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How To Regulate Show Scale Settings In Windows 11

From Strange Eskildsen, 2 Days ago, written in Plain Text.
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  1. Scale factor, on the other hand, is a quantity by which all of the parts of an object are multiplied to be able to create an enlarged or decreased figure. Scale and scale factor are mostly used in blueprints which may be used for the construction of buildings. Once you full the steps, the new scale configuration will apply.
  2. scaling and polishing price Singapore " 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pSR+cSa7uXBuHWBh/QKKgx4qk2+o/1WxRkrnmLsTbnqG/+L3pS+69IZ4/nQnE/UY3EGx59NhdlwQaOmpYyrKm8/YZAGXrPV4I2fAh5KjD7EX6FgBPk/tuTJ1VSgwr2azPw1k7w0jhxuLmegVuKpx0dG5NE3V6uZ/1iMyadRsTVuqbOY2x6Ems377sG4cYGH1PqayZ6t3SM3icLfypXRfPe5dIJ6spaQfzxdTZbLmesfDaa+E+QfTgX7kHAnofL2U33XvyGZmqkdWLAL6FzsVj4VFuorFpoHAhXu12JIXqrv0vsbyxs5Evq7v+tuxdyEYRjQ6oWefiDogF1s3DP+vLxeovcun5Ldej4o1kHcuMAjaj2+wrtbCG1mbe23cmWk7z7/mEyn5t3UWtje+lOuNtbELks+jEug/ZHuWJl9U19LhdEHuzLb8AqVt38w5ao/WckAYSALXhil755bh+5effEAAlTomn5iLKYv0c+LxbQ02KxbJrtsqbfUXKBCxwQq/BhZ62rvtjfCqK2VIM0FKnRMoMKP0dTYF5e3vRGc+fbrBCp0TKDCj5HYF5fWknxN05YMK3cIVOiYQIWfozHZF9Xs9hppuxb1KwUqdEygAlQrUKFjAhWgWoEKHROoANUKVOiYQAWoVqBCxwQqQLUCFTomUAGqFajQMYEKUK1AhY4JVIBqdY0K//K/8rv1t//V7y7BN+lf+5vfXYJv0l/717+7BH+O/o1qKvybCoKgzurfquwr/Nv/zu/W3/53/71u6u/8+99dgm/Sf/AffncJ/hytu2pX+Luf3dR/9B9/dwm+Sf/Jf/rdJfhz9J+BCt0SqADVClTomEAFqFagQscEKkC1AhU6JlABqhWo0DGBClCtQIWOCVSAagUqdEygAlQrUKFjAhWgWoEKHROoANUKVOiYQAWoVqBCxwQqQLUCFTomUAGqFajQMYEKUK1AhY4JVIBqBSp0TKBCa9qobWt5RXFrWbUgUKFjAhVa07pFKihQ4Qfo26iQqKj+pHS9edX1QYXWtFNpW1klat9WVm0IVLhP6TpTKj8cH/7Bt0rVn7RWKnn4CrcFKrSj7S5SKtrZ3sL2kNNzQZjY2NiHcgvTNR3Z3wAIP1MqW9tTjrHahWdEJkf+OLH5m5bjpFNHh1afF1DhLp3s/Tk9+oMbKmzKN561M3f6rKLWmqGSQIVWpKt+FMeRRfzavN3Ka48KR82EONZcuHpDU31GFuuqvTZZ61xL4wnlU2EbUiGm1JGK2hvNgAr36azvwFnf6XXUoMGvlqHCunIgGdsn43UCFdpQYurkWdi+MW8Tqvrr4CbGKtMfJvl1w8FOZdT1PK65pdEdhSi7pIL3ZhscXatI0yeNW21HQIU7lEZ8iz/pLj/6g4MK36RWqbBWmfdOPxcb/5h3E/Xt5idGtyfXRp1Knb13sTqkFw/HdSroS3Pq9Inu66VAhTu0Kd1aHhDaseVOJcdDpHLzfCQ73WtcSyrboNBfpsK66GNuD5kdkMbyYeSZJE/0WXwy6Tc0Ro3MEHUfPJiNBSq0obDeblQeHPOocLAjxeu1VgVTGZttRZNxnQon+6RomjQqeSOBCncoC40BaUZDxsjc71jpAWGsx4hsTdZdzDyWJsTeY/nLVDjp8/Q4ND7qu0ovFPdB9jpBHse7wiR5oDGjzvIg6feZyvQ1hQZxE7PlpUCFNqT77V77EAczCAEVXO/vejdQXcw/3EEFd2p15/NBgQp3SKlgwjDmAWF6kB4EVe2j60/s+CFY8z+XVCg+3MTUUBxNF9Q+Ou4ktiFthDtk0doyb5hC6Cvcp1apoG9YXrT9UTAGWBPa47VMCrjhQXy11u419cPRRQUVdI6Hk3QSt9yg7M8m271N87Cp61KgQnNtw77e1o4ncm7LY2NzkEckKk69SQWjvfRCQiroMaM8eQfuoYpdiYDzzNw2qNCKaDIq2pvpQM1pHktK5bbDw1366Q0PrrflqYwSPWNhBRVkbMkksHMQGV3ddUEazXg3FajQXCUq7O14Ys2V1t4f+UtGo097uJ4K5m1IhbMdMwp/wnweFajQjsiGpCszc4HqaE7jQMZ2Sv8kBxkYNKCCeByoqBhhXJxLcxvpKTfDFu5driPuK4IKbaoFKpRuSEiFLdkapStRQ4VkrfuDeRUVinP4wqDCU2rdtzE9WQ7ofgHPLWbhiJ9QXkWFmBW4HSX7SBXmwit3WPcdPYvilkeSoEKbeoQKpdmfm1T43FK/8CDz1zeokJqJB1Dh1XrFmsltxPfCVv2TXzOP/KmzK+wKS7Xc8JLXEZmn7EfX7vAh+Dynh8XZFTZNPOmbClS4QwGra6ggnUi6izepcFARjSgrRxCgQpt6yUpqsfHZ+hy21/xpXj8HYaR7AvaMa3c4/JxzdKDAHEQLeogKh8CB7FDYFfwRnnf7t+yRcJMKpi2ppMLJsyukoMKTegkV5EZlZm5qe9lXcF2EcJ6iSnEtFSr6Cq6L8JwNuiRQ4Q5tlb3Hxyyh/qIwIjf2xQsqSHNhfFzSqJoK3Mzsq6hwtN3PQ0Wf41GBCm1qz/fW3L1wsnjN9XVjGpJTbQffG59etyt4M+PS5CTmATq2up4OVLhH+2IdxJFWtdBcZGp6EAEVkpzulTwKR3ZzSDLlU+FskCKzmmtjV7CPlTlpJ8asjTKrbgIq7B+DA6jQhowl2ax/kDtMzcSJPNS23iGyENI6iOjqAGITM/qPWbGAqqCCvJLllOaMozhKbCM7mc1OMxdLJ54SqHCX9na9Gt2ZJBLfRnEjCKhwpKmqzPkbqSxW0cangn5aojjaEh3IB9LMQdDMRayKkzLj28jZlKgA38b71CoVIp6KjKxb4p7eGh/UU3joTM6rmbruj0wLr2M6I+fHaMMzUuL4SjeZ+iK5f8aRvWHpI4bIMZI1mVmbi2xBhfsk6+j3Mud4PHhL5+0qaPmb0HS2XX1PqxcO6Zbhbpc4JLHc1zPV/E1ihiZn8Zi2J8lCC7N2PlxPAd/GO9Wub+Oe5o7yg501OMfFgpjTLvcPJRSIIb6xdInPV/FGHqODbXeUOCnt3NXsGbxyJtrZHFN6CIvgDK0IVOiYQIWW9CXx2aIWL3KHQIWOCVRoSYf2zHvHyhA8nzQauXLgxQIVOiZQoSXF7fkSbq+ZIvOXheS6LVChYwIV/hydan0cXiRQoWMCFaBagQodE6gA1QpU6JhABahWoELHBCpAtQIVOiZQAaoVqNAxgQpQrUCFjglUgGoFKnRMoAJUK1ChYwIVoFqBCh0TqADVClTomEAFqFagQjvaPLXk9bnUdwlUgGoFKrSj51bbt7lWv0agAlQrUKEd7dQza16fS32XQAWoVqBCC9pSEC4boGsbRsw6eTHW6lMnNjzXpmnqewUqQLUCFZ7XhuNrRhJd1cZ7NdE1Kc4mBXy9PkIIUm9DKtSnvlugAlQrUOFpJaYOnzma1m53Tj+POyXhdWQf6TRWV4PqhKm3QQS/+tT3C1SAagUqPK11VbDlnD9MzY5BpR0qr6cOqNAg9f0CFaBagQpPq3KnnzjcEy6+uh9AmDqgQoPU9wtUgGoFKjwt3c8/XnwYB5vA3dgFLkwdUKFB6vsFKkC1AhWe1jFS+UUPX7avdvuIr69u9BSm3vKuQXsJ4tkg9f0CFaBagQrP60Qzi/tg+vCklGwIFmxmX5/azkFkScPUdwtUgGoFKrSgI20fp+KCC2kkzXyjeh2kpjlI2tw2a5r6XoEKUK1AhVaUnmijQYeFzLgrVNXrfUw63UjNp59AhXZ1jQpJq7s5/w6BCm1pG7nH62AtiM4ysLHTCTw7odTFZkFealJOJ1SlflqgQkmHp6Z9Za/hTSs7v9n9i79SUeW+eKBCa3I2wYNr9w/NZxFCiyJ3E+5I3VygQqjUELeoHpt7fm3pz7Vzg+JrG8u9UKpyXR6o0JpsP7+AQtHI72yzX5taxH2FO1I3F6gQamN8QYrqcVcVBxV+k15Ahb3K6Y8HBXJn5h/9qGo3MDapRVs+/47UzQUqhMrMXo6ggidQ4WnlazYibGRBwykwG8Yq0wfT7PpTE6Q+iuvCNpJxan3q+wUqBEqVWcQOKngCFZ5WpFTOix738jNbUc/0qD+OY7eCsi71kddP5joNn1+f+n6BCoHOdhnKJRXW+j7smPDW5iB/0w3drth6mjkqODT4tsd0nekbfCDyn3a8xJ4/TvQptEp+53vF6rzSQ6Ryuwp/u7tYRu9lJyvwZcm+44kYLHmue3c2nyRJrvJjOT86J9+ACoHa9G3c07RCfpCfNwqo8JmG0RbqUm8PFFBhZ63itanvF6gQaG9r8AUVdBWKM7Hs2GPyl24JkZtvkkeFRDzXaFDi5hJ0P08R82MaWWr8Z+ax2Kr4oN+qwN09Vrqe0ykCqpNZRu/tVu9lR4c5P2oyNmb4mcrIU9d3KuBaMt3Qw7gt5afPifSbA6jgq127wh8Tnw1UKMm1smUqJLx8Pcn8Y4YKTOm9AMMfQeTSWzxaOnwSCjLuJuiTdtzCn8VGtJUQGmnur3uLxaf1JMDZSliNtb+M3stuKwPWLbvWW8vTieiQRnJESkvk2X5u01J+OdNkrUAFX+1S4fCUOfC51HcKVAiUX6OCPz8ZUkEkzXJAhbW02F7K42Wly2yVPcm53jp6G0fjEHi2ZoU/hZ+dXUcrvvWZAGlHaexIZm+W4pinK8jvbMi1BhV8tUuF+Cnfw+dS3ylQIZCrFWUqbL0IWFVU+LRNcUEF02J71fh06X4mCew8dDAfbevtmT5MbY9jX9ggvexSNy/FfJEhRGoIcTLZxJ+FK1yYn7OBgAq+sB/E44ramxJJvs7sficVqJE1BrsyFdLTISYjcJkK0mIfVRGaN5ybOJOze1RPBZ6X3pIFgZQXeXjZFQk5lQDpxJ0MMh+QMj7Fy9TLr2Lg5AtU6JhaoEKLE6Xbn0uFdE3TQ2f/mPw9WYPyBRV4WO/PQPhUSHKTrJYKfJ1tMZm1rsiuRAVxdJMZiCJh/BlQwcvvhVQY9HvB+6katFBfayWX6fWfuhio8LCSFj0tN+pcf1I7qqWCLYmre+kpl8MBFY5mvrKCCtyt9wYQARVylZ0/G40gttTZr1oRd4MKBCQzSAgrupdpxaePU2Gu3uXFZGpfvc3o1UxNg0RKjR+sox9KzUfF25lSq+sny2WUGj54MRao8Jh4wtybLD3GRdPI0+SZnZWj2XHXB6/UkeZdlVk+etxzkHtrvQ9TtxEAv8bamDnW7bx5Afl2ARVsoM0KKlCLffTnDDaFw+rWDCya2hWqHFq97I6eXYF+JQLSSUqRB4usbKZhfvun7QpDNZMXPWVfjRS11x/ydmhZcQcVXBqRxoDHgYVyF6qSXGap+k0vViVQ4SGlPFmfuV7tJlKu/TrTFDh55vC7tZJJ8+vLALfso2Wa462SxMYxNEzdSgD8mpnJvb10orz+i1T3SJr/taGC7RdcUuGs8o0/12h91tO1q//ZLSpkZg6CfsL8cnDlZWenQckCyYk0kHZSzEMwwnNfMMjvZBj1uL+CrqTyQrfoamI+mhfHZ7Z+3kGFWVinZ0r3OybFu3k9FZ4UqPCQdjJhflzz86c7CpFzx04lKN3ZDZzplH31U8fS59OTmXAfYBPTeYlZTx6mbicAfo0Xky5+dEr1qMEUYbdP2WuIuHRQeTG5Ly7tSVZFBfZh87tH4rOeZDG11forpbubdgU++yRZnAwTt4e0IjtykWevhshUdj2EMDVdX4mTHPdFAcv5mZt1eNxfQXcMxH6wVFPzauX38FuhQn+uFubNQM37oMKr9BwVys/8IfVCzkrPWpZ52Qmx7Gp46q2q2EZvL7UkSN1SAPxqKpxcpzyxRkTbYLMXIb85Ui8oV4eYq1AmTo9RFRV0qmAu0vqsn/irZfpVfosKB/FtPLi82Bf+WJVd6CvJv5IF3EmZTtjp06NCmB97Rkb2K5XVxNq4VB/0Z6TmK3n1Nmc6vNPQfiY/5VSq62Co1NJW2gUdm0llfzdmgHIakabCu1qaNyvVd1QY6/ymq4G8Ga2mav5uqGDGIL2lviCjavI+m+rL0WuXXK460chRy2DIAio8prBp2Wy9CmGHs2wrc6PYtb8UNFBlgCmJMhGmbikAfjUVvHlENplELkrWhlYcGPtJopv47KwLwOsgdN2NDvojelOKurJVpTKSz3okqyl4XcV5wwkS850SHyK0ZIEuZEtw5oUO+2N1dp8UwMsz3OwLYidksDFO9F4olyC/rXyl3cNRV/pSYRdqZUYOAxlJcOX70HVxPpsNmQorNaWqaTsUajmbG4OBrajlNI4KYqqgOqzUyJ69oCymasoZDqac+0qoIL2NdzpBUs7N5RZcvpHhmWbBRPdxZsuSqQJUeEjqYv7h0h/GzKvJm+vB5baqYv4hNh5EfuqWAuBfWUmdt7gDj7M2/OlqQgVTyVZqMZFX71LDTN31RhBqNaFWfC5Hp2Opt4syFapGEDqZjEqofTdnjSWLvtgc5mo5oTc+Fab0ejKkD+Z9OumDeyBm2mTExZ1xqUbz4JKgwkPSDdLhGHxiq2oxIKCRs9sRa3u9muheeGndlx6OcNMVpm4pAP4VKqxb3IHHH5D80WrkrzDlij3XVYwbX9t7v6TCykBkwtOYMnZYMSTqqdAz9sa5ruils5aUVc90APoeFQbWEOo0MbMjSwHMjNHC+fZ8Cymo8JjSmOcSvcrsUcF8EjMVbLN+nQrs1nOw/YWU3QVNXztI3VJQ2ytUOLa5iac3v/lHqxEV2Lg4olr1wQN14650SYVx8bdnzQZjrs31VHgTeyNXXjlrYgcCH3TYGQv8voIKZzjtUdO7YZp8mD7IJCAIqPCgyHVAN/Lu/eNU0F0D