16.01.2022 11:51:39: <p style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;">Прошедший 2021 год выдался непростым для каждого из нас, а особенно для малоимущих семей, которые находятся в тяжелой жизненной ситуации.</p><p style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"></p><p style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"><b><span style="color: rgb(171, 160, 0);">Приглашаем вас присоединиться к доброй акции «Семейная почта»&nbsp; благотворительного &nbsp;фонда «СОЗИДАНИЕ».</span></b></p><p style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"></p><p style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;">В рамках акции более 3 500 малообеспеченных семей из далеких регионов России, попавших в тяжелое положение, получат необходимую помощь и поддержку. Все семьи малоимущие - это погорельцы, беженцы, семьи с детьми с ограниченными возможностями, дедушки с бабушками, которые одни воспитывают внуков.</p><p style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;">У каждого из нас в доме найдутся вещи, которыми мы не пользуемся и готовы поделиться с теми, кто особенно в них нуждается.&nbsp;<b><span style="color: rgb(0, 53, 98);">Давайте вместе сделаем доброе дело!</span></b></p><p style="font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px; color: rgb(51, 51, 51);"><span style="color: rgb(34, 34, 34);"><span style="font-weight: 700;">Ознакомиться с подробной информацией вы можете в презентации.</span></span></p><p style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"><span style="color: rgb(0, 53, 98);"><a href="https://portal/PublishingImages/Lists/News/AllItems/%D0%9D%D0%B0%D1%87%D0%BD%D0%B8%202022%20%D0%B3%D0%BE%D0%B4%20%D1%81%20%D0%B4%D0%BE%D0%B1%D1%80%D0%BE%D0%B3%D0%BE%20%D0%B4%D0%B5%D0%BB%D0%B0!.pdf" style="color: rgb(32, 103, 176); transition: border-bottom-color 0.2s linear 0s; font-weight: 700;"><img src="https://portal/_layouts/15/images/icpdf.png" style="border-width: medium; border-style: none;">Начни 2022 год с доброго дела!.pdf</a></span></p><p style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"><a href="https://www.bf-sozidanie.ru/pozhertvovat/pomoch-veshchami" style="color: rgb(32, 103, 176); transition: border-bottom-color 0.2s linear 0s;">Благотворительный Фонд "Созидание"</a></p>
17.01.2022 10:41:43: <p style="box-sizing: border-box; font-family: Georgia; margin: 0px 20px; line-height: 1.8em; text-indent: 2em; text-align: justify; color: rgb(0, 0, 85);">Каменные арки гигантскими прыжками взмывали над землей. Пока еще он&nbsp;был пуст, и&nbsp;только ветер гулял по&nbsp;сухим водотокам; целый год ушел на&nbsp;то, чтобы соединить земли на&nbsp;севере с&nbsp;землями на&nbsp;юге.</p><p style="box-sizing: border-box; font-family: Georgia; margin: 0px 20px; line-height: 1.8em; text-indent: 2em; text-align: justify; color: rgb(0, 0, 85);">—&nbsp;Уже вот-вот,&nbsp;— говорили матери своим детям,&nbsp;— совсем скоро акведук будет готов. Тогда в&nbsp;тысяче миль к&nbsp;северу откроют шлюзы, и&nbsp;сюда потечет прохладная вода, чтобы мы&nbsp;могли орошать поля и&nbsp;цветники, плескаться в&nbsp;купальнях и&nbsp;подавать к&nbsp;столу полные кувшины.</p><p style="box-sizing: border-box; font-family: Georgia; margin: 0px 20px; line-height: 1.8em; text-indent: 2em; text-align: justify; color: rgb(0, 0, 85);">Дети смотрели, как на&nbsp;голых камнях поднимается акведук. Он&nbsp;вырос до&nbsp;самого неба&nbsp;— на&nbsp;тридцать футов в&nbsp;высоту, и&nbsp;через каждую сотню ярдов щетинился желобами, по&nbsp;которым струйки воды должны были приходить прямо во&nbsp;дворы жителей.</p><p style="box-sizing: border-box; font-family: Georgia; margin-top: 0px; margin-right: 20px; margin-left: 20px; line-height: 1.8em; text-indent: 2em; text-align: justify; color: rgb(0, 0, 85);">На&nbsp;севере было не&nbsp;одно государство, а&nbsp;два. Вот уже много лет они рубились на&nbsp;мечах и&nbsp;закрывались щитами.</p>
17.01.2022 10:42:55: <p style="text-align: left; box-sizing: border-box; font-family: Georgia; margin: 0px 20px; line-height: 1.8em; text-indent: 2em; color: rgb(0, 0, 85);"><b>Каменные арки гигантскими прыжками взмывали над землей. Пока еще он&nbsp;был пуст, и&nbsp;только ветер гулял по&nbsp;сухим водотокам; целый год ушел на&nbsp;то, чтобы соединить земли на&nbsp;севере с&nbsp;землями на&nbsp;юге.</b></p><p style="text-align: center; box-sizing: border-box; font-family: Georgia; margin: 0px 20px; line-height: 1.8em; text-indent: 2em; color: rgb(0, 0, 85);"><i>—&nbsp;Уже вот-вот,&nbsp;— говорили матери своим детям,&nbsp;— совсем скоро акведук будет готов. Тогда в&nbsp;тысяче миль к&nbsp;северу откроют шлюзы, и&nbsp;сюда потечет прохладная вода, чтобы мы&nbsp;могли орошать поля и&nbsp;цветники, плескаться в&nbsp;купальнях и&nbsp;подавать к&nbsp;столу полные кувшины.</i></p><p style="text-align: justify; box-sizing: border-box; font-family: Georgia; margin: 0px 20px; line-height: 1.8em; text-indent: 2em; color: rgb(0, 0, 85);"><u>Дети смотрели, как на&nbsp;голых камнях поднимается акведук. Он&nbsp;вырос до&nbsp;самого неба&nbsp;— на&nbsp;тридцать футов в&nbsp;высоту, и&nbsp;через каждую сотню ярдов щетинился желобами, по&nbsp;которым струйки воды должны были приходить прямо во&nbsp;дворы жителей.</u></p><p style="text-align: right; box-sizing: border-box; font-family: Georgia; margin-top: 0px; margin-right: 20px; margin-left: 20px; line-height: 1.8em; text-indent: 2em; color: rgb(0, 0, 85);">На&nbsp;севере было не&nbsp;одно государство, а&nbsp;два. Вот уже много лет они рубились на&nbsp;мечах и&nbsp;закрывались щитами.</p>
17.01.2022 10:43:32: <p style="box-sizing: border-box; font-family: Georgia; margin: 0px 20px; line-height: 1.8em; text-indent: 2em; text-align: justify; color: rgb(0, 0, 85);"><ul><li>Каменные арки гигантскими прыжками взмывали над землей. Пока еще он&nbsp;был пуст, и&nbsp;только ветер гулял по&nbsp;сухим водотокам; целый год ушел на&nbsp;то, чтобы соединить земли на&nbsp;севере с&nbsp;землями на&nbsp;юге.</li><li>—&nbsp;Уже вот-вот,&nbsp;— говорили матери своим детям,&nbsp;— совсем скоро акведук будет готов. Тогда в&nbsp;тысяче миль к&nbsp;северу откроют шлюзы, и&nbsp;сюда потечет прохладная вода, чтобы мы&nbsp;могли орошать поля и&nbsp;цветники, плескаться в&nbsp;купальнях и&nbsp;подавать к&nbsp;столу полные кувшины.</li></ul><ol><li><span style="text-indent: 2em; font-size: 1.6rem;">Дети смотрели, как на&nbsp;голых камнях поднимается акведук. Он&nbsp;вырос до&nbsp;самого неба&nbsp;— на&nbsp;тридцать футов в&nbsp;высоту, и&nbsp;через каждую сотню ярдов щетинился желобами, по&nbsp;которым струйки воды должны были приходить прямо во&nbsp;дворы жителей.</span></li><li>На&nbsp;севере было не&nbsp;одно государство, а&nbsp;два. Вот уже много лет они рубились на&nbsp;мечах и&nbsp;закрывались щитами.</li></ol></p>
17.01.2022 10:44:03: <p style="box-sizing: border-box; font-family: Georgia; margin: 0px 20px; line-height: 1.8em; text-indent: 2em; text-align: justify; color: rgb(0, 0, 85);"><ul><li>Каменные арки гигантскими прыжками взмывали над землей. Пока еще он&nbsp;был пуст, и&nbsp;только ветер гулял по&nbsp;сухим водотокам; целый год ушел на&nbsp;то, чтобы соединить земли на&nbsp;севере с&nbsp;землями на&nbsp;юге.</li><li>—&nbsp;Уже вот-вот,&nbsp;— говорили матери своим детям,&nbsp;— совсем скоро акведук будет готов. Тогда в&nbsp;тысяче миль к&nbsp;северу откроют шлюзы, и&nbsp;сюда потечет прохладная вода, чтобы мы&nbsp;могли орошать поля и&nbsp;цветники, плескаться в&nbsp;купальнях и&nbsp;подавать к&nbsp;столу полные кувшины.</li></ul></p><p style="box-sizing: border-box; font-family: Georgia; margin: 0px 20px; line-height: 1.8em; text-indent: 2em; text-align: justify; color: rgb(0, 0, 85);">Дети смотрели, как на&nbsp;голых камнях поднимается акведук. Он&nbsp;вырос до&nbsp;самого неба&nbsp;— на&nbsp;тридцать футов в&nbsp;высоту, и&nbsp;через каждую сотню ярдов щетинился желобами, по&nbsp;которым струйки воды должны были приходить прямо во&nbsp;дворы жителей.</p><p style="box-sizing: border-box; font-family: Georgia; margin-top: 0px; margin-right: 20px; margin-left: 20px; line-height: 1.8em; text-indent: 2em; text-align: justify; color: rgb(0, 0, 85);">На&nbsp;севере было не&nbsp;одно государство, а&nbsp;два. Вот уже много лет они рубились на&nbsp;мечах и&nbsp;закрывались щитами.</p>
17.01.2022 10:45:01: <div><br></div><div><p style="-webkit-font-smoothing: antialiased; box-sizing: border-box; margin: 0px; padding-bottom: 7px; color: rgb(51, 51, 51); font-family: Circe, -apple-system, system-ui, BlinkMacSystemFont, sans-serif;"><span style="-webkit-font-smoothing: antialiased; box-sizing: border-box; font-weight: bolder;">Операции форматирования</span>&nbsp;включают в себя выбор выравнивания абзацев, отступов и отбивок между абзацами, обтекания отдельных абзацев, а также видов и начертаний шрифтов. Эти операции выполняются различными текстовыми процессорами с разной степенью автоматизации. Суть форматирования заключается в способности текстового процессора изменять оформление документа на странице, а именно:</p><ul type="disc" style="-webkit-font-smoothing: antialiased; box-sizing: border-box; list-style: none; color: rgb(51, 51, 51); font-family: Circe, -apple-system, system-ui, BlinkMacSystemFont, sans-serif;"><li class="MsoNormal" style="-webkit-font-smoothing: antialiased; box-sizing: border-box; position: relative; display: flex; margin-left: 0px !important; margin-bottom: 8px;"><div style="-webkit-font-smoothing: antialiased; box-sizing: border-box;">изменять границы рабочего поля, определяя поля сверху, снизу, слева, справа;</div></li><li class="MsoNormal" style="-webkit-font-smoothing: antialiased; box-sizing: border-box; position: relative; display: flex; margin-left: 0px !important; margin-bottom: 8px;"><div style="-webkit-font-smoothing: antialiased; box-sizing: border-box;">устанавливать межстрочный интервал (разреженность строк на странице) и межбуквенный интервал в слове;</div></li><li class="MsoNormal" style="-webkit-font-smoothing: antialiased; box-sizing: border-box; position: relative; display: flex; margin-left: 0px !important; margin-bottom: 8px;"><div style="-webkit-font-smoothing: antialiased; box-sizing: border-box;">выравнивать текст — центрировать, прижимать к левой или правой границе;</div></li><li class="MsoNormal" style="-webkit-font-smoothing: antialiased; box-sizing: border-box; position: relative; display: flex; margin-left: 0px !important; margin-bottom: 8px;"><div style="-webkit-font-smoothing: antialiased; box-sizing: border-box;">равномерно распределять слова в строке;</div></li><li class="MsoNormal" style="-webkit-font-smoothing: antialiased; box-sizing: border-box; position: relative; display: flex; margin-left: 0px !important;"><div style="-webkit-font-smoothing: antialiased; box-sizing: border-box;">использовать разные шрифты и т. п.</div></li></ul><p style="-webkit-font-smoothing: antialiased; box-sizing: border-box; margin: 0px; padding-bottom: 7px; color: rgb(51, 51, 51); font-family: Circe, -apple-system, system-ui, BlinkMacSystemFont, sans-serif;"><span style="-webkit-font-smoothing: antialiased; box-sizing: border-box; font-weight: bolder;">Форматирование текста</span>. При редактировании документа изменяется его содержание, а при форматировании — его внешний вид. В текстовых редакторах различают&nbsp;<em style="-webkit-font-smoothing: antialiased; box-sizing: border-box;">форматирование символов</em>&nbsp;и&nbsp;<em style="-webkit-font-smoothing: antialiased; box-sizing: border-box;">форматирование абзацев</em>.</p><p style="-webkit-font-smoothing: antialiased; box-sizing: border-box; margin: 0px; padding-bottom: 7px; color: rgb(51, 51, 51); font-family: Circe, -apple-system, system-ui, BlinkMacSystemFont, sans-serif;">При&nbsp;<span style="-webkit-font-smoothing: antialiased; box-sizing: border-box; font-weight: bolder;">форматировании символов</span>, как правило, задаются параметры шрифта: гарнитура, размер, начертание, тип подчеркивания и прочее.</p><p class="definition" style="-webkit-font-smoothing: antialiased; box-sizing: border-box; margin-top: 0px; margin-right: 0px; margin-left: 0px; padding-bottom: 7px; color: rgb(51, 51, 51); font-family: Circe, -apple-system, system-ui, BlinkMacSystemFont, sans-serif;"><dfn style="-webkit-font-smoothing: antialiased; box-sizing: border-box;">Гарнитура шрифта</dfn>&nbsp;— это термин, которым определяется общая форма символов. Например, гарнитура roman является общим названием для целого семейства классических шрифтов и отличается засечками на концах букв и комбинациями толстых и тонких линий в начертании символа. Эта гарнитура легко читаема, поэтому разработчики шрифтов создали на ее базе множество шрифтов сходного вида, например шрифт Times New Roman, поставляемый с Windows.</p></div>
17.01.2022 11:40:30: <p style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"><b><span style="color: rgb(0, 53, 98);">В ходе итоговой пресс-конференции Генеральный директор Росгеологии Сергей Горьков рассказал об основных итогах работы Холдинга в 2021 году и планах его дальнейшего развития.</span></b><br><br>Глава Росгеологии подробно остановился на ряде ключевых вопросов:<br></p><ul style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"><li>Инвестиционная программа на 2022:&nbsp;составляет в общей сложности 9 млрд рублей - 5 млрд руб. собственных средств плюс 4 млрд руб. в рамках программы докапитализации. Это рекордный показатель с постсоветского периода. В течение следующих 3 лет общий объем инвестиций в модернизацию компании составит порядка 23 млрд руб. с учетом докапитализации и собственных средств Холдинга.</li><li>Цифровизация:&nbsp;утверждена стратегия цифровой трансформации, развиваем направления Big Data, искусственного интеллекта, Блок чейн, ведем разработку российского ПО. В следующем году планируем на 40% сократить зависимость от западных производителей и инвестировать до 500 млн рублей в направление цифровизации.</li><li>Водоснабжение регионов РФ:&nbsp;выполнена задача Президента РФ по обеспечению питьевой водой южных регионов РФ, в том числе Республики Крым и Геленджика. Завершены геологоразведочные работы в Азовском море, в ходе которых установлено наличие запасов пресной воды под морским дном.</li></ul><span style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;">Подробнее смотрите&nbsp;</span><a href="https://www.youtube.com/watch?v=PfPiBjWVWgE" target="_blank" style="color: rgb(32, 103, 176); transition: border-bottom-color 0.2s linear 0s; font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px; background-color: rgb(255, 255, 255);">здесь.</a>
17.01.2022 11:41:22: <img src="data:image/png;base64,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" 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17.01.2022 11:42:03: <img 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" 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17.01.2022 11:42:36: тст
17.01.2022 11:42:47: <img 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KEVzQ21WGuoRsMH8qAqgIjyidR2UQBvN6OO2eaqe5ATpILU+/TQDF+hTsTj29GQF2qUTY0f4ETL0o9E3aVBadEPMFi/YUGke10abmZDiZX3xkG76QdouIfNV78s/DpPu6kWQ8e+gdJVy3CFFOLKXQkoryrHJSEtD65fdOHX0pzwRA/1Ng9TQ/GasleYU1qP3z57DwqSgA+v3MCKe+5B18sRnBXxwJPbhcXtqvnSvah5eTe6Hk/GV3EDv54Bvqq/D6f+tRGVQq8iDMnfoXyXo+lBDVZ9TIr98TIUPPQgrK/VYvOCXoqIMGz94yJxFCaK+6MuV1g+xGMbTRQoH0YDvoF3Xqv2PS+S3JffW4HTxx5EefocLN3/jkNWjzBcvYGCkXDn1BEPPZXzhVXMObZh4E9xyKlQ5gdJWrxwYC8GStX1/NO/W4sLe1ajQN6ju3MZvqfQ7URsrj+Ed55MwwN3kQ6w9R8PfgPW+i0BQasLO75PcsvfB5P9L9H1s3qfjsSqr9GS8tAPUBfSuYosVlcWV5alkGU1Tj0eL3TU/mb3a5jI+CoKxFNkM8lIX/VVur4qpI0poLoueJz80yb1I7jejuTXfkIN1bN7ycdJJ4Kgpj6E0QjyedPS6NilnzfBUl+H0yHWRUWsvzfYdJQJX95OYdgPyzEUtR6LpD9SIfjc155vkn5VHQLVPjJ0nUaHCrv/yndw4mdFeCEvDoOv/juqXv8D0jc9BGNGuLqILJ/wbRf5uLtWQqune1rLxOUrgcTQJiyAAq4TT4bvwKvTO05UzN8ynJ9/4a+3z2PnG/NXpSMiv5/v2hnsOGfpkGT/10fnrdKRLw6SfsVUdu+9e+e7/iAd+hS4+m97P/Vn3nw+G1l+pvzhjflHmd3983npgBfJHhccD8F/HCW5RXH9p8YXsE45tx03b03UkiP9CmTB2qaVKHox2HEO54uJ9pF6zL9fvwQ/JOB8pnjXAy5YEyb5wlBrxTgczqfGLRREcTgcDofD4Xx+uIMNR0l/czgcDofD4XBUwkeiOBwOh8PhcGKAB1EcDofD4XA4McCDKA6Hw+FwOJwY4EEUh8PhcDgcTgzwIIrD4XA4HA4nBngQxeFwOBwOhxMDSxREzWLCasa2/1EOLfvW27fKsWF3CywTYb5H9Kkyi9O1ZdA+1QFLex2032rCQJjveQ0eEb9DptxaIHxCjcNhON9Ha2011n7Lqx914b/az+EEcH3ibTTsZt9Zk3ToW63ix9g/dT5Ac6GYh0qr3GfPYaBBPG6M8J28LzZ/wCC1K3oDk1U59LvNGFT4gj9gwHe+DGu3N6HbPiudE7l2ntpP9k0+Op9eWIdm78ernW/CyHSDbez7sOJRzueIJQiirsKyuxq6p3+F9svsW0UJeODOG3j33Qt47O+rUXNeqSyfDYnYvKscdXd/iGZrHBqObecfYOTEzu/fRNGjbdjxthMffgKkkM6XVn1X/Jgrh6OC6x+0YMPfd+OZd924QvurVmnx9IFHg39X7aZzL0w19yGb/vpxw8u+D0Zf/+BlVL5Kf9zzt2h+ZKV4kBPAHHW665D30iR+/ckyfJV9W+/dXyHPZJYCYhaI7sHfsPMf03n2Tb+LF7H1+7VotgsXCLqweQe1n1du0Hn27b1JVO2gQEo6z/mcI3z8ZRGI3+naPo8tR+bf+sMn0tH5+T9++Mb80zuPzVtd0oFbCOs/s+85bZ9/4T+kA19A/mhrny//h38U5LBqy3Pzx/7jmnTm5hH2mdf/P/NdL1TOr6JzKQV755ts/yWdIOjcqX/eO//Vb1K9ffMf5wte6Jsfl04tPdfmT/1Pph9Pzpf/22/n/3hdOsz5/POHX88f2yvqEP7myfnSzv+Y/6N0aqkJbz//Md/0d0xXd8+/YLsy75aOfrb8n/l3XhD93gMnfkv7v51v2iLqedOH4hW3OjfHp30itnV1PZLP+S/JP0jtx/X/Pf8007e/OzpvlXzFuNRmZgtyJly/ne+qOzTf9f8V28+rvc8J51OOSg2Q9xuK/Puwn0sWORL1O5zuYgOMyfjp4SrqiceJh4kVGd9B84sm6H1foJ7FpdebsHmzODSpGLIkHK/X0nE69gpdw4Y9v1WOovb3cU06D4rWhSFN+eYb3gwzXOodDj3yG3GfjZw9Jd3vO6YWDxyyYdc7DFUwdQXmsQI1XR0oEspZjs0Nb+KSb+rwN2hg9wWdGgw4x0Y72FRRIe1/xA5EeLZ82JdtgfKTEymfH72HuqffRdvFG8Iu6xntKPP3nBjX7G+icrs0fWuowDbZs0Kd806TNnzArrqKbqEeKtDARivDPtODwZcasfVVl9Brn55xUE+tESd+z84Bl15twWPdDmFUCJ/cQO+r3dDXDvjyE3R6NuTQuFJPtZtr0dD3O1yXzrJ6aX1Xg6f3bMDyV5vw5XzS5e31aJXp8kIipEmElKdX7726ukCfCef7aPZNC1Fd1nbIphO8cvZva5/yTzeIdiebrpGeJ+6H01dvuuK5CSmdza/8Tjz9p/dQyfQ32NR5JJsM1GXv5pNBmPIGvZflcQ6nW9jooahD+NiN9qZmbG6/RDveslTjxAQ7CVy3Ngl1oW14T1FPAou0n+vnf4mGq8loqvkqhmr3Q0PPWftU4PKHMDoTRj4L6lOOom4DiceGJ3+A8juBX7/0Mmoa/gVVJKgHSsphypAuYYTVNb8+KTev/izUxeDn/frm6KsTbcJ7LJI9eM/LN2brKnyan/A2oyRObOue24J0YT8RK4QRaS3Sv0L/fDwLQaVWrUa6NPuRvkoc1Rt2SvV991oUPVeNoq+I7eeKuxOFf/Xpfyb8G4lg/s1XxzHVl+Sjf9+FzWx/e5dYBsaf3kcNs+tHvSNtMgL1608foEGaJg6uc7cHiwuiPprE4GX6d8192CBqUEiG2mvxtecvondmGR5YswzXhSHLPTANyKf76Nihi7h05zKkUGP4i5fasLnlg4VOTAFb7yQNl36yDA+uWrZguFTOtYGXYfJaaJRMvF6PHGnYVeBjF9qa2rBW1mADbhxqehcDWIZVYA36K9iwO8q5bBZA/f0r+MXKr+KtH1cIgai6Z8uQ5Fdn9UgHAgmTz7u/icpjT+LqOTPm32/F+B72aWc3TlhZgyMNP3//FfzYHo/NRX+NPXlxGHj9faERCXfOxyfMSe3D1kENyhtrUbOOnEbYZ8ZB/8MKvPOzI8K531Yl0DEnBqVAee0jFbD+KztH954pxx7yUdNvvycFn9HAhua9eioeYQHbM/sOYoPQ2LJgZwy9FNRZXnobExn3oamInCMd2xFy+D1ymqpkFgpparFKmhYCq8u330Xeo/U4HaL8Hw7+Cnk/CRIcLIL0R7bjp/cAvYdeRvfvqcwvdeHHFNQ+fbg84tR5VDYZQ3lFSLY/rITV0irqieXbeJSO/vrV96gxWImiXX+LAtKpfzhyEhN/+g2aGy5i+s570F31TSwXEwggdvu5dPF3lPYsmo9cxPJNf42mx7W4PngBj32/SSpDZJ25Kdy9AXXPpiGF5HDoVSoJlb/hh/f6yx+z7GPkowHUPT+JaWl3UUSok0iotZnrH7Sh5lUg5aGHYpveZ7pHeoE7V8P04CKnUBdbX1/ZgprH6d+L78Hi7QD85j0cIrsuKHko4tTzUHcbnhEffFuzuCDqk7ngDXgg1Cs98ZIbuOcbuHCuDYM/b4NDcmJt5MTkAcaDVXsxcdp//tcd7yoj3qInRSfIthe/A+3Em2h4myltEf74v9sw0NOGPx5j8/tu6rkJQx5+KB91+8ag1WvxoHRIPR+gu4EM+s40/FRozOn51GC/sIo12K9RL1K6jPHwdqEME+ekBn1wAAPSqElkPkARNai/QBq6flyNzaw3E82zJflcPcCcRARC5nOOgtx3se1R1oswYfNPxFEWsed0FZafXMCvqafV9a9NOLHLhIb6Jkz0ULD3pXDnhCQEWnfXUQAFfO/ZWrRu8DqKcM8k7r4XGzLEHpqIBmu/Iu1/QgHVS7Vib4t6SOICb9JNNjIl4wUzye2t7wp6FRTnAJq7SU9X3YO3pMbW/a/fxveE3vlbwojK9Y9Zfm5gRWkFLDUmVO6qxWmvvr3uHVmRETFNdTJD90tCj+6Ob7+C16RDjCFqvH9B5fzent34I9OL94/gnSINyWRMGLnwcx+s7DyV/3vSETmvPb9PTL/sgnREzn/iREsrmls60H3+P0PY/F9i27MsEHGgcnctKqnMKQ/9AHV58dL5EEg2iVUaYU2OQPJ3YJHyKtSV1+Z3fV19efXfxVXhPNtIlnTo+ieT6N5XIY4wbX9b9CtX3WLDmL4VrXuo1Rt8C9u2v4xnqONcfiDC2smY7Ify4SR9oE7Ohpo6ob4ra+ox+CzZK5Wh9V16cCSduSu0fLxM9HVTfVGdvULldIbqSEWHel0DHn32AJ1/Ei9I+0pI199i9x9AF6uYoMxh4KV/QRvZ+QPBYokQ9uAjsJ2I5F+CEt5mAhHWuZH9TFA7d/rZDVghHVcNBVAN33+JdC8ZTS9XYbNvFkcdgn+Tymx5ZGUM9UXtBtNDH3HY8Pg3RN/26vtkJ7PUuaMAj9om06a/EC8JxUQXaqjNf4Ds+nZncUFU8mromYJfvhA+SPAOaV78Fe7LZ0pMm/GtoMq/4m7J6X7lmygSDOwqJoIOo0p85MS79M/02934MkuXti/vuIBhduwTufNwY6DpZfwYq9FQ8c3oFdw5iUHWKH/9fmz2NuZ3349tpUzpXHDII/u7NWLv7Uv3wyhEa86AMlxAnpRXNvV4WiG7G7jysfSnl2ieLTmXlfsc+Oo9D2Lb1/1TrAsIkc9rA03YwHrBn2jw4JoEaBXGTPXBRg3uuQ96IcCTE+6cnysfS6NpMsI/U0Qctjbha00uesY3YRSmGS6h2ST2tpbTfQ+ujNBoh+P3YxS8EnkPUvAqym15+hZUst4Y/gAHq5c7xePpyf6h9uVfWS0M5U9POBaOOEZMU53MgnMVl4QeohbGDWslnU7EhtLvCI3ru1fko7ySzlGj84ukZBx7+P4QIyzBcKKt499RRR2arTv2hx4dpnLVlSzD9GUXBYXJaHgyUkMi2eQnWjTXbJCmQ8IRTXkD+GgAlWy0j9qAdNKTtbKlB17Sv1uEF5Ioncusw/dt1GyQB+1BiMl+qP4pGGKsXelPXytN8bxmpyBKjR5GYHjwItUX1dmhbtz3aL26X476Rn60KH+YNbYXUfkSazwZi5B9DFyztqHoVWrca0pQSZ3FxaLGvywkCpv5/ZvYRu3Or1fdB8uxMuREGH1dyFV076YA6ooGLxyrQ2XGIvyYwBLVV8ZDqLyHfNurb1MbfwEWNmDx+HciBHhjOPH8L9G78j4071orHbt9WeSaqLUwlrAxSydq9pkx+JE/aGFrPEz/owqVff8J3JUoOkhSMOsZKVo+sxsXWC9L6CWEgAUOd66kBkvcDcrdycKoUor+2xiXovB5y278lj1H1jODlSJjwSi3xzbMmpwGPXN+v3mflMlbzv/E6T7WbEYySml+3IfUwzlHebl4Ed9ukE/33Yd32Cgc9Zor6bgQfEbzbG8P7F8fRPrFd7H5pSCjIyER83npN2PkSJPR9bMWDPy8CQPP3iudZ1B9sOD24gUMLgicw53zs+fYc0IP9BcNbeiWrgv/TMI+gIlHxFE497H78NWLv0RRF/WmnGMYYEPGReW4xO77eTXqZNXuR4XjpGBI6HFaf+WfCvzofVhYlI4/g/YuklB6mjBiMkGNnTeQuD7xobhe4yuJC4OGiGmqk5mvXhUjaSuxVggkHbBYyc4EPJgYeE/ooDy4Sh4ESDr3/l4c+4oTO3a0+dadMLw90XnzfdIROX59Lae9X3e/R6FrECZOoq7jBlKokXqA+YSXQkw1e5FssmDPdhSlq2k0oilvABMX0Ub+5NFn6zAo6Ml2mKRTXiZe6cYzM5TOGgogLr6FBsVSAzWosR8K1u5ZLfw7eMW/TmTCLpZHKIMKPYyEtz6FqW82Ahd2zR5DGvkhGbH6aCU/+QLFdcPdHWj+gPkcdbK/TscY8k7GAu6MVIZLqDtyEdPCrwLTpGMBBLWH0ET0L0EJbzM+WABFAfpAxjdw4WcBI8jetu/KGCak6fkJqd6zk706fxUWNjr/m2Q0/awRNfcuNoBiRGcra1eGqq+/QNEP70EKBUZD3WRD0KDm8fAdsIl2smvqrDxNOqRXoau3OosMoljvrQqnHqTe58VfIW+jCdrNVcIC7y+TUrVd9mA5G1n60jex7UlyTFcost9YhrWF5dBuPIz7vk9KGbDu49pHs4IhOqzdaKb2/4Ef/q0wFB+S9O+g5iE2lP4WdPeXQ88WXhsP42u7T8oCE+KKG79e1E9178U2tl6AHNJWownphWyx3n78A1lVykOPwijvRn/kpMbDQ4FkF5qDzo9LPZx8NjK2kOVf2YLmZ7VUpldQKSzIi+LZ3mHuv38XvdKhkITI59p7mONy4gTrfZx/G60d8iZzJYw/vI8aSQe2fr8KpiOtqKmtQrqhDpbfhzsn3U6suJMMs0YMFLc2nBQCxfDPpF7akX+hNHcJZdNQj+9DOrqCjQpRgCnMCFoHcML6Pk6//gpOyOLG63Yz6rrpj1X3ICfSUEfyQ6gpCdTTNhyiKnjgyW+LUzsZpMvUMx4mORv3symuRhifJodPzuWFYD3ViGmqk1kocrZ+V5jm+cXz+4UF6XqDCbpDpPl3rkbNpr+UrmJIOnf/QexgI/KL4et/EaTj8zux93lnGlpfbEQrlXn67X9BTbhARLLJ1u/K8xke9eUNIP2rKKV/Bl99DZbzFJB0/S9YxDMiE10wHXJSZ+y76H5ZnCpv29cSfu1ITPZDervum8IC7teer8c2qu/mI3UoomeDZFe5gcqgRg+jJCdkIyly/bz0OoNVf42GRygPX/o6KmtY4+nGM893CFOfEWX/+7fR8BNWjtXYfE/gSN8HaN7eiGYWhXxykYKOKmzY/TIswpoZKqfihx6kF1eS8dNnt6oYnVRHpDoJjgqbYVNwT7+C9o/Jb390EUVUX4L/pU1YnM1GKdkI4lVKK78cazeXQfc8K6kG2/LYKA1b/1aPx969QXKbg+Wpnb777/Aulo+RSPU11F6Nbe2i1A/tpvr4H3Wo6RPt9ZmyWnRLo5fL8/4WNeRjn+m+IJsBCM0w2TUe346GSFP5twmLDqKERvVwI3574D6UrlkGzLjEBd4PfgPvvNVEghSNN6e0Hr999h4UsPdkXLmBFffcg66XKVINcAjvNh2G5n4TVtb+J/TP7sbp0kjDgYnYXH8I7zyZhgfYOzrIKB+gZ1vrtwQ4eg2aahZnlNpNtRg69g2UrmLv8nDjyl0JKK8qx6X6gGmLN9jUoglf3j4A/LAcQ4HnZXyV5PBWzcLRuPRHKoTRmteebxJ+MaT62T6WCXKwlAYdlhEJkc8Vm6pwoSoN117txt/sOAlL8l8Ixuhl+b0VOH3sQZSnk9F3/zsOWT3CMPEG6oWHO6dACBQpMKTg1/TK7yI8cyWK6svR9KAGwsj+nctQ8HgRNb5sXv5eVB4rwtN3/w41T7dhW8tVrH3IH7Euv2sltHrSh9YyFe/giUNOhVJPkaTFCwf2YsCnh2tR+eMf4Ok1QO8bbIrrQwocEvA0WyB/78IpIjVpqpZZMJK/g+7XJNl8TI3PxySbhx6E9bXakEPuq1aloenHReE7JwqkxoSC/gEmy+cW6uvEK234B2poHq0phzGZyvzDrXia6q9tH90TcoF8DDYZQ3kF7n4IzeYHsfmjC3hsRxsq306E3icAKQCkUjUzW/wS6dQuCiA+GcO2l8IsJo7RftgC7uaXH8Sjd7nRTvVd1T2JCdKJYy9Xk+zYBWr0MDzeNW5f+wnw9LN7URlu4EVYSC8ugXh6V4lvKmp53nacoA4qrvwKNexXl5Fkn5yM9FVfRdfPgq3n8eD6RWobpLVqEz1NGDhMDfVrwddFPfDkdmxbqgiKiFgnEQhpM1+Kw3I2Y0JcueISfyGsIA4bag7BKrVPH86IPr/rZ/WoFIKReCz3uiuS6bvSDwmWhAj1dd3pRO8VaX1aPxuhq8OJF1sC1kUx7oWxhP2YBygt+k5ke6Ug7cSToX6QcftxB3vPgfT3Zwr7qeVKitDZMDRbFHdLwn7iyRbmsqFm+VTi541bJZ+fc64Lo6bkRO8mRygd43wBWDL7ocDiozlBh3xrQW9b2OsyXsIzLIhSLOGQfqmLwOOcmw1bY5rXzYKoehT5+51SWwzZ8VmcbtiFb79+D945UxXTSOjtzBKMRHE4X0yW350oNH48gOLEBgvARR26/fk6atj6ogWB0koUvRjsOOdmo9/F1nspAyiG9pF6/3HWYbh/F0zn03Ds5civK/kiwoMoDofD4XA4C7m3QljAP9FTB9OifzF4e/K5mc7jcDgcDofDuZXgI1EcDofD4XA4McCDKA6Hw+FwOJwY4EEUh8PhcDgcTgzwIIrD4XA4HA4nBngQxeFwOBwOhxMDPIjicDgcDofDiQEeRHHUYzcj5/4K1Lz+JmoKy7D5Fe+HLTkcDofD+eLB3xPFiYI5XOp7GQ3tvwPWPYq6XRuW7AOhHA6Hw+HcanzGI1GsUW5B0Wbxq9VrtzfB8nuPdC4y1853wLS9XLg3vbAOrR+E+WL8rcKffgfLkVqs/RbJ5Fvl2NzwNiakU5898Vi7qQInft6EE7dTAOV8H621VUhnH9k1VGBb1we4Jp1i9dHdIJ7Tbq5F8/k/SCc4HA6H80VnkUEU+3ikGAApt1p0O8Ur2EcOF5x/6k042MmJ12DadwG/kL5c/eHFi3js7xtx+iO25007MC1p/6P3UPf0u2i7eEM4d+XKJHaUUSNnp50/vY+aR+nabzX5viA/8Uq18OzN7GvkC5jFpdebsFkK5lhAJm8sg5XB+PpV8SQ1wM27K8QG+H4Kemo7MCjldyGh5NWCQemKS6+24LFuh/g18E9uoPfVbuhrB3yNejh5sg9Hsn1f3mQsOCd8E0l+rRoZ+Ovi+get0LNn+455yyaVxfkmjOx8mLxds7+JSgqCtew6Fry0vy/qBbFkMhfKWYGarg4pWGeB6Zu4JOkFC+RPt7Rhx9suXGG7H7vR3tSMze2XaMeDwZcasfVV8dz0jANVOxpx4vfswoV1ufYpsz8fgfL90wdoKBSvY8e88gjcGj5QI2s6Zu/AtkKxA+HbjvxGPMnhcDicT4XPdiQq/TtoNe/FH9mHKd8/gneKNBQ4jMFyXsWI0t3fROWxJ3H1HLu3FeN72Ocr3ThhpcbvS/ejruYepHxyEZUvvY/r1KBXHqLW556/Ret3/1K8X8ZQey2+9vxF9M4swwNrluE6BWRVO/bANBAhH79/E0WPtqHqXbfYAIOCnrffRd6j9VIgGD1rH6mA9V+PCN8rmj9Tjj0rqfF++z0MxpieWqKTwSW0Pv/v+LW0FxN2MzZ//xX8mILg5asS8NVPKHh5qQ05soAxKDHJ3I1DTe9iAMuwil3/6ivYsFsK5BGPzT+shNXSKsrc8m08Skd//ep7GEIc9D+swDs/Y/XRit9WJdAZJwbtwfXiw8FfIe8n7+G6tC9nqLsNz4gZjpJgsv4Nmre/i/YrYgeCw+FwOJ8NSxREadH1FgtmzLAWSYcCeMFM59/6rtBA+fHg2m/+BZsNrCddDVOfWzjq+HhO+FfEga3fFnvaed3SIYE5aujfxTY24nS/CZt/Io6aDDvFe5fnlaP7cdrv7sDmp17Ba9CgqWbrwimoP72HEy/Rc+/5Bi6ca8Pgz9vgkBrSNmpIvSMjDKEMQsBnhuWRlRiixvgXnwDf27N7QSDY0BdsxMuLV14H0KWXDnn5hBrpl2rFUZZH6TnCyMMcrrGRKRnB5RmZ157fJ45alF2QjhBRyIAx8crLqLqixaOBeVeNBwOv/ooCg2Q0/ewoJnqacOl/P4efUnrTbw9gwDuaQyyZzB/ejonTbZg4JwWmg/QcYUQJuP7JJLr3VQgjYtrtb1PwRFx1i8HQ3fdiQ0Yi+0tCg7Vfke/fByvLB9XF96QjC5joQg3J94FVlE8J8UvpZlx9Vvx2vbecNfcKuz5EWWvoXukAw+nAENMHKpNbena0esDhcDicxfOZjkQNtdch76VJTNyZgAfXxFNooZ5rA03YwEZOPtHQvQnQ3i2d8BGPDT9kDZsb716m3cdLUJkhnlHw8ay45ujir3Bfvhis3WF8i4KuSFzFJTZ1SLk2bliLFcKxRGwo/Y7QoL17JZb1WZfQbBJHWZZTmR5cGdtXs32BkrS+J9jIiIJoZGDvgumQEw88+QPUxLwo6g9wCAGME1Xf3yk+7/79+AdhHtATJr+LkPndGixn/37pfhgfZH84McGCtY8GUCmMiAHpJPO1yXHspAJxes2ErzW5KND8JowKPbqAPJb/b1Nwl5SMYw/fLz7HxxhOPP9L9K68D8271krHVCLJOruoBHV50jFG8jex7eFlwNuvoaalFc0/ef9ztG6Ow+Fwvjh8SkFUsCCHGsTzbOTpPlhON2Hg503orggWRgUf5br0mzFMIxldP2sR7h14NqALjzkM/IQaNrAgi3Zf7RDXSwVyV6I4OrXqPljPiM+ZP7MbF9j0zovfCRPYrcRaoTF1wGL1/tTfg4mB94Tg48FV8tGKAO78M2jvkv6W4xzDAJvyKSrHJVamn1ej7uviKSXB5Onn0WcPUDla8dsfxgvre5o/kE4Q4jkqo/k+6QihWgazaD4iBQRFUQYECqj8X2H/avDCMWnq8v0j+O3PnqN/61GULFwUhEXIfAFapLM8TFxE2ydMLnUYFGS+HSbxAhH7ACYeEfPoPnYfvnrxlyjqko94SSNR7+/Fsa84sWNHm299G2OivQs1FKA9XbMd+mB1HhJJ1nfeg+Yn75cCRi+J2PxcI0496MSPOy7CsfLPAs5zOBwO59PgpgZR1+1m1LEpuFX3IGfBqAU1iOvY9MYlnHjlPQxY30Tzq4ETR6FZe08a/d+JE6++jYHzb6O1gy0E9nPd2oaiV4EHSspx+sXv4nt3ulFVaxanauR8iXr1T1I+rlxA3sYyrC0sh3bjYdz3fWoMfYuPg5OzlaUL/OL5/cKoj95ggu4QleHO1ajZFLj26gM0b29EM2thP7mIbd+vwobdL8MirJOhZ7MF2Mlp2LCSdq0DOGF9H6dffwUnZGuFw8vTjzgSxUZOZPNi4VAtAzd+TfkVAoIvSYcW4B+ZEUayBl/BStpf+by8buOw4fFv4AFK75kdu6DdXIG139qFr32/Hg3nw/86MzqZy/jIiWts+tjeRXoGpDz0EDazYC39qyilfwZffQ2W8+/D0vW/YBFuYFxF95F/wdbv7xJGyzQ7LuBDOrriTvlolVTe+w9iBwVLgQxfoY7C49vRkBftqKIk68Pl2BBE1o6+JpjeJv1+sgINj6yWBVG/QYOQH/+PFTgcDodzc7ipQdTyu1ZCq/8GrK1lyJGOyckprcapx+Mx0PQy/mb3a5jI+CoKpHORWLGpCheq0nDt1W78zY6TsCT/hdC4CvzpPdTsvohpNmLyw3uxPPk7aKiiFvPKr1AT5Nd5OaX1+O2z96AgCfjwyg2suOcedL0cLlCQoHS7XytH04MarPqYGr2Pl6HgoQdhfa0WmxeMFHlw/aILv9Z/F1ffNwvrgAYO19L98nVR96LyWBGevvt3qHm6DdtarmLtQ/5hmUjyXMBdGpRWVaIycJAuCGplkPLQD1AXdUAQhIwynP7Zd/H0PcuAGTeu3ZWMp5+tRuW6hdNpCqKSuYw3uvFlCiy/vH0A+GE5huo3iIHH3Q+h2fwgNn90AY/taEPl24nQ++pjJYrqpWex3TvpWY8XofW7fyGcDWTVqjQ0/bgIiqViFNydePKbAVN86ggp69+/icrnJzG96q/RuqgRQQ6Hw+EsBv6yzU8NNkLwEp5hQZRiioz9VH4ftiLwOGdJYK8aYIvoi57E/K6gc6McDofD4cQED6I4tzc8iOJwOBzOTeIz/XUeh8PhcDgczq0KH4nicDgcDofDiQE+EsXhcDgcDocTAzyI4nA4HA6Hw4kBHkRxOBwOh8PhxAAPojgcDofD4XBigAdRHA6Hw+FwODHAgygOh8PhcDicGOBBFIfD4XA4HE4M8CCKw+FwOBwOJwZ4EMXhcDgcDocTAzyI4nA4HA6Hw4kBHkRxOBwOh8PhxAAPojgcDofD4XBigAdRHA6Hw+FwODHAgygOh8PhcDicGOBBFIfD4XA4HE4M8CCKw+FwOBwOJwZ4EMXhcDgcDocTAzyI4nA4HA6Hw4kBHkRxOBwOh8PhxAAPojgcDofD4XBigAdRHA6Hw+FwODHAgygOh8PhcDicGOBBFIfD4XA4HE4M8CCKw+FwOBwOJwZ4EMXhcDgcDocTAzyI4nA4HA6Hw4mBJQiiHOg23oE77pBvRnQ7pNOfFwYbFHlM31yJ7kvXpZOcLzqOgVaYjHqkC/qRDtPpa9IZDofD4XCCszQjUfouXJ2fx7xvs6BIK537HPGC1Z/HSyc2Y8hUCd5WftG5TvH1BhR1r4DpxAAmBP2YQOvmFdJ5DofD4XCC84Wdzluu3YyGhnR0D3zehsw4nyoT3Whw1OF0axFyViyXDnI4HA6HE5mbGERFmua7jkvdldis12ODfi3WFjVjUD4q5OiGUXavdu1mVJ6ekE4yItyvhuXL4W82HRhoLsLatZTe2rXYbGpdmN61QTRv00Ov30DXUX4s/vwMNsjLSZuxm1JkSPmkNEPm0zGA5iI6J6Vrah2E8pJBNMjTFrYGOurn2qVuVG6mNDboKY0iNFgu0ZO9BKmLBuluknNDwNzrtdMmaL3nCUd3Q8D07DWcNmkhu0RJwNSpd1NeH0newfSHNnki9JxtDc0oCqMD4eUCDFlOw1i0HK3eek1fi6IGCxQzvfQcY+D8NB2LrjyBxK5vjm7jQrn49OEaBpu30T1SupXdS1+WSLapQqfYM5X5p02RiesB9t2KIW8erg+hlexFK7/XZ2+BMD1S2opwrEF+fQSZKaB7KyvRULnZXy/dcp26jiEKyNdqZXkLWN6wwFewLSD/1wP0tjmcMgXU37WBBsqTtz6C2ZE8PwGyYL5I0jk9yaKo4TT8NatGlpHzrix/OvTbqG59AlyYnh/ZuevkE03dsryxEWUTfMUOQGkzWqzdXAlFc0KpRqPz3k1uS4MN29BAafhk1xzox68FtAUNsCxQtEBdtMjKGOn+gHYiXY9trUMKf+c4XQk6xFlK5hfN1fmuF7ro/4HQ8UdfmLdKewzrC4/Od/ku/OP81fE/Sn8Tf/zt/LHypvkL0u781a75F/wXz8+7x+d/+mj5/Fu+WyLcH4j1hfkXZJlxX31n/oVHS+dPCY+4On+q9NH5Jqssvatvze9h+XdL++535p9+cM/8W7IsjV/47bz3tLJsfsa7yuf3yG+ifP70acqn98arp+ZLH22aVz56z/yjlFnvJZQ65VUuY6Vs3RdemH+0/NT8uO+GP87/9qel86Vd49L+wrrwESjn8a75p0u/N/+gTFhXu15QlG286+n50u89qJCnApL1o4HCUMhfhbxZngP1ivLK5OKDPeen4345SWl4ZatGLqfKC+YLnv7p/AW5Kl346Xxpade896qlKY+cxeubQKA8BK7Oj1+VXcXSffotKrnEUpQlkm2q0KkF+Qgoy/hPH53/3k9/68832c1vpQoZ/2n5fJO8whbYh5xguh+oWxFkpoDuLd8z/44/Y6JOiY6EZW6+vOmC4t5A32B9ITA/AfkneZXveUuWP/aMp6nMitr3I6u/P77zwvzTp3yaSywsvzI/MlkwX1Sg1Dnmix783ikpLypkqSLvgeX/4zt75gtIZiIB6SlQnmP2XUr2L/xNMij31kEQAn2Ym+rp0XJvHavT+QW2FqDnTK4/9TsbQXaPvnBBsln3/AU6X05147uCtQWlpfM+d0Rn3nn6QWV7MX5h/rfCDWruJz1S5PGP8+/sKSDZS7sM9x/993OWhM9wOm85dbTrKKrWUtRMPQPTaaxY68Cl4F0QkeUr2OCRRPT3P5Pnj9LXbuuGtq4VRrZ2a6gb3RuaUamXrYNh0311y3HCIiY40d2K9OYGbJat9UrPWSsbyQrGILqHilAnv2nFWmyr0WJgQOyjDHV3Y0NzJZSPbkDd8hOQHh2BaxhovYbKZiPSfZlZQeVrhnGgO6DXGAnq4TcDlXVGSiEEQ60gSaHOuIg1QyrkrRb92nR/HVAadZXX0CrIVp1crju0MNVtQ44sKytytqFugwUWtT22aMtz0/SNsZw6zSbo05mep2NzwzWkXx/CJelsRGKtG4VtylGhU4FcH0Dr4Da0blvrv4fshqraT2AHflFEKbP0HKz1Z4x0qg4byI796rK4zA12D6GobjP8Vc+eUQPtwABpdWjYCFTdtSI0G+WCUs9Q9wnoA3SO+aLWDSfIj7G95VihdeB6mOLFmvcVK1Rrh4/lOTWovFaHE0MDaO7OQYPgzNWzfIU0E7Fk/khPOuo3Au3mOspfK0R3RDp9rVKoG787oraA/NNAt+SNJrrRmt6MBqXRYy27Qc39QVlBspX+ZDA7lf7kLA2fWRB17XQlTEObyQAcmJ+n4OfENqQHOJ/BrSt9Qc8dmm24ZKrBBkkD1NwfCAXpwqJytk2cbsW2HDGx69cmkKPw0BJaLRwT4mCqw5GOnBzhT/U4JjB46G+g8ZbBu63cSobF8nod1ybISII+2gHp0RG4BsdyydAUrIA2fRATqn0AGw4/gRWVRbKgIwA2hH5iBSqLZIYcA2rkHSvL1+YgXZCtGrmwv9dCG8R/p1M68sbiNbkusi3vGelM9OW5afpGDJFTbV7BpirEBfKnG/RYEWAWS1GWcLbpR4VOBeMaVY4+h2onOOlFJixv1sum8/LgL0EwnkGe71q2rcRWWbujRmbhScfanOui90kvgml5M/Sy6TyZeFVAdj94CH+jkeeXbZRnao1DZeuSpRl1Jy5RNUUXSAgMbsVKesZ9VXqqe+mYjLU5eskWVkBvvE4dFQoYvRHRdYdQXSJq866sD33rWtSRT/Eh5Uc8HzjdpySn0gRHEXU4ajaH1BeRQWxd6X+mZtslmGo2CH7s5vmj5SS7dIjuyEFBX5BO0Aot0gcnxClKh4NiphBGr+Z+xjN5vjLecYcerWvrIBctZ+m5uUGUVr7mSMmloRVoaKAei/cCipDTAxyAvuuqL+iZd1uwebASJySdVnO/WpavSMfQpSDGQkqtTRc1UKu9hkuqu/MS2rXYsOcduL1lkG0W4eeL1LNLpx5v0EeTcciVn1r64LKkQID1mhc4GQoiJvQkE2k3AtdO12BgQ0MYg7uG0zUD2NBADaJ0JFbUyJs1wGG7riG4fmkIE8ICcTVyWU5Oi/aDPGfi0qBiZOVRuS6yzfqCdEZtefzcNH0jV3rJYULDNlkAsjydAkLpb4mlKEs42/QSSae0oRbyU8NAmQgZMFBrAlP3ECwvPI2ucZYHK/wlCMYLsMrLO38VXXrplEqZhWeC/JHX1y1HjomCDMsLeLprXHieTLwiYfVai7Ub9uAdtzy/0mYpko3wKFm+YRuaT7Riw0DNwnVBYfywgPTr6gsvDAT1RRNkU15bWLG5Ga0bBlGjl2YAjA2w+CpKbd6V9TFUtxwNdQP++lb82puCWhMFbs3Bh4WHmk8g3VKJiQaLP5AIih5dV/3PdFs2Y7DyhLDeKFr7Vc910osJiO5Ii+vBdJqCowl9uigbar+uhTJ6NfczXrD6yjg/P4S65Q2oGwhpSZwl4OYFUdcGMbAiB6F80VpqvFrJ2n3Ve30CgwNBFNkLKeIK6h56G7yo7w9HThGKBioVCyCvO06jpu46tklDxOlGI4ZMDeLQrIRjkBps6e/g5MCYY0HdaZl5X7uEE62nfX40p6gIA5XyBdFURmp86q5vE6caGUODGNLLpjYUrMAG0wo0swWIPmFcw9CJSlg2FJHriMy1oROoGypCpT6Uq2Xp1WGoqBIhL4kGFfKmLi2G1upDNhpeLAOyxZuURl3zCpg2MEmpk0u6cQNOkzO9JKvXa4PNqBzYhiK1I0FqyiPnpukbNWLabnTLbyI7HByQ/lZDtGVhBNgmI5JODVFZ9P45MSXLN1Dg1YBtcvsmuxmURcQT3ZGCfrXEILMhC/yuhoJdso0BsmOfukx0o2ZgAxqCZe4684t6/7VByDHmwFJ3WhYUsGe0hn0dS7owZ7Mc+ppKoLkBg15RRfDDcnKKtpEvIp2TuyvBFkgnfBleLvyA4/QlaQbgdDO2yYoZS97ZfNOKa9f8dqyS64MNOKGtQRH5icptE2gItao8CNR9xQo2isZ2YtH5oJBeyNJwnK5D8woTRHe0AaYVJEuLXKeHcIL804YiyRulG2EcooBeafSgOEzd/UFg06TXSLY+rocezeTExs0Joq5T5dY5YKoTh0uDwXo0NWiGUfilgR56k4WUWWnqiimD9CK0Lq9BpWTMau5XjxZGMvScQZPv1xnGugk6VuMPGlZspqBNTw3bWuFXdHr9ZjQ4VkQclUkvosbgWoP/FxWm0+SEZEPPWiMFVTkYlNJdu9aIugk6VqMXZXftNDmHtdRTDv0ktjbgROV1NBspDeEXMSacXlGDVpUtzKVL6aj0Pi8ol3ApvZJ6n6GviI4I8ma/hNFtxaF/0Pnrn20rt+K1gUuKQGLFYKsgW7Y2am3lJSENaZZWnVxYvTakUyDl/3WeaTAHrSeMEQM4Pyr0R8HN07ccCgg3kCMW0iW72Ezpar0CUYW6soSzTUY4nbp2ugHda8kuwhQmhxoHaoL89l05gOXSsPM1ajypOVkyfYxaZiuuwSLUix7pUtlbvY0tBS0NbA1Y0LLTOU0ennkmcIqfjg0O+kdNKc2GbdfQ4PuFG+nt2iKoe3VZOooaNlBngToXKvywAnruiWbyRZT3tWvFX5iZBtaiORpbUJV3+XSeluQ/BGON7BkB03mbW5ejTq5cDApGm7tJxyRbXp5TiW0O0quQcZRyOi+9qBXLKeAUU43WfkOxAoOtm4U0mB+pvMT8eI4k++XIqTmByutenSb5sHW8Na2yjsAKKms39HJdbHBghXBezf2EfDpPm4PKISNqZIGgw7KNgkVph7Mk3DHPxv04nM8T7Cfy1JOvCfLGVva6hYEN1Ptkp9hPuymUJp/P4XxKsJ/ZD2BDTeiptdBQENUA1ARTWK7LtzyDYuWqGv3n3D58hr/O43A4HA6Hw7l14UEU5/OHtijoKBRDWySNQnE4txz64KNQDD0fheJwbkX4dB6Hw+FwOBxODPCRKA6Hw+FwOJwY4EEUh8PhcDgcTgzwIIrD4XA4HA4nBngQxeFwOBwOhxMDPIjicDgcDofDiQEeRHE4HA6Hw+HEAA+iOBwOh8PhcGKAB1EcDofD4XA4McCDKA6Hw+FwOJwY4EEUh8PhcDgcTgzwIIrD4XA4HA4nBngQxeFwOBwOhxMDPIjicDgcDofDiQEeRHE4HA6Hw+HEAA+iOBwOh8PhcGKAB1EcDofD4XA4MXDHPCH9/fnF0Yu6/RZoy4/BlCMdk/CMHMeelvNIMD6HugKtdJTD4XzumBvDmY4uvDEyBfcNYJkmFbnFJpTmJksXMGYx0tkCs1W6JkGH9SXlKMxKlM4TatJR9SzOF4lZWyv2m4GSYyYENCNLjAO9dfsxYmjArvXxsHfuQ5NrK44FNl6c24JbfCRqDJbO83BLexwO5/MKNSxNh3FyMgWFVQfQ0LAXpZlzGDTXo90uXUJM9jSi5RyQW7ZXuKYs24P+lkb0TEoXqEpH3bM4tz+zk1b0HK3Hnp07UGMeQcKmTTc5gGJokV9iRNwb+7Bjx1M4OqJDSSEPoG5XbukgynGqA/0z0g6Hw/n8MvI6LFNJMJieQN7qZCQmpiH3iTIYEtwYPDsiXWRHv3UGKcYyFOekCdfkFJfBmDIDa78U/ahJR9WzOLc7jt567DvYiZG4XBhNu3Hgn4+g7rHV0tmbS/zqAuw8dBTHjh3D0XoT8vgA6G3LrTudN3sWjTVdmDUYkNbfD4dvOk8cSrVoyxXDp47eOuy3aFEuDeWK+9PiSYFl0KRkoKCkDAWr46VjhNOG9tZO2KbcuLFMg9S8MlQUZ8E/ueCErdOMHus4XGzaICkTj5RJaQy1YkfbsHRdANksf0DrjjZZ3hlj6Kk9jP44I56rK6A+jbryiM9ywPhcHfxJ9aD2cD/iFOnPYazXDPPro5gJOs2h5nkq80TMjfXCbH4do+LDFspPLl/pECMl5PTskCCzoFJNUcrMmlGCPKcFr4+6KO1lSNGXYmdpLuT+zGlrR2unDVPCnE8SMh8pQ1nBaogaIJVTriaEmDeHkA9sKYPmXDsGp9n9CXR/uex+BulHeys6bdK0EumH0WTCxrQ48bRXR1K3oKF2o0yvGJOkCwepo5Dir9doryci1oGCJaxbGXMjp9BpTUbBE+uRJh1jumg98iN0xEvPEuy8F7qqIyjNkC4h7O270DReINRtgop0VD3LY0PrLjPsebtxpDhEw0q62WnugXVc1J+kzEdQVlYApXsIpz8MsrczHeiwDENQEbm9SX4tQL1EfLq80F7zyipQ7JveDGIPpIepuYUwKXQ9uC77n0OotEV5mRX5iejv/PokEiRPpEcpGQUoCZBzIBHlPnsG9TWDyH2u1u8PFYhyk/vehTq+8BqBsG1CsHsCfTrnduKmjkTNzc2ho6MDu3btwo4dO4S/2bHFQw6xowvjGj1KC9dIx2IhEyUNDWhg24EqPJw8DsvhFpydlU7PkUHUmzGsoV7FgQYc2JkHnGtBY8+Y9wLyG/Uw25bBsFOaNtA5KI0m9DrodFaJmDZtVYYkIMmAKu/zSrLEJAJw9C7V6Bo5qI5+BCZlb9+HwxYHdKVsuuQAdhZoMGyuR+vQUtRLABTE1R+2wJWzEweozHvLciX5eedm7Ggn+Q4iT5CvKKsqMFFFIslQJV0vbiWZ0gkZ0+csGM8sRx2Vs8qog2vQjCO+umNxeCP2mYehKZDyV6qDw3IYTULlycj01yPbqg1+Nzhs6aUgtZqOs6mnZRil+81WryxJT4/ug3k4AYXVdO+B3TBqx3HyYCtsHukSL1P96PNNWUmM9MMaShfUXh+xDmIkynTjsx7DE4qghjEO+xSgy9SJu3MuuJEAbYK46yVBdkBNOqqeFZeKzAwdMjJCtNSS7duWGUTd3FsKncOCw029ZFkiavTH0duEwycnkRpgb8dHSAG0BlRLOtUgKLDMH1UbhMZ2rKee7NWFHMm/iGKWT2+KyO1hb1k2QLper5i7dGKSghX5dUqbUWeLcxQo1fvKTOURXCLlh5lVDP5OQGZfB6oeRvI4ybnlLLxuOBA1cp/s64crvwDJvfXYtXOH0P7srGuHzSldECsR24SFLJ1P53weualBVHt7O6xWK9xucdUS+7unp0f4ezF4hjrQM6pBdkkxZB3WGIiDJjERiWxLXo2NhQVIIWc7Oi6eHbN0UA9Pj7JdBchITkRyRiEqtqRipr+P+huE4xyogwl92S4UZHinDXbCmDKF3l5yYHHxYtq0JSTE0X4CErzPi5dGIuTMkXzIYWo00v4imLP2wOLSQJEU9c56Bt3ks2rxRC6bLklGRsEulOkpGOjoITe6tIwNj+CGbgvKCjOQTGVOyylGAfn3mZFRsSFyjGOcVCP74UJBvqKsSEZBRBNIXEKCdL24aYLck2Aoh2njanq2WM4Kcuy+usMILJZx8vMV2FUg5S/3CVRT/U5RvfsCaUacRvEsedVlFlf7pp5yn6gVGqbR3nNi+eaGMTyVQPqxE3lpdK+gY/lIwihsilmlBCQlsSkr+UEPbP2DIdb7qb8+Yh3EyFKkO9bTSY22Hsb10qiKywmX+FdULEgnCAuv0WL9zmqYcoOPCzgoAJfbfmJaLp7YaUTKVC+YaavTnyG6ZgqpW6oV9laS7cb5N6wUJMQhXtKpREGBZf5IULIxDI/cgG5LGQol/5JTXIBs6hqNjCqlLLcHVhcPU124x8dldeERRpfk1ylsRpUtjsHSITg8qcxUnsIKbEmdQX8fWVW0/s6LzL6SV29EYUEKxbyj5ImDoUbusxgfn4HrXDtOeQyoqKMAbW858uJsMO87Cl8fJwYitgmBLKFP53w+ualB1H/8x39If/kZHg4x3KsaOzrJkN2ZhSjJCWOYUePBpNWGaeggdlYduGwnr5KZC3kfKlGXQU2YA9PknTzjdro+A1mKTpYWBXXHcEQ+H6EKD4YokBnVGfHw4iJDSmoIHT2j0BkfVgaZly9jisqXnansfWflZUPjJie6mFY1CKsfq8Oh6o2K4etl0r8C2hTh3CQ1yKF6nYtBk6As5+rsDAoqxbqDww67W4OMbOVUTmJuPknIH0hHIk7REsUjM5uUZ1pqvOLzYDp0CKUK/YinpjIQDXINFMkO9vtHqGbPopc6Cno9tYYLUH99xDqIkcWmy0Y0WvrdWFe2uI6QmnSif5YH4/ZpICNLYfvQFqDumDTVqEZ/xi7TX0nIlP+ykMgxHcOx6vUhplPlrMZjdYdQvTE6KXtmbRikQE+j0ynqh6FNDjwiocYWHZepzMwlKjwidBkJdG5aFrAtAs8krDaSvS6T5BgEVXbrhpsFSqlGVD+Rh9VCEJyD4upSZFIHpvdcrDmN3CYoWUKfzvnc8qkvLF/sEqyxnnYMunXYWpInW3cQhOE2YQjXuynXP3kZRpvvmqdwsM+F7LIyiJ3VOThZt/h8iyKdHYf7qbc8jUkn6Lw4NrwUjRLsnegYToCxZL1izU4s2Dupt5RgRMl6ZUoOJ7Ny1jsU930kaOloAGrkF/GaWdjPtKJ+107fNcolEzkoqchHnK0FNb50gqzbWCqEcnrgYoEHOf0Z2gucOgLrfUt/xkIi9fSZ87whBTcetq6msRY7veULsQYmPsuAvCRy8NIQGJuOmErKgyFYDEWovz5SHYRg0XUbBkcvmujiZGM1nsiShZQJydHJPlQ6ctRcswAnGxQjwli2Gv0RRtbiwvupSMzacabVPyW1I3D9k8S0Zb+vHp6qMWMk2YCK4iAtd8giqbDFOXGk8HyL97y4He6no9OTJLUYkevaUwfR58pGWVmIIDMKu03I0CnTiEtFRgrr48QaREVuExQsoU/nfH65qUHUf//v/136y09OTuDiwiiY7kVX/wxSNpVIgU4YAtaxCHP0C5CtQaBtb5kOk971CuT6kskqk/KVa2+8G/NPyeT0GfJFmDExN4VTnYPQGEpCLIJUz9zUKXQOamAoWbiAUeyFeuD2jl54cU4ubNjVyC/CNezn6k1veKCvqMOLx6j3TdtzRvJiMuKzHoaBLV6h3tpeIR11a6JiQihnnDhFQT3vJOqxugKH9p3TsTcGhHOa3R2HZewZbPHyPjPGUwtR/c8vCuU/dqwcweOiNGwypGKqvw+TGBF+pZZq2BSwrkeOuuvV1EFQlqBug0JBTT0FkjA+h9pAZY9PgIaaI0fAnJ6TLeYheSpCoHDpeFFzTVAomBNMO4xlq9EfISj0UNMbK5PoaWzCGx49Kuq8+vMcgolZsUbwANlQnBWHG/3rt8SRIg00YSK6iLYYz8qThPwqv174t0WMKCp0bS/KdJMw1x+H4IYDicJuPXMh6k8wzliI3Cb4WEKfzvl8c1ODqNLSUiGQWr58ubCv1+tRWFgo/B0LwxYL9bYNKHlMhVYGrGMR5ugXIFuDQFtarhHrU9w4f46tNdEiVafBjH0Ebtk1iYksnXhhXUycLgMpsGNEsb5lFmeP7kHdqdALDQNxnesUel+FxsX+/NaFc519cGUXImhSa9Ygla3HsSk90IhtlI39QycXqxr5hb3GgdGRGSAjHxtXJ/sawDlnwKoduwWWcQ30xgKkCelQjzLIo2LBHeBpx4Sxfi1SWDm1GcjQuDB0XllPs0M2YcrTu/44Eh5FRDoHO1u9nCJNo4zYSNopyDXkIM27JmTOHbJRTVxfgMwZK95o7cegOxMFEXoKka9XWQfBWIq6DYQtym20wJldjqpgLYuWdFDjhn1Yvmp6Upii0aTq/L35SOkw1FwTkjjo2JAF2b7StM/i6J46CKatRn9Wr6G/ZkhWygkye08d9rRaIwdXjlGIYt6I1ck+KSOYmBVrBJMz8NgmatGnrBj2RlGOcepAaKELF+dGskVtKtXPDInF7X8W29g18cGmqVWi0LU05BrXI8V9HoIbDkSV3Yo27rYPk/bImBvHCMXjuoxU6UC0RG4TvCydT+d83rmpQVQ8GRYb7mxqahJ6USyoYsdiR4N1xUYsnVp64J6dxay0TdosOEtGlrpGbEGzCgqQOt2HxiO9sDvpGucYrMfrUXOwE3bWdmrzYcxmP4Q5gl67k9KYxFBnC7pGE5CXpz6XbOF9ZmEJwi7x8rh9+WSbS5iTYvmfo/97cVNamSgsyQnu0BI3olCvwWhHPY7bJikdJ+y9R2Ae9CCzuHBRa1MWIjocDL+BTtsYnJN2nGmvQ9M5+TCDA73UW2Pr2wqX9uECrn4zjlvp2VTOsTNH0dI/Qz1278v2smA0UhPX34IjvXa6htX/cTSenKJrtkQe6ZQY7TmKniEmS1b3TeigeDSzIF8MonQsaJ1Gbw/pzyTlwdaDI/s7cFm4MwhxuWBLnYaHR6HRG5AbqVWKeL2aOoiFWNKlum5qw7AmH2WFOnhkujzr0+EMFBSwRbqtkn4ymbJfNqXQca+CqElH3TVnjzai1RZ8akebb0Q2BmH22v7kEDpbujCakAfRtNXoTw5dk4qpk40+e2N62Nrvgk6fHXmaTwhamJg7YRtzYtJ+Bu11TQgmZo/L5S+j045TfcKiKKSSIjrtVnS+MUyObR2yQ+q1GlvMEupnuq/RV2bnmBXH62twsNMu80NRovBtk7BZzpLVpEJywwGos9scoxGpM/1oaT2DMW/9NZHtaZQ/QJDLze9TvXlxC2USrpkTSxexTZBQ5dM5twVLspzn00KTXYxi1esa1DCKjpoa6W9iWRJ0hgqUb5SMTFuA2gPJwjtBju6zCO+KSdDloay6GBlCNuKRY6pFGXsP0NF9sNygJFKysWV3CRRrQSORakRhXgSXOtoBeVZFZij/HdDI3t2TaixEuKQySg9gt9YMc/tB1LD8svfWlNWhNHcxwW1wsoqrsMXVCov5MM6R7Nh7mkybetHSN069RiCBgtbe6SQYIq1vi5GU/EeQZmtDXYf0nqj8ClQV+oPbxPXVOBDP3jdzFPuEyktCpnG38L4ZtWQ/vB5zlkbUeN8TtWUvTN4KoKC1omIaLebX0XTQQqfZO8RKEE/OfJKty8hZqCRZhjwkDQ4hx6BY0hySSNdHqoNo1FRO1Ok6hmFlJ+jqln3nhEN+/O+10hZUocLVgg6vfiboYKio8k+JqEkHKq5JnsKofRz25DkgVzolJz4Hptoyhe2nZG/B7hL/Yno1+sPKsxsye6Py5JXVojhHjcZnobhqC1ytFpgPUzmWpUBfasKm3hb0jSulPNPfhJp+aYfyqknNwtaqYkqBBUcdsFLnamtV4HvF/MyptEVtQS0OJMvLnABdXhmqizNiH4kK8G3Lklidl8PrhgNRZbfku6v3amDusKBp30mh/pIyjdhdVaDohCvlxmA+NcDRsmuc0nuuIrYJEmp8Oue24I5b4mWbnKA4grwAkcOghoO9bDMv4CV5S8qQ+LLNIN9z5HA4tw9DrTvQhmAvC+VwPoNf53GWmmWx9wA5HA6Hw+HEDA+ibnVS0vjPZzkcDucmkqL41Q2H44dP53E4HA6Hw+HEAB+J4nA4HA6Hw4kBHkRxOBwOh8PhxAAPojgcDofD4XBigAdRHA6Hw+FwODHAF5Z/4ZnDWK8Zba+PwiW8ty4TRpMJG9P4ixNCMwtb636YUbL0745x9KJu/wgMDbuwPt6Ozn1NcG1d7LuoxPdmLfywczZ/x1hIbmIdR4ln8hTqDw4jT3ohKYfzRWP2bCNqusaR/Tl8Lx8Por7gOHrrsd8yh3VlJhTqPLB1tuDkqBZbG6pVf/rki8EsJq19sPTbYJ9y4cayFGyqqsNj6l9urhJ5ULsMSdnF2GXKW+RrLMQXg7ryy2BQfNIjCWtyV4d8i/UXj0+rjiPjcQ6h/1QfrKOTmHbfQEJ2Gfaacnldcb54zFlx9EcdGKU/eRDF+ZwhNq7OLQ2o9X1jYQw9tYdhzajCkdKb8EG7WxIHeuvrYXEkI/uRAuSvyYAuLVnxwdHPNR5yQk91II6/XT0Mn586nhs6jv1tw4AuD5sMucjI1Pk/YM3hfKGYg611HzpB9jg8/Ln0YbdOEOW0odPcA+u4+B20pMxHUFZWgNWyzxMJr+cn36MkYMqC0mHfPbJNuRemM9aD2sP9iDP6PxcipOkw4rm6AvFLVfZ27GoahHbLAVRvTA7+6RVhSsYCrbzC58bQazbj9dEZ4bma1FwUm0qRqxhicMLWaUaPddw3tfZIWRkKKHPByyYiRudiQOSQ5d0bEPXHyfIvR8hnP7J2H4Lsk3JUxF1oGi8Ifo9vakgDfcURlAZ8ss1jO4qnzNRnyJZ/JiHEdFKKN1/ieWtGCfKcFpKR9K07fSl2luYqRmFEeQck5EsnCEOtYF9n2VKmwbn2QYifuCO5lotyxQjVZ8so8hQyEGU5adiL+sI0zJ6pR81gLp6rDfEMgUhlFHHa2De/bJhyUwk1qcgrq0BxlhTACnl1+L4jJxBEJ6NGqGdrFNNBsdRxZPsT6s6agZI8Jyze6eMUPUp3BtiBIIfAhMJMPUaq49kzqK85iYSSF7EzzxuMSGVMLsOLO3Mxp6qOIzGHsTMd6LAMi3lg36UsNqFUXriIfmAE7bvMcJccIJsO8+21kP4whB4KSN8NdCyU77IEymth+Lyyb8+ZTBshzvRLz9EqdSDQH6ryj8H0XoHSt3nIZve0DCOjjGQkffNTHFH3YBOl8VjQNEL7VoZq3ZS3H8s0SM0rQ0VxlmKEUI2Pmhs7g44OC4ZFRUFqbjFMgq9bwvqTE9SmRFIUviXE8wN8dWC9y/0a+8ZjdmEZytanyb6mocI2giG0t9MwNmzCaM3n8zNbt8bC8jkyonozbMsM2HmgAQ17S6FzWHC4qZeq1IsT0076J7MEDQ10DW1VhiTxlJfZs2jcZ8awpiB4OquNKF6nwXSvBUNBP0lOCsS+dJ6yCSUUQKnHjvZ9h6mXq0PpXnrugZ0o0AzDXN+KoTnpElKyodZ6mG3LYNh5gPK/F6U6ByyHm9BLmcsqEcvU0FAFVqwkQ5WvnCUhvlXr6GVfwJd2oiBBmwBMT5JEw+HGYL8t4MvtszjbywZdA3FikoxSkedM6ZSM6XMWjGeWo67hAKqMOrgGzTjSMyadFXE5XJTBbGowyUhp25JNeY3IMCy9cTBW07P3liF72SjJ1Qwrk31WLrI1LtjOy54zMkw1loQcfRrtTKKv34X8gmT01u/Czh07sGPHTtS12wLkE7mMc+TI6s3D0BTsxAEq48484FxLIwKKKIP0raMfMVShEpcDLvrvbOseX/5rj57BZFAdlxNdHUe0P8b0OVjGM1Fe14ADVUboXIMwH+mhcN/PrIvqGDrkS3Vclh/0c/4BhKnjxFzoU4FRm6wssyOwUX1l5mWTo1dbx+Fx9Dbh8MlJpJbupfJT/RZoMGyux/ER71Mj+wGPrR+DuoeRP21G7U6Wjx3Yuecoesd8jiKCP9TCwGQg1EEJmApm+nxHNQy+ACMJhirv8b0oywYGKa/tduk0070mWV73FkM7fhIHW63kqT5b4rKKUbaOaryzhyRKzFnRY5ki2ysJEUCF960+IummJHdv+3FANGA0RuujKIhsOnwSk6ml2EvyP7CzAJphM+qPj5B+LlX9BUN+D9vE9JWo89Vy2HqlfeTXEh6uIr/WgL2lqZjsOohGmXAj20YwxtBDnaIEY8nnemnJLRFEOahxHYYeZbsKkJGciMS0XDyx04iUqV70+pSGKoPVR5wGiYl0DW0JCcoh8BELNdJJBlTI06negtQpCzrOztIVccgqLkSme5iMcmHLNmftEXvnxY9F1VudPdODQXcmSmqfQG4aPTc5AwW7yqhEw+jokQrgIAOmjoK+bBcKMpIp/2nIfWInjClT6KVCxsWLZUpMTAArVlxCgq+cQUf6BcfigkYj7QdDm0LlcME+zsruZQ5T1LsF9T3DqTeSkpA02gtBbF4m+9AvfD0/EA+lpsyzJkieEwzlMG1cjeTEZGQU7EIFNcIz/X3UD/Uz53YDGh3FPrnIpS1LF66AXjJRXF2MHCZ7Vue1zHmMovccM/Is5GVr4LKd9zlLu20Y7qQcCDHU7DjGZ1w4134KHkMFBXjkJMrzEGczY99ReYMSqYxjsHQIFYxdBRliGQsrsCV1Bv198hL6EfTNpYGaEobFQxlZFofkLCNMVVWo2EIed1RFgxhlHUeyP4EEA8pNG7Ga7C85owC7KgxImumHXARuN8tVAjKlOs7NVBMoh6vjROSyQGzUBpuk1LPD5zFFV+RlUx5V13E4hmChhjx1SzWeyE2j8os6XJLtxvk3rBR6qvMD4yPjQt2YR7QoZI3pgd0w6qaowa/3BduR/KHfV2iEkYA4jXc/XjYyEEf14z2ehpzih5FNQfP4uNjwzZ7thGUqFVuqpbym5WFnmR4a0gdBpJ8pzE8XU34H0UkNtb2nB6MaPUrlw+lyIvhWHxF0c8zSoZB7ckYh2VJq1D5qiNqhqdQtqH4iF2kkf+FZJST982/ASoqyFPUXHPk9bBPTV6LOV/sZIb0fp6CrAjsF352ItNwnUE1ymbL0SPYW2TaC4TjVgX4YUBLrCPynxC0QRHkwbqfQOCOLmjsZ2gLUHTuCwGU7SSmhBE7GZndDk5ENhalRL5X51/FRcl6M+DyUbNWRYZxUNh7UCL7x+ig02SUojnKp0OXL1OrospGpGJ0XG2/3+DjljEo5bsc0MpClLCQK6o7FsDbJg6EOciw6Ix4Oe2sODHoNpk424rhtErPOMViPU29mmJxAEguwwpBmgCF1igKASekAmVO/FTOpeuhTpAMBaJPDG4MmQTl9sTo7gwIIB6YX7bTjlI4gPhPZVOfTksPJyM9DgssGcTBqDMOjbqSszweLoahFFxrRVCM5gDzJSeQUo7qUumdBGpSQZXRcBqkfBQbyCk6ELoMCBMe0oAMKPEPUsI5CZ3yYtGKRUM/9yNFD2FWYh6wM0rGNT6C2ZE3Q/CuIoY5D25+EJgGKWl6djQxqYxyLruTwdZyYly8EVTbBq3swOkz2np2PXHZPlHUclLHLoKYEmd6pWYkc0zEcq14vTPeo8QNiA8wa6kIxIExejY2mChiSvMF2dP5QHR7M2gZhJ2vTSd+IGx+9TALJRY68OKQ7OvJSYdvpmJmGZb848iaOvjWiZyRM+Bqfi5LCTExb9qNpEFhXVhzSTlT71rC66cBl0YAVck/UZVC4H42PGsNlUr2kTOUUICkKjh2L9cc8C+tvsUTy1T7GRjHqTkDOOmUAm5iVixSytyEWo6qwjQXMnkVHnwvrio3K9vpzyC0QRDnhEsbUlwl7kYhTtsMySNFnqLPBpqoUsB6z9KdE4noj8jXj6KqR1nhMW7B/x2H0z6Ti4cKcINH7MNok4xe2/RYyWi8OOJmBschePOBDnhenWEiVpYyAvRMdwwkwlqxXrCcKRkZpLcr0cRg2H0TNvib0xj2G0nzKF/UWwo+AJGN9QSZmrP3UFyE8NvQPupFZkB86+Iq2cAlaclAeuKTRA+Ys3OxvYQRtMUh17pFG21brkZskTemNnYfNlUINm/wJCcjQKWsvLjWDnESQBiVUGedIj+mf8y0yPaHtcD8dDTJ1au+kXm+CESXrw9UgW58gT69V0SMOR7wuK3j+FURfx6HtLxQJYGbg8Vcy5lzUWKXolraO43KRx2IiNqVH5bCxJV16+eKKKOo4GGS/LvIMoYuvzg8IUMOsDAjSsIZF9EKwHZ0/DI08aHkKNeYRJBsqpA7iHFwsfpmyYJ9Pt2h7SvyFlFOYt5UYbvOfp23BWiCBcP7Ri3J6qlQ3i/6WgOm2AOLzCshP0x9J+SjICj1cErtvlevmHKVD/5xvUZR3x+F+qvdpTPpEEslHuYR0oreTQMLV3xIQSVjeehfKr0FA/9dX/htMFhFtI5A5WDu64MguRnGYev28cAsEUclIENoRNsgYDgfGyTLjQ85faZGSRJ1OwTvIkdZyyJg9a8E5dxLyyaiF+eAkA6oOlCBbM4U3TrF560AyUSIYv7RVGcgleNFCCOo97gX3Odnks0SyWMiIpYzI3BROdQ5CYyhRuYg4GbmldTh6jHoFx46irnQNZsddSNClLnD2gcTlGqDHIPqpdz97tlcYUjdICz0VCM5fA020jsM5Sa4iTpi+FJnEFHXmI452RESq87hlUkCcBn1OkjCld/b8EFyp+dArHuHBXIiKWebNW6QyxpMek1YwnfLpiW9T9qLnpk6hc1ADQ0mkRc7y9RNsK1GOTkh45mYxO7dQa9Wguo4j2l8oxDUYcb5K9lCvnloZbXKEskcisI7jkC1GUThrtQnlyFcsUFVRx+Eg+2UBf+ixE3V+QIBa4aDpUD7iVPvDSCjXxxwgnxVnPSytY4kXG8XMrcIaF79+iVuVQRbYy9bAieeCrIML6x+9KKenck2PIRtTsA0HOGcZjt4enGM2N9MHi7D4LTix+1a5bsZTOixe868Vkm/+4CWSj0oQ0vGEzq5KwtXfIlDrq731Xr6OrnaLQbccaXRdsJ2IthGA4xzYskv3sBk/8gWsbRSKs9iN/a2+s/hpcAsEUXHUMUuhrvmI2Bv2MnsWR/fU4ZR3IYtU+SnaUE2/FhkZGriG/GtfBGaHYGOj7JnS4lVHL1q6xqHRl5JhSPPBcQmkB3nC8LH7vBlm/2pwiThoBOOXNuptyv3umjXCqlbYFLeNCL1hjU7sccdR7zMFdowoC4mzR/egzlfIyLjOdaLPlY1CY2yDoHNDXXhjKgWGfDX3Z8GQl4TRXjO6+qeQlGcI2ojDMU7BkBa6EFNAXgID3DFhipWCX68/GhuEzZWAHMUokRqk3qGXOTvsVOcpsqHvtPz1SHH1UzlmkKqXvY9H6FG5YR/2T2kx5sZHqEw6ZFDVCkQqozYVOs0MqbHbrydsE/yzfK2DC+c6++DKLoSaKvSvn2CbPB0/Ix01qGm1KZyYZ4pNcaQg8ui/2jqOZH8SbpfSmY6NQqhlbyXP2WAlu8jMzhb3VRO5juNy86lhHsXJLjYtL5uWUVvH4Vi9hq6cweiIcoWHvacOe6S1Z2r8gJYp0PgwLisirTEwU9Ck6iiEUukPI6JcH5Oc8Rg2USAwZR0WGj8dy+s41U2cXL/EulWswZStgWNb0HVw9Kxw/jEccZoQQyJsuscyBZ2xVlg7OdrTESBXP6p9a1jd1CJVp8EMyd0tL4towH6ZRPRRq7GGmpqZ0RHlWiB7D+r2tIo/hFBF+PqLGZW+2lfvWTmk9y4MyX+YQ8yO2CidTOSw4FKFbSjQGlAtBYf+Tb7IPnhn8bPillhYrs03CosIzUd6YXdSr3pyCJ0tXRhNyEMeNTRzkyPo7enFtCYbufIufQBZRiN0M/1o8aVjw/HGk5hKMmCLMBntQK/ZginqpZqCLC6IzytDSaYbwx0dsl/VRSZxYyH0mlF01B+HbZKe67Sj94gZg55MFBdKz9Hmwyj8wuIIeu1OzM5OYqizBV2jCchjhVSJ2+1GZmEJctR6KYKNVDjHRnCmsx772oaRbDSpfjNy2iYDUqeGMTyTCsMmYRWRAqfdis43qA+Rug7ZEdpXV78Zx61jcM46MXbmKFoooEkybBJ+Gu2ZG8OprnNwpeixLplkOCtuLjbU7nHBNTu3oIfvZxQ9R3swxGTPdKeJTUtkoiBfVkitHvlCY5kKfa48ozkwGtni0Ra0nmF5m8XkUCeaOi5ToG0U1jCoK2MWCgpSMd3XiCO9diEd55gVx+trcLDTLsu7m+owE4UlwaaNYyPHoIfmMuW5cwiT7Ln2XhztZJFKAeQiCEWkOlZrfwIUqJqPWzFG9uccO4OjLf2YIfvbRJXsmXPC1tGDy8tYOnO+Op4VoiMKkhZbx1SX+Xo2UqZBtmJtWuQ6Zs+3n2pEY4+8ruSIafjWF0o63Nrvgk6fLUxlqPEDWkMh1tE17Y2dYlmcYzhztAXnXDpKX7omgj9Uh4dsh+6VZOy0n0KfnQVzqUIwx5Y0rKO+v9mbV+aPeo5gf00bzoYeHFoE8vxMwnb8FD1dB31QgxKne9iPhLasT8bqwlJhcX5nZ7BZAkKtbw2jm4ysggKkTveh0St3aQ1pzcFO2OnBan1UDrVDqVMn0XjcJtoje1ZrP1w6PbIjjQD5CF9/sRCNr/YRl0sddtF2jnptx3YcjSenkGosFNccqrANJXGI9wWp3k2+yD54Z/GzYrET658O8Tkw1ZYJ7+c4us8C4R1C2Vuwu2SjoDBDb7TAYk9BvqkwfISauB7VB+IV6bB3n+xm71eh0w7qbVumNFhXEWqRYjzySrbiXE0XOjqGkKH6hRUZKD2wG1qzGe0Ha4TnsvfDlNWVwj8zEo8cUy3K2lvReXQfLDeoclKysWV3CTZGYxWpRhTmqbZEATZS0Ta8DAmpWXi4qgIbM9RaEEEyLcg8CTMKgiyKdMDW2QErBQVbqzZGnB5MyX8EabY21HVI74nKr0CV8IsbB/obD6NPmPXow+GaPvaHjH401ThDv0eImpyH18/B0ljje4fQlr0mKMWUiIxMNsmghyKGIrQF1dirMVPPtwn7TrIEkpBp3I2qAjFvasuoLajFgWT2PpWj2CdUcAJ0FJhXF2conAJzPlFWYXgySvFclRYd7WYcPMeey95LU4YDpblBHFgQwtYx9SjV2h8jJR+PpNnQVtchvYsnHxVVhYL9DXXsg5mN2VOD2LFP+ENBR00jXCHfJaSmjtl6bB0lnwBFDEWEr2PGHHXSxzF+w0F/ZQStZ21BFXaTlMztB1Ej5EGHvLJaFPve96TCD8Rl4YnnKtDT1gnzwXP+aw7QNd6HRvCH6phBf1MNWY4E04msragqlgTD8kF5TfPlldVVNozkj8Iu04sZZX5Y/Rl3lwXVtzlbB3pGNdBLesPkWliYicEOMzrXB1tcr9K3htFNAW0Bag8kK+SeoMtDWTW1F3HUAa9X6aMonardgNncjoOiogh+oLY4R509CkSov6iJzlfLWWg7KcjeshslMuFGto1bGPayTQ7ns+Xq/OnnTPPPnb4q7QcinjcduyDtK7l6+rl5k+nYfNCzF46FPqfgP+f/da9p/tC716R9zlIj1NNzp6k2g3PhGNVxqPNCPT43H1RFVNfxJ/P//qJpvurEh9I+hyMSSTcjswgfxbmluSWm8zicm4cHc84xoRfWP5MJQ140fTDOrYJnbhL23lZ0jiYhT/kBQQ6Hw4kZHkRxbgHEd7qE+pq+tqAOx0JO5UXCjs59h2G2xsGwu0yaw+d8FgjvjQn1+R7hPTpqP1sTiBP9TQfR9PoUMkp2oXDhsi4OZ5HcTB/F+TxzBxuOkv7mcDgcDofD4aiEj0RxOBwOh8PhxAAPojgcDofD4XBigAdRHA6Hw+FwODHAgygOh8PhcDicGOBB1C2CZ/IU6nbUhf0gJ4fD4dx+eOC0taN+z07pO2o7UdvYCZsz+LvjOZ8dQ607sEf6AsPs2SPYUdeL273J4r/O+xzjcQ6h/1QfrKOTmHbfQEJ2GfaaZN9143A4nNscR2899lucWGMohtGwBomzl9Fv6UH/5QQYn6uN8bUXnJuC04b2o+0YnL6BZRod1ldUoHD1bfBW8jDwIOpzytzQcexvGwZ0edhkyEVGpg5pii9/cjgczm2Ox4ajT5nhMOxGvfAJKC9zsB79ETqcRjwX6t1iHM6nwK0RRA21YgcLKFK3oKE28Ls+k+ipPYj+mRTqlchexue9J4Ds8mMQ3ocmnAe2lGlwrn3Q972tR8rLUKCInB3ordsPi/BNJD8pxudQF7QLJF5vzShBntOC10el78DpS7GzNBfss1Mj7bvQMpqH3Ydk32US8jMJw956FKaNoH2XGe6SA5TXGKP4IOVflpCK3EITSnNDffxqCK2iUKA5J/Ym2HedMh8pR1nBatl3nZywse9Q2abgZpckZcJoMmFjmhjkOXrrqOc4DY2+AkdKA77lJDnFUWT7vnUnXq9VfPvOcYqO9cXJeprhnunEmcZ9ODm3iRzqY6JD9Yzg+J4WjGaU4YApyDfiQugHw1+3auUxh7FeM8yvj2KGXaIhORfL5SymE/g0QRehUg9ZD6+1E7Ypt6BP7JuPJtNGSCKPUuZendZAX3EECy8/iqfMoyyD0ssDpeu13v2FBKvDhYSRg+wmNnXT2mnDlFjRJO8ymbyD5cWBU3SsL44a1FpvgxpeR6Opf4fC1sfI3xxGP3tWXTaGBTlKpxTI/FGEuhMIkR+lv3IofdxYD2oP9yNOlj+l7BKgW1+CisIs1bYb9DkL5BCsDqSgZjS8Xc9Zj+JHHaSJAXUeEnsnas3jWF9BfiDwJan2duxqGkcBy6sjdH369TiSnQYSo/0H9YeR/Js6HxI5L97nLWiwfMFmUFt19KJuvwXacPqmIDaduB25tdZETfWjb1L628tIP6wz0t8ynNPsU+OZKGloQAPbqgxgn5dVMgxLLylyNZ3fW4bsZaOwHDbDOiedFnDB4QISsregrIycedkWZCdIp8Iwfc6C8cxy1DUcQJVRB9egGUd6xoRzWbnZ0LhsOC/uCowM24GkHOjJUXhs/RjUPYz8aTNqd7I1ADuwc89R9I4pMqaCJBiqpPI37EWZ8CXzerTTo8IxbOklx1wt3bMMoxb2Rm/vs5lhsA/FJqCQye3Abhi14zh5sBW2gCUK7sH+Bcdmz/ZSYx4Bco6NfdPQba3wOZjwz0zGxhKj8IX1jrOz7ADGLJ04785EYUm4j+zK5cO2EtKYhYSXB8vuPhy2OKAr3UvXHMDOAg2GSc6tQ8r6SjJUyZ7VgBJf8BJBD+esOLrPjOGEQlTTfQd2G6EdP4mDrTZh7YGc6GTuxmB/YBqzONsbsYZiY9ZF1gTo8pkdsS0fOvGMj9mzjdhnHoamYCcOUFn3lurgIHk3hVkMaG9vRN+0DlsrvAGUWh1VV/9yHL3s80DSDj3NwNKX3ZtZ4t2vhoFlRmXdqfNXcqjR6uiH3PV5qOGrD5DdbH8LWiSbiMZ2o8UzxD4KLO2EwjOEjogXBZBRjPpDQQIoRrKWLH8a40w1skokuTegykCSSzKgyitLydDU2mkgkezf0dskS3cviiWZKtsRGQv8m/q8RcoLwyU2WBRviXa2RU2DdRNQpRO3AbdQEJWApKQZWPtHpH2GB7b+QWoKFuIRXFQcNImJSGRbQoLiS/kimSiuLkZOGp1Py8UTtcwRjqL3nNxhz8FND9DospCbm0tbFnQa6VQYEgzlMG1cjeTEZGQU7EIFGfZMfx/F70RWHrI1Lth8UZQdtmE3xVB6MF8xPjIOjJ6EeUTrd3a6KWpY6yHFYSqJQ0KCVP7ENOQUP4xskta44HVCk1lcjeKcNOGe3CdqUUKtw2jvOXLbxNwwhqcSoC/biTwmt+TV2FiYTw5/FDZ51dCRpCSSpc+BMybR1z8l/R2COerhtA4KvccK7yfc1TxTW4CyTSkYt3RhyHEWJ6ml020tWfAVfyVy+bBNE0RHIshj9gx6Bt3UeNbiiVx2jVjfZXpyeB09VLN+4kgH/c9KhH92Nrwezg0PYypBj7KdeUij+5JXb0RhPjUUozYoRB6tzJPo+tFeKC/vQ6QqihkyJObuEzKZHbEtk6xazggslnFq/yqwqyCDbCcRablPoHpLKqYsHcp8SsxR4CCqS4X/i/+qdVRd/fuggKjH4oJGZv9x8cp74zTe/XhhX23dqfNXfuasPbC4NJC7IvvoOOLWGFHqk50R61PIn9BxAdVyiZYxWHqGyUmGd4xjlh7qLijzHA1sBEVcWC5t+yxgqioEoHHxktwTqU5JcnEJSPDKkhlaFHYaSHj7P4tOyxRSt1RL6aYhb2cZ9JrAdkQimH+LIm9h8yIxJzZY1FkX7SxLTYO15KjTiduBWyiI0iDXQFol72mTAveOaqDXZ0sHAkhKkXqmoSCnJfdU8ZnIpq7xdIQgQw2aBGXrvTo7g0rgwLSQdAby8xLgsp0nVSPGhjHqTsH6fLG7JRoBOd5dhWLDypydqQIGCiL7+4QwLAY8mLUNkkFqoNNFkIpSKMgUhSIaanweTIcOBUwBiQ2GkjQYDNT4UeDoGzwURg1Tqb7IswdlDkMdHeRo11EPKsc/gqTymdrHSmDQDKNtfxfGU40o8bWqiyOsPC5fJkeuQ3amsr6z8rKhcY+LveSIhNfD+DwTDh0qhbL4CyUetczTDDCkTpFO+Yd3R/qtmEnVI2gVDbfJGrGdqGu1Kpz3onHYYXdrkJEtX/sCJOayEatxeGMBH9QgdXSQo15HPW75tLdqHY0GD+lmD0Z1RjwcxfeL1dcdEdFfSUgjOjrjw+RJ/GQVH8KhXeuFJQMMzyzpnwvQZUrjfTdFLtLonFsPY36YEQ9HLzr63dAb8wMCZ/VoDWwERhpdYttzW4SRTDEAjcAi7DSs/Y+P4jJSkZsj9zUZyJDZr58Q/i2KvIXNy5IzDct+f9C6c08jekZCDa8pUaUTtwm31HRefJYBebKe9mRfP6aS8mAIEUOx3kl0sF4M/eO54TdLj1v4W5uiyr2FJkFLzsMDl5Twan0ukqQpvbHzNrhS8pAtf4SODFH6UyQNa1iM5ZiOwmDkRvAUaswjSKZefnGUH7FnvWLmqm5Iefc4behsrMVOb4O630JPWkjy+gJkzlghDh5Ko4aZBcgPKkoKfnb8CG3DHqwroUYnwLOre+ZqbCoQG4zMAoO6BikG5PJwOFltsF6vcMqPUN+xEqiH7CfenWis9f7Ee8fCNQ8S0ck8GesLMjFj7RdHRTw29LMecUF+cNll+qdMDlQZEG/vQOPxESmPKphzwY0UhIzhSbdnSGraQMElknylP32wgO5HbRj2rEMJRQWBgYBaHVWNvRMdwwkwlviDFHWorzu1/sreSQ1xAuskBMsJW5siPuepmg6MpJagXNaZWHK5UEe2w+JCdkkxMkJmfxZnOyxwZZeQ74nWJ8uQjTYJG24II5tqfPNS2qnc/udcLAdTsOyT5ClsT6GDTWM5p8EmaUVC+7fF5C3QN7O/3exvbaSAnOVHluegeqBcDlKqm0V/S1Pk1+yo0onbh1vsPVFp2OTraY+g3zqDVMMmYQosEMc4qUR8tEPHTghLE+KW+Z3y5BSZSBIWG0PBOUlKGgc20iyQpkdOEpvSO4vzQy6k5uuVSk+WEDTmp/sDG4zQKNd8sIYvznoYjVG+bEpcrxGHZezB1NC27jNjPLUQ1f/8Io4dO0ZbOYLGsXG5EAcPbdQrlkYNDaHWKLH1IAewNfMGzneYoVgKoPaZnhH0WMah0WgwesoijvLdBOTy0CazWpMclxyhvmNFqYceWyv2mceRWliNf36RlZ228hA9h6hkzi43QI9B9Ns85Pt6MarRw5Ab4uo4ja8BS854DCX5SXCft4adCpHjmXbARVouiCwY5PgpRQjtkhxFYyTBAroDW5F54zw6zENKW4lGR9UwN4VTnYPQGEpCLLINjdq6U+uv5qZOoXNQA0NJqF+k+ddpHdi9BRlTHdjvXQS51HKhurJ1sbWfhSjJCe2V3LYuWMbZ+sScKHyXBFtYvqcevYFrYQnPuJ1sLExQLmMp7VRu//HCjEMmth7w+1nfRv7WH+aG9m+LyZvCNwtMYmqKDWpGEops/Z2U14Vr8JTLQXJNj5GuTME2vMAaZajTiduJWyyIoshb6mm/0dqPQXcmCoJO2YjTZhpSpGBn/QQo7pwddlLAFJlVjg3a4ErIUY4SqcAd0BKMCXMRWlkwlob89Slw9Xehn0235PpzqtWxhQzDuKwwqjFhOkOTqouiJ6xc88Eavk0Z1G+yDocdzfIohQK7KBTRaY/YMEqOK9eQ43/lwpy41iUYWYY8Yd2NuUsaNVRMJchh60GSsb6MOXXqJTXJXtKm8pn2TjPOU0hgeq6QdKQfHaeiCxZDEVYea9Ygla0psSlzM2KjrqhGp8rBR9JDIa0UCo5y0nwzQXPuUBKPRuaMLBjykjDaa0ZXP3UX8gzKqadIaOKo5tQwB5uVypGZHbrR1mYgQ+PCkPwXF8TskE2Y7vDOSgmwgC55PcpYQDLcplx4HqWORsJ1rhN9rmwUGpXTjGpQV3dq/ZUL5zr74MouxMKsOHH26B7saR/xrdNi66/yyd7d49J0zxLLBfYedLLRucK8kEE6XYSezmEkGAsjrE8MgS4DWtcUzg4GdokceJ39ACJwBD8Ui7DTsPavY+myqeY4n58VNnbOK2OBMP4tiryFzQtjbBA2VwJyIgpFtv6ObQnh1+DJidMsk/4KgiqduL245YIob097eHgUGr0BuYE1PzeJkd4e9E5rkJ0bad5qFD1HezA0OYvZySF0NnXQEQrMhLkPD+bGTqHrnAsp+nVInqVrhM0lTMl5XC7MzskVWomr34zj1jE4Z50YO3MULf0zSDJsUvzMU6vPJ+MhUvWQxVDQGgqxTjOK9sZOMW/OMZw52oJzLh2MRqlMDupVNh7F2bBxggculzffs3DaT6GPOqUaXarf6IIw2nMUPUOTdM8khjqbhKFp3xSP4DSm0dvTC/sklc3WgyP7O3BZuDMIaZuEdTfDw6FHDRXE58BUbUTqlAWNrdIIg5pnjvWgnU1FFRYiIzEPJVt1mO4zL8kb3sPKI3EjCvUajHbU47iNXeOEvfcIzIMeZBZTXoQUIhFOD1nxSUume9HTa8ck6YKt5wj2d4SUeNQyT9tkIHkPY5iCecOmMFd73DJd6kXnuRlosvMil9EzB6etAz2Xlwk2OSelMTsrTpV73LMQTSmL9FuHmf4WHKGyOumaSdtxNJ6k4M6wxb9wXEZ8jgnVRrbwvNH/S6ZodTQCbjfTqxLE0rGOWHdR+Ss35SXUiE4yMjIS4BrsQKuV6SGrox68wdb26uQNvhq5KP2Gr57I5ylcHskl8ugc5VljQEmoiyL5MfL3hVS/gk702DDmpHKN2dBzhP0iMxVGk8p3RC3CTsPb/3oY11F7ZPamSzo7xORag7azQUZsgvm3KPIWLi+euTGc6joHV4oe65L99ecSGyy4ZueEelSPXA8mYTt+isI/HfTZYUJ9VTpxe3HrBVGE0NOm//KCdbHtb6DFYkdCfhkKI3aps/Hw+jlYGmtQc7ANVlcmtuw1iT0mRz8aD/dRD5h8YN9h1NTQNcLWJPzEeaa/CTUdoX/SkpL/CNJsbair2YfDJ1l+KlCteFkckZiBzCQWQwW8hTwuC088V4H1cSMwH6Rn7mvCG9QTLjtQLfsFkh126mGyhaOhmUF/kzffNdh39Bw8GVtRVRxeMNkPr8ccNUo1NQfRZnUhc8temLzdSDL4iop8JI+/jqaD+9DU40BWWYkwujAZdHVmorDuhkw9xKhhELQFqGLvY/COMER8pgOn2M+9dVtRIuUzcf0WGJKmYOk4iyA/6oqKsPIgMkoPYLdRi/H2g3TNPhztdSO7rA47Q02LLSCMHhKJGytQkZ+M8debcJB0oceRhbISofQhFsRGKXNqCMTLC4IGKj5GO/y61PQ6XNllqC1VESaOdAivLWBvSRru2OdLo6aGBYss2Ro09osFSVxfjQNU9+7eo9hH1xxsH4fWuBu1gbYjQ1tQJby+Y7hNWq8RtY5GINWIQll9R0PEuovKX7GshB7RYXLYTQHHZCfTQ2bvVkAvqyPVclH6DW89MZ/nrScBzToURxyd02BdsdH/PrxAVPgxbUEt6UQubgy14/A+Ktfhdljdoj+MprGO1U7D238csp6Qp0s6ax5B/MO7URF0zRoR6N8ItXkLnRcH+hsPo09ssHDYV3c1aBIbLDSxNXJCKmqR68FBtF/Wwrhb9ivYYKjSidsM9rLNLyQXjs2bTMfmL0i7C7h6ev45k2n+WNALrs6ffs40bwp6Ujz33Omr0n4Y/vNf5/eaDs2/e03a/8y5MH8sZJm/iHwK8oikh7cDQhmfmw9uEqKMVdkL5zPki1hPnyd/GCkv4dok1pw9d/v7mc+IW3Ik6paHTW+M2dDJRk8yDchTOUDD4XA4nyVqV8BxOF8UeBAVCm0B6o6F+jSBFgV1x0J+AiMi9k7sY2+kjjNgd1kud0uc25scE44dC/X5iByYyM78n1XhfJ5JTonuBQ+cT4vwbZK2oI5s8Pb99MpnyR1sOEr6m8PhcDgcDoejEj4SxeFwOBwOhxMDPIjicDgcDofDiQEeRHE4HA6Hw+HEAA+iOBwOh8PhcGKALyzncDicWBlqxY62YWlHYlkCUnMLYSrORTL/6S3nM2Zu7Aw6OiwYnr5Be8uQpFuP4vJCZPFX6ywJPIjicDicWBGCqEkYqqqxKYUduAHn5V50tZ/DVEYZXtzJX2HC+Qxx9KJ+vwVz68pgKlyDBNc43uhow7k5A/bWF0b+DBcnInw6j8PhcBaF/EPfyVidW4wyQxIwakPAGBWH86li7+3FVIIBZU/kIo3pZ1oOircakDBjw4JvOnNi4tYYiQo2ZC6RYnxO9qK+OYz1mmF+fRQzN4BlmlTkFptQmut9QdwQWne0wSG/Z86G1n1m2DPKccCUI3552mlDe2snbFPsa1/LkJRphMm0EWm+LqXyOViWgmx6jinP/8LAubFemM2vY1TMCFLzylBRnCV8I2+odQdCFAfZ5eILPp22drR22jDlphxQOfLKKlAsH3+lHkYd9TCmpV0vfnkEKasKFEO/LN/UIJhKcxH8FXviM4IWJcWI5+r8HweVlwfLkpD5SBnKClbLvvRNMj3TgQ7LMMRHy+ouRFkFvM+hOus098A67pLq7BGUlRVgte8BkXTDgd66/bDIH0LlT8koQIkinTB1s+h8SnnQlstemufAKTrWF0f310rynBtDr9mM10dnhDQ0qbkoNpXCr+bB7CUb5dLL9iLXhRJHbx32KwTjx6uvAgH5UtqNWDZrRgnynBa6Rix/ir4UO336Faz8c7Ae/RE6Rv35Z6gpQ9B8B+hlODtVhSBrB4zPKV8mKj47GSUv7kRe4FBUGH9GAhXLLvdBgfkS7odCHl7d08rrI1waIfyD4JscXhmpr4/wzwqGE7ZOM3qs43AJVZiJR8rKUCAztOB+MvrnhtWD2TOorzmJhJIXsdNXUVK5k9lIYir6F8iAPVauf+T/C0n/1qdJo45B5LZATxZeI+ZTqyjfnPUoftQxKtmZE2ca9+Hk3CbK+2OiDntGcHxPC0Yzyqj9yl1gw565WaqxeCTGy5RwrAd7DluRWXUEIT99GbF9YQT4VKpDo8mEjWTwatq424VbaCQqCYaqBjQ0eLcSsG+myrG378NhiwO60r10/gB2FmiEr2v7vu6+gFmcbTFTEKAnZy8FUHNWHKWgajihENX0nAO7jdCOn8TBVpvvC9iO3kbFc6oM8bB3NKLdLl1ASlp/2AJXzk4coDT2luUC51rQ2DMpnM4q8ZahCqzDmmSokvYbUJJFWSCDqzcPQ1PA7qdy5LHbG9Ej7zk4J0nB5TJZKI+oIcNpOnwSk6ml2EtpHthZAM2wGfXHR8J+/Vuef6EMARmZPdsofIBWLA/Jo1QHh+Ww7+ObDEdvEw6fnERqQN0dH6Enaw1CXQjpC4lnosS7X22Ado4ahHozbMsM2HmAju0thc5hweGmXnJVIqp1I7NETJe2A1UPI3mc0mnxf8Q4bN0sQT4Dsbezr9XrsLXC2/Db0b7vMCwOHUr3UhoHdqJAMwxzfSuURVloL+z7tmrqIjiysrCtykBPkEONQpMsX3uLJbuxkqv1M33OgvHMctQxuzHq4Bo044hCsZV4hjrQw75+K0NtGVwOF5CQjS3UOJfRtiU7QTojEcFOY8XjsKKndxqadQbkBgZQjCy/jlWJDgBV0n6D6AAEPRnWFAh6ckBUMspXFEMHS5FGEILVR/TPmqNGth5m2zIYdh6gcu9Fqc4By2HpA9ICTkw76R+ZPQqykqPyuWH1IDEX+lQ2aOj375gdgY2ih8y87KBTsV79S3i4StK/VEx2HURjRBuKEs8QOhTCTsbGEiNSp/vQcVb0SGOWTpx3Z6KwZGEAxYiLT1QGUJ5J9J60wpVagIJw3w5X0b4IPtvnU/eiWDuOkwdbYSWDj9TG3U7cQkGUfMicbRqlglOPomfQTTZXiydy04Rh9YyCXSjTA8MdPdT0LMTR24Ku8VQYq0vh1ae54WFMJehRRgbJhj+TV29EYT5pwahN+gK2E/YRNxLyi/3PeWwT3e/GuPQl9LHhEdzQbUFZYQaSKY20nGIUZAMzI6NCYykotlCGBCRQIeISEqT9RMTHjcHSQSG8vgy7SMuTWfqFFdiSOoP+viEhfQEPhf4KmQTIIwaGLBZMpW5BtTT0m5xRgF0l2XCffwNWbxQRBHn+2aZRZGQEFss4GVGFVB6SR+4TqN6SiilLB0RfMETXTCF1S7Wi7kqy3Tj/hpUCmDjEe9MXEo+DxrtPDsJBDTMLhMt2FSAjmY6l5eKJnUakTPWil1V8NLoRpxHTpU2o+4IUYHwU48LJSHWzyHwGwAK21kHWc/N/OX32TA8GyWmW1D6B3DRKIzkDBbvKKNVhcrjyRALtJZ6OqKmLUMjKwjaqc3k1z57thGUqFVuqpXyl5WEnCVgz2otzsrYlwVAO08bVouyoDirIw87095EGBIPk3UPy1mikfYb6Msy53XSvDlm5ucilLUsnTyeynapnGpb9O7Bjh7g9tb8Ddq0RVaVZChn5iIv3yTFBdABIkPaZnoxROeR6kpxRiAoqX2g5LWQp0lhIsPqI4VmOc7AIZrSLGvJkKncacp/YCWPKFHp9hkAhDYtqZPYoyEqG2ueG14NE5ObrBP9uk6Ko2eHzmKKQIS87WO359W+noMdy/evxpbEUjFF61FWg/2RoC1C2KQXjli4MOc7iZP8MdFtLkBcsgpLBRrkE/XzqICyzudhd7R+NDUqk9mX2LDoVPjsNeTvJD2lG0UsGH76Nk9K4Tbh91kRdvkyKr0N2plKbsqg3oXGPQ4pv/Dh6YWZKYCxTDMPH55lw6FCp0Gv3oaj1ZKzfdQiHiv1XeCbHyelqoNOJCa1+rA6HqjcqlHSZ9G9EHJdhJ5vPzJXnIBG6DOo9OaYDnLsWyWEtgdy7Zb/Pue/YuQdHe8cUIwN+xnCZIoWkzIAheOG7Z9W+RjxqHHYqjwYZ2aulAyKJuflUW+MYZdHJ2GX6KwmZAT8XyTEdw7Hq9WGmBBgejNup25iRpawz4duH0nB1tLrhhXptVtYl1WXS3URUdROIinzKoV52BwvY1lHvOcef78uXpyg/2VAWJYscvgbucaaHYVBTFzEyPnoZSM1FjryyMjIo3WmFfDUJyjpYnZ1BluPAdJCMO3o70O/Ww5gvGzlYwjIsyk4VKEf9DuwuQfasBQcbQ48whsaBy6KSKfQkUZeBBK+c4lgupZGaoKhIIwaC1kcMz/KM20krMpClNATh229HAgwhKSWUg1u6Mibm5VPINAqbEAF5MDpMSpSdH3wUcWwUo+4E5KwL0L+sXKRQGkNBOkMxQe1TR78bemM+lUeJ9rESGDTDaNvfhfFUI0pUOGetodqnm+twDodV6WaY9oU6lpeRilylwSODHOV0SId6e3LbBFEOJ6s41qMT930kaBcooRBY7LdgKsUIkzyCEvDAaetEY+1OX/ARfD3IEFql808d7IOHeibFPvufhf1MK+p3+dMINT+8gDknXPTP+RYp8JG2w/10dHqSXKeSSE5fPoy6tziVejCH0RJ0yMEFJz2COslLCwUXM1QD2sBKYD0U6U+4WJnjgg5HR4buFYQSWhLR6AaG2/xyp15bnysbZWVSIBdl3SiJnE8fLA8/asOwZx1KFKMZDohFoV6deMBHwgIBB0FNXcTEHFwsMp+yYJ9MLjue6qBmhUoeurWX6sADV2APnnq6HRYXskuKkSFXDNVl8MDN0tSmKIIkJYuwUwXKUb/k1Xl4oowavxAjjOGZE+yQlMwvR7Yd7ifdm8YkE2VGDjX6Uzj7+og0zezBnMtF//eiIg0JRSeLtpDlD1UfUTzLi1M0BFUBa2h/pPa5KvQgLhd5mdKUnscGGylttj5g0Y7XLwjpaxDQF/ClfyNQj2NiFmc7LHBll1CbEkwAq7GpQOjWIbPAEEa/ZUijn4JuCqPfFlhUDEmGqqM50eBh2SeT/Y6n0CEafARfeHtx2wRRWiFklgxGjjC3q0QILKrykTRtQWvAPLbH1op95nGkFlbjn188hmPHaCvPls7KyfKtEdlbno/4/sNokoKTyZ5GNL3hgb6iDi+y+2l7zij8/jky8cnUGCQhX7GexbuRA5Muc7CulkYTMfCQD6Om5ZlQSM5ifHBYcr5yEpBMrZAn+DBV7JBzSYJbbGTlyA0tgZWZGgJpNzroXmFVMht+Dk40uiFfg8Hm+ct0kzDXHwdbmqW2boITOZ8+WB4ObEXmjfPoMA/J5CL1DD1uWYMp4pwMFugHoKYuYiJebFQytwprRAJlU2XwrngPglAHFIQoev1u2LrY2qlClOQEDAeoLsMkpqbCjWQs0k4jQbqioXy6o1bqeMEOk/KV6wy9m9BRo0a/rCIfcbYW1EiN14+a+im49KIiDYlI6xlFwtRHFM/ykiwaQgRLcGCcVDo+YOrQj9rnRtYDEiiyxSgKZ602jGr0yA9c+Oz1C+XrhHpdoH/SSPSyYKNXUeK2dcEyztY55cg6UDI8I+ixjJP712D0lAXhVrmxheWzcwHeQgr4hDYkBJHal3jR4LGVre0MkD1bLxnG4m87bp/pvDVrkCoMySq1e4R1KzQ6SDNtAkJgkVGMnUY2j92oWFwsXJ+SC0NOmm8Wb07hCe3orN2DxjNO3/qXtBwDcoWlM2wuwYHREXJnGfnYuDrZZwRzTrf0VwS0qdBpZoR1V97gR9hYQvFsXYuIg3kYrQ7Rufw4xAW1SsZqrKHOzcyot3crYe9B3R5xsWBMaDOQoXFh6LzS1GeHbMIUWybrUK1eQ3/NkNyUoZ29pw57AhYmLyQOugySgn1EWrMmQT3no3vqcIo9NgrdkK/BENZqGNcjxX0e51jiKusmOCry6YXlIXk9yljwTj1g+YLpNWuEVbBQFmVE6D1rdLrwvVI1dREjOpYvtnYsTiYX2hjy2XB3QOszJtiMFoo2jnSuczgBxsK8hU5cbRnGBmFzJSAnO5REFmmnkXA6hBELTaRezgK0SNVpMEN64pbJMVFUMp8s47OKUXf0Rfyz0HD9M158zijzBerSYIRfzygRrj6ieJaXOF0G5dWOEaUh4OzRPajzGoIQlGhILwLHXL2ofG5EPRCJy81HNvmIk12j0GQrpwgFvH4hK4e0LIj+jdioM5CJnPA9KRXY0dM5jARjYch1TvZOM85DD9Nzhcic6UfHqdDB0HBHDWqa/D+MEZACvtTU0DKJ2L7omE9l0+dxMtnTxs4Fq/TbmNsniErciEI9ReYd9Thum8TsrBP23iMwD3qQWVwYdJRAW1AFsZ3y/ypEaAyme9HTa8ekcwy2niPY33FZPCmgQ7bOg3GLGT12Jz1nFpPWHvSSzukEDy4aN4bfQKdtjDradpxpr0PTOTb2rIYsFBSkYrqvEUcoD05K3zlmxfH6GhzstMND/W27tRNvDJMRrMuOsF6IeiIul5BHIZ+2Vpyi+3T64PflGI1InTqJxuM2TArPPYOjrf1w6fTIjrox8JIFo5FCpP4WX3kmbcfReHKKesFbpLVWOXQNBbQnG311N3bmKFr7XUJeIz1am28kBzgI85Fe2J1U1skhdLZ0YTQhD3ls6UI0uuFx++Q1OzsJm+UsOcdUIcCMXDfhiZjPAOJzTKgOCPQTNxYKizc76o/DNklpOO3oPWLGoCcTxYWRPLiauoiNxPVGrAP7laCUL5LdELOdmjaclQ0RufrNOG4lu5DquKV/hp69yf+TdYbbDY2hRLFW0U/kMnjmxnCq6xxcKXqsS/bW5SxcbM7Q44Jrdo7qSo2demA/1YjGnkh166G0/c+ZHOrBEfMg3JF+ARWCrIIC4RdYjV49IT9kPV6PmoOdsCsy4v0hw8IAXn0aKghbHzE8S5sPI/ndQfMR9Ao+lHSlswVdownII0OYmxxBb08vpjXZyA0jv0jPVacHXnKQTz6CuiLIVqx5DCAuF4Vkk0z/jp5heuzXv1QKfBTrqOS+RBgGl+sJPV84RNcoRorccGsMKAkl7LEetLMfyRSS30rMQ8lWHfkjs+xXjUqy89dBQz69pXNI8OmCzzFbMJ1kgCFoMVW2L4nrYVxH5sN+QS34VEnv99egTW7wXwD+Wx0h/f35xWHDG+c/xtoNG/BXd0nHKJa2vXEeH6/dgA3SweScfGTGXUZ/z6v4t75+2K7E4+ul/xP/mOtVhcB74qDNzYbH9m94o5+MID8X6V/Nhs51Ef39fXjnl+/jd5pvoezbX8Lg8CSSczfia3f9N/z513Oh/S8b3rJYcLrvlzg38v9Dxt9VwLRxpeDM/jwrE5orVvyy7wx+ec4GZ+rfozTzv/D+f/wJf/VILr4i5IXxMX438C6m0vxlYNz1V+uRp3VgkNK3nO5D//vjWP7172PnD+7FXY5zOPpiP/5P5vfwT0Vfhf+uwLKJ+xPjg/jlL38pbOc+8EAny+cC7vor5GbG4XJ/D179N/bcKdz1wPfx9D98PYQxLawDhsP2Bs5/vBYbNvyVkL/lq76pKM+5D/4k5OPpv1vty8ddf5WrqLv3p+7CA99/Gv/w9YAnC7oA5JIcfW4mTovcXC0cg5S+5TT6zg3jT7rH8U+mh3zv9oqsG2JdXJoY9snrl788hw88Wmwo+yc8krZcuCps3QhXSMSUTykPd+XiEbqOweSinerHW+TV4nLXk/4nIyc/E3GX+9Hz6r+hr9+GK/FfR+n//Ef41TyYvYioqYtAPv7dAN69dJeyLB//DgPvXsJduY9AyOp/+3N8XZ4vkt3wXBr+7p9+iL/5f1jKYtn++PVCZP3u5/h/d72F/z36RyTn/xP+J+mxKF2p/P93Hcp2bsSf/zfh4ILnhy+DA7+sP4g3rtKF/+d3+JWvLn+JwXE3tVHjGPzlNP6C0vrvEe30Y4y8dRLnZnR48JurpDwGIMh6AuOD/uecG3Yg/mtGlMv0LxRC2abSfLYiQHa4Pk+mJ/3vY3z51/H9nT/AvQH16SOwPiKmocZ21dVH9PllfpfudQzS9cyHkq78SYfH/8mEh0hgI13P4eeXkpH/j/+IjX/uF2B0z1WvB0JaxJdv2PHWpVUw/iAHfy4do6cGsck8ZCf8J97/t/8l6d//Rcbj/wTTQ973REn3yH3J8H/RcbdMTwbBsoH/omuGv4RckjfdROX7v1hXtpPK7RO2rF4dOPXjE7j451vxo6K/EvRx+aqVcFtP460PE5AfREf/259/HfqMOFx6+xeCT/8l+ZyPU/8OFU//HVYH003V7QtrB+U+len9HNL+7p/ww7/5f2S+RJRFYBt3O3EH/+wLh8O5+YgvF7TmyV/WdzMI8qJDGY4gLzTk3I5Eqwce2I4+hc6EqgW/ELyZCPmw5ileAMu5tbh9pvM4HA6Hw4kSz9wk7L2t6BxNQp7h0wugOLcHfCSKw+F8CnxaI1EcTjQ40Vu/DxZHArKLq2HK+3R/VyaMRI0bg46WcW4NeBDF4XA4HA6HEwN8Oo/D4XA4HA4nBngQxeFwOBwOhxMDPIjicDgcDofDiQEeRHE4HA6Hw+HEwO0dRHkmcapuB+pCvc51SWG/PtqBI8L38zywd+7BjlYVX3iMgVlbK3btaMXNSZ3zmTLUih17pDc9z57FkR11Id9GzOFwOJzPltvv13keJ4b6T6HPOorJaTduJGSjbK/J/zbnm8jcWC/Mba9j1HUDy5KyUbzLhKX6xezspBV9ln7Y7FNw3ViGlE1VqHssyLdCOLc4Ttjaj6J9cBo3lmmgW1+BisLVET99w+FwOJxPn9sriJobwvH9bRiGDnmbDMjNyIQuLdKHYT//OHrrUW9xIDn7ERTkr0GGLg3JX7CPPHI4HA6H83nj1gmi5sbQazbj9dEZ3MAyaFJzUWwqRa5spGekfRfM7hIcMOUE7bkvfNX/EFp3tMFh9L8AcME1bHqlzQHjc3X+D3CO9aD2cD/ifPctTIcuQk/tYfTHGcO+0t9pa0drpw1T7hvAsiRkPlKGsgLZyMPsGdTXDCL3udogHwCVPm0wLe0iRZnPIMift0yTiryyChRnScN0QlnZlye3oKF2Y8D38iapPAfRPxP6GQvlS9VmPYofdYwiu/wYhPfJBZPnAvmJ+5QTP8sSkJpbCFNpLvxVPoexXjPMr49iRhBfJowmEzbKPlg2N3YGHR0WDE+zCzSURrGURqDs5IhlzB5eqvIE+wTFHKxHf4SO0Wxf+qrkF4i3zmQsS0hFbqEJpXLjkBNLPauwv2B5AfzlEwlfZ4IMrBkoyXPCQte42DUpepTu9D8rmJzoIOr2W6CV5KRWlkr7S4BufQkqCrNk/oONDLai0zYF0UQDdOwm1z9lEO2tnbBNuQW5p2QXoqxsfchv8gVLw3GKjvXFUR4lHxKxLr32l4otDbXYGDCKP9lTi4P9M0jxli9ovYv4rhFYClkG7jMCfa06eQcjtL+QUGMHrJydZvRYx0X9pXI+UlaGgtXxVMQdCCEqmV6Gl5NYx3LHRflIyUBBifgMgWCyVLRbiOj//HXACcctsibKjvZ9h2Fx6FC6twENB3aiQMO+GN8K6eP2gMeG/kEdHs6fhrl2J3bs2IEdO/fgaO8Ymc9SQgba0Y8ZaS8Ujt4OaoiknRDMnm3EPvMwNAU7caChAXtLdXBYDqNJtghmsq8frvwCJPfWY9dOKhOVa2ddO2zCh7K1MFSTPOjehpJM4fpwzJFh1fuedwA784BzLY3oGZMu8DLVj75J6W8vI/2wRip0IJ4hdPSMSjvRk2SoEsvGZFMmfPYd9e126SyTcRMOWxzQle6la/aiWDuOkwdbYfVWODWsTYdPYjK1FHspjQM7C6AZpjSOj4B9xd8nu4YSMOlllnj3q2EI5kAWWR45nqEORExK9fOSYKjy5n0vRFHVQyaq4KiuZxX2R8y6XPR/HfKpwShjW75OPCEjYp0xps/BMp6J8jqqsyojdK5BmI/0UFO5CILI0qOwB9H+Zvtb0CKsa2SwhncfzMMJKGS6cmA3jFJ+bfIP78eAqvqfPYvGfWYMJzyMqgP0/L2lSJ3swsHGXvJCKrG3o7FvGrqtFVKjqK4uRabQv1BB0B/UEch1kG2iTfm5ebJU42tVyTusv2Cokd0cxS/1MNuWwbDzgKDjpToHLIebhLWNWT4fUwVDktLHlWSJ96uTUyZKpPsaDlTh4eRxekYLfKq7gMB2Kwb/xwnKLRFEzZ7pwaCblKb2CeSmJSIxmaLuXWXQU1+po0dqKcZHMI5RnDSPQFtYTYpwALuNOkxZDqN+QZQQO3PWHlhcGmik/aDMWdFjcUET9qIRWCzjZEQV2FWQgeTERKTlPoHqLamU5w7JGGYxPj4D17l2nPIYUEGNSsPecuTF2WDed1RoeOLiSR50b6ImRNfUxxgsHdQF0pdJz0tGRmEFtqTOkKOUL1FPQFLSDKz9I9I+wwNb/yDYR8ejYczSQzUUQVZhiEtIEMvGZJNTjIcpOHCPj4sNCDUwnZYppG6pxhO5aXRNGvJ2kk5oRtF7TmxihiwWTKVuQfUTuUijNJIzCrCrJBvu82/ASvL1yS5RI0z5xmm8+8GngBdbHj9UFz1UF+EVJIrnxSEhwZv3NOQUPwwqJelOuKZWfT2rsj/C7WYtSQIyc3ORy7bMBPGEFxV1JpBgQLlpI1YnS3VWYUDSDAV8i/glRTBZ2kfHEbfGiFKf/RmxPoVcCR0XmBvG8FQCmcxO5AnlXo2NhfkULozCJhdb1Kir/xHS3/EksvudoiwS03LxRPUWpE5Z0KMm8pgbQmvrIBviQMV6cThJbV0yEpKSMGPtJ0/lx2Prp/ulHQVyHWSbaFM+bpYsVfladfKO5C9Uyc5BHQDBze5CQUayoOO5T+yEMWUKvb12mc9JQAIJSO7jhBUaquUUB410n3hNAVJYCyipbiDB2q1o/R8nOLdEEHX58hR1cLORqZijy0JetsbfqM65yflrBOUtzGEOOhmrN5pQQeH+TH8fluSXbFJvVmd8GKE/U+nBUEcPRnVGPBzuW5YOO+xuDTKylYvDE3PzqS/vNQYqE2uXUo1k2HmSI81BcXUp9RwCGh6BaVj2i6NVwojVnkb0jEhdE8dleh71NnKF7o5EInQZ1NA5pmU9Ww1yDXpgsN/f86HGr3eUZKunKEYt1Kvr6HdDb8ynZnXxeGZtGCQ/pdHpxKnR8VFcRipyc+RzDRnI0JEUhOBhDJdJhkmZWcrpqhwTjh2rhtSmqGcJyyP0nN16GPPDpBTz8zyYtQ1Sn1kDnS5cd1J9PauyPzVErDMJTYJyOn51NjLI+zumVT9JSQhZZhUfwqFd631TNZ7ZcYy7qKiZ0ghafB5Mhw6hVG4ylLPFNjCq6p/0d3TUjYScdVB4iMQs5FKgNzqkDHgWMkd+qIOa93UoK/Mvb4imLjW5BgoQBtHvVxCc7R2FRq+nID1Kboos1flatfKO5C/UyM4zbicvnIEsRTm1KKg7hiOlKj5uHJOcPJi02ui5OnhVV4GqdosTK7dAEOWAk2kni9jFAz4StIFGoUNGgJakrUmj/zsQq/+VY+8kp5RgRMl6xQS4EnsnOoYTYCzxO+egUOAyQy59QRFYD0X600sCtTKKsselIoMcqaLhEUhSTOuUrplFf4s4jIw5J9hky/kWf5DFtsP9dHR6EsLsoER8lgF5SRSkSWPDbEpxKikPBtWek5xthwWu7BIUZyg8joQy2NshrL9YyLRlv++ap2rMGEmmXnmxWMFzLhZdTsGyT57OU+hgQ/bOaSqPC04qWlywx0dNpPJEAQUqHdRzzi4pRuikon2eXJ5PocY8gmRDBd0rnQ6BunpWb39zLorSU6QgNwiR6ywUop14XPLRl2G0+dKgbb+FpBCMSLJk62fENJ6q6cBIagnKZRG2x2lDZ2MtdkZ8jkoi1r+3XIfBTFOTEHiRFilMwDfCjUSxNH6EtmEP1pWUIsvXAkfjS4n4LBjykjDae5akSEz2oX8qCXnqHYECdbJU5xsE1PhaVfbGiOQv1MnO6RK1eJnw/9hQJye5/j+Fg31UxrKyoJ1DVe0WJ2ZugSBKi2TmNDxuireVOCcDVYuuYX56AeRFFtl9nJs6hc5BDQwloReJ00U41TkIjaEk8qI8bQqFPG4I7YqcII2JZ+6G9FcAywILpZzWyX3iMeoxTsM2TCnGJ1NTlIR8xboF70YORkpBJA2bDKmY6u/DpLQGItWwiY6qw23rEta0FJbkhBC7PNhjW+D6CRH5egE272+Is+KwtB4kXmhcMrGVrRXxpSNtVQZyqglIZg1vUH2IjsjlUYsbti4LxjMLUZITOqXon6eU5wEqf5z1MBojvmBKTT2rtT8PdVSoFdImh7SPyHUWCifYo+LY/IcP2ZoQ6f4k6YycyLL0rw05sHsLMqY6sN+7mMxjQ+s+M8ZTC1H9zy/i2LFjtJVHPwrjQ039e8tVjnUaumOBg5A6hAtsXw5L4wC2Zt7A+Q6zbL1ONL5UJG2TAanS2rmRfitmUg3YpNYRyFEtS3W+QZ2vVWdvIpH8hTrZJSeIWhzCY0dGtZyU+r+3TIdJcz2Ojyhzp6rd4iyKW2I6b82aVGDUBptCwUdgox6sb3pHqxPmhIcvK5VojM2LaVKhW1QQ7sK5zj7qzRbCGObVTK5znehzZaMw3EVetBnI0LgwdF65Xmt2yEZ9de+wrNjrdNuHqZGTMTeOEbJbXQbJRS1akoFmBvYRtxRkSRvzLfELh4sT1xcgc8aKN1rZGohMFKie/7Kjp3MYCcZC5IXs1UVYPyEhXy/A1h88tolCvSkrhlkjoluDVGHaM06WDm3sRmFxwWqsIRnOjI6IvWgv9h7U7QlYyBwWNeVRCT27k/WcC/OU01UKYnmeUp7JGY9BFNWwEHCGQ009q7K/ORustJ+ZHSbEiFhnEm4XFI8aG6W7SIWFIRgvsjUhbCNdWahD4WTpxNmje7CnfcS3NiR59Ubkk9x801ojNoySV8k15CDNm785tzJv0aCq/r3lykIO6a9r6DwUHmKW5E62n5kTbpiRpZGM9WWs8R1GW5N/IbqqupSTuB4FmTOwvtGK/kE3MgvWLxiJUYVqWarzDap8rSp5e4nsL9TILk6XQaW0Y0SxfmlW0LW6UyrW5kYhJ7n+i+v53Dh/Tv5gde0WZ3HcEkFU4sZCYfFpR/1x2CZnMeu0o/eIGYOeTBQXSs5Ea0Ahdd1G2xvROTSJ2Vknxs4cRcs5F3RGo2ykxQP3LKUhbGKvwuNySfuzcAlTBuyaOVmPww03NTCRRgbcbnIyhSWI2OkRyILRqMNMfwuO9NrhpGdP2o6j8eQUkgxbfMOyOZT31Jl+tLSewZiT8jg5hM6mDlzW6GFc0OB5KP/esk1iqLOXXKgO+XoWQWahoCAV032Nvuc5x6w4Xl+Dg512WVkl4nLBlswMD7M1EAbkqioTg2SlMaBkCX4fK68XVuen+oRFUUhlSZNzN66j/LHel43VN8lvqAdH9teg7aw4lifIbuokGo/bMCmU9wyOUrDg0umRrTpAUVMeudzZ5terOblgST8ij1LGIj/l8532UxBFlbqwUQxERT1Hsj/PnBO2jh5cXpaN3Iw5vxzcAbakos4EXP0wH7cK+i7UWUs/ZpIM2BTqd+khCSfLZGRkJMA12IFWq5gXJzWYb7D1x95gQgj6ptHb0wv7JPkTG8sr2Z5wv5ylrH8vccgtlGz/qNf2bTjeeBJTqUYUqjHI+ByYqpkNWNDYOiQ0xKp8qQLKh6ggGCWfY1DvCJSolqU6VPnaqOQd2V+oa4fyYaR+xKD5CHrtTtIF5odb0DWagLw8FZFMFDrnb8dY22HBWQquU1kk6ENdu8VZHIuZuv0UyUDpgd3Qms1oP1jjez9HWV0pcn2N4f+fvf+BbSvb8zvBb6NF9KPwhsKKsy1ihtqAQpuToTBNbZu7IZGR8IZCTAxsNFhZcRELGQoBPZHUK1VDrlglSAIsA5JhS3gWtiSs5VkTiAiEBobeNiddRh6FZ04/aTYUOjRa7ERED40WM6GQR01AZUj0kuihkdrfufeSvJf/RctVlut8qq5F8l6eP7/zO7/zO394jgqDd+5jJvAMfu9DHAjbfOhh8axiQrFdOVWChQXptUR4Ewth6bXAOT2zjhzbK0P6RN/OyAAzbhcYrugZmcdqN9unZgvLQWFDEJic94R9osroHJhfVMPrC2Jz+aWQ916TE/fmHMoFpwLnlJUFlLLSpTHBea8yT65zLGFVK49PA4PNg/lxY91KNmi3offwCEN2xSrHFqhxfdxZJ20X51xRLqzMB3F7bpzcQQYr71Xc6/fCu/sQC2z8vKsPZpJfee6fZDd3D/B6d/GQPSDld2m8/j5i9WknP0q5l6H0r2vEPVkE1Ncx3rJL2In8quJn+9sM3sbceHvl1rqcm9e/ox32k2z2XAy+5doVLOW6pGujzBh9w7jVH8WzFZ+0T9QwZuZcHehUc1nqHHO4B0qLv5QWkpuV9KO0ALhnFDMzZ9j2fovNh0GhPt3yuNFNnZgUW484VGqdL7P8ZdSp+33mMdxzj7Z2jkuwOuBJYtn7DJuh+1hytGNLqxDWzh3iaMgu1b0OaFuWbdKOre1A3s3tRTuy68bQ1BI8bJ+nrWUIZrbPjLF7boy2k8W25VTVjlHbYbDPYLJqU6+22i3OB/Ebn9WO5ZdFmm3cF4GNbzjG6Zh6mwJ+nggbCKYbbCpbdwPFxggbCUZsTTeovRr8eMqfw/kxcyWm8zicq4qKD6T/qOHlz+F83nAnqiHST4k5nA9A2/dBv2i4EgxNPcXTRiNHwj47P94R3R9D+XM4P2b4dB6Hw+FwOBxOB/CRKA6Hw+FwOJwO4E4Uh8PhcDgcTgdwJ4rD4XA4HA6nA7gTxeFwOBwOh9MBfGH5FSR/8ga+F69xfFoob/g2PjUBi+yHQMIzviBiZ8Iugug1jGB80oXB6k3OOWWKqVdYexjj+4NxOD82iim8WnuImI3v68W5GNyJumqkQ1h7EET+uhueL0zQ5t8hsOPF24IVc08mxONtys94MOW6Bk0uide+ZzjI27G45mr7IOEfA8XMEcKv9hCJp3BWeA+N2YPFKUtn54NxOJyrQzGDo/Ar7EXiSJ1Rh1RjhmdxCooDLjicFnAn6opx/Hwa28kqZ+gkgK83wrg28xR3BoHE7l1sxm2491h2VIbwTBSWe4/huvj5GZ8l+aPnePAsBhhsuGG3wGgyVA795HA4ny/5Izx/8Ew4W9R2ww6L0QRDf+1B7BxOK66GEyUcHVF7JhejT3GsQh4nIS+838Zxzs4sYmfnjU9hojzPJR7FgDEP1Ae7OGRTXV0amG5NCufVlY4Yyp+E4PV+izgLRIZ58immyoegphFaeYDgmfRWQp4e4QiLoA6TT6dQ+lr6FX22p4Lz/pI0ZVSbZptnBuN1593yOH7lR0TrwJ0R2XhSPoInX/nQLaWvmM/Sk93okTsEghMVgWnuCUpHgykoyVg/hkdLo1UjMSkElh4ifN6nPL5DOB4niCoRyGTQnrzbkaUS8fmI0Q1bJohv4znxXDHrBGYnLGClfUyO5Ha1IynkMQX74hpc/cfYvetFwb1KMvuAw6UyUfi9AUSSYhp6Tbfg8TgwUCfIVmm69noazzCJpxUlq6tDLM7dHT+ibDqXnfdm82BmfBA9DcpDoK9yLEsmys5PjOK0wMqjl8rDIyuPUlmoYZ0hXak6LK0Y3cKX3jirDIp0ViOmu6ZAlce55E8Q8nqp/M4bTEvXOTolH8XOshcJ4yRWKX6WZkV9lctD+EJ93RIxl+VaT875yBa+8sXFeq9rR7bt1OUG6SmHId3XyeWbR2TrK/jilfSyz+RxCWcQkq2bslXqS1tyUcRTRw71ju0hW7JEnTZVVT1XHnFzQjZjA2FVg+OA2s5nLYqlCixflnFMSfVeoKVeiXXRW3CXdaguDet2M52SbGS6ts3q0lB75JK3R4wqnek1wTk1hdF+0XbXrf9SPdeV2qN6ZVRdJnWfkaN8vni8i6+3YzB6yD5KBwOmQ2uUliJuUBhf1A3jx8kVWljeC/vcIzx6VLrcMEl3SiR2l7ERTMMwsUj3VzHrUAsnxu8csfPLK8SCITIA8/TMIjzmLsSDG/BGpGey+9jeCCKpG8dik7iAHNI5QGMeo4pFjZBnDGaNdKsRiV2s753BcHumrMgngTVKcw5Ds6tieizAwfY6AinxvpJuDH5xR+lAMZIJnFKPyiQd4K3q7lE6UMUUQi8jyOkdcNRzoOSchrFXHfdxGJFz6bWcTIoaFXm51JNTC3kLdCBL4uyAysk0iRUq6zmnAblDL54EToR7gxYz1Lko3opvBY5jCVKjIVhJfMVoGIeGmxg+82JpdhrT09OY/XoLoROlrjSFerM7a15Eu+yYXaX8L07AkA5iYzNETUQtrdLUFlKcMbVDiHN11sYUBuss3zo75ks662YlYYK79H7eLjRk2f11LHtjUDtmsUqfL04YkKby2AxVp7iAw3AURemdSBb7IXKg2iAnFij5z6w8PRirKdAEdpc3EEwbMLFI6VudhUMdg3dtB1XVVQbFv015hxVTpcaPGvQ1qq+5ISk/YgUieVQpsckt6ah4zdl7pRsNKB7BF5DltQ3ZtleXM0hR49trnyunRQiuCcUjH+RJYaRD6wpbN2fvRsK3jl1SJ4F25XJhyIHwhVHPHMhJh3zU6ZLetEm9fNZADsTmxkuk9BOCfV6ddUAd82Lt+bGkq23oVTGK8KEBN4fP4F2aFer+9OzX2AqdkEsj0bRu62Cfl8pesnkmd+n9POxlB0NuG5ntAw6pPSqXEZEObcrKcRHjuiRePtyBwjz+AKgGx+G5TrbbHyCJEtRRDwRPSW/d3IGq4go5USpoNOQc9JQutXLoNfsGgcMCKfMS7lj66b4WRsddeKykCD5JESRM4/MYH2LP9MNyZ0kwYvHQgdjwJeNIUm/C4bKhv1FcAnkUCoDaMAiLxULXIAxq6VY9WKXcORR68DMjpZ7pCWLH72EY88Bl1ArpGRp3UP/4HMfxes1wPajH56dwrU6Ug5VgvRjBQHz5EMGsBffm6/UI5WjQ23uOSPhYes8oIho+pCa1DkXqOinKpZ6cWshb4IKylNDYJzE1OgCtVNYz1DCeh/eoT0UM2mBW5xAteywJRGMF8leswjRo8jhJiXgJ77EOLmYQV+/BaThFcGMNkh/WkjQ5caxB99x1wKil/PdbcGfWib7TEEJyhSvRIk3tcBL0KeLUGl2YGdNL+Vahu6SzalYSKqhL7wWn+hjBYJIM4Qzukjetpc/7LXcwT98/pXD3s0IUIr296I2HlJ+l9hA+lV63IC8WKDmOrDwtGKwq0OybAA4L5Igs3YGln9KnNcJx10M5i5HzUk94TJ+38SKph3NeWvtHnMSO8d5AzrdLys/QOBzUWJ0fx5WOrEot6ah4aTT1NLXCSTBAKVHTfyVaybbdulyEUGs0mnJahOAacoJgIEaylMsvg8RxAZrh8Yqt++IGyaSAJDvpn2hbLhckHwkgmJPLpQ5Cg5tTJrkl9fJZy1EwiFP9GObvWAT7rDU6cNdtRuHta0RIV9vSq+Qx2fg4XnqPoXOxzt0q7lEn7JQ6E2tS5W9Vt4WOqlB+os1TqUvv5VOCctvI9OEm6UOljFiH3U+OiX5sXirHfthmKa3qOEIHH1JKl4EKg+PjlN5D+KmDlQgEEFdbMcHXgtTw+Wxx8O6dMBpjNikHZwdt1PsvJFHSW4ZKYbW6YTIbgLOkaFx0BnKhzsggZqp64R9CHkc+1vhdp165fPh4AF+sPMb8qNy16ZL+tgOFu7ONcIHCHa8dYtLZmYGg3to9N8V8gI31+iMkFdSw2MnrPAwjWso8VfRQXA2rlSxwXXTQtuiZNJX3B6DWKMt6wGykHKRxJgRsxLBNg1z0LZln4iSGeKEPI8OiuyI28sxIujAkGNsBjE7NwE5OZHhPcMNaUEQycUbRDEIx46VzYOVpgynTFmlSsaLPnFET2Yg03iUo3SZySqRPGD0GI7m/pXw3IZ1AoqCG0aw0hD2WYao51KyQX1mm3w67/pRkURm5OA5HcK63wtonffABvHtH3pjBDGV1HYTNrEYhWUc30iF4WYPj9CimIwa+WMHj+VFF5+AiNaguFJcvXKB+yTDJtV0uVpd1rSqNhDCiU7DCOSxPiRYjdx/j8XhFC4opJjM1DAYx3I8iF2l0zuC8WXZiaymSraMG1+DEzVaj3jLq57OaE7wjHe01laYkJYTzGeeFTmRbepUvkCtDNs1zFy6hc6fFwOiUrBPWSd1uRRHZ6CF1myplxDrs76CHZUieGyOMgnn8UOtYjzMEH4ij7uLI+zoCx02GvLotcLtMOAs+wCb10697xpuU+4+Xz8aJSmeY0mlAjr8Sja6lIeyhXiFT8vfMcaCKMnX7GjIvl/GlpGzT02wBYhXFAn2DHm95SnEMz6a/wrNYEdfdExis7nVmE3izs4a70pRS3bgawIaCn8W01DO/UxsuQ9Ut9IK0AzapFxVEsIV/0D1oh62XekLSEERqL4zTXhvsjXwo4qLGWSFvRtuybIFQ1kXkpHAHrBb0StNnJ2+jyPXZYJZHQc6H0ij04xrzZ9JntY14DRnkBG/nYrlvlibjkAk43ce3x9LwTzGPXCkzAnlkcvTn7bakK9K1EUaODGSqsfclQvk6JwnpqitED9Ub6WUFaqgdJpxHwhDGJYUpkAJMjuEWo5mMIgpigTZ4Ng2xumpqfgWpqUkcmX4y4tMPgjjtc2KqZkFHFok3O1i7K03L0NVg+WSbZLHvCyJndmPcqHTSW3KRutyO2lAHxhfMweymxqtuUtg6FjGuLx/uoWifoTRLty5dLkDCTx1BjRPuEfmanioSfvhiGjjdI5U1Sq1omc8SOUH/yaw14CJ6ZYCxyiPoFys/dUY6q9u1yJ2WL7HgPYZWVkb5HHNgThFcLj0jPudjU5qKzhRrQ2TP1F2bp3SQ6uuecnpxwpBFeHsTNTP5MrptDgyzwcHeYTjqNjKcz8aJEnt2kvGWI6zbaU7mjKmrCl2SjuhGbsFEiqO2TkoKV2etT+qU1L8Xrdt9tnZiFbdN7/HW561a75FCYH0Tr4tWzKx8Q72pp3Tdh7ONnr64yA+oLFCvwBaWZ/NVgpAatHTL4Yp+3LDrcUo9shQ1n+HIOfT2G3Wnm4Sw1GrZyFp7VMu7fVm2QChrFcozNf1WDPWy6bN9vD3KQT9sVTbqpCx1+2H0/dbmQguN0EqwyZkL0CRNKosHM8MqRLcXREP45VfYVCws6YaW2oLe4cp6GvlVZzBSCelAL/XBBdstp8Hol8pihxWHCEepF70fEobz7dIi0+akcHpK6WxYoNLopeQ8y8mwBUNVCOuH5obRexbETpXFTwXWsfm6COvMCr4R6s9T3G+nAjWgEH2BYNIEl3uoDR2Q02ZdFhx0NdQtxVhA9AVb8+eCe6hRSgbL67IWJ4fRHd7AZqnzc8lyyZ++gv9QDbu7yZKA/Cle+Q+htrsbLF6uRzv5LKER9J/6Fg24iF7RMw0rf4d1uwa50/IIq3N2qCIbWJd0uFsYSTfhNltzJT1TvujZihMqW38n3atd0aeMq/76VOX0omXqC5jJ8kZj9Wq/SDoUwAHT1/M9BH/ohVqfKJ/PdN61a9AjjmhUWdDHUXLr1QaURlAZRYWnlUciQRa/z1A2Dtn9IA4LBjidQ5LC1a71OTmMIqcZUo5s1IWtnaBevWeSFJZ6FPJFx+k4jqmNNA6PYkBbiiGPTN0FSBXyRztYD2Zgnpyra6xivgUsbO5TX1SGNLqi17dMMHpGHDCdR/B6JyysL3BUL7aSSCfJMAnTn81pJe/2ZamkUOUNnAjzUTqZM9aP4ZE+5MIvED7XwyrbAEZnoFQnY3insLYnwpSWWm9ooxetgsFIYSSOxZGaEtSr3vp6Ba/EpRV1aJwm5iQNjq9g65ufi4bw599UNXw66A1qnFOcBUEvSxfTnW603J1BZ4RRncORfGU7kT2KClPhpR8mVBiE3daLeMiLF2Fyc2125fRGI04OEc1pMNSkQK9d0wPxKJTV9Rhida3oBkNYP2Qcx6yTrd1al/1QJI24WIEwOqAt19F8qwrUkAQC/hg0ThdsF+0ZtFuX00ly9HVg6teURAB+NqLjstXppCTgX/oa628y5XVa/UN2WJhKC3XgsuWSw4F/DzmzC84mS2JyB37s5cxwNXuomqb5rGYA10hHz+PHSttGYax8LS7GbkuvBJuVRExZ+UX7odbDQOXXWd2uRrmOV2v8Ajeoo3MaiYltgIG1WWwaXVV+RrjYPUVllq2/YxfVh9qqroyr0frUeqjUDUbchBFCsgzOJWGqMx7wVcmVw/h8nKieUbisasR9a3geTSGbzSARegLvYRGmcZdi2iYe2ELgiD2TwpF/Uxg+LU9TFI/wQlh8O1azUFukiPzJK7w4yKHPeh3abJbCYVdOmEYq5nK1o0CM7iFMzTuhPw1ifedIHAHRUYVVk9Pz2o/oSQapxBvsrmyCgm5MOoTNZzGohz1wGYpS3NIlxWsevg716Uts+4+QYp+njuD3BnHWa4e9nVZQZQFbGhWLxaG2knGuqY0k24gfr2PklF031wydV9NY3h3KUiIX9uJ55AQZKuuTN1vYDp9Tud1Q/DRaZx0mQ0XorYpN9HR2F66r49hd9+MoRXFmTvBma5tkz5xnSVvSUeysb2FfOfhRRjfsFBZeep+EkMhIct5+gbjGBluTdqRRmspI07CKX1hKDDoc0J/tYb0UJ6U78nwNCw/9SDQWlcQg5c2A8/A2noQSJLcsUtHnWH/JfnVTX9/7b9hJZ2OIkcNnv1FvPFJJMX+CVy8OkOuz4rq2VJ5ZcVqySOWazQujBD2jLmEBrW/tOaKC/BMIPfHisGjCuKv+kJrOMYdJM+nls9IUhOhUUgWCP0p6kErgze4KNptWoGYUUFDb4W5/GKVCG3U5k4jAL1YamFtVmkKhyYiOAWaq+8mgF4FERpBvKhJAiPo0BsETvoBcioVyGZXLiUqoIJWTCMmFOlOtRucKlGaTy42WA0pymuazliEns6Evsf48Kti2zMkbbFFnL2ewwkxeWFt6pbPDdZ3ait11+AW7JNkPko+BwmdPdVq3lRRJnhXZZhKvsJdgzpxebGt6RuBkv4DzltosKsejAJ48WMCz/cajQ50jT08K0eevqFtvgLWuMuYR8b1AktqMsREtBlwTwuJ8v7/0K0hOiQ+d9P2kME6s4p7OC+/uQyy8p8yxfaI8K5iomoIw3xxBnnq0C6V9i8YWMSV1PdPfBhFjv+642aCmpMNY39gTpwj3NrCwJ3xaIbyJhUyDPXR0Dsx5klj2PsNm6D6WHIMYnxtDbicI78YBpaUP1okp3AhtYy95yr4gfk9GOhYBu8N+rrxMX1FQ2mtm8A7uz/XDt+vFwwM2JM32OHHi3pyjsj9RCwbtNvQeHmGontdFzoXfF0HBdBtzo61agybyJoewY1kSfcO30B99hhWftE/U8Azmqn890mOEiY19W6t2IVcN4s79GQSe+eF9eCB8n+0n41mdqDg2+QQSySTU1PaM1DPyzDFe8gh7Nm0tB8U0mMdwz61c0FtDozS1A+nQ0qpWEafGYINnfhzGNhqvnpF5rHazfaK2sBxk5dELk/OesE9UXcjQO0wv4YWjQadCThrh9Q3siQWKjdoCxeZCRtrzxoiJ1XvQeb3YfbhQkf8Kyb/hkEQ3hqbmcYPt0bO+g75VCmd8DmO5HQS9Gzhg8rdOYOpGCNt7SaGetNk2S6hxfdzZdh1R0qouA1G/DxGyLbfnqvdhq4P6OsYbjuioMHhnCZ7dHfi3lhEWqrhUjlIhDbYrl7gPCwvS6zLn8C34oJbtTaRvZ3RO74TrokN4TfNZB2ZD7wFe7y4eCkZeA4PNg6Xx0g922tErJr/7mAk8o87lQzATKbYVq9RWSCXTad1WcE4mbIG0XoLtaTVINrP8gwCWDmqz+ittlrDfF5Vj03VnHaNMT5fGBOc9T916nY+y7SbUsM6V9rQzwuUy4dDnhX+k08X1nylss80fD3/23dOpqe+e/pn0thN+/Yvv7jcM49ff/eL+1HdTHxTB50QLeXcsS/He/V/8WnrfhH/z33+3OPX4u1/9b9L7T4FPMU2XQnP9//Uv7n83NfWUtILzKcPLicNpn89nOo/DkVPMI3PCRszCODfZYWvZ9f8e+BTTxOHUpavtNTUczo+Z32CelPT6RwD7SfAzQHF8C+fj8bHkLR67EGl24vrxc0xvv0WXwY65GVfdY1i+dz7FNHE4VQhHjURsDY5r4XA4cn5kThSHw+FwOBzO5cCn8zgcDofD4XA6gDtRHA6Hw+FwOB3AnSgOh8PhcDicDuBOFIfD4XA4HE4HcCfqSpDGq5VpTN/dRUL6pEz6FVamp7EUaPssAg6Hw+FwOJcAd6KuBDp84bajt3AI/yv5GSTsxPk9nKmtmKjeqZvD4XA4HM5HhTtRV4UBFyasapzt+SAd1I58xIcXSTXMVWcDcjgcDofD+fhcnX2iMlH4vQFEkuI5ab2mW/B4HNKGhdLmi0Y3bJkgvo1LZ6lZJzA7YZGdyJ/HScgL77dxnAvHhpngnJrCaL98b15xg8iY9K6EWbFhJIXzxgdfMAbhODh27tL4FCYsFNPRDqafVX9bwszOgdMJaQ0K54tJdKnRZ3TAXc5PA/JR7Cx7ETO48fMpDfxfb+Mtez2rPAE9E2Vno0VxWhAyCdMtj3A2mvyZo51p1CbTLJ1rVqKVLES5B3Xy8+3yiGx9BV+8EpaweV9Qpww7HcLKgyB0pbDqyq0URlW5kbxtnhmMD/ItvzkcDofzw3E1RqLy1JiveRHtsmN29REeLU7AkA5iYzNEzXiFs4MgkqZJrDxaxZzTgNyhF09ka4XSoU1sBNMwTCzi0aNFjOuSePlwB5G89AAjmwM769wwTI6Hh13DYOeiyxHCeZmCXghnFbMOtXgS93ERGHTTZ5RGuubsvUCvHXPS+0du2WG+pspzq3M3oU1Sfrb3IQ0y1afbArfLBMQD2Fz3421BD6dL6UBl99ex7I1B7ZjFKoW9OGFAOriBTfHYe4kMztgh4bI0CGmtpg1ZVFM8YgdXSm8uTC/sc5KshMsNJrGTwBqVWw5Ds6v02SI8Fnb+8joCKfFbHA6Hw+H8EFwJJypNzlEMVnjuOmDU9qCn34I7s070nYYQkq201tgnMTU6AG2PFkbHXcyQY3Ae3sMRu5ndhz94Cv3YPO5Y+tHT0w/brAdWdRyhA5mDUSiA+VQakwUWC7tM0Ih3JI4QVIQjxuU2F/D2dQRZVTd9RmmkS6NRASoNNNL7nm7ZiJdKXX5OOzAKl6MPSMaRlG43otvmxm1DAaen5+i74YHy1JNjSluS/LYZ3HUYSQ496LfcwfyYHqfByjQguTrC//I0CGmtpqUsqjlBMBAD1Grp/UVRUTokWQlXN31ygtjxexjGPHAZtfRZP4bGHTDjHMdxuWPI4XA4HM73yxVwoopIJs4A46AwKlFG58DK0yeYkC0GUmuUc2EDZiPUSOOMtbXkoLyDHpYh+RSQEUYDcJa8QGN88o4cnV6YqqaShqae4un8CDqaYCqmEIlSHg2mliM95NkgI42c5XJsnEhGOoFEQQ2jWbnIvMfCRpCSiFd5aL19l3syVjrkQ7hghXO4uat1MQbwxcpjzI/K09ol/eVwOBwO54fjCjhRGeTY1FMnDadGBw05YbkikM8xz+MUweVpTE+Xri/hY1NPmTOKRSKfIzelD4ZG/gUlJgeVYgqtI2LPKun48iH2cmZ4PK2dsHTIi70zNa5d60PhcBeKnQ3SZzinHOuqfZgeTd0RJFWrTLSShZzsPnzBHMzucRjrhhvDs7Lc6XoQhHxZWFOyCbzZWcPd2dL3a9dpcTgcDofzfXMFnCgtNMLK8PfCuwuRSVFDrQKbqeoWRqlMuM3WVJXX3EjXnL28+Lx4liYnSQdtI8eBEsMcM/kyqo6QrUcS1vkYUvCuPQdbVtUQwVE5hfq6B7N3x2FVnyP8QrYuTNeHXnJ7BH9RjtxJFEgjSR5Md4tpt5ayKFNA9AVbj+aCe6jOtKCACe4qmddZhVWHFALrm3hdtGJm5Rs8ffqUrvtw9km3ORwOh8P5gbgCTpQKBiO1mIljHEufCJBDsfX1Cl7JRmIKVd7DiTB/pYMwa2W4Br0wpaWSrbmhiz1YXquURzQSp/beDLP0SQ0D12DAOeLHyiXgicAKvt6JtO9cydYjsXU+FucI+gpvcaDIpBxKG3NUyBlxjQ+SVIwYd5uhPg3CV1rspDPCqM7h6K1y483sURSnlGpTaa4wfUZulJrk0mzcqw1ZlEgE4I9paha5K1FBLZe7RkOftEE6juNzwDg8igFtpZwyBeklh8PhcDg/EFdiYblu2EkN+SG8T0JIZLLIpo7g336BuMYGm2z5Ty7sxfPICTLZDE7ebGE7fI5e+w3xZ/U9I3Beh/grumgK2WwWqaMAnjxYwLP9DFCkhjnqQ+BdF8wWI/J0nz2TzRaENdjFQhZ5YZRoCE6nHqcv16VwxLh2wjkYrOb2p/mKBSl8dqUQDe7jjNy8aw0WRRWP/eSoFGC47YZNikQ15Ab7sV4y+AJRwXsbpLSRixfexpNQguRAeYw+x/rLU5LDGEbIZ8qnjhEKhHCmNoOyWZ+2ZSFRKEBtd1ctcr8kdHoY1FRur/2InmSQSrzB7somDhTLwdKI7qxja58vNOdwOBzO98dvrhDS608XlQ4Wiw7pwyCCwV9g7yCGvzb8XfzB1N+BuMXTX+Ev/+RX+Pe/58LgX/4T/Hcv/hn+p/i/h3b4D/CP/t5/hp8Igfwmfvv3hmFSvUM48Ef4471f4iCWR//v/wH+2//qP4XqX3rx1f87hvf4DziLhfHLX/5SumL4d/Ttfxf7JWK/ZcHPfuen+OnvWGThhPGnpz/F3/r7f4h/8HvKkZ2/+ss/wa9O+/Gzn/0Ofip9VkrrX/zrmCyOA/zLog4/8/wBbvWLqVVygj/6f77EO80N/OHEkCwsFfr/hgqxX/4Kf3qmxzDJ6D/6G38bNl0ah0GS1S/2cPAv/xqG35/BH/7+gDDyc/ziPv7JX2gx/A//IUZ/uzIWJKT1L34Kyy0LdG3LAmJe/sN1eGZH8du/WSesOu8F/uov8Se/+gv81HILlGzyg6J4/fav8Dd/9jOQiGX8NgZNavwvkV9i7w2VWTQD/f99AqZ/96f487/+Hdyy/Cf0zP+KP/G/Rvy3fg+OocquYBwOh8PhfEyuzmabTZE227Tdx0qnwyHCZo9pOO+v1BlRETedTDs/IPyrBJcFh8PhcDgtuRLTeRwOh8PhcDifGnwkisPhcDgcDqcDPhMnisPhcDgcDuf7hU/ncTgcDofD4XQAd6I4HA6Hw+FwOoA7URwOh8PhcDgdwJ0oDofD4XA4nA7gThSHw+FwOBxOB3AnisPhcDgcDqcDuBPF4XA4HA6H0wFXw4lKh7AyPY2dI+m9AnYMyTRWQh92+Gw6tILp6R0KjcPhcH44jnamMb0SwpU6TpsdFfW1Hwl2MHl2H0+mV/CBJvmT5UqWD+ejwUeiOBwOh/NhDLngMSWw9SU5GMtBvLe7McwPj+D8COBOFIfD4XA+EC0sEyvYevoUT7eeYN41gG7pDofzOXM1jn1h03kPgtBNPsXUkPRZGTad9wxpZ+XcPDY19yCow+TTKZQez0e28JUvDrMsjPxJCN5n3yKee4+uLuD9+y76+174qzE5MTM1in4Ve1I6m8/ohi0TxLfxHOgb6LNOYHbCQuajQia6ix1/FKeF90BXL0y3PPA4KgZFTNuZ9I7RBXWfEQ63B44B8al206+MSwPDiBszrkGZ8cogursDf/QUYnJMcE5NYVTMVN14amVdK1/gBIGlDYRVTtxfcUD4NBPF7o4f0dMCyaZCX+l7xSh27nqRsN3Dk/EB6W6JLN6sLeClxo1vZm0QU1dKnxaeOyp4n8ekT6swT+LplE4oH6VY1egzOuD2OCCJVUAusy61HjbPDMYHe8SbbEriGTDmUeNg9xBnglhNuDVZKps8IltfwZc0Y/IxyYwltEZeWeyvL+BF2oqZxxMYlDJTW+5En0x+DLkMKf16mwcz44MQU1evHMSphWdpeTh5nIS88H4bxzlLf3Ue60J64vciEEmCqoKgJ7c8Yp6F8BuKnuVZTBcJDeqDXRyKQiO9n1TofVNdFOTerHxJsG3IpjoEIX1gYafhvL+CivoGsLQRhkomS8EWeMkWMKHJkNc3BUKaq8KtKSPRbgR1Uh4EJB2Kkw7J6h3Tyy1B5yo2qPS3b3gKc1V5bS3vWj2wjE9hwlKyVlLaLlhnGtu01vaqjFRnqmqDiFAnzIi1ZW9b6foF6swbH3zBmFjna2R1kfIRaS6zdtqTUvmoYZ15golB4cMyxegWvvTGK/VD4DLk0Z7OXrjMP2M+6khUPp+Hz+fD3bt3MT09Lbxmn33vFI/gC5DCyaFG3bsRRLLvFuZWH2F2pJc+NGKcXq/OjUATf4nN3WOwKf4SZwf0vGkSK49WMec0IHfoxZPAiXSXLQVYx7I3BrVjFquPHmFxwoB0cAObNYsDTHDT/UfsWp3DTW0SwY1t7Gel29XUSX+RjPhaVVzZ8Da2y4EwxV+GN6aBa57Fcw9OXRIvH+4gKs9UB6RDPoTPpTcCCeyueXEIG2ZJfkK+Hs3BzkRaQqWHyWiA0SizzmV6YLHqgXhUlrYsjqNkZk02mH/XLYX5CHMs0F475qT3j9wy62KqPLc6dxPaZBAb2/sUkkheIbNVkL+Gg+11yIqQiCEYUsHJZLbogbkrTmXjRURQ227YXE7oC/RMuP6KiOLRCwSTapjHXWUHipFL5wCNmdo+MqZ0jZk10h2JPBk4kmFM7RBkuComDuvKxLXkJLCGjWAOQ7OrJIdFeCxSHlPSAzXkyYiuwRvtgl36zoQhTXneFNa0DLolOUvl2Wufk94/glz0sWCInJJ54fsecxfipPdeUWhEC10cbFG+bcpGnjZ2ydNXgRoJXxgK9c3uY5vZAt04Fsvfd1MtvXyKRz5UmyKkAnjiPUTR7KH4VzFupM96R4S8LrqNyFFet6tsSHN5U43cXSY9SMMwsUjPkK471Ih517BzVGV/W9SZ9m2ajHr2Vo7OjvmSnN1MyjJ7OG8vdypa2duL63p90qFNbLxMQV8lq+fHkjG6YPm0K7NW+RMp4DAcVbRDzDbuh2rle1nyqKauzlbTqsw/Yz6qE7W7u4tIJIJCoSC8Z68DgYDw+vvkJBigplFN/1XIRsKIU+V1zTpg1PZAo2Etngrqnh5ojS7MjOlReBtWOBwa+ySmRgeg7dHC6LiLGTL45+E98u8ZxwgGk2TIZ3DXYaRnetBvuYN5Cuc06KtykMR4etilHcCoy4E+JBFPSrerqJf+BD2suubERDkuJ0b6gGQpkHwMsVMNrJ5Z2PpL8Qyjl3IdPRYf6Yg8lSFVVLU8MekkklTE5psuQZZCvno0EERaRoeR2XlMWSo9IDk9lmEYWNpKAs/G8PaU+VBmqFTdUphSOakobOl9T7csEpW6/Jx2YBQuhyAQkizjBEFfDCQQqXyoDF0zGNOfI7wn/zmBCePz4xhiMuu34M4Sa0zjCB1IBlDnwG0q9zMqE1mbJUFxBGIoGJy4bVE6i3lWB9QGDFossNA1aJALkJWxj8rYCs9dUR9LOljRr3Y4Qez4PQxjHriMWpJDP4bGHTCTy3Acb9DopQ9AHXASy104pO9Y7szC2XeKUCgBVbckZ6k8VRqN9L4HctGbxucxPtQvfX8JrG2Mhw7IZSFa6WKL8m1XNvK0sUuevhL5SADBnLIuiTrSB4fLhv7y99XlEdHLQ9QPZeWhuhyO4Fxjh+eORYhfzSKWZNBvm4XHqsZp+IC+XaGpvLNvEDgskH+0hDsW9oxorzxWcr58AeryyGhaZy5i0yrUs1dKVOiW4uwRM1uxh7JCa25vO9D1uhxRHk+hH5tXyMptLuDt64jgTF6sfNqXWfP8SfT2ojceUso6tYcw2UYllyWPaurrbDWty/zz5aM6UX/+538uvaoQi1UPun9k0iH4wgVYncOQ9/0FZ6PPCEMDS9kzaCIjn0RC5tioNcqGccBsJKVJ44zpaDqBREENo1k5VSU6B40dJHLhkYpEcUZPmQzSR3IapH9w/DEe3x0pD20Xs+TI5ABDKZBuG6YeP64aBu7+wIahiCMywnFyEm6y3lgJXZ/Qe0zFjss92AvTY8MwawiiYq+rGI+R1MwYtnSY4mIKETaSZTCRZIn0OyofanwscoH0wGAkqabPxMZHgAy6PMpuE8wUwFmy8sSAawJWdZw6BIrmiBro1wif98HpHlEM7bcmjXdi4qBIncFIZS7pV1sM4IuVx5gflTuqXdLf+hSTCdI9IwYVeqKDY+UpnkzIC7k5KqXQYBKFJsr1g3TxsmRDSL1lg/Mm5ViGzkAu1Bk1QpmqHv/lIozgFqxwDstrchpJ1gMxXKPSq8/gIKU2l8SprHI1lfe7dzglrTeblPZqkDok6gLZiUYyq6kzHdi0BvaqE5ra2w50vS4n7ygnvTBVTXcPTT3F03lWjy9YPheQWfP8SfTbYdefUkevMpx0zJw6vRVW8ncrXJI8qqivs1VcYplfRb73heXf7xKsLPZ9QeTMbozXnUZqBjPyBRRqRhtkaHSkNEXkmOWlhvic3umqtYj14KWXFWJ4Nj0tTHFOT3+Jh3s5mD0ejNS0vK3Sz+avxXC+XPDhWO/GpCyQYiYK//oSZktxNVqH0C4JP3wxjeAkVFYLMIbgnhmGKrqNhXK+qtZbtEQFi03wohAtFhGNxgGztTzf3haxZ1LcdH35EHs5MzweyaHJZ0A+Jt5ul9InXhth+vQshQx7pi5sdIT+FN/LGlgjnE4DCoebZZnGnk0L6wG6rrtka2RKFFFgX5aczVryyIiJU6RteiNMaT5DSpa4s+ADxTM1S4myCbzZWcPd2dIztWuF5GRyYuAfbm6V9IhCw3tJaJ3rYvuyaUXC70NM44R7RKm9bHRx6vY1ZF4u48tyHM3ldmGy+/AFqZ67x3FhUyQUTh7SgH5d5PJOZ1grzEZKhFsVBHtVRbM6cyGbxvgQe9sGcnvLaFPXm9YZ0v8c2Z4PSq28fC4sMxnV+RPQYsRhwnkkDGECoRhFmI0yOoZrbckF635L2tLZj1zmV4CP6kT97u/+rvSqwtDQ97firBBl61NMcLmH2uz1XpBMisy4Spy2ogayl5yuXLXTlTmr00DL1gCwOXOPASn5HLxE6/TrYGdrTCiM1XtjMJ768GBXGh1hC7mXvUjqXZj/+Td4yn4183QSZvHuxcmf4pX/EGq7u46TQC7n4E3Y++mFwSmtK6laE9UGKrNNmDqL7kcQjathHb6grsjWdwhrAgwpeNeeQxBrt5YMVC+G50r35RcZCTGEOmRwxgpQ1SUrg4QwZA/TbazO2SlUFvUj3LvRh/dvg3X2x0nh9BTo7avvQjGHXUsWtndYuaandAlrMCRq1v2wJSVlUgisb+J10YqZlVKZ34dT0WNVotWIDsV74d/LIyMKDV1MaB+ki+3Lphn501fwH6phd8sW8svQjdyCSQ2orZNS2Je5JqqA6Au2/sUFt/BrhMtHLm+dluVQctzlCPaqimZ15kI27Xu2txfQ9aZ1hvSfOS7N+soX4oIyU6DIXwWVxQ4rDhGOFsmvCSGutsJetVygk7rfnPZ09qOX+RXgozpRExMTgiP1k5/8RHhvtVrhcrmE1x+fBAL+GDROF2x1HGSdgbSrNPxdB3GaQznFVqiqGSfC2KwOQtuoM8KozuHorXJhYPYoKgytK6fqZGsAhDlztp6pgLcH8sVKzdKfwf7W1/h697i8ZoWtZximBqWQlPJ0HCV3pA8W+xD6S+sM8oWOjUXuwC/0Ul3OBoPaiaCwoNrqdEjrSqjnddFapbJgmFrW+MsXZCjMUMy8tYNsfYewVsQ5gr7CWwhi1elhUJ8jcVyQPUMXS2O3fGqpqvHJJ5AgB6jPUGp6izh+voPDggG32YicRiN8V6XuwcAXbnIcTxH0Vm3Ed3KIaE6DIXMjJ0oHvUGN88QxCvK0iYlTrO2pXvejmNVJx3F8DhiHRzGgLd3II9NkBENlMJKWJHCsWCdHvUvSr5VX1YtcG1NUCg0JUWiiw/JButi+bBqTw4F/j3rLLjRS3+x+UChTp3NICv8S10QlAvCzEVyXrc6Ih2Q/FFPKSk7ekZ1RG1BWQaKpvK9dg551RqJKCR+z0d2qcJrXmYvYtOb2thOa2tsL6HrTOjNwjXJyjvixciFCIrCCr3ciFOIFy+cCMmuaPwWDsNt6EQ958SJ8il6bXTG1LdBB3W9KU50tcfllfhX5qE5UNzVObFhxc3NT8IyZU8U+65RiIYtstvoqULNG93I5ZPNyw1JAQW2Hu96wCaGz2kmlY/BtRZCicHLCGCo1oPQ6kwhhi/3SwDQMi2xIPBf24nnkBJlsBidvtrAdPqdezg1pymlQmOI5D2/jSShBz2SRij7H+ktSevtY1VSdGE8pD6loEPvURdRfk1ulZunXwmjUIHfow04kJYSRIaV/HWN1WTKkBmZIzxAKhJBIUXqjATx54MM74ftylGnJkhwFSZCs5eJkPw4wudziz/prSCPkP0SBei2uhiMDaWqY17ETbWSKRIaGrcLiRLVZuQamLYqFSj6yKUSD+yQBPUSxDsLhIInsrZfLJ3MSwfO1BTz0J4Q8i8QR2ArgKEVhpI7g3/TRJyY4pJ0Di8e78L4twHB7ss706wBcHjt6T4PwSsNRxfwJXr04QK7PiuvaUtokfSvmkMvmhbgHHQ7oz/aw/oTKK0PPZE4Qeb6GhYfSLtDtIDiKQOy1H9GTDFKJN9hd2cQBmw5rhG4YTnJcD71PEEpkBLkd+bfxIq6BzdZoFUgt8cAWAkdMF9n3N+Fj1ac05dC2Ltbnw2VDdanQpLdcPMILYTFwdT1tRZHKsVKmclukNEWFhiO4jCE76fwZ6UxA1EvBPxJ0Q7Qh3nCOGs5hxWhpU3n3jMJlVSPuW8PzKHsmg0ToCbyHRZjGXcpR1xZ1pn2b1tzedkJTe9uJrtdliPKox+nL9bKsWFw7JHOD1Sw4EBcrn/Zl1rw9UdJ/ww79aQyxcz3sN9iQfxUXkIfQVgrlLV7l/CgNflOdFWle5pn9J/j6yX7rEbgrzmUvhfioxH0LWJBe1xDexEJGvreFGtfHnQ0XA6JnBDMzp1jf8eEhBcr2iWI9Vv/yQnmfqHsepRfeN3wL/dFnWPFJ+3oMz2DOVYmhZ2Qeq91sf5AtLAel/UGc94T9QZTE4VuQ5YSeM9hnMDkqt0rN069zzOEevPD6H2KBzcWwvXOsHiyVFgOTIZ2ZOcO291tsPgyK+x153OgmpyDFVpYOlRS/Ki0S5yRrn1q234feCVeD7kaenMDQWS/s7ia9luIp4okkElrqfVmkz+phHBScW82Fh6GIuA9KsRpgn5lESaw6xxJWtfLy0cBg82B+3ChrXM24OZJHcH2hvE/U2OKU2NPKH8HrfYsCycLdqLUdcGHCGsFm0IuQ2QPsbGBPmEPZw8bCnvBIhTA2FzLiXis6B5ZWtcJeSFtsx2fSL43BBs/8OIx1W/56DGJ8bgy5HTL4GweU+D5YJ6ZwI7SNvST7OU89Y9eNoakleNgeTlvLEMTSZ8bYPTcUa1RbYL45gnxwHQulfYvGFjFV0pe2dbEBlyAbfZPecvrbIGLkZLlvtu80ipyT2VmgUqyCbNG6hu3FI71XX8d4oyEwhnEC87dz2AxsYjnM9h+iz97vY2shLO0f5MGszM4wmsqbME6s4p6O7MOuaB+EvY88K5iongZqUWfat2kt7G0HNLe3neh6fcq2tCQrjQE2zxLGhyRZXbB82pVZq/ZEAbVXDtNLSqWjgaPfvjzOWVtZq7TYXNcIe3QJtNJZgeZlXiyQY5YTOxafNWyzzavPr7/7xf2p76ae/pn0/uL8+hf3v5uaevpd/RDE8O//4tfS+8+cX//iu/tTU999gDg75n//F998NzX3j7/7n6X33yt/9rSJDnRCc71srnNXhT/77ukPpCufJqI8PsRW/NlT0pn7vyDtqcePQd6ftr1tXj7t8Onl78PzVM3//t2/+Gbqu7l//K+k958v3/uv8z4qwipWzmXxvYqzmEcqEaLeW1yY8284K8jhXAFUl7eiisP5fiCVvTStzUQRyZjhdnUwo3DF+KycqL7+qp8ucz6APnyf4syEN/Fw81ucGt2466oz538lEfdbqkwxK9E5VvBUdmwC5/NB28dtEeeKoe2r2rrmA9DaMLtCtq3BFPrnxG+w4SjpNYfD4XA4HA6nTT6v6TwOh8PhcDic7wnuRHE4HA6Hw+F0AHeiOBwOh8PhcDqAO1EcDofD4XA4HcAXlnM4nyTscOnqQ5y7oO4zwjHuhsNY2nEvjaj/W2TM43AMdvhTmHQIK1UHArNNF21feOCyaPmP9Tmcz5p6tqZEH5z3V1rsXP7jhjtRHM4niWTYtG48Kp2YmjvD4WsvgrEu2BfXIO4EcQL/3Q1ELffwZLzVDsMNkJworVs6nPV9Bu/CQQTC74Drk7h/Z6jJ+Vm1pEMreBCx4f5K/cN+ORzOp0QdW1NGhe4e+dminGr4dB6H8ykjPyC23wjHlAtmnOOofAbhAMafPO3cgZLBDlEW4tEOwOK6i/uTZhTf+uA7+uwPbuBwOIrDqEsXd6BacTVGoo52MP0MGPOocbB7WD7T7NakB44BWR85ExXO14qeFoSziHpNTkxNjaK/rAV5nIS88H4bxzmFwc4XMo9PYcom9peFHrRiTFOaPnHL4hHSklYOcZ4EsLQRhsrJzstiHx5hhxIcE++KdGmgt7gwNWGRbWiWQZSdWRY9RUE4YskE59QURisJpiSfIOT14tv4eZ08lYZh1bDOPMFE1eawxegWvvTGAbP8TEE5YjrT5XSLHO1M41naKRtJUMqNncNl88xgfLA0pVQnvyX6SuGIaY0Y3bBlgpQf6bwo6wRmFTLpIK66sm0wRF1Oj0gmys64iuKUCqAmrnplXSOzejI8QWBpA2GVLC6Fblboq5J9BSn9uuqyE+NL2u/hsXDOVm38xdQb7OwEERcEyM7QGkbB+xKYlJ2FKEcaidLV3M9if30BL3Abj+ZHIEqlWfnUlk0lf63KtRltypjF8YacvmBMtBEUh4Xq94RF1AqxfuvEswqFT+izV/TZnorKeAn60F1sx22499hVOQ9M0IFUZeSPytHvDSCSFPW313QLHo8DFTNEddrvRSCSRI6lger0LY9kP4Sw6tYSqY7qanW2S40+owNuRRwfS2/ZV6vrvjIu4Ry4Wx7hHDgxOfXrWbNyl5dJLe2Udf26oSjflrKm78nrJDt71ObBzPigpOeM9myIILOaqMwKPWseV50856PYWfYiYZzEqvUQX7XKywfVr0a2ph7tyaS5zlSVVekzWV2UqeQnzxUaiYohGCIBzz/Co0UPzF1xBDe8iOSl2/kItkjpYhoX5h89wuo9J3TJl3i4Ey0fgJgOrWMjmIZhYhGPHq1izt6NhG8duwnpAQET3PT9R+xancNNbZLi2cZ+VrpdAymVL4xz6Z2cXvucGA5dix7hqHyslSPLI7K1DG9MAxfL0+o9OHVJvHy4g2i5409hb24gmDZgYpHle1zKU4S+LaeAw3AlnyLUAIbIgboETgJrJLcchmZXKS+L8FiAg+11BFLSAxLy/LKrZmSYODsIImmaxAqTv9OAHMnkSeBEuttZXLWyZWSQooouf646PXkytGveGNSOWaxSemZtUlyV5HREOuRDWKEQCeyueXEIG2ZXS/KZg71Xut0uxSwSgddUE/SwDzcYeSLj6918iXi3DZNMZ+ZvofjqZX0HtyU9MF6jRCYTYEeYMpqXz6BQd+ZYxnrtmKPX83bRGrZbru1SK2P22SY2Xqagl+r3rEONmHcNz48bjKQldrG+dwbD7RnBaA9azFDnongrK//jGOlU7xCszIHKU2NH5RjtsovluDgBQzqIjc0Q1VRGnhrUNXijXbBL+ZwwpMl+bCLEHhh002di+ctlJHzmlvWATJXnVuduQpukOLb3qUaLfCy9rUd2fx3L5biork0YkA5uYFPIkAxZmtlVKvfE7rLC5pbKZOdIacGaUa+sW9JK1lJZxtQOoSxXRSFiXSHE1jaEPXOWoT+y/AvxyWkrLjlku7fpeVipwzyE7jb05rLrV2Nay6RtnZFTVRevElfIiTJhfH4cQ/096Om34M6Smz6JI3Qgma9YDKcaKzykoP09PdAOjMI1TAoXj+JYeCKDxHEBmuFx3LH0o6dHC+MXN2AkByTJTpIvo4K6NJSpHcCoy4E+JBFPSreryEcCCObUUEvv5ag0mvKwaP/QOG5SW19IJkWDm48hdqqB1TMLG8uTENcweilPUTHBpIx+BE/1GJu/A4uQb2qEPVao4yFI2Rbp7UUvfaZw9FJ7CJdavg/iBLHj9zCMeeAyaikv/RgadwhTSsdxZaWQ55dd6jrjwBr7JKZGB6Bl8nfcxQwZhfPwHvXFGJ3FVSNbgaIw4iN/TpmeEwR95FpYPbjrMIrpcc1gTH+O8J6Ymo4gZz5AxkwtV4h0EskCdRpvumDUluSjgaaOfGqIPcP09LR4fbmAzXAO12fmGhqa9MG3iBWoIzCnrCvXpPsXppsl8r3koLcqH7Z+ogcaljEV5Y9eC1+/QLm2RT0ZkwYFg6fQj81X6jfpl9tcwNvXkbIDUoY1bDuHQk9+pnQs/qANZnUO0bIXlUA0ViAfygrmQ6WpA8AaNs9dh1iOTLazTvSdhhBi/nv6AEFBpe7CIeXTcmcWzr5ThNgDqm76TCx/uYyEz0RBicimVQQ75ugjRzZOVojxkfS2Lsck0yQ1mDNSXFTXLHcwP6bHadCntDdVU0FCdrJvEDgskH+xpCgTMmGI+QIk3TaoW9Zt0ELWJ5R+eVlqjS7MUL4qtojRyoYwqGawyiHLvxCfjPbiqpAObeNFUg/n/IR4hmhLvbmk+iW3NeyaXcK6P0otp5xWMrmAzpSoVxevEFfIiSLnRl5Y3SaYDcCZ5AB126bw+PEE9YVlyA0TtBi5+xiPxytPFFOs0VXDYGjk+haRikRB/jFMFFcNxSP4AnEYnDdbHphbzEZxSFZDbTCIQ57dNkw9flw1Baecf07G3wF6C4bkemU0UmrOoPD7+u2w60/JiFa6HcfhCM71VljJ/n4YA/hi5THmR+Uy6pL+Xhy1RjYnQQyYjVQCaZwJ+eksrhrZytBpG5Rt+h0S5NiYLPIC6IHBqKF7ZzJn7CIUcUSNQ9zgxE25Quj6hHSlYse1jXkrFD38RUza+xDfXm44upJOUjdRb4RRLuZu9YUWhjemU124TB1qIOOTd+Rk9MJUNX0xNPUUT8tTkSXyFAZr2K7D45Evmjdi2KZBLvqWmiXiJIZ4oQ8jw8yFKiKZINkaB5U2RufAytMnmKC0FJMJqplGDCofEM5PfMIe6IRiCpEoxWswUb0nPoreNiCdoLjUMJqVo549lmFKS+OOZZl373BKT5pNSu0btJmhLlDHomViG5T1B5PGO1GIirLsMRihKduiCg1tiIzevkbPXCwu8qDgZZ0Bp+cCIzKXVL+qbA2bKcgeeLG2c1Q189HMrl5UZxrVxatD563hDw7zyulPUewlq+jfTDQA76sIkmxSuEx1YZPXO11Zt9Frv4dxRQWN4Rl54RU0MHvmUc9BTvip8DVO3B/RIvhC+lDGWfABpoPSG6JLb8ecLLJiJoqA9xUiyXPBuy8hpjiPHNPc0yCW5YFI6IUx5BLkIDpMeOkP49hFjmQxijDrAXqGofuWPPwWVKdTQO58ZRN48yKA18fi2q0SH+yfMTQ6knACuZJP0GZcrWRbppGG5zPI0Z+329N4K34iIyX0vsRyOEPwwTSaiadMwg9fTAPn/RFoFQoxBPfMMNZ3trFQVRwtZSj1cEV6MOSaQiH1FXyvI3ANVjsH1EtkcrzMg0TzLMCuinPfqS5clg41knGOlaeqDSPM6vdX9LcL1yeprih60dQcWS3oDbMpPRcpRxS5PjvMgiJQ+IJSNDaZGfGBDzeqwoiA9JqhMcNTcgQvWW+b1n1yys6pduqYnZXDRlGll81IZ5iHQPW72nYKdb6VB0Y0rE8S1XISqLb39chTWdGft9uYrhUiUhUhirRRoKqGitd+XOWy6HNi9aJzWpdRv6psTc/oHcyTHi283EM0O6RsAxvJ5EI607wuXhU+uL7/cEhz0VrRwBejO1j25jA8OY+ZwX5xEEpYXMielSOu22BNQy75Gr5nG9jse4T5soawNVFsqlAk9+4Fdti6CvVj3JGVcv70FfyHatjvscV09YfR2bzx/A1Jjd+fIezdwca6BveX6Dvk6LCFg7nhSczPDKJfTLDg4Il0Qxi0Md3GqttcU1CqbpbeSjdGZbHD6t9GODoOfTaEuNqKGUs3Tr+VHmiCIp1E3LcAH5OtQAqB9U1EdGOYWRnBgJalU1xcGBEf+DAyKaqmKtgE0bYfV1PZss+EXrkahkbGrVtLlboXlrl53KyxNPLGuBd2eqYinjh8C76qIW4if4pX/kOoySln9q9aI7oHb8Lef4AXcGJx0kpxn2GP8irN3F6AbqhZ4tIFUP+2yolSoYuJLJcTRryU9zohi+P4OWBwQC+871QXLkmHmslYw8ozVdNjroXV73EUfct44fPCYqw6ab7fiqHeMKJv9ymCHPR2q9TGUfiCZyproarQig80eaJN2IhAeaFJDu9e7MC79hzqx3cweMl627Tu6/oolKTYmZOTORPCaeWoi6MVRRTEXm4Foc63oEV9ElDIiZyQvXVshqU3TemmsqK8WyjvtUKsOEStbIhAGmzwt7vhfGObcRFCWZijWN8MYidkxlLbjtTHs9E9WlbKaRRKxqaVTC6kMy3q4hXhCk3nSZWxRD6BxCl52tJU3HE0Tm8ssA9JDhSRL8hLMgH/0tdYf5MR1m0wj7t/yA4L6XVSMcYoWxPFnrE4MdJXwNsDeXOXw4F/DzmzC84G63sZijVCWiO+uGEETiOIMd/nOEpmrQ8W+5DkQBH5gqIRMFyjpouthVBV0sMuhmKmUmAQdlsv4iEvXoRP0WuzK6cdmqBIJ12KadN0HMfUjhqHR6XKyaDeFatUHVCoql0ngux1EEbDLxBXU9ky0kky1DoYau2WiE4Pg/pcWCcnz3sPi7ZbPq2qgoa60pVn1Ir2oETuwI+9nBmuRgqRCCKYVMPqdAhr9tpeE1VDFhlmjbrrr8MzsHnnZAxxuZir9Kpd8kcv8PpUDfMNm+iQXUQXirIYL0mHmsp44BoM1AeOHysnTBOBFXyt+CEGq99ajHgmYWY94fKi8BL9GB7pQy78AuFzPayWkiuqgsFIypQ4Vjq+2X1sfb2CVyf0hMFINTqBY+UD2N/6GivsgXZRrC/qh8U5gr7CWwgm6JL1tmnd1xlhVOdwJF9pT2SPosI0Xd0lDnKuXSPnO45oVKl9gq1WG9BwFQXRsj4xqtZhVa9FaowOeoMa51SWBdn3e0QhVmxrKxvCkJyKPl2jLkubcRFCWRjHMetk64fW2198f8k2Wk5WNDaVNWkt7epFdKZVXbwaXCEnKo7AVgBHqSyyqSP4N330iQmOYbEmCg7HWQiBUAKpzAmigSd44Hsn3BMxwGwoIhn0IpDIIJvNIhUJICQsN5CXLDlrdI/dF56JBrFPz+ivyZ8pkGdugss9VNcwlSiyEYFSWJkEXu0JC3egZ0k2MANzhlAghEQqg5NoAE8e+CBPcc+IE9dJuVgvNMrynU3hiOVr4Rn2S71FGf037NCfxhAj42+/IezE+OEIRhuIvfYjepJBKvEGuyubOGBD1B2QC3vxPHKCTJby/GYL2+Fz6oHdEH/meoG4msk2k4jA/zpGhXYd5ka2jVxMh4NKgHqvT0hnMhRO5iSC52sLeOhPCCOVF6FAXTWTy42hugpBvULqVRdMLrjqzDg2pViQ5fMEkefreEmOzfWbkmNTRY/tJq6r4/Bt+oW6IuZJqVeNKBakeFIJvPGv48GzGFTX3XCXMtVm+ajZUNl5DJETij9Lkmzne5l9PPn6SV29LtFcxkNwssbn5TqeR1OUD1G/dsI5GKxmagaq6B7C1LyT6ksQ61VrPnTWYXHkTW9F2YcidMNOMvaH8D6hOpthciI7tP0CcY0NNtbW64bhFH4o+gQhwcZQffVv40VcA5vwQJvIy5zCiAb3yVLoIZqgy9Xb5gySTMk1DW+X40pFn2P9JXXS7GN1lzgo6BmFy6pG3LdWLpNE6Am8h0WYxl1N15E2L+sPZ9DhgP5sD+ulshTq1hoWHvqRICG2Y0PyqWPBfp+pzbA0yUyruKrROeYwSXoUeyb9qrMVl1S/qvUu8UYsa/X1m7CRDNq1qxfWmSZ18SpwhZwoM26O5BFcXyDle4ZIzoSxxSnYJOvYMzqDmWEtkt9u4uHyJgLpQXjcpIlISQsYVRi8syT89JNtLbCwwIxOGgbnvapfBLBhb4pDuh7uptBjp7BHlaWvd7rKcTfiPLxZDmdheQsHRSNuz42LI0RkYGZmhqFNfovNh8vYDKQx6HFTLinFpRWXqkHckbY+2H3IwnkI73E3bt6bwUi9sfSeETjY6LbJ0drAtc0gxufGYMpH4N1YxsOtA+DWFG4wnzV58Z//9Q3fQn/0GVYWlrHxMgHN8Azmhf2OGO3H1Vi27BgUn6Aftz2jTae0dI4lrHrMKIS2sEzhLG8GcT7owfyEsalzXBe9E64GCpEnRzx01gs7OT4tVKaWuE+Wzw34kz0Y9iwpppYVMJ2Zvy3I8BnpzDL17lRfjAl61Qo2lSPE83ALr8knNXtWsarYrby98umxOWHvy2BvYwE7h8ySt/E9MuA5cowVo83VNJExgzU+95w6JHcfUj6oTu0VYCFZTTWaI9A5MMe2x4g9U/78uscIUy9FZ7Uo9YcZ+yUPzIUQtpaZnLxIaMdwb660P043hqbIxpgLCAk2huprQouxe41/TVkXeZlTGLupHthnZlAyQZeqty3oGZlXxPVwNwkd2cylcp1tjnFiVVEmW6EC6dUKZi0takKLsv5gqOyXVmVlSW1G8JzaDPaLOFV7NiTxehvBhIbqo4s0vAlN45KeUcD0iE3FnlJ7t4PWA1KXVL+q9G4zyMp6DvfvDJJetW9XO9KZRnXxCvAbV2mzTcXmZZwrhjRHb1Nu7sf5HjgJ4OuNCExz4q/IPkWEjWH9Gsw8qfqF7Q9BKoClh0k4HtX/QQmHc9X4pOrXZ8YVGonicDgtybzB2uwKdoUpU2mqxxtGTu+A4xN1oCjRiEYyMLtb9Og/NsU8ySsKP9s812QXpjA4nKvPJ1K/PlP4SBTne4KPRH1fZKJ+2VYf9Y4m4dTl+Dmmt9+iy2DH3IyLy4vD4bTkajhRHA6Hw+FwOJ8YfDqPw+FwOBwOpwO4E8XhcDgcDofTAdyJ4nA4HA6Hw+kA7kRxOBwOh8PhdMCPbGG5+AuxY/sj3B3pRsK/jM3cbTyd4r/5+1zJRnfwwAu4+S87L5WjnWm80MxhddyI/P4TLIQHcX+ltOnk1YXl61npdPK6mGt+JZxNhODb/Rbx0q8hDTZ84RmHpdXhcmVEuxRUHCjXBXWfEY5xNxxGvtcCh/Op8qP7dV7+JATvMzJ4uffo6jVj/O4UbG0bO85VIJuKYC8YRjRxitz7LvTdmMPKFxc4doPTmkwUu1u7ODyjeqQ2YGRmBq7PYE8AwYlK2TE3f6PmBHzxgNt+hROVDq3hQTCNPqsTrmEj1IUEDgJBkosOzvtLbe5ULjlRWtmBurkzHL72Ihjrgn1xDa5LOsWJw+FcLnyLA85nBWvU1qhR05pvwTF8DUZDP7S1pzVzOHURnKi0s+6oWjq0Qg6TruJEZfexvvAC+Rv3yUmXP53GK3KK9rpv49H8SNMjMkQkJ0o3WTUqHsXOtBcpCn9NET6Hw/lUuBJOlGDYoDQwNQaNwXrHO35ETwt436WG3ubBzPigZMSOyCA9Q9op3+zxBIGlDYRVJaNZ35jVjasB4rPycXlpWN7tgUPeU8+fIOT14tv4Oagvj16TE1NTo+iXtfe1YRF9VQa+aTilaQI1rDNPMFG1Xa1wFIA3DpirjXcJUWYY80B9II46oEsD061JeBwDsjPVMoju7sAfPUWBPdJrgnNqCqOyzGSiu9jxR3EqPKCBYcSNGdegGIa0meqYR42D3UOI0Zhwa7JKZvLyrSez7BusLRzC0moEoCacymaUzaZzzJNPMTVUR4/y1Ngte5EwTmL1dgabCy+hcX+DWVspYaWRBg++mbVUnW8m3osY3bBlglSOOSFNfdYJzE5YIB8kVcqwl8rBU1UOeZy88cEXjIkyVOthGZ/ChHxeifLu9wYQSYrxKDfi7LSO5BHZ+gq+uHKqK3/yBj5fEDExMdBbxjFVzlMLOVLYQpKalBWjeR0heYS88H4bB5tpqyuPKi7iRGX317HwQg33N7MoF7VEMUJ1y5eDc5V0seVId327U5JR0n4PjxudO9a0PEXq63TVtKRczjW2U6SprI93cXc7Dtu9x6gkVUx/yr6INZeqbh6VOt0Hs4t0eqRfqiN15CLYijSc91ekOt5Adk3zI6YrBj3GHi2VzyQskQos4WH4nLImrwcyhDRUC1QmzxY6y2gqS8GOXcSGcH5IPp+F5XmqGGtexNQOzK4+wuqsDTjYxnrgRHqglnTIB6orHwET3I8e4RG7VudwU5tEcGMb+1npNqsQmxsIpg2YWKRnFsehS77Ew52I4gTrXDoHaMzkXJBhoWvMrJHulGgvHKCAw3C06oT3LPZD5EC1QSwYgso5T/lZhMfchXhwA95IKQbWgC7DG9PANc/yKx6Y/PLhDqJShEUyOmveGNSOWaySTBYnDMiGt7FdEQgRQzCkgpOFseiBuStOMvOiEk0EW9TAxjQuzFMYq/ecUl4r+UrthZEbdkAbWsPd2WlMT09jdmUXUfnJ5Wz0gIUj6cmjxQkY0kFsbIZImsCgmz4Tym4O9l6g1z4nvX8Ed90zE0iO2xQerOTQUcPfY4FVD8SjMnlnjxEle2mymRsav7ODIJKmSaw8WsWc04DcoRdPZLrLGuzlKhmmqRzkh3WmQ5vYeJmCfmKR0ruKWYcaMe8anh9LKZHqSLTLXjfv9WinjhSPfAhUq1I6hM2Nl0jpJ7DIymvWAXXMi7Xnx1V6WKJKjsJHzcuqgqy+sWveLjhAid1lbATTMFTJY6f1ia5tkYwnqeEzwlCnUFUGI/pwimRK+uCiFLNIBF4LDb19uIED1VZ5ZnDG9N/kLstnjim2nDZtZ1N7NGiBWZ1D9K3sO8cxJNCLIWv9uciSTmtuzkk6rUfqxUOsf+gBtG23BacI71UX0DHCkXYahV7Y52Q698gtHqnSps42lWWHNoTzw/DZOFEnQZ9ggD13HTBqe6A1ujAzpsd5eI/6HXWgRjkQzEGtlt5fKiqoe3rQwy7tAEZdDjKoSTCby8ju+xE8pV7Q/B1Y+umZfhtmPVao4yEcyGpavlAA1AayTxZY6Bo0KBPbbjjo7UUvfabwWVJ7CFcO3m+KaXwe40P9lJ9+WO4sgS3biIcORKOQjyF2qoHVQ71xlgYhv8NkYuKIHgtfR4IyrrrmxITDCC3JpN/ixEif1AiVMWF8fhxDQj4suLPkpk/iCEkZycdiONVQ+ZJB7KcwtAOjcA1TYxCPktljZJFMniN3sItXRTtmVpgBm4RNFYV3eavsjB0HyVnppfuSnghxzY9BfxqEjwSk6qbPhLLTQEPWSqXRSO97UG9WMB3axouknpy/CYhH0/XAMmwQ0lVyIrOxt2SuTbCZG5s/jX0SU6MDJB8tjI67mKGGrqK7xwgGk+TQzeBuWYZ3ME/6fUp6L5brET1zCv3YPO5YWFmJ4bjNBbx9HSHpUFrJUZPXESHvs070nYYQSrAwqmirjpwgGKBeedVDRyTnU/0Y5u9YxPIyOnDXbUbh7WtE5HooUSvH1mVVQVbf2MUKinrzgcMC+Q5LCnlQ9UDMF6DG/RMk9kxw/IXrywVshnO4PjPXcFS1vfIkJWR6qFKX5aNhii2jXdvZ3B4Nkn6rkYu+JY0QSURjKPQOob4PVdHpWUHv5TodKNedTmg3Pxqyi+eRsGQ/RIrRMEht2kBFcpTpXE+34Ny0q7PNZdmZDeH8MFwJJ0rVRf9kzqhP1Yg03iVIKU2kjNInjB7qDWro3pncoRAo4ogMadzgxM2PfihrEalIFGcwwET1gpGMvwP0FgzJh5GN1KOlp5I1aW1M2+H022HXK3tdx+EIzvVWWKtXz9ZBpZZX3G6YzJSRs6ToRHXbMPX4cdVUoWhQSgyOP8bjuyPlqaliNokkdcQMJYEIUEOoiMYEMRoxI922KTx+XHUCucKrKaDAHCW9kxpuGwYEAzZEjtmEzBlLI0F6ojaaoejbU8+P2SylU9cG6RC8zHFxehQNXY9tWIgzKljAIuIxCtc8DEsT+6fWyMb6iQGzEeqS7qYTSBTUMJqVIxI9lmEqa8k5P3lHr3phGlTOTQxNPcVTYV1OEckEdWWNg0oZ6hxYefoEEzX1oL06IoxUFaxwDstHSU/wjtLUa1JOB1Fi8PTpPEaqpk/qy/EDy+rdO2p0DDCblHIdpJ68ukD6J68fnwqy0SI26jtp70N8e7kykqjgYuXZ29fAEyM5X8x2NsY4bIMmF4U4GHWCWLyAvpFh1PWhTuKIFzQYul6l04MW6nDGcdSxl9t+ftQWO7lahwiXPTZxdF5ttcIsfXIxLs++dGJDOD8MV8KJMg6ZgNN9fHssefLFPHI5uWHJI0ONMt5uV3py7NoII0cORara+0r44Ytp4HRXGnYF8h4hXTVz1y2J4Vn5+1/i4V4OZo9Hajwo7ayxp57JsiyO6S99VGWYr1hKbBEFlkVdX83aDJF2w2FoMeIwVXpdxSjCrJfuGG4QdnN6NKzBLOK9VARFti5jfQmzpTQ8CJLUq2Fz+uL9Lxd8ONa7MVnTmsphPWb6U3xPMTGKYAfrri/NlvNar1w0RoOy4VbpYSRHUXTGyIie0zM6eYPPkOK6AGfBB0I+T/ucmKoeKlBZYGOjdWw4nmQdZcvOrLL1Gu2g0ZHRL0JQ8/QZzuldbbI19KlELkO6rpKtj6qG7gsqwXokbdCqjjCy+/AFSbfd4zAqIs4J9VHVODFlGsvxw8oqnWHlTfKpVjFBrp8ostEiNuo75JqC61plJFHJxcqzcVm0aztb2SNiwApLrzSld/IW0VwfbOaqp0u2VQhfjaq+Qzn8km25OBdoC7oHYbf1Ih7aF+UrjM73wmbvzIVqX2fbkOVl2BDO98LVGImyeDAzrEJ0e0GsEF9+hU3FQo1uaElJe4cr61fk17i8V5Y/xSv/IdR2d+PFx4oeYZ01BC1RrtFY9BiQKq9N6RYNh+m2sA5AHg+75uylJiuF09NmPch2wxFRyXpd2f0Q4mor7JY2Wrk6iA6aCl2sV0QVnC0GTupdmP/5N3j69Cldk3V6cjrY2XonStvqvTEYT314sNusuymt5VB1CaNaxegOlr1J6F3z+Pk3LA66JmtjKebfS6+qEBKrQx8VZUHwPuVIcV0AYa3U3DB6z4LYqVnDoYJZtIDYj0QFWQ9f1P5lUmTyVcKUIjO2vSiITrMc+eisRis4XdWPVKD7gko0kI+cduoIpSf6gq3jcsE9VN091gj1kfo6LWksxw8rK52WJVxqrOQIcr0c+g168gITSNZp8IvJBMWjh+GDtibohppV0XyBpF1Nu+WZRpIy3N1wTrZd29nKHjH6YR3qFab09t8eIacfhrX68ZJtnbxOLlQdnaYOA9MCobp2xAXaAqL/hh360zDYIL04Om/HjY7LrF2dbUeWl2BDON8LV2RNVDcGx1ew9c3PxcpAjfV9p3weSge9QY3zxDEK5Z4cu1hN7FbM+uQO/NjLmeFyKoeRFSh6hLVrCFqjXKMhrgGiHuWBOPtuuEbGNxlHUlV5hl2MclpPDqknp8FQdU9ORlvhlCn1urx4ET5Fr82unAZoQlHREuWRSJAF6DOQ1IljquDog8U+hP5SpGT0K2Ykg/2tr/H17nF5vRFbzzRMxqyQTAoGU6SqwcsnIEYj5v+YdcX6LLAP9Zfzlhfm70qQAaNHC4kYmSgZ+SSOqRExGElW9IzRqEbuqLJuQyB7hCjFpZxebI6wVso4jlknW8OxXrNYWWUZJkcyjpcv4lCblVML9ag2vCfC0L+YJ+iMMKpzOJIv2iWyR1FhykpI9sA1enWOeGm0ViIRWMHXwg8NVCQDqjNUR+RrQNho0tbXK3glC7qtOpIIwM9Gqlw2qmHVDOAapek8fqwcQaHvrHy9U/mxANFYjh9YVteukQvDpkOUchX0SG2ApFYfhNbKplPjCH1b7USn8S370QabLm84jNcOWWRY49utJoejmjbLU3BK1KRHjUZ927SdbdgjRv/wCPpyYbIx55R9i3JUmFGyrYNDJLs6Ok325Iw6oUNVzk77tN8WCPSMwGE6R+T1jjQ6386WFI1oU2fblOVFbQjnh+FqLSxXdYsVotZDwKDDAf3ZHtafhJDIZJHNnCDyfA0LD/1IyBrnQoEqisuNms7zBTj2k1PgV5iuKsghyFIapCsVDWKfGnI9a1mInhEnriMG79pzRFPsmRSOAk/wYOEZ9sloFvMnePXiALk+K65rK+EIU5jFHHLZPMXQOpxqxF5XDLFzPewX6G7FA1sIHKXE8P2b8FH7UJ4KNLDG6gyhAMk9lcFJNIAnD3x4J3yToSXDokHu0IedCAuDGgZqTF+ztcgGyRETiCOwFcARy0fqCP5NNi1pgmNYfEJwGM9CCIQSSFHZRlk+fZVYGENOJ/TnYWzvvMEJ0wEpnHfUi3NKU4eD9IyBPVPSk1QUz9df4rTXjrGm04v10TnmwAbEYs82oRyQGsKwlTV9apgtrc1fLuzF88gJMlmS4ZstbFMj1Gu/If0EfRBOJ7lI4W08ofxnBJ16jvWX5Azbx6Rp4iF6hhyRl+t4HmVyFsPZCedgsJoFR0c37CSjfAhvOe8kn+0XiGtssMn8pbbqCD3TbKRKKIvTl1h/HkWKlfnJG2zthJEzWGGuMwBaT44fVFY9o3CR/OO+tbI8EqEn8B4WYRp3lRevfxDUALtJ5pm9NazsviZbgmoAAKIUSURBVMHxSQonx2+wu7KGvTM9nJ5RsUFOR7GzvoX9al+rmmJBqB/CJdivdbw8VeP6TVvdhr1VeeZTx0K9PFObYWmS4Va2s117JKCzYpj1V8gqWC1NykhlISddL+j01hum9xWd1jtdyrU/crkIPa0ixV1KB8UvfETP5MVUtNsWiKioA8h+bRCTRuc/oGEgWunshWR5QRvC+WH4zRVCen2l+Ku//BP86i9+Cssti9gQ//R3MGLTIX0YRDD4C+yF/xTJn/we/v7sf4P/4qfsgTSir9/iTO/EH4z/5xA+Yp9GX+PtX/1N/Oxnv0Of/RX+8k9+hb/4qQW3LJXWoTquf/v//SP887/+PyueKSE++68R++Uv8UvpOviXReh+5sEf3OrHT9hDv/nb+L1hE1Tvwgj80R9j75cHiOX78ft/8N/iv/pPM/jl2kO8/jU99//7S/xzWTiHyQI1Xkkc/vIM/yeWlqbhMGNQlZ+f9KM7+c/wZ/9HF6ZG/hP8ZoP8VhBlpnN+Aez9v/CP/4df4e2/JQfq735F3/+P6fvETwZgNuTwr8Jh7P2Pv8Sf/qUa/6Xnv8ZvHcaQ0low+p//lIrGApPqL/En/58/wh/v/RLhaBqa/+sE7k78F+IoBjUyr9/qIEbzj/E//Oot/i05UH/3qymM/MdCLBSNGYbcv0I4vIf/8Zd/ir9U/5fw/Ne/hcNYClrLKCgaQQdsZg2Sh3+Mf8p04CCGv9L/Pmb+0f8Nv1OyjT/5G/jbcj05+Jf4awM984e/jwGF/RRlc9r/M/zsd0rawhBl8ld/s/S5CjqLGcXoH+N1mBqAYSoXKZz/w/sE/tlf/A04/5sh/Lb4UR3EeP7977kw+Jf/BP/di3+G/yn+76Ed/gP8o7/3n4n6Qvzkb/xt2HRpHAYp3b/YI536axh+fwZ/+PsDlAIRUc7vEA4wOYfxp6c/xd/6+3+If/B7UmOm0sFC5VzJe4zy/nfxB1N/p7yvWNt15D9ch2d2FL8tFk/d+mgxqfAuHMAf/fEewn96ip/+rb+PP/wHvyc5BG3I8T9qXVY18crQDg0r5BH9X7rxexP/CP+wSeOuzKuSenH99HdG8LeNv0n5/Kd4/eZX+Od/mkD+t20Y/0f/D4yUCv1//RP4X8fxW7/nwFDdkSlJpv86Vq7rvwz/cxz/tQ5/e/wPMTFUnRKJFuV5/OI+/slfaDH8D/8hRn+7pCX1y6qx7Uy3b49YWKSxqkwEB389DPffGSjrbzmPMlvz09+xwaz5N/jTP/6nkk7/Bxj/7h9g6u+U9omqI5fYv6PPC1THS+k4BEsG/h09E/stWFi5tdkWlHXvt7XIRQ6Q/b+48feEH2ZU62YVgr36K/zNn/0MNbeb2peLyrJdG8L5QWGbbXIuwr/57r9fnPpu9Zf/m/T+svn1d7+4P/Xd1NM/k94r+fUv7n83NfX0u/p3L5s/++7p1NR3DZJyefzZ0+8xT98X//t3/+Kbqe/m/vH/LL1vhFje93/xa+k9h/MpcVF7JNrHx7/6WPaxPkI67v+CUvspc1FZtmtDOD8kV2s67xOgeHKI424nPNXb3HI4EsV8ConQDvxx9kufS5k44nA+cYrIs2l2P9uc1QS7jdvHD4HbkKvDbzBPSnrN4VRxJByPAOG4E+mjj4F07Es7x+p8+mQQWltGMK2BeXweUy1PtxaPc4jY7tc/YoLDuRIc4/n0Nt52GWCf+/4Po06zY1SSzqpjc64qF7UhnB8S7kRxOBwOh8PhdACfzuNwOBwOh8PpAO5EcTgcDofD4XQAd6I4HA6Hw+FwOoA7URwOh8PhcDgdwBeWc74HEti9u4lDjRP3VxzljeTYsRbH/m14I6covAe6NAaMuCfhEja8Y+RxEtjGZjiJ910amFxzmB3hv2DjcDgczqcBH4nifHROArs4rD1BFanAOrYPAItnEY8eLcJjLiK8vY5A6fC71GtysDSYePQUT1ddUAW3KvdOAlh/ftTkwF0Oh8PhcD4u3InifFzSr+ALq2A2yw+MZiQQjpyjz+nB+FA/enr6MTTugbPvHJFwQnwkk8G50QrhlI4ePQyac/FAVra30osINJbBOoffcjgcDofz/XA1pvOEzRhj0hslfU75JoXixoXBM+ltiT75NFIeJyEvvN/Gcc6mkNR62DwzGC9PIYkbTKYV4bIkTONZuhSOFI9uUra5Wx6Rra/gi5vLm0YKG8BFjHDbMghSfDkWX58VE7MTsGiB49272I7bcO+xC+XzX4W8pmBfXIOLnRGcP0HI68W38XO8Rxd6TU5MTY2WzzoT86uGdeYJJqrOqCxGt/ClNw6Y5emU005eGa1k1ogs9tcXEOybw7zOT7KwVcJMh7DyIATDHKVbtiFvgmSymXSIz6UCWNrM4Iv7U7Agip0Hr6CdW8PN0y18HbXg8aytpROVP3kDny+I2JmQcOgt45iasKCyfV1t3izjU5hgBSRQR0Z5SsuyFwnjJFZJrt3SZqFjHjUOdg8hRKUx4dakBw75poOZKHZ3/IieFmrKUpB5fRWn4mObndYrqxMEljYQVollle4ojFYo5UMKDDPJZ8om+36TfDGEeqColF1Q9xnhcFfkIz6jU2y4mo9s4StfXEq79CHF5fcGEEnmpLhuweNxQAymnXrZWZ3JRHex44/iVJh37oXplgcex4BM/0hOb3zwBWNi+cv1SND1IKrNkoBkmyhRNflvTTPdbWALBfrgvL9S9/BoZT41MIy4MeOSdVYuXNYVqsuxWTgior5Wq3QlnHbsVz2dUKLUvQzerC/jZf4Gff8L0VYVj/H8623EjR6q7xbeceMouEIjUb2wzz3Co0elyw2TdKdCBimqv732ufJz7qqHTgJr2AjmMDS7SvcX4bEAB/IppA4pHvkQINtbw9kBgkkTJlceYXXOCUOOnboeoOYPGLSYoc5F8Za9kTiOJSgDQ7AyB4oZgM0NBNMGTCxSfhbHoUu+xMOdCJlPOQUchqOy078Z5MCE6iXo4nQqs3zEhxdpM9zjdY4tyOco1RroNNJ7CY38g/6b1FDlEViYxvRCAHnnLFy6I/gCOdxytXagWOO1ufESKf0EFkkXVmcdUMe8WHt+XJZVYneZ8paGYYJNKa5i1qFGzLuGnaNGE4Uk120vGXYrGX1yoKRPQZ8EQyo451k5eWDuiiO44UWkFEw+gi1yvGIaF+ZZWu45pbIUy23QXdLrOdh7q3S4wQHu6RA7YkN6Q3QSRivSoXWFfObs3Uj41rErDRa2ylcFE9xSWh6tzuGmNkny2cZ+VrpdTZGVc5X+5qnRXPMi2mXH7CqFszgBQzqIjc0Q1ZT6NKyXF6gz2f11LHtjUDtmsUrpX5wwIB3cwGaoEms6tImNlynoq/To+THFoLMLshHyLhgkmSzm7VJH5eI0110d7EwXhXhEW2kq68c87HUiLVJnYK0qn9nwNrZLhdRJWbNrzk7WW0a74WRzyNEfwzA5rB52DcMg3vmIaDHqdkJ/tgeflO+ToB9vCya43NyB4tRyhZwoFTSaHvT0lC51+fT6CkXq1dCTGk35ObXioRPEjt/DMOaBy6il+2wKyQEzznEcb2SG2+EEwQD1l9Rq6b0MjR2T1MMa0PZAa3Tg7gwZlPMw9o7o3qANZnUO0bIXlUA0ViAfygrmQ2X3/Qie6jE2fweWfspPvw2zHivU8RAO5Mnt7UUvfaZokFJ7CJ9Krz+IDmWWjwqNoMnlxlBtQQG5jGAgm9ONAcddPH76FE+fPsbdER0ZtABSttt1e9HVHAWDONWPYf6OBf2kC4L83WYU3r5GhMkq+waBwwI1Lku4Y2FTiloYKT4SMWK+AJVGLenQNl4k9eQsTUDpGpowPj+OIaGcLLizxBquOEJSQeVjMZxqrPDM2sS0DIzCNUxNSzyKY7qv6i7ptQYakpdch7vryY8aogA5tnKVu3AYLckgcUyu7vB4RT5f3KB8F5BMtpevCiqopbT0aAcw6nKgD0nEk9LtKlg5U3NO/1VIHwQF59Vz1wEj1SdBzrNO9J2GEKpXWM3qZdt15hjBYJIc0hncdRihpfT3W+5gfkyP06BP+v4RPXMK/di8Qo/c5gLevo6Qa6ZCdynvgkGSyaKzgmlLdyv6INpKlbr0vruO7STrQ4WhuubERDmfToz0AUmpkDoqa3aRHsrjazucQkHoLGpMFlgs7DJRt+t7QOeA5wZpZ/AFjtL7eEk9FcNtN2zcg+LU4bNcE6XTNmphB/DFymPMj8rvd0l/O0cYEShY4RyuU8XVGmXvZcAMI9n09BlrhIwYtmmQi74VRqZwEkO80IeRYWEYiozXO0BvwZB81sxopN7YGaQ2TKTfDrv+FOG9ytDQcTiCc70V1uqlSBemM5klAn7EtE64LtPypEPwRQwYd5YnP5twgndk+3tNg1BMOg5NkUM2jxH24bt3OCVpmk3KNA7azFAXkkoZMyh+L2ssnZ46Thw1HPKWotsEM3Wbz6RAum1TePx4AooBoU4bUOosHFFDGTc4cbODs0nPgg8wPT0tXrNfYyt0UjWyWUKLkbuP8Xi8kupiKok0uTYGgyiAzvJVRCoSJS02wFRvaIGVc7gAq3NY1mgWkUyckf4PKuOiBm/lqXJKuETTetlunUknkCioYTQrda7HwkZFJCfw5B296oWpanp7aIqc//kRpf41JYZnpXKha3ZlF1FhDWAdLqq7bTA4TmV9d6Q81V3MUjjU0zFIhXRZOny5daFNYs8qOj89i5WdSMPRS4buCzfsaiqPBy+Q1DvhFgwGh1PL57mwvFkbn03gzc4a7s6WKlTtnDtD0dDQ1WitCbL78AVzMLvHYWzLXxCnsIo5ceB6wGpBrzSld/I2ilyfDWahfcojx1q20yCWZemY/tIHNuGQOZNbV2rsHCacR8JiT64YRZj1Uh3DbU0VtMxrmzIrcxLA7qEGNzylNVV10Ggv2KvMYt/3LbSucQwWj+FfmRXSMvv1DiJ1G5ocMtQAqJqUSTrDzKgGmmr7qNHVpE2Q0YMgTvucmGprPVEPqANOZfFemqIoIhP1Y31JTDe7Gq0daUnCD19MA6e70uBdBPk03+K4nnrcG5Upm7qwtSdimr98uIeifQaVGdp28yV3EL7Ewz2qMx6P6MwqYOUcRM7spjjkhZdhg5dEm52elvWyzTqTPsO5VGcVsNE+6aU4qqq6hKke5ZTniOoQ3rXd+iOiF9Ddi8HWEEllveDDsd6NyXIhXZYOtxmOMOXfB8lfb0hbttrkLuv86pwd3Qkf1mXT+rUM4IZDdB5Njs6nXDmfP5+XE0UGj/WS1Q2tWQqB9U28Lloxs/INngrTRPfhrDNaI29o2FW9tkqkgOiLIJImF9x156zqIa7bUrH5Fka/FUO9bEpvH2+PctAPW6UK2w0Ny4fptrA+QZ4Wds3Zlc2nymKHFYcIR4vUfoQQV1tht7Rn1pvntX2ZlTjaC1PDc4a9BxXDJhjJsyAe0OsVtpakW0MllUO6ak4vIwhH+F9B8egFgsVbcNlUiHq3kTDP45un32DemobPu09NbzUaaKk1KdYfYhEQRyyLKFRb0kyqZhGwIKO5YfRSHnZka2Eak4Hg56q6hLwUoztY9iahd83j598wGdI1aRaevBD5U7zyH0Jtd7c1pVkP+TRfv20KLirv5GGsjgxLDJYb98XJYXSHN7ApOV3t50u5TmbRY0CqtGZIRiFK5Zxk60+GqnSAnG5B5dmEfSvaq5dt1RldH3opPKFDIydzRiUsIXQIig1G8y6CfMrTCNdtOzSFGCJ1vKiL6O7FqKylWr03BuOpDw+kBXCXpcPthlM8S5OF0KHhxIJEW7ZapS7rvNb4BdzDVKpvI3UdVAHqqAWCSajVasRfBcWZAg6nDp+ZE5UkA6KDoVEDn47j+BwwDrM1SiXjmkemzh5G8oaGXcq1VRKJAPxsRKDZIudCTmlcT+JgMwC6vpJl6MfwSB9y4RcIn+thFX7PL2K4pmdzekiqKulgF6N29HsQdlsv4iEvXoRP0WuzK4fLm9A0rxeQWYnKAufKNSeudMYcvZ5nq1p1BhjUBSRi8tXpKWF6RK03VI2wJOD3pWC7zUa2MsI2BzpDPzU5KnICbOjLF6iZq2YA16gjeR4/VjoHVGYrbPSKFcq1a9AjjmhU2fwdR+OUCEqfzHgLMjKOY9bJ1sKs11l4XtWg5RNInAJ9UiBCmH0W2If6y2WXL1y82c0d+LGXM8PV1pRmO5AU6+m2AMl96Wusv8mU1/T0D9lhofpVWifTfr6U62TE9TYFvD2Qr4JJIOCPQeN01Vl/ooLBSBEnjpXrZrL72Pp6Ba/krVw79VKgjTqjM8KozuFI/usPInsUFabThJmugWv06hzxY6Ubmgis4OuaH4FcgO6uxuNuF9Dd9shgf+trfL17XF5LxdYqDRvJhCWTwtTXZelwe+HkEY3QcyYzWrlpbdnqetCDjR5N+L14y348ct8F03kYvlftdJw4P0Y+Gycqk4jA/zoG6K/DXDNFIKHTU8MNxF77ET3JIJV4g92VTRy0XuFcn0Kh9YhALgzv8whOMllkTt5gazuMc3Imbsh+bauzDpNBJPTSnkgSPSNOXEcM3rXniKayyGZTOAo8wYOFZ9ivM4XVf8MO/WkMMXLG7DfEdVUfTAcyqyxorVwacaUzNPRaNJxGOBx6nId38DyaEvPmZ78266PPlQtciscRJC0TcAl+gxZa8rDSyRS5LWxtTQRn3coFyCWGnE6Sx0usP48ilZXkvxNGzmCFmbWuPaNwWamn6VuT0pBBIvQE3sMiTOOuqoXjIjrHHFinOfZsE8oBqTgCWwEcsXJKHcG/yaZdTXAMi8ohOMRnIQRCCaQyJ4iycvS9E+5dhALpXMPF+m1SzOUor0yfskhFd/CKqo3Baq6zdscAs6GIZNCLQCIjPh8JIHRWWSfTfr7IyZTiFOMNYp/C0TNPtww5w2o73A0qlG7YSQ0q+3VrCAmqT4Kct18grrHBJvcp26mXEq3rzCCcTnKRwtt4QnnMCGl/jvWX5HTZx6TpyCF6hpzrl+tlPTp5s4WdcE6Qa3NHTo5MRpkEXvkOcK42w1ZPETvQ3eZoYTRqkDv0YSfCwqP6Qs4oM6lqg0EYHb8sHW4ZTpE6aVEfAu+6YLYYkS/JJFsgCdHtQhb56hG4VhQLUhgsXyH4D86hNtvqy0lYjsDqGcmxxwb3bQPO9rxV9Z3DEflMnKg0otQAR3Im3PaMNlnIOYjxuTGY8hF4N5bxcOsAuDWFG6xOJzv4KZv6eutFzn3DuNUfxbOVBSxvvERCM4yZedm+UIweI0y9zIeyKNOuGsSd1Xtw6pLYfbiAhYWH8B534+a9GYzUWwzTMwKH8FtmR521Jp1yyTKTwRySGXsP3u0+FPMWU8E+M1/T+KkGJ7BSXoSjgsUzA2NsHV9Of4n1Qx3cngaLd3UOzAk/n97FwwWS/+YeChYPlmRbExgnVnHPqUNSSMMytkIFmD0rmG04FdqNoal53Og7RXB9B5UBKTNujuTpMyqnh88EXRxbnCqPqPSMzmBmWIvkt5t4uLyJQHoQHjfrY6cutghY/+GL9c/Dm5RXpk8LeLibgs55DzN1FUaFwTtLwpYWka1l8Xl/GgbZ8+3nKw6fFGcp3h47fXdUHq8a18edyrohp3sIU0semAshbC0zOXuR0I7h3lzV2rt26mWJNupMz8g8Vj1mFEJbWBbSnhRktiR69QJMl+V6tLlXID1dwtTQRcpKJqPlLRwUzfAsVf8KtMLFdbc5Yh70SPlZeFRftiKAleqLtGr/snS4ZTjHPmFLCbaDVMwn6p14ietB474FrIcv6NHEfeVwlje/Rc5cyZeSNDmv1NE13IZbqmc9I2Ow91J999VbNsD5sfMb/Oy8j0eabeIm32CyEWxTyYdJOB5JvxrjXC2kzTYvtlEih8Opi1Cf0g02BO1kw1gO5+Pxef4676rAhq1PovCzno/JDht3oDgcDofDuTJwJ+qHJOHHMtvVWmXHPY+l4SJHDofD+dEg7OVW/1gatv5s6ulTPgrF+WTg03kcDofD4XA4HcBHojgcDofD4XA6gDtRHA6Hw+FwOB3AnSgOh8PhcDicDuBOFIfD4XA4HE4H8IXlnO+do51pvNDMYXXciPz+EyyEB1vvpcXhfHTEPYhqzq/tc8r0M4tj/za8kVMU3gNdGgNG3JNwDcr3J2nnmR8PxdQrrD2MwVZ336cPg9sSzg8Nd6I43z+ZKHa3dnF49h5dampgZmbgGviwXbg5nA8mHcLKgzB0Yy7F8UtQ62Ee1AlbkKQCS3gY7sbwpBs3DUDytQ/PDvKwL67BJZ0a084znzvFzBHCr/YQiadwRp6kxuzB4lTViQyXAbclnB8Y7kRxOBwO4ySArzeOYW84YpLA7t1NJB3y3bLTCK08QMgwhyfCMSLtPPN5kz96jgfP2IGMNtywW2A0GdBfOmmYw/nMuBpOlHAMQM0gu0Bfeft/cSgeYx6oD8SeCbo0MN2ahMcxIDsENI+TkBfeb+M4Z49QL9MyPoUJS+kwunrHCpwgsLSBsEo2rJ8/Qcjrxbfxc1Aw6OozY3xqCjbpK8KRL8Ez8Y1AF9R9RjjcHjjkPSXWk9rxI3rKTorqQq/pFjweBxSdqbr5N1eOGal3TAI1CEsbYaiEfEAw4orklOmTvlcll14TnJSf0X6Z8WtQDubJp5gqnXeikAvLjxNTU6MQgxEbk6BuEk8rX0Bk6yv44rL8VCHKUqe4n49s4StfXBm3nJYyYR/WP0KCTRE8S5fKWkqzoijV6DM64K4qp0x0Fzv+KE6p5830yuaZwbh8CofK2u8NIJLM1ZS1EGd9FRfziPbz8+F1oN0814ZTyXOdMMqIOmeO1ZZrW7SqDwKt8lgHIdwmx/cII1UhGOaeQO4LJXbvYjPpEPWlnWekzyqUphH1GHu0BMVxgoQ4snUus3WEEE8Q1eKttofNdbsascwiRjdsmSDVYVFP+6wTmJ2wQIss3qwt4KXGjW9mbeXNgcX6qYXnm1lYVMfkRHpRcK82PzfwB7UlCsWub5dl1LM/Jfnr5OmtseXy9NaLu0I535IOjnnUONg9hFiFTbg12ardqCOblvWX+CjlUCuzejKsa8ObxvVpcoUWlvfCPvcIjx6VLjfYuaHVxIIhalTm6f4iPOYuxIMb8EbKp8SSMVvGRjANw8QiPbOKWYcaMe8adionydaQDvlANkwGKc76BoJpAyYWKS2rc7B3J+Bb36V+qBwT3KX00jM3tUkEN7axXzrFMruP9WUvYmoHZlfpmcUJGNJBbGyGKIYK2VyO/jVg2OOhRpeuYfnJ9/Wg9LGjZKR3IHNpn5fSIcnN5C69n4edrGk6tCmTyyLGdUm8fLgDmeiQOcvQv7I8zdmpVORQvJsyuSyOQ5d8iYc7ETJv9Ske+RBgp4pehOIRfBf+UrVMLojJLcnrEVbnbkKbpHLarhxImidjtOaNQe2YxSrTKxtwsL2OwEn5AeyseRHtstct68FyeZAukVB77XPl+NyDYhBKGufn0upAizyfBNYonByGZlfFuCxSnlPsbmud65R26kMn9VwMN4Xgyiymp6cxPXsXa/7jcn6Rz6EADXQa6b2ERv5BO8805BThPUF4Mo4RjtQp5UyKHCi5TaxvDzvh7CCIpGkSKyS3OacBuUMvngiK3AOLVQ/Eo4gWxWeF9V9Raq1NNpipoStGwzg03MTwmRdLsyRDkuPs11sInSjl/sPakhZ2uRPyEWwxW65xYZ7CXRUOPmfpjaIsKgFZ3OyqyTcjhmBIBSerP4semLvilD5vxRa3G1eL+sv4GOXQFnVt+EeK6yNzhZwoFTSaHvT0lC513WNSTOPzGB/qp/v9sNxZgpssSzx0IDRUyL5B4LBAurWEOxb2jBZGx114rKS2vkCVAyRBChughkKtlt4zMgkcFzQYHr8DSz+lRWvEFzeo21lIVp1mroK6lF7tAEZdDuqDJxFPinePg2Sseu2YueuAUUvP9FtwZ34M+tMgfLIaXSgwFdLAZLHAwi5Tc4OcjwQQzKkhT7KqW0qHJDeVuvS+Gypy5vzBU+jH5iW59MM264FVHUfooJKholBFZXnSaBRlkN33I3hKvel5SS79NsyScNXxEGTByDhBMEC9IIVwW3MSDJCZUeavFfVkciFUaklePdAOjMLl6AOScSpNBuXDR/mwenDXYYSW6ZVrBmP6c2oUj4Qn0tQwxWCFR17Ws070nYYQIsWrlI8GGhKqimRbiq/eTEiz/FxaHWiR59jxexjGPHAZtUJcQ+MOmMmtO46Lhd1U54QnOqNlfeiknhPU6UdXlwqG4QnMzc3BPaJH5mAb6yVPOJcBc7Oa0s4zDdD09uI8Eia3qYLglBSkN3KKLLVym1jfHnaCxj6JqdEBUY9JbjPk1Z+H98A0uccyTO5rHNGSF5WN4e0p6ZzNLMSfPCbtiL+E91gHF3MCVu/BaTglJ2Ct0qEgflhb0twud0I+FsOphuo39Z76KVyhvgyTO0IOp7w8FXGzqyrfIiaMz49jSMg32Ykl5iBXbHHbcTWtvyKXXw7tUc+Gf6y4Pjaf3RYHKrVcBbphMlMv9SwpNiDv3lFfzwCzSTlsO0gGQF3jADGKOCKjGzc4cVO+lEE7gruPH2O8PEJQRIp9WW2AoWEPm56JRKn3aIBJ6DinkUgUoDaaMSDcl+ixgHWsk53WaMnDNzhvou3VF1Sx3kEPy5B8HsEIoyC6KqH09tWZBhBJxt8BeguUwRgpx2d1ZEsSYCN8BSucw+300iXSIfjCBVidw9SMtkknMmlGMYUI630bTJQ3Iv0OVJTUqMuHjHpgMFIK02dU0kUkE/S8cRCKQSWdAytPldM+bdEiP5dbBySq80xa+8XKY8yPyrWhS/p7EWJ4xkZ9pGt2ZRdR1jn+EDrMo3ZkHltbK5gYtZDaGmFzkQNBullyID42aoud3OxDhMvDPFnsh+JQW63knNZDB+0HjOg1Qq1Rym3AbKTGLo0zJrceG4aZUx4VRz2K8Rg1ymYMW0SdyxeoIqhZZ8ElOgHMSZmagb230qEo80PbEoFqu9wZ3bYpPH48oazfHa8DI6dGUYVNEKuwmPGO4qqpvzIusRzaooEN/yhxfQ989vtEMc+aVZT3VOPTGVYS1NOXFxJDo6vfICf88MU0cLpHUHclBZtPFoz/l3i4V4R9ZryqUZM3EOyZHMweD0aE+MkonbOoq2Puod6l9FIinyPD1GdoqOhyEn4fYhon9aKbrP2oIp9jPXvqLS5XGjOWXh8bbc2cQdGmqZQGtkIeYjBBLJfDoOtLH/WhSsPGMrL78AVJHm6SWaMga6BGxRdEzuzGePtfaimTs+ADWb4brE2KPZPl6SH2cmZ4PCPir43y4ujD2+1KGOzaCNOnZymSH90Xst+Jk1HLRcu44zrQLM+MbAJvdtZwV5q2mRbW9VwU5dTKiOoQ3rXqaXElrerDhet5EwaEllVyIDTa1t9v55lGdA/CbutFPCRNuaT2ED7thc1e34VitNKotnS7FYLcisgJvp0KFpvgRSFaLCIapdpttirXHxmoAya9FOnHNfarRKFDIeMHsyXN7HIjlM7+dM16tCIyUT/Wl6SpYLoarX+6OFKbUHxPsTDajKtV/S1xGeUgj4uuxnlvZMMvWOafEJdj1T9hROFr0UWOuk7othVRYJood9yF9QVV5E/xyn8Itf2esJC3bk90kM05s8By4s+YNzbR92heVhlZA1FZq5B79wI73jU8Vz/GnUEd+nrJ+xY0R04GUpIlimTAqTHWaVs6UfnTV/AfqmG/xxaNtt937hZ6nibcXnXDXK0RVMFK2UknSUrdjabEuiEGcxurbnONYrGpHdYYiRQQfcHWXbjw8yEVciHp4xYUoi8QTJrg+vkQVG1+qR2ZsPVH8zf6pHfUPvgW4Kuus2x9AZsXE8jh3YsdauyfQ/34Dga7WcPZC8vcPG5WgpFQkWQoj0J5simYD6OTMu64DjTLsyqFwPomIroxzKyMYEDLAkuLC5PFL7SJNJUgvO6B67Yd0Y0IIuRFUSe0Dq3rw4XyWKaIfJbqIulpw059t4Z0PwcWvTzyTIpCpe8IX2vnmSb037BDHw5jLzUKUziCc/1N3CAH5IV0v0SaeXVqg+zHAvVpS7dbIchNBZuUeJXZRtbCi+g+lXRcDeuMwoWiikqypD+1jXUl/z+sLWlmlxuVkPI7ONvD+mZYekPaE93BsjeH4cl5zAz2izokLRL/cEptQpcgv7bjalp/xU8vrRwUcTHxrEMmnjKNbXg7cX2afHYjUUXBcpbII5E4rfRar12DnvzaaFTpuByz3lTVVFzuwC947i6nYrJNJOHH0tfreJMhB0OYS+7HkN1SZ15dOf/db3FipK+Atwds5lpHjQSZ26O3kC0VIEf9CFFKsqE0tpyPIkLJM5kb90ZFcjjw75GH70K9JDfFwOTC0q4qp1W42L1yiyL2xtV9ulrjKGG4pmdjskiqZGHQxVA0TIkA/GyEz2Vr2QhUSCDgj0HjdMHW9pfak4l8/RG7FEPpJWTrC4S1Rs4R9BXeQixKPQzqcySOC7Jn6GLhdDMXSkWdc2rIEsfKNQvUg976egWvFArQjPbyc1l1oGme03Ecn5OjMzwqOVCMPDL11u9chO6u5j27durDRfJYJoODzQU8kC/cIVLv2EJv6vCw7+jou+oCEjH54u+UUOfVeoPY72nnmWb0jMBhOkfk9Q7CbF2Xo87IASE0fhRXjc9eRVu6XUWhqmN3Ihg1SQYMlQXDJP74yxfkQ5khn8XWGShFyRjeyVWQLJwy/z+0LWlmlxuh/E712iFBt/ossA9JTg2RF9budYLUASiRT0CswmIBtB1Xs/orcInloIiLjZzJb5ZobsPbjusT47NzouKBLQSOUshmUzjybwpTUibHsNiA9IzCZVVTb4x6HVH2TAaJ0BN4D4swjbsUQ9CFAhkwlxvUuanFYIahmETQG0AikxXiigRC1FurnlenypBl98UrFQ1in2yf/pr40KDTCcN5GNtPQmI4qSier7/Eaa8dYyM9KOYziPoCeNdFhsqYL4eTFWoYCztP/5YoUJrJw3eThy990jZkuJ3XIfx6SZQLpfUogCcPFvBsn7pA+RSOQwGEztQwW+oODwj0jDhxHTGhtxNNsbRSGQSe4MHCM7BgypBs1XZ35af6bUH5U9vhvtCXPkAm1RQLFflTvqLBfSpvPcSiHITDoRd6X09CCWTomcxJBM/XFvDQnxDKSDfshBmH8JbL+gj+bWqENDbY2nZ628vPZdWBpnkWHEfSmdd+RE8ySCXeYHdlEwdsBOZCyOpIJoFXvgOcU8Nsq6NmbdeHi+SxjA5Wu4E6T8+w8+ZEKMNU9Dl2wufotd+QpquMQjmfh3ekcJl82S93++jzUqjtPNMMFSx2tgI+Rg6KFXZprVEFykvEj9cxsiPXzQ0bvw8hF/bieYTJIIOTN1vYVshAZGjYKoxeqM0Wxdocnd2F6+o4dtf9OGI2IHOCN1vbpBcGOJ2U/0/CljS3y50gOABnIQSo/qcoz1GWVt876e5FiSOwFRDlx+zEJpvSMsExLGay7bia1d/LLoe2aG7DLzeu74+mnb6riPnmCPLBdSyU9sgZW8SUzO01Tqzins4L7+5DLLBH2P4xnhVMWKpcY70TrkZDHqpB3FnyCPt0bC2HxV/1sH2V7lXPq8fhW1iQXhNdvTDYZzBZ2giGnJf51W4pnGB5X4x7bC8Pun3kW4ZXWMMQg2+5djGDb2EdObZvkPRef6FRGjkqDN4hufRX5IKuPpid98R1N+RQbQcT6BuegkuxmrEKJpfVe+j3erH7cEGUS5+Z5OKGYvmO+jrGLzxcpsb1cadyEX4bdC6TKuI+KIvSAPvMZHlPH51jCatatk/UFpaDou4ZbB7MjxtFh6d7CFNlnRHLus88hnvuUdG5aZN28nNpdaBpngcxPjeG3E4Q3o0DutkH68QUboS2sZekbnPbuZLXkS6o9RZ4libqOjrH7dYHirrtPMroGZnDarefynATyy/Zl3phojrA9tgqoXPMYSa3DV8pXA2TyZyiEW/nmaYM2mHrPcTRkF25eJiRjsLvi6Bguo256g2lLom+4Vvojz7Dik/aJ2p4BnOuqppnHKQuYwwaxY8pCGYD7s8g8MwP78MD4ftCma5OiLvAH73+BGxJC7vcAT2jM5g524b32008DHZBw/aAc3dj05cSFkUPXaSSU3fr5kgewfWF8j5RY4tT5XrfdlzN6u9ll0NbtLDhlxrX98dvfD47lksbDco37rriNN0YT5gDr9p8kfMj5/OrA3J4ffjYSGvabMoNOutRjG7hS78Gc0/qO7ycDpHWNjXc8JXzyfHZ/zqPw+FwOJdEMY9UIoQdfxy9Njt3oDg/ergT9QkzNPUUT+sez0AMTeHpU97r5vx44PXhhycT3sTDzW9xanTj7o/lNGUOpwmf0XQeh8PhcDgczvcHH4nicDgcDofD6QDuRHE4HA6Hw+F0AHeiOBwOh8PhcDqAO1EcDofD4XA4HfCjd6LY3jPTK6HSCUAcDofD4XA4bcFHojgcDofD4XA6gDtRHA6Hw+FwOB1wNfaJqnukg3jERdpZOqJAPLIgqJvE0/KZF3lEtr6CL25WbKOfie5ia/cQZ++70NX1Hu9lf9lZQnPjg9LBntIxGmMeqA92cVg6i+zWpHCeVuUUrjxOQl54v43jnD3Czukan8KEpXTgj5S2M+kto0uNPqMDbnZOnhBQu+lXxsXOLDNTXFM22S6DmahwRlv0tCCcXcXO45uaGkW/cIhbvXjo09AKHgR1lXjqyfwkgKWNMFRlmVeXAeMEgaUNhFUNjufgcDgcDucz4bMeiSoe+RCIS29KpAJ44j1E0ezB4qNVjLNzC3pHMLv6CItuI3IH29gOKVdIxYIhchzm8ejRIjzmLsSDG/BG8tJdILG7jI1gGoaJRXpmFbMONWLeNewcVZ4RMLnp/iPhWp27CW0yiI3tfWSl29XUS386tK6Ia87ejYRvHbsJ6YF8BFvLXsQ0LsyzeO45oUu+xMOdqHjCfceQ8+UL41x614h0iJ1YL73hcDgcDucz5jN2ok4QDMQAtVp6L5IIR3CuscNzx4L+nh6o2eiMSgMNve63zcJjVeM0fEDfrmAan8f4UD96evphubMEtwmIhw7IrSCybxA4LJB/tIQ7FvaMFkbHXQqHnC9fACXfRkClpvs9wqUdGIXL0Qck40hKt5XUS38GieMCNMPjlbi+uAEjCkiy47uJfCyGU40VnlmbkD8hnuFeSnAUx8ITnZGPBBDMqaGUZhXkwAWCuWqRczgcDofzWfLZOlHCiEjBCuewRvqEkSZnowAYrmFA+qSawUEjkEviVDY8pBI8rRLdMJkNwFlSdKLevcMpDDCbKpN7jEGbGepCEpJvU0sxhUj0jNJiom/XUj/9WozcfYzH44PSexYMS4caBoM4cdZtm8LjxxOoPEF0y9PfAcUj+AJxGJw3mxw4WsQROY1xgxM3+amkHA6Hw/kR8Hk6Udl9+II5mN3jMCp9m9Z0sX/yKJCv1YgeDXNsinhfJGcnw7wkNpIl3Kqg0dGnVcSeYXp6Wry+fIi9nBkez4i0/kpGy/SztUhiOF8+3EPRPiNOSwoUkYn6sb40W47rgWIx1sVJ+H2IaZxwj5TWeNUh4YcvpoHTPUKuHofD4XA4nz+foRNVQPRFEEmTC+6hDxyBaUDmLEP/qtBFweu0bASoiEL1gqNMCjWui2xNlLC+ypCCd+05jhXfbSf9g3BL4SxODqM7vIHNfXHorBjdwbI3Cb1rHj//5imePqVr0izc64T86Sv4D9Wwu5ssEs+f4pX/EGq7m5+iz+FwOJwfDZ+fE5UIwM9GRFw22a/nSujQxxr59Jk4FVeHk3dJQG2ANDsmUFR4SHkkEqdAn0F0Kq5dgx5xRKPKReTH0XhNOPI1UcL6KucI+gpvcSBfrNQ0/Qn4l77G+psMuqVw+ofssAhLq8SVVUK8fRbYh/rLs3j5QtUC97bJ4cC/h5zZBWej+U8id+AXRtVczR7icDgcDucz4wo5UUXkcllks6WrQJ/Qp7kc8nIfp1BoOiIyZLdCfRaEN5BAhsIR/KNiDjl6nYo+hzecQ69tWLH2Jx7YQuAoRXGmcOTfhI/8FJNjWHSiekbhsqoR963heZQ9k0Ei9ATewyJM4y7lGqJiQZb+FKLBfZyRC3ZNviiqafoNMBuKSAa9CCQyQjipSAAhYWmVGIjhmh44CyEQSiCVOUE08AQPfO+EewoUacmSbAVBoJDNC3IVKVByTHC5h9BsTK9AaTa53Kg/cFZE4tU61kne8mLicDgcDueqc4WcqHOENxewsFC6fGC//j8Pb2I9LBtXUl/HeLMREeME5m+bkNvfxPLCMvzs53Pn+9iiMB96Y1BZPbjrUn7ffHME+eA6xfkQzyI5mMYWMWWrjBMZJ1Zxz6lDcvchPbOMrVABZs8KZi1VY0lxnyz9D7Gb6oF9Zgaj8kVRTdOvwuCdJXgsQGRrWQjnoT8Ng/MeZkbEQHpGZzAzrEXy2008XN5EID0Ij5tN56WUi9wVaVnAprAvQRw+kqt8YEzvdEGW1fronXA1fCiPdDIp/Hqw0/EwDofD4XA+Ra7GZpsNqbfZ48VgZ+c9SzfaGFLabHPyKWT7Un621Gy4yeFwOBwOpyGfxZooVdPJJs7F6OLS5HA4HA6nDT4LJ0rbx39Uf2n09fMtCjgcDofDaYMrPp3H4XA4HA6H88Pw+W1xwOFwOBwOh/M9wJ0oDofD4XA4nA7gThSHw+FwOBxOB3AnisPhcDgcDqcDuBPF4XA4HA6H0wHcieJwOBwOh8PpAO5EcTgcDofD4XTA1dgnKh3CyoMgzqS3Al1q9BkdGHc7YJSfPfejIIvozgN44cbTH8N5NJz6HO1g+llMelOiC2r9IG7edmN0oMF5hlJ90v1IjjPifIqkEVp5gKDCqFfR1+g4Lk7H1GtLia5eA2xfeDBuabzVcvMj0n68XKmRKJP7ER49Eq/FWSrI0yA21wNISfc/b7JIRQLYWvsas9ML8B5rcOMGbwE5vbDPVerF6r0J2NQJvNxYQ+BEeoTD+VQxucu6K7/cJuk+56Mgb0sfLc7BacjiwLuCrSg/Jv6iXCknSqXuQU+PePUbHZhymYHzI0TT0gOfLdRrW1vGQ/8xVBYnpu6t4udPVvDFgHSb8yNGBY2mUi+0Axa47s7A3nuO8OsoitJTyKcQ8a9jaXYa01JPNPaMXs/exdrOGySy4mMczveKSl3WXfml5gd4flTkbWlPvxGjd5bIcX2P+KvXikGJzHEIO2t3qeM+DWHQ+yyIB/R6dmkd/mimYl9+xFyp6bya6QdhOiMJ+73HcJUcivwJQl4vvo2f470wtWHB+NQEFKOUdadBzJh8OoVK8HmchLzwfhvH+Xs2e6iHZXwKE4qAMoj6vQhEksixZ3pNuOXxwCFNo6RDK3gQ1CnDrZeXTBS7O35ETwtCmntN5ChNjaJfMiTZN2tYOLTg/lL9YdR8ZAtf+ZIwTz6mMNmXpKFy3WR5ui+7v46FF2lYZx5jYlAMOBPdxY4/itMCxUr5s3lmMD4ozY0KMkrDeX8FjnKkR9iZfoa08z5WhA+r3zNOEFjaQFglH/atkiXJyTk1hdFSBqsQ5BYxwm3LIEjfEWTbZ8XEbFU5yuXWpYbe5sHM+CDEHIhpqyllJnfUydtJAEsbYagUeWmlA/Xyz0RXO+wtlzUJAKZbHngcAyhNuIm6Ih9kJ93tM8LhruhTDXXLSESRhjylc/kZjjVWjLtvwfQ+jPXNMHTUG3Xrk9gLvED4nYbCWRLDKUaxc9eLhO0enozX8dTr1J8uDcnG1Vo2cpRyaja9U1U3a+rLLXg8DijEVLeOS+XPAmpLvxnNdfey6ngtynipAsBMujdlq8gyfxKC1/st4qJyVum/RF05VNs6smO7O9QonkJUT2UehXJCxZYwavNdW1cU9qSGWhslp7oOXY5NqK6HGhhG3JhxDUr1sF7517NnRDtyrWqLlGVeP/8KuTbQYQFz6XsXlHuTqfzqMk2H1uh9Dtfst+G6YcCpbwG+tB1z83Z0xb+Fz3+I3OAkVimgWgt1yfX5E+ajjkTl83n4fD7cvXsX0+S9stfss8ugmE0g8JoUTG/HcNnOJ7C7vIFg2oCJxUd4tDoLhzoG79oOjmTRZnM5+teAYXJ4POwaNog3ZCR2l7ERTMMwsYhHj1Yx61Aj5l3DTjmgPNWjNXijXbDPrtIzi5gwpBHc2EToIiNj+Qi2lr2IaVyYf8SmY5zQJV/i4U5pFCGFvXAOww4tQlKPYHp6Fiu7UTJ9It02F5z6AmLBMKluHYpHeBFMQm0eh0tyoPJUQde8Magds1hl+bMBB9vrHzwFlA75ED6X3kikQ5syWS5iXJfEy4c7iDRThbMDBJMmTK6QTOacMOQO4X0SIJMmwRyDNZKb2oHZVXpGzADWqzLQa5+rDFvT5R6UbiigCu8LoyrZbehAezAHdrks60dYnDAgHdzAZo2imOAupXV1Dje1SdKnbexfeJQoiwxTjm411KRFUS85k5obWFqZgG1Aix6NBkwLhN5o/xBcd+9TL/QUQe8b+ia7oYfJaIDR2MyKyacRF+ExA4ckm92EdLtTqqZ35uy90g2J7D7WWX2Ryv3R4gQM6SA2NkMK3c+cMQHI5DlnpxRfnI50t5qWdbyWdGhdoXtz9m4kfOsV+ZLTv7YRRG5I0imPRdJ/5eKG1rYuj8jWMrwxDVzzJKfVe3BKeYxeYJjhJLBG6c1hSLKFYnLInlzmWosPtAlFhc0T62E2vI3tJhWsnj1jtJYr2ZRNWVu0OC6VeYQk3iaDlbog1INecmCk948kQ3aZcs+kKU9qtegQpQLYCmZg9tzHXdcQ+kujgyoNND1aDNgmsEJ1Sh3zIXDMvtCAS6rPnzIf1Yna3d1FJBJBoVAQ3rPXgUBAeN0JwvSD4ERM48uFTYRz1zEzV+kdZN8EcFggw7l0B5Z+aiC01JO/64EVMfgCFeteKDA11sBkscDCLpNGvFEi+waBwwKV/xLuWPrRQ0pjdNyFx0pp8AXIVSPSVKHJh7N67sJhpIappx+WO7Nw9p0iFGq/JcnHYjjVWOGhCs8UVTswCtcwKVo8CkE3s0kkz3M42H2Fon0GK6SIi5M2qKJeLG+VKqQOjtvUSJwFEahj3U+CAcQKBjhvW6QewwmCPiHxuOswQsvy55rBmP4c4b0j4YmOoMYiQBWa6mEFqiT+4Cn0Y/OSLPthm6UyUccROmhSTTR2TFKvbUBLMjE6cHeG8nceRil5J0EflSrJ7a4DRuEZF2bG9DgP71F/soKKHAb5NEG36EMqyEcCCOaYwyGjHR1oi2MEyYHtpbITZd2DfssdzFNaTykPSvutgrqUVu0ARl0O9CGJeFK63RZFpCM+vD4lE281Uw88gaM40GezVXrRNXTDZiMv6PQtYkJ6dBiZnceUpfE3WFor04j9GBq/Sf3LApLJDzR9VdM7Go2ywI6DQSSpMZmRyr2n34I782PQnwbhkwmzKLgnMnlKjuOF6FR3q2hZx2vIIHFcgGZ4vKJ7X9yAUSbfk9gx3hvG4HFJOjU0Dgdb3XAcVzQ+LW1dPobYqYZMwSxsgs1kejdMDmcc0WaNo4ITxI7fwzDmgUuyhUPjDtKHcxzHP1Af5HygTUhQRVJdc2KiXA+dGOkDko0qWD17JtFKrtl9P4KneozNS21Rvw2zZDzU8RDaVh1Vt6i7dAn1QHBgJH0WDNllyb2IbIJsINk7tdlGekYaGE9QKEZYLU06UgPDsPRS5z3axBpeUn3+lPmoTtSf//mfS68qxMigdIpyMdwk7H1xbC8/x7HUY3r3jrUcZpgU5T4Im1mNQjLZvmf77h1OqZdhVgaEQWpo1AVyaiigYjKBM1KyQcXIBjkzK0/xZIKpYXt026bw+PEEpVKGvKUnB5RVV72TDLltoGww5ydMZIRlFXLAhQmrGnFyUhUqTYbgNXWl+pxujJRGeNPvkCC/1mSRx9oDg5EMQfqswx5AEUfkXMQNTtyUZz8ZxzvoYRmSDy8bYaSO21mzBletUQ4RD5hhJGOWPmPfSeOdmAGF3HoMRjJraQiPtEvxiBzsOAzOm4LxKNOGDrRFOkGyVsNoVk6L9ViGKfRmDlIRqUiUdMwAU+1AqYwzBB9UOhfT01/igY8afuc9zJQL/GNDRjh6SHqnhsGgdLzOgg8qaZv9GuvUba1189sljQSVu9pohkKaPRawgYCaxrC3r4nj2Aad6m4VLet4DVqM3H2Mx+OVbxRTScp9Rb4DX6zg8fyoIn9d0t8L0W3D1GM2xS+9F+hWOJwqFnDmrDzyXcsAvlh5jPnRD05Ncz7QJgyOk0zvjpB0RYqsg5qjJqNuBWtgz9okGX9HRtsCpeoYqTaftW87WtK53OUDEsxmLGzuo0id6qULtF0fzgXr8yfKR9D05nzIEixxMZz0pmcIrqkCUl9RrzviwuBIARmmnDqNck0AoaHPqL0qk89RZeszNDSwaTEg8vrF92U09JkUUCbHTIquDQHG8IwUtZpK3EVkogF4X0WQFBY/lJCnTkOGW5kYld6IPpAXLyZVwOh0wnD4ApvTh+IHZ88w/RX97bqOGfm6lHwGbDD67fY03oqfyEgJxlJ8Wmygg8LrCtR5qyXhhy/G1tWQkQq+kD5ksmZN5imCy7XhQC8aZvmShsZoWNEikWMeM8lMzACmazOAVCUDLUn4qfeqceL+iBayZLelAyUER6GRkMgpPZfSrqCHepXSywrVuqKB2TNfcX7rwqbV5nGjXCgqdPfIG0EjhsjffhuJIO34ooFY8ohE2NT4GMxN45JTrRtd0NvnMF5lg9l06ryUuNy7F9jxbmNTcx9LDdZJNYcaw3NWBDXCpB6u9FIO9eSb01y/29Fdkcuo4/UQ1+iUup299nsy+WaRePMCgdfH4vqeElWVs5WtYxQzUQS8rxBJsrU7FUrfMTIF8u7j22MrOVukIMU8ckI9lJFN4M2LAF4fi+uqSlQl55LpxCYo1+p0XXNjtV4Fa2DPSjSXK8lHUJ0glmsMA1OdiuaQN0NOjPS6TCu9kNGh3NmAhPwXkKpu5Si91mREbzCCw2geQ41Go04OED1Xw2zp1PG6YH3+RPmoTtTv/u7v1oxGDQ1VrWb7ELrF+du0MF2og5bpXrFA1Yk1JRUyKfnqtiL1Sqi26bQNVVUnBoRCbUBkdkW0GrHplxud+rB1GW76V+JsT1jUW6IY3cGyN4fhyXnMDPaLiiwsKBTvixSRbxBRlyx9CTY0SjHdXnXg7Mkmwjo3Ht1MY3NjD8HQLQyWGq5uLZmfXlio8b1ZU9uoEZZe1TbQcfgWfLU90vwpXvkPoSYjz6KQT6d1a1hoLE1umKu1jQ1XSy9bkwErRpWNZVhF8qfUWaiBrs1A67ZTIn/6Cv5DNez32JSwPNXt6UAJuaPAiLMFmCUh6fpIiknRqMqRevZKB1KpK6LTsYbn6se4I61lq6U0rSa9rUEFi2cS0eVnWFvJSQvLc0IdKRayyJy8QzgYQPidnhqM0QuUh1I33p+F4d3ZwHqVg1SaTmX0WKbwRXQa3mgMmY6cKB36eqk/VCtMCO2STJjpJJWSsCasGc31ux3dFQcVLqOO12NQWNPFyiqXfA3fsw1s9j3CPDX6qcA6NiM6jM2sYGRAK6iouPha+KJEa1sn/Ihg2Yvc8CTmZwbRLyZOcN5KqCwezCTWsbO9AKl7JtEv/U0hsL6JiG4MMysjGNAKqRGcFUVyLp1ObIIO9vlHsJJQ35Pz6N/24cGuVjl70MSeibSSazdE1bmNVbe5ppFlDktJc4Q1QzJv5myPyrWiOi3oXO6KAYl69Lsw60zggfcBniTFheWCLSzmkMumkIuG4Q8eomCehEsxinkR2q/PnzIfdTpvYmJCcKR+8pOfCO+tVitcLpfw+lLIZgSD1y1NWl+7phfWGSi3ujhGNA6oDVKvIR9FhN6bzGbhbl2uXYOerQmo2jPjWAwIbERdZWAjQQkcK9YNZLG/9TVWXskXN8vWZbCram2GEGafBfYhybgSeWG+XYIaYR0KSMSUKwXzyWNqzA0wUpYZxePn2DkswHDbjRGyJsLUM5uPHvgCbnsvdYq8lQXvOj0M6nNh3UU5Xexi3+mWj2Iofz7f06NWpL1E7sCPvZwZLmedX3IZmCzZtJVKFg5d7J6861NNIaec9jmJC+M/uj5WijroDWqcJ45RkIcpZqBpsBVyOPDvIWd2oV6y29GBEtXrrhQ/z9YZYVTncPRWueA9exQVpguVMwlKXRHXbBTw9qDtxSn1+f+39z7AbV35fe93s+JUYDegh0xNpAUTQ12hDjgJmBWyD0geOQrUCu5I3cAt8SpxUtJ5UCpqSzqmXFGMyHmmZiiFosaiYzIRNRWmJqaPcgd6FdqVJgZroYo4DTAu1CWyJceBsoQ25MuCm4JPQDeAt1CT9zv3XgD3gvhzQcle0T4fz5UJ3Ivz53d+53d+5889p7ED/RPn0GPcxO3pMYyQlWZrZZmzNza9gFjjYQxNSm/mqaZkawXjqzhM7dBGKJpvHipDermz3psORqMG6eUHxcXEjNQyImwmvyBMcfpGQ7pSrZ2oqd+qdfcp6/g2YlgYPYupu0k0SmG2ddhhId9AnOJIYHWFStDYiUOSA8XIJFlnUoYaW7cSIS1vhcXeITlQREZcQlCkEe0945h5921xKcXb7+Itp8xRSaxCTA5br1RIDUqT89Q8lU1ICrb57PyK4MSwe2xtWifpbOlSj6r2jKFCrgbWFsUpfQ3ytIjaqFSd6muGqvIpy13