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/hLi/8A5R/XyYf8SteNn/RPcN/+LP8ACv8A+jU/XKivyN/4eH/tC/8ARrPwZ/8AEsfG/wD9CDR/w8P/AGhf+jWfgz/4lj43/wDoQaP7VwP/AD8q/wDhLi//AJR/XyYf8SteNn/RPcN/+LP8K/8A6NT9UfCN/f6r4U8Mapqi7NT1Lw9ot/qKeSbfZf3mm21xeL5BwYNtxJIPJIBjxsP3a6Gvx90n/go5+0JqWlaZqI/Za+DRF/p9negn9qvxvASLq2jnBMA/ZJuvJJEnMX2q58v7nnzY8xtD/h4f+0L/ANGs/Bn/AMSx8b//AEINbYnNsC8RXa56Kdaq1RjhcXy0rzf7uP7he7C/KtFotlZ2mP0WfGzlj/xj/DkvdXvPxP8ACu703f8Axmu73P1yor8jf+Hh/wC0L/0az8Gf/EsfG/8A9CDR/wAPD/2hf+jWfgz/AOJY+N//AKEGsf7VwP8Az8q/+EuL/wDlH9fJlf8AErXjZ/0T3Df/AIs/wr/+jU/XKivyN/4eH/tC/wDRrPwZ/wDEsfG//wBCDR/w8P8A2hf+jWfgz/4lj43/APoQaP7VwP8Az8q/+EuL/wDlH9fJh/xK142f9E9w3/4s/wAK/wD6NT9UdFv7+81Lxdb3i7bfSvENtYaWfJMe+wk8KeGNUkbef+PjGp6lqKecMhdnkdYCB0NfFv7Kv7THxN/aN0b4k6lq/wAJvAngW8+G/wAVB8NNSsNN+LviDxfbXO74a/DP4jpqtjqVz8HPCctzusfiPb2jWtxpeneXd2E0QmlhKXkv1pq9x4nhkhGg6PoOpQsjG4fV/EeoaJJFJu+VIYrPwt4gWdCvLSPNbsrfKImHz17KisZ9Xq4f6rCnXoU/Z/7Th6SvQowpVZVlWnSeHq1KkJTlCvGnOVSUuTn+J/i/E/DOd8FZ7mPDPEmEjgs5yudBY3DUcXgs0ow+uYajj8LKhj8pxOPy7GUauExWHrU62Dxdei4VI++pKUY71FYmpT+I4ra1bR9K0S+u3x9tg1LX77Sba3/dgn7LdWvhrWpbzEu5B5tnY5jAk4YmJWRXHigxxmbR9BjmKIZUi8R6hLGkhUb0jlbwrC0iK2QkjQxM6gMYoydolYao4KopUOVuUUnisNGd4uzvTlWVSK/llKKjJaxbWp4PMr2tL/wCbX38tjeooorAo/PL/gqb/wAmZeJv+y5/sY/+to/s+1+Ulfq3/wAFTf8AkzLxN/2XP9jH/wBbR/Z9r8pK/qHwn/5N/D/sseIv/VJweftvAf8AySkf+yhzf/1W8PhRRRX359WFFFFABWfpN3FqGlaZfwQ/Z4L3T7K7ht8KPIiubaOaOHCAIPKRwmEAX5flAGK0Kz9Jks5dK0yXTU8rTpdPspLCPaU8uye2ja1TYSSmyAou0klcYJOK0SXspvlk2qlJKavyRTjWvGWvxSaTjptCeq1uvtLVbS06vWOq8l19UaFFFFZjCiiigArPsruK5udWhjh8p9P1CO0nfC/6RK+laZfib5QCdsF7Db5fLfuMA7AgGhWfZSWb3OrLapsni1COPUm2lfNvTpWmSo+STvxp0thHuGAPL2YyhJ0gk41rxlJqmmnG9oP21Jc0/wC603BX+3OAnvH1+/3Xt59fRM0KKKKzGFFFFABWfJdxJqtlYGHdPc6fqd3HcYX91FZXOkwzQ5I3/v31CB8KQp+z/OCQmNCs+SSzGq2UTpnUX0/U5LWTaTssornSVv035wvmTy6a20gl/KyCNhzpSScneMpL2dZ2je6apTak9V7sGlOf9yMrp7Cltul70d/8S09XsvNo0KKKKzGFFFFABXi3x5/5E7wp/wBl9/ZY/wDWnPhFXtNeLfHn/kTvCn/Zff2WP/WnPhFWlH+LS/6+Q/8ASke7wv8A8lNw7/2Pco/9WGHPrmiiiv8AOs/ssKKKKACvPNR+Lvwo0f4jaB8HtX+J3w80r4ueK9Jm1/wv8LNR8aeG7H4jeJNCtotanuNa0DwRc6lF4m1jSYIPDfiKabUdO0y5s4otA1qR5lTSr4weh1/LP/wUy+LPjz4If8Fu/wBj/wCI/wALvhbqPxp+I2l/spSaH4I+GWl3h0+48UeJ/HN/+1b4D0aOe+EFx9k0vS73xLDrmtzssKR6Npl+0l5p6Br63+j4YyH/AFixuLwKqujVo5TmePw75qVOFTEYLDSrUKNWrXlClRo1aijCrWnOMaUG5uSSbPh+PuMP9Scpy3NpYdYjD4niTIMnxi9nia1Wjgc0x9PDYvE4fD4SFXEYnFYehKdTD4alTqTr1VGlGEpSUX/URpF5FqGlaZfwQ/Z4L7T7K8ht8KPIiubaKaOHCAIPKRwmEAX5flGMVoV+Bv7M3/BTr9rHw3+1D8L/ANk//goJ+zH4N+A998ctNjPwP8XfDnUJ7vw5PM1qToOialKPHHxI0jWxq0scWiG+0TxLZ3+ha5e6LZaz4bhttTe/sP3yrnz3JMbkeLjRxcaLp4qm8Vg6+GxVHG4bEYaVWpTU6WJw9SpTqOFSnOlUXNzxqQfMrOLl6XC3FmU8W4PFYnK/rtKpl+Mnl2ZYDNMvxeVZnl2Np0qVd0MZl+NpUcRQlOhXo16TcHCdOouWXNGcYFFFFeIfTBRRRQB90/8ABM7/AJF/9q7/ALOph/8AWVf2Wq/S+vzQ/wCCZ3/Iv/tXf9nUw/8ArKv7LVfpfX0eXf7nS9av/p6of51/SJ/5O/xR/wBgfCP/AKxfDoUUUV2n4mFFFFAH55f8FTf+TMvE3/Zc/wBjH/1tH9n2vykr9W/+Cpv/ACZl4m/7Ln+xj/62j+z7X5SV/UPhP/yb+H/ZY8Rf+qTg8/beA/8AklI/9lDm/wD6reHwooor78+rCiiigArP0mOzi0rTItNfzdOi0+yjsJNxfzLJLaNbV95AL74AjbiAWzkgZrQrP0m0i0/StMsIJvtEFlp9laQ3Hynz4ra2jhjmyhKHzUQPlCV+b5SRitE17Ka5pJupSagr8kko1rylp8UW0o67Tno9bL7S0W0teq1jovJ9fRGhRRRWYwooooAKz7KOzS51ZrV988uoRyaku4t5V6NK0yJEwQNmdOisJNoyD5m/OXIGhWfZWkVtc6tNHN5r6hqEd3Ony/6PKmlaZYCH5SSN0FlDcYfDfv8AIGwoTpBpRrXlKLdNJKN7TftqT5Z/3Uk5q/24QE946dfu917efT0uaFFFFZjCiiigArPkjszqtlK741FNP1OO1j3Eb7KW50lr99mMN5c8WmruJBTzcAHecaFZ8lpE+q2V+Zts9tp+p2kdv8v72K9udJmmmwTv/cPp8CZUFR9o+cglM6UmlJ3lKK9nWV43u26U0ovR+7NtQn/clK7W4pbbJ+9Hf/EtfVbrzSNCiiisxhRRRQAV4t8ef+RO8Kf9l9/ZY/8AWnPhFXtNeLfHn/kTvCn/AGX39lj/ANac+EVaUf4tL/r5D/0pHu8L/wDJTcO/9j3KP/Vhhz65ooor/Os/ssKKKKACv5Yf+CnXxi8W/s//APBbf9kD4x+C/hn4g+MGseA/2VP7Wvfh74UgmuvEmt+EpdT/AGq9O8f3WiW8EFy82o+HfAl74j8TWyNEYTJow+0vFb+bKn9T1FfQcN53TyHG4nE1sBHMqOKyzMMsq4SeInhYzpZhh5Yeo5VadOpU5VCTvGHs5yTajVpytJfGcdcJ4jjDKsDl+EzieRYrL8/yXP8ADZjTwNPMKlLEZLjYY2jGnh61ajR55VIR5alX21KnJJ1MPXjem/5Rx8fL3/grz/wUA/YQvP2e/gx8U/BfwM/Yj8Yn4j+OfiF8SNL03TLu1vLHXPAXiebQNXbQdX8TaFZzXtz8MfDnh/w7pcWvXev6tca5rGpXOnafpem3d1af1cVn6RaRafpWmWEE32iCx0+ys4bj5T58VtbRQxzZQlD5qIHyhK/N8pxitCtOI88o5vPA4fBYH+z8tynD1sLgsNLE1MZWl7fF18ZicTiMTVp0p1K2JxFedRx9lCNNWhGOjlKeDeE8Vw488x2a51LiDPeJMxo5jm2ZrL6OVUJfVMvwuV4DC4XL6FbEww9DCYHB0qalLEV6tao51alT3lGJRRRXzZ9qFFFFAH3T/wAEzv8AkX/2rv8As6mH/wBZV/Zar9L6/ND/AIJnf8i/+1d/2dTD/wCsq/stV+l9fR5d/udL1q/+nqh/nX9In/k7/FH/AGB8I/8ArF8OhRRRXafiYUViabr9jq1tdXVrBrcUVnnzV1Lw14j0a5fEZk/0Wz1jSrG7vvlBA+xQXGZMRDMrKhZpHiPT9bkmisrfXoWgRZHOr+FvE/h+NlZtoEM2vaRpsNw+fvRW7yyKvzsgXmuiWFxUFVcsNiIqg4qu5UaiVFztyKq3Fezcrrl57c11a9yVOLtaUXzfDZr3rb2728j4Q/4Km/8AJmXib/suf7GP/raP7PtflJX6df8ABT7xPpupfsg+KNOt7bxDHcJ8c/2N8yX/AIR8WaVYHyP20v2fg+3VNU0Wz0x92P3Oy8b7QOYPMBBr8sf7YtPtv2DydU8/zPK3/wBh619i3Yzn+0f7P/s/y/8Apt9q8rPG/PFf1B4U4bEw4BjCeHrwkuLuIarjKjUjJU3kvB9qjTimoPpO3L5n7bwHOL4Ti1KNv9Ys3V7q1/7N4f09dVoalFZdzrFpaXK2ssOqNK2zDW2h61e237w4XdeWenz2a4/j3TjyhzJsHNOvtVtdPeNLiLUpDIpZTY6NrGpoADgiSTTbG7SJs9ElZHI5Ckc196qFduCVGq3UTlTSpzbmlq3BJe8ktW1dH1fNHX3o6Oz1Wj7PszSorPu9TtrKKGaaPUHSfGwWmk6rfyrlQ/76Cwsrme34OD9ojiw2UPzgqCTU7aKyS/aPUDBJt2pHpOqy3o3kgb9Oisn1CLGPm8y1TYMF9oIJSo1motUqjU