iVBORw0KGgoAAAANSUhEUgAAA4sAAAB9CAYAAAALMPb6AAAABGdBTUEAALGPC/xhBQAAAAlwSFlzAAAXEQAAFxEByibzPwAAQTZJREFUeF7tnQm4JUV59wtxQdSoqFHcUOOGKy6oiBjcNaJG427UaCJfEmOM+/Ipo5+i6DBzT3efO8OAiKBoGE1ijIKoOGIQQWa5p7vPnYVlZBxUdoYdBuZ+/7e6znjmnOru6tPd557l/3ue9zl3TtdbVV1dfeb9d1VXKVKA1Qt7qyB8mfLCU5UX3QLbrvzWq8xRQgghhBBCCCFTRxAdDnH4E9Vs36pWbl5QfrygVl6Iz+g8tXTuXiYVIYQQQgghhJCpYFm8n/LDhgrat6iVWxbwKQIxsdmN8vk7iMi/MKkJIYQQQgghhEw8IgK98H/7RGLHmhCLXrh9LMTi8gv2V178JLVq7d3MN4QQQgghhBBCCjOz7kDlx6EWir0isWMiFkd5ZPFNq/dWjehg1Witgqjdhnpei/p+XS1Zs49JQQghhBBCCCHEmWXn3hNC8efqOP1OYrqNsliUUUQ/PEUF8Y363Uqp6+wmmTq7UzXC15tUhBAycpx11lmf6zVziBBCCCFkkWmED1ZeeLV16mm3japY9MIjVRBdYZ0+uwKC0Q8/YlISQsjIsWbNmoVeM4cIIYQQQhaZFXN/DsF15diJxZO27gORuFw123eq2fn++oqt2LyA+n7UeBBCyMhBsUgIIYSQ0WUcxeLq1XujzrNq5UX2xXg6RrFICBlxKBYJIYQQMrqMo1iUOszOX2bqlG4Ui4SQEYdikRBCCCGjyziKRX/TE1GPq1QzZfppxygWCSEjDsUiIYQQQkaXcRSLzfaTUY/r8Nlfz26jWCSEjDgUi4QQQggZXcZRLK6YfwrqfH1unSkWCSEjDsUiIYQQQkaXcRSLM/FBqMvNFIuEkHGHYpEQQggho8tYLnAz9wzU4xaKRULIuEOxSAghhJDRZRzFYiM6WPnhnSqI++vZbRSLhJARh2KREEIIIaPLOIpFf8NzUOddFIuEkHGHYpEQQggho8s4isUgPCTZNoNikRAy3lAsEkIIIWR0GUexuDw6VM3q+mQbxSIhZMShWCSEEELI6DKW01Dbh6mVF/bXsdcoFgkhIw7FIiGEEEJGl7GchhodTrFICJkEKBYJIYQQMrqMp1h8BcUiIWQSoFgkhBBCJoFVl+2rlq47QDXCp6nG3AuU336pWhb+lQri1yo/fDVEycthL1Izc89VM+sOVMHGhypvyz2M9+gyjmKxgXanWCSETAAUi4QQQsg48ZVz7qP8TY/Wws8P/xWfx0FMrcFnCPstRMiV+PdNOLYTn7t2iywvvAPf3Qbbgb//gO8uxucc/n2G8loB/j5SNdYfrEXkqrV3M6UtPmP5zmL412rllv469tq4i8WFhb3UivD+qhk/VjXiF6hG9Fac+7/APqmC+FMqiD6IzyOVF78xWSEW6Wa23s94E0LGAIpFQgghZBzwNxyKILwJ+xUExjVqxaZEbIiJMJFPWYFTtmxoQliJuJJ9/vYwfCfHRFjNdvl3rBnvQv6XKj/+gfLbn4agOVQtnbuXqcHiMJbTUMPXT7RY9FoPR/3/HtflZAjC9egzNyT9ydKntOF7OZ48qFiH/nVK8nAifiRy2yvJlBAyilAsEkIIIaOON/dOBOc3quMuSoLvPOFUxkRsitCR4N4Lb4NthqDxlN96lTpm7X1NjYbHaIrFvSCi/1zNbHhUny2/YH+Ion/V18lWz24TEeWHHzF5jjZLltwFfeAw1PtEcz126am28oBCHkTYzq/XJJ30q+PgJw8tvOgq1QhPUbPRi9SSNXc1JY0XUm9/7tEQ0M9TQfgybV70fDXzmyeoUxb5QQshFUCxSAghhIwyMrLXbIdqhcNIVaVmRiJFDOjgfv42BPZtBMKfU8vDx5ja1c+oicVmfG+UsRJlbUW9tlnsUtjVTgIqSXMp7NfI83xn8+Pf4HO1WtZ6qqlVvfjR03FO31N++yb9IEEeKNjOp5Dh3EUwJu923gax9T3V3HCQKbFeRPiesG0/9dX4IX3WCB+c+y6vvB88034hhP4MzuMC1H87/r4e1+T2xMIb8N3v8fdm/P0B45WNTOltovyvtB+nlsWPtZr07WXn7mc8Fgcp31a3jgXrHqrPJQv5TfPmnpE8fOgxmc4sx7z1DzKp60Wutbf+ScnMDUt9RPjL1PwphmKREEIIGWVWrd0Xgeg6p03e67TOqJAE90H0Rz16tnphb1PL+hg1sdiI361WXZy0hVwTm4kIstXRZiK89piy6WjHb8V1mP+RWhLf3dSsepZs3Qci7hMQRNck173AeRWxjmhstq9SjdYHax1lTM7py+hTMUzE3KY+86MzUJfnGo8/sXr13jj2BqRZg7a440/Tv2XqN0zaR6wz1VtmAjTnL1HHRo8wOaQTzB+Cel2M++pq5H+V1XzcB75M+51/tfEaLrJ/qB+tTa9j62ock4cobzYe/Whx1vqabq9O++1h+E7aUK6PrCpcJ8H8A/B7cSrO6RZ7XWDyvbwLHoTPNl5TB8UiIYQQMuo028v06J4t0F4Mk0AvmaZ6pKlhfYycWAyXDn+U12LJ6N7FeoGZOpB298PvJeJXl1W/6X6F8oJ4trZ3ZRutd+8WAt0Cv9tOECEe/3KPEcZG+3Foj+9COCciUUZGbefQbUm7/U4vSJXHio1HquMvgU9HbKaYCNCgvUEti4c7wigj6tIm8qDEVq+OrUL9/OgY49VPc91j0caX63a2tVnHpI2D9sVqZuOjjGf1yPR6LehRb1sdOibXZeWmjxuvqYNikRBCCBl1ZOsLP9qZK5hk9G+P0Y0e6xxzmSKZZxJs+/H62t81GzWxONM6Njl3Sx2GaSJEvPC3tYjFZvsA9LlfJQF7BX2liEl50r5BeLKe7lk1zXipFgi2sjumhUy8bfd065nWq/Dvi/UDmyLtIe+ketFaNbMhfwXYoPVMpL3FKX+59o3WS4zncJhd/3yUvStTJOu6x7crf+7Fxqufk/TI7k+cHrgko9knGc9qaURH6LrmtXfym3mTWr7hUOM5dVAsEkIIIaOOjLL4UbiHSJEgRwSSfJe8Uyjfy3YZN8GuQ7AvU8K6LLoW318PuwX/vlMHshI0ywihyyhJryUB9Va14qI/N7Wsh5EcWZxgsdhY+0hc1wvMu4TFrNMfu036SRGBJSbptVCIPT31s0r8yM89t6Rt/6CCucdD2LwR9dgx0DXX5YQ/MCVnI9vVyDY2etTSkle3JWlWGc/hIKNweXWTa+1FF6hl597TeNnR+8BG1+sHWLZ8Oib9QKb7+vHbjGc