nGMXEgB2NMS+mRqhjSHnGVhDTIxcxE9yEsW8Cl8q+macWtfX5+eZTdaIaqUFmc67T09O4evWq4FSx73YK6zmnUuKVXAvh+tRNbGgO4IhNVM6mQy5h0af3wnVE1um5ZAyBKx6Ecyb0uIzIZZKIeH14uMcMizFTCCslutjIpjJCr48CgoutL/JewPXIOj2TRCxwBZ5wDqYel7h2RtcJJ9WhsOcKArEkPbOO5YVZ3FjVwmarUPnKIFS2zQB8gRjWk2uI+K7gvPehdJfRAadTT7o7i7m7a0hSeteXFzBNz2is1MiyrOdWMO95gKzhOE6WGZre53LD3szevsq/8dAOh0Mv9HquULwsTEGeF0ZwcSEmyqAO2IsDJlcvhN0VSmnqgvMAhLfaRFmy9Ptw5fwIrt3P9/nLkA7Ccz2EtSRL213MzFLD32xHfn/RdocDetbjvxJAjJ5JkexC1y9g5CI5BaoykKV0m+Dq7VA2nHnU6IAq2qn8DEL55WW9HrmOqZsbaLZ3l0zVMR2UdFJ4zo/71NPW738GxqSxDbaeYVyYuYqrbzmF4X72uv/VmSsY7T9Usut/ghqcKcxV3YAth3S6mNZk7BYWY8y/1JNpLJJLp2X5uY5bUdJ5YcH7zmhnU9ZkyGfz5b4eEe0A6UY3E2ZmHSsBHwKbTzPNILFT3S2hdh0vxQCzIYc4dXx8gm2heEMsT/mGRXQYEL2DhQjZhPUY7s6PY3qJzWeJqLZ1gqO4iYCP5LmexFqE5c+Lsqljo2+ssVd4AYTQKWPJWUBkLYn12F3Mj09Dlpxnw1PZhBZqsLVIh72YC4llmYz5wF7wLnSwJarZM7Vybepy4gDYm+FSW8TaB1buI9dQh+pU5zOQe0u7A/2jVzBD7fdJ5jOyXeTp75kLw8Lu5mVtZx3UrM+7gE91Ou9Zw3rOI9LfLOnNhk64T/egONNhRN/EGeg8HsxfHBH2nGD7RLnH+8CmdZfn2Ku87LkovGP5lQZFvCNTSEv7xjAv+4zOA8/8RYw8odjYHkHucfQV5ocb0dE/CjfbX2VmDH72TKsZ3Wd6oVjnV4OmQwMY2JyF5/Y0Lvr3QMv2yOhtJCdpXVjv1EFh6RzDOKfxwOufxthNFlEzTM4zGHIwZy2DZcrvg6wezt6uCo3TPrj6rAhN++EJmIXpFqGX0cL2TJnBmJB4LQw2N4Z7jPVXDL0TLlsl57gB7SdIlm1FWQp73lD6e7uqjNe2duJoWwTXxr3SnjCdGBhyFRcg6hwYnWgR9heZGfMLZa012OAe7oFRZQb0ThcqJpuorQPqaOoaxkSjXNZi+bF9opSw6aSihrPnDPYBnDz0GRuT3AZWY3HEWqjfb5G+28YWgtMjKMw8sD152o9jSLYYmrEVnMZI/iHSMSHfT2McybEZnmhUlDvbf+cM21eG3Y/dwaw/RurT/xTTDHl2qLslqKnjSli8RdsSFOKVdEaSXXvPELrTc9QxuowlkkGrtQ/9hwOYXYyDOvFIeNXaukMYGNjErOc2pi/6qYjYXne9aJz2Yr184srQjp6hbqTnyL5cXhJkZO3rx+HALBbjLDV1GMRqPK1NcAzhDKgsF/JlSTpbbjF1FXu2olqu7ThBbVFboS1i6TXDSe1DHapTg89I7p8mterzLuBLu2KzzWdEuU0QCwhrFMpvXMj5bBHXdtjKlxOHw6nJ583WPS82gbchnFI+1ek8DofD4XA4nM8rX6iRKM7ugI9EcTgcOdwmcJ5XuBPF4XA4HA6HswP4dB6Hw+FwOBzODuBOFIfD4XA4HM4O4E4Uh8PhcDgczg7gThSHw+FwOBzODvh8O1G5ddwaP4XxwnknHM6nANsf5qy0U3rqPq6cGi8esbOLYHvgnJV2rE/dv4JT4/kd7jkcNbBz204Jp1QorsFRTC1ECmcSloO9fXfq1FyZc+o4nOebz9/bebkkloO3sBhaxfpmFk+0ZrjP9cOyO3aQ5+xKkojMz2A+vIknezQwdA1gwLXvKc6U+jGRjGB+Zh7hzSfYozGga2AArn27LhecHxvi4bf+FvmhumlsRgKYv/kAaZMblwYtZeuFsIWBX4eTV/vxDI+o53A+dT5fTlRmGdfPX0MUBtgO22ExmmBokx+oy+FwOJxPB8mJ0p3E1X6lK5QJzeBNbwL2cxfgapO+Ww/Bf+M2QvEt4ViUPOx4pfYjLhw/ZNzxGYsczmfF7nGiMmsIeDy4vcoqnHgmXk9/Hyyyc4hW5k/Dk+3FRLWTpUvCYef09PcfQlvB08pg7a4XXn8U1CEXz0vr6UefFJHYY9oU/i6FHehasB3V4kkEMH4+BJvieIBlzJ26hoTzLYwXvqS0BDzw3F7FFktLswnO/n4ckhJbtvcmhO2HLp+WckcRrPkwejmIhkJcKuLWGtDVexKu9kpmTQxj+2lSBDu0Utgkr5yRzSA08ya8q2YxH0J6y4bCBEy/Q5m0lqFqOUvpkBfjHg1ajQ70sjOb5MrDRmfmFhDZyErhHIVb9ky5MhAbjFWlPsgpk8c9WtIzV1HPBFTofCW5K+MuKcsSnS7Io1q5SN/KKat/JfJqNbtIXl2i3LfpHRNFyTEasXmcng5D1z2B4UMtO9dxBUr9zq3M4+xsFEb3BPqlcxATgQsUTw6HKYxXt4Uh/h7dbmiWxJE64RzAoyeF8w+L6qKmvpbYDqFumBFVK/8a+lheFmXqd03dKqNXlGe9xYX+PgsUKligshNVWmYZSufYtRVorT3oPWrCk+AUpoM69E72Qh9fhO9GEA+1JJtRFZtrqq1PeaS0lLXiBVulss5samAduIK+knMac5EZvO5ZlWxWiSwYQppRv16XqUPCSPiCB75QXDxTkPTuqNsNh8yQCfVsm1mtolvsXEGbGwM97dyRrcEuWRMVw/zYZfgTBvSdm8TkxCAcGnZC9hyWM9IjuQiCYQOOdG7CMzoozcWfxUxgjapDHlL8aVk453qgi9/ExblQ4ZlEYBqXb65D33cOk5MTGHRoxFPcV4QzzyVMVNnp9/lryI5m6Y5I7XjUIKTFn4BBSMs59OjiuHlxDqF6AtkGpc0bxJb0qRKx+TGKO412tyQH+x6EZs9jriDw8jTbh4pyoaswql+B3LIXPrI1Bdp7C78dspNUm+0YyofXq/ZEWZXyNxXjmhg6gpa4H5dn7yMl3Wbrm6bGPIhqHBicYOH0wZCgZ6arrBXKLcOryFAlmmEfkvJFZes2A2HSs/mYdFuNzjNSabBD2w2dbmpM2dUJds6/HLEs83pU1OlqZbmtXNSQl5f2CIYkeenXb+DilCSvfU70HNBgM+DHsrw6FaByWwgj23oYveRAfVo0tPfAfQCILvhIykQmBJ9/g1Stt4wDVSTqD1DjNSyV1x6s+i/DI6uM6uprie0Ytpd1EsrKfyf6WBaVukXI6/M5UUlxoaik6kkmSE810LB2nWy1h1p07eFRjPfZsK+lCVotczQboGlqQluHC6ff6oVpww/P3UJtrEGt+iRDZ8dwXv6CgZKViVQe6utMFuFgRFhHWCSF+4F6K48aytnuDDlIF+CJ7IF9cELIe58hAf/ladm6zCQ22YI0mb0TbKucDDnNF4q6NTFoA5ZmMeVbkx7gVGJXOFGpuz6Es6TooydgaWtCU4sRjtNuWNlJ2j6plsRXEMcqbnpWoHMxQzeBM04DNsjQXZAUIXV/Af4NPbqHpXDabBh0W6FZDWBJULhl+MmY6ruHccLShqamFhgdp9FrzuLBnVCxcZUqe1P+0moVU4a141EBGcwFRVraYBukPGtWEVAdyHYyIR/8aTJm0ueypO7CF85SnRtCT0dRDpQFRH13sC49Vo4GkkVBLnRp5ILZxhr8PuoeaWSpaWgs/FYwrA1aaPPhNVYNrIBq+TdoCnG17DsEl6OV9GiV9Ehkxe9HnJy4gdMOGMnQN7VZcGK4G3oy7t775Y37mt9HWllDvgINlD8pX1S2HT1HqF+YRZydnE+o0nlGNis4hlqTBRYLu0zQindECmU5qtBpoSy9khOxjTLlooKCvAYPCQ2jXF6+CGtmGtDe44IpGyWnZbtxFnST9ex7Xq09+vBUsHT0kLzDWKCWJubzYVVjRZ+r+rnxpp5hqT60wXJiVOggrAaWRAdGdX0tsR1ldbq8/Heij+VQrVuEvD63dfTgCDkn2Xi8Lqctl4pReZNzrDHDZqQvYstkqVths1Up5UYbbBTXxoOozO5Wo3p9UtKAxrz8BQMlKxNWHvXUmeZmNJNdUYh/fRHBDenvZ0hZ251Ygp9Uxeo+DYexRci75cQgnK0bCATyKaW6J1S/or0TndYia34vlb4Vbkm3WowuDHTrsRVcpFaRU41d4UQ9fEgaaTDDVBydJNqpkmmKFTqTpSpDBpiUySU1/PsO9WOAPO68IsRXHwJ6Czrk45NGI/XcNyHUtbWH1IA2w1QyZdXRfxVXh7tUD2vWjIf0t4H+Xq/2ugo15g+hh0UZCIwGYLOsYVCBNEpicB6hkCqTW13FBvXOLNJUR552M/1qK4bVaumug0TAi2DWCmenotlXxab/vOztH+WIY035lyO3jlBkk/TMJI3kUOMaI40ymqFoWpss6KQH4qt5V0tGIgBvMAurs1PpyNQkh1QkTMZZA4NBbFhU6bwaHj6ksjTArAwI7dRCabLxsvLYWbmsYXU1C23HgRJ5tcNCvunqsmTQqXHsPW6gOnlT2fDQ7+/cXoXG3IueaspZkU34z0v6QNfg2Sn4VkpHDWQ0WtDrMgl6NB0GDrh7qtYJRoOiR9AIk1mojGJZPMP6Wl7+O9DHCuxUt3KpCMJUjBqDobqTG71WrJt0vT4yjfs5aqBH+2rK+NmwvT7VRT11ps0Ou34DwcVi13IlGMKW3gor6X1FGvbQP9IIkRoq2O5cPEaab0R7u/SFgA6O8au40qeUdnNrJVkk8JB0C9QRkwfTZDCSHUtgsz71/cKxC5yoBBsJpq429YjELwpodaVG3sDaSgVt+9kqRqYIGaSZTaVe25isgp963Uu9IlJnps3pJNKsl8J+uGNUxNNigrEZeHDnLpLSOHCOnED5kHBGDAT+MVkYp16HVwxE9rpwFNfk8VSa6ydiC9Tb0DrR21V+qiTvmLwuREK9M2VnheqmgfqPUq/maaGeu9efhrmXGq8dCFwxzdCjR9x/GbNCq6xC/nnkxv71i1hMm4X1O6Kekc5sldMx1ouT/lSQwn2vH2nBCVCTIXmj/zpGPCtosQ9IDkQdOp9JU+ehFZXaioQYEKiTrkSrK+/o1V0uef27jGCaGlht6Y90EGz3k6LSNHU50amJ48aItE5j04/z7PdbehxxdbA+RglqdFw5ndNnSCE4K5/S2E6jzUHpoD+aO+Fo3x5rLdgINKsMLGvq62sNKsq/Hn1UOpSnFGub6rGnRZvArtdHPFhpsWOglpcrmzYSrrffxcy4bL2VsYO6aJsIhaoUTiaEECVaf8C8LZ3lqVaf6qO+OtOCLocJW6EgVthHYVlJFiZHZ3VHU5DBBu7fXpFG2nKkQ+mKprWS7U5Sm8VgLlktGirW5wyFQ/97MFsoa+G6HGTvVlbv7HNUyf7HjA4tTBtzopMhN3XJ9VJTSs8wW7at1tGvSIME+246jole87aMNzTSj9ZbqJKsF0Y0doaKeKjiuQaPY336BsZevynekMh3XhrFQHB8ohfm7YEIWRRNEJvP76V/JTYXMTUdlD4UyWzcwkJYA/sZtmiy/AAtc0yGD7ciHZ7FRX8O2VKBJ+JUpZgspc87JovIDT/iJhfe7mhAOiB9XQf5aQZGk60frgg1WOEoUl1dKuQvGW9m7GWvYj+8MQfPhevQXDqB9gZq/MnRjQuNoxyp91jih2YjN+CPm+B6m5wAVRlijf4wSNwCTzaD8MxdxpT2LYw61Ot8jrqJ6XwdKYNODGh7WSbXqSxL2Um55PUvDt/5a3i4TV5ST1ZfjDx134+lbDM6Kf+GwAi8CTuGTusRvODFnVsr6DrRXqJianQ8P53D/m6Cpf9VRE55EIkmKyw2p5QFfFiCBpqtRfhDDgzaKrYyZREd8hbsocSqr6/VqCb/evRRqVug7oN3xCs5cvXY06JNEHiyiaBnDpentNUXfEvTRhVpsMB9MoKxaxcwnpYWlqdZakhPU0msPQzC7wviod6Jtw5VCUdB9fpUD/XVGZYdO6wLswhGeqBPBYSp4QFLIzZuSw+Ug8lgIIapuVmMhKXvJKSXFwtUs90tWrHgnwj/ViKBOCW8seL0fCOFQxK0UFkfKShNgcrOF4exK6bz9u/Xkx2IIKKwHyuIUC+vMLQsjJLEEX3INL/IGhvm1uhhIF0zsHDYmpcGaf5buhjC0oR9+2HAFlZXlLPwMd84ztaxKLxmPAxdF05fuop332a9tbfx7tWTMEu3BAz7oWervOINijCEUBTrKKqvzxJJY2lhEWmzC84qyz7yjkmbyUgmaRURpcCxEo1RTTPCVOJA1E3Mh4WoFk6X7SlH/fI0oEGWaVXyZ8jWCAhrCZxdaM0+wJLQpdTBaNQgvfwAitU7qWVE2GyISZz0E4nBtxCF1umC+nZYvoaDrUF4FYep17xB3W/W2KrSedLISIi+MJmVuiNnP9OjMmUpBqQcwdpRueT1rx0dJJLt8qI0kwE3dUhDAokAZm/EobH2occorZlj695abML0WvaBB55ti3fV6Hh5GjSlHo2EMOKzAYNzVJjyX/V5S2S9nZzQqubJIBYjRWiVykJ1fa1CVfnXo49K3Wpq0ijkpU63RBRrHFuMeFVUUkRre4RVaezox8S5Hhg3b2N6bATTQbZcmjl7Y5heiKHx8BAm1byZV6B6faqLeuqMQDvsNtKhgAc3ghtottkV02KVaGzvwfjMu3hbGLGjNuAtZ6ETXaS67W4wGOk3MawINitPCvdnzmL8lqQpiU2SgQatOtEGbkcHvUGDrdgKsvmyFi6mNY2q1feLyq5wopoOuYQFmt4L1xFZTyGVjCFwxYNwzoQel2ScdXa4DmiwOj+FheV1pFiP5u4MZpfSZCidwjwym0Y4APYWihROah3Lvis4P3IN94VuWgecTj02bk7heqQYxlyQwrCaVTcsteMpwkZGmprK7GXV1AUne4OIvRkopCWF9WUfrpwfwbXSQGqSRTZrgqu33FRJGdqOwGUmWXqnC7KMBa7AQz0ms+vItp5S3WSz0Nh7K44QqCGXTgsyEeQSmcOtKDUkVEbMTKiWP/XG82GwZyL++9TT1GO/1B61k94YtoKYvRJALEnPrEdwfeomNprt6O6SGySSr8aO3roylEM6nY87hWTsFhaF9SZ6oeGoqfO5DJIRL3wP98BsMSJTyIc4wpDLppBhfzQdgsvKyjKvR/myzMHU41KuUXmqcmmAxeWEnslr5i7W5PLSO+GyMM1LIODxY4N66v0l6zUYjTY3ek1ZRL3ebW+J1UYuTyrL67dIAwywmss1HBmEvDeERdrdXS3Y5+oTFlUvLKwIsqvEqm8GPqE+kD4tTAtTdYVpm2dRX2vIX70+VkeVPZWQ1zP23C1RSaHfkY4oaWyzoWf4AmauXsVbTuY+sFfur2Lmyij6S/aIWlk4i7NUPpWpXp/qop46I9F22A79RhTRLT3sh+uxkPlF7pX2M6xhu3WdcApvIl5BIJaktDLdnMWNVS1stn3IrK8g4AtgU2MGmYmKtDsc0LMR3rxuJdcQun4BIxelkxg4FanQTXveMKJv4gx0Hg/mL44U9jVxs3n2gmfTgPYTb2HAdw0LnotYyu/t4Z5AX3678oZ2nKBw2grh0DOtZjjP9CI/1axzDOEMqDc8fxEjLAytATb3KHo61PfN1cRTG5afCZxpK6aFAoHZeabimqZq6OsaJWlER3+JLHcih0poDqCn2pCYCraC0xjJz+jsaYaJ5OLONyRq5b/qxciI9Dexp9kA+8BJFGYQqGEcnmgU9k6ZGfMLesf2mzrD9uWRHhHR4ECPs+S7WmwhOD2CwqQU25el/TiGevJ92Bo6v+zFmEdc6RL1jpELUIJ3BFNpcS8ZYx/pkU6m00K9GKd6UVKWT1suOgeGz2ng8foxPXZTSHOruRtneg8JDVmCeur+DZLVQE/Zhojpna33OJZGbsDrXYax3P46FVHKc4/WROXtRjnfIsOcz1UNrEMuqcyMcLlMCHs9WOi6gjL+nYD5SBcy/imM5PeJ6j6H/kKlegb1tZb8VetjLdTYUxFFPROea8fxoR5VIy3PEubMVV4xxKhVn+pDdZ3JQ2XjMN2klsNRVueehuq2m9nqUbjn57AwMwY/SyvZum6ydYeo0i3PzcIfa0Vnv6t6mVHdHZ1oUeiW1mCDe5jqqqqe9xeX3bPZJofDKVJ2U8U8ZTZX5DwF0mablTZP5XzKrMM3ehEx+yRGVa+R4nA+G3bFdB6Hw+Fwvpjk1sJYaXTCzR0oznMIH4nicDicqvCRKA6HUx7uRHE4HA6Hw+HsAD6dx+FwOBwOh7MDuBPF4XA4HA6HswO4E8XhcDgcDoezA7gTxeFwOBwOh7MDdsfC8kQA42UOHWWbI9pedaOncLLl80sqMofzHqD3aj92xQs+lfYhyixjbuwaotrDeGv81fp3A35uSSAwfh7+codjobXCfkycT5NULADvQgCxzSyEvSu1elhc/UJ95/v/cTic54Fd5US19E6ieF7sJiKBedx8kIbJfQmDlXaS/TGSWg9h0R9EJLaB9JM9aD08hPFXn2JH6M+Ssk5Uhr4ew7VoC30/+jlzKiQnqkV+KHEedjRDpWMZOJ8GGdK/sWtRaA50o89hQWtjEg+DfiwEH6LFWf+hshwOh/NpsKum8xo0ssMR24w4dGKUnKonWL11B+vSM88LicAFjF1cwEqDBc7+M5h4+8rucaAqwI7L8Eaz0Dvdn99RGcWhxPmLO1CfLUks3Ykiq+/G8IlDMLZRGbTsg8V1Gm6rBhuBAGLSkxwOh/PjZFeNROnKbHaXCIzjvF+Hk/lpsswaAh4Pbq9uFc6W6u8/hLZCK5jB2l1yBvxRCEdgsTORevrRJ00JiuGVndOBmcVvuIsLIzeh7X0Xg7Z8oPlRDDfeHbSgIcWeCcNSY7Rmee4UqLNdAjuEU8zLtrwRmdAM3vSuimlhX5YZMcpEqBfvicF4coKeSYtp053E1YLwMgjNvAnvajGubZSGm7qPqZEbiBuOY3K4q3g4qPAc0O3WYGk+LMpUa8LRk+Ro7ZNGB8uOaskpPaZE/ByFHt2To8Wz7CTWfaO4GNxCa8VjTUrDY6zBN3oZwQYn3hovdzq8VIYKOZWQjAhnS0U2snjCzuayuTHQ0y47KLXClGCrMs5kZB5zCxFsZElDSf9s7gH0tEuhlJVVufxU0NVCXGXyuy3sGOZPTyOs68bE8CG0lIt7zYfRy0E0lJSNIi2ZCObGPIgZT2KCZCeUulxWZethdXKZFGlpI5pKjpBP3BrF+UUDBq6ekM4CSyLCzg2LbIDEiT3NJuq09ONQPiIhT8pKlp8WzNd5EbILAQ88t1exVSYcQdYhI3ptSfjpmTR7ptWKvsE+5IPZXl9FfQjZZLIqI+On14fy+iFHsDWJSrpfS5eqy0ZgW3kfhZud6SefIChTFoyCLWOU2G92pl9Pf1HG5cOQ2bEa6VBTjozMWgAez22sChkuU9cV6WRhmCmd/bAJwi1jByiMVqMDvaUyqWlTapWNRI18C+UPpW0r1dft+kuUtr1l9VFOOV1UoT+7mF2/sDyZSAMajWi4mfJOX4Y/YUDfuUlMnuuBLn4TF+dCVIwiicA0Lt9ch77vHCYnJzDo0Ignr6/ID7c0oXeSfp+/huxolu6gyQKrHliNRIrHYaZWECEdN9nMwojF+mIQ6U4HWgIXcHrwFE6dOoXB8XlEFIe5J7HJPpt6C/EM2QuxlCe3DK9vVfpQAXJ2ZtnBtNZ+Unp5bS2SW2YHsEofVEFynSUHSmOGe0DmQBWIwh9ogHOYydwN855V+C97EKr7JP5SNhBcLB1jXEEwtCX9rZ5EwAvyu3YOWwt2wYOoxoHBiUlMDNqApVlM+dakBxhJrJMeNNuHCmVaOjPIpqkuUPloHIOYYPonBDMFRTAqSTPd15rJgXWTwXSj26yV7jD2wdlzAJrNAPzL5Q9uTQQWEM624nAvOVDSd0qo3L1BVBdbCvdnSS6wkpMkOVCZEGbIqYpqXRgmGUyccUr1UFZnatDQ2FTiQOWo3bqLhaUt6J1HJQeKdQbG4Ilq4WK6N3EGTl0cNy/OIaKIqBn2IbE8JifPwS2cen8B87LhLMEu+BMwCHbhHHqkcBQ6vLkEf9yEk+OUpyEnDOkwPFd85K7unGepD09Pid0btguNdE3ZsA4WK2+pbkye64Mh4cfl6QBpUJGkaPCKccjtqgA59WMy+z0xCIcmCs+FOSwrbIm8PNnVK+qDynTULEfqOFy47Ee6g5XJJM65LVJdz9siqhdT8nQOwd4Yg3dqXjlCKrPtE0NH0BKntMzepxojocqm1KrnhNp8/5hQVbd2MbvYicohFfPBH85CY7YJp8Kn7i/Av6FH9/AJWNgUQJsNg24rNKsBLAnatAy/fwP67mGcsLShqakFRsdp9JqzeHAnVFRucoU08ukcrVY2ndMES6eBeVEFQ52KPqDm3gSbmT2VQjy+hfTSPG7l7Bigijp57iRsDRF4xmZkikM/Zr+XTR9ptdU98zW/jxorDf1XCcnZ0TsxXOkoejIVfh85WeR41iaL+EoEoQXx9H1zb++2U95FTOgZ7kGHIHMLToz20jerCIhC3zHa5mZshYLkNhXJRYLU8Esf1EKNus+fVpflCqz5vYKj4D7tgLGlCS1GFwa69dgKLpJW5ckJvdIG0pd8mWoURUqy9zIH143TDiNamP65BtCt3yJnsRiKWjJZEoTGgHaLBRa62g3KDDa098BlyiLq829v6AWZbEJj7cGrZXuU7BGqX+lq+sYM5CxuxPXkQPcJdZCRiUaxoSVZUaPQRjJo2XcIrk5qLqnOyMtSFawnTJ2QU6dex5uXbyJpOYPhfA83E0V0Q0viHIRNmvI75OqkJnYVEUVEDVS3xPJoampDR88RmJluxyX9pEZoQWEX2mAbdMOqKdFhrR0n+w9hn1D+DpweICdgK4gdFJ3Es9WHp6fE7jEnVoVsVvx+xJvJ1kl1Q7ABw93Qb/jhvV+0qjnR4BXjUNhViuquj+o2OVmjkv1uMcJxmuKimuf1yd0TeXmyS5xuV5uOWuW4Fl3BE0M33C5WJk1o6+iBgxzvrZVV0SlJxrCS1aKzp5jOVw+T9mfjyKuUgMy2C3XA0QrEVxGXbquzKbXruep8/zhQW7d2MbvKiYpeE0d1xOt1jEzfR44M0KjkMMRXHwJ6CzrkQyVGIwzYFJV77SEpcDNM+aFyiY7+q7gqn6KqQZOtU3ASIoIXlcNqlKqFuRMWwSJkkWWOEnNkTtiEitrU1kFORl9Zx6K5tUILVgo1Jt5gFlZnJ0r6IQUSAebsUIPmLj9kzxBGZLJWODsrhSInjZVFakgjLM0tMOjKj2wJhlFuDRtNMJOfuamwKJvwny+W3+BZ6m2vVO+KaCx2MjFhBAvDCincD6xSw2+lRlAtOSx7fVg1OHGkkl9ZkwQexsiQmciASd8wmgxGKosENktsga6lgvQTDyEGowgFBiOVRWLzU+g1NsLWexwGaiBulhjTtTu3saoxo7englCkUU+D80jBOdoG6aSHGciSNXKNtn5cutSnkBVKpuVUo7MLo1lslMlt348nS5cxFZAk1WhD/6VL6FNGpGiYt0Odr0gYMXINDQYp0dSwPYQeFqXhgLFUhzVaacRbYp8ZRmrPEqUKoJZnrA+b/vNF+zh4FlO+lcII/I6pKZsEYpQJjdEMxYrPJgtYXzO+mncZJJpbK9qmhw83AIMZJoWQ26lzqiH/JF5DHnWko0Y57nt1HJeGDynSuUf6v0BLF06T3vUUii2HdSYLcnTyKrWN3DpCbLrCYKL2iFGfTamMunw3sAwkN6GYDNkxddhytXVrF6PQjecdk/ztPIIN+RdtcwZpVo7kfY+d8otfydALQ8lJcgsalBVoJzRYYDN54WFTehYgssrm9YtzzQwtaYnCKWvQw0gdEb+gOMWa1qAqMeQ8eP1Im0+ix7iJC9K3RUSlZrludU5UmKsmqFfg9acprT0wbm4PZTutODrE5r4TCFw4D//UHFon+lFhllAGG1Wj/+WeSH1PBhuCH8ZhkgFzzh7emINndhraauvGGtthtwVxMXAfKcshNK0vIrjRTI6BGclwWHqoBrEFeKNaON/qQov/hvRlvWSQTNP/Hszi1APxGznrTLUqWlwZGaZ/LJhT2B7MumDgxGCK5SlHEF2BHLJMuLrKjZJAUxc5zH5M3xjBKekrFjZD330aHRU8jtgC9ZK1TrzV1YJyYhMabFHhMLGtAHNIRnzw3AohzhZBFKia0gqwNyNZTWoSFpa3YhQX/T5E7INCpyWXjMDnuYVQfEsYBcyjjKlUnnugtw9RXRI/ZUTDAf/YdpmT4ajS8GihIz2PpfNOfp08U32gGkZ5GhYrGNIPb2DOM4tp7dO9yahGNptbJAkmCAWSDSilosFLICmYRq3SbhJC2CW+2HbI8agnHQpKyzGF2N0b8N1ZEdapFSgVuGJ9Ftm3M2RXpU8C0WvkZEh/M7RmuAuddbU2pVY9V5dvYwc1nJ77uL1ipU4HpSBH7WVZvY3imiLRIsq41dtyNfpTfinB7mFXOVHi23nSh200Qsvqp+k4JqiRLc0Yc7iw3kLVZf3pe2dk2M02ppQR3A+BevRWDCh9KNJRuUmXsSffaiUQp45Jo4o5pmzkhjCH73q7Aw3pgPStHFGpzZEpTPvnEDCXc0yyiNzwI25y4W1qOcsGUxEdHEO9iL3pxbXpAN4arTzSJSKt92rZIxsVyA/Bs7+pQex/FZFTHkSiycpOFNF22A59MIjF9UMwBUPY0h/B4TZAlTuU2cCthTA09jNCHDufIGlECxmkZgs1UkdKLamsXRBGDzQwVGonGpn+NcNCZbU9GLlzLzdSjFV4R7wljfk6Nqjj3mytXhLMcfYvZdHcSWk3BDDiTVDYp0mmF+C9cwsrXSfQXuJIZTZuYSGsoUaBlXN5qQkNtjmCqWk/5gJmRUOdE15sSKPz5DAG2tvEjo7Q4Ij3a5PCWuQhsnoz2nXKxLXtp8IPUoMr6Je4oD3deRLDA+1oEyMSFrYqUcrzyWYQnrnLmJIcjEbRcOD4RC/M2w2H0OiV7zOLa+AaCi+Y1Mkz1Qf6BbWabOqI0WTpx6uRU2SiokhWq2A1qC2bJFqbyccRGks5eRsgfmIkRINXYXpYB2EAN5eVdbxEkkzINdGpTsd2lOW47iM7GtKhe2AcXfvEPcnEBenC7SLtbM0TS20a8TtkGy9Po3VyGF35NoqtiSruySM6GxeuQ3OJ1TmVNqVmPVeX7waLGwOxKczNjkDZ/aT6pICtWWPLMSQ2F6mOB6UPedTbcjV1a7fzudqx3LBfLwwfxhtYARcvhmBf9+2HAVtYXVFObcR84zgrW3yuhgZLJ8xkzG7eWIXGLB+SJaUmRcrGoqT+MjJxrFBFNRgpjQypwW3V1VKjGHwLUWidLtiKVrUEUamNPYNw6snrnypdiEnEfFhgIzIu285G4hptcJ80Q7Phx8y2Va9SbylPJoYYVfzWimPbRRo0Nfz4pi44TFsI3ZlDMJyFyaF+2jW9tIDFtBku59NuLaGD3qDBVmwFWZleNTUxpWosjoYm4tikZw3bbaKITg+DZguxlawsDLqEYOTTUKVrPjSyexJrYUTSWnSYq8k4/0IA9T57jGgS5lxZ2C2w9bpgyj6Ax7NcovdpLC0sIm12oZrYhAbb2INBpx4bfjLOMoVbYUOzrRbYOyQHisgIc9xq2aQ0eOAJbN/IYO0hq1ViHaOIqAa2wmLvkBwoIpMtU4+V8mwxvgq2hGUjFBWdI8N+6BHHarxBJnO62L1C4RLZtDLsNXF9i07tlHwpz1IfKtGgebqeck3Z6GA0apBefqBcd5daRoTNzpnEySumi2yKSkOyqlR/9zP7zdaaKoS8Ioz0awwGiqkaatNBVC3HBLUPW4CxE4ckB4qRSWalv4jYAkbPTuFukpwAQR5t6LBbSBOZnKRnGIrtUtpgcXahlerckrBeT6VNqVnP1ea7Ee0945h5921xsfvb7+ItZzlDVW09cHXK2nK1dWsX87lyopq6nDgA9jbHdUTWU0il1rHsu4LzI9dwX+i2dcDJjP7NKVyPrNP9JNbuzmAumIbBaq7TuehAp5X1qTQwK9Y00B2nE/qtIGbn7mItSelYX8bCtBcPqTFzUjcls76CgC+ATY0ZlooLTvJkkdXY0auqN8lGjE6ScxcVRowUvedsFhp7b9VRn1o0dvRjmOS3FZxVNJqsZ+yb8WGZyVzK6yr1Phyd8shySKdZmYjlErl+i1JpgNVcyyVqoEbSCkSjwoifXVx4poos5dnk6q04ZVUP7Q4H9KxXdiWAGCvT5BpC1y9g5OICYuRAJmMhLNyJAvoDqJyldjgceurcTeEKOQhJkkVyLYTrF0ZwcSEm9MDVkMus4daNJaRbrTjQkpdpShyez6WRTmWEsMQ1chpY+4uLvgswp5h6ydmoF15FWZK+ZU1w9XaoMp46xxDIt0b02jTyS5WEzsxmAD7K4zrJKcLqoPeheFMiF7uFqSmfILvtGAU5ZcNzGJ8PiXWIyXt+HNNB9naeU3wFWzDQm0Jdiq1TXY74cOU81TMhDDly3SOZU9yL5J9pDHqxYWZTngcoD+wtXcEupLC+zMIawTXRcIikg/BcF9OTXLuLmdkgtprtOKwYhaYOhRRPKkVlIRRJuhB3StHbeDb6kEcez3rkOm6ROjK7VquGVUWFbNqpPNi6u9l83ViP4PrUTWyQbLrZsExmHSsBHwKbzFZWNnhNh1zCgmNv3n4nYwhc8SCcM6HHVdNQ1k5HnqrlKDo3iN7BQmQNyfUY7jK9W2JzbxIGMwy5OPwe0l8WD9mzELPnZM/kvhobVSuUO7N5/vv0jB77pWdq2RS19Vx1vhls9Ic5MU/lwNRhy9XWrV3MU3VSnjsa2nFi4gzaPB7MXxwp7N/hPNOLLmlYkxn9M6Be7vxFjNADe7QG2Nyj6Km90GcbxnaqDVEtSnwoFgmGz2ng8foxPXZT2rfDiTNDDmHx3/KdWfhjrejsdykWFZZHgwM9TuWiwWo0dqB/+LCwt8fUXCsm+iVHRnMAPU89IiM1mvExXGONJpsDF74140hXBv6pkcI+Ud3n+ktGzrYQnB5BfmCYPeM84y4OfVej3Q5bcxjLHXYV8pKhd8JVefiuPqhMRydahL1YZsb8QplqDeSIDPfA2JBAYMGLEDkfx4cOVW20dI5RTLSwfYFmMOYXhAWDzY3hHqPKHl8CwanLWBRmOBZxeWRR+LZIENMjSZx8y4A7/g0q9oHC2p9SGm29OL40ghteL5aNxb1h9FVHPUtpREf/MA6zfXHya+YODWBgcxae29O46Cc5sT1rehsx7V0XXvDoIJXMJOKIx58gQf6bsYzARDktwHNrAZfHWE0mUbFjntwTcOU39Gk6hIGBTcx6bmP6ol/QqaPuXjSSEy8s9GURCSh1T9j3p/04hgorgxvQfmICZ9qKdoEMB8zOM+jNGw5GayeOtkVwbdwr7S/UiYEhV0ndZFNtI9LfEsFpjChmRIojAE+vD0W25PFQOCZKv1tVBauGCtlQQzk80aioG4K9Y/sUsfuxO5j1x0h8/XBVrcBG9JH91hXst7hPlHu8r8JbwSXUSkeeGuXY3jOE7vQcOUmXsURhtFr70H84gNnFODbovo61M6NuKZ4gxUNhsL2PSu3ZqhdyVWD6ax84Wdz3rpZNuaCinrM9ndTm+5lRjy1XWbd2MV/aFZttPpfkEJl5HQvaIVypuJ3AFwBprYtigzbOpwgZ1yqbgpbdMI/z1IhrYmwVN6vk7A52Tznyer5b+FxN531W5DLriAXmsLDaDJv9C+xAcTgcDofzBYY7UXWTRHD6IqZvb8DYexqu0pcbOJxPFR0c41crHk2jc4zjKu+dcji7HF7Pdwt8Oo/D4XA4HA5nB/CRKA6Hw+FwOJwdwJ0oDofD4XA4nB3AnSgOh8PhcDicHcCdKA6Hw+FwOJwd8IV3olKROZw+NfcU56o9h6zMU55OYSZS757HHA6Hw+Fw1PKFdKJS6yH4Zi7g7OApjHhWoD18+HP1quhKJAp20tNqMATlKYEcDofD4XCeFV+4LQ4SgQu44E+gxXwUjs79MBra0PI5OQhRRDzFPmc2Ix5N4sjkaPGYAQ6Hw+FwOM+M3eFESUeLdLs1WJoPF85nO3rSDcc+2aFKyYhwflBkI1s4P6i//xDa8j5S6i4ujIRhYWe+VdnzPxlhZ1lFsJFlETXDdNQNt2OfcEDx8twpXIuKz5ViPnkV/R2iE5NwvoXxCpEIYSScFY4ekLb7F85MktijQavRgV52FlKNM6RykRm87gF633UgdnYaG0cmMVriRSnzp4WhqxcDrnbZAcwZrAU88NxexRZ7RKOHpacfffkzyyRHTSEGCkdvcaG/z4LiiUgUzl0vvP6oWGYl4ZQ7uiBxi75bbICzUEa10pKXlwbWgSvoKzmbS5THKiucChvX5fOiR3cZh3PdN4qLwS20KspTnXxIYaFZmkdYVFjSo5MFPRIpCYedv9Xfj0MFha2MKDuFkkDTaoSjt6ROFEji7tQYbmYOk969KupdbgXXz85i1ejGRL9FTNe2OnQU7hK92x430Vqiz5k1BDwe3F7dKl8XFZSpM5kI5sY8iBlPUto6aqdNsBEVK6ZU9s+i3MqktQRF/SYZz5OMo3IZJwK4cN6P3GEK41VlGCvzpzG7asOZS7Iz+YS8rcN+7oK4uS/JYcHjQyie3iaH2vaJ/qhhJ8seKUJpZudx6vJhMErKmJ1z19Pfh6I4t5fJHi3J3CWXOaOMzWOU6JTcbrGys7kH0NMuVVghrgTZjXGZbS+nVzXSvI3y5b3dhm/XLUX6BGrls9xRLxmEZt6Ed9UslodQDiHYquazXJrX4Bu9jGBDHTLlqGIXTedF4Q9Q4zo8iclzbpj3rMJ/2YNQ/gD6TAgzZHSjWheGJycxccYJXfwmLs5FCqehry8Gke50oCVwAacHT+HUqVMYHJ9HRHaYdOr+FMY8UWgcg5igcM71GZDwX8a0dER9ey/FT99PTg7B3gw024ekz5Poret03BqYegvhTgwdQUvcj8uz92tMz+UQCZHDYLLA0mCExazBxlKYqmaRHBmbCyX5SwVnMXu/GHJsfgyX/QkY+s5R/BMYdGiEU7jnFKf9K/N+zm0Gwh5cmI9Jd5ndncblm+vQl4RzfaXCWq3YPKYWN2E4PlAwEGrTAmQRDhbLWiSF+wGShyo2EFxcl/7Os4JgaEv6u4jaNEX9ATQ4h+mZc3Cb92CV9MhTUFhJPoVwzqFHF8fNi3NFna6JCb2S/CcnhnCkJU51YhayopTRgkO9TuHUeK/0wJp/AQ+yJrh6pcY9dR9TrA5pHBicoDDP9cGQIL2bDih0KJ1IA1oz+RrUuaCr26yV7uShxmD6MvwJA/rOsXB6pLoYoiZBDVRus5QOWKlxlxyoWmlrL9aXIbFiYigvG6liPqtyq4uGdvS42TH2C/AJVYMaRZ9fOGG/t8SBYrRbzNCkI3iwJn1BrETph80dsDIHKkMN5AUPInvsZeVQ0z6psJPqiGF+TFbGE4NwaKLwXJiDUpzNsA/l08TkyczEBcjMBJHEOjkWirSapFsSGYXdorKzAUuzU/DJ5FQbtWmunzXfBdKtNDoGJ8R8WqT0KUxK7XyWklv2wqfWhFUhEfCC+oIKno1MObvIiTKhZ7gHHW1NaGqz4MRoL32zisCSaN4z0Sg2tFa4SRPamprQsu8QXJ1kRVYj1BQyUojHt5CmHuatnB0D46TE507C1hCBZ2xGarhW4PfHSckHcNphRAuF02Y5geFuPTb8XqFxamik+On7piYttNRza9Bqpc9NeKazgg2aQrhCXhytQHwVcel2WVIhLFGFM5hNwgnwgkHevI8lWUWOrcbRsN+JvkL+nOgSgpZCTt2FL5wlH24UJyxtFH8LjI7TcFupHfD6yAwVkee9raMHR8hAZuNxqcFdJlluQN89rAin15zFgztl1mqxxmEuLIwaDOSPA68jLWhuRvNqQOlArC8iyI5dV4GWfr8VCkq6IpKLBEHRK6kjTaaeYfR0sGfaYDkxKhjM1cCSKB9yChYU8mmDbdANq6ao07VpgEaSf1PLPhxyOdBKGpIvym3oHHAfpif8N7CcuI+bZFUNx3thE4dYsOL3I06N+8BpB4wtFCarZ8Pd0G/4C44XI5MloWgMpF/krNPVbtBId0RS9xfg39Cje/gELEJ9tWGQBKSh8lGTtURgFjfieuow9SF/MmXNtDU0inKgSytWTGjzsmEV81mV2w5oaO9BD3MeFsjRifmoUdTA2icbaZLTboNZk0ak4EXFEIlmyYeygvlQiSW/4Fy65XIYdKJ1I4AAZaKWfaptJ9WRuuujukFO/KhUxi1GOE6T/lLqvKK3KNFA5ZFPUxs6eo7ATB2eeFwuzRye0L/ytGqYASuwBr83Cljdkl2msnMNoFu/RR0f9a8EqU9zvawhuvIEhm43XMYWKZ8OyucWVlbryWcplG8f5VujrF91Q46zjxw8ZTDPRqacXeVEUYMhV7hGE8wGYFOqjI22fly61AfFYJDCq8kiyxwlvRPDJ2zYJxigDnLM+orOWCKGWFYDo1lp3posnTBUa5zKsOk/L4x0CdfgWUz5VlT2wsuQW0coQl0Yg4nSUZlUZIlSaYDVLDkh7WZqhLYQCRe7Fu09l3DpdFdhyi2XiiOeZkFLIT98iA0Kw2ySWlaJdhs5ZFl6tkJLkktFECY7pDEYxKHitYeUlmaYSoaGO/qv4upwF5TfZrDs9ZIpOwC3Wxp5YNSTljY77HrlaNJKMIQtvRVWchJrobHYyZiGESy80SiOYmmsVjKGMupIU4NSYWESFVZsjMkhfgg9LB1ySRhhlOl0feSwHopgk9KWL8py6F7thZ1639fO30Cc6kJv3mGlVMViWWiMZmXj3mRBJ4VXcLJVEF99SPXMAmXWjJSyzYr6UyARgIc5l063bLriGaTtWZWbRH31uxGWXhdMm36cn6aOwgE3eiqeW25Ep02LdOQBNXPEWhSr2VZ0dTIXKod4jOyAsV1p58g5Hr96BX0qzkKvbSfV8fAh9U4MZijF2Q6bWSPrSJWSIxsVJrdQA4Nh+yicrmX7dwKJh2SX2QC7PNVNMBi1dG+zQlzb2Vma1bAPr45fwvAhefr3SP/fTsV8liCMHmWtcHbKRnqpqBqoHq3LZk+qkyPb6sOqwYkjcv14RjLl7Oq381iPk/6Xe0JqwsghGVnA1OhgwbhtW7dBaKmVUjTgDXoYqZEVGi5Sni1ooSudnWC9OulPtSimuqQps/yUoCqi14pG+vWLWEybycEodT7kpMhZYkaCGv3CQx3kUAHp0JJy1IaqSGBcDPv1ES9W9L04KTWmiSRLI+vFCx+LaHXbZCBvSF4f8WClxY6BfOuQTiJN1V3ZZJWDGvRTb+JaNIcDvWTcZfa8nrSw6aouh6k4mpSLIMhGHhydhfn/qjS2w25rxmpAmjIVRrGaYbMrXKg606SkSVRYPCGFzaRZk7sB/5hUxsL1Orxs6D65CXU2ksmu+NuLi2mY3W4U/KKy7MNhh+hlmRx2mWwS2Nxi2SjNhVTPCuSQZRVO11pBrhmIWfNjrJA2ul73UleFZa1yzgR9Ou/HRqsT/UUPilCbtso8q3LLU3f9brTB0cmGAprR6WhnbWFF9lktaJam9NYeRJButcEsiIPqlCC+yg10bdTZSaVu0UXlUnwqAVGc2m32aHsZbcJ/Ph/O68Lb0C32gfJOZKVsZZgtAR7MytJD1+Ugfbu5Lqsr8rjYJV+3WU+at6Nwmunatu4sFcPdueIyEWXcJagpvtR9eP1Un3t7YJQb0RYTjM0kizt3kZT0MZfJUqlWILYAb1QLZ2+x4yygWqacWjxNbfwxk4Rgj1v2CAYpF5nDmCeNzpPDGGhvEztXwmJD9myRXIYNqJZhD/2AGoZmxMVGQI7UqFVce1iG/JAto8nSj1cjp+CJRJFUNA5VYGuiChPmaTy8MQfPhevQXDqhcDQKFKaubmDk1A3hqyJRhMizoA6shA724UlYqeY9YYtUZ704P9+CK9SVFXtJUkMpjye5LjOiIqwhGT4sDfM82UTQM4fLU1q8NeogR7SFGqd1FaNvbF1PD3LeMdzwemAx9qNDMhr1pIXRwEaTFmYRjPRAnwpgVWPFgKURG7elB2rQdtgOfTCIxfVDMAmjWEdwuI1JtEi9aZIjOhAtgqo1alkmTTg+0QtzaS1kU1PSn9VhsmPT2iLphzcwx9acaS7hRFklIXIr8Pnj0Gg0WL3lx5olP62kQysZ5/h25ZfqmfiJFA0bpGfN1kp63Agxa8cx0WveZmDYdFMlBH0yRzA17cdcwIzRQl1Rm7bKPKtyy1N3/U4E4FtiMzNbWPSH4Bi0Ve5gtFnR0RxE5MF9smFp6O1WyWGlOiXktYINU4FaO1mqW9hcpHIJSh90EMUpNt5KcW6zErAPDaNoJoLwzF3GlPatYvkKIx8aGCoJpJHZkmZYKJwj20aV5R01ZVwgt91LnURWevWleTsKW0esekfgFQMm1uGbmkZI142B8S7sa2Ghi4vEQ+IDIrXyWSCLyA0/4iYX3u5oQDogfS3QBtfgcaxP38DY6zel70S2iSazgVsLYWjsZ4RRXcUknWqZcmqxi0aiJAOYJxNDjIx5qzQsvBKhfm6rBfYOyTAQGWH+Lg8ZYno0G4uSysvIxLFCdchg1NMjRhg1aSzLV3USqeWIMBVQbZpEFQ0a9V6rbE2UsDbD2YXW7AMsVVi4sB5exhb2o5stNpV6yOJ1Egc0WYSXWBVK4v7MWZydXymsnWBrIjqpV1gYzt6/H3oyPpGIssES5KsxQD4KL5/bZ+sLXj1MAW2EEGUB7dtPEtvC6opy9VPMN46zigXGbF1PC7rcJ2FmvV/5IuY60iKSH03y4AZ5lM02u3LaohZNXXCYthC6MyeNYpUZ+asjTTmlwiImKqzYIBpYOGyKuKEoQ3axe6qnV2RrougS17dl8aCSkhCxBQ8esAXbb7lg2grCeysvbR2MRg3Sy9I0Up7UMiJsgDOv/GthRNJadIhDI2Ux7Ke6xNbvNcjyRRejWtYEfTL2YNDJ1iBOyRZ8q0xbNZ5VuVWjYv1O4b7Xjw2DE6MDdjSv+uAtSYeSNnR2tSIdvIHglh5WS14LG8hOUYsXW1GuX0rdx8zZcdxSmq2y1LaTeZS6xUbj5EW3n5XxagTKbKxAFKdcVvI1UWRvjK9CNBPRYj1PxMmR1cGwrTGX0OlhIOcztpItpoddLEGNjbJ0KeNqatLsMM3bUdg6uhQzvolVrGxRJ7XzkORAMTJIlq6nrJXPPDEfFtjokauCo63rwulLV/Hu28y+v413rzLbuZ300oIwg+Fylll9p1qmnFrsIidqFb4ZH5bXU0itL2Nhmk0PmODoFFVfMNyb1NsLxLCeXEPEdwXnvQ+Fe3k6nE7oqeGYnbuLtWQxnIcaK5zCHEg7nE5q+oOzuELhJFMprEeuY+omNcj27hrTJEpy6TRS9Ht2sTBuRSmNVrPKEQaCekz536dS64j471MF1GN/2fZiDeEI1WJTF7rYWi95pWjqgIMcC0SXEMm1UGOkRTrsxVxoXQg7SRX2DqWtYESaDsFl1VBP6wKuR9gzScQCV+AJ52DqcRUW+jLkeUwlY7i1KCyKgl4IqINkSY3hzalCOGt3ZzAXTAty2GYcGjvQP0zls+HH1Nyy6GTVkZY8wmjSRhRRanzsbBipLhpgoV4/olFhFMtuKWNK6kjTqm8GvmX2zDqWF6aFqbrC9CI5bE720hYbORLCIT1Z9uHK+RFcuy92cVcWzuLsQmWHiEoA2bz82e8jftynDoG+vJKQmvgwz5xDF6WzyYbe4wZsLnqQn4Vqp/phYPXjSgAxoX5EcH3qpvAmWTcpfy6zhls3lpButeJASzHedJqcjlwa6VRG6OU3dTlxgBxiNnIaYfWV5Z/Vx5FrkLJWFZ1jCCepVYhem1adtpo8q3KTqKd+Z0Je3Ig3w97dRZ0WF/qYii0soNJLqgydtZNqO6G3ouBDEbpOJzWYYXgKciAbNnsDq1obbGXaylLU2Ek1NB1yCS9BePNlTPU/cMWDcM6EHpfCSpB+iHJiVzJ2C6KZ0AvyTMZCWGAGSH9AtgyhlHY4HHrS1amCXU6uhXD9wgguLsQEnVOD+jTXieCQUJneWUBkLYn12F3Mj09jic2XSajLp0Q2C429V7YmsDxiR7iyw5OlcEyuXnSUfeDZyJQDfHmckP5+fklEcOeBDs5XgcXffw///g8f4M/JgfrHb/aj66e+LDyyd58ZhvR/QzC4iP/04Uf4ruZ/h/sf/g2Eo+tosRzCz32FHvrKV2EzaxEPfwv/wf8BFpei+KH+Gxj4l/8EX5UUbe/P/gpsugTCfj/8Hyxi6Ts/guEbA/itb+wrUdYf4rv3/hAbbQdx8Kss8DwJRO48wKN4GB9++KFwLX3nLymM19F/6KeFMBKRO3jww5dx8OBXIf+liBjux4+ihd9/+OESvpPT4aD7mzjatld6TsbKf4BnKQnLP/0NfO1F6TsZTdothJY+wuO/7cChrq/D1PBd3Pt//h2+tfghgpEEtF/vw+m+ny84Ni0dnfTMQwR97JkgIt9rxNf6/iX+ecGab8/jh8EI/vwrPwdXfx9+qUksk6981aII56ONr+B/+/Xfwm98TQznh9+9hz/8+CuwHLWIDRSVj0W3geAf3EG0wYIukmvttEjy+ooFRy0Uyl7qYcf/AN/+Wy70d/1tfLn0/jbEvPzwZakcX2wR1pClfqkXx4RF8SX3CbXy0YkKi/f+/R/iwZ9TQ/yP36Q0/RSlifFlvPg1eTikJ9EM2r7xTfzmr/4dQU/+/D//O/zRj36xbLpF2T1CtKAjTM9y0B1045tH27BdSxK49bvv4b+9eBxvHvuqcH/vz/40sqEP8Ad/okXnr/ws9u79WfyKTYdEmHRfqB/fwY8MVD9+6xvY15DAhxcu4s736Yd/+V38kSzecJy63Nk4wh9u4mdYWX75RXyt04SGh0H4/t23sEj6G8204Rvf/E386t8pZ9FLZdwAncWMXORbuBPcgL6TwvzJamkTQ8kjyGajbVv9ejblJj6jun5nIvDMLiJt6cfpXxXnHVuoIxO/8wGC/58Rjo4Kc5F7G5AkPfxRZy/+wT5ZaTboYCF9KMohSnL4x/hm/z8o2YOrvH1SYye31UvGD8lm/OHH+IrlKNVR9kULOuRlTPX/e41fQ9+//OdFp0+w24/I3hZ1JRj5c3zl59h+cr+Epi8nsDTzLoJ/acI//eYx/D1ZYZXayK98tUthl4MfxbH3a7+OwX/282IZC3H9EC8fPIhidkv1SkWat1EahogyfS+i3aTB90IfYvEu6UMkCf3/0QfTX3yEP/7RV6n+/oTKfEq26q8OwD14CC+KCle+PBSUplH8vKl34ps9P1eoA3XLlKOKL+2mzTYVm79xOM8t4mZ3pLDFjQnrZh2+0YuI2bdvlvrjodxGgEUS5TZo3HU8i3J7Rqz7MHoxDsfkcF0j4BwO57NlF7+dx+F8fsmthbHS6ISbn9nzxSKXQXItggVvEFsmO2y8+Dmc5xruRHE4zyEN+1wYZ285Sp9//OjgGL9a4egcto5pHFf5SPHTE1vAGDuJocGOM25LyRICDofzvLE7pvM4HA6Hw+FwnjP4SBSHw+FwOBzODuBOFIfD4XA4HM4O4E4Uh8PhcDgczg7gThSHw+FwOBzODuBOFOfHD9sH7OwCYmyb3NR9XDk1XtipmsPhcDic5xX+dh7nOSCJyPwM5sObeLJHA0PXAAZc+/ghmBwOh8N5ruFOFIfD4XA4HM4O2DVOVDIyj7mFCDayT4A9Whi6ejHgapeNVrDRjDksRDYgPNJsgrO/H4ekA6XEYyk2hb9LMcuPeUhGMD+3gMhGFk+wB80mJ/r7DynOpcqs3YXX60d0k0Wkgd7Sg/4+C4qnYGWwFvDAc3sVW8Ijelh6+tFnyT8hHi8RlT4JUJ70FnamlDwcOWV+k6fVibfG2caM4tEcIWMvbEk/bq+mhTy0WvswWBKuXJ4sfTb3AHqEs+IkSA4LHh9CcTGMZtNRuN0O7BMEXv4IkLJHf2yTpzyc8r/JhGbwpndVWS5yhGOAlJLYoyUZu+QyJjJrCHg8JIctIW6N3oKe/j7IH6kk12Lc4v2E8y2MVzgRdHnuFK4l8mWwHdW6pya9ZfJOoVQ5biWfPz26J0dRugH6um8UF4NbpEKy/NVMhxgmut3QLM0jLNQDLUxHT8LtkI0g1q1DCdyi7xYbSJZso1Ehrwk43xovHsa65sPo5SAaCundQf7KULaMCvWqvJ7Slxg/74eurjJ8NunlcDjPB7tiTVSOjOkFTxQaxyAmJidxrs+AVHAWs/dT0hMZhGbG4Ilq4RqexOTEGTh1cdy8OIeI4jhqE3rp95P5a8iOZumOQCaEmTEPoloXhun+xBkndPGbuDgXKZ5qTYZz+vJNrOv7cI49M+iAJurBhesrhWdi82O47E/A0HeO4pnAoEMjnNY/t5yRnhBptg8V0nLObQbCFM58TLpbHvlv2NVrkm7I2FzyI246iXGKe8hpQJrCveJbk+5SNhXypPTZgKXZKRQeyZChv+BBZI8dgxMUz7k+GBJ+XJ4OUDNXB6n7mGLy1DjUh5Nbhte3Kn2oRjPsQ3k5nIMovgsoii+G+bHL8CcM6DtHz0wMwqGJwnNhDopiSKXBDls3dLqpgWdXJwzinWdMDd1Tmd5UWkgtOoW00tWpNrUbCC6uS3/nWUEwtCX9nUel3IioP0DOzLAk/z1Y9V+GJyQ9tAMdis1PYXHTgOMDlXZqJ8eLHYcifVKiNn/lSSdIrloz+YWiXLvNWulOPaiX3dOml8PhPB/sCicqthpHw34n+hxGtDQ1oc3iRFcrEKfvBTJRRDe0sLoHYWtrQlPLPhxydVIjtYrIiviISAM09Pum/KXVKo5VyESj2NBa4Savoo3ut+w7BFcnNXWrETJvIst+Pzb03Rg+YRGfMTpwuteM7IM7CDGfLnUXvnAWpt5RnLC0UTwtMDpOw22lRsfrIzNbpIHiz6elraMHR8gRyMbjVR0V+W/YpSlzLoTWfhL9h/aRrMS4B+zN2AouUh+YsQa/NwoSFk4L8qRnXAPo1m+RURefSJATFgXJ4bQDxhaKp82CE4NOtG4EEKju4ylYIVnFm+0YkIcz3A39hh/eggOsZM3vo7g19F8tGqDV5uXQho6eI6BSQDwuSi9114dwlhyX0ROwCDphhOO0m3IVJSdNlolsllxwkpnJAouFXSbspPmsTXXdU5vebFZILUxCWukyqUuttpl0IBQs6DEjFwlSnNIHCdVyI0w9w+jpYDreBsuJUcGhXw0sCfpbrw4xx34uzEbmBioeuJsJ+eBPl9cNtfmrRIb0ABoD2iW5thtqa2Ap9cjuadPL4XCeD3aFE9XecwmXTncVpqNyqTji1HE0mKReeKMN/Zcuoa9d/CjSqGik1NBo68elS31QBiMPZQ0PyW9rNrVDYec7+nH1qnTa+sOH1Mc0wGwqTjQy2m1maLKU7goeUi4VQZjsrMZgqNALV49Gq4x7n9lIDU8Cm0Lr9hAxMtQmizyXTTAYqTFObNJTOcRjm4CxXSkHnQPjV6+gzyh9rkkCMYpIYzRjn/SNQJMFbPCk4ADLSQTgDWZhdXbW6cjkkIqEyUHVwGAQpffw4QYpiBnKYmiHzayp6aiWY9N/HqdOnRKvwbOY8q0Iztez4lmntxSNxU6NeRjBwtBsCvcDq9BYreR8FqknHQ0KD74RJjMV7CZ7pk4dyizDyxz7A264O5S6W0AaoTQ4j6CcCqrN36dJPbJ7HtLL4XCenl20xQFbQyE2Yq+PeLGi78VJWZc1x9ZfTI1iMN/Qnfej/CqUauSQjCxganSw0GAq10mkkSTnraGCnWckksxUaqEt7U1rddscA3nD/PqIBystdgz0qPZS1CPEnUOa2etMUpi+ejAryUm6Lgfp2811JOm/dJL9aA/7pzrRa4owlLIip22LRV2a6yZoy3pI1Ih4/Uibe9FjrCLgApvwn8/H/TpGPCtosQ/Qb9m9BMRi0CqdXWJbejJpZNEKyfeqiGLqVZpOnn5m+zCoT28mTR5w6w4c7cZ22G3NWA3cJ0kT64sIbjTDZpc32XXIrQxsdI3VoSe5OnXozWuI5g6gl3pBlTo+sQUvolonersUC9qKqMpfJXLIsrqha60h1yiuyfRdaWPqlN1TpZfD4Twv7CInSgc7W+9EjdjEmW4YN7w4n18Ak4tgbsyDuN6F4bffxdWrV+k6WXePLheZw5gnDr1rGG+/y8Kg66Q8FC1ayB7mqgxB6FqYGZaMspzk+janTrG+aWII9oYQLk/Vue5IDULcDdCyFqqxhXLRjM7CeiL51UO9fLovtFNP2D/VMfUqfj9kl6/y0aGVPmbTpcJKYlNoYJVkIzfgj5vg6u1QOYIoXxNFOjFkR0PoMqYEx0YHsRiyVBJKkuvKUshtJsiplJ6vgmLq1dKPV0ktNiJRys2zQG16c9hka3d0LfSL+mk7bId+Iwi2FGclGMKW3o7DbdJNAfVyK0dSKNgG7GmoU4cmjsP05AG8nuWyo3uZjVtYCGtg7620Vkqkdv4qsY6NDdKo1lpSrbaurX7Z7Ty9HA7neWEXOFFJ3J85i7PzK2hoFBsxtlap0yhbP7QSwSpaYbF3oC0//ZYR17rUw0pklXr5Ftg72gqzeBlhDUqefdhvALZWV8TeY56YD+Nn5yCsqd2/H3q2FiuijF0IW2NQjHgo1je1GPHqYcrURgjRp/SiSh2XNWHqjJwaFrdOD4NmC7GVbDFudgkOFpsCbYDB2Ep5WlGs12CLxGfOjuNWcX06m89RhKEVvLQ8OhiNGqSXH0D+E6SWEWGzHvmpWIEYfAtRaJ0u2NQMQgnI10SxtWmvQhRfVNCJ/fv1wlo2ZTGsQCyG/EhOBpEQfWEy72wKhfKvYqxFFarSm4lATO4ORyuauuAwbSF0Zw5Btm7P0bVt1ESd3ERyip5CBrEYFawwSlanDrV0wc06K9FrZUb30lhaWETa7IJTMS9cBhX5K8taGJG0Fh1mee7KUX1dWz2yE9hpejkcznPDLnCiWqgx1iId9mIutI5UKoUkOS13ojLDZGCOyyYCvgBi60msRXy4ct6Lh8Lv1WNgRnAzAF8ghvXkGiK+KzjvVYbS4XRS7/Empq5HsM7SsnYXM3NBpA1WmJkD0HQILqsGq94LuB5h6U0iFrgCTzgHU49LsZ4jl04L+RGuZAy3FoVFUdDXsuU1SAc9uB5aQ5LiXrs7g9ngFprth6VXs9vhcJC0FqdwhfKZFPIQwvULI7i4EBN60bpOJzkVYXiukDyTlLb1ZSzM3sCq1gZbrYZMRjvJyrAVxGwhnAiuT93ERrMd3YrVw1lkNXb01vVKdw7ptCQ7lofYLYji0ws60XTIBatmFd4L1xFZF+UbuOJBOGdCj4tKIZdBMuKF7+EemC1GZPLlkBJHEnLZFDIyH0FeVuuR67hF+mewmp9Zo1crvblMEhGvDw/3mGExZgppSQmOTA7ZVGbbCMh2Gqijwd5wiGJVY4XdIncBRGrKTcaqbwa+Zabj61hemIaXOXiOTkH+9epQY0c/hp16bPinSt5iJd3Iqh2hrJ2/UnKZNdy6sYR0qxUHWiSZ0pVmc9+5NNKq5CpSj+xEVKQ3EcHc1AzuP2XHisPhfDrsiuk8nWMIZ8jAri9cxMjICMZmQsLbZaP5FarkuAwMdKIlfhvTF8cw7Uug3d0rjC6sV1rJXYamQwMY6GxB/PY0Lo5Nw5doh7tXCKW4IFznwJCw9cE8LrK0TC8ia6G09HcU9scx9k1QenWIz7P0jmEmkIXZPY5Bi3KYZSs4LeRHuMZmsJQz4vhQj3Ix7g5o7TyKtsg1jFPcl2/GoO0cwLCr2HLpHKOYcJuRDcxgTMiDH1vtbgyTPAUz3tiB/lE3zNkAZsYobRc9iLV048xQ9emUbVBPe3hCHs484jonzoy6lIvNocGBHmfJd7XYQnBakh3Lw8wScsbjGOrJS8+IPmmri/mLonwDWTPc44MQimHFizFPlJroJ4h6x4rlMOIF+QLkBI9gKljUHXlZXZx/CJ3zDAYqvUa2I6qnd4XS6IlmgSdReJks8+llngul2DsyBVlyK9Nuh60ZaLbZK+hZDbnJMB/pQoacnpGRi7gWSsPUfQ79+aHEHegQq+dsq4rotWnFsT/6ekYoa+ZPTgLBqctY3KA/NxdxOS9Tuqap40GFjmm2/lJ8WAXqZVegVnozMcTi4os0HA7n+WPXbLbJUYO02aaNb9RXk3IbORYQN0SstsHmZ03VDT2r5uXTQJQPKm2Gumsov2lsnrIbbHI4HI6MXbSwnMPhcDgcDuf5gY9Efa7gI1Gcz4LPy0gUh8PhPB3cieJwOBwOh8PZAXw6j8PhcDgcDmcHcCeKw+FwOBwOZwdwJ4rD4XA4HA5nB3AnisPhcDgcDmcHcCeKw+FwOBwOZwdwJ4rD4XA4HA5nB3AnisPhcDgcDmcHcCeKw+FwOBwOZwdwJ4rD4XA4HA5nB3AnisPhcDgcDmcHcCeKw+FwOBwOZwdwJ4rD4XA4HA5nB3AnisPhcDgcDmcHcCeKw+FwOBwOZwdwJ4rD4XA4HA5nB3AnisPhcDgcDmcHPAMnKoH3nV/Cl760/ZoMS488hzz+2I/J1w7iZR1Lqw4H55alOxwOh8PhcDi1eTYjUdYb+P5f/zX+WnZ9/8avSTefPx75X4P1jY9hHf8AHydYehO4198h3eX8+PlfePxfP8LJX/sAX/kZun75Q/yW78/wiXQ3z+Z/CIr35deJZWxK9wVSa/i904swCeEs4uS/eYTH0i2Rx/jo3yzB+cvi77/2z/4zbv5pVrqXjyOEj6TPHA6Hw+Hk+eJN531yD3PvHcQHH4zg4Et7pS85zxOfkAP1D52Psddtwne/88tYeftv4ntvruLsvbT0hMjmXzwhB/4ncePfGvAHdN04tUe6I/HJGt7ujeHm33gR70d+Gd/9Vz+FT6Y/xmu+70sPZPHR738Euw/49X/1dWx85xfxu7Yshv9pCN/6gfQIh8PhcDgV+AydqMf4+P038MrLL+Og9WW8fGwS/o+VYwvhye1Tgl9yvo+EdB+J9/HGG5N44xUrrAcpjFfewPslYSBxD+8co3vWg3j55VfQPxdWjDw8vvc+8FoHwm+8Ais9Y33pJbzSP4ew/CGKx1k6F0nfTb5fSAnxGOF3jlEcVhykPL3yxvsoTconH1N6X6G0HLTSc8fwjiKS7YjPs7yJz88tF58PT3ZgMlw6FvMI773ihCJZVfJfVb7hSbw2+Q6OWSk/Qvm8o5QJwpgslcnyO7Dmf89kVho2XYWfPA4r0vXG+x9vG1nKE1v9S7zwf/4dnPvGz6C1SYuftf09/PphwLP636UnRD750V8B2r+Jr9P9Trq+3q5U5z+5+ad460fN+N3f6cAvvKhFa/vX8LsXNfhw8pE4svSDP8GVSeDSxV9Gd3szXmhqRec3v4apX/yfuPitPxPC4HA4HA6nEp+RE/UJlidfwzt73yDH6WPcC3+Mj+eceDzZj/cfSY8I/A5CimnBEH2j5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17.01.2022 17:34:50: тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост тестовый пост
31.01.2022 12:38:35: аываыа
07.02.2022 17:05:39: <br><a href="/upload/grain.blog/046/04691400f032b6568e7068635b1b5ed0.mp4" data-file-id="147" download="video_2022-02-07_20-04-16.mp4">Загрузить «video_2022-02-07_20-04-16.mp4»</a><br>
07.02.2022 17:06:36: <br><a href="/upload/grain.blog/8f2/8f261a11894f4894afe29bfe83f4e3a2.mp4" data-file-id="148" download="video_2020-10-28_12-40-53.mp4">Загрузить «video_2020-10-28_12-40-53.mp4»</a><br>
07.02.2022 17:10:53: <br><a href="/upload/grain.blog/9da/9dae98443e74a4f4ce5b2f66ad7648d7.mp4" data-file-id="149" download="video_2022-02-07_20-04-16.mp4">Загрузить «video_2022-02-07_20-04-16.mp4»</a><br>
15.02.2022 09:04:17: <br><img src="/upload/grain.blog/5cb/5cbb18e717723b72fb8edcbc4c32b73c.jpg" data-file-id="150" alt="pexels-beyza-efe-8549835.jpg"><br>
16.02.2022 11:08:34: https://liquipedia.net/valorant/Main_Page
16.02.2022 11:08:54: <a href="https://liquipedia.net/valorant/Main_Page">https://liquipedia.net/valorant/Main_Page</a>
16.02.2022 11:13:01: <br><a href="/upload/grain.blog/5b3/5b30ecdb93786c8cf99b475006410daf.jfif" data-file-id="151" download="загружено.jfif">Загрузить «загружено.jfif»</a><br>
16.02.2022 11:13:34: <br><img src="/upload/grain.blog/40d/40d62814c04f9df7c6db67a8b7de0d04.jpg" data-file-id="152" alt="dlinnye-foto-4.jpg"><br>
16.02.2022 11:13:51: <br><img src="/upload/grain.blog/d4f/d4f97b8323faae50d9af04f913a7952f.jpg" data-file-id="153" alt="0965221661750d31c92c7d9b10c7779b.jpg"><br>
16.02.2022 11:33:01: <br><a href="/upload/grain.blog/0cf/0cfdf399309db87211e2f73a2929b9fd.mp4" data-file-id="155" download="2022-02-16 00-51-17.mp4">Загрузить «2022-02-16 00-51-17.mp4»</a><br>
16.02.2022 11:33:57: <br><a href="/upload/grain.blog/16a/16ae6a822360eda4f34566b84689ad99.mp4" data-file-id="156" download="video_2020-10-28_12-40-53.mp4">Загрузить «video_2020-10-28_12-40-53.mp4»</a><br>
16.02.2022 11:36:00: <br><a href="/upload/grain.blog/f76/f76841d53fdf1876589531206cccdad5.mp4" data-file-id="157" download="videoplayback.mp4">Загрузить «videoplayback.mp4»</a><br>
16.02.2022 11:36:21: <br><a href="/upload/grain.blog/199/199732e6dbd19edc954124671ec67d6a.mp4" data-file-id="158" download="2022-02-16 00-51-17.mp4">Загрузить «2022-02-16 00-51-17.mp4»</a><br>
16.02.2022 11:58:26: <p style="-webkit-tap-highlight-color: transparent; margin: 0px 0px 1em; color: rgb(51, 51, 51); font-family: PFDinTextPro, Helvetica, Arial, sans-serif; text-align: justify;">Компания осуществляет все виды геологоразведочных работ от региональных исследований на все виды полезных ископаемых, до подсчета запасов и ввода в эксплуатацию месторождений, обладает уникальными компетенциями в области морской геологии и работы на шельфе.</p><p style="-webkit-tap-highlight-color: transparent; margin: 0px 0px 1em; color: rgb(51, 51, 51); font-family: PFDinTextPro, Helvetica, Arial, sans-serif; text-align: justify;">В составе Холдинга работает уникальный по уровню компетенций и объему накопленной геологической информации&nbsp;<a href="http://rosgeo.com/services/intellektualnye-uslugi/" style="-webkit-tap-highlight-color: transparent; text-decoration-line: underline; transition: all 0.3s linear 0s;">Научно-производственный кластер</a>&nbsp;и современный&nbsp;<a href="http://rosgeo.com/services/konsalting-i-partnerstvo/" style="-webkit-tap-highlight-color: transparent; text-decoration-line: underline; transition: all 0.3s linear 0s;">Консалтинговый центр</a>, по геологическому сопровождению проектов любой сложности.</p><p style="-webkit-tap-highlight-color: transparent; margin: 0px 0px 1em; color: rgb(51, 51, 51); font-family: PFDinTextPro, Helvetica, Arial, sans-serif; text-align: justify;">Холдинг является основным исполнителем государственного заказа на работы по воспроизводству минерально-сырьевой базы Российской Федерации. 100% капитала Общества находится в собственности государства.</p><div><br></div>
16.02.2022 12:48:21: 
16.02.2022 13:00:52: 
17.02.2022 07:37:33: test<a href="/upload/grain.blog/64f/64f99fc79a599cee9d5cea59bbae3051.mp3" data-file-id="162" download="05. Conquistador - Las Patillas.mp3">Загрузить «05. Conquistador - Las Patillas.mp3»</a><div><a href="/upload/grain.blog/64f/64f99fc79a599cee9d5cea59bbae3051.mp3" data-file-id="162" download="05. Conquistador - Las Patillas.mp3">Загрузить «05. Conquistador - Las Patillas.mp3»</a><br></div><div><a href="/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><img src="/upload/grain.blog/5e2/5e260db83708f14768dc5f539c50ef9b.png" data-file-id="160" alt="5feb20b438c90293d153b657ff88ca2e.png"><br></div><div><a href="/upload/grain.blog/3d4/3d4f5f1e10dca20db9b99a29b1a29122.docx" data-file-id="159" download="демодок2.docx">Загрузить «демодок2.docx»</a><br></div>
17.02.2022 07:38:46: test<a href="/upload/grain.blog/64f/64f99fc79a599cee9d5cea59bbae3051.mp3" data-file-id="162" download="05. Conquistador - Las Patillas.mp3">Загрузить «05. Conquistador - Las Patillas.mp3»</a><div><a href="/upload/grain.blog/64f/64f99fc79a599cee9d5cea59bbae3051.mp3" data-file-id="162" download="05. Conquistador - Las Patillas.mp3">Загрузить «05. Conquistador - Las Patillas.mp3»</a><br></div><div><a href="/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><img src="/upload/grain.blog/5e2/5e260db83708f14768dc5f539c50ef9b.png" data-file-id="160" alt="5feb20b438c90293d153b657ff88ca2e.png"><br></div>
17.02.2022 09:10:19: <p style="margin: 0 0 var(--content-text-bottom-offset) 0; color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"><span style="font-weight: 700;"><span style="color: rgb(0, 53, 98);">В ходе итоговой пресс-конференции Генеральный директор Росгеологии Сергей Горьков рассказал об основных итогах работы Холдинга в 2021 году и планах его дальнейшего развития.</span></span><br><br>Глава Росгеологии подробно остановился на ряде ключевых вопросов:<br></p><ul style="margin: 0 0 var(--content-text-bottom-offset) 2.5rem;"><li>Инвестиционная программа на 2022:&nbsp;составляет в общей сложности 9 млрд рублей - 5 млрд руб. собственных средств плюс 4 млрд руб. в рамках программы докапитализации. Это рекордный показатель с постсоветского периода. В течение следующих 3 лет общий объем инвестиций в модернизацию компании составит порядка 23 млрд руб. с учетом докапитализации и собственных средств Холдинга.</li><li style="margin-top: var(--content-text-list-offset);">Цифровизация:&nbsp;утверждена стратегия цифровой трансформации, развиваем направления Big Data, искусственного интеллекта, Блок чейн, ведем разработку российского ПО. В следующем году планируем на 40% сократить зависимость от западных производителей и инвестировать до 500 млн рублей в направление цифровизации.</li><li style="margin-top: var(--content-text-list-offset);">Водоснабжение регионов РФ:&nbsp;выполнена задача Президента РФ по обеспечению питьевой водой южных регионов РФ, в том числе Республики Крым и Геленджика. Завершены геологоразведочные работы в Азовском море, в ходе которых установлено наличие запасов пресной воды под морским дном.</li></ul><span style="color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;">Подробнее смотрите&nbsp;</span><a target="_blank" href="https://www.youtube.com/watch?v=PfPiBjWVWgE" style="background-color: rgb(255, 255, 255);">здесь.</a>
15.03.2022 14:31:34: тсетст
17.03.2022 09:11:46: <br><a href="/upload/grain.blog/37e/37ef6e2a20688fcfc1241d8017468ad2.mp4" data-file-id="170" download="тест.mp4">Загрузить «тест.mp4»</a><br>
17.03.2022 09:17:55: <br><a href="/upload/grain.blog/17d/17d43788151d2aa10e6baa0156d69e35.mp4" data-file-id="171" download="тест2.mp4">Загрузить «тест2.mp4»</a><br>
17.03.2022 09:32:47: <br><a href="/upload/grain.blog/433/43318c0e545875cd776fa83d4304bc59.mp4" data-file-id="172" download="тест2.mp4">Загрузить «тест2.mp4»</a><br>
17.03.2022 09:44:06: <br><a href="/upload/grain.blog/723/7235ba6920c7f9cf9b05cad1db54cd2d.mp4" data-file-id="173" download="тест (video-converter.com).mp4">Загрузить «тест (video-converter.com).mp4»</a><br>
28.03.2022 16:13:27: <p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В 1966 году&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9D%D0%BE%D1%80%D0%BC%D0%B0%D0%BD_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD" class="mw-redirect" title="Норман Джонсон" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Норман Джонсон</a>&nbsp;опубликовал список, в котором присутствовали все 92 тела, и дал им названия и номера. Он высказал гипотезу, что их только 92, то есть других нет.</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Ранее, в 1946&nbsp;году Л.&nbsp;Н.&nbsp;Есаулова прислала&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80%D0%BE%D0%B2,_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80_%D0%94%D0%B0%D0%BD%D0%B8%D0%BB%D0%BE%D0%B2%D0%B8%D1%87" title="Александров, Александр Данилович" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">А.&nbsp;Д.&nbsp;Александрову</a>&nbsp;письмо, в котором доказала, что правильногранных многогранников (кроме 5 правильных многогранников, 13 полуправильных и двух бесконечных серий (призмы и антипризм) может существовать лишь конечное число. В 1961 году Александров передал это письмо В.&nbsp;А.&nbsp;Залгаллеру, возможно из-за заметки Джонсона 1960 года<sup id="cite_ref-2" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0#cite_note-2" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[2]</a></sup>.</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В 1967 году&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%97%D0%B0%D0%BB%D0%B3%D0%B0%D0%BB%D0%BB%D0%B5%D1%80,_%D0%92%D0%B8%D0%BA%D1%82%D0%BE%D1%80_%D0%90%D0%B1%D1%80%D0%B0%D0%BC%D0%BE%D0%B2%D0%B8%D1%87" title="Залгаллер, Виктор Абрамович" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Виктор Залгаллер</a>&nbsp;опубликовал доказательство того, что список Джонсона полон. К решению была привлечена группа школьников&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A4%D0%B8%D0%B7%D0%B8%D0%BA%D0%BE-%D0%BC%D0%B0%D1%82%D0%B5%D0%BC%D0%B0%D1%82%D0%B8%D1%87%D0%B5%D1%81%D0%BA%D0%B8%D0%B9_%D0%BB%D0%B8%D1%86%D0%B5%D0%B9_%E2%84%96_239" title="Физико-математический лицей № 239" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">школы №&nbsp;239</a>. Полное доказательство заняло около 4 лет с&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%94%D0%BE%D0%BA%D0%B0%D0%B7%D0%B0%D1%82%D0%B5%D0%BB%D1%8C%D0%BD%D1%8B%D0%B5_%D0%B2%D1%8B%D1%87%D0%B8%D1%81%D0%BB%D0%B5%D0%BD%D0%B8%D1%8F" title="Доказательные вычисления" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">привлечением компьютерной техники</a>. В доказательстве также существенно использовалась&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D0%BE%D1%80%D0%B5%D0%BC%D0%B0_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80%D0%BE%D0%B2%D0%B0_%D0%BE_%D0%B2%D1%8B%D0%BF%D1%83%D0%BA%D0%BB%D1%8B%D1%85_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA%D0%B0%D1%85" class="mw-redirect" title="Теорема Александрова о выпуклых многогранниках" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">теорема Александрова о выпуклых многогранниках</a>.</p><h2 style="color: rgb(0, 0, 0); margin: 1em 0px 0.25em; padding: 0px; overflow: hidden; border-bottom: 1px solid rgb(162, 169, 177); font-size: 1.5em; font-weight: normal; font-family: &quot;Linux Libertine&quot;, Georgia, Times, serif; line-height: 1.3;"><span id=".D0.A2.D0.B5.D1.80.D0.BC.D0.B8.D0.BD.D0.BE.D0.BB.D0.BE.D0.B3.D0.B8.D1.8F"></span><span class="mw-headline" id="Терминология">Терминология</span><span class="mw-editsection" style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=2" class="mw-editsection-visualeditor" title="Редактировать раздел «Терминология»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=2" title="Редактировать раздел «Терминология»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h2><div class="thumb tright" style="clear: right; float: right; width: 416px; margin: 0.5em 0px 1.3em 1.4em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px; max-width: 100%;"><div class="thumbinner" style="padding: 3px; text-align: center; overflow: hidden; border: 1px solid rgb(200, 204, 209); background-color: rgb(248, 249, 250); font-size: 13.16px;"><div style="float: left; margin: 1px; width: 201px;"><div class="thumbimage" style="background-color: rgb(255, 255, 255); border: 1px solid rgb(200, 204, 209);"><a href="https://commons.wikimedia.org/wiki/File:Stella_octangula.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/19/Stella_octangula.png/200px-Stella_octangula.png" decoding="async" width="200" height="210" srcset="//upload.wikimedia.org/wikipedia/commons/1/19/Stella_octangula.png 1.5x" data-file-width="240" data-file-height="252" style="vertical-align: middle;"></a></div><div class="thumbcaption" style="text-align: left; line-height: 1.4em; padding: 3px; border: 0px; font-size: 12.3704px; clear: left;">Многогранник, имеющий&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%97%D0%B2%D1%91%D0%B7%D0%B4%D1%87%D0%B0%D1%82%D1%8B%D0%B9_%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Звёздчатый октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">24 правильных треугольника</a>&nbsp;в качестве граней,&nbsp;<span style="font-weight: 700;">не</span>&nbsp;является телом Джонсона, поскольку не является выпуклым. (Фактически это единственная&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%B1%D1%80%D0%B0%D0%B7%D0%BE%D0%B2%D0%B0%D0%BD%D0%B8%D0%B5_%D0%B7%D0%B2%D1%91%D0%B7%D0%B4%D1%87%D0%B0%D1%82%D0%BE%D0%B9_%D1%84%D0%BE%D1%80%D0%BC%D1%8B" title="Образование звёздчатой формы" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">звёздчатая форма</a>, возможная для&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">октаэдра</a>.)</div></div><div style="float: left; margin: 1px; width: 202px;"><div class="thumbimage" style="background-color: rgb(255, 255, 255); border: 1px solid rgb(200, 204, 209);"><a href="https://commons.wikimedia.org/wiki/File:Partial_cubic_honeycomb.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Partial_cubic_honeycomb.png/200px-Partial_cubic_honeycomb.png" decoding="async" width="200" height="198" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Partial_cubic_honeycomb.png/300px-Partial_cubic_honeycomb.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Partial_cubic_honeycomb.png/400px-Partial_cubic_honeycomb.png 2x" data-file-width="873" data-file-height="866" style="vertical-align: middle;"></a></div><div class="thumbcaption" style="text-align: left; line-height: 1.4em; padding: 3px; border: 0px; font-size: 12.3704px; clear: left;">Многогранник, имеющий 24 квадратных грани,&nbsp;<span style="font-weight: 700;">не</span>&nbsp;является телом Джонсона, поскольку не является строго выпуклым (имеет&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D1%83%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D1%8B%D0%B9_%D1%83%D0%B3%D0%BE%D0%BB" title="Двугранный угол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">двугранные углы</a>&nbsp;180°).</div></div><div style="clear: both;"></div></div><div style="clear: both;"></div></div><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Названия тел Джонсона имеют большую описательную способность. Большинство этих тел можно построить из нескольких тел (<a href="https://ru.wikipedia.org/wiki/%D0%9F%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Пирамида (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пирамид</a>,&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%BF%D0%BE%D0%BB_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Купол (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">куполов</a>&nbsp;и&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Ротонда (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">ротонд</a>), добавляя&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B0%D0%B2%D0%B8%D0%BB%D1%8C%D0%BD%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA" title="Правильный многогранник" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">платоновы</a>&nbsp;и&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%90%D1%80%D1%85%D0%B8%D0%BC%D0%B5%D0%B4%D0%BE%D0%B2%D0%BE_%D1%82%D0%B5%D0%BB%D0%BE" title="Архимедово тело" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">архимедовы</a>&nbsp;тела,&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B8%D0%B7%D0%BC%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Призма (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">призмы</a>&nbsp;и&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%90%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Антипризма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">антипризмы</a>.</p><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Би-</span>&nbsp;означает, что две копии тел соединены по основаниям. Для куполов и ротонд они могут быть соединены по граням одного типа (<span style="font-weight: 700;">прямые</span>) или по разным (<span style="font-weight: 700;">повёрнутые</span>).&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Октаэдр</a>, например, является&nbsp;<i>квадратной бипирамидой</i>,&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Кубооктаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">кубооктаэдр</a>&nbsp;—&nbsp;<i>повёрнутым треугольным бикуполом</i>, а&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%BE%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" title="Икосододекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">икосододекаэдр</a>&nbsp;—&nbsp;<i>повёрнутой пятиугольной биротондой</i>.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Удлинённый</span>&nbsp;означает, что к телу присоединена&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B8%D0%B7%D0%BC%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Призма (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">призма</a>&nbsp;или она вставлена между двумя частями тела.&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D0%BC%D0%B1%D0%BE%D0%BA%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Ромбокубооктаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Ромбокубооктаэдр</a>, например, является&nbsp;<i>удлинённым квадратным прямым бикуполом</i>.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Скрученно удлинённый</span>&nbsp;означает, что к телу присоединена&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%90%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Антипризма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">антипризма</a>&nbsp;или она вставлена между двумя частями тела.&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%B0%D1%8D%D0%B4%D1%80" title="Икосаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Икосаэдр</a>, например, является&nbsp;<i>скрученно удлинённой пятиугольной бипирамидой</i>.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Наращённый</span>&nbsp;означает, что пирамида или купол присоединён к грани тела.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Отсечённый</span>&nbsp;означает, что пирамида или купол отрезан от тела.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Скрученный</span>&nbsp;означает, что купол, принадлежащий многограннику, повёрнут таким же образом, как в повёрнутых бикуполах.</li></ul><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Последние три операции&nbsp;—&nbsp;<i>наращение</i>,&nbsp;<i>отсечение</i>&nbsp;и&nbsp;<i>поворот</i>&nbsp;— могут быть осуществлены более одного раза на достаточно больших многогранниках. Для операций, осуществлённых два раза, добавляется&nbsp;<i>дважды</i>. (<i>Дважды скрученное</i>&nbsp;тело имеет два повёрнутых купола.) Для операций, осуществлённых три раза, добавляется&nbsp;<i>трижды</i>. (У&nbsp;<i>трижды отсечённого</i>&nbsp;тела удалены три пирамиды или купола.)</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Иногда слова&nbsp;<i>дважды</i>&nbsp;недостаточно. Необходимо отличать тела, в которых изменены две противоположные грани от тел, в которых изменены другие грани. Когда изменённые грани параллельны, в название добавляется&nbsp;<i>противоположно</i>. (<i>Дважды противоположно наращённое</i>&nbsp;тело имеет две параллельные грани (противоположные) с добавленными телами.) Если же изменения касаются граней, не являющихся противоположными, в название добавляется&nbsp;<i>косо</i>. (<i>Дважды косо наращённое</i>&nbsp;тело имеет две грани с добавленными телами, но грани не противоположны.)</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Несколько названий происходят от многоугольников, из которых собрано тело Джонсона.</p><dl style="margin-top: 0.2em; margin-bottom: 0.5em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;">Если определить&nbsp;<i>месяц</i>&nbsp;как группу из двух треугольников, присоединённых к квадрату, слово&nbsp;<i>клинокорона</i>&nbsp;соответствует клиновидной короноподобной группе, образованной двумя месяцами. Слово&nbsp;<i>двуклиноид</i>&nbsp;или&nbsp;<i>двуклинник</i>&nbsp;означает две таких группы.</dd></dl><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В данной статье используются названия из статьи Залгаллера<sup id="cite_ref-_a90f79aa24d78429_3-0" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0#cite_note-_a90f79aa24d78429-3" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[3]</a></sup>. Вместе с номерами многогранников, данными Джонсоном, в скобках приводится составной номер из статьи Залгаллера. В этом составном номере</p><dl style="margin-top: 0.2em; margin-bottom: 0.5em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;"><span style="font-weight: 700;">П<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>&nbsp;обозначает призму с&nbsp;<span style="font-weight: 700;">n</span>-угольным основанием.</dd><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;"><span style="font-weight: 700;">А<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>&nbsp;обозначает антипризму с&nbsp;<span style="font-weight: 700;">n</span>-угольным основанием.</dd><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;"><span style="font-weight: 700;">М<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>&nbsp;обозначает тело с индесом&nbsp;<span style="font-weight: 700;">n</span>&nbsp;(то есть в этом случае тело строится на основе другого тела).</dd><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;">Подчёркивание означает поворот тела</dd></dl><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><i>Замечание</i>:&nbsp;<span style="font-weight: 700;">М<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>&nbsp;не совпадает с&nbsp;<span style="font-weight: 700;">J<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>. Так, квадратная пирамида J<sub style="line-height: 1em; font-size: 11.2px;">1</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>) имеет индекс 1 у Джонсона и индекс 2 у Залгаллера.</p><h2 style="color: rgb(0, 0, 0); margin: 1em 0px 0.25em; padding: 0px; overflow: hidden; border-bottom: 1px solid rgb(162, 169, 177); font-size: 1.5em; font-weight: normal; font-family: &quot;Linux Libertine&quot;, Georgia, Times, serif; line-height: 1.3;"><span id=".D0.A1.D0.BF.D0.B8.D1.81.D0.BE.D0.BA"></span><span class="mw-headline" id="Список">Список</span><span class="mw-editsection" style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=3" class="mw-editsection-visualeditor" title="Редактировать раздел «Список»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=3" title="Редактировать раздел «Список»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h2><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.9F.D0.B8.D1.80.D0.B0.D0.BC.D0.B8.D0.B4.D1.8B"></span><span class="mw-headline" id="Пирамиды">Пирамиды</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=4" class="mw-editsection-visualeditor" title="Редактировать раздел «Пирамиды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=4" title="Редактировать раздел «Пирамиды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Первые два тела Джонсона, J<sub style="line-height: 1em; font-size: 11.2px;">1</sub>&nbsp;и J<sub style="line-height: 1em; font-size: 11.2px;">2</sub>, являются&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Пирамида (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пирамидами</a>.&nbsp;<i>Треугольная пирамида</i>&nbsp;является правильным&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тетраэдром</a>, так что не является телом Джонсона.</p><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><caption><a href="https://ru.wikipedia.org/wiki/%D0%9F%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Пирамида (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пирамиды</a></caption><tbody><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Правильные</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">1</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">2</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>)</th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Треугольная пирамида<br>(<a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Тетраэдр</a>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Квадратная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная пирамида</a></th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Пятиугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятиугольная пирамида</a></th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Tetrahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Tetrahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/120px-Tetrahedron.png" decoding="async" width="120" height="120" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/180px-Tetrahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/240px-Tetrahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/120px-Square_pyramid.png" decoding="async" width="120" height="74" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/180px-Square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/240px-Square_pyramid.png 2x" data-file-width="420" data-file-height="259" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/120px-Pentagonal_pyramid.png" decoding="async" width="120" height="74" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/180px-Pentagonal_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/240px-Pentagonal_pyramid.png 2x" data-file-width="413" data-file-height="255" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Tetrahedron_flat.svg?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Tetrahedron flat.svg" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/88/Tetrahedron_flat.svg/120px-Tetrahedron_flat.svg.png" decoding="async" width="120" height="105" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/88/Tetrahedron_flat.svg/180px-Tetrahedron_flat.svg.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/88/Tetrahedron_flat.svg/240px-Tetrahedron_flat.svg.png 2x" data-file-width="212" data-file-height="185" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_1_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 1 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/c/c4/Johnson_solid_1_net.png/120px-Johnson_solid_1_net.png" decoding="async" width="120" height="120" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/c/c4/Johnson_solid_1_net.png/180px-Johnson_solid_1_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/c/c4/Johnson_solid_1_net.png/240px-Johnson_solid_1_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_2_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 2 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/08/Johnson_solid_2_net.png/120px-Johnson_solid_2_net.png" decoding="async" width="120" height="120" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/08/Johnson_solid_2_net.png/180px-Johnson_solid_2_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/08/Johnson_solid_2_net.png/240px-Johnson_solid_2_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.9A.D1.83.D0.BF.D0.BE.D0.BB.D1.8B_.D0.B8_.D1.80.D0.BE.D1.82.D0.BE.D0.BD.D0.B4.D1.8B"></span><span class="mw-headline" id="Куполы_и_ротонды">Куполы и ротонды</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=5" class="mw-editsection-visualeditor" title="Редактировать раздел «Куполы и ротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=5" title="Редактировать раздел «Куполы и ротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Следующие четыре многогранника являются тремя&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%BF%D0%BE%D0%BB_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Купол (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">куполами</a>&nbsp;и одной&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Ротонда (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">ротондой</a>.</p><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%BF%D0%BE%D0%BB_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Купол (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Куполы</a></th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Ротонда (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Ротонды</a></th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Однородные</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">3</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">4</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">4</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">5</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">5</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">6</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Треугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Трёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Трёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A7%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Четырёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Четырёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Пятискатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная ротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная ротонда</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_prism_wedge.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism wedge.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/ea/Triangular_prism_wedge.png/80px-Triangular_prism_wedge.png" decoding="async" width="80" height="72" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/ea/Triangular_prism_wedge.png/120px-Triangular_prism_wedge.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/ea/Triangular_prism_wedge.png/160px-Triangular_prism_wedge.png 2x" data-file-width="582" data-file-height="521" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/80px-Triangular_cupola.png" decoding="async" width="80" height="59" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/120px-Triangular_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/160px-Triangular_cupola.png 2x" data-file-width="440" data-file-height="326" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/80px-Square_cupola.png" decoding="async" width="80" height="68" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/120px-Square_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/160px-Square_cupola.png 2x" data-file-width="455" data-file-height="386" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/80px-Pentagonal_cupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/120px-Pentagonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/160px-Pentagonal_cupola.png 2x" data-file-width="420" data-file-height="419" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_rotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal rotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/80px-Pentagonal_rotunda.png" decoding="async" width="80" height="53" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/120px-Pentagonal_rotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/160px-Pentagonal_rotunda.png 2x" data-file-width="450" data-file-height="300" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_3_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 3 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/6f/Johnson_solid_3_net.png/80px-Johnson_solid_3_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/6f/Johnson_solid_3_net.png/120px-Johnson_solid_3_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/6f/Johnson_solid_3_net.png/160px-Johnson_solid_3_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_4_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 4 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/4f/Johnson_solid_4_net.png/80px-Johnson_solid_4_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/4f/Johnson_solid_4_net.png/120px-Johnson_solid_4_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/4f/Johnson_solid_4_net.png/160px-Johnson_solid_4_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_5_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 5 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/32/Johnson_solid_5_net.png/80px-Johnson_solid_5_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/32/Johnson_solid_5_net.png/120px-Johnson_solid_5_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/32/Johnson_solid_5_net.png/160px-Johnson_solid_5_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_6_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 6 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/5c/Johnson_solid_6_net.png/80px-Johnson_solid_6_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/5c/Johnson_solid_6_net.png/120px-Johnson_solid_6_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/5c/Johnson_solid_6_net.png/160px-Johnson_solid_6_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr><th colspan="5" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Связанные однородные многогранники</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Кубооктаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Кубооктаэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D0%BC%D0%B1%D0%BE%D0%BA%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Ромбокубооктаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Ромбокубооктаэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D0%BC%D0%B1%D0%BE%D0%B8%D0%BA%D0%BE%D1%81%D0%BE%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" title="Ромбоикосододекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Ромбоикосододекаэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%BE%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" title="Икосододекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Икосододекаэдр</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Cuboctahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Cuboctahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Cuboctahedron.png/80px-Cuboctahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Cuboctahedron.png/120px-Cuboctahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Cuboctahedron.png/160px-Cuboctahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Small_rhombicuboctahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Small rhombicuboctahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/ad/Small_rhombicuboctahedron.png/80px-Small_rhombicuboctahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/ad/Small_rhombicuboctahedron.png/120px-Small_rhombicuboctahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/ad/Small_rhombicuboctahedron.png/160px-Small_rhombicuboctahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Small_rhombicosidodecahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Small rhombicosidodecahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/31/Small_rhombicosidodecahedron.png/80px-Small_rhombicosidodecahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/31/Small_rhombicosidodecahedron.png/120px-Small_rhombicosidodecahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/31/Small_rhombicosidodecahedron.png/160px-Small_rhombicosidodecahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Icosidodecahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Icosidodecahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Icosidodecahedron.png/80px-Icosidodecahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Icosidodecahedron.png/120px-Icosidodecahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Icosidodecahedron.png/160px-Icosidodecahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.A3.D0.B4.D0.BB.D0.B8.D0.BD.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D0.B8_.D1.81.D0.BA.D1.80.D1.83.D1.87.D0.B5.D0.BD.D0.BD.D0.BE_.D1.83.D0.B4.D0.BB.D0.B8.D0.BD.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D0.BF.D0.B8.D1.80.D0.B0.D0.BC.D0.B8.D0.B4.D1.8B"></span><span class="mw-headline" id="Удлинённые_и_скрученно_удлинённые_пирамиды">Удлинённые и скрученно удлинённые пирамиды</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=6" class="mw-editsection-visualeditor" title="Редактировать раздел «Удлинённые и скрученно удлинённые пирамиды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=6" title="Редактировать раздел «Удлинённые и скрученно удлинённые пирамиды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Следующие пять многогранников Джонсона являются удлинёнными и скручено удлинёнными пирамидами. Они представляют собой склеивание двух многогранников. В случае скрученно удлинённой треугольной пирамиды три пары смежных треугольников копланарны, так что тело не является многогранником Джонсона.</p><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="3" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><span data-interwiki-lang="en" data-interwiki-article="Elongated pyramid"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Удлинённая пирамида (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённые пирамиды</a></span><span class="noprint" style="font-weight: normal;"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Elongated_pyramid" class="extiw" title="en:Elongated pyramid" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span><br>(или наращённые призмы)</th><th colspan="3" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><span data-interwiki-lang="en" data-interwiki-article="Gyroelongated pyramid"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Скрученно удлинённая пирамида (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённые пирамиды</a></span><span class="noprint" style="font-weight: normal;"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Gyroelongated_pyramid" class="extiw" title="en:Gyroelongated pyramid" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span><br>(или наращённые антипризмы)</th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">7</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">1</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">3</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">8</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">4</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">9</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">5</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Копланарная</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">10</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">4</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">11</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">5</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%82%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Удлинённая треугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая треугольная пирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%87%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Удлинённая четырёхугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая четырёхугольная пирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Удлинённая пятиугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая пятиугольная пирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Скрученно удлинённая треугольная пирамида</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%87%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Скрученно удлинённая четырёхугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённая четырёхугольная пирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Скрученно удлинённая пятиугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённая пятиугольная пирамида</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Наращённая треугольная призма</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Наращённый куб</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Наращённая пятиугольная призма</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Наращённый октаэдр</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Наращённая квадратная антипризма</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Наращённая пятиугольная антипризма</td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_triangular_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated triangular pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/3e/Elongated_triangular_pyramid.png/80px-Elongated_triangular_pyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/3e/Elongated_triangular_pyramid.png/120px-Elongated_triangular_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/3e/Elongated_triangular_pyramid.png/160px-Elongated_triangular_pyramid.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a8/Elongated_square_pyramid.png/80px-Elongated_square_pyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a8/Elongated_square_pyramid.png/120px-Elongated_square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a8/Elongated_square_pyramid.png/160px-Elongated_square_pyramid.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b4/Elongated_pentagonal_pyramid.png/80px-Elongated_pentagonal_pyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b4/Elongated_pentagonal_pyramid.png/120px-Elongated_pentagonal_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b4/Elongated_pentagonal_pyramid.png/160px-Elongated_pentagonal_pyramid.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Augmented_octahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Augmented octahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/6b/Augmented_octahedron.png/80px-Augmented_octahedron.png" decoding="async" width="80" height="106" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/6b/Augmented_octahedron.png/120px-Augmented_octahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/6b/Augmented_octahedron.png/160px-Augmented_octahedron.png 2x" data-file-width="486" data-file-height="644" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/e3/Gyroelongated_square_pyramid.png/80px-Gyroelongated_square_pyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/e3/Gyroelongated_square_pyramid.png/120px-Gyroelongated_square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/e3/Gyroelongated_square_pyramid.png/160px-Gyroelongated_square_pyramid.png 2x" data-file-width="320" data-file-height="320" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_pentagonal_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated pentagonal pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/38/Gyroelongated_pentagonal_pyramid.png/80px-Gyroelongated_pentagonal_pyramid.png" decoding="async" width="80" height="65" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/38/Gyroelongated_pentagonal_pyramid.png/120px-Gyroelongated_pentagonal_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/38/Gyroelongated_pentagonal_pyramid.png/160px-Gyroelongated_pentagonal_pyramid.png 2x" data-file-width="412" data-file-height="333" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_7_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 7 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/48/Johnson_solid_7_net.png/80px-Johnson_solid_7_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/48/Johnson_solid_7_net.png/120px-Johnson_solid_7_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/48/Johnson_solid_7_net.png/160px-Johnson_solid_7_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_8_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 8 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/f3/Johnson_solid_8_net.png/80px-Johnson_solid_8_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/f3/Johnson_solid_8_net.png/120px-Johnson_solid_8_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/f3/Johnson_solid_8_net.png/160px-Johnson_solid_8_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_9_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 9 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/06/Johnson_solid_9_net.png/80px-Johnson_solid_9_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/06/Johnson_solid_9_net.png/120px-Johnson_solid_9_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/06/Johnson_solid_9_net.png/160px-Johnson_solid_9_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Augmented_octahedgon_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Augmented octahedgon net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/07/Augmented_octahedgon_net.png/80px-Augmented_octahedgon_net.png" decoding="async" width="80" height="37" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/07/Augmented_octahedgon_net.png/120px-Augmented_octahedgon_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/07/Augmented_octahedgon_net.png/160px-Augmented_octahedgon_net.png 2x" data-file-width="1373" data-file-height="631" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_10_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 10 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/c/c8/Johnson_solid_10_net.png/80px-Johnson_solid_10_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/c/c8/Johnson_solid_10_net.png/120px-Johnson_solid_10_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/c/c8/Johnson_solid_10_net.png/160px-Johnson_solid_10_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_11_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 11 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/0e/Johnson_solid_11_net.png/80px-Johnson_solid_11_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/0e/Johnson_solid_11_net.png/120px-Johnson_solid_11_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/0e/Johnson_solid_11_net.png/160px-Johnson_solid_11_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr align="center"><th colspan="6" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Получено из многогранников</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тетраэдр</a><br><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Треугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Квадратная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная пирамида</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%B1" title="Куб" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">куб</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Пятиугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятиугольная пирамида</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Пятиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пятиугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тетраэдр</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">октаэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Квадратная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная пирамида</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Квадратная антипризма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">квадратная антипризма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Пятиугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пятиугольная пирамида</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Пятиугольная антипризма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пятиугольная антипризма</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Tetrahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Tetrahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/40px-Tetrahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/60px-Tetrahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/80px-Tetrahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/40px-Triangular_prism.png" decoding="async" width="40" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/60px-Triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/80px-Triangular_prism.png 2x" data-file-width="730" data-file-height="925" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/40px-Square_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/60px-Square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/80px-Square_pyramid.png 2x" data-file-width="420" data-file-height="259" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Hexahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Hexahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/33/Hexahedron.png/40px-Hexahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/33/Hexahedron.png/60px-Hexahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/33/Hexahedron.png/80px-Hexahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/40px-Pentagonal_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/60px-Pentagonal_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/80px-Pentagonal_pyramid.png 2x" data-file-width="413" data-file-height="255" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Pentagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b6/Pentagonal_prism.png/40px-Pentagonal_prism.png" decoding="async" width="40" height="37" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b6/Pentagonal_prism.png/60px-Pentagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b6/Pentagonal_prism.png/80px-Pentagonal_prism.png 2x" data-file-width="967" data-file-height="903" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Tetrahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Tetrahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/40px-Tetrahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/60px-Tetrahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/80px-Tetrahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Octahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Octahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Octahedron.png/40px-Octahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Octahedron.png/60px-Octahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Octahedron.png/80px-Octahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/40px-Square_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/60px-Square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/80px-Square_pyramid.png 2x" data-file-width="420" data-file-height="259" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Square_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/40px-Square_antiprism.png" decoding="async" width="40" height="38" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/60px-Square_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/80px-Square_antiprism.png 2x" data-file-width="950" data-file-height="893" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/40px-Pentagonal_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/60px-Pentagonal_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/80px-Pentagonal_pyramid.png 2x" data-file-width="413" data-file-height="255" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Pentagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/6f/Pentagonal_antiprism.png/40px-Pentagonal_antiprism.png" decoding="async" width="40" height="35" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/6f/Pentagonal_antiprism.png/60px-Pentagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/6f/Pentagonal_antiprism.png/80px-Pentagonal_antiprism.png 2x" data-file-width="991" data-file-height="864" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.91.D0.B8.D0.BF.D0.B8.D1.80.D0.B0.D0.BC.D0.B8.D0.B4.D1.8B"></span><span class="mw-headline" id="Бипирамиды">Бипирамиды</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=7" class="mw-editsection-visualeditor" title="Редактировать раздел «Бипирамиды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=7" title="Редактировать раздел «Бипирамиды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Следующими многогранниками Джонсона являются&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%91%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Бипирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">бипирамиды</a>,&nbsp;<span data-interwiki-lang="en" data-interwiki-article="Elongated bipyramid"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Удлинённая бипирамида (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">удлинённые бипирамиды</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Elongated_bipyramid" class="extiw" title="en:Elongated bipyramid" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span>&nbsp;и&nbsp;<span data-interwiki-lang="en" data-interwiki-article="Gyroelongated bipyramid"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Скрученно удлинённая бипирамида (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">скрученно удлинённые бипирамиды</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Gyroelongated_bipyramid" class="extiw" title="en:Gyroelongated bipyramid" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span>:</p><table class="wikitable" width="800" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="3" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><a href="https://ru.wikipedia.org/wiki/%D0%91%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Бипирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Бипирамиды</a></th><th colspan="3" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><span data-interwiki-lang="en" data-interwiki-article="Elongated bipyramid"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Удлинённая бипирамида (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённые бипирамиды</a></span><span class="noprint" style="font-weight: normal;"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Elongated_bipyramid" class="extiw" title="en:Elongated bipyramid" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></th><th colspan="3" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><span data-interwiki-lang="en" data-interwiki-article="Gyroelongated bipyramid"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Скрученно удлинённая бипирамида (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённые бипирамиды</a></span><span class="noprint" style="font-weight: normal;"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Gyroelongated_bipyramid" class="extiw" title="en:Gyroelongated bipyramid" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">12</sub>(2М<sub style="line-height: 1em; font-size: 11.2px;">1</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Правильная</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">13</sub>(2М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">14</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">1</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">3</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">1</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">15</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">4</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">16</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">5</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Копланарная</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">17</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">4</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Правильные</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Треугольная бипирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Треугольная бипирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">квадратная бипирамида<br>(<a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">октаэдр</a>)</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Пятиугольная бипирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятиугольная бипирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%82%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Удлинённая треугольная бипирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая треугольная бипирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%87%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Удлинённая четырёхугольная бипирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая четырёхугольная бипирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Удлинённая пятиугольная бипирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая пятиугольная бипирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Скрученно удлинённая треугольная бипирамида<br>(<a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D0%BC%D0%B1%D0%BE%D1%8D%D0%B4%D1%80" title="Ромбоэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">ромбоэдр</a>)</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%87%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Скрученно удлинённая четырёхугольная бипирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённая четырёхугольная бипирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Скрученно удлинённая пятиугольная бипирамида<br>(<a href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%B0%D1%8D%D0%B4%D1%80" title="Икосаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">икосаэдр</a>)</td></tr><tr><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_dipyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular dipyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a5/Triangular_dipyramid.png/80px-Triangular_dipyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a5/Triangular_dipyramid.png/120px-Triangular_dipyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a5/Triangular_dipyramid.png/160px-Triangular_dipyramid.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Octahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Octahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Octahedron.png/80px-Octahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Octahedron.png/120px-Octahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Octahedron.png/160px-Octahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_dipyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal dipyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/7/79/Pentagonal_dipyramid.png/80px-Pentagonal_dipyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/7/79/Pentagonal_dipyramid.png/120px-Pentagonal_dipyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/7/79/Pentagonal_dipyramid.png/160px-Pentagonal_dipyramid.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_triangular_dipyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated triangular dipyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/f7/Elongated_triangular_dipyramid.png/80px-Elongated_triangular_dipyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/f7/Elongated_triangular_dipyramid.png/120px-Elongated_triangular_dipyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/f7/Elongated_triangular_dipyramid.png/160px-Elongated_triangular_dipyramid.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_square_dipyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated square dipyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/d/d3/Elongated_square_dipyramid.png/80px-Elongated_square_dipyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/d/d3/Elongated_square_dipyramid.png/120px-Elongated_square_dipyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/d/d3/Elongated_square_dipyramid.png/160px-Elongated_square_dipyramid.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_dipyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal dipyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/8d/Elongated_pentagonal_dipyramid.png/80px-Elongated_pentagonal_dipyramid.png" decoding="async" width="80" height="87" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/8d/Elongated_pentagonal_dipyramid.png/120px-Elongated_pentagonal_dipyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/8d/Elongated_pentagonal_dipyramid.png/160px-Elongated_pentagonal_dipyramid.png 2x" data-file-width="461" data-file-height="501" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_triangular_bipyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated triangular bipyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/4b/Gyroelongated_triangular_bipyramid.png/80px-Gyroelongated_triangular_bipyramid.png" decoding="async" width="80" height="72" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/4b/Gyroelongated_triangular_bipyramid.png/120px-Gyroelongated_triangular_bipyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/4b/Gyroelongated_triangular_bipyramid.png/160px-Gyroelongated_triangular_bipyramid.png 2x" data-file-width="535" data-file-height="481" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_square_dipyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated square dipyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/af/Gyroelongated_square_dipyramid.png/80px-Gyroelongated_square_dipyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/af/Gyroelongated_square_dipyramid.png/120px-Gyroelongated_square_dipyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/af/Gyroelongated_square_dipyramid.png/160px-Gyroelongated_square_dipyramid.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_gyroelongated_bipyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal gyroelongated bipyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/6c/Pentagonal_gyroelongated_bipyramid.png/80px-Pentagonal_gyroelongated_bipyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/6c/Pentagonal_gyroelongated_bipyramid.png/120px-Pentagonal_gyroelongated_bipyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/6c/Pentagonal_gyroelongated_bipyramid.png/160px-Pentagonal_gyroelongated_bipyramid.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_12_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 12 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/4b/Johnson_solid_12_net.png/80px-Johnson_solid_12_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/4b/Johnson_solid_12_net.png/120px-Johnson_solid_12_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/4b/Johnson_solid_12_net.png/160px-Johnson_solid_12_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Octahedron_flat.svg?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Octahedron flat.svg" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b3/Octahedron_flat.svg/80px-Octahedron_flat.svg.png" decoding="async" width="80" height="60" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b3/Octahedron_flat.svg/120px-Octahedron_flat.svg.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b3/Octahedron_flat.svg/160px-Octahedron_flat.svg.png 2x" data-file-width="362" data-file-height="272" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_13_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 13 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/62/Johnson_solid_13_net.png/80px-Johnson_solid_13_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/62/Johnson_solid_13_net.png/120px-Johnson_solid_13_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/62/Johnson_solid_13_net.png/160px-Johnson_solid_13_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_14_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 14 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/5b/Johnson_solid_14_net.png/80px-Johnson_solid_14_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/5b/Johnson_solid_14_net.png/120px-Johnson_solid_14_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/5b/Johnson_solid_14_net.png/160px-Johnson_solid_14_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_15_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 15 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/19/Johnson_solid_15_net.png/80px-Johnson_solid_15_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/19/Johnson_solid_15_net.png/120px-Johnson_solid_15_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/19/Johnson_solid_15_net.png/160px-Johnson_solid_15_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_16_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 16 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/6a/Johnson_solid_16_net.png/80px-Johnson_solid_16_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/6a/Johnson_solid_16_net.png/120px-Johnson_solid_16_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/6a/Johnson_solid_16_net.png/160px-Johnson_solid_16_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_17_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 17 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/69/Johnson_solid_17_net.png/80px-Johnson_solid_17_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/69/Johnson_solid_17_net.png/120px-Johnson_solid_17_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/69/Johnson_solid_17_net.png/160px-Johnson_solid_17_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Icosahedron_flat.svg?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Icosahedron flat.svg" src="https://upload.wikimedia.org/wikipedia/commons/thumb/d/dd/Icosahedron_flat.svg/80px-Icosahedron_flat.svg.png" decoding="async" width="80" height="41" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/d/dd/Icosahedron_flat.svg/120px-Icosahedron_flat.svg.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/d/dd/Icosahedron_flat.svg/160px-Icosahedron_flat.svg.png 2x" data-file-width="236" data-file-height="120" style="vertical-align: middle;"></a></td></tr><tr align="center"><th colspan="9" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Получено из многогранников</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тетраэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Квадратная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная пирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Пятиугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятиугольная пирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тетраэдр</a><br><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Треугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Квадратная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная пирамида</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%B1" title="Куб" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">куб</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Пятиугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятиугольная пирамида</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Пятиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пятиугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тетраэдр</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">октаэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Квадратная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная пирамида</a><br><span data-interwiki-lang="en" data-interwiki-article="Square antiprism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A7%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Четырёхугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Четырёхугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Square_antiprism" class="extiw" title="en:Square antiprism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Пятиугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятиугольная пирамида</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Пятиугольная антипризма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятиугольная антипризма</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Tetrahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Tetrahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/40px-Tetrahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/60px-Tetrahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/80px-Tetrahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/40px-Square_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/60px-Square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/80px-Square_pyramid.png 2x" data-file-width="420" data-file-height="259" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/40px-Pentagonal_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/60px-Pentagonal_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/80px-Pentagonal_pyramid.png 2x" data-file-width="413" data-file-height="255" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Tetrahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Tetrahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/40px-Tetrahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/60px-Tetrahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/80px-Tetrahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/40px-Triangular_prism.png" decoding="async" width="40" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/60px-Triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/80px-Triangular_prism.png 2x" data-file-width="730" data-file-height="925" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/40px-Square_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/60px-Square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/80px-Square_pyramid.png 2x" data-file-width="420" data-file-height="259" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Hexahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Hexahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/33/Hexahedron.png/40px-Hexahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/33/Hexahedron.png/60px-Hexahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/33/Hexahedron.png/80px-Hexahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/40px-Pentagonal_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/60px-Pentagonal_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/80px-Pentagonal_pyramid.png 2x" data-file-width="413" data-file-height="255" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b6/Pentagonal_prism.png/40px-Pentagonal_prism.png" decoding="async" width="40" height="37" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b6/Pentagonal_prism.png/60px-Pentagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b6/Pentagonal_prism.png/80px-Pentagonal_prism.png 2x" data-file-width="967" data-file-height="903" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Tetrahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Tetrahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/40px-Tetrahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/60px-Tetrahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/80px-Tetrahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Octahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Octahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Octahedron.png/40px-Octahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Octahedron.png/60px-Octahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/f5/Octahedron.png/80px-Octahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/40px-Square_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/60px-Square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/80px-Square_pyramid.png 2x" data-file-width="420" data-file-height="259" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Square_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/40px-Square_antiprism.png" decoding="async" width="40" height="38" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/60px-Square_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/80px-Square_antiprism.png 2x" data-file-width="950" data-file-height="893" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/40px-Pentagonal_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/60px-Pentagonal_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/80px-Pentagonal_pyramid.png 2x" data-file-width="413" data-file-height="255" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/6f/Pentagonal_antiprism.png/40px-Pentagonal_antiprism.png" decoding="async" width="40" height="35" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/6f/Pentagonal_antiprism.png/60px-Pentagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/6f/Pentagonal_antiprism.png/80px-Pentagonal_antiprism.png 2x" data-file-width="991" data-file-height="864" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.A3.D0.B4.D0.BB.D0.B8.D0.BD.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D0.BA.D1.83.D0.BF.D0.BE.D0.BB.D1.8B_.D0.B8_.D1.80.D0.BE.D1.82.D0.BE.D0.BD.D0.B4.D1.8B"></span><span class="mw-headline" id="Удлинённые_куполы_и_ротонды">Удлинённые куполы и ротонды</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=8" class="mw-editsection-visualeditor" title="Редактировать раздел «Удлинённые куполы и ротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=8" title="Редактировать раздел «Удлинённые куполы и ротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><span data-interwiki-lang="en" data-interwiki-article="Elongated cupola"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB&amp;action=edit&amp;redlink=1" class="new" title="Удлинённый купол (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённые куполы</a></span><span class="noprint" style="font-weight: normal;"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Elongated_cupola" class="extiw" title="en:Elongated cupola" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Удлинённая ротонда</th><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><span data-interwiki-lang="en" data-interwiki-article="Gyroelongated cupola"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB&amp;action=edit&amp;redlink=1" class="new" title="Скрученно удлинённый купол (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённые куполы</a></span><span class="noprint" style="font-weight: normal;"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Gyroelongated_cupola" class="extiw" title="en:Gyroelongated cupola" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Скрученно удлинённая ротонда</th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Копланарные</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">18</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">4</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">6</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">19</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">5</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">8</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">20</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">10</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">21</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">10</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Вогнутые</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">22</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">4</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">6</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">23</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">5</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">8</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">24</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">10</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">25</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">10</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Удлинённый двускатный купол</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D1%82%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Удлинённый трёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённый трёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D1%87%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Удлинённый четырёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённый четырёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Удлинённый пятискатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённый пятискатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Удлинённая пятискатная ротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая пятискатная ротонда</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Скрученно удлинённый двускатный купол</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D1%82%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Скрученно удлинённый трёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённый трёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D1%87%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Скрученно удлинённый четырёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённый четырёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Скрученно удлинённый пятискатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённый пятискатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Скрученно удлинённая пятискатная ротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённая пятискатная ротонда</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_digonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated digonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/33/Elongated_digonal_cupola.png/80px-Elongated_digonal_cupola.png" decoding="async" width="80" height="98" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/33/Elongated_digonal_cupola.png/120px-Elongated_digonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/33/Elongated_digonal_cupola.png/160px-Elongated_digonal_cupola.png 2x" data-file-width="954" data-file-height="1174" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_triangular_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated triangular cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Elongated_triangular_cupola.png/80px-Elongated_triangular_cupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Elongated_triangular_cupola.png/120px-Elongated_triangular_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Elongated_triangular_cupola.png/160px-Elongated_triangular_cupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_square_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated square cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/40/Elongated_square_cupola.png/80px-Elongated_square_cupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/40/Elongated_square_cupola.png/120px-Elongated_square_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/40/Elongated_square_cupola.png/160px-Elongated_square_cupola.png 2x" data-file-width="397" data-file-height="399" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_cupola.svg?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal cupola.svg" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Elongated_pentagonal_cupola.svg/80px-Elongated_pentagonal_cupola.svg.png" decoding="async" width="80" height="60" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Elongated_pentagonal_cupola.svg/120px-Elongated_pentagonal_cupola.svg.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Elongated_pentagonal_cupola.svg/160px-Elongated_pentagonal_cupola.svg.png 2x" data-file-width="484" data-file-height="362" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_rotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal rotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/35/Elongated_pentagonal_rotunda.png/80px-Elongated_pentagonal_rotunda.png" decoding="async" width="80" height="67" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/35/Elongated_pentagonal_rotunda.png/120px-Elongated_pentagonal_rotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/35/Elongated_pentagonal_rotunda.png/160px-Elongated_pentagonal_rotunda.png 2x" data-file-width="422" data-file-height="353" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_digonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated digonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/60/Gyroelongated_digonal_cupola.png/80px-Gyroelongated_digonal_cupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/60/Gyroelongated_digonal_cupola.png/120px-Gyroelongated_digonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/60/Gyroelongated_digonal_cupola.png/160px-Gyroelongated_digonal_cupola.png 2x" data-file-width="1200" data-file-height="1200" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_triangular_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated triangular cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/64/Gyroelongated_triangular_cupola.png/80px-Gyroelongated_triangular_cupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/64/Gyroelongated_triangular_cupola.png/120px-Gyroelongated_triangular_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/64/Gyroelongated_triangular_cupola.png/160px-Gyroelongated_triangular_cupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_square_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated square cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/26/Gyroelongated_square_cupola.png/80px-Gyroelongated_square_cupola.png" decoding="async" width="80" height="63" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/26/Gyroelongated_square_cupola.png/120px-Gyroelongated_square_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/26/Gyroelongated_square_cupola.png/160px-Gyroelongated_square_cupola.png 2x" data-file-width="424" data-file-height="333" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_pentagonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated pentagonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/32/Gyroelongated_pentagonal_cupola.png/80px-Gyroelongated_pentagonal_cupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/32/Gyroelongated_pentagonal_cupola.png/120px-Gyroelongated_pentagonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/32/Gyroelongated_pentagonal_cupola.png/160px-Gyroelongated_pentagonal_cupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_pentagonal_rotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated pentagonal rotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/37/Gyroelongated_pentagonal_rotunda.png/80px-Gyroelongated_pentagonal_rotunda.png" decoding="async" width="80" height="61" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/37/Gyroelongated_pentagonal_rotunda.png/120px-Gyroelongated_pentagonal_rotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/37/Gyroelongated_pentagonal_rotunda.png/160px-Gyroelongated_pentagonal_rotunda.png 2x" data-file-width="433" data-file-height="330" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_18_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 18 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/e8/Johnson_solid_18_net.png/80px-Johnson_solid_18_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/e8/Johnson_solid_18_net.png/120px-Johnson_solid_18_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/e8/Johnson_solid_18_net.png/160px-Johnson_solid_18_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_19_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 19 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/7/70/Johnson_solid_19_net.png/80px-Johnson_solid_19_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/7/70/Johnson_solid_19_net.png/120px-Johnson_solid_19_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/7/70/Johnson_solid_19_net.png/160px-Johnson_solid_19_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_20_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 20 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/c/c5/Johnson_solid_20_net.png/80px-Johnson_solid_20_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/c/c5/Johnson_solid_20_net.png/120px-Johnson_solid_20_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/c/c5/Johnson_solid_20_net.png/160px-Johnson_solid_20_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_21_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 21 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/0b/Johnson_solid_21_net.png/80px-Johnson_solid_21_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/0b/Johnson_solid_21_net.png/120px-Johnson_solid_21_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/0b/Johnson_solid_21_net.png/160px-Johnson_solid_21_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_22_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 22 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a3/Johnson_solid_22_net.png/80px-Johnson_solid_22_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a3/Johnson_solid_22_net.png/120px-Johnson_solid_22_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a3/Johnson_solid_22_net.png/160px-Johnson_solid_22_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_23_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 23 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/c/c3/Johnson_solid_23_net.png/80px-Johnson_solid_23_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/c/c3/Johnson_solid_23_net.png/120px-Johnson_solid_23_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/c/c3/Johnson_solid_23_net.png/160px-Johnson_solid_23_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_24_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 24 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Johnson_solid_24_net.png/80px-Johnson_solid_24_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Johnson_solid_24_net.png/120px-Johnson_solid_24_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Johnson_solid_24_net.png/160px-Johnson_solid_24_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_25_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 25 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/9d/Johnson_solid_25_net.png/80px-Johnson_solid_25_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/9d/Johnson_solid_25_net.png/120px-Johnson_solid_25_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/9d/Johnson_solid_25_net.png/160px-Johnson_solid_25_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr align="center"><th colspan="8" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Получены из многогранников</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D1%8F%D0%BC%D0%BE%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D1%8B%D0%B9_%D0%BF%D0%B0%D1%80%D0%B0%D0%BB%D0%BB%D0%B5%D0%BB%D0%B5%D0%BF%D0%B8%D0%BF%D0%B5%D0%B4" title="Прямоугольный параллелепипед" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная призма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Треугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A8%D0%B5%D1%81%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Шестиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Шестиугольная призма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Трёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Трёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%92%D0%BE%D1%81%D1%8C%D0%BC%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Восьмиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Восьмиугольная призма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%A7%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Четырёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Четырёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B5%D1%81%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Десятиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Десятиугольная призма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Пятискатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B5%D1%81%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Десятиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Десятиугольная призма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная ротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная ротонда</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><span data-interwiki-lang="en" data-interwiki-article="Square prism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A7%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Четырёхугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Четырёхугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Square_prism" class="extiw" title="en:Square prism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span><br><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Треугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A8%D0%B5%D1%81%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Шестиугольная антипризма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Шестиугольная антипризма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Трёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Трёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><span data-interwiki-lang="en" data-interwiki-article="Octagonal antiprism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%92%D0%BE%D1%81%D1%8C%D0%BC%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Восьмиугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Восьмиугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Octagonal_antiprism" class="extiw" title="en:Octagonal antiprism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span><br><a href="https://ru.wikipedia.org/wiki/%D0%A7%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Четырёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Четырёхскатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><span data-interwiki-lang="en" data-interwiki-article="Decagonal antiprism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%94%D0%B5%D1%81%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Десятиугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Десятиугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Decagonal_antiprism" class="extiw" title="en:Decagonal antiprism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Пятискатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатный купол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><span data-interwiki-lang="en" data-interwiki-article="Decagonal antiprism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%94%D0%B5%D1%81%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Десятиугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Десятиугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Decagonal_antiprism" class="extiw" title="en:Decagonal antiprism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная ротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная ротонда</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Tetragonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Tetragonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/1d/Tetragonal_prism.png/40px-Tetragonal_prism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/1d/Tetragonal_prism.png/60px-Tetragonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/1d/Tetragonal_prism.png/80px-Tetragonal_prism.png 2x" data-file-width="924" data-file-height="924" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/40px-Triangular_prism.png" decoding="async" width="40" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/60px-Triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/80px-Triangular_prism.png 2x" data-file-width="730" data-file-height="925" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Hexagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Hexagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/25/Hexagonal_prism.png/40px-Hexagonal_prism.png" decoding="async" width="40" height="35" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/25/Hexagonal_prism.png/60px-Hexagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/25/Hexagonal_prism.png/80px-Hexagonal_prism.png 2x" data-file-width="991" data-file-height="858" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Triangular_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/40px-Triangular_cupola.png" decoding="async" width="40" height="30" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/60px-Triangular_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/80px-Triangular_cupola.png 2x" data-file-width="440" data-file-height="326" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Octagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Octagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/59/Octagonal_prism.png/40px-Octagonal_prism.png" decoding="async" width="40" height="31" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/59/Octagonal_prism.png/60px-Octagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/59/Octagonal_prism.png/80px-Octagonal_prism.png 2x" data-file-width="986" data-file-height="775" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Square_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/40px-Square_cupola.png" decoding="async" width="40" height="34" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/60px-Square_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/80px-Square_cupola.png 2x" data-file-width="455" data-file-height="386" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Decagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Decagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a5/Decagonal_prism.png/40px-Decagonal_prism.png" decoding="async" width="40" height="30" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a5/Decagonal_prism.png/60px-Decagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a5/Decagonal_prism.png/80px-Decagonal_prism.png 2x" data-file-width="997" data-file-height="757" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/40px-Pentagonal_cupola.