5ckGoSanPbki7e9K/2Vd+Q+Zd1pq9Vou5oVm6NYvpmj6VpsjrK+n6bY2LyoCEke0tYrdpFB5CuYyyg8gEA806PU7aWye/WPUBBHu3JJpOqxXp2EA7NOlsk1CXOfl8u1feMlNwBIy/DF1nQNNhmTUBc6bpdhbXxu9M1a0le5t7KJZ2hS/s7e4vMyI+HgjlLsQOXYKdVSrKhWvGcYxr0Yzg6cr86jWSvJr3XDm5XF6t1I+RPNHnjqm3GTTutrxvp1va9/JnSUVm2Oq2uoPIlvFqUZjUMxvtG1jTEIJwBHJqVjaJK2eqRM7gclQOabbaxaXdy1rFDqiyrvy1zoetWVt+7OG23l5p8Fm2f4Ns580cx7xzWboV05p0aqdNKVROnNOEWrqU7r3U1qm7Jormjp7y121Wvp3NSisv+2LT7b9g8nVPP8zyt/wDYetfYt2M5/tH+z/7P8v8A6bfavKzxvzxRc6xaWlytrLDqjStsw1toetXtt+8OF3Xlnp89muP49048ocybBzR7CvdR9jV5pQ9pFezndw/nStdw/vLTzFzx/mjo7PVb9vXyNSs2xsXtLrWbhnVxqepRX0aqCDEkej6VppjcngsX095QRxskUdQaL7VbXT3jS4i1KQyKWU2OjaxqaAA4Ikk02xu0ibPRJWRyOQpHNZsV1/Zc2rXd6moSW+p6pDc6etppmralLHbLoej2zLNbWNnczWX+lWt0Sk8cQ3MSf3jsK1pUq7hU5YzSrUuWC9nJ/WOWvRk6dJ296UWlUfLdqNOSejYnKN1qvdlrqvd917/fbW2rR0lFZ8mp20Vkl+0eoGCTbtSPSdVlvRvJA36dFZPqEWMfN5lqmwYL7QQSR6nbS2T36x6gII925JNJ1WK9OwgHZp0tkmoS5z8vl2r7xkpuAJGPsa1ub2VS3P7O/JK3tP8An3e1uf8Au/F5Fc0e62vutu/p57GhRWfaanbXsU00MeoIkGd4u9J1WwlbCl/3MF/ZW09xwMD7PHLlsIPnIUtsdVtdQeRLeLUozGoZjfaNrGmIQTgCOTUrG0SVs9UiZ3A5Kgc0OjWXO3SqJU7e0vTkvZ823Pp7l7q3Na/QOaLtaS121Wvp3+RpVmy2LyaxY6kHUJaabqti0RB3u+oXWjXCSKegWMaZIrA8kyoRwDTbbWLS7uWtYodUWVd+WudD1qytv3Zw228vNPgs2z/BtnPmjmPeOay5r9W8T6eix6p5UGn6xYzn+x9bFkbu7utDmtH+2/YP7OeNYrK8H2n7V5UZbYHzKRW1KjiI1Jr2dSnKNCtOXNSlpTdGondNaKon7OM3opSTTuTKUbLVNc0Nmt+aLX3aNrsdRRWXc6xaWlytrLDqjStsw1toetXtt+8OF3Xlnp89muP49048ocybBzTr7VbXT3jS4i1KQyKWU2OjaxqaAA4Ikk02xu0ibPRJWRyOQpHNZKhXbglRqt1E5U0qc25patwSXvJLVtXQ+aOvvR0dnqtH2fZmlRWfd6nbWUUM00eoOk+NgtNJ1W/lXKh/30FhZXM9vwcH7RHFhsofnBUEmp20Vkl+0eoGCTbtSPSdVlvRvJA36dFZPqEWMfN5lqmwYL7QQSlRrNRapVGpy5INQk1Oe3JF296V/sq78h8y7rTV6rRdzQrxb48/8id4U/7L7+yx/wCtOfCKvWY9TtpbJ79Y9QEEe7ckmk6rFenYQDs06WyTUJc5+Xy7V94yU3AEjxb43anbXvgnwzNDHqCJB8ff2WN4u9J1WwlbH7TXwjf9zBf2VtPccDA+zxy5bCD5yFOlKlVVSDdKolCtCE24SSjPniuWTt7srte67PVaHu8Lyj/rNw57y1zzKGtVqv7Qw+q7rzPp3x9458LfDDwL40+JXjnVP7D8E/Dzwn4j8c+MNa+w6jqf9j+FvCWj3mv+INU/s7R7TUNW1D+z9J0+7u/sWl2F7qN15PkWVpc3MkUL8l8Dfjl8Lf2kvhb4X+NPwW8Uf8Jn8M/Gf9t/8I14l/sTxF4d/tL/AIR3xFq/hPWf+JN4s0jQtfs/sev6Fqth/p+lWv2j7L9qtfPsp7a5m8U/bo1a11H9hn9tVLeLU4zH+yX+0WzG+0XWNLQg/CDxiAI5NTsbRJWz1SJndRyygc1/NX+wRqX/AAWQ139hT4a3/wCx1rPwn+H/AMFfg9a/EuTwp4e1/wALW+sePvj/ACn4l+NvGHiqTSr3xP8AD/xh4YVLPxBrGreCtOsofFfw7ubqfQ5ooJrq/Y3Z/h/J+EI5vkOLzCWOw+V43C5zg8C55tiPqmXrCYjBYmu3JRwtbEPEyr06CpuL9lGg61SrFQg6tP8Ad+KfETF8McZZfkSyLMs+y7GcKZnnUqHD2XSzHPFjsFmuXYWLSqY/CYOnl0MHiMVOv7WPtp4pYWlh6sqtWGHrf2MUV+d3/BND9uEftz/sveEvi3ruhpoPxBtNc1nwB8R9M8P6Xrc/he28aeHY7G6mu9LvpIr2LT9P1vQtX0LxBHp2o6jJcaQdWOmyXd9HbQ6jefftzrFpaXK2ksOqvK3l4e20PW722/eHC7r2z0+ezXH/AC03TjyhzLsHNfMY/KswyzH4rLcXhqkMXhKtWlWpxi5q9KbhKcJRTVSk2rwqRvCUWmnZn6BkudZdxBlGXZ5lddYjLs1wdDG4Os4uEpUcRTjUgp05WlTqxUuWpSmlOnUUoSSlFmpRWbfata6c8aXEWpyGRSymx0XWNUQAHBEkmmWN2kTZ6JKyOw5VSOadeanbWMUM00WoOk+Ngs9I1bUJVyof99BYWVzPb8HB+0RxYbKH5wVrjVGtLktSqv2rap2pyftHHdQsvfa68t7dT1OZK92tN9Vpfv2G6LYvpej6Tpkkiyvp2m2Fi8qAqkj2lrFbtIqnkK5jLKDyAQDzWlXNaPdf2b4X0R79NQklg0rTLa5Eematd3puYrWKGZnso7J9S5lRyzy2qkAh5NoYE6sep20tk9+sWoCCPdujk0jVob07CAdmmy2SajLkn5fLtX3jJTcASNK9Ks6tWbjOoniKkHVjTkoTq87uo2VlKT1UE7q6VhRa5YrRe6na+qVl/VzQorPs9Ttr6KaaGLUESDO8Xmkatp8rYUv+5gv7K2nuOBgfZ45cthB85C02x1a11F5Et4tTjMahmN9ousaWhBOAI5NTsbRJWz1SJndRyygc1k6NZc7dKolTt7S9OS9nzbc+nuXurc1r9B8y01Wu2u/p3+Rx2o/F34UaP8RtA+D2r/E74eaV8XPFekza/wCF/hZqPjTw3Y/EbxJoVtFrU9xrWgeCLnUovE2saTBB4b8RTTajp2mXNnFFoGtSPMqaVfGD0Ov5Xf8AgpP8ZfG3wd/4Lc/sh/Er4UfCrW/jN8RdG/ZZn8OeCvhjbLf6Bd+KfFfjW+/ar8C6Qr3V7Yb49F0y98UQa3rGoRxraf2Ppmo/8TGyWOW9tfrn9nb/AIKffteeHP2tPAf7Jn/BRb9mLwr8B/EHxrae3+EXi/wBd3l34fuNX2sNM0bUblfGvxI0PxJHq16q6I2seG/E8Euia5e6Ra6toMVnqMuoaf8AcYrgPMVlmXZlgJ0cQsTkKznE4Sti8JRzCLp1sXHGLCYCVWOKxNDC4ehRrVKsaTu6soQc5xcV+RYDxdyhZ/nmQZ3QxmAnl/GP+q+DzHD5ZmeJya2IwmWTyuWa5xDDyy/AYzMcdjMThKFCdeOlCFWoqVOpGpL+tL/gmd/yL/7V3/Z1MP8A6yr+y1X6X1+WX/BODxHp+laZ+1PYXVvr0s9x+1NaSRyab4W8T6xZKs37Lf7L0KCfUtI0i+061cPGxliubqGSCIxzzJHBLFI/6X6v4j0/RJIYr2316Zp0aRDpHhbxP4gjVVbaRNNoOkalDbvn7sVw8UjL86oV5rzsswmLnhMKoYXESdZV5UVGjUk6sY1qnNKklF+0jH7ThdLrY/kf6RU4Lxf4pvKPu4ThFS95aN8F8O2T10b6XN6isTUtfsdJtrW6uoNblivMeUum+GvEes3KZjEn+lWej6VfXdj8pAP22C3xJmI4lVkDIvEmnyxxyrb68FkRJFEvhXxRDIFdQwEkM2jxzROAfnjlRJI2yrorAgdiwuKlBVI4avKnJyjGao1HByi7SSko8rcXpJJ3T0Z+J88U7c0b9rq/3G9RRRWBR+eX/BU3/kzLxN/2XP8AYx/9bR/Z9r8pK/Vv/gqb/wAmZeJv+y5/sY/+to/s+1+Ulf1D4T/8m/h/2WPEX/qk4PP23gP/AJJSP/ZQ5v8A+q3h8KKKK+/PqwooooAKy9D+2/2Lo/8AaPmf2h/Zen/b/Ox5v237JD9q83HHmefv3443ZxWpWXodzc3ui6PeXi7by70vT7m6XyzFtuZ7SGWceWeY8Ssw2HlPu9q1V/YVHaNva0bt/Gm4V7KP91pSc/OMCX8S3vyy06bw389rerNSiiisigooooAKy9P+2/a9c+1eZ5H9qQ/2dvxt+xf2Lo+/ycf8s/7Q+35zz5vm9sVqVl6fc3M93rkU64istUhtrM+WU3WzaLo94x3f8tf9Mu7pd44G3y+sZrWnfkr2UGvZLmcviivb0daf9+9ov/p3KYnvHf4v/bZb/wBb2NSiiishhRRRQAVlzfbf7a0/Z5n9n/2XrH2rGPK+2/a9D+wb+/meR/aPlY42+dntWpWXNc3K61p9mq/6HPpesXM7eWTi5tLvQ4rUeZ0TdFe3h2dZNu4f6o1rRu5uyi37KvpPayoVHJr+/FXcP76iTLZb/FDb/ErfJvR+VzUooorIoKKKKACvFvjz/wAid4U/7L7+yx/6058Iq9prxb48/wDIneFP+y+/ssf+tOfCKtKP8Wl/18h/6Uj3eF/+Sm4d/wCx7lH/AKsMObv7bGga74r/AGNP2t/C/hfRdW8SeJvEn7Mfx60Dw74d0DTbzWNd1/XdY+FfivTtI0XRdI06G51DVdW1XULm3sdO06xt57y+vJ4ba2hlmlRG/m3/