Те же, кто часто ошибается в оценках, вскоре http://sbeiompora.com/vtb-kapital-investicii-rasshirili-vozmozhnosti/ индикатор для бинарных опционов лишатся имеющегося инвестиционного фонда. Предприниматели будут бабочка гартли индикатор для бинарных опционов допускать ошибки, но на рынке действует процесс отбора, вознаграждающий тех, кто чаще всего оказывается прав. Стефан Кинселла и другие ученые австрийской школы весьма подробно останавливались на этом вопросе. Нисколько не намереваясь принизить значение данного аспекта проблемы, я просто отмечу, что его обсуждение выходит за рамки этой книги. У государственных «инвесторов» стимулы совершенно иные. Губернатору Коннектикута Роуланду бабочка гартли индикатор для бинарных опционов любой вариант проекта со стадионом не принес бы ни прибылей, ни убытков.
Конечно, избиратели могли бы заставить его косвенным образом понести малую толику потенциальных убытков, не переизбрав его на следующий срок. Ведь он может покинуть свой пост задолго до того, как станет ясен окончательный валютные пары результат проекта. В таком случае избиратели будут лишены всякой возможности для возмещения ущерба. Несмотря на всю сложность построения, индикатором ZUP достаточно легко пользоваться в торговле.
![бабочка гартли](data:image/jpeg;base64,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)
Далее следует кликнуть мышкой по первой точке минимума, либо максимума, в зависимости от типа тренда. После этого следует кликом обозначить противоположную точку и т.д. Следует повторять до момента окончательного стратегии для форекс завершения формирования фигуры. При этом после формирования первого отрезка система будет автоматические подсвечивать область на графике, где может располагаться следующая разворотная точка.
Вершина В находится на одном из уровней в диапазоне от 38,2 до 61,8% (речь идет о движении ХА). Вторая — на уровне от 38,2 до 88,6% (это для точки бабочка гартли С, если смотреть по движению АВ). Был открыт в 2000 году, но его уже применяют многие трейдеры, которые используют в работе гармонический анализ.
Недостаток Паттернов
Также мы показали, как отрабатывают себя сигналы по бычьим и медвежьим сигналам бабочки на Форекс. Помимо этого мы предоставили возможность скачать индикатор ZUP, позволяющий автоматически на любом таймфрейме определять эти свечные формирования, что само собой упрощает жизнь трейдеру. Соблюдайте риск и мани менеджмент , и профитных сделок будет на порядок больше.
- Гарольд Гартли занимался аналитикой фондового рынка, читал лекции по теханализу, консультировал трейдеров с Уолл-Стрит.
- Также отметим, что линия Фибоначчи должна быть растянута вдоль «ХА» таким образом, чтобы точка «В» расположилась на уровне с отметкой «61,8», а «D» на отметке «78,6».
- Итак, для начала построения паттерна, необходимо соединить отрезок XA инструментом «линии Фибоначчи».
- Это инструмент технического анализа рынка, вручную наносимый трейдерами на график.
- Равенство этих волн обычно указывает на высокую вероятность отработки.
- Вторая коррекция от первого отрезка, здесь варианты могут быть различны, ориентироваться трейдеру надо на числа Фибоначчи.
Формирование “Бабочки” или другой фигуры становится сильным сигналом, поэтому стоит потратить время на анализ графиков. Итак, для начала построения паттерна, необходимо соединить отрезок XA инструментом «линии Фибоначчи». Не забываем, что линии Фибо всегда растягиваются справа налево – по ходу цены. Далее, при развороте тренда, соединяем экстремумы инструментом «треугольник», обозначая точки «X, A, B». В идеальной ситуации, точка В, должна располагаться на уровне 61,8 %, а точка С, на уровне 23,6 % начала второго крыла.
Применение Индикатора Бабочка
Чтобы было удобнее анализировать соотношения между ключевыми точками и можно использовать индикатор “Бабочка Гартли”. Отрезок колена BC по теории волн Эллиота является коррекцией. С другой стороны, этот паттерн считается моделью разворота. Осталось войти на оформившемся паттерне, в данном случае — на точке D, что являет собой уровень 1.272 от движения CB.
![бабочка гартли](data:image/jpeg;base64,/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgICAgMCAgIDAwMDBAYEBAQEBAgGBgUGCQgKCgkICQkKDA8MCgsOCwkJDRENDg8QEBEQCgwSExIQEw8QEBD/2wBDAQMDAwQDBAgEBAgQCwkLEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBD/wAARCAElAYcDASIAAhEBAxEB/8QAHgAAAQQDAQEBAAAAAAAAAAAAAAUGBwgDBAkBAgr/xABrEAABAgQEBAIFBAcPDA8GBwABAgMABAURBgcSIQgTMUEJURQiYXGBFTKRsSNCUqHB0dMWFxgkMzhDYnJ2gpKys7QZJTQ1U3N0dYOUotIoOURWY2WEhZOVtcPh8PEmN0dUwsQ2RUZVZHej/8QAHAEBAAIDAQEBAAAAAAAAAAAAAAMEAQIFBgcI/8QAOREAAQMCBAQEBAUDAwUAAAAAAQACAwQRBRIhMQYTIkEUUWFxByMygRUzkaGxQsHwFiTRF2NykuH/2gAMAwEAAhEDEQA/AOVUEEEERBBBBEQQQQREEEEERBBBBEQQQQREEEEERBBBBEQQQQREEEEERBBBBEQQQQREEEEERBBBBEQQQQREEEEERBBBBEQQQQREEEEERBBBBEQQQQREEEEERBBBBEQQQQREEEEERBHux7R7YeUEXzBH1YR4bDtAaovII9AvBbeCWXkEekWgAB7QReQR6RHnaCIggj0Wt0gi8gj2wgIFxBF5BHpAHaD1fKCLyCPfV8oPV8oIvII9ItAADBNl5BH1YR8nrBEQQDrH1YQsi+YI9IAjyM2KIgg2g2jFkRBBBCyIggggiIIIIIiCCCCIggggiIIIIIiCAbmPdIgi8ggItBBEQQQQREEEEERBBBBFc5nwvs3XhdeN8LI/dF//AFIzp8LbN7SpScd4VJAuB9nufYPUjptLy4WNhtCg1JEJCgnpc/eMZvdaEEa3XKNHhsZtuiWLeKKGsTS9KSlD1k+0nT0hzM+FDm0+gLGY2FU37FEx/qR0zpNCb9CpigjaySf4sO6Wo6RYBO1okfawAUED3yOOY6LkbPeF7mnIza5RzMDDK1NgXKG5ixv/AAIUaL4UObddQVsZi4WaSN/XbmL/AHkR03rtIBq01ZH3I/0RDzwVRG25JpSU/ORvEpjbkzKFlS90oadlytb8HnON3pmhhAW82pr/AFI0qt4SWblIdbZezLwmsuJKxobme38COx7NLSLerDUxrIJ+VJZITuGCfvxDE0OdYqzUyGJmZq5OUvwks3Ks4tprM3CTZbAJ1tTPfp+xwuJ8GLOpWwzYwYP8jNfk46h4Tkkpm5m47N/XEiolkpG8bzxiM2aoqSd018y48nwXs6u+bWCv+im/ycN3HPhKZs4BoSq9Us0MIzLSXUtFpluZCrkE90eyO0FTnaXRpB+q1acYlJOWaU69MPrCW20AbqUomwAiFsw8dULMSmJosnIu/JnOS8Zt67fOskgBDZAVpOo+sojp80xUlmjhF3ldGGnlqDaMLj/i3gGx7g+uUmhTuNaC+/VWPSEqbQ+Eti4FlXTe+8PKkeF1mjVktKYzHwsguqCRrbmNrnr8yOlAwzhOsVFmoVqiS8+5LNFplb1lLQi49UG23Ty+MPKmYcowDbtOZXLqbUFAJcKhce+Kraxkh6V0H4c+JvXuua39RszlsSc1sG2Fr/Y5q/8AIj4V4OOcKf8A4q4OP+Smv9SOs8tUOahLUw2lK721JOx8tu0fbyNNwYvNIcNFyJMzDZy5HOeD5m+2bHNPBx9vLmv9SNdfhEZut3vmnhDb/g5n/UjrTMIveEqbT12jcBR5yuTcz4UOa8qkrXmbhNQA6BqZ3P8AEhnynABVpyTRMMZ24MUVFSVNtszbi0LSbKQdLZ3BFiPOOudQSncEDp3jldiVFCkcRV12tYmqb81T8Y1CXVRUOLQn0IzTh1pWL6fnD3bmLMEDZSQoJ6h8QBCYOJOCyawnKqm6xm5h1ttJCSfQZxPUgD5zY7qH0w0qpw3t0595lOaOG1qabDm5UkKvewTfqdunXcRLmatUy2cw6ycGlpqqc1IUBOuvqI6kK5mw2tuPufbDfomJ8Powc/RqmujtTEwy4hc16A49NAqJIIXq0gjaxAi4KBndV21kz9rKFallPUZOZ9GkKtK1BKkJWHWWlhO/bcDeNEZa1kbrmGEgC91GwiTKNWqhTmHFszUlrWypX6Zlg8VqSR6qdQOk7ne0OGYw5J1KblUzpq03S0tIcVMS1ODRClJ9YJHRQB2v39kb+AhC1NbKDa6hI5dzif1WqSbfvUYxLwE8kkfLMn/pfiiXcYYHRKqDmGqbVPRkgpdXPhptZWDY2CT0EM5dNmbAjlesdIAcTe49l41NFF2UjKmV2l0zlYMWkH+usudPX1VfijEcIvj5s6yonewSrpEhOU6TaWaa4+wh4o1Kd1kgqI2T+CNSUpKHaj6PMTDagySVJRckgbm20YNHEOymE0qYhwrMjf0lq17X0nrHv5lZ0myHW1fA3h61KrPzaFypAS1qvpKRukdOgjQZmXpF4pQ5dKgeg2AMamjjAutBUyJsHClRFhdG4uNjuPOHJSsna5WESxkp6VWZoBSEhCybdz03tGRhx991IceeWE2QNGn5vxiasKyzVIw0zU1EKcdTyJceW11KJBuDYxUmibH9KswyOebOUKVHJqr0qoLkJirSepBF1aFgW87WvHw5lDUElIRW5NeojcIX3NvKJoxowFVJt4IWA+whwavMC3lCTQlpXUWW3U3ClpO6dQIB98QWU6imoZS1aQmXZZdSlSWja+lQB9u4EJU5gSek/wBUnJex7gKA++ImCrAmoTcst7mFC1KQq99Y/wDCG5Pp5jQK7agbfGNsoRMOVwJPTUvNzDc0z+lUBSk7nY+0bRiTgycU0XDNM7C4TpJPt6CHrThOibUqmNLW8i6tKU6goDuRCyw5KVkAPsht7SVqe1C6iBcbE2APSNg1pWLqPJPLqrT8umYlZhpd3C1bQoC49pFo0Kjg+pUmwmnGQpQ6A3MSLJ63KLUGApZMu8F7C1r+2GxPhxQUvWduovewjbltAutS5IU/hGcp3o/OmWV+kN8xJRc7RqGhvJISXkC6gnvtc+6H7UJOYqlFo78owt9baFNL0DVax6bdIR6lS6hT3kKm5VbXNIDeoWJI36XjTIFjMmxPUOZkZlcspaFFs2J7Rregu9lIMPWs0dydmvSlTsu0lSE6itzcG3lvDfn5UScw2w3OJmQofPbTsmMFlltmSWKe6TbmIjYaoj7wWUvN/Y06vfGQXuNPWNpby5d9oMrKVAariMhgK1zJO+SVhhT6nEoCPur9fKMCpJzrqSbi/Qwr1ObDw5CGUtp6m3c+ZjTRMOMWW0soV5gRG4WWwKwGmrHL1Otp1i5ubWgjIHlvklzc3gjFkuv0JyMkSPmwsCQKZN1YTuG1Hp7DG3Taeo2unvC25IaadMHTuGlfVGoR/wBJSVS6SPRpJNtkISen7UQ6JamgW27eUe0+SCGpYAfsSfqELzUva23aN3dlBT7H/OyjStyKDVJtWnvfp+1H4oeGE5JLci2m3zUJF7eyEatM/p2dXbcKIh14cRaVSLfaj6otP0hXPhN6ge6UUMJA6dIZmMmgqsM7WswB98w+4ZGLPWrKQftWU2+JMQ0/5iu1x+X91q4ZaCJmZVa/rNo+qH0+thhhx59aW220la1q6JSBck+y0MvDu01MJ7Fxs/VCLxN4gfw7kpiRyUdKJioMoprdjYkPrCFgHseWVn4RtVGxuosMbnJHqoAzHzcVmZidV31jClMf5snKJJCJpaFXS86Oi990pOw22vvHknXpWdS2+XCULO5J7+VoiOTmy3IJS004lIQNJIIBHQm3vEKuG6w24DKLcI0quLnaPFVZdK+719OpImQxBrR2U80vlv25W4JAHrQ96NqlglKF3ChcxGWB2Q84loToJ2KfWiTZeXmJPQXLKHQKA2i5TRtAVGsfY2CXxqsgddRjaadeZd5LyipDuzZPVJsTpv5WB+jv206a6p8alWunpYRvzYW9KOpSAHbBbZHZad0n6QI7MGi87WC4sVjmQU9vbCXNAWJhWesttK03IUAd4SZvYGLS5Sb1RGyjt07xzGxkiZkc3MxZOQViXavO8xNNmZdloBwBVlKc3FwrtHTmokAKKhcAdI5dZ8CQpWfmPvScO0moc6otOIM20pwoBlmd9lAHv5x0aIXfYKpWEBgJUKYjTLmuTzTCFtoS6pKUPEPOoI+6Wn1VH2jzjQcQhbK0gO7fctC8OJygSsxMOOqmVoDiioNsjShAPYDsBH2MLUtaShbz5B9sdoN01XLMzAm0lCTKhag/810A3Six2O/mNukezGLazMSxlgpltrQElKGgNh5dxCtNUaUl1ty7DLwbUHTZsBSj6vkeghoC4HsIiNzQFPE4OFwt1PylNoBWCtCx1NiI13ZF2UdQpZGkm/q726dRGFTzyUaA6oJ8rxgDykJ0hZF7336xGCApSCVuVYcmpB4E2uhwbdNxC3SmZY4jcdmg4pKNChYW2UbEdfKEsIlqslDi5hDLjIAWHDZKkDsPaYzSdXQxN81aLJQ+lCUkhJKUg2JUO1+8Q1GjNFLF9YBSzMSCpipJpsu3KOsOLKVhA0qCO11Adem0MWfYS06622ixQshW1ine3Ty9sOBupUVua9OD04t4uFZbQBoC79Lncj8UaNTp0+qZVUH0pDbhUpKkgAEE3tYRC0mMWkO6nLRKC9gtbskZqUflloddl1hDm6VPNFQJ9gicsPYglZTCsjJPUpqbSpKXkB0kBKiLbAe6IfqdbcqDLEo/LNtpaA0r5xG9u5PT4Q+qY+4ij09C7/qFh6wI2URFWq0UkBT3xNNNTtHkXww0kuIKvVG4sbW6k29hhrUIql67LKBADxUnc9ARv3F49+WZlxpMlMTClMoBDaSdkX8o0Z0JW3YD1rWBEVbK2tWoaWag6e7ZITb37j4wiTu13b+o4q6RGy9dsltZ9bVcRrzeh1olHZNwOwI6iNkWpT51VLnTNJSlYsoKBG1iLfGFJFTpjDBepcnMIc0lIeU9uL9bdoRHLBzSdwpJvePqlKDjZaUbeuLWSPP6Y1YdVhmoIWaSqKqfUZpgS7Trc4lJIeuoA7m4EadTrE45LPSrbTLTSgApLbYFxe8fc+kLebcaVdaLJAJ3ULxjmZGddKgzJvOa03GlF4nGo1WjhZayalUJfD7IlJ51kIe3SFeYOxtCfMuLfmWXJhRcUogjV5xvS0pMzVAmw0kj0ZYWtJNikA26QmuaeZKrCbFKgSQAB0/8Y1WFoTyFInnk7CyrdPYI19wTv+P6YWqvTz6OmrF4HnLCCgJ+bYdbwilQvsbxgrC+5ZAW9ZRsExkQkvParXCe/sjC2QNRHUiPtFywEJ+ctYRe/vg0LBXw/wDZTrA9Ude8YeQ88oNstFajuQOwhamXhKL+SkDUy2kawTspR79LxoNMqZqLzQXzAEkXO23wiJ263CwMU+aFwtGn3qH44Ixvy82Ts0q3sgjVZX6V6bIiw2H0QrTMn/W2YSBuppQH0RlkpNIEbNUWmQo85Ok25DC3PoF41CSfQUSsuG1SzZA9RoAwphICY0KesTcrLzQNw42hd/eBG/pF7Rs/dQU5sLpj1VsmZmjYm6lfHcw5cPpIkkX62hPnqoWJiYbXLNlLaiU377bwoUl8zbQUgBs+SYsvuY1SgAE4KVSbCGRidX9eHCR+wot9Jh6BKkg6l6vKG5WnqU1PBE7LKW7oTuPK5tEVObOurVbrGPdJeHD+mXjbfnIHwiH+OHEC6Zgeg0xNyZqpl5Q2seWg267fb/VE2U16k89wyiHEKC0lQPY9oqZnlxZU+bdclqZkvRcWzFIn1tSpq75s2nUEl0N6CSdgbDfpuIxVyNDururGC08jy97BcN1KZ1WlGmqFIOmal0yk0ylxh4KASU7a9R7WIJ3sLEQ1GsSLp0y5I4epLE6lpYC5193S0vz0EbkX6Hv1j5r2X0/KSE07XZdxCK0pS5yQJsxL81ZUWQjqlIItpv0T74beJaBjJlliQw+wwyy0EKQggqBAAtYHqnYW6x52dkZmDXmwXumSlkN2i5S21nPjnC9el5mblacZbmkKbaWsFY3AAUL77j8MWWoGemG6xT2JWdqjMnNLbC0szCg2oH7bc2B94irU1WsRh+RZxEplc0lB0qVKpSlB29UBCbp77mw23iU+H6iJxXRcShxSXKkGXPRXi2lWh46lKUAq6baiRuO1/KPQz0NHBTCamlDnE2y+nmudR1EtS93iYi1rRvfvdTbK50SXpqaXhvDNVr6mxreekWhywnsQtVtfbp3MPeg44p9fcdYRJz1PnG0axKz0stlahve2oDUL7XG3XeK9UWcxxhvHaJj5AamWX08jlua9KEKSk6lFsHSb9QQbWiSKjUzVa2yZWiTiH0SbhS0wm5Q4VKUhSVfujt7wCBGZoIqemEjXXP8AnZcaV8klaYQzoA3ub3v+llLLKT6CySq90A3hNnbetGXDM/NVjCFFq89KJlZmdp0tMPMJSUhpa2kqUnSdxYkix6Rin9r/ABiMei5sgyuITZqiwAu47RzH4omlS+fWJl6jaYTKvdf+CCf/AKY6Z1b1goeyOafFmlSc8amu36rJSyr+7UI6NCfnBUq7qgJUUBQHSAOgE3EYk3tvHqlWG5Ed264Fkn1aYCXWHOQ1MFBWNDiihJBSRdRTY/TCCqWw1NNh9M5MyqvVTosHE6u52+1P3oWa0jWhlLTraFB0es4m6R16jvDaYw7iCdQmdkaa69LvuKbbdRYIWpN9QF9torTNL9ifsujTTMiF3WXrzlJkxy2mVTirctZUnSk/th3Eaa3KNMS60BpcqppQsQS4pd+vwEKisJ4lDKlv07Q2kEqJebFrdftvvQ3X2QlKlMWUB6xse8VzBlFyVbZUNdo0LP8AJ8skBUxNhLCd0K5ZIWOthYfXGrMvyS/Ukm1hBOq7itx7APww1X8UTepTXKQUBRskk2j5bxNMhST6MybHoAd4peIZfqKtmFx+kJxLSRZY+13MbUpUAVDm+ukJKQlW6fiIQ5LGglQoP0OTmlK31OKcFx2Fgq0ak/ix2amVPJpUpLpI2bbCgkfSY3NXEd9VqIZRoCnhTZmbp82lbKUEODSkrbQ5pv7D9cPlh9YkKeibJu62+AvTbSrmXFwNh1iFGMWTLXWVYcHYLBIH34WGczau3KS0t6BKlEsVafnC4URcHfp5RXlljfqFNG2Ru6k/0OZmJd6cQg8qXF3De1r9I+ac4uoOIkOYOYR87ukefuHeGG3nLXm6Q7Rk0yQLLtwr5xUTe4sbxoSGaNVkEvrapsipx1AQlxQVrbH7U6upiEOapipDxRIy1OS2/KT7c05qsooCtIHvPXeG+H1FhwXO6AVW84acxmFV5xGhyWldv3Q/DGmjGE81qSmXYIULEXP44cxqJ2unU6kHVuOo3t9ELvp7VDWzJS1Okl6m0q9IcbSVKJ36EkeURmrF06dJEq0kg3BBP443zmFUTLliapsnMODZDzgVqQnsBY2jRrwDqjAQblPtRlmMSyqpdxJQ4lB9Q7gk2UPVt59BCbWZqtKn1tpfmVoClp9VarAX77wzDjafDzTol2LtK1A26eyNqazIr80Veq2lJvdLepO0SCVqkNiNUv4WGtFTklXPMlnNt9zt5f8AhCA+q0iwoEX1gkC17b9e8aNOxbPU2ZVNNy7KysEELKincW840lVuZcbLRaZAWeiQdvvxjmNAUAY66d04oTeEphdrCXmEqsEne5t2Hu7w1D1IPWMzWJZtimzFMVKsramAEqKr3Fj28ukJ3pzgH6mj64wZBZZyravboYyMKIWD9qk6jfpCb6e75J+iPtufdIKSkEEetbyjAkWcqWa2A5NJIsOY2ldxbt7owVJ1QmULQohTrY3B36RqLrD7jTTTrSFaFXCj3Hl7o13551x8OL0gjf1ekalwKyBZffOd5xSpazYdzBGUzygAUstE9yoXKoILZfpldx5gylslydr8oi3bXc38oxYoxLSqllrU8QUubQ/JzNOdW06k7KBFgR8SI5Bu4pqkxoE5V33k6dR5jqlEn4mL0cPGL26vwSV5uYfLi8PtVGUVvuBrLqPoDgHwi/NQNpgHA31XDFdI9/Lc0ag/wrRYGm/TcK0iZBuHJJlV/wCALwuomWlrUlKrlPWI2yFrC6tk5huopVq1U5u5O9yE2P1RWDic4s85cosxpjDmXuEpGebXJJWJqZQpaW1XNyUgi9h7Yi8OZJHAdlvHVGKNllYnPKsT9Cy+xVWabMFmalpKYdYeAvoUEkgjztDlyPqc/VsuKDUqm/zpuYp7DjqyLFSigXNvjFMsL8UtNx5l1L0HMOtS7lQrrbjU+lICSQu4I0joLHz+MWq4Zq9T63gJRo9Q9LkpGZVJMqsPUS2lICbjraLVRCWU+qr08hNU31UwKPthl4oVqq6rfatI+sw8bkwzMRgqq7v96R9ZihS/WulX/lj3WvQlfpx8f8I39Qij+c+Xcjh7OCpUa8wiRcn3pkvJSAE8xHNbYCtwkHUgXO53AsbReGgovPPX7vIH3oZnETlsvEOHnsR0lLaZ9pKG5xNwkzDSbhAuepSVnyv8BEeIxlwBHZX+GqkU73td9LtFDma2heCk1hq4mxUA28b9bjWCR/Ct/wCdmdhWqNzkqJKbsdyEnSNh7jtC3i52bmMGT0q+E8yXU0lSU/NCkBINvOwPn5fCNqHPNSavSHrWRuonoAI49XG0kOK9dSuv0laOaLsm2UssMtrdCw0FBsJO56C20TNwkyspLOOO8wFyYSWlp1D1R03v3sTFeMUvT2K5r+tBW2pCucwsJuUb7Ej64lHh2wri/DLiFVyuL5tSS66zudaAL2I1Xune4T2tEVOwl91bqZWsj5Y7q1q6cpc2FJ0tOpUtsvIPzgFEWPn2hVZTKyzK0vJLrxAuq1h12sPohp02ooS9LF15xTrh5LylAAqUEgBRt7QfpEOdlhx+dbYQsnmK7diBe/0xfAubLzs4DdT2Rg6VqsrhKRFbmXH555vnvFf2pWdWkDsACB8I9n+h+MLsylCGwhN7AC0INQNgR5Xi2wZQAuHM8yPLvNNGrkgLsbbRzh4tUA5xFYHrPU5B99lqjo5WSLLKtgBfb2Rz24ucPV6fxeK7RcNVaor9FMuwuTQ2pDaw7dXN1b20E2097Xi9SPDJA4qnNGZIiwKC+XZIUN7i9vwR9FamANOknuCmNaboWP5+gmXoWCKyitNzKCouJbKOTo9YEeeu9j5R8UfKLiXqyUuyWClKQpRTrcLSEAgXNyTHV8awLmeBkHdY64WkMykw6paCHUuLLe6rjyhquqcZN33Hly/MUpP2D29evU332iRneH7igLKZ00NEq6hwp1Jm2E2I8rfjjQqPD/xMVdIRVZxp5KTcIfqSPV+Aiu+saeysRUxaLE/so+TNU5tS1qmHFBQI9ZtoC56keUYdS3PsMqzNuhYANkJKledtIh7NcMecsrMtzL3ySlTStQJmiqx/i7wozeRedq21WxPS2km5WlLykn7yIrvqGWVtsRB0/hVifA57gAIGs9eo3j1CCk6r+zYbw5MEYCrWYWY1Dy3oYQurYhq7FIlypR0B554NhSiBcJBVcm2wBjvTg3JDhS4Jcp01ut0jD1Ok6Wy23UMR1SUQ7NzbyrJJ1lKleuro2jbptteOWV0Quf8AwS+G3llxO5Gy+aGK8fYopM69UZqSVL08S/J0tKASRzEFVzfztFJ88MB0/LLOTHGXFInZibksK4gqFHYfmAA663LvraCl6QBqIRvba8fouydzQywzfwYjGGU1UlZ+gOTLsuH5aWLKC6j540lIN723tDClM7uEvNXMmtZDrqGF6zitianJOfos/TUqU7MMKUH0fZEaXFJKVE2JNkk9rwRfnYU0pIvcEeyOmORfhaZS5qcNWH88KrmLi2TqVXoLtWdk5cS3IQ4gOWSnU2VafUHe8MnxUOEDBeRFfoWaOV1JTSsP4pdclZ2mtX9HlJ1ICwpofapWm/q9AUm3WOhXBz/tf2CP3mzX/fQRcVuFLI48R2e+Gsp3JyZkZCqOrdqE3LBJdl5VtBWtSdQI1bAC4IuobRdnio8LLKXITIXFWbOH8xcW1Kfw/LNusy06mWDLhU4lJ1aGwroo9CI+/BVyiVPYmxznZPShMvS5dvD9OdUBYvu2df0nsUthkH2OxdHxHADwX5kb3/SLW/8Al24IudvAZ4emXHFllTVMfYwxxiSjTchWF05DNMDHLUhLaFBR5iFG/rnv2iyh8FHIhBBObWPfPcSdv5mFfwYP1tuI/wB9L38wzFSOOri24k8vOLLMTBuCs48RUiiUyel25ORl3wGmUqlGVkJFumpSj8YItXjg4F8reEt/L1+lYyxPWJHFFScl6kqbMulbTKCgqU0UtgBWlavnXGwiV+JTwrMrMreHrEuceWWPsXVqfodObq7UvPKliw9Ka0l1Z5bSVeq0VL2P2sUEzKz8zhzkakmM0swatiVumqWuUTPOhfKUuwUU7d7D6I7kcHGJqTxG8EOG5GvlM0moYdmsKVhtRGoqbSuVcCvLU3ZXuWIIuGmR2W7mcWb+DssUPPMIxLWZanvvM2K2mFuDmuAG4ulvWoX29XvF8eMPw08i+GzIav5sUvMHGtQqUguXl5GVm3JQsuvuupQAsJZSoixJ2IO14jLwzsoZ/wDRyCkVmW1PZeIqb00q1gl9kmXSoA+anPvxZXxrsxBTMusvsq5R0hyt1SZrU0Af2KVaDbYV7FLmVEe1r2QRMzhq8KLJ/O7InBua9dzJxjIT+JKcJ1+WlBK8lpWtSSE6miq3q9zD6rvgmZUOU51GGM6cVylQseU5UJSWmGb26FCA2r4hXwMWd4Dlrb4JctHG1FKk4bUpJHUEOOxz94B+MLiKxdxh0DLbGmZtTr+HcQv1OUmZOoEOpbDUq+82ps2BSoLZSL+RI7wRVN4i+GDMPhizMYy8x8hpxE6Ev06pSqry89LKVpK2yeigdlJO4Nr3BBN3M7fClyjyu4e8VZxUvMjF05UaFh5ysNSswJbkuOpaCtKtLYVpuexBiQfGgotPXgfLDECmUmeYxC9KpdsLhpbaVFN+trpSYs7xdfrHMxv3jvfzCYIvzvw/8gcvqZmvnRg3LaszszKSOJKsxT335bTzW0LVYqTqBF/eIYETRwXfrrsq/wB80n/LgitPxxeG7lhwsZHKzQwnjzFFXnhWJWnCXqPo/K0Ohd1fY20m407b9454Hcx3I8YP9aC57MT03+S9HDdWxMEWdKVOJuNh5wRsDmMtJcbSFKX0PkPbBG10V/fzkKqv1pXGmHFgC32RyZR/3JiUcoaVjTL6i4lwdP41oSqBiZgtvsMOPuKDltOr1mU2uNj7ojxKZ1A5iVkAd4ypdqarJLy1atwOl4tvmriMun6KRuF4eDmF7+6u7w9ZtYKy+ywp+CcUYhYE5Tua2FMocW2pGslPrFIsbEXvGOt1/JfM3GrEpMzRE28y6kJW0U81FrGxI33PaKWtoqiiElakhXcm8PvKWam6TjemO1DS7KJeCCpfRpS7AL917X9nuES0nPEhMg37qnXYfC2EmF2o7FL+bmRGVWV2Cca46kqbMMhhKvk9baipTLtuoJ6AkxdHh3w/RsP5WUSVobPLYdlm31m1itakgqUfaTEU8RmCjWsia5Q3XkpW42p5Z7FWx2+AiZ8kbpy2oKHE6XESLKV38wgD8ET1ji6EriUbS2qYHJ+WsCYZ1fBNafHYBsfCHgpQHrjfT2HeG/VachU27NqJUVkWT0AsO8cyBwa667NXC+VoaEmYebCp14H+7J+qELO/FDFNw56A2+hDc04GnXdWybAkC/ndN/gI9k52qO1KcTcNMMKCRoGm6u528v8AzaGLnjT1TeXVZm2WyXpFsTqRbcJbUFL/ANAKitVzvffINldwyiEBBkO5UOV+tS89IVuVaISQhWhN7qJ1K3PlcdvxxEtJYTUJwy84+W2B6yydgpI/DCdN4mmKdUlanUqlppKUaybEbnSfZ5Rr1ZS5cpmEOqSq4sbbHyt7IouInaD3XoWuMT7Be4hVjxGK1y+F5GksU5IQWJhTrnMULesCnTYdbj3fGJrwixnKUTDlBYkn3G2mxTkzbqCn1kXWHFBGpKdW2wPuPSIywvUfT3mgu7kwNlLN9Puibst8OuSdaE5LPPJcOoruo2IN1AfTtE0VwNQrjyAy5TpwVOZjrSEZj4ao9Lm1rSpIps8qabVYiyipTbZBNjtbt1iZ8LNImPSJ0pBLagygnsbXV9IKYY5VOVKfl5aXSVu8zSlAF9Sun0RJ9KpqaTSmZLma1oJLivulncn6YmjbrmK81XSg6NWGdFhYDpCBUOivdC/O/NVDfqG4NosLmHRNGspJbWR1tEBS0jl/iOSffrWN3kzK5l9EyymbSgIWh5SSjSBtp0gdYn6sXKFjfcWjmPjBujM1LF9aqePZ5ickseTMqmisTCk65RbhK3UBO6TcnfptFqBmfS6ryvLG5grRzOD8jcPB6ou4sel1rIKnXKm4nV2H39vjH3KYqyno8u7T5fHTkuyyS4o+lOLtcWJII6WinOaruH2KBLv0LEdRnZp1dlszNSVMhY7AgAWPTc/c+6G1LuSM3gx2amQ+ms8sqEw5UhoCATZPJPrH3Xiz4MnUlQNne7srkYizfyblAunDMlkKUQ6Q9MKSd+lgNgD1hh1TNzKb1uVjxlwjymXSIqDIvysxLuKqNMmJhSAClTK0oSgE2Gq4P4IH6JiM1NVLpkmlmZZ2cSt5tQ8+vzeh84eDaN3FZ8SRoArQPZuZYkJWcShxPclT5B9kItdzQyolnFsT1dWy6pvWEhLywbj1d/ois9SqNXo00ZCryrKnE2JCNB0jtuNjGlMVKnzTYBd5Kj2Ld7+82jBpGEaOKyJZMwu0J7cDBameNjLE2C214mCk3HUaVkH6o6b+MOpTfCgwhC1JSvEsiFAH5ws4d45h8BhS3xm5VrWoJT+aJtNzsLlCwPpjp74w6Fu8KDC20FSUYlkSogXCRZwXPxjlFdULe8Ib9Z/IHv8AmgqQ/wBNMUVy6WtrxdJ4NKKB+epWUWSber6RMC3utF6fCGI/QgSKb7/mhqRt/DTFFsu0Lc8XWe5aCq2ataUbC+wmJkk/RBFcPxoEIHDNhp0JGpOM5UA26Ayc1f6YmLg5JHh/YIIF/wD2Omf++iHfGhWn9DNhpu41KxlLEDuQJOa/HE48DUgmq8DeW1KWrSmdwyuXJ8gtbqfwwRRjw3tM8JHhrrx2plqXqiMOzuKnA6kJ5tQmUH0ZKvO59Gb9wEO/jyUpXARjBS1KUVUGRN1G5PrsxFniz41ksquFPD+UdDVyhiGdlaW02ki/oUm2FEEeV0tD3kRKfHgCOAbF9+9Akj1v9uzBFFngwfrbcR/vpe/mGY52eI5+vXzT/wAYyv8AQpeOifgwfrbcR/vpe/mGY52eI5+vXzT/AMYyv9Cl4Iq3I6x1c8FDM9SqVmDk7NzClBl9jEcigjZOtIYmNz56JfYe2OUUWl8NHNBGWPF1g5U5MBqQxM6vDsyVKISVTI0s37fqwaG/mYIunHDDkwvBPG1xKYuVIlDE38j+guqQEpUJ1Dky+hJ72U21f2mOf/i649GLOK57DzDoXL4TospTQAq4Di9Ty7jsbugfAR25YpdPk56cqzUuhEzPhsTDgHz+WkpST7gSI/NrxKZgDNPP3MHMBqZD0vWcQTjsqv7qWDhQyf8Ao0ogi7m8CCVL4JMtEJBJVhxQFva47HOrw/OF/Peh8ZmHsfYkyzrlEoFAfqk7NT9RlVMN6XJWYZbSkqA1KUt1FgO1z2jozwEOoY4LMrn3ElSWsP6yALnZ1w/givOJvGiyFprU7LUbK3Hk7UZZa20NzQk5ZhahcbuIfWoC/wC0PuvtBEneM/VJJrAOV9FU+kzT+I3phLdxq5aWgCbeV1ARePEmX9CzWyamMucVJmPknEVDRT5wMO8tZaW0kHSqxsfbHA3iV4p8e8VuakhjbGIYkpSQKJSk0qWJLMixrCiATupajYqWdzYDYAAdr+KmoVKkcF2P6rSp6YkpuWwW46zMy7hadbWGU2UlaSCCPMWgir9jbwauHOs0V1jBOJsU4cqZSrkTTswicaC7ba2lBJUm/UJUk+2KAZP5M4xyB4+sCZW47lmW6rR8WSaS4woqZmGlKu280SAShabEXAI6EAi0Wf8AB0zrzSxXmnjbL7FuOa3iCjHDwrDLNUn3Zr0eYbmWmtTXMJ0BSX1agLA6E36CHXxqU+UlfE04fp1hoJenWaet9XdakzjyRf3AAQRSx4wf60Fz989N/kvRw4V84x3H8YP9aC5++em/yXo4cK+cYIlFCy1JgoNrneCNdldhubQQRdLmpmRU2hZKNLzek+QIjNJhpaUqKUAtKKTcgRHNPxSQFNa0qQkkpJ+1vGyMT8mZJQQsOgXvvv52j0Yc0rQNcFKsk1JzDZSFpC0+QuIUqPT5qpTTdOosi/OTzzmhDLCCpbiu1gN//N4jPDlVrdcrcpQaC049Oz7yWGGUJ+eo9SdtgBck9gCTsCYvzkpg/CWW9Ibk5Yicr82LztQcbUVOrJ3Q2R81sdAnqepuYhqKtsA01KyIHP32T8w/gF/FGAadhrMmU5kwmWaTPMNTKh6ydgCtBB3sL6SO+9okCiUOnUGQapdLY5EswkIbRqUqwHtUST8TCdh7EFPqL6pSVnGnX21fZG1DQsbdbd4X1uKbQFFsnzt2jjl73/V3WghjjN2he6AL7iNScYDiLAXPSMxcU4jWi3uvCdWXnJemzE4ysgstLXbzISSB96MsFjcrJ2TfFIDUzNPtvjQ+7qAQOlkgEfxtUJ9WoqJ6Tfk3m0ramG1NLQeikqFiPiDDqkaeWabLMu/qiWwVk91ndX0kmPHJNtZAcRqTcG3tB2g5jXG6kbIWhcwsZYNn6bMzuHXkEuU15yX9cddBIBv7QAfjCFR6nNJZFJn5LnIt1XuQLdL9ouBnhlu0nH81NobHLqjDU4gjYcwXbcAHndAJ/diIhncsEGYUhqXCVne945jYuW4t7LvCcSMDx5KOqBJmUqKX5BD6Vg/Y7kqse3Q+Z8osNlHhbMypVFMxNzUowy7bSp6ZIRe33IBJ92wv5Qk4By3dlqvLLmZNSm0EkkoKkmJ4l22JeZlZOWRpLSklJAsQ522i2xuYqrNUuDbAp+4TwdKYYlS4ZkTdQd3emSLXHkkdk/Sfb0AV3xsbAAA9h2jBRqmmekm0GwWgaSPK0ZXFakqI7bRKRYrjl2Y3SVPdDCBPbaoX57oYQZ0XvBaEJpVgEocsOxMcncx6hiOg46x3VJR55qQdxBOMOKbWxdRKzcaVEr79bR1lrKCW3ACBt1JjlZnU042cbuqTzUrxZMhIP7GebuR7DF+j+tVKkfLHuo4p9JpVVZerU5KzZYaUNakTCGipStkkXIuL2vbbrDnqfpuKq+xhikyS2VyUohpzmTUvYja9lp9U+wbkR9olETGTiHZldglx0JGgnSm/a229oVsuGTJSNWLDbS1JbQoakL3BaPZJEdJzjdVBGC1xCjuYRQZ6rzMnL0l2X9e1y8HF+qTcbWT1HWEqoYlpSVql5WjsoXqsS+ym9xt1HW9zCrJNUkTS32G3VOqWAVKfCbEr3ATa593aER+lpRVJkvOusNsqLyioahYK6WO94xMWtbdyU4zHKkqrVJyfuhFMpyNFkkttAL2287wlLmnkraBkJYEnlgLZsTfa+/tMOWYpVMcfdm3alLFgnUSUFJSo9Ee+FiiYio1Aprks1hCVqjqydMxMOaw2PIJvtvfeKhOZtmK2WGN1nFRPgXGtXy1zAoGYFA0CqYaq8tVpUKF0F6XdS4gEd0kpAI7gkR3nwNn5wq8b2T5ouIqrh+dlaow2KxhisTqGJuTeG5BTqSsWUCUOoIva6Te4H5+ZtzmTbrmhKbuKVpA2G/SPlLl1XWAY5B3XRGy/S7kllXlHk7gpGEMl6XL0/DqZl6YSyxUHZxHOWQVnmOLWrr2vYeUMOk5KcH+VWaFcz0ZpeFqRjSdm5ycqVZn60pxbL7y1KmFpQ+8pDCiVLB0JSQFKTsCRHNfg18SrDPC5kuxlZVctKpXX2ahMzxm5edbaQQ6oEJ0qSTtaKb50Y+YzOzdxnmTJU9yQZxTXZ6styriwpTAmH1uBBI2JGq14wsq4vilcYmC+ICv0TLXKyrGrYbwm+9MTVTaBSxOzpGj7Fe2ttCQoBdrKKlFN02J6U8AP6zPKiw//ACIfzrkfnf5hJ6dY6UcO3ixYTyPyPwflNPZSVepTGGaeJNycaqDTaHiHFK1JSRcD1rQRMbxhc1l404k6fl5JzOunYDpDUuUbEemzR5zygf736Mm3YoPnHQfjy24BsXX/AP2CR/lsxw+zjzEnc381MUZmVJssv4iqj8+WySrlJWolKL+xNh8Iu7xB+KLhjOvh4rOScnlTVaXMVWnS8kifdn21toLRQSopAvvoFh7YIrIeDB+ttxH++l7+YZjnZ4jn69fNP/GMr/QpeJX4IPEPw3wkZXVPANXy5qWIHZ+rLqImJacbZSgKbQjQQoE39T78Vo4nM3ZHPvPTFmb9PpD9Kl8SzDMwiTecDi2QhhtuxUNjct3+MEUWgXNhFjOGrgx4ls5qrhfGuXOEX5Sgv1JDrGJ3plpqWlCw9Zb26taihSD6qUlRI2EV1bAJ3JG3aOhXCZ4nmFuGrIGiZQT2V1Wrk9SHZx70tqebaZXzplx4CxSSLBdj13Bgi6Z8XGaaMmeG3HeOVTwZn5ejPSsg4CApU6+ktMlIPUhagq3WyTH5wFW1G3S8WZ4vuPHNDi0m5Sk1eSlsO4RpbvOk6HJrKwt21udMOkXdWBcCwSlIOwuSTWbqd4Iv0McCP6yLLX97S/5x2Pz74g/t5Uf8Le/lmOi3D/4ruEcl8h8LZPzmUlYqT9ApSqe5Otz7SEOkqWdQSRcD1vvRzkqswmbqEzOISUiYeW7Y9tRJt9+CIpP9tJP+/o/lCP0W8RmEcSY/4SMZYIwfSXalWq3hBcnIyjakpU88tlISkFRAF/abR+c+RcEvMszRGoMuJWUjqbEGOrtL8avBFNp0nIOZIVxapWXbZKvlNkXKUgEj1e9oIlbwr+DvPDIbMHF+Y2b+FlYabnKKmiSEq9NsuuzClvturcs0pQSlPJSNyCSvYbQlcZOIKZVvE9yKpMjMhyYoqabLzaB+xrXNPOJB96VAwj438bJ1dFfYy8yT9HqqkFLT9ZqPMZaV2UW2gFLt5ak++KGYK4g8Ty3EbReIfMiam8TVeSrbVan1KUhtyaKD8xNgEoFrAAAJSBYACCLrb4wf60Fz24npv8l6OG6tyYv3xpeJPhjipyZOVVJyzqdCmDVZWo+lzM626izQXdOkAHfX19kUFWAFEAwRZATaCPvl7DftBBFaVNTKX1JCyAeoEbPys4oXSs3RY38