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/60px-Pentagonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/80px-Pentagonal_cupola.png 2x" data-file-width="420" data-file-height="419" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Decagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Decagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a5/Decagonal_prism.png/40px-Decagonal_prism.png" decoding="async" width="40" height="30" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a5/Decagonal_prism.png/60px-Decagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a5/Decagonal_prism.png/80px-Decagonal_prism.png 2x" data-file-width="997" data-file-height="757" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_rotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal rotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/40px-Pentagonal_rotunda.png" decoding="async" width="40" height="27" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/60px-Pentagonal_rotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/80px-Pentagonal_rotunda.png 2x" data-file-width="450" data-file-height="300" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/40px-Square_antiprism.png" decoding="async" width="40" height="38" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/60px-Square_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/80px-Square_antiprism.png 2x" data-file-width="950" data-file-height="893" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/40px-Triangular_prism.png" decoding="async" width="40" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/60px-Triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/80px-Triangular_prism.png 2x" data-file-width="730" data-file-height="925" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Hexagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Hexagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/13/Hexagonal_antiprism.png/40px-Hexagonal_antiprism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/13/Hexagonal_antiprism.png/60px-Hexagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/13/Hexagonal_antiprism.png/80px-Hexagonal_antiprism.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Triangular_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/40px-Triangular_cupola.png" decoding="async" width="40" height="30" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/60px-Triangular_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/80px-Triangular_cupola.png 2x" data-file-width="440" data-file-height="326" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Octagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Octagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b5/Octagonal_antiprism.png/40px-Octagonal_antiprism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b5/Octagonal_antiprism.png/60px-Octagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b5/Octagonal_antiprism.png/80px-Octagonal_antiprism.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Square_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/40px-Square_cupola.png" decoding="async" width="40" height="34" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/60px-Square_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/80px-Square_cupola.png 2x" data-file-width="455" data-file-height="386" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Decagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Decagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/40px-Decagonal_antiprism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/60px-Decagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/80px-Decagonal_antiprism.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/40px-Pentagonal_cupola.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/60px-Pentagonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/80px-Pentagonal_cupola.png 2x" data-file-width="420" data-file-height="419" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Decagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Decagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/40px-Decagonal_antiprism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/60px-Decagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/80px-Decagonal_antiprism.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_rotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal rotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/40px-Pentagonal_rotunda.png" decoding="async" width="40" height="27" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/60px-Pentagonal_rotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/80px-Pentagonal_rotunda.png 2x" data-file-width="450" data-file-height="300" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.91.D0.B8.D0.BA.D1.83.D0.BF.D0.BE.D0.BB.D1.8B"></span><span class="mw-headline" id="Бикуполы">Бикуполы</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=9" class="mw-editsection-visualeditor" title="Редактировать раздел «Бикуполы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=9" title="Редактировать раздел «Бикуполы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Повёрнутые треугольные бикуполы являются&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D0%BE%D0%BB%D1%83%D0%BF%D1%80%D0%B0%D0%B2%D0%B8%D0%BB%D1%8C%D0%BD%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA" title="Полуправильный многогранник" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">полуправильными многогранниками</a>&nbsp;(в данном случае&nbsp;—&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%90%D1%80%D1%85%D0%B8%D0%BC%D0%B5%D0%B4%D0%BE%D0%B2%D0%BE_%D1%82%D0%B5%D0%BB%D0%BE" title="Архимедово тело" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">архимедовыми телами</a>), так что они не принадлежат классу многогранников Джонсона.</p><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><a href="https://ru.wikipedia.org/wiki/%D0%91%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB#%D0%9C%D0%BD%D0%BE%D0%B6%D0%B5%D1%81%D1%82%D0%B2%D0%BE_%D0%BE%D1%80%D1%82%D0%BE%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB%D0%BE%D0%B2" title="Бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Прямые куполы</a></th><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Повёрнутые куполы</th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Копланарный</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">27</sub>(2М<sub style="line-height: 1em; font-size: 11.2px;">4</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">28</sub>(2М<sub style="line-height: 1em; font-size: 11.2px;">5</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">30</sub>(2М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">26</sub>(П<sub style="line-height: 1em; font-size: 11.2px;">3</sub>+<u>П</u><sub style="line-height: 1em; font-size: 11.2px;">3</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Полуправильный</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">29</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">5</sub>+<u>М</u><sub style="line-height: 1em; font-size: 11.2px;">5</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">31</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+<u>М</u><sub style="line-height: 1em; font-size: 11.2px;">6</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Двускатный прямой бикупол</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D1%80%D1%8F%D0%BC%D0%BE%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Трёхскатный прямой бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Трёхскатный прямой бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A7%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D1%80%D1%8F%D0%BC%D0%BE%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Четырёхскатный прямой бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Четырёхскатный прямой бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D1%80%D1%8F%D0%BC%D0%BE%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Пятискатный прямой бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатный прямой бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Двускатный повёрнутый бикупол<br>(<a href="https://ru.wikipedia.org/wiki/%D0%93%D0%B8%D1%80%D0%BE%D0%B1%D0%B8%D1%84%D0%B0%D1%81%D1%82%D0%B8%D0%B3%D0%B8%D1%83%D0%BC" title="Гиробифастигиум" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">гиробифастигиум</a>)</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Треугольный повёрнутый бикупол<br>(<a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Кубооктаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">кубооктаэдр</a>)</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A7%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D0%BE%D0%B2%D1%91%D1%80%D0%BD%D1%83%D1%82%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Четырёхскатный повёрнутый бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Четырёхскатный повёрнутый бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D0%BE%D0%B2%D1%91%D1%80%D0%BD%D1%83%D1%82%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Пятискатный повёрнутый бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатный повёрнутый бикупол</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Digonal_orthobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Digonal orthobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/c/ca/Digonal_orthobicupola.png/80px-Digonal_orthobicupola.png" decoding="async" width="80" height="94" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/c/ca/Digonal_orthobicupola.png/120px-Digonal_orthobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/c/ca/Digonal_orthobicupola.png/160px-Digonal_orthobicupola.png 2x" data-file-width="1011" data-file-height="1189" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_orthobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular orthobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/30/Triangular_orthobicupola.png/80px-Triangular_orthobicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/30/Triangular_orthobicupola.png/120px-Triangular_orthobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/30/Triangular_orthobicupola.png/160px-Triangular_orthobicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_orthobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square orthobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/7/76/Square_orthobicupola.png/80px-Square_orthobicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/7/76/Square_orthobicupola.png/120px-Square_orthobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/7/76/Square_orthobicupola.png/160px-Square_orthobicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_orthobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal orthobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Pentagonal_orthobicupola.png/80px-Pentagonal_orthobicupola.png" decoding="async" width="80" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Pentagonal_orthobicupola.png/120px-Pentagonal_orthobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Pentagonal_orthobicupola.png/160px-Pentagonal_orthobicupola.png 2x" data-file-width="513" data-file-height="257" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyrobifastigium.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyrobifastigium.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/89/Gyrobifastigium.png/80px-Gyrobifastigium.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/89/Gyrobifastigium.png/120px-Gyrobifastigium.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/89/Gyrobifastigium.png/160px-Gyrobifastigium.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Cuboctahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Cuboctahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Cuboctahedron.png/80px-Cuboctahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Cuboctahedron.png/120px-Cuboctahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Cuboctahedron.png/160px-Cuboctahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_gyrobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square gyrobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/ee/Square_gyrobicupola.png/80px-Square_gyrobicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/ee/Square_gyrobicupola.png/120px-Square_gyrobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/ee/Square_gyrobicupola.png/160px-Square_gyrobicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_gyrobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal gyrobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/6c/Pentagonal_gyrobicupola.png/80px-Pentagonal_gyrobicupola.png" decoding="async" width="80" height="39" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/6c/Pentagonal_gyrobicupola.png/120px-Pentagonal_gyrobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/6c/Pentagonal_gyrobicupola.png/160px-Pentagonal_gyrobicupola.png 2x" data-file-width="521" data-file-height="253" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_27_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 27 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Johnson_solid_27_net.png/80px-Johnson_solid_27_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Johnson_solid_27_net.png/120px-Johnson_solid_27_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/aa/Johnson_solid_27_net.png/160px-Johnson_solid_27_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_28_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 28 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/d/d5/Johnson_solid_28_net.png/80px-Johnson_solid_28_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/d/d5/Johnson_solid_28_net.png/120px-Johnson_solid_28_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/d/d5/Johnson_solid_28_net.png/160px-Johnson_solid_28_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_30_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 30 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b8/Johnson_solid_30_net.png/80px-Johnson_solid_30_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b8/Johnson_solid_30_net.png/120px-Johnson_solid_30_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b8/Johnson_solid_30_net.png/160px-Johnson_solid_30_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_26_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 26 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/6d/Johnson_solid_26_net.png/80px-Johnson_solid_26_net.png" decoding="async" width="80" height="50" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/6d/Johnson_solid_26_net.png/120px-Johnson_solid_26_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/6d/Johnson_solid_26_net.png/160px-Johnson_solid_26_net.png 2x" data-file-width="997" data-file-height="622" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Cuboctahedron_flat.svg?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Cuboctahedron flat.svg" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/2e/Cuboctahedron_flat.svg/80px-Cuboctahedron_flat.svg.png" decoding="async" width="80" height="67" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/2e/Cuboctahedron_flat.svg/120px-Cuboctahedron_flat.svg.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/2e/Cuboctahedron_flat.svg/160px-Cuboctahedron_flat.svg.png 2x" data-file-width="215" data-file-height="180" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_29_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 29 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a4/Johnson_solid_29_net.png/80px-Johnson_solid_29_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a4/Johnson_solid_29_net.png/120px-Johnson_solid_29_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a4/Johnson_solid_29_net.png/160px-Johnson_solid_29_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_31_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 31 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bd/Johnson_solid_31_net.png/80px-Johnson_solid_31_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bd/Johnson_solid_31_net.png/120px-Johnson_solid_31_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bd/Johnson_solid_31_net.png/160px-Johnson_solid_31_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr><th colspan="8" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Получены из многогранников</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/40px-Triangular_prism.png" decoding="async" width="40" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/60px-Triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/80px-Triangular_prism.png 2x" data-file-width="730" data-file-height="925" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/40px-Triangular_cupola.png" decoding="async" width="40" height="30" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/60px-Triangular_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/80px-Triangular_cupola.png 2x" data-file-width="440" data-file-height="326" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/40px-Square_cupola.png" decoding="async" width="40" height="34" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/60px-Square_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/80px-Square_cupola.png 2x" data-file-width="455" data-file-height="386" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/40px-Pentagonal_cupola.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/60px-Pentagonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/80px-Pentagonal_cupola.png 2x" data-file-width="420" data-file-height="419" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/40px-Triangular_prism.png" decoding="async" width="40" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/60px-Triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/80px-Triangular_prism.png 2x" data-file-width="730" data-file-height="925" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/40px-Triangular_cupola.png" decoding="async" width="40" height="30" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/60px-Triangular_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/80px-Triangular_cupola.png 2x" data-file-width="440" data-file-height="326" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/40px-Square_cupola.png" decoding="async" width="40" height="34" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/60px-Square_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/80px-Square_cupola.png 2x" data-file-width="455" data-file-height="386" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/40px-Pentagonal_cupola.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/60px-Pentagonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/80px-Pentagonal_cupola.png 2x" data-file-width="420" data-file-height="419" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.9A.D1.83.D0.BF.D0.BE.D0.BB.D0.BE.D1.80.D0.BE.D1.82.D0.BE.D0.BD.D0.B4.D1.8B_.D0.B8_.D0.B1.D0.B8.D1.80.D0.BE.D1.82.D0.BE.D0.BD.D0.B4.D1.8B"></span><span class="mw-headline" id="Куполоротонды_и_биротонды">Куполоротонды и биротонды</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=10" class="mw-editsection-visualeditor" title="Редактировать раздел «Куполоротонды и биротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=10" title="Редактировать раздел «Куполоротонды и биротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Куполоротонды</th><th colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Биротонды</th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">32</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">33</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+<u>М</u><sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">34</sub>(2М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Полуправильная</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D1%8F%D0%BC%D0%B0%D1%8F_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB%D0%BE%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная прямая куполоротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная прямая куполоротонда</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%BE%D0%B2%D1%91%D1%80%D0%BD%D1%83%D1%82%D0%B0%D1%8F_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB%D0%BE%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная повёрнутая куполоротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная повёрнутая куполоротонда</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D1%8F%D0%BC%D0%B0%D1%8F_%D0%B1%D0%B8%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная прямая биротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная прямая биротонда</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Пятискатная повёрнутая биротонда<br><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%BE%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" title="Икосододекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">икосододекаэдр</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_orthocupolarotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal orthocupolarotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/9e/Pentagonal_orthocupolarotunda.png/80px-Pentagonal_orthocupolarotunda.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/9e/Pentagonal_orthocupolarotunda.png/120px-Pentagonal_orthocupolarotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/9e/Pentagonal_orthocupolarotunda.png/160px-Pentagonal_orthocupolarotunda.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_gyrocupolarotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal gyrocupolarotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/d/d2/Pentagonal_gyrocupolarotunda.png/80px-Pentagonal_gyrocupolarotunda.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/d/d2/Pentagonal_gyrocupolarotunda.png/120px-Pentagonal_gyrocupolarotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/d/d2/Pentagonal_gyrocupolarotunda.png/160px-Pentagonal_gyrocupolarotunda.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_orthobirotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal orthobirotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b8/Pentagonal_orthobirotunda.png/80px-Pentagonal_orthobirotunda.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b8/Pentagonal_orthobirotunda.png/120px-Pentagonal_orthobirotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b8/Pentagonal_orthobirotunda.png/160px-Pentagonal_orthobirotunda.png 2x" data-file-width="440" data-file-height="440" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Icosidodecahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Icosidodecahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Icosidodecahedron.png/80px-Icosidodecahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Icosidodecahedron.png/120px-Icosidodecahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Icosidodecahedron.png/160px-Icosidodecahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_32_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 32 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/81/Johnson_solid_32_net.png/80px-Johnson_solid_32_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/81/Johnson_solid_32_net.png/120px-Johnson_solid_32_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/81/Johnson_solid_32_net.png/160px-Johnson_solid_32_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_33_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 33 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/ea/Johnson_solid_33_net.png/80px-Johnson_solid_33_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/ea/Johnson_solid_33_net.png/120px-Johnson_solid_33_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/ea/Johnson_solid_33_net.png/160px-Johnson_solid_33_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_34_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 34 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/86/Johnson_solid_34_net.png/80px-Johnson_solid_34_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/86/Johnson_solid_34_net.png/120px-Johnson_solid_34_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/86/Johnson_solid_34_net.png/160px-Johnson_solid_34_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Icosidodecahedron_flat.svg?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Icosidodecahedron flat.svg" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/ab/Icosidodecahedron_flat.svg/80px-Icosidodecahedron_flat.svg.png" decoding="async" width="80" height="64" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/ab/Icosidodecahedron_flat.svg/120px-Icosidodecahedron_flat.svg.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/ab/Icosidodecahedron_flat.svg/160px-Icosidodecahedron_flat.svg.png 2x" data-file-width="512" data-file-height="412" style="vertical-align: middle;"></a></td></tr><tr align="center"><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Получены из многогранников</th></tr><tr align="center"><td colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Пятискатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатный купол</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная ротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная ротонда</a></td><td colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная ротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная ротонда</a></td></tr><tr align="center"><td colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/40px-Pentagonal_cupola.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/60px-Pentagonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/80px-Pentagonal_cupola.png 2x" data-file-width="420" data-file-height="419" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_rotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal rotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/40px-Pentagonal_rotunda.png" decoding="async" width="40" height="27" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/60px-Pentagonal_rotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/80px-Pentagonal_rotunda.png 2x" data-file-width="450" data-file-height="300" style="vertical-align: middle;"></a></td><td colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_rotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal rotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/40px-Pentagonal_rotunda.png" decoding="async" width="40" height="27" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/60px-Pentagonal_rotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/80px-Pentagonal_rotunda.png 2x" data-file-width="450" data-file-height="300" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.A3.D0.B4.D0.BB.D0.B8.D0.BD.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D0.B1.D0.B8.D0.BA.D1.83.D0.BF.D0.BE.D0.BB.D1.8B"></span><span class="mw-headline" id="Удлинённые_бикуполы">Удлинённые бикуполы</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=11" class="mw-editsection-visualeditor" title="Редактировать раздел «Удлинённые бикуполы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=11" title="Редактировать раздел «Удлинённые бикуполы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><span data-interwiki-lang="en" data-interwiki-article="Elongated orthobicupola"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%BF%D1%80%D1%8F%D0%BC%D0%BE%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB&amp;action=edit&amp;redlink=1" class="new" title="Удлинённый прямой бикупол (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённые прямые бикуполы</a></span><span class="noprint" style="font-weight: normal;"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Elongated_orthobicupola" class="extiw" title="en:Elongated orthobicupola" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></th><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><span data-interwiki-lang="en" data-interwiki-article="Elongated gyrobicupola"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%BF%D0%BE%D0%B2%D1%91%D1%80%D0%BD%D1%83%D1%82%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB&amp;action=edit&amp;redlink=1" class="new" title="Удлинённый повёрнутый бикупол (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённые повёрнутые бикуполы</a></span><span class="noprint" style="font-weight: normal;"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Elongated_gyrobicupola" class="extiw" title="en:Elongated gyrobicupola" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Копланарный</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">35</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">4</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">4</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Полуправильный</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">38</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">10</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Копланарный</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">36</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">4</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+<u>М</u><sub style="line-height: 1em; font-size: 11.2px;">4</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">37</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">5</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">8</sub>+<u>М</u><sub style="line-height: 1em; font-size: 11.2px;">5</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">39</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">10</sub>+<u>М</u><sub style="line-height: 1em; font-size: 11.2px;">6</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Удлинённый двускатный прямой бикупол</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D1%82%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D1%80%D1%8F%D0%BC%D0%BE%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Удлинённый трёхскатный прямой бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённый трёхскатный прямой бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Удлинённый квадратный прямой бикупол<br>(<a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D0%BC%D0%B1%D0%BE%D0%BA%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Ромбокубооктаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">ромбокубооктаэдр</a>)</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D1%80%D1%8F%D0%BC%D0%BE%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Удлинённый пятискатный прямой бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённый пятискатный прямой бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Удлинённый двухскатный повёрнутый бикупол</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D1%82%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D0%BE%D0%B2%D1%91%D1%80%D0%BD%D1%83%D1%82%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Удлинённый трёхскатный повёрнутый бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённый трёхскатный повёрнутый бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D1%87%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D0%BE%D0%B2%D1%91%D1%80%D0%BD%D1%83%D1%82%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" class="mw-redirect" title="Удлинённый четырёхскатный повёрнутый бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённый четырёхскатный повёрнутый бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BF%D0%BE%D0%B2%D1%91%D1%80%D0%BD%D1%83%D1%82%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Удлинённый пятискатный повёрнутый бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённый пятискатный повёрнутый бикупол</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_digonal_orthobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated digonal orthobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/d/dc/Elongated_digonal_orthobicupola.png/60px-Elongated_digonal_orthobicupola.png" decoding="async" width="60" height="100" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/d/dc/Elongated_digonal_orthobicupola.png/90px-Elongated_digonal_orthobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/d/dc/Elongated_digonal_orthobicupola.png/120px-Elongated_digonal_orthobicupola.png 2x" data-file-width="675" data-file-height="1124" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_triangular_orthobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated triangular orthobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/8a/Elongated_triangular_orthobicupola.png/80px-Elongated_triangular_orthobicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/8a/Elongated_triangular_orthobicupola.png/120px-Elongated_triangular_orthobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/8a/Elongated_triangular_orthobicupola.png/160px-Elongated_triangular_orthobicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Small_rhombicuboctahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Small rhombicuboctahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/ad/Small_rhombicuboctahedron.png/80px-Small_rhombicuboctahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/ad/Small_rhombicuboctahedron.png/120px-Small_rhombicuboctahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/ad/Small_rhombicuboctahedron.png/160px-Small_rhombicuboctahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_orthobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal orthobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/81/Elongated_pentagonal_orthobicupola.png/80px-Elongated_pentagonal_orthobicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/81/Elongated_pentagonal_orthobicupola.png/120px-Elongated_pentagonal_orthobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/81/Elongated_pentagonal_orthobicupola.png/160px-Elongated_pentagonal_orthobicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_digonal_gyrobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated digonal gyrobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/93/Elongated_digonal_gyrobicupola.png/60px-Elongated_digonal_gyrobicupola.png" decoding="async" width="60" height="105" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/93/Elongated_digonal_gyrobicupola.png/90px-Elongated_digonal_gyrobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/93/Elongated_digonal_gyrobicupola.png/120px-Elongated_digonal_gyrobicupola.png 2x" data-file-width="678" data-file-height="1191" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_triangular_gyrobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated triangular gyrobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a4/Elongated_triangular_gyrobicupola.png/80px-Elongated_triangular_gyrobicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a4/Elongated_triangular_gyrobicupola.png/120px-Elongated_triangular_gyrobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a4/Elongated_triangular_gyrobicupola.png/160px-Elongated_triangular_gyrobicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_square_gyrobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated square gyrobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b7/Elongated_square_gyrobicupola.png/80px-Elongated_square_gyrobicupola.png" decoding="async" width="80" height="81" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b7/Elongated_square_gyrobicupola.png/120px-Elongated_square_gyrobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b7/Elongated_square_gyrobicupola.png/160px-Elongated_square_gyrobicupola.png 2x" data-file-width="449" data-file-height="453" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_gyrobicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal gyrobicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/ae/Elongated_pentagonal_gyrobicupola.png/80px-Elongated_pentagonal_gyrobicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/ae/Elongated_pentagonal_gyrobicupola.png/120px-Elongated_pentagonal_gyrobicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/ae/Elongated_pentagonal_gyrobicupola.png/160px-Elongated_pentagonal_gyrobicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_35_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 35 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/1f/Johnson_solid_35_net.png/80px-Johnson_solid_35_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/1f/Johnson_solid_35_net.png/120px-Johnson_solid_35_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/1f/Johnson_solid_35_net.png/160px-Johnson_solid_35_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Rhombicuboctahedron_flat.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Rhombicuboctahedron flat.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/50/Rhombicuboctahedron_flat.png/80px-Rhombicuboctahedron_flat.png" decoding="async" width="80" height="72" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/50/Rhombicuboctahedron_flat.png/120px-Rhombicuboctahedron_flat.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/50/Rhombicuboctahedron_flat.png/160px-Rhombicuboctahedron_flat.png 2x" data-file-width="999" data-file-height="898" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_38_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 38 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/38/Johnson_solid_38_net.png/80px-Johnson_solid_38_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/38/Johnson_solid_38_net.png/120px-Johnson_solid_38_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/38/Johnson_solid_38_net.png/160px-Johnson_solid_38_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_36_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 36 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/ad/Johnson_solid_36_net.png/80px-Johnson_solid_36_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/ad/Johnson_solid_36_net.png/120px-Johnson_solid_36_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/ad/Johnson_solid_36_net.png/160px-Johnson_solid_36_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_37_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 37 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/86/Johnson_solid_37_net.png/80px-Johnson_solid_37_net.png" decoding="async" width="80" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/86/Johnson_solid_37_net.png/120px-Johnson_solid_37_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/86/Johnson_solid_37_net.png/160px-Johnson_solid_37_net.png 2x" data-file-width="1055" data-file-height="669" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_39_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 39 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/16/Johnson_solid_39_net.png/80px-Johnson_solid_39_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/16/Johnson_solid_39_net.png/120px-Johnson_solid_39_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/16/Johnson_solid_39_net.png/160px-Johnson_solid_39_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.A3.D0.B4.D0.BB.D0.B8.D0.BD.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D0.BA.D1.83.D0.BF.D0.BE.D0.BB.D0.BE.D1.80.D0.BE.D1.82.D0.BE.D0.BD.D0.B4.D1.8B_.D0.B8_.D0.B1.D0.B8.D1.80.D0.BE.D1.82.D0.BE.D0.BD.D0.B4.D1.8B"></span><span class="mw-headline" id="Удлинённые_куполоротонды_и_биротонды">Удлинённые куполоротонды и биротонды</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=12" class="mw-editsection-visualeditor" title="Редактировать раздел «Удлинённые куполоротонды и биротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=12" title="Редактировать раздел «Удлинённые куполоротонды и биротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Удлинённые куполоротонды</th><th colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Удлинённые биротонды</th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">40</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">10</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">41</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">10</sub>+<u>М</u><sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">42</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">10</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">43</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">10</sub>+<u>М</u><sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D1%8F%D0%BC%D0%B0%D1%8F_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB%D0%BE%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Удлинённая пятискатная прямая куполоротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая пятискатная прямая куполоротонда</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%BE%D0%B2%D1%91%D1%80%D0%BD%D1%83%D1%82%D0%B0%D1%8F_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB%D0%BE%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Удлинённая пятискатная повёрнутая куполоротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая пятискатная повёрнутая куполоротонда</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D1%8F%D0%BC%D0%B0%D1%8F_%D0%B1%D0%B8%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Удлинённая пятискатная прямая биротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая пятискатная прямая биротонда</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%BE%D0%B2%D1%91%D1%80%D0%BD%D1%83%D1%82%D0%B0%D1%8F_%D0%B1%D0%B8%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Удлинённая пятискатная повёрнутая биротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая пятискатная повёрнутая биротонда</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_orthocupolarotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal orthocupolarotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/c/c6/Elongated_pentagonal_orthocupolarotunda.png/80px-Elongated_pentagonal_orthocupolarotunda.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/c/c6/Elongated_pentagonal_orthocupolarotunda.png/120px-Elongated_pentagonal_orthocupolarotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/c/c6/Elongated_pentagonal_orthocupolarotunda.png/160px-Elongated_pentagonal_orthocupolarotunda.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_gyrocupolarotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal gyrocupolarotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/ef/Elongated_pentagonal_gyrocupolarotunda.png/80px-Elongated_pentagonal_gyrocupolarotunda.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/ef/Elongated_pentagonal_gyrocupolarotunda.png/120px-Elongated_pentagonal_gyrocupolarotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/ef/Elongated_pentagonal_gyrocupolarotunda.png/160px-Elongated_pentagonal_gyrocupolarotunda.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_orthobirotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal orthobirotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/f2/Elongated_pentagonal_orthobirotunda.png/80px-Elongated_pentagonal_orthobirotunda.png" decoding="async" width="80" height="87" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/f2/Elongated_pentagonal_orthobirotunda.png/120px-Elongated_pentagonal_orthobirotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/f2/Elongated_pentagonal_orthobirotunda.png/160px-Elongated_pentagonal_orthobirotunda.png 2x" data-file-width="406" data-file-height="441" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_pentagonal_gyrobirotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated pentagonal gyrobirotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/d/df/Elongated_pentagonal_gyrobirotunda.png/80px-Elongated_pentagonal_gyrobirotunda.png" decoding="async" width="80" height="87" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/d/df/Elongated_pentagonal_gyrobirotunda.png/120px-Elongated_pentagonal_gyrobirotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/d/df/Elongated_pentagonal_gyrobirotunda.png/160px-Elongated_pentagonal_gyrobirotunda.png 2x" data-file-width="412" data-file-height="450" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_40_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 40 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/89/Johnson_solid_40_net.png/80px-Johnson_solid_40_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/89/Johnson_solid_40_net.png/120px-Johnson_solid_40_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/89/Johnson_solid_40_net.png/160px-Johnson_solid_40_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_41_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 41 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/3a/Johnson_solid_41_net.png/80px-Johnson_solid_41_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/3a/Johnson_solid_41_net.png/120px-Johnson_solid_41_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/3a/Johnson_solid_41_net.png/160px-Johnson_solid_41_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_42_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 42 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/80/Johnson_solid_42_net.png/80px-Johnson_solid_42_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/80/Johnson_solid_42_net.png/120px-Johnson_solid_42_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/80/Johnson_solid_42_net.png/160px-Johnson_solid_42_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_43_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 43 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/fc/Johnson_solid_43_net.png/80px-Johnson_solid_43_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/fc/Johnson_solid_43_net.png/120px-Johnson_solid_43_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/fc/Johnson_solid_43_net.png/160px-Johnson_solid_43_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.A1.D0.BA.D1.80.D1.83.D1.87.D0.B5.D0.BD.D0.BD.D0.BE_.D1.83.D0.B4.D0.BB.D0.B8.D0.BD.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D0.B1.D0.B8.D0.BA.D1.83.D0.BF.D0.BE.D0.BB.D1.8B.2C_.D0.BA.D1.83.D0.BF.D0.BE.D0.BB.D0.BE.D1.80.D0.BE.D1.82.D0.BE.D0.BD.D0.B4.D1.8B_.D0.B8_.D0.B1.D0.B8.D1.80.D0.BE.D1.82.D0.BE.D0.BD.D0.B4.D1.8B"></span><span class="mw-headline" id="Скрученно_удлинённые_бикуполы,_куполоротонды_и_биротонды">Скрученно удлинённые бикуполы, куполоротонды и биротонды</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=13" class="mw-editsection-visualeditor" title="Редактировать раздел «Скрученно удлинённые бикуполы, куполоротонды и биротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=13" title="Редактировать раздел «Скрученно удлинённые бикуполы, куполоротонды и биротонды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Следующие тела Джонсона имеют две&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A5%D0%B8%D1%80%D0%B0%D0%BB%D1%8C%D0%BD%D0%BE%D1%81%D1%82%D1%8C_(%D0%BC%D0%B0%D1%82%D0%B5%D0%BC%D0%B0%D1%82%D0%B8%D0%BA%D0%B0)" title="Хиральность (математика)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">хиральные</a>&nbsp;формы.</p><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;"><span data-interwiki-lang="en" data-interwiki-article="Gyroelongated bicupola"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB&amp;action=edit&amp;redlink=1" class="new" title="Скрученно удлинённый бикупол (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённые бикуполы</a></span><span class="noprint" style="font-weight: normal;"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Gyroelongated_bicupola" class="extiw" title="en:Gyroelongated bicupola" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Скрученно удлинённая куполоротонда</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Скрученно удлинённая биротонда</th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Невыпуклый</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">44</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">4</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">4</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">45</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">5</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">8</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">5</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">46</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">10</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">47</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">10</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">48</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>+А<sub style="line-height: 1em; font-size: 11.2px;">10</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">9</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;">Скрученно удлинённый двускатный бикупол</td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D1%82%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Скрученно удлинённый трёхскатный бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённый трёхскатный бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D1%87%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Скрученно удлинённый четырёхскатный бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённый четырёхскатный бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%B1%D0%B8%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Скрученно удлинённый пятискатный бикупол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённый пятискатный бикупол</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB%D0%BE%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Скрученно удлинённая пятискатная куполоротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённая пятискатная куполоротонда</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BA%D1%80%D1%83%D1%87%D0%B5%D0%BD%D0%BD%D0%BE_%D1%83%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%B1%D0%B8%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Скрученно удлинённая пятискатная биротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Скрученно удлинённая пятискатная биротонда</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_digonal_bicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated digonal bicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b3/Gyroelongated_digonal_bicupola.png/80px-Gyroelongated_digonal_bicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b3/Gyroelongated_digonal_bicupola.png/120px-Gyroelongated_digonal_bicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b3/Gyroelongated_digonal_bicupola.png/160px-Gyroelongated_digonal_bicupola.png 2x" data-file-width="1200" data-file-height="1200" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_triangular_bicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated triangular bicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/5c/Gyroelongated_triangular_bicupola.png/80px-Gyroelongated_triangular_bicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/5c/Gyroelongated_triangular_bicupola.png/120px-Gyroelongated_triangular_bicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/5c/Gyroelongated_triangular_bicupola.png/160px-Gyroelongated_triangular_bicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_square_bicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated square bicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/51/Gyroelongated_square_bicupola.png/80px-Gyroelongated_square_bicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/51/Gyroelongated_square_bicupola.png/120px-Gyroelongated_square_bicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/51/Gyroelongated_square_bicupola.png/160px-Gyroelongated_square_bicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_pentagonal_bicupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated pentagonal bicupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/8c/Gyroelongated_pentagonal_bicupola.png/80px-Gyroelongated_pentagonal_bicupola.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/8c/Gyroelongated_pentagonal_bicupola.png/120px-Gyroelongated_pentagonal_bicupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/8c/Gyroelongated_pentagonal_bicupola.png/160px-Gyroelongated_pentagonal_bicupola.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_pentagonal_cupolarotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated pentagonal cupolarotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/0d/Gyroelongated_pentagonal_cupolarotunda.png/80px-Gyroelongated_pentagonal_cupolarotunda.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/0d/Gyroelongated_pentagonal_cupolarotunda.png/120px-Gyroelongated_pentagonal_cupolarotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/0d/Gyroelongated_pentagonal_cupolarotunda.png/160px-Gyroelongated_pentagonal_cupolarotunda.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Gyroelongated_pentagonal_birotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Gyroelongated pentagonal birotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/1f/Gyroelongated_pentagonal_birotunda.png/80px-Gyroelongated_pentagonal_birotunda.png" decoding="async" width="80" height="88" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/1f/Gyroelongated_pentagonal_birotunda.png/120px-Gyroelongated_pentagonal_birotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/1f/Gyroelongated_pentagonal_birotunda.png/160px-Gyroelongated_pentagonal_birotunda.png 2x" data-file-width="408" data-file-height="447" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_44_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 44 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/30/Johnson_solid_44_net.png/80px-Johnson_solid_44_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/30/Johnson_solid_44_net.png/120px-Johnson_solid_44_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/30/Johnson_solid_44_net.png/160px-Johnson_solid_44_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_45_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 45 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/ba/Johnson_solid_45_net.png/80px-Johnson_solid_45_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/ba/Johnson_solid_45_net.png/120px-Johnson_solid_45_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/ba/Johnson_solid_45_net.png/160px-Johnson_solid_45_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_46_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 46 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/fb/Johnson_solid_46_net.png/80px-Johnson_solid_46_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/fb/Johnson_solid_46_net.png/120px-Johnson_solid_46_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/fb/Johnson_solid_46_net.png/160px-Johnson_solid_46_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_47_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 47 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/7/73/Johnson_solid_47_net.png/80px-Johnson_solid_47_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/7/73/Johnson_solid_47_net.png/120px-Johnson_solid_47_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/7/73/Johnson_solid_47_net.png/160px-Johnson_solid_47_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_48_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 48 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/2e/Johnson_solid_48_net.png/80px-Johnson_solid_48_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/2e/Johnson_solid_48_net.png/120px-Johnson_solid_48_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/2e/Johnson_solid_48_net.png/160px-Johnson_solid_48_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr align="center"><th colspan="6" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Получены из многогранников</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Треугольная призма</a><br><span data-interwiki-lang="en" data-interwiki-article="Square antiprism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A7%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Четырёхугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Четырёхугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Square_antiprism" class="extiw" title="en:Square antiprism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Трёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Трёхскатный купол</a><br><a href="https://ru.wikipedia.org/wiki/%D0%A8%D0%B5%D1%81%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Шестиугольная антипризма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Шестиугольная антипризма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A7%D0%B5%D1%82%D1%8B%D1%80%D1%91%D1%85%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Четырёхскатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Четырёхскатный купол</a><br><span data-interwiki-lang="en" data-interwiki-article="Octagonal antiprism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%92%D0%BE%D1%81%D1%8C%D0%BC%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Восьмиугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Восьмиугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Octagonal_antiprism" class="extiw" title="en:Octagonal antiprism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Пятискатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатный купол</a><br><span data-interwiki-lang="en" data-interwiki-article="Decagonal antiprism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%94%D0%B5%D1%81%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Десятиугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Десятиугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Decagonal_antiprism" class="extiw" title="en:Decagonal antiprism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D1%8B%D0%B9_%D0%BA%D1%83%D0%BF%D0%BE%D0%BB" title="Пятискатный купол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатный купол</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная ротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная ротонда</a><br><span data-interwiki-lang="en" data-interwiki-article="Decagonal antiprism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%94%D0%B5%D1%81%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Десятиугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Десятиугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Decagonal_antiprism" class="extiw" title="en:Decagonal antiprism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%81%D0%BA%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D1%80%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0" title="Пятискатная ротонда" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятискатная ротонда</a><br><span data-interwiki-lang="en" data-interwiki-article="Decagonal antiprism"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%94%D0%B5%D1%81%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%B0%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0&amp;action=edit&amp;redlink=1" class="new" title="Десятиугольная антипризма (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Десятиугольная антипризма</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://en.wikipedia.org/wiki/Decagonal_antiprism" class="extiw" title="en:Decagonal antiprism" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[en]</a></sup></span></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/40px-Triangular_prism.png" decoding="async" width="40" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/60px-Triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/80px-Triangular_prism.png 2x" data-file-width="730" data-file-height="925" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Square_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/40px-Square_antiprism.png" decoding="async" width="40" height="38" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/60px-Square_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/29/Square_antiprism.png/80px-Square_antiprism.png 2x" data-file-width="950" data-file-height="893" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/40px-Triangular_cupola.png" decoding="async" width="40" height="30" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/60px-Triangular_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/93/Triangular_cupola.png/80px-Triangular_cupola.png 2x" data-file-width="440" data-file-height="326" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Hexagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Hexagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/13/Hexagonal_antiprism.png/40px-Hexagonal_antiprism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/13/Hexagonal_antiprism.png/60px-Hexagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/13/Hexagonal_antiprism.png/80px-Hexagonal_antiprism.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Square_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/40px-Square_cupola.png" decoding="async" width="40" height="34" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/60px-Square_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/41/Square_cupola.png/80px-Square_cupola.png 2x" data-file-width="455" data-file-height="386" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Octagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Octagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b5/Octagonal_antiprism.png/40px-Octagonal_antiprism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b5/Octagonal_antiprism.png/60px-Octagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b5/Octagonal_antiprism.png/80px-Octagonal_antiprism.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/40px-Pentagonal_cupola.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/60px-Pentagonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/80px-Pentagonal_cupola.png 2x" data-file-width="420" data-file-height="419" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Decagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Decagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/40px-Decagonal_antiprism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/60px-Decagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/80px-Decagonal_antiprism.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_cupola.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal cupola.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/40px-Pentagonal_cupola.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/60px-Pentagonal_cupola.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bc/Pentagonal_cupola.png/80px-Pentagonal_cupola.png 2x" data-file-width="420" data-file-height="419" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_rotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal rotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/40px-Pentagonal_rotunda.png" decoding="async" width="40" height="27" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/60px-Pentagonal_rotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/80px-Pentagonal_rotunda.png 2x" data-file-width="450" data-file-height="300" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Decagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Decagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/40px-Decagonal_antiprism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/60px-Decagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/80px-Decagonal_antiprism.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_rotunda.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal rotunda.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/40px-Pentagonal_rotunda.png" decoding="async" width="40" height="27" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/60px-Pentagonal_rotunda.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a6/Pentagonal_rotunda.png/80px-Pentagonal_rotunda.png 2x" data-file-width="450" data-file-height="300" style="vertical-align: middle;"></a><a href="https://commons.wikimedia.org/wiki/File:Decagonal_antiprism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Decagonal antiprism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/40px-Decagonal_antiprism.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/60px-Decagonal_antiprism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/2c/Decagonal_antiprism.png/80px-Decagonal_antiprism.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.9D.D0.B0.D1.80.D0.B0.D1.89.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D1.82.D1.80.D0.B5.D1.83.D0.B3.D0.BE.D0.BB.D1.8C.D0.BD.D1.8B.D0.B5_.D0.BF.D1.80.D0.B8.D0.B7.D0.BC.D1.8B"></span><span class="mw-headline" id="Наращённые_треугольные_призмы">Наращённые треугольные призмы</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=14" class="mw-editsection-visualeditor" title="Редактировать раздел «Наращённые треугольные призмы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=14" title="Редактировать раздел «Наращённые треугольные призмы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">7</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">1</sub>+ П<sub style="line-height: 1em; font-size: 11.2px;">3</sub>)<br>(повторно)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">49</sub>(П<sub style="line-height: 1em; font-size: 11.2px;">3</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">50</sub>(П<sub style="line-height: 1em; font-size: 11.2px;">3</sub>+2М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">51</sub>(П<sub style="line-height: 1em; font-size: 11.2px;">3</sub>+3М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A3%D0%B4%D0%BB%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%82%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Удлинённая треугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Удлинённая треугольная пирамида</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9D%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%82%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Наращённая треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Наращённая треугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D0%B0%D0%B6%D0%B4%D1%8B_%D0%BD%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%82%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Дважды наращённая треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Дважды наращённая треугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B8%D0%B6%D0%B4%D1%8B_%D0%BD%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%82%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Трижды наращённая треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Трижды наращённая треугольная призма</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Elongated_triangular_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Elongated triangular pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/3e/Elongated_triangular_pyramid.png/80px-Elongated_triangular_pyramid.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/3e/Elongated_triangular_pyramid.png/120px-Elongated_triangular_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/3e/Elongated_triangular_pyramid.png/160px-Elongated_triangular_pyramid.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Augmented_triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Augmented triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/15/Augmented_triangular_prism.png/80px-Augmented_triangular_prism.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/15/Augmented_triangular_prism.png/120px-Augmented_triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/15/Augmented_triangular_prism.png/160px-Augmented_triangular_prism.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Biaugmented_triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Biaugmented triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/be/Biaugmented_triangular_prism.png/80px-Biaugmented_triangular_prism.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/be/Biaugmented_triangular_prism.png/120px-Biaugmented_triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/be/Biaugmented_triangular_prism.png/160px-Biaugmented_triangular_prism.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triaugmented_triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triaugmented triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/1a/Triaugmented_triangular_prism.png/80px-Triaugmented_triangular_prism.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/1a/Triaugmented_triangular_prism.png/120px-Triaugmented_triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/1a/Triaugmented_triangular_prism.png/160px-Triaugmented_triangular_prism.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_7_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 7 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/48/Johnson_solid_7_net.png/80px-Johnson_solid_7_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/48/Johnson_solid_7_net.png/120px-Johnson_solid_7_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/48/Johnson_solid_7_net.png/160px-Johnson_solid_7_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_49_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 49 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/7/78/Johnson_solid_49_net.png/80px-Johnson_solid_49_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/7/78/Johnson_solid_49_net.png/120px-Johnson_solid_49_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/7/78/Johnson_solid_49_net.png/160px-Johnson_solid_49_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_50_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 50 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/ee/Johnson_solid_50_net.png/80px-Johnson_solid_50_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/ee/Johnson_solid_50_net.png/120px-Johnson_solid_50_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/ee/Johnson_solid_50_net.png/160px-Johnson_solid_50_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_51_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 51 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/5b/Johnson_solid_51_net.png/80px-Johnson_solid_51_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/5b/Johnson_solid_51_net.png/120px-Johnson_solid_51_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/5b/Johnson_solid_51_net.png/160px-Johnson_solid_51_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr align="center"><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Получены из многогранников</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Треугольная призма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тетраэдр</a></td><td colspan="3" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B5%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Треугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Треугольная призма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Квадратная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная пирамида</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/40px-Triangular_prism.png" decoding="async" width="40" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/60px-Triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/80px-Triangular_prism.png 2x" data-file-width="730" data-file-height="925" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Tetrahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Tetrahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/40px-Tetrahedron.png" decoding="async" width="40" height="40" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/60px-Tetrahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/25/Tetrahedron.png/80px-Tetrahedron.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triangular_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triangular prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/40px-Triangular_prism.png" decoding="async" width="40" height="51" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/60px-Triangular_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/21/Triangular_prism.png/80px-Triangular_prism.png 2x" data-file-width="730" data-file-height="925" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/40px-Square_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/60px-Square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/80px-Square_pyramid.png 2x" data-file-width="420" data-file-height="259" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.9D.D0.B0.D1.80.D0.B0.D1.89.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D0.BF.D1.8F.D1.82.D0.B8.D1.83.D0.B3.D0.BE.D0.BB.D1.8C.D0.BD.D1.8B.D0.B5_.D0.B8_.D1.88.D0.B5.D1.81.D1.82.D0.B8.D1.83.D0.B3.D0.BE.D0.BB.D1.8C.D0.BD.D1.8B.D0.B5_.D0.BF.D1.80.D0.B8.D0.B7.D0.BC.D1.8B"></span><span class="mw-headline" id="Наращённые_пятиугольные_и_шестиугольные_призмы">Наращённые пятиугольные и шестиугольные призмы</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=15" class="mw-editsection-visualeditor" title="Редактировать раздел «Наращённые пятиугольные и шестиугольные призмы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=15" title="Редактировать раздел «Наращённые пятиугольные и шестиугольные призмы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Наращённые пятиугольные призмы</th><th colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Наращённые шестиугольные призмы</th></tr><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">52</sub>(П<sub style="line-height: 1em; font-size: 11.2px;">5</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">53</sub>(П<sub style="line-height: 1em; font-size: 11.2px;">5</sub>+2М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">54</sub>(П<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">55</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>+П<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">56</sub>(П<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+2М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">57</sub>(П<sub style="line-height: 1em; font-size: 11.2px;">6</sub>+3М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9D%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Наращённая пятиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Наращённая пятиугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D0%B0%D0%B6%D0%B4%D1%8B_%D0%BD%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D0%BF%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Дважды наращённая пятиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Дважды наращённая пятиугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9D%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%88%D0%B5%D1%81%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Наращённая шестиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Наращённая шестиугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D0%B0%D0%B6%D0%B4%D1%8B_%D0%BF%D1%80%D0%BE%D1%82%D0%B8%D0%B2%D0%BE%D0%BF%D0%BE%D0%BB%D0%BE%D0%B6%D0%BD%D0%BE_%D0%BD%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%88%D0%B5%D1%81%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Дважды противоположно наращённая шестиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Дважды противоположно наращённая шестиугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D0%B0%D0%B6%D0%B4%D1%8B_%D0%BA%D0%BE%D1%81%D0%BE_%D0%BD%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%88%D0%B5%D1%81%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Дважды косо наращённая шестиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Дважды косо наращённая шестиугольная призма</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B8%D0%B6%D0%B4%D1%8B_%D0%BD%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D0%B0%D1%8F_%D1%88%D0%B5%D1%81%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Трижды наращённая шестиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Трижды наращённая шестиугольная призма</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Augmented_pentagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Augmented pentagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/34/Augmented_pentagonal_prism.png/80px-Augmented_pentagonal_prism.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/34/Augmented_pentagonal_prism.png/120px-Augmented_pentagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/34/Augmented_pentagonal_prism.png/160px-Augmented_pentagonal_prism.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Biaugmented_pentagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Biaugmented pentagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/f8/Biaugmented_pentagonal_prism.png/80px-Biaugmented_pentagonal_prism.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/f8/Biaugmented_pentagonal_prism.png/120px-Biaugmented_pentagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/f8/Biaugmented_pentagonal_prism.png/160px-Biaugmented_pentagonal_prism.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Augmented_hexagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Augmented hexagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/56/Augmented_hexagonal_prism.png/80px-Augmented_hexagonal_prism.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/56/Augmented_hexagonal_prism.png/120px-Augmented_hexagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/56/Augmented_hexagonal_prism.png/160px-Augmented_hexagonal_prism.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Parabiaugmented_hexagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Parabiaugmented hexagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/80/Parabiaugmented_hexagonal_prism.png/80px-Parabiaugmented_hexagonal_prism.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/80/Parabiaugmented_hexagonal_prism.png/120px-Parabiaugmented_hexagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/80/Parabiaugmented_hexagonal_prism.png/160px-Parabiaugmented_hexagonal_prism.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Metabiaugmented_hexagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Metabiaugmented hexagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/26/Metabiaugmented_hexagonal_prism.png/80px-Metabiaugmented_hexagonal_prism.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/26/Metabiaugmented_hexagonal_prism.png/120px-Metabiaugmented_hexagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/26/Metabiaugmented_hexagonal_prism.png/160px-Metabiaugmented_hexagonal_prism.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triaugmented_hexagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triaugmented hexagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/c/c7/Triaugmented_hexagonal_prism.png/80px-Triaugmented_hexagonal_prism.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/c/c7/Triaugmented_hexagonal_prism.png/120px-Triaugmented_hexagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/c/c7/Triaugmented_hexagonal_prism.png/160px-Triaugmented_hexagonal_prism.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_52_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 52 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/9c/Johnson_solid_52_net.png/80px-Johnson_solid_52_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/9c/Johnson_solid_52_net.png/120px-Johnson_solid_52_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/9c/Johnson_solid_52_net.png/160px-Johnson_solid_52_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_53_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 53 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/6a/Johnson_solid_53_net.png/80px-Johnson_solid_53_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/6a/Johnson_solid_53_net.png/120px-Johnson_solid_53_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/6a/Johnson_solid_53_net.png/160px-Johnson_solid_53_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_54_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 54 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/6/64/Johnson_solid_54_net.png/80px-Johnson_solid_54_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/6/64/Johnson_solid_54_net.png/120px-Johnson_solid_54_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/6/64/Johnson_solid_54_net.png/160px-Johnson_solid_54_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_55_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 55 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/9f/Johnson_solid_55_net.png/80px-Johnson_solid_55_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/9f/Johnson_solid_55_net.png/120px-Johnson_solid_55_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/9f/Johnson_solid_55_net.png/160px-Johnson_solid_55_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_56_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 56 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a8/Johnson_solid_56_net.png/80px-Johnson_solid_56_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a8/Johnson_solid_56_net.png/120px-Johnson_solid_56_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a8/Johnson_solid_56_net.png/160px-Johnson_solid_56_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_57_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 57 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/17/Johnson_solid_57_net.png/80px-Johnson_solid_57_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/17/Johnson_solid_57_net.png/120px-Johnson_solid_57_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/17/Johnson_solid_57_net.png/160px-Johnson_solid_57_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr align="center"><th colspan="6" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Получены из многогранников</th></tr><tr align="center"><td colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Пятиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Пятиугольная призма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Квадратная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная пирамида</a></td><td colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A8%D0%B5%D1%81%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Шестиугольная призма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Шестиугольная призма</a><br><a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%B2%D0%B0%D0%B4%D1%80%D0%B0%D1%82%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Квадратная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Квадратная пирамида</a></td></tr><tr align="center"><td colspan="2" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Pentagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/b6/Pentagonal_prism.png/40px-Pentagonal_prism.png" decoding="async" width="40" height="37" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/b6/Pentagonal_prism.png/60px-Pentagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/b6/Pentagonal_prism.png/80px-Pentagonal_prism.png 2x" data-file-width="967" data-file-height="903" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/40px-Square_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/60px-Square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/80px-Square_pyramid.png 2x" data-file-width="420" data-file-height="259" style="vertical-align: middle;"></a></td><td colspan="4" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Hexagonal_prism.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Hexagonal prism.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/2/25/Hexagonal_prism.png/40px-Hexagonal_prism.png" decoding="async" width="40" height="35" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/2/25/Hexagonal_prism.png/60px-Hexagonal_prism.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/2/25/Hexagonal_prism.png/80px-Hexagonal_prism.png 2x" data-file-width="991" data-file-height="858" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Square_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Square pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/40px-Square_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/60px-Square_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/53/Square_pyramid.png/80px-Square_pyramid.png 2x" data-file-width="420" data-file-height="259" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.9D.D0.B0.D1.80.D0.B0.D1.89.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D0.B4.D0.BE.D0.B4.D0.B5.D0.BA.D0.B0.D1.8D.D0.B4.D1.80.D1.8B"></span><span class="mw-headline" id="Наращённые_додекаэдры">Наращённые додекаэдры</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=16" class="mw-editsection-visualeditor" title="Редактировать раздел «Наращённые додекаэдры»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=16" title="Редактировать раздел «Наращённые додекаэдры»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><table class="wikitable" width="640" style="font-size: 14px; background-color: rgb(248, 249, 250); color: rgb(32, 33, 34); margin: 1em 0px; border: 1px solid rgb(162, 169, 177); font-family: sans-serif;"><tbody><tr><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Правильный</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">58</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">15</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">59</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">15</sub>+М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">60</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">15</sub>+2М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>)</th><th style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">J<sub style="line-height: 1em; font-size: 11.2px;">61</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">15</sub>+3М<sub style="line-height: 1em; font-size: 11.2px;">3</sub>)</th></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" class="mw-redirect" title="Додекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Додекаэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%9D%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" title="Наращённый додекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Наращённый додекаэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D0%B0%D0%B6%D0%B4%D1%8B_%D0%BF%D1%80%D0%BE%D1%82%D0%B8%D0%B2%D0%BE%D0%BF%D0%BE%D0%BB%D0%BE%D0%B6%D0%BD%D0%BE_%D0%BD%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" title="Дважды противоположно наращённый додекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Дважды противоположно наращённый додекаэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D0%B0%D0%B6%D0%B4%D1%8B_%D0%BA%D0%BE%D1%81%D0%BE_%D0%BD%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" title="Дважды косо наращённый додекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Дважды косо наращённый додекаэдр</a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%A2%D1%80%D0%B8%D0%B6%D0%B4%D1%8B_%D0%BD%D0%B0%D1%80%D0%B0%D1%89%D1%91%D0%BD%D0%BD%D1%8B%D0%B9_%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" title="Трижды наращённый додекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Трижды наращённый додекаэдр</a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Dodecahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Dodecahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/33/Dodecahedron.png/80px-Dodecahedron.png" decoding="async" width="80" height="77" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/33/Dodecahedron.png/120px-Dodecahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/33/Dodecahedron.png/160px-Dodecahedron.png 2x" data-file-width="984" data-file-height="951" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Augmented_dodecahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Augmented dodecahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/d/d0/Augmented_dodecahedron.png/80px-Augmented_dodecahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/d/d0/Augmented_dodecahedron.png/120px-Augmented_dodecahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/d/d0/Augmented_dodecahedron.png/160px-Augmented_dodecahedron.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Parabiaugmented_dodecahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Parabiaugmented dodecahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/44/Parabiaugmented_dodecahedron.png/80px-Parabiaugmented_dodecahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/44/Parabiaugmented_dodecahedron.png/120px-Parabiaugmented_dodecahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/44/Parabiaugmented_dodecahedron.png/160px-Parabiaugmented_dodecahedron.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Metabiaugmented_dodecahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Metabiaugmented dodecahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/1a/Metabiaugmented_dodecahedron.png/80px-Metabiaugmented_dodecahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/1a/Metabiaugmented_dodecahedron.png/120px-Metabiaugmented_dodecahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/1a/Metabiaugmented_dodecahedron.png/160px-Metabiaugmented_dodecahedron.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Triaugmented_dodecahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Triaugmented dodecahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/9/94/Triaugmented_dodecahedron.png/80px-Triaugmented_dodecahedron.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/9/94/Triaugmented_dodecahedron.png/120px-Triaugmented_dodecahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/9/94/Triaugmented_dodecahedron.png/160px-Triaugmented_dodecahedron.png 2x" data-file-width="512" data-file-height="512" style="vertical-align: middle;"></a></td></tr><tr align="center"><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Dodecahedron_flat.svg?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Dodecahedron flat.svg" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/1b/Dodecahedron_flat.svg/80px-Dodecahedron_flat.svg.png" decoding="async" width="80" height="41" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/1/1b/Dodecahedron_flat.svg/120px-Dodecahedron_flat.svg.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/1/1b/Dodecahedron_flat.svg/160px-Dodecahedron_flat.svg.png 2x" data-file-width="310" data-file-height="160" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_58_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 58 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/33/Johnson_solid_58_net.png/80px-Johnson_solid_58_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/33/Johnson_solid_58_net.png/120px-Johnson_solid_58_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/33/Johnson_solid_58_net.png/160px-Johnson_solid_58_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_59_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 59 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/8/8a/Johnson_solid_59_net.png/80px-Johnson_solid_59_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/8/8a/Johnson_solid_59_net.png/120px-Johnson_solid_59_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/8/8a/Johnson_solid_59_net.png/160px-Johnson_solid_59_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_60_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 60 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/5/58/Johnson_solid_60_net.png/80px-Johnson_solid_60_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/5/58/Johnson_solid_60_net.png/120px-Johnson_solid_60_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/5/58/Johnson_solid_60_net.png/160px-Johnson_solid_60_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td><td style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Johnson_solid_61_net.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Johnson solid 61 net.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/a/a1/Johnson_solid_61_net.png/80px-Johnson_solid_61_net.png" decoding="async" width="80" height="80" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/a/a1/Johnson_solid_61_net.png/120px-Johnson_solid_61_net.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/a/a1/Johnson_solid_61_net.png/160px-Johnson_solid_61_net.png 2x" data-file-width="1000" data-file-height="1000" style="vertical-align: middle;"></a></td></tr><tr align="center"><th colspan="5" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em; background-color: rgb(234, 236, 240); text-align: center;">Получены из многогранников</th></tr><tr align="center"><td colspan="5" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://ru.wikipedia.org/wiki/%D0%94%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" class="mw-redirect" title="Додекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Додекаэдр</a>&nbsp;и&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%8F%D1%82%D0%B8%D1%83%D0%B3%D0%BE%D0%BB%D1%8C%D0%BD%D0%B0%D1%8F_%D0%BF%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0" title="Пятиугольная пирамида" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пятиугольная пирамида</a></td></tr><tr align="center"><td colspan="5" style="border: 1px solid rgb(162, 169, 177); padding: 0.2em 0.4em;"><a href="https://commons.wikimedia.org/wiki/File:Dodecahedron.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Dodecahedron.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/3/33/Dodecahedron.png/40px-Dodecahedron.png" decoding="async" width="40" height="39" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/3/33/Dodecahedron.png/60px-Dodecahedron.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/3/33/Dodecahedron.png/80px-Dodecahedron.png 2x" data-file-width="984" data-file-height="951" style="vertical-align: middle;"></a>&nbsp;<a href="https://commons.wikimedia.org/wiki/File:Pentagonal_pyramid.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="Pentagonal pyramid.png" src="https://upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/40px-Pentagonal_pyramid.png" decoding="async" width="40" height="25" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/60px-Pentagonal_pyramid.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/0/02/Pentagonal_pyramid.png/80px-Pentagonal_pyramid.png 2x" data-file-width="413" data-file-height="255" style="vertical-align: middle;"></a></td></tr></tbody></table><h3 style="color: rgb(0, 0, 0); margin-top: 0.3em; margin-right: 0px; margin-left: 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.9E.D1.82.D1.81.D0.B5.D1.87.D1.91.D0.BD.D0.BD.D1.8B.D0.B5_.D0.B8.D0.BA.D0.BE.D1.81.D0.B0.D1.8D.D0.B4.D1.80.D1.8B"></span><br></h3>
28.03.2022 16:31:40: <p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В 1966 году&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9D%D0%BE%D1%80%D0%BC%D0%B0%D0%BD_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD" class="mw-redirect" title="Норман Джонсон" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Норман Джонсон</a>&nbsp;опубликовал список, в котором присутствовали все 92 тела, и дал им названия и номера. Он высказал гипотезу, что их только 92, то есть других нет.</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Ранее, в 1946&nbsp;году Л.&nbsp;Н.&nbsp;Есаулова прислала&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80%D0%BE%D0%B2,_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80_%D0%94%D0%B0%D0%BD%D0%B8%D0%BB%D0%BE%D0%B2%D0%B8%D1%87" title="Александров, Александр Данилович" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">А.&nbsp;Д.&nbsp;Александрову</a>&nbsp;письмо, в котором доказала, что правильногранных многогранников (кроме 5 правильных многогранников, 13 полуправильных и двух бесконечных серий (призмы и антипризм) может существовать лишь конечное число. В 1961 году Александров передал это письмо В.&nbsp;А.&nbsp;Залгаллеру, возможно из-за заметки Джонсона 1960 года<sup id="cite_ref-2" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0#cite_note-2" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[2]</a></sup>.</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В 1967 году&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%97%D0%B0%D0%BB%D0%B3%D0%B0%D0%BB%D0%BB%D0%B5%D1%80,_%D0%92%D0%B8%D0%BA%D1%82%D0%BE%D1%80_%D0%90%D0%B1%D1%80%D0%B0%D0%BC%D0%BE%D0%B2%D0%B8%D1%87" title="Залгаллер, Виктор Абрамович" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Виктор Залгаллер</a>&nbsp;опубликовал доказательство того, что список Джонсона полон. К решению была привлечена группа школьников&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A4%D0%B8%D0%B7%D0%B8%D0%BA%D0%BE-%D0%BC%D0%B0%D1%82%D0%B5%D0%BC%D0%B0%D1%82%D0%B8%D1%87%D0%B5%D1%81%D0%BA%D0%B8%D0%B9_%D0%BB%D0%B8%D1%86%D0%B5%D0%B9_%E2%84%96_239" title="Физико-математический лицей № 239" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">школы №&nbsp;239</a>. Полное доказательство заняло около 4 лет с&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%94%D0%BE%D0%BA%D0%B0%D0%B7%D0%B0%D1%82%D0%B5%D0%BB%D1%8C%D0%BD%D1%8B%D0%B5_%D0%B2%D1%8B%D1%87%D0%B8%D1%81%D0%BB%D0%B5%D0%BD%D0%B8%D1%8F" title="Доказательные вычисления" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">привлечением компьютерной техники</a>. В доказательстве также существенно использовалась&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D0%BE%D1%80%D0%B5%D0%BC%D0%B0_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80%D0%BE%D0%B2%D0%B0_%D0%BE_%D0%B2%D1%8B%D0%BF%D1%83%D0%BA%D0%BB%D1%8B%D1%85_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA%D0%B0%D1%85" class="mw-redirect" title="Теорема Александрова о выпуклых многогранниках" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">теорема Александрова о выпуклых многогранниках</a>.</p><h2 style="color: rgb(0, 0, 0); margin: 1em 0px 0.25em; padding: 0px; overflow: hidden; border-bottom: 1px solid rgb(162, 169, 177); font-size: 1.5em; font-weight: normal; font-family: &quot;Linux Libertine&quot;, Georgia, Times, serif; line-height: 1.3;"><span id=".D0.A2.D0.B5.D1.80.D0.BC.D0.B8.D0.BD.D0.BE.D0.BB.D0.BE.D0.B3.D0.B8.D1.8F"></span><span class="mw-headline" id="Терминология">Терминология</span><span class="mw-editsection" style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=2" class="mw-editsection-visualeditor" title="Редактировать раздел «Терминология»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=2" title="Редактировать раздел «Терминология»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h2><div class="thumb tright" style="clear: right; float: right; width: 416px; margin: 0.5em 0px 1.3em 1.4em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px; max-width: 100%;"><div class="thumbinner" style="padding: 3px; text-align: center; overflow: hidden; border: 1px solid rgb(200, 204, 209); background-color: rgb(248, 249, 250); font-size: 13.16px;"><div style="float: left; margin: 1px; width: 201px;"><div class="thumbimage" style="background-color: rgb(255, 255, 255); border: 1px solid rgb(200, 204, 209);"><a href="https://commons.wikimedia.org/wiki/File:Stella_octangula.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/19/Stella_octangula.png/200px-Stella_octangula.png" decoding="async" width="200" height="210" srcset="//upload.wikimedia.org/wikipedia/commons/1/19/Stella_octangula.png 1.5x" data-file-width="240" data-file-height="252" style="vertical-align: middle;"></a></div><div class="thumbcaption" style="text-align: left; line-height: 1.4em; padding: 3px; border: 0px; font-size: 12.3704px; clear: left;">Многогранник, имеющий&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%97%D0%B2%D1%91%D0%B7%D0%B4%D1%87%D0%B0%D1%82%D1%8B%D0%B9_%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Звёздчатый октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">24 правильных треугольника</a>&nbsp;в качестве граней,&nbsp;<span style="font-weight: 700;">не</span>&nbsp;является телом Джонсона, поскольку не является выпуклым. (Фактически это единственная&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%B1%D1%80%D0%B0%D0%B7%D0%BE%D0%B2%D0%B0%D0%BD%D0%B8%D0%B5_%D0%B7%D0%B2%D1%91%D0%B7%D0%B4%D1%87%D0%B0%D1%82%D0%BE%D0%B9_%D1%84%D0%BE%D1%80%D0%BC%D1%8B" title="Образование звёздчатой формы" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">звёздчатая форма</a>, возможная для&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">октаэдра</a>.)</div></div><div style="float: left; margin: 1px; width: 202px;"><div class="thumbimage" style="background-color: rgb(255, 255, 255); border: 1px solid rgb(200, 204, 209);"><a href="https://commons.wikimedia.org/wiki/File:Partial_cubic_honeycomb.png?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Partial_cubic_honeycomb.png/200px-Partial_cubic_honeycomb.png" decoding="async" width="200" height="198" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Partial_cubic_honeycomb.png/300px-Partial_cubic_honeycomb.png 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Partial_cubic_honeycomb.png/400px-Partial_cubic_honeycomb.png 2x" data-file-width="873" data-file-height="866" style="vertical-align: middle;"></a></div><div class="thumbcaption" style="text-align: left; line-height: 1.4em; padding: 3px; border: 0px; font-size: 12.3704px; clear: left;">Многогранник, имеющий 24 квадратных грани,&nbsp;<span style="font-weight: 700;">не</span>&nbsp;является телом Джонсона, поскольку не является строго выпуклым (имеет&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D1%83%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D1%8B%D0%B9_%D1%83%D0%B3%D0%BE%D0%BB" title="Двугранный угол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">двугранные углы</a>&nbsp;180°).</div></div><div style="clear: both;"></div></div><div style="clear: both;"></div></div><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Названия тел Джонсона имеют большую описательную способность. Большинство этих тел можно построить из нескольких тел (<a href="https://ru.wikipedia.org/wiki/%D0%9F%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Пирамида (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пирамид</a>,&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%BF%D0%BE%D0%BB_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Купол (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">куполов</a>&nbsp;и&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Ротонда (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">ротонд</a>), добавляя&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B0%D0%B2%D0%B8%D0%BB%D1%8C%D0%BD%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA" title="Правильный многогранник" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">платоновы</a>&nbsp;и&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%90%D1%80%D1%85%D0%B8%D0%BC%D0%B5%D0%B4%D0%BE%D0%B2%D0%BE_%D1%82%D0%B5%D0%BB%D0%BE" title="Архимедово тело" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">архимедовы</a>&nbsp;тела,&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B8%D0%B7%D0%BC%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Призма (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">призмы</a>&nbsp;и&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%90%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Антипризма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">антипризмы</a>.</p><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Би-</span>&nbsp;означает, что две копии тел соединены по основаниям. Для куполов и ротонд они могут быть соединены по граням одного типа (<span style="font-weight: 700;">прямые</span>) или по разным (<span style="font-weight: 700;">повёрнутые</span>).&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Октаэдр</a>, например, является&nbsp;<i>квадратной бипирамидой</i>,&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Кубооктаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">кубооктаэдр</a>&nbsp;—&nbsp;<i>повёрнутым треугольным бикуполом</i>, а&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%BE%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80" title="Икосододекаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">икосододекаэдр</a>&nbsp;—&nbsp;<i>повёрнутой пятиугольной биротондой</i>.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Удлинённый</span>&nbsp;означает, что к телу присоединена&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B8%D0%B7%D0%BC%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Призма (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">призма</a>&nbsp;или она вставлена между двумя частями тела.&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D0%BC%D0%B1%D0%BE%D0%BA%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Ромбокубооктаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Ромбокубооктаэдр</a>, например, является&nbsp;<i>удлинённым квадратным прямым бикуполом</i>.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Скрученно удлинённый</span>&nbsp;означает, что к телу присоединена&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%90%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0" title="Антипризма" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">антипризма</a>&nbsp;или она вставлена между двумя частями тела.&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%B0%D1%8D%D0%B4%D1%80" title="Икосаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Икосаэдр</a>, например, является&nbsp;<i>скрученно удлинённой пятиугольной бипирамидой</i>.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Наращённый</span>&nbsp;означает, что пирамида или купол присоединён к грани тела.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Отсечённый</span>&nbsp;означает, что пирамида или купол отрезан от тела.</li><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Скрученный</span>&nbsp;означает, что купол, принадлежащий многограннику, повёрнут таким же образом, как в повёрнутых бикуполах.</li></ul><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Последние три операции&nbsp;—&nbsp;<i>наращение</i>,&nbsp;<i>отсечение</i>&nbsp;и&nbsp;<i>поворот</i>&nbsp;— могут быть осуществлены более одного раза на достаточно больших многогранниках. Для операций, осуществлённых два раза, добавляется&nbsp;<i>дважды</i>. (<i>Дважды скрученное</i>&nbsp;тело имеет два повёрнутых купола.) Для операций, осуществлённых три раза, добавляется&nbsp;<i>трижды</i>. (У&nbsp;<i>трижды отсечённого</i>&nbsp;тела удалены три пирамиды или купола.)</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Иногда слова&nbsp;<i>дважды</i>&nbsp;недостаточно. Необходимо отличать тела, в которых изменены две противоположные грани от тел, в которых изменены другие грани. Когда изменённые грани параллельны, в название добавляется&nbsp;<i>противоположно</i>. (<i>Дважды противоположно наращённое</i>&nbsp;тело имеет две параллельные грани (противоположные) с добавленными телами.) Если же изменения касаются граней, не являющихся противоположными, в название добавляется&nbsp;<i>косо</i>. (<i>Дважды косо наращённое</i>&nbsp;тело имеет две грани с добавленными телами, но грани не противоположны.)</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Несколько названий происходят от многоугольников, из которых собрано тело Джонсона.</p><dl style="margin-top: 0.2em; margin-bottom: 0.5em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;">Если определить&nbsp;<i>месяц</i>&nbsp;как группу из двух треугольников, присоединённых к квадрату, слово&nbsp;<i>клинокорона</i>&nbsp;соответствует клиновидной короноподобной группе, образованной двумя месяцами. Слово&nbsp;<i>двуклиноид</i>&nbsp;или&nbsp;<i>двуклинник</i>&nbsp;означает две таких группы.</dd></dl><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В данной статье используются названия из статьи Залгаллера<sup id="cite_ref-_a90f79aa24d78429_3-0" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0#cite_note-_a90f79aa24d78429-3" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[3]</a></sup>. Вместе с номерами многогранников, данными Джонсоном, в скобках приводится составной номер из статьи Залгаллера. В этом составном номере</p><dl style="margin-top: 0.2em; margin-bottom: 0.5em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;"><span style="font-weight: 700;">П<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>&nbsp;обозначает призму с&nbsp;<span style="font-weight: 700;">n</span>-угольным основанием.</dd><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;"><span style="font-weight: 700;">А<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>&nbsp;обозначает антипризму с&nbsp;<span style="font-weight: 700;">n</span>-угольным основанием.</dd><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;"><span style="font-weight: 700;">М<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>&nbsp;обозначает тело с индесом&nbsp;<span style="font-weight: 700;">n</span>&nbsp;(то есть в этом случае тело строится на основе другого тела).</dd><dd style="margin-left: 1.6em; margin-bottom: 0.1em; margin-right: 0px;">Подчёркивание означает поворот тела</dd></dl><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><i>Замечание</i>:&nbsp;<span style="font-weight: 700;">М<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>&nbsp;не совпадает с&nbsp;<span style="font-weight: 700;">J<sub style="line-height: 1em; font-size: 11.2px;">n</sub></span>. Так, квадратная пирамида J<sub style="line-height: 1em; font-size: 11.2px;">1</sub>(М<sub style="line-height: 1em; font-size: 11.2px;">2</sub>) имеет индекс 1 у Джонсона и индекс 2 у Залгаллера.</p><h2 style="color: rgb(0, 0, 0); margin: 1em 0px 0.25em; padding: 0px; overflow: hidden; border-bottom: 1px solid rgb(162, 169, 177); font-size: 1.5em; font-weight: normal; font-family: &quot;Linux Libertine&quot;, Georgia, Times, serif; line-height: 1.3;"><span id=".D0.A1.D0.BF.D0.B8.D1.81.D0.BE.D0.BA"></span><span class="mw-headline" id="Список">Список</span><span class="mw-editsection" style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=3" class="mw-editsection-visualeditor" title="Редактировать раздел «Список»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=3" title="Редактировать раздел «Список»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h2><h3 style="color: rgb(0, 0, 0); margin: 0.3em 0px 0px; padding-top: 0.5em; padding-bottom: 0px; overflow: hidden; font-size: 1.2em; line-height: 1.6; font-weight: bold; font-family: sans-serif;"><span id=".D0.9F.D0.B8.D1.80.D0.B0.D0.BC.D0.B8.D0.B4.D1.8B"></span><span class="mw-headline" id="Пирамиды">Пирамиды</span><span class="mw-editsection" style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=4" class="mw-editsection-visualeditor" title="Редактировать раздел «Пирамиды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=4" title="Редактировать раздел «Пирамиды»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h3><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Первые два тела Джонсона, J<sub style="line-height: 1em; font-size: 11.2px;">1</sub>&nbsp;и J<sub style="line-height: 1em; font-size: 11.2px;">2</sub>, являются&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Пирамида (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пирамидами</a>.&nbsp;<i>Треугольная пирамида</i>&nbsp;является правильным&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тетраэдром</a>, так что не является телом Джонсона.</p>
28.03.2022 16:36:38: <p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В 1966 году&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9D%D0%BE%D1%80%D0%BC%D0%B0%D0%BD_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD">Норман Джонсон</a>&nbsp;опубликовал список, в котором присутствовали все 92 тела, и дал им названия и номера. Он высказал гипотезу, что их только 92, то есть других нет.</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Ранее, в 1946&nbsp;году Л.&nbsp;Н.&nbsp;Есаулова прислала&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80%D0%BE%D0%B2,_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80_%D0%94%D0%B0%D0%BD%D0%B8%D0%BB%D0%BE%D0%B2%D0%B8%D1%87">А.&nbsp;Д.&nbsp;Александрову</a>&nbsp;письмо, в котором доказала, что правильногранных многогранников (кроме 5 правильных многогранников, 13 полуправильных и двух бесконечных серий (призмы и антипризм) может существовать лишь конечное число. В 1961 году Александров передал это письмо В.&nbsp;А.&nbsp;Залгаллеру, возможно из-за заметки Джонсона 1960 года<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0#cite_note-2">[2]</a>.</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В 1967 году&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%97%D0%B0%D0%BB%D0%B3%D0%B0%D0%BB%D0%BB%D0%B5%D1%80,_%D0%92%D0%B8%D0%BA%D1%82%D0%BE%D1%80_%D0%90%D0%B1%D1%80%D0%B0%D0%BC%D0%BE%D0%B2%D0%B8%D1%87">Виктор Залгаллер</a>&nbsp;опубликовал доказательство того, что список Джонсона полон. К решению была привлечена группа школьников&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A4%D0%B8%D0%B7%D0%B8%D0%BA%D0%BE-%D0%BC%D0%B0%D1%82%D0%B5%D0%BC%D0%B0%D1%82%D0%B8%D1%87%D0%B5%D1%81%D0%BA%D0%B8%D0%B9_%D0%BB%D0%B8%D1%86%D0%B5%D0%B9_%E2%84%96_239">школы №&nbsp;239</a>. Полное доказательство заняло около 4 лет с&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%94%D0%BE%D0%BA%D0%B0%D0%B7%D0%B0%D1%82%D0%B5%D0%BB%D1%8C%D0%BD%D1%8B%D0%B5_%D0%B2%D1%8B%D1%87%D0%B8%D1%81%D0%BB%D0%B5%D0%BD%D0%B8%D1%8F">привлечением компьютерной техники</a>. В доказательстве также существенно использовалась&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D0%BE%D1%80%D0%B5%D0%BC%D0%B0_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80%D0%BE%D0%B2%D0%B0_%D0%BE_%D0%B2%D1%8B%D0%BF%D1%83%D0%BA%D0%BB%D1%8B%D1%85_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA%D0%B0%D1%85">теорема Александрова о выпуклых многогранниках</a>.</p><span></span><span>Терминология</span><span style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=2">править</a><span style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=2">править код</a><span style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span><div style="clear: right; float: right; width: 416px; margin: 0.5em 0px 1.3em 1.4em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px; max-width: 100%;"><div style="padding: 3px; text-align: center; overflow: hidden; border: 1px solid rgb(200, 204, 209); background-color: rgb(248, 249, 250); font-size: 13.16px;"><div style="float: left; margin: 1px; width: 201px;"><div style="background-color: rgb(255, 255, 255); border: 1px solid rgb(200, 204, 209);"><a target="_blank" href="https://commons.wikimedia.org/wiki/File:Stella_octangula.png?uselang=ru"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/19/Stella_octangula.png/200px-Stella_octangula.png" width="200" height="210"></a></div><div style="text-align: left; line-height: 1.4em; padding: 3px; border: 0px; font-size: 12.3704px; clear: left;">Многогранник, имеющий&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%97%D0%B2%D1%91%D0%B7%D0%B4%D1%87%D0%B0%D1%82%D1%8B%D0%B9_%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">24 правильных треугольника</a>&nbsp;в качестве граней,&nbsp;<span style="font-weight: 700;">не</span>&nbsp;является телом Джонсона, поскольку не является выпуклым. (Фактически это единственная&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9E%D0%B1%D1%80%D0%B0%D0%B7%D0%BE%D0%B2%D0%B0%D0%BD%D0%B8%D0%B5_%D0%B7%D0%B2%D1%91%D0%B7%D0%B4%D1%87%D0%B0%D1%82%D0%BE%D0%B9_%D1%84%D0%BE%D1%80%D0%BC%D1%8B">звёздчатая форма</a>, возможная для&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">октаэдра</a>.)</div></div><div style="float: left; margin: 1px; width: 202px;"><div style="background-color: rgb(255, 255, 255); border: 1px solid rgb(200, 204, 209);"><a target="_blank" href="https://commons.wikimedia.org/wiki/File:Partial_cubic_honeycomb.png?uselang=ru"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Partial_cubic_honeycomb.png/200px-Partial_cubic_honeycomb.png" width="200" height="198"></a></div><div style="text-align: left; line-height: 1.4em; padding: 3px; border: 0px; font-size: 12.3704px; clear: left;">Многогранник, имеющий 24 квадратных грани,&nbsp;<span style="font-weight: 700;">не</span>&nbsp;является телом Джонсона, поскольку не является строго выпуклым (имеет&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D1%83%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D1%8B%D0%B9_%D1%83%D0%B3%D0%BE%D0%BB">двугранные углы</a>&nbsp;180°).</div></div><div style="clear: both;"></div></div><div style="clear: both;"></div></div><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Названия тел Джонсона имеют большую описательную способность. Большинство этих тел можно построить из нескольких тел (<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">пирамид</a>,&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%BF%D0%BE%D0%BB_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">куполов</a>&nbsp;и&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">ротонд</a>), добавляя&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B0%D0%B2%D0%B8%D0%BB%D1%8C%D0%BD%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA">платоновы</a>&nbsp;и&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%90%D1%80%D1%85%D0%B8%D0%BC%D0%B5%D0%B4%D0%BE%D0%B2%D0%BE_%D1%82%D0%B5%D0%BB%D0%BE">архимедовы</a>&nbsp;тела,&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B8%D0%B7%D0%BC%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">призмы</a>&nbsp;и&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%90%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0">антипризмы</a>.</p><ul><li><span style="font-weight: 700;">Би-</span>&nbsp;означает, что две копии тел соединены по основаниям. Для куполов и ротонд они могут быть соединены по граням одного типа (<span style="font-weight: 700;">прямые</span>) или по разным (<span style="font-weight: 700;">повёрнутые</span>).&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">Октаэдр</a>, например, является&nbsp;<i>квадратной бипирамидой</i>,&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">кубооктаэдр</a>&nbsp;—&nbsp;<i>повёрнутым треугольным бикуполом</i>, а&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%BE%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80">икосододекаэдр</a>&nbsp;—&nbsp;<i>повёрнутой пятиугольной биротондой</i>.</li><li><span style="font-weight: 700;">Удлинённый</span>&nbsp;означает, что к телу присоединена&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B8%D0%B7%D0%BC%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">призма</a>&nbsp;или она вставлена между двумя частями тела.&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D0%BC%D0%B1%D0%BE%D0%BA%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">Ромбокубооктаэдр</a>, например, является&nbsp;<i>удлинённым квадратным прямым бикуполом</i>.</li><li><span style="font-weight: 700;">Скрученно удлинённый</span>&nbsp;означает, что к телу присоединена&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%90%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0">антипризма</a>&nbsp;или она вставлена между двумя частями тела.&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%B0%D1%8D%D0%B4%D1%80">Икосаэдр</a>, например, является&nbsp;<i>скрученно удлинённой пятиугольной бипирамидой</i>.</li><li><span style="font-weight: 700;">Наращённый</span>&nbsp;означает, что пирамида или купол присоединён к грани тела.</li><li><span style="font-weight: 700;">Отсечённый</span>&nbsp;означает, что пирамида или купол отрезан от тела.</li><li><span style="font-weight: 700;">Скрученный</span>&nbsp;означает, что купол, принадлежащий многограннику, повёрнут таким же образом, как в повёрнутых бикуполах.</li></ul><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Последние три операции&nbsp;—&nbsp;<i>наращение</i>,&nbsp;<i>отсечение</i>&nbsp;и&nbsp;<i>поворот</i>&nbsp;— могут быть осуществлены более одного раза на достаточно больших многогранниках. Для операций, осуществлённых два раза, добавляется&nbsp;<i>дважды</i>. (<i>Дважды скрученное</i>&nbsp;тело имеет два повёрнутых купола.) Для операций, осуществлённых три раза, добавляется&nbsp;<i>трижды</i>. (У&nbsp;<i>трижды отсечённого</i>&nbsp;тела удалены три пирамиды или купола.)</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Иногда слова&nbsp;<i>дважды</i>&nbsp;недостаточно. Необходимо отличать тела, в которых изменены две противоположные грани от тел, в которых изменены другие грани. Когда изменённые грани параллельны, в название добавляется&nbsp;<i>противоположно</i>. (<i>Дважды противоположно наращённое</i>&nbsp;тело имеет две параллельные грани (противоположные) с добавленными телами.) Если же изменения касаются граней, не являющихся противоположными, в название добавляется&nbsp;<i>косо</i>. (<i>Дважды косо наращённое</i>&nbsp;тело имеет две грани с добавленными телами, но грани не противоположны.)</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Несколько названий происходят от многоугольников, из которых собрано тело Джонсона.</p>Если определить&nbsp;<i>месяц</i>&nbsp;как группу из двух треугольников, присоединённых к квадрату, слово&nbsp;<i>клинокорона</i>&nbsp;соответствует клиновидной короноподобной группе, образованной двумя месяцами. Слово&nbsp;<i>двуклиноид</i>&nbsp;или&nbsp;<i>двуклинник</i>&nbsp;означает две таких группы.<p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В данной статье используются названия из статьи Залгаллера<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0#cite_note-_a90f79aa24d78429-3">[3]</a>. Вместе с номерами многогранников, данными Джонсоном, в скобках приводится составной номер из статьи Залгаллера. В этом составном номере</p><span style="font-weight: 700;">Пn</span>&nbsp;обозначает призму с&nbsp;<span style="font-weight: 700;">n</span>-угольным основанием.<span style="font-weight: 700;">Аn</span>&nbsp;обозначает антипризму с&nbsp;<span style="font-weight: 700;">n</span>-угольным основанием.<span style="font-weight: 700;">Мn</span>&nbsp;обозначает тело с индесом&nbsp;<span style="font-weight: 700;">n</span>&nbsp;(то есть в этом случае тело строится на основе другого тела).Подчёркивание означает поворот тела<p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><i>Замечание</i>:&nbsp;<span style="font-weight: 700;">Мn</span>&nbsp;не совпадает с&nbsp;<span style="font-weight: 700;">Jn</span>. Так, квадратная пирамида J1(М2) имеет индекс 1 у Джонсона и индекс 2 у Залгаллера.</p><span></span><span>Список</span><span style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=3">править</a><span style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=3">править код</a><span style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span><span></span><span>Пирамиды</span><span style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=4">править</a><span style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=4">править код</a><span style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Первые два тела Джонсона, J1&nbsp;и J2, являются&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">пирамидами</a>.&nbsp;<i>Треугольная пирамида</i>&nbsp;является правильным&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80">тетраэдром</a>, так что не является телом Джонсона.</p>