AGPv2j/+Cq/7Ff7Gng/4BaP/AME5Pir4+/tmHx5N8E/Gx8NeONP1z4XzeI/HHiqTUbb4r/DS38F6tqsb23jCfWPFOif8JVqHw8t77w1q+kXwu9Q0W6tbxv65KK/hbJuJqOWZZiMpxmSYDOcHiMxw+ZShjauLpclfC0KtGl7N4StRkv4r5+aU4VKTqUZ05RqNr+huKOA8Vn+f4PiTLOLM44XzPBZHjchhVyrD5bX9rhMwxmGxeIVaOY4bFQl/u0VS9nCnVo140MVSrQqUFGX5c/8ABID9j3xv+xX+xronw6+J8NvYfEvxx418Q/FjxxoNreQajD4X1bxJpvh7QdP8OPqFpLNZXd9p3hrwnoI1iSwllsItal1G2srq/toItQu/1GoorxM1zLE5xmWNzTGODxOPxFTE1vZxcacZVJX5KcW5ONOCtCCcpSUIpSlJ3b+s4dyLAcMZHlXD2WRqLAZPgcPgMK601UrTp0IKHta04xhGdatJSq1pRhCDqTk4QhG0UUUUV557Jl6H9t/sTR/7S8z+0f7L0/7f52PN+2/ZIftXm7ePM8/zN+ON2ccVqVl6Hc3N7omj3l6u28u9L0+5u18sxbbme0hlnXyjzHiV3HlnlPunpWpWte6r1lJRi1VqXUPgT53dQ/up6R8rCj8Md9lvvt18wooorIZ/LD/wU6+MXi39n/8A4Lb/ALIHxj8F/DPxB8YNY8B/sqf2te/D3wpBNdeJNb8JS6n+1Xp3j+60S3gguXm1Hw74EvfEfia2RojCZNGH2l4rfzZUoX/7Q+qf8FiP+Ch37DutfAX4MfFLwZ8Fv2MPHl18UviF8QviNpGm6TdWupxeIvAvi280DVl0HV/E2g2Et7e/DTw/4f8ADmkxa9d6/qk+uaxqNzp2n6Xpl3dWn9VtFfoNHjbCUMHl3JkEHnGVZDXyHA5tPMqzjTpYpY6nWrzwEcPGlUlGjj68cPCVX93OpOdSdeLp06X4vifCjMsXmedurxnVjwxxFxjg+MM24ap5DhYzr4jL55TXwuEp5zPG1MTQpzxOTYOpjasMPevSo0qNClhJKvWxH3T/AMEzv+Rf/au/7Oph/wDWVf2Wq/S+vzQ/4Jnf8i/+1d/2dTD/AOsq/stV+l9eDl3+50vWr/6eqH8p/SJ/5O/xR/2B8I/+sXw6FFFFdp+JhRRRQB+eX/BU3/kzLxN/2XP9jH/1tH9n2vykr9W/+Cpv/JmXib/suf7GP/raP7PtflJX9Q+E/wDyb+H/AGWPEX/qk4PP23gP/klI/wDZQ5v/AOq3h8KKKK+/PqwooooAKzdGvn1PR9K1KSNYn1DTbG+eJCSkb3drFcNGpPJVDIVUnkgAnmtKs/SbuLUNK0y/gh+zwXun2V3Db4UeRFc20c0cOEAQeUjhMIAvy/KAMVol+5m+S9qlJe0v8N41nyW6+0tzX6ezt1J+0tfsy076x1+W3/bxoUUUVmUFFFFABWbY3z3d1rNu0aoNM1KKxjZSSZUk0fStSMjg8Bg+oPEAONkanqTWlWfZXcVzc6tDHD5T6fqEdpO+F/0iV9K0y/E3ygE7YL2G3y+W/cYB2BANaavCs/Z89qSale3sv31Jc7X2rp+zt/085ugnvHW2v3+69P1+RoUUUVkMKKKKACs2W+ePWLHTRGpS703Vb5pSTvR9PutGt0jUdCsg1ORmJ5BiQDgmtKs+S7iTVbKwMO6e50/U7uO4wv7qKyudJhmhyRv/AH76hA+FIU/Z/nBITGlJXk1ye0/d1ny3ta1Gb57/APTu3tLdeW3UmW29vejr/wBvLT/t7b5mhRRRWZQUUUUAFeLfHn/kTvCn/Zff2WP/AFpz4RV7TXi3x5/5E7wp/wBl9/ZY/wDWnPhFWlH+LS/6+Q/9KR7vC/8AyU3Dv/Y9yj/1YYc+uaKKK/zrP7LCiiigAoor8P8A9qj9uv4ifs/f8Fc/2Z/gd4o+M2h/Dn9kXxH+zT4o+Jvxc0nxJo/gS10aXW9N0T9pmey1m68bavoE3jLS3bUvAXgiCz0nRPEllb6lfWFtp1vp11caxe22o+rlGT4vO62Kw+C9n7XC5djsylCp7Xmq0sBQliKtGhGlSqyniasY8lCm4xjOo1GVSCfMfO8S8T5bwphcBjc1VdYbMM7yjIoVaKocmHxOc4yGCw+Jxc8TiMNTpYHDzmquLrKc6lKhGU4UarXI/wBrtFv31TR9J1OSNYn1HTbC+eJCWSN7u1iuGjVjyVQyFVJ5IAJ5rSr4y/Zm/wCCgP7H37W2p33hf4AfGnw14x8V6Jpo1DUvBrad4k8K+IrawgFvHd3Wm6N4w0Lw5e67pWmzXEFtd6t4ft9R0q2klt1kukE8G/7NrnzDB4vAYuthsbgsTl9aMnL6riqNSjWpwk24XhVjGbjy25Z2tNe8m0z0sszXLM5wdPHZRmWAzbBVHKEMbluLw+OwtSdN8tSMcRhqlWlKUJaTip3jLSST0CiiiuI9AKKKKAPun/gmd/yL/wC1d/2dTD/6yr+y1X6X1+aH/BM7/kX/ANq7/s6mH/1lX9lqv0vr6PLv9zpetX/09UP86/pE/wDJ3+KP+wPhH/1i+HQooortPxMKKKKAPzy/4Km/8mZeJv8Asuf7GP8A62j+z7X5SV+rf/BU3/kzLxN/2XP9jH/1tH9n2vykr+ofCf8A5N/D/sseIv8A1ScHn7bwH/ySkf8Asoc3/wDVbw+FFFFffn1YUUUUAFZ+kyWculaZLpqeVp0un2UlhHtKeXZPbRtapsJJTZAUXaSSuMEnFaFZ+kx2cWlaZFpr+bp0Wn2UdhJuL+ZZJbRravvIBffAEbcQC2ckDNaK3sp/Hf2lK1r+zty1r839+9vZ/wB32nmLXmW1rS9d42t5b387GhRRRWYwooooAKz7KSze51ZbVNk8WoRx6k20r5t6dK0yVHySd+NOlsI9wwB5ezGUJOhWfZR2aXOrNavvnl1COTUl3FvKvRpWmRImCBszp0VhJtGQfM35y5A0hblrX57+zXLyfDf21L+L/c5b2/6eezE947b9f8L28/0uaFFFFZjCiiigArPkksxqtlE6Z1F9P1OS1k2k7LKK50lb9N+cL5k8umttIJfysgjYc6FZ8kdmdVspXfGopp+px2se4jfZS3OktfvsxhvLni01dxIKebgA7zjSlbmd+e3s638O/Nf2U7X/ALl7e0/6d81xSvbS3xR32+JX+dtvOxoUUUVmMKKKKACvFvjz/wAid4U/7L7+yx/6058Iq9prxb48/wDIneFP+y+/ssf+tOfCKtKP8Wl/18h/6Uj3eF/+Sm4d/wCx7lH/AKsMOfXNFFFf51n9lhRRRQAV/LZ/wUo8I/A3x5/wXP8A2IPCP7SH9ht8Hta/Z68M2/iS28TXyad4e1LVofGX7TN34F0bW7maSKBtL1z4gW/hbSL60uZEtdRt72TT7phb3Uhr+pOvza/at/4JW/sv/tn/AB28MfHv46S/EfWdZ8LfCy4+Ett4J0fxJo+jeA9Q0R5fiBe6frWowReGJfF48T6Hq/xDv9b0i+0zxjpunx6nofh1rzSr20t9UtNW+u4MzfBZLmmKxOPr4zC0a+TZrgYYjAQ58ZRr4zCyo0auHTnSUatOb56c5VIRjOMW5xWq/NvFLhrNuKuH8uwGT4PLMwxWE4o4dzepgs4qujlmKwmV5hDFYrD41qlXlPDVqcXTrU4Uas6lKU4xpzbUX+S37ZPwy/Z++AP/AAVN/wCCV9/+x74P8D/DT4ieNvH1la/FvwR8LdM0zwvZW/wx1nXfA+h6frer+EfD0dlpulXWv+BPEPxXg1G8+zRXGtado/n6gt0LZJp/6jq/K79jH/gkL+xt+xl4/wD+FzfC628e+O/HkthdReFPFfxS8R6N4il8Hadrlm1tfnwhZ+H/AAt4S0yzuNS0y4ksJNY1Cx1PXY9NurywttTt7TUNQhuv1Rq+Ls3wOYvJ8HgcTj8whk+X1cFUzTM6XscbjJ1cdicZySpOtiJwo4SNeOGoqpVc7QkrKPK5T4c8N5tkj4qzPNsuyrIqvE+e0s0o8O5HifrmXZTRw+VYDLOZYmOEwFKrjMwqYOeNxk6GFp05TqQfxucIFFFFfHH6WFFFFAH3T/wTO/5F/wDau/7Oph/9ZV/Zar9L6/ND/gmd/wAi/wDtXf8AZ1MP/rKv7LVfpfX0eXf7nS9av/p6of51/SJ/5O/xR/2B8I/+sXw6FFFFdp+JmJpvhrw5ottdWej6Bomk2l9n7ba6bpVjY215mMxH7VBawRRXGYmaM+ar5jJT7pIpmkeFvDHh+SabQfDmg6JNcIsVxLpGj6fpsk8atvWOZ7K3haVFb5lRyyhuQM81vUV0SxeKmqqlicRJV3F11KtUarOFuR1U5P2jjZcvPflsrWJUIq1oxXL8Nor3b7200v5H5Pf8Ff8AwJ4IX9hPx9t8G+FV/tr46fsTaRrG3w9pA/tbSdd/bn/ZwsNb0vU8Wf8Ap+nazY3VzZarZXXm22oWlxPbXcU0MsiN+GP/AAzh+zz/ANEG+DH/AIa7wP8A/KOv34/4LAf8mJ+K/wDs4X9hH/1vL9mmvxur/Sv6LmLxX/EDKdX6ziPay8WOO6cqntqntJU6XB3hS6VOU+bmcKbqVHTi3ywdSbilzSv89j83zbLcfPD5dmmY4ChLB4atKhgsbicLRlWlWxsJVZU6FWnB1JQp04Sm48zjThFu0YpeMf8ADOH7PP8A0Qb4Mf8AhrvA/wD8o6P+GcP2ef8Aog3wY/8ADXeB/wD5R17PRX7t9dxn/QVif/B9X/5I5v8AWfiX/ooc8/8ADtj/AP5oPGP+GcP2ef8Aog3wY/8ADXeB/wD5R0f8M4fs8/8ARBvgx/4a7wP/APKOvZ6KPruM/wCgrE/+D6v/AMkH+s/Ev/RQ55/4dsf/APNB4x/wzh+zz/0Qb4Mf+Gu8D/8Ayjqnp/7Nf7PNvYWNv/wpD4OX3kWdtD9um+GXgeWa88