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[/img]Les pyramides régulières seront de hauteur h et de base un polygone régulier à n côtés inscrit dans un cercle de rayon 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[/img][br][br][img]data:image/png;base64,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[/img] [b]Création du pied de la hauteur de la pyramide et des sommets de sa base[/b][br][table][tr][td]Penser se mettre systématiquement [b]en mode souris[/b] [img]data:image/png;base64,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[/img] entre deux actions [br][b]Bouger les points ![/b][br][br]1. Placer un point H(0,0) en écrivant dans la barre de saisie « H=(0,0) »[br]2. Fixer H (clic droit + Propriétés et sélectionner [img width=106,height=21]data:image/png;base64,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[/img])[br]3. Tracer un cercle de centre H et de rayon r en saisissant « cercle(H,r) » [br]4. Placer un point libre, nommé A, sur ce cercle [br]5. Tracer un angle de mesure donnée à l’aide de l’icône  [img width=32,height=32]data:image/png;base64,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[/img] puis clic A, clic H et saisir l’angle « 360°/n » puis OK[br]6. Renommer le nouveau point B (clic droit « Renommer »)[br]7. Créer un polygone régulier à n côtés en cliquant sur [img width=32,height=32]data:image/png;base64,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[/img] puis clic A, clic B et saisir « n » et clic 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dkyt/m9LGwkPZBFHiPEtgVEFJCT/lCBcs++Priw7v3eEX5vC9fvsI7Ylz7TAxsnz75wf+rvwA2RwyK7exYdWhj/zt2IWL5v/mb8woY6FZW6QXzMhdHy05Rh9myZkWmLJlEKR3r9OkT2vwUd50EdhW+Ugb28+cvRG6Al9cjSlr3Js77t/ge+F3EGnFQnRWBL0OGDEgf/Z0mTRqY0wjNlftMzUxFLBKHaXCxM10a1TmEOiwsTMQlcYYYMz18o1mB78nJ8X5+fhTa8VF8PtG/mV+fzzUxNqEk+UxEgZIbBQoUQK5cOcXHJksWFfZYu24lgT0R74tZjB8RKSxzXN6+c0dw279+/UrEE/GImzNnTvrkEhTf2bJmQxYqXGZJ5gf/zcTYOBFP/vlSJp4NoJRKDtZ7S8r1mqoDviQ+febLf/rUW5TE5DZlzJgJhQoVEllmBQsWgF3evBqbQqcy4cS6kQT2BEiVizdcu3Yd589fwJ3btwXQLCnePx9FgxYl1oU8ufMgd57cwowwo9E6uQ5WAt+PvvB5+gzePk9x985dPHz4QJhRPMsUKlwYlStXEkn0+fPZJVcz1fZcCewKitqXzIQ7t+/i3PnzVDvqssjZZRu5dOkyKE1gKUAjpW22bBo9UnIGGq8dHj7wws1bt6gfV8RMlJaY3kqVKk0EWBVRqnTJFBvZKoE9HrDfvHUbZ86cpVH8PF68eA5TKgdfjMyAqlWqoGSpEhqdhhafHr97/x7Xr90gTv4LNFNdI3PnCzJnzoIKFSqgRo3qKFe2THy30Kq/S2D/w+u6cvUaDh06jNOnTiEkNIQWeQVRiab8cmXLCnv312IMWvXW42jsI2KWuHH9Bs6ePYc7d26LMypVqowG9R1QvkL5nwrGaWtfUyTYyVVNrr1IqgPFicCgzCtdWhDK3Ht/O3iav3T5igD52bNnBCdO5cpVUN/BASVLliCPiVl8t9D6v4eGhonF9tGjx3DC0xPBIcHE8VmeQF+flL2iShfW6hZWigT7s+cROHQgFFmz6pIbDgiPiEKNmobImEE3TvmyV+XsmXPYf+CAoBLhhJVq1asLmr+UNpUrAzAuJnf48BF4HD8uFuFs1zds0AA1a9bQ6LXJn/qYIsH+6HE47twKpyRxmXtv184Q5LEjYqdi+r/J4QEVPtu8aQtOnjwBYyNj1K5TB/Xq2aNE8WLK4CJFn/uQ9gyOHDmKI0eP4At5cti8adu2DcqWKa1V/U6RYOeR/eB+Gtmz6QpTJigQxHdjRF6HH6YM15Hau88d27dvF5s09vb10LxFcxQme1w64pYAlxDdv/8A3PftE7u9TZo2RcuWzbVmoypFgt37KdneF8OE6RJBJsytG+FEw62DqtWYgzAKnp6nsGnzZnIl3iLPSgl0aN+epubqEsYVlACXD92yZSsuXDgvNs1Yfvb2dVVm2ty5G07FMCJQvz7XCFCwUQqcliLB/qsZc/ZMKJG2RqFCpe9YtGgZLUAPCd9y6zZtqHR9Q1hRXIl0KCeBwKAgYc8z6F8RbWK1atXRoUP7RFOZMxmd+74Qumck7B0MkM/ud9NTuZb+ODtFgj22GUNrTwQHRaFBQyPs3rsWixcuhUP9Bmjfvh0K5M+XULlJ10VLgHeTd+7cTUxy7jAjb1WXLl3QvFlTEaSWkOM5maB374QjQ0ZdfPSNhEMDrrmbkDv9fk2KBLvc9SgPItTTC8G1q6exddtOKqrQBE2aNFKN9KS7xEiA/fNL//c/Ck14iqZNm6Fz507ITIFoyh4eHqHikuLF9XHwYCjs6xnSfeL2oil77xQJdrkQfJ554/CRIwT06xSjYonefXpLC1BlEaLE+Rx8tnr1WjITD9LGWyH079+PQilKKnyHoOAobNsSAh3CtqWFDoVER9L+hh6qVFWN4Z5iwP7lqx8tQtNABzIb78iRY1RefjF8Key2Xbv26NSpg2SbKwy7hJ8YRAzPu3fvwToiytUh+6Nr165oQV4uAwWqtFy9GiYWpmxyGhjowOdZOC6cCycv2c+etIS2TuvB7uFxDOs37Mb7998pfNaQpr3yFAOug40bN9HOaQb06tlTKniWUHQk4jomyl26dBmePHlMYG+J7t27xptN9YSAzgUas2eX2fvMhn6H7PdstDmYPn3iTRmtBvu27Vvg6rwLxYr9ixw5ClDmjx9t96+jbKCtaEVMw/3+7Ye8FGorHckjAa6n+7//raDQgyPk2q2FAQP6JWtEpdaC/fWb52jfbhTV8JlKFUAyUTYPp6mRF51Gg61bB8HRpTGaNm6aPG9ZemqMBLi27rL/LSePzQ4RbjB06BDkzpUzWSSktWDft28H5s71gkO9IZSu9kN2RkY6uHnnLPTeT0TnemURCT3oGhhCV98QegbkxqKkBX0DY+jRt4GhMfSNTMTHgD8mJnSePtmadA19dOjf/K1H5XXEvynpWY8++nQ/Pf7wvehv0vF3CXASyfoNG7Bu3TrkyZMXo8eMRn67vHj/4ZVILeS8WRNjiyQXo9aCfffubVi8+Bnq1hnwG9hv37+E15710NouA8Ko1k/cFf10REQkpTlHCzk66ZkWVTqUL8o5ozo0VTD49Qz4m3JCKS9Uj7b09MiwZMXRoyrgeoYmAvS6uqQMrFRCEehnVi5WBvrokVLpGcgUSp+u0TeiXFOKixf35Gfwh5VLj37m57FicQ6qLrEKMLMAP4uea0CxO6xw2nrs2LkLK1euIkeCOdKkTY9nPuEICY4g/3w42raric6d/qGuJd42/5N8tBbsr177kIfFEZUqzKDdUHMyY0hMJCfCDHbumoC+HdOjXvVqRFURhEgKfQyjUNWIUEpGDg1GGH0iwvjnEPqmD00NEeEhiAwLpXPDZJ8IorPgn/lc8aHf0c/iXHpYJH/ovkx5EUmUF5G89UchwZwgzf8Je0oc9FPMv8WPP/SL/6lDICcFiwG9vkzBdIk2Q4+VSygQK5kM8Dwz6ZEiCUURs9UPBdPjGStaoVgJDegjZi1SLFYYHVIU8Rx+hvg3feg+YpaSf5MiG+jLFJQVMjbLgSqUzJ0iSwf2G478+YdT6HAzGFNiuK/vS5w+M5dcw8XRt09fVTwmzntoLdjfEiVFxw7t8OpFBtjXd4SNTS7KtPmEUydWo0jhl1gw241GVRPBvRIzeCspRgZwRDgrAgE6gkHNSsDf0T/Tv6Oo6Bp/+FwGOhdhiwgJEQoVHhIkFCqcFSq2cglFIeWSKxZ/0+8iwvkamXJFCqWSKZfsb6x89DzxbHoWzVhRrFykSEKZxDcrE/8uUq5nQrfE//iPPGvRBMYKJgN89LcAOpt7sZRLmGmG0BGKwEoRrVh6shmLlUo2u7FCGctmLUNTGBibymY6mqWY80Y2W8lMQWNiUdh35Di279eBfZ1+YoCiLoj4l48fv5JzYRRWrZ5AObxJkw+rlWDn/M/JU6bhPmXzlyhVFPeveeH1sy9Il9mS4inKoUfXzjCjUSk0kWUrZcBg84ZBIvtmtPB/4pu/ov8tQ5f4RbRuRZtHMVvdP+95/6CIkf2eAcqAFjOKmCkI2KxY9OGkkiihTLE/DO5IUqRQhDN9BilJePRMJVMunqn4m+/3Y8aKovuz8vAMFxEmuy6Sr2Mlk89cQvnouXSeUC5WqnCZEokPz16sPOI7WrmiJzOZ4sWIQsxavAbSI8Ab6utgu08ostfYhXy5iwuwyw92Lhw9NhujRpWCg0MDJYclxU7XOrB//vIF06fPxKlTJ9Grd29069IZV3YshrvreNQb44zKbfsh8NPHRANdMfGp9iyR6he9jvhZuYS9E610MqWSnRZrvRGjeNFKJ/4cfR7/6pcAE54lIgj4rFBCmSJlM4ZshuJvBnW0cvGswYCn88OEYtFsxTOXUCaegeibZ8BYZqBQFFYsvj/PajTL6UYEY9XRezDMNQ3Fi1SKWWvJBhUG+xRMnFgdtWrVUa1go++mVWBnN9as2XMo2u4Q/vmnM/r27S1yQS9umo+rS6egyojpKFizGcWvBySJsFLSTX+dlWKUK1qJZDNWbMX5ZRaLNcPJLolWrBilipnixKzEpqCJiSGtp3Zg1tyraNhoOtF5gBSNzRgdqq7ujdfv5mHFCleiIFE+pkaRd6M1YA8jYS1YsAjbtm6h7eOWGPzfoJj46bPrZuLqipmoPmIGCtRogpCg74r0XTpHjRJgHWCPFdk+cJkyE54nI1GmfBdYpsmAZ97XKbHdBY2bFcO8uQuSLM9Va8DObqs5c+agatVqZNeN+Gnr+fSqKbi+Zh5qjpqDfFUbkDtLArsacazUowzIAxSFCOxx34eNy1bA750vKlHItb65KSXZ3KZUytbo3btnkrA3aAXYOTNmwvgJlGaXDS4uTr8VHD6xxBF3ti5HjTFzYVexLoGd8vCkQ2MlwEFhJqbGODStH15cOo8OS9xhnLUAxlMF9atXr4hK6nXq1FJ5+zUe7EzkM378RLx4/hxuk93iTPI9Nm8kHu7dgppj5yF32ZoIDZHArnKkqPCGvGHHXqRT84bj06N7qO+2HjYFS+H+w4eYNNFR2P+OTpNQiAhZVXloNNjZTp9CLsYjRw7jv//+Q5vWreLs+6FpA+F93B21xi5AzlJVCOxBqpSRdC8VS4CzmEJpXeU5ezD8Xz5Hg8nrkcVOxuZw/LgnJk+eTDR8pWmQG4u0FLatqkOjwb59xy6Kf5lDftf6GDtm1B9Tvdyde+Dl+ZOoPXYhbIuXJ7AHq0o+0n2SQAIcXxT87Qs8ZgxEkN9HAvtGZMolG8WZw2fZsuXYtGkjpU52iPG4qaIZGgt2ttPHjxsPWwoScnZ2/M1Ol3ee/cL7HDvj3fUrqD1+CbIWLEn+WwnsqgBHUt2Dd1MDv3yEB9nsYZS43dBtI6xt88Q8jos4uLlNoQyzqxgzZgzq1q2tkqZoJNh544jt9MePHsHVzfWvrFzhtJ2+Z3x7fPK6j7oTlyFD7sJis0M6NFcCHCka4Pcex6f0FZtJDVw3wSpL9p8aLLffDckZP4XWatltbRPdIY0E+6bNW8invgA9evRAzx7d/9pJ9qnvHdNW2H72k5bDyjavWPxIh+ZKgEOk/d+/wjG3PjCgGlGNaWS3sP69Isju3Xsxb/48kek0aGD/RHdI48D+mEqzDB82nNKwrDFt2hRB6P+3I/ibP3aPbIlA4k93cFyJNJltKfgrVtBFokUk3UDVEmCwf337AkddesGE3m8T1y0wTfM7dw/vmDu7uOLWzZtwcnZChfLlEtUUjQI7x2i4TZ5KK/JjFCMxCXVq14y3c4H+X7B7WFOEBgaivtNamKWzpi1oYjOVDo2VAIcbf379FEece8IyW3Y0dd0MI1PzONvL1OGMBS6PM2HCuER5ZzQK7CdOnCL/qiMFAtXG2LGjFcpI//bZD7uGNCZBERGSy3oSmoUIbJIOzZUAZ4j5vSCyVMeesMqbH01dNoow4T8dS5b+D5s3b8LAAQPRunXLBHdMY8DOlebGjBlHgfwfMHPWTOSj4laKHN8++WLHINpupiSABs7rRAw7x5RLh+ZKwJDA7vvcC0cmdEfGIsXRxG0ThQf8OUOJ+WjYYRFMNB2TabGaJ3euBHVOY8C+bsNGLF2yBP8SI8A/xPGi6OFPq/qd/R1glCYtHCatlsCuqOCS8TwG+/un93BkYk/YlCqHxk7EMfMjwD/Olh08eBgzZ84UzMGDBg1IUOyMRoCds44GDx4KU1NT6tB0pLeyUvhV+H98h+3/1oNphoyoN36FyPmMO+dU4VtKJyaxBAzJZHn78BaOOfdGtnJV0XDiqh+h+X949neqBO7k7EL1ZR9iytQpCQol0Aiwb9y0mZKnF2PIkCFo1bKFUqL+/P41dhDYeaFjP2aZyNuUwK6UCNV+siGl8L26cwUebv2Qo2odNBi7VKE2HPc4galTpqBZ8+YY0P9fha6JfVKyg/39h/cYOmyEKO0ya9aMeF2Nv/bQ98Vj7B7YhBY6+VB7xCKRLymBXWkcqPUCBvuz62dxctpg5K7dEA4j5iv0/K/+/nBychHFjKdMmax07cNZlEoAACAASURBVNZkB/u27Tswb948YosaQKRHbRXqdOyT3jy6jX1DWyNj4WKoOXSuiJ+RwK60GNV6AYPd++JxnJ41Evkatkbd/6Yr/PzDh49SWuZ0tGnblpgIeil8HZ+YrGD/6OeH4cNHilX2nDmzEkSN9uLOJRwY1RFZSlPtzoHTBd+LBHalMKD2kxnsXqcP4PyCCSjYrBNq9XNRuA0cSjJpkpMoW8+juzL0hskK9l3E9jpr1iyRON21MxPkKH/4XDuNg2O7InulGqje303cIJIZMaVDYyXAYL/vsRsXlzijWNveqNZzrFJt3X/gEGYTbjp26oge3bspfG2ygZ23gkeOGi0opXlUz5Y1q8KNjn3i4/PHcGRSL+Sp3QBVek0S1A4S2BMkSrVdxGC/c2QrrvxvCkp2GYTK/wxT6tl+nz7RbuokfPX/imnkmVEUO8kG9ouXLlOM+lixsk5MkM/DU/vJhdUP+cn2q9h1tIxrJTYDl1JilE5WhwQY7Df3r8O11bNQrtdolCf6E2UP9uCtIiq9YcOGUb1aB4UuTzawzyemgN27d4mslIpULjyhx91ju+DpNgiFW3VB+Y5DiGWLCIEkKyah4lTLdQz2a3tW4Oa6Bag0wBGlm/89sjWuRt178JByVcdSZY5SGDN6FNFxxE8wmyxg59AA3kSysLTA9GlTkcbSMsFCvnVoK05OHYrinfqiXOv+xDIV/INmMcF3lS5MSgkw2K/sWILbm5ag2rDpKN6gvdKP47LzLq5uuEescBxCoEgxuGQBO+cZOrs4ozvFqyd0YSqXzg339Tg1YwTK9hqBkk17EoHpdwnsSkNHvRcw2C9tmU+MECtQc/RcFLVPWHDX/v0HMXv2bPTp2wdt27SOtxPJAnYnZ1dcOH8ec+bNQcH8+eNt5N9OuLZ7Nflrx6DigIko0agTggO/Jep+0sVJKwEOgWF24QvrZ+H+rrWoPWExCtXkqFXlDy5LOXr0WCpGkQVOjpNgYRF3mLD8zmoH+1OfZyIsoECBgnChgHxFbK2/ieHy9mU4N28SKv3nhGIO7YkNLGWBnRnoUtISRAZ2U5xfO5XoTzahruMy5K9aX3mkR18xY+ZsqlhOlgJhqWyZ0n+9j9rBzr51ZvbibKSmTROm0bF7dHHLYlxY6IwqQ11RpG6bFAN2poszInpoHQp9DY8MQ2gKidFnsHPlk7MrXfH48E7Uc1oBu0p1Ewz2kydP0+bSFKpW3jreFE61gp1dgs5kwly7dpUoMuYmOC45tmTOb5yHS0RqWm3YVBSq3TxF8Dzq0y4w08Sd8TqP+28foHGJRsiaNjMCU0AiueB8JCU+s9wJPp4HYO+8AnnLJ5z9i0m02JThsqCutA78mymjVrBz9TT2wthSprirq7NKCCzPrJmGa6vmEKnpTBSo3ljreR4NmMucwH74jgc2Xd6Az98/oULeSuhdrRcyWlgjSMsBrytYfnVxesl4vLxwAvWcVyF3mWoJHtl5AJ06dTouXbpInP1T/lrUWa1gP336LCbRQqIz1bdnXnVVHJ5LJuHu1pWoPnIW8lWpp9U8jwx0Jn7ee2M/tlwleglzK9ha5cCN59dQOmdZ9KnWG1amaRBEewnaeshjl04tHIV3Ny7DwXU1chSvlKju7N3rLtgo+vfvj+bN/1whUa1gX75iJTbTzhcH35cvVzZRHZRffHTuSHi5b0GNkXOQp0JtreV5NCKzJZzSCXde3Y0d17YhY5pM6FyhK3JmyIHNl7fgtNdJVLGrjp7VeiCNsTmCtRTwMp7HEJycNwIfve5R3vAaZCuSOCzwBtP4ceNQvnwFjBg+9I/McWoDO28CjJ8wEc+JoJRjYWzIXaSK49C0AXjqcQA1yF+bq3Q1LeR5jBIL0VCqUrHl0jbsu7UbOa1zoUOFTshuZSsiOANDA7HlyhZcfnoRdQrVQ7cqXWFCNY5CtJBFgUOwmWX5xKzB+PrShwiSiNQ0f/FEQYEjIceNm4BwksdkItWyTp8+zvupDeyv37yh3MHByEuJ1GyvK1LLXhEJuBMdwyuy/WqNWUA8jxW0jueRQRtIu77rz2/E4bsHUNCmENqX74hMlhkRTL/nw4jO+RLojw0X1+Puq9toUrwFOlRsCz3y1ITFkVzOwXCxCsyIe3AFP/bsyP8myh6xa0QeRxRPDqgi70KRc2Q8j1+J53EA8Tz6EtiJ5zFPQUUu/eM5zCYxZ+58nD17hijNXVC0SOHkBTvXsmfebWXDMv8mhUh6qfsmEM/jzcuoM24JshQsQVXqtIf6zoT4U74GBWDt+fXwvH8UJXKURvty7ZDWLB2CqYxl7DqSRnSuX4Af1l9cB6+3XmhVqg1alW0uihH9CHyLEonI5pYZoGskixUJIqqRsIhQWKTLTJXrdChQDvj+5QOVeKGSkRYWVBgsAt+++MroR9QAeBnPox88phPP4/fvaEikptbE4pbYg9nDFi1ahMG0h9OoYdx+e7WN7Nu378TCRQsxkUyZ2gqQHynSeeZ53DuhA/we3tM6nkdz8jW/8ffF6vNrcOHxWZTPUwFtyrSBBVV6DiKzxZBqkZqZmFEhNGI3o9E3hOxcQxrh3355iy2XN+PN1zdoX7YTaheqjojoEpE8UltaZcTpR+dw8p4HcqbPjRblW8Dc1BLHbh/FpcfnUChrUTQr1xzvvrzDwWv7kS9bAVTMUw7B/p+jlebnqn6KvAdlzhE8j0R/4jGlj5hlGk3eTFUOf+Z5VOZ+8nOZTMnJyQmNGzdGn95xZzCpDeyz58zD0SNHMGvO7L+6h5TpaChVbts7ujXZfsTz6LgCVlnzEPWd5nsqzGlU9fF7iZVnKPLvxQ1aeFZFqzItYUo7i0FUrtHCNC3VDLXA/TcPkYFGaSM9IxgT0K3TmSMkMJwWp5H4HPwFFuYmsDa1hk64Lr7RqG9qYonbH7yw8NBMdKrWE3ee3YS5sSVK25XBSo8laFm+HfZe2YFGpVsI+9b/22e8/foOrSq2QToYkUKR2ZTEo7s+9cP/41scc+1FxYiN0chtCyytMyvz2uM898XLlxg5cjTs7OyoSsu4OHfm1QL2IEq7Y5IbTq6ePXMGMmbMmOjO8Q1CKA5m14jmCProSztxa2CZMauoJarJhzlxpni998ayU0vx6N0j1CpYB81KNRWL1BBSVEMyV6yssmAWATaMCgPz7x6/u4dZnZbD+6YNihfXx5OAk7BJkxc+tzIjR74I6Ji/RFaTLDAmsG8+twHXX1zFzH/mwvudN+bTfTJYZCYXZnZ0qdUNh64fws1n19CiQhscuLoPuTPnhX2xOoj4FkAzRNIHJgieR2KEOOrSA8Zp06Hp5K3E86g4dcqf3i3TXDs6OiMgIID87pPjTNxXC9gZ5IMGDUF24lpnslJR71MFR1CAP3YNa4Kwb99Q33WDEJom8zyye/Hhu8dYfmY53nx+TZ4Ve9Qv6iCYFcK4ZiiZIxnSZsJd3ydYfWIJVvffTKbHJaw+uQgurRdg3f8M0aS5ATLlfk+juRmWzTdCHXsd5Mr3DV8/f0UmM2t8DKfymfunIEvarPga+BmvPj2HtWUmFMtaEp1rdcWJO57Yd20n5nRdJDbg9KnadRCRwwoyWBW9l7+9Wjmp6WHH7rDIYoOmblthZG6RaDTwmoOth4sXL1Lor3OcvDJqAbvXo8f4b9B/qOfggCGDByW6Y/IbBBGp6Y7BDSlhI0Ks6o3NzDWW55EVnD9LT63AkTsHUaNATfxTqbOwW0OjTS+m7cucPhsukWmz5+p2LO65Al6vvbCFFrDDGozH8qVRyGyjgxy2uggha+30qXA0a00Kku0zHhKdXBQV4y1ZsAItYB+RmRKG7wTmMw9OwNzIElnTZRNgP3LjEC57k7Og6Th8++z7Y3GrBqDze2NS0y9vfHB4QjekzZWHRvYtVAr+zzyPyoBl7foN2LxxE7m4x6NK5d83qtQC9vMXLoqFaZeuXZWitouvo4FfP2P7AAfoEldMfWcmNTXTWLBzXwxpZH9AQFx6agkCgv3RpnR7lM1dmkyVEFEenUf2tBbp8J1qhTrtHIsutGN67wVRhVzbghV9d2LvRiv6C2BDgA8mp9ODe5Ho0Yu8LhaPMXfvTFTOUx2VitbAdHdX9K49AO5X94gd2OK5S2CV51K0q/QPdlzagtpF6qF+sfrw//ROLaN57PdoQIxtfi+fCLBb5y+EJi6biMWNqv+q4HB3P4D58+fjv8GD4/TIqAXsHGTPZKUjR4xUOF9Qkb4zg+/2/vVgaGZKPI9rYWhiqtFg5z7x4vT