28.03.2022 16:36:50: <p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В 1966 году&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9D%D0%BE%D1%80%D0%BC%D0%B0%D0%BD_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD">Норман Джонсон</a>&nbsp;опубликовал список, в котором присутствовали все 92 тела, и дал им названия и номера. Он высказал гипотезу, что их только 92, то есть других нет.</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Ранее, в 1946&nbsp;году Л.&nbsp;Н.&nbsp;Есаулова прислала&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80%D0%BE%D0%B2,_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80_%D0%94%D0%B0%D0%BD%D0%B8%D0%BB%D0%BE%D0%B2%D0%B8%D1%87">А.&nbsp;Д.&nbsp;Александрову</a>&nbsp;письмо, в котором доказала, что правильногранных многогранников (кроме 5 правильных многогранников, 13 полуправильных и двух бесконечных серий (призмы и антипризм) может существовать лишь конечное число. В 1961 году Александров передал это письмо В.&nbsp;А.&nbsp;Залгаллеру, возможно из-за заметки Джонсона 1960 года<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0#cite_note-2">[2]</a>.</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В 1967 году&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%97%D0%B0%D0%BB%D0%B3%D0%B0%D0%BB%D0%BB%D0%B5%D1%80,_%D0%92%D0%B8%D0%BA%D1%82%D0%BE%D1%80_%D0%90%D0%B1%D1%80%D0%B0%D0%BC%D0%BE%D0%B2%D0%B8%D1%87">Виктор Залгаллер</a>&nbsp;опубликовал доказательство того, что список Джонсона полон. К решению была привлечена группа школьников&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A4%D0%B8%D0%B7%D0%B8%D0%BA%D0%BE-%D0%BC%D0%B0%D1%82%D0%B5%D0%BC%D0%B0%D1%82%D0%B8%D1%87%D0%B5%D1%81%D0%BA%D0%B8%D0%B9_%D0%BB%D0%B8%D1%86%D0%B5%D0%B9_%E2%84%96_239">школы №&nbsp;239</a>. Полное доказательство заняло около 4 лет с&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%94%D0%BE%D0%BA%D0%B0%D0%B7%D0%B0%D1%82%D0%B5%D0%BB%D1%8C%D0%BD%D1%8B%D0%B5_%D0%B2%D1%8B%D1%87%D0%B8%D1%81%D0%BB%D0%B5%D0%BD%D0%B8%D1%8F">привлечением компьютерной техники</a>. В доказательстве также существенно использовалась&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D0%BE%D1%80%D0%B5%D0%BC%D0%B0_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80%D0%BE%D0%B2%D0%B0_%D0%BE_%D0%B2%D1%8B%D0%BF%D1%83%D0%BA%D0%BB%D1%8B%D1%85_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA%D0%B0%D1%85">теорема Александрова о выпуклых многогранниках</a>.</p><span></span><span>Терминология</span><span style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=2">править</a><span style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=2">править код</a><span style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span><div style="clear: right; float: right; width: 416px; margin: 0.5em 0px 1.3em 1.4em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px; max-width: 100%;"><div style="padding: 3px; text-align: center; overflow: hidden; border: 1px solid rgb(200, 204, 209); background-color: rgb(248, 249, 250); font-size: 13.16px;"><div style="float: left; margin: 1px; width: 201px;"><div style="background-color: rgb(255, 255, 255); border: 1px solid rgb(200, 204, 209);"><a target="_blank" href="https://commons.wikimedia.org/wiki/File:Stella_octangula.png?uselang=ru"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/1/19/Stella_octangula.png/200px-Stella_octangula.png" width="200" height="210"></a></div><div style="text-align: left; line-height: 1.4em; padding: 3px; border: 0px; font-size: 12.3704px; clear: left;">Многогранник, имеющий&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%97%D0%B2%D1%91%D0%B7%D0%B4%D1%87%D0%B0%D1%82%D1%8B%D0%B9_%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">24 правильных треугольника</a>&nbsp;в качестве граней,&nbsp;<span style="font-weight: 700;">не</span>&nbsp;является телом Джонсона, поскольку не является выпуклым. (Фактически это единственная&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9E%D0%B1%D1%80%D0%B0%D0%B7%D0%BE%D0%B2%D0%B0%D0%BD%D0%B8%D0%B5_%D0%B7%D0%B2%D1%91%D0%B7%D0%B4%D1%87%D0%B0%D1%82%D0%BE%D0%B9_%D1%84%D0%BE%D1%80%D0%BC%D1%8B">звёздчатая форма</a>, возможная для&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">октаэдра</a>.)</div></div><div style="float: left; margin: 1px; width: 202px;"><div style="background-color: rgb(255, 255, 255); border: 1px solid rgb(200, 204, 209);"><a target="_blank" href="https://commons.wikimedia.org/wiki/File:Partial_cubic_honeycomb.png?uselang=ru"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/e9/Partial_cubic_honeycomb.png/200px-Partial_cubic_honeycomb.png" width="200" height="198"></a></div><div style="text-align: left; line-height: 1.4em; padding: 3px; border: 0px; font-size: 12.3704px; clear: left;">Многогранник, имеющий 24 квадратных грани,&nbsp;<span style="font-weight: 700;">не</span>&nbsp;является телом Джонсона, поскольку не является строго выпуклым (имеет&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D1%83%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D1%8B%D0%B9_%D1%83%D0%B3%D0%BE%D0%BB">двугранные углы</a>&nbsp;180°).</div></div><div style="clear: both;"></div></div><div style="clear: both;"></div></div><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Названия тел Джонсона имеют большую описательную способность. Большинство этих тел можно построить из нескольких тел (<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">пирамид</a>,&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%BF%D0%BE%D0%BB_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">куполов</a>&nbsp;и&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D1%82%D0%BE%D0%BD%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">ротонд</a>), добавляя&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B0%D0%B2%D0%B8%D0%BB%D1%8C%D0%BD%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA">платоновы</a>&nbsp;и&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%90%D1%80%D1%85%D0%B8%D0%BC%D0%B5%D0%B4%D0%BE%D0%B2%D0%BE_%D1%82%D0%B5%D0%BB%D0%BE">архимедовы</a>&nbsp;тела,&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B8%D0%B7%D0%BC%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">призмы</a>&nbsp;и&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%90%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0">антипризмы</a>.</p><ul><li><span style="font-weight: 700;">Би-</span>&nbsp;означает, что две копии тел соединены по основаниям. Для куполов и ротонд они могут быть соединены по граням одного типа (<span style="font-weight: 700;">прямые</span>) или по разным (<span style="font-weight: 700;">повёрнутые</span>).&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">Октаэдр</a>, например, является&nbsp;<i>квадратной бипирамидой</i>,&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9A%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">кубооктаэдр</a>&nbsp;—&nbsp;<i>повёрнутым треугольным бикуполом</i>, а&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%BE%D0%B4%D0%BE%D0%B4%D0%B5%D0%BA%D0%B0%D1%8D%D0%B4%D1%80">икосододекаэдр</a>&nbsp;—&nbsp;<i>повёрнутой пятиугольной биротондой</i>.</li><li><span style="font-weight: 700;">Удлинённый</span>&nbsp;означает, что к телу присоединена&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D1%80%D0%B8%D0%B7%D0%BC%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">призма</a>&nbsp;или она вставлена между двумя частями тела.&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A0%D0%BE%D0%BC%D0%B1%D0%BE%D0%BA%D1%83%D0%B1%D0%BE%D0%BE%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80">Ромбокубооктаэдр</a>, например, является&nbsp;<i>удлинённым квадратным прямым бикуполом</i>.</li><li><span style="font-weight: 700;">Скрученно удлинённый</span>&nbsp;означает, что к телу присоединена&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%90%D0%BD%D1%82%D0%B8%D0%BF%D1%80%D0%B8%D0%B7%D0%BC%D0%B0">антипризма</a>&nbsp;или она вставлена между двумя частями тела.&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%98%D0%BA%D0%BE%D1%81%D0%B0%D1%8D%D0%B4%D1%80">Икосаэдр</a>, например, является&nbsp;<i>скрученно удлинённой пятиугольной бипирамидой</i>.</li><li><span style="font-weight: 700;">Наращённый</span>&nbsp;означает, что пирамида или купол присоединён к грани тела.</li><li><span style="font-weight: 700;">Отсечённый</span>&nbsp;означает, что пирамида или купол отрезан от тела.</li><li><span style="font-weight: 700;">Скрученный</span>&nbsp;означает, что купол, принадлежащий многограннику, повёрнут таким же образом, как в повёрнутых бикуполах.</li></ul><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Последние три операции&nbsp;—&nbsp;<i>наращение</i>,&nbsp;<i>отсечение</i>&nbsp;и&nbsp;<i>поворот</i>&nbsp;— могут быть осуществлены более одного раза на достаточно больших многогранниках. Для операций, осуществлённых два раза, добавляется&nbsp;<i>дважды</i>. (<i>Дважды скрученное</i>&nbsp;тело имеет два повёрнутых купола.) Для операций, осуществлённых три раза, добавляется&nbsp;<i>трижды</i>. (У&nbsp;<i>трижды отсечённого</i>&nbsp;тела удалены три пирамиды или купола.)</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Иногда слова&nbsp;<i>дважды</i>&nbsp;недостаточно. Необходимо отличать тела, в которых изменены две противоположные грани от тел, в которых изменены другие грани. Когда изменённые грани параллельны, в название добавляется&nbsp;<i>противоположно</i>. (<i>Дважды противоположно наращённое</i>&nbsp;тело имеет две параллельные грани (противоположные) с добавленными телами.) Если же изменения касаются граней, не являющихся противоположными, в название добавляется&nbsp;<i>косо</i>. (<i>Дважды косо наращённое</i>&nbsp;тело имеет две грани с добавленными телами, но грани не противоположны.)</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Несколько названий происходят от многоугольников, из которых собрано тело Джонсона.</p>Если определить&nbsp;<i>месяц</i>&nbsp;как группу из двух треугольников, присоединённых к квадрату, слово&nbsp;<i>клинокорона</i>&nbsp;соответствует клиновидной короноподобной группе, образованной двумя месяцами. Слово&nbsp;<i>двуклиноид</i>&nbsp;или&nbsp;<i>двуклинник</i>&nbsp;означает две таких группы.<p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В данной статье используются названия из статьи Залгаллера<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0#cite_note-_a90f79aa24d78429-3">[3]</a>. Вместе с номерами многогранников, данными Джонсоном, в скобках приводится составной номер из статьи Залгаллера. В этом составном номере</p><span style="font-weight: 700;">Пn</span>&nbsp;обозначает призму с&nbsp;<span style="font-weight: 700;">n</span>-угольным основанием.<span style="font-weight: 700;">Аn</span>&nbsp;обозначает антипризму с&nbsp;<span style="font-weight: 700;">n</span>-угольным основанием.<span style="font-weight: 700;">Мn</span>&nbsp;обозначает тело с индесом&nbsp;<span style="font-weight: 700;">n</span>&nbsp;(то есть в этом случае тело строится на основе другого тела).Подчёркивание означает поворот тела<p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><i>Замечание</i>:&nbsp;<span style="font-weight: 700;">Мn</span>&nbsp;не совпадает с&nbsp;<span style="font-weight: 700;">Jn</span>. Так, квадратная пирамида J1(М2) имеет индекс 1 у Джонсона и индекс 2 у Залгаллера.</p><span></span><span>Список</span><span style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=3">править</a><span style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=3">править код</a><span style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span><span></span><span>Пирамиды</span><span style="user-select: none; font-size: small; font-weight: normal; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;veaction=edit&amp;section=4">править</a><span style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a target="_blank" href="https://ru.wikipedia.org/w/index.php?title=%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%94%D0%B6%D0%BE%D0%BD%D1%81%D0%BE%D0%BD%D0%B0&amp;action=edit&amp;section=4">править код</a><span style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Первые два тела Джонсона, J1&nbsp;и J2, являются&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%9F%D0%B8%D1%80%D0%B0%D0%BC%D0%B8%D0%B4%D0%B0_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)">пирамидами</a>.&nbsp;<i>Треугольная пирамида</i>&nbsp;является правильным&nbsp;<a target="_blank" href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80">тетраэдром</a>, так что не является телом Джонсона.</p><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><br></p><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">Первые примеры изгибаемых многогранников были построены&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%91%D0%B5%D0%BB%D1%8C%D0%B3%D0%B8%D1%8F" title="Бельгия" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">бельгийским</a>&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%98%D0%BD%D0%B6%D0%B5%D0%BD%D0%B5%D1%80" title="Инженер" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">инженером</a>&nbsp;и&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9C%D0%B0%D1%82%D0%B5%D0%BC%D0%B0%D1%82%D0%B8%D0%BA" title="Математик" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">математиком</a>&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%91%D1%80%D0%B8%D0%BA%D0%B0%D1%80,_%D0%A0%D0%B0%D1%83%D0%BB%D1%8C" title="Брикар, Рауль" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Раулем Брикаром</a>&nbsp;в&nbsp;<a href="https://ru.wikipedia.org/wiki/1897_%D0%B3%D0%BE%D0%B4" title="1897 год" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">1897 году</a><sup id="cite_ref-1" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-1" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[1]</a></sup>. Сейчас их называют&nbsp;<span style="font-weight: 700;"><a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%BA%D1%82%D0%B0%D1%8D%D0%B4%D1%80" title="Октаэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">октаэдрами</a>&nbsp;Брикара</span>. Они не только невыпуклые, но и имеют самопересечения, что не позволяет построить их движущуюся картонную модель.</li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">В&nbsp;<a href="https://ru.wikipedia.org/wiki/1976_%D0%B3%D0%BE%D0%B4" title="1976 год" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">1976 году</a>&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%BE%D0%B5%D0%B4%D0%B8%D0%BD%D1%91%D0%BD%D0%BD%D1%8B%D0%B5_%D0%A8%D1%82%D0%B0%D1%82%D1%8B_%D0%90%D0%BC%D0%B5%D1%80%D0%B8%D0%BA%D0%B8" title="Соединённые Штаты Америки" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">американский</a>&nbsp;математик&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9A%D0%BE%D0%BD%D0%BD%D0%B5%D0%BB%D0%BB%D0%B8,_%D0%A0%D0%BE%D0%B1%D0%B5%D1%80%D1%82" title="Коннелли, Роберт" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Роберт Коннелли</a>&nbsp;впервые построил изгибаемый многогранник без самопересечений<sup id="cite_ref-2" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-2" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[2]</a></sup>.</li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">Из всех известных на сегодняшний день изгибаемых многогранников без самопересечений наименьшее число вершин (<a href="https://ru.wikipedia.org/wiki/9_(%D1%87%D0%B8%D1%81%D0%BB%D0%BE)" title="9 (число)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">девять</a>) имеет многогранник, построенный&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%93%D0%B5%D1%80%D0%BC%D0%B0%D0%BD%D0%B8%D1%8F" title="Германия" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">немецким</a>&nbsp;математиком&nbsp;<span data-interwiki-lang="de" data-interwiki-article="Klaus Steffen"><a href="https://ru.wikipedia.org/w/index.php?title=%D0%A8%D1%82%D0%B5%D1%84%D1%84%D0%B5%D0%BD,_%D0%9A%D0%BB%D0%B0%D1%83%D1%81&amp;action=edit&amp;redlink=1" class="new" title="Штеффен, Клаус (страница отсутствует)" style="color: rgb(186, 0, 0); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Клаусом Штеффеном</a></span><span class="noprint"><sup style="line-height: 1em; font-size: 11.2px;"><a href="https://de.wikipedia.org/wiki/Klaus_Steffen" class="extiw" title="de:Klaus Steffen" style="color: rgb(51, 102, 187); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[de]</a></sup></span><sup id="cite_ref-3" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-3" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[3]</a></sup>.&nbsp;<span style="font-weight: 700;"><a href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%A8%D1%82%D0%B5%D1%84%D1%84%D0%B5%D0%BD%D0%B0" title="Многогранник Штеффена" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Многогранник Штеффена</a></span>&nbsp;можно легко вырезать из бумаги (см. статью).</li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">Известны примеры изгибаемых многогранников, являющихся реализациями&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%BE%D1%80_(%D0%BF%D0%BE%D0%B2%D0%B5%D1%80%D1%85%D0%BD%D0%BE%D1%81%D1%82%D1%8C)" title="Тор (поверхность)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тора</a><sup id="cite_ref-4" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-4" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[4]</a></sup>&nbsp;или&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%91%D1%83%D1%82%D1%8B%D0%BB%D0%BA%D0%B0_%D0%9A%D0%BB%D0%B5%D0%B9%D0%BD%D0%B0" title="Бутылка Клейна" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">бутылки Клейна</a>&nbsp;или вообще двумерной&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9F%D0%BE%D0%B2%D0%B5%D1%80%D1%85%D0%BD%D0%BE%D1%81%D1%82%D1%8C" title="Поверхность" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">поверхности</a>&nbsp;любого топологического рода.</li></ul><ul class="gallery mw-gallery-traditional center" style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em auto 0px; width: 2318px; text-align: center; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li class="gallerybox" style="margin-bottom: 0.1em; margin-left: auto; margin-right: auto; vertical-align: top; display: inline-block; width: 155px;"><div style="margin-left: auto; margin-right: auto; width: 155px;"><div class="thumb" style="margin: 2px; width: 150px; background-color: rgb(248, 249, 250); border: 1px solid rgb(200, 204, 209);"><div style="margin: 43.5px auto;"><a href="https://commons.wikimedia.org/wiki/File:Br1-anim.gif?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; margin-left: auto; margin-right: auto;"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/f/f9/Br1-anim.gif/120px-Br1-anim.gif" decoding="async" width="120" height="63" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/f/f9/Br1-anim.gif/180px-Br1-anim.gif 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/f/f9/Br1-anim.gif/240px-Br1-anim.gif 2x" data-file-width="390" data-file-height="205" style="vertical-align: middle; margin: 0px auto; display: block;"></a></div></div><div class="gallerytext" style="margin-left: auto; margin-right: auto; overflow: hidden; font-size: 13.16px; padding: 2px 4px; overflow-wrap: break-word;"><p style="margin: 0.5em 0px;">Изгибаемый октаэдр Брикара первого типа</p></div></div></li>&nbsp;<li class="gallerybox" style="margin-bottom: 0.1em; margin-left: auto; margin-right: auto; vertical-align: top; display: inline-block; width: 155px;"><div style="margin-left: auto; margin-right: auto; width: 155px;"><div class="thumb" style="margin: 2px; width: 150px; background-color: rgb(248, 249, 250); border: 1px solid rgb(200, 204, 209);"><div style="margin: 33.5px auto;"><a href="https://commons.wikimedia.org/wiki/File:Br2-anim.gif?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; margin-left: auto; margin-right: auto;"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/e/e7/Br2-anim.gif/120px-Br2-anim.gif" decoding="async" width="120" height="83" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/e/e7/Br2-anim.gif/180px-Br2-anim.gif 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/e/e7/Br2-anim.gif/240px-Br2-anim.gif 2x" data-file-width="440" data-file-height="305" style="vertical-align: middle; margin: 0px auto; display: block;"></a></div></div><div class="gallerytext" style="margin-left: auto; margin-right: auto; overflow: hidden; font-size: 13.16px; padding: 2px 4px; overflow-wrap: break-word;"><p style="margin: 0.5em 0px;">Изгибаемый октаэдр Брикара второго типа</p></div></div></li>&nbsp;<li class="gallerybox" style="margin-bottom: 0.1em; margin-left: auto; margin-right: auto; vertical-align: top; display: inline-block; width: 155px;"><div style="margin-left: auto; margin-right: auto; width: 155px;"><div class="thumb" style="margin: 2px; width: 150px; background-color: rgb(248, 249, 250); border: 1px solid rgb(200, 204, 209);"><div style="margin: 24.5px auto;"><a href="https://commons.wikimedia.org/wiki/File:Ste-anim.gif?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; margin-left: auto; margin-right: auto;"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/4/45/Ste-anim.gif/120px-Ste-anim.gif" decoding="async" width="120" height="101" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/4/45/Ste-anim.gif/180px-Ste-anim.gif 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/4/45/Ste-anim.gif/240px-Ste-anim.gif 2x" data-file-width="500" data-file-height="420" style="vertical-align: middle; margin: 0px auto; display: block;"></a></div></div><div class="gallerytext" style="margin-left: auto; margin-right: auto; overflow: hidden; font-size: 13.16px; padding: 2px 4px; overflow-wrap: break-word;"><p style="margin: 0.5em 0px;">Изгибаемый многогранник Штеффена</p></div></div></li>&nbsp;<li class="gallerybox" style="margin-bottom: 0.1em; margin-left: auto; margin-right: auto; vertical-align: top; display: inline-block; width: 155px;"><div style="margin-left: auto; margin-right: auto; width: 155px;"><div class="thumb" style="margin: 2px; width: 150px; background-color: rgb(248, 249, 250); border: 1px solid rgb(200, 204, 209);"><div style="margin: 34px auto;"><a href="https://commons.wikimedia.org/wiki/File:Steffen%27s_flexor.jpg?uselang=ru" class="image" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; margin-left: auto; margin-right: auto;"><img alt="" src="https://upload.wikimedia.org/wikipedia/commons/thumb/b/bd/Steffen%27s_flexor.jpg/120px-Steffen%27s_flexor.jpg" decoding="async" width="120" height="82" srcset="//upload.wikimedia.org/wikipedia/commons/thumb/b/bd/Steffen%27s_flexor.jpg/180px-Steffen%27s_flexor.jpg 1.5x, //upload.wikimedia.org/wikipedia/commons/thumb/b/bd/Steffen%27s_flexor.jpg/240px-Steffen%27s_flexor.jpg 2x" data-file-width="4721" data-file-height="3241" style="vertical-align: middle; margin: 0px auto; display: block;"></a></div></div><div class="gallerytext" style="margin-left: auto; margin-right: auto; overflow: hidden; font-size: 13.16px; padding: 2px 4px; overflow-wrap: break-word;"><p style="margin: 0.5em 0px;">Развёртка изгибаемого многогранника Штеффена</p></div></div></li></ul><h2 style="color: rgb(0, 0, 0); margin: 1em 0px 0.25em; padding: 0px; overflow: hidden; border-bottom: 1px solid rgb(162, 169, 177); font-size: 1.5em; font-weight: normal; font-family: &quot;Linux Libertine&quot;, Georgia, Times, serif; line-height: 1.3;"><span id=".D0.A1.D0.B2.D0.BE.D0.B9.D1.81.D1.82.D0.B2.D0.B0"></span><span class="mw-headline" id="Свойства">Свойства</span><span class="mw-editsection" style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA&amp;veaction=edit&amp;section=2" class="mw-editsection-visualeditor" title="Редактировать раздел «Свойства»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA&amp;action=edit&amp;section=2" title="Редактировать раздел «Свойства»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h2><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">В теории изгибаемых многогранников известно немало красивых и нетривиальных утверждений. Ниже приведены наиболее важные из установленных на сегодня фактов:</p><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">Никакой&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%92%D1%8B%D0%BF%D1%83%D0%BA%D0%BB%D0%BE%D0%B5_%D0%BC%D0%BD%D0%BE%D0%B6%D0%B5%D1%81%D1%82%D0%B2%D0%BE" title="Выпуклое множество" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">выпуклый</a>&nbsp;многогранник не может быть изгибаемым. Это немедленно вытекает из&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D0%BE%D1%80%D0%B5%D0%BC%D0%B0_%D0%9A%D0%BE%D1%88%D0%B8_%D0%BE_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA%D0%B0%D1%85" title="Теорема Коши о многогранниках" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">теоремы Коши</a>&nbsp;об однозначной определённости выпуклого многогранника, доказанной в&nbsp;<a href="https://ru.wikipedia.org/wiki/1813_%D0%B3%D0%BE%D0%B4" title="1813 год" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">1813 году</a>.</li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">Из&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A4%D0%BE%D1%80%D0%BC%D1%83%D0%BB%D0%B0_%D0%A8%D0%BB%D0%B5%D1%84%D0%BB%D0%B8" title="Формула Шлефли" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">формулы Шлефли</a>&nbsp;следует, что любой изгибаемый многогранник в процессе изгибания сохраняет так называемую интегральную среднюю кривизну, то есть число, равное&nbsp;<span class="mwe-math-element"><span class="mwe-math-mathml-inline mwe-math-mathml-a11y" style="display: none; clip: rect(1px, 1px, 1px, 1px); overflow: hidden; position: absolute; width: 1px; height: 1px; opacity: 0;"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\displaystyle \sum _{\ell }|\ell |(\pi -\alpha (\ell ))}"><semantics><annotation encoding="application/x-tex">{\displaystyle \sum _{\ell }|\ell |(\pi -\alpha (\ell ))}</annotation></semantics></math></span><img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/4d3db9800b81d5257517fb637098a103ec681a7c" class="mwe-math-fallback-image-inline" aria-hidden="true" alt="{\displaystyle \sum _{\ell }|\ell |(\pi -\alpha (\ell ))}" style="vertical-align: -3.171ex; display: inline-block; width: 16.254ex; height: 5.676ex;"></span>, где&nbsp;<span class="mwe-math-element"><span class="mwe-math-mathml-inline mwe-math-mathml-a11y" style="display: none; clip: rect(1px, 1px, 1px, 1px); overflow: hidden; position: absolute; width: 1px; height: 1px; opacity: 0;"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\displaystyle |\ell |}"><semantics><annotation encoding="application/x-tex">{\displaystyle |\ell |}</annotation></semantics></math></span><img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/6f5861bebbbe9e84e1148db713cbf19d9203b2d8" class="mwe-math-fallback-image-inline" aria-hidden="true" alt="|\ell |" style="vertical-align: -0.838ex; display: inline-block; width: 2.263ex; height: 2.843ex;"></span>&nbsp;— длина ребра&nbsp;<span class="mwe-math-element"><span class="mwe-math-mathml-inline mwe-math-mathml-a11y" style="display: none; clip: rect(1px, 1px, 1px, 1px); overflow: hidden; position: absolute; width: 1px; height: 1px; opacity: 0;"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\displaystyle \ell }"><semantics><annotation encoding="application/x-tex">{\displaystyle \ell }</annotation></semantics></math></span><img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/f066e981e530bacc07efc6a10fa82deee985929e" class="mwe-math-fallback-image-inline" aria-hidden="true" alt="\ell" style="vertical-align: -0.338ex; display: inline-block; width: 0.97ex; height: 2.176ex;"></span>,&nbsp;<span class="mwe-math-element"><span class="mwe-math-mathml-inline mwe-math-mathml-a11y" style="display: none; clip: rect(1px, 1px, 1px, 1px); overflow: hidden; position: absolute; width: 1px; height: 1px; opacity: 0;"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\displaystyle \alpha (\ell )}"><semantics><annotation encoding="application/x-tex">{\displaystyle \alpha (\ell )}</annotation></semantics></math></span><img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/34541b636c850c12c30e5b280d6c0dcc194f06fb" class="mwe-math-fallback-image-inline" aria-hidden="true" alt="{\displaystyle \alpha (\ell )}" style="vertical-align: -0.838ex; display: inline-block; width: 4.267ex; height: 2.843ex;"></span>&nbsp;— величина внутреннего&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%94%D0%B2%D1%83%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D1%8B%D0%B9_%D1%83%D0%B3%D0%BE%D0%BB" title="Двугранный угол" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">двугранного угла</a>&nbsp;при ребре&nbsp;<span class="mwe-math-element"><span class="mwe-math-mathml-inline mwe-math-mathml-a11y" style="display: none; clip: rect(1px, 1px, 1px, 1px); overflow: hidden; position: absolute; width: 1px; height: 1px; opacity: 0;"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\displaystyle \ell }"><semantics><annotation encoding="application/x-tex">{\displaystyle \ell }</annotation></semantics></math></span><img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/f066e981e530bacc07efc6a10fa82deee985929e" class="mwe-math-fallback-image-inline" aria-hidden="true" alt="\ell" style="vertical-align: -0.338ex; display: inline-block; width: 0.97ex; height: 2.176ex;"></span>, а сумма перебирает все рёбра многогранника<sup id="cite_ref-autogenerated1_5-0" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-autogenerated1-5" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[5]</a></sup>.</li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;"><span style="font-weight: 700;">Теорема&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A1%D0%B0%D0%B1%D0%B8%D1%82%D0%BE%D0%B2,_%D0%98%D0%B4%D0%B6%D0%B0%D0%B4_%D0%A5%D0%B0%D0%BA%D0%BE%D0%B2%D0%B8%D1%87" title="Сабитов, Иджад Хакович" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">Сабитова</a></span>: любой изгибаемый многогранник в процессе изгибания сохраняет свой&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9E%D0%B1%D1%8A%D1%91%D0%BC_(%D0%B3%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F)" title="Объём (геометрия)" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">объём</a>, то есть он будет изгибаться даже если его заполнить несжимаемой жидкостью<sup id="cite_ref-6" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-6" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[6]</a></sup>.</li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">В 2012 году,&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%93%D0%B0%D0%B9%D1%84%D1%83%D0%BB%D0%BB%D0%B8%D0%BD,_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80_%D0%90%D0%BB%D0%B5%D0%BA%D1%81%D0%B0%D0%BD%D0%B4%D1%80%D0%BE%D0%B2%D0%B8%D1%87" title="Гайфуллин, Александр Александрович" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">А. Гайфуллиным</a>&nbsp;доказан многомерный аналог теоремы Сабитова — любой изгибаемый многогранник в размерности&nbsp;<span class="mwe-math-element"><span class="mwe-math-mathml-inline mwe-math-mathml-a11y" style="display: none; clip: rect(1px, 1px, 1px, 1px); overflow: hidden; position: absolute; width: 1px; height: 1px; opacity: 0;"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\displaystyle n\geq 4}"><semantics><annotation encoding="application/x-tex">{\displaystyle n\geq 4}</annotation></semantics></math></span><img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/25010fec4b0f68f1b46f49d14917d962acca0b16" class="mwe-math-fallback-image-inline" aria-hidden="true" alt="n\geq 4" style="vertical-align: -0.505ex; display: inline-block; width: 5.656ex; height: 2.343ex;"></span>&nbsp;в процессе изгибания сохраняет свой объём.<sup id="cite_ref-7" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-7" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[7]</a></sup></li></ul><h2 style="color: rgb(0, 0, 0); margin: 1em 0px 0.25em; padding: 0px; overflow: hidden; border-bottom: 1px solid rgb(162, 169, 177); font-size: 1.5em; font-weight: normal; font-family: &quot;Linux Libertine&quot;, Georgia, Times, serif; line-height: 1.3;"><span id=".D0.92.D0.B0.D1.80.D0.B8.D0.B0.D1.86.D0.B8.D0.B8_.D0.B8_.D0.BE.D0.B1.D0.BE.D0.B1.D1.89.D0.B5.D0.BD.D0.B8.D1.8F"></span><span class="mw-headline" id="Вариации_и_обобщения">Вариации и обобщения</span><span class="mw-editsection" style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA&amp;veaction=edit&amp;section=3" class="mw-editsection-visualeditor" title="Редактировать раздел «Вариации и обобщения»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA&amp;action=edit&amp;section=3" title="Редактировать раздел «Вариации и обобщения»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h2><p style="margin: 0.5em 0px; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;">Всё сказанное выше относилось к многогранникам в трёхмерном евклидовом пространстве. Однако данное выше определение изгибаемого многогранника примени́мо и к многомерным пространствам и к неевклидовым пространствам, таким как сферическое пространство и&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%93%D0%B5%D0%BE%D0%BC%D0%B5%D1%82%D1%80%D0%B8%D1%8F_%D0%9B%D0%BE%D0%B1%D0%B0%D1%87%D0%B5%D0%B2%D1%81%D0%BA%D0%BE%D0%B3%D0%BE" title="Геометрия Лобачевского" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">пространство Лобачевского</a>. Для них также известны как нетривиальные теоремы, так и открытые вопросы. Например:</p><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">Изгибаемые многогранники существуют во всех размерностях, как в евклидовом пространстве, так и в сферическом и в геометрии Лобачевского. Примеры аналогов изгибаемых октаэдров Брикара в трёхмерной сфере&nbsp;<span class="mwe-math-element"><span class="mwe-math-mathml-inline mwe-math-mathml-a11y" style="display: none; clip: rect(1px, 1px, 1px, 1px); overflow: hidden; position: absolute; width: 1px; height: 1px; opacity: 0;"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\displaystyle S^{3}}"><semantics><annotation encoding="application/x-tex">{\displaystyle S^{3}}</annotation></semantics></math></span><img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/01e57c690f890937838c10ba57853ff21bf30ec8" class="mwe-math-fallback-image-inline" aria-hidden="true" alt="S^{3}" style="vertical-align: -0.338ex; display: inline-block; width: 2.576ex; height: 2.676ex;"></span>&nbsp;и в пространстве Лобачевского&nbsp;<span class="mwe-math-element"><span class="mwe-math-mathml-inline mwe-math-mathml-a11y" style="display: none; clip: rect(1px, 1px, 1px, 1px); overflow: hidden; position: absolute; width: 1px; height: 1px; opacity: 0;"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="{\displaystyle \Lambda ^{3}}"><semantics><annotation encoding="application/x-tex">{\displaystyle \Lambda ^{3}}</annotation></semantics></math></span><img src="https://wikimedia.org/api/rest_v1/media/math/render/svg/23974922b805b2e0d138316017f4369cf76be8a1" class="mwe-math-fallback-image-inline" aria-hidden="true" alt="{\displaystyle \Lambda ^{3}}" style="vertical-align: -0.338ex; display: inline-block; width: 2.667ex; height: 2.676ex;"></span>&nbsp;были построены Штахелем. Первый пример изгибаемого самопересекающегося четырёхмерного многогранника был построен А. Вальц. Наконец, примеры изгибаемых многогранников во всех размерностях и во всех трёх геометриях (евклидовой, сферической, Лобачевского) были построены Гайфуллиным.<sup id="cite_ref-8" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-8" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[8]</a></sup><sup id="cite_ref-9" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-9" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[9]</a></sup></li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">В сферическом пространстве любой размерности существует изгибаемый многогранник, объём которого непостоянен в процессе изгибания. Пример такого самопересекающегося многогранника в размерности 3 был построен в 1997 году Александровым<sup id="cite_ref-10" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-10" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[10]</a></sup>, а пример несамопересекающегося многогранника в сферическом пространстве любой размерности — А. А. Гайфуллиным в его работе 2015 года<sup id="cite_ref-11" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-11" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[11]</a></sup>. Напротив, в трёхмерном пространстве Лобачевского, и вообще в пространстве Лобачевского любой нечётной размерности, объём изгибаемого многогранника обязан сохраняться (так же, как и в евклидовом случае).<sup id="cite_ref-etudes_12-0" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-etudes-12" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[12]</a></sup><sup id="cite_ref-13" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-13" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[13]</a></sup>.</li></ul><h2 style="color: rgb(0, 0, 0); margin: 1em 0px 0.25em; padding: 0px; overflow: hidden; border-bottom: 1px solid rgb(162, 169, 177); font-size: 1.5em; font-weight: normal; font-family: &quot;Linux Libertine&quot;, Georgia, Times, serif; line-height: 1.3;"><span id=".D0.9E.D1.82.D0.BA.D1.80.D1.8B.D1.82.D1.8B.D0.B5_.D0.B2.D0.BE.D0.BF.D1.80.D0.BE.D1.81.D1.8B"></span><span class="mw-headline" id="Открытые_вопросы">Открытые вопросы</span><span class="mw-editsection" style="font-family: sans-serif; user-select: none; font-size: small; margin-left: 1em; vertical-align: baseline; line-height: 1em; unicode-bidi: isolate; margin-right: 0px;"><span class="mw-editsection-bracket" style="margin-right: 0.25em; color: rgb(84, 89, 93);">[</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA&amp;veaction=edit&amp;section=4" class="mw-editsection-visualeditor" title="Редактировать раздел «Открытые вопросы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править</a><span class="mw-editsection-divider" style="color: rgb(84, 89, 93);">&nbsp;|&nbsp;</span><a href="https://ru.wikipedia.org/w/index.php?title=%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA&amp;action=edit&amp;section=4" title="Редактировать раздел «Открытые вопросы»" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial; white-space: nowrap;">править код</a><span class="mw-editsection-bracket" style="margin-left: 0.25em; color: rgb(84, 89, 93);">]</span></span></h2><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">Верно ли, что&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%9C%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA_%D0%A8%D1%82%D0%B5%D1%84%D1%84%D0%B5%D0%BD%D0%B0" title="Многогранник Штеффена" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">многогранник Штеффена</a>&nbsp;имеет наименьшее число вершин среди всех изгибаемых многогранников, не имеющих самопересечений<sup id="cite_ref-14" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-14" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[14]</a></sup>;</li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">Верно ли, что если один многогранник, не имеющий самопересечений, получен из другого многогранника, который также не имеет самопересечений, непрерывным изгибанием, то эти многогранники&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A0%D0%B0%D0%B2%D0%BD%D0%BE%D1%81%D0%BE%D1%81%D1%82%D0%B0%D0%B2%D0%BB%D0%B5%D0%BD%D0%BD%D0%BE%D1%81%D1%82%D1%8C" title="Равносоставленность" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">равносоставлены</a>, то есть первый можно разбить на конечное число&nbsp;<a href="https://ru.wikipedia.org/wiki/%D0%A2%D0%B5%D1%82%D1%80%D0%B0%D1%8D%D0%B4%D1%80" title="Тетраэдр" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">тетраэдров</a>, каждый из этих тетраэдров независимо от других можно передвинуть в пространстве и получить разбиение второго многогранника<sup id="cite_ref-15" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-15" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[15]</a></sup>.</li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin: 0.3em 0px 0px 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">В размерностях, начиная с 4, неизвестно, существуют ли изгибаемые несамопересекающиеся многогранники.<sup id="cite_ref-etudes_12-1" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-etudes-12" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[12]</a></sup></li></ul><ul style="list-style-image: url(&quot;/w/skins/Vector/resources/common/images/bullet-icon.svg?d4515&quot;); margin-top: 0.3em; margin-right: 0px; margin-left: 1.6em; color: rgb(32, 33, 34); font-family: sans-serif; font-size: 14px;"><li style="margin-bottom: 0.1em;">Неизвестно, имеет ли место теорема о кузнечных мехах (должен ли сохраняться объём при изгибании) в пространствах Лобачевского чётной размерности (4, 6,...).<sup id="cite_ref-etudes_12-2" class="reference" style="line-height: 1em; unicode-bidi: isolate; white-space: nowrap; font-size: 11.2px;"><a href="https://ru.wikipedia.org/wiki/%D0%98%D0%B7%D0%B3%D0%B8%D0%B1%D0%B0%D0%B5%D0%BC%D1%8B%D0%B9_%D0%BC%D0%BD%D0%BE%D0%B3%D0%BE%D0%B3%D1%80%D0%B0%D0%BD%D0%BD%D0%B8%D0%BA#cite_note-etudes-12" style="color: rgb(6, 69, 173); background-image: none; background-position: initial; background-size: initial; background-repeat: initial; background-attachment: initial; background-origin: initial; background-clip: initial;">[12]</a></sup></li></ul>
29.03.2022 08:57:03: test<a href="/upload/grain.blog/64f/64f99fc79a599cee9d5cea59bbae3051.mp3" data-file-id="162" download="05. Conquistador - Las Patillas.mp3">Загрузить «05. Conquistador - Las Patillas.mp3»</a><div><a href="/upload/grain.blog/64f/64f99fc79a599cee9d5cea59bbae3051.mp3" data-file-id="162" download="05. Conquistador - Las Patillas.mp3">Загрузить «05. Conquistador - Las Patillas.mp3»</a><br></div><div><a href="/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><img src="/upload/grain.blog/5e2/5e260db83708f14768dc5f539c50ef9b.png" data-file-id="160" alt="5feb20b438c90293d153b657ff88ca2e.png"><br></div><div><a href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4" style="background-color: rgb(255, 255, 255);">Загрузить «Project 1.mp4»</a><br></div><div><a href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4" style="background-color: rgb(255, 255, 255);">Загрузить «Project 1.mp4»</a><br></div><div><a href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4" style="background-color: rgb(255, 255, 255);">Загрузить «Project 1.mp4»</a><br></div><div><a href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4" style="background-color: rgb(255, 255, 255);">Загрузить «Project 1.mp4»</a><br></div><div><a href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4" style="background-color: rgb(255, 255, 255);">Загрузить «Project 1.mp4»</a><br></div><div><a href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4" style="background-color: rgb(255, 255, 255);">Загрузить «Project 1.mp4»</a><br></div>
29.03.2022 09:18:21: <h2 id="ftoc-heading-2" class="has-mid-blue-color has-text-color ftwp-heading" style="padding: 0px; margin: 0.83em 0px; box-sizing: border-box; color: rgb(5, 122, 240); font-size: 1.95em; line-height: 1.4; font-family: robotocondensed; background-color: rgb(21, 21, 21);">What Will I Receive?</h2><p class="justify" style="padding: 0px; margin: 0px; box-sizing: border-box; line-height: inherit; text-align: justify; color: rgb(204, 204, 204); font-family: robotocondensed; background-color: rgb(21, 21, 21);">The majority of upgrade materials gained in this walkthrough come from Island Quests. Some of them have special requirements, so you might have to return to them at a later point.</p><ul class="justify" style="padding-left: 1.3em; margin: 14px 0px 14px 1.3em; box-sizing: border-box; list-style-position: initial; list-style-image: initial; text-align: justify; color: rgb(204, 204, 204); font-family: robotocondensed; background-color: rgb(21, 21, 21);"><li style="padding: 0px; margin: 0px; box-sizing: border-box;">20x&nbsp;<span class="la-item" data-la-id="40611106" style="padding: 0px; margin: 0px; box-sizing: border-box;">Class Engraving Pouches</span>&nbsp;allowing you to unlock the class build you wish to play from day 1.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;">Songs:&nbsp;<span class="la-music" data-la-id="3" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="lap-skill-icon" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; box-shadow: rgb(34, 34, 34) 0px 0px 1px 1px inset; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_1_8.png&quot;);"></span><span class="lap-music-name" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(215, 121, 231);">Song of Resonance</span></span>,&nbsp;<span class="la-music" data-la-id="14" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="lap-skill-icon" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; box-shadow: rgb(34, 34, 34) 0px 0px 1px 1px inset; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_4_107.png&quot;);"></span><span class="lap-music-name" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(215, 121, 231);">Elegy of Serenity</span></span>,&nbsp;<span class="la-music" data-la-id="8" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="lap-skill-icon" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; box-shadow: rgb(34, 34, 34) 0px 0px 1px 1px inset; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_3_192.png&quot;);"></span><span class="lap-music-name" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(215, 121, 231);">Serenade of Love</span></span>&nbsp;and&nbsp;<span class="la-music" data-la-id="9" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="lap-skill-icon" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; box-shadow: rgb(34, 34, 34) 0px 0px 1px 1px inset; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_3_193.png&quot;);"></span><span class="lap-music-name" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(215, 121, 231);">Forest's Minuet</span></span>.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;">Currency:&nbsp;<span class="la-money" data-la-id="10" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="lap-money-icon" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/money_3.png&quot;);"></span><span class="lap-money-name" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(230, 208, 69);">Pirate Coins</span></span>,&nbsp;<span class="la-money" data-la-id="2" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="lap-money-icon" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/money_4.png&quot;);"></span><span class="lap-money-name" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(230, 208, 69);">Gold</span></span>&nbsp;and&nbsp;<span class="la-item" data-la-id="58002901" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="la-gametip" style="padding: 0px; margin: 0px; box-sizing: border-box; cursor: default;"><div class="lap-item-background lap-item-epic" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; background: linear-gradient(to right bottom, rgb(46, 8, 59), rgb(128, 4, 169)); box-shadow: rgba(191, 0, 254, 0.5) 0px 0px 2px inset !important;"><div class="lap-item-icon" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 1em; height: 1em; align-self: flex-end; position: relative; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_2_8.png&quot;);"></div></div><span class="la-color-epic" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(191, 0, 254);">High Seas Coin Chest</span></span></span>.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="la-item" data-la-id="63230001" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="la-gametip" style="padding: 0px; margin: 0px; box-sizing: border-box; cursor: default;"><div class="lap-item-background lap-item-legendary" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; background: linear-gradient(to right bottom, rgb(57, 37, 9), rgb(161, 99, 5)); box-shadow: rgba(243, 147, 3, 0.5) 0px 0px 2px inset !important;"><div class="lap-item-icon" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 1em; height: 1em; align-self: flex-end; position: relative; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_7_140.png&quot;);"></div></div><span class="la-color-legendary" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(243, 147, 3);">Legendary - Uncommon Card Pack</span></span></span></li><li style="padding: 0px; margin: 0px; box-sizing: border-box;">Access to Una's Tasks with some of the best&nbsp;<span class="la-item" data-la-id="66110004" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="la-gametip" style="padding: 0px; margin: 0px; box-sizing: border-box; cursor: default;"><div class="lap-item-background lap-item-rare" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; background: linear-gradient(to right bottom, rgb(8, 44, 59), rgb(4, 121, 169)); box-shadow: rgba(0, 181, 255, 0.5) 0px 0px 2px inset !important;"><div class="lap-item-icon" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 1em; height: 1em; align-self: flex-end; position: relative; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_10_25.png&quot;);"></div></div><span class="la-color-rare" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 181, 255);">Harmony Leap Stone</span></span></span>&nbsp;rewards.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;">Access to the&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">Procyon's Sea</span>&nbsp;and the&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">Rohendel&nbsp;</span>continent.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;">Enough material rewards to reach item level 460.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;">And many more rewards...</li></ul><hr class="wp-block-separator has-text-color has-background has-mid-blue-background-color has-mid-blue-color is-style-wide" style="box-sizing: border-box; border-width: initial; border-style: none; opacity: 0.4; color: rgb(5, 122, 240); height: 1px; font-family: robotocondensed; margin-top: 20px !important; margin-bottom: 20px !important; background-color: rgb(79, 79, 79) !important;"><h2 id="ftoc-heading-3" class="has-mid-blue-color has-text-color ftwp-heading" style="padding: 0px; margin: 0.83em 0px; box-sizing: border-box; color: rgb(5, 122, 240); font-size: 1.95em; line-height: 1.4; font-family: robotocondensed; background-color: rgb(21, 21, 21);">Before You Start The Walkthrough</h2><p class="justify" style="padding: 0px; margin: 0px; box-sizing: border-box; line-height: inherit; text-align: justify; color: rgb(204, 204, 204); font-family: robotocondensed; background-color: rgb(21, 21, 21);"><strong style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="has-inline-color has-mid-red-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(255, 83, 83);">Disclaimer:</span></strong>&nbsp;Before starting this walkthrough, make sure you have completed the following tasks:</p><ul style="padding-left: 1.3em; margin: 14px 0px 14px 1.3em; box-sizing: border-box; list-style-position: initial; list-style-image: initial; color: rgb(204, 204, 204); font-family: robotocondensed; background-color: rgb(21, 21, 21);"><li style="padding: 0px; margin: 0px; box-sizing: border-box;">Reach level 50 by following the&nbsp;<a href="https://lost-ark.maxroll.gg/resources/1-50-leveling-guide" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">1-50 Leveling Guide</a>.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;">Unlock&nbsp;<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-16581" src="https://assets.maxroll.gg/wordpress/icon_chaos_dungeon_v1.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub><a href="https://lost-ark.maxroll.gg/resources/general-chaos-dungeon-guide" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">Chaos Dungeons</a>,&nbsp;<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-20221" src="https://assets.maxroll.gg/wordpress/icon_raid_v1.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub><a href="https://lost-ark.maxroll.gg/resources/general-raid-guide" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">Guardian Raids</a>&nbsp;and&nbsp;<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-15497" src="https://assets.maxroll.gg/wordpress/icon_unas_task_32.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Una's Tasks. Also, finish the Awakening Skill Quest and the&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">North Vern</span>&nbsp;<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-16768" src="https://assets.maxroll.gg/wordpress/icon_world_quest_v1.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Main Story. Follow the&nbsp;<a href="https://lost-ark.maxroll.gg/resources/post-50-guide" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">Post Level 50 Guide</a>&nbsp;to complete these tasks.</li></ul><div class="wp-block-advgb-columns advgb-columns-wrapper" id="advgb-cols-4feabcf9-246f-4656-b826-006baa3ca2c9" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(204, 204, 204); font-family: robotocondensed; background-color: rgb(21, 21, 21);"><div class="advgb-columns-container" style="padding: 0px; margin: 0px; box-sizing: border-box;"><div class="advgb-columns advgb-columns-row advgb-is-mobile columns-valign-top advgb-columns-2 layout-12-12 mbl-layout-stacked gutter-10 vgutter-10" style="padding: 0px; margin: 0px auto; box-sizing: border-box; display: flex;"><div class="wp-block-advgb-column advgb-column advgb-is-half-tablet advgb-is-full-mobile" id="advgb-col-c34b08e5-818d-4938-9b2c-dca165d59ac0" style="padding: 0px; margin: 0px; box-sizing: border-box; z-index: unset; flex-basis: 0px; flex-grow: 1; min-width: 0px;"><div class="advgb-column-inner" style="padding: 50px 0px 0px; margin: 0px; box-sizing: border-box; border-style: none; border-width: 1px;"><p class="justify" style="padding: 0px; margin: 0px; box-sizing: border-box; line-height: inherit; text-align: justify;">Use the&nbsp;<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-22916" src="https://assets.maxroll.gg/wordpress/minimap_symbol_224.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Ocean Liner, located in all continent harbors, to fast travel to&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">East Luterra</span>. Enter the&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">Gienah Sea</span>&nbsp;and select the&nbsp;<span class="la-item" data-la-id="720000" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="la-gametip" style="padding: 0px; margin: 0px; box-sizing: border-box; cursor: default;"></span></span></p><div class="lap-item-background lap-item-rare" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; background: linear-gradient(to right bottom, rgb(8, 44, 59), rgb(4, 121, 169)); box-shadow: rgba(0, 181, 255, 0.5) 0px 0px 2px inset !important;"><div class="lap-item-icon" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 1em; height: 1em; align-self: flex-end; position: relative; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_5_182.png&quot;);"></div></div><span class="la-color-rare" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 181, 255);">Estoque ship</span>. Board it with your fastest available sailors and head out!<p></p></div></div><div class="wp-block-advgb-column advgb-column advgb-is-half-tablet advgb-is-full-mobile" id="advgb-col-489e668b-a2fe-420f-87c6-d471b6fb7367" style="padding: 0px; margin-top: 0px; margin-right: 0px !important; margin-bottom: 0px !important; margin-left: 10px; box-sizing: border-box; z-index: unset; flex-basis: 0px; flex-grow: 1; min-width: 0px;"><div class="advgb-column-inner" style="padding: 0px; margin: 0px; box-sizing: border-box; border-style: none; border-width: 1px;"><figure class="wp-block-image size-full" style="padding: 0px; margin-bottom: 1em; box-sizing: border-box;"><img src="https://assets.maxroll.gg/wordpress/linereastluttera.jpg" alt="" class="wp-image-23681" srcset="https://assets.maxroll.gg/wordpress/linereastluttera.jpg 750w, https://assets.maxroll.gg/wordpress/linereastluttera-711x400.jpg 711w, https://assets.maxroll.gg/wordpress/linereastluttera-174x98.jpg 174w" sizes="(max-width: 750px) 100vw, 750px" style="padding: 0px; margin: 0px; box-sizing: border-box; border-radius: inherit;"><figcaption style="padding: 0px; margin: 0.5em 0px 1em; box-sizing: border-box; color: rgb(227, 227, 227); font-size: 13px; text-align: center;">Ocean Liner</figcaption></figure></div></div></div></div></div>
29.03.2022 09:19:39: <p style="padding: 0px; margin: 0px; box-sizing: border-box; line-height: inherit; color: rgb(204, 204, 204); font-family: robotocondensed; background-color: rgb(21, 21, 21);"><strong style="padding: 0px; margin: 0px; box-sizing: border-box;">Disclaimer:</strong></p><p style="padding: 0px; margin: 0px; box-sizing: border-box; line-height: inherit; color: rgb(204, 204, 204); font-family: robotocondensed; background-color: rgb(21, 21, 21);"><strong style="padding: 0px; margin: 0px; box-sizing: border-box;"><img src="/upload/grain.blog/403/40314a2862946e9f6af2cc619f400a49.jpg" data-file-id="174" alt="20210620_122607.jpg"><br></strong></p><ul style="padding-left: 1.3em; margin: 14px 0px 14px 1.3em; box-sizing: border-box; list-style-position: initial; list-style-image: initial; color: rgb(204, 204, 204); font-family: robotocondensed; background-color: rgb(21, 21, 21);"><li style="padding: 0px; margin: 0px; box-sizing: border-box;"><strong style="padding: 0px; margin: 0px; box-sizing: border-box;">This route has you bank Chaos Dungeon and Guardian raid runs as rest bonus. A rest bonus run of a Rohendel Chaos Dungeon and later Guardian Raids will be worth more upgrade materials.</strong></li></ul><ol class="justify" style="padding-left: 1.3em; margin: 14px 0px 14px 1.3em; box-sizing: border-box; text-align: justify; color: rgb(204, 204, 204); font-family: robotocondensed; background-color: rgb(21, 21, 21);"><li style="padding: 0px; margin: 0px; box-sizing: border-box;">Enter the&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">Gienah Sea</span>&nbsp;from&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">East Luterra</span>.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;"><a href="https://lost-ark.maxroll.gg/island/serenity-isle" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">Serenity Isle</a>&nbsp;(25 minutes) - Sail here and pickup the<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-15496" src="https://assets.maxroll.gg/wordpress/icon_purple_quest_32.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Adventure Quest by interacting with the wooden pile left of the island entrance and complete it. Follow the&nbsp;<a href="https://lost-ark.maxroll.gg/island/serenity-isle" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">Island Guide</a>&nbsp;for more details.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;"><a href="https://lost-ark.maxroll.gg/island/toto-silver-island" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">Toto Silver</a>&nbsp;(10 minutes) - Complete the<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-15500" src="https://assets.maxroll.gg/wordpress/icon_yellow_quest_32.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Normal Quests and<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-15496" src="https://assets.maxroll.gg/wordpress/icon_purple_quest_32.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Adventure Quests found here. Learn the&nbsp;<span class="la-item" data-la-id="120308" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="la-gametip" style="padding: 0px; margin: 0px; box-sizing: border-box; cursor: default;"><div class="lap-item-background lap-item-common" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; background: linear-gradient(to right bottom, rgb(59, 59, 59), rgb(169, 169, 169)); box-shadow: rgba(255, 255, 255, 0.5) 0px 0px 2px inset !important;"><div class="lap-item-icon" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 1em; height: 1em; align-self: flex-end; position: relative; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_1_216.png&quot;);"></div></div><span class="la-color-common" style="padding: 0px; margin: 0px; box-sizing: border-box;">Frustrated</span></span></span>&nbsp;emote from your inventory when it's given to you.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;"><a href="https://lost-ark.maxroll.gg/island/freedom-isle" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">Freedom Isle</a>&nbsp;(5 minutes) - Complete all the<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-15500" src="https://assets.maxroll.gg/wordpress/icon_yellow_quest_32.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Normal Quests. You must obtain 6x&nbsp;<span class="la-item" data-la-id="520305" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="la-gametip" style="padding: 0px; margin: 0px; box-sizing: border-box; cursor: default;"><div class="lap-item-background lap-item-uncommon" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; background: linear-gradient(to right bottom, rgb(30, 47, 8), rgb(76, 130, 4)); box-shadow: rgba(111, 195, 0, 0.5) 0px 0px 2px inset !important;"><div class="lap-item-icon" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 1em; height: 1em; align-self: flex-end; position: relative; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_4_227.png&quot;);"></div></div><span class="la-color-uncommon" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(111, 195, 0);">Class Engraving Selection Chest</span></span></span>.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;"><a href="https://lost-ark.maxroll.gg/island/blackfangs-den" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">Blackfang's Den</a>&nbsp;(15 minutes) - Complete the<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-15500" src="https://assets.maxroll.gg/wordpress/icon_yellow_quest_32.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Normal Quests. Progress the<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-15496" src="https://assets.maxroll.gg/wordpress/icon_purple_quest_32.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Adventure Quest until it asks you to go to&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">Peyto Island,</span>&nbsp;and then move on to the next step in this list.</li><li style="padding: 0px; margin: 0px; box-sizing: border-box;"><a href="https://lost-ark.maxroll.gg/island/lullaby-island" target="_blank" rel="noreferrer noopener" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(0, 127, 172);">Lullaby Island</a>&nbsp;(5 minutes) - Progress the<sub style="padding: 0px; margin: 0px; box-sizing: border-box;"><img class="wp-image-15496" src="https://assets.maxroll.gg/wordpress/icon_purple_quest_32.png" alt="" style="padding: 0px; margin: 0px; box-sizing: border-box; width: 23px;"></sub>Adventure Quest until it asks you to participate in the event, and then hide it.<ul style="padding-left: 1.3em; margin: 14px 0px 14px 1.3em; box-sizing: border-box; list-style-position: initial; list-style-image: initial;"><li style="padding: 0px; margin: 0px; box-sizing: border-box;">Save a&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">Bifrost&nbsp;</span>location near the event. Press "Alt+W" or use the hotbar below your minimap to open the menu and press "Save Location". This is used to return to complete events whenever we obtain the&nbsp;<span class="la-music" data-la-id="3" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="lap-skill-icon" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; box-shadow: rgb(34, 34, 34) 0px 0px 1px 1px inset; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_1_8.png&quot;);"></span><span class="lap-music-name" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(215, 121, 231);">Song of Resonance</span></span>&nbsp;from&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">Peyto Island</span>.</li></ul><ul style="padding-left: 1.3em; margin: 14px 0px 14px 1.3em; box-sizing: border-box; list-style-position: initial; list-style-image: initial;"><li style="padding: 0px; margin: 0px; box-sizing: border-box;">The island event occurs every 2 hours at 04:22, 06:22, 08:22, etc. Finishing it 3 times rewards&nbsp;<span class="la-music" data-la-id="9" style="padding: 0px; margin: 0px; box-sizing: border-box;"><span class="lap-skill-icon" style="padding: 0px; margin: -0.05em 0.1em -0.2em 0px; box-sizing: border-box; display: inline-block; font-size: 1.25em; width: 1em; height: 1em; box-shadow: rgb(34, 34, 34) 0px 0px 1px 1px inset; background-size: 100%; background-repeat: no-repeat; background-image: url(&quot;https://d3planner-assets.maxroll.gg/lost-ark/icons/use_3_193.png&quot;);"></span><span class="lap-music-name" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(215, 121, 231);">Forest's Minuet</span></span>, which is required to fully complete&nbsp;<span class="has-inline-color has-la-artifact-color" style="padding: 0px; margin: 0px; box-sizing: border-box; color: rgb(216, 81, 4);">Dreamgull Island</span>. For now, move on to the next step.</li></ul></li></ol>
29.03.2022 09:29:31: закрепленный пост закрытая группа
29.03.2022 14:33:07: <div><br></div><div><br></div><div>213123</div>
29.03.2022 14:33:16: 
29.03.2022 14:34:42: test<a href="/upload/grain.blog/64f/64f99fc79a599cee9d5cea59bbae3051.mp3" data-file-id="162" download="05. Conquistador - Las Patillas.mp3">Загрузить «05. Conquistador - Las Patillas.mp3»</a><div><a href="/upload/grain.blog/64f/64f99fc79a599cee9d5cea59bbae3051.mp3" data-file-id="162" download="05. Conquistador - Las Patillas.mp3">Загрузить «05. Conquistador - Las Patillas.mp3»</a><br></div><div><a href="/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><img src="/upload/grain.blog/5e2/5e260db83708f14768dc5f539c50ef9b.png" data-file-id="160" alt="5feb20b438c90293d153b657ff88ca2e.png"><br></div><div><a target="_blank" href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><a target="_blank" href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><a target="_blank" href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><a target="_blank" href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><a target="_blank" href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><a target="_blank" href="https://community.yacl.site/upload/grain.blog/a67/a675223ef5dd7227bb7c46219e1fd50b.mp4" data-file-id="161" download="Project 1.mp4">Загрузить «Project 1.mp4»</a><br></div><div><br></div><div><br></div><div><a href="/upload/grain.blog/4c8/4c8e28db8e1da4ae69a521163f138249.pdf" data-file-id="176" download="демо.pdf">Загрузить «демо.pdf»</a><br></div><div><a href="/upload/grain.blog/7d8/7d8873de76098732c8ac2b67b1af5466.docx" data-file-id="175" download="демодок.docx">Загрузить «демодок.docx»</a><br></div>
29.03.2022 14:47:22: <br><a href="/upload/grain.blog/05f/05f7bd2b80a9b3ca6c288ebceb4678b6.pdf" data-file-id="179" download="демо.pdf">Загрузить «демо.pdf»</a><br><div><br></div><div><br></div><div><a href="/upload/grain.blog/db2/db29d1f4e87d4cdb9d04687ea60bbd0b.docx" data-file-id="180" download="демодок.docx">Загрузить «демодок.docx»</a><br></div>
29.03.2022 15:02:03: <br><img src="/upload/grain.blog/a1b/a1bcb1b071ee57003f26b712b5368227.png" data-file-id="181" alt="120114994_10217882093312887_1311588931026175403_o.png"><br>
29.03.2022 17:15:07: <br><a href="/upload/grain.blog/2b5/2b52df7958f4f231b334c48bb44e79e8.mp4" data-file-id="182" download="lost ark kpop dance.mp4">Загрузить «lost ark kpop dance.mp4»</a><br>
05.04.2022 06:46:14: 345345
13.04.2022 09:18:23: 
13.04.2022 09:18:38: <br><img src="/upload/grain.blog/5be/5be0d4f07216fbdee92e6f54dd3f555d.jpg" data-file-id="183" alt="2109.jpg"><br>
13.04.2022 10:35:27: <p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для того, чтобы оптимизировать гибкость ума, вы должны бросать
вызов своему мозгу каждый день: удивляйте его новыми действиями, чтобы он не
останавливался и не переставал себя стимулировать. Повысить свои умственные
способности возможно при помощи упражнений.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;<!--[if gte vml 1]><v:shapetype
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 path="m@4@5l@4@11@9@11@9@5xe" filled="f" stroked="f">
 <v:stroke joinstyle="miter"/>
 <v:formulas>
  <v:f eqn="if lineDrawn pixelLineWidth 0"/>
  <v:f eqn="sum @0 1 0"/>
  <v:f eqn="sum 0 0 @1"/>
  <v:f eqn="prod @2 1 2"/>
  <v:f eqn="prod @3 21600 pixelWidth"/>
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  <v:f eqn="sum @8 21600 0"/>
  <v:f eqn="prod @7 21600 pixelHeight"/>
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 </v:formulas>
 <v:path o:extrusionok="f" gradientshapeok="t" o:connecttype="rect"/>
 <o:lock v:ext="edit" aspectratio="t"/>
</v:shapetype><v:shape id="Рисунок_x0020_4" o:spid="_x0000_i1027" type="#_x0000_t75"
 alt="382.jpg" style='width:262.5pt;height:175.5pt;visibility:visible;
 mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image001.jpg"
  o:title="382"/>
</v:shape><![endif]--><!--[if !vml]--><img width="350" height="234" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image001.jpg" alt="382.jpg" v:shapes="Рисунок_x0020_4"><!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">«Гибкость ума» предполагает удивительные когнитивные процессы,
которые позволяют нам рассуждать и быстрее делать выводы и логические
заключения.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">В это же измерение входит творчество, аналитические способности и
та мгновенность действий, что позволяет нам сделать отношения в своей
повседневной жизни более качественными и удовлетворяющими нашим потребностям.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Все эти процессы — не данность и ни в коем случае не
характеристика одних лишь молодых людей.&nbsp;Напротив, в данном случае речь
идет скорее о приобретенных навыках, о способностях, которые можно развить в
себе и которые не теряются с возрастом. Только для этого необходимо каждый день
работать над собой и приспосабливаться к тому, что нас окружает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;">&nbsp;</span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Нам просто нужно прийти к осознанию, в самом широком смысле этого
слова. Точно так же, как мы уделяем время физическим упражнениям, идем в
спортзал или на занятия йогой,&nbsp;<b>следует «тренировать» и свой мозг</b>.
Находить&nbsp;<b>несколько минут каждый день на практику несложных стратегий</b>,
которые будут способствовать взаимодействию полушарий нашего мозга, созданию
новых нейронных связей и постепенному повышению «</span><i>гибкости ума</i><span style="font-size:12.0pt;mso-ascii-font-family:
Calibri;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">», в целом.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;">&nbsp;</span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><!--[if gte vml 1]><v:shape id="Рисунок_x0020_5"
 o:spid="_x0000_i1026" type="#_x0000_t75" style='width:467.25pt;height:316.5pt;
 visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image002.png"
  o:title="B6775678"/>
</v:shape><![endif]--><!--[if !vml]--><img width="623" height="422" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image003.png" v:shapes="Рисунок_x0020_5"><!--[endif]--><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">1. Одевайтесь и раздевайтесь с
закрытыми глазами</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Даже если вы будете делать это всего один раз в день, обязательно
попробуйте: одевайтесь и раздевайтесь с закрытыми глазами.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Сначала вам может показаться это глупостью, но на самом деле таким
образом вы «запускаете» самые неожиданные процессы, которые:</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">улучшают координацию движений</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="margin-bottom: 0.0001pt; line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">усиливают взаимосвязь и взаимодействие правого и левого
     полушарий мозга</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">развивают мелкую моторику</span><span style="font-size:12.0pt;
     font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">помогают рисовать так называемые «ментальные карты» о
     существующих расстояниях между пуговицами, о том, как застегнуть молнию и
     куда просунуть руки…</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Попробуйте выполнить это несложное упражнение, только не забывайте
о безопасности: лучше делать это, сидя на кровати, чем стоя.</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">2. Игра приблизительных и точных
значений</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для того, чтобы улучшить гибкость ума, необходимо понимать один
очень важный аспект: это потребует волевых усилий. И даже если сначала все это
покажется вам слишком простым времяпрепровождением, поверьте, ваш мозг будет
благодарен вам за него.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Мозг любит нарушение привычного ритма
и новые стимулы.</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Игра приблизительных и точных значений — это ежедневная задача,
требующая от вас внимания, расчета и подсчета.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько лестниц в моем офисе?</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">А в автобусе… Сколько людей сегодня надели черную одежду?</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько получится, если сложить две последние цифры номера
     проезжающей мимо машины?</span><span style="font-size:12.0pt;font-family:
     &quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:
     &quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько пройдет секунд, прежде чем цвет светофора сменится на
     зеленый?</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">3. Каждый день учите по 5 новых
иностранных слов</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Неважно, какой иностранный язык вы выберете. Это может быть каждый
день новый язык. Чтобы повысить гибкость ума, будет отлично выучивать от 3 до 5
новых слов в день.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Так вы не только будете расширять кругозор и увеличивать свой
лингвистический потенциал, но и способствовать формированию новых нейронных
тканей, которые впоследствии станут вашим когнитивным резервом и помогут
достойно справиться с течением времени.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">4. Меняйте привычную
последовательность действий всегда, когда есть такая возможность</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Рутина — один из злейших врагов нашего мозга. Ему скучно, когда
ничего нового не происходит, он «переключается» на автоматический режим, то
есть он не работает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">В тот момент, когда наши когнитивные процессы ограничены, когда
они всегда одни и те же, когда не остается места для творчества, свободы и
личного удовольствия, мы имеем дело с нежелательными последствиями: потерей
памяти, отсутствием концентрации, медлительностью в рефлексах и т.д…</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><i><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">В идеале нужно стараться каждый день
посвящать себе 1 или 2 часа. Это уже будет подарком для нашего разума и чувств.</span></i><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">5. Говорите, слушайте, соотносите,
спорьте и делайте выводы</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Социальные контакты, позитивные отношения, диалоги — все это
позволяет нам расширять горизонты своих знаний. Социальную активность можно
назвать «бензином» для повышения нашей умственной гибкости.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Так у нас получается быстрее обрабатывать информацию, мы
     учимся ценить ее и в то же время у нас формируется и свое собственное
     мнение.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">А споры, вопреки распространенному мнению, могут иметь не
     только негативные последствия, ведь не зря говорят, что в них «рождается
     истина», значит, наш ум становится острее.</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Мы становимся более внимательными, отзывчивыми и в то же
     время более уверенными в себе, учимся лучше управлять своими эмоциями.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Ведь очень немногие вещи в нашей жизни можно назвать мудростью, а
уважительное и остроумное общение — вполне.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">6. Ведите дневник</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для многих людей ведение дневника уже стало жизненной
необходимостью. Им нужно поделиться своими мыслями, идеями и полученным опытом
с листом бумаги.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">И это не просто записи, восстановление хронологической
     последовательности каких-то действий, это настоящая терапия для нашего
     разума.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Так мы учимся трансформировать свои идеи в слова, а опыт — в
     целые фразы.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Наши мысли становятся более подвижными, текучими и гибкими,
     взгляд внутрь себя находит канал для выражения, а потом все это
     возвращается обратно к нам в мозг.</span><span style="font-size:12.0pt;
     font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><i><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Так мы развиваем свои творческие
способности.&nbsp;</span></i><span style="font-size:12.0pt;mso-ascii-font-family:
Calibri;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Чем больше мы пишем, тем сильнее наше
желание писать еще. Это как открытая дверь, позволяющая нам увидеть разные
дороги, которые нам еще только предстоит пройти и изучить.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">7. Выходите на прогулку каждый день</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Наше тело всегда находится в гармонии с умом. Тело, которое
устало, переживает стресс и неблагополучие заставляет и разум становиться более
жестким, сковывает его.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Человек начинает сосредотачиваться на неупорядоченных,
разрозненных и хаотичных аспектах, которые препятствуют развитию его творческих
способностей. Но нам нужно обратное: расслабление и возможность
концентрироваться на чем-то, то выходит за пределы нашего тела.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Выйдите на пробежку, это расслабляет. Выйдите просто на прогулку,
это позволит вам облегчить душу и сердце и успокоить ум. Когда мы шагаем наш
разум чувствует себя свободным. Это происходит даже чисто на химическом уровне:
мозг получает больше кислорода и больше питательных веществ.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Так что если вы действительно хотите иметь гибкий ум, то не
забывайте, нужно «инвестировать» в себя: посвящайте себе время, и пусть
неотъемлемыми частями вашей жизни станут страсть к познанию нового и мотивация,
чтобы чувствовать себя по-настоящему хорошо.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;"><!--[if gte vml 1]><v:shape id="Рисунок_x0020_6" o:spid="_x0000_i1025"
 type="#_x0000_t75" alt="https://medaboutme.ru/upload/iblock/266/uprazhneniya_dlya_mozga_kak_povysit_umstvennye_sposobnosti.jpg"
 style='width:750pt;height:500.25pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image004.jpg"
  o:title="uprazhneniya_dlya_mozga_kak_povysit_umstvennye_sposobnosti"/>
</v:shape><![endif]--><!--[if !vml]--><img width="1000" height="667" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image004.jpg" alt="https://medaboutme.ru/upload/iblock/266/uprazhneniya_dlya_mozga_kak_povysit_umstvennye_sposobnosti.jpg" v:shapes="Рисунок_x0020_6"><!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal"><o:p>&nbsp;</o:p></p>
13.04.2022 10:36:36: <p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для того, чтобы оптимизировать гибкость ума, вы должны бросать
вызов своему мозгу каждый день: удивляйте его новыми действиями, чтобы он не
останавливался и не переставал себя стимулировать. Повысить свои умственные
способности возможно при помощи упражнений.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><br></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">«Гибкость ума» предполагает удивительные когнитивные процессы,
которые позволяют нам рассуждать и быстрее делать выводы и логические
заключения.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">В это же измерение входит творчество, аналитические способности и
та мгновенность действий, что позволяет нам сделать отношения в своей
повседневной жизни более качественными и удовлетворяющими нашим потребностям.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Все эти процессы — не данность и ни в коем случае не
характеристика одних лишь молодых людей.&nbsp;Напротив, в данном случае речь
идет скорее о приобретенных навыках, о способностях, которые можно развить в
себе и которые не теряются с возрастом. Только для этого необходимо каждый день
работать над собой и приспосабливаться к тому, что нас окружает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;">&nbsp;</span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Нам просто нужно прийти к осознанию, в самом широком смысле этого
слова. Точно так же, как мы уделяем время физическим упражнениям, идем в
спортзал или на занятия йогой,&nbsp;<b>следует «тренировать» и свой мозг</b>.
Находить&nbsp;<b>несколько минут каждый день на практику несложных стратегий</b>,
которые будут способствовать взаимодействию полушарий нашего мозга, созданию
новых нейронных связей и постепенному повышению «</span><i>гибкости ума</i><span style="font-size:12.0pt;mso-ascii-font-family:
Calibri;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">», в целом.</span></p><p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b style="color: var(--color-dark); font-size: 1.6rem; font-family: var(--base-font-family);"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br></span></b></p><p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b style="color: var(--color-dark); font-size: 1.6rem; font-family: var(--base-font-family);"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">1. Одевайтесь и раздевайтесь с
закрытыми глазами</span></b></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Даже если вы будете делать это всего один раз в день, обязательно
попробуйте: одевайтесь и раздевайтесь с закрытыми глазами.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Сначала вам может показаться это глупостью, но на самом деле таким
образом вы «запускаете» самые неожиданные процессы, которые:</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">улучшают координацию движений</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="margin-bottom: 0.0001pt; line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">усиливают взаимосвязь и взаимодействие правого и левого
     полушарий мозга</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">развивают мелкую моторику</span><span style="font-size:12.0pt;
     font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">помогают рисовать так называемые «ментальные карты» о
     существующих расстояниях между пуговицами, о том, как застегнуть молнию и
     куда просунуть руки…</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Попробуйте выполнить это несложное упражнение, только не забывайте
о безопасности: лучше делать это, сидя на кровати, чем стоя.</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">2. Игра приблизительных и точных
значений</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для того, чтобы улучшить гибкость ума, необходимо понимать один
очень важный аспект: это потребует волевых усилий. И даже если сначала все это
покажется вам слишком простым времяпрепровождением, поверьте, ваш мозг будет
благодарен вам за него.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Мозг любит нарушение привычного ритма
и новые стимулы.</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Игра приблизительных и точных значений — это ежедневная задача,
требующая от вас внимания, расчета и подсчета.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько лестниц в моем офисе?</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">А в автобусе… Сколько людей сегодня надели черную одежду?</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько получится, если сложить две последние цифры номера
     проезжающей мимо машины?</span><span style="font-size:12.0pt;font-family:
     &quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:
     &quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько пройдет секунд, прежде чем цвет светофора сменится на
     зеленый?</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">3. Каждый день учите по 5 новых
иностранных слов</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Неважно, какой иностранный язык вы выберете. Это может быть каждый
день новый язык. Чтобы повысить гибкость ума, будет отлично выучивать от 3 до 5
новых слов в день.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Так вы не только будете расширять кругозор и увеличивать свой
лингвистический потенциал, но и способствовать формированию новых нейронных
тканей, которые впоследствии станут вашим когнитивным резервом и помогут
достойно справиться с течением времени.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">4. Меняйте привычную
последовательность действий всегда, когда есть такая возможность</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Рутина — один из злейших врагов нашего мозга. Ему скучно, когда
ничего нового не происходит, он «переключается» на автоматический режим, то
есть он не работает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">В тот момент, когда наши когнитивные процессы ограничены, когда
они всегда одни и те же, когда не остается места для творчества, свободы и
личного удовольствия, мы имеем дело с нежелательными последствиями: потерей
памяти, отсутствием концентрации, медлительностью в рефлексах и т.д…</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><i><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">В идеале нужно стараться каждый день
посвящать себе 1 или 2 часа. Это уже будет подарком для нашего разума и чувств.</span></i><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">5. Говорите, слушайте, соотносите,
спорьте и делайте выводы</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Социальные контакты, позитивные отношения, диалоги — все это
позволяет нам расширять горизонты своих знаний. Социальную активность можно
назвать «бензином» для повышения нашей умственной гибкости.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Так у нас получается быстрее обрабатывать информацию, мы
     учимся ценить ее и в то же время у нас формируется и свое собственное
     мнение.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">А споры, вопреки распространенному мнению, могут иметь не
     только негативные последствия, ведь не зря говорят, что в них «рождается
     истина», значит, наш ум становится острее.</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Мы становимся более внимательными, отзывчивыми и в то же
     время более уверенными в себе, учимся лучше управлять своими эмоциями.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Ведь очень немногие вещи в нашей жизни можно назвать мудростью, а
уважительное и остроумное общение — вполне.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">6. Ведите дневник</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для многих людей ведение дневника уже стало жизненной
необходимостью. Им нужно поделиться своими мыслями, идеями и полученным опытом
с листом бумаги.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">И это не просто записи, восстановление хронологической
     последовательности каких-то действий, это настоящая терапия для нашего
     разума.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Так мы учимся трансформировать свои идеи в слова, а опыт — в
     целые фразы.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Наши мысли становятся более подвижными, текучими и гибкими,
     взгляд внутрь себя находит канал для выражения, а потом все это
     возвращается обратно к нам в мозг.</span><span style="font-size:12.0pt;
     font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><i><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Так мы развиваем свои творческие
способности.&nbsp;</span></i><span style="font-size:12.0pt;mso-ascii-font-family:
Calibri;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Чем больше мы пишем, тем сильнее наше
желание писать еще. Это как открытая дверь, позволяющая нам увидеть разные
дороги, которые нам еще только предстоит пройти и изучить.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">7. Выходите на прогулку каждый день</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Наше тело всегда находится в гармонии с умом. Тело, которое
устало, переживает стресс и неблагополучие заставляет и разум становиться более
жестким, сковывает его.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Человек начинает сосредотачиваться на неупорядоченных,
разрозненных и хаотичных аспектах, которые препятствуют развитию его творческих
способностей. Но нам нужно обратное: расслабление и возможность
концентрироваться на чем-то, то выходит за пределы нашего тела.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Выйдите на пробежку, это расслабляет. Выйдите просто на прогулку,
это позволит вам облегчить душу и сердце и успокоить ум. Когда мы шагаем наш
разум чувствует себя свободным. Это происходит даже чисто на химическом уровне:
мозг получает больше кислорода и больше питательных веществ.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Так что если вы действительно хотите иметь гибкий ум, то не
забывайте, нужно «инвестировать» в себя: посвящайте себе время, и пусть
неотъемлемыми частями вашей жизни станут страсть к познанию нового и мотивация,
чтобы чувствовать себя по-настоящему хорошо.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><br></p>
13.04.2022 10:37:22: <p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для того, чтобы оптимизировать гибкость ума, вы должны бросать
вызов своему мозгу каждый день: удивляйте его новыми действиями, чтобы он не
останавливался и не переставал себя стимулировать. Повысить свои умственные
способности возможно при помощи упражнений.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;<!--[if gte vml 1]><v:shapetype
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 path="m@4@5l@4@11@9@11@9@5xe" filled="f" stroked="f">
 <v:stroke joinstyle="miter"/>
 <v:formulas>
  <v:f eqn="if lineDrawn pixelLineWidth 0"/>
  <v:f eqn="sum @0 1 0"/>
  <v:f eqn="sum 0 0 @1"/>
  <v:f eqn="prod @2 1 2"/>
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 <v:path o:extrusionok="f" gradientshapeok="t" o:connecttype="rect"/>
 <o:lock v:ext="edit" aspectratio="t"/>
</v:shapetype><v:shape id="Рисунок_x0020_4" o:spid="_x0000_i1027" type="#_x0000_t75"
 alt="382.jpg" style='width:262.5pt;height:175.5pt;visibility:visible;
 mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image001.jpg"
  o:title="382"/>
</v:shape><![endif]--><!--[if !vml]--><img width="350" height="234" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image001.jpg" alt="382.jpg" v:shapes="Рисунок_x0020_4"><!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">«Гибкость ума» предполагает удивительные когнитивные процессы,
которые позволяют нам рассуждать и быстрее делать выводы и логические
заключения.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">В это же измерение входит творчество, аналитические способности и
та мгновенность действий, что позволяет нам сделать отношения в своей
повседневной жизни более качественными и удовлетворяющими нашим потребностям.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Все эти процессы — не данность и ни в коем случае не
характеристика одних лишь молодых людей.&nbsp;Напротив, в данном случае речь
идет скорее о приобретенных навыках, о способностях, которые можно развить в
себе и которые не теряются с возрастом. Только для этого необходимо каждый день
работать над собой и приспосабливаться к тому, что нас окружает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;">&nbsp;</span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Нам просто нужно прийти к осознанию, в самом широком смысле этого
слова. Точно так же, как мы уделяем время физическим упражнениям, идем в
спортзал или на занятия йогой,&nbsp;<b>следует «тренировать» и свой мозг</b>.
Находить&nbsp;<b>несколько минут каждый день на практику несложных стратегий</b>,
которые будут способствовать взаимодействию полушарий нашего мозга, созданию
новых нейронных связей и постепенному повышению «</span><i>гибкости ума</i><span style="font-size:12.0pt;mso-ascii-font-family:
Calibri;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">», в целом.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;">&nbsp;</span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><!--[if gte vml 1]><v:shape id="Рисунок_x0020_5"
 o:spid="_x0000_i1026" type="#_x0000_t75" style='width:467.25pt;height:316.5pt;
 visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image002.png"
  o:title="B6775678"/>
</v:shape><![endif]--><!--[if !vml]--><img width="623" height="422" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image003.png" v:shapes="Рисунок_x0020_5"><!--[endif]--><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">1. Одевайтесь и раздевайтесь с
закрытыми глазами</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Даже если вы будете делать это всего один раз в день, обязательно
попробуйте: одевайтесь и раздевайтесь с закрытыми глазами.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Сначала вам может показаться это глупостью, но на самом деле таким
образом вы «запускаете» самые неожиданные процессы, которые:</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">улучшают координацию движений</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="margin-bottom: 0.0001pt; line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">усиливают взаимосвязь и взаимодействие правого и левого
     полушарий мозга</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">развивают мелкую моторику</span><span style="font-size:12.0pt;
     font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">помогают рисовать так называемые «ментальные карты» о
     существующих расстояниях между пуговицами, о том, как застегнуть молнию и
     куда просунуть руки…</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Попробуйте выполнить это несложное упражнение, только не забывайте
о безопасности: лучше делать это, сидя на кровати, чем стоя.</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">2. Игра приблизительных и точных
значений</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для того, чтобы улучшить гибкость ума, необходимо понимать один
очень важный аспект: это потребует волевых усилий. И даже если сначала все это
покажется вам слишком простым времяпрепровождением, поверьте, ваш мозг будет
благодарен вам за него.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Мозг любит нарушение привычного ритма
и новые стимулы.</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Игра приблизительных и точных значений — это ежедневная задача,
требующая от вас внимания, расчета и подсчета.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько лестниц в моем офисе?</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">А в автобусе… Сколько людей сегодня надели черную одежду?</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько получится, если сложить две последние цифры номера
     проезжающей мимо машины?</span><span style="font-size:12.0pt;font-family:
     &quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:
     &quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько пройдет секунд, прежде чем цвет светофора сменится на
     зеленый?</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">3. Каждый день учите по 5 новых
иностранных слов</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Неважно, какой иностранный язык вы выберете. Это может быть каждый
день новый язык. Чтобы повысить гибкость ума, будет отлично выучивать от 3 до 5
новых слов в день.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Так вы не только будете расширять кругозор и увеличивать свой
лингвистический потенциал, но и способствовать формированию новых нейронных
тканей, которые впоследствии станут вашим когнитивным резервом и помогут
достойно справиться с течением времени.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">4. Меняйте привычную
последовательность действий всегда, когда есть такая возможность</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Рутина — один из злейших врагов нашего мозга. Ему скучно, когда
ничего нового не происходит, он «переключается» на автоматический режим, то
есть он не работает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">В тот момент, когда наши когнитивные процессы ограничены, когда
они всегда одни и те же, когда не остается места для творчества, свободы и
личного удовольствия, мы имеем дело с нежелательными последствиями: потерей
памяти, отсутствием концентрации, медлительностью в рефлексах и т.д…</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><i><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">В идеале нужно стараться каждый день
посвящать себе 1 или 2 часа. Это уже будет подарком для нашего разума и чувств.</span></i><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">5. Говорите, слушайте, соотносите,
спорьте и делайте выводы</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Социальные контакты, позитивные отношения, диалоги — все это
позволяет нам расширять горизонты своих знаний. Социальную активность можно
назвать «бензином» для повышения нашей умственной гибкости.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Так у нас получается быстрее обрабатывать информацию, мы
     учимся ценить ее и в то же время у нас формируется и свое собственное
     мнение.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">А споры, вопреки распространенному мнению, могут иметь не
     только негативные последствия, ведь не зря говорят, что в них «рождается
     истина», значит, наш ум становится острее.</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Мы становимся более внимательными, отзывчивыми и в то же
     время более уверенными в себе, учимся лучше управлять своими эмоциями.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Ведь очень немногие вещи в нашей жизни можно назвать мудростью, а
уважительное и остроумное общение — вполне.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">6. Ведите дневник</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для многих людей ведение дневника уже стало жизненной
необходимостью. Им нужно поделиться своими мыслями, идеями и полученным опытом
с листом бумаги.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">И это не просто записи, восстановление хронологической
     последовательности каких-то действий, это настоящая терапия для нашего
     разума.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Так мы учимся трансформировать свои идеи в слова, а опыт — в
     целые фразы.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Наши мысли становятся более подвижными, текучими и гибкими,
     взгляд внутрь себя находит канал для выражения, а потом все это
     возвращается обратно к нам в мозг.</span><span style="font-size:12.0pt;
     font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><i><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Так мы развиваем свои творческие
способности.&nbsp;</span></i><span style="font-size:12.0pt;mso-ascii-font-family:
Calibri;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Чем больше мы пишем, тем сильнее наше
желание писать еще. Это как открытая дверь, позволяющая нам увидеть разные
дороги, которые нам еще только предстоит пройти и изучить.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">7. Выходите на прогулку каждый день</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Наше тело всегда находится в гармонии с умом. Тело, которое
устало, переживает стресс и неблагополучие заставляет и разум становиться более
жестким, сковывает его.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Человек начинает сосредотачиваться на неупорядоченных,
разрозненных и хаотичных аспектах, которые препятствуют развитию его творческих
способностей. Но нам нужно обратное: расслабление и возможность
концентрироваться на чем-то, то выходит за пределы нашего тела.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Выйдите на пробежку, это расслабляет. Выйдите просто на прогулку,
это позволит вам облегчить душу и сердце и успокоить ум. Когда мы шагаем наш
разум чувствует себя свободным. Это происходит даже чисто на химическом уровне:
мозг получает больше кислорода и больше питательных веществ.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Так что если вы действительно хотите иметь гибкий ум, то не
забывайте, нужно «инвестировать» в себя: посвящайте себе время, и пусть
неотъемлемыми частями вашей жизни станут страсть к познанию нового и мотивация,
чтобы чувствовать себя по-настоящему хорошо.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;"><!--[if gte vml 1]><v:shape id="Рисунок_x0020_6" o:spid="_x0000_i1025"
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 style='width:750pt;height:500.25pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image004.jpg"
  o:title="uprazhneniya_dlya_mozga_kak_povysit_umstvennye_sposobnosti"/>
</v:shape><![endif]--><!--[if !vml]--><img width="1000" height="667" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image004.jpg" alt="https://medaboutme.ru/upload/iblock/266/uprazhneniya_dlya_mozga_kak_povysit_umstvennye_sposobnosti.jpg" v:shapes="Рисунок_x0020_6"><!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal"><o:p>&nbsp;</o:p></p>
13.04.2022 10:38:12: 
13.04.2022 10:38:24: 
13.04.2022 10:39:03: 
13.04.2022 10:40:45: 
13.04.2022 14:50:10: <p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для того, чтобы оптимизировать гибкость ума, вы должны бросать
вызов своему мозгу каждый день: удивляйте его новыми действиями, чтобы он не
останавливался и не переставал себя стимулировать. Повысить свои умственные
способности возможно при помощи упражнений.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;<!--[if gte vml 1]><v:shapetype
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 <v:stroke joinstyle="miter"/>
 <v:formulas>
  <v:f eqn="if lineDrawn pixelLineWidth 0"/>
  <v:f eqn="sum @0 1 0"/>
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  <v:f eqn="prod @2 1 2"/>
  <v:f eqn="prod @3 21600 pixelWidth"/>
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</v:shapetype><v:shape id="Рисунок_x0020_4" o:spid="_x0000_i1027" type="#_x0000_t75"
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</v:shape><![endif]--><!--[if !vml]--><img width="350" height="234" src="file:///C:/Users/ajax/AppData/Local/Temp/msohtmlclip1/01/clip_image001.jpg" alt="382.jpg" v:shapes="Рисунок_x0020_4"><!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">«Гибкость ума» предполагает удивительные когнитивные процессы,
которые позволяют нам рассуждать и быстрее делать выводы и логические
заключения.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">В это же измерение входит творчество, аналитические способности и
та мгновенность действий, что позволяет нам сделать отношения в своей
повседневной жизни более качественными и удовлетворяющими нашим потребностям.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Все эти процессы — не данность и ни в коем случае не
характеристика одних лишь молодых людей.&nbsp;Напротив, в данном случае речь
идет скорее о приобретенных навыках, о способностях, которые можно развить в
себе и которые не теряются с возрастом. Только для этого необходимо каждый день
работать над собой и приспосабливаться к тому, что нас окружает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;">&nbsp;</span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Нам просто нужно прийти к осознанию, в самом широком смысле этого
слова. Точно так же, как мы уделяем время физическим упражнениям, идем в
спортзал или на занятия йогой,&nbsp;<b>следует «тренировать» и свой мозг</b>.
Находить&nbsp;<b>несколько минут каждый день на практику несложных стратегий</b>,
которые будут способствовать взаимодействию полушарий нашего мозга, созданию
новых нейронных связей и постепенному повышению «</span><i>гибкости ума</i><span style="font-size:12.0pt;mso-ascii-font-family:
Calibri;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">», в целом.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;">&nbsp;</span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><!--[if gte vml 1]><v:shape id="Рисунок_x0020_5"
 o:spid="_x0000_i1026" type="#_x0000_t75" style='width:467.25pt;height:316.5pt;
 visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/ajax/AppData/Local/Temp/msohtmlclip1/01/clip_image002.png"
  o:title="B6775678"/>
</v:shape><![endif]--><!--[if !vml]--><img width="623" height="422" src="file:///C:/Users/ajax/AppData/Local/Temp/msohtmlclip1/01/clip_image003.png" v:shapes="Рисунок_x0020_5"><!--[endif]--><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">1. Одевайтесь и раздевайтесь с
закрытыми глазами</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Даже если вы будете делать это всего один раз в день, обязательно
попробуйте: одевайтесь и раздевайтесь с закрытыми глазами.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Сначала вам может показаться это глупостью, но на самом деле таким
образом вы «запускаете» самые неожиданные процессы, которые:</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">улучшают координацию движений</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="margin-bottom: 0.0001pt; line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">усиливают взаимосвязь и взаимодействие правого и левого
     полушарий мозга</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">развивают мелкую моторику</span><span style="font-size:12.0pt;
     font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">помогают рисовать так называемые «ментальные карты» о
     существующих расстояниях между пуговицами, о том, как застегнуть молнию и
     куда просунуть руки…</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Попробуйте выполнить это несложное упражнение, только не забывайте
о безопасности: лучше делать это, сидя на кровати, чем стоя.</span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size:12.0pt;font-family:&quot;var(--base-font-family)&quot;,serif;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">2. Игра приблизительных и точных
значений</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для того, чтобы улучшить гибкость ума, необходимо понимать один
очень важный аспект: это потребует волевых усилий. И даже если сначала все это
покажется вам слишком простым времяпрепровождением, поверьте, ваш мозг будет
благодарен вам за него.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Мозг любит нарушение привычного ритма
и новые стимулы.</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Игра приблизительных и точных значений — это ежедневная задача,
требующая от вас внимания, расчета и подсчета.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько лестниц в моем офисе?</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">А в автобусе… Сколько людей сегодня надели черную одежду?</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько получится, если сложить две последние цифры номера
     проезжающей мимо машины?</span><span style="font-size:12.0pt;font-family:
     &quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:
     &quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Сколько пройдет секунд, прежде чем цвет светофора сменится на
     зеленый?</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">3. Каждый день учите по 5 новых
иностранных слов</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Неважно, какой иностранный язык вы выберете. Это может быть каждый
день новый язык. Чтобы повысить гибкость ума, будет отлично выучивать от 3 до 5
новых слов в день.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Так вы не только будете расширять кругозор и увеличивать свой
лингвистический потенциал, но и способствовать формированию новых нейронных
тканей, которые впоследствии станут вашим когнитивным резервом и помогут
достойно справиться с течением времени.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">4. Меняйте привычную последовательность
действий всегда, когда есть такая возможность</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Рутина — один из злейших врагов нашего мозга. Ему скучно, когда
ничего нового не происходит, он «переключается» на автоматический режим, то
есть он не работает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">В тот момент, когда наши когнитивные процессы ограничены, когда
они всегда одни и те же, когда не остается места для творчества, свободы и
личного удовольствия, мы имеем дело с нежелательными последствиями: потерей
памяти, отсутствием концентрации, медлительностью в рефлексах и т.д…</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><i><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">В идеале нужно стараться каждый день
посвящать себе 1 или 2 часа. Это уже будет подарком для нашего разума и чувств.</span></i><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">5. Говорите, слушайте, соотносите,
спорьте и делайте выводы</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Социальные контакты, позитивные отношения, диалоги — все это
позволяет нам расширять горизонты своих знаний. Социальную активность можно
назвать «бензином» для повышения нашей умственной гибкости.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Так у нас получается быстрее обрабатывать информацию, мы
     учимся ценить ее и в то же время у нас формируется и свое собственное
     мнение.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">А споры, вопреки распространенному мнению, могут иметь не
     только негативные последствия, ведь не зря говорят, что в них «рождается
     истина», значит, наш ум становится острее.</span><span style="font-size:
     12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Мы становимся более внимательными, отзывчивыми и в то же
     время более уверенными в себе, учимся лучше управлять своими эмоциями.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Ведь очень немногие вещи в нашей жизни можно назвать мудростью, а
уважительное и остроумное общение — вполне.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">6. Ведите дневник</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Для многих людей ведение дневника уже стало жизненной
необходимостью. Им нужно поделиться своими мыслями, идеями и полученным опытом
с листом бумаги.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<ul type="disc">
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">И это не просто записи, восстановление хронологической
     последовательности каких-то действий, это настоящая терапия для нашего
     разума.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Так мы учимся трансформировать свои идеи в слова, а опыт — в
     целые фразы.</span><span style="font-size:12.0pt;font-family:&quot;Roboto&quot;,serif;
     mso-fareast-font-family:&quot;Times New Roman&quot;;mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
 <li class="MsoNormal" style="line-height: normal;"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
     &quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
     color:black">Наши мысли становятся более подвижными, текучими и гибкими,
     взгляд внутрь себя находит канал для выражения, а потом все это
     возвращается обратно к нам в мозг.</span><span style="font-size:12.0pt;
     font-family:&quot;Roboto&quot;,serif;mso-fareast-font-family:&quot;Times New Roman&quot;;
     mso-bidi-font-family:&quot;Times New Roman&quot;"><o:p></o:p></span></li>
</ul>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><i><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Так мы развиваем свои творческие
способности.&nbsp;</span></i><span style="font-size:12.0pt;mso-ascii-font-family:
Calibri;mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">Чем больше мы пишем, тем сильнее наше
желание писать еще. Это как открытая дверь, позволяющая нам увидеть разные
дороги, которые нам еще только предстоит пройти и изучить.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black">7. Выходите на прогулку каждый день</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><b><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;
mso-fareast-font-family:&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;
mso-bidi-font-family:Calibri;color:black"><br>
<!--[if !supportLineBreakNewLine]--><br>
<!--[endif]--></span></b><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Наше тело всегда находится в гармонии с умом. Тело, которое
устало, переживает стресс и неблагополучие заставляет и разум становиться более
жестким, сковывает его.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Человек начинает сосредотачиваться на неупорядоченных,
разрозненных и хаотичных аспектах, которые препятствуют развитию его творческих
способностей. Но нам нужно обратное: расслабление и возможность
концентрироваться на чем-то, то выходит за пределы нашего тела.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Выйдите на пробежку, это расслабляет. Выйдите просто на прогулку,
это позволит вам облегчить душу и сердце и успокоить ум. Когда мы шагаем наш
разум чувствует себя свободным. Это происходит даже чисто на химическом уровне:
мозг получает больше кислорода и больше питательных веществ.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size:12.0pt;mso-ascii-font-family:Calibri;mso-fareast-font-family:
&quot;Times New Roman&quot;;mso-hansi-font-family:Calibri;mso-bidi-font-family:Calibri;
color:black">Так что если вы действительно хотите иметь гибкий ум, то не
забывайте, нужно «инвестировать» в себя: посвящайте себе время, и пусть
неотъемлемыми частями вашей жизни станут страсть к познанию нового и мотивация,
чтобы чувствовать себя по-настоящему хорошо.</span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal" style="margin-bottom:0cm;margin-bottom:.0001pt;line-height:
normal"><span style="font-size: 12pt; font-family: Roboto, serif;"><!--[if gte vml 1]><v:shape id="Рисунок_x0020_6" o:spid="_x0000_i1025"
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  o:title="uprazhneniya_dlya_mozga_kak_povysit_umstvennye_sposobnosti"/>
</v:shape><![endif]--><!--[if !vml]--><img width="1000" height="667" src="file:///C:/Users/ajax/AppData/Local/Temp/msohtmlclip1/01/clip_image004.jpg" alt="https://medaboutme.ru/upload/iblock/266/uprazhneniya_dlya_mozga_kak_povysit_umstvennye_sposobnosti.jpg" v:shapes="Рисунок_x0020_6"><!--[endif]--></span><span style="font-size: 12pt; font-family: Roboto, serif;"><o:p></o:p></span></p>