qFE+1Sy/2I3mSXG3znk3NvZy245zXudZujWL6ZpGlaa8iyvp2m2Ni8qAqsjWlrFbtIqnkK5jLAHkAgHmtFjcX7Kf8AtuJT9pTtD2tT3ly1by5ua65HZW+1z3+yrL/WfiXmX/GQZ5a0tf7Wx+msbK31jrr6W8zyr/hnD9nn/og3wY/8Nd4H/wDlHR/wzh+zz/0Qb4Mf+Gu8D/8Ayjr2eis/ruM/6CsT/wCD6v8A8kP/AFn4l/6KHPP/AA7Y/wD+aDxj/hnD9nn/AKIN8GP/AA13gf8A+UdH/DOH7PP/AEQb4Mf+Gu8D/wDyjr2eij67jP8AoKxP/g+r/wDJB/rPxL/0UOef+HbH/wDzQeMf8M4fs8/9EG+DH/hrvA//AMo6p237Nf7PMU2oP/wpD4OXH2i8SbyX+GXgd1sdthY2/wBlhX+xD5Ub+R9uMeFzNeSy7f3m5vc6+Vfjn+1z+zT+ydds3x7+L/h7wJe+Mrpdb0TQ3stf8Q+JLnTbfTtM0N75fDXhPSdf1/8As03ul3Eaao+mx6fJMk9vHcNNa3KxzUzWeFoYivi80nhKMKcb1MRinSpNutSShKrUqRjT0vNSclfk5PtWa/1m4lbjbiDPXr0zbMOz/wCojXt8z0P/AIZw/Z5/6IN8GP8Aw13gf/5R0f8ADOH7PP8A0Qb4Mf8AhrvA/wD8o6wPgD+1f+zx+1Hpurap8BvinoHxCi0B7ddcsrODV9H13R1vPNFnPqfhrxLpui+IrG0vWguEs7250uOzu5Le4it55JLeZU+hqihmlXE0o18NmFTEUZq8K1DFyq0ppOzcakKkoSSaa0b1Vh/6zcSrR8QZ4n/2Nsf/APNB4x/wzh+zz/0Qb4Mf+Gu8D/8Ayjo/4Zw/Z5/6IN8GP/DXeB//AJR17PRWv13Gf9BWJ/8AB9X/AOSD/WfiX/ooc8/8O2P/APmg8Y/4Zw/Z5/6IN8GP/DXeB/8A5R1Tf9mv9nlr+2uP+FIfBxPKs76H7CPhl4HENx582nv9qeL+xPnks/s/kxSbT5a30y7l83De51my2LyavY6kJFCWmm6rYtEQdztqN1o1wkgboFjGmOrA8kyoRwprSnjcXzO+NxMF7Orr7WpK79lO0bc323aF/s83MrNClxPxLbTiDPHrH/mbY9faV3/vHRa+drHlX/DOH7PP/RBvgx/4a7wP/wDKOj/hnD9nn/og3wY/8Nd4H/8AlHXs9FZ/XcZ/0FYn/wAH1f8A5If+s/Ev/RQ55/4dsf8A/NB4x/wzh+zz/wBEG+DH/hrvA/8A8o6P+GcP2ef+iDfBj/w13gf/AOUdez0UfXcZ/wBBWJ/8H1f/AJIP9Z+Jf+ihzz/w7Y//AOaDxj/hnD9nn/og3wY/8Nd4H/8AlHXl/wAW/gB8B9N8OeGp9O+CfwjsJ5/jL+z1pc81l8N/BtrLNpmtfHv4a6PrOnSyQaNG8ljq2kX99pWp2jk29/pt5d2N1HLa3E0T/W9eSfGj/kV/Cn/Zc/2Z/wD1o34V1FTG4z2c/wDa8T8Ev+X9Xs/7x9PwRxHxDV4z4RpVc+zmpTqcT5BTqU6maY6cKkJ5rhIzhOEq7jKEotxlGSakm000z0j/AIZg/Zp/6N4+Bn/hpPAP/wAz9H/DMH7NP/RvHwM/8NJ4B/8Amfr3Oiv5O/t3PP8Aoc5r/wCHDF//AC4/qv8AtTMv+hhjv/CvEf8Ayw8M/wCGYP2af+jePgZ/4aTwD/8AM/R/wzB+zT/0bx8DP/DSeAf/AJn69zoo/t3PP+hzmv8A4cMX/wDLg/tTMv8AoYY7/wAK8R/8sPDP+GYP2af+jePgZ/4aTwD/APM/R/wzB+zT/wBG8fAz/wANJ4B/+Z+vc6KP7dzz/oc5r/4cMX/8uD+1My/6GGO/8K8R/wDLDwDTv2Wv2abfT7GD/hQXwQv/ACLO2h+3TfCjwDLLeeXCifa5Zf7BbzJLjb5zybm3s5bcc5q5/wAMwfs0/wDRvHwM/wDDSeAf/mfr2HRrF9M0fStNkdZX0/TbGxeVAQkj2lrFbtIoPIVzGWUHkAgHmtKtKufZ37WpbO81mvaTtP6/i4865naXKqqUeZa26XsKOaZnyxvmGOTsrr63iHbTa/tNbHhn/DMH7NP/AEbx8DP/AA0ngH/5n6P+GYP2af8Ao3j4Gf8AhpPAP/zP17nRWf8Abuef9DnNf/Dhi/8A5cP+1My/6GGO/wDCvEf/ACw8M/4Zg/Zp/wCjePgZ/wCGk8A//M/R/wAMwfs0/wDRvHwM/wDDSeAf/mfr3Oij+3c8/wChzmv/AIcMX/8ALg/tTMv+hhjv/CvEf/LD7T/4JIfC74Z6J4L/AGsdM0b4deBNI03Q/wBr1ItF0/TPCPh+wsdHjl/ZP/ZP1eWPS7S10+KDT0l1W/vtTkS0jhV9Qvbu9YG5uZpX/XfV/C3hjxBJDNr3hzQdbmt0aK3l1fR9P1KSCNm3tHC97bzNEjN8zIhVS3JGea/MP/glH/yLP7Yv/Z4EH/rH/wCyJX6tV/Knilj8dLjzNq0sZi5VY0cocassRWdSLq5FlkqrjNz5k6rbdRp++3eV2fgnHP7zijM51Fzzqwy2dSc/elUm8rwUnOcpXc5Nttyk223e9zE1Lw14c1q2tbPWNA0TVrSxx9itdS0qxvrazxGIh9lguoJYrfESrGPKVMRgJ90AUyLwr4Yhjjhh8N6DFDEiRRRRaPp8ccccahUjjRbcKiIoCoigKqgAAAVvUV+eLFYqMFTjiK8acXKUYKtUUFKTvJqKlypyesmldvVnyXJFu/LG/flV/vsFFFFYFH5kf8FgP+TE/Ff/AGcL+wj/AOt5fs01+N1fsj/wWA/5MT8V/wDZwv7CP/reX7NNfjdX+lf0XP8AkxFL/s7fH/8A6x3hMfF55/yNX/2L8J/6k5gFFFFfup5YUUUUAFZeiW1zZ6LpFneNvvLTS9Ptrtt5l3XMFpFFO3mnmTMqsd55fO49a1Ky9E+2/wBi6R/aXmf2j/Zen/b/ADceb9t+yRfavM2/L5nn+ZvxxuzjitU37Corxt7WjeL+NtQr2cf7qTkp+coEv4lo78stem8N/Pa3ozUooorIoKKKKACvww+NfxU0fSP+Cj/jTw1+y9+yHY/H/wDbY0T4faRf+KPiX46+KureGfBnw08BXXhTwPHaQ6f4c1zVZvDMUsNvreiy3+qaBbeG9Yb/AISiXTrG61W817W46/c+vz5+N3/BPD4SfHr4y3nx5m8Y/G/4I/F61S00GP4kfAH4hj4deJtf8N2/hzSLGGz1W9fRtcSVYD9t01r2yh0/Urmxhg069vLqwsNPgtvJznCY7F4NRwCw3taOJw2Iqe2jh/rCowqxjOWXVcVh8VRw+Pi5xlCvKk3GgsRGEoymmNNJrmvrdK17X5X8Vmm4+V97H5m/8E/JfizF/wAFiP2urf406N8OPC/xJ1H9nr+2PG3hv4Py37/Dy01e41L9nS7sJNPbULi4urvWDpeqrP4ovbmWWSfxbfeI54nEVzg/0cV+f3wI/wCCbnwE/Zw+N8Px8+FviD4t2HjK58Eat4I8W2eveNbXxXo/xETXdTXWtX8S+NbjxDoGoeKrzxPf6vbaTqU1zpHifRdJFzoemGLRo4zqEd/+gNcvDeX4vLcFiKGMSVWpmOOxUbVliL08VV9tHmqqnR5ppycZv2NJSmpSUIxkkVNptW/lS2tsgooor6AgKy5ba5bWtPvFbFnBper2067yM3N3d6JLaN5XR9sVneDeeY9+0f601qVly/bf7a0/y/M/s7+y9X+1Yx5X237Xon2Df/F5nkf2l5eONvm5521rRbU3ZxT9lX1ntZ0Kikl/fkrxh/fcSZbLR/FDb/ErfJPV+VzUooorIoKKKKACvJPjR/yK/hT/ALLn+zP/AOtG/CuvW68k+NH/ACK/hT/suf7M/wD60b8K6ip/Dqf4Jf8ApLPquBf+S34O/wCyq4e/9W+DPruiiiv5CP62CiiigAooooAy9Dtrmy0XR7O8O68tNL0+2um3mXdcwWkMU7eYeZMyqx3nl/vd61Ky9D+2/wBi6P8A2j5n9of2Xp/2/wA7Hm/bfskP2rzcceZ5+/fjjdnFala123XrOTjJurUvKHwN87u4f3W9Y+ViYfDGyaXKtHvst/PuFFFFZFBRRRQB+h3/AASj/wCRZ/bF/wCzwIP/AFj/APZEr9Wq/KX/AIJR/wDIs/ti/wDZ4EH/AKx/+yJX6tV/L3ih/wAlxm//AF4yT/1QZWfiXG//ACU2Yf8AXrLf/VVgQooor4A+UCiiigD8yP8AgsB/yYn4r/7OF/YR/wDW8v2aa/G6v2R/4LAf8mJ+K/8As4X9hH/1vL9mmvxur/Sv6Ln/ACYil/2dvj//ANY7wmPi88/5Gr/7F+E/9ScwCiiiv3U8sKKKKACsvRLm5vNF0i8vF2Xl1pen3N2vlmLbcz2kUs6+UeY8Ssw2HlMbT0rUrN0a+fU9I0rUnjWJ9Q02xvniQllja7tYrho1Y8lUMhUE8kAE81qk/Y1HyJpVaK9pf3otwr2glu1OzbeydON90Tf3krv4ZadHrHX1V7L1ZpUUUVkUFFFFABWXp9zcz3etxTriKz1SK2sz5ZTfbNoukXjNuP8ArcXl1drvHA2+V1jNalZtjfPd3Ws27Rqg0zUorFGBJMqyaRpWpGRweFYPqDxADjbGrdSa1ppuFdqCly0k3Juzpr29Fc8e7bap2X2aknsmJ7x1tr9/uy0f5/I0qKKKyGFFFFABWXLc3K61p9mq5s59L1e5nbyycXNrd6JFaL5vRN0V5eHYeZNm4f6o1qVmy3zx6vY6aI1KXem6rfNKSdyNp91o1ukYXoVkGpuzE8gxIBwxrWim5u0FP91Xdm7JJUajc9etNL2kVu5RSWrJk9N2vejqvOSVvns/JmlRRRWRQUUUUAFeSfGj/kV/Cn/Zc/2Z/wD1o34V163Xknxo/wCRX8Kf9lz/AGZ//WjfhXUVP4dT/BL/ANJZ9VwL/wAlvwd/2VXD3/q3wZ9d0UUV/IR/WwUUUUAFFFFAGXodzc3ui6PeXi7by70vT7m6XyzFtuZ7SGWceWeY8Ssw2HlPu9q1KzdGvn1PR9K1KSNYn1DTbG+eJCSkb3drFcNGpPJVDIVUnkgAnmtKta6arVk4Km1VqJ04u8YNTfuJrRqOya0aRMXeMXdv3Vq93pu/N7hRRRWRQUUUUAfod/wSj/5Fn9sX/s8CD/1j/wDZEr9Wq/KX/glH/wAiz+2L/wBngQf+sf8A7Ilfq1X8veKH/JcZv/14yT/1QZWfiXG//JTZh/16y3/1VYEKKKK+APlDE03Sr6xtrqC68S63rUtxnyrzUoPDkVzY5jKf6Kuj6BpNo+GIlH221vP3igHMW6Ms0jSNQ02SaS88U694gWVFRIdXt/DEMduwbJlhOg+HNEmZ2HyMLiWePb92NW+at6iuiWJqSVVONBe2cXPlwuFg1y2t7JxoxdC9veVB01PXn5rslRStrL3drzm9+95e9/29e3Q/Kf8A4K46LqVn+xD4uvLjxd4h1W3b9oX9hfGl39t4UjsE8z9vP9moptk0vwxpupn7OOId+ovuA/f+eck/j3/Z939t+1f23qnkeZv/ALN8nRfsW3GPK8z+yP7R8vPzZ+3+bn/lpt+Wv2l/4LAf8mJ+K/8As4X9hH/1vL9mmvxur/Sr6L2IqT8CqcnGgm/Fjj6n7uFw0I8q4O8JtVCFKMVPvVSVR9ZnxeeRSzRq8v8AcMI/jm3/ALzj+rle2m23lqzLudPu57lZ4tb1SyiGzNlbQ6K1s+w5bc95pF3eDzRw+27XA/1XlnmnX1jdXbRtb6zqWmBFKsljFpEiyknIeQ6lpWouGUcDynjXH3lJ5rSor9zVaacGlS9xNK9Ci00/506bVR9pVFJrdO55fKtfi1d/il+Gui8lZGfd2dzcxQxw6tqGnvFjfPaR6W8tx8u398L/AEy9gXJ+c+RDB8xwMJhKJLO5eyS1XVtQhnTbu1KOPSzeybSSd6S6ZLp439G8uwjwANmw5J0KKSqySirU/clzq9Gk232k3Bucf7k3KHTlHZeeunxS/wA9H5rX7zPjs7lLJ7VtW1Cad923UpI9LF7HuII2JFpkWnnZ0XzLCTIJ37zgih4eDz6LZXY1DULiPUrCzu7b7ZFpEc1jFc2kckcMS6bpljanylkX/WwTLuXA/d/JW/WfpMlnLpWmS6anl6dLp9nJYR7Cnl2T20bWqbCSU2wFF2kkrjBPFae0bo1bwjeValLnVKkoxvGq3C6gnDmaTjGNo2hNWs2nNlzR1ekZK3NK71jrvra+ret2uw2xsbq0aRrjWdS1MOoVUvotIjWIg5LxnTdK05yzDg+a8i4+6oPNNttPu4Llp5db1S9iO/Flcw6Ktsm85Xa9npFpeHyhwm67bI/1vmHmtSiodabc21S99KLtQopJJW9xKmlTl3lT5ZN6ttlcq0+LT+9L8ddfncy/7Pu/tv2r+29U8jzN/wDZvk6L9i24x5Xmf2R/aPl5+bP2/wA3P/LTb8tFzp93PcrPFreqWUQ2ZsraHRWtn2HLbnvNIu7weaOH23a4H+q8s81qUUe2ndO1K6hyL9xQtbu4+z5ZT/6eSTn/AHhcq/vb3+KX+ei8lp5GbfWN1dtG1vrOpaYEUqyWMWkSLKSch5DqWlai4ZRwPKeNcfeUnmqQD6k+oWtrqGoaXNpeoRWl1dWkWkPLqEr6Rpl6JZRe6ZewjEN7DGTHDC+6EgEQhEG/WfZyWb3OrLaptni1COPUm2FfMvTpWmSo+Sfnxp0thHuGAPL2YyhJ0p1JKE/cjL2VO8GqNJqLlVpJyrXg/aws3CKq86jOcHFJ6ia1Wr1evvS/lekddNr6W0v3aZJZ3L2SWq6tqEM6bd2pRx6Wb2TaSTvSXTJdPG/o3l2EeABs2HJJHZ3KWT2ratqE077tupSR6WL2PcQRsSLTItPOzovmWEmQTv3nBGhRWXtZWtanbn9p/BpX5u3NyX5P+nd/Z/3SuVee1vilt9+/nv5mfaWdzbRTRzatqGoPLnZPdx6Wktv8u39yLDTLKBsH5x58M/zDBymUptjY3Vo0jXGs6lqYdQqpfRaRGsRByXjOm6VpzlmHB815Fx91Qea0qKHVk+fSn+8tzWo0Va23I1BOn5+z5Obre7DlWnxabe9J/fd6/O5l22n3cFy08ut6pexHfiyuYdFW2Tecrtez0i0vD5Q4Tddtkf63zDzVCSOZPENnEdW1RvtNnqd9Ha+Tof2KOCyn0mCa08w6P/amyeTUIJfl1DeTb/PIcIB0dZ8klmNVs4nTOovp+pyWsmwnbZRXOkrfpvzhfMnl01tpGX8vII2HOtOrJzk3CEr0KsLQoUVa1KbU0lTSi4NKc6kUpuCleTWhMoqy1a96OrlL+Zab9dktrsjudPu57lZ4tb1SyiGzNlbQ6K1s+w5bc95pF3eDzRw+27XA/wBV5Z5p19Y3V20bW+s6lpgRSrJYxaRIspJyHkOpaVqLhlHA8p41x95Sea0qKzVaacGlS9xNK9Ci00/506bVR9pVFJrdO4+Va/Fq7/FL8NdF5KyM+7s7m5ihjh1bUNPeLG+e0j0t5bj5dv74X+mXsC5PznyIYPmOBhMJRJZ3L2SWq6tqEM6bd2pRx6Wb2TaSTvSXTJdPG/o3l2EeABs2HJOhRSVWSUVan7kudXo0m2+0m4Nzj/cm5Q6co7Lz10+KX+ej81r95nx2dylk9q2rahNO+7bqUkeli9j3EEbEi0yLTzs6L5lhJkE795wR5J8XbO5tvCXhqObVtQv3l+Of7M+y4u49KSW3z+0X8K1/ciw0yygbB+cfaIZ/mGDlMofa68k+NH/Ir+FP+y5/sz/+tG/Cuoq1ZOlWVqfvKUnajSTTt9lqCcI6fBBxhuuXVn1XAkV/rvwb8WnFPDy+KX/Q3wm+ur83d+Z9U2NjdWjyNcazqWph1CrHfRaRGkRByXjOm6Vp7liPlIleRMdFB5pttp93BctPLrmqXsR34s7mHRVtl3n5drWej2l5+66Juu2yP9Z5h5rUor+Q3Wm3NtUvfSi7UKKSSVvcSppU5d5U+WTerbZ/W3KtPi0/vS/HXX53Mv8As+7+2/av7c1TyPM3/wBm+Tov2LbjHk7/AOx/7Q8vPOft/m5/5a44oudPu57lZ4tc1SyiGzNnbQ6K1s2w/Nua80e7vP3vR9t2uB/q/LPNalFHtp3TtSuoci/cULW7uPs+WU/+nkk5/wB4XKv729/il/novJaeRm31jdXbxtb6zqWmBFKtHYxaRIkpJyHkOpaVqDhgPlAieNMdVJ5p13ZXNzFDHDq2oae8WN89pFpTy3Hyhf3wv9MvYFyRvP2eGD5iQMJhBoUUKrJcllT/AHbbjejRle+/Pem/aeSqc6j0sPlWu+u/vS/DXT5WOf00San4d0mW21DULH7Vp9hdx3UcWkfbVint450heNtLk0xdqSLGwg0+JQEHlBOp0I7K5Sye1bVtQlnfdt1KSLShexbiCNiRaZFp52YwvmWEmQTv3nBBpMlnLpWmS6anladLp9lJYR7Snl2T20bWqbCSU2QFF2kkrjBJxWhV1qjVSrFQjCKrzmozo0vaRfM7QlLkcrR2dNydO9/dJivdi7t+6ldSlZ6LVK9vR7mfaWVzbRTRzatqGoPLnZPdxaUktv8AKV/ciw0yygbBO8faIZ/mABymULbGxurR5GuNZ1LUw6hVjvotIjSIg5LxnTdK09yxHykSvImOig81pUVm6snz6U/3lua1GirW25GoJ0/P2fJzdb3ZXKtPi0296T++71+dzLttPu4Llp5dc1S9iO/Fncw6Ktsu8/Ltaz0e0vP3XRN122R/rPMPNH9n3f237V/bmqeR5m/+zfJ0X7Ftxjyd/wDY/wDaHl55z9v83P8Ay1xxWpRT9tNtu1K7hyP9xQSt3UVTtGf/AE8ilU/vC5V/e3v8Uvzve3lsfeH/AAS00jUL7Rv2vrq28U69o0EX7Xtokmm6bb+GJbK6aP8AZE/ZIkeWeTV/Dmq6irzo6wSi2v7eMRRRmGOGcyzSfq1q+kahqUkMln4p17w+sSMjw6Rb+GJo7hi2RLMde8Oa3MrqPkUW8sEe370bN81fmH/wSj/5Fn9sX/s8CD/1j/8AZEr9Wq/mHxOxNSPHGZtRw79lhsmjDmwmFmmpZBld/aqdGSrSX2ZVlUlD7LR+JcbxT4mzHWWtPLG/fmtsqwO1pe6u6jZPqjE1LSr6+trWC18S63ostvjzbzTYPDktzfYjCf6UusaBq1omWBlP2K1s/wB4xAxFtjDItH1BI40bxVr0zIiI00tv4YEkrKoBkkEPhuKEPIRucRRRxhidkaLhRvUV+frE1FBU1GhypyabwuGlO8nd3qSoupJfyxlJxitIpLQ+U5Ve/vf+BzS+7msFFFFYFH5kf8FgP+TE/Ff/AGcL+wj/AOt5fs01+N1fsj/wWA/5MT8V/wDZwv7CP/reX7NNfjdX+lf0XP8AkxFL/s7fH/8A6x3hMfF55/yNX/2L8J/6k5gFFFFfup5YUUUUAFZ+kx2cOlaZFpr+Zp0Wn2cdhJuL+ZZJbRravvIBffAEbcQC2ckc1oVn6TaRafpWmWEE32iCy0+ztIZ/lPnxW1tHDHNlMofMRA+UJX5vl4xWia9lNc0k3UpNQV+SSUa15S0+KLaUddpz0etl9paLaWvVax0Xk+vojQooorMYUUUUAFZ9nHZpc6s1q++ebUI5NSXcW8u9GlaZEiYI+TOnRWEm0ZB8zfnLkDQrPs7SK2udWmjm8x9Q1CO7nT5f9HlTStMsBD8vI3QWUM+Hw37/ACPkKE6QaUa15Si3TSSje037ak+Wf91JOav9uEBPeOnX7vde3n09LmhRRRWYwooooAKz5I7M6rZyu+NRTT9TjtY9xG+yludJa/fZjDeXPDpq7icp5mADvONCs+S0ifVbO/M22e20/U7