6iztYdGIevlOiyT+0S1oqZ8lowDOUdZA9qx1uv3mAA9cIrOmyi1iZ6gXr4eD29LBvoE97FWSnwxAL54egRm197H/khODvIehb819kssmFE/dO4uTd47Q5lRvtqnaAKSVL7L/mjsuPL6KwLXljyjdH+Fd/WhPQ9KCmEV3+PpnB96PPA8Hgm7FICTSaxGS08afUKYKHs2fPEeX5FHTo0CHOQVUtYF+zbj3WrlkjQjETSygfu9MBfh+wvZ89jNOlR70JK2FITL6aTlfNqxUzAvy5J5ex5NQiYcZ0q9QdhbMVFu5F3jvgXUY2Z8ws05FfnDaDyD8eEhxFWTlBcKivj4IF/WjzLB2WLIlEbftIfNM7CTur/CJuJoyul/nUZZIK/vJJrAcs0v8okR5Ig0QI1Z2Kj0xUEYApew6Tmr59fEfwPNqUqoBG9N54ZlbFIQ8bqF69BlVAH/jbLdUCdk6uPnjggBjdixQupIp+iXt8evMCuwY1hHmWrILnUZ8EqQ101Rz4Z0p+9uP3T9FidZkYebtX7oW8mfKIXVM2aVgJeLeRTRsa2GkLPCfu3jYlyjd9PPt0mhIgrPDtTQHkyquDzBYBCAoKQTjvhvK1JBuOLhSbo7GYFnRi/07NI7r8pTPYX929Cs8p/WFbsSbqj1umMocFux+ZdKtIkSJEfz7qt116tYB96rQZuHDhvCBEUobBKT6t+PDMC3sHN6eFTl7ieVwobD9tYQPjxSr7zvffPIJ1F1eRxySDALytVdaYMAEGPWOSeXBMjE0pNDo7rnpdwdwDs5ApnQ0mtZ0ACx1z+AfElZ0lAgJ+EWFcv4tPyqr9u+B5JGKrk9OHInetBnAYuUBlD+DY9lGjxiBTpky0wTTptxDyJAc7mxWTyP/55MkTQVya1cZGZZ17Q7TH+0a0QcZCxPM4ZI7WkZpykoa+rj72UUjvhkvrYZs+O7pW6gYbMkOiyAxhW52VN4yC6PTILrn74i7WX1mPUCqQ1qHsP6hJu6esNEnvHVfZK4Oc5/HMbNoAqt8CdQfPUNnNmU6RqfH4mDzZ9TfWiiQHeyDVueSItC8UmcZgt0r3e6GohPb2JfE87ieeR5tS5VF90Ayt5HnkGHauOsGhvVuubEYB20JoVaI5Pr76gGcvnsImcxaalovjoa83Np5n0n5dsvF7omaBqrSTyja+NkGdPFKC5/Eg8TyOV5rnMT6cMMsv10/9RIxhbm7OyJTxxzqFr01ysAfQFDuamL/CaNNi1owZ8WaAx9eh2H+X8zzmIJ7HalrM88iA56Cvndf3YsuZDXh5nHYz/aqTXW5HC9HnSJflFqyqhCBjtkzoVKYrqtlVQKAWAp3fneB59NyDi4sdUbRtH1RXkufxb/jgggWTp0zF69evCewuv1kRSQ523sYdNXqMmG5n0QLV1MREGTz/9dzHFzyoVEl34nlsqPU8j2a02fLxux/adOmPb+97I1/+BmJhygO395Mz+Bg2CksWT0DdknXJZRmodSN6zALVyBR3j27FpWWTBc9jFSV5Hv8GCA5L4RQ9Hx8fAXbbbNl+Oj3Jwf7p82eMGDEKJgTy2QT2xFJnxG49T4dHHfsgf+O2qNhllFbzPHJQ13GP4xgx6ibRjMhYbRnovEDlgf/B/SUYPTIt2rRqiYDvHP6rnYchLbRvHViPqytmoFyfMSjfRvkKGn/qeQhtK0+bPgNej7wo+doFuXLmUC/YmXF1GFXW4OxvzlBSVVwM9+K+x14cd+lPPI9do3ke2YbVThBYmJti6Yr/YeVKa9jlbUsL0x/9YDe016MDlF/5EGNHDsD378Fa208G+/W9K3F99VxUHuhCPI9dVfbCwsLDMWPGLNy5c4eSOJx/8/ypZWRn36eZmRltisxUWYYSS+jOkR1Ul2cgSnYegLLM80hx4Fq2Xot50Qz2vfv3YvzEZyhaePhvYL97fzm4onkPSlT/RmDXUp2mjT9TXNu5DDfWL0S1odOIxU3xyojxaQWnfk6fMRP379+nbDgX5M6VU70jO+cHss2uTxsk7I0xMVZN0A/34taBzTgxdQjK9h5BI0Qvraa+M6Th+7P/J/zTbSK+fe1DIQEVhOKyCfPyuTf53p2xbvVI5MiWi3ZaNTuM+W+gNCKwX962CLc3LqW84dkoWi9+jsb4QC7/O9vs02hP5+nTpzSyOyEHRdnGPpJ8ZGd30Nix44U3ZjbVsTQ3N1O07fGed2PfeipCNRzl+49DqSZdtRrs3FkLivG5fPUyho9dBL8P5WFsTMAOeQMTszNwdeyIerXrICBQe+117iOD/eKmuYL+pNaEBShcq1m871nRE9jNPXnyVLyiIsGc5/xrkYIkBztX2Bg3fgK+Ucw51zhNlzatom2P97wYUtOBE4n2uFOKoL6zoMHgFYVBHD1+DC+e+yKLTTrUpTTG3DntEPAtMF6ZaPIJclLT8+tm4sGe9ZRKuZiIrRqprMns5uZAsA8fPohNpcy0k6rWkZ0XDVwS5AUxrrLN/msDEtPTyzuX49zs8ag0mGrzOLRLEdR3YvQjk8bI1AQ6BrQ7Gh6F0MBgMmO013SRv2MZz6MRzq2eiseHtqPu+KXIV02xqhmK4IQ9f5ytFEY7zMzZ/uvAmuQjOzfSlXa1rl+/Lvzsv7qDFOnEn865sGUBLi10I1JTNxSu2yrFgD0xMtHka9kTp0PhEedWusDbwx32k5YTqWkdlTWZR/TRY8YhHe3Ss83+656OWsA+d94CHOFkaxrZCxUooLLOMc/j9dXzUHXoVBSs2VTreR5VJhgNvZGIxKS2nSXKwhcXPGFPDL55ytZQWWtf0c4pe/7y5ctHDGFjf9vTUQvYV65ajY0bNmIGJVuXLlVSZZ07sdRRVG+oPnwG8hHHNzNNSYfmSoCp7zhH+PSisYLrx8F5JXKUqKyyBnP651jiJqpQoQLt7Qz5bU9HLWBnApu58+YSxcEE1KmTcHriX6VybP4oIrTfTDyPs4jnsY4WUt+p7D1rxY10yY8aTkkjJ+ePgJ/XXTgQz6NtkXIqaztXYHRzc6PNt+bo3q3rb/dVC9hPnZLRkvXs1RPt2rZRWecOTR8I72PuqDmGeR6rS2BXmWST5kacgRUaFAjP2YPhH83zmCWRPI+xW3ro0BFR6KJfv35o1qxJ8oD97r37GDZ0GJo0bYr+/fqqTJL7XXrhxTlP1B5LPI/FiOeRRg3p0FwJcOZVyHd/wfP4/eMHNHQjnsfcieN5jN3bTZu3YM3qNRRSPg7Vq1dNHrAzqenAgf+hUKFCFKAjC65P7MFZPHsndsbb68RsO2EpbAqUpHABCeyJlWtSXs9gDwr4jONT/0Uo8Tw2mrIZ1tlyq+SRHNe/cOFiqq/kQe5HR5QoXix5wC6PaQ+m7VxVbSxF0kJnz7j28L1/B/Ucl8M6VyHB+y0dmisBGanpRxxz640oinRrPHUr0mb6OQw3oa3nWHaui/qGBtYpU9zizIhTi83OHZg8ZZrIQ51NXI92efIktE8x1zGp6e7RrfDFx5tW9auRjkaIcNpMkA7NlYCc1PSYS3foGRmhyZTtxHqgGirEt+/e/ZR/GlfehNrAvo5cj6tWrhSr5cqVKib6jYSSm3HXiBb49u6NsP3M02cmt5b27zImWjAafAMmNQ34+A5HnLrByDINmhLYTYnvURXH7Tt3MXHiRNSsWYtM5v5xhpKrDeyenidpmnFB79690b5d20T3LyToO3YOaSJ4URpO3kQ8j+k1mucx0R1OATdgnkf/D29weGIXmFF+KIPdWAU8jywa9sRwteu+//ZFyxbEWx/HoTawez/1oUp5g1GmTFlMmjg+0a+OGXy3D2qAcHJlMc+jCREKaTKpaaI7nAJuwGD/8u4lUd91QRrbHILn0ZA46FVxLFn6P7jvd4fjpEkoV7ZM8oKdox/H0O4WUwrzIvVPdW8U7XgwUSxvG1BPLHQauKyjESKtBHZFhZdM53EQ2OdX3jg8qTus8uRDY+cNgrIwsQdja5KjE3x9fQVLdJbMcfO9q21k5w5x3ZtDBw9SjMysP9a9UbTjgcTgu414HvUMDFDfcQ2MiLxf06nvFO1bSj2PSU0/ErHVEcceyEBcP42In1MVDL5PfZ5R4d8xlLtbIM6YGLk81Qr2gwcPU0LsNFpADESrli0S9U65esPOgY1ooWMJ+/ErNZ7BN1GdTSEXM6npu0e3cdy1L7KULIcG41aohMH3+HFPTJ8+Hf907vxXlmi1gl1ut5csWYoc/xMTlXzt9/oZ9gxuKhY6dccuE7mN0siu2VoheB7vXIHn1IHE81gd9ccsobTDxJOaLqDNpINkMTg5Of7RXmfJqBXsTHXAWUtcC3X+/Ll/tK0UeWUffB5i77CWSJM9F+qMZJ5HE60gNVWkbyn1HBnP4xmcmjEUOWvUJ57H+YlmEpbXQA2lfRfeTMpgbf1H8akV7NwKpq9evWoVrZodySdaPcHv9bXXTewf0Q7WBQoLnkde6WsLqWmCO63lFzLYn1w8jrPM8+jQHHWHzEx0j67fuEmVNiialvJzB1NVl79Rtagd7Ldu38HwYcNRp25djBo5PMGdfUE8jwdGdyLbryxqDCSeR4qok8CeYHGq5UJDYgN7dOYAzs0nnsemHVGrv2uin7ti5Sps3bKVFqij4y05qnawM90BE50+e/YM8+bN+Y2iTNHe+9B0eGhsF9gyz2M/V0H4KYFdUeklz3m8rnpAPI8XFk1Csba9Ua3nuEQ1hFl7x1AaHr93NmEyZsjw1/upHezcmu07dpHNPk+M8E2bNk5Qh59c9KTNie6C47tKr0l0j0jBYy4dmisBptG4c3QbLi11Ramu/6Fyp2GJauzJk6dF+Emr1q3+WOg39gOSBezsFx1CZbcLFCgIF2enBPE/ep05jCOTeqFAozao1G0MVcyj0oraSgeWqFeuPRcbGZvh1qGNuLxsCsr3HZsonkd+17Nnz4WHhwecCUNly5SOVxDJAnZuqIuLG9WsvEClZ2YlqOL1g5PuODqpL4q26YYKNEKEhQZpLfVdvG8phZxgRKEBN/atEaSmlQY5o0zz7gnu2XOiZhk9eiwy024pu7HT0H5LfEeygJ0bdfTocREY1rNXL3T5p1N87fzt73eP78Zxp38F7XG5tgMQGvxNArvSUlTvBQz2a7tX4PqqOag2bCpKNFb+vctbzBUYOQWPUz0VDSxMNrAzx8fgIcME4emMGdOQllh+lTluH94GD9dBKNNzKMq07Jsi2MCU6b82nstgv7JjKW6unS94Hos5JCz6lWnunJ1d4eX1kPjYp1JRNTuFxJFsYOfWsdto7dq1GENxDQ0aKMcMxaSmnlOI1LQPkZo26yWBXaHXnbwn8QL10raFuLNpGWqOnosi9i0T1KCz587D2ckZNWvVIp6YoQozQycr2J89fyHCfrNls8UUoiuzsDBXuPM33InUdCqTmo5FycbdJLArLLnkOVHO83hx4xzc37kGNSlJvnDtpko3hmmpuZTMpUuXFF6Yyh+SrGDnRixavBRbtmwW5d7r1q2tcOev7FpJO3HjUFGQmnaUqO8UllzynMhg19M3wsV10/Fw/xbUGb+ESE0bKN2YK1eviYykSpUq06bkCKU8eckO9kdUMnLw4CFkd+Un5gFnsuEVi2++sHk+Li2ZTKt6FxS1byNR3ykNG/VeION51MO5VW54etwddSYSqWlle6UawYF+06bPxOlTpyh+fRIqViiv1PXJDnZuLce579q1E04UgF+rVg2FOnBmNfE8rpmPKoPdUKh2M4n6TiGpJd9JzPPI7rLTy5zw8rwH7IkRIk+5mko16Oat2xhLnDBlSpfBuLFjYGRkqNT1GgF2rjk/fNgwFC5cBJPdXBWamk4sIZ7HbSupVMlU5KvekFyPEs+jUm9ezSfH8DwuHod3xPVTz2klcpaqonAreG9m1qw5OHb0KFGgT0DVqspzRGoE2LnHM2bOxr59exW23Y/NG4mH7ltRg0hN81SsG019R+EC8ogBUcn813LmCstWOlHFEhA8j2HM8zgSHx/cQX2X1bAtqrgZIrPVJ6FUqVIUWzUmQSVGNQbsj729RaxM+vTWIo/wb3HJ/B6Y5/Hp8f2oMWoOcpWpLswYfX09qtnEdVZ1EBwchHAqhCBqK0pHsktA8DzSOzkxZzC+PPNGfdf1yFqghELtYpItJ2cX3KUqeI6UoFGhfMLIUDUG7Nxr5upbsGABevTogZ49/r6VLHgez3qizriFyFqsHFVONoKOnhGeUz0dpsbLmcMWkSTcQOIWpJWRQkKVTko6CQiex8AAGc/jh3eC/kRRnkdmgZ5HgYMtWrTEgAH9EpzhplFg56yT8eMnUrUzb9pVnYEihQv9UfqC5/HqBcHzmLNsVfh9+oIdFE1pbGxEo3qoGNn/6dQRFsYGMrekNMInHZIVuDODPfjbV8HzGOL/FY2nb0P6rLnivZKDBseNGw8DSqznOkm/FgWL9waxTtAosHO7zp2/IHjcK1SsSPwyE+JccUdGRWLvmHb4cO8WcXyT7VeiEs0Ii2GTJTNat5Ilcq/fsAk5qcJxpfKlEECFhyWwKwML1Z+rp2eAICp9eWxyL0RQfagm03cibUabvz6IF6XzqGrL3r17MHTIUDRpkrhiYxoHdu49L1a5gxxG0LBh/d8EEkm2+K5RLfHpySM0nbkNxplzi3pNPbp3wbkkYgAADwRJREFUQ9b0aRBEo7oF0eHx8dX3jTBrpMWq6gGszB3lpKZHXXoIf3tTAnt8PI888LE7ukzZssLVqOgezJ/apZFgf/HyJYYOHS6mrqlTJ/9WvJVJTXcObwb/1y/QfNZOGFjZEBcNRcD16IbMac0RGhaO0CgdKkcZCCtLE6r2QISnkhmjDDZVfi6Tmn777Es5CN1gYGaCZgR2piz808FZSE5OVGiMTFo3V1eULFE80W3SSLBzr9zdD1Bp7umoUaOmIL6JvYEQHhKM7UMaI5AI7RtN2YIMeQqSGbMIOamisTzzaT7RK2S1sSHevyb48v6tBPZEQyVxNxCkpn7viA2sC4zTWqHN/P14+eYD1q5ZCxMTGpBots5mm03wCXE19IWLFmPPnt3o1r07ulEJe1UcGgt2ttdmRpszffr2RWdabMoPdmExz2NIwFeivlsPayqI++69LzZuIuBnsCYPDCdyRKFrl3+gjzDyAtCGkzSyqwIvCb4Hsz98ffeK2MC6wSxTZrSdfwA3bt+Hx7FjaNeuDVVNCSNw70XWrDYoXrw4ZbINFd9svigTIPi3Bmos2LnRvh8/YtIkJ3g9fCgSPSpVrCD6wt6V7QMcyDwJQX2ntWI6NCM22JBIgFfvunq6FGuTDxF03ndSCAnoCcaoyi5ksH9+5YOjTj2QJkcutJq1Bzfv3MONa9fQrWsX8Rzea9lJHjV7+7rYtm07MXz9k6AsNq2y2WM39sbNW0SsNF4UcmXbLWeO7Pj+xQ87/2tICx1d1Ju0GiYWxOBLOahGRsbE+SgLJAsissswUgYJ6CrDa6JuxKSmfs8e4qhLb6S3K4QW07bj5u27uHb1inAs8MF1TDeQF61hwwbEA6SPgvnzJ+qZv16s0SO7vLFsvzNHJBPNOzk7QiciGFu6VYUxZTc5EDlmhK4h2XxUiIBMF/6PD4qxk4CuUqgk7maC55GIrTwm90emYqXR1GUDmTF3cfvWzZi0TA4JOH7cAwP691OZ6RK71VoB9jBavMyZM4/4/A6gXfuO0IsIwbYFrrSBZIK+46fCoV5dcjcGIzyC7Bjp0EgJGNKs+/LWZZyY8R+ylauCRhNW4satu9iwfh0NYjXFJuANYveqTdlHtWrVSJI+aAXYuee8u+ro6IxVq1fDKm1apMuYmYK/QuDv9wF9evXAyMGUdE1KESFxxyQJUBJ70xiex5nE81i9HvE8LqRd78/EMHFJzMhhtNGUgzYBS5VULF4mIe3RGrBz53r26oMzp08hd5689FOUsNmDA4PEAnbxgrloSm6rIP8A8bef6JJi88lEmzqyX3GUJJ0r/zdfJ36Qf8ctUomeRnmoMdi9L3rgzOxRP/E8vnn7Fg8feCGdVTqV+NL/1jKtAfsT76fkg20FKysrsdkkAyWneunj9Zu3yJfRDKN7tUeUrr5I/9KnwDBm9mUCfB06hxWD+SBl3/yznvjWpc0O/j3/mwsb6NC2Nm+AiHOE3f+L+OJwYYrz+OAvEWUcrWpyrYhRMFkIsvh7bKWK/ne0+slv89t702YlS0MuYW/P/Tg5czhx/XRH+W7jcfX6TXI6uCCENv3GjBqNylUqJTjISxH10xqw8+KlW9euyJLF5ieaY04K+Ep+9RCvM+iS35pAqkPMYIw6GQB1GJyUJcPf7JJkkLOCsALo0Ypflz4Mcj1yjemSYugZGtLHmH42IkWgvxP4hULQpoguncO/F5+Y80xIqYxFBQk9/vD51CYdViyhXLLniXuRIor7RT+T78suOf49c1X+UCxur0x7RPvlB6e2yToV079o7YlWoFizlZidWPliz1a8ppErYmx4yH73K3mgKpSLE5R4m//KtdtYt2wBrp88jFKViZu907/Yu88dL188x4gRI1CnTi1F8Jqoc7QG7Oxzb9yosRiF05AXJiI8QnTckFKznvo8R/0KRdCxfnUEBX0D77BGkD0fGR5C54UikooBc/BRJNVJjeDfUSXsCDpH/EyjCv9N/s1xN5F8Lt2f6zVF8qKXAs/kpo58RpFJ/XduSQanDLg8g8hmE12KsxdgZ+UigLNy6bKCyZWLAK8jFIp+J5Trh2KxArLbTiggKRPPVmLGon+z8rFiiRlKKFi0Eotn8uxE9xPP5XvI7svf3Da5MskVh3+WKRYrlGxGEz+L/siVK5bJ99sMxXolNwtZLjJnAdcj3bF7D8ZPdBbtN6fd0yCKenz56iUKFcgvEjKUpVFJKOK1BuzcwcVLlpFwJojaOeZm5kK476jYqw8xAm/ctAmN4wga+5NgWCG4SHA4A5vqp0YwyKlqNn+i6MPJvVH8iYwQPJK8gRVG5DxhIYGkTKw8waJ8fATR7kWwMpHSyJSJvsWH7kvXcHZOuFy5xPlyBWMlkysWfcuVixSMGFp/jMpCp2QjsgxM0SoWHdsmYMhAZ+UipeLZJEa56GcOwPqhXKxE0TOVmGHksxbPVtGzFs9OZAYKxRKzlSmZjaRgrJDRM5Xc7BNKJu7BpqNcsfg+dJ2hASzMLHHf6zG69ekPIxNjWBPLLg8g3N6PRJIVTn3eSbnHuWhhqo5Dq8Aur0+/bOkSBBPw+LDJlg2G9CLSkS0/oH9/iqWppg65Kf0MDkZjRYigbXEuThwZKQN4JCmTUCi5YhEYeNYJJ6USykUKIpSFlY2+WaG4bD3PVkKheFbi+7GihVB2Fn9IASPl1/EMJ2YwOk/MbjxrsVKzMrMCkWIJ5aJ/sydLmD38s1zhWM9kqxC5CSUGfF7z8IwlVy7+jgG+bBYzo4Cvo/c+4JSvDgE6pxhQ5AfPRD4U5OXqNhmtWyeMLEnZl6BVYJd37jXVp3/q7QMTUxMUoF22B+SNmTx5Mr5R+lZ/AnyzZk2UlUOKOp+BK0wzVq7oGSuKlCuCTDIxW0XJTDT+sBKGBX+XKQkpRhibgKRY/GGlks9U4l50zyhWMPo3KyArZASnP9LsxQoqzEMxc7GChUE/Khz77r7F3YhMyG6b9Sew65GiPPbywuixY+PNSlPVy9FKsMfVeaZZmDp1Gl6RLchkqZ2JLPVvJUdUJUDpPjIJhNPMweagzBSUzVj6NAV4nj6LISNGIUeOnML2Z0XkUZ396s+f+QgKRHXNxikG7Cxwr0ePKa59tkjM7dixE0U9dk50wL8E5oRLgFca27btxMhhQwTQc+fNS7yMlCZJI/8jGtVbkCt5NiXdKMv/ktAWpSiwsxB4k2L+/IU4deokcYtUQ6/ePWGXJ09C5SNdl0AJ8HtYtWoNjh07igIFCwqv1iXi4xeMD3Q0atxEkJLGVxomgY+P87IUB3bu5ZevX4kdeD2NKluFX77fv/8mWbyFKl9GSrnXBQoBWL58BR498kK9eg7o3bsHMlG92pfE/PD69RvYUpIGJ9ao+0iRYJcL8fDho1i6bCn8KMWrU6dO6NihA8zNzdQt41TzPK5zu2fvXir9uVrY5t2JDqVFi+YKU0ontaBSNNhZeEytt4JGGS5pU7FiJRplqA5T/nxJLddUd3+ORWez5dChgyhUqDD+/bcvcTKW0ig5pHiws7SZUWotFRvevn2bSALp2KEj6td3kEZ5FUCRR3MPD09s2LgRL2jrv2HDRujcuVOymCnxdSdVgF0uhOMeJ7B6zWry0XujNDHBduzYQWna4/gEmpr+zu5eTp9jZ0AmyivtRHnCzZo11ViXb6oCOwPx/Yf3RI+9F7t37UIYbZA0ongb3sHLbmubmnCaqL5+8PUlElp37Ni+A8G0mcSjeUsKr86dK2ei7pvUF6c6sMsFyrmtW6gM+GmKj+cyN23btqHIu9pKFzJL6hekSffnwl1naJOI45AeP34kZsd2JLcqVZSnj06OfqVasLOwmb7h6NFj4uU9o928IkWKolHDhqhC3N/pKdZGOmQS+EbJ6xcuXMSBgwdxlRKkra2t0aZNG4pCbZQkuaJJJfdUDXa5UHkD5ODBQ+Lz9u0b5M9fAA0bNED16lWRMWPGpJK9xt+XUyHPn7uAg4cO4ebNG2JxX6dOXTRs1EArN+oksMeCHG96eJ44iYMHDuL582fInTsPxVo3EBtSNlmyaDw4VdVAtsnPnj2HAySHBw/uE/FUBrE5VIcKvOWjLX9tPSSwx/Hm3lKM/MmTp8hnfFjYplmzZkPlypVRnkjwixYpolVTt6LAZBfi3Xv3cOXKVVrHnIaPz1PRbweHeqTstTR+8alIPyWw/0VKPMKdOXOWuEyO4/79+2JX0M4un1iQlSlThpJI8mvM7qAiLzuuc7ha4VUC+HlizL13766IXcmb144K6tZEzRrVYUv5AinlkMCuwJtkTpp79+4L2ofz58+LxaypiSmKFismgF+ERnuO9+AUNE0/mIPn1avXoj/cl+tEP+cf4A8bm6yoUKECfcqjaNEiSGNpqeldUbp9EtiVFBnnwt4ljsLzFy7g8uVL+Eg/m5maIU/ePChWrDgKFyqEnLlyIDNtshhSalpyH5zd9ZYW4C9evMRDSnK5RRtBXl4P4e/vD0vLNGKGqkSFH4qXKJbi1yUS2BOBRuaRZ+DfvHULdyiG/vXrV5S0EAlLSgjPQ4tbOzs7WuTmFsy0zC6cPn16KnBmnIgn/v1SdqX6ffIjBfTDaxq9OTf30aNHomzPJ64+QkfmzFkodqUQMeQWEyy5eXLHX+olyRqs5htLYFeRwHnEf/bsOY2ajwTAnpAtzG5MtoE5MyctsZjZUFhrhgwZaWs9kwz8VulJMSxhampKCQxGxFNOSc6cNE3J0/qCekNXKA8nf3PmDyco80KSzaogouEOIEIoObjfv38PX1pj8Cju5/dRXMMV6jJSaC0rXH4KfmPly0szUGZ6fmo8JLAn0VvnyhHv33/Ai+cvBG0EmxFvKHfW1/cDbdJ8iwExP56BbUyZ/JxTa8BZ/gRSztHUo6TmCAI504YweFlxgmgXk3kROa2ND1YIPp95L3lPIAu5SLNTUQZeWNpmt6WfM4lYcumgJHHyMPxOfiJJJkkk8JXs5ICAAFoQBuATmRp+fp/Ev/l3/Amk0TqUE5ajgc3fDGZWBvmHZwELCwtYWNLH3BxW6ayIosKa7G8LiuLkn9MlSdtTwk0lsGvgW+RFpeCtIWoLHaLU4pFbSh5P/IuSwJ54GUp30BIJSGDXkhclNTPxEvg/+nOCGmFpSVIAAAAASUVORK5CYII=[/img][/td][/tr][/table]