4oK4D9IAnzJm6/lXUuFz1+IQImkzatY3qhEVFlTDF1S7xvRqbFrdm1QophGCtzeoIOYL9o+SszRPZiyeqCxdRt7qjsNyYaY0J4uVPleO8hBixJ2WGZkwZu4IqPBsDsk+8mxqzalwYjf8sC0909xYsSZwHZkFvl9Ihe1T1opQlRsR/4FqRAXulq+4KZ9y//7jFVQY0YlSkx0VrPpXqPC2mCs1lVdTc65YM5Z2BmLmMik8IkCFp5R6zi+XdgVa3u+qh9d6rp1vvq9j5nfht0pW9PmpWwqAj11imqvZOggyJ8x53mGoiTAzkwwtU4HtjdLfd1S4OKdMBT3kmCnDlOHAHWU7Iw8gypcCFVrIJI3cLLilwjGYgzjVz0FYhfZIdooKU7cUAB9UaK5mVHhXs4Gdnly+2cp6kwoLz64waUaFha7KYrKQs9xkJeujyq5g8py66VNbCM2xkXQOVpULJkCFpxRfUOEzMhPjCXUaXBdhU9+nDqgQm1hnXuqWAuCDCs3VjAoDpd6tK5OyDkm3qTAq3BborHexRUymN6ighydLqdsm52AycWHcrVcXVOA+hUkyMYXQQ4h3MTMugpEDqNBKX6EwBjgq7MwL8eK3nYm8dj+ks++8ZzboDFK3FAAfVGiuhiup587ZeancGkpTET+sV2JABT0emA64etouvU41sM5ELk1ABVposfByXpgphvFKpjpXAoWCCu8zcaQYcuUfyAW4EPp6c1PiuVrSWZN3f7oCVHhEG4lsfMx4YQDLUWFrI9/btQv053B93m8nayBNlPuMA+DTMoHjRep2AuCDCs3VkAortzCKau4ooIJuquczdUGFybJwNpR0y5mavpfSBFQYWYugHW/oy05n5C05EkbMybdxVlBhIZdg/BBwlmo6NYWYOY/qwZTOWoars0GFR7RhD3tyBeYaveHQPpH+l6ry3qxzlF5EZtY5Xm3ed0GU+5gD4KvK1O0EwAcVmqshFcbOYbh45dY29HTVp+GFjbpi/k76S28Rw1tf197VZFxKI7ILq+2w4N0t3h5Slf4QDNGiiGVPnzxwSXq8ToIPT1ZTutrQFKJX5D/5oIIM7eorUOFx8Z4GKt5I/Ty46R2uvWeKJ7xzkxPFzgWVkm0VbJR7eZe584PUrQTABxWaCxHaOqan7Qp/Znw2UOEegQod07NUOLayKbvo9JVbs4MKzQUqdEzPUqHN9v1Lt8cBFZoLVOiYsB/EL1WbQfRBhY4JVPilarMTByo8pFIInifVVj5NBCoUe0y3InkU0vUXmkgq1WYQfVDhuo42kt9lnS2F63tSFfmkLozyuSq+4eMCFW6u7mbRjfca3vMttwv3KHzrGuogiL7W9sKndOvP7m6CGWVZ0p7vi8cMVLgut93Oi6jggvZV5bO3m5jn7QbyABXqqcA3vvC0yK9EQhbJo3BuNXhLhXa35muCIPq6lu+VKo0n9kGo2nVAhWMuXmLOXxVUuKEb6/1aoYLLvyofE5s73Km8BYEKjahQLP/S7/J6KrxcNy8TBNGnjkJe3k1itzunn0cTd14/VP5R2Yci8Ta0BBWu61upYBYUHKNWo42CCqQGVPACMO7U6YdToRREn0JlXTk9lyWsARVsam+ZGqhwXQEVrIVK/lZQIYo+tyby4ClXkR2lHSUK9/EiEzs+2Ug+ay+NKKY7eCgBY6M2tF3K2TgfZ0ExmlgtQQWmgguxXvXj0Y2PrPGOAjtaKvCeeTbYeiq3TB4FMxqUqPB8G7cHdtpOedN7E0BeTqIgd3lwr8OHa6cSyif3XLxjeVYiKURe8iUvNV8U2/0KFWI5M6DCwX7xYiEsqHBdwY8d7ktcQQVqXyJe0bNTeWaDDiW0wUhsd0rzM0lolVEc0yrEtcoy+i+MRZDoHLdlI9Za7XMeNHqbhCQW8lkDX0FQgX7+A2/7Qhabqh+PbryrK3v9E5v7pm8mr//iKpXS7cvpthXbvqQ550spT0puPHXObX9PNqo6mFG8V63LD9cmKj0O+5guHe8+y0+ULW95/uEqFfixDKjgTi3SgArXdS8VaHDH8xYb7o7xjiIy4qOlx5eZeCMIXjmclDZH2uvbX45Lvubsk+PnjhsLuYwxSB59E9k1gQp8q3YpV89j5Y9HN8bRgtpvuV+pBJYxwaMOXC/Pkb9F3IYfiDNVXtki78hJLGF474m1rAvfhc9O+HCpLHFL041slS09UaLLIPpXqOCMVRox8ToxFz3bNLZIoMJ13UsF/sH3pmpn5gy5d7LL4HUqCPhLwYZok7CyqXFd2s81kxEIX2XTxMwBKtDPLz8UA6Hix+MbIzfwkzd6tjEj5JQ973Nn7vPWp8Luoi5y98BMLid0N9PI7CDrI7z8cEVmUzuv72ireemJEoVB9P3TQ53MRe0cBLGxsLKsQYVmVOCwxEz9BlTYmkTmcaAzXLdUGv2rVIhLt+XT5HFhKChHEeaCmChFWRPDJKhQ3Aber73ix+MbY+yN/LkyG0zKKWdK5m6ev/W89AN8+ZtaM03Oto3PPAtm1cNldqy3sh+WniijIIi+f3ogE+lKv6BvnBxkJzBQwekuf4XLZr6eCnKs9IvfRwXeIkESCJ2S4JTzPqbNRAU++2DLxBsCFYrbsGbz3eWPxzdGNr3d8imSgCLBkLJgnzufCinvQGlySdYclIZOs3vPsw0pkpsZefW2mgpBnFv7YUUdFoVB9CupkJUC16y56wAqOL1iBNE2FXRrsDNdA6GTv9krdxqV8Vbhdq2Z3zSoUNwGuQGXP558ztM/B685LTYiiK9Q4fNIVTNmi1JcnGsj3BJg1kUudX2Fz7uoEAbRr6LCwTrGuQScmbMr7NxvACpc1zdTgdzljuXd2b0toLOzK0hKveBGAwhQ4dPvK1Bv/vLHkxtD9kYz+rdU8LwWqqkgO91EbMqMTsWGN2Rn5AFEtW/K1b5CUYsbUMHvXFRQ4XDpt83nO4cnzEF8ERXyYhS4v8jkNhVkz4Wya2N5UxZzJ3dq33DDRFChZFeo+PHMjcnVfi3NpyQI1hacq+wKLJmqMC2wuV9kdMw5k1PVVjd32BVKT1R1PlVUqICC9BVcF8G5aIAKN1TyYuLGZH0fFawZ2eyhEmZymwp7acii8OaXN3AzlvKzyjfNNlcGFdx0ka1hFz+e+XE3Ksqloti5SO/2HE21P6kyFeThMI+DAQ9Frxcz4zHocRiVHy5ZkbDzRzW2mpeeqECed+IFFSqgYOwqG0NEj1egwnUFVDjwrVqr+6iQyAN4NFHLw0xSO6KrokJiDm5CPyZvq6aTREqXu09uEo1W0oIK1rWkGGeXfzxzD1My65sE7HwgyT6Pe3kEyHR3Uj4VcqJMEokPiYwX3CSoXeV2kKj2nyeP9uWHi/0VQj/rvaFB6YlihUH0WQUVYmN58qBw4lk1erR4Ebh4QCSe+RNUuK6ACseI3dYO8V1UCFzcypnQ7Y/zdTUV4sKA4I8f3Sl7sojrp9Y1IQ03YQQV6FbtxbfR2BLKP569hwcVDuZPyixNpHSJ3Mts71NBbjZV2zP5nkYqd7fWLVvOTJB7zwup/HDphMZv1S9THotx1H+iWGEQ/c8Dz3AYV0jTMSpsnAfOIqdTDKfOlDy4HKhwXUnwrLDn/FnfMnFVv4i6YnzZbaK1+ZG3O4povqnKhHdxpZ0VbD6hK37iXnlNRnEKzVDvzhszzNyqZgMIUOGTl6ycdS1wQerLP569h24Bg/E8+kxkCUKxKEIzXe6AJEnJHT0zXg3ksrxJzP3S9d45mmxiL3q+uaL/XOgmxy3TKHTOTS0OnyhSGET/085OybeQDkHkU0HW0NjvQVeP/OAMoMJvUVo1XK0SqHCpxj/e1+iRVZhX47Mlj6zEBxV+h05+h/SWQIVLNf7xvkaPUOFqEP3DI9H1QYXfoaxpxCZQ4VKNf7yv0SNUuBZE//hQCBBQ4VcoaRw2EFS4UPMf72vUZhyXQ1S/jPZSoMKvUHnR1HWBChdq/uN9jW6GaPwSgQodE6gA1QpU6JhABahWoELHBCpAtQIVOiZQAaoVqNAxgQpQrUCFjglUgGoFKnRMoAJUK1ChYwIVoFqBCh0TqADVClTomEAFqFagwo/S7up+t20JVIBqBSo8oc1jy1iy6xu/xaDCq9QFKuxb2sAcVHhCeYN9HSt0I+5q9PJ1OqDCc9rklxt6ldVsedN53fpKzaSlQBGgwuM6u8fjSLuSq9juAHqW+Fg7b48yP7RXeiU8zokid8kW5Kcgzp7ZMSzc3fxBgQpP6cThMmtOarYUup4u9ytrJ6gUqPC4dra/tneB8uQD2TUsctEAj3YfIdnus0hYyk6ifFKYDI8K9Ogcc7O7+fNYABWeEu/CUHcXmlEhazGMglXD8P91AhUeVmq3JjxIYNDjKTLx/0wg5o0JEUzRgPe6t3jcmA0ITlWtxEYigqd+RHCKyk0AkSjjSf5QYJ1QoMJTahThsc2wKffp2DDSd41AhYd1NsE6tm7z+DSXcZ0Nz36w2xrbWPzpnh+Xo6rog1btBWQiCtqNos7qMUOGL1DhKf1wKpgNqp4VqPCw9qYax0ULfpLdRor9Haj2by4DgJlI4md/O9DKR0m2ezjYvkV518kHBCo8oajYNpaNQCZa+kZt0lhFbqMZfStTDgsvfUmOs56Zu8sB4flMa5PcluOup+vM2pe2B34p+VA4+Nxks6U9IMz213StyJyzawVIoMLDyuSupn5VjYLdY4QK2eVYzxBgHW46fDn/cJJOggNGC40QqPCEdjHvVp/wqDGjfVn41q4V7QNR3JtY7WSbF76jtOmH24RlI5v7mG0f6JOTOeyeBNpGhqxScWlHmET2nTFjUJ1NJCBKc95iRhqOys1t7xao8LCKzaL8Bp9uir01Md2qtGKrt73cw6CvoIcHcbn3F8uj5HKIn7/noMJTcpYjNgJtpEWgjaE2n4m7l8WWcHR0x63+WVDAvcR0V+w/dpTx5/HgUh9UxtNQa9pPhneyExRIN2AtO1Xx5WVr4g0/FGehwrkVwwKo8Kjs9p8b30iw96hAO0Nt/V2gClUSnWYy8o1vOLDAubU7+b0CFZ6S2SHUbBdrLEdrFTooxGbq+eB3/7hrmZQ3qQ23tCVVbCsrjUhUfG77jBkVIxg0bKtMVncLVHhUxYaS3n1YGyrQzKSSpsLbylTZp2dd6W1CY0WzwaloZ54YUKEFtUkF1yILt8tBom9sNe/xQz7Iyx5PFVvZy22P3aOR2u4p73G5lr6FX6BnBSo8qkoqHAwVlPNHcn2FmF0Y1kHasmjusthW1G6GDiq0oTapUNwHfl++LXFxm/nWn/fu3q9p/8jUO+uiZxBmlqxj2lc2ltzytX2kYhYfSCNnd6zK7xGBCo/K1mw7bchiS0J4YxPPrhDXUOGzcHL4dBObnl1h97w7HKjwlO6ighxN7G6wYlzU76J1cdZNKqTW/Y0/2samK7ktfNzYNHGgMxK/gE8KVHhUtmb7td50EMOnJCrmIOzjUj2CsOeYxG7w+pljDuJ5fU9f4Uh3j2ci3b07x1KZG1DhoCLqWLiPkgMD4qJROa4jY8rACOIZtWdt1Hfd1fqT3JPwKdkX5saCCtdHAu7Y2i2XcF2E6HI6416BCk/JOCt4doX0OhXYrmD7kh7R15xcPojKLigbr8UwDY6XPw9KjpcG7NRMWcLa+Izam5mkoaK5sUlk56/9p0TfsNzcRPtk7G+MBJx7Q+ScHTeGDxWGqLsFKjwluenO4mPtSGUqZGYOYlfUU2/Zg3wkD4O1KJ9sPU/Mc5Wu3SO29/Lnj/LLPqN5tDAz+Yza82JirxNe5uC6caWn5EwjyUQWSsjdLG6hM0kkORuhaDpTno9T0RfUXKHhZBI9P4AAFZ6Tqac7cWLflAcUIvJXOFpP1yM3GumOhw2bmO6p+KrKQ7C1g05v2pESJ1lsu6FrHjYkedFLOZmpjC09Fjm91M8GPzbwYnpGLVDhYBt1woIokwpdvjXb3FmHpImJbM+weBYSxW5zbt2lPzBhrjj3uOcEKjwl25BnxreRb9YlFQ7i28j3ay/ujNy+nyRZ5Pk27sllMS9mnshpiRfInvi+kzsjTzUcjQ8kX/HATo+RsVuw/6M8G7uq1TR3C1R4WKdilvpEruxFPIXNxQBBToiNj9LRrXbyfBvZ5V1le/PJNjBDJWVf+YcFKjwl0yTLWgU7IVi+3zuV0JqFzNwvio2xO2+4eT/z+oWjnCV9TbI+Zn4nMD3oir6TOU2izybh/BONGl6cywfogZCHJSV368y1JU9bnj5BhSd0fNjce7qyNfrr47OBCr9bR3+a/HGBCo8rfnQF47UIXnkri+NvC1T4zbrspT4kUOFxnR607KTXgN6KpahGoMJvVtbKAAJUeEZR69FcXy9Q4RcL0VyfUytUWD8Y+T1qwf3sUYEKv1j7droKoELXBCpAtQIVOiZQAaoVqNAxgQpQrUCFjglUgGoFKnRMoAJUK1ChYwIVoFqBCh0TqADVClTomEAFqFagQscEKkC1AhU6JlABqhWo0DGBClCtrlHhP/8vfrf+6r/8r7qp//q/+e4SfJP+2//uu0vw5+i/r6bC//D3/up3S/3lu0vwTfp7v/3OXtNf1HeX4M/RX9T/WNlXwAgC+l3CCKK5YFeAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblABagbAhWaC1SAuiFQoblAhd+tTEUneZWoqHRso9T+ywv0bQIVmgtU+N1SSkUpv9oqVTqWqwtQ/GKBCs0FKvxuKZWbDsEFFRKV5er0DWX6HoEKzQUq/G4pdVDqSK8uqHBQp7XafUehvkWgQnOBCr9bSm1zqfoXVIhUelQq/Y5SfYdAheYCFX63NBXO+v/PSyqcCRaZ2nxPub5eoEJzgQq/W0SEWMWfl1TYkU1ho7LvKdfXC1RoLlDhd4uokCgCQIkKKc8/pMbo0AGBCs0FKvxu8ejhoPILKpzUgf7sOuOyACo0F6jwu8VUOEZqXaZCps7050TA6IRAheYCFX63xNK4VlEaUuGoVMxSQoffL1ChuUCF3y2hQpqrdUiFtXI6fFfZvlagQnOBCr9bQgU9UFCngAq57SKcrUf0bxeo0Fygwu+WocJnpnKfCttiBYTqiNczqNBcoMLvlqXClsYK9GLPHgqHYtyw64jXM6jQXKDC75alwmdsqBDzn6joIJw64rIAKjQXqPC7FalEXhxz9nCUvkLiGRPSqBtDCFChuUAFqBsCFZoLVIC6IVChuUAFqBsCFZoLVIC6oatUSNT6SwvyBwhUgLqhq1TYggplgQpQN3SVCps7VoJscvUi9w6ZLDqvk3ay212G00nXjSPsgApQN1RNheNB13MVn+y7SKnseuU56aNxOVT2Ve2Vyj1XkPjmkhNxLGmNOfFlB2itVFPkgApQN1RJhW1Ea0dz4+t1jlQUZzdqZkzRKFLqXjSpvHGw9OxE9Ll+shQha2s0U0GFO1a8gApQN1RJhUgdqKYkB2pF04gr