SOD5f3kV7c6TNNNg/P+4fT4Eyo2j7R8+CUzpSaUneUor2dZXje7bpTSi9H7s21Cf9yUrtbiltsn70d/8AEtfVbrzSNCiiisxhRRRQAV5J8aP+RX8Kf9lz/Zn/APWjfhXXrdeSfGj/AJFfwp/2XP8AZn/9aN+FdRU/h1P8Ev8A0ln1XAv/ACW/B3/ZVcPf+rfBn13RRRX8hH9bBRRRQAUUUUAZ+kx2cWlaZFpr+bp0Wn2UdhJuL+ZZJbRravvIBffAEbcQC2ckDNaFZ+k2kWn6VplhBN9ogstPsrSG4+U+fFbW0cMc2UJQ+aiB8oSvzfKSMVoVpWadWq1KU06k2pzvzyTk7SldL3pLWWi1b0FH4Y6JaLRbLTZeS6BRRRWYwooooA/Q7/glH/yLP7Yv/Z4EH/rH/wCyJX6tV+Uv/BKP/kWf2xf+zwIP/WP/ANkSv1ar+XvFD/kuM3/68ZJ/6oMrPxLjf/kpsw/69Zb/AOqrAhRRRXwB8oFFFFAH5kf8FgP+TE/Ff/Zwv7CP/reX7NNfjdX7I/8ABYD/AJMT8V/9nC/sI/8AreX7NNfhB8Z/i94I+Anws8b/ABh+I1/NpvgzwBoc+ua1PawC5vp1WSK1sdM0y1aSFLrVtZ1O5stI0m2knt4rjUr61hluLeN2mT/Sj6MFSFLwEjVqzjTp0vFjxBqVJzfLGEIcGeE8pzlJ6KMYptt6JJtnxeef8jV/9i/Cf+pOYHp1Ffi5qv8AwVZ+Mvhj4WaN+0n4w/YA+I2g/ssa3Pos9p8WY/jJ4D1DxKPD/iPUIdN0LxBP8LRo1rrFlZ6xc3NpHpV1qWsWOiahJf6YLbXXi1Oxmn/X3wV4v0L4g+DvCXj3wtdnUPDHjfwzoPi/w5fmNoje6F4l0u11nSLsxPh4jc6fe283luNyb9rcg1+zYHNsBmM508JWnKpTp067hVw2Kws3QrOSpV6cMVRoyq0KjjJQrUlOlK2k2eY01uvxT+Wmz8tzpqKKK9IQVm6NYvpmkaVpryLK+nabY2LyoCqyNaWsVu0iqeQrmMsAeQCAea0qy9Etrmz0XSLO8bfeWml6fbXbbzLuuYLSKKdvNPMmZVY7zy+dx61qm/Y1FzpJ1aL9nb3pNQr2mnvaF3FrZupG+yJ+0nZ/DLXoruOnq7aejNSiiisigooooAKzbGxe0utZuGkVxqepRXyKAQYlj0jStNMbk8MxfTnlBHG2RV6g1pVl6fbXMF3rcs7ZivNUiubMby+y2XRdIs2Xaf8AVZvLS7bYODu83rIa1ptqFdKajzUknFq7qL29F8kezTSqXX2acls2J7x06/d7stX+XzNSiiishhRRRQAVmy2LyavY6kJFCWmm6rYtEQdztqN1o1wkgboFjGmOrA8kyoRwprSrLltrlta0+8VsWcGl6vbTrvIzc3d3okto3ldH2xWd4N55j37R/rTWtFtTdpqH7quuZq6adGonDXrUT9nF7qUk1qTLVbN+9Hbyknf5bvyRqUUUVkUFFFeTfG/44fDT9nX4aeI/i38W/EcPhjwV4Ziga9vWgnvLy8vL2dLTTdI0jTbRJbzU9W1O8ljtrOztomOWe5uHt7G3urqCKtWnRpzrVpwpUqUJVKlSpJQhThFOUpznJqMYxSbcm0kldges15J8aP8AkV/Cn/Zc/wBmf/1o34V18I6H/wAFbP2fbjXvAenePvhX+1D8D/DXxP1C007wD8TvjP8ABp/CPwz8VS6gYP7OuNI8SWniPWprnTrxLu0nGqLpv9n2dncxX+p3NjYiW4j+7vjR/wAiv4U/7Ln+zP8A+tG/CuuLD5jgswpV3g8TSxHso2qqDfNT9pBypucJJTiqkfepyceWcU3BtJn1fAya434NurX4q4e/9W+EPruiiiv5PP61CiiigAooooAzdGsX0zR9K02R1lfT9NsbF5UBCSPaWsVu0ig8hXMZZQeQCAea0qy9Dtrmy0XR7O8O68tNL0+2um3mXdcwWkMU7eYeZMyqx3nl/vd61K1rtutWbmqjdWo3UirRm3N++ktEpfEktLMmOkYqzVorR7rTZ+aCiiisigooooA/Q7/glH/yLP7Yv/Z4EH/rH/7Ilfq1X5S/8Eo/+RZ/bF/7PAg/9Y//AGRK/Vqv5e8UP+S4zf8A68ZJ/wCqDKz8S43/AOSmzD/r1lv/AKqsCFFFFfAHyhiabP4jltrptY0rRLG7TP2KDTdfvtWtrj92SPtV1deGtFls8y7UPlWd9iMmTlgImZpFx4nmkmGvaPoOmwqim3fSPEeoa3JLJu+ZJorzwt4fWBAvKyJNcMzfKYlHz1vUV0SrU5KqlhaEPaOPI4yxTdDltdUubEyUue3ve3VZq75HHS0qL09+TtvdR971tFbf3eXzuflP/wAFcbnxZJ+xD4uj1TRfD1npg/aF/YX2Xlh4n1LUr9tv7ef7NXkbtOuPCOlW6eYMGbGqP5B4T7QBk/zqftt/Gr4pfs+fsw/Gr4wfDfwjo3iTxL4F8MxahocNxdajqJtheaxpWkXviLUNCt9JgS5sPCmn6jeeKNStv7YjgOn6PcvPcCESLX9Jn/BYD/kxPxX/ANnC/sI/+t5fs01+NUsUU8UkE8cc0M0bxTQyoskUsUilJI5I3BR43QlXRgVZSVYEEiv9I/ozv6x4A1KVCFLB1K3ij4iUKVal9Ym8NWnwV4URhi4KpiJOVanJqajKbpNxS9mtT4zO01muspO2Awb15dV9Zx/uu0Vo/LXXfY/jf/ah+JGr/Ff9iu3+JnxU/wCCkt98bPiZ8SdK8E6ta/su+B9R0Twvo2g62/iHRda8SeH/AIjfDXwpp2Z7fwDp1tq2oWmua/Z+FtLl8Q6Lpl9orajDHp0l/wD04/sXXuozfsZ/sjSaLb6TqcI/Zn+B0E81zrNxZ+XdWnwz8MWtzAotdH1VZHguIZoLgPJE8M8UkLR7lbHouk/sz/s4aAPEg0L9n74I6KPGWm6ho3i8aT8KfAmnDxVo+rRyRarpPiT7HoMP9uabqcU0seoWOp/arW8jlkS5ikV2B9N8KeEfCngPw9pnhHwP4Y8PeDPCmiQyW+jeGPCmi6b4d8PaRbyzy3UsGmaLpFtZ6bYQyXVxPcyRWttEjzzSzMpkkdj+n5HkmIyzMZ4/FTw2JdTLaOBqxVTMqk61ajWnVeLrVsXja9aVSs6k3OFKdGjT5acadL45y86T5o2TkvfclpDRNL3UlG1tOqbd9zRu5NVSKE2Flp9zO2PPju9SubKKP5cnyZodJ1B5/nyo3wW+V+fgnYCSTVRZI8Vlp76gdvmWsmpXMVkuSd+y/XSZp5NowV3abHvOQdmMnQor6pTilFexpvllzNt1rzX8krVUlHpeChP+/ciz/mf4aee2/rda7GfHJqpsneWy09NQG7y7WPUrmWybBGzfftpMM8e4ZLbdNk2HAG/ORQ8PPrjaLZf2zbW8WopYWYOL6WeW4nFpH5r3+dPt1s7h58+fFB9ujjYvsmlCjdv1l6Jc3N5oukXl4uy8utL0+5u18sxbbme0ilnXyjzHiVmGw8pjaelaqSdCtajRSdei+a9X2kLxrNQp3qNezaUufm5pX5fevZqbe9H3pfDLtZ6xu3pvta1lvpvd1jLrEjSDUrHTbRAoMTWOq3WoM7Z+YSJcaNpgjUDkMrykngoo5pttNrTXLLeafpcFn8+2e21e7u7k4P7rdaS6JZxLvHL4vX8s8L5o5rUorN1INztQpLmSUUnXtTaXxQvWbcnu/aOcb7RS0Ks9Pelp/h19fd/Kxl+drX23Z/Z+l/2d5mPtX9r3f23ysff+wf2J5HmbuPL/ALS24583Py0XM2tLcqtnp+lz2fybp7nV7u0uRk/vdtpFol5E2wcpm9TzDw3lDmtSij2kLp+wpWUOVxvXtJ/8/H++5ufyi1D+4Kz/AJpb3+zp5fDt66+Zm30usRtGNNsdNu0KkytfardaeyNn5RGlvo2piRSOSzPEQeAjDms6OTxCkurGKys7ndqkP2WO+1Keygjsv7D0cyfZJoNJ1B50/tP+0F/ewW5L+Y/GQg6OsvT7m5nu9binXEVnqkVtZnyym+2bRdIvGbcf9bi8urtd44G3yusZrWlNKFT/AGehPkpXm5utzTTr0UmrVVaSlaP7v2b9nKd2xNar3pay0ty6e6/Lb1vr+EkkmqiyR4rLT31A7fMtZNSuYrJck79l+ukzTybRgru02Pecg7MZJHJqpsneWy09NQG7y7WPUrmWybBGzfftpMM8e4ZLbdNk2HAG/ORoUVjzxtb2NO/Pzc161+X/AJ9/xbcnnb2n/Twqz/me1vs/f8O/4eRn2kmqvFMb+y0+2nXPkR2mpXN7FJ8uR5002k6e8Hz4U7ILjC/PyRsLbGXWJGkGpWOm2iBQYmsdVutQZ2z8wkS40bTBGoHIZXlJPBRRzWlRQ5xfP+5prmtytOt+7tvyXqtO/X2ntN9LaBZ6e9J2/wAOvraP5WMu2m1prllvNP0uCz+fbPbavd3dycH91utJdEs4l3jl8Xr+WeF80c1Qkk8Q/wDCQ2arZWY0UWeprNMupTl2cz6Sbaaa2Okqkd5Gq3SW1sl1JFNFJdySXcDwRRXHR1ly3NyutafZqubOfS9XuZ28snFza3eiRWi+b0TdFeXh2HmTZuH+qNbUpp1J8uHoa0Ky5ZOvyxtRqOVSN6zftVFNwUm4c/LaCeqmS0V5S+KOqUb/ABRsvh2vv5XC5m1pblVs9P0uez+TdPc6vd2lyMn97ttItEvIm2DlM3qeYeG8oc06+l1iNoxptjpt2hUmVr7VbrT2Rs/KI0t9G1MSKRyWZ4iDwEYc1pUVkqkE4N0KT5U1JN17VH/NO1ZNNbr2bgu6aHZ6+9LV3+zp5L3dvW78zPu5NVSKE2Flp9zO2PPju9SubKKP5cnyZodJ1B5/nyo3wW+V+fgnYPzg/wCCqHx38K/s+/sqQ+N/HPwK+Gnx3vdT+IXhzwx4Y8F/E/w/Y+Nvh