1yG9KEM85XVNJ40XHGs+phGKREEIIGQe88B0IcG7ST+RF4AXxjQhm2ghkfqgaCIBlTzuv9TrlbXyWHhk6du0D9Ts5YrKYhyw84YdP1AtI+NFbYJ9Gnifju/XI61a10gT3roF9Mo0MYhGBV51QLNqtDrHonfdnCMzPdBeK6CvSF3W/ae/Ed7J35zmwH+M6nI5//wIW4e8bdm+rkTzUyDf9MKS9C3m919SuGrTocRGL0eW4n76MfnW16VvFTe7VmVZgSs5H9qTUAirnHkzu/01q1aYHGs96kSmv8lujV++11KdjIiblHVcXvPALTvdR8jBrizpmrWyzUg1+POMkyuV8m/NzytsynMV2RhSKRUIIIWQcWLJwFwSST0YQ8wYIw8OTUQ8EMeU20N9LT5HTq13Gn0CAfAGCs9udAvppFYsyyuASaNZt+hrF1b6z6EXL9UMDW3m9Jtd/duMdus/40ceU136GXs1Trxa75R564R0ZEZeHFo31j9Mb83vhv6PvXq3bz+WhRNLHfqf7elW4iEUxL7wDn3fk9rssk2vUCP/FlJyPtJ8f/j73/tMjbjCv/TrjWS9B67W7y7TVRyzpj1c6r9ArvztBfJ6TYJQ0XnRSJaPMM9Er0Ma35F5XOR60ZRbG4iwmNEJQLBJCCCEkQd4Rk1FHGbHKC1inVizG71erZCEStE/3+6Dd5iKEOib5SDBc1GQ1VC/6z5IPC/7E8tbrUJdbdf1t9ew2PdoTyRYh71WnbcuectiLfjCBeutg3KGdtDCPTzDe5XEVi2JFrmOfwbfZvlOtaL/UlOyGLO7j8jAiEdwnGq968aNv5NZJ+qTMciiCvNsosyVyhRvaMoh34e+3GM/BkJHYoD2XO0IqlrTvrPGcaigWCSGEELInspy8BH+2IKpj0yoWk+X2v4mytuLzsj6TPff0PnsOQkPOSW/fIFM2wzOdzYt+Ajter9BZBSfE++kgOhGB2ZYE0efo0cJB0RvZtz6PtswfuUuO31zZ1gVFxGKWSX+TtpA20w8OOobv5Tu9GE77Uj1aWAQvejnyvy23XaQsL7xMLa35/jtufn9cqz/q8mz16Jj8XjRabzde7vjtZU6L3ei+GV7otA1JGkHbbVaAFpPtzXrqPqFYJIQQQkgPFIvZrI7vrk4IH6xWbn5Yn5245UGox8rc9hPTQWn4SZ3nkjX7FLK8jc+L0Gx/2q2+Os161YireX/Mj93e/5QA34uOM17lKCsWRTQl4uYKXLsfoG9+GOfxYrVcVjOVFUPn3oBjH1eN6Ev4/jmmVHdkCq+8R5w3+pWMeu7S+37WiWyPI/de1iir/i2IL1Ze6+HGyx3ZfF+2AnEd7fPC441nMYLwZSjnxtyRc32eYflRzAliGsXiqaee+jff/va3A9jZ+HsdPnfAFroN3282x06CDW1rlVNOOeXRUh7KPk3Kh23v1KnLdphjp+Pv4Dvf+c5hxr1SkPf7usrstnpWMXbEnHdfvczhXGy+sFrOSa6TpawydT3aHKoF5N93zeUczGEnev2rymMQQ7mLch+ngbqc1l2/jsn3JkmlmHPvK6+oIZ/tkpep/9HyO2WKqBTkLdfJWoeK7X2mSJIKxWI5vLCRL4IQlMpoSRD9m/FaHGSkJpjfaq5nuukgu30Ngu5DjGd5vrLxPgjMf5U7oqmvbbwNdTjAeA5OGbGYXFPZGP9Laqb1hEoFezfN+JNOI2CJiF6tVE310Cu0tv8nty76eGvw1Vmb7b/C9XV8j3D+dtwzf2M83dALfcVrnR5MSBpZ+KuuazuGTItYFEFlAp0+YehoItBOr1GYHQ07u6u8QibBHD6DKoM45JcmFqW8YvdpRaBsaSdrnUySXGy+sHERi2K1iR7kPVFi0WaoizxsWBSxgHLTfn92mCSVktb/qjCTd6UPL5AfxeLIQLFYDi+cdRKLempfgQVQ6iBof9RJPMnITyP8gvGqjiB+LQRJ/n53Ikga0VuN1+AMIhal70l/b4RnqMBxAZcyePGTIIh2OIknL7pK+XO1PMHT9fCimzKvjRwL4p3oz+l7K7rgt5u5+1+KyXVotjeqZRseZjzz8eKvOgnF5KHF1trac0yZdLFoRKJ1JGpQk/yqEmXI72jkZxs9HNQkGD2pivohnyyxWCj4r4qstjJJcrH5wsZJLO4Y5mhy0Wvd619VHlWbuTZDEw0oK/VBh7HKR43T+l+VhjLknqyk7siHYnFkoFgshx+eMBZiMdm/s5U/sqfrealafsH+xrM69OhVdF7uyKa0p4z4lKWoWNSLFm28HWV/QS3Zuo/JpV5kVMsPv+80uijtEsz/g/GsFt9herLuO/EFuI77Gq/B0Fv7RJvcp6M6TktuhC9zG7UU0Yt+3gjfYzyJYZLFIgKCOgMPEWUDj/AYEVvnU38J4EoFROLfnafFhhpwoTyZOmyrhzaTLBebL2ycxKJc380mSaUg76kRi112dl3TKrtJ6wsdK9pGLuSVWaWhLJnyW2rGAfKhWBwZKBbL4YXfcBaLQev9xmv4BNERqMcd+aN6EFfyDl5dyDt+siCMreyOiSjxwnm1pKQoKSIWpc/p/SNbHzLew8OL3mlG7ex165juZ60zjVd1yLuTXnh+bj/Wwi1221sxDy98M/K8M/ec5bo052/T74dmIdu2+JHb9FM5jyD6bmWrC08QkygWJfAbVpCEcgq/ayQBFXwHnQ5b1AYWQfDNFIs4j+0mae3INUWZmW1mkuZi84WNlVgUQ96nm2SVgXxHViwWzQPp5T6T8zkJf2/uzqvX5LikN66VIw+HbOX2WtUjxtJmtnLMYSdM3aUd9XvenTxSrNRDNPimiUWKu6FDsVgO36H9tBAQMRIeabyGj2wNkCfSdLuHN+PvQ41X9XgbXoRrvDPzGouw9uJrkO5ZxmswXMVicn12QYh9xngOl+D8B+Bc87ew0Q8c4isqnx7rtw6DeLo195oEMe7NisqWEVXZT9FpRHUTyo7aerXWNPzoGKe8dBvHl6nZ6EDjSbqYNLFohGJmYChm0khg8j5bgCbfw2SKqExhzRN2zlOwJG2Pr830+5H4lLR9QRKOSRDcWQQndwqr5GVcCwHfTLForNYFVzqgnNwRB5M0F5svbOzEorGq3xmbGLHYixnNz5qSLvddLYIReTuNmKH8She6kTazlWMOD4R5cCPnk/W7OFC/hB/F4shAsVgOWXTESSzCvFY9Uwjz8Lb8Gdr1klwxkpzHenVSjVMwZXVVL8xeZKfTXo3wTcZrMFzFopy3F367ko3gB8ULlzvVVY/uhR8wXtXghV/NLVv3jfhHxqMaVm58FPK8OHdqtFhS/grrAj9e9CKkcVv9VO6BRuufjSfpYZLEootQlGBxkKf38LW+WyjBmEmSC9Jnii+Tf+EgCz7vk3p059Vrct4muTPwcxGLO6TdjUstmJGNPME+rWKxUoGD/CZWLHaQ9oKl/U7UIhiRp+23wyZcK13oBmVULhY7GNGYNdI4yG8ZxeLIQLFYDi/6r9z2W2yxGESHo01v03Ww1a9jyXnUu/m7fm8x/k1umyULoJRb5c1VLEpZMhV0MfHCv0S75G9an7zn9wu1ZOEuxrMc3nl/hnO/MFO8i8n1GmRvxTxm5t61+/6wldsxnaa9UzXC1xvPhBXh/XEM/cnx/Uc//oE6ktNP05gksZgRAEpgVsk0M+TVHcw4CyUHwVNarCAPCfQre9qP9C5iUawWodUhJajuM5M8F5svbFzFou7bVQl25DfxYlEwD5as/arK9hSQ58d7yxAzx/q+h1U2WixtZsm/0t945Jf2LnFh4Q0fisWRgWKxHH7rR05iUd5b9Obea7yGixce5TR6o98VjOoXtF7rp7lTBkXkNSLfeAxGEbHox39nvBYHEX9+dG6u6JF7I4ivV834IONZDtmaQlY4zRJrcv8H7YtLbZKfxpI1d1Ve/O9u01H1fdbGuT/EeMv00y85XWMZUWzOX6FmKmq3CWVSxCKCibQgQ4K/ylYvFSQAQr7yHpRzIJQWtMFE3FUWCJkgOHXUpMioKtLbxKJNjNa2OqcR2b3l6TJ7vzMuufT6GRtbsWjsbONSCuQzFWKxQ9r1wfeVTQdFfrbRN3295LPn+0rPM+38zOHKQJ7W31+UX2ghJvhQLI4MFIvlaIRnOolFL9yFtH9rvIaLF/6HU0CtRcF8dXsrpuGFq3PFQdKmp5UaQRsnsSg0og861VcLyvizxqscfvSNfOGO40E02Ab5LvjhE3HPbzf3dbZJXbxWoP2a7Rcmwjnn90Jspe5PH9N+JJVJEIsZgkKClcoXASkK6pH6niLqV/mUtyzBKMGjSZYL0luFAz77hFpd7WzK6y1LNgfv+9645NLrZ2xcxKJNrHcs+Z0sAfKYKrFo7pW0935LC5SM3yY9eohP66hjVQ9fyva/IiDftCmpzveWpO3x7RjF4tChWCyHF65xFote/A7jNTxklUivlb9lhm7z8Hqcy2OMZ33Ithi5fU5GOcOz1Or47sarOOMmFpvxYyHKrsh/txRtE7R/pb628T7GczAaax+J/C7PFFvJiOMdaJ9yeyvm4cfvwzntyhzhFEtGVm9CX/1bfP4itx+JSRovOqv06rpTwCSIxbSACN/Xsr1AESQYRV3SAvzSwX0aOPesFVedAi9J1+OnA3Z8WsWvlGlcKwF52kY2xeT7vnMzbrn0+hkbp5HFrFH0UtcAeUyVWBSQt7WfVVEe8rFdqz2mr8u/e45L2ZWMbMo59OYtZg5XSsZvnfN0faSlWBwZKBbL4UW/zJ86uIhiUUZtRATmtqks/BFetMcUv7qQ9yLd+ty5pRbbGTexKHihw5RM05+a7ecar8GQPRvz+q6+DvFavU9nnbxp9d64T/4r/9xh0peb7ZvxCRFrOd5tWnjH1yl/w3NMSSSDcReLCIZEFNmCi8qXoR8E1CNNWNUS+HaDcqyBl2vZSJsqHPBZarEfFyS/3jJgnel7vd9PjViU79PyhZVacAj+UycWhbT2xPelxDf8rQvbmMMa/Ps0S5pKtqVBPkMTiwLyThN7Tg/GkI5icWSgWCyH57C4Rmd0RvaWGzZ++7Dc+okl7yuer1ZdfF/jWR+N8BTHPreu1Abw4ygW5R1CP84fYdOjZeFXjddgeOGPc6+DnoIafsp41Etj/ikQd390mo4qgtn6fY+tEPEZLjElkBwmQCymLX5SS/BfFAn6LHUTG0rwk1a+i5BGulThYDtmrJLzQj5Wkd2pt+2YdnTA5gsbK7GYNWLduUaDAP+pFIvI39qfUebA06vhb51iijz3EKDyb1s6WLkF/4C0mSXf2n7j0/ol6uEkfpGWYnFk8KJvUiyWwAvXOYrFnVoIDJtG692511dMi4/op7Vum9FB3kXMG0GSPudFrVIjWuMoFletvS/qtMncc+mWiMU59ZUBp6LObDgI53xN5pTXZFTuqsr3dcyi0fpQcu6OYjDLpI2C6Nc41/uZ3EkO4y4WEURYA+YyoytVkRYESgBnktQOyksLvnLFEdJkCgdbIOoaFOYh+Vjy3h249x4TM4dysfnCxkosCsg7dVQdNtD5wG8qxaKA/G0PVgbeygK+tsVrrPcHvre9Y1x60SJpM0u+tf7Go8y0VWZz42Gko1isjNULeytvyz30CMyxmx6IwOhR+t2nxtxTlDf3DDUbHawa8QuUP/diNTv/cgTQr0Eg9QY1E71FL1vvheflBqYUi+l4YTzSYtGPPuMkFvU7jeGv0aayZ92heqP2WmzDc5B//qqfWixCDK26bLpGFoVG+MXceuupzfIuYfhS41WMZvSx5LwteXcsEaTDXRBkyZp9cG5nmgVpBjf9GxLfrPszcWacxSICiLQn98PtwymgLmmBT2VL4+eRtsCGBKcmSSpIlykc0vKGlTo/8e/JT6z3Pa/e41MnFgX8O23bArHCI1PwmWax2Dcd1FhhoZJxb1inY8r3Pem0ucwAyKJs/xsE5G/9XYa5PKCiWBwIeUIehIeooPV21Yg+j6DoWwiIfg4RshF//xGB49UI7q7D5w583oBA6UZ83oRjN+O7W/H3bfjudnxKkHnn7sAqzygW0/HDtrNYFJE+bPyw6SQWE5OpsrfUbi59LxGL56tl597TnElxxlUseq3noc/syF3lU84tiJYbL3dkuwrZ6zLvIZH0m8aG4a/gG6x7NuqXPeqZZ4nQLTdNdwoZc7GYFliUnr5VBWmB2rBHPVEP68qoefVAmlzhgH/3jSLgu+2DnqP4IQ/baPEegabl+FSKRQHfpa1CWXhLE/hMrVhEGQOLnF7gU0j8mX7flx5Wql+W7X+DkHYuLtcP6SgWnQnWPRTC8K0IsL+D4HcjAqAb9BS+4xAoSkAkQkWCPgmsJLgUE7FlNYiWXrMFWr1GsWhHtnWQa+K20uhtuI5HGM/hEYT/XkAsJnWt21ymGCZ9bvoWuOngO6yyq++D8CK9sX4RZqLDld++KbkWlnzFpP3r2lvRBT/6dO5DmDTT7RavU8H8A0xuxJFxFotpgdCgQqVqUJc+0YM6D32FVpQ50IiJHO9J3xfwuYo7V8SvJx8ps0989qYRM4dysfnCxlYsSttIv7Klle9NMifgM7ViMU3kwApPB0VdbVNaM/OR4z3pdd83hwdC2qw3TzFzuDZQrq0/5k7pRRqKxVyWb3gyhNNyBIPb9CINHWEYlHjaPqhRLNpZEt8d