8VldrZrWU3R9q347xSr2KmKs8noqtKYKKtwhUAHqhqqosA1iXK9NEMv91Ug091JhXWy4kaj8ZipQ4QcIVOiarlDBe5cbC93WXxmyPeghRc49ikjiUWxtbArqX7AlYifmyo3apLp34GyXumYW0XIPau2osN0pFR2sK7rOId8YKhgj4VlfM+N80k1Mgxx67ZLL+CXVyCnbQLa7yBhJDBVOOzpJAGG2FIyiz60e2+z05U+5ivZVowpQAeqGrlDBm39wzbXXbp90/aWAVZmuPDv6G8fJKc7pw1ijI9E1mswSXO/Wak+mS9dI65p5tBY+CptrqzXbLCODj4RsGRHt5bP9tJV5w0ZNTkmVmi5wolptYMXh+tNMbCB+90NnnNNnW5vRwXxwMF9WvtyJrxglO5Vn1bYOUAHqhirtCrpqrW1jWQwnvJq9iamyHiNpw8sjiFQ+39o4eEq/TVw/g2rmztgbqX03qbYqslHzPqnaE3AoaUGFiF6nO/og5+LtuZk3fZkj0yFmi8gx90YKR8UnHA9Hm9GOXpKhJPn0qEApjxEX1h4rCVSAuqFKKiTUuB+kv1AMJy4H5XuZdChTwf7dc91fq9BJgLKxhv9cpzRn29wz6gCcTQdg7VEhudgnOOW6K6ExNGBiRgvne/ZsIAev3Q++QmbZJd/hIEUWk0flrAeoAHVD1f4KPDpXOXHhFhVMhS5TITPGxDO/X5e23OFsxN7IlVdSuS049nTYGQv8voK6cEHio2YIwRfdmz5I6hEk95IFX0HeOCrwd7Dfdg8qFAIVuqarvo1nPfoOt9EJqlSyjsmjoZIKbGfQyjhpeY4hlmqf8cuNPb610bU5T3cpnwq645CdzGgmPR04EjcPJygX2Rs0VrmN0e1sIP40hs33vNfnRDeoUDkxAipA3dCNNZPHjPrjhV0hKhrdNDYTDleooLzDlVQ4UhqpyY4KVusrVKDJARXJKzPxwUd5RkNmIGKXSeERcUkFHiCZK4EK9QIVuqZbK6m3pupezkEcVHRKr44gQieDSiqwvdHaHS73+6ymgm7jY2WYQlOI5ijbGWXUUuWPcEmFXOY3b40gQAVPoELXdDO+AlcV20VIPN8mM3V5hQp5YACopgLFxZSlT3L8GFj991V2BZNbVJgqzIUztTlK5+BQ4XPth9rjjGzvB1RoKFCha7pFBZkJ2JkK4tc4U4f21VQ4BFWqmgq6smZSt81xfzKRmJFKTmUqcLU1SVJzYT2E2IiZ8VSxqMGW/5QUVOAPMlChmUCFrqmKCjtxMNxGzIGt2P5Pfk88t3OOARXOpi4flayjOO7FA6GSCntlJgHN8ZOZYthSUrP24uD7K2zIP0rYpCu/LmGSmQvr69ntffTggM5KN0VvxZR/7byYjnzhdAe7QkOBCl1TJRXYczHXdZ4rOS19No6EVmf6KFKlOYiUHRK3ZiGkTXKFCkdrESx6GHTVSOYZT3KBQ1xQ4ST+jMSDT3I+zFQUmQvHym7vk9Cab+e3KDLlz1J77b04SebfTIVef+C/HajpY/k4TRVlOOj3nsynLFCha6qigqwyiHYWA2Tji3bBMiVekrBJZFDh4ugnsSFJQvEZ8oPp34djfRv5xA4LNrYCnmm5QrYXtwVaFJGd9cmJS3LmdRJ8OD1EtGRiZy6sIbW3Zd9nftFd+WXVg7k2eWPszht+Y9dBSFbmnaZCRdCHh6gwUlxXtcbu1YTrr1JD/0R9+DJ1T6mpV8n7Ss2vX0qpsf539jRdygIVuqYrdgXEZ6vQY32FqerLiw9lXy244i7l7dSwopIKGgMeB0Y0nXr9SkKFDzW7WZ77BSp0TVeocLoMZQY9RoWVraVLpZb2o1VxXOryVSosp+Y4v5vXU6F9gQpd0xUqrNuNa/A79BgVFkpN6O9ETc2rt7laFMdrqDDzEDJVC1ABer2wH0RzPUaFiVJsGVio1VxejYQOQ/VONZk1FCr0dH9iOPISayoMLEt0DjOHjvFQqelqIG9Gq6mavxsqvIu5YqBPmMuIZTHUXYxlX7KTFHLSpE8H3kEFKBSo0FwPzkHM1Af9WamFafbfZSQxI7vCbKbr5WzWZyqs1Fy/nXpYoGo8V6beLtXCUmFBqabGEjnQL/SblVBBar5myVx/9s4X1i81blb86chkpY9MljqdPlBnh/gRVLBBdX7EyPZqhNKKIOJPyVq/v1igQnM9SIV3sRfO1agnr4ZiZpzJH28EwVV17hsdqIqb9Dx1aagwVlMBwHTCOS8nYpgsqCDX6NM/wxWRoMczIIYwI6bDTK10utHcGkG/mgoUzcIzalPU4OvhttdmUU3jiNyv1NWogs+FALzU9iJ8wJcIVGiuB6kgDfRI1+2JzE2aWYdLKiwEIsuQChNzxkqfb6hgklLvgev7SM71qDC9sDFw9+BDMn+nc8bClLferdnOV1KBV8QVUf9ydStKp1TEOyJyv1LfQ4Wv6ziACs31qBcTGxcX1AXgmmndlS6pEPx1VDBTFhOq/HJwYgcCH5SFMxb4VJB+gC++nBlCME0+TKdkcsuC+WIqBL7seT0Vfoi+hwpf13EAFZrrUSqsyLS3oorYp1d9UxsbU2HM9sa+NUnyvzPWnA7bjkNAhTHZGq2BovehzxW/CR5CiLlzpuaSS93cxQupcCqCZu3UCVQoC1T48XqUCj3qHMypkR5QpZ7JTERzKrzxyJ8nMBwVrPpXqPA21pVd+guDeXGujE9kBmLmMpmWuhVfR4XPyAYOplWvlgp+iPDPzxPtUGSC/ppOtPi28liiiDZuw/PZkyhdHgbr5j3RMg766cf5pjDk64vI3uk6K3x6dyoxYcdJ6yA0kGdi1J9R2XIb9jSIWx6cfBG3vFRgdu7deiCwEUg42Sn29nZrX6BCcz1KBTInjGRAP9VV2840NqcC2Rtl9O+o4GVfTQVNg5UyTFn23GlsZ+QBRJGuTq+kgluJS8E2DBWCEOG0PibLdO30wnCkFE0855R+tHG7Zl7CiR5oLU64eyFHDpcQHUGc77XaZ3SRIJZgSottyPWfM43VJlJUqL0kiIkl0s9JPQtorHYRLdExOQVxy+0Za++vF7c8LDAvBFIU5NwVnmOXx7zdwcHEOL+xF+NTAhWa6+HVUUPVf7fTkx9jW2ubU0FX5d6MZw/kYLG2gvRRZVewWQ3M+MNdbqneR9I5WIXrMK7rlVRwgftpIYpQIQwRfpL4/iYYv1BBls6cqe770cYtYTgo6JpXz6Y7v6+f81redH0uxfleKw4wngQrAGPJ4CAFJPAcuRYfPw0VjibKiDcK4tMSW+hS3HJ7hk8FL255UOAj13ha11s1glhLvpugvG0KVGiuh6nwrmZD68o0/7DuB82poLGylLptDgaTidZ5cnVBBc7b5meWXeghxLsYNhZ1IwerV1LBRtM+UWWwWwX4IcIzaRA1Kgoq7KqjjZuV/AlVwtSsp029WY6K6BuZWWUvU6I7t8jO2xRJogbE3Bv5NCMeKWIsRfNLYzdLPJi4pF7ccneGRwUvbnlYYLtRW1xFhdR2ig5Xt3N7UqBCcz1MBd22T63bs5rbdt413tyLuEmFnlJSk83BhRK0jMlwMJnysZXvrzCYj9/MKqwRz3hOhmZt1ohKIIYNPbQge+Tkvca78aVUMC0tVxy717AfIjwM6bM1AYKzY5iVHJXawjRxsf8zP67ghe+RjRMcblnw+el2NaAP889yEy8nnth+4XOnCBdM5QzjlpfOKMctDwtsz6q0Np7tDGWwnVubAhWa6/H4CnO3MGpZrIE0VOjrY8vZbSpQBmP/oEbAlKYVeJ5xIX6Mq1lBhZHxZyT7wQf5QRIL+uaydqn1YEpHlsp3m/pyKqTc+m75QRcCBCHCvV6zZ1eIPBOeF21cqj1H4FnzPmYukjcrnCDw4nxXUcGdLJesokLKQ4iTb43wanNSilteOqMctzwssGVhJRWKYra8DasTqNBcj1Oh7xZRF69kHQR9NFXTReHGEERfMYsaHB0GFhm9IVXpD5l7pEURy57OcOCSDFb6+FDGJrTaYdh7N5fT/Y4Pk/vkQyNhOvSWan09FSSe34H77pYKXojwSip8HilKV8w7pvvRxjm0qMxArItcXMXxqRDE+X6QCrrUh5KTcxCGOIxbXjqjHLc8LDCo8McIEdralTzlZG80fW1LhW35nM+LUODHdcRD+DDaONkZ/cjhoXwqBHG+H6UCdeWDAYTfVzhW+xeUqODilocF/j1U2GbqYrxX1tVlJYGS9bn+pK8XqNCuzFOeq/3a35owCBGeVtkV5AjPO4TRxskYkJupi0vv4F0xkxfG+a6iwqGwK/iGwzCBHv2cgtoc2BWOVYs2Lqhg4paHBc4KuhQf2jcnz67wGv/v9qhw5FCLNexq5qEWf89KsTqBCu3KPOUbFZlgvEKAMER4LvMCSVSmgtSrMNq47ndsxWp3rGhGN2aCIDmV4nxXUcGGGTfBx6upoPslu2B20E5VWAvHpafjzm2FHsYtDwsscxjsM3Hxe7kp0dIv1aLaowIztQ5dzaiwf9W3fU6gQrsyT7nuDhj7u9v1JwgRzvG8I99fgT0MEw61GUYb128NRWhowbXsVEw2UuTwlNZmrktxvquokEr83/QgKKmmQkJmAP+ZN24NJ6m3QdxyoxN3IM6yXNSLWx4WeCvlywJ/hdTSYCczqZtXDSBapEIjF/Af5c1+r0CFdmXbvoNtN81THoQIT008741PBXFRJB6E0cbZZie9dkqXs69gccEzOUJmXKWCON9VVBAQxXZ1dzUVaJ1nMCSO1UF8Gw/2mxVxy43k+2T7ctzysMAHKd+ptKWaivO1nJqVwq63KlChuUCFdmVXBrsFDDaSvx8inPdHjw6pxBOXJOme1jAYrwY/2jg5Obp5wg2vFdj4TXmyi2TNRBjn21q7QqsXL5qw6xLC5QubwugQ1sydSpKdK1spbrlI1knolKW45aUC8+qP5DOKgqS6QEwQXqJxeFmoibaosPP2c+VfQtaH0N3aK9+wEn/yXTbx3d3SFjpX55HzmfZH55yCNSAnF4Q+SOqtlgmX1vC9b+vHAxWgkn5IvIe21RYV1tSNi6kGn8y6Eza7bFW8U6roIKxpEQp1jSKzF4xb2kJjNOoLigeq3U6KcyoGT3ZVSCmpt1omXFqzk95nO18RVIDKOrxsgdK3qvURhNnAbSt7wpEjxyE9utaa1qGcuerSUX9pi3EnXxfDtqPkdDz4juzSTSgl9VbLBEtr2CP+M/FXwj0jUAEK5ex/v0ytU8EsGeFNp7l2BtaYdWFQKnpe4nIeFX2CtfFfLdsgLmd6JOkuHKLIgYO3LVU7AhWgUJufOYX+tNqmQrHYnO0wZT8LW2lTf1zgVqClwQd5OV5uhVeIjfHpvKeCpTVmJWtbAhWgULG3yPI3qW0qFG4mwa7wVm4OwszkektbtmRrPHpnXczGhpl5Sb3VMsHSGprK2bXXxQMVoG7ou6jAR4OlLZ/bWBn/lQZUCJMWq2WCpTWf6TrSrGmLC6AC1A19X1/hVF7aQvPUyowIaqlQTmpXy5QTpaebkYPvEqgAdUNtU+Ho2RXO16mQmvWi/tIWEq9LD2JoeEo8H7HLpDL7cGGM4Fh6z30zK1AB6oZan4OwfugSDuuSCuJAevKibATLHvgjqes25N7JmRhtBI19ZdJYonReTDu05k8JKkDdUOtUMCEmt1FpQCGycTMjZoe/tCXJiwWwbtWsuDR5M5YRB79UpVUx3mqZYGnNjtxV06ytvf9ABagban8dRBBT+5IKu5x9G9kn0V/acjTJTp/eanl2U8yKuc1MImkfSqtivNUywdKag6xvyVpySgUVoG6oPSq4SFW8g4WZECxvjUf7cXi7aPhLWxJev7CVs8QSQGFqssBxiVaFcET8IKm/WiZYWrOhtRLrtjzVQQWoG0KEtuYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFX6Q0n0kGym0qM1Nw3Sz+OT3KaqIAv0DBCo0F6jwg0Szzlm74f626qZnyyuiC74sHutzAhWaC1T4QWKX93ajox2jm3UUVIAqBCr8HFXuy/RagQpQhUCFnyNQ4ZUCFZoLVHipoujTi5qebmgfBfZjddXR2fsSE0Pj0wZBF59YDryeq9ytrC1if1snW/NXX+sku1GR+yuJPja2P84y53Chp13u3GsDKoSF9a7rRzgPo5RTLHcbSJ4jkecbQ4VyWPlNGnN40xfGK78tUKG5QIWXivdEoRUsvOg2LzZCcSvo3Tq3I62YiePYbCJD/OCaF6uNvwu1F/vb9i3MXyUnmqUytHRm92lbbptlXFrTE1AhLGxx3SDCeRCl3FxJkJVoWtGCHjlU3oKGHPjp5Qvjld8WqNBcoMJLRatnOJAOt9iyfGXP1cCszj968TVsLY85ZCdtn3Lkd7SqdmuNkF7s7wsq6HTplvZzoIW2smOt2+eSo4CedF3ccYfhLCUqUcEvrLtuGOHcj1IusUXTnd08O5PUlVSgZMnxpfHKbwtUaC5Q4aUq9or0toY0UXh4lzU/ZLep3VsLCllZH4fxfr3Y3xdUyGUHKbnWWk7k6lexb23m71JSVVh33TDC+SGICbQ1X+jInDnKdaupIF2iV8Yrvy1QoblAhZfK1sZ9WPu2LsBX5gXnMrV7X2ztRuAoxVz2Yn9fUOFszlhLNgUVKva4L20ueVlYe91ShHMvMNjZ7neZFWGFXDZlKmT21NfFK78tUKG5QIWXyla0tdmq+nSIaSBOH2ZU647+LgKmdrvNTbcmpnfg7ejF/r6gglzrxJuYJSYYoApqLOu8j8nGcJUK6+C6pailKggYxLHHJS9XzmoqOGS8Ll75bYEKzQUqvFS2DknVOkVmnkFCdOUlj+NGVPBif1+hAhk1eWPCogR+5U9yVeyfWkmFbWMqOG2bU+F18cpvC1RoLlDhpSqa35w7BrvEfcg9c38A0ZAKRezvq32FXVZE9rmgQq6y8+fNEYQdudRTwe+BNKXC6+KV3xao0FygwksVDNXXfvNNdsP9Mdj+2dS/Q2FXoPMvqWBjf1+hQhxsbcafbqwFoNj5rIFdQa5binDuRSkPrRX723YFc/CV8cpvC1RoLlDhpbJbknItNlXD7jx4Vvkm2P7Z1G63X6lsQVpFBfnQ+jzEZSr4CcwUoJktWDuUZFVU8ApbZBNGOPeilIczG7bYB+vFZIOcBtd5Zbzy2wIVmgtUeKmMC8CBK9SJHQmSzFYmsjL4Y2pTYVOZ+E8lUZkKXuzvT3ZmSncqpMKBh+15LC6HtuWmmYski6kqnyRRBRW8whbXvYhw7qKUH8wcwomwkYo/w8GZTaiI56h0nVfGK78tUKG5QIWXStczdkWUbncmrnxRUX2DCUPbjCeROCLKNiNlKnixv01Q8FNIBU0VnhfgqQjz6TESC+SJo4xTQPK8sq/gFba4buAN6UcpJ4/JnJ0b6cBJSnOIpRzyZbN96TovjFd+W6BCc4EKL5WukxS42yxpkCUMyU65mUV/AFEEDz9ySG+zvGAXNqVB7G/OO/k06yBMtiepzseMc7frIHSWkaw44LUH541Zn+CN6cPCetf1I5yHUco37Fm9kZJuaRHF+XNnr0hxzzUPStd5Xbzy2wIVmgtUeKlu2tfTl1jfU8uWu8frP3SxY0sCFZoLVHipbla0UzEz0KK21o1wf69tH1SARKDCS3WzomWhL3NLSsySg+3FTsd1AhUgEajwUt2qaIl6TdhTMmKyPe9Qf24gUAESgQov1a14x27FUNs6UVgUG7TlDv3Q4MwtCVRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAheYCFaBuCFRoLlAB6oZAhea6QoX/6X/+X363/vK//m9Qp/R3/vfvLsGfo/+jmgr/5/81+936v/+f7y4B9LX6f//Wd5fgD9L/99qeOgRBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBEARBENRRqcV3lwCCforGg+8uwSs1WU3VfNTkTFAB6qSWSms6Cx7/sVLfVZw6TdXg6TxW+vvO382bxXCqpsMi03elhvrPSBE2SlSYKfXh3oymqrYs49VcqVlP3ky8N8EBfdHpj/3BoS5KqeVsph/RlffZQE2/rTw1UmrcQh4D93qlK6eu7FP7yUhN1eztChUIoCMvZV1ZFvTjanhwLoMpwUipfvnA20gXAFSAfpDk0dYtZK/21J+gdqhQvB72J1xhZ+b9TPXp9UJxnVeLuX9BXZddZ2Gi5rO6svRXmiGTpZpOOGcC74K5EhxYTPU1QQXoB8k89SvuN79Mk3dqGl1fuq/HLfMVN7vjIR2gRvPdFEH+DvS/H9yyjld89uRNGmslXXydUDfxq8EDhbmsgu/2o55ajf2+gv63r7yEC9eLelf9WiqIBvwTDwQBGg4f4YG32XJQUSQI+j4ZKnALuVID3XCtdJWY02eT/txU2LcBjb6lGpOtTs0GLoN33f+dU4urkw0nM+6M8xB66NWZOXWZ56bLrBtJ3W2X9lm3nfPZkgvRNw22/NWVU1d7/XJBZg99jaW+BP+dzbxO+NTr4gyKq5YL+fbuOOSBxckaUibz6WRcGkGMi0GDLubSDirmaiRUcFcdy69Gto/J5U/cN2O0d9ctsb/9+K0KVBD0ffKpoDu5ar6cmUpCPVxTYXUT+dEfSoWfq1X/Y2mNdW9LqbNSkZdLNZuOqUe+6ut6WYzKBRsf0tKu1JIq2qJPlU9RTiOqr2UqKLWajAaaOlTA0ZRPdCOIsZqO+dypq4E9Q57xZSEth+gLcGkZLIXeTRegr4tcpsIooMLC8GSs/zIVvKsaS2hPLYPMB2zHmEn5fUvuoDBwgArQT5KpZtyxnRmjozy5K26eqcJOplOuxlRf3j0zPGlKVV+e77G12s3YSDGYTsM2U4/F6bSRN1RfeS3nBRWC9vxD3tq0MyX1elmgpz+kQg7pvHIhP5hDk5W05pdVcCiZD+jKt6kwmcrbof6KTAXvqiu56kq9B5kLcuxwY1Bc/b0w6oIK0E+SVLM+G8FmppVjKkwKe/u7ec7nPMz+qMiFOTA2JsuBqc+ri+l+2/FwH8y9GnRBhYAp5qihgivchwpbfeqwvF0UcmpSyd+LKjh2aBwUVOAzL6igv1SfD8+Lim6vaoYQUxX4QuiL9t+8k93VzYHwQwj6AeKBupkksw0wU2FcdIT1yKJPmusnW3fd3y9z6bNZ0DzbugLz6TOvxk4Wqxn13T37gVx97OVRooI9MOjPaPLUp8KYRgGz4uPgC72VC+lG/EMuUbkKTszMwoL/CBVo4nFcRQXJi7+vb23kPOcypAhLtJLf8ZIKK2+kASpAP0lsezPzAQEVPLPYTFkN2F4//fBbw7EFQEEFK1c1F1Pzyf1UmNirl6hg5fUVRgtdFE4XFtJ9lX4lFUz1nMiIZ3zBmbC0c+oQTaVrNQ6v+kEDsFIPSfeMzG9bGkHYAybna9eEoK+XXy8DKvR9KvhTcKPVtPD6cfU9oEKpV0+mhOHAXuxOKqzUdDEpjyCqvC8dPi4K2b9JBbGfUDWdU++DzKdXZmn54jRxumD7C/8s/lVHNDYKZyAWthTFbzsPD5icq68IQd+hq1QIRhChgcCa7fhUU2cDKqzeQvVNXqZazd0Bf57iChWMsSKkwqjC23hmyVNRSPNVhtx7Catg31bPRdH/uOLayRfXlzZzkvxvcNWl6vUCI+nY+i/qfoSYOoxXRnHA5Fx9RQj6Dl2lwqiwNn5UDt5Zpl8QUKGnypMPpkpPjD+Psf31qZpKzouBo8VkWqbC2CuDLe78oj9iy1RUMPfKfpWJzB0GVTBss9/qRxC6zIY3TIXgqu9qFQwgBgX1FoZRMkM5mIagBRWgn6SrVKBWkGYmPwbWq+BtQbOXdErPNcNi7R9MfSroKsueiGPXakrVGyyNMx/PEw6WPA3IOfdNI/wuJwVUmHPPo2/sCtbleGGKNF45AMmkxYrSlQqpKzLPTM4sWYqvfwGFeir0rMHEUMFdlbA39adj/bo/mfL3eGdilqEAKkA/StepwMt5rBeT+CoNqYLxh/ah1g3/qq9H5gEVBlPjNORypqquB+wyMziaypIkyuODfBvnMrL/oPkQNX0PqdCjM6bKTDZoOiwJJ1QPpzx54kx2QzXv9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  3.  How To Modify Display Scale Settings In Home Windows Eleven
  4.  Scale and scale factor are mostly used in blueprints which would possibly be used for the development of buildings. You have to be wondering what does scaling imply in Math? We need to draw its blueprint first to arrange the furniture, like bed, nightstands, and so forth. In the above example of scaling, the two rectangles are similar because their primary shapes are the same even when one is smaller and the opposite is larger. After you full the steps, the system will apply the setting you specified. The scale factor may be calculated if the size of the unique figure and the dimensions of the increased or decreased figures are known.
  5. You can all the time revert the modifications utilizing the identical instructions outlined above, but in step four, click on the "Turn off custom scaling and sign out" choice.