heGYKhdZO5t1sYe2VOAMQ5s4qbw1SGjykNmYn3yPscrKp+ctZ+8B1JIHtF8z2F1dEauFwjZeOUmnNZiV6UUmcraCzJpc+c1JKbJ5luxcOkjzTY/bWi1uGaZ6ZrEuo65ZfMQkKsbjcW+iIzww2iXlG5RptLbTGjloHQJCEpAA7ABIAHsiU8OTb1KSZ9tCkg7LI6afM/EmKbSZHZitJLBtgnkily1ZUh5xtUjVWrFmYSLaj7bdYdtDnpiaQuUn0FMzLjSs9lDzHshIc5iJNmpymh1rZaVWuUnzEKridDzVVkyShQBeSBcqRbtEr9VR7LJNh2Sd9JZSS2PnJ848nFt1GnOISLI9VbqQkklIUFKHxAI+MKA0PtCxCkrTcHsQYRQV02aKbkgnoenvEat+YLeS0Jtqtb822HXN1za2z31MLH1AxmlMQ0GectKVZhagb2UdJ+IIEatSwvJT7vpDKQlKvWVtaxMNp6jN0mqcxBTomBpN/PziUsGQuadgsB91jzUZo1XlJB+UnZZ+aknlIUhtxKlaFgA7DfqlMR6miyC1qW5uLbG3eFefTy59+wAs6qwtexvFeaZxdUKq8SU1w3N4NnWp+VfcZNTVOoLStDHNJ0abi426x+b2fFTiCvqqllDRscIA4u6jo1psTr/Ze5bhFPTxsD5D1Wtp3KnultStJbXMAqdWLBKQOhJsNvv8AuBMOKmegsIlJ1+cYLxFpgldlahtq+PWKwZ3cXlFySzToGWFRwZO1OZxAJctTjM4hpDYde5frIKSTa19jEkZ35rUvJLLOtZn1mRcqDFGSxaTbcCHH1uPIaSkKIIHz73t0SY3b8TuKmeGHgmf7n8vq31t/PnZauwijfnvKenfRTbT65TZCppmETzRZcF1m+3W0LRxJQwhRFTZIUom1+kUc4a+N3DPEbjOdwVTcFz9DmpWRXPIXMTiHUuoSpKVABKRuNQN4spc2uCbWv74qY78XOJsAq/B4hRsY/Q2v2O211rTcP0dUzmRSEhP+br1GeBDdQav+6hImanTjcemtH3HrFWcR8XNCw9xJSXDi9guefnp1+XaTVETaUtJ5rXMB5em5sLd94ycQHFrh7I/GuHsvGcJT2Ka7iJAU3KSMwlosFawhoK1JVfWSqw2sE37iL8XxE4xmkhijoGEyt5jerdg/qvsPY2UTsFw9rXXlOhtt3Vg6qpD7ThZUF3BsnzjnVmtw95uVl3G0zSMuazMuVLEC5mVSylvQ61qFlpurcWveLQ8RHFTgnhxoMhN4qp0xUK3VWyuTo0m6nUsgDUpTigNLaSbatJJPROxiHMp/EzwHjfF0nhbHGAJ7CPynMIl5adFQTNshatkc0cpsoFyPWAUPOw3joYbx/wAcVlIcSpcPa6MX1zb23sL3IHoCq82CYaHcmSYg+yilrh7zzVlgihqyvqjE80tyzBCAVA3IJ9f2wpYN4dM65FuoGoZeVBnnyTSEhxSDdYCgRssb7xMuevH9hfInMyqZZ1DLaqVd+lIYWqcYn220LDrKHRZJQSLBYHXtDCY8VjBMy4Gk5NVu6zoChVWtv/8AOOjBxt8QKyBlTFhzMrhcHMNjr3PkovwbCoiYnSm6iWV4S8+SiZdncvqmnVZaEc6XClLC72N1bbeUaFW4VuJSel0NtZXTodWouOn0lhJvfpbUB5RcriY41sA8OVWbwsuizeJMSutB8yEu+GG2Gz80uulKtJNrhISTbc2uIQeHvxAcB51YsZwBWsKzmEa7PrUiSQ7OCZl5hwXOgOaEFKyBskp36XvYRQHxF48mw78VFAzkgZr31sO9r3t62t3WW4BhcUoi5pv/AJ6KoLfCHxQLRyjlrNFIN9K5mVIJ891x9Hgy4llIUXcp1KJ7pnpZBB94c+uLhcQnHdhrh9zEcy7qmXtUrEw3KMzZmWKghpJDgJCdKkG3TzjzIvxAsq85sXyuBpmh1PC1Xn18uQE48h1mYd+1bS4m1lnoARYna97A5/6g8feA/EWUDDEW5r3v0+dr3/bRSOwTC3SiN0xzD/PJUEVwI8VallQyjnQCb/2dKflYDwJ8VCPWTlNOf5/KflY6Q0zi1oNQ4lJnhtRgibaqMs660amZ1JZOhku3Dei/TbrE+3O1vO0eexT4v8RYQ6NtZRRtMjQ9upN2nY6FdCHAKSoBMTzpodt1xg/QK8VRN/zpZwf8vk/yseHgT4qibnKac/z6U/Kx0jwTxb0bGvETWOHtnB09LT9KcnELqSptC2l+ji5IbCbjVt329sYcG8XlHxTxCVLh2rWCZ3D9bkXJplmZdnUutzK2RrASkIBAW0CtJJ8h3jqO+InF7OZmw9nQwSnqN8hv1b67dlC3CKB1vmnU5du65yDgQ4q9j+dJN/8AWEn+Vj39AlxWA3/Okmv+sJP8rHSjN/iooeVGbWFsm5PB87iKvYnDIbDEyloMF57lo1akm9yFH2AROmkXFrC5G/lHKrvi/wAQ4dBDUVNFG1swJbqdQO9r3/VTRYBSTOc1khu3dcY/0CfFbckZSzQ/5wk/ysH6BLitP/wmmvjUZT8rHR7BnFxQsZcQ9V4e5bBs5LT1Jdm2l1Jc2lTTnJFyQ2E3F/eY9x3xcULCmfNNyAw/gmdxHW6hyG3n5ecSy1KLcuSFApUTpRZZPbcdo6g+I3F/OEH4fHmMfM+o2yb5iSbD+VAcIoA3PzDa9vuucI4EuK0dMpZrb/jCU/Kx4eBLissR+dLNeX9sJP8AKxfriC478NZAZjP5eVPLqpViYl5ZmaVMMT7bSTzBcJ0qQTt748yO8QLKnOXGEtgabodVwxVqm5ypD0taHWHnNyG+YmxSo2sLpsTYX6Xuf64428D+I/hrDFbNcOv073te+2uy0GGYcZOTzerZUF/QIcVg3GUs1/1jJ/lY9/QJcVpFjlLNH/nCT/Kx0ewFxayGMOIes8O1UwHM0WrUoTYROOT6XUTJYAUNLehJGtq7g3Ow9sYuJni+oXDhiLD2F5rBk1iKfr8uuZQ2xOpYLKA4G0XGhWrUoLtb7g9Yqt+IvFzq+PDm4ezmvbnAzaFu973t+6kOEYfyzLzTYGx91zlPAhxVk3OUk1/1hKflYP0CHFWNxlJNX/xjKflYvrn1x50LIbHf539ay0qFRm0SMtNuOMVFtCUKeRqKLFBJ0na/e3QRHh8VjBIWGzk7WxqNgTVWhffr+px06bi3jqthbUQYbGWOFwc+4/8AZQyYfhsZLXSm49P/AIqnDgS4rgb/AJ0sz8KhJ/lY8PAjxWHb86Wat/jCT/Kx0f4juLqi8ODOGXqxg2dracUsOPNJl5pDPIKA2bK1JN78ztbpDnz8z/pmQmWMnmhU8NTNWl5yblpT0RmZS0tsvNrWFaikg20W6d45EfxK4skEDm4ez57i1nV9RabEfVpa3dWHYNQjN8w9NidPNcuRwI8VqTYZTTW//GEn+Vj08CPFadzlNNH/AJwk/wArHUCT4lMDM8P9P4hMUsv0Whz0sJhMsVB+Y1l1SEtJsBrUop2HS1ybAExXOa8VrASHnPRMpa+6wFENuOT7KFKHYlISQD7Ln3xdw7jnjXFDIKXDWHIS0nMbZhuLk6n2UMuF4dCBnlOuoVSzwI8Vp3OU01/1jKflY8HAjxVp3GUs0P8AnGT/ACsdIjxZ0UcNY4kFYOnTILVyhTBNoDp+zcq/M026i/SHDgPiOwzi7Ih3P2oUp6kUeXl5qZdlnXkuOBLJKbBQAF1ECwt1MUJ/iXxZTxmR2HssJOVufr8t9ffZSNwegcbCQ7X+3muXv6BLisI/9001t/xjJ/lYifMDLfGGV+JZjB2O6KulVmVQ2t6VU824UpWkKSboUQbpUDsY7JcNfES1xHYfqWKqdgeeoFOkJlMoy7NTaXvSXNOpekJQLBIKd/Mxzq8RZCVcVOIkkjaQpouf8Ebj1HCPHGLY1jkuDYpTtidG3MbG5vcabkd1RxDDoKenbUQOJBNtVWR31QLbQR8uLFgLg2gj6qDbdcNSszUbslwlJ1quQrpb2x0l4asuZfLPh8kqu5L8ut43YYqM8pSbLbZduphn2aW1AkfdLXHLynsTk7MIpxflmlTSgyi84zcFRt0Cr947Oyb9NxPhCWlaMtLipJtqVVLt/PbUyNBGny9W4I7GNZSTZoV5jgCvMPOpJaTexKLAdbfGJdws00ocp1Wy06rHcWA3FvLvERUumzci8FONlKQoDTY3t9G0SxhZSZZTPppU3LOKCkPpPryznS/tSdrg7RbiaAFXmKfuG2n5Hm0x5XOkpgFcoq9wnzR+GHDKIWwyZcJN2VbjzSYRk0x5pfNllJZfUQqwP2F7uFW6BXuhakJpcykl5BbeTstH4bwcO4VQkLMwtthtDIV6vRBt1Ea1VlwuzoHrCPmrvBiWDidrLBFvO/SN1Y58ukkbqF7xgdBBUZO60Kc/qStlzYX2jRrtGL6A62i60Akb94zuoUyo6Nt4UmlpfasrrGag5WOc3yK0boQoLndXp72v5/NVf6THNrCe/il1kd/T5n+giOlVXAFYmgkWtMLH0ExyUzQytqGc3H3i3L2mYkNBmKjUXFJnw0XC2ESqFn1QpJ3026jrH5M+HcUVRiWMRzvyMMUgLt7Au303svomKOIgpy0XNxp56KQOPpX+y3y132LdP/phiX/E+xM7Scgqdh1l3S5XsQMIcTeylMstrWfhr5Rin2bWQlW4eeITAeFatjdeJ3ZybkJ1M0thTRQDNBOmylqJ+bfr3iw3iVVdutZh5T4DdfbSh+acmnlOKCUoDjzbfrE7AWSY90zDqVtbgMVM/mRxNkcHWIuGi97bjVc8yvMVU54sSQLe6jbhroDGR/HXRcFpQtqVqlHZlrq21KmaW3MWHn9nGn3x1EHzbW23tHNTi9rmG8I8YOVeYuFq/ITknLN0lcw7JTCXQlUtNlKwSknq1oFvK8dLLbqPY3I37R87+LodWeAxR4s6SOx92nX+V1MDcIxLCP6T/K5sZyVmm4b8Syl1+tTzcpT5ByRmZl5ZsltpElqUo+4D70OLhOoFS4m+JrFHE/iaUKKHQZotUaXeFyHlApl0eR5TQ1KI+3Wm2xMQ3xyYXrONeM6fwnhyXMxVKsmmScq0DbU4thAFz2G9yew3idvDVxzO4Wq+NuHHFSPRKxRp12el2VkX1Nq5M00DbeyghQ9hWe0fScWbJTcDsrqL88UzG+oYbZiP+VyIHZsTMUn05yfc+Sa3HqyzU+LbLOlz6A/KOs09CmnBdJSqbOpNvb3hS8UunyUtX8takxLMtTX6Yl+chICuWlaClF7dASbeV40OOYE8YuV4Av6lN6f4WYV/FTSflHLUkfs01/KbilgU721GARhxymGS4Gx6VJVMBFS62uYK0OecpJv8LWNZp2Ul3H14ImlqcU0krKvQ1G+q14g7wuJGQm8i8RLfkmHSMVzAC1tJJt6JK7bi4idc7L/oVMafvFm/6EYhDwr/AP3DYiv/AL7Zj+hyseKhqp28DYi5rzcVAANztcLpSMacSiBH9JUYVKUl6z4orLFUbbmES840toODUEqRJgoNj5EAx5xVScrTvEAwBPyCAy/Nu0l55aBZS3OaUlRPc2AF/ZGaw/qpQ9s2n+hR88W4tx65b79DSf58x72llk/EKaEuOU0O3bYrlSN+S9x35ix8R6EveJLgRp1sLSqcoAUlQuFAuC+0YuOGmUukcZuWE9RpNiRmppukPzCmEJRrcTUFoS4bD52lITfrZAHaEHjVlsZTfHTQ5XLyaTL4mebo6KQ6opAbmyfsSiVAp2VbqCIlHLHgyz4xpnTSs4uKHGUlPOUJ1iYYlmnw89MLYVqZbAbSG22gr1iBuq529YmLIq6TB6SjxGtqWsa2lLeWSczydrDv5LBY+oklijZc5739EwhijDmC/E4reIMV1qUpVNlpuZS7NzTgQ0gqkiE3J8yQI6E4QzEwHj+XemcFYvpNbbl7c4yU0h0t3vbUAbi9ja/Wxjm7i7K/DWcniK4iy9xj6Uml1GbeW96G7ynPUk9abKse6RfaNjBOEGeGrxA6TlvgGrVD5GmnWZRxEw9qU7LzEvrUhdgAqyiCDbqkRxOJ+GKDiiCnDZXMqY6Zr2i12loHc731Vijq5aJz+m7C+3rf2TlyHTfxMcaEKt9mrNv4ke8c1Mm8mOKLAWf1LBYZqDku5MuIFgp6VUlLgNvumlJv7I8yJUE+JljZQBP6YrRA/gQ6fE6rruI/zv8AJegSSJut1OpmfQgD7InUCw0gHsFqWokftE+UWubK3jWjpwLxyUoa/wAsuUm5+9lGWtOGyO7h5I97pI4Xn0cSfGrjXP2dbL1Gw02tFHCgdKQU+jSux6HkpWsjstQMdBR39xjn74XmKGqJUsf5R1mWblatKvon9JTZ1RbUWXWz3OlRT7rx0CG30R8v+LLpGcQikDbRRMY2Mdstgbj3N12sDIfS579RJJ91y7wzmDQsq+PTMzH2JFH0OiCtTRQkgLdWEDQ0i+2tatKRv1MSz4fGXVax7i7F3FdmAhL1TrU2/LUq6DYLWbvvJv0AGlpHsC/ZFUc7Mv8AFeZ/F/j3B2C6aqfqk5WZ1bbI7pbSVqJPbZP02EXV8M7NZrFOUc/lpUHgmp4MmyG2yLKVJvEqSQP2rgcSfK6fOPrnGjZKThHxlEPmuhha89xHb9gTuuFhxz15Y/YOcR6lRPn42274kuDEuoDifSKQhSFAKBGk9jt2jDxw0ynULjDy3nqLJsyUzMopzjzjCQgrWmasFHT3A2B8gPggcZMpjae45qRK5bzSJXFDzNMFKdUpCQ3MaTpUSsFP0giJSy14M+IDG2c1Izg4m8b0+eXRHWnW5Zt9L70wWjdtsBtIaabCrE23O4tveDaukwaiosUrqlrGtpcvLJ6nEjSw766LBifNLJBEwk5738kj8W7CsluNzLjOuQBYlK2uU+UFhOyi2r0aYvbuZdaAPdCRmyyc6fErw/hZzS9TMMzNPbXYBQVLyjfpbqVeYUtTif4QiZvEuwK/XsjJHG8jLhU3hCrMTLjg20MPENKPt+yFn78Qj4dzNQzQ4iMZZv1tCjMS1OJKgbgPzC0ptf8AcoUfdFPBcSiqOFzxIfzIIZIfXcZf2IUtREW1nhBs5wd9u63s/kId8SrBKVtpcDkxRLhaQQfPY9Yy+K5KystOZYplpVlkKTViS22EX9aVte3XvHzn4dXiX4FUOipiiWjN4sf9nZX/ALiq/wAqVibBZZPxbAWBxsad1xfT6D2WKgN5NSbbOH8haviin9IZS/4JNfUxEq+IuR+hMpIG5FYpX9GeiKfFGGqn5SpBsTJzY6X+1l4jPiP4NMQ5G5RSWZNTzYcxExNTsrKiQVJrb0F5tatQUp1Q2CLdO8WsFpKSppMIlqZsj2SyljbE5zmdpftp3KjqJZI3Tta24LRc+WikDO1Myrw18q1Na+UmbZLoT0trmgL+y8OfMOj0KR8MmgP06nyTKnZWnvuOMspClvKeusqIFyoqvcxvYlxvQMGeGjhMV7DcpXTW5JFMlZaZKg226qYeUHrpIUCgIJTYj1tN9r3rNUMgM76HwrNZtVXMJcvgmfdafYw0KhMqDyXHNKHVNAclNz6w6m2+x2iXCYRVxNE0vKEdY8t/7mp6bD1P7KOcmN1g3NeMfb1U8Kt/Usmwf/mP/vzET1PM2r4g4Y8r+GTA5ExWcU1F+YqIbVvy/SVJYZP7pepar9AhPYmJXcF/CzbAPSY/+/MVPy3GNsnahgTiCdpLwovy4tuVfHR4y5RzkW7XS4oJ87K8o6uC0jKqOre4AvZUyOYDsXhvT++v2Uc8rmuY0bFoB9r6rshk1lnRsnstaDl1Qkgy9IlUtuO2sX31es86f3ThUfYLDtHLbxGv11WIv8Bp39EbjrjRqrIV2lSVcpL6H5Coy7c3Kuo+a4y4kKQoewgiOSHiMDVxV4hAH+4adf2fpRuPlnwfqKiq4rqpqq/Mc1xdfe+cXXYx5rWULGs2BFv0Kq+esEZ3WwkApOq8EfqB3ZeMCnHCOVFIYxFSlrnZpahPS6kJsPWIcSY6IYJm5yVn1LYUtrW8tRUhWw3t26RTnLqfps9jOhjUDaaSbe4E/gi4mFlKVLLUjYLcVZXe19h9+L8gaHhoW7BYaqccK4ynplxMnMOMTjiNtMylK7jtYq6fTE0UGVkp2RBfpaGgogrSk6kn6enwMQHgPDnpUy04pIJ1AqJHcdYsDTXhLsoZ7JABjAsRoq8uicdOl0S8uJNTji0E/YrpuUjyvCgW1JOsJBKR96E+mPFe6iT5QrBY0kkn4RA8qO3mm1XJ0O1eUpqUEpCfSF+xHS/0kCHCzYyzdumkQ2Jyn/J9em6q48pwzTTQSlR/U0pBGkfG5+MOdogspUOhSCPojeTRoWh0K1JpoG5tGKUUUKKR0EbzgB2IjUUkNK1gbDcxrIQ6Jw9CtBo4FQxVz/XacUQTpmXenlqjm7haRmkeKFWJsyzoZM9M/ZdB0f2CB16R0wqtDqa6jMuKldnX1rSAtPQq27xqN4DnvSkTwokvznVWS7ZvWTbz69I/HmFQY3w/VYgfASPFQ17B0kWu7Q7ahfSZJKapihDpWgtsdx5Lmxx6yU5M8WWW7rEm+4hDdPKlobJSLTh72j64ocDN5+cd+G8p55ydYpTNOl5WZmJZN1Np5Dk25pUQU6tKgN46VPZeVaZdD71DlXnE/NW4WioWPmdxvHynAtQ9J9N+RJYTA/ZvU1ja3zuvTaPR4Zj+PYfS08UeGS54Ynxh1j9T7dW3a2yqywUkjnEzNs5wJ1Hb7rk1xkcIGFuHaj4YxJl9O16pLqE+5LzKZzQ5yihKVIKeWkWvv1jpll1WF4iwFhyvLJK6hSZWYcud9amkk/fvDXz1zwymyCnaXSs5akJJ6sMuTEihUkuZStCCErPqBQFiodfOI2b8QjhSYQG2sbzCUJFglFJmAAPK2jaOFxGOKuKsKpqSroZXSxFxMmU9QPa1u1lapDQ0U75I5G2d2uq/ZmSU2rxOaDMplHi0ZqnAuhs6f7DH23SMfE5T6hw48auGM8KPIPik19aJydLLZWOzM2k2B3KFJVbvqET8eP7hGVMCcXit5Uwk6g78jO6wel7lF49meP8A4SJwATmK33wm5HNozq7X62uj2CPRU2KcRQup2yYVK6NkHJe2x6hbfY2/f3VZ8dI4PLZ2gl2YeihHxEsI4rpmYuAs/cO0p6p0antsJcdYSVpacad5rfMKfmpWlWyumxERXnZnLiXjmzCwNhbAOXdRk1U57lrSpwvWU4tOtxSkpCW20JTe57AkmLiOeIJwmPMGUdxhNLZUnQW1Uh4pKfIjRa3sjVp3HjwdUXX8j1xUkXfn+i0JbWr36UC8T4TiuNYfRwskwaR88DXNifZwADvMW3A/wLSaKnlkcRUANdYkeoUoZ/SC5Lhqx7S2Qp1Uvg6oS4t1UUyikiw9u0QV4XEpMyuROI25mXcZX+ax9QS4kgkeiSu+/XvDte8Q7hVcbUy5iqoPNrSUqSqkukEHqCCNxGvL+IXwnyIKJKvT7CSrWQzRlpBPntbfYR5Knw/iaPh+owR2GyEyyB+axFrW0tbXbzV8y0bqplRzh0i1rqvfE6jFnDpxnSPEE7hiaqtBmuTNtrbSQ24QzynWuYAQhYtcA9iD3hDoGJMUcZfGRhTH2HMGTlKolEXKOTDrp1pYl5clZU44Bp1KOwT5kCLNT/iH8KVQl1StQqdTnGF7qZfopWhXvCjaNaQ8RDhRozJlqOKnKNE35crRuUm/nYECPY01fxBHh7Wuwd5qmxGESa2yWtfL5qi+GlMhtUAMLsxHrdQ3xCyE674kWAptEq4ttE9QSXEoOkWc7n6I6KqOo3I7W+EVLf8AEb4WVzAm3Wq44+LEO/JCSsW6WJVeBXiZcNbY0pGKVgfc01H5QR5PiXAuKOI4KOIYe9nIjDPe3e3b2VykqaKkfI4SjqN1WPM/MqcyS4+MTZorwtN1hinTrqBLsko5gclQ386xAsVX+EL2Sy8ccUvGpK54s4JnaLRKQ41NzK3UqLTSGWOW22XCAFOLIGw/bG1gTE3u+I/wtvOKeeodfcWs3UtdHZUpR8ySu5jOx4l3DVLIDUtIYnZQOiW6W2kD4ByPcSVfELaNrKfB3CoEIhDy4EZbAHp2XObFSGS76gZc2ayirIynzSPErxnMrl3OWqYrWlzQdPzOx7/+sKOAZGY4i/EJreN5qXc/M5l6lZlHXUHlvGWPIY0k9dTy1PDzSmJAT4k/DCh8zSKTiMPKJJdTSWgsk9bnmX3j2X8SrhilCtUrScSslz55bpLSdXvs5vFKpdxPJJJUw4W9sroGwtNx02vmd9xaw7KVgomhrDOLBxd/wofzRlpzhp8QOnY+pUg81h7FMw1OThaaUWy3OfYpsG3Upd1u289MdHUqQqyg4kpIuCLm9xeKgzPiUcMU4tLk3ScSPqSLJLtJZUQPIXcjMfE74dtNvk/FYH+L2x/3keY4m4f4o4khpM+HvbLCzI51x1gbaX0791ao6ijpC+0wIcb+yiPJKTnGfEoxhNqYeDS5qqgLCDZXqi2/wjDKy07wueIA4iWlXmMM42dAUUIIaDE6u4vbYBEwPhp8hEro8Szhpl5gzbFAxGl9RJLqaYyFm/X1td4xTPiXcNky6l6YwxiOYcSLJW5T2CoDyBK49U+TieZ5bNhbzE6nELm5hqWjRw9lTy0Yb0zAODswP9lGmfEnPL8STBc0JV4sh+kAuJbOkeqb7x0UsLk+e3wimTviZcOjj6ZpWEsQrdRbS6qRZKxb267xlV4ouRJ2/Mxik+zkNf68eS4p4b4o4ihpIW4c9nIjEe4N7d99PbVXaSspKV0jjKDmN15x88SEzgyl1TIGl4Fdq85i3D6FmoaitplDzrjZAbCbqWOUSk3G5SeotDh8PPJCuZRZPzlcxdS1yFaxfNonFSryCl1mTQkpZS4k/NUdTi7dQFpvY3Aab/ibcPr0yidcwLiB2YbGlLq5SXK0i5NgoquBcn6Y+1+KXkp2wfihV9zdDI/+qOlVYNxL/p0cP4fhbow4gyOLgcxFthfQXAKhbUUhqvFSz3sLDTZMHPqTmnPEmwRNolXlMtzFF1OJQSkWHc/GNjxXJGbmp7LH0SXdf0oq2rloJ07yvWHY54n+RTswmady8r7j6CCl1TDBWCOnrarx5M+KBkVOFJm8uq+/ouE81hhVgetrq26COxQQcUUdbh9X+FuIpYjHbM3quLX9PZQyPonslbzh1m/7pk+J1JTc3IZUGWlHnuXKzV+WgnTsx1teJU8RFh6Z4UKOyww64v5YpVktpKjtLvXvbpCDMeKDkXN6PSsu6+9y76OYywrTfra6to9mPFEyOmmgxN5fYjfbBCghbbBAI72KjGYafiiJtA38Md/tnvf9TerMSbelr+qF9EeZeYdYA28gowz0k5w+HblBKCXd5/pgIbCCV2C5nta/l7rxImblPnB4aOG5P0R8voplKu1yzrvrB6W9vbtGdzxPsiXWES68tK+4y0boQtqXKUH2C9hHr3iiZJPS/ojuXOIlsAABpSGCiw6ere0bvj4ocIGjC3fLndN9TdbknL6b7rQPogXfOHU0N2P6poOSk0rwu25NMm/zhMesjQdX9nH7XrCrhTKV3NLw3WqGKeVVSkrmqzT0KQeYl9h1wkDvdTZcT/ChUPij5Nej+hjK+vFj+4n0cI8+l7R8N+KdlPJsGWkcrK4hrcctLjKU2PXYG0bzM4uyHw+HOa7xHOvmbt3bv38/2RslBfqlBGXL3/VPzw5syaljDI/8xdaD/wAoYLmDIoL4OpUqu62eu5CfWSPIJA2tFM/ETNuKnEoBBvIU03/5I1Fh5fxTsrJJSlSWUNYaK/nFp5hu/vt16n6YpnxL5y0rPXOCp5k0iiTVMlKjLyrKZaZWFrSWmUtk3TtuU3jscF8PYpTcV1WNVVIYI5WnQlps4lpI089Sq2JVcDqJkEb8xafXaxUUs7XHX3wQJBHeCPtR1XnAVPmT8tU040pT70jyUSyuc4vngqKUg9voi/WDnXFyzQSqxFySPMq/9IovkxSHE4mmJp51SpVMvyOYNyVOKCh95tUXXwbPqcRLoJFltNqsFWO+/wCERYvqp266hWkwVLN06nMrdN3HE6yCLWsIf9KmPSyVAWQIiXC9cXPyjSZnYNBKbX67AbRJ+H5ptTAc3SQAAR1PviQXtZVnaG6f1MWgMJSFC+1oVEOpA1X2ENunPg2OlPvhZZcCxpv12iFwUabOK55aav6M30ZbSD9dvvxu4drUwELZnhsndBVsAOwvCXOKVN1+aLaQtesJ0q6bAdYVWJRCSnnoSs36dkn3d4vZW8sByqucSVuu1Z526ZOXUtzzHzR741lSFQnDeamCPMJhSSpKQEghNtvVEffMSBt1iEED6QtL3SO5R0strc0boSTcC5PsioOYvEBm3OY7xDgfBGVmJ6e9TMO1ackJ27Djry2m0IS8y2lZUAFvNdU6t72NrRbzEFUdlae87LAFaBcFQ2v2H0xWDK6rTk3xgV6eqpKKNScGTMjMPqSSgPzM1JOtJWroCsNzNh3DXeLDXdJc7Vbxi51KnzKqrVuo5VYVreJH3nanUqQxNvKeSQ4S4nWnWCLhWlSb373hxt+oyQvY2hMw6y+zh2iSUw0Wly9OlmlIUnSUFLSRYjsdunaFFax36DrEI9ULuwXKrxnzqx7lqbdKTP8A883FduFvgJzw4qabNYmwgzT6LhyVfMr8r1Za22XngAVIaSlKlL03FyBYE2vcECxPjOJKcb5YqJF1Uiofz7UTZh+u1bL/AMG4YgwbUJikz7dAJbmZRwtOtqmKoEOqSpO4UUuL9Yb73ik+xcrkd8qpbxG+Gxnzw44OezAq01RMTYfkikz81SHXCqTSVBIW424lKtFyBqGw79YVskPC9zsz4ysoOa+F8X4UlKZiBlx5hmcdfDqAlxTZCglsi90HoekXC4TcS4gxz4W+YM1jCsTtael6PihhD0/MKfc5aJdakDUu5OknbfaFTKeVx5UPCUkZXLRurnE71AmhTvkhbiJzm+nObtqbsoKtfofONVuqSZ6+GDnXw/5VV3N3FOLcKTtLoCGFzDEk6+Xlh19tkadTYHznAdz0BjS4ffDXzn4i8q6XmxgzEuGJSlVZyZaaannnUvJLDy2lXCUEWugnr0iJ82X+LjDNKNAzsrGaMrSqoQj0XEE/PqlZopIWE6XVFtZBSFW3IsDHXzwuqlK03gdwU7PuJbbVU6jLJUdrrdqjraB8VrSPiIIuPGXPDtjnMvPxvh3o7sjLYjVPTtPW9MqWJdtcshxbhUoAkCzSgNupHnD/AOKTgQzU4S8L0fFmP6/h+fla1PmnMJprzi1pcDanLnUhIAsk+e8XkyByiVh/xYs36mplSZWkyD9abJTsPlFthwEe4uuJ+BEZvGnnZepZDZbVGVVqYmsSl5tXmlUk4QfoMEVLuHHw585eJnLdrM7Btcw7IUt+dfk0JqDrqHFFogKUNKFAi5I69ohzMrIjFuV2eMzkJiObkV16VqUpTDMMKUZdTkwGy2sKIB02dTfbsY7H8I9VlchuD3I+nzjDTD+NKpJyhSbAlc8467q9p5abxTPxJcIDD/iAYGr7aAGsRroc0CPtltzQaUf9AQWVXPim4MsyOElGHnMf1qiTv5pC/wCi/Jrri9Ba06tWpKfux0jfzq4Fc0ciskqHntimuYfmqJX3JNqXYk3XFTCTMsrdRqSpAGyUEHfraLp+NJhnEmI5fK1OH8P1Kplk1Lmehyq3tFwza+gG3Q9YXPEhadY8OTLZh9tbbjc9h9C0LSQpKhT3wQQehvAaJdUQzu4Fs0sicm6JnZiqvUCaote9EEsxJuuKfT6Q1zEagpAGwFjYxW5qynEpva5AjtTxrZTZj5y8C2XOFMsMIzuIas0zRZpctK6dQaTKWUr1iBYXH0xyHzGyczQyZrkvQ80sDVbDU6+nmstz0uUB5AIBKFfNWBcXsTa4vGblYU9Z1+HbnBkXN4HkcV4jw3MKx5XGqDTzKPuqDT67WU5dAsnftcxKS/Bm4kQm5xlgi4BNjNPgny/Y+8XE8SEWr3DYPLMqSH3kwleInIcR09nNk6nIcY25CX1GqGhuTCJUWmGiDM8shu2nV8/teF1m65T8QfDXmpwy4rZwlmlRWpZ2cbL8jNyzwdlptoGxUhY6kG1wbEXF+sTBw8eG5nZxIZYyeamEq5hyQpNRmJiWlkT77qHVclwoUuyUKGnWlQ69os/419Yo7tLysw+ZtlVcbXPTbzYI1pYKGkhRHUArSq3uMWf4ZazLZC8NHDjgWaabl3MWusSL7a9lJdm5WanFEeZ56kJ/hRg6pdcVsUZGYtwjnyvh7q81JJr6a9L0D0hJV6OXnnEIQsEi5RdxJva9otyrwX+IrSD+bvA4sN/s0x+Sjb46MGjCvifYFqaNm8UVTC1ZSm1gn9NollfSuVUfjE4eLtVc86dWcsUZOVPHcq2uVq3ygMMvTiEqVrleUXfRyAT8/Tq/bWhZLlVda8KTPM5oOZTjGuEPlVmgoxCXQ8+GiwuYUwEX5d9WpJNrWtDo/qMHEUDc4/wN8Hpm/wDNRT+sZvZ/UDEkwut5m5hU+vsMiTfXNVmdZnEM35gZUVLCwi6tQSdt723jq3xC46xpSvCewrjemYtrUpiB7DuFXXasxUHW51a3Fy3MUXgrWSq5uSd7m/WMWS5XK7iIyHxPw2ZpT+VOL6nTp6p0+Xl5lx+QK1MlLzYcSAVgG9leUWfwj4QufuNMK0fF9NxzgxuUrMixPsIdemNaW3UBSQqzR3F94pNiPFmJMY1ZddxdiGqVupOpShc5UZxyZfUlIskFbhKiAALC/TaL2+E3mfmVifihlsLV/MPE1Uo8vhme5VPnqtMPSzegtBGlpaygaR0sNu1oysJm50eF1nZkbldiHNXE+McJTdLw5LJmJlmTdfLy0qcS3ZGpsC91jqRtGzkz4UXETm7gqn46maph3CkrVmETclLVZx70h1haQULKG0K0BQIIBN7GNXxDcx8wRxd44y/OPMSHDD8/JMO0b5VmPQVtlpklJY16CL72t13i3XjJY7xtgHL3LOmYJxVVKAxPVWcXMfJc25KqcLDLXKBU2QSlPMUQL2vY2uAQ0TbZc6uJ7hBza4UqxISOY0nKv0+rlYp1VkHC5LPqQBqRcpBSsAg6SBsbj2SnkN4YudXEHlNQM3cK4twrI0uvpmTLsTzr4fSGZl1hWoJbI3U0oix6ERbbxRpyZxBwDZV4lrDpmajN1mgzT0wv56nHaRNKcN/aokn4eUbNaq1cy28GOl1rCtXnaPVGaJTHpebkZlcu+2ZmtNFZS4ghSSUuqvY73INxeFgs3KqPnV4W+dmR2VmIc2MTYywlN0vDsuiYmGZN18vLCnENgJCmwL3WOpjLlL4V2e2cOW+H80MO4qwmxTcRyTc9KszL7wdShXQKAbIB284uPiit1nEng3v1zENXnqpUZzCzLkxOT0wt995fymkaluLJUo7dz2jVxfiKvYU8IHDtewzXalR6lLYepXInKfNLl32yZpAOlxBCk7E9D02hosXKqrjXwjeIPAmDK/jmq4xwc7I4epc3VplDMw+XFtS7SnVhILYBUQggXPWIrrvAzmfR+GiW4o5Wu0GqYWmZRic9Hk3XFTLSHHA2rUkpABbXcK3PQ9Y6BcGuKsUY18NHM+uYxxLVa7UDSsVNqm6lOuTT+hMiqydbhKrDyvDS8N6qscQPBRmhw31RwPTlKbmJaVbWSbMzrS1sK9gD7bnTpb2xm6aqk3C7wPZpcVtFr1fwNV6LTJGgzLcrMLqbriNS1oK/V0JV0SAe3URAdZpK6RVp2lGYbmTJTLsuXmr6HNCinUm9jY2uLiOu/COk8OvhkYvzRnk8ieqTNZqQBTy18zWqTYTvbcuIFv3YjkIHHJi7ziipbilLUom5JJuSYwi1SSNrQRmLYPlBAaIrQZJy77eFA9MPJDi6i62Sb2shCNI/lRaPLWcDz7YSsOBv1QTudHb6orvlmEStAokm5pTz2ETjaiBuV3v/ACk/RE1Zbz5pdQXLLbUUhzk38kje/wB8ROFYdtdWew3NcxLTaFkJbKTsetlD8US5hyoapZQVYEKt9EQbhKcZdF2FApSRuD1uSYlDD02pI0atiok/TEnZVXKV6bNj7qFlmbuBZdvjDGp1RsOphT+WkS7KphxJ0NArUSRsBveIdyoybJhvYsxaziarLpc2hUq7POqS260CmwUUjfqNkiHRScw6wysJrFFQUn5y2XN0jubGIzlaw7MOl5Y0Fw6lWFtyST9+HBJzS3CCHVK2tpJvHc5bS0XCpnUqZEVVhaEqbc1XAMZW5pL3qjUkn2xHsjUnkoSNZBt0jdYm6q6sFhZG/fpFcwgbFaXTrrYWqnOS8u3dx0hCE7bmEzCOCqZgZmpTsmltVRrr6JmoTSRZTq0ICEC/XSlIAA957mNPDs5UZjFq5KfmEIalZZTjdwSFrJAufOwJhy1F5ZUQ5p89orPJa4RqQA2uFgW4lvUAb37ntGut6+hAO6xv7IwuPgpWTuR0hNZqYmKipKFIsgWAvGJnctmYqSGMyvsuZfjOr1Y5yz/aUifA/wCmaiX58X8FVW3Sgy//AGu3ENeMkvmY6y0Cja9Inze3/DNw4ODTjB4c8S8ME3wh8UNWXQqemXmJGXqK0rEvNSjjpdQOY0kll5pZ9UrGkhKTcm4PPCu7KSOCMEeFdmQQOlNxWPP/AHKqHpkfmXiXJzwpaXmVhBUr8sYfoUzMynpLXNaKxPOD1k3FxYmInzp4ruEfh04U6zw3cL2J3sWztelJunpU2XXm5ZE2CH5h6YUhKFnSSlKEXINtgN4WeGziV4MZ3ggw5w+Z45rStNXMU5+SrFOSxNpdQFTTjgSHG2lAEgpNwTGUUjZR5nVTji4BMfVjOmhUd+bQ1VJa8qwEN8yWZS8y+lJJ0OJXuCPL3wyOG7FDuCvCpw9jULXqoeJ5KpDSq1wzithwj3HTuIaeZnGjwccO/DdXcieESZnq7O4gZmmQ56PNBiUcmEhDkw87NJSpZ0D1Utgi4F9N7mLsNcTOSdK8LGp8P68ett5hvrdUzRvQpkrJNZTMCzob5Q+xAr+f7Ou0EXRrN6jSeVzmcHE5IlpDrmWjUtLrBsXZmW9OcSf4XMlUj3eyKn+LFIzVS4YckqdIsKefmarJssNIF1LWqnqSlI8ySQITOJfjyyLzF4F0ZcYXzD9KxzWKVRpKepqZKbbcaLbrK5gKcLYbP6kpJso3Cj1Bj3iL4sOFbNVjh0pMlmtJzEjgzF1Lq+Iz8mzqRKy0tL3VqCmRrBWkIsjUfW6W3ginTi6yazjfwlw+YHyVwbMVySy6r9OqlRWxMtMhlunststj11Aq1pce6X+ab9REZeK7gp5WZPD3mCxLJ5beJk0eadsLpUp+XdZT8QmYPwiFuOfxIMY1HNamjhSzynGMJsUdpuaXJyPLQ7PF11SzaZZC7hBbG220PjiA4yeHvPPhbytla7mlLTGY+G6xhev1STNOm0rTOMlLU+dYZDZAS8+uwUQdO1zYQRWK8QTjXx1wgMYKcwZhKhVo4lM2mY+VC99jDQbtp5a09dZve/SI68UvEk1jLgKwZi6dl2mJitVqi1B1pq+hC3ZKYWUpvvYFVheK2+KjxL5HcQ0vl6jKDHrGJFUQzxng1JzMvyeYGtP6u2i99Kvm36b2hxca/FTkFmrwQYFypwHmGxVsVUiaork7T0SM00ppLMm626dbjSUHSpaRso3vteCKzPFnntmRw9cEuW+OcsKuzIVZ1iiya3HpdDyS0qUuRpUCPtRvDH4/KknNfw48G5rYtp8o5iF1yi1FD7bQTynpgBLxR9yFBRuPd5QrYk4h/Dyzs4f8GZV5z5xS7krR6fT3H5SXan2nG5piXCCkqbZubEqG3WK68fXG7kbj/J+g8M/DqzNT2GaW7KLmam9LOsMIYlgAywyl6zyzcXUtSU9BbVqJBFbDxIv7f8Nv/wDZcl/JRH14hnGtmJwm4swJJYOotFqchXWX5ioMz7S1LKW3EpshQUNNwo9utohrjk4vuHHM+sZGzeBM0ZGsM4Vx1K1arqZlZlPosogJ1OkKbGoCx2Tc+yJAz4z68LfiPrNCrmbWaxqbuGwtEkhuSqzDZClBSkrSiXBULpEETB8WPJTCWJpHLHOSkURqUxLiurStCqK2E2XONutBTOq2ylICSkHqRYdhE28YWUedFVqXD3J5OYLmazJZb4gkqxUFsTbTKW25VTCUo9dSSdSEr2F9gfOK08RPHfkRnjnxk7g+h1aYpuWGAcTS1cqtenpB1LcyWEhSENMJSXw2Akt3UhJKl306RqLc44fEjxtPZvSCOFDO2cZwcxRZdEw5KSAQl6eLrqnDpmWQvZBaTsANoIp38TXBP+yD4ZMx0ND/APFstRZpwD1rCelnmRf2fpg/GJC8Q3jgx/wg1DAsrgjCdArKcVM1B2ZNT512jLlgJCOWtPXnKve/QRB3EDxmcOGcWU2Ssy7mnLzeM8KYtw1W6uy5TptK2OUtHprqlFkIOka1EJJv2B6RI3ENnF4YPFFM0GbzczianV4dbmESBlBUJcJDxbLl9LO9+Ujr0tBFyTz0zdrefOa+Ic28R06SkKliN5t+YlpPVyWyhlDQCdRJtZsHc946l8Sv+06YR/ezhD+clYoFxo4d4U8P43oUvwm4hcq9AdpWupOOPTCymc5yxp+zoSR6mg7bbxaTPPir4f8AFnho4dyKw/mMxN46kKBhuVmKOJCbSpD0suXL6OYpoNHQELNwuxtsTtBFzSi73g9/rwG/3sVL62opDFrPDUziy2yN4kRjrNTE7dBoiaDOynpa5d54c1wt6U6WkLVvpO9rbQRe+Ief9nXjT2VOQ/mWouD43xCsGZU7i/ypVBbz+xMRRHjczKwdmhxS4wzHy6xAirUSfmJd6RnkMONhzQy2kkIdSlQspPcC9o6C1fib4EOOnKPDFN4lcXqwjiHD7qZuak3HXZNSJrQEOll5KFtuMubnTfWABexF4ItPxLb/ANTryhG39scN/wDY81G9xFJRTfBywvKX/snDOEyNrbrmJV2I64teMHhaz1xXlZw7U6pOO5R4er0rO4jrSW5iXYDLMu5Ltsy+3OKEJdWVL07nTpva8NjxBONPIzHOSmHeGPhtmHZ/DlLVJCZnRKOsS7crKN6WJVvnpS4sghClLI+0Fiq5ginWft/UWkWN/wD2TZ/7TTGhmh/tNdD/AHvUn+ltxHE1xUZBO+F0MiRmLJfm6/M63JfIvo0xzOeJ8OadfL0fM3vqtCfjzipyBrHhl0rIanZhsPY7lqJTpZ2jiSmgpLrcwha08wtcs2SCbhdoIpY4D/8Aau8z/wDF2LP6CqKjeFPmy7lvxW0ugzM1y6ZjeSeoUwhSyE842dl12+6DjYQPIOK84mDhJ4qsgctuAfHeT2NMxGKbi+sSOImpOmKkZpxTy5mVU2yNaGi2NSiBuoW72iPPD6neB/AUivN3iKxmafjXDVa59Fk1elOtlpLaCh0MsNq1kLK7XNthcQRWv8WvFVLyo4WsP5M4VSiTYxdXrrl07D0JhSpp0C3/APIXLn3Axx4lyOUkRZnxBeLuQ4r81JKpYSk52UwjhyWVJ0lM4Al6YKlXcmFoBIRqIAAvfSkXsSQKxs3LYVfreCL6USlSAPtgSYI+VXdAKNinaCCK6MzT25SnyjVMZS0iSuhttJ/U0p2SPcBYRIOBp9c4pycmFpCl2CjfYmwBt9EMW022g6m7hSr+y1v/AB+9DmwS56Gpx55CuS2QQjpdV9hEzQp37KwuCJr0NLbbiynnizbQH2RZ8xfoPadomGjzYQlA1lFk9Ab/AH//ACIrphOsIRMNzTjx9ImN0C+9vM/tQBsIkmVxahtthCHFBxwhKUE+sSVW+n6hG1j2VcqaZKopJsFardReNuozku5LcwpdIIsoISVHfzA7RGcpiYNpQkOXBtdQ7nyhalcQpUQQ6UDre8YaC11yo3NDtEry1ElJhSnWZhlYJun1rG/frC3TqHMC2tSQb9vKG2xXETkxoYUkkGy3NN9MLKaxNS4Qhptt1N/WJVp27naLRqHHRqgMIHdOqWpSZS65h1RFrnbpHs7imiUhoAuhagDcN/j6CG6nFiACicbmZYIPqrRdaSO17b/eMLDE5TptpEysS8yF20r0A9feI05rgeoLPJaVDWbPEFM4Kmmp/C1Jm63iE6VydMk21vOLQk+trCQSARdIHUnoNoszUJ4PBTcqlxd1eqQCEj3k+yGrLVKWl1a5eXQ0VEklsBOoWFunaNtNZKvU1dO5EaveXuBDVJlaG2SHjbG9Pwo83JTzizMvsKfSy3v6gNiSegub2v5GI4ezhRS1PzjEg099uSX7b+y3YQ2+IeuKZxdKhd1hdNRoCT1+yLuIgyfnZ14K9DdWg2N29RuY89ieITCXl7AL1WFYZTOhEjtbqvniWZhzmY+LsGTz7bbbcpITbbaUA7XdTe9/dFMwjz+qL/Yuk235pL1TkpebCLhBeZSuw8hcbQ25iSoKUJWMPU25vuJZH4okp6s5AH6lQVWGNMrnRusOwVJbdQLm3lHtl3KbG46iLm/J+H1qDiKBTU9Nf6WQbb+6LaZP4IwPijCUs6zhagLdaTpWpVNaKj77p3i02YOVN9AWtzX/AGXH1QUB0O8fISvrpO3sjr1iHJmpTU8y/T8DYel2ZWcD6OXJNKU8EKuAfUsAbC8N/GYwvh1+XwzjnAtBoqaqguJn/k1pbOywQjUhJUnfqSLe4GJBIL2KhNKbXBXKYXtsDH1pNhf78dJp7BmWk085IyiMKPNzBSlKmwzexPXYAj3g9r+ce1Xhldw3NU+s0dNErIKlBcquVQkhuwNw581zqBcW6xlzgBcarEdPmdlc6y5sFJ+MfJSryO8dQ6dhjCnpAplcy5lGZcm3NdpiNNvMLCbH6YauIq9RsFVSdk6Fkgmr0koU03NtSUu5YW+cEgFY722MQ+JaCA7QqV1HqQ117LnJYnexgsfIxeqUx9lDNuej1DDUlS3zfU1O09thaTf9ulN/hHxUsFUrF6S5g/DkhOpSkuL5cs0gJQOpusAH4ReEYcLtcCqNnA2IVGrG3TtHmlXkYt/NZc06nL5U/SqVKPdkrcZCifYATf4RpvZSt1BYDErIp19CpDaifotb6ICFx1K2sOxVS7K7Ax9gKt0MWkYyskafWmGZlUotJVy18mWCwLj3HpbyhLby7wlJYiS1OOlaEunUAGgmxv1uR9UOT6rU3CraQq9iDvGTQQOmx6RJ9WFNZn5iXlGWW2QspQENJXqSDsL9vf1iR8F4twThvBlYlcSUaWqM5U5ZXovJlG7S90qbGonodSgbjf6IhlD425gLq3RQRVMmSSQMFibn07fdVqCCASAekeLFvtSPfFj5fHWFalhzCmGqdguVlpxqpy8s7MKbQoLAW2Fi4so35g6+W8PPOsUGjY0ladJ4bkEk09EwW0SibEFxYudKT5W6QlcI6hsF9xe6UFJLV4dNXvGQRuDbHUm+xv281TopWSSEn6I8KVDqk+XSLNStdwy4lxE1g6XS2+UpUtuQChce0gWPujWmJnDCp4yaJZqWS2NNpuUB1DyUbDSbb31Wt5dtwwnZUi626rbpPW0ehKiL2NosVWK1hiVUXWaDTnBfVcFsN+QKRa537dYbz1cpjz3ONGpqUKG6+QSBfbsn8EZ5bkzKFiD7YLK8jEv1BmXfLimpaRcadbAsmVWAPYFWFjCYjDTS0JcCGEk3IaI9bfpDlpdRlv7YN+94ktGFVupuW2kDzKTf6DvHz+ZpllSkrWkkDeyALfTGMoG5S6jbc77x6NR6Xh+zVKlGT85si3Uge3yhMqUiwmXWGUJUVC920gmM8seaA32TUso9AYLK8jCg0wyQoekKSodlt6YxqS42AUb9rixiNbLT3jbYNmk7ef1wJd1bLQCfda0ZLAi1gIItYk3NjBH2U+2CCK7MpiuQmEJaqbJQrpsrr96N+Uq0tM1EycoXAwTzHT2CRp2HtJFoaC0pUktvNpW9+1G0ZJCaep7ymnLpSs6r+YAO30/WInjIzKV9y1SnhyvvOVGZnAr1W29KD2AJ2PwAh5YVxKt1c1WVvBTUoky7AVudZHrEedh9ZiHKfUPR6W4dR+zPctIHewH4SYcia2iQp8vT2E2sStVu6j1i01oVU3Ux0XFCnJc8x0hKVEgarw5KdiJ2cmEyEs7d1VlXBuEp7qMQNK4icbQJZhKlOEgADveH1TasmgU5cuHw5UHEXeWDYpJ6JHsjJYFreymhjEjMiyqUkXE6WzpK7/PV3J8zCxJYjHIC3bXJ6lW/0RCNMrYcZaaWnTpFyAe/naFqVxcy5NIlpHS8+DoKidkftj7YxkAWhN9VNMlXHVvIS6U9LpaG5Skd1eQ8oVWsQMa1pQ5pCF2279OnwAiJKVi2RlXnEvVJo6d33Sq9yNze30WhTexHLonnmEElCghwAG2xSkggxnJmNitS62ylAVoIXbmKsBcE7fD29IztV1KXEnmH1rDr5xFbmLGCnSp47bEHsI+kYtQHbIdOlJGki8SNiWof3TR4mKu6xX6M828kekSbzQKVXBKHAd/44+mI/wAC1ITL6mppbagv1bHqL+2FXiSkJ7FGGKbU6K4hp+mTykuqulASy+2dSjqIAAW0jv3it6K1imgzBmKTWZR15s7KXNIShR8xsY4tVRZqgvtdeioK/l04bfZTrjuhUeWmlEWQHElSUKPf2ecQ7VUsNPKYaIKgTZMMCv4mz6xLNKDc3SplxB9RErUGHV2/c6wb/CGfWq/m7h9PMxVQKlLtb/ph6UUEX/dpFvpMYFDbUBbOxAHdS02udlnlfpI6FW1E9Ppibcrc028KU95C5WYZb1JJCt7edopIc0sXuOMztLxZNSj7PzWnAhba7fwbEe8Q7aRxJ16XDcrjfD7c42vYzciQ0u37g+os+4pjR9O9hu1ZbWtd0lXkc4mErmChmmzjiE2tqGgQyMf4yTmZMSi6h9iMqgtoSdz6x3N+nYdIg/D2bOC65o+TcQtIcWf7GnDyXAfcrYntsTD3E/LuJCEL5S7BViLX/GIgLXPGV2iNka03YEoU3B9OTNCckpppTiDcaACU9iD/AOkTthNtcrJMTCkFKFDQoJv087G8VaWt2QnntE0624h1Ki4km60npv7DDro+a+MaMEp9NRNy6laEtzCNRPxFiPpiGOMxu3UkhMjbEKyM1yFFWttsJPdSbX/8++EyZolFmVFKGENKHrWB0qt9XxiNJDPWlz0olqu0p+VfubrZUHEG3sNiIWaVjqh1ZIFLq8ssKOzalaVX8rGLUjGSNs4KozOz6TZbNay6pVSC0uNMzKFA3RMNJcT9UMr86bA9MU69NYZlEI0K9SX9QKJ8wLbeYh+O1N1sqs2UqHVSVdIQKvVJgpJS4lw9PshsT+OKL2MhGZqtNL5TlcmBP5XZZzbLiGsIyTLjv7Ilsavpho1fJignakz1Qklp+alqYIA9wVcD6Ik/01Lh0PMFrzUgar/TaNOaXLruGXwffsYzDUOdsViSINUITeXeMKQ6l2nV9qbDatSUTTagSR5rQoD/AEYTZ2Qq0o8aq/h3W+gEqbamOYVOH7cbJIHsAMTDPAoUVJXc79Ib05rWpSlDVcW3F4vMq5WjdVXQs8lXafpsoh5SZ1mZkHHFFX2QKSN/3Q+oiFej0ehP0txkvrmNIOrQ6EAgqHkCe3eJbckGQNbre3QI84SHsKUaee56qPJaibqVyE77d9okGIu/qaoxSgHMmjR6TheQqFNfnKpLNNyk6iaAVNpUUnUgk2G/2g7RIuYrdPzLx4w5g2piouIpaEn0bUAQha1WKiANtd7X79I0ZehSyFhiTkGGmx1KGkpH3hDzyyQyjF40IAKZd0E267CKlVVvJ8S0atBsvQYE1tRfCH/RK5pJG4soul8vsYVKj1erlSkfJTi2XmXlHmBTe6tHY9bXv1jRqGW+NJSjyFdm5Irl6iAtoc5OsakarKTvba94sJLBb1JxSw0kalTs1uTYdfOEzGDQOBaKyFtlTOjUkLBsdBHQe+0dCoqZIuS6MDq3XncFpY62bEo6gm0BOTW17W3891XNzC1bQsKMqy3dQvrcKjb3AD64b9ZYfpky5IzKmC8gJUtTaDsL3tcnyibPR2Xxo5zhWBcpbaKjbp298NHEuWFQq9Lq+LaJOSyZKXUETSJl1SF81GnUEpCSLWWOpG94sRSGV1nH7Ln1D2UrBI8WBNgfMqLpktuBCFOqJcuo61X0gEjvv29kfTCJFl9tS33AspNg2ADaxJ3P4IlupTuAVSWEBLYcaLlLfZXWAmVQn0hsIIWm9/Xus3398ak7gdvMbMKebwNT5KlyTMrrDMykspKgQhRAbSoX1KB+BjSSqjgdl7WvdXMOo5sSpzINJM1gzuR5+yjtmryduWXXrdlEJ1D3nv8ARGcITNuKWytx9Nh1J2jG5hypsuuNzABbaWpt1aUkpTY2ve34o8p8q5JIcbKVqKu52+qNHvjdq03UbqZzHWe23uvmaklJTrLbQFreSo0nmEchDlvtrHtcRtvS7iEFxxBAv3jCpQVJA7HSu5t5Rq03CFoboElqbBdKl6SFbEEfhjTqFPkW13O1zsTteN9YTvq6RpVKTW8lpZfQsadgtF7RlYSbNhKGxcDyT7o07lO17+2Nh6VLSShagoHf1biMAQLbwRfTSQ4vRe20EetgIVqT1gjN0VsG6nTpVV0OlSj+1jNVebUZNMxILZcUwddkbKtbdJ+H1CIaGclRkvVmsJywI/u9x9QH1xvSme4aYeWzh1pmZVbQlu3KI7lXrXv8IlaGtN1IXXClOSqwXJSKCftnHL+Z1qhTbrCnFlRdsb7A9vKIIpucTT844mrSCJRpaypPJ1FtJO526i532vDokM1MJy7iJldVDm59TkuADfvdO8WWSBQOFtVN9Oq7FLaTPPK1TF7spP1mNqRxHMz86rW4fWI1r0km3sMQ2rOnDehT8vMPOpQq9m2lgpPlc22jXZz6pqVLbbkahZff7GL+4le0T6DdRHqVhkViolgy8q0/y0gjmFIBUdh1Jv3hSoFSfl5UtrQhtM1s44pQIB+dpHlsk3+EQNRs3apOBEtTKJOzFyNCVTjAPtOxUR0vDifzWXRmForuE8QrAUXlchLTiSe51FafM9RG9wtTpopvw7UW3HuYlfqSTxcLN/1XcFSiepvc290SHV52nOSrFWlghaFENOAo3N/mnzvfaKtv5vYLw1VQ0mWqXpIQVPIlW9RQkEgkgercFKupA9XyhzTefmBscN06iYXxKqXmplYaLM+laFhZAvpbbSrURY7qKU/tojc7XQrQglTw1LVqZLcsumASyjdbynOX6vlpP1xBGbfEcMq6/M4Sl6L8rzsolsqdE1ym0cwXSknQSogEXsB1iVHsw6hMPgTZbTKKBLakK1J6AklQNj7fwxRfOGsLxjmBX69KNlbUxOfY7KB+xoskW+Cb/GMue9uyMaHbqcsuM263nBVJtrEssymQl3mwzKNLXywbH1lXPrnyNtrnaLR5XYOwPUnnxU8J0ibDbYKQ/JtuaT7NV7RRnhoeDc7PJVcEOp2KTf5pi9OUk1Z+a9YeshNt45cxL5updBoywaJ5VPJfKGutqYqOBaUttzZSUILYt7kkCGrO8L+XQbUMLVSuYcWAQluRnVKYSP7ysFB+iJHTOAfbRkE7f7YRN7KpzHKn+ZfBdOBSqlI0Gj4mbIPMXT/61VLc312F2HVewi5PcRWnFmQFapTxk8MVZ6embkvYerUv6DVG7fctqJamAPumlknsI6qLnAT84Q28aYSwjjyku0fFuHpOqS6hdIfaBW0r7ptY9ZB9ojcO0sgkcdFxwqlKXTZ12n1enTdOm2yQ6w8hSVoPTdKgCIkLKWbr7dTZpzWJHU09p1KnGXFLKEpvuUggpSbeRHvi2ub3DSZmkuNSc6rElNlAfRpervlNSk0H7SXn7FSkDs29qR06dRWKk4YVgbECZlluYbcZeHIXNtBDku7ueU6jcBVuiklSVg3BO9on8sauViNzr2apwp1Dm69TEzLE40JhIKUhxJCVb7XIBsPhBXsvMe4ZaMzVMNTypZGl30iXSH2wDuDqRfv57+cKOX1dp1bklvycmZSYZOqZlgfUAPVxG/zbncdvK1osbhnGFOmGFpRVDKPiXSyEOJukkD5wMaimjkFwtn1ksJ2uqcKnUrdUpTocSbqSQLaVdwO490Yiw4g8+UUhwKOvTYBST7CYuFirBWX+MW+bi7BjRfAAFUp10O2H3TjVlkd7KuPOIsxBwxS05zJnAWN2nLesiWn0/e5rY2+KYhkpntClir4pDY6KIqfj/E1LUGJSrvKT15T91J+F4XWc10Pp5Vepzg7cxhYIPvTCXiLLvHuFwpGIsJzKGmyQmbas60oeYdbuAPYqx9kM2YuVEC5PTcC/4o5ssW4K6jJG6EKXJbFdIqaOVI1FtZts0s6SD7jH056crcsNhJGxCvq6xCK3ClxRN7gbLBHXysYzymIq7Tv7X1aaBP2h3T9BvFdsJZspHvD1KU0XAdz9EYZdmXbZcm6gypbFwlISoBRPnv2hkM5g1rTep0wPoRa6m06SfwQss42odTozLT6nJdxCyNLhNgb/AERJcqAsG63KnLIZfSq4Wwr5rg3SfMD3dIzTqpaTWmQk5RgiySpxafWIPxIEYnH5ebojLqHG1hLi0hSd9r33IH4Y+p15MvLS7jsszNrdb1Bx3VsOwt7BGdVofda0y16M65KtHSFb7E9DGpJVSfpE+l6mPhh8Ap5mkE2OxG4I8usbM+pTATMcxSi8gKCSb79x8ISWita+YsWud4sDrblIULJHwyiVhsQllut1RqTmkLnVlM8pTr6NrLUrqSLRoIWESTrqSNV9CgOgB329sa0w+blKd7R8zLnLpqeWonW6S4L9fI2v+CLocHAA9tlRLQ17nDd2/qfMrYwxiaZw1U3anLMtvLLZaIcJAsVJPbftGKq4nqTVAqVGlmJflVda3nrpOrUopBtv+1EIgd0A6r7nsLx7UXNSkqva6dr7XMagZXF7dzotqlxqoGU0urGHMB5HzTUmJMIcNgQDuB5m/eNV5x9TzjzS1tqcWV+qSLE3/HC3NBBURfeEqZ31W7XiJsAtbspOa4WyGykugLfVkdWg8kJWHVIKRt3Rv74htSS3NqbuehJ99omShv8ApGR1bmHCb89d7fu0WiFZp9SXFOqSCdRsCCLiKVPfM/8A8j/Zemx0gw0pGvy2/wB1rTK1rFlrKreZvGqhBW0+kC+ybCNxU42bkS6E3TuNN94Tg44264ttekqHQDpHSYdLLyr7XWuqXWghSkqA9ojC4yXWdGoakLIuo9o+n5hxexcUR7VRrzSrgKBuLWiRaJOqbJaSgFSSSr7U9oTxsfjG5Ob2BsD7TGkrygi9vbvBHyTeCCLVVMOrGlbiyOwKrx8hZT80n6Y+YIJdelXlcee8GonufpjyCCLIJhaUlKVKAPUX6x4HlfdK+mPiCM3KWWZudmWjqbfcSR5LIjMavUVAJcn5lae4Lqj+GNOCM5j5rFgtpNTnUqKxNvBRvdQcN7Hr39p+mPhM4+l30hLzodBBCws6gffGCCMEkpYLf+XKuEFtNUnAhW5Tz1WJPXvGv6bMf3Zzfr6xjBBGc7hsUAAW01U51gksTcw0T9w4U/VGy1iWvs/qVdqKP3M0sfUYTII13N1lK35rcT/74qp/njn448OLMUH/APUdUH/LHPxwlQQWLBKv5rMT/wC+Kqf545+OD81mJ/8AfFU/87c/HCVBGblLBKisU4jXs5Xqkq/UGaWQfvxru1aoPG709MudPnOqPS9u/a8acEYOu6zst1us1RlRLNSm0FQKSUvqBII6bHpH18vVm+1Yn/8AOV/jjQgheyJURinEbR+xV+poT5CbX+OBOJ8QpJUmvVIKPcTSwfrhLgjNysWHklY4rxIpJSrENTIPUGbcI+uNI1OfJJ9NmN9/1QxrQRrYLYEjZbHp85e/pb9/74Y9+Up69/THx/lFfjjWghYJmPmtr5Tn7W9NmPi6Y8+UJsixmXT71mNaCFgmY+a2k1WooToTPPpRe+kOED649NWqSutRmiLW/VVdI1IIWHklyts1epnY1CaIHT7Mr8cefKlR/wDn5n/pVfjjVgjNgsXK2flKf7zswf8AKq/HB8pT1gPTJi399V+ONaCCXWz8ozpPrTkxb++qj5VUJ5XWdfNul3DGCCCXWcT84P8AdTx/yivxwemzXUzL38cxgghZFuis1FDCpZE9MBpfzkcw2PwvGEzkwTcvLJ9qrxggjFhvZbukc62Y7LIZl9XV1f8AGgEw8P2Zf8YxjgjK0X3z3f7or+MYOc5bda/4xj4ggi+isnqpX0x4FqAtePIIIvrmK84I+YIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggiIIIIIiCCCCIggggi//9k=)