9d3sJBZlVNcPX208h4cfnVFILI6KTePWGd140T/kvteZPPDZid+E1xsvN7xoeW7e0mcacycYj+EjAlhWGs6rZ68lDyRuUX7rVSYnUoBxFosIIGxirJJ35spSZeBZFpSZts9j5gqFOO4kHPC9LcArvCqnabO+awrrm9ZqSTO1YlFAOalbpeCY87RspJ9asSiklFtacBvLnJ6N42kjmwPPlJA2s+Q3DLE40IM8pKFYTOWEeD/ltb6MwOda/d5OmalYVRnFoh15T9QLLxxpseiF54ylWJQ6e9EP1ZKFu5ozKc5YjyzOPRpCcHvu/S/n54VfM175yHvNXrTZ3EN20yI0ulM12y8xXovDTOuFqM8Nub8H3SbiMohnTQ6kIGMuFvuCimEElC6gLmkBYy2iJAuUOVBdcNxJOEgAiO8zF6RxQdJb8rCK/950YuZQLjZf2FiLRQHH0h4KiDm9R4p0Uy0Wy14vAXnYFnhxWihH0vX4iQ38gKmK8xkElDGQ6MNxikUrfiyLf6zVI4mjIBI7RrFox9siox8Xm/ZJN30+8s7o3CuN5/DwogvGViwG0Wo91XdQxlksCn70jdyRNf07EW5Tyy/Y33hl47Vel/vbovtzvFY143sbr8XDC7+Q1Ndh6nJyXm3ntiB9UCzWA+oyNWJRwLHMrS7yyFgQxBokWtKVEmCwsReLQopQEduBYy6rUVIsWso2h3NJm1GAfJ022Zd0Nv9BF7opez6DgjKqFotlbYzFpgiJoH1F4WlXg5oePYCIyVtEQ4xi0c6yc/dDHS5xE4vRzaqxCCM1hcSi6ROjYMdvXVCNcKk5i8EYd7HYjF+J+t2p71VbvTumR7bbbzFe2ci7zy5TUL0h7a2YRxB/IvmNchCLyX24Xi2L9zPepCDjKhblP/+eYECba1BWN6jLyItFCSRNEitIU0g44Fjfe0p5ZXRAWtv7Wqm+vWnFzKFcbL6wiRCLgu06iMn3DtMAKRYtZZvDuSCtdWEb5Ou0Mn7GQ5OB+mfZ8xkUlEGxWAkz4SEIhi4vvKCDBNUSIElwl2nIt9vEL1kZ9Rrkcw3+3tWXd7dRLNqR+vrhpZMjFvVU2R0jYNerIDxLHVfy+o6/WLw36tXK7V8i/rxotfFKZ3n4GBVE2f1VRuea8VUQ6k8zXotHIzoY987VTg+0OiZ93Yu5CuqATJpYhA1djNlAPaZOLNrSG8sLEAv7WdKWEmCwiRGLRnBY31+E5S2yUuia2+j1X6w8BqHs9YK/bTp2oXceJb0lj4HexS57PoOCMigWSyNTpprzc84BvYwyyEiCrIYayD5ird8iuF6Pz58ov/UtiK1ZBIRfVs3oM3qDa1kow4/fhu+O0HstSgAmgeBMdKBqxI+E718j3xszBRrFop3j5vdHfbe5i8XW6IrF5N23b6vZ6BGqsf5xi24yxbcs4y4WBdknM28kUPpf0N6Wez80wvfk9gUttqLF35fulD/cC/3xrMIzLeRea87fqJqLcK9NAOMqFgVLQDCUgNIF1CVNAI2MWIRl1gXHCwsHpLGNEGYGy7aAFt9l/ib1phczh3Kx+cImRiwKSJe2WIpY6sJGOEaxaCnbHM4E6dLus8yFpHpB+rR3TwsLnrL9b1BQBsViaYIYAa1jQJQEhTsR9P1aefGHld8+DCLx4XrftEGZ3XQw8r4+8+k9xaIdLbaj7Y5i8Ua9Kf2wcV3gRgST11ppvCaDyRCLT9cjfXnvGco1DuJ3Gy87fnimm1gM32E8Fg8/+lgy08Jh+mmv6bZo/0ZPEyeFoFisB9RlKsVixjQ66wIr+N4qavLe0bL5mEO52HxhEyUWBaRNDbxRL+u0SByjWLSUbQ5nAl/r+6J5U397yXjvsfBD3TLnUwaUUbVYHEOxVwYZ4Qva1zlNs0qCwYsQyL25lDjsRRbVkb0bKRaLIytWeuHvTX3SbbdYjA41nsPDD922zpCRaq/1deM1GUyCWBRctj/Rx8P/MR79NOafgnO8Jvc+D+JL9EOQxWR565k4l6tzBXKWaaEZfcnkSByZQLHIrTN6QJm1bp3RC9L0LdIh18UWNMv3lrS57532+oiZQ7nYfGETJxaFtPJh1q1N8P1Ui8WUcnOnkVZ9v6PMSoSntJktH3O4NtLKzas/0lAsavxomVMwK0GcF2/UU0erhmJxcIK5x6Mef8wNahdVLEanOolF6YdB9E3jNRlMiliUkb68a6j7IASWTOG1EYSfMgIq3WQV5kbrROOxOCw7955OI6B5pu+59k2LMvV7jBlnsThoQDIsbHVzCTyrBmXWtim/DRM47+j1he0hyPBvm4h12p/R4kexaCHjWlivJb6fWrFo2mqgcpHOurANbKA9EsWvJ5+OFZrSKnW35DEMsWhdZMkcTgVpKBbN4hXzTnv0ybYLwfzLjGe1UCwOjh8+EfW43EksShvLQkbDxgsbbmJRT4X+vlq9sLfxHH8mRiy2Ho4+dJG5D1NM3mXGcXlPuZevbLyPCuJfZ4pFeRdaFrpa7Hf9/PgjpYVixyQfLzqf01HdGXOxmCaCBt7EukrSArVhi9m0wC2vHkgzsHBAWlvQt1sIZogYJ9Fm8SslwGATKRYF+PRdxy7rFfBTKxZRRlo75fYN1K2yRWk6iH/ZPKXNevMQM4drw1am1MUcTgXpKBb1YjN+dEuuMJKAJ0AQrxb2Mp7VQrE4ODKN2Avz3yfTbRvuQNpnGc/hod/9cgi+dZpwjVp12b7Gc/yZFLEoBO3j9Mifrf4dk2vYbP9YLVmzj/FK8KLn49ru0oLS5iem7/F4nRaWi8VMfBDO84pS0097TV//+IumBJLDOItFBBDW6ZUIShZ/wSaAuqQFPk4bpFdB2juEaKPcEU6kKyUckDZ1o3783dc2kl47OtDrK2YO5WLzhdUyPVjaq7esYZ1nN/BLG/kS2x2Iy989xwpdc6HXf7HyKAryH2gEHn5/Y/Gp05yFk7SZxb/W33jknzYqmiu6JU2PT8emSCwG8Qf0e2K2AKfbVupA/13Gq3ooFgenieDW5d2qxRSLjfBNTgsoyTX2wnnlbXmQ8Rx/JkkszkSH43zu0COAtnMQS47dohpzTzFeCZ4sopXzwCB5KPV/jcfwWRLfHff9D536qpyn3HN5vxNiyb15vV4MjOQyzmIxbdoYzGkqY92kBZF1B73doLy0fd9c3gssJRyQPnWaKfLpE5IwZxFt8XXutyjbNgpUy/Tg3nJMWUXasM/fHCoMfPtWqjW2o7OgEP6eZrFo65M7zOFU4Gd9v7Auk/JM0blIm9nyMIdrIa098H3uXpNIR7GIAObE3MBIBzoQGbPRwcareigWB2eZbrvrRlosrtj4LKegWqcJr4doeIzxHH8mSSyuWrsv6vrr3GnrWvS1/yT6luKeCubbmVNQk/57tZpdxL0Vvda/JQIwQwyLyfGgfQf66jEQt23z25RtesR1/hx1zNr7mtJICuMsFgUEEWkBcC3TCouCAMkWgIoNJfhJKz9vtVEB6UoLB0nfmwes8PYavfT6i5lDuSCttc9U/YAB55Q24uTcNy2+A9+fGSJ9d/vj76kUi8i/77zFUGamMDMPrGzTqWs1174qbWbzN4crJ609UA+n0XSkpVhEIHtWbqCjR3uii9WyDQ8zXtVDsTg4smels1iMrlXBxqcaz+HRbB+Asrfn1lFMhMhs9CLjOf5MklgUvLmPauFjO4eOJcfP1SN1wmz0muTaZ4iwxOcMnX4xkO1Bgnb+u79i8oAtmP+R9mu03o7+fWeuwBRLzvHz2o+kMgFiMW2lz5EYXUQ90kb2ah0lEVCONfByLRtpqxAO1iDcYoWCQYt/EbGYNiWz0OIheaCtSr9Ta/EtdX+iTiJgreLG1HcqxaLkbSsTltkvcTzt96duc+qraedlDlcO8k4Te04PSCRdj1/HpkkshvO5wVES4LTU0rl7Ga/qGUuxKO0W/l6vRrqYeO1noD6O01BFLLaGLxaXbbsnrvGaXJEhlow+fdp4jj+TJhZlQaU8UZXcOzejzz1X+wTxKbkzGKRveNE7dfpho1c/jX7kPFU6aF8J0fwM7fum1Xvjun3H6RpLm8k2Rcs3DH9F4jFi3MWigIAobfRu6NtU9JIz8lCpOOkGbZIqCmBOgZek6/EbKGCHT+Y0vUHytOVjDuWS8R5nqQVJusm47rnTGrux+Je+P5FHlsDpC9aLXp9e/8XKwxXknTaqmFse0tgWj6r0QZXk15O/c1+Vc+j1FTOHKyWrz7u2B9JSLCLwuzRXFCVB3AVqycJdjFf1jJJYlPflvPAPmXURk8BPFpbpfTdr2LgucJNc5+t3B/DDxg+bTsF4Iih/ZrzGn0kTi4Iffy9X+Ot3oePP6imo8lAlq39qAbaIeyt64QeSqbUOo4PJFNw9n8I32o/D+V1qZhtkm14gqP2/6ivnLN4iPiPOJIhFBBKZwa9JtmigDmkjWTsQzOW+x1MUCcxSgthCATfSVyIW08RZxwZpA1s+5pATSF/r9GWck3VUEd8XWnzJloc5VAqphy1vmE2YDF3oVZGHC+ZeGWiqOPzS3kmudIEt5DfQwjuCtJnFr5bfeORb+p6StD2+HZsisehFf3ASi374m6kRi8H8A7SIzhVfOrDcqYJF2Iqim2b7yWi7K93Eomx/Er3CeA4XP34b6rErd7qePo/4ykWZLlsHEykW595g7sd0k+OyZYQIMel7Wddd/8Ys0t6K8rBHtp7JOx+xRCCfbZ1lMRO/D+eZ37/19iIQnA0IaWJlEsSikBYUGatlemGRoBBpreINVqlgzBKKsN0LmbiA9JWIRQG+1iCwSBt2Y8vLHHIC6a2jSWJlrwfySH14UaT9BVse5lApcvrJHlb0mo9KHi4gX6vAQVm5C0AhzcALuRQhYyQ8996RNrP5msOVgTzTptsXfReZYhHiYVu+WERg44VRrcvZj9Q01PD+CHI354ovMREBstLnYiLvTOqRUAdxK9faC480nsNl5eaHob9dndvfxGQE0guPMp7jzSSKxUb4YOW3s/dn1f0tvgnntC17lN6Iq0ZYzx6uWaxaezeU/f3cUVKx5P7agev5fOO9J6tX743z/E+36ajSHu3rUvOaciZFLJqAqm9UpMvOdp0KlYaU0Rt8uQRsgkP9So9oIQ8RQFllFNqyA+krE4vS9vDvrVsh8dpNTz7azCFn0gJpmNRzoOAUfqlCEeXlCpBebPmYQ6Vx6JPail7zUckjCyOW08Te5rzfipT+rH1NkkqRc+8tC5Y7vTPFr9LfeORX2cwJ+FAsIljZmCsy9AgBROXysL4VKkdJLH4NotgL1zmNNGhRAzGwmCyf319fH5f6ytRA2SB/MViy5C4QiqudpqJKn/TCyyDcx39V1EkUi4IfzuSLLPOAwnrMmO638TrlnfdnJufhEcTv1+XnjgbCktHP7MVplm94MtLmP7gR64xSeluGf94jzqSIRQEBRdr+Xh2T4O6kvACrFxMYShDTFxwac128IbN+CKxkOlzhPRglIINf2hQwbUhTeAQPfpWJRUHqac5R8pK2HHi/yU59us0cciZPLKGup7n2FfMgIfXdTDnvov1OsOVlDlUC8su7Zwpf81HJIw3kI/2w1Eg/0qU9FKhlD1XJt6ccp/KkzSw+lfQh87uY9btTuC3gQ7GIQDZ/NdRkNGqnarReYryqR7blkC0T8sXidjWz4VHGqx5O2roPyvlJ5jL/HZM6acEd39t4D5+T1kh9t2SO8nRMt2G4AW14P+M9XGQqqvQn1+Dci76uR2zGmYkVi/Fz0Jd2Ol3LLEtE2GdMrsNjdt2BEHWXub1nqIXdeerL/3t/452ObL+RpM83/bCptXj7So4okyQWBQQVWe8vdkwCQgnsJW1fEGKCIBFK8sQ8T4TljkJ0A5/S9ZNgFt9/HJ+nSfnGJ9UkL+NaCPhWKharpLdeYuZQIeCX+4BB2g+fH+8dBcX3ch2ONsdtvh0rPMLSwZJX5fcn6pb2Tpw2HJ8IsZgn6GHO1wnpbPddrSswS/495UmbZI5kSpv1+oiZwwNhfh+zHp6JDSSa4UexqILoeKeRHgl2vehzxqta5F3IIPog8s/e7Dt5Wn8dBGW9C7QsLOyFQDh/9UYxXd94lwrC9xjvxcELf+MkbsVErC3W1NkT4v1Qh01OwlbaVsyL/s14jyeTKhZlBdGg/XNnYWQzfU+3r8HfTze5DofVC3ujb/2H2z0uD7DiW5ynyZ627Z4QgD91apfkN+0a/H4823gTMGliUUBg4SLISpsEYoMEh/DNmy5amaGOhac+doD/xItFAb5195dFHUF1IU1UiBW95qOSB9KLmJc+fBL+znyoguPbJb1xzcSMSNvyGOihjCvIP23RpNR641hpsWjO1+nhGUx+18r0d4pF1Wj9s/u0wOiSSvdalGmJyxEkNcLvQyw67FOG4yIygvADJod+vC33UMsgSFYvJPu7DUoAYayDd1s9ekxPY5u/SPlrn2i8h4+IW9egPRFq8aKtPCnbYrj0OTHpd835W/H3x/T7ZePIpIpFwWsl0zhdVhG1WdJnh7+3oh/+H9V0WYwGJnX0omONpxsi/ly2sxFbifyD+Gdq1WX7Gu+pZxLFoiABFCxtlcMqrNQ7hmaUIzVAr8AkaHPez88G/KdCLArwlxHGqgX8wCOKHSx51nJ/mtEi6/kXveZ15VGjFXqfGedSWLRVwSAiVdrd5lOHoazNZdsA+aSJxapthMWn7PflRdnvCnZMC7X45N0bbQ+KTCucCQ9RjehE5HuTDqRdgjYxHXzF25QXvlc19ftBT0dg9jKIu39AANjAv89QXjyH/E5Xjfbg02abeuVO93olQe961Vh/sMkhmyWr766C1jNxLh/BuRyFupcTmjL65iJIOib1DdrnqJn4IJNDNjKKNNN6IdrjKNT3aLTxk8yR4gQbHwpxfaGZVpxv0jeb87tQ7mr8/WSTS5XspVe3bKItmtE7VTN8c6WLOU2yWGy2D0Cds7fFyDItxOaGu7fi7OYDld92nH6qf/PWq2PXPtB4u+OFn0pG+10EqaQLP2k8p55JFYsdEBTkTZcqZCb4qizQQF4yjbFKUSvnWvi9TBvIZ2rEolClgEc+p1d0DfryNocqB3n3XW+xote8rjyqNnOtC9/L8On7PUFetSxs04up8x5lw1Knv6akr9RQxkDvWttAPhSLajWEnx+ud5vCiKBHB4Xhd/S+YkWQaV/e+ich8DoSwfNPkd8ter8xVzHWbVKHoH0H6rFDea0bVEO2g4h36cVbJPgUEZLs8fZHiJLBNsyXFUbzNh7vtWSE5TrU6esQU29UK8JnQYA8Nsmr9VQI2sNVI343AlUf6Vv4/sakrhAJsvrqyhLvYsqqin7oNlLSsaS+1+LvE1HnN2qhO9N6ghaCXut5qOerlD/3rwh6T4ZtgSXXbNUlUt+NperbbP+TCcT762U1pNOCPLwa13uFfhAgI8iDIKPPIs5n4tci38/iXH6Ic5MHEDfg33cm0w7DH1T2Huoki0UhiL/pPFLcbUn/26qa6w4wOdWPPOjyw+8lex1a6tRt0g+a7VtVY+4I410MWbAniH7pVJb8zjTjq9AHn2W8p5pJF4uCGTUJTFBjCxxcTKZf1RZgIG+ZCpk3xSvVzLkFVQiUDshvqsRiB+Ql5z3QtUD7yDtxVT5M6CvDHKoF5N+3smXRa97rX1UeVVmZawS/tCnLlYilPKScnnIzy5d2t6StxEzelZ438qNY1PjhJwsFe3o0IPoDRMXJCPbeplbMP0UtbR+AYOchCOQfrEeO/E2PhlB7JtK8A2lmYL+C7xW6nEIiIc3grxdK6Zglv2Qa6eBTXvz4zESg9OSbZTIKJsHh7KZdaNfrYNthv4NdieO3aRErbSCBcvdo7irUtdn+mCm5OLJgTRCvLVxfabukPlLfHbDfI2C9XAun5vydug07AlzSaj+0dSJwP2pKL44syhNEZwxcXwniRbB64X/AjkJeb4W4PUz3xVWbIAQhemejA9Vs+DS9MJMXvRPntgR5nIb6r8XnH3FOOD95wID+mDyASPqRXBc9VXf+Xaa25Zh0sSgPFXTfKHhPy7UPouHurejH70uutUNd5ZoF8azxHAy/dRja5oY/3TsZJv06wG+OjOJPOdMgFrtBgCPvMYlwPN0EO9ZRAjkGk+lmH69SgOVhhK2MNsriNVIHm8CV6Y1yTILeQEbEjHulIO+pFIsdzLQ/vYCNnDf+7u0r3dfh6Dr6SU952syh2sD57DHNUs7RHHKi27fKPAYxlKvvZfwtIqTUtGzB5NVbRq3vKvYi5VnqYB3ZtNV3EEM+8k5n5zexlr4uIG+KRY28uxa03bZe6NgsAi4tMrTwuxMi8QoE7Rfi2CYE5Vvx93U6KJNAXIJCsSKjdFWYlOmFPzNnWRwRwlo0FAyCtYnowPlKm2phiL+zAtRENA1eV8Fvf9rkM4ChbgHqKPXUdTXCyZoWpsuJ/6fUe4QyghnE25M2tpSRZVK/3X0Ln5JHp539SEadISbDXUn7SzqTVvqsvCOm02WcnxZ34SmmpuWYdLEoI7x+tEG3se28rCZtD1sevtTkUj/B3OPR337n1N90X2pvrOQdbS/8glPbyP0m5ZZ5CDMhTJtYJIQQQkafAAFKIgD6g5hcg48E7xKA7xZGDk/Su038CgWbDiZ5yjQ3r/Vwc5bFkGlkfnSuFhi2/Ku0pK6/VcG6h5rSi7P8gv3R9luSvCxlVGnJ9b1CLS2556UfvQF1vqnaOkt/lH48SF82lgiK1kDvqvUy6WJRaEZfKvSgQq63vAs4rD0G5T3pIFqtHxTY6tNt0nea8ztVUNGKwSdtvR+E5/lO7ZM8xLhSLW8903hPJRSLhBBCyKixTJZ7j35YKOCrxBCYJWLsQoi6lXo0yJpuABNB40W3K7/E6IXffinyuTEJ4ixlVGVafIW3lqqr4LfepoL52wuL9aKWiLE7YC82JQ+OFx6J9r259jYuYnJ+Xni7XvSmLNMgFmc3PU33X90vLOfWa8mDqc8a7/qRBbGkbi71k98jLyq1qmQfzfZLcF/id8ThvtS/h+GZatXaqV0dlWKREEIIGUVmo0cggLvAKbCtwmQqq4wweOGP1cr245J92+JzKhWsVQTgsgekTLWtW8xIu0tQW5Yg+rJuQ9fAfSCTwBuBbyP8R1NqOeQaNds7hv+wIsMkaJfVUcsyDWJRFo4J2m4Pm5LRs+Htrbhs3WNVc+OlTqPXSZqtaqbE4k1pNKNlzrMUZJaFF37YeE4dFIuEEELIqCIrd3rR2Tq4rUscSb5J8HwFgsYPqZO27mNKl/JfBJFzfTXTEiFoJABvtN5uch8cv/Vx1PuWJNirQYTJ+Yo1wtebEgcnWeF2KYL3XU7vZw1iUldZAGcmeoUptTze3CshdC/RfaNWoetoqy7GOW4cfNGhDo3IdxaLjfA9xmv88KO/1/d23rXTgjI803jVzMJe+E35tpNIk3rLA6y6BLu3/kHKnw+dptsnv39XqGWtpxrvqYJikRBCCBllgvMfgAB3mfLbNySBewVTGiUQk0Ay2dLiGgTFJ+gVK20EMi2xfWsidAYRDaYsCfb9eI0+nyoI5o5A/usRyO3SAV8ZQSO+OjhFUKjbJLpJea1jq9t4HkFyEL9deeFm/Z6WlFOmvmLSDzr1DdrXIu+j1JKFu5gCq2Fm46OQ76noe7cnoqJknQcxOU8RbkF0qV5RtSyyGnByjbNN+utsRSuwLgZfPf8hEIFbjdBJt2T0cTjn6UWvwW/JTqffsGSLi++W3kc2i5nWa1Ent2niSf//vvGcKigWCSGEkHHAjw6FfRfBzU06cBFzeeemYx0xlIwUyabq22ENp/fAZJ9CP7w0ETqOo2NSNxlBkDK98EoI0qWwB5scq0G2qJDl9/3w17DbtGjU0xUdxFhnSwYRDklALds/hKjrFyDOD65ceAl6NKP1MZQTo7yduq4uq4GKaXFozk8+G6G8/9mG3xedN/MfBGmHIDoC7XIO6nBH0r4F+t2gJucofdxrXY/2+qbeG7MKZHVL/eDCUmbHpK3lmgxzddA6CORhCtrRdo5i0u+D9iV6q51hcNyFn1fHX2KvS7clD8W2pT7AqhI/XKH7Q55gTB4o3Wq8pgqKRUIIIWRcWEDgLu8WBdH/g/0Cf1+7O6jOMwl0RFxI4O2131lYuB2/5eG6XFmVUkSDrYyOJQLxcpR3hg7OmzUHo97p91De/PNQv8+hfj9SjdZF+nx121hMpoTKtDIvugCf30I9P6IF4oeGtKfa0rl7QYC/EmUvg/0M5V+KT7Sppa5iIn7lWnvhHOx7EJyfUY34BXohpGEhezHOhH8N8fafqMsOLRr1tUb9XEZm0kyCcBFmnX4s4ln6lx+txbl+AW3zRD0yWxVL5x6NvNfp0UpbW4vJucmI6jjvsddE/9D7c2ZcGxm9q3rxmCy8ja9Rfny92fs0xaSvhxHq9XLjVS8y08GPvqF/Lzr9uc/wvfRRr/VfxmuqoFgkhBBCxhFZnW95+BgIpMNVEP6jHmHyIlnB9GSIiW/h83gEQcvw+WEcf71qzMkG6Q+E4CwXeK8I749yn4183wuB9SU9hbWB8iTg8qJj8fc/q5nWC9XSdQfo9/WGzaqFuyFQlil4shn8C1GvN+iFURqtdyu//RY1O/9yfPd0LRpm1tyvdHuUxdsFodt6uGpueLK+ll7rjWjHd+Ia/p1qzL9Vi8qg9Ux89xfqSwhs6xjxLMKSNXdVwfzjlTf3T7j+30dbbkFbQwAgoBYB1i0iJfDfw/CdHBOxIKNHq5Be3rX0w6uRzyb0qR+jrx6FNnieOmbtfU2J1SPbmnjt10EgoE9E79rDdD8JX6oF/Tij381EO9tEYsdEqA9LlAlyr0k/brafq69xr82Eh6APPKuSLVKKINPNZ6IDrXUSk3rNbDgIvyv3Nh5TBcUiIYQQQggZDNkEvjmH4D98M8THJyC2Vig//h5E31kQJDJyuyGx8DcQCr9Euv/G59fx7y/i7yMhkI/QgfiXw/ubHElZlm1+GNr895mjiiLeZW/FVRfXJ8rJRECxSAghhBBCKmRhL73xuozYyEivNvwto5KLPZI7Dcj2MjKKaxOJHZMRXj9cYjwISYVikRBCCCGEkElg1WX7QgT+KhGDFpEoJiOOQXytHtElJAeKRUIIIYQQQiYBed/Sj3bp9xFtQlFMC8n4x8aDkEwoFgkhhBBCCJkE/PiU3IVtklHH8d1DkgwVikVCCCGEEELGnUb7ccqLLk/27bSIRDG9sE37YjUbPcJ4EZIJxSIhhBBCCCHjjhcelfmuopjeQ7J1nPEgJBeKRUIIIYQQQsaZYN1DVRBtzRxVTPZVvF3vHUiIIxSLhBBCCCGEjDNefHTuqKIcD9o/0FuZEOIIxSIhhBBCCCHjykzrhRCB12WPKsp2Ge3blD//auNFiBMUi4QQQgghhIwjzXUHqCBuOb2rmGyXsVfiSIgbFIuEEEIIIYSMGytaT4AQPFfNbuoXh93WGVX0opcbT0KcoVgkhBBCCCFkXPC23EMFrbdDCG7NHVEUW3khPuNTjDchhTjrrLOe32vmECGEEEIIIaRWFhb2UqvW3k2tXr23/tvGmjV3VTOtJyiv9X4IwLNVc/5OvWeiTRx2m7zHGLR/p30JIYQQQgghhIwJIhC9sAHbBnHXUn54Jv4+GZ/y3XLlRccrP/4B/p7Hd9epWYhEl9FEMZl+KqIyiN9jSiOEEEIIIYQQMhbMzv8l7Fb93qGMFMqniEFZkKZjK8yxJsSfH/eLwjRbiXy8KDAlEUIIIYQQQggZG/zoM7kL1Axix10oQvF0dcza+5qSCCGEEEIIIYSMDY3Wieq4i+yCbxAL4mQ0shH+XB03v78phRBCCCGEEELI2LBk4S7KC/872QPRIvyKmixmM7txl/KiU5W3/kGmFEIIIYQQQgghY8WqtfsqP1zjvGBNmslCNlpwhtcqv/UhtSS+uymBEEIIIYQQQsjYsXTuXiqIfjmQWJTFbmThG72HYnQDROIpqjH3FJMzIYQQQgghhJCxxo9PVCf8NlntVEYI5Z3DXmEo38kxSdNZIdULIRCjEMe+oprxQWr1wt4mR0IIIYQQQgghY8+K8DHKi45VQXiW8sOLIAKvx+euLrG4E3Ytvt8CQ5qoibT/CDtELdt2T5MLIYQQQgghhBBCCCGEEEIIIYQQQgghhBBCCCGEEEIIIYQQQgghhBBCCCGEEEIIIYQQQgghhBBCCCGEEEIIIYQQQgghhBBCCCGEEEIIIYQQQgghhBBCCCGEEEIIIYQQQgghhBBCCCGEEEIIIYQQQgghhBBCCCGEEEIIIYQQQgghhBBCCCGEEEIIIYQQQgghhBBCCCFThFL/Hz8NI/sTi7LRAAAAAElFTkSuQmCC
Desafio Semanal #18
A abóbora é um alimento muito consumido em vários os países. China, Índia, Rússia, Ucrânia e Estados Unidos figuram na lista dos principais produtores. Dentro dos EUA, o estado de Illinois é o maior produtor deste vegetal desde, pelo menos, o ano 2000.
Para essa semana, seu desafio é preparar e transformar dados com o objetivo de identificar os estados que tiveram maior e menor produção de abóbora no período de 2000 a 2016.
• Conjunto de dados 1: contêm informações sobre a produção de abóbora em diferentes estados (indicados por código) no período de 2000 a 2016.
• Conjunto de dados 2: contêm uma tabela de consulta delimitada por barras verticais, sendo que o número de dois dígitos apresentado logo no início da cadeia se refere ao estado.
Usando as duas entradas, crie uma tabela que identifique os estados mais e menos produtivos com relação ao volume de produção de abóbora por ano. Compare os valores de produção com a produção média para esse estado.