<p class="MsoNormal"><o:p>&nbsp;</o:p></p>
13.04.2022 14:50:58: <p><span>Для того, чтобы оптимизировать гибкость ума, вы должны бросать
вызов своему мозгу каждый день: удивляйте его новыми действиями, чтобы он не
останавливался и не переставал себя стимулировать. Повысить свои умственные
способности возможно при помощи упражнений.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<img 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" alt=""><br>

<p><span>«Гибкость ума» предполагает удивительные когнитивные процессы,
которые позволяют нам рассуждать и быстрее делать выводы и логические
заключения.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>В это же измерение входит творчество, аналитические способности и
та мгновенность действий, что позволяет нам сделать отношения в своей
повседневной жизни более качественными и удовлетворяющими нашим потребностям.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Все эти процессы — не данность и ни в коем случае не
характеристика одних лишь молодых людей.&nbsp;Напротив, в данном случае речь
идет скорее о приобретенных навыках, о способностях, которые можно развить в
себе и которые не теряются с возрастом. Только для этого необходимо каждый день
работать над собой и приспосабливаться к тому, что нас окружает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span style="font-size: 12pt; font-family: Roboto, serif;">&nbsp;</span></p>

<p><span>Нам просто нужно прийти к осознанию, в самом широком смысле этого
слова. Точно так же, как мы уделяем время физическим упражнениям, идем в
спортзал или на занятия йогой,&nbsp;<b>следует «тренировать» и свой мозг</b>.
Находить&nbsp;<b>несколько минут каждый день на практику несложных стратегий</b>,
которые будут способствовать взаимодействию полушарий нашего мозга, созданию
новых нейронных связей и постепенному повышению «</span><i>гибкости ума</i><span>», в целом.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span style="font-size: 12pt; font-family: Roboto, serif;">&nbsp;</span></p>