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  8. In the above instance of scaling, the two rectangles are similar as a outcome of their primary shapes are the identical even if one is smaller and the opposite is larger. Once you full the steps, the screen will flash a "Please wait" message to apply the new text measurement. After you complete the steps, the system will apply the setting you specified. You shouldn't change the size settings utilizing customized values as a result of it affects the viewing expertise. However, if it is necessary, and also you do it correctly, it could allow you to hit that candy spot. For example, we now have to construct a bed room of measurement one hundred eighty inches by 168 inches.
  9. Scaling is used when the dimensions of any geometrical figure or shape or an object could be modified with respect to its unique size. When things are too giant, we use scale elements to calculate smaller measurements. When issues are too small, we use scale components to calculate greater measurements. Scale issue, on the opposite hand, is a number that is used to increase or decrease the size of a determine.
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  12. The scale factor can be calculated if the size of the original figure and the scale of the increased or decreased figures are identified. You have to be wondering what does scaling imply in Math? Scaling is a procedure through which we draw an object that's proportional to the actual measurement of the thing. Scaling in geometry means that we are both enlarging or shrinking figures in order that they keep their basic form. When we scale figures, they're generally identified as related figures. For example, if you do not have good eyesight, making the elements larger on the display screen might make issues simpler to see and use, avoiding stressing your eyes.
  13. Although it isn't required, you could need to restart the computer to ensure the setting applies appropriately for all supported purposes. For instance, we now have to attract a butterfly on a chunk of paper in order to study its parts. Since the butterfly is small in dimension, we would prefer to scale it up, as shown under.
  14. If you connect an exterior monitor, using a custom scale setting may help enhance the dimensions of the text, icons, and menus throughout the displays. Changing the display scale can also enhance content material visibility whereas showing a PowerPoint presentation on a projector. Scale is the ratio to represent the relation between the scale of a model or scaled figure and the corresponding dimensions of the actual determine or an object.
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  16. We want to attract its blueprint first to arrange the furnishings, like bed, nightstands, and so on. So, we'll scale down the bed room to fifteen inches by 14 inches. If you want to make the text more readable, you ought to not regulate the size settings. If the system isn't scaling parts appropriately, repeat the steps to pick out a special value to extend or decrease the scaling worth until you attain the correct configuration.
  17. In this how-to information, I will clarify how to change the dimensions settings on a desktop monitor or laptop computer display. If components are too small and text too exhausting to read, you in all probability need to adjust the size settings. Find comparable words to scaling using the buttons beneath. All content on this web site, together with dictionary, thesaurus, literature, geography, and different reference information is for informational purposes solely. This data should not be thought of complete, up to date, and isn't meant to be used instead of a visit, consultation, or advice of a authorized, medical, or any other skilled.
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