Saída
Entrada
2000
Illinois
3636000
4713117.64705882
-1077117.64705882
Michigan
704000
853823.529411765
-149823.529411765
2001
Illinois
3192000
4713117.64705882
-1521117.64705882
Michigan
528000
853823.529411765
-325823.529411765
2002
Illinois
2988000
4713117.64705882
-1725117.64705882
Michigan
816000
853823.529411765
-37823.5294117647
2003
Illinois
3258000
4713117.64705882
-1455117.64705882
New York
742000
903529.411764706
-161529.411764706
2004
Illinois
4572000
4713117.64705882
-141117.647058823
New York
819000
903529.411764706
-84529.4117647059
2005
Illinois
4967000
4713117.64705882
253882.352941177
Michigan
754000
853823.529411765
-99823.5294117647
2006
Illinois
4918000
4713117.64705882
204882.352941177
New York
798000
903529.411764706
-105529.411764706
2007
Illinois
5420000
4713117.64705882
706882.352941177
Michigan
713000
853823.529411765
-140823.529411765
2008
Illinois
4960000
4713117.64705882
246882.352941177
Ohio
931000
1137941.17647059
-206941.176470588
2009
Illinois
4291000
4713117.64705882
-422117.647058823
Michigan
737000
853823.529411765
-116823.529411765
2010
Illinois
4274000
4713117.64705882
-439117.647058823
Michigan
952000
853823.529411765
98176.4705882353
2011
Illinois
5204000
4713117.64705882
490882.352941177
New York
693000
903529.411764706
-210529.411764706
2012
Illinois
5563000
4713117.64705882
849882.352941177
Michigan
945000
853823.529411765
91176.4705882353
2013
Illinois
5476000
4713117.64705882
762882.352941177
Pennsylvania
856000
1020588.23529412
-164588.235294118
2014
Illinois
7458000
4713117.64705882
2744882.35294118
New York
690000
903529.411764706
-213529.411764706
2015
Illinois
3179000
4713117.64705882
-1534117.64705882
New York
489000
903529.411764706
-414529.411764706
2016
Illinois
6767000
4713117.64705882
2053882.35294118
Minnesota
167000
167000
0
C:\Users\u0163072\AppData\Local\Temp\Engine_36204_b6d640fbeeec45f29b1e28ab6f26b075_\Engine_17020_93d87cbb7cf7447c854b466c056fa52b_.yxdb
Single
Profile
Desafio Semanal #18: Maiores produtores de abóboras
2016
6
1,350,000
2016
17
6,767,000
2016
18
662,000
2016
26
791,000
2016
27
167,000
2016
34
202,000
2016
36
322,000
2016
37
936,000
2016
39
930,000
2016
41
483,000
2016
0
2016
42
735,000
2016
47
274,000
2016
48
1,480,000
2016
51
372,000
2016
53
398,000
2016
55
201,000
2015
6
1,464,000
2015
17
3,179,000
2015
26
770,000
2015
36
489,000
2015
39
842,000
2015
42
794,000
2014
6
1,798,000
2014
17
7,458,000
2014
26
970,000
2014
36
690,000
2014
39
1,053,000
2014
42
1,050,000
2013
6
1,947,000
2013
17
5,476,000
2013
26
978,000
2013
36
960,000
2013
39
1,004,000
2013
42
856,000
2012
6
1,870,000
2012
17
5,563,000
2012
26
945,000
2012
36
1,071,000
2012
39
1,440,000
2012
42
1,147,000
2011
6
1,674,000
2011
17
5,204,000
2011
26
986,000
2011
36
693,000
2011
39
1,122,000
2011
42
1,026,000
2010
6
1,984,000
2010
17
4,274,000
2010
26
952,000
2010
36
1,462,000
2010
39
1,104,000
2010
42
972,000
2009
6
1,479,000
2009
17
4,291,000
2009
26
737,000
2009
36
750,000
2009
39
1,237,000
2009
42
819,000
2008
6
1,484,000
2008
17
4,960,000
2008
26
986,000
2008
36
1,062,000
2008
39
931,000
2008
42
1,240,000
2007
6
1,224,000
2007
17
5,420,000
2007
26
713,000
2007
36
1,152,000
2007
39
2,013,000
2007
42
936,000
2006
6
1,325,000
2006
17
4,918,000
2006
26
855,000
2006
36
798,000
2006
39
1,340,000
2006
42
1,248,000
2005
6
1,595,000
2005
17
4,967,000
2005
26
754,000
2005
36
795,000
2005
39
1,332,000
2005
42
1,313,000
2004
6
1,404,000
2004
17
4,572,000
2004
26
1,008,000
2004
36
819,000
2004
39
1,116,000
2004
42
1,216,000
2003
6
1,225,000
2003
17
3,258,000
2003
26
1,022,000
2003
36
742,000
2003
39
1,088,000
2003
42
750,000
2002
6
1,540,000
2002
17
2,988,000
2002
26
816,000
2002
36
1,071,000
2002
39
924,000
2002
42
1,170,000
2001
6
1,464,000
2001
17
3,192,000
2001
26
528,000
2001
36
1,344,000
2001
39
944,000
2001
42
988,000
2000
6
1,800,000
2000
17
3,636,000
2000
26
704,000
2000
36
1,140,000
2000
39
925,000
2000
42
1,090,000
Entrada 1
Entrada 1
ESTADO|SIGLA|NOME DO ESTADO|ESTADONS
01|AL|Alabama|01779775
02|AK|Alaska|01785533
04|AZ|Arizona|01779777
05|AR|Arkansas|00068085
06|CA|California|01779778
08|CO|Colorado|01779779
09|CT|Connecticut|01779780
10|DE|Delaware|01779781
11|DC|District of Columbia|01702382
12|FL|Florida|00294478
13|GA|Georgia|01705317
15|HI|Hawaii|01779782
16|ID|Idaho|01779783
17|IL|Illinois|01779784
18|IN|Indiana|00448508
19|IA|Iowa|01779785
20|KS|Kansas|00481813
21|KY|Kentucky|01779786
22|LA|Louisiana|01629543
23|ME|Maine|01779787
24|MD|Maryland|01714934
25|MA|Massachusetts|00606926
26|MI|Michigan|01779789
27|MN|Minnesota|00662849
28|MS|Mississippi|01779790
29|MO|Missouri|01779791
30|MT|Montana|00767982
31|NE|Nebraska|01779792
32|NV|Nevada|01779793
33|NH|New Hampshire|01779794
34|NJ|New Jersey|01779795
35|NM|New Mexico|00897535
36|NY|New York|01779796
37|NC|North Carolina|01027616
38|ND|North Dakota|01779797
39|OH|Ohio|01085497
40|OK|Oklahoma|01102857
41|OR|Oregon|01155107
42|PA|Pennsylvania|01779798
44|RI|Rhode Island|01219835
45|SC|South Carolina|01779799
46|SD|South Dakota|01785534
47|TN|Tennessee|01325873
48|TX|Texas|01779801
49|UT|Utah|01455989
50|VT|Vermont|01779802
51|VA|Virginia|01779803
53|WA|Washington|01779804
54|WV|West Virginia|01779805
55|WI|Wisconsin|01779806
56|WY|Wyoming|01779807
60|AS|American Samoa|01802701
66|GU|Guam|01802705
69|MP|Northern Mariana Islands|01779809
72|PR|Puerto Rico|01779808
74|UM|U.S. Minor Outlying Islands|01878752
78|VI|U.S. Virgin Islands|01802710
Entrada 2
Input 2
Campo 1
Last
Transforma as informações em colunas
Padroniza nome e tipo das colunas baseado na Entrada 1
Skip
1
Retira linha que não será utilizada
Skip 1st 1
Junção dos dados das entradas e transformação do campo Valor em número
Média que cada estado produziu por ano
Trata campo valor
Ordenação de dados
Ano - Ascending
Média Produzida no Ano - Descending
First
1
Estado com maior média de produção no ano
First 1
Last
1
Last 1
Média que cada estado produzida em todos os anos
Max diferença da média produzida = [Max Venda de abóboras]-[Máx Média produzida...
Ordena exibição das colunas
C:\Users\u0163072\AppData\Local\Temp\Engine_36204_b6d640fbeeec45f29b1e28ab6f26b075_\Engine_17020_35d2aa48bf624dffa94118414b32e821_.yxdb
Single
Profile
Horizontal
PT_Desafio_Semanal_18_marcelotr