<p>
 
<img width="623" height="422" src="file:///C:/Users/ajax/AppData/Local/Temp/msohtmlclip1/01/clip_image003.png"><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span>1. Одевайтесь и раздевайтесь с
закрытыми глазами</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span><br>
<br>
</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Даже если вы будете делать это всего один раз в день, обязательно
попробуйте: одевайтесь и раздевайтесь с закрытыми глазами.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Сначала вам может показаться это глупостью, но на самом деле таким
образом вы «запускаете» самые неожиданные процессы, которые:</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<ul>
 <li><span>улучшают координацию движений</span><span></span></li>
 <li><span>усиливают взаимосвязь и взаимодействие правого и левого
     полушарий мозга</span><span></span></li>
 <li><span>развивают мелкую моторику</span><span></span></li>
 <li><span>помогают рисовать так называемые «ментальные карты» о
     существующих расстояниях между пуговицами, о том, как застегнуть молнию и
     куда просунуть руки…</span><span></span></li>
</ul>

<p><span>&nbsp;</span><span></span></p>

<p><span>Попробуйте выполнить это несложное упражнение, только не забывайте
о безопасности: лучше делать это, сидя на кровати, чем стоя.</span><span></span></p>

<p><span><br>
<br>
</span><span></span></p>

<p><b><span>2. Игра приблизительных и точных
значений</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span><br>
<br>
</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Для того, чтобы улучшить гибкость ума, необходимо понимать один
очень важный аспект: это потребует волевых усилий. И даже если сначала все это
покажется вам слишком простым времяпрепровождением, поверьте, ваш мозг будет
благодарен вам за него.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span>Мозг любит нарушение привычного ритма
и новые стимулы.</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Игра приблизительных и точных значений — это ежедневная задача,
требующая от вас внимания, расчета и подсчета.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<ul>
 <li><span>Сколько лестниц в моем офисе?</span><span></span></li>
 <li><span>А в автобусе… Сколько людей сегодня надели черную одежду?</span><span></span></li>
 <li><span>Сколько получится, если сложить две последние цифры номера
     проезжающей мимо машины?</span><span></span></li>
 <li><span>Сколько пройдет секунд, прежде чем цвет светофора сменится на
     зеленый?</span><span></span></li>
</ul>

<p><span><br>
<br>
</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span>3. Каждый день учите по 5 новых
иностранных слов</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span><br>
<br>
</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Неважно, какой иностранный язык вы выберете. Это может быть каждый
день новый язык. Чтобы повысить гибкость ума, будет отлично выучивать от 3 до 5
новых слов в день.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Так вы не только будете расширять кругозор и увеличивать свой
лингвистический потенциал, но и способствовать формированию новых нейронных
тканей, которые впоследствии станут вашим когнитивным резервом и помогут
достойно справиться с течением времени.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span>4. Меняйте привычную последовательность
действий всегда, когда есть такая возможность</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span><br>
<br>
</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Рутина — один из злейших врагов нашего мозга. Ему скучно, когда
ничего нового не происходит, он «переключается» на автоматический режим, то
есть он не работает.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>В тот момент, когда наши когнитивные процессы ограничены, когда
они всегда одни и те же, когда не остается места для творчества, свободы и
личного удовольствия, мы имеем дело с нежелательными последствиями: потерей
памяти, отсутствием концентрации, медлительностью в рефлексах и т.д…</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span><br>
<br>
</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><i><span>В идеале нужно стараться каждый день
посвящать себе 1 или 2 часа. Это уже будет подарком для нашего разума и чувств.</span></i><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span><br>
<br>
</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span>5. Говорите, слушайте, соотносите,
спорьте и делайте выводы</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span><br>
<br>
</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Социальные контакты, позитивные отношения, диалоги — все это
позволяет нам расширять горизонты своих знаний. Социальную активность можно
назвать «бензином» для повышения нашей умственной гибкости.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<ul>
 <li><span>Так у нас получается быстрее обрабатывать информацию, мы
     учимся ценить ее и в то же время у нас формируется и свое собственное
     мнение.</span><span></span></li>
 <li><span>А споры, вопреки распространенному мнению, могут иметь не
     только негативные последствия, ведь не зря говорят, что в них «рождается
     истина», значит, наш ум становится острее.</span><span></span></li>
 <li><span>Мы становимся более внимательными, отзывчивыми и в то же
     время более уверенными в себе, учимся лучше управлять своими эмоциями.</span><span></span></li>
</ul>

<p><span><br>
<br>
</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Ведь очень немногие вещи в нашей жизни можно назвать мудростью, а
уважительное и остроумное общение — вполне.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span><br>
<br>
</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span>6. Ведите дневник</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span><br>
<br>
</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Для многих людей ведение дневника уже стало жизненной
необходимостью. Им нужно поделиться своими мыслями, идеями и полученным опытом
с листом бумаги.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<ul>
 <li><span>И это не просто записи, восстановление хронологической
     последовательности каких-то действий, это настоящая терапия для нашего
     разума.</span><span></span></li>
 <li><span>Так мы учимся трансформировать свои идеи в слова, а опыт — в
     целые фразы.</span><span></span></li>
 <li><span>Наши мысли становятся более подвижными, текучими и гибкими,
     взгляд внутрь себя находит канал для выражения, а потом все это
     возвращается обратно к нам в мозг.</span><span></span></li>
</ul>

<p><span><br>
<br>
</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><i><span>Так мы развиваем свои творческие
способности.&nbsp;</span></i><span>Чем больше мы пишем, тем сильнее наше
желание писать еще. Это как открытая дверь, позволяющая нам увидеть разные
дороги, которые нам еще только предстоит пройти и изучить.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span>7. Выходите на прогулку каждый день</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><b><span><br>
<br>
</span></b><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Наше тело всегда находится в гармонии с умом. Тело, которое
устало, переживает стресс и неблагополучие заставляет и разум становиться более
жестким, сковывает его.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Человек начинает сосредотачиваться на неупорядоченных,
разрозненных и хаотичных аспектах, которые препятствуют развитию его творческих
способностей. Но нам нужно обратное: расслабление и возможность
концентрироваться на чем-то, то выходит за пределы нашего тела.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Выйдите на пробежку, это расслабляет. Выйдите просто на прогулку,
это позволит вам облегчить душу и сердце и успокоить ум. Когда мы шагаем наш
разум чувствует себя свободным. Это происходит даже чисто на химическом уровне:
мозг получает больше кислорода и больше питательных веществ.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>&nbsp;</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span>Так что если вы действительно хотите иметь гибкий ум, то не
забывайте, нужно «инвестировать» в себя: посвящайте себе время, и пусть
неотъемлемыми частями вашей жизни станут страсть к познанию нового и мотивация,
чтобы чувствовать себя по-настоящему хорошо.</span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p><span style="font-size: 12pt; font-family: Roboto, serif;">
 
<img width="1000" height="667" src="file:///C:/Users/ajax/AppData/Local/Temp/msohtmlclip1/01/clip_image004.jpg" alt="https://medaboutme.ru/upload/iblock/266/uprazhneniya_dlya_mozga_kak_povysit_umstvennye_sposobnosti.jpg"></span><span style="font-size: 12pt; font-family: Roboto, serif;"></span></p>

<p>&nbsp;</p>
13.04.2022 15:20:20: <img 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" alt=""><div><br></div><div>123</div>
14.04.2022 00:47:40: <p class="MsoNormal" style="margin: 0cm 0cm 8pt; line-height: 15.6933px; font-size: 11pt; font-family: Calibri, sans-serif; color: rgb(0, 0, 0);"><b><span style="font-family: Arial, sans-serif;">Далее после «Вход по паролю».<o:p></o:p></span></b></p><p class="MsoNormal" style="margin: 0cm 0cm 8pt; line-height: 15.6933px; font-size: 11pt; font-family: Calibri, sans-serif; color: rgb(0, 0, 0);"><span style="font-family: Arial, sans-serif;">Пользователь попадает в личный кабинет с его текущими заказами.<o:p></o:p></span></p><p class="MsoNormal" style="margin: 0cm 0cm 8pt; line-height: 15.6933px; font-size: 11pt; font-family: Calibri, sans-serif; color: rgb(0, 0, 0);"><span style="font-family: Arial, sans-serif;"><img width="492" height="350" src="file:////Users/sergey/Library/Group%20Containers/UBF8T346G9.Office/TemporaryItems/msohtmlclip/clip_image002.jpg" v:shapes="Рисунок_x0020_2"></span><span style="font-family: Arial, sans-serif;"><o:p></o:p></span></p>
14.04.2022 00:48:14: <img 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" 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14.04.2022 02:02:07: <img 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alt="">
15.04.2022 06:59:46: 
15.04.2022 07:00:00: 
18.04.2022 08:31:02: 
18.04.2022 08:31:22: 
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18.04.2022 08:36:09: 
18.04.2022 08:41:53: <p class="MsoListParagraph" style="text-indent:-18.0pt;mso-list:l0 level1 lfo1"><!--[if !supportLists]--><b><span style="font-size:14.0pt;line-height:107%;mso-bidi-font-family:Calibri;
mso-bidi-theme-font:minor-latin">1.<span style="font-variant-numeric: normal; font-variant-east-asian: normal; font-weight: normal; font-stretch: normal; font-size: 7pt; line-height: normal; font-family: &quot;Times New Roman&quot;;">&nbsp;&nbsp;&nbsp;&nbsp; </span></span></b><!--[endif]--><b><span style="font-size:14.0pt;line-height:107%">Создание раздела первого уровня<o:p></o:p></span></b></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shapetype
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 path="m@4@5l@4@11@9@11@9@5xe" filled="f" stroked="f">
 <v:stroke joinstyle="miter"/>
 <v:formulas>
  <v:f eqn="if lineDrawn pixelLineWidth 0"/>
  <v:f eqn="sum @0 1 0"/>
  <v:f eqn="sum 0 0 @1"/>
  <v:f eqn="prod @2 1 2"/>
  <v:f eqn="prod @3 21600 pixelWidth"/>
  <v:f eqn="prod @3 21600 pixelHeight"/>
  <v:f eqn="sum @0 0 1"/>
  <v:f eqn="prod @6 1 2"/>
  <v:f eqn="prod @7 21600 pixelWidth"/>
  <v:f eqn="sum @8 21600 0"/>
  <v:f eqn="prod @7 21600 pixelHeight"/>
  <v:f eqn="sum @10 21600 0"/>
 </v:formulas>
 <v:path o:extrusionok="f" gradientshapeok="t" o:connecttype="rect"/>
 <o:lock v:ext="edit" aspectratio="t"/>
</v:shapetype><v:shape id="Рисунок_x0020_1" o:spid="_x0000_i1039" type="#_x0000_t75"
 style='width:450.75pt;height:153pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image001.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="601" height="204" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image002.png" v:shapes="Рисунок_x0020_1"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">При входе в Коммуникационную
карту, пользователь видит разделы первого уровня. Создать новый раздел или
изменить уже существующий можно в Административной панели:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><i>Рабочий стол – Контент -
Сервисы - Коммуникационная карта <o:p></o:p></i></p>

<p class="MsoNormal" style="margin-left:18.0pt"><i><!--[if gte vml 1]><v:shape id="Рисунок_x0020_2"
 o:spid="_x0000_i1038" type="#_x0000_t75" style='width:451.5pt;height:282.75pt;
 visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image003.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="602" height="377" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image004.png" v:shapes="Рисунок_x0020_2"><!--[endif]--><o:p></o:p></i></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для создания нового раздела нужно
нажать на кнопку «Добавить раздел»<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_3" o:spid="_x0000_i1037" type="#_x0000_t75" style='width:451.5pt;
 height:95.25pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image005.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="602" height="127" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image006.png" v:shapes="Рисунок_x0020_3"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><o:p>&nbsp;</o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">При нажатии откроется карточка
раздела, в которой необходимо заполнить детальную информацию. Пример заполнения
карточки:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_4" o:spid="_x0000_i1036" type="#_x0000_t75" style='width:451.5pt;
 height:462pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image007.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="602" height="616" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image008.png" v:shapes="Рисунок_x0020_4"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><i>1 – Активность раздела (виден
раздел или нет), 2 – Название (наименование раздела),&nbsp;&nbsp;&nbsp; 3 – Сортировка (чем меньше заданное
значение, тем выше в списке будет находиться раздел), 4 – Изображение (иконка
раздела), 5 – Описание (краткое описание раздела или расшифровка аббревиатуры).<o:p></o:p></i></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для применения изменений нажать
на кнопку «Сохранить».<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для изменения уже существующих
разделов, необходимо рядом с названием раздела нажать на кнопку «Изменить»:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_5" o:spid="_x0000_i1035" type="#_x0000_t75" style='width:450.75pt;
 height:106.5pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image009.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="601" height="142" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image010.png" v:shapes="Рисунок_x0020_5"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Откроется карточка раздела, в
которой можно вносить изменения в уже существующие данные.<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Подобным образом можно работать
со всеми разделами первого уровня.<o:p></o:p></p>

<p class="MsoListParagraph" style="text-indent:-18.0pt;mso-list:l0 level1 lfo1"><!--[if !supportLists]--><b><span style="font-size:14.0pt;line-height:107%;mso-bidi-font-family:Calibri;
mso-bidi-theme-font:minor-latin">2.<span style="font-variant-numeric: normal; font-variant-east-asian: normal; font-weight: normal; font-stretch: normal; font-size: 7pt; line-height: normal; font-family: &quot;Times New Roman&quot;;">&nbsp;&nbsp;&nbsp;&nbsp; </span></span></b><!--[endif]--><b><span style="font-size:14.0pt;line-height:107%">Работа с информацией внутри раздела
первого уровня<o:p></o:p></span></b></p>

<p class="MsoNormal" style="margin-left:18.0pt">При открытии раздела первого
уровня пользователь может видеть карточки сотрудников и подразделы:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_6" o:spid="_x0000_i1034" type="#_x0000_t75" style='width:450.75pt;
 height:198pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image011.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="601" height="264" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image012.png" v:shapes="Рисунок_x0020_6"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для внесения информации внутрь
раздела необходимо в административной панели «провалиться» в нужный раздел,
нажав на его название в списке разделов:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_7" o:spid="_x0000_i1033" type="#_x0000_t75" style='width:451.5pt;
 height:99pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image013.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="602" height="132" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image014.png" v:shapes="Рисунок_x0020_7"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для создания карточки сотрудника
нужно нажать на кнопку «Добавить элемент»:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_8" o:spid="_x0000_i1032" type="#_x0000_t75" style='width:451.5pt;
 height:65.25pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image015.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="602" height="87" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image016.png" v:shapes="Рисунок_x0020_8"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Откроется форма создания
элемента, в которой необходимо ввести подробную информацию о сотруднике. Пример
заполнения карточки:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_10" o:spid="_x0000_i1031" type="#_x0000_t75" style='width:451.5pt;
 height:472.5pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image017.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="602" height="630" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image018.png" v:shapes="Рисунок_x0020_10"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><i>1 – Активность (виден
сотрудник на портале или нет), 2 – Роль в карте (Заголовок карточки), 3 –
Название (ФИО сотрудника), 4 – Должность (должность сотрудника), 5 – Символьный
код (символьный код сотрудника), 6 – Сортировка (чем меньше значение, тем выше
в списке будет отображаться карточка).<o:p></o:p></i></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для применения изменений нажать
на кнопку «Сохранить».<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для создания подраздела нужно
нажать на кнопку «Добавить раздел»:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_11" o:spid="_x0000_i1030" type="#_x0000_t75" style='width:450.75pt;
 height:63.75pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image019.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="601" height="85" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image020.png" v:shapes="Рисунок_x0020_11"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Откроется форма создания
подраздела, в которой необходимо ввести подробную информацию о сотруднике.
Пример заполнения карточки:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_12" o:spid="_x0000_i1029" type="#_x0000_t75" style='width:451.5pt;
 height:426.75pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image021.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="602" height="569" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image022.png" v:shapes="Рисунок_x0020_12"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">1 – Родительский раздел
(подраздел попадёт в выбранный в данном поле раздел), 2 – Название
(Наименования подраздела), 3 – Сортировка <i>(чем меньше значение, тем выше в
списке будет отображаться карточка).<o:p></o:p></i></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для применения изменений нажать
на кнопку «Сохранить».<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для изменения уже существующих
сущностей необходимо рядом с нужной карточкой нажать на кнопку «Изменить»:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_13" o:spid="_x0000_i1028" type="#_x0000_t75" style='width:451.5pt;
 height:64.5pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image023.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="602" height="86" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image024.png" v:shapes="Рисунок_x0020_13"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Откроется нужная карточка, внутри
которой можно изменять ранее внесенную информацию.<o:p></o:p></p>

<p class="MsoListParagraph" style="text-indent:-18.0pt;mso-list:l0 level1 lfo1"><!--[if !supportLists]--><b><span style="font-size:14.0pt;line-height:107%;mso-bidi-font-family:Calibri;
mso-bidi-theme-font:minor-latin">3.<span style="font-variant-numeric: normal; font-variant-east-asian: normal; font-weight: normal; font-stretch: normal; font-size: 7pt; line-height: normal; font-family: &quot;Times New Roman&quot;;">&nbsp;&nbsp;&nbsp;&nbsp; </span></span></b><!--[endif]--><b><span style="font-size:14.0pt;line-height:107%">Работа с подразделами второго уровня<o:p></o:p></span></b></p>

<p class="MsoNormal" style="margin-left:18.0pt">При открытии подраздела первого
уровня пользователь может видеть карточки сотрудников и подразделы второго
уровня:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_14" o:spid="_x0000_i1027" type="#_x0000_t75" style='width:450.75pt;
 height:214.5pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image025.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="601" height="286" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image026.png" v:shapes="Рисунок_x0020_14"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Для внесения информации внутрь
подраздела второго уровня необходимо в административной панели «провалиться» в
нужный подраздел первого уровня, нажав на его название в списке разделов:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_15" o:spid="_x0000_i1026" type="#_x0000_t75" style='width:451.5pt;
 height:117.75pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image027.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="602" height="157" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image028.png" v:shapes="Рисунок_x0020_15"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">Откроется список сущностей
подраздела, в котором «Элементы» соответствуют карточкам сотрудников, а
«Разделы» - подразделениям:<o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt"><!--[if gte vml 1]><v:shape
 id="Рисунок_x0020_17" o:spid="_x0000_i1025" type="#_x0000_t75" style='width:450.75pt;
 height:151.5pt;visibility:visible;mso-wrap-style:square'>
 <v:imagedata src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image029.png"
  o:title=""/>
</v:shape><![endif]--><!--[if !vml]--><img width="601" height="202" src="file:///C:/Users/lizanyan/AppData/Local/Temp/msohtmlclip1/01/clip_image030.png" v:shapes="Рисунок_x0020_17"><!--[endif]--><o:p></o:p></p>