По отношению к отрезку BC вершина D, при выполнении данного обязательного условия, обычно находится на уровнях 161.8%, 224% или 261.8% от движения BC. В данной статье я предлагаю вам рассмотреть такую замечательную гармоническую модель Гартли , как «Бабочка Пасавенто». Гармонический паттерн «Бабочка Пасавенто» был открыт учениками и последователями Гарольда Гартли – Джил Мур и Гарри Пасавенто и является идеальной модельюпаттерна «Бабочка Гартли». Именно они разработали и дали математическое определение нескольким основным вариациям данного гармонического паттерна с разными уровнями Фибоначчи. Для начала рассмотрим эталонные классические модели — наиболее красивые и гармоничные. В точке D будет первая возможность для входа в сделку на покупку отложенным ордером Buy Limit.
Индикатор Multiple Trend
Трейдер может выбрать любую, а потом специализироваться только на ней. Например, для импульсных волн Эллиот принял цифровые обозначения, а для волн коррекции применял буквенное. В модели Гартли можно встретить только буквенные обозначения. Они нужны для того, чтобы определить главные точки графика и места разворота. Нужно ли страдать, вычитывая и точно рисуя расстояния на основе этих дробей? Как вы знаете, уровни коррекции и расширения фибоначчи, на которых такие уровни построены, не точные и цена может группироваться около них, но не точно отскакивать.
![бабочка гартли](data:image/jpeg;base64,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)
Паттерн Бабачка Гартли с идеальными пропорциями Фибоначчи (по Песавенто) называют Бабочка Песавенто. Представляет собой надежную графическую модель Forex с корнями из гармоничного трейдинга. Ее принято определять за счет уровней Фибоначчи, поскольку последователи рассматриваемого вида придают особое значение данным уровням. На практике паттерн отличается прибыльной эффективностью, когда возникает в направлении действующего тренда.
Модель имеет прямую связь с волновой теорией Эллиотта. Поскольку подразумевается разворот, а само движение строится за 4 элемента, мы получаем так называемый заходный импульс. То есть в этом случае волна ХА является первой в рамках нового тренда, а оставшиеся три – первая коррекция. В пользу этого говорит также и факт равенства первой и третьей волны в коррекции, это свойственно зигзагам. Именно с этим связывают сильную отработку и мощные движения после образования бабочки Гартли. Так происходит не каждый раз, есть стандартные ориентиры, но также часто можно увидеть, как давший начало тренду паттерн отрабатывает в разы более крупные цели, чем предполагалось.
Как Торговать По Стратегии На Практике
В бычьей — максимумы и минимумы понижаются, а в медвежьей — экстремумы повышаются. Например, на растущем рынке точки 2 и 3 должны быть выше точки 1. Обратите внимание, что если цена преодолеет данную часть, то паттерн неудавшуюся фигуру бабочки с графика очистит. Лучше не спешить, открывать сделку нужно после того, как будет полностью сформирована модель. Необходимо следить за тем, чтобы соотношения частей были правильными. Трейдер, который решил торговать по графическим моделям, должен четко следовать пропорциям.
![бабочка гартли](data:image/jpeg;base64,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)
Как видно из рисунка две стороны АВ и СD абсолютно равны по значению. Трейдеры применяют и другие соотношения, но суть от этого не меняется. Трейдер не столкнется с неопределенностью, ведь идеальные паттерны имеют четкие правила построения. Модель может быть дополнена другими торговыми методиками или индикаторами технического анализа.
Обратимся к рыночным примерами классического варианта бабочки. Для большей наглядности, с последующих графиков я буду удалять “неработающие” уровни. Если возникнут вопросы о их построении, просто перечитайте предыдущий материал. У индикатора достаточно непростой алгоритм вычислений. Но трейдеру не нужно вникать во все детали, вполне достаточно понимать основные правила по использованию данной разворотной модели. Помните, торговля на рынке Forex – связана с большими рисками.
История Возникновения Паттерна
Алгоритм ZUP или индикатор https://migitinstruments.com/2021/05/13/torgovaja-strategija-metod-purija/, на взгляд многих специалистов является доподлинным шедевром технической мысли. Данный индикатор паттернов с сигналом, в своем арсенале имеет не один десяток всевозможных настроек, а также оснащен сложнейшим вычислительным алгоритмом. Сразу следует сказать, что на сегодняшний день, существуют и другие варианты данных соотношений. Таким образом на графике в MetaTrader образуется фигура, визуально напоминающая крылья бабочки. Бабочка хорошо отрабатывает от уровней поддержки и сопротивления и от фибо. Если просто бездумно все сигналы ставить, то получится меньше заветных 60% прибыли.
Индикатор Zup
Если зигзаг зафиксировал перелом, то есть, цена отбилась – осуществляется вход остальными 0,6 от рабочего лота, такой сигнал, можно сказать, самый надежный. Похожий принцип открытия сделок происходит и по другому интересному индикатору — ZigZag. По одной из версий Бабочка Гартли и индикатор ZUP — это одна из разновидностей ZigZag, которых существует более 10-ти.
Большая часть случаев формирования фигуры отрабатывается примерно одним и тем же образом и вызывается естественной цикличностью рыночного поведения. Торговля криптовалютой или торговля на валютном рынке Форекс подходит далеко не всем трейдерам и инвесторам, поскольку существует большая степень риска получить убытки. Прежде чем начать торговать, убедитесь, что Вы осознаете все риски. Сайт forex-invest.tv носит исключительно ознакомительный характер и не несет ответственности за последствия принимаемых вами торговых решений. Индикатор Бабочки Гартли – актуальный простой и прибыльный инструмент для определения разворотных движений рынка.
Использование гармонических фигур дает возможность входить в рынок с меньшим стоп лоссом. В бычьей – максимумы и минимумы понижаются, а в медвежьей – экстремумы повышаются. Параметры для остальных вершин плавающие, поэтому их значения могут меняться. Чтобы определить потенциальную разворотную зону, трейдер должен обращать внимание на ретрейсмент 0,886 от движения XA. Важно правильно рассчитать соотношения коррекций, тогда фигура по своему внешнему виду будет напоминать крылья бабочки.
Контролируем чтобы D была в пределах 61,8% — 78,6% уровней Фибоначчи. В этой статье будет рассмотрена графическая фигура Бабочка, которая в кругах форекс трейдером также известна как паттерн бабочка Гартли. Впервые модель гармоничного трейдинга под названием паттерн Бабочка представил Брюс Гилмор, однако его модель имела слишком много комбинаций Фибоначчи. В качестве первой цели используется расширение от точек AD на 382, а в качестве второй цели 618 коррекция AD. Общие стоп-уровни находятся за следующим уровнем структуры, после точки D или на расширении 1,41 XA.
Как Торговать По Фигуре Гартли
Но действительно надёжными среди них являются именно Гартли. Есть множество разных версий в свободном доступе – скачать может каждый желающий. График показывает снижение, обычно оно достаточно значительное.
Паттерн полезно сравнить с «Бабочкой», он отличается от нее отрезком АВ, у которого небольшая амплитуда. В паттерне «Краб» он не должен превышать 61,8% высоты луча ХА. ABCD-паттерн важен, он считается основой для всех остальных моделей. Отношения цены равнозначные, они выражаются через Фибоначчи. Отрезок CD должен быть равен отрезку AB — это фундаментальное условие. Если трейдер видит такую фигуру на графике, это свидетельствует о том, что текущий тренд ослабевает.