<p class="MsoNormal" style="margin-left:18.0pt">В разделах «Подразделений» так же
можно создавать карточки сотрудников, для этого в административной панели нужно
зайти внутрь нужного подраздела. Процесс создания и изменения карточек и
разделов идентичен подобным процессам в пункте 2.<o:p></o:p></p>
18.04.2022 08:42:49: <img 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BSX54Kq/bUxImO6iXOTpiyhguhUMX/UDTvLjggx6ND8mWAt23MMdSifTCza4uo1EtMVgtXNI0nk0dLlW5/OWWVL9Jx5ihcCPKxZKVh5iK9i3qtCYHK+KwXrrrKj6NR5qNjnluf57iSBfOvWfZhZtRMW2q3bD4ohxyzaZ85eJeYZf/HF11Kwvga4M8LbGrwK62rleVPPfivnVcU/d5y/Fb/5fBxMnx5XuGWeuXk+HCVKt2aNX/jP5+m6yv5wOM+7r+x3xe+fXPMsvpXdvHiu8rfid0WayB/FtT/l+XQqjynCV/onwhLuFf4+PV7h9vljz37zN4f/9By7e+G6Z2E/8/MZ5KbiPKO8Tvyv7L7i2M+F88wN58WL1z275xKJ5LejZxaF9OwR+Pqb79Cl52QxLFjbOAJahKNbFk6evoIdu04IaykLW1V+vAxuE0xsYoSlSlXb8U5RIbo/SRgLtcEkVIceg9qIs1AbfYG4RIL1Alotu4ULT/4p+jL84QlXM67+iDqdqZ+p3VpYZxV+USddzwtNWqbAy5vug44b9Zeo087ijPpr3GdjRB+Ljik79HyOR97xb+UxpVtlH5bPcx9K2T9TCJLn08JtNp9vUCEWlL8V19O1IgwSM+I3+1PhZ8VvZVh8rSI+Ff7w70rhvBI4HhR/Y9cYhHcsRtfSyegyaBLsAzqg88BJmLxgLUbNWCZ+NwvKQm6/cYjILka79EKYt4wTcVbp76+gGgkS7+wZ4l4+ObwBphpNUUdDsXhonQb8ssFZTEEToyipHysW/Gzggup1SejS9fy/XkNXVKP+MudRPXJbm+4zH1fXUCx+WleDwqLfteq5Ut55PPW7bkPKS+r7sr9suGHxWqNucwrPTVxft4ETPqml2G2kZm1H1KDr61LYteo5CS3B8eK01yO/eHRnDYrjZzWaCncaup6oW98Jn9VSLERaszadZyMcuefrFIuYKtLG/teu40hpckEDiuen1Z/lQV0Ki/3mfBCL0DZQxE2Rf66knYKxevfX2D1xIlq0SICLexJ2nr2DLZMLUU2MRqXrKQ5cdqrVdHjh+refVyJYOfFs7XRxowz6BRrbh4kbosofJSxY585XbEuzZNlmcq8QT3wdCy/+bCOBxHMq23fohx69R4shsvxhIeXqniiEJF9jbRsiLIf8YavrTwSrZ4qYV8pzTu/f/1wMp50zby3MSYjx/M/O3YaLa3ku6V8+sROijyu5i5du4MGDz2EkRGEy/vvf/2HV6h3iLQYLPragcqX0S4JVOSQ4N38wic9AYTXlOaUsjnkRJ/5MmrJUrHysGPrsTOLxiJiv6tA8SgjUh4++xN79JxQC8wXB6koF9h//+CdWrNomwmM/2G+lBdsvIEtUjC8TrJfLb+I+pZUb2fUbdgsr7v4Dp3Cb8pUt2FwJ8PemzfuEn8rh0Sy+2T8pWF8tXHaMLMNfiWC1bJIKSzvFm38LuxQ6xsIkAbbOObB3yqBj1AlqQsdJrJnbpcLagdzbp8KhRSfYObYnt4lo7JwN2+aZsKNva/sUhXsVYXEHzLpZFpq6diR33CGLo/8ZsHfOhEXjOJjbp6GJcxb5lQW75hx2MqybdkATlyxY2nL4KbCyT64QVkn0O5XCSoWtUzZdlw0bCpuPW1L4FpQOTo8l+SG+myRTXLkDqFhJmdPNAs+cvjlNHGd71zw4OHVQHFcRfyuKi51zR4pbJqyaJMGU4m9BcbZ3ofTQfxO6jv3lsE0bJ8GmWQeKI+cdC07Ka/v2iv/kF6fBjNxwXHkYH6e9mVs+GjtQh5P84fhY8hA/Sg+v/mzlkE5hV8qbF+LG6WpE5+xdcmDrmC6Ocd40diL3jmkiTQLbFMrPjmjcNEXkP4cjhhKKfEsV99mUftu3yEeT5mkiz1iom1EeOlD87BxTK/LxxfAlEskvweJ0xeo9WLfxIPTNo2FsTc8+Hef6QNMwDFGJJdSveILI+GLo0fkXr/9F+Flmv/S8f7Gf9bajoU4deLeOUBu4D2pDSKyOvgi18VeJa/T7CqwX3Mb9H/4r+hwvfiZc/gc+8+8L9XqK/p46dfSrUXu16tx1bN++B6sWzIGVgTP100i4NHSnfooPtEhUcJ9Sk4QBC4z66i6oo9kKevoeqMXWKerY884S3MFn2F1d6k/VJ3HDfTbuF+kZKa7nvBdCktyxUKpFwkCf9ymlvnIDbU/oG3uT/66oWYf8pXulb+CB2uRGV/jjDV2D1mI0oh75qa3rTWlwRx0SVA11W0ObjtUjocTCS0/fU/Q5X61oJcFKfUBD22AEdihCTN4AsXVN39FzMH/1dpQdOoXt1N+cvmSjELLt0grhGJwFz/iu0LFpRyKrsnX/15dBdU03fFLHA1O3X8Im6oMfo3uVFxiCj2s7U1/dC7EZ0zBv0TrMXbhOfA8sGogatZrBpcNwDO5VCHUSl7XrO0Of2sqR42fDysob/p3HIjsxGtWpz1tHNwT9R89DuLs3tLy6oHhAEQx0m5GI9EJa7lSEtouFqU8P9OtbCg0N6idXd0Zs56koLMhE9epNoGcZj9JZG7GP+r7LZ89Hm5Bs9J24GnNJwM+cswYLKE4xsTnwbj8UI4fPwaIV2zF7yiy42/vh4xqOsG2VjfGz1mPbjsNYNHcOHC08YRVYhHmLN2AW9cdnz1uH+fMWwsqyNUzdO2H+yt3YvWs/xvQZCEMNV3yq7omQruMwYthCLFm1HVPHT0VTGy/UqN9ClEsWrB9XC8by7Q8wLy8famqNoPZXW8zeehLrJxTiL39pBINGyRi5YCv27DmCWSRqm5l7oCZd35DKrKp78lvhFyvipQ3xOuqft3JI8Cc1mmLAoKmi4mHLJ69Eq5yfuniJYg4rH9ekykDtI1sxT3TVmp3iOK/Qy28eavNbFxJSrX3SheWP51iyNZHfTCjDqTwkeCWJTRZ7ZpYBQmCxaOPzIRH54jxbXnWpIuEhxW18OwiBe+ToWfFwWjYKEvNBb9y8JwQ5i0IWcDy3lRc1+jWCVbnIE1c8vDIvC1O3VsnCWnzq9CUKI1CE7dQiXsw15bA4P1uQIP3Xv/4lhP1ndD3PW712nSpyEt8iPSS8WYjeIxHJqyazHyziWeCz6LVvFiniwwL87l1VgtVfiFn+sJjna/lt4eGj54S/nE6ONw8NPn7igsgHW8qDUWJIsJzD+rowtY4RQkNlp+VXYkzCtE3IIDRvTsKmVSGiEgbDkkRly4ABCI4cCP+Q/iRaM9GqbTGaOefCJ7QUjs4k2lp0gU9wCQIjB6NFq1y08OuH6NRxCAnvA3u3zvAO6AsLq2gYWcc+td6xOHLw7I2Q6CFoGzoAru45sGvZA0FRpfANGYi2wX3g4JoD/6iRiE0dhdbendCsdRF13IbDP7wUgSF9SER3gn9oMcytItGUznn7doWLXwnCIgdQ3AYjOLwvCdsO8A4qosYqFLZu3eHpXQBH797wpm9juyxEJI+GIwlx9wBKU/OO8AsrRTOn9rAhv9sE9qc0DYVH61wSZYqOpIBFnF0H+EcPR9ugPgikb2+vXJg3y0G7qKHwC6brIgbBziEBTm16U9py4dZ2AFq17gqvkAFo1ozEabNc+AYXU16VIDyqiJ6XSLi0HYSwsEKY2WfCl+Lh064IAeED4NAsBc29i9CyZRr0rJLgRXFtTg2Yf9QIxKaMovqnC6WTOrkV8eMtjRq36IawhGF0X/pSno2gNKWhVcgQhEYNFPH18s6DSeM0+IQNRduQYsr3IXB2yYSzT1+4tUylzgmdo/TbkHhvFTgAfkF94R82CO4e2TCxbQ/v4EHwpca1bfggtGiZKV4+PM0fiUTyq9A2iUDZ3tMYPGKRWGSp8jkWr3ZO6Th/4SYKekyEjsnz538t3C5oG/iKdlpV2/FuwIssueCThPEKy+qo8wqhqoQEa/HRr0S/RNXni/8AtgM2CisWW2pZuFZzzcLmS+XUR1yL/WWb0Sm5FEMmLUIhiY5+HUoxafZ+nC+/inklE1BQNBXdO3fG6IUHcfLQUXTr2B2zpi6BZ6Mw5AybjcLiORhS3AUuIYXYWnYMK5fuxdmzl7FqyU6sXrQQ7s0cofZpc9QnEVZLuy16TNyCixeuYMyAgRgxewOO7j2FyQOHwal1RyzdeBS7t25DQdIILFxzChdOXcS8acOxZvthHDtyDhuWr8fscRNhZBGFCYs2YDH53zm6L8Yt3ofTx0+gc0IGapPwfaWilfqnbC1sFpCBxC5D0H/MXKzbfhCXrt/Bk6//hofUBz1C8Zy9YgvySybCPSYf+s6RCuvq7xQq9es3g65zV5TfvIGWli7In3UCZXNGo2b1xvjTJ/6Yu+oBNq9dSu1nZwwacwiXTx/CJ5/YIHjWQbrjf0OkU2uo/ckB3Wafov8/wKGpH7rtuIC1E7OFeMsdozCo9Iv0gl7mbFwuXwk9dWM654G5K+9jUM8CNMlZgPJz+1D9E0s0btcfbLs/vLwX/trAC6uOPMClsg1ITOmDcTNWoqBjN7QOzsf4JXvx98fl6E7/bZziMHjHbTwsP4EuBUOwcPtF3DhZBhutpmjerhcGlYyAj18mxqw4hRObVlPfIB7R5N/R65/j3PZliInMgnNgMY7d/BILx09AYvpA7L74OXbOHYuPSAONOP0It0/uRUHBUKzcfxVX922EtZaLmO+rFKzLtj3Aoq7dUa1aM3xaqznm7ziN1aO6oJp2MLYef4BDy5cgLrkPFu24gqt7t8BCp0XF9arvy6+FNQ1rNX75w8YyfonzqkXrKxsSPHLMPNy4ce8XmTZzhRBjLxsSzEIzNKJALHb0ww9/Rxu/DHGM528q53zyufUb9ghL4aLFm57OU+UhwzzJmMUtC9f+AxSCkFfBZQtmZfHEfnp4txfnl6/cRu6bCZM8W4z5PL8lYIG9cLFieDIvMrR563588813YgVcHrqrHAoweIhiGMN1eqA3bt6HBw8/F6siq/2lEXoWjhHnOuYOEtZN9ptvJP9WCnPOG56Le+ZsOWbPWSNEK88hHUX5yp+bJFA3k7+ff/6VsAh3zCsVbjZs3CPOs+Dlea4WNoEiL7766m9CTLJg5m1peHVhXpyJ5/iyZZSH9g4onSrir2voLQQwz0vlAldZsLLovkNClj9pGf2owNiLRZVOn7lMcXkiwmNrstJiyysiq6lZYcrUZWKYtJGZFKyvA1ObVyNY/cIHw611N/hHjkdEbAmauBYgmESkpXUUjEmUGDVKQZuIMUhNp0apVRYMLGPRtFUPElH9EBAzFsGhPWBgGg9vEowODrEwsM9GWOJYBJAAbeXdGVZi2CsLvgy0ix1O4jhJ+GFil4aAqOFwbJ4MXbNYeJK48miVTiKwKwnlQio3YXD0LYG/X1fq2EXDm867uefBK2wImpPg9CLh5eSShhYBpXBvkQZD+1wSe/0pvHS0ixsJrzZd4BsxHH6+neHkUwgf/0K4+Q9BXPsxaErXe0eOQXL6BPIzE4aWMbATQruYrhmByKgSmJEIfDZENp5EZRaJtRLY2ITB3rMXCcBucA8ajNaeWRS/cDj69Ieff1cSrEVIypiGtvTb0JxEqf9AtGlD4tu7H3z9CuDgVYIOOVPg6tYJoanTERZUKIRrVMwgONIx38gRCAjoSXHuh5DIYri06YNIyrdGtjGwcqL7FNwbppaRYmiuMn4sWO09esO/XRfomUXAs10p+Z8NLxKZjiSWjZpw3pSglV8f+LXrDgPKW2uX7mgX2hfubYsRENgN5k2z6P9ANG/dB9FJI0l0d0LLgIHUORgI5zb9EENi2LllHjyChyAiagDMqfwpwn8Wj6f5JZFIVMIW1i3bjlI/aP1PBClbXD18C3Dj1kOkZY/4iaD9tfDIFB1Dv3dbsFL/iBda+ihjFtRGnoHa2PJnYnUcC1YSlpe/E32On/t4TTmATxpQHigFq3MGNl25jmVzV2HHum3o2nmZGEJ8eMUkNKwdjTVbTpJApXOz1mDItN34/ruvMHPwANi07IW9F67iKPUhx/cfh4Xr92D0pPXYQaJ36/m7+PuF0wgL6Yn1ZQcR6dUZ267fw/pl85GT0hl1P2uEFolDceXoIbS08qK6OBzrjlzEvtVHsXf3Pszdfg5HyjZhxtpj2LduIoIjZmDf9rloE5CCTdvKkLdwBzatXoBlG/eR0N6JdQvnYOLC7fj68x+xZFgvWPqU4NSpXXC1aYpa6iry8XfC/fM/1XaETetkROeWYA4J06s37+Jf//63InPp8zX1gY+fK8fACQsQnz8IzQOz8BEJdB4SrfHCkOhfxh2fftYUod1X49//+hJDikZgCQmqf9w9DQf9ZlD7qy9mL72Oom6dqX+pj+ZeM3Hk4D5U+6wx/Eato3gB26eMgI5tGs59Cfz90RU0aeqP/HXHMb1vHKyCRuHyjct4+OAmekf4QDtlIs6X70FidHt4+nTHlt130Ts3B7YkZA/vWoOGRnHYePQK7jx8hBWTusA5eDzulp+EvYYd1D51EP1qXhhVTc0cgR0n4PaZTTCoQ+K3eiuM230FE4q60zkjqGkFYevle+ibEo2PdcNRMn4l1q7bifmr9+HJ/YsItKO0qVlTOTiFFSPYKmqCggXHcXjlBPyJ+tF//osl1J2KcPP2bXg4hmDw/rMY0SmY3JnhI6No7Lt1B71iAvBxLe5j/7xgXTSoE3xSF+DK8TLofGoDtY8b4VP1MBy79hgD4+PwSe1nhrzfC+sAXhNn3frdWLhoI5o5x4hjqtz+Xl7RkGB3IVx4saBfgkXUL6luFjhs6Tt5+pJ4MHiIrhizXtdZDD3euo3fqKj+KAUri1G2fF6/flcc54WYatV3fi5szkzeBof975g7UAzhfTFuHBd+U9Cl23AxP3PnzsNCnAUE8T6miu1zWNiyeORhvWvW7cIOcjNrzmq0C8kVYp635VmydDN1mjOE9ZX95ev4N78tYqvxYjrPc2B5EanSIdOhTUKZ/eehJ5nZA7By1Q4x3JnFMw8V5vTxir6c3r4k4tkdp5stmrzn69jxC2Bk7i/SyFZgFtfslv1YsXK7GErN942v0TFoLcLkhZJYvD4T7C2hb+QjthJiS7AiP1zFHN6i4gliX1nOGzOrAEydtkyEy29XeNh1UmofTJq8VPjH/ijzU/JqeCUWVhKkvpGjEJc6Ci4tu6JNSD84kHB7KlhJ0Bo3TiERNwpR8SOp/HaDhUMWgklAOTRNJBFWjMDQXjCxTIZP+BA4OpL7pjkIihoKe8d0+EaPJkGXA2OKK1so28UMI4GaKASraZN0IVibOyZBRwjWoeQ2k0RZdwSEFQlR5uhTDJ82BdAxjYJXKAnWFumwa9ULIbEjKdx+5CYKbiTO3Fzaw7BJDgndfrBsTP7SeY/WJEBDh8HXpzOaeRUiMWMKWnl2hUfgADR3zYIPpTuShK0PCUvjxmkIjB0FZ6cU2JIYD40YCPNG1MhVDN9VWFjZCkqC2CoUTTx6wrN1F7SsEKw6JiRYffujbdtucPHti6jE0ST++pHIJNHbLAeB0SOFZdnBgfKMxJ9/aCmikscJS7O3T2+4th2IsIgSNHUtQAvv3nBw7ABn/xIEhfWDY+tChFO+NW4Sh0auPREQ2ofq2miY2SaL4dEcPxasTVr1Rtug7jCyioEXxYsFqyeltalDPHWScihP+8Pdr4hEbXfom4bByqWHEMQ29mnwDilFYMxoRMeUohkJ34j44XBqkQ+n1r3ouyMc2xSTaKb765oPF69eJFxzKNwkWDXh4dUcD8on5XdF2ZJIJD+FLaylwxbi9t3HcG+TDw3DcDH6hMVqQ/1QzJizEafPXROWVh6hosqPX4LbBZ133cJK/SPeouaTlCkkTs+TYL3ygmC9gkHHvxZ9O1Wfr/8L2A/agOoN2OJHgrWuI6q1yMHe+7cxjvoy+w9ewLjxu3Du1iNs2bgB+XkTsG3TJuSVjsXehVsxavZefPnoOlYuXoyMrotwYNt6+IV1wbglu1B+8hQGj9+If+OfmDllAk5v3wdvj0ws27Ibno1SsfnGLazZugO3Lx5BUy1LmAf2xdlTZ9EpqQcio7tg67HLOLDzKI4fPYt1a87i8vkTWL15LwbndkATp4kkpschuP1obFmxBMGTN2HLzBL4Z03Ff6mTnhsSgZL5u/H55SfYvmQaUvsuwdGyjWhi2BS1G6rIx99Bfcr7WmY+iCsoxc4DJ5FUMBgtIvKwY/9xIVj/93//J6bAffvdD5i7cissWidi+JTFePD5E/QcPgN1LP1R7yUGKVWI4cD1vTBrzy2c2bMN4yYuxYTpq3H/669QGBdNAq0VZpBgHVDYS4i1lm3n4vCBPfjs08YInbgBOzaswe4T53HswkUsWbMDu4+dgatTW2Qv24d1yydg+5Er6BKXiu3kpiTOHxoJo3Hri3tYt3oDFizZiZt3v0G3DllonDYdZft3Y8L6E1g6uAT9Z+/EhjmFCIhbjAu7N6P+R41Qi3RCrbpOYiht9er2iOo8FXfObYO1bmOo1fXCmF3lmFRSCLW/0P9anpi2pxwD+vTFhI0XsXPZHDR1jEBk5xl4fP8CQlxI9H7iiIW7zmDN2B50jR0Gl13C6gndSKQ3Qd36DqihkYZTZ+8j3j0OA/acwphuYXTOnoSZL+afLUdpdhD+WuPlgnXBoHzE9NiKw5uW4xOKVx3qx/+1lgvWHL+KmT3ToPZnW1Srx9MYeecVRzHtUcx5Vf/1c1yVWiiCyriPf+YrF6vMKxsSzFY5FmC/xK+1trEgY5HIHx5+m5RSKCLLwpUFUmbHAWLY6bgJC4UVtVvPkejRawwJyRwhbNnqqbT68b6l7p7Jzw0HViKEI2Ws0qqoChaybInkG8C/eXiymDdA1yrdsChTrv7LfnE8+TffbBaAQjhWCMHK8HV8rjJ1K8VF+FspbM5DtjSz2NTU5QnmHB+2WPPEcsU1nMcMz/3lse18juPG1yr8cBX/n79GEbYy3Mrwcb62slWc/efjIgxKozJfFH4q/v+cf5I/Cs9hjRBiQVWH5dciBGvMKLQL6EziNAM+of1hYxtPInAggiIGoG0YCR6nLHgE9EcTMVR0EDy8CtCqXQn8gvqgbdQItG3XDcaWSfAKHohmJFiN7LMQRILRN7BQDBl2dEoTczJNSAA29Swk4TZY+NuyVR7s3HsimESSX+ggBLIYtI2BjUt3+LIV0SICDm36Iy5phBh+3DaoCNaNY2HYKB1RHabD17sjzBw6IrL9BBJ2fdCGRGB88jDYNcsWQ4KtrcPEkGMvim/TNkWIiRtEwjpeDHdlweoRWALbJqkklEspLjliqG7bkCL4hg9FUFAhxbUP/AN7CjHIHUpHiktC2lj4BPRAcPwohIb0gpVjRxKjQ+EXUixEvj0JUmefQri4diAx35fEYQ8YmkehVcRYJMT1hxH9dvItJjGdj0ZN09GkRWf4tu0NC4cMEsOD0CaQwgxmoZsAJ5++cHdPg551EnyCBsLWPh6NXLrBN4hfEETCmeLr69eF4kbin7Bz7wHfgC5CsHoEDICTawa8IkYgNJI6O2GD0ap1Dkxs04XVuW1oMYIo3m7u2eJlAg/vtaS0+AeVkICl+1xxf/3DSuDk3J6uS4NXyED40D1tS2XEoWmSuHd+bbvD1q2A0kl50byTEOnWjeOeDlWWSCTPwyK0KT2bx0+Wo/zKXWFJbeaWRc9Wd8xfvB2PP/8aE6esEWJW1+z3WVh51IOWPs9hfbdfFGs0IFHg2QVqo849b2FlSLDaL7mDJz+qnsM658p3qE71WYN6TiRYqZ9HHfHaFsHIGjAH4ycuQV5iLlxb5iM6rgBOVNeNnzgPSZGpaNwyBdmJhQiN7YFA3zh07DUTY6mPGekdgU9IrPxJqw3C2vdFWEwfdOtaBEPLtsjL7g9b23AkpPeBjUkQ0oqmiUU7s5PzxDzc6uqtEZkzCYuWbECvnC5IyR2C/iSau2Z2hZVDArqVTMfAIRPg6egHfYsspCbnILpDKWK8o9EopDuSw+PgGjIUdy+fhJ1OMwRQ/ALdOyCjcCb1f+cj3CuKBBT1GV/BPEQWKtUNW6Nz6RTcuPMQDz//Css37MZfjL1Q27YdPGM6Y++R05hHQrVZuwx8auED7eYROHzyIq7dfoBb9x6h39i5QvBW7h//EnXrNIW5TzEef/MYwc3cSZRaErYoXnYRF9bOwqfq3lhz5j5Ku3RG9RrN0DZ6CU4eYQurLaLn7MaSkd0Q02clnlw/Cae2BdhTfgNuzv5IXcrDg/+LOf1649Pqbjh24w4GJfhDN30Gzp5bCVM9axKJPpi74hb6d8uHWeIkMQz44t610PnYAgOWHse+Zf2gRf2Km18+RlFCHPXPPeDqnQ1/zyh8TGUiptsMPLq8CzYVgnX0riuYP2YIapLwc6b+zbWrFxAVmII91x6gMCqSxKEd7EMG4MHjqwh3JcH6sSOW7ruAjRNZjFsjtM9aPLh8Gi2tvVCd7mt0vzW4e/EADEy8MPTARcwemI0atZzh034M7ty4jLb2HqjBIwkqBOuqsi+wrEfPp4J18Z7zWDWiAFYexXj48C7SfUJQnY63iByNu3fvILRZW9gHdUeiXzL1nxKQlt5bGAyTOvSHu2sIidvftoiWGHWqQmu9Cl6ZYH3VsOjjFX7ZWsmfL598Q5VLdzG/lbdOYcslW/JYvLG4rVbbUZjpecEmFktDh88S1/Gn/4ApIhN/7gFikfVLDxefZ3cKVLv9OTfK46rCeP4aBS+6U7UyXeVrX3TPblTF8ZkffM2L51Rfozz30zg97/7FeLx4XvLq4I6IPjWMr2bRpYpFgXjRHbFAEK8qmwhbl46wd+4g3tYrFzFiN9a86JFtMuxdefGhdLEwkNIfXgiIxYp1s3Q4kChs5JDy3AI9LIxsHDOpw5alWKSI/zfPog5bR1iS/4qFn5LJr2SYkJBq7luCoOAiNHZsL8Jn0WvtVICw+OGws4tBE49CElkkmhzTYeucJSyXzZ3TKwST0i/FokUcNx5GK+KpTBMP9aW0cJp4kSQ7l2zY86JLlH53Eu0t3bOEWDWySYRn8GC0bp2HxpTmpiQO24b3g6VNNInNdIp/Lgk95aJLFKZYxCqROiMpMLNrD7/okWjt2ZE6q4pFjjjPeMEmpZWS58vy4k1N3XLEYkg8tJbj/GLeshWT02Nik0ICchAJY8XLAHajzDele1O61o/EN8/HbdRUsVCSWEzKLhUObnnUMNExyn/FvVEM6+XrxPBncX9z0ITSKsoGX8uLLrXIFQttmfF9IreKBbYo/yidHDee//rTxaAkEkllDCxi0IKey/WbDlK/5m+4decRHj36SsxdHTNhJe4/+BLnL94UopXdqvLj5+B6gKeLvBerBGu6QV3HEx9lLYDapJtQm3iDxOr1SqL1KgLXP8Ddb58NU+XPqls/QKP3OrG1zdP9WCk/NMi/zz5rgr8SvFIqr5hajTruteo4in5l9bquYhGlT3kFWOpb8iqtn9WwF33K6rzSK+cp+VGd+p416JqPq/OuEW6i38lzN/l4fQ6jmuIaDkOdw6X2mhf9qUniuTr1Q3nlWJ6+9UnN5mKV2U+EewfUUue+mTM+IzHCK8/WrO+KenUdoPZRGwwct5PEWhfUqu1EYoX6vnT+s+oOT+P2Su439dlqUb+7sU97bNl7DGUHT2P34bM4X34LiQWlUNNxg39KT0xZtA77j5+DR0wB1DRdUTxmLi5euyPc7jp4Ctv2HherB9fkFyYv9BtV40554oTkQetxevNS6NV3QD3qn9au5QC78GE4sO8UpkzYg8+/+hIHyw5i8+b92HvgKr558gj+rcLgPWQFFo7sSTrAGQbaLVC7aRa2HD0FZ0c/pC48jDPbVkO7fhPU0PbBNhLbvSL9oJswDjvL5sBYhxcmaoOx00+hW8dsmMWNw92rJCSd/EnI2qLfrF3YOK+f2NIysvNsXLx+FwcpX65duY4+qR3xp7+QwOw4Fmf2rYGlri3U6nhiwMZyfP3FfezefQLl5VcwqGMm/vpXR4TkzsPpS1exbctBHDxxC1dO7YWvoyv+/FlzTF1zAPOHdEG16k3EnOeBCw7i+sXz2LzzJK5dvoDkwHCo1XbDwP038M2DG9i95yTKL11E76Q0KneKlYdZsH5SPQgzV1zGtJwCVK/uiM+ovExetR8Lye8/fdwUHfqtxo3rNygOh3D9+m0M6ZAnBHPPDRdwbOxYxCSPwJXyc9R3C8PJa/fRNzcXH9V4tlDtm+atFawMWzEdnWOfbkvz3fd/F9ZUHn7MCp6FamXY6sfbuCxboVhJmD9Ll28RizO9zIIqkbxL8MsAfoPOQsOcxJGqjsuvhYWK0iL2bA4ii0cSrhVi6Olxdsu/CeV55bln19LvinOqtkBRnnu6LcwL/5Xiiee92rrmw9ElE8a8eBOdZ3fNPLrBrVWOEHzcORNCtMIP8Z/y41lcnsX3xXg+dfP03PNpEuJP6YZgYfY03RQXpQh+tu3OM3+VgpnjaOOUB0/fboq5vHycz7+QVuV1Cr8rx0vhTunmmXsW3M/H7yd+0XfzVl3QyD7xqah9eo4Essp7ozwm3HC6KrlRHqvkRuH+xe8K9xKJ5GdhIcov7NqF90ZW3mgkpg1Go2apcPHMwYlTih0PWMCKocFWv35oMNeB+mY87erdtq4q4XmsDQx98Un6LPyJt7OZeg9qMx4qmE5Mvg+9xY/Rft/f0P3I1/BffhWfdlyE6saB0FR/PVae38uLL/1/PZ5i1WCeM/nKt7CpjKY7iUx3+CT3wqot+7B8415s3HUE+4+dx76j5zF90Qas2XYAQel9kFc8HlMWrMPMxRtx6sJ17D16DpvKjtJ1B7Bo7S44heaSQHQXe9+qDOsF1LU8oG8eAAM9T6g/3SOXh5i2QK364Vi++h7GDeoDTQM/NLYPgq5hDNaV3UHPTgX4tJ4b9I1ao4GGm2JkoW5rGJj6in6/jrEPtOhZ4C2M+IUDH9fRI3FP/ScDE29oUBhsvNEzouP6nuS/N/QNn+W1rpEPDIy9xIuKGiT+9BpFwC8kB01sA1C/vmLnEu6LGZq0gYZmC/xF3Qvj917H/Akj0cgpHvZWvuIlRQOKA+sZw0bh8A3IhK2Vv5gup6WrKBd6FE8Ol9PdoKELqtdviaaeGQiPzIGFuReq13TEX7T9MO7kFcwZkoUmromwsuBFYJ0ons9eVoh8NPaFHpUX9lekrcJvxbY+zrB2TEJ4dAGaN26LmqSbGrAbU38YG3tDm9JibO4HDV0P+m771B+l/2+at1qwMixEnd3icfDQaVGJ8+fS5RuYPGUpsnIGinmi4VFdxNY2y1Zsw5Mn3wg3PM5+6vTlYplyHs6qym+J5F2FOySGFmGig6Kq4/I+oBCzz4sgFoHGwjrJ/1kkVXL/CgXTi37xf6WwV3X+52BBKwS3inN/hF8TvkJIqz4nkUjeLPx88txVntfKCyzxKsG8T6ubVx7K9pzCxcu30LxlNgx/pWDlkSNc32jqUgf7Lepk/lFYtGo0bIF6TZNQs20RagQNeI6/ti2Bmk9/qLUuxJ+btCeRo1hhWJVf7yosxlhYqDr3yiDBWou+vRN7YPriTZizfBsJ0P3YceAUTl+4ge++/wf2HTuHgPa9SZB2FPux/vs//6Vz17H70Bms23EISzfsxoDxC2HqmYy6+q1JxP36cshp5H1lnzuu5UYagOIU0AMtXALF/qp11UnQ1WkFv+AecHEOQe16vP9ppXCo7LOBSoxMfMFPPi7yUZP3wn12nIWxGBFIx+s2dHv6YoDnZD67nvxV562IeIoe+c/HeAujimv42o8bemHAisMY0r2rmI9ahwV0hV8iXnw9CVc+ztZ55UjH+vSby60iHIWftevxdj6cXvKb4vCxtg8GbN6PAdkhUPuoqTiu6gUGb0nEewk/+89poP88ZJziUKe+wt/ayjQQDfj5ojB4pKRyOmE9+n7bRkm+9YKV4cw1t26HYcNnif1AK3/++7//Vfx69jl1+jLSM/uLzJfzKCXvIyxYuWPCou6PLr4kkUgkkrcDtqjyCyke/v9rX4wxPOpDzyRQtA2q2ox3Gupo83xQzbpNoVnHgeDvF6BzPO+VF1lS6Yfk5VAe16Y+s2NQNoZPW4YpCzZg+Ya9KCMxeqH8Nv7x4z+xaO1OxOYPRGaf0cjoNQJffvUNyq/fxa6DpzFv5Q4UjZyDtil9YNoqEQ1IsLIIVhnWb0BDx51EHu/g8WwBID5Wo3Yz6t//+kWBqgIWgLxPrjZbil8490d55vfbk96q5p0QrAwLT17Uh/cSZWvqxk17cfXabdziid63Hoh9RectWI+UtD5i/1Ge2ypXp5W8z3DHhLcvEJ2V99jSKpFIJB8SYqG6p3PMfwnFnHwecaOuzQLh7bKKSN4deC6upUciug2egVHTV2Huiu3Yuf8UrlM/++//+BGDJi5A4YgZWLxuF2JyB6D8xl3cvPsQa7YdxLDJy5DTdyJCMwfAtGWC2N5GVRjvO8Ia/poskwq/VZ/7EHhnBCvTgN8A1XcRCy6xgOU3K0p4nLViASbHCpO2rLQl7z9K0SosrTyvkTovqjs1EolEInmfEC8q7ZJgaB5S0R7Ifo/k98NbIGo1DkKTtpkITu+HkdNXYv3OI0Kw/vD3f4j9WKcv2YjjZ8sxddE6PPj8S9x9+AW27T2BcbPXwi+pFyzcE6Fp2VYMa1UVhkTye3mnBKsSMTadHgYeX/4M1avwSiTvO8rhwYbmYdSJUayO+4wkiUQikbw3PKvbTayjoWPoL9oAaVmVvAp46Glt6lM3tPTH0CnLsOfIWdy8+wjfk2D9+tvvceD4eVy4chN3HnyOH//5T9yl7wPHL2DSwk3QaRSImnWay7645LXwTgpWiUTyPNxAMFp63mIek5FFOHVmokSHRiKRSCTvB8aWkTAwC4G2oS/V/Ty6TFqyJK8YzZao3sAVsZ1Kcbb8Fr79/u/417//Q0IBQrTevv9Y/P7ff/+HH/7xI85duY2sonGozdfKqXiS14QUrBLJe4RCuCpHG0gkEonkveJpHS+tqpLXB49irGfQGmHti7B8015cv/sQf//nP4VQ5c/fSMRevnEX81ZtR9v47qir5ymGFKvySyJ5FUjBKpFIJBKJRCKRSJ7CApT3Ea2l1RI2zaPQOrgjQuK6IjCmM9z8O8DYLhjV1F0Ve41KsSp5zUjBKpFIJBKJRCKRSH6C2Be0YsHTT2s2w2dE9drNUbeBK52TVn5J1SAFq0QikUgkEolEIpFI3kqkYJVIJBKJRCKRSCQSyVuJFKwSiUQikUgkEolEInkrkYJVIpFIJBKJRCKRSCRvJVKwSiQSiUQikUgkEonkrUQKVolEIpFIJBKJRCKRvJVIwSqRSCQSiUQikUgkkrcSKVglbw3qWi2hrukm9vySSCQSiUQikUgkbxvUV6c+u6q+/OuiCgUrby78NqMqzpKqRMfQD3rG7aBrHCCRSCQSiUQikUjeMrivzn12VX3518XrE6xa7gqLGX2L/zoebzcUR46reGOgjLOkyuC8N7GOgaV9e1g0SZZIJBKJRCKRSCRvGdxX5z77U41XBbx6wVoh+jR1vaBnEgBDi3BKVDRMG8W91XAcjSiu/OZAU7e1QrhKy2uVwYXe2CoKFnbJMLdNlEgkEolEIpFIJG8Z3FfnPvs7K1iFyNPxgIFpMMwax4sEKUh6R1DE16xRPPRNg56l6YV0Sl49UrBKJBKJRCKRSCRvN9xXf2cFKws7Lf02MLGJUZiMSQCqSuS7gFK8stVVS89bitYqQApWiUQikUgkEonk7eadFaxKsaq0qqpK3LsIC2/TRvHQlKL1tSMFq0QikUgkEolE8nbzTgpWjqyGjidMbWLfS7HBopUnFjfU9qjSG/OhIQWrRCKRSCQSiUTydvOOCtaWMDQPI2GXojJRlTGxiYO+RTQMCH3zaBhZxap097bBN8bALFikVVUeSP44UrBKJBKJRCKRSCRvN++cYFUOBVYk4OVzVs0aJ6CJcwe09u8C38Du8AvugRat88RxVe7fLpJEPDX1vKr05nxISMEqkUgkEolEIpG83byTgtXALOQXRQaLPV3TSAwfvYQ8/AHnL9zE9ZsPMHn6OnFczyyqwvIa81TA8m8+bmgZ89QfQ6tY4Y4xto6jcBPFHFNDy2eWWnZjYsNzaROFBVf4bc7b6iRUuE8Qfiv9YbfKa18Gp1HPNBDqmtLK+jqQglUikUgkEolEInm7eccEqzs06JtX0v01glWHhOn02Zuwe98ZWDZJhrVDisDZIwc+7brDL6gH3Nvki2MsItkSGxbTT1hhWXCyP06tOqJNu27wD+kJu+Zp0KPjjR3bw4X8UK5K7Exu+ByLVXbPfviS30YkcPkYC11Pv87wD+4pvu2c0n+VlZfTaGQVqSIfJK8CKVglEolEIpFIJJK3m3dKsHIkNXW9xJ6lv2Y4MAvWqTM3YNvO4xXW02hY2Sfj6PHLuHL1Ho6dKMe9+18gILQX4tuXYv+hc9iw+RDOnL2OzLxRJBbjULb3NK5dv4/9B88JvNp2RXzqILr2MmxJpLIY3XvgLHI6jxPCdev2Y9i89QhOnb6KCVNWC8E6fvJqnLtwA4ePXsTjz79Gn/4zRdxUxbsyLIhNG8VBQ9cTDavwBn0oSMEqkUgkEolEIpG83bxzgpX3KFWVkBepLFi37zohhCUP42WRefXaPWTnj4GtYxpu3XlEArQUjZq1R2LaYLQLL8SS5btw4tQVYQk9deYaBg1dAHMSjyxSh4xYhARyf/X6PZhROBqGYThz7hp695shwotOGoCQ6CL0LJqOuySG0zuOxP0HXyKBBHFdrUAcItE6avxy6JhEqIz387AoTyCR3rpKb9CHghSsEolEIpFIJBLJ280HJ1hZmF68dBsdckbCokkSyq/eFRbTktK5JDyvY97Cbdh34CzOnr8BF49cHDx8QVhLd5Afjx5/haDIPoghUfrN377H+k2HsGb9fjz56lshgMNi+tJ117FyzV6sXLsXjx9/jdSMYZgxZxPK9p7Cxi2H8eTrbzGQBLC2FKxvnFclWBWW8FhoGYU/RdssGqZ2qt1/SHDeGFtEQdcsVrz04f88pF/bLApm9FvVNR8aovxQ/aRtGkVlhvKIj9Fzr2dCZYnK0XuTT43jxYs6Q6t4WDZJhIF5JAws42BJzwn/1jHjtQNkmXgdWPA0mkYJ4hk0b0x5TvWeeWPVbiWSPwqv3WFsGQVNagsNbRRreahyJ3k7sKD+sp5JJIysE6k+pjbaKhpaxpEwoTqC2yNV10jeB6g9aETtsnG4eFZF/9U4Asa8/o5K92+Wd06wiiHB1PH5LUOClYKVFzxq4pyOGzcfICl9CGyapuLi5dvo1HUCrt24L6ygah+5IzCiUIhUnsvKw4dLhy+CtUMyVq7eQ+JzoxCst+8+RkbuKOHPFRK97McGErBz5m/Bn6u3FkOBeaEndstzZB8+fIJlK8twjo6xlfbXWFjlkODXy6sSrEaW0XD2GYrV205h//5zwoq+adpSuJhHw4AqfLMKKl/za4+9jJ9z/1v9eZ0YmEehXeFCjBlaSvkUBX0SYH5xUzFr9DzY80JmFe5Uxfll6RDnfu54pWuU/ysfe9swonxoGVaMueOXws0qBkZUv2kZxyFz1CasGD0bdiRkOZ9elpbferyqMbSIojQOwerVO+DbMhG1dRLRte9a5GQXorZGIHyzZmPVklVwaxYrOriq/GBemk5Vx37G/cvOv+yaF1Hlx2+5/rVD7aBl4xToRs+CfussWFpGwNK2I7TSltP/fBKy78Y2b5J3C32zKLRJnIwtWw8gxDMN+pZxz85XemZ+7pmtfOz3HFfFq/Dj96D0v3IYrzvM34RNHHSdczFw7jokR6SioV4obLz7YPmGfegQnEv9Zqojfia+ynS8eE7VsZ+jsh+/qTy8cEzy2zHj/oZ7N4xbcQT7D5wjLuLQzgOI98yEXqWFZX+Jqrof75RgFYsu6XhULLr0y4JV2yQSs+dvxb6D54R1lVfvnTJjnRjayyLSwTUDd+59jtTMYeRuixAaQ0ctFnNYeY4rL6x0+uw1HDl2CZOmrcXl8jsoKZ2H5A5DxFBiDkfDIAwXL91C195T0DF/LC5fuYsx41dg9bp9+OGHfyCRBO3SFWVYt/GgCP8w+TV20ipoG/8awaq4OarzQvJHeVWClS1h/knL8e3nn2NE9wnoXDgVndIHwoqOa9B95hcnbFE3tE6AGTUO/LKCF+8S39QYcFlm0ctulG4NrONFZ1OXxUojxcsLQ15lmhp+8TaU3OmS+NMzi6RroqiyULwVreyHqHB+4Tl53WgbhiF92Wmc3k0dZtNQaBmGI6H7Tjw8cRyuFEd9m1joUB5xOjk/dM1jRJxNrGKfS4tItzgeI54dXXqWRBor8s+skSJfOS906LnX5bwikcTHhD/89tgqDkaU73wf+C0y57ki71THvarQMw5DQPZ4fHnmEgLMI6FuHIpm4aPxLVWR3+3ei+ZUx+iKe6tY3ZxXOdcx5UXhKN2cf5Q+zg9l/onyROl/Pv94FfM3Vxb4/hjYdMCEjVdx6fBWGGhHYdqyOxhV0h+GLQbgyqO/YUzfQZS2cFGuxQtJEu66FHcDXoGdfutxeigPFPc5WlHmrak80DFeJI+PK8oJd5g53ZxPim9jG36GFHGxsEsQFt3K+WMk3ijzc8XHFHnM15lSQ2xKok7XLEaExyNe+B4YURniMJ6WL3JvQGVWPJcUF/7WYev4C/lQ5VC+WTVqj/rdDkIjKAs2pknQyNmLOh3nUNwor2xihLWVLbDim9eHoHIijlPeKv1R/OcODOWT0l1FflhQ2WTrrQW557pJce/Ib75e+S38YTfklt3wcSq7Cj/o/rKffLwRPc/iOIUprMJcD1acp+PKb0Uc6T+VK4XVmNyIcBRxV6bDnM5bUvyUeaFMq/CH0yPcKMPkuCjiyB305/x5mg5l3pAf/K2Md0W+cFjKb2XeKcN+mg8cXsWLAhEXOm5hw/mvjCfF2VLhB/sv8r0iD8R/QvjFceLwKueLMrw3Sjw0DOMwasMNqsGARUMGQ9OA+jucjyyO6Hnh+oqfI216TkzoGlHfV7SVynqM3SvrdXavy8+meKboHlB+iPqAn7eKZ82U8oP95GeWn3VDykNDqvO5DLAf3OayH7+mjmTrkpF5lOIYhcVhGNkkUH+Bnm0WcBVlguNlSm75hRyHxaP2RBtFdQiPljGt1K5zvWLMdQn9rhwXRb2iKh+rCIpvQ/ce2Pn4Porax6KWTT62XX6C/cvnw86W4klp5PjrU35wWpQWc34Z/TT/jDl/yC/OK3Gs4n5V1NOmFIaeuSLfOD/16bxJI76/z9ov7sso69zK/SRRXp72kyjMSn0qUd/Ts8f+cfjSkv/bMLOg+9l2MK788B/MnLQQuV0moUf3cfB0bi8sraKv1ETxLInRUFS+jXg9IOpbcllX9lvFs0zfBlbPnqHXwTsmWFlktISheaiIuKoEVYZX/vUJ7I6Q6L7grWhYxKZlj0ArnwJ6EKJg0zQFsSkDhXDlTM7tPA4jxixFZt5ohNI1bIENjy1GTsFYdO4xSQhV3qLGyT0bMckDxAJO7GdUQgncvDqJh45/Dxu1BN17TxW/W3p3ouuGwt65A930GETEFaN12y4Ut0pvHH8GTqO+WbDc1uY18aoEqz5VzP4py3D96Em46LZDbf1Q1CWyBizF9l2nsGPHSWzfdhDZ8Vkwa56HiQv3o2zXCZRt34u08Bw00I1CYt4ibC07iV27T2P5nFXwbp4Cc5dOmDR7FYLbJKKhURSySxZhUPe+0LJKQO6wNdi99xT27DuF0l6lQvQ09uqLaUsPYM/uU9hZdgzDOw+DmYmiQVUV76pAxygcqfOPYu/6Caiv5Yea6m0Rkr0eV/cfRHPDEOjYpqHf5G04fPQC9u86gKz4fKjrBCEodSQ2Ur5xfqxbvhGRAVnQNQ6nPMnH+IUHcPjIBexcvw0R/umi8TKwSUbXURvIn/M4fOAICjPHYdSUvdi16zjWbz6CvXtPIq/TICQOXIBOSbkURghco8Zg+sxlsHOIp8bz5616rxt9fuHRYQxuHjoFX5NQ1LZsj0X7ruHmjUs4tXI77BoGISB1BjbsoLRsOIjNW45hwfRFaGRLjUSjDMq/HTh86DyO7D2CjildxRtyt+BBWLjmCMrKuPwdRWFuT+pgvFkBZUqd84YkWqftuoKNlO+zZ57AOErHukM3MHPACNTXbAcX/+EYMWoedb6joGmeiL4T1qN3RBdouXbCuBWH6bk5jbIdB9EnvwQGZuFw8OyDmcsPUXmnZ2zjDoR7Z4iGNiJ/OjbuPINdO09j6/otCA9Koo4m32PqLJm3R7fSjdhBz8mOnSexbQs9h23z0EAvAtF5c1B26CIOUnmcMGgCDPSD4J08GlMnTIdtozAYOWRg2OSVSEvIxzgqh2Xbj2LDpmPYu+cYeib3R9eBq1FGZW3v3hMoyS+GMbUzb1S0UueQBWuDTjug45sLvYT1qJ2/mDqKkQqx1CQHWskrUa/7TjTImAdjx1RYcuc7eDJ0AoufCioT75HQDh9C9yUbOgnzYOSSrhBKjVKhFzkdBl49oRs9HcbNFILOvGk+/Z8MI/cS6ESOpXiwKEuHXsQMGLpmwsy1H3RDhpGAIQFmkwrd2NkwdM6EiecQOj4YlqYhMPIfC52IETBvkgnduIWoX7AZ9XNXwMC9I8WROlOBY6DnWwQLywiYORdAJ2oydXSj6To67tOdjodRPKjsxM+ECcXLyoqetfA5qNdtJ+p3Wg2DVnmwpL6EiXcpdChMc2vKE3sKK3oqjKntNwyaDH3vHsJ/U9e+5P94ckMdbff+aJi1HnUpPg0TJlAfgDpy1kkwIPfqeRuhnrsBDZOnw5T6B0oRbt6sC3Rip5HbKJg37w7thDkwbdYBRn5jyP1G1CvYCO2QEgorHKZuFFbcHKjnbEKdzuuh36oj1Xs9oNlxC9SzV9Fx8j9tLkwdc6EbMx/18ylfcjhfcsQ9UVkOqhBTy0iYexbjyLlrmLNgHy4cPYBmNuFCVFiHlmDu+qPYvPEQNmymZ2fpJvg3joV/+ijMmLENW3ddwIFd+5EWV6AQJHTP8oevw8EjVL8dOo1+OX1hQO2AFj3LiYVLsffwJRw6fA4jiofAqmlPjJ64Fi1appBgTkBOj5UoyCuGtm0WBs0sw56yE9i36xCyk7tBQz8cbkE/U0fSPdOljnfikGUoyi9ATb1Yals2YUjvIUjInYWRvcfAxDAUNi36YsqU1fBsnIqs3kuRldkP6rpBcGg3AHOmroS7eSRadpqOLdSO7aB6a9emMgSG9kLJxG3URp+g+BxGAcXlTdfLLFg1WnbD2vJL6JKZhzGbb+LI5lWwoGdDi/oPAUljsW77aewoO42Vc5egRbNYyv84dBu5VqRrx85T2Lp5D1Ij0lDfgPK9ZDUO8P06fAbF+QOhRXnSKncGRo8YCXPyU69FZ5TOXI52raPg6DMcy6n+3LDxINWjR7Fu2Qa0aEFxon7SuPl76d6cwO4d+5ERlUv9pFgkdZyPOUs2Yc+hK9i2ZguCW6WiAdUPxTNWIT40Bbrm/CLthfRJfhYzi0gYBQzGmfufw88jEWrVvVCN+mg61J8aNGkNcpNyUE83Dh27r0SXLoNQXycYKT2nY2TBCBjQfW3iU4h5G07iwMEL2LJqE/zcuJ2NE3qK9Q4PMWZj4asSse+kYNU28FW84VKRoMpwJhlYKN4QKY/xb85IPqewwkYIYcvwmxuGOzz8FkxUXPTNY7sZPsfHeHgxX6ccqqCw3igaCnav9Ifd8HE+z9dwmHzeoCJ8ZZxehpZ+myq9OR8Sr1SwJi/FjRNn0IY6ePqN4qFlGo0FB67j7M61iE0dhtP3vsLCwb1gQh2rLn2mIjK6EL3H7sTV08dhaxKLwfOv4NqOMoS364XxW69g/7KZsPXsgpuP7iDVPxxq1XwwbtN5HFg6ERoWicjsNhUdUkoQkz8T52/cRm54LsZuuYQja1bAP6AI87fcwfmVq2FO4oXfYKuKd1XAgjV2xn7cKT+JUWMXY/iYJVi+rRxXd5XBRiMUhfOPU74dQEb7EvQcsQH3791ErHsMsqkx/PzQSSQGdkfJ4mO4fHgrjKxjMW3nVRzftgHxiSUYvOAAbl08CTfbaOSO24fPr51HQeZAdBu4GIOLJiE4tBgTV+zHt+U3UJgxBM3bdsGYY9cwvWceappnoOzqj/jPF5fh0DSO/H5zDZ1SsN4iweqq4YeYwdtRfmw38oum4uLmvbCq0w6dx57Eo9OnkBLeG50m78X9u+WwoY5y7+nHcXzfToSFdkNy4XJcLL+AwLCuWHj4AdbPmQf/4EJsPfcAu+aPg7ZR2JvtGFGdZ0wiU6tpDvbe+AH//uo7/AP/h73z50FHI4Dqy3C0TVyKU6dPQ0e7HYLzVwoLzfK0PmjgNxDn/3Yfg3sWITp3EW7efYhk33Q0atMb3fpOQlhUIUpnHcXZPVvg6jEY5248xoCug+GfORknvnqIkrw0NDTmexxLdXkWieQnOLx4FeJSpqL83vcYk9wDbgkzceXKNXTNKEZAwijsOnsfI7v2RWTPpbh7cTc9S56oY5WOE7fvY2hBPnzCSjB062U8vHMU+XmD0Na/Bz2Xk5Gc0g/JXebh6o07yIjIgQ7P31aVH1WBEKypUO+4AzX77ke14t0wpedFWO/ouGb2LtTNJLHYuje0U1ajVpe1JMqo7coqw59HHYWJfTSsKc11+l/Bp13mw8oiHzVG3kfN7ImwMmoL09Zj8fHEG9Dxy4Nmzm40jCim44EwCllAwngRjD0nomb3DTC3aIdGxu1Rv+thaPl0gmmbyajdaSmsjINIHC/AXyfdgrZbRxiFLULdrNkw9RiGuj3KYNAym+rnLBgEDIVRq24kOGejVvdNMLUOh07GWtRLHA9L8sPMox9q9S4jsRQG7dSNqB83CDbcBmeU4aORx0mAJsAgYglqd1tLIrQ39MNmoFbhXhg0T4BR+DzUyZkHS6M29Exlom7vA9B3ThfpUY8YgEY6bcj/MeT/Ngo3EiZuRdDz7w/jVr3QMLcM6tGD6Hwpnd8N3TZdYRgwHdX7HYShU3uFhZZEtLnLAApvFwn9blAv2AvNCBLlVOcYeQ+CgU8fGHsNQt1e+6DjmSvyptrgE9BuVwLdyJl03/ZBz7srjH1KUafwOOpkT4GBdy+YNcuFQdshMBT5MhO1emyGsX0ChfnmXr4x2lTnx/ffggs7N8HELhtHbzxEj7gcNNBsB/vOi3DryRV0I+GZkj8Vj+89Qo5DHNLGbMO/ntxCr06DUTR5Fx4/uI4A93ikD96Gy8ePIjmmJ+JILF64ehudwrPhSwL90ecP0L/rCHToNQcjS8ejucsoXCh/hJZuMVD7NAwT5t3GghnTodU4A92ozU2I7YOOgzfgyuXT8PbIxuJjD1XXkdTHa2gehwH7rmLl9IFIGbITV84eQyvHJBROOYdzy1eiwaduMHIeiTs3HiCycQdqZ65j3PDR+LRhPOYdfQJ8fhf+BkGIWnQCty/uQoesYejYcQhatu2JnF5TEBvXB3kD1+FGeTmCPFJImP+yAeO1wRZWEpGLz93C3QcP8PjSadiZhUDbgson9V/bpYxCQddRCIouwYo9N7Bh5izU14vAeqofD6xZjPjMcbj6+RMM7ZSHqN6bUE7tVGpML0TmzMSpK3dREN0RvqN349yRRdCs3xKfufbC3kc3kRkahjYp6/D1ndvoGt8XcX1X4N5XXyKqXRrMXDujC7V/UTF90H3kNlw7dwr25okYOus27l4+gdT0IZi08jzuHt2Pxq27YOO9OyhMj0dNTeqnc3+bR3xIa+svwoLVkNrWE4++w+plGzFi/AqMHjkLtq6ZKLt8HzOKu+KjOtTvWnwXi+bOwUc1fTB02X6cnroYJmYZ2HzqDpZNmAFf6reOWHAMp3fugFPjKGGB9Qvuidwu48S2oKx/VIX/W3nnBKuAImtkGfGHhcbbDKfN0CJMitXXyOsUrNpmMZi7+yKWjy7Gn2r7Y/GBcswb1AeGtvmYuPAAVq3YjmUbz+Gbh/cR3SQdvSefQvnhoygqmoktF+5i3tBSWLoV4MK9h5gxaiKSs0Zhy4nb2DxzFDTNItFl+DpsIzEzb2kZHjz5Gyb1LcTINeewb8ki+AT0xbxN13F04TKY64e9ccEaM30fHt+9iiVLdmDRkp0oO3YXV7Zugb19L+rMfI6UsAzU0gxEdc0IjFt3E3PHjUFinwW4d/oiSvpMw7LDN7FpzlQ4+YzGVRKfPk0jUEc3EDX1OmDjwXsY0X8mNp26h14ZBaihESReOOlZRKEuib+wrtNxZfNuNKrTBp+ZJ2HMwfMYmtcFvWYewIX9t3Bs/2E4OlHD/BYI1qtlB+FHjfmZx0/QI6IDAjpNw/Xt+2Bdtx0KxhzDyWWroPVpS1imzsTpC2fg6p2H4yTM5o+gDlDaYMS0H4UDlx9jTukczCNhv3zKDPiF9MVGKjcbZ4wSCyu8ScHKw+y0DaiTkjEDp6/cwSXqXF68cg/nDhyCp2Ms6uuHwj9+EXbt2I0mgaU4fPoqzl65jjnt+0HdpxhHHz7AnEkzMGzqAVw9Q51OpzhYefbFrDWHsXzxNqzbVo77Ny/BO2gMTl6+i8LcErSjzv2h+7fQJzsNGiYKwaplnIVVe+9hVl4f/Ll6IjYcuIdhqb0xbO05nN6xEQkppYhPHoQJa8/gysoNSMuejtu3LqBX1+HIKZyNqxSPog6Z+Gs1b3gM3oKj+xdCS8cb2ubp6DNmCzav34N5S/bj8dc/YGLH/tQJ/uUtzF4bLFhtklG/8yF81ncP6vTcD+223WFlGgyzlsNIZO2ESeNIEqKhsDZrjwZdD0Dbtwv0Epbi08HlaBg5EMa+k1B9+AXU6TAdFtYFaNDzOKoN2AtDlzxoZe1FtdIT0GuTAhPfqajVdQUszGPRsNNuaLbrCnPX0ajRjwRa8EDoBo5DzT5HoNOaRJn3BNTtMBNmLUrQoMsO1O2+AzrueTBuR2Jv0FnUKDoAwxbpsDIPh4V9FnQSlqBe1hI07LAW1UsOw5DKi27qchKmY2BpQmlpVYTa3beSYCUhm7QGDUNJBAZMQb283aifvxbGLXqgXvf90G2VCWvTEFjTs6CTuoUE73CYtKX09dpKArEfdCImogYJREPH9tDusA21chdC168fNFJWokaPdTCzjIRpq4FQz16HBqnzUK/HEdTKniWO1eqxA3penWEQOAM1+uyGYfPUZ4K1eV/U7nuc4n4aDaMHU/6HinOGARNRP2cV1FNI4Pc/A/WwIhKs41G783JYmARRPMOgm7wFDRIHo5FBMDSytkEjOI+OB8OiSebz+TLgKPTc0mBp8+bqMi5vmsaJmLPvPm6dP43+Q5fg8uMfsJ2Eo0Y9H9gXLMKpyztgZ+UNjUYdcOrsNeQ0i0eHcdtwavsS6Gh74zONGCzcdglTBs/HiqMPsGrWAsSlDiaGYMWpR9i0YCTm7DiLpUWlqKnejp5nNigEwdJxJM6Uf4nBpVOQmjkRW/c+wuTRE6Buk4bhc3Zj3ZpdmL/uJL76+hbS2udSHO9ghao6kgSrBpXhLmtP4/PHj3H/KrXrzmH4pH4Eeo09jhuHjiAvcwi6D9yM+9duIJj8H7PwHPoUDUNK6Raq08pxdu9xBJqEImbBUZStGY86Gr5Qp/rNvEknDJ9JcVm9EwtXHcdXT75BYUg+tHgItKr8rApIsKq7dMLq29/h5unLuHyFBGRKARpSO2pIwt0/fgLWbDmBBQu2Yv+FL3B1205Y6YVj+fFrmNqnM/7SMBwbj1/B8N6FWEpt+9aFCxCbMhixyYOx6ugdHBgxFT5Fq6ntPoiCvKHIHLQc5x9eQWJgKNqkrsE1qv8d6nmjtmcxDt+4i+h26TC2K8C4+fuxesUOLFl3Bt88foQEx2wMmX4Z0yZOxkc1vFCvcR62X7iGzj17Y9aZRzh74CBWrt6PkaXj0NghXohWlemVPIUFq4HfAJygZ3TfzoNYvGw3lsxdDQe3LHomrmFiYRd8Ui8W4+dcxexpM/BJbV8MmL8Le0bMgFfKPNx/QGWF7mlSWinSi5biwd/uISs6DnX1FaNNN209guCoImGkUxX+b+WdFKwcWU09b1GxvI+ildOkWGxJrg78OnldgtWAGm0Ng3DM3nUR68cNQW3dcKw4VI4J/YvQfdkZHF67HK4tMtE6sgQXLlxGYtMM9J5yGpep4u7WYxIWbDqPlbPnopFHF5y99xX2bi7DzHnbcPb2V1g2eiACePhx+TlEBeTCzqMAk45cw7zSQqhbZmHFscf4z5dPcOXmVzg4ZzHM3gLB+mxIsD9qqQeIIcFXdu6Eo0tfnLj9CDE+7VFXL5TEZjiGLLqCBZMmIoEE690T51DUYyImLzmGnStXIThkFi5fLIebVTgaGpF7nfZYsfc2xg1agC2nbiM/Lhc1NYPFyAYd6gBoG4eSP3Nxbft+OOuHoE6jFAzadopE6hHsL9uOAP+J2HfwFJyd3wbBOgpnd57GppXncWj9CjSs743Ywnm4vmM/LGr6I3voIZxYsRpan7nDuv0snDh3Gs6eHXH6zpeUt1sxecYmzJy9AdNmrEN6YCdYOHXBnqvf4x+PbuPGw2+wZvKwNy5YDc3CYOlRjAv3nqAwrT+GTzqJ/kVD0W/ZRZzZsRIG2r7wjJiD3cfKse7YNYzr0Q9DSfgt7UgCQQjWe5g+dgoKh6/C8ZNnkBzaEdN2XMHW6XPh6JqOdvGzcOb8VTg5xcIzbjK++idw7epN3PvyLrp1SBWC1cIuFg300rFiN4nfngNRWzMDWw7fx1ASrEPXncftM6cwcep6zJqzCdNmbUDv5CIk5s/Co88fYcXizZi/4gAeffkYhekZqM1DtUftwIlDy2Cg74Ogwdtx/ewRBPnlohmJr23HLmN63iAqh29YsPKQ4ILd0PLNgEXLkajR/xAJMurMuQ5HzV5sNYwgkUOi1SwZDQv2Q8u/B4m+JdCInoX63Y+Q+NoB7YQpqN9hNswbdUPDjmvo/0LUKL2IehlLoNV+PbQDs2Fl3RH1upZBN2Q86nbbCmNbKm/u44WQUk+aC83EZaje/xh0PHNg6jUGdTttRoNO26HfugBaGeug7ZFPgnU2qg08gjrd9kAzrBjWBiHQTdyAujnzYGafCnOXQvK7DPpOcQrBGjMCVgb+MHfrhdrdtsDUggReHB3PWoX6BSRUm/eGRu56GLWk60is67EItogQ6wuwv/WSR8HEbzyq9TuEhgmzoNF+FaoX74dhs1QSrFtRs8dWaMbOQoPcXajRbQUJjnwSqSTq2/WmvE2BQcQ01MlZDAvTMCGQq428SvHbR/6Vwcgx5algtXAsQq2SkySqy1A3ez7MLYNgRveidmEZDNxyqVymQzNjK9Qj+sGEBGudguVi+KS1SRj04jegQcpwEtrRlPc70DC8C6yNIqEbvw51c+fDzIHyxbk3hbubBHn6GxWsxpS3jfyG4vqDLzF3ynz0Hzgbo5Ydxd1LVF+Z+MKEytCpy7tgT4JV0zZDLG6Z2SQG6SRYT25dBH19X3ymHoXZm89j6tBFWHnkIY7t2ItJ0zZg5pyNmDp9HdJS87Hq4GXMzutLbUagmOuoaRQIi2bDce7637B5I7WXc3fi8rWvMKTfWOSPPIDju7ejdasOaBoyBGXl5eiSHAd9x+6q60i2sJrFoNvmiyRWr+PS5Ssoat8Vn9UOQfeRR/D41k0smLsJyzacxRc3ryHQKo2E1DGsPnARBw8eRHxiXxzYcxohVCai5x/Bvo1TqY8QBg2qB/LmH8eFvVvg2SobLfx74ui5qygO7/rGBSsPCd5w4ybyoxPQrtcGfPOI0tUsErVde+HAzYcY1Wsg7Jqlo2DESlzYuguW1M4uO3oNc4vpuTJJxNZTVzG0sBBLjj/AmT37MJHu16zZG6kOXY+8oAL4DViHBw9vYvGCTZi37gQefHEV0f5BcI9dgasHD8Oe2rs6rfvj8PXbaOPVHl2WnsWJTavRgoSTR2g/nL1QjvZOuZTPlzBl/CRUq+uL2jYZ2Hj2Crr3KcLcszcxbVgpfCIGY1/5Q8ztMpj6HhFvdkTRO4AYEtxWMSTY3zMJf6rRBtWpj6Zlk4od525iTLccqH0SilHTr4gXBWp/cUfRrO0oGzIVHsnz8OWTLzB/5jrMmLMZ02ZuxOQJs9G6dTwMrXnea8zT0aevytr9TgpWhocG6xhSQ2WXRIl4w5PWXyHKtPCwZ06jqrRLXg2vSrDyokvt0lbhi8vl8LWKhrZlFGy9B+HCzc8xMKUbautHYdPZO5g1uBgFC0/h8OZVaOnREfHdF+GLLx4jyaEDBswrR/m27WjbJh/dxxzE5dPH4NS2N249vou0gAio1fDDhC0XsXPOaLRNWojrly8jJrAAnuGl2HfrGywq7QVr/2E4c/MW2vtmovOok7i8fv0bHxKsWHTpDE7vqbToUo+deHTiGOw0IzBy+UWc3bYDQW07IYby49qjB+gQlISskWvx8MAJRPjko0Pv9Xh07TratsjFogO3sHPeIni16YROo7fjzq3L8CKB0os6DLdOnkRKfF+kF81DafFYGGgFIKlkER4fOAYXvWDUsk7CiNNfA//+AnG+8bBsMR2XL12Bi8ubFaw8/9gveRh+pCrxnzeuILBlAgmpIKRQ3B/uOYzmRvGYsfUuzu7ZjYiw3siftBsP7l9Di5ZpKF1xEsc2r4NfmxzE5c/EjInzYGMaDN+MObhSfhVBLaMxZtN57Fsy8Y0OCeaFi4yb5WP9+UfYt2A6atSKxpzV9zBh6CBUt8imjsrXmD90OFzbTqdcAA4sXwh1DT9M23URGzqVQt2fnqdv7qF/QS/4Rpbi+K3HGN+9D8atu4CdcxfAtVVHZAzYgkeP7qOZUwo6j9uDC7u2w8AlC6tu38WQgg5oaBwntlhqGj4G5XcfIy8uG7V0c7D//DeYkNYLrTMX42r5OXSI7YrWkQMwbd56+DtFIrp4NR5e3gNLg9aoZ90BZ+49xpC8jqjZIBBBE/eh/OxqGOq3QWDJVly9cAyhgXnwjqHO8/2/YU7+IGhRx0lVnlQJFYJVLLoUkgMbo1Doxa4hobqBhE4GGubtJjE5HqbNsqAfsQC1emyjMhINrewt0AjoC6PAqVCPKSVRNxR18paQYO1Jfm2DsWseGmaugH7LfBJ226EVli+sgQaRC/DpqBuoHz+KRGE7mHjPQM2eG2FuEQgbkzS69ogYEmzmOQ4fT7pPfg8Woqxh5zJoeRbAKHwxamfPgqVdV9QuOgod767Qj15BwmwhTKmeNPZhwX0MBvTM66atIbdLYeLcGYahU1CjaA+Vs2ghRP8y9gp0vXJgbdkZDbrvgZFLKgm/NaiTuxTGTh1h3GYUicXD0HdLhWH4PNQm4Wdp7ANr2yzUKTxUMSR4D9QjB8JG14fiOxa1em0i0dxJWGq1Agth7pANrQ6bUKPzMliax0I7nQR40ghYNipErT4HYehceUjwQNSi+JnYpkErqwz10ibA1G0I6vQmweqeDzOnzqjX8ygaRPUXYr4GCV5D104w8htHfu2DnnsH2JjHQb3TPqhHdSPBGgG9uNWom7dIkS9tRqBGyXHovWHBqkVCuvuMk3hwai8s9Nqinm4g1G270DPzHYbnFKL9iO14dOscstv3RUrBFNx78Dl6eXVA2rCNuFd+FNFhnZFVvBG3SAi2a5WAzmP34fT+fWgX0AntOkzGjJlLYGsdhrhBW/Dg3iV0zihGUu4UjBo0AS5uY3Dx6mO0ahkHtWrhmLTgDqaNm46Ow/fg1N5daNM6G8EdZ+HWNw/ROSUWbvGzVdeRQrDGYdDBm1g9qTfckmbhi0ePEO+Tid6Tz+LCylVQr9YSJq6jce/WQ0TR8zVk0U2uvZEXlQFjr564dvYawk1CEb/8DE6WzaQ+Qig0SbB2nHUU5w/ugLd3RwRnTsWdJ99gYERnaIotvVTn6WuHhwSLRZeofs1KxMfq0Ri79jpuHt6Bxj69sP3yA4wrLoUjPZ9j1pzG7bIytPEchMu3KR9DslHfIhkHrz/AyM4FSBq8GxeP7UVYuzwEth+DmTOXobllINpNOYgLxxZDW70VqrXojX2Pb1L9G4/OY07h7sVzSI4tQkLf5bhLAig2PBed5p/C8R3r0Kp1R0R3nodHX36BdHpu+026hGO7d6CNX2eUzN2PW0f3oalXAdaT4Jo7bBA8Akqw69xDLOs9gvTBm31B+y5gZh4Bw4DBuPrDfzB9/DxkdhqH/PwRcHLKwM7yR9i+gEcglGLz3i+wZ8c2+Af1wtJ9l3BmwQrYN87H7nP3MXXIOLh4dUbPMevRr2sJ9MSCkBX+VwrrVfDOClZGiFYjf6pg+M35u29p5TRwWrQN/KRYrQJelWAV25IEj8HcKcvQwiYWmqZRiCtchjmT51BjEAU9qwQUT1yLHh3yYdKsKyYvO4jtO45i05bDWLpoPdrYpiC202Js3Mr7+h7Atq37kR3fBRYueZi+YB1CfRKhbhiJvMHLMLR3P+hYxKH7iA3YUXYcW7cdxtqVZeiY1Bn5pWsxsv8w1NUIQWKXpZhYPB7mb3jRJQOzKAS+uK1N/FTMHjcfdsahMHTsjImrjmL/gTPYd/gM+nbpjwY6QQjtMJry4wjWrDuALTsOo09eCYnfUDRpXYwlm89iH7k/tO8YOsZ1o4YpDEZNc1E6uwwHD5/HgQOnUdqtFHokUv1Sh2P2iHlwMImARqNk5E7ZQnk4EBr6gbB3H4KJk5fBwTEBJi/ZSuV1Y0QiyqVtb2zeeQyDuxRRnRYpVqBtS3GfUDQJuZ2m4sb9h1i+ogxrNhzAilWHcfPWtxjRbyAaWKVh9MKD2HvwDA4cPIsRhUNg2jgFA2ZtR3HHfqirGYyCYSswpHexWNXxTTXgBtQh80+eipUr1sPZIRINDJLRrd9a5FIntj6J81bR47Fo8WqER47EgkWb4OeUgAaGUeg8dCn6RvWAtlsBJq49gg30fKzffBTzJs5BU3q2rL36Yva6I9jGix9tOYA5M5agebtizFi6HXFeqajdKAMl89ahfXR76FKHX880BpmDV2HG6AkwswyDnmUWhkzcggLqNKobRSNz4GrsP3yOytc5LJ+5CE72EfBOGYPZU2dVLLqUiXFzN6B9ZAexcEurvJmYOGEszKkTbWSTiT7jt2LnrqPYsvUwVq3djY4hXaD/Jq0n1PnmbW20Y2dDzytTrCpradMBmu2XQ9e7Eywd8tEwewPqdVxPonC1WLjHyiISehGTSSx2E4sSWREmnn2hGTmC/MuDdvw0qscS6XgYrKhu0wufBn3vbHIbDAvH/vhs+HnoemQKS6Zpi4FomDiJ2jVFuFrxc0nkZsHMrQTq7WfScV5xNwG60eSHazZM2gyHRtRwWJoGkdgdhoZJk2BunwHthGWol70GDTJILLSfAxOHWBi1G43a+RT3zOWol7USn5Ueg3ab7mKxJvWYYbCk+2th2wk6cTNg1DyJwk+HdvJySieltdNG6AQUwdIsFMa+w0SY5tY8/DgTmkmzYdSMBG7EdOj494SlRThMWxZDI3EyzKjMmXqUokHOOtTPXIkGHVdBI7QUpi590DB1FtW1EbBo0hUaybNh3Czl2aJLjt2gkULH7Ci9TXKhkbaYRHQGjNpOQL2c9aifsRLqlAa91rkw8RqL6qWnUL/DStTLWw9d3x6KFYJtkqATNVMsniVWBW6SBe1EzpfVinxJm0tinK26b6guo76LvmUKiidtQQnXYxUdV14JN2vgEoxdWobTNx9i+8Y9WLH2AFau3ouTNx5jx9ApyClaiidfUgeZ2sA9ew8hL6kndEk8GlAaB0wrE1tu7D10FpOGTYQ1lRkdKnddRqwX++TvP3QeEweNQWOH3pgwbSPc3FPQ0CABnQrXoWvnEmjadcDI2XtEHbFp0yGsXLIaAaEdUDRlm+o6ku4ZL7qUMnIVBvToipoNw5A5YDXGl05Aaqf5GNdvHEwMgmHjVkyCbD286PnKLF6HqaVjoa8bBBuvrpgyYQVaU73u22chRg8ZJOp4XgnZwrEAw+fuwfadivZ/+YptiG+dRX2ENziHVbmtzXzFtjZa1Ncwcu6K+RuoHxKZC4/Ycdiw6wS2bD+G9VsPYmSfiejUdxkmjZwCI2qnDG1TMXTGeuQlZEHdIgVFk3dgH92rfQfOY8aISbCxDEXLTrMwcdwomJuHQNetKwZMX4Qu3Qbi/N0nWLtmN1ZTvb5y1T6cvfAEa+aQwG+ci/GLDzztJy1bsgFe1unoN/4C7t29hbVbj2LX5jJE+6Wirm06+s7fg40bD2Ld5iNYNpv6YS6JMHyDL6HfFZTb2kxYeQS76B7vLDuFnVt2I9IjCz3HbcRGel7Wijb3EDZsOog1a/dh/a4zeHLzBuLpObQLHYZ1O89iL/ffdu5FckxnGPDuFCrCehW804KVYWHHw4N5TqtYcp4SJKyU74LVVViHKb5NFILJiBpGxTBgKVarglclWLm8mdoottdgcSg2XKZOgy41fiZiS5pEsc2FPjWCptYx0DSKgFXTVBhTZa9Bv9kCakSdRLbE8KJcvLKaLi8Bzy8vjHkTZ8Vm3gbkXpfEKndCeWELI7sU6ozGiK2VeDlxY15inDsJ5Jb942Gxb/o54LzhlVLFwjP0m/+L7XdI1JvRb84PXqCqMXXeLBvz/MIo4c7YkvOJ8oHyQ9s4XGxbINJFolfHNBZNXDNIcEQ/PW5qQ9eScDW3TxHHtfm4cosBEs0cliXFx4CEqzKPzCg8HrKiXDztTaEoP3HQpPjr8Jt2+i/yjeJeSyMA2f3mYdqUBWKoDm/7Ur1+NAaOO4UJI0ejgS6/uY+ApWM6dfwpLyn/WJQamiu2emB/RLkhsca/VYVfJVDYvAUPl2fefoCXytenOCqXyudtIfi+mPALH7rvhjbxosyzcNfjBesaxYvh5bwNBg8B5HnKxnTflBvcW5M44KH5miT2+aUfb3nBC5lY2pKg4rlY1ornkOMizvOz2ZjzmRfWU2wjxeKChwTyc2VrnyRGA/CzJ8qQCecr5x+7US73T+WLyyCJYJG+RnH07IbBlOpzXq1VPJfs75vM9wosrKmeYyHDcaH087YpCjHFW7Pws5lasSJwxXPKv9k6qPSD0qbYloXSQ3nO274885vcUnrNm2RAJ3G9mH/Jq/WKepCeMcV2LYq8E0KLw+XjvJos/1b6UREfEQ7Hgf0QW7rQfRTxVcRLXMfXKLeVoW8rM+oIJy+FVrtiIUKfhUnxpWtEfIU/HC9KKz1vT92IbWY4bc/iKLa1Eemi+lbkmTIdirxUbDVD5Zj3teXfT7fm4TxRbJ9TOY9EnvMx8bsibEqvhVUkhUHflL+88rGlOZX9oLmo1X0tzKkOF+ml8qf0RxEn5X1UkS+Vw3wD8DOmqG+eLSwp5q7rBMAiZiK27diAJpb+aEjPaR11fySVLseGoTNQOHorLu1fSWkNpWe+Uh0t6vUIWDikwZrEPlspedsTcyqbog20pWfNlp47qvd4WxuuG0xFe8nbrii2PWE/NNmPJinU3lCbS795m6uX1ZGcDkOqa/Qs+PlVbHfFfon2p6Jd5dWhxaKd5N6QwuIVdbmd4bjxyvUm9Nukou1jfxlup7h+s3BIhSn5pUF1jNhSq6JuelOIbYKe1pOK/gz3R3geqAHdDx2LWNg4JIuXw9y2ClFP32ILIbpebD9GdSLXE9x/MWuaJhYFZD9M6bni7X2U9SSHxQtw+cQPw+o1m9FQVzGsu5Z6IFI678Ka5YupTx8s+kmW1E8yofukYRiKOtqJmLn0PubMnIn6BhQeXcP9IbEdGdXbWtSWc13O1/EWRG86T98NKsortVtcLnk+OLenfN+5zGtxHlf0wbjN1TIIgZ5jNnbuOY2Obu3RgI5rU/m2c2pP5UTRb1U+Q6+Dd16wMiLyhLaBD1VSoWKfVrPKje1bCseR42pgHgJtfR+Rhqq8ER86r0qwqoIr9JcJIVPqkIuGV8W5XwuXH95mSdW5dwrKKxMSJb92axnOW151zpS+XzynyNf3IE8q4O24bJ0z4OiWUXGvE0SHrKlbLpq5pj29/7xN1pvcmudNw6u8/9oXD7/4bHK9/AeGVfL171YZpLhSJ1L1uV8JiUtTt2LUz16p2HZGiDgV7v4QL8lTvqdNMxXzXH8p70Va/+j94ev/qB9KnvnFwt/EYyA0Y8eQ0HomVF/Oq4rH64OfOYtm6XDxyIIVCXp+/kTd5poJBxJCUXlTMG7oaJhZKsTki9f/XP0mntVfWe8pnkvV56qad62d4vsn6thK/1/ev3l5e8TXWzdLg3OrbPGbj3FbZufcEU4tM6hvU3HsaT6RQDZJEturdO7M0yze/IvmDxFxr5okw9UzF7ZNkkR54GPG1r++/f0jvBeCVQknQmGd9ICmbmto6nm93VAcOa4cZylUq57XKVglklcFd9aMKi0Lz2+OeQN6biTkW2TJ20ESCUG2+EUorJLCWqnK3WukkWL0icpz7wxs8WDLcYX1V6WbdxQSjIZs8VT+p7qLX1QakSjhERZaJu9hmiU/C79wV24HKeDyYBNLx561dZXhtk7fPAJ6laz3kjcA1bG8t+qbWBvlvRKsz1BYKt8FOK6q0yB53XD+S8EqkUjeX3hobSwsLSLFkFHJewwPIX5TLwskEonkNfOeClaJ5JeRglUikbzPsFg18OgGjdgJ0IgaI3mfoXts2KqruOeqyoJEIpG8y0jBKvlgkYJVIpG8z/ACJybNs2DQugcMPLtL3mfoHps0zxT3XFVZkEgkkncZKVglHyxSsEokkvcdXu2XV8Fly5vkPYbvsRSrEonkPUUKVskHixSsEolEIpFIJBLJ240UrJIPFilYJRKJRCKRSCSSt5v3XrDWa+iG2vVdnjumrtVKHKvXsMVzxyUfFlKwSiQSiUQikUgkbzfvtWAVgsTcH9aNg1Ffg/dnVRzn33zM1KJtlSZc8nYhBatEIpFIJBKJRPJ2894KVk5Q9drNMWjwdDx58g1cWyagRl0n1KjjBLdWSeLY2PELUZOONdBsKSyu/Luu+jOra50GruKcho6H+Ob/L4ZRq+I6tuRq6PAxhfWWj9WucM/X19dwQ616zoSL+K5d/5lfT91XHHsxLGU8xHH1549XFuKS34YUrBKJRCKRSCQSydvNey1Yq9VyxJBhMykgYMLExfi0ZjN8XN0B4yYsEscmTl6Cz2o1E0LWwTEKrdukwcS8rRC6LDItbAKhZ9RGiFH2z7JRkDiu9J9xdImFh1d76Bp4PRWW7Je3bwc0bhJGQtSZjrnD0NQXTZtHk3BOhLNbPKxtQyqErMK9l286GjUJFYJaz9AbVo2Dn4bF4XI8GI4TH2NhbWoZAAMTnyq9ee8TnG8m1tGwbJJCD0KSRCKRSCQSiUQiecvgvjr32atS81SphZUF68NHX+LCxWtieLC5dTtcunwDX375NSZMWoyPPrNHcclklF+5heMnLuDs2SsICMoRlszNW/YjJDwfan+yxtDhM3H06DkhEFks1qznjLz8ITh56pJgw6a90DVsg/Coztiz7wTWrN2FEycvioT+5aPG6Nl7NO7ee0Tu9uDQ4TMiLAMTX4X7vcewdt0unDp9CZHRXREc1gkHDpyCvnEbIWjLdh9FTHwPxBIbNu6hdDmhsX04ystvIiWtCJ/WaKYyDyQvh8uIoUUYTBvFwdQmRiKRSCQSiUQikbxtUF+d++zvrWAdPXaBEJOHjpxFl24jUNBlGI4eO4dtOw6JIcFtAzvizu2H8GqTjs9qNiPxOgnnzl+FjW0I9pNo9AvIQmufdPz44z9JzJbD0NRPCFYe4tvMKQb2zSLR3CUWt+88RGRMV2EFZRHaqnUKZsxchdNnLuOT6k0xbMQsITw/rdEUvm0zcf3GXVg1DhICOCyyAK28UjFtxgocOHgKWTkDhBjlNHCcTp2+TMK0L1IJFrcc9srVO/B///d/SMsoFv6rygOJRCKRSCQSiUQikfw2qlSw8vDfJUu3ICevFJdJBLIlNafTYKxYtR2jxszDoCHTsXnrfhJ9DqhWqzlMLdvi+vU7CI0owLr1u8V1O3cdwey5a7F7zzFhpWXBqhCTjujVZyzOnCnHxUvXxXDdnr3HCIE5a/Zq7N13UgjW6rUdUUrhbNt+EH/+2A6e3u2FlZetvd16jBTXz5qzWvjP7n38M3D16m30LZ4IdxK+HOeE5N5ISinERhLfw0fOxvadh7Cr7CiycwbiExLBqvJAIpFIJBKJRCKRVAWK6YKS34fqPH1zVLlgXbtuNzR1PYUV9P6Dz6Fj4IWNm/cKC2suiddTJBJ5nqqamiW8fdNx89Z9tPRIxvoNe/D48ycYNHiamJN67Pj5p4KVw9Ax8IaxhT+cXOPo3AX0LiLxerYccYk9yS9t+LfLxvETF4UYHjBoKsWjjI6bwcUtnkTqZTi1iMfVa3cQGdtNuPfyScP5C1fFUGG+dsfOw9i3/xRlyPeIjusmuH//cyGI7ZpGCPGalz9YClaJRCKRSCQSieQNwCMfa9RpLhZVZT2hXChV8uuoT7C24nV8OA/fFvFapYsuTZ2+AmW7j6E6FSQvn3QhSHmRpX0HTmHegvXk1kMIw127jqD/gMnCCjti1BzUo8J3/sJ1nD9/RQjfwJA8YRU1sWgrFleqq+6K0WPmY/GSTeK6GzfuiSHBPC/24KHT6NtvAo4cOYtzdL27ZwrOnbsqrmcBvX7Dbnz19d8QFNZJLPzEw4D7Fk+g606RqH4gLK+cSXzjOC0XL92gDOuHeBLC/GFr68fV7HH4yBl07jpcLCT1YvolEolEIpFIJBLJ64HXmWGtwcYsHpmZ32WoGB3Jhi4F0yW/wMDSacKo16twLDKyStCqdariBQBpNVV5XpVUiWBlOMG8Kq+3X4enApbh3zzsloUkC1kjUz8xlJctriwGWeXzyr68+BJbMvmtCQ/3DQjqCC291uIc+82r+3bvOQrDR84R5/itgJaeJ5JT+4jMT6Jvtr6WDJwi5sXGxHdHRnaJsMCytXbU2HlCDKem98VAumkp7YvE/Fa2ACvfOnBc2W8buxAiVLEgFAlmPs5u7RwixNscVemXSCQSiUQikUgkrw7expJ3AdHU8UBWxwEYMnwWsnIGCsOYtW2wGClpYOwj1qmRvBx9yicW/KypeKHb3n3GYvDQGaTTMvEZabY3uX1nlQlW3haGRSSL0hfPsVDkwsZuWKDyljdKQctCkd3wb94jld2wKFSKXT7Hx1g48iJKnKHsHx/njOWFkhj2888f2wqh2rXHSPGbE6/2ZxvxFqZDVn9xXWX3lcNQwsc4jgyHxXu98nG+luOg3P5GIpFIJBKJRCKRvB5YrFaj/ncz5xgxIjM9sz90Db1FX511hWJIsLvk10Kah3UXaxzWNWwkbOoULYx9XbuPFJqIz6m6F6+bKhOsbwNKQczCt/Ix/q8Qmz+9RiKRSCQSiUQikbw9cJ+dp+u5uidixqyVcPNIEuvUvEkr4PtIrXouQvx36jwUg4fOFKKVR7aqcvs6+aAEqxKlVfTn/kskEolEIpFIJJK3EzY08Vo2U6cvF1ZA3i1ElTvJ87DgrF3fVVhQq9d2onxU7Laiyq0Strrytp15BUPQo/doYcFW5e518kEKVolEIpFIJBKJRPLuwYam2vVcxKJKbQM7iql8cpTkL1O3YQsxTNrBMRKBIdkICMwU83xZwP6S1ZRFK1u0+/WfBH/Kc+VitFWFFKwSiUQikUgkEonknYCHqPKiSsUlk4Vw+iUL4evmuZGab+moTZ4SaWrZFiUDxmLT5q3YsGELNm3ahvUbtyAvfwC09VuLXVlUXaukVn0XscDs0OGzxP+qzHcpWCUSiUQikUgkEsk7AW+z0rNwDDy8278FW664oxYJ6Lqa7tCg/3XqOaNOQ/r9gsWX18ypr+6Caryoa20nNOBjlc6/Tth6yrueTJg0B6vXbERwWEeYWwXAqnEQklN7YNu2nejdZ4TYg5UXXlLlhxIeDsy7srTxy0DNKsx7KVglEolEIpFIJBLJWw8vqmRk5o/+A6YIq+CbtK6qk8Crp+uN9PwhaG3ti8/UWyMiZwiCWvmjZv0WqE2CrgaJWbbA1m3gAsNmSUjO7I/EyFwY0P+aJG7ZWszUbeiGuuquJBjJb62WJHpbQF1FmL8H9j8xpTu2bNmO5q4xYpcTtrjyPGCe+xsU0hGbN2+Dl0+qGB6syg8lvHJw23bZyO00uEqHBUvBKpFIJBKJRCKRSN56eNVad88UdO46vGLXjzcnWBtouKGOfltsOXQGuQ5+UPukJcbsOoMhHcLwSR0PuLXthJB2qahPwrSBZis4tSvAsIlLMaBLXzSy8oeTdwY8vVPQpm0mmjsGwrJxCPT03VFH3QOWVoHQJjH+R0WrWGSJhOnkKfNI5I8V4rWyyFeuqjxl6nx07zlUCNaXvQSoR0Laxi4EffqOF+6q6oWBFKwSiUQikUgkEonkrYdXtg0KzUNWzkCx2JIqN1WFEKx6flhRdhIjs3vB1b8AS/adQrdIf1h7d8XkmSswf+0BDO3aC42ck7Bs2Qqo/bkJes3ehcUzhiOp+wTsP3UJa1atR0x4AeYu2QUXh9YI6rUEpxYtg3n1pqijItzfAgtKtqYuWLQCOZ36o0YdZzE8ufJ5FqkDSydg4KDxwur6MhHK57T1vTCgdJr4loJVIpFIJBKJRCKRSCrg7VjCIguQkV0itlpR5aaqYMFaW6cNlu+7iK3zV2Dw6CU4euUqCsL8YOHRCRNnrcTCNftwYPcWuLZJx/I1GxGeOxW3yr/HyrHdoaZmiuELNyOyXRTUPorEmg2HkV4wHOvLv8SpeYth9YoEK1uiR4+dgWEjpgoLdQPNZyKTt7Xh+a1z5y4Viy+x218SrPxdOmQ6XectBatEIpFIJBKJRCKRKOF5k7yVTce8UhKvb3bvVeWQ4HW7jyGjcRuo/dUVQ9cfRJcOKRiy9iQGJabBzqcz1m3eCmePFBy9/QQb1i5BftpiLBhfjL9+bIuxS7cjKTIZatXCsWbPXdw4txvt+4zBoglL0KR2sz8sWBkeBszb2Owq2015lynykIcJs3jlc+kZfbBm7UbYOYRVDLNW7Q/D29sYGPug/8Ap0NKrujnEUrBKJBKJRCKRSCSStx4estrcJRY9eo0WQ12rSjCpQiFY/bBo415kNQ/En+p6Y/DK3egUG4644qVYOn0WBk/ZiK3r18HOLRkXr1xHgrsvHH2nYf7YInz0iR2GzF6HmNAE/KlaKDbsv4cpXbJQo2UeFk9YBNs6jq9EsLLIZKtq336jsWXrDnQqGAh3z0R4+7RHcclYscUNf0dEdRJzWpXzWlXB+d/UKVqs0sx7ukrBKpFIJBKJRCKRSCQVsEDS1PXEgEFTYWLu/1JxVRWoa3vAxDIAenoeYoVfQ4sAGOjzKr+t4OyTDR+/FJia+UJT3wum5r6oV98F2gZ+MDHzFiLSkNKga9CarvWEiUVbNCQR3kDPm877QZPS+qpWCmZxqannifbpvbFgwXKsXLWOWC8WW0pM7o45c5fg+LGjSM8opDz9eSHKVu3o2G4kHvtVqYVbClaJRCKRSCQSiUTyTlCtdnPk5JUiIqar2KJFlZuqpB6JzPokVnlf1fr8W5OFdUvUrucsht3yljUsAIVFmNyoa7qRgGwpFj/iVXdZuGpo83lX4Q9vayOuqRTGq4DFfR2KgzGJ4WbOUXBoHiEWTqpHAjWrY18hWM+ePY3Q8FyxuNVP/KC48ZDhkoFT0MwpRlhbf+LmNSEFq0QikUgkEolEInkn4IWCGjcJw8jR84ToY4ugKneSn8LCma2tLDYZxRBg/t8CaRmFYj9Wnu/KqwlXvo7zmVdl9m+Xjb79J4q5r5XPv26qTLByQjlxf/nEDn/9tImAf9eq9/zyyhKJRCKRSCQSiUTyc/BqwalpfdGp81B8SkKqquZSvq/wPFcWstr6rYXF98XzbFk1NPXFqDHz0KhJaJVaV5kqEaxciDhhIeH5mDVnDRYu3iiYPXeNWOmrqlW6RCKRSCQSiUQieTdhgcVDbIePnI2k9n3wSY2m4pgqt5JfB+s1VfNXlcbFseMXIjKmi7C0VrWxscoEa7Vajpg4eSkePfpSjH0uHjAZD+n38BGzofZRY3xKBe3j6g7462dNhFu+hjODx35/VM0eH31mLzKICyMf50LK7vkcfytXqmJ/OLMZds9i+JMKdwz/ZvHM59gN+6Whoyj4ymur+iZIJBKJRCKRSCSSXw9rAS391hgxeg5y8weL/n2NOs1VWgglvx2eX/tpjWawahyMCRMXIzGlENXe0FZCVSZY2XQ/nhK7Zu0uqP3JBmpqVli9ZicGlk6FnmEb9Ow9BuMmLMQqOpac2kcUOr7G2S0es+esIbe70LnbcCEsef8gM8sAjB47DytX78CYcQugb+wDAxMfFPWbIDKWTdrFJZOQ22kwpk5fTmJ5CSZPXYZp01egjV8GuvUchcb2YaKws9g1tWyLPn3Hw84hXExIVpUOiUQikUgkEolE8uZhgxPrBXWtVsjOHYghw2bBxz9TnKtOwrVGXSehGSS/A8o71kZpGf0wYvRcePmkC132ovW1qqhSwTpuwiJs2rwPteu7omY9Z2zctJcE5kQ4usTixx//KYYIDyqdjocPv0B6ZjEsGwXhwsXrmDVntRCrly7dwPCRc4Ro3brtAFas2o74xJ5Yu75MCFfnFvG4ceMewqO6YMXKbeK8W6tkdKFrr12/ixMnL1GBHoSA4Fzcu/cIru6JQjjzXNqmzaPw6PET+LfLemNvDyQSiUQikUgkEsmvhxcOEkYu0gG8P+jA0mnI7VSKyJiuaEd9/oDgHPqW/BIBQTkICuuEhOTewpBYOmS6EKz6xm1E/qrK+6rijQvWvsUT0dw1TghKXvFLTc1QDBlev2E3hgyfhV1lR0Uk1dQs0I4y8iIJ2Oycgbh95wEiorvAwTESUbHd8ODB50KMHjt+Adeu3cGyFVufDv1V+2sjLF+5XYy9VlMzhrVtCO7df4ztOw4Jkcxza23tw3Dl6m34+GeItzKq0iGRSCQSiUQikUjePnhhILYMmlu3E6vZpqYVie1vcki8soCVvBzOpyzSWLEJPdCiVRK09FqLaZo8XVJVflclb41gLb9ym8RnFAlKMypcg7B5y37MmLUKS5Ztxp8+aizmsLIV9MKFa+jdZywePvoCixZvwuKlmzF33lpMnrJUCNfL5bdwn8Qoh8Nh80RhFq5r1pVhyrTlYnViu6YRJHgfYigJ4k4FQ3Dp8g2xRPPpM5fRRgpWiUQikUgkEonknYQFFusMNlrxYkySXw+v58OajbXT2zQXuMoEa7VazTF1+gqU7T76VLDuKjsizPa8+ezde4+F6d6+WSROnLqIAYOmIjQiHzdu3UNQaJ5YSnnu/HXCKiqE68XrYh6qnlEbZGSXICm1UAjRW7cfIiyyM9Zv3CNEK4fNY7G3bDuI2XPXKob/OkXj4YMvhDhlf8+cvSLEcfmVm/AL4CHBUrBKJBKJRCKRSCQSyZumygQrr9bbo9dojJ+wSCx0VJuUOy+yxHNVm7vE4vMvvsKhw2ewd98JsUgSm6Gr13YUY9FPnb6MPfuOC7Hq5BonrKSBJGL3HziFPXuP48jRs2K8Nc955UWb2GLLCzBt3LwX4VGdxf5MvG9QYd/x4s0Bu9tMYnbRkk3YQMKWxSr7u3zlNrRolSjEtKp0SCQSiUQikUgkEomk6qgSwaqEV+Nlsar8z78/rdlUTIa+f/9zePtmQMfAS4yXVm5Tw79NzNvCoXmUcK/cC0gsW03nmzSLEH6xFZXdK1YLc1eI4vou0NT1fBoWL8/M1yrdaVZsX8PX8vm3zfwtkUgkEolEIpFIJB8yVSpYWSgylf/Xqu8sJvYuXb5VLLrEQpSXp658HQtNhZh8fkNg/s/HeXUw5bEX/Vf+r/xb+Z8FL1PZjfK8RCKRSCQSiUQikUjeLFUqWH8OFp416zpJ66ZEIpFIJBKJRCKRSJ7yVghWRlo3JRKJRCKRSCQSiURSmbdGsEokEolEIpFIJBKJRFIZKVglEolEIpFIJBKJRPJWIgWrRCKRSCQSiUQikUjeSqRglUgkEolEIpFIJBLJW4kUrJJ3Gl6sS12rJdQ1JR8EdK8bVtECbbJsfWDwvZZlS/I6qMKyxfWjLFsfGHS/G2pXRflSbAMpy9cHRFXWXb+AFKySdxJlBa2p5w0dI3/oGQdI3nN0CR1DX2jqtn6tlaiibLWCln4b6Mqy9cHA9QjXJ8oO/4vl4lWgLLeael5UlmXZ+lDQNWoLbapPlGXgdYgLpZDQ0PGEjoGvqC9VxUXyfqFrTGWL7jffd2X9oqp8/DGUdaIHlWMfUZ5VxUXy/qFj6FfR51K8rFBdPqoGKVgl7xiKh4YraCPLCJg1ToCFXRIsmiRL3nfskmFumwizRvEwNA8VnX5FI6qqnPx2FJWxu2iMTayjKCxZtj4o6F5zfcL1CtcvyvKgqqz8dhQdPm2DNjCyCBfhmMuy9eFQUXeZWEcLIcll4tXWXS1Fp9LALBimjeIoLCpbFKbKuEjeLyrKlqlNHPRNg6FR8UJXVTn5PSj88iDx0g4mNjEiLFm2Phy4nTJrTH0uizBo6Xu/0rL1W5GCVfIOoehA6lOjLDp7oqJOEhWo5AOioqPPlShbqV5FBcriREPHQ4gJ0RjLsvWBUlGvUBnjekZZ56gqM7+einrLJFCEofT/p2FL3m8qRCRhZBVJwoItYn/8hQjXf/yChV/kWXInU5atDxLly1XTRrFUHnxeUbvIL0K8YGIVVVF2uWzJ8vXBwWWL2y3bBPHi4lXUW78HKVgl7wgKy6qBeajirY+sND94lA0oW0T/SOOsFKvGolFOURmW5END0fnj+kbROP/+BprLJlu+ZL0lUcL1jIl1TMUwzj9WtnjInsJPLl+qw5N8OCiFxR8VrVwu2WrPAliWLYmgQrjqmQT+obL1e5GCVfJOwA+Hnkk7WXFKnkPxxjdBzDf9vRUoN8yGFvwiRIpVyfMoGmd+o/x7y1ZLMcdM1luSF+EyYWQZTuXk9wlWLltaet5ipIm0qkoqw+XBrFFcxfDg31O+FNcYW0VWvGhTHY7kQ4TrmiTxouz3tou/FylYJW89XOFyxWvWOE42zJKfwA0qzzv8PQ0zV7j8Jtrcjv2SZUvyPKLjR/XO7xm+KeotHc8KC4UsW5KfwuXi93b8uHzxvDI5KkSiCn4Ba2AWIlZ6VVV+XoZ40WYUQGVLilXJT+FywfPxRXn5Hf2u30uVC9Z6Dd3wSfWm+OunTQTVajv+5o6A5MOCK09pXZX8Er/LykruFZ0+WbYkquGy8XusrIpOn7SuSn4eLhu/52Ubu+dF58TiXfJFm0QlSTBtFP+750orpsjIukuimj/ysu33UmWCVUOnFWrVc4GuoTf69JuAhYs3YuGijYhL7IWadZ2EkFV1nUTCw1O4UZeVp+Tn+F2ighpxbsxNbaQFTPLzKEXFbx66SeXL0Fy+DJG8BLbgN4p7um2EynKkAvEyxJgtYLLekvw8v0dUcDlUDDWXL0MkPw+3a8KC/ztehvxeqkyw1mngCjOrAOw/eAoHCBatw0fOwe3bDzBh0mLUqu8iIvPRZ/b4qJq9+F29dnN8VrMZGmjy3mIe4j+LXv5dg0SucEtUq8VW2lbiW3k9f7Obz+gYh83XKOPCfr54TPI240GiIkY2zpKfhStP3urmtzbMbKXgObCq/JRIGK53uP7hekhVOXoZvD2SrLckv8RvHR3CwzyfLeSl2k+JhMuHeJH7G4YFcznUNvSV9ZbkpXCfy9jq903F+r1UiWBlMclic978dSjbcwy1SZz++WM7qP3FBm6tknDv/mOkpPVF3/4TMX3mCowdvwCz565Bfueh6NJtOEws/FGzrjMys0sQFJonIu3fLguLl2zCqtU7kNK+CDXqOKG4ZBJmzVmNMePmYy6F1SGrBJ0KhqJV61QRZgNNxWqgBV2HwcOrvTimKr6Stwl+GEiwynlgkpcgBKtF2G/r9FW8SVbln+TnMbWJhzFh1lj1+fcNIVip/lEI1t/WOPO+hbLekrwMLh/a+r9tRVeFYA2RglXyUrh86JsG/WbBylZZOTJE8jIUgjVK9KNUlaPXQZUI1rrqLWBm1Q7Xrt8lYVokLKA8RJgTyvNY58xbi/Ub9yAhuTe2bT+IL778Gj16jRbcun0ftvZh+MsndthNYnfAoKlo3SYNl8tvoh8JXBa0Fy9eR1bHAYiK7ozVa3fi229/wKDSaQin/5cu30Bah35QUzOnxCrCvXDxGgnZISLxquIreZt4/wWr6BBbRqOhQagC/YpvQtechAGv9qc89xxhMGqUAEu7ROibhEPTOJr8q5RHjeOhbUjuDMNhzOEoj7+HSMH6M1DZMrOJhSaVF30rXk1UcZy/9U2pzJhEi0WF+HzlsqVtSscr+cNlx9AiksohlaVGSbCyT4S2cTi0TKJg+p4L1w9CsFIcLWzioPVCOeA6xoDqGGW5kbx63nvBynWQVQw0KrVrTzGKeO/bpjfJhyhYua4yMouAhkkkzLheqziubRQGPfOKfqSyTBpSH4rar6oof6IdofZAg/pjRjaKeKpy967w3gpWtmTaOoTj+o17CIssEEN3ledYiI4cPRe7dx8jUWmC7JyBYtiwmpolGjcJw+PHT+Dlk07/jbB23S4U9h0nBO7mLfth7xgp/J0xaxVOnrokrgmNyMfpM+WoTmFUr9McJ05ewNFj58Q1bKHV0vPEocOnRTi8+FPleEreRt5/wWpoHgm3tMnYvvskduw6jrXr92PLjuPYRf8H9eyKxp6dMXcNHdt1Erv3nkYZs/MY1q7cjLAWaWhAojZ71CbMHTcB1jaRMGEBQfmlY9kehVN2YPWCNWhjmyA6nqrCfx+QglU1RhZRcAkZgpXr9yLWpwN0LeLoeAJ0TGKQ3HMlFs2aA0fXPpi+lMvcKVG+du04hMKORTA0jYSpLTf4CSROI+DSbiBmLT+CMxfv4vr1O9i/+yB65BbD1DL2vRatoqPxngtWM8toGHt3x5gV+7Fp1wlFPbPnFMp2H0aH1tnQpXus6jrJH4fLx/ssWI2pfbOLHYJF6w9g225FHcNt2M7tR7By5gp4v+dt05vkgxOsjROgZxGL8KIlWDhqDhzMomHYKB4mdikYM3sreuSXQIeOGVO7aB85DAsXb0F48xTo28Sr9u8VYkx1rGObIViweD3aeSVA3+rdLvPvrWDlOahsZd134CRGjZkHtT/boFY9ZzGXtJ6GG06dvoyBg6ZC7U9W6N5zFA4fOSsWYeJ5phMnL8aFi9cxf+F6PHr0JQq6DhdDgc+euyKG/S5ZugVzSYyWDJwihh0npRTi3Pmr0DXworDdhWDlBZ4ysopJyF7GiJFzsKvsiLDISsH6LvD+C1YhKuJHY8GyHVi57SQ9jMCJQ8cwf+lOdM3oCNeYYeLYPnoGigbMwYABMzFk5VE68m/08s3EJ4ZxmHr2B/xYvh2NrINh3CiRGpxQ+GQvFNfhm/uIs42HdhVUym8KKVhVY2pNDbZTV5z8Gji5Yh70DEKpkYmGrkNnnKFjB+ZNhI3jePyTiknZhqXo1m8OFm2/gH/941uUpPWALjXuukYR8O4wF4///h/cL7+I0UPmoFvvWVi06Tz+8+8fMaPvUOgZRz5nkX2f+CAEq2k49KkDd4/KwRlqX7meGTRsAQYNnYOgFunQMY2gDlacsEywe7YOGFvFQN8iRljoDejb0DIGOiaRosyYvCBAeJSInmnks/MVLzjYsmFsEV3hNx0j/81syK15NEz5WuqA6tNvE6rThBWE3JhYxVKnlMLl/4IEGJpHCb8ZI+v4KrGYvCred8FqaBgC56Ll3BJh/fglKCqdh+KSmZi66yq1TZ8jwe5Z22RK9163opzomXPZUvjB5Y0Xx9Mzi3qKrmkUDCqVSS4rBspyQH4YsZ90nbjW+tm1uoSBZexz9ZVppfKpQ+e5/D4tQ43jhb98neL6SuXxLedDFKwaxtHouuk6/u/cKbgahEGXypSxXSqufvMvrJk1HQ30w2FoHArnzkvxf//9J7q4tYcml6OK6/WfK0PP6jEzEr7K8qP81idxbMaj2qj8iHrqJdZaXcNgOAXOxX/+8zVSAiLRwPjdfgn43gpWhueYRkR3ERZTHurbqEkomrvGYvnKbcI6amzmh798bCssqGfPXhHzTVmwstANj+yMrJyBuHLlFgqLxqFT56E4d+4qnFzj0MguVIjV5i5x4vr0zGJcv3FXCFYe/nu5/AZyOpWiZu1m2LBpLzZs3IMjR88iN3+wHBL8TvD+C1ZucLlBVddpBwvPnnj0w4/ISu6G6g0DoaEXCo/E0fj7//6Lfu064tMGbVG/fhtox47B/R++R0+fTHxmFIexBz/H4xMbSLCGiMZVzzEf+29+g3tff4Pvr15FDHUKdKRgfY4PQbAyPCw8omgj8K8nSPBJRG3NIIT0WI3//vglIlpGwMJ1Kr79x/fo0SEWf6ntj48bxGD+vr/h5oEF0Dfwh4VbEa59C5zesgKWVuFooBcCdf0QNKRyF5Y6AlGhOTCyep/L1gcgWM0iYBA+BNf+8z+M9c+G2qeeqKnRju51KPSpc94qsAc83DJgViEsTa3jYOfaEW3adUEjx0y4eeahuUdnxKQOQlhYN5hbUmeO3HLajfm3dTLaxQ5AYtpgREb2gJl5JImNeCFKm/t0gadHNsypfuJtOKxcstCmbRc0tqPOon0KWtNvh+Z0D6gzaGIdA0vnbHj75sOa/rMQ1jKJhmvb3kggv+OT+6NpMyrzZu/O3GGO53stWI1IHPRegr9//w3SGkfjU60g1KzbBk7dV+L7+/cRR22TLglEIy4TtmkIjh+IhPalaBeQR2IrQogGMzpv69wR/qGFCI4sQggRFN4brVplwYLOsZjVNomFR3CRKAdxif1gZxsHHXMSFCRCGrnlwD+sD8Li+iMyth9dl06Cg1+yKV6QmDZJQwiFy+UzKroXLK1J1LJYoedexzIe7gG9EEHXRsQWIyCoK5o4sshVnd63iQ9RsPI0l04rzuObQ4fgYhgOvQrBevLO11g0aTLUDSJgaBIGp9wF+Oarr5DXoj20qK7iqTM6ZrHwrFSGmjSJg25FGbJuloY2Qb0V5S+Kyl9EIbx9cmHZmOrE5hnwDugKe/tkqqeef1nHI5T0TSJEHZjWYxO+/+4JSrsWwpzqMh3T6GcvXN4x3mvByg09D9ONju0mhugybFlds24XGtuHoToJWiY1vQjzFqwXgpUzgr/ZEqv2J2uMHjsfOXkkPus6CUvtkaPnsP/ASaxZuxNNmkbgE0pMSHg+lq/YBh19xTLxCxZuwMpVO7Bs+VYxT9a9dQpmzFyJ6LhuqFaruYp4St4uPgDBWoEhdRrt2/bD53//J/Iz+pAgoAbcJBytEkbhBxKsQ2K6QYsqOBOqbK07TMHDH75Dj58I1mDU041Azzln8I/bp5E9Ywv+dvcuYqVg/QkfimA144axSQ723/sX9syZREIkBuvO/g2n1y6BtrYf7D2nC8HaKzMBnzYIhY1HH+wu/x7b505E/YZ+SBy7D/j+IUJdSLSZVnorTA0zWyUUwuT5MN8nuN75MATrYJT/639Y13cCfIN7wa9tHoyorqmnH4MBSy7+P3tfAVbV8r19/9+vbtoKSHcIJnZ3IN2lkoqIid1id3d3d2F3BzYSgpQ0iIJ57/vNmsNWxKNevXIvHGY/z/ucc/bEnr33OmvmnbVmDRKvnUBNYztGINygpOeOuYce4d6RbWjSei4eJmQh9nEa4h6lIPvpc1zcfxBNa5PVihGO+v2w9mg00lPTceNGFFLTc3Bm2zaYV3dAWUNPTLkch1vrtsBAww7qOrZoOHQzkhPj4czKGzQbgMiEWAT7eUNJyxFVDXyx8sxjZIZdRXNDR1RixDRoViiS05/iwe1IRCVlIeHBbbh37MEGmi5y77W4odQQ1ufZ6N3Eh5MDDR07tB29F88T4jlhraJnD5M2g7HraiKy0tJx7348srKeYtPiFTA2ckIVDUd0GXAQubl5eByTiKjoJ8h8/grXV2yCiZoVqhh3w/BlF5CWno27NyPwOPkpYq9cgHWrriivagPbOUeRl/MMNy/dw3VWd3x8PKYODoEmrWs0D8Kq0AjEP07CtWsReJKajTM7t6GWsQNUDX0wdt1lJKdl4u6tcFy5EY3nzxLRx8eLEaN8q1wxhiCsf5KwMhlTNeiGMcvOI0OSoZSneHz9Aqxad0VFNRu0dZ+ClOcvkRiXxOQvCckZL5AQdhz1jdrDwHsJHqelIahNd1Q1/NBySn1kI5c5OBeeioyMZ8jLe4HszKeIu3sNLjY9ZZNrBfKXFCg4YZXh57J1UVGpKWrXdUK1GjZ86xna0kbaYobSylVu9FE5AllbKZ1A62ApkBOtcyUCS2lUB7kfk2VWKiPbvqY5lNVacjfkspUavqunYN0CxRWlh7DSDHNtCxlh7dt9OJR0nL6asOprtkFN6znI+R2Y6t8XDcbuwesnCYKwykFpIazkMllV0w7OIceQlxqF3gNWICP3Gfo5B6CCuhXqtFiI5OdvERMZjvOXI8D6YfyRHosOjbrgFxVrLAu9i6hLp6GtYy9z0yxlKDWE1XY8buYCrxkpyM7KxbPspzi1cxfqmFjB3G0ZXvzxCv3dA1FJwwYGLcYi/uUfmB88GNWbLkPeyzwsHDEJRtW6oo37DETlvEXoisX4TckWU7bdQ+bDq2hX3xW/VOwEk3bjcD3lFXbMnIOfVR0x824qHm7YgqrlO7D+uj1qDNqMnOw0uBFhbR6MpOxkDA3wwn8r2qD7jONssALk3LyCBuqWaOa/npGYZxjlMwhlq3RERcOuWHg4HMl3zqF2DacPXPqKK0o9YTVzQVkjL6y5nIrUG1fQqbk3G+S7wK7PajxjA9Ml48bi54pW8B99AVnxN2HT3guGjYKw+FoK4nfuhVbZ9nAesRcvcp8gyLknylTqCBXTAKy/kITwU4ehoWwBxzWXkPPgFmpX6YAfNZwwePFd/P7kPlqx8aNaNR9Yu4xG3TruKKPUCTUspiAp9zWm9ewLHZuFePbmFab6DUZlDUvo1A9CfFYyhvfyYf2zIKzFDt9IWMuq2cJz+D68fP4EgSRDFTugqmkPbDmXhIjTB6Gj1gntvefh6dMY+Hn4sefaHSPm3MPzxCtoaNQOBv4rkJ73DIGNu+I3VRse84HW0tK6VcPWY3E/8w0u7V4Px65rkJgUg8CuA7EmNBEvku6gRSP2fyiBHkqlgrASiFSWrdiIk8nCN0u/P/UACqcR8SxcB22h8+FvmZVWsthK5yiflEegOIPemSCsf4qwXtkJNW1HrL+WhbiLR6BZqR1azwgVhPUTID1QOggrWVmdoVqnLw7fy2aE5CVunzgAQ32KmmjPCOtipLNz29cshXfgHITMP4TElCzsXbYcSkoWWHHkHu6fOwFNRlgVdZ3q51BqCKudzMK6Y/gctGzXF3a9luHhC+Do0gUop+qO3Xee4sqWNShfri08Qo7iZUYsWte2hnnn9UiPfAxnY0dUMnRGBeVO6DL1FNJuX0PdxgNxPft3nFq1Bk4e4+EfOB2ObuOwNDQJbx5dgqGxLUIuJSDh7AV095oIL5+JGLT+PJ6lJsK5loywxmckorebI6o7LMPjlFRsvRaBxOvXYK5mhzlHo5F87xa6uI+FT88Z6NZ1DHpM3ceGM79jgHUvqOgXfytraSesDkwHVbeaiZzXz9Hf1R/l1BzY/80N5VRsMHx7OJ5cPAudChbwGnUeadHnUd+0E/6n7oJJ5+LxeOtOqKo4YVVYJhIunISn22j4BM6AJ5OD4NkXgLdZcGlqiw7zTyM3PhbDekyGZ8+Z2H4qDld2b4eZgR1UdF1g5bsERy6E4+KF2zh2/AoSM3OxetZcaHScjqw3v2Px8Emo2zQQtj6z8CTrCYYEeAvCWhzxLYS1YRf8qO+NDTey8PjSSbh7jIEvkyEPz7EYOvc8I0cpcGjZGU3d5yEj4wEs21jhf+Vs0WPkDTyNv8wJq77PYiS8eo2Lh85j89ZjmDFlKTq192PPsjN6zDmOvLQY1DHoiBrtlyEzMxGurSxRucEYxL/+AwsDR0OFjdvk3k8xRqkhrAICfx6CsP5Zwhp1ajM8hm3G76+fwtvKB2WUOqPjrCOCsH4CpYmwEmg9tOeYQ0zZA+MDBqCKthO0jRhhfecS7I7/VbJGmcoWsBp4GH88T4JVXRt0m8c67czHaF3XCcoGHw7SNJnM0jocHniiwHlFQqkhrLSG9TUbnDsNQFkVS/xcyRLdp9/C6/TLqGnYBjbDDuB5WiTq1e6K9dczcWnDWlSp0h5NbDYgPToe3Wp78uA5ajq2aOe/D5lht+HQeSRu5/6O8FuRuHz1IW7cjMD16w9x/vxtHNi0Fno1HDDqdCzy0jNw/Uo4rl59gDtxGXiVHAvHmq6csMYkPULwoGE4EZWDjRMmwWL2UWTeD0NdNTdsPBWP9OQ4nL/8gNdNuHjpLs6euQyfNiUjunFpJ6x2+nZo4rwJr14mwdXGGcr6Mqu4sqYd3CZdQM616zAv34n1bWeQ/vgSmtZhOkrXE1PPJyB2y05Wvxt2RWUh6VE8Llx6LweXLtzBuRPH0b6JHTrMPo63ebm4w+Tr0tUIJGe/wNE1K6GhYYUOPTYiOycX6xauhqfXBHgPWoHrKXnYtHg5yjAy3HvCPoTHZuL1ixeIfBiP3JcpGODnJQhrccS3ENZ6nvixZgC2RuYgNTIWlwrI0AUmQ2dPHEbrplZo7jIbGZkPYd/Jno2tnNBr7M0PCevr17gUeh4bt57AqTvJeBoXjg61bDBi+Wkkhl9n/3ELpitXMtKbCB8LR/y3ehBOpr7CoeCp7Hk7lLjJYEFYBQQ+giCsf4awzjgVh5SH9xCb9QwH5s+FioYt1NhAoYMgrJ9EaSGs9L/RNXbBL5UtEbz8Gp5G30R9U0ZQqnl8QFgH+7vjvxWtULZKZ9gMDgXykuHUyB7azccg4Q1wavMqNji0Zh2+Hd+/rpI6Gwh6z8DIgRNhYuqisFvblDbCusCuL36q2BG/KjtgwpZHyH54BrWNO0Gl7iBci03Hto3HEJOSgQGugSinZoWmRFij4uBs5IBf1W3wq5IdRu+8j/jLx6BlGojTcXlYNzIE//2tDcood0Y5VTuYmXtD18AJFY27YsatJ7i/fjPUK1ugonIn1Bq0CZnpyXDla1j74d7jZEQnJeLm8WPQUG0P22XnkX3/NiOslhi+7RZirh6FmnJb/MLklgJF6dTwhpGZOyhKbImI5FrKCasTkxudNkzHvPwdc4NH4rcqFoys2qCMlitWXElG1LFDqPRre/jPvoVnkZfQsBojrHoywvp42y5UrWSHmScScWffdlQu35rJH8mBJYxqecGomiuUmL5yWXMRmXduwLRcG/zwSyuYu87Bszd5sO7UA/13RyHhXCgq/9YMP1bogB8qWmLW1QTsWbUW5VU6sWt5YdvNDNw9sQ9trYYhJi0JQ3sKl+BiCYmwbr+LzDNnYMreZxl1a1TSccaVmAysmjkL/y3fEeUrt4eJ9wpkEmFt1A0/q7tjcWgcHuzfDCUuQxZcVxnX6QpDpvsrqVrDss8evH4eBZs2jLAqf0hYDfyWIzknC91qOOKHH5ujYvVeiM97i2nB/dGizza8fZkFh8ZOMG6+AOnp8bBr3BHGdvPwHG8x0msAb7Pc+ynGEIRVQOAjlCLCygaNdSzH4AX7Ow4MHMktYJqsY2/ZdTY7A8x0H8QVm66OLUwClnFlN6JDD76tzcyzSTzP8wdX0bimA9SN3aGuZYNOC0+zkxnwZIRVbGvzIUoLYdUxdkXdFkHoN2kHMpiMrBodwgaEshldbSM7mLdajtfs/IHNK9Cj/0Is3HAezxlxObNlEwz0HKGs7QDnYTvw4u0fuH3uHAYGz4Zv4BzMW38eea/f4vS6NTCiQacgrB+hxBBWPXto5m9rc3npNvgFzsK8DRfw+s1LTB8wClW1HFFFywlDll0kNYPHF06glrE9qurZoXGnNch5+RqHVm1EF6/xmLT8NPKe5mC03wCUU7KGx+gDeP7iOZZNXwJ3r4mYuPIMUh5Ho1tnb/yk6455kU+RsHsP9NVsoappjcZjd+P3VznwZIRVr2kfpNIFM9hAsZk7IzNWcN90A3/ER6K5ljX0OoTgYXoeLuw9AB927V4j1uFOXCZWjptaYrZaUnjCyvqhhqO2s5f4GgOa+vAtRNQZiW0/4TDwNB1dqrviV21nDFl6Fa9fpGPG6Hlw7jIe87bfwJvcp+jjEACDjpMQ/vx37J27CGoadqho6Ik5YRnIPHAI+hXao67TPCQ8e4HQTdvQzTsEvSfsxKMnqZg2YDjKMQLssvYKu1YaJvWfi+69Z2PBzhvIy05A28YeaN1jC7KePcfKWUuZfE7CqJmHkMdau235SvxS1QlzDj5CXuJ9NKhuB+0G/ZD5Khuje/vwKOny7rc4oTQSVpro77srHEiKw1j2roMGLUC/oUuR+vIP3DhzEt2D5qBv31kYu5HJxOtc9G3sjQqaNmjsPBeJz5geW78VXb3Ho+/EHYhJTsGE3sHQqNkfpyLzcP/wLhgb2KOSmhPrTx8A2bfQyKgN9LuvYOMxYOuUlUx3zsQMpuNe56aju70PKhp3x44byciOvoe5808jJS0ZS+ZtxM0nb/Dw2AHUNHWEdqFtwEoCBGEVEPgIpYewkhWseqsB2HbgAlwc+/Eol7RHa33LUdh79DJ6WATxhfx67Jyx/XhsOXAGHs18UUHfHT1mHMSR49fQp1swVBjRpfq09B3RtO9yHNweio41FHtzdkFYPw3aGqKd22Scv3wPW5evkgWjyd+SQdfECdUbhmDT/ms4ff4uLrI8Fy/fwRI2eDNjA0mtah4wNHNHVV0ntHefje0n7iEmMQtZmVm4fe02Jg6bCgNDF773b+HrKgpKBWE1coZ2u8FYfOAqTp6/jfMXmRycu4qR/UOgRXuimjF9omONms7z+J69K8aFcNc6TTZ4a2yxGskZz9lg8BZu3X+Em1euYKDPMGgwwkjb1KgZusF71FZcCXuEiOh43L11ByHDJ8GAPRtlE08ELj+KVWPnwYDJGOksc5+52LXrKDrWcod+g57YfPAiBvsN5hMntGVX++HrsWvNDjQ0YeXZNZrbTcGOUw/wIDIeD+/HYOuydWjZyBPaJiVD3yk6YdVh77S21yy+raBzAy+oV3OHNnuPjf0WYe/Ww7xvUjd2hoahN4bMDEV41BOkpGTg3uXrGOAdzK1brqN349CmHahbwxlaJu5QNfZEzwWh2DB+IUx0HVCVdJz3XBw6F4VwJgcPHkRhxcLlqFPPkwfAadV/JY6cuIGzF+7iPMPZExfQt9tA6Bg4oqqhO9yHbsK5sEjcfxCD46HnsHb9CQzoPRam7UZi//HLCHAMQBUNe5g26Y0Nu46gi7MX65+L/wRwaSSsaqw/shuyEUdO3sS5i7L3fe7CHRxj46MTp8P4b37u3C0c2RUKu7rdoEFLGfSc0LrbPBw+H4mHUYm4fz8Ky+atQrVqzmjptgTHDx5Hh2aeUDei6OeucPLfit1bNqKOiSX0bVgfyuo/w65DdV84exVDA8cw+XJh4xKmB+sHYsqK47gb+QSv375FzINIrF6wBvVquvHtveTeSzGHIKwCAh+h9BBWvmk+G+CpaNvLNr+nrUJosFzNjZ/j5CH/nIGJK6pSPkZCjdg5Gugpa9kzZe36bl8vPtBmA1Fl1mHr0u+C11IwCML6aZAc6DJ5IRlSYbKgw2TmvSwwmTOTyZIypUufLB9FWH23XQ0bCBDxVdJ1RLUGPdCoeQ9ok/WVZIulKbZsKT5h5TrD1A2qheSgKhvEEVmlvQQp0rTH2EN4/TwZds3YAM/InRPWprYbkUEuwWzwol6zCyNSrDxf10zPjtVtxgiGjj3UDT1Qs4EvdI0cmXw5Mrnz5LpLk8lVVdqChrWBnpW+sQuXP9JZJHckm7QXopSua+gEFSaHekx2qX5aR63M2mlSzxfVajD9yfTgO11Z8B6LKeieFJmw0nvj75S9R20uS/n/qQLvmb932lOXvTuD2r5o0ioQeqxPk+SIZFODvWNJJ1EdWgXlhv3W0Ge/dV1gVt8XxtVl+k6H5yeZYf0g+63C5JBA31X1XaBPZZl8qrFztGerWV1GqFm91JdqGLExB5N7kl3qV6kekmUiwNom1OZC91kMUeoIKwO9Fx2mIwq+b+mdf3COfrN3SZ5BXCZpv1T27lX1ZDJkVN2F56f+Ur+6O0uT7R1NckDX0Gb6TkXHiaUxuaB9gAvUT59V3+lAWf9bXqkj6lsvR1Z2MrwsnPCbii2ffCkpeqowBGEVEPgIpYiwCnwzBGH9m8AIBLkYa7LBXOEN0hUVpHcUnrB+DqbuUDbtgj5rLuDpi9fYu3AhNNhAj4gsEdZmtpuQE/8EXrU9UMXw02uZ9dlgX8fEjT3LIpAbkktWt04JXPZA8qHQhPUrocveo6YRydF7OdFn3wkF88kD5SE50GVEVV765yCVpYkUeel/B/7sff5ZlEbC+lchV4a+w3vR1HdAU7u1eJaTDB8bd6iUAAv95yAIq4DARxCEVeDLEIRVoKhQ6gkrG6hpmnWBVcAseHsPhxF7FmR1oDTy/jBrGAz/HpPRoKYndL7jYLu0QJEJK1mPNA0coKSdb4mSk6ekgt6bjhEbsGvY8SUWkqWMPsliS1Z/HRNnlm7zHpp20JRjVaP9Oik4lKqeI1R12fPStIfWd3AVFYS1+IB0ZfVG/dG91xQ0asje+TdMqhQnCMIqIPARBGEV+DIEYRUoKpR6wsrAXTD1aQsjJ+gWdilnz4afz89XuKzA56G4hNWD6WR3dHSZjr69x8DYTLEiiesYu6CpwwSMGT0Pdc1doV1Ndl7T0BV2/rPRr8d4NGs5DMPGrsLU2Vsxa+5WhIxegKYNPfh2S/TeJZdjil0xdPJ2bNt3Abt3HcfkUfPQkJEaWo/J3fULXfvPQhDW4gWuK3UdmQ4t+bpSEFYBgY8gCKvAlyEIq0BRQRBWgaLEP0lYJfdHHdqrkj5N3Nm5Qmk8nZ3/VNn89IJpMrijkooTxq2IRlbkEZgYWb4jdQSK16BbqJwe+00TIjy9QP3SOZ6Hyn3gVu7B65Gttf6wDoIuuzfpOh+0maHwPb0Dy0fl3l2flS+cV8vAAfUd5+IVGz4vHDIClbUcoccG8Fp1g/HgGXBw7lw4+u9jqcD505ex8+AVxGa8RMz1s2jLCC5ZWtW0HdHedxkiUl8gJ/kJDuw6jW17LyI27TnSYh7C16on1Gn9dqFr/1kIwipQVBCEVUDgIwjCKvBlCMIqUFQQhFWgKPFPEla6tkkdb74vrlldH1Sv6w3jmhQkxgWq+s4wq+8P88bdUaNOF+6uqkukkP4PJmRVp3Q/1GnkD9OaHqhKlqN80kiWQ3VdO1RQc8OEFeGIvx2KOtVtoaTtwK1L0rWNa8naTy6ynBiadYUJO6dXzZVHya/ewJ/Xb8h+U4R8sjYasXumNkr3oMOtlV15AC8ilUa1urE8snRNQ2cY1PZBvSb+0C9QJ91TzbrdoE6eAfltlurjoOdS2wvV6/miZn1fmNTw4JYxvQ/yuaOKlgsm74rG08grqGHqgMrqNnAYcQi/5yWjbW0H2PY6jLev0tCsgTP+W6EjDFuNQHzuW6yeOB7llS1RvcNEJOQB1w7sRv3abqisasWemTVMmgdj+pI9cLfuCU2jb98+RxBWgaKCIKwCAh9BEFaBL0MQVoGiAh+gC8IqUEQg+fgnCKuajh1c+ixGxKNkREbEIyIyEY8iHyDAsysq6nRFyKqzeJyUjsioRCTGPsa04ZPYNWldpgvUavpi9KoLiE/KQExsCh5HRGJ0/7HQJlJnxsgrI4JtuszHiSsxePrsFV69yENcVCRmjprKSKQT1LTt0WHUVhwLPQFjM1dWrz30GwXj8JVHWDlhNNTNvDF96zXExqcypOPuxYtw6uiDctou6L/2AkIXrYERI79VGSluYD8D1+9EI9jXBz8b+2LRuXCsGzoNlSp2QB3b6bgVnYr5oyZDzdQLUzZcxqO4VDyMSETC4zjMHzmdR5Qt6Kqsq+cAU88ZuMjy3LsdhVv3HuP+7XsYP3AsdA1d3lmgCdqs3WYW05Hx5ndMDQzGjxoe2Beeg6vb16ICI6hu/Y8ywpqKpvWd8WOFDtBuMBCRmS+xanII/lvJDiO3ROKPJ3fRpLo9qui5vKuX1rRSNGJ5612/BoKwChQVBGEVEPgIgrAKfBmCsAoUFQRhFShK/FOEVVnDGoGTduH3Fxno338KunWfCr+eE1Grniv6L7uE56kJ6OMzBDUadId/yB5kv8xFSEAwflNxwvD1t/E6IwkjA8aiaet+GL70NN7gBUJ6DEV5FWs07bIUqa/e4PDqTViy9QGiw05j5OQ9ePYajKxNRoUqHWA9/yTiYsJhbOKA8ppumLEvnA1EgQMLJ6KqmR8mLd0Hvy5DULvVYOx59AyR+/egchUbjDsdh8cH9sNAqRNUagbhUORzXm58H2/8y8gf+zNf4diY6TBpOgoP0t/g+IaNMNR3gJZ5IIZMWAdnm17QNfGAw4CtePbqGfq7BqGqfgGyyIh8zT6r8extHkY6BsOseS8EzzqH33PT4NuhK9+39f1zdEdlTVfM3heLhEtH0NlrEavzOQJt/fAba6tbn4P4/e0L7Nx2GCs3HsODxFwk3b6Cpmb2qGTmg9D4XJxdtgJqatafdk/+CxCEVaCoIAirgMBHEIRV4MsQhFWgqCAIq0BR4p8irCqaNug5YSeyU2JQo7oDKmvYQ4mRWP2GIxHz7A3WTprK5LcrzBv7M/nvhhWn4hBx5gB0mw/G49y3mNZvKMooWUFD3xFlVO0x81Asnlw+Bm1NW6y4nIKo0/tQ7rd2GDD7DmKv70aVcq3Qe+FVvE6JQkNdK7SfcQRR4bdRVa0zPEcfREpMFmIf5WD/iulQ07aBirYjjGr7wLzDUGwOS8S5DZtQSdkWo49G4+GOnVAq3xkTtt1EekwK0jJTMb6vL/7NCOuWmHRc2n4KV+6nsrpWQkvbju/Lq6FnD9PWQzFl4X4sW7EHM+fsQ1RKHnYuGAtldi3puXDCGrQSac+zMci6L/RqesI9eC+SYx/Bo01XqBp9uO5WS88Oda3nID7zGaKSs3Hr0F7o69hCSdMBrr0ZYf39BQ7sO4EVa4/jwp0kZCfFws+2F5RNvHEz+RnWTVuEymr2H9T5vSAIq0BRodQQ1vJVGqNsxYYcFZXk/5Ho/G8VGqBcpUZQUv04/WtQSbkZKlRp8u5TXh6B4gpBWAW+DEFYBYoKgrAKFCX+acL6NDUWDRt48G1UtAztUa/tEqTlvcXjRzEIj0hEVFQiIh7GITouBUd37UFL5/F48TIHdtY9oMLdWD2grG4Pj8Hn8DTxCprUd8BVRj5Xz5qLH36xxujF9/D45gEYarSCWc81eJaRBR8TR7SaEYo7N67A3HY64p9nYqTXFGw/nokT62dAVdsS6gb9sG5vJOJSnrEB6htM7jsEP1Z1wLhj0bixahOcfbcgPSsWvq4z8DAxC1MG+DHC6oc1DzJZfnb8kYf+Dj1RjpFpLUMnNPKYj8jUl7h28iwjq9uwbP1xPHn2EjuXfUxYzQKWIPn33xmJTsKD8HjkvPoDD0/sRw1jh3dbOr2HO5S0XBCyXWYhHu7TH1V0nFBVywHukktwA3IJtoCSvjeWHUthxP4gj7q95lY2Hh3aDm0NK+gUcDUmaBk4Q5O9E+ESLFAcofCElW7sp9/qQkuvPeo1coN5fRdGIpvi13L1ocTSlVRbcIJKjSJy2aK1Nxo382Tk9dtJJl1TU7cdBxFkPSOmNNh15OUVKI4QhFXgyxCEVaCoIAirQFGiOBFW2lfUtMVYxD19jmkDh0DLxBO1GvrBrL4vqjfwhaGJC2pYjUfK6z8wtlswylS1gZaRM35TscOoLRHIuHkGhrp22HwrAzf2bsGP/2uHQXPv4vGNvVCp2BROU07gVUY8WhnYoM2UA3gQFYvTD9JxeuUSlK3gjQNXcnFyw0xU1bTmJNKoZjcY1PZHyKoHyIo8B1NTawzZfQ+RVx4gJiYdc/sOhqrJGMRn5eQTVn9si3+G6xt3YOji83iRGQ+7tt3wk5Il5h9h5PdiKJQrtsHPlTviX2U6YOflGBxcO/mTFtb+HXtx0tjQdgKiM3IwefA4VNF2+uA5UjCnclWtMXjjbWRGXEGtag7coisjrEd40KV2LbuisoYtfixrgd7sebxIYfei3x5Oww6xwXceern3QhkVa2gYukDTwAlVNO3RwGYYOnUOYDpEXgTmPwdBWAWKCgpNWOmmfmHE1D9gLG7dfoir1+7i3r0onDh5hZPSX8vV44RS36Qzps9cjb37TuJB+CP4dh+Dn8vW5URWejD0nYguWV7LV27MrbFEcOm7dD3p/G/l66NeQ1ccDj2PnbuOYf7Cjexcgw8eMtUlWXxlkF2LiHKFKo3fWXjfX7cF/yxToQG3AlM+yi9ro+xepbzSNQS+FYKwCnwZgrAKFBUEYRUoSvxjhFXDBkGT9+DV00Q0yiesBmbuUDZwxcSd95H5+B5cbXvDzNwPbgPX4/jp82jfrAvKaXtizsEoPE0Mh6ddP9Rs4I8uw7Yi5+3vWMAIXZnK1rAO3oq3v+dhwci5mLb6PqKvH4FH97l48ux3HFuxFJWrdOCElY74G6dQp5olyqn1xslbb3By7RSYNBuMhcu3wqZzEIxr+WDi2nC8SbkKMzMrDMi3ZJ5cvxZqau1h1Gg60vJeYsYgP9ka1oxXODFuBmuHPVadSUROzA00MLGGz+xTyEmPg49zMOo07gHr7ouRmvMa+1eFQKkwYe2zmt1PHsa6DUWtxt3R0Ws20t/8gVmjJqGS1vu8+qYeMGZk3qLLIqS/AlaMHAMlns4Iq6YDPIOPsZY+Rw/vYWjUaTD6TtyF1JfA8aXLoK1pharV/LH6/BO8eZaCicNmoFmrXmjatj8GTN2LJ89fY+uMaVDTc/zm9a2CsAoUFRSasP5Sth66eo9A0pNUdPMZwUmfhk47LFu+A5FRj2HAiKqyWkscOXqBkdjLGDh4Bswpstpv5mxQ2RKGTKGpqLfidVFede22nKTqG1nwelQ1W0PfuDOvl8iqlm57blVVVmNkh+Vx9xyCEaPmoUnzLlDXafvuIdOnmlYbmNWyQ11GbOs2cIFJdRteD5XXMejI8xAB1WXfNdh1y7LvdI36jdx4fVSe2k5trMLILRHZ6rXtoa3XQZDWvwxBWAW+DEFYBYoKgrAKFCX+KcKqqm0H72HrEX4nDPXre0DbRGbJ0zN2hm7tICzefRspqel4/DgFqSlp2LtoLerUdIeGASNQdXtj/bFwZGdk4UlyJrIyUrF25jwYGDpyi6CavhO6jtyMu4/SkJHzAi/z8pCWnIydS9eilqkzlDVt0XrMDsRERsGzkx+UdO2hqheETYfjsHHWOBjVH4hdp8OREJ+CR+z6ibHRGO47FOXUHdFv/XVEXDuH5rVcoEwRfRtNwPUHsRgZ6Isfjf2w4uZjbB81C1WVLaBZewCOhCVh+8z50DDqgmlbruJJUiqioxPx4F4Ert2NwZKpI1BV973VVIe1xdRrDsIS0xDL8kVExCMuIRVHNm5Gg9pu3Hoq5dVg128/Yivi4tNx8dA+1KruAi0TSveAqo4j7Py2IJ7VExOThOjYZKSmpePgmk2oV92d10MDfs06vTBtzSU8ychhA+5c5GQ9Q3pSElZPW4RaNdzkuCD/eQjCKlBUUFjCSqSNboqsqhMmLcUP/1cNFZSacEsnWUAvXAzjZLKL1zBkZuXg+InLOHnqCo4euwhzIpBm1rh85Q4aNvXgRPIES/PyHckaXwu79xxHYO+JaNfRH0eOnGfXY0SYEc1r1++hZ6/xjIC6IvTIBZSp2BD/99/qOHjoDObO28DdkKlNRKTduwxBTGwiDoeew8nTV7hlt1oNGwQz0rxo8RbWXhM0a9kVDx/GwNq+NyevGzcf5Plu3XmIDZsOwNFlAE6fuQZt/Q4YMGg6Tp2+yuugvPKeicCfhSCsAl+GIKwCRQVBWAWKEv8UYSVQeZPa3T48x9qjy0irmr4L6rXpC1uX4WjQ1BdqjIAReaJ0HWMXqBu4orn1MHh3n4QWzXygpkvrO6k8q8eMkVZG5qrqMZK48SGe3DuFZvUZUdV2ZITOXbZXay3aT9UT2sbv9xk1rtWN78Oqw66vbuiO+h2CYes0FLXrdYW6vjO3NFIeIzM3aFeTytGeqexc/j6sxuy7tE8rtVPHrCtqN/KDAW3Hw+6pdtPesLQfhNp1GWE0o/rk/D/ZPZrU8YJZPR/UIHfout7QNnRi1/x4TalRLS+ermviytLp+bxPo36pGt/PldXDYFanG3tv+c+A5SPQs1ZlhLlao55w6DYR7h7DUaeuJ9/WhtdX4FpfC0FYBYoKCktYyc22Vl1HPIpJgK1DX04SpbR//1gT02aswq7dx/lnfEIyWrbxQSX2ENas24MzZ6+jUTNPREfHMdLYjRPWO/ei0DNoAi977vwNDB42C5Y2gZykUp2Ll25lNwT07juJk9zrN+5z197xE5fy8wsXbeZtoAf9c5m6nPDevR8NDZ22aNDEHXFxSajDlOuYkEVYvWYPfmV5zp67jjdv37Lr9OLkmtyZjUytuKW3WatunLDeuRvJ3ZmJXLdo483JuHSfAt8KQVgFvgxBWAWKCqR3BGEVKCqQfPxThFXfzINbRD+Vpm3EiCkjikQqC7ulUrqmgTOq6jpCk9ILBQ0yqO6GispOGLM0Cunhh2Fk0Bla1d6n65u682sXrFePkVDdfIsipfPrs2voMIIn5dPLLyeVIWsm/aa9VIncFayjcH5qs46xKzSoTipDkGfB5M/FjeV5D9pf9qN8DNROni6nHn69D+qhdn4iHyO85P6rqseIcYH7/SsQhFWgqKCwhJXcZzV12+P+g2j4+I/mRJOIJ5HSf/9Ui1solyzbhpmz1/Lv//pfdfzv1zqoUccBEZGx8Ow6FLdvP0TTFl15uRth4egRGMLrIUssWUItrHri+IlLGDV2Abd0hoaeR/+B0zgBpfPde47DWUZud+w8ygmtZGElwkp13bz1kNXdHDXNHREV9Ri16zlxYrp0+TZMZUSa1tSSq7J7l8EIPXoBg4fOwg//MuVEmD47WPRARuZTToj79p+CH34w4m2V9zwEvgaCsAp8GYKwChQVBGEVKEr8k4S1aOEBDX13OPovw5SQ6TAxdeKkUn5egaKAIKwCRQWFJawSMVywaDO3PtJ6z3/9rwb+779m6GQZgOTkNLRs480I5nRcvnybrwH94QcDTlTJ7ZbIKFk0a9d1wk+snms37qOrzwiWRw9Hj19EH0YQ27T3xePHiTw/BXFat2EfhgybzS2lEZGPERUdBwvrQIRMXILVa3dzwkqDj//9UpsHgrpw8Rb+83MtGJtaISIiBma1bNEveBri45O5dbVadRu+vtbFfSArvwebNh/E//3HDD/9Zs6UQTNY2fZGJLvG/IWbcO9+FJq27PqBJVngWyEIq8CXIQirQFFBEFaBooTiEla6N3L5dYaaAW1/I/4HfzcEYRUoKigsYSWQlZWCIx06fBZ3GfmcM289J35x8U8wcsx8/OenWjCsZoVzF27wNaxz52/E47gkDBwyE8Zm1khPz3pnHc1++pyvY50zbwNSUjL4OXunfuwmgAEDp3GLJ0UFHjl6PmrXc+bnZ89dzwku5d289RAnk7S+lIIqnTl7jZHdJJ5n85bDePY8Fx6MLJOrMR0WVoH48dc6CAsLh1uXIZwERz+Kx/YdR7BqzW5s3RYK3+6jOWHVNeyEiZOXceJMQZjEGta/CkFYBb4MQVgFigqCsAoUJRSZsEr42F1Y4O+AIKwCRQWFJqzkHktrWenmaKuaeQs28vWeHTsHcPJIEX/Jsqpn1ImR1BmYOXsNHJz78zIUhdfVfRACeo1HYO8JPOBS94BxvB5yI46IiOVrVWl9KQV4Ijfddh2784BNtOcr1UNrTcuUb8DdismaS1vR0HXJekvBlCjgU2AQq9tnBLekbt56GCbVrdHZOvAd6aT6KZowWYspgvGYsQsxYdIytG5P+5NZws6xH49WXKFKE+46THmJqBd+FgJfA0FYBb4MQVgFigqCsAoUJUoDYRX4ZyAIq0BRQaEJqwQiiuRGS6SPPqXgR5RGpJbIIVkzpTyURqA1rf/9pTZ34aVG0/cf/lWNuwkT+SWiSFZaIr5Uzy/5+7oSgaX6KCoxbXFD+6b+Wr7+OwLdqKknX6tKLsrkEvzD/6uGbt7D+RpVikJMLshS26k9RECpLNVD9dK2OxRciUgqdw9mbaU2/PirOT9HeaXyAt8CQVgFvgxBWAWKCoKwfj+o6ztB05DcQ+Wnl0YIwipQVBCEVaCoUCoIq4TKKvLPfw2UGCoqNeWW2W99aERoibhKvynwEpFSIs70vWBegX8CgrAKfBmCsAoUFQRh/evQMXHjkWa7+U+GjfNITlrlRmcthRCEVaCoIAirQFGhVBHW74m/+sAKlycy/Xe+BIHPgd6DIKwCn4cgrAJFBUFY/xpoyw5Tcy80b9cHDyPisWf/eZg36cGfC6XJK1OaIAhr0aG0r50VhFWgqCAIq4DARxCEVeDLEIRVoKggCOtfA+0tOW7iGiSnZOKPP/7Aq9evEf0oEW07B/P9MOWVKU0QhPX7gyZCSLaq6jrwz4ITI7RXK+2JWhpc0wVhFSgqCMIqIPARBGEV+DIEYRUoKgjC+vWg7Ux0q7mjqo4Dfq3SCfMX7URe3ksED12Euez777//jjadBqCscmeoMkJbmi2tgrB+DLKMfqtMaJu4cZLq7DkWcxZsh73baP6b3NJl6a5o0ro3fHtOf3dOUSEIq0BRQRBWAYGPoPiEVcvIlc8EE2jwRp2rtrErH/AJl7k/B0FY/zrE1hPyIQjr14N0V71mAfAJmArvHlNw9Pg1Nph4hr4D52PGnK14+/YtJk5bD9+AaXD3Gg+zut7sGZdOXScI64fg1lFD53f9oLw8nwKVMandDdNnb0HOs1w2sAWysp5h4tT1/Dmrs3Sy+M9ZsANJSelo3raPQltaSxNh1WNy81fHS1Se9JCE71ofb5/8fCURgrAKCHwExSaspNDadR6I7r1m8MGba7cQdLAeBPPG3blyo86VImvqmrrLLS8ggyCsfw1kESNrAw0UBXH9EIKwfj3U9Jzg1X0KXr96zYlDWjobTDx9jpcvXyEv7wUyM3OQkpqJ12/eICb2CV/fShN38upSdAjC+h58gM/Qs88sLFq+Bxa2Q1BFy5Zb6qVJ3Q/Azqto20NZyw5KmnZo3CoIBw5d4kS18LFrz1nUauiH6nV9cO9+DD83adoG1r8qrs4rTYSV918GzlwmaBLia8imbjU3biwgaBm75geJc+V6TJXJ2ddY4um6VJbkk8Zu9J3KU5v4OdZGPQUYzwnCKiDwERSXsJJiI0UW1H8Ojp+8gbBbkXjyJB05z/OQxD5PnLqBmXO3wc1rPF93o27g9FVKuDRBENa/BupE/QNnoKvfJD5JQjPC8vKVRgjC+vWggZ5fz+nIzMrBgCEL0cZiAGxdRsKOgT5tnUegWds+WLRsDxISU9GifV9BWAVh5bqns91QvHjxihPKsNuR6BM8D4F9Z7N+ci7vK2WYi4A+M/mkSPegGQgaMBcTpqx7R0TJmh/7OBkRUQl8QiQjIwdv3/6OK9ceYNrszdi+6zROnwtDq479GaFwU9h+tTQQVhpDVa/niw1bjmH3vnMYMXYF1ycyC/3niSa9d+r7yCpPEcyXrNiHYyeu4dKV+zh5+iZWrT2EgN6zULO+L5/Y+BLRpLXRlK9+swD0H7wA6zcf5XJ24fJd7D94AVNmboKVw3DoEoE1KtmWfUFYBQQ+guIS1oIghVm3SQ82oBvF3ZkePIzjHS8deS9eYsfuM+hkO4R36KV1YPc5CML616CkZYfV6w4jixEMbzYIJMKhCLPA3wOCsH49VHVlhJXWqtLE2/LVB7Bp2wls2X4SW3ecxEY2uFy6cj/u3HuE5JQMQVgFYeUgC5e143BZx8eOyOgEjApZheFjlmPkuJUYycgIfQ4cthgTpq7HzbAI7l4eF5+CfYwQLFiyi+cZN2kt5i7cwWVsxZqDWL7qAFatO4RtO08h9OgVXLsRzsltP0YqTOt4KaxbcGkgrGTBrNnAD49ikvKlBkhMSsO0WZsZkfVh71Z+YDealCUjgKP7GJw6E8Z11aeO6zcecn1GOoqWO8irjyyz9Dl05FJERMbnl/z4yMnJxYZNR9GsbW+o6ZdcI4QgrAICH0HxCSspLFKCpHjJhYRcUOo2DeDENTPzqUzLsYOU8OTpG7gSJtcSYQV7D0FYvx3kDkWfp8+GcTlLz3iKgD6zhKU1H4Kwfj00GAGwdhqBI8euIj4hlcvVzVuROHPuFk4xObv/IJafi4yO55aR+s17fpXbnSJBENb3IH2jzz4Hj1iCjVuP84BJytr2fGBPfSN90u/2VoNw8PAlHGbkk3SVpf0w9B+yELv2nkXUo0Q8jkvhkagjouI56SUy8zguGZHs9+EjVzBn/na+lpqsaAePXOZWL518wqFIKE2E9V6+TqFI5NJxiL3bek17cNkpWIYmY8l1OLDfHKSnZ+fnZjSIkdbCkI7cvBcYO3ENt9zqmHxIWslaasyeNU2KvD/++KiuP/54X9/98FhYOQ7n7SiJpFUQVgGBj6D4hLUwqMMmBUhKtjPriGlGuOBBs8Ne/pO54qTZQ0V1Z/oaCML67SCXKFpHTdZV6cjMfoaA3jOhwjrT0k5aBWH9RtAafKbDVq49xJc4kIdIA0ZMaX1+V7/JePHiJcZNXMutanLLlxIIwvoetJae+rMqGraoUNWST8wWTCddRJO7U2duxtgJa9CoZS+MHr+KE1FyAyZr/pgJq7mnEsmZEXu2RuwZkYumo8cYvr3ScZaHJuXIuk/Bl5au2M/dSIn4KFpfWpoIq+SVJpFD6Thy/CpqN/Lna52ltaQ06UFu5k+fPud5CpJKIprS8eF54NXrN1y+iGTKiKsbVHVlE7tr1h/meeiQyhQkqOxHgfOya0RGJcDSYTj3cKLo1vLur7hCEFYBgY9Q+girBOo8acBnUN0Dw0YvR0JiGldydLx69ZopyFA0aR3EB3xfWquh6BCE9dtBne/okFX5kiXrVOmgAaB3j6mctJbmSRFBWL8NNJgjqwNZVUlfkfvm3QcxuH0nGnfz1xqSi7DMkl963c8FYf0QJDdknR80fDEatgzkyxO0jFzeQXLfpejSN8IiuZ6iSRG+ry9LI11Fa1M9vCage9BMvjbfpcs4Tm4lD6YO1oP5+sKnOc9x8fI9eHhP4OsKBWEtmYS1Rn3fdzqFDokYSuTz3IXb3Jppau4N88Y9OOmUoki/J5HvySVtwSWVJXL5vj7wtdDkbt6wRSDMWH2tOw3gAb2ko2BeOshlPS9/TTYdUrqUJ/bxE/TsMxs16vnyST5591gcIQirgMBHKL2EVQJ14EQqWnXoj2vXw7mSkw4KKDF01DJUq+2Vv+6wdBILQVi/DTSrS50uDdroKNyZpmdkw7VrCCcVpTV6sCCs3waKON3eciCSkzO4LJFrcMjkdVix+uA7+aJAczSIJB0nr47SAEFY34OsVq079ceTFJnM0HZItKaVAjGR2y6BiClN4L5584a7+vYbtABtLYL5lkm7951FDCMA5L5Z+CBrWtjtKG5VpYBfKtoOjMiGIC0tC0+S0zkBKemBcAqjNBBWmmSg/xCtRV29/jD33KBD6scka+YzRlDv3ovhYybpKJzn9t1ovj6a6urVbw4junf4eWkilyAdZEAgK33Gu2VbH+fZvfccfAKmwcljLHcnprXWdBA5LpyXlk9wXZi/RKe4QxBWAYGPIAgrgYiokqYtVuevkSBFV3CtxvGT1/lG6ZKbsLw6FBmCsH4byDrvGzCVW8DokDrRgp0prQXrZDMk39ovvx5FhiCs3waSLYrempaWjYOhl/lasaUUhZPpKgpKQhYumhCh9YdEbuXVURogCOt7kAswkQXpICI5c+5WTJ6+EdNmbuauwFNmbMKiZXv52ufZC7bzc+SO+fKlTIeRdYwiT9M6aYoKfOnKPTwIf8yJqXTk5r7A4BFLUadxd3aNDFy9Hs5dhz8VUKekojQQVgmkb8iCThP4udxC+mF/VviQzkvjqNPnbqFxq16oomnHJ/9pmySyeu7c+7H1tODYiw7pPEE65i7cycdt5H5MbsNV2PjN2mk4Hjx8zNOpjoJlKKJ1zQa+JcY1uNQQ1gpVGqNsxYYcFZX+/B9JoDRCEFYCzSKSlXXdxlCu3OQpSHJvoo6c1uuUNjdOQVi/HmTVov/UoaOXufwU7EAlSB3z5Sv3efAKRY2m+TkIwvr1IGs8TZ5RdFZap0W6aN6inVyWSK7sXEfx5QxkCaP1g6V5HasgrO9BhLFaHS/MX7KLe3306j+HuwHrmrhDj6URASC9RW6gFCX4/KW7OHnmJjZuPcajAZN1zNJ+KOo08ufulVJe2haO9milJQ7rNh7hkVqJ6FKgJjqoXFVGKuS1qSSjNBFWAr1vIq1DRi7luyvQIa9fkyAdZ87f4i7j5ElUsD7SYeSBtGffufycH469CqIgiSVdRxGFC0Y+52M4XQc+QRce8X4XCCpLB7k0k2uzIKyfxt9KWOnGfipTF5q67VC3gQtq13PihPXXcvXl5hcQEIRVBgqZTrNv5NJEh6Tk5LmhUACKvsHz+YxxaXERFoT160EkoYvfpI9cqApD6ohpOxIaEEhRhUsLBGH9ehDxMDX34pYr2vOS1iKStYvc54gsLFu1n++dSFawLdtPcFdMvVI0wVYQgrB+CE5KmY4xrtWVDd5d+W8a7Eug9c6ku8ZPXsf1Eq0nbNAikAfVKaNkwQkLBeFp2aEfLOyGwMJ2CHcBpq3jKqpZo7K6DTozUtvGIhinGNmlgGBEVrSMFW8yrjQRVpIN+iTdQ0TTJ2DqB8RQ3vH6zRts2HwU5k168DJSPZLM0W/STURaFy/fk7+29dNHSmomRoWs5G2gvvJdfQz0SRN5JJ+tOg7gEa4LHg8j4wVh/QL+NsJKN/VLuXrw8R+NsFsPcf3GfdZZRePY8Uto0MSdkdZ6qMT+VJLlVYZGvFxFpSYoX7kxyrBz5SqxcwXqrVClCcpUaMDzF3xwRITpPIHqraTcjNchpRMoP6/vb3zgAl8LQVhJ0dHM39RZm2WajR9/4NnzPP5Jh0QupN80O129rs87panoEIT160Bh+Ski5/FT17m8FFxTIw+SXNGeiDRLLHXmpQGCsH49yBJPwUiSktKwaetx3LoTzdey2rqMxKDhS7hM0QTInv3ncSMsgu+FWVp0VWEIwvoxJNL6KT1DJIL27iWyOWnaBk5WbZ1H8r03aS1gdEwSMjKe8nWr2Qzkjn73/iNuXfX0mcj7U4pa/fr1Gx6wiepTRJ1WmggrWdKJDBLoO01q1GsagPFT1uECGw/RmlNagpCamsXJ4badp+HuPYFb8GVLqVy4XNAnWUZlv534cgX6Tp9OnmOxedsJRETGITUti0fWJ5JKa1mXrNiHdpbBvA4yMFCd1BaSLaqPflN9UjtJ3gJ6z8KBw5cQl5CK8xfvMsJacsZsCk1Yiax28RqOxCep/IIq6q2gpdcBK1buRERELIzNrHk+s1p2qFPfmVtfTdg5ZbWW0NRpB239DqjfyI3nI4tsZZXm+K18fahptUHj5l1Qs44DJ6dEVCXy2rCpBy+jpNqCdQitoG/c+V17ZIPVVjBg5+galb9yICLwd0EQVlJu1Lk+YZ2zdFBHHNR/Lg9iklZgHzE6Upgipc5bmjEsDRCE9etA7uW9g+fxCIZERgsTVILs+NCCn8k6aBunEXxNjrx6FRGCsH49aLBIwUae577g6wVp3RZFbi2r1BkVVK352laK7prFQAPJTjaD+aBQXl2KDkFYvx402KftuIiAEmE4f/EOXr58H4n1cwfls7AbiknTN3K95tJlrMKuzy8NhFXXlLw5vHlQo3GT1nJSSd4dEtkkAkn/sWbt+vAAXh2tB/NtbiSCSnJEhLJVx37ozfTSrPnbsXz1AcxbuAMDhixCB6tB3GJK4zCpTipPYzI7l5F8T2Czuj48Xd1AlofaRQHCho5cigWLd2Ppyv1M3jbAq/sU1G0i2xdWuj7t8EABv1p3HADjml1KzMSJwhJWsnDSTV25egcTJy/DD/9nwi2jRDh/K98AFy/dwrCRc9Gl2zAkJCTj/IWbuHb9LqKj47jr8Ljxi3H7dgRuhoUj/GEM+vSfjP/8WBONGCG9cPEWwm6x8+ExmD5zNSetxqZWOBx6HnfvRfLzU6evgr1TPxw5eoFflwgvWXSbtuiKc+xaRJLJ0iqv7QL/NEo3YSVFSbPN23eekvW2+ceqtYegzhQjWbtsnEbi2Ilr+SnAoBFL8q1g8utURAjC+udBM8q1G3VnulQW/EEipAVBbsBEJOh7wTx0nD4bhmq1u0HHRPE22pcHQVi/DjTgosmy6bO3cHl5+eo1G7Ttgn+vGRgweCH6DZyPHkEzcTD0Ek9/y+SKJt+kgV5pgyCsH4Pkh/owskbJSycQyXTrFvIuYBwdn1uvSKDjYUQcmrfrizt3H+Hy1fvcVVhRrfulgbCSjNRq4IfoR0n8/T5/nocTp27Cm5FDIqKUTuMoyZJKhJPcbmlcRcSR9oZesGQ3Hse9jx5c8CDPEJoYIY8Ryk8u6VSe6pIRT9l+rAQiv7QH8J7955CZJUUPfn+8ef0GN29FYtioZXzJFpWldpBFlton7/6KKxSWsJLFs5a5IxOoBNg69MUvZeu9S/s3I57TZqzGnr0nMGLUPEZAw1CFPYDa9ZwRG5uIFq29sGLVLhw9dhHlKzVGV+8RiGektknzLvzc4qVbOdms18iV1R/Pb2b5yh04eeoKVDVao1p1G26BJesuWXKbt/JC9dr2/LrNWnbjZWrVdeRtLNhmgeKC0k1Yq+o4wq/n9HcREOmIik7ga25I2dHgkDpuIhATpqzDfDYwJAVIClpefYoKQVj/HEheyDpKckKHvAGetB8drRFbvHwv/y7lo0/C8DEr+OxwSZkN/isQhPXrQLrHqGYXHD95g8sOyU1cfDLfToK2KyE3zuiYRCTnb11CB8kjDf5KgzwVhiCs70Hvn9bId/GZiKkzN3GrvIqOvYxoFAIRWnK3PHZSNlkr000f6rKCkPTa0pX7+L6rdIwcu4LXI68tioDSQlhpzfL9cNkErHS8ePEKs+dv5+tH5U180HvvYD0IN25G5JeQHVIfR2C/ZCfZERWdyOWG+s/CxgDSeSSTg0csQXpGQaL6vi5Zfe8PWg5Rp1F3pvdKpiecwhJWWjuqpdeer1n19huFf/9Uk7vp0o3S9/Ub9zOSuRMDB8/AiZOX8eOvdWBg0hkPH8Zwgrl0+XYsW7Ed/2Ikk8hu6JHzmL9wE+7ei0KNOg4svzlPW7tuL1av3YOz564zgjoM//pfTZRlZPaH/1cNTq7B7Gae4eKlMG7pnTl7LTpaBODu3UjUNHcQhLXYovQSVlKy5GpyvYBCJaXXf/BCHgW4YF6a3SOFKQWpKJhWGiAI658DdbbkxkSumHTIH9jJOtY+wfO4a6dkCaPzlE4HWSloC4CSNiv8LRCE9etArm7N2vZmBDUJ8fEp3O383v0Y+AVO59YMig48evwqZGbmcDkkAnvi9E1OckvbRBtBENb3oEmL9lYD3+mncxfvwMNnAty6hsDdazwjDO9Bv2lNNEUILnwU1mmS3qI1q+SqvnZjKF9K07RNby6v8tqiCCiNhLXg+6Zj3qJdPI9kzSQdQ3vwUtAtWovKj/y+jSDr/2QE88NzQEpKJhw9xvCtamiNNdVHdVO/SmRV3vZw7+t7f046jp64hpr1fXl5stzKu7/iCoUlrHRDP5epi0VLtuDS5duowsjqv/5XAz/8xwwdLHogOTkdrdr5YMDAaTh95ip316W1qhJhXbZiB5Ys24YfftBjRNaSdX5R8O8xBrduP+RE9IcfjPDTb+bcqjpl2kqEHr2ACZOWsvPG/LrkBkwW1hs37/PfZHVNSEzBuJBFnLwKwlqcUToJq2QJo/3nCh57D1zgClfewI7KlEayShCE9cugSQ3aMuJEfqClgp1qQdBBnWyP3jNRQdWKbwdx5240P0/pUudNwSxKg1VMENavA1neu/lPRs6zPL6NCMnR47gUhmQ+qJs1bxsPiHPp6n0exZXWdtFemG06DeAWM3l1KjIEYX0PPqHmOorrFzri4lP49jU0wTGO1igWAq1bHDthDSbP2Mj1EVllYx8/4TpKnl6jZRA2ziP4/q4UDIwm5PTltENRUJoIa2R0An/HRA4LvnOSBfIUqtXQj7vekgXfiZHOT+2HWviQ0qR0kh3yetPPJ6vkUj52wmrkvZCtoZbySv1k4aNw+vET17nuo/65JC3jUljCSuBWVt32CA09j9t3IjBz9hqsWLWTdWJJGD1uIX74P2OMn7iEr139pWxdmDBSmcRIZeu2Ppi3YCNiYhMwhuW7zAjvpi2HOEEdPHQWIqMe8/M7dh5lhPQBD6JEJJZckCig06bNB7Fg4SZucU1JycAgVmbVml08SrEfI71UvnY94RJcfFE6CSsRAQoOkJ7+3r2Egi617RyssAEi/goEYf08iFSSTNEAj3eUBTrpwqAjL+8F38CfytAgsqvfJDxjBIQOKQ9tsUQuTdRpy7umokAQ1q+BBycBtNVIUlI6327k18qd0KRNb26Vlw7a15Bc9X6p1JG72dF2Ed2DZpZK3SYI63uQlYks7RQQ6ejxa/Dyn8IDxNHawILuwBLofGUNWx7c5vTZW9xiRZFgC5IQguQOvHbjEe6h9Pr1a26hpckVee1QFJQGwkqT9LQF0tBRS3H56gP+numQ3r103LoTxbfQIo8hmjCjo7DVMzPzKdasD8WYCWs4yY1PSOXnpTxSPgokd4wRzU3bjuPilXuyPpUdUh7pN0Wmpgk66nd37D79bm/YwvmSnqTxPfSJ/NJ+w/Lus7hBoQkruQBLpNA/YCwWLNrM3XItrHpyN99yLK1BY3dY2vTi29hQ9F8H5/5MkbfixJYCMY0auwABvULYILMlr6t85UZw8xiM+Ys2IWTCYm45pYBKFMipVVtfTJ66AmNDFqFhEw/uYuzlOxI9g8YjqM8k1G3oCg3ttvwaGjrteGCowm0WKA4ofYRVsqAW3KyaDlJ6X1o3SBYK6sjlpSkyBGH9PCj4RKNWvfgevXRIHSZBOqTOm47EpDS+dyG5/NIgktzmVq07xNMKds7kXqfowXIEYf3zIFnRNXHDxct3cebcLU42yAV4w5Zj3M2Tzt2+G43klExOSujZUMRNssBSYCbKb1CKgsURBGH9EERASF+RLNEn9XdkeZJ9fgxVXQf4B07nOkk6JB1V8Hjz5i36DVqA/YcucmJDZeV5KikSSgNhlUCTq9Xr+WD1usP5b/x9P8ckQnaiwCGlydKB2LhkuHmN5/XQOIv6NYoETPqKDnkuvQWPd2n5shd67AqPNUITeASKBjxgyMKPluNIkylRjxLFPqxfwN9GWCUQGf3xN3PumktWUiKrdMMSoaXz0vpWyvevn2pi9+7jfG0qWWH/90ttXgflqcTyUH4CrWOl8nSerkNuxVQ/rYel/VvJLZhu9n+/1OGf0hY4lIf2aC3cToHigtJHWMmiRW50BaMfnj1/m4duJ6UnrwyBLF2tOvWHpf0wrnRL2pqIvwJBWD8PkqlBwxfnS9N76wMdd+/H4PhJaT9WWWd78kwYdx8m9ykqT+H621oM4HvP0SHlIxJLVjEa/BW+pqJAENY/D5rYIBdyIqTzF+9Er35zkPgkHRmZTzFy3Er2LDxh3rg7Vqw5yPXbtRsP4dJlHI4cv4ZTTOZIZ5UmvUUQhPVjkD4hOfgzLpLkSkmWKZKlgkc6kzlyD5aCeyUkpvLIsRT1lYLGKXKwJQmlibCSrJD+IblZs+Fj0iqRw4K/JXJJsuHgPobv50vb5FBdNHFSVccerTr0w/3wWJ6PjoLlqR8s+Fs6aNcGIs9S30j1kZxSP0wR0SVvJak8HdQPC8L6efzthFXCn71JIpq0jpW2oKHv8vL8nQ9M4O9G6SKstMaiTiN/vpm+dNCeqxS+n5SdvDIEIqsNW/TiIdPJ3aVnn9lceSv6DLIEQVg/DerASQ72H7rA5el95yrrrGmNmDEb2Fy/+X7AN3Petg+IKH3SrPP6TUd4ujQrTO5QREIUWc4EYf3zIBnp6jeZB7d5GBHPdRdFw2zCSCy5blI6WVGVtezg6D6a6zly4SRiQesVaT9C0oHy6lZUCML61yDTTU6YOG0DJwCnz4Wh78D56GA9mFv321gMQI/es9Cr/xy+xpXkjCxf2kaKL2elibBKIKs8LU2Yt2gnd9398JD1eQUPGjPZu43m4yt5EySks2gp1oWLd/NLFDw+rI/kb8fuM6jd0A/yov8SCSZZJXmMYTqv4EGkWBDWz+MfI6x/FmQxlfZrlaynAqUJpYewUsdLltEpMz4MtLR0xT7u5vu5gEpUjtxZXuSvkcjNe4FpszbDpFY3TljklVEkCML6adBkBlm1omNk+9QVnA2mSK2WDsNRVqkzd++l4znr5B1ZB05W1YL1ENHw8p/8riwd5MZUt2mP/EHCh9dVFAjC+udAgz0a9M1ZsD1fOsDXgG3edgIbtxzDrr1nsXvfOY6de85g3aaj2H/wAp49l1kb3rx9K9s2gg0Q5dWvqBCE9a+D9tZsZzWQr0EcFbIKZZU78z5R2nuziqYt14PXboRzeZQixsqrS5FQmggrET3JI4jvmmDowvUJLa0iC6rksUak8mnOcx6DYSobI9VrFsBJKY2/SCZITkhu6FOy8lNfSHu9hkxey7fByWHlJbJK/SF5kNByB3I5pwlcKXgcWWulPVZlQZXYNfInWFp26MfXrVIgsFev3uDeA2Fh/RKKPWEVKO0oPYSVOth2lgN56HTpoEAlpFC/FHqfyrp2DWGKNDe/JHDpyn3ulkKKUl4ZRYIgrJ8GDeZad+rPt3GgoyBhpcAm9L8i+aLJjbv3HjFicY533IUnOqjTpa1sHheYGSZ3O7JifEk+SzIEYf1zICs7DcgoCjUNCqWD9l89cvwqDoZexonTNzgOHbmMw0evcP32RwErxZQZm7j1VV79igpBWP86SPaICBw5dhV3mA6jIDw0eUKgvpEICQWRS0nNRBffSR9NxikqSgthpUBddZv0QLXaXvxdUzAukgnJS6hd52D495qBQcOXcFLp7DmWT+IScaTJViKnJCu05Mq8SXfWp/VGvaYBvA+kNdISgaX6aM09laf1qMNGLefbv9k4jYCpuezaMrLszOujttVv3pP3mzQWo8kTykPEmvLQ74Yte6Gb/xT4BkyTBV1i7S18f8URgrAKCHyE0kFYSTFqGbtw64N0UJAI/8AZUPkTa22oU3b2HIeXL2Wh1VNTs7ibiyITiYIQhPXTINmwsBuK7Kc0KywjrHQQqRg0bDHvWKlTp462KxvMte40gHfiheuh2WL6vHTlHi9PBw0Am7btIwjrJ1CaCCvJDAX2ogm3TVuO8SBx0Y8SuTVi287TfDsRykPWByuH4dzqmpWVw7e7mbd4J+49iGVk9waXM0V2MS8MQVi/D1QZ+QjoM4vv+xvYbzZ3Lw/oPRMujFwQQVi2ch+3sNLa/NIwiUsoDYSV3iVZJmkSjJa1LF99AA5s7ENkkPQNja2ofyJyyicxOKF14pZMTkjZbyKptMY+9OhVPmkbFZ2A+w9i+P7QFByO9uulfCRHdD3qU3ldbGxG5+lalEZ1EiHtYDUIcxbs4FbXB+GxiIiK58sftu44he6MOJMVVoO1gfpdssASEaY2yXNJLq4QhFVA4COUDsJK7pbU2RZ0t9y64yQf3ElEQR64ywlTyqREKSjToqV7kMkGgaNDVqGSug1XpKSsC+Jz9ZVUCML6abwjrAWiE9IRH5+Cxq2DmPy8J5skH9TpGhYoL4GsrjqMSBxnpEI6yOWT1oMp8v6ZgrD+OdCgy6v7FLx69Ypvg0R7+BKBnTRtAx7FJPHJjQ2bj2HDpqN8iy7aeo62fGjerg8qqdlw9zhyrSOLQ2laxyoI68cgXSNZ7OWly4Ms/kN3RETGIyUti0c6p4PWU9PE3M1bEZg4dQMnFCWJGPwVlAbCSpZP2T6sifx900HbZK3dEMqtrmRtlVeO5IusnH49p/HJss8dtO558Iil7wirvPqoH6XJkOmzt/ClNp86aKL42MnrfNtC0plfI+PFCYKwCgh8BMUnrKTozBv3wO07UTKNxo7HTEGSGycp1ML5ScERQaCZPfpOAzxy5yRFSuhsNwTV63mjQfNAvk6iefu+HC3a9+O/a9TzLbFK8lMQhPXTIBLagr339xF+ZYSVOnQis39WFmg2mvKev3iHl6fjzt1o7upUUtbdfAsEYf0yiADQ4Gv+4l1czkgnETGoomHLI2/2HkCRMd8vV6DvFEFYScuWB2Mi0G8iF54+E9+505UGCML6IUjP6DBiQG69snWEH29lIw+UjyL/zpy7TSZk+Ud8fCoPthT1KIH1gX25PpR3XUVEaSKsEuksOOl/+ep93veRdVW/QBnJSkpW1Rf5Xmm0JpXKFkbB5Q0UyInK0jULtoEMA7TGde/+8/k5Ze2QB+lISEx7p+tIdgvWVxIgCKuAwEdQbMJKHS0pzplzt8q0GDtIQY4Yu0Lu7BsNDGmWj9YN9h4wjwcvIUVt5zqa10OKT0XHHvWbBfCtcGimmRQjITEpnQ8mA3rP4q4sBest6RCE9dOgDtasrjcjl4/yJUzWmXr3mMoGeH+eGFAnXbdpACKjEvJrAY8AS5MnJbHD/bMQhPXL4NYw9kkucKfPhjEiasfvm9ZlkUWeogXfDIvEmPGrMW7iGj7RQRb/Q6GX4O41gcsQrRmjPQonz9hYKrYckSAI63uQHNE6vhlztvKttsh9kmSDdBilfQkqOg5878yCkyNLlu/lgXd27jmr8LqqMEoTYX0Y+eEe42wgxX9fufaAT9YradpxYkl9HierbIz16rUsEJNUhpcrcMjbe5VcfUkeSdYoeBetua9Z31cuWS1IdumQzkv1PUlO58twaFKP2ibv/oorBGEVEPgIik1YSXF2thvK3eWkg4KSUKdd2GpF5JWUM80KUiCTgspwLlOiVBflIRdhIrRRj2RRYQsfwUMXcQVZsO6SDkFYPw0+KWLghLmLduZLAHi4f7K2UyRFeWXkgSY5XLuM+2B/4P6DFnBLmrz8igJBWD8PIgq0pIGCwyUkpGLh0t3o5j+ZT5gRcbh6PRz9By/kQUnIkkpW1+p1vTF01DK+92AOy3Pg8CV4ek/A9ZsROHzkCreCkcxS3fKuqUgQhPU9yNrk4DZGplzYQROtFDV/3KS1GD9lHSZMWS/7nPrhp4Rxk9fy7W0iIuN45FVastA7eB7CI+K4TJJXkrzrKipKA2HVMXHlXj5XmJ6RjsKEkSZrewTN5MTVwm4IX34g9WOF85LcPEnO4G7FdNB5KY90bNp2AjZOI7nF3tN7Ik6fvZWf8r4+6ch++ozvS80q4r+ldCkPGREo+nDLDn35/ZQUd3VBWAUEPoLiElYajJH7E233IB0UoMTedZTcjpXyE/m4EfZ+v0zJvfM2U8jmTXqACC0RVtq8/8HDOJ4mKUdJIVOUPEFYSw9hJRABaNmhPw9wQwdtf0QRqf/srC7JHQ0mV6w+wMvTQeH9azf0hzYbMMgroygQhPXTIGsVrRus36wn3/uSJkLIakCuvRRwiUgE7YNJSx7ITZgCdDVjoIA4pK86WA/i61hpQJeX94JvcUPrXS0dhvE8NRso3vKFwhCE9T1IH1HQN2n5AgXhsncdDTvWJ1IgHQf3Me9Bv6VzBb7buoyES9cQLo+tmM4bz0guTZqQizF5J8m7rqKiNBBWydWX1sLTZEXB4IKycY9sjPT27e+ciErpdEh52EiK/yYPEZcu49C0TR/YOo/E/kMX+Xk63ueVHc+e5SHpSfo74luY2NJ5iinSwWow13vdGWGmLWzokEeCaVcH8oQi623heyyOEIRVQOAjKC5hpXUV5PJEgzvpoDUSsqAQHw/SKKgEDeJISdJRUOFRHVQXlZVtP/JpwkoWVmVBWEsVYdWvLtv7jSYrpA6WBnTkPi4vf2FQWdo8PSVVNpCkiRWyWJBVX15+RYIgrJ8GudmRzqJAb8/z91OVDvIaeRTzhOsrkhuKXP4OjJDQOVqmQASVyhc8srJzeOCSMeNXcdc7eddWFAjC+iFowE6TtsNGL+P9mJq+I59wI3de/imh4G/6nv+b3MlpooMC2wT2nc23U6KI1eQFIO96iozSQFglULwPcs+l7WsoeBsd0thHGidJhzzCSC69FLiSxkZcjpi80ITcmvWH83N8PJaSDum8VB9ZaYePWc4neWlpF9VHurJlx/48kjEdhdtAXgBiH9bPQxBWgWIOxSSspJRq1PPhe8ZJB63xoo6WLKTyyhA5oI5c2rqGH0zpScpz+85TfA8vDX3nDwirtA6DjvT0p7ByHP7JyHklFYKwfhlkzScLPA3eXr95ywNSGJjJXKrk5ZcgrR+j9dJ0PM3JRfDQxbwTLg3rwQRh/TQoEvk2pneIcNJkCK2P79lnNicKtMaezn0OfQfN559BA+aiJytDZXv0nskn1WiN64Ilu/kAsmDAFEWDIKwfgyytNJlG+kpe+ufAl0CwPpCitaYz4hJ2OwrN2in21lufQmkirATq42jConvQDKTlW+npkIhhQRQknbTGuQYbexX2OCKZMazeBWs3hubn/JBoFgRL4enkSkzLtmiSt/CSBvKco2CaZPGXDskCTMsjBGH9PARhFSjmUEzCSov1aZ3py5cyaxdZvbp1n/LZIDik/MgFkwZ4ew+cx5OUDF5WOsgVjzpmcvelja8p0nDBg5QqbZxN15ZXf0mGIKx/DjomtA2SC9/sPCY2CWMnrOG/P+V2SRMgNGicPGMTlyGaHfb0ncjXvtLgQF4ZRYMgrJ9G5XzCmp7xlBNUIqyBfecUAJFX6fNzeJ+f1pr1DZ7PLazzBWGVC0UnrH8VNOlLLuek47ZuP8mJh6K7lstDaSOsBJpEJas8uYgXXFsq70hLz+YBL83q+nxyQoM824zYc5w4dT13Kf7cQaSTJtyorsJkVQIZHsigsH7TUTzPfZFfEoiIShCE9QsQhFWgmEMxCSt1nkQGaL9UsnSNnbCaK7gvWawoD83cUT6aqSO3k3MX7nB3kmGjlqNabS9OMGo19OPrx2jNIUVJXLH6IAaPWMKuK6tDXt0lGYKw/nkQ0STXcVpbSJ0wbXL+qXUzdJ5cf/cdvMCD5JAHgBTcS15+RYQgrJ8GBVBaunI/cvNe8sEXuQV/D+TmMrA6KagOuQQLwvohBGH9MshFmCZR3LqN/yQZUXSURsJKkFnZnbiLL02ibd5+AjfDIvjyg4dsrHTy9E1Mn7MF7awGctn4kiWf+kGapG1rEYxpszbj1JmbPFp+XHwqHoTH4mDoJQwbvZwHnqPrfmkcp8Xqkrm+j+YBoK5cC+fB5qrX8/1kX1zcIAirgMBHUEzCSiClSsqS7ousXF/jXkmkk8pK63JosT65+VIdhjVkdRMpIbcqGvCR1fVTa2MVAYKwfh2IAJD8EHkl2ZGXR4J54+48YAmtx/kWF72SDkFYPw3SJ7SlQ/3mPdGwZSAatez1nRDI66Ton4qqsyQIwlpEMJNNzn1Nv6poKK2EVQKRP3LDJVdf2nmB9kolnUIyQa7DtO71z+oXysfHXKwclSdrKHm8Va/rw/tFOv81/SPJJpFbah/pAOqHS1JfUSoIa4UqTfC/X+rg3z/WxL8Yfilb72+9YYGSBsUlrARSgkQ+/8qgjMqTYi5cB1lT6ZyEgmmKBkFYvw0kF2Tpl5cmgeRLEa3yfxakdwRh/TR0qrnxCbeiQGmQO5IPQViLBqWh7/scSjthlUB9HI2RiFCSy61szCU/75cgeanxuhio3r+yPIbkk6JXlxTLqgSFJqxKqs1RpkJDpphbYfDQWVi1ZjdWrd4NZ9dg/FquPiey8soJCCgyYRX4PpARVltBWAW+Oz4krPJl6VPQreYs9JbAZyEjrG0FYRX47pARVstST1gFvj9khNVRMQlrucqNoGvYCafOXMOFi2EYPXYhZs5ai8ePkzB77jqUrdgQP/5ah38qq7VEuUqN8FMZc0Z0W6Cikswq+5+fauE/P9dC+cqNeZ0//WbOztfm1toffzVHRfanpPyUTjdG+SmdytP5X8rVyz/H6mL1kHWX11OmLr8u5SnYZgKdI6It1UX1UjspjV7Uz6zsv3+qydPLVGiQn78BfmZ103ci4z+XrcuvIaVXVpFdk9L+x+oisk7nK7H2U9sqVGn8rizVS/VTHXRNXjcrK+X/kT0Delbvng8h/xnReak8PatKyjLBovZLeUuKhVvXxEkoUIFPgmRDU9+Kd7by5EcumNwrqbeCvpk7HzTKq1dAgGSL9I9cGfocmHzpGDkIvSXwaZDeYfpHWb31V/XDpOc0dC2FbAl8FiQfatqdvqpf5BO5Gm3z6xD9ooB8kGxpc682BSOsRNCIGJFV9dSZq4xMNcL/+291/PD/qqFZy25ITEqFs9tAdPEajrYd/PATI58t23gjqM8kTiRV2KBy9NgF2Lz1MOYt2AgD486oXLUZevYaj3HjF2Pr9iPoFzyVX4uuo29sgRmz1vD84ycu4Vbd38o3YPUP4+XnL9zE4e03ipO+Xn0mol2n7pzgFW43netk2RNz5q5/V27w0JlQYaT6t/L14eM/Glu3HcaKVTvRuJknJ882Dn3g230M/25lG4RhI+Zyq3Lrdr6ccBKB7hEYAr8eYzBwyAzoGnREGXafalpteL56DV056aTrrt+wH1vYfbh3GYL/MsJsaRME/4Cx/LnoGXZCvwFT0aqtD2bNWYe58zdw8k9tacTaYlbTDkuWbWPPJxSBQRPe3d/gYbOwdPl2LF+5A06uwaw9Tf9WoftakLLls8micxb4BIhw0qzwVxHWfNAsoZAtgU+BZIP0z9fKFicVeoJUCHwaJBu6Js5MXr7Oek+yVVWzHatDEAqBz0NFo81X6q5mUFJtCb1qwqtN4NMg3aWuY/FNY65vxd9CWMnaRyQyIvIxvHxGcsseuQgTSSJSt3rNHmzfcQQXL4YheNB0/PCDPgawz5s3HzCS1Rjr1u/DiZOX4cMIJpGv0CPnYVbLDlHR8Th56gons/SdSCoRyWPHL3ES6dt9NE6cuIy16/fiN0YUDx4+h8tX7sCPnT9+4hJOn7nOyWPYrYcYxEjoDz8YccsnETipfWSZnDVnPR7HPUEAI8hEuuPin3ASTW2MiIzF8JFzGUncxe+vei17TJuxCgcPnUEHiwDWrji4eQzm97hrzwn88G8zNGrqiWjW3jHjFrIHD4wcM5/fc1DfSfy3hVVPtGnvi4iIWIwNWcTaNgsPwh/B3qk/Jk5exu/5hx9MUK2GDeLikhjZD+bk/fadCDxkZYIHTudElJ7f+o37OUG9/yAaEyYtg7JaC27VJrJKzzr6UTwcnPtzq628d1ccwGf8eOdMfxShQAU+BHWq1LkqVW3J5OXrJl5I2aoxpStIhYB8yPSNiia5bH6tbDWDsnobWYRbMfATkAM+6NO15HpIngx9CUR2he4SkAeSC5qMJU8PebLzOZA8agqXc4FPgMZc5JmmpNbqm+TrW/G3EFayBlavbc9JpZ1jX/yS795K+Nf/amLKtJWchO47cApLl21jZEybN4rIZr1GrkhMTEFX7+EwMbNG2w7+nHD1C57Gyaeb52CWX52RuX64fuMetzjGxCRwsmhS3QYeXYciNS0TzVt2wzZGiqfNWM3zD2EkjogtkVMirkSIKa17z3HcJZksrzTgICI3c/Y67D94mpNKsnreuRvB6751+yF8e4zh53/4lykn0wsXb8HQ4bP5vRJZdWVklYhwh049EMvabWDSmVuF9+w9yUlp9tNnuHsvCuYNXHDl6h3kPMvl16C2bt95lD83utaGTQdw4OAZTnLJpZosqJ7dhjIinYRmLbuya2hi/sKNnJz/8IMqJ82hRy/w50vts2eklAhwTXMH3Ah7wIkwWXgfPHgEC+vAd+7RxRX0LrQN7UXnLPARSCaIdH7boI8pW9UW+WsNhWwJfAiSCdI7X0tWJZBMahnYioGfwEcg2aK10WTN+tqJNgKfbNPuKPSWgFwQqaiq1f7b+kWm75TVWovlMgJyYVizGzT0rL9xzPXt+FsIK5G/8lUa49z5GzLC+P+qcRJLa1TpPBHNYSPmoHkrLzyMjMXO3cc5GQ09ep4Ts9TUTE7etm4LxfoN+7B67W5OBK9cu8tdZX/4wZC7416+chtjxy3Ck+Q0bNh4ANu2H8Hadfu49dO0hi22sPKz525g+fUwYtQ8RpIvcOvv2XM3uIXX138Ua8t9TJ6ynBNVGqTQ2tDJjFAfYoSaSKmNfR/cuhXOiSRZLYlckpX4h/8z4RbeLdsO83vJyMjmlliy8lI6XefEySucSJKF1Nt3JHd7vnDxJo4wYhmfkIyjxy/yZ+To0p+T02vX72Edu1+qk1yD+/SbjFFj5iPpSRpr71FeLjklXUZY/2OGZSu2Y9OWQ7ydVIZcg3/4v2r8JTdu3gUPH8bwCYAbNx/wdCLXYexeyG2ZXKblvbtiA/YuaDZHj0fdFB20gAxGTHFSdOBvGfBJIKVbVZPW7NCWQEK2BGTghILpGyU1Rii+kbBK7nW6JkxvCdIqkA9Jz6h+K6HIB41RtAyEJUygILpwedCk6MB/SbaaQpVPiDDCKkirQD6IrHLLvRyZKWr8LYSV8Gu5etxNNTk5Hf2Dp3FraZ36zoxgHcTNsAfQNezIG1O3gQsCAkNkLsKXbkFTtz1LD8f4SUuhqtkGLu4DebqOQUdumSRyqKHdlhM1slo2YcQsMvIx/LqPgRrLT268rh6DoMwGDWTBpDWeenrtGVnbjNNnrkFFvSUjhve5q23FKk2wa9dx7GDkmAITEdGmgEi0hpQIpAFrY98BUxAZ9Rj6xp05id656xi0WH1NW3ZDdHQctwRTXfsPnEYnq56cPJN1k0g6uSLn5Dzn90suxUQUrzNSStZhIuhkfSbCass+hwybzQlrjToOqGnuyK2y2vodMGXaCpw6fRX/7781uLU0ITEFbdv74Yd/m3Lr6m5yO2bX8uw2DI9iEtC+Uw+os+dDacdOXIKOfkduaSUircWeLVlraZ0ruT5/qxXh7wIpUApOwbeK4B20UKKlFdSJ0qCPrF9KVSmQ2V+TXU5atTrwEPOGNbrJvaZAaYFswEd6RhYM56/NIsv0ViuZ+ybpLTH4K9V4R1YZGfjrsiXTe9yKz+oV1rDSDVm/2IW788omcf96v0jeS7K6xaRIqUb+mIvIKk3C/hN84W8jrHRz5Arsxsjj1Wt3uTWUiNve/ac4KfulXH32EGQReX/4wZiTNlq7SpbOVu18OUkjy+RVRuLI0qit1wG3bkfgHiOtR45e5ISyVl0nvj6Wgjddunybu/nSp4VVIA9mFBubiH2MSO5j1ySyStZJSpu7YCNOsvoPHDrLra4UxIgswBSBl4JBkUvy4dBzvBylk4txj54hPEiSVBfd0/SZa/ALK0NuyQsWbsL//ac6KKjS5q2H+DMgV2Mi7MtX7cT//duMB5giMkyEUrLokiW1vUUPTpQXLd7CSTuR2B07jvJ8vXpPxOIlW3hUZFrDSm7UDZt44N/svseELMTUGat5XRRgafS4hdyaSs/t6LGL/PkQCd+z9wS3zh48fJaTfJokoPst/M6KI0iBksWDtjCRLGICpQ96pm5Q1+2MKirvB21/FSRbFKBCx8iRK2h51xVQfBiYeXD9QnrmrxIKCbwe1r9pGtjkT4rIv7aAoqMLH/BRFNav2Wrks2D6j3Sguk7n/O3f5F1XoDSAPEJkUYH/OlmVQHJaVbM9k1vaqUFGWgRKH8g9nNyAKUDc9xpzfS3+NsJKoKi7RKZoexVas0mBk8gVVdrupWBemXWTtnch62x9vtaUyqhrt+GNprWgFLiIIvxq6rbjhEsiXUSMKTIw5ad6KUARWVSHDpvNo+/S9akesriSSzGRPXoB0nY6VA+Vo6i8RI5Xrd7Fy9GLorQdu45h0pTl3PW2LMtP1yGLMa0DpXZKlllqCwV7orrJCkQWZoqI3MGiO37N306GXKLpk9pEn3TPss8m/FkZmVpx92OKSExpBevm5SvL8tNzogBSlEZtp3zUHsNqljzqMOWj50zlqB76pABMFJ2Y7rnw8y/WYPdL90zkggJWaGO7MaMAAIMMSURBVBvZ820nyIIhoLigDpPcf2nGlzwmvheZKAhZnc14BE5NfWu+LYm8tggoGpy4HiF9Qnvzkn75djfgT4DrLZmXCNdbhkJvlRYQSSV9osoG/iQLRaW7yPJBhEXLwI7rS3ltEVAskGyRhZ3eO43jiq5fbM4j8ZP1lq4pry0CigbWL7J+iowDymqt8uXgnyGrhL+VsEogMkXEj4gSHxjIyUPnC6bJyjR6R8rIJXjT5oN8mxfay7RwPZSPrkEEkvKT+zFt80LXpHOUp0VrL058JSLIUaAechGmgEd1OeFrxNOproZNPVCzjgP/TkSTriMRRypXsO30SaSQCO3BQ2cxdfrKdyRVSpeu977s++9Ub8HnJEt/X0baW1VeGoHKU/uo7dI5KiPdb+H8JQmy+82/BwGFhyTfXGnSOTky8b0gkyshW6UJH+gTOTLxvfDBdQRKBd6/8/f9cJHg3XVk1yzcDgHFg/SuZbLFzsmTi+8ESYaFbJUeSLLF37kcmfg78Y8Q1u8BengSIZWXXhA068QJMiOdBS2JZLmVLJIF80ug89wyycoWzEOWym+xStK16JoFSaaAgICAgICAgICAgICAfJRYwkooDoz/ayCbqRBkVUBAQEBAQEBAQEBA4M+gRBNWAQEBAQEBAQEBAQEBAcWFIKwCAgICAgICAgICAgICxRKCsAoICAgICAgICAgICAgUSwjCKiAgICAgICAgICAgIFAsIQirgICAgICAgICAgICAQLGEIKwCAgICAgICAgICAgICxRKCsAoICAgICAgICAgICAgUSwjCKiAgICAgICAgICAgIFAsIQirgAKgmUCpgbz3X5SQ1wYBxYU8GSgqyLu+gOJCngwUJeS1QUAxIe/9CwgoFgRhFSixqKzSlEGmrJVUWwiUArx/700/kIXvi2ay+km25LRBQDFB7570SdHKltBbpRGkR0ifvNMrhWTie6Gg/Mprh4BiQvbu3+sVAQFFhCCsAiUOklJW1eoILUM76Jo4Q9/UTUDBoWfqCh0TJ2jq20BFo23+4Oz7dtDU6dMAQE3HAtpG9tCr5iK3LQKKB9IjpE9Ir8hk4XvLFtXXDFW12kPLQOit0gS9akx3GTlAXdeC6ZeWXM/Ik5FvRr4uVFFvA009a+gYO3F9Ka8tAooF3i+y962hZwVl9db5siWIq4DiQRBWgRIFUsYqGm04cTGs0QWGNbvyTwMBhQd/3xxdYVDdkw36bTm5/F7EgmRLVasDH1zSNWSQ3xYBxUNBfUL6hfTM9yIWVI+yWms2sHTIv5aQrdIESW8RiGCoanf8jrJF+q8Fn8gzqO7BrtEt/1ry2yKgWCgoW/pmHpy4ctn4Tv2igEBxgSCsAiUG1MFX1WzPlLI7H1gSaREopeCddDdupVJWbZU/aJMvN38GJFvqup1Z3bLOX+41BUoNSL+QniF981eJhUxvteXWECFbAhLBIGLx1/VWM26x1TF25PqQkxg51xQoHeCyxXSXtpHDO/koLDMCAiUVJY6wkkWlfOXG+LlMXfxarp74Q5YS0KCP3J04WRWdskA+jFjnTO5QZGH4Vl1AsqWq3SFfroRsCchA8kD6hvTOt5JWkkly09PjZFXIloAEIq1doKbT6ZtlS3L7JHIiJnAFCoLkgZY3iPGxgCKhyAlrhSqNUVGpCSeZlZSboVylRuyzKf9dtmLDd5+EClWa8HT6kympyjp7+i2VoU/K16ipB/r0m8waPgpVNVox4lo/v3zjd+XltUWgZEM2iyw6ZoEPQZ2zzFrx9QM/rmvUWuYTCiFbAh+CZIL0zreuCSP5orXQglAIFIY0ISJbd/j18kX6jrxCuGVVTv0CpRuku7jrORs7y5MfAYGShiInrPpGFlDTagPTmrZQ1WyNatVtGMlsDSNTK9Sp5wzDapYwr+8C8wYuMDSxhImZNVTUKShBM050a9ZxQN2Gru/K0rmGTTzQq89E+PcYy+uozVCnvjMMTDrz8oKwKhaoY6ZAJcLdSUAumFwQ4VT6BtdgPujTsxRkVeDTYPJF+udrJ0Qov4pGO/l1CggwkN7R0Kcxy1eSCqbnyNtMtt5e9IsCH4Nki5bMyGRGjIkFSj6KjLDKCGdTTJuxGrPnrkPvfpPRvJUXTp2+CluHPpg0dQV27DyGeQs2YfnKnVi5ehfPc+z4RbRu54t//1gDDs79sXnLIfQPngb3rkNY2iW0bOODgUNmopNlT2zbHoop01Zi9Zo9WLh4C4IHz0DokfOo18iNW1zltUug5IFkiQLsCFIh8CmQbKh9dSATNuhjnzqsUxeyJfApkGyQ/vmWyRCK2CpkS+BTINnQrebCyefXBMkh2aqq1YHVIciqwOehokkR9YWVVaDko0gJa/kqjTkRvXjxFnQNOyGo7yRcuBiGkAlLMH3mauzddwqjxi6Aj/8oDBo6E0OHz8aly7cxiBHSH/5tiumz1qA3K/PDD/oYPW4hzpy9juBB0zF89DxOZKm8m8dg9BswFT2DJmDsuEU8T8+g8XyNq7x2CZRM0EyhmEkW+BRo4Kf5lZYK0lHkjkdueWLgJ/ApkN55b6n4GjQTyxgEvgCmd8w88tdJfx1hpWUQQrYEPgeSD3Udi6/qFwUEiiuK2MLaBIuXbsOmzYcwYtQ8rF67BzNnrcWOnUdx6PA5jA1ZxGcWu/cci2UrdmD9hv2YPWc9tmwNhbJaSwT0Go9Va3az9HHYtec45s3fiLXr9mHPvpPscy8nsf4BYzmJXbRkC9ax8ouXbOVptLaVri+vbQIlCdSJt+BbAQjCKvApUMcsCzLxdYSVBory6hMQkEB6h/QP6aGvda3TrSYm2gQ+D5KPqnxf6a/QXcpN+TY2Ym20wOcgi+9gKdaxCigEinQNKw0Im7bshuq17WHv1A8dLQN48KTW7f1gY98Hapqt8dNv5qhV15G7+LZs483LdLDoAW39jpx0kltwF69haN+pO1/b2raDH+wc+6GmuSMvV6uuE1/H2onVTS7HtF6WytOnmFVSBPxzhNWwhid0TFygquuAqjoOUDNwgb6cfEUFsvxpGblATY9dX88JesIK+EmUJMJqWMMDmgaOqEpyVQiaxhT8SX45gX8Gf42wuvDy8ur9drhDXd8RmkYUMV12jj61jZygpk86qvjoCUOmw9T1HKFV7X1bBT6EjLC2+zrdVewIqzs0mEx+qM8coV2N9oWVl1/g78C7gISCsAooAIo86NJvFRrwyL2/lK2HX8rV44SVovqSyy5ZQJXVWsjSWdpv5evnp8vyESiftIUNrYmVytIaVSongdJ/K98AFVidlIcGo/LaI1DS8M8QVupkNVkHbFyvJ7z6LcSwkfNg3TmIn9M1k1/mu4EN8tR07Nng0w11mgbCPWgZ1i3fiEa1naFtKie/AHtfJYWwejBZ7oZWlsPg3GU8uvlPRle/yejG4OwxBs1bBzCSQy7K8soK/BMoXoTVHfpmvuhkPwqt2vq+kxVdE080bDMEVrZ9YVTdjeWRV/ZvhhmT9do+6OA4As0a+bC2esjPV8pR8gkryaQP2tuOgkvXie90Wle/CWje3As64r3/YxCEVUCRUOSEVUDgr+GfIaxahk5oZDkF1yIyEBcdgys3HyEjKxMrxk2BLrd2yvLps0GZhMJ1cLCBoyy90LmCefLBz5m6QVXfGU79V+PUtRjEJWYiMzsXxzZuhImBI3QK1PP+2u/Pyc4X+l3we4F2frZcobSCKFxOdu4zz+BvQEkhrPpmLlDVC8KBazl4+fwpbt99hHv3Y3Dnfixe/g5sWbIEVbQcCuSX/44Lp8s79x4F0grkk+X98LfsXH65j84XTP8wTYK8a/LzBb7z34XTP3HNP5telChOhFXP1BFaJqPwIAnYs2IUlLQd2Xl3VFF3R8iSWGREHkNNUxtoV3tf5lPP7t35AiiY/kGeQuf/TLq+kROqthiO65kvsKz7CKhoO32UpzA+KRf5KJj2OXx8r/K/F8ZH9/EN1/5alHTCKpPJkbjxCMjJTJLptAexDOEY4B2Aqnqu757hp57959Lfp305z6fOF06XX0fh3wXKFjj/Af5EPf8kBGEVUCQIwipQzPHPEFZNfSfYBi3H+mUbUcvMERU07OE97RyQlwTX9q5QM3BnHYEjIx+OUGN51fh3RmRZZ0XWWYo8S27EqrosndJ0HaBuKLsHyXVPCvRjWN2DW241WHpVRlZ7zAhFalo6Fk9fDnvnkWjbNhBaxi6crBpS+7ibHas7/9pUt+QKaEjugixNdi0Z8X53XUNn3kbKp8cG0u/ay+85383QWObCpcHq1TQq9MzZd/1q7N5ZOV1qN/utY+TC3b/oHN0n3fM/4f5XogirfhBO3snDuX2bUVHNGhoGzlDRd8X5iDTsXrWSEVZGQkzdoMae6wfv2IDJDHvmkrxw+aJ0/twdoWPKBlZUjv2m81RGlu7EZMcDOgbsHTFZ4NtD0bs0ceXp5DFA71KXyRh3fS/4Lk3oXbK8pu7snMzVT1Y3uf+9l3eyHMtcAmXXk7XBGfosjcu7gey6+tXceLtkMkJyyGT+g/uQ3KLZfVI6a6OsTbJ0KqthJEuX93yLArwdxYqwjsSduLfYuWzkB4R17KJopDw4wgmrjinTQfQ+SW7kvk/27tm7kp677NnK3IyNWLoO0xX8veTrL/ouPXf+PEh2KD2/rPTeDKT/PXmJqFuibL2BuJTyHPO7DsJvlS1ZHtn1SedoM3kknSfVKWsvuZF6sjaQ3DB9ld9GSeY0efuZfjZwZHqNrvfhs5XqVTOU/VckmaM2yib7SI7ZNUw+dFWl69P11Ok/RnqUpWmxerg85+t3+q7L/mMyffn9QNcu8YS12ijcT3iLrQuHoryqLbRY36Fl7MrSZK7CXE5Ij9F7ZH0cEUD+/Jle4v0oPWf+yWQqP52/P1ZenWSAkJ+P92H5ekfHmMkpl3FJDiU3ZPbeWd2yOvPLMnA3enae3NT5u6RrsGvxNub3oYV1EpVXJ/2V319LID1M5WQyKZMZbdbfcr3I/n/fW06+BYKwCigSBGEVKOb4ZwgrdT66+YPlKpp2KFu5PerZrsTbPzLQ08UVFXS7wKXPKhw59wDXrz9E2LVbGNtvNB8sqeq6wdl3DVasOIBNe64j7HYUDu88ANvWvqis64kxy05i4YjJ0GYEgDpVVUZ++07ej2Uz5qJ6ixF4mJaHI7uPYfOuCzh98gqmTpiH2jVcoEEDeTbgqsrqd+u3FmeuRuL6jQhcOXsJgR59UUXNBm3c5+Pw0QvwsfJHGWVn9As5gAWTp6CqakfUshyHw+fvoL9XEJpYLsD2rTvRspELG0QyMmzaHwvWnMbg7n2gpOeKiUtDMXbodNZpO797JjqsM67jOgMbNxxAB/MurIO3h2GTfpi36QLCwiJw81YU1i9di9pmbrKBaYHnWdQoaYT1+K1cnNu/hREOe0Zq3KDBBtDnI1Kxa+UKVFZnhKNODwyYvAcXb8je8cWT5+Dj1AvqbECmWq8nRizejwWr9uH4xUiE3byPhVMXQl/PDo06z0Lomds4eeIaDhy8iGMnbuLsqYvo2joQ7tN2Y/nY+TBkAz4tNuCv6T4Nm7eGwqq+F3vP9tBrEIQZa8++e5dbV21CvVrujJg4olbbQVi0Zi8Wrt2PyzeicP3SdYwLHsvJqC4NANmgrm2XWdh3Jhw3WPkbV25i3OAJUNfyQMDwA1g5dzZrnxWUjH0wY/Ml7F62DtX17aBq6o8x80Nxnf1HbjJsX70Nzep7Qo2RIz2Syxp+GLXkCG7cjmT1RuHQ9r1o1bSbjADLeb5FAdI7xY+wvsGWhYPxm5IV1PUd8GtFBwybE8EIaygjrLZQY+/DuHFfLNjy/r+5aTn7b9Z0gwp7nw3bTcLWA1dxgsnHyVM3ceLUDRw7dgUj+g1ARW0HuIdsxrJVe7Dt6B2uv3au24GWjb04SdQzdoJ6re4Ysegof2f8va3ZgiYN2MCfSCR5iTDiZ9d7GQ5cfIRnr98iJToGq+etQUNzV04m1Zi8d5+1F5NGzuIERYvJX632Idiy+zS8HHxRQc0V3gO24MjJmzh1OgynWBuPH7+MUV2GQlnVAyNnHcWsiWP5hNw7ixYRFKYju87YjdWTl8CYyTnpY1OnSdi04xhsWPv0zIdg7bYT8HH345OO0nMl4uE9fB2WzlvJyLgL+585oL7VOGwKvYWbNyMQdusB5o2fBT0m7zQxJJX7HiD5UATCepfJ5NZFw1FZy5H3a3ySi8mhTcASHLnEdALTYzcuXsMA/2Gsj6T3xvoy9u47ByzD0YsPmYxG4hLTc/4eAziJ1TNyhnabQViw6xJOkwycCWNyehM7N+xE/YZdocrk1KRRP8zfzGSclQ27/RArZi2CWXVnLlM1mgZhxfaLOJEvQ+dZ3zdz1DCoNArCgq3HYdu5F5NXF1TVdkTXYTuwfe061K5uC+1a/hgx7wBOs/ynTjO5O3kDi6fMgFE1Bz5Bx++bJgbrBGD8muMY2W04exfOUNOxQxvPRdi5ew/atKR+teis8n8WgrAKKBIEYRUo5vhnCCuBZoeNzH3gFTgLvQYuxtF7abgTegB1TBygUs0fE5edwNwpS2HnNAIDpx5EzrNnGNWtD36paIv+E26xP9UbHNi8F8PYQOhMeBpexoejRU1nBC66gT8yI9DcXDZzr11/EB7mAdsmTECbvtuR9/INEmJisX7Vdsxceggx2S8Qc+UkmtZmg2YNO7gM2oXc3FxsXLAGXbwnY+G2m8h9loogpwBU1PfB3H0ReJ0ejY61fDFv5xPcObyUXSMQV5/k4dqRPdDTtYZ9wBngZSxsWtpDhQ0WNYxHIzIF2Dp9GMpoOOPc42c4uHEjfqrUCWqsM6Z1SFo6tmgSvA0vnqbDw9wNlaoFYt/tdKTeD0P/3lPRfehq3GFk+9a+nTAxtudWHnnPtShQMgnrVkYe2CCIyZlmNc93hLWiqhWMmg3Fqu1nMHLQDNg4j8bsLWF49uQR7Bu64Oe6QTiY/jtepsZi5oxVGLfwCLLy3uLo6hWoUScQXt2nYBQbcNExZ/oK+PSYjDp1fDApLBXJBw/CSM0GqprWqDt0C169eQ7/Rl1Q3sAfWy4nITP6Pgb1nQa/QStwLeE5wo8fhLGOBWqxwXs2qy/l9i2MD1nEiNAVvHzzBotHjUNFpc5o2m0BMpjcXg09Ar+AaZi29gwusP+KroY75m/PRNL1LVBh5Hzm3nC8SIxCNws/VNH2xIL9McjNTsC0CfPRc9hqXInNxZO7F9GithMq6Hlg9r4HyMmMQ8jwmejaeyGO3s1A0t3LaFbHhRG3v2dAWBwJ682YNzi+bQFadgyGpf1QtGg3FIu2xiPpzmHUMLZA1Vr030xDcngYgvtOhv/QNbib9hw3DuyCrnontHLZwt7mcyycMQNeAdPhE7ACUanAiU0T8T9laww7EcPUVy42r9yCgZO2MIKchyd3LqJxTUdU0vPBvKOP8DwjETNGzUevoatwJf45km9dRJPabqjACEvPWceQ9ywXW7acwIMn2Ti5/QSuJebi8bVTaFrTCb/pumL2zWSc3bMLFVQ684mMTdeYAmLHmB7++G85F8zaHIvcJ+FMxtdg/Pz9iHsNnA6ZhXLlPHDgxguEHZvLynbk3iVkLSPCWtnAFWOvMjk+fQLV1G2gpmWNGn3X4AVeolczT+g0mIanb19jwgBv/FzFlhFwF05ClDVtMXVHGOLvXYK6liVM2o/GvfQ83DxxFD26T0Dw1N3IeJ6HrXPmMj1oL7MAficoEmHdtngElPJdv8kjo2PQGjzNy8OuNRvR1WcSpq2/iGe5zzDCLxjlq1ijc/8tePbiFQ6v24GegTOxbN8dvHyRgxG+g6CkYgkt52mIfgvs3rIf4yatwfYT94AXqWjZ2A2qtXrh2L1spEfdwdBBcxAcshOJ2a9wZe9WGGhYolb7oXj6B5PpA6GYOGMz5izcjqBuvaDcifV1r98gqOsglKligbqOM5DO5O6P+AswM+mMniuu4kVWGhZMXwpP76nYeSodT27tg6mJ9fs+zcQFVer2xcm01zg4ZgaqVOkE7UYDcSX1d1ZTLBw7O6CqgSCsAgLfE4KwChRz/HOElVzUzJoEYsuhMFy5GY081vmFLlsIfSMHaJLrj0EX2HWbgu69psPTbzrORWbixPb1+KmcFYJn3EHSueMwVu6A8qqWUDXvhWtpL7Bx0hRUrTcCiS9+x6x+w/BbhY6wGbSbjQ1TYFHfAe3nMyL5OhtBbj1RRsUalVQ7w8xyGp6wwdrqUUNQ3rAXGxy+wL450/BrhfYoX7UzfqzsiAWhCXh0bi/0tTuhgr4XZh58iKjLd3H8ZCwunQzFwRtxuHF4P0yM7FFBzQ5OAceRlxEOiya2qKxtC1WD4Qh79BJrJw1BWU1nHLqTjHOHDqOd1VDYOQ6GaU0XVGb30bjfZqQlJcDGxB52o/fjRXoi2rEB6M+MtPxWsR2q2U5F+qtcDPLoCxVdcq+T/2y/NxSJsCppO0BD1x66tbqjCyMTfj2mwHfAciTmvMC0QSPxb9MeCE1+hlmDx+Hnih1RtoolrHtux5u8ZDh3cMV/y7SDuf0kZL3IhXVHP/xWpTPKGrhj4tVERO3YBT1lKyizd1lzwDpksIGZO3t/7WkiIjsNNvXd8BPLX6ZSe+h1GIsnL19geJcgGLcdidScHHR3CMQvldm7VrHDgGXXkRt7DbVNnbHuahqiThyADqu3kqYdyG2P3EIrq3XFnA3xCD+/F7M2XkBy5D04tuiKssqd0cpnHV69eo4gOz8m62xQxWRds+koRGb/jjWjhsPcYS5yXj1DgK0f/lexE8opdUDV2n0RnvkSy8ZNZHL75TWR3wPFj7AOx/n7r/A7ezdZmc+QnfWcf75iA/tHF/ZAT6Mt3MYeRl7WY7Sp68iImSX/b1ZneiSbyUSgkz/qWa3D87zHcLKwxi9Kliij7IcjN3NwZMME/FTVBmNPR+PCnp0oV7kjKrL3Ytx0HJJyXmFq7yDU8liBF2+eo6etP3uPVlxH6bYcjsjnf2DNsDHQbzQCSa/+wMrgEfjJJAjnnuRgplMQqjQeicd5wKbJE/A/VXtMuRCLI5s34z9lOiF4ASMy6S/x7GkaRjLC+mMFF8zcFIP7J9dBpUpL/NfAD7tjnzHCOhPlK3hg65l03L+wDZZ2g2Fh1Q/GtFRB3xlVDF0x4uwjxB86BEMmUyrqlqjWcznSnmWhR1Om0+tPQlxWLlbNmYwOtiNhYdEHunqO7B5tMGHTZYRfPY0q7PvE7feRfOcc9LUsuGz+VK4dbAbuwMunibBo0QXqRt8vMJoiElZyq9Uw64FjUU9xcu0ylOV9lSV+qmiJ8VvvIfHGSWhU98XxR3k4tWYZlJU7oYqGLcppOGLG4UdIu30RtTQtoOYwFfeysmDf0R//7+eWcOi7Es+zn6B+LRd4jT+NV9kxaNXQCeXYOyvPdEpTl6V4+TYP/Vz8oN9sINKf56KPVz/8XNmS61o1pps0rEJwKzsHfk69UMEgEKFhmchJykXC3RMwrmGH2bezcHPHJvz6a3P88J+OGDTnLmJv7GWEVeZqz++bEValun1wMPYpdgydiN+U7LDowENGdPOQnXYHDhaOrE8VhFVA4HtCEFaBYo5/0MJazQ06JrK1e5XUbWDRayPyfn/ByFgQlI0CsfVUDFISE3H08CUcOX0LiVkvcXTnThlhnXkb8UeOopaaDbSru6OCqhtC2AAsavM2qJSzxKzQWMSc3YsKbOC//EwyHhzcCWVGEpzWXETWvTA00LaDJrlVsbJKGk7Yx8jGqS2MzHQcj0evgLj7j3AjLBp37rDP6xF4/OQ50iIOoXZtGzb4sYZy42G4/4L9r9kf+zUbyCIvDfaNWTvYYILWRtp6H8Dbty8R/SAKYbeicOt2IvLYiHfx6EGMsDph2+V4vH6eg5jYFCQkpiH67k106+iL2t3XMsIaj85sYBiy5gYPHHSNXZ/aced2FK7efoxcdrllAWNRlREvec+1KKBIhLW8siXqdZqMy1HZiI2KxqGDF3HiUgSesfczZdhkRli7IzTpKSYMmoBKWo7QM3SEcqvBuMEG4v39h/GBWwvPmZycuNr35u53ldkAe+SJKDbAy8adm+x9h0XhQUIm3qTHw8bEDYMXXsDrvBxcZ+/yNn+X0bh6KwbP/gBW9RqDaq2G4Ul2Jnxce0NFzwXq2jZo2WUOMrLjYWUxGbdjcrFwVH9UZLJDruDkEqhr6oIq6l0xeVkEfn/LKmLH3OBB+FXJismGPZxWXUDOw7toqsUIOne182CDVnusOxmNI1s2wTHgEMCI0Z2wcCaf1KZHuH4jElmMDK1dtAIV1e0+er5FgeJHWGUW1pO7FqFN50GwcRqO1h2GY+n2BCTdOQAtVWuMW/wQr55n4MaNh+/e5/XbsXjJ3sGAgOGo02kVI6zx6Oboyt6nMyN7vXHi9jOErpcR1nGnonCc6bJKmvbc/bGCoTuW30rGqulz4ReyE5nxD2Bk5gRtWotcnaVX7YKlB1NwZed8tHfYghdPH8OmKSN7DYbhcsozLPYfjp8rdsam849xMXQ//lfVlhPWXctWo5brYmTkJGKE/xpExWdhXGB3Tlinb4hG+JnNMNC1QKXaQdgf9xynxjHCWt4da0KT8CbvOR7HJiMmJgnRt27D36UPftVwQPDB+3idk4O7+XJ+Py4Db56mwLuxJ7TrjkdE2h/ITk1H7ONUJDLddvHAYdSpbo8RTPc+uHIclVV9sPN0FiMeiUy3RXLddjssErceJjF5zIGtdS/2H/5+k3GKSFh1TRxgXG8iolL/QEIsk72bsr4qjMljVFIWEh/eQiOLwUh7/hx9/AaiIitDekNVyxbtvfbieWYkbBt2RiXrybiTlQ0PpsfKKVnAc8g6lpaIWvW9MPFkEh7v2A79qlbQYWX1iUTW8sXppBzMHDUFOg36svpzMbjnUCjpyJa26Bs4Qt1yHMIysuBs2x8jN99BxJmjGDH6MtJiGUk2toDDsEPIYOnHDp7F9l0XcC8mB+Gnt6OaHMJ6KDYba1hf58LKpMTdweCBu5HO2u7U2UkQVgGB7wxBWAWKOf45wmrWyB8mtHbUkBFXPXtUqNUTN579jlVBY9F51GG8SI1GhwbOKKtihf8qW2HEkUicP7hPRlhn3UbcocMwY2mabNBaVsMNS88m49rajVAp3w5NfFYinQ2IunefhYeZuQjxHYBfK3eG/bjjyI17iFasc1Rm19U1Jhc8P5yLysXRVXNQpdEoRGe/xLrxs9DZeQw8fSbCtcsYWNkPQXuLIBiZMnKi5YF5eyIRfukqDpyOx82Lx7DtSizuntwHIwNrVGaDUAf/o3iZE48R/cfCqctYuHqtQvST11g1fjC3sB6+m4Lju3ajZgM/1G8ZjC3n0hFzejNaBC7Bk4R4WBo5YuCKS0h/dBOuLkPh0m0CPLzGw8FlJCxsh6BxQ19G+P++7VkUhrCuWIZ/K9ljxokExF08DiNdS0ZALfBfYx/seZyNhWOmcsJ6JCkbY/uP48HANHRsYNBhPBKe5yCwS2+UZzL3MWH1wLgLj5F07jy6uYyCs9soBCw5hpzMZDiaOqPn3FPITrgPT/dhcM5/l46u9C6Hol5tT9S1CkFyVia6OgZCSdeZW2g7dV+HpxnRaNuiHy7F5GHr7HEoo2IDPUZWKYBNVV32PtS6Ysbax8h+fAdLVp9nROExurTzxm8k69NO4k1yNNqZ2jFZd4eeiTMqaHpgf1gaDq9eDMvu25CXHYcg/xFw8BgPT+/xcHIfhU4kXy16MDL498hXcSSsfA3rgsGM/FsysmmPXyra8zWsyQ8OQ0etE4YtDkNazA24uhb4b7L3Sc/OrJY7Wjpu/CxhDWGE9cjWbSinZst0kBMqGXrhaHQ2loWEwG74duSmx6ERI6xVDV3Ze3NCWW1v7LyRg7Mr5qCp5VLkvUxH17YO+F+tgbic+hwLvQfhv5UdcPBuBs7uXM8J68RTD3HsyCWcfZiFjeNDoGE6EUmZzxHCCOt/yjph2obHeHR+KwwLE9YKHth2NgNhp9aifhPSTwOw9tITJJ87CU1laww8HonUq1fh7ToKLkxe/OYeQnZOBvybyCys8VnPMX/CMNSs3wMtHKfhQe4f2DQ4BEMXnsT9KycZYXXD5jPJuHN6P6wchsHdeyLcu4XA1mk4LGwGobp5N/Yevh8ZUUzCygii+TCEp7zAtiUL0clhlKyv6jqW9VVD0bptT5i2GYzHeW8wrfdIlFO15ZNclVSt4DTyJF6lRKCdWSeoW01CDCO1Hg593hPWrETUNvfEqJ2PkHb5KAw0O0PThOkcA3uomffD/ayXmDJoNHQb9vskYb2YkIIlmy8jlfqyem6s3ivISbiMpnWsUZHp1A691uINGxZf3HsIO0/GIeL8TrmEdXd4Mo6vP43HcRkY5hqIxg5bkPs8WhBWAYEiQJET1krKzfjAkD4L/pZ9l+21SqhY4DtBKkN7r9J3CXSuYD4pr3Q9WR46J6tf+i1DwTo+rI/yS3UIFCf8/YSVIq2qmnhjUWgUrhzcCfNarmyQ7gL3IfvZHyUXPlY+6DgiFC/TEuDQsisjHY7QMw/CjvBUnDuwhxPW/lNvIfPudbSp4QQlPUdYBW3As1e5GObTj7t8Klfrgd3XE5GQ+hQJt66iSQ2KUugIs2ajEPn0LU6sWQYjNhBU0XdHwJRTwB+56Ovgzzp2Nyw/Fouoc8dQy9iOk+UaHYZj/oINaN3IlQ0wHRC04DRePY1F53rdMH1zLK7smg+9+v0QkfEWhxctQMWKnWAfcBIvsx6iXf3OKKvaGZW0huBW7GusnzKUE9bjD9OxZ816/FypAyqouWPh3mQk39iO1n2WIjUpCY5mjqjuPg8pbDAxrucQ9h+yRCVtZ/gM34yR/SZAiyI5ynm2RYWSRlhP3nmBCwe3fUBYL0axZ75qOf5TxQ6TD8biybWzqGvmwCNf1rSagDvZLzFn1BT8u5o/DiXnYtOcxWygawNNU1/MPxyN9PuX0LCmI1S07NCiyyw8e/0CbgUI66TrSXi0Yyc0KnRE+codUK3vGmSxgXw3c1cY2E5DfE4uZgSPYs/FEhW1HOExaD3GDZ4KNTUr1LUZh9S8XIztOxKVNexg2Lgfjt3Lwu29W1FVpRMGrb+JN2mP4W7RA2o6TqjLZLLfoGnQ1uyCOZuTEX1uHSqp22HOsTg8j7mLxjXtodd0LGIZWdg3fwEbSNJaale4DduL13+8wFBnX6g0HIjbaS+wZcZ0KKlZokJVe3QOXILJE+dBz9iZPUv5z/h7ozgS1rvxv2PXR1GC2QA+/Aiq6baDudt8pOTmYnyvQXyNaCUtV3iN2YihA0JQuaol2rhuwYtXifByek9YT93NxdGNE/GTig1GnYjC/fOnYGREUVJd4T3xMF7lpqFre3dotBiH2Od/YM+8hdClyNH6LnAbtZcN8PMwwDEQFZluOx3zAuGnDqBW5xE4l5CF2V7D4TRoD/5guUZ4BeEndUcMD41g+hS4dmgn9DXaw6jhXKQ+zcPY7r4oY9oX5568xdEFi6BObuZ1gnAwIQ9nQmZxwrrzQjYuH5rDyGUnlNd0wbjQWGRdPg8dZSsMOReLhEOHoF2xIypU6QB9/6XIyHuKAO4SPAXJz55hXF9vbvFVrheMy9m/Y//wKRix8BQeXj/HdEInOI7Zy4hRPLp09kFZptuqVvPD4Dk74Ovenz0r9k7lvJtvhaIQ1vsJv2PHkvw1rIx8qhi4YNKeB0i8fRENazmijJIlDJsPxtTF29GelgVoeWLe0cfIfHATrRuyZ6Btj+rtRuF68ktc2LQBlSpZwH/SMeB5Ijq17ILyTC91GboeL56loLG5I1p0XcEk7hWm9h/JI+OrGTASu/I6fn+aAMtmzqjWajAyX7zAkMAPCauaxWhcyaG1pqxs36H4sYwleoXcYpe5yvRSZ1Qw9MXq83F4eOEw1KpYYNC8+4i7SWtYPySsVer2xrb7T7kM71qwABUqtIeFz168fBEDZ0FYBQS+O/5WCysNEIkY0mf5yo35OU3d9tDQaccUdmuoa7WBslpL/r1MxYY8n4ZOW9bpyPISsSQCq6rZGmosL0FFvdUH1yDIiOj7P6iqZht+jYJ5lFSbo4JSk/z01u/aI1Dc8PcTVnJN1GSdbVuvRbiTlI2UxCcIj0zCM0bONs5fCG1dRhJq9MLiwxFIS0/FtWsPcO9BAtIzcnFw+zZOWHuNvsz+Um8Q+1DmupuWko7VE2dDj3WsFOSjKiMVrmNkgXG2zZwJZXK9Y9emIExt/MnamY24qFjceZiErKxMzBs3madRdFeT1iNw6E4KMp4k4trNKCRnP8fdC2fQqLYTmnutRGZuHkb3CMa/yzlhyd4E3AxdjSqV26KF/zpkvXiO4G590bHrIeRmPIR1S1prIxtw3IqR1rA6YcfVBDxNS8XZ83cQ9iAJTxLiEOjSE7W7r2GENQHu9Tx5voCQg0hJz0H47UjcDU/C04wMLBgxHlr6+VsT/E1QJJfgCmyAbNZmLI7eT0FqXByuXIvAg4gneJqVh4lDJ+LfJr7YFvMMr3Oe4vZNlhadiYSo+/CwCeTkQUvXXq6FdcKVBETv2gNjRjjVtW1Rd9AGvobVt4kXyqo7wGv4LiSzdxlxJxJ3mDw/zcrCypApUNewgrnVaMQ9f4vs1GRcu/4QManZeHD5FFo2ZQNNXUfomvfG2tAoZGeyNt2KQmLGM9w/cwymmp6Yvj4Bjy5tg552B1St1RNHHmbhJrt3XW0rdOy7Hk+ychEbEYNb9xKQ8zQHq6bNYfLjwJ6NEyx7rMbjJ0/xKPwRwm7HITvrGfbOXwZDYyfoSoPHIkZxJKy3H7/BjqUfEtYxC5kuuE9Rgq1RRdsV3UMO8fd5n95nOJOf9CzMGzIRVRj5b+2y+dMWVkZYB+y/B7x5hYd3o3HjdgL7z6dg0sBxXJbUmMw6sPeWnPkcMeExCLsfz95bNtZMnQkdA9k2Og07TcbFiDSkp2UgJ+8lUpLSkZaahsUTZzL5dEBFAzeMPPUYuXHhaN/YA5V1bFCjyVw8SX+KYN8A9FkRhoyoMLRr0oWRESdUYYS1oEvw2tAk5OZk4N6daNyPSMaT+DgM8xuAX5gcjzj9CPGhoUz27Fi/b4uaQSvfrWEll+Co9Lfs/xKBsxfuISIxC4+unUMLcwcMX30R4VfPQNvADlWNvDBl3XWm05/iFvuPPYzNQmZiHPp7DJBtLyXn3XwrFIWwFg66pGvEPhsEY9f5RCYHqbh+PRIJ6c+RcO0qLFt6s/+3PUyaDsThsFQ8TU3BTdaXPXmai4fnjqNJTXvU6BCCGPZ/XzlxKiNdTB9o2cosrNlP0LoZI7BargicfRKZz/Lw4G4U7kWkICstDWN6jEBlVWuYdxgq18JKhPX2699xft1qqDP5qKTuhF5jbyI77iLqmFij3/zLeJYUDUsmlz9VckLIsnDEXNvzMWE1D8KemBdIuHQctckTivXhlt57hIVVQKCIUGSEVUZOm2Lk6Hlo0rwLxoQsgmlNW8yZux69+kyEvpEF5s7fgOkz12DCpGXYuPkghgybjZmz12Ll6l3w6zEGE9n5Fat2wcd/NAJ7T0D7Tt2xYNEmzJy1BkuWbcPceRswg323se+Df/2vBie5VDfV27KNN1axeoIHzcDipVvhHzAW4ycuRdOWXTFsxBzeHlePQfzaa9bt5XVQeXn3IvBP4p8grEzRM9C+pEb1e6Fb4FwMHbkAjkxGaG8+6rRo6wMN067o5BaC/sMWwtllMBo0C0LjVgGorOaEAdPDkHjmHDztRqPXwJmw6NATGmxgT3sBGjFCXKlKe7TovRVvX2ahaycvKLMBnOy6sr3jTBsHwafPXAwaMged2nfn2wPI9suU7a2qXcMXLj4zMGz0EnTrOhSG1VyhauiGRh0GohMFEjGgyL6eaNCqP1q07s7XoakbuaKxxWC0bd8TpnV7oq1FX5jW8uAunPrVvdGi40A0ZOSFIgI3bNsPFnbDYO86GnYuI9CsmS/fl864QQDadOqP6jVpEE/re51Rv9NQBAxZjODgWWjX0h+0h6tegWf5d6CkEFaaDNEz64qm7YPRjMmK5FpI5L5Zh/5o3Lw7fx/0jvXq+MPZdyoGDJmHTp37olGrPqhXvxsqNOyNQ/FZWDR1KUufjh5+42Fu7smIsDOTH9meqSZ1fdHWMvid+yLJjnm7/mjVqiff25DyGDXsgTYWA1Az/12qMzJi3n4Qug9ajEGD5qBjmx58uw9CfdvxSMzMxPAB0+AVOAfduoxENTPXd3v86hg5Q9O4C9q7T0DwyCXw8hoGU0akNBlRrt+SXbdtAGubO98L2KRBT1jbD0ZN2jKHyXWtdoPQbxzrC6Ysh7VlEJd/+o8Z1mD/BZZeo1lf+PWfj8HD5sGyc29oMwJD9/Pxsy0aFCfCSvKjbyb7rzZu5v1OfvTYf92cPac2HQKZfpG9X1VdZzTsMAS92H9zANNBrdl/U5O9Y5KvauY90LZzP9QwZ/LI6tAz68Zlsklzb1TSc8GYExE4f+gILNwmoG+f6Wjd3A9V2XshOeU6imSlTTCCx6/HtEkrYGcZyK1cfK9opqNIZvSre8HSfzmin77E/nmr0KyxN3+3NNFAk3Z1mTy2aO4PbaaX9FmdhjX90JrksW5XtLQehpZNvPm2I6SL9dj/u0nHYDRt7AtdE9Jr/dDJdjjTTaNg5zwCzZv7QoPpZpKLOkx3tW4dCENJzht0R5vOJOfsf1bDBy0tBsHScSTTbaNg6zQMtWqz+2H6sm7L3mjZrhd/xhQ0SE3fHW0cxmLAyGUIDJqMBvXY4J/Wrn7nfqikE1Yuk/n9R6MCMintS6pl6gV778kYOmYpuvmMgRn7L2nSnr5M71B/qlfTB55BczFj7lb0YmM9EzNnRvacYdawF2wcBkLf2Jm/V3qX1ZnOatu5P6rVYv9J6vPY+2hqOw5jpm7F2DHz0aKFH5dNknGj2l7svQejdn2vd20iy69eHSYD7HytmkwfVXPnabUa90bbjkF8D+I2NsPQnPV3mhRBmsmqefO+aNWuJwzNmDxJ90z11GD/GSaTDRuw+zB24y7NpvV6oh3T1WZ16D8lPZ9/DoKwCigSipSwVqjSBMuWb+ckdP3GA7B36oe9+04y0rkZfQdMxbwFG3meatVtsHb9PqYw/Dm53LzlEK7fuM/JbN2GrtjEyCzlXbh4M06cvMw6jwmMCM9Hn36TMZYRz+Urd7KBXhf8Uq4+G9TMxpGjFzBx8jIcOnwO02as5mTYjl1746aDrC3rsJKR4PkLN+H4icucxHb1Hs6vWzbfqivvfgT+KfwzhJVAAyWKFExEjfZjpZn1gp0QuQ6rM3JGG5ersw5Wy8iFdVwuUNJwwdD5D5F15iRMKnZAZTbopu0TeGfHOjVNNviy7LkE1x/nIfzoXujr2H80AOfXZeXIekWb6xe2VvIBVX67KCKrbBN0T+iycrT5PRFGPmAgIsEGB7JBFlmO2QDCmDppRjY+uB9ZmrShvhYjFnRvEjTZoJI2TqdN+DXYvfL688tRXtrwnbeVDz7ft/PvQskhrATZM+ODNvaspfOa7BwNfOgcPVvaB5i/Yy4DLjxdh72Lyk3648zT15gyeDx+qtSZy6eWyYfrOWlwp84I7LvBI4MOK0/vx4CuyeRBepcke3LfZb7caTHy0cB+Ip6/fQEfp574TdmatcuJT2wUvKYe+z8QUZFkktK5DLIBJ9+fk8kP/SbZfiejDERiq7L/AFmb6XxhV19t9r+StUmW/vdPhhQnwkqQ/sey50vn+HOlSTT2zug5S/nk/Tcpr0x3kXx8+O61mExWMXDF5MsJuLB/D36p3InrIS43PJ8EWf7PvTcdXVuUazgYYc/eYKn3EJSvavtON3B5ZLrpg3oZIeDyyGSW6y32X5DSiCRrsTRNJudcplh6Yf3E743hXb30bOjZF5BzskYTsS1YVpvX2YXLpez5ya5J+4TS5BuXZ/YM6L8ppX1PlHzCSvhYJjnYdwpeqF6gryKSyN9Nfh6u55iMKmvbF9Absok36lff9VHsHK+LneOyRnVQf8quS1tmkRxKckD5iUDy956vh6TrkZzxvo7Os9+Upsv+O+pM7rm+Y3KtQX1mAX314f9KhncyyfpTfo7l/bhf/WchCKuAIqFICWtFpSbcWhoyYQk2bDqA2XPXYfuOYwxHsWjJVqxgRLN5Ky9Ur23PCO1+tGzrg+07j2LSlBXo3XcyVqzaCf8eYznppXoOHT6LSZOXI6jvJIwauwC9+03BiFHzcOFiGC9Hbr79GBE+euwiwwWsWrObW3T3HzjNSe7mrYc5QV29Zg+30O7YeYyTZzo3dfoqlKnQQBDWYod/jrB+GzygquMKzwG7sWP+GlTXceQRDN+lsw5XuZYfQnZfxZH9B2HZ2odbqT6sQ+BrUbII618AG9xVrR+IWXsuoJfPMFTVk7m6FSWIANCehrsPn4e9ZUCpk1fSO8WLsBYh2CC/Khus91h4CPOmLWLy9e1bB1HUVo3GA7B0/yUMchrAyMPft81VSYJiENbSAfJE0TZx+whEoD+VpiMFh2P/LR32myaJPqg3/zzfS7jg+e8AQVgFFAlF7BLcDK7uA2Fayw7uXYagZ9B4NGjsDkvrXtwFl9x+Bw6egdp1neDB0om4dvEaDjWttihXqRF8u4/mrrtNW3SFk2swbB36coLbrqM/LKwD0bq9HyysAjFyzHw4ugxA+SqNWVp3+PiN5m7ETuycg3N/do2ZcPMcDM9uw/g1nN2C4dF1KBo382R5R/HytVgbxDrW4oiSRlhloNl5XdYRyUvjMHNjxNYO6tzKVoIGtMUUpYaw5oMGR2RBkJdWFKBrUVTevyvQUXFCqSKs+SDrFrlVykv7WpCsFheLU3GEIKwlA6T7qpn7onYjf9Ru6Ica9fO/024CtbrAuLYXajTwg3mTHu9Qm/02q9ONk1ID9q6qszLkzvxej3pw7xgzdt6sdn6+Qtf9KxCEVUCRUORBl34tV58HTfq1XD38XLYuyjIi+lv5Bhw/l62HXxjILZjS6ZN+y6L2NuPff/rNnLvqUj0E+k4ga6jssyH+92sdnkbXo3M/l6nLQed+K1+f10HXo/qIlBasi879yNLLV24EJVUakMi/D4F/CiWVsHqwNn+685ERDvlpAl+P0klY5acVFUqrzJZawvqdLD5C130egrCWBLhDRdMTw2dfQmpaFlJTspDCPgmpaSlwd+qL3rMOs/MZiI19ghiGRwzxyZm4tGkHqqlYQMdmCu48SceUfn2hrCvzNlDVskOnnuuRmJaN0ImLoKdpB92Prv3tEIRVQJFQ5IRVQOCvoQQRVmpfNTfWsdmisoYtqrBPAn2vasAGrjW7QNPAkXVWDlDWouiENnyLG1pL874eD9bBOKAyS5PS+Zqe/HT6pEjBUnpl1sHJ1nXRs/HgW5rQehsjdi1ap6bMrk8BRTT07Qu1yQbKek58YKpC0TSrydaGSe2g71oGrJ16ztAvAQPukkJYDWu4c8u6qoHMsk7QNnLk0V71aM0Ue4ckI+/erwZ7N7RGiuelYDYfvscq9F3LAbpm7B2x901ruWitGC/P0tQMZO67VJbkoaq2Ha9XJlsUAEe2Xoxm9ikKJ6+b12/3zvWX0nUNndh5mwLyYysL8pTfLnIbVmLpsrrZdd+V9WT3w+SIR+mU3a+eqQuUNO2Z3HvCyMydR8wmK4NUF8k33ZMeuyd57VbmQVVY3fnPtKgha3PpIqwcTCZIF0nPvQp7Z1pcT0jywmTTKF/X0FIHJhe0zl/9U7om/11r5tchyYaSFgVoYsSrmiuvg8sfQctetj6Q8rLr0eBerZBHCn3XMXaCEm0tRvkKtr+EgO6huBBW0j/qOjIdIv2fyS2c/9/Y++L9k/77/on3P3zdvUwmKPCWJC8q9M5ZnUYMGqxOSbdIuoMmMfj7ozWo7P3xNvB6WJ9E79rQne/nWlDvyHSTPXTYtTT17KHC6pHpRvYfZfKjxNojW0dLMvJhe0inSOtWP7hnagOTIek61D7l/H73/VpbD5bHE80tRsDDaxyGrL6EN9kZmNhjEtz8JsC0ljum7r2D19HhsG8WgIZte6N2056YfDEOqWdOwaxKB+g4zkYaG2ovGjaARy3WZXpfw7wPTkS/ZGeBy3NWQo/2PS7Uvr8CQVgFFAmCsAoUc5Qcwqpv4gr95n0xYMJGzFu8G4uX7mXYg7lzNqOH+zBoaDnD0mMG+gfMxIhJ27Bu0xGEDJuFWmYuMtLJOmpVHSdYeM3Csg1HsXHzUYwfPhNmZk5QZwM3oxps0MYG601sJmDBGpa+5RgWzlqN5vXYeX02OKjtgz4jV8LFaSAnRWpm3hg+cycG9JyEbr1XY9nq/ZgxcxMmz9iCpasOYPKgGTCt3xN9Q1bDrlWPAkFFKKCKOyzc52Jg9xAYU7TEQvda3FASCKu+Ga1p8keP4FXw9ewDbWNX1mY3tLKZgVEjp6NmTWdoUuRpj+lYvJbe/zEsnb8ObZt3ZYM3F5a3K+y7zcf0eTuxiMkWYcHiHZgwdh4a1HWGceM+6DtkLroHz8Xy9UexYvFmOFoFQFWPAtm4w6R+IIJGrscGVi/J1ujBkxlJoEBhbjAy90WfUWswd8EuLFm+H/NmrYV1+wB2TRfezoYO4zFp5lbMXUgB63Zi9pwt8Pcdzcq6soGjA0xbBCNk/n4uk+tWbmfX7YmqTFY1DT1g03U+hgway8ipMxv0uaJGkyEYGbIUbVq4QbVODwSNXoGO7XvydmjoOaKp3RSMGT0b5nXY8zFiBMjECz2GrcX6/9/eeYBFlSx9f9/vvffde+8m1zUrKknMOaxxzQkVlaCABBVRQFHXnHNAxADmHFExR1TMmDGLCYwYACVHUdf/19WHgyM7pt1l7zBUP8/v0Zk5c+bMnKK6/13V1eK614u/mWH9JsBYCJ2sLSZyGDkYzoMR1jJVnWHpNh8r/MXvLn573xlLUa+GECxUQE74moFjV8DGahCKG3aGQWUXjJmzDQP7TEWPAauxbOUezNTwNVOHzESFmm7wFPe6U5Pecm2fgbE1mlh6C9v3Fj7OEmaNh2DE9A3wW7wTS5bvhvfURWjS0EkWwyldsxd6j1uJ7hYDoVQVVq6T/t+w3XSM+tUH1YRt/ZWD/b8Lsg+dEKzinpeq1hP2A+ehz4DZmLl4P9au2wMPMUA0FP0LCTjTys6w6DkbS9YGYb34W184dw2a1O0OA6qeXK0HurrPw8oNh7DOfz/6dR8FY/H3bFBZ+K0BizB73jYsWrYbixYGoIf9YFmMrbS4f/Xtp2PQYB9pc6ZCdBqU6wGPUSvhaO2BBm28sEjYj9+8LZjitR7zFu/C4vn+aFanJ9qJzxrQYyxMzWyl4DSt2Q+jJq5AuzbdZfEl2j+4o4uvvB6yX++JfqhWpYucAFTEN0EFvmzRyHwipvpsxoLFu7FEXOOYET6oUtUeRqJfVn8feg9d80+F26DBiG1IeRyBzqaWyFdaiHEhlH12X0fStUuoXaojiggRnq9kZww8cAfPjh5BJfEeI6tZePr6NeYN/1UIVhvxHmuMWBmCFzGPcToqAZf8VsHEgAUrw3wIFqyMjpN7BKuJcWeYdJuNKPHnFLLjMPwWbsecZXsRmvYWN/03oeA3HTB+6Q3x6luEnruKHTvPIyrlLW4f2ouaFaxRwMgKLuP2IOnlK5wMOoFl64PxJP41rh3eixpC1NKsc/Ney/E44TUuHjslzr8HIWFxiLx9AS3qiter9kZ40m9Y6jUH/yhkiTl7biP5+V10Nh8IJ8+1mLdoG+48TUJa7DMhdnbAa5AXynaYhIfiinzth+Ang86ZBSLsUaiEHSYuf4DnQQdRuUTH9wtH6SC5Q7B2ESJuMM7fBY6unoGiYqBfuKQN+k0Kxdv4q2hUzRwGdYZj58m72Lf9ILxnb8bRy8/wNDQELYUg/a6IM5bvikNGTBgWL96KeQu3YcveR8DrSNg06YiK7SYhVtzL9Kgn2Lf3KM7ciEJGQjQGOnnix6KdYDnIH9eu3sSyRZsxd+URPE3MwJb581CsVAdUaNgfz9KBiyfPYPaCHQg6dw9xTx/CqUMf/FDUAl19g4E36TgRdA57D57H8/S3OHtgH/IXNUeF5qMR8igeD29eF4PRbdh39gFSYiPh3rUvvslvjVkbniL+4V5UqGSB4kaWaGCxWnQ3yRhob4N/1x+Ja+mvMarvWOQv1h6l6gzA6acZQOINNK9rgfxGzpi99RZei+8RsGoXVm49i4SMdGzxnYtSxsqextp+67+SvChYjcysUa39JBy7cg/bN+6C95ydCLkbj9vHg1CprCVK1XLHA+G7Fk71wT+KWGH+/jAkRoXBovUAdB+4Tvia7QiPShH+54kQATswfdB0lG0+AeHiXs9xGIqfineAYYMhOB/9Gog9jVoVm6O80zKkCvs9uSEQvosDceZaNJ6Enkermtb47ueBOPkSCBzrjULCHknwkmgtVtoaTsPPIv1mKJoK2yqZC1OPdUawlrfFTzXd4P8gRfiUJBw7cga7gu/gzW8vsc5nLkoYWKB8k9EIDLmHvQH7MWPWNpwMjUbE5TOoXb4zqnbwwuV7z4TvCsSG3VfwMjURE92H458mDlh+LxnJN29hnu9WBBy8hoTEOMzoPxr5C7ZF15Vn8PhuKEyF6KTIrd2Y7cIKgO2zJ6BW06my39p9NFQ88xbbAgKxwM8f9Wq4YOaZSNzbth2mwpbyG3bFuI1X5fvG9OuJ/xTsjB7jA5EsfMWRXYcwf/lB3I1+iZtHdqN6ZRuUzspq6oYiJUW/O1L4NyRgw9rNQowfwp0nSQjZswMVRb9slC01vqRRZ7QYtwspTx7DjjJmRJ9Je8rO3HUNSdcvo4GpNUoJ8V3YpAuGBIVpFaz5CrdDrc5zkfzbb5gwdCJ8b7zAzYVrWLAyzEdgwcroOLlIsJpYwtR+DiLSUzGsmQu+zt8a/1OsM2ZcicItIVgLfWeBCcvv4OnNo6hcXgzGi3ZAbRshcDN+w2y34TD6eSwei/8vnT4dBYu1ww9F2qN6m5mIEqO4tePG4HtTVxy7l4RDi+bim29/wVf/1whfl+6JHbeScWjJEhQ3c8Slp4mY5bUQw1ecQczjO2jXortMlzMw6Yyvf2iOBbuu4Orx/fiuQEsUKNIOBp2n4nZ6BuYJJ0ARFdqXtbBhJzGgtMPYRXfwcM9eVBadKAvWPw8J1uImgxAcmo6dfmPwrx9b4P++awOHwbRRfQh+qd0ZJUy6ivvQHbUb9UGV2j3Q0HIGIpJeYs7oMfhnPnss3x2D0KDl+KlgM/xbvL9e+81ITXoC6yadUNF8MmLS0jCixxDkK2KOQmbdseDgE7y4chTVy3dC8TK2qFKvD2rWd0UFisbPOykExQM0qNYFpvU8hYBNweAenvjqq5r4tuavuJb2FitHTMV3P5nDbsFJRF8JQe2SFvhW2MPqE/dwZv8+fFukI+YcuIsHZ4NQqmgLfPV1I3z1fTtM2hiKp5ePoVQxS0xeeR+PrwegWImm+E/+lqjwy3wkpr6Ap50Nvqk3HOdikzHUdTj+VcAaM7fcFsIYiLt/FvUrt0Urt81IT4mGXYuu+Oqf4tz/9wsaOK5GclIMXC1cUCwz5TknyYuClaJJFP0yE8KgTsPeqFKrO9q4rER8WjJGOvRCocq9ERqZCO+p8zF6zXk8f3QTbZo5o7CxjeJr8rXA0sBQXDy0B9+Ie07+rFTbyQgV93pG1wH4ppg15u0KkwIjKuwQalVqgQrOyxAXHw8no/bCBn9G+RZ+SM1IxSg7B3xd3RNBsWnYN2kuylV0ROWaTjL9vYCBJRyGBCP20kU0MbZiwfpnEIK1gBCsmx8lYvuCxeKemSNfCUv0GhsEpDyDbWt7FDKyQZkaPVG7YR9UFTbRuKsvnqW8gp/bMBQzs0PNuj3wn+9+wf8a2OHggyQcXr0G/yxpi5X3E3DSa664r9Xx1Y922HQmGTd2rEHhAi1gteg47ly/BAMDc1Q1n4k7z3/Dm5evEOA7GYUM2uHfPzRD657CFpKfo2GdLvimoOgbTbvB5+RjhG4MQJHvm8Pi141IFn7j1asYDHbphpJ1JiIiMR1zBg/F/5BP+rohitQYidsxL7F0zHgUE32iEqXvhqKlrOEy+jSSX5yGsUFNcY0NYTV6O16lRaJxQ4f3tlci/qxg9RvSD/8q0Q2bL8Uj4theFChjh+UPk1iwMswnYMHK6Di5TbDOxqO0VEzo1B9Fja1RoIITfK9H48b6jVKwTlxxB3fPboVZmQ4wrGCLH4s5YPnBaJxe44e2g7cj49kDtKtohaK0dquSPX4q2QmzDobh7N6tMGk/BVGv3+Jy0En4bz6OHTuDsW79YVx98AqJ1wNRqbotDt+MQWRCmui5E+DUuju+L2GV9btRRG954HWEnjosBjtWMDYRA7yOk3BJ9PQvnkQi/O4z3LwRhvne81DawAYj593Cg90sWP8qpGA1/hUHQpLx9O4NbN5yDAHiPp6/Gou48JOoX609Slbuh0U7buDZ81hcuxKGq6EPkJwuBoQz5uAf39ti2c4XuHVsHUzKCAEqBkmt7XYiNfGxFKyV2gn7SIiDg7W7sL2uYhDcAS1cFiMp6RlaNeqCBp3n4GpYNCLuPsTlq+G4cf85XkU/gX1tBxj+7I47L9Jx4/I1bAg4huDLTxD78BbMGzrixxKdYDc/GM+vXkQDIQryi0Hr2pP3cTJwJ/KX7IuQexm4f+Mq1m84ImzyJAI2BuHwpcfCBl+gYgVHjJp3DakJj7Fzx1Fs2XoM+4/cxauMZ3CzsVYEa0wSetsORLuhOxDzMAzzZggBFHEJtat2QN8NN/EqNgpbNxzClh0nsW3bUWzcflEKnYUTPFGgdM5v65MXBSutSS7bZDg2nbqP6KhIXLpyF6E3HwsBmYzpw3qjQPleOBUeq/iajHjYNXfC9wYavkbY5ppDt3Dl2AG5jtCkjBVKt5mE0JhEjG7jAetx+xD54AaWLLmIyIhg1BaCtXy3RYgSQuXSwbPYsP0ELtyLwYPTR1HbpCPy1e2PHREUsX2BsLCnCL9zH/7L1qFKOSt0GXAMMRdZsP5pMgXrtgdxmDthJn40sJSp94XrDcKF2BSM8hiOApV7Y+WhO4h+/hyXr4Tj6tXHSBT3bO30sShcvD0MfxkC303BOH7lEV4nRcPdqg/+z9QR869FIzb8HrYGHEHgiZtIS4zBEHtP5CvUDjaLj+PmxTMoUqEXDtx+jqCl+3DsbBx2L50m19IWN+wEa8+lQrC+gHnLnjL9uKCZA2aejMDFZatQttYo3I6Lhb/vLjyIisaQ7rao5bkVb16n48jOo9i0LVj4pRNY538MkSnA5f1+csmMUghMEazOQw7hdUYcgvYfRcC2s7gXLd67bgUMTTr9LovjzwrW6X16oeWAncKDJcK5tRO+LtMdayKSWbAyzCdgwcroOPooWLehbFkLGIvvlE8I1iUHooRg9UXb4TuQEf0Q7atYC8FKaUjdZARh5oFwnNu7HcYdpuLpywxsW7UdXrMD4EdrCX03YdzEZfBwHQmzmj1w4kEynoTfwbm7z3F0k7/scNX0J22CtVTHyQhNzcDOOavh3Gs6fp2yA3GvMjDFYxQ8Z1xlwfoXokZYgy6mIOxiMGbO3gjvWQHYc+QZ4u+eRJXy7eGx5BKSIu7Asm1vmIqBkFHjITj4OAnLZ/l+tmB1svFAMZOuKFHKAs27L0Zc3EO0Nh+K43eScGzdWlSr7gjjcl3RdsQWJMZEw6kOCVYPhMekITjomFwrNnd5kKx0Oc1zBPIXaQdLvxOIvX4Fv4jBWAExEFuXKVh/KuWBi/fScP7IQUz23ihtcu68zZg8ZSWGDZ0lBnfdMGHRDSQ+v4V58zfAZ84mLF9/CS9fRsK9ixJhPfEkGlNmbsftyCSMceqPDq6HkBp9FbWrdIDnhltIuH8Hs7zWYvb8bfBdsBUzvNdi5PjF6NC+57tN+3OQvCZYaS1hMVNbzAu6j6fXzqJFox7ie3RDrTajcD82Fj4j3FGgnAvOPk5FRNhthNx/gaD1a1HapHNWAbkPCdaL4l4vH78FDyMTMbSrJ+yGBSMx6pQiWB0WIzrtJQ6u2Imp3uuxZGMwHty/CxeL3vi2Rl8ERqfivP8O9Og5DW4j1uBe3GsE+Hijk9sBvLjAgvVPkylYtwrB6jfRR/xti/tmZo1iQrBejk3Grz2HYODS84i5fx2dWroKf2aHCvXG4uKjVGyaPQ6FhGAt+bMnRngHYO6SQIQ9i8e6idORz9Qe86+/wNMLl+EzfR1m+O3ExbuRCJi/EIWLmcNq4VGEnAvBhLVXEB16EhVM3LH/Yir2fUKweh+7h3P++7A96AnOBKxG+VqT8DRB2FUPW9T23IaXSXFYNdcf3n5bpV+aNXsDRo9fhu5OA2AkvqvyvRXB2n3oEWSkPcPKJf6YJvzY+gM3EHb+LNrUd5T1JTR/pz8jWCNSUjDfew5CnmUgcKEfihTvgJ+qubJgZZjPgAUro+Pol2CllOCIK/tgWrolvi1kjmodZuNp+itM6zUYJvUnIOrVb1g+aTJ+Kmou17lUbjUFT1PfYs20Cfje1B1HwpKFuJyDf3/zC776TxMULNsTjt0noLyZJUqJwcbVqBTMGT8dRk3EuTKA7b6zhHARnaAYyGkVrJ2mICw9HeNb9cJX/9sAXxezw8WnadjktxAe0y6zYP0LUQXrietp2EEpwfk0UoKfnEOlihaYePApHh7bh+IFm+M7YR8/VOyNvQ/jsfJzBKv5ZDxPoWilB/6Vvw3yG9ljceAjRATvRpXao/Ag/g1muQ7A/+Vvje/yt8LPnv54EfscThRhreuJJwkpGNKzv0zH/OpfHbE+OB4Pz6zBDwVbYuqBcDy5eBxljS3lQIwE62mZEmyBWYFhCAveixKFm4r3NRE2ZIMOPaagdh17/FjEFl6r7yNCTQn+UUkJTqCUYFsb/KfuUBx8koKUt2+xf+kS5P+hDewHnULq82toULktWvfehOS4p7Cp3wVffS1s/ruWaGAxCpYd3JVCL1nFU3KOvChYi5frhr2343Bqw3J890NLYYttUbr2QIRHxiiCtbwrbjxPxcxRU2DSfBJevAY2z/ZGcdXXaBGspVpNwJlnaXj5+i12LZyHH75rC/fJF7IEK6UEx8bFw9nEAl/9v3r4H6PuCI77Dcdn+uGbCq44FJ+GDR6j8dX/1MdX35pj49mnuHRgCyzd9rNg/SvIFKxbHiZgtbcv/p2vFX4Qf9/dpx5ERuxDNK/VBUsPP0Lo4U3IX6Alvi/cGoXLDMJ50SdtnDkGxjVd0ayJK/7zfWPRl7TC+LWPkXHnKEqXt8GS8PjMlOA64rVGcF98Cikv7sPQsD3MZwYiMT0DCS8eoWcbR+FTPHFc+MhPCdZJe24hJe0Nnlw/h/oVOsCs/iw8T07EyD6OKFlrPB7GpsDHbbCSEvyfpjCt1w+ODsNkVWKqyK5878yU4FGnkfT8jOiXa0v7KlZnOhJ+A+YM6I9CmVvQqPxhwWo5EzfjXiJaCPmYsAvCv1nJ71KABSvDfBYsWBkdJxcJVuPOMHX0Q5z4c5puNQBFRGf7kxCsSx4kI2LbNhT6tgNGzrsi/tZe4szhU9i4/TQiopNxKmAdKpS3kuuDnKYewMuMNFl0ad3GYES8SMP1o0GoWbkripQWHaXLEkSkvMSNs+exLuAorj+KR1T4JTSv2xXFq/XG3ZS3WDlnAf75bSu0dfPHK/GHPXvweNExdkHh0p3gfzwcj66cFJ2YJYyF+CjZeSrui+t9cPqiTOk8efUxkiIfoHPjnhix4B5iDgehChdd+ktQii4NwQXxgx9bqxZdsobn5BtA4lXUq9QWNTr54XZMGm6GXMA6/yMIDokQdwdYLATr//vWFusOpuJJyCaYiMEqbfXS1iFQvBoL22adUL71eDx9+RaR98KwMeAwgm88QUJkOBw69sGPxbtg5CIxKIuPQeCuI9i04yzCH6cAaTFwrN0Nhj/3xbMMICL8LnbtOYPDp8IRn5yAca6/ov3ANUjNeIkJHkPkVhXFxEBs6+VIXAs+IidWyjcbh3NhiXgUdgf+/odx4vJTvIqPgkeXvvj3TzaYvfEZkiL2ZRVdamixRlxzCn7tZo1/CcF6WTyKuxaMamIAl69YZ7iMuAi8DEcrKrpk4gzvbTeR9CIae3YcxpYDVxGX/hobfX1haMpFl3IKA1MbtO2/ClHJKbh45IzwNcdx9mYkmaIQrH3wU/neeJQOLBViknxN+34BeI038B44RghU4WuEbW4+/RB3Q46hhPAzJqbC17SehAfi/dHiuarlLPFDUSsMmhEKpF5AnUrNZNGlNPF6+Kkr2L33DE5fixAi4iHcO7ni3zX64UgykHDjtrCxQzhw8i4Sk2Iw0N4DNgOC8er2DTQTtmXAgvWPQ4K1Rm+svB2P18JP7N1+FDuDbiE+JREzR0xGgWLt0Nh5Ph7Giz7ptPBPor84fZlK9gGrJg5D054r8DAiGgf2HMOG7efxIvklVk/wwjdG9lh6LwVvoiKxf89pBB6+gsi4VOxctBiFirRF+4Un5Dl8h41HgVLtUPQ9H2mJYqU7ouugleKIVHRo3VOu8y9QxgEzgqPFcwno08kd+Uq0R/Vm85AubHDKr73wn0Kd4ThxL5JSU3DqUDD8t53GQ+FXrx3Zh+qVreWWWsr31iy6JPrl42ewe985XA2PweObF9C6gRCo2bI4DISAbjVlv/DZsXAUgrWYEKxFhL37HQoTHektNDKxQkkhWAsZd8GoU4+Rcu4UKhdsDUPrWbIgIy3SH9tjEAoaWsnf/CfRb2+Of4vHKzfARPS1LFgZRjssWBkdJ/cIVtrWpkyj/nAb4odW9XvKSpalKzmivdts9LIdhsKFbTBhSSie3TmPyT4bsGLNHgz2nIzy5a1RqkI3mFWyQ1FTW5i7zMWqLWdw9NApTBozRwzk7VCS9h8UnauBiTXqdZiAmfP2IGDbYcz1XoJGjbrLfS9Nq3VHzwF+6GAxQG4HUrSMHTr1mQdP9wkoW0FcSzlbdHKaBheXcWIgbSeu1w7G9dzRfchCjJq0CpOmrcXEKcth0dZddOJd0MLKC30cR6Nc2XfbSOgquUGwUvVlo/K94OA2D7bWfWVammE5OzQyn4L+/SejSjVbuedhbfOxmOq3Des27seI4XPg7OqD9h0HCLHbDR0d5qBXj6Fy+wd6f/VGozBgsA9qVLFEzU6T8TguEUsWbML85YHwnbUKrZq5SIFJe5kalHdGF/f5mLfmAFYu3QpXp6lw7e2FetUdYCJtZz7GCDuY4rUOk6evhpOw2eKlrdCu5xz095iE0mIARgKRKklbunjDyXmMuAY7MXC2QYV6AzFq5mZs3HYMCxdugmWbvkJQ0rYVDmjTxRvu7qNQtnJXeXzluoPRf8hs/NLQDiWqu6L74Hno2MIVBmWU1+u1mogBA6eheg07GJbtghIVneE4YBlWiAHy+vU74dlnHEzEdzfmbW1yEOFrxH1taj0FPgv2YJ3/bgweOB3OHt5o27qH8GvOcBnoh/YdyNd0Eb5G2ISwa88+44WvsZW+pnN3L/TsMRbG4p7SPq3GdTzQS9zrds16KPdaCIFf2gvbHzARFStbwazhQLiPWISx09ZIG5w0ZQU6t3OX2SCla7jApp8fRkxYiYnCT02athr2NoOkff7cagL69Z6CquTPtH4X3UanBGtNN2wIe4ED2/Zjmt9OLFu0BQ7WA1HCWClSVFL4koYW4zF97k6s37APo4Z4wcltBjp1cEOpck7CL8zFQuFfNojXBvebDLNy4u9X9IHmvWZh2PgVmCzu65Tpa9HfbRIqVuyCUmZdUdtqAjw9p6OCONZICD2jCpo+0k7YiS3qtBgk/Nwc1KjjJP6m7FFaCM62PWfBrccI4WdoP2k7lK/VH30H+6JFC2fhV4UvNe2KVt1mYv6KAwjYckD0pbNQtYajsM33BSj54HotR2PwyKXCtsT1ea3FhLHz0eQX0a/KflfjNxIYi9+pmrnwu/19UFf8ndCesIbiubYO08T3morKZOvyOXs0dZ4Bjx7jUY6iuvX7oc+IhRjQb5L4G+mq+C9xXOkqzujs6YdeVsKv/8V9LQtWRp9gwcroOLlHsMpNz8VgrQhtpk4CVDymzo42TS8qOtXCJe3htfY+Hl3YihIlWqBgaUsZhaX9JLM6RdGBUUSChEtJ0ckVNrSEoeig3+0b5yAGKuJc4r3FhXilqGuprM30MzfzF+JV+WxxLqPOKCoGGerm6pSeV9TYRjmenhMdfVHakF2lZCcpfs2qio69jJWy4T8dq16fjpI7BCtdpz2KiXtSvIxyzwjDsnQ/rWWamqzOWibz/hqL31/cf4oy0D0tV9VB3D9xPylFLfO9xhW6oHApS2EzVqhnMx0JL5Nh28EF3xa2kLZhYKZR4VLca/pssrliFLmg85P9UVRK2F3R0pkb82dCQpc+x9DMRtqMOpCiazTItFHlOwgRKwab9HlkkxQ5Li4EiXKNZK/Czg2pOJJyzSYVu8oN/g0rOKJsJfF7CLsrIa5T/T2MytH3p+ip8pjENkWTi4lBc3HxuUWNxG/1N0bSlGvOa4JVoaTwF+SDlN9d+A6yxXLCt2nzNeIevedrhH1p8zUGmf6KUG3ftLIQXtJ3vm+DJagKNB1LflGcX9NPFTdVPov24KRK6CZ0nJbvoOvQ76ArgvWnmu7Y/SwFvuO88M8f28q/ZTnhlXkM/b5Z/Q/d30ybMDATfRTZQKadSN8l/qX08LLiPdQHat7XIuJ+kWCj725M/Zw4Hx1rJn3E732kUTnFZyjvUSglPquIEfkl5RjTSrbymFJkn+KxnHTJvI7iwo7Jl2bvS+V3kue3ee/6Csnz0Oe/f6x6vElZyliylJlH9JvQc/JvRXyWaof03tL0+eQ7RX9aRghZad/Stynvk+ej66S/nUyfmf3z/gwsWBl9ggUro+PkIsH6UezFYM0OI+eex9n9/ihXrpMUqtqPpfTRbhJtr6l86vW8RG4RrF+CUsXy8zAUIrd2xwm4Gn4f9pYeYjD//rqr9xDnzamIeU7apPI3of21nEQOUPOoYFX5b/zueQWyD50QrEJQFarRBytC7sFrlJcQVurWL9r5oE38l/5OP0Ze7StZsDL6BAtWRsfRF8GqdJqVf+6N2g1cZKeu7Rjmj6GPgvWLEPZkVs0ZtX9xQ4VqFG3Qcgzzh2DByuQkOiNYBRStrN7IDVVrd8+zIk+fYMHK6BMsWBkdR38EK0FrR2lti7bXmD9OnheshBhgGpa1/VvTZfMCLFiZnESXBCtBa0ZpGyNtrzG5CxasjD7BgpXRcfRLsDI5AwtWJqdgwcrkJLomWBn9gQUro0+wYGV0HBaszKdhwcrkFCxYmZyEBSuTU7BgZfQJFqyMjsOClfk0LFiZnIIFK5OTsGBlcgoWrIw+wYKV0XFYsDKfhgUrk1OwYGVyEhasTE7BgpXRJ1iwMjoOC1bm07BgZXIKFqx/HerWRFyB9h0sWJmcggUro0+wYGV0HBaszKdhwcrkFCxY/zwkUkuZdUXpssr+wCXLdEHpcra/Oy4vwoKVySlYsDL6BAtWRsdhwapCUQmTivZiEKyBeGzC0QoWrEyOwYL1z2FU3g4lTGzQttNwjJu8EhbWozB5xjrUbewhnreWfkzb+/IKLFiZnIIFK6NPsGBldJy8LVhJkFJkopiRFQxMbaRgpd+hXDUnlK3qKEUsRSvodfo3rw7+WLAyOQUL1j+GqcBA+CTyUYNHLMTzF/G4cjUcnbqMQWJSCkJvPkD33l4y0ko+Tts58gIsWHUDslPqPw2FPWr2qdqOzS2wYGX0CRasjI6TNwUrdZyqQG3edhCGjFyEtf4HcerMddwJj8DDR5EIv/cE5y/ewuZtxzBuyiq0txolRKwTSoj3UVRD23n1FRasuoeSEZD7o/8sWL8c8l804G/a5lfs3HNSDDCAlNR0HD95FR2sRiL6eZx8Li3tJVasCUS9pn1RzNhKvk/b+fQZFqz/Hcg/qeKUJlakOK3kgBr1XWHeeQSGjlqMQcMXZv79504/xoKV0SdYsDI6Tt4SrLTWizpOik449ZqG3XtPicFdvBzcfaplZLxC8Klr6DfQF5Vq9pDClTplbZ+jb7BgdZCDKopUUVRe2+t/J4bl7aQdG1Wwy/WilQXrlyHvu7j/NMn25OkL6Zvmzt+KSdPW4Mjxy+jYZQyiomPl82q7HRYBj4Fz5RpXeq9ZFe3n1kdYsP53oCylGvVc0bL9EPTymImZczZhl+hvb95+iKTkVGmXy1ftzdX9KAtWRp9gwcroOHlHsNLAntZ0NTcfhD2BZ5Cami4GdnF4+TJDdp6//fZbFmpLTUvHvftP5cDwqeDVq1fy+fMhN9HVcZKM0uaFqEVeF6xkO+XE4ISi8bLADU16/BcGWfSZtF6xUq0e8F2wFX4Lt0kBQpkC2o7PDbBg/TzI7ujeN2zeHzt2K1FV8mFu/Wfju0LmcO3rIyOslBKsClbyZW/fvs36/9oNB1H1Z5c8lSHCgvXvhyb2XD18cC30Hl68iMfr12+kDWq2hMQUGWktWcZG6zlyAyxYGX2CBSuj4+QNwUqCg1Lierl7S5H6+MlzLFq2C1euhePNmzeZgzplYEf/T05Ow/LV+2BtPwG1G7oJkTsYjVr0h0OPKTh1JlQKWEq3mzBtdVbUQtvn6gt5XbAWN7FGbyEIIiNjsX7jIZmKSeLh76rEShExiqrSBEnnrmNxQggTamSDDj2nyevT9r7cAAvWT0MTFeRj+njOkr4nPf2lTAU+evySFAemwr+t3xiEM+dvyKJLmoI1+yQc2Q/ZkbbP0UdYsP79GJW3Rb0mfXHilOKnqFG/qkygKLZIky7UL+fmCV8WrIw+wYKV0XH0X7DSYK+4EKsDh86XqUiHj12Sg7b9Qedlx0kdKUHRiqfPYuRzNPs7fspqVKntIiMWtAaHBoYERdrqNHLHlh3H5bHzF+0QotVWr0VrXhasdM9//sUDV6/fk/ebGq1xnjBlFarVdRV/Ozk/4KJBXY36veHlswExMQmZV6G0s0KkVK3jkmu3MWHB+mno/per5oxLV8Jw995TWNqOwy8tB+DAofPo02+WXHtP7eSpa+hg9WHBStkknbqOUdYTavkcfYQF63+HgiU7ymwmKgZGTdMOX71+jd79fGTGk7b35hZYsDL6BAtWRsfRb8GqpNEp0bH0l6/kOtRZvgHYu/+M7DjVWV9q+w+FSCEbFRWL5JQ0LFiyE2v8D2Lx8t1SkJLwpfMZV8hcPygEKr1GzWfOJpQ06yJnjLVdR24nrwpWEqN07ynaTk2d3FAbRbiqCLH4uZMVZD9kR2pkgd5HhUlU6Dl6Pfv7KDuA1lyrTR38qdcyY9ZGaed0/uzv1XVYsH4asguaPDshBKmzqxf+8V1zKQYoU4TSLc9fuIXZfpux78DZ36UEq1CjyCwL1k/DgvWPo0wQW8sslANB599LB1bt8OLlO6he11X6PG3nyC2wYGX0CRasjI6j34KVCjq06Tgc0c8zB3BvlA6TmipW1X9DLt2WaXWU8unQYyoMytigRbvB+PkXdylc6HyU/kvpdCQMKKJFrFl/QJ7PfcDsXJ2a+THyqmClgVePPjOQnvZS3mN18K8KxXXCXig1WKk4rX2ygsQGRWnpGJVSZl3k31u1ur1Qp5GbjODWbNBHRu9JTMhjhK2RWFYrbNLxewPfn2ghqMXGJsK803Bxvbkv1ZO+FwvWj6MK1oNHLqCz7VhY2IyW29ZQW7Vuv3y9neUIBAadUybdWLBmQfbBgvXvgeyQ/KFjz2my2r7aqP6Daq/Upnqvl31lbpxg04QFK6NPsGBldBz9FawUvaI0uiAxyEtKSsXzzGrANNjXHPBrDugSEpPlWtXvCrWVoqJy7Z5SMFBHTOcjAeviPlP+VjSTTKKCqiGeOXcDEY+j0aCZpxS12q4nN5MXBSuJzFoN3HAjc6CV3VaooAhVwbSyHy/Ewkh53ynKSe9TKwlTBIG2QmrZfjCcXadj9ITlWLBkB7buOI4jxy7h4qU7ciB36/ZDeb7jwVewZMVuuLh5ywJPDZt7wspuHFYLUeI5yBeNWw3E02dKZdjs13Po6EVpl7R+LPt30WXomlmwfhzyP1Ro6/DRCzL9Nz4hGbfvPJJr8Os28cD3hc0xbMwSHD1xmSOs2SD7YMGa85D/I0aNX47YuCRpb9Ru3X4kfVijFp7SlyYmpsh+VB9skAUro0+wYGV0HP0VrCQe+v3qK4sq0b9795+VHajmII5Qo2Wr1x9Ai/ZDUKF6d0zzXi+jrZRmN9lrLYoYWqJ+s74IvXEfT54+h3v/2VKM0AwxzRRToZP09AzMX7wDBqb/nQqyOUleE6wUUSfhqUbPqVCIai/U6F7bd5+CJkJA0hqt6Og4GW11HzBHFuiiyClFGn5u7I49gafxLDIGGZnVqD+nUer6o4gohN99IsUJtcioGDRq2R/DhTARVySfy27DYyeukFHh3GR/LFg/DQnW8jWcEXLxNl6+fIUZszfKNaxU7dzOeTJm+wZIm6GJM9qHlQXrO1iwfhzqw8jX0eSrttc/B8pkqlDdGSvX7s+yNWoHD4WgQfN+0idRHQkL69GYOHW19E/6sHyGBSujT7BgZXQc/RSsNMCjyOfps6EyijV4xEI54P9QZJUEQJ9+PrLT9t90KPM5yC1tHj2KwvZdwRISqq2EqKW95VRRQB0vDQBJ4EZFxcmomL5FWfOaYC1mZCXF56tXr6UdqLaiCsNlK/fI+09RTc325s1vws5iYdd9MszEefYHnct85fdNmy1qfoZmU5/bve+0jLSpn5tdSFMF2ebtBsuUYm3fSxdhwfphaOKE7iWlhlcU9/3SlXBMmbEO3xVsKwfLtHb1RUyCTAmndYFHj1+WooAF6ztYsH4Ysi+yhdYdhsqoJ9nal0x20bE0MUzR08MavpD84FLhI6kPVn0R7RlNwtVQZoDox4QuC1ZGn2DByug4+ilYqZO0th+P2LhELFq6E/cePJMdqeYATkUVA6fPhMrNzakSq6vHTCzJLKik2QYNXyDThLMLUpphprVlVGmYUqL0bS1rXhKslApOWzKoa7A0bYUaPU+FlsZMXCEfq8JTbVSIi6IWGzcfkY8V+3onQmNiFYGhNs3zfwxxInkuqnZNEyaJSSnvvV/dLoLSjWkgSpM22r6frsGC9feQEKA19GRHDi7TUL9ZPzn4J1Hq3Gu6vLcr1uyTUVVKs6SUdJpgORp8hVOCs8GCVTuUIUR24OY5W2YNUUZHtx5TZN/1Ob7DSBxDYtXWcaJc0qA26nNHjVsmJ1nUokr0OZR1Quury1RR7Dv7+XIjLFgZfYIFK6Pj6KNgVfZcnTt/q+yE1/oflGX0VWGRHWq0nyVtwF+hRncZZS1o0FFuI7Jt5wmcC7mJwANncf3GfaSJAR9VGab0Jvos6tipU6bKweWrOeO8OJaiX7SOUC3UpA/kFcFK95MiAWQz1DRthtprYUe0FrVZ2/e3a1BEKbBl+wm5J+b8xdvlY81Gaw7HTlopBYN1t/HwmRsgxava1M/5GNRoDWvDZp4YN3mlfJz9Gikq7DFwjhxM5oaiJixY34f8CU24URGtg4dDpAAgmyHbpC2MArYek9vbULt7/6mcXPk6X0s5kRF86ho6smB9Dxasv4cmQ+h3ob6M+j61xcUnyWykkma0t/iH18LThK1hOTuMHLsUMTHvJt9uCR9n332y9D1kr5R9RH0xVQymWhKUImyS+by28+Y2WLAy+gQLVkbH0T/BqkSX7GSKEqVn0tYP1DQHb5qDOIpUjZ+8KrMTVravofPQOehfiqiWqeyIaj/3woAh8zB95nopBGgGuUnrAUK8/IqiRlYoVLITFi3bJQVFrYZ9smaX9YG8IlgpZc3Nc5bcr5KaaieqIF2xep8cbKnpb5p2dO36PblVA60j1WxXr93FCDGwozWHDj2nyv1/D4nBGxUioT0zaSsStann+xBvBdR27T0lJ1fUjfk1j6FGEY/6TftKG9X2PXUJFqwKSnqlDWrUd5Vr56OfxyH83hOEhT8WInS0LPp2LuSWvL9UXGnoqEUIPHBORl67Ok7E7bAIIWhv8hrWbLBgfQfZWDHh42iSg5YXaGsUtfeevVEKTm3rWuV61RrOWLpqj7Crd5kjQYdDhI/rL30ofQ5V0CfhSvut3hV2TE2ZzLVjwcowOggLVkbH0T/BSkKRxOUdMYCjiOiHIqv0PK21mThtDYoaWkqhm/1cMuImOlj6l85bqFQnWcG1T7/ZKFLaUgjWgXI9IwnesuL3o7Q8qkjc0Wa0HHxmP19uJS8IVhqcNTMfhAcPf58+To2qXdL60fHZIpuqmJ27YCsMxD1/+ChKPg67+1hGveo0cpdb4wQdvpC1JpZaQmKKzAJo0NxTRvepwJLaND87O+rnDR21GO06j8gqypT99ZVrA+XgUtfT71iwKkKCIk80uCe/RZH86T7+sqjXMSFOaXmDiTiGBOnKNYHSJ9Vq6CbX6G/ZfkxWN6etQ2gihQrAsWB9BwtWBerDKNppaTtOFg/UbFQwTl3CoDbKMpFrUMso/RjZKInRek37SV+m2Zav2iszjNQ1sCRUK9bsIZfjaPq8A4dCWLAyjI7CgpXRcfRPsJLwoBnkuLgkpKalyyrBmgM3zQFcfHySXA/4ueKSRGttMVDcuvOELFLxUwkL0Wk5yq0maEsS2nokOTkV3V29UNTIUus5ciN5QbBS5IGiq9o2uqfKrE6u09FS3POEhPfXjqrHUMobbaM0aMRCTJ6+VkZUKX34mLALzab5Hmo3bz+Ek8s0ud8vTX6on68KYm1Qo22aKLo/Y9YG+VgVqtTu3n+C3n19OMKaSyC/UqtBHzlpQRH4SdPXiAF/d9So11sWVqJoPB13+NgldBCClLbd6jtwrkznJEFAx9OkCEXreR/W92HBqm45YyvTfWNi3i1DiI9PlksLZJVggc/cTTLCqjZK4a3XuK/MICIRamX/vthNSEjG2Ekr5HvpMygridbAko2eFH2i2lT7Y8HKMLoLC1ZGx9FDwSo6zwbN+skCSJoDtuxQi4tLlNuQqJUMPwXNHpc06yLX/ixcuhM1xSCTtphQi+jsP3geSUKwugqxQFvhaDtHbiQvCFZK86YoRFenSTh5+t1gixpFG6r+7CIjWtSy25IqFmmA5zFgjizORcJDs2V/j+b7qG0IOCxFLm1TQpE0tWl/n2K/tK1Jg6b9ZDEetVG6sJKap6yz1nVYsCqCtXGrATJSRRNuFAWj6Pzxk1flGtZ2liOk7zl4+IJ8npYeUBSWljPQxMS/87eSxZZozSsL1vfJ64KVsiyq1nHBMmFblFGkNtr32Vb4OhKYJCLJBkuWscHAYfOz1udTI9/S3nKktDtNsUtr8jWLNFGxujLCRmmv6ajoOHmM5qQbNRasDKO7sGBldBz9FKxUVTNFCFZqmoM2TagzfSP+pX3hlJTgblK0KB3qhwsmUVl+SjmmaqwRj5X0T6W9RXJKmvyXoh0sWHPfGlY17Y3WLU/xWisj8A8fRaJm/d7wHOyn3GbRPmRP2pq2Y7OjtojH0RgxdgnqNfbAuMmrEJkpPKh96D1DRi6Co8s03H/4DFO918nvoabx5QZYsL4TrLT/c+1Gbti4+TBexMTj0JGLCL3xQE5ikG2eEAKW9gCmtfnzFm3HkeOXZGS+Us0e2LTlqIxqWdjwtjaa5GXBSplDLdsPldk/mo2KCdIad/J1VGSO+kw6nvo9iqR2dVLWRKuN7Ckllfo2pVHqOS2HUder0jnIfnfsPplVD13T9lT7Y8HKMLoLC1ZGx9E/wUqpSTTo0zbLmx1qNPijmebCpTrJDpjW3lCH+rF0SurgqVIr7dlK51c/gxr928VhotzLU9t7cyN5RbCqkICgqLul7VhZ0IbWftGAjNJ31Xv8ITTt4XPJ3o6duCIL7VDa+eZtx+T5qKnnVR/TOlm5vlEMNGkASZMphmJAqO076SosWBV7q9vYQw7oaZsa8kmU8lu5Vk9cuRouo/V1hDCl9GCKeNG+mWWrOSHw4DnMnLMRV6/flfZw6kzoR4suUTExStcsUKKjjIrlhirSf5a8Klipj3JxnyknwdSWLu7/FK91MKvsKCctKJpPx9F6+J59Zkg7pL6P+kHyd1R1OnujLADqI9WsJKXIoT0Cth7NPEK7f6TGgpVhdBcWrIyOo3+ClTpEqqB6OXPrB7Vp60QJalSRkwonTZu5HpfFAHHjlqOyPD+tyaEZ5OyfQWKWClIcyEz7pOqt6rloI3/a9kSfohh5TbASdN/loC4z+kCDODvnSZlR9PebIlLfF56fK1rpOEpfVysTqy1FfM78xTtk1dgevb3ei3hQOyfES+PWA2QanzLB0lWrreo6LFgVwUrFuajSNEVOKf2SfFjDFp4yPZOqrDZq0V9useXefzb+8V0zOUFx78FTaQsRT6Jl2joJ2I/tw0pZJ7RcgURr+erOMp2TbJx8Zm60nc8hLwpWupeUCjx1xnp536k9ePAM3XvPEH7MSvZfFH2t+nMvLF+9T9oH7SutWcuBIq1UZI4mzKiR36NjyB8Sqr0oEx/dsqqdkx/UtDsVaixYGUZ3YcHK6Dj6J1ip86SUSEp7og3Rqaom7S9HTVtHSmhrNABUqx5qnl9NF161br88TlOYULt4OUyW/ac0Kc335WbyomDNDkWjqJAWpd1SI4EZfvdxljigRlsanTl3A8+excjHnxKt9Do12p+V9ircsSv4vaIn1EJvPoBDj6moUc9VrpumqsA0OKTBJolobdeam2DB+i4l2G/hNhQs2VGmANPWNmpE/8q1cDRs7onTZ2+g3yBfuXbw3j1FrNK6VUoLpnWuJFg/toaV/OBU7/WIiU2UUVlai9/ZdqyMmNHafAMhXilCn93n5WbyomAlqJ+igoC0FRel8NIkKvkvEqvUr9l0m4CQi8o2SdSGjV6cJVjVSCsJU4rk00RuL3dv6W+Mytsrk2PidfptVcGqbpPDgpVhcicsWBkdR/8EK0GzyMPHLJFrENt2Gg47p0lioP9x0UriQRUY1GhTfhIR2VODKSJBhU4yMsv1a56D2uLlu7UK3dwMC1YFGmxR1IEq8zq7esl1YC3bDcH6jYfEYOy8HBRSZKJ+035SfGra1Iegtl0cW6WOi1xL7dRrmqw6rdnoOFrXSOdvYzFMHkub+2u7xtwGC1ZlIoQquG7dcUL6K9pnlSbbaILiUUSU3FKpQTNPuYY17O4TWRmYskKo8A1FWr/O1xJunrNx+NjFj0ZYSbBOmr5WVjJXG1UaplTjWUIg29iPF7bVUwoWbdeZG8mrgpUgMUmRdKo4Tem/FHUtK77T5OnrsiZx1UaClSLulDnUpuMw+S+9n6DJDKUKsL0UrZ27jsGYCStkFoA6wcGCVbstMUxugQUro+Pop2ClzpUqpb54kYDFy3bLbSBm+W6WnSY1bR2qJqLblcdNn7n+vbWo1DGTIJk6Q4my/SY6Z6q8qLxHibpR9IOO0bye3A4L1nfQYIv246V0TaoKTHZVvrqTHODRa6PGL5NVXinFU10/lt2+VDTbvftPZaSVbIzslyZcbmVG2NRGx5h3HpEVCdEHWLA6oIBBR7mlCKVdhoU/xo1bD6TwJIFA+7Leu/9MRlGpajA1WjtPa5z3Bp6BuRC4fX/1lcKWovsfW8NKIsXLx19WoV60bKdcL6vZKDX9wqU7GCLEM9mgtmvNbeRlwUqQDdGkK02G0QTs3v1K6i41aReZWR4kWNW+jvb2nTlnk/Qz9H56js5Bjykl/VlkDE6cvCZ/W5rcYMHKgpXJ/bBgZXQc/RSs1CHSgGuN/wG5LQSl01GKFO05RwPCT0W91PWItH0ERT/U4iTUMVP1X0qle/AwEkeOXhTHK1E0alQsh2a0jTI7eX2BBes7KE2OtomgaBe18yE35aCtcGlLzF+8XT534eIdGYmlzfgpgkXt9zb2Vu7v+ur1u431qZFgoPQ7EsVUdGfOvC0yU0BtE6etkQNHfSmYw4JVEazeszfKdO8+nrNklfFqdV1h332KGCSk4Oath7CwHiXF69z5W1CwZCfpi0g0XLoSLiOu1Cgy/ynB6iN8F1VzpUgZ+aoFi3fgkPBjVA1bbUePX5aZJPQZ2q43N8GClbac6Qo3ITQfRbwrwJRlF9kEKwnKwAPn5HNU14GislR0rpz4LShlXbW1A0Eh8rdlwcqCldEPWLAyOo5+ClaCBlxtOw6X6W+UTkmd7o/FOsjKq5RuR01bx0pQe/Pmze+ipXROqhr7LPKF7ODXbQiSx1J79eqVHBRQWpXmdegDLFgV5Low8Xei3vfnz+PR0WY0fiphgUHDF+L16zfy+QlTV8nBHw3kWrYfIgUBNdW+1FRhEikUIdu2M1hW8NRsNACkaGrhUp3lMWv8D8r1aJQaalhOn9ZHs2AtKASr74KtCDpyAd8UaCOru+7cc1IKVCq+FR1N6b9K0S3rbuNRSAjWkeOWIiExRT6nts8RrDNmb8C5kFtSAFNl9F4ePnIv6iq1XeS6WcoYOXzsEgtWPUkJpvXJVMhL9U2aNiHtQotgpQkNaq9fvcGwMUvQtO2vUmxqNhasLFgZ/YIFK6Pj6K9gpU6UBl0kCqiRoMhXtL3cBD02VtkAXVvHSqiCgqIZVIiEzkUdLUVtT58NRVr6S/jMDZCpUWrbsu0YTCt3E4ME/RETKixYFYqb2KDfr77yflP6N60b/KFwO3RxmJC1qf7SlXvlwI+2ShozYbmwwa7o4jgha9N+TfuiKtO0LpUmOWh/TBIpaWnK/sHUSKxQNJ+KiBUV56RoB9mhWRXt15cbYcGqCFYSiydPX4PHwLkIvXEfe/adkZNjV64pW9ZQI5uh9dMBmZVbqak+i9rnCFZaw5qUnCaLex0SAnnX3lPo3nu6sGNzNGjaT/o2yhRhwZr7BStFVmnC7MWLeHn/Ne0hyy6ETVHTJlipJSWlZk3wioOV94jGgpUFK6NfsGBldBz9FawEdaaU9kYRA9pwv4sYAHoMmJOV1qStY1WhRlvU/NJygOzIi5TujF4eM8VgL1W8/iYr1ZMarQWjtGMa5Gm7jtwOC1YFur8OPafi6vV7MjWX0nYbNe+PO2GPpR1QlVYaJLayGIrIKGUygyKwJCLUptqW2mLjkmTqOq0vo8IotK/qvv1npXCgRusNqWgKDfT0QUBkhwWrIlin+/hLEXn85BW5RrV6XVcYi3uurjMlu6FJD02/k91ffY5gpc8JuXgbGwIOZx1Hyya2bD+OOUI0Z7x6hSMcYdUrwfrk6Qt5nzXtIcsuPiJY5euZ7b33iMaClQUro1+wYGV0HP0WrARVOKzdsI/cboZE64NHkTLd90Mdq4raBgyZJztlz0G+iH6uzFTTe9X2+MlzOUjUt0JLmrBgfR/aUkauZRX/nsys6Hv12l1UE48r1+ohtyGhFnz6mpwwofWsFJF/GBElnyeBQPtrajZ6btXaQDnxQVsi0eQKbejf2mKY3gzwtMGCVY2wBsiqv7R9kaXdOHTsMkamctLEBUVWNf2S5mPN579kDSvZb436vbF81V4pYBOT3qUXUzExFqz6I1ipj6KmaQ9ZdvEJwaoNaixYWbAy+gULVkbH0X/BSlAqJVXZPHX63XYh2jpVTZRB4VtZqZWqdtL/1fepjdaYWdiMlh29ts/VF1iwvoMGZzToooi7k8s0aQckPmkfTNrOaH/Qeflc+N0ncr2pWWVHTJ6+Vqb8WtqORUZGBtZvCkLdxh5SkERqpJVTo8rWVGWYCuuQ3VJ1Tm3XoS+wYH23hnX/wXMyak/Re83lBtl9kzaofY5gpSUSp86Gorn5IOQv3gGuHjPR2mIoajd0w5Llu+WxtOaaBSsLVm3HE9RYsLJgZfQLFqyMjpM3BCtBa1EpIkaFaz6UVqeND7V9B86haeuBellkKTssWH8PDbxq1u8NL58NcOw1TUbyacBPLSEhGV2dJglRa4m1/gflc7RetYX5YLnWNS4uSa5Nbdi8v4yo0v81q7QOGblI2pW+VAL+GCxYFcFK29pcD70n7YW2l6GmLZL6Iah9jmClyZOExGQ5ybJxyxFZydrOeRK+LdgWDZr1Q3r6SxzlNawsWEXTdjxBjQUrC1ZGv2DByug4eUewEhStoo3OXdy8ZWERdS1rVss2QKQBY/Z25epduUdmuWrOclCn7XP0DRas2qGqwZQKToKDCuSojVJ5afujaTPWy8e0fY1rXx8xKFwiH6uNxOvSlXvQqsNQNGrRH2MnrpDI9Yt6WLxLGyxYlW1taM/n9xv5ni8BsiAcCdbnL+Lk4+yvk1Cd7LVWFtLRbPcfPMOyVXsx1Xu99Im8rY3+CFbyLVHRqj18uI0YuzRLsO4JPJP57Ifb4aOX5G+rClZav/+pRrUkWLAyjG7CgpXRcfKWYCWkyDC1kWsLab/D9ZsOyb1Z1SI32RsN4CKeRMtqmgOHzkeNer2lSKGOV9v59REWrB+GBmuGZW3RuNUA7NgVDC8ffznYL1fNSaaSU6PKrsWMrcWgcIncZ/Xho2eyoBetG6Q11SPHLZMRVdpfldKK1c368wIsWIVgLdFR2s2fbVSgq4P1KMTGJmY+836jLb6meK3LiuB+qJEYYcGqH4KVqpBfv3EfcfFKVF0TqslAfiguIRn9h/jJvXlpomzdxiAkJqb87ngV2k5p8/bj4rdVChuSnfgHHBIDWvEZMe+Oo/Or/6dJEirsZVTelgUrw+ggLFgZHSfvCVYV6phJeFKnTiLUyn48Bg1fIAZ0a2Wa5zTv9TKSSnux1m3SVwpU6tApQmuq5Xz6DAvWT0Mik2yEovj0fxrEObpMldFW+ttSJji6yX0RazdyQ4PmnjIduHo9VzmAo/RfBf0YzH0uLFiVzI9W7Ydg8IiF8Bzs94cYOGw+7IWvojT13n19MHDovPdep+JxtE90y3aD4d5/jnys+Xp/8Zgm5H4V56GCX/oyaZKXBSv5EpqYrSf6L8rgIH+jDXqtSu2eWb6nVoM++KXlR44Xr9Vq2CfrM+R7xOOPfQadr1ZDt6xr0wdYsDL6BAtWRsfJu4JVhcQCzRJTdKtwaSHKDDrKFD36t3CpzlKk0oCSIrPa3p8XYMH6eZCNaApOipqSDdHzZuIxvSZFrbA32tOXtrFRIxSa58lLsGBVfgOyB/I/lEr+hxDvpQk4Epq0Zy89zv56USNL6cuKZj5+73UV8TxF+fVlr9+8LFgJ8i3kb8jXfBCzru/1b+Sj6DmtxxLiNWUC7t3n/JH35HZYsDL6BAtWRsdhwcp8GhasTE7BgpXJSfK6YGVyDhasjD7BgpXJBTTmgR/zUUiwlirT8YsFaxGDZpnRQ7YtRjvkd8j/KIJVuy1ppxGMylEkkEUF8yEUv1O0ZHPpj7Tb0e8hP1fSxIJti/koJFgNjNt9Ub/IMLoKC1ZG56GO3LCsJXfOzAch2zAwNv/CjrkRChdvwpMhzEch2yL/8yWCgqDjS5fpxH6L+SDkd0wq2Ao/1BSFvlCwljBsy36L+QSOKF661Rf2iwyjm7BgZXQe2TkbUefMAz9GC2LQRlHSIgZfFqUgyLYoMsu2xXwIsg3yP1866KPji5duzbbFfBCyjS9dyiARfq5wiabC79mLc7BoZX7Pu8mQL1/KwDC6CAtWJldATtdERsJ48Me8D6U9KYO+L++UaaBI6XhUHZfTgpnskL95N+jTbkOfwrhCF/ZbjBaEv6nigGKlvmz9qgq9R5lsc9ZybiavY1bVGSVN2vP6VUZvYMHK5AqUaEUb4YhJVLCwYBSkoKhoJ9ei/hHBSpBtUWEKHvgx76P4GvI7f0RQEPS+YqVbKefiSBijQVnhu5R19380+qVEWWlChSdEGE3IHozLd0Ehjq4yegQLVibXQIM/A+P2whk7SrQ5aibvIAdplbr94QhFdihKq4hWtq28jupjyN/8WduSfsvIPOuc2j6PyVtQ9MuwrFWmjfxxQUG2VbRki8zUYBatDNmW5iQuR1cZ/YEFK5OLaCQdMK0nozWL1EErA0AeBOYdaNAv7rvolKlYEg3W/pJOWUY5GsnKm/Q572xL2zUw+okiKOnek3/5I+tWPwSdhyK1ppXsNGyL7SsvodoW/Z8iq4pd/PnoF9kWrd+niBr5ReUz2LbyFJm2RRiVs2axyuglLFiZXIfSQTeT+9AZV7AVDpvEqzrYZPQVpbiSvRyYGRi1k+lOf22nLAaP4ny0JyJFW2mWmgYD2q6F0T/Ij5A/Ib+SEwM+xW81lZMiNNmiTLppvxZGvyA/Yir8iaGZZWZGCPmaPy9WVRTh21hG8mkrJfKTiohh9B1aB033m+47VY5+Zw/abYVhcissWJlcCTlkGgDStiRUNIcGAYz+Q0JCuf9CTORQp6zYFq0PI9tqofU6GP2D/Aj5E7KtnBrwvfNbjVHUgP1WXoH8SJESTTPvf06JCcW26P/kJ7VdB6OfvNcv/okUc4bRZViwMrkcZQCgDDIZ/edv7IzZrvIYZFt/l32x38p7/H2+i20rr8EildF/WLAyDMMwDMMwDMMwOgkLVoZhGIZhGIZhGEYnYcHKMAzDMAzDMAzD6CQsWBmGYRiGYRiGYRidhAUrwzAMwzAMwzAMo5OwYGUYhmEYhmEYhmF0EhasDMMwDMMwDMMwjE7CgpVhGIZhGIZhGIbRSViwMgzDMAzDMAzDMDoJC1aGYRiGYRiGYRhGJ/m0YE3A/wc/FiIZPP93QwAAAABJRU5ErkJggg==" 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25.05.2022 09:18:22: <p class="MsoNormal">Тест тест тест Тест тест тест &nbsp;Тест тест тест Тест тест Тест тест тест Тест тест<span lang="EN-US"><o:p></o:p></span></p><p class="MsoNormal"><img src="data:image/png;base64,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" 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тест Тест тест Тест тест тест Тест тест<o:p></o:p></p>
25.05.2022 09:22:43: <p class="MsoNormal">Тест тест тест Тест тест тест &nbsp;Тест тест тест Тест тест Тест тест тест Тест тест<span lang="EN-US"><o:p></o:p></span></p><p class="MsoNormal"><img 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alt=""><br></p>
01.06.2022 10:04:52: <br><img src="/upload/grain.blog/042/04291de7e66bdaf8aae34f67e99ac649.jpg" data-file-id="179" alt="f171a35f6d739d3a37f52ba96b0f3c8a.jpg"><br><div><img src="/upload/grain.blog/d0e/d0e16788ecce92c5ad0fc1a16526430c.jpg" data-file-id="180" alt="145d03f0b611f3c7faf1a47dd76a4d55.jpg"><br></div><div><img src="/upload/grain.blog/c5c/c5c578999557b7ca1d8c023552231e12.jpg" data-file-id="181" alt="ff71d93bfbef5730550e0fa70e9542d4.jpg"><br></div><div><img src="/upload/grain.blog/bab/bab3abb7a93a3f5c6632ecd5fa1c0132.jpg" data-file-id="182" alt="f021111f1b85750e5ec296b1a65873f7.jpg"><br></div>
01.06.2022 10:06:32: <img src="/upload/grain.blog/a81/a819ddb3ba5db50ea1e2e74c6606507e.jpg" data-file-id="185" alt="ff71d93bfbef5730550e0fa70e9542d4.jpg"><br><img src="/upload/grain.blog/34a/34ab22cf9f92b54ad0cc4f63ae8398bc.jpg" data-file-id="183" alt="345345.jpg"><br>
01.06.2022 10:07:14: <img src="/upload/grain.blog/a81/a819ddb3ba5db50ea1e2e74c6606507e.jpg" data-file-id="185" alt="ff71d93bfbef5730550e0fa70e9542d4.jpg"><br><img src="/upload/grain.blog/34a/34ab22cf9f92b54ad0cc4f63ae8398bc.jpg" data-file-id="183" alt="345345.jpg"><div><img src="/upload/grain.blog/5dc/5dc36fc7309df912ceca007b4e68c4a8.jpg" data-file-id="186" alt="f021111f1b85750e5ec296b1a65873f7.jpg"><br></div>
05.06.2022 15:27:20: <p style="margin: 0 0 var(--content-text-bottom-offset) 0; color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;">Прошедший 2021 год выдался непростым для каждого из нас, а особенно для малоимущих семей, которые находятся в тяжелой жизненной ситуации.</p><p style="margin: 0 0 var(--content-text-bottom-offset) 0; color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"></p><p style="margin: 0 0 var(--content-text-bottom-offset) 0; color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"><span style="font-weight: 700;"><span style="color: rgb(171, 160, 0);">Приглашаем вас присоединиться к доброй акции «Семейная почта»&nbsp; благотворительного &nbsp;фонда «СОЗИДАНИЕ».</span></span></p><p style="margin: 0 0 var(--content-text-bottom-offset) 0; color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"></p><p style="margin: 0 0 var(--content-text-bottom-offset) 0; color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;">В рамках акции более 3 500 малообеспеченных семей из далеких регионов России, попавших в тяжелое положение, получат необходимую помощь и поддержку. Все семьи малоимущие - это погорельцы, беженцы, семьи с детьми с ограниченными возможностями, дедушки с бабушками, которые одни воспитывают внуков.</p><p style="margin: 0 0 var(--content-text-bottom-offset) 0; color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;">У каждого из нас в доме найдутся вещи, которыми мы не пользуемся и готовы поделиться с теми, кто особенно в них нуждается.&nbsp;<span style="font-weight: 700;"><span style="color: rgb(0, 53, 98);">Давайте вместе сделаем доброе дело!</span></span></p><p style="margin: 0 0 var(--content-text-bottom-offset) 0; font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px; color: rgb(51, 51, 51);"><span style="color: rgb(34, 34, 34);"><span style="font-weight: 700;">Ознакомиться с подробной информацией вы можете в презентации.</span></span></p><p style="margin: 0 0 var(--content-text-bottom-offset) 0; color: rgb(0, 0, 0); font-family: &quot;Solomon Sans&quot;, Helvetica, Arial, sans-serif; font-size: 14px;"><span style="color: rgb(0, 53, 98);"><a target="_blank" href="https://portal/PublishingImages/Lists/News/AllItems/%D0%9D%D0%B0%D1%87%D0%BD%D0%B8%202022%20%D0%B3%D0%BE%D0%B4%20%D1%81%20%D0%B4%D0%BE%D0%B1%D1%80%D0%BE%D0%B3%D0%BE%20%D0%B4%D0%B5%D0%BB%D0%B0!.pdf"><img src="https://portal/_layouts/15/images/icpdf.png" style="display: block; margin: 2rem auto; max-height: 31.7rem;">Начни 2022 год с доброго дела!.pdf</a></span></p>
13.07.2022 15:32:12: тест&nbsp;
13.07.2022 15:32:14: тест&nbsp;
13.07.2022 15:38:44: тест 123
13.07.2022 16:30:36: 123
13.07.2022 16:30:38: 345
04.08.2022 08:27:32: 
05.08.2022 09:20:40: <br><img src="/upload/grain.blog/0ee/0ee037ea0b17e599c74ed4e1100529d2.jpg" data-file-id="187" alt="dbb3f98565bab5ac219a6c5ff714f813.jpg"><br><div><img src="/upload/grain.blog/fbb/fbb68322ed31e8572e96c89e2439a5e9.jpg" data-file-id="188" alt="79ec806e466a01ca9907204ed27007ad.jpg"><br></div>
05.08.2022 09:21:24: <img src="/upload/grain.blog/38e/38e2bd0d462a5b5d15e7185367f877f7.jpg" data-file-id="190" alt="dbb3f98565bab5ac219a6c5ff714f813.jpg"><br><img src="/upload/grain.blog/d70/d7021aa758608e375916f25ab586d247.jpg" data-file-id="189" alt="dbb3f98565bab5ac219a6c5ff714f813.jpg"><br>
05.08.2022 09:26:38: <br><img src="/upload/grain.blog/fc4/fc4cf34f06dfeef18b62ffd6ec451ba3.jpg" data-file-id="191" alt="987.jpg"><br>
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