7ovi/UdF8U39r4r1jT9V0rfcw6TpOk6zZ27WiaNqFxcapHp8Wp2EV7NI36X1wfxM+F/w9+MvgrWvh18UvCOi+OPBPiGKKLVvDuv2gurG5MEyXNrcRkFJ7O+srmKK6sNRspre/sLuKK6s7mC4jSRfPzOlWxeW4rC4R0KGKq0asKOIqwnVjGc4tQ9pTnKdJwi7WapNrSTU7crqOkk221ppp0+V/x/4H8q/wDwVab9r8/s8fCLWP2m/wBoj9nzxDp/iv4g+H/EPgb4DfA7QLIWdlajwR4tMXxDsvF97CniLV9E0G1vV8NvHZ3OpeGbm78WWlxBqN0bawlb+nn4uy6pJ4R8NNfWen28w+Of7M5t0s9TuL6GUf8ADRfwrIMs82k2Dw5fA+SC4+Q7xk/Iflyx/wCCUP8AwT407w14g8J237Nfho6V4maxbVLi78U/EXUPEUY06/ttSt49G8Y3/jG58XeGoHurSA3tv4c1zSoNSt1ey1GO6spp7eT6g+J2kWPh74ffD7QNLW5TTND+MH7LGkacl5f3+q3aWOm/tB/CaytFutU1W5vdU1K5W3hjE9/qV5d395KGuLy5nuJJJX8LJcqx2XYjOMVjXRq/2hhsvjH/AG/HY+vSqYGOLjVvWxNHDKUKyrxlFKnGNOzpwpQ5faT+s4HfNxtwYk2uXirIPsxSd82wVtNdVbvr1ufXljLrEjyDUrHTbRAoMTWOq3WoO755WRLjRtMEagchlklJPBQD5qbbTa01yy3mn6XBZ/PtnttXu7u5OD+73Wsuh2US7xy+LxvLPC+b1rUor+bHUg3O1CkuZJRSde1NpfFC9Ztye79o5xvtFLQ/rOz096Wn+HX1938rGX52tfbdn9n6X/Z/mY+1f2vd/bfKx9/7B/YfkeZnjyv7S24587PFFzNrS3KrZ6fpc9n8m6e51e7tLkZP7zbaxaHexNsHKZvF8w8N5XWtSij2kLp+wpWUOVxvXtJ/8/H++5ufyi1D+4Kz/mlvf7Onl8O3rr5mbfS6xG8Y02x027QqTK19qt1p7o+eFjS30bUxIpHJZpIiDwEI+anXcuqpFCbCy0+5nbH2iO71O5soovlBPkzQ6TfvP8+VG+C3yoD8E7BoUUKpFcl6NOXK3zXdb95fZTtVVuXp7P2b7tjs9feev+HT09387nP6a+uJ4d0lpbW3n1r+z7AXsN/fTWimf7PGLl5rmHTr11uC4LSRLasglLxiYqokfQjl1U2TvLZaemoDd5drHqdzLZPgjZvv20mKePcMltumy7CABvzkR6Hc3N7ouj3l4u28u9L0+5ul8sxbbme0hlnHlnmPErMNh5T7vatStK0kqtWMqNFSWIqSk4Ory/G70opVFH2SekWoqdvtkxXuxalK3KrXtfZavRvm+dr9DPtJdVeKY39lp9tOufs8dpqdzexS/KSPOmm0mweD58KdkFxhSX5I2FtjLrEjyDUrHTbRAoMTWOq3WoO755WRLjRtMEagchlklJPBQD5q0qKyc4vn/c01zW5WnW/d235L1Wnfr7T2m+ltCrPT3pO3+HX1tH8rGXbTa01yy3mn6XBZ/PtnttXu7u5OD+73Wsuh2US7xy+LxvLPC+b1o87Wvtuz+z9L/s/zMfav7Xu/tvlY+/8AYP7D8jzM8eV/aW3HPnZ4rUop+0hdv2FJJw5Ur17Rf/PxXrN8/lJun/cFZ/zS33937vhtb8fM+8P+CWlx4ni0b9r6PSNH0G+05v2vbQ3N1qXiPUNKvYZD+yJ+yQJkgsLbwtrMFwkcAikikk1K1aaV5IXigSNZ5f1a1e48TwyQjQdH0HUoWRjcPq/iPUNEkik3fKkMVn4W8QLOhXlpHmt2VvlETD56/MP/AIJR/wDIs/ti/wDZ4EH/AKx/+yJX6tV/MPidWpx44zO+Ew8/Z4bJlNSli0qzeQZXaVXkxMWpQ+yqLpRf2oyPxLjeL/1mzH35K9PLGtIe7bKsDorx2fXmu+zRialP4jitrVtH0rRL67fH22DUtfvtJtrf92Cfst1a+GtalvMS7kHm2djmMCThiYlZFceKDHGZtH0GOYohlSLxHqEsaSFRvSOVvCsLSIrZCSNDEzqAxijJ2jeor8/VamoKLwtCUk5N1HLFc8k3pFqOIVO0do8tNSt8Tk9T5Tld788l5Wjb/wBJv+IUUUVgUfmR/wAFgP8AkxPxX/2cL+wj/wCt5fs01+N1fsj/AMFgP+TE/Ff/AGcL+wj/AOt5fs01+N1f6V/Rc/5MRS/7O3x//wCsd4THxeef8jV/9i/Cf+pOYBRRRX7qeWFFFFABWbo18+p6RpWpPGsT6hptjfPEhLLG13axXDRqx5KoZCoJ5IAJ5rSrP0m7i1DStMv4Ifs8F7p9ndwwYUeRFc20c0cOEwg8tHCYQBfl+XjFaJfuZvkvapSXtL/DeNZ8luvtLc1+ns7dSftLX7MtO+sdflt/28aFFFFZlBRRRQAVm2N893dazbtGqDTNSisUYEkyrJpGlakZHB4Vg+oPEAONsat1JrSrPs7uK5udWhjh8t9P1CO0nfC/6RK+laZfib5eTtgvYYMvlv3GB8gQDWmrwrP2fPakmpXt7L99SXO19q6fs7f9POboJ7x1tr9/uvT9fkaFFFFZDCiiigArNlvnj1ex00RqUu9N1W+aUk7kbT7rRrdIwvQrINTdmJ5BiQDhjWlWfJdxJqtnYGHdPc6fqd3HPhf3cVlc6TDNDk/P+/fUIHwp2n7P8+SExpSV5NcntP3dZ8t7WtRm+e//AE7t7S3Xlt1Jltvb3o6/9vLT/t7b5mhRRRWZQUUUUAFeSfGj/kV/Cn/Zc/2Z/wD1o34V163Xknxo/wCRX8Kf9lz/AGZ//WjfhXUVP4dT/BL/ANJZ9VwL/wAlvwd/2VXD3/q3wZ9d0UUV/IR/WwUUUUAFFFFAGbo18+p6PpWpSRrE+oabY3zxISUje7tYrho1J5KoZCqk8kAE81pVn6TdxahpWmX8EP2eC90+yu4bfCjyIrm2jmjhwgCDykcJhAF+X5QBitCtKytWqrk9napNezvf2dpNcl+vL8N+trkx+GOvN7q176b/AD3CiiisygooooA/Q7/glH/yLP7Yv/Z4EH/rH/7Ilfq1X5S/8Eo/+RZ/bF/7PAg/9Y//AGRK/Vqv5e8UP+S4zf8A68ZJ/wCqDKz8S43/AOSmzD/r1lv/AKqsCFFFFfAHygUUUUAfmR/wWA/5MT8V/wDZwv7CP/reX7NNfjdX7I/8FgP+TE/Ff/Zwv7CP/reX7NNfjdX+lf0XP+TEUv8As7fH/wD6x3hMfF55/wAjV/8AYvwn/qTmAUUUV+6nlhRRRQAVn6TJZy6Vpkump5enS6fZyWEewp5dk9tG1qmwklNsBRdpJK4wTxWhWfpMdnDpWmRaa/madFp9nHYSbi/mWSW0a2r7yAX3wBG3EAtnJHNaK3sp/Hf2lK1r+zty1r839+9vZ/3faeYteZbWtL13ja3lvfzsaFFFFZjCiiigArPs5LN7nVltU2zxahHHqTbCvmXp0rTJUfJPz406Wwj3DAHl7MZQk6FZ9nHZpc6s1q++ebUI5NSXcW8u9GlaZEiYI+TOnRWEm0ZB8zfnLkDSFuWtfnv7NcvJ8N/bUv4v9zlvb/p57MT3jtv1/wAL28/0uaFFFFZjCiiigArPkksxqtnE6Z1F9P1OS1k2E7bKK50lb9N+cL5k8umttIy/l5BGw50Kz5I7M6rZyu+NRTT9TjtY9xG+yludJa/fZjDeXPDpq7icp5mADvONKVuZ357ezrfw781/ZTtf+5e3tP8Ap3zXFK9tLfFHfb4lf52287GhRRRWYwooooAK8k+NH/Ir+FP+y5/sz/8ArRvwrr1uvJPjR/yK/hT/ALLn+zP/AOtG/Cuoqfw6n+CX/pLPquBf+S34O/7Krh7/ANW+DPruiiiv5CP62CiiigAooooAz9Jks5dK0yXTU8rTpdPspLCPaU8uye2ja1TYSSmyAou0klcYJOK0Kz9Jjs4tK0yLTX83TotPso7CTcX8yyS2jW1feQC++AI24gFs5IGa0K0rW9rVtz29pO3tL+0tzO3tL/bt8X964o35Y3teyvbbbp5dvIKKKKzGFFFFAH6Hf8Eo/wDkWf2xf+zwIP8A1j/9kSv1ar8pf+CUf/Is/ti/9ngQf+sf/siV+rVfy94of8lxm/8A14yT/wBUGVn4lxv/AMlNmH/XrLf/AFVYEKKKK+APlDE03X7HVra6urWDW4orPPmrqXhrxHo1y+IzJ/otnrGlWN3ffKCB9iguMyYiGZWVCzSPEen63JNFZW+vQtAiyOdX8LeJ/D8bKzbQIZte0jTYbh8/eit3lkVfnZAvNb1FdEpYVqry0cQm3H2DliaclTStz+1SwsPbOWvK4Ohy6XU7ayufS8o/3rRav2t775fnzX8j8p/+CuPifTdS/Yh8Xadb23iGO4T9oX9hfMl/4R8WaVYHyP28/wBmoPt1TVNFs9Mfdj9zsvG+0DmDzAQa/Hv+17T7b9g8rVPP8zy9/wDYmtfYt2N2f7S/s/8As7y8f8tftXlZ+Xfu4r9pf+CwH/Jifiv/ALOF/YR/9by/Zpr8bq/0q+i9LDPwKp8lKvGP/EWOPklLEU5yVT/U7wmvNyWFgnDtTUFJf8/WfF55z/2o7yjf6hhPsu1vrOP0tzvXfW/y75dzq9pa3K2ksWqNK2zDW2ia1eWw8w4XdeWenz2aYP39048ocy7BzTr7VbXT2jS4i1KQyKWU2OjaxqagA4PmPptjdpE2eiSsjMOVBHNaVFfualRvC9Oq0k/aJVoJyfRwboPkV91JVG9uZbnl+9rrHfT3Xouz97V+enoZ93qdvZRQzTR6g6T42C00nVdQlXK7/wB9BYWdzPb8cHz448N8h+cFaJNTt4rJL9o9QMEm3akek6rLejeSBv06KzfUI8Y+bzLVNgwX2gg1oUUk6Vo3hUbUrzaqxSlD+WK9i+SX99ua/udB+93Xl7r3/wDAtfTT1M+PU7eWye/WPUBBHu3JJpOqxXp2EA7NOls01CTOfl8u1feMlNwBNUPD09iui2VtZHUJbXS7Czs0mvNK1OwmuIrW0jjjmihvLO3kuPNjjDZtY5ULNsUliBW/Wbo1i+maRpWmvIsr6dptjYvKgKrI1paxW7SKp5CuYywB5AIB5rTmpexqpe0UnWpOEHUi04KNW7l+5TlKF+VNSgn7W/I+Um0uaOz92V3Z73jove2e/X4d9QsdVtdQaRLeLUozGoZjfaNrGmKQTgeW+pWNokrZ6pEzso5YAc0221e0urlrSKLVFlXflrnRNas7Y+WcNtvLzT4LN8n7m2c+aOYt45rUoqHKjedqdVJpezvWg3GVtXNqgudN7RiqbS05nuV72mq8/devp72n4mX/AGvafbfsHlap5/meXv8A7E1r7Fuxuz/aX9n/ANneXj/lr9q8rPy793FFzq9pa3K2ksWqNK2zDW2ia1eWw8w4XdeWenz2aYP39048ocy7BzWpRRzULr93V5eS0l7aF3P+ZP2FlD+44yf/AE8F73eO+nuvbt8W/np6Gbfara6e0aXEWpSGRSymx0bWNTUAHB8x9NsbtImz0SVkZhyoI5qkJ7HSX1C8Y6hcf2tqEV3JHaaVqeoS20q6RplmsMtvp1nc3Ftm3soZz9qjiYNOV/uit+s2xsXtLrWbhpFcanqUV8igEGJY9I0rTTG5PDMX055QRxtkVeoNaUpUVCal7WLdO1SKqRtX/fUmqcL0Zey5be1cpOpzez5Va4mpXW2+nuv3fder97Xt038h0mp28Vkl+0eoGCTbtSPSdVlvRvJA36dFZvqEeMfN5lqmwYL7QQaI9Tt5bJ79Y9QEEe7ckmk6rFenYQDs06WzTUJM5+Xy7V94yU3AE1oUVlelb4Kl+e9/axt7P+W3sb8//Tzm5f8Ap2V73dbfyvfv8W3l+Jn2mp297FNNDHqCJBneLvSdV0+VsLv/AHMF/Z209xxwPIjky3yD5yFptjqtrqDSJbxalGY1DMb7RtY0xSCcDy31KxtElbPVImdlHLADmtKihuj79qdRN29nerF8vfn/AHK9pfW3K6duvN1Pe0u15+69fT3nb8TLttXtLq5a0ii1RZV35a50TWrO2PlnDbby80+CzfJ+5tnPmjmLeOaoSXmnv4hs8/2ot9bWep6fHH/YmsfYpEvZ9JuJp/7RNh9h2QNp8Cectz5ANxtdw5QHo6zZbF5NXsdSEihLTTdVsWiIO521G60a4SQN0CxjTHVgeSZUI4U1tSnQU5O1anF0K0Yv2sJP2jpTVm/q9nCpf2fKoxlHmv7TQmSlZfC3zR+y1pzLX4t4/F8rWG3Or2lrcraSxao0rbMNbaJrV5bDzDhd15Z6fPZpg/f3TjyhzLsHNOvtVtdPaNLiLUpDIpZTY6NrGpqADg+Y+m2N2kTZ6JKyMw5UEc1pUVkpUbwvTqtJP2iVaCcn0cG6D5FfdSVRvbmW4/e11jvp7r0XZ+9q/PT0M+71O3sooZpo9QdJ8bBaaTquoSrld/76Cws7me344Pnxx4b5D84K0SanbxWSX7R6gYJNu1I9J1WW9G8kDfp0Vm+oR4x83mWqbBgvtBBrQopJ0rRvCo2pXm1VilKH8sV7F8kv77c1/c6D97uvL3Xv/wCBa+mnqZ8ep28tk9+seoCCPduSTSdVivTsIB2adLZpqEmc/L5dq+8ZKbgCa8k+Lup2174S8NTQx6giQfHP9mfeLvSdVsJWx+0X8K3/AHMF/Z209xwMD7PHLlvkGXIWva68k+NH/Ir+FP8Asuf7M/8A60b8K6iq6Xsq1oVE2pODdWLUYW+GS9iuaW/vJwW3uaWf1XAnN/rvwbqv+Sp4ev7r1f8Aa+E1XvaLy19T6psdVtdQeRLeLUozGoZjfaNrGmIQTgCOTUrG0SVs9UiZ3A5Kgc0221i0u7lrWKHVFlXflrnQ9asrb92cNtvLzT4LNs/wbZz5o5j3jmtSiv5DcqN52p1Uml7O9aDcZW1c2qC503tGKptLTme5/W3vaarz916+nvafiZf9sWn237B5Oqef5nlb/wCw9a+xbsZz/aP9n/2f5f8A02+1eVnjfnii51i0tLlbWWHVGlbZhrbQ9avbb94cLuvLPT57Ncfx7px5Q5k2DmtSijmoXX7ury8lpL20Luf8yfsLKH9xxk/+ngve7x30917dvi389PQzb7VbXT3jS4i1KQyKWU2OjaxqaAA4Ikk02xu0ibPRJWRyOQpHNOu9TtrKKGaaPUHSfGwWmk6rfyrlQ/76Cwsrme34OD9ojiw2UPzgqNCihOj7l6dV2b9parFc66cl6MvZtdXL2t+iiP3tdV5e69PX3tfwOf024sdL8O6T5R1C5sbbT7C0t5I9J1Oa9miht44Ipn063s5L6PzFjDtutlVAwYkKVJ0I9TtpbJ79Y9QEEe7ckmk6rFenYQDs06WyTUJc5+Xy7V94yU3AEhujWL6Zo+labI6yvp+m2Ni8qAhJHtLWK3aRQeQrmMsoPIBAPNaVXWlRdSq/3lRuvOXtfaRSqU3Nu/J7HSclrz35Vf8AhdCYqXLHaPupctno7LrzbLt+Jn2mp217FNNDHqCJBneLvSdVsJWwpf8AcwX9lbT3HAwPs8cuWwg+chS2x1W11B5Et4tSjMahmN9o2saYhBOAI5NSsbRJWz1SJncDkqBzWlRWbdH37U6ibt7O9WL5e/P+5XtL625XTt15ute9pdrz916+nvO34mXbaxaXdy1rFDqiyrvy1zoetWVt+7OG23l5p8Fm2f4Ns580cx7xzR/bFp9t+weTqnn+Z5W/+w9a+xbsZz/aP9n/ANn+X/02+1eVnjfnitSinzULu1OrbktFe2g2qn8zfsEnD+4oxf8A08F73eN7/wAr2/8AAt/O/wAj7w/4JaeI9P0rRv2vrC6t9elnuP2vbSSOTTfC3ifWLJVm/ZE/ZIhQT6lpGkX2nWrh42MsVzdQyQRGOeZI4JYpH/VrV/Een6JJDFe2+vTNOjSIdI8LeJ/EEaqrbSJptB0jUobd8/diuHikZfnVCvNfmH/wSj/5Fn9sX/s8CD/1j/8AZEr9Wq/mHxOlhVxxmfPRxEksNk3tlHE04upL+wMr5XSbwk/ZRX2ozVZy6SifiXG/P/rNmNpR/h5Zy+49F/ZWBvf31d9muW3ZmJqWv2Ok21rdXUGtyxXmPKXTfDXiPWblMxiT/SrPR9Kvrux+UgH7bBb4kzEcSqyBkXiTT5Y45Vt9eCyIkiiXwr4ohkCuoYCSGbR45onAPzxyokkbZV0VgQN6ivz9Sw3IlKjXdS8uaSxFOMHG/upQeFlJNLSTdSSk9VGOx8p79/ijbtyu/wB/OvyCiiisCj8yP+CwH/Jifiv/ALOF/YR/9by/Zpr8bq/ZH/gsB/yYn4r/AOzhf2Ef/W8v2aa/G6v9K/ouf8mIpf8AZ2+P/wD1jvCY+Lzz/kav/sX4T/1JzAKKKK/dTywooooAKy9Etrmz0XSLO8bfeWml6fbXbbzLuuYLSKKdvNPMmZVY7zy+dx61qVl6J9t/sXSP7S8z+0f7L0/7f5uPN+2/ZIvtXmbfl8zz/M3443ZxxWqb9hUV429rRvF/G2oV7OP91JyU/OUCX8S0d+WWvTeG/ntb0ZqUUUVkUFFFFABWXp9tcwXetyztmK81SK5sxvL7LZdF0izZdp/1Wby0u22Dg7vN6yGtSsvT/tv2vW/tXmeR/akX9m78bfsX9i6R5nlY58v+0ft+d3Pm+Z/Ditad+SvZwS9kuZS+KS9vR0p/372k/wDp3GYnvHf4v/bZb/1vY1KKKKyGFFFFABWXLbXLa1p94rYs4NL1e2nXeRm5u7vRJbRvK6Ptis7wbzzHv2j/AFprUrLl+2/21p/l+Z/Z39l6v9qxjyvtv2vRPsG/+LzPI/tLy8cbfNzztrWi2puzin7KvrPazoVFJL+/JXjD++4ky2Wj+KG3+JW+Ser8rmpRRRWRQUUUUAFeSfGj/kV/Cn/Zc/2Z/wD1o34V163Xknxo/wCRX8Kf9lz/AGZ//WjfhXUVP4dT/BL/ANJZ9VwL/wAlvwd/2VXD3/q3wZ9d0UUV/IR/WwUUUUAFFFFAGXodtc2Wi6PZ3h3Xlppen21028y7rmC0hinbzDzJmVWO88v97vWpWXof23+xdH/tHzP7Q/svT/t/nY837b9kh+1ebjjzPP378cbs4rUrWu269ZycZN1al5Q+Bvnd3D+63rHysTD4Y2TS5Vo99lv59wooorIoKKKKAP0O/wCCUf8AyLP7Yv8A2eBB/wCsf/siV+rVflL/AMEo/wDkWf2xf+zwIP8A1j/9kSv1ar+XvFD/AJLjN/8Arxkn/qgys/EuN/8Akpsw/wCvWW/+qrAhRRRXwB8oFFFFAH5kf8FgP+TE/Ff/AGcL+wj/AOt5fs01+N1fsj/wWA/5MT8V/wDZwv7CP/reX7NNfjdX+lf0XP8AkxFL/s7fH/8A6x3hMfF55/yNX/2L8J/6k5gFFFFfup5YUUUUAFZeiXNzeaLpF5eLsvLrS9PubtfLMW25ntIpZ18o8x4lZhsPKY2npWpWbo18+p6RpWpPGsT6hptjfPEhLLG13axXDRqx5KoZCoJ5IAJ5rVJ+xqPkTSq0V7S/vRbhXtBLdqdm29k6cb7om/vJXfwy06PWOvqr2XqzSooorIoKKKKACvzv+Kv/AAUg+Evwu+MPi/4GaL8PPj5+0F8S/CH2S+8R+FP2b/hbJ8S77wfpVxo+jXRbxJL/AG1olvFLFeX7peLZy3p06S4t7K/+zXYeBf0Qr8CdB+N3x8+Nn7Xf7X/wr/Yv8Pfsk/so23wn8VXNj8Zfi/4w8Bae/wAYvibqela94k0zU/Gd1BY2KWHiuwtddsPEOo/bfEdhNBpVnrdnf6n4iN74jgtm8TO8xrYGGFo4eajXx2IeHpxjhfreJmoQliJrCQnWw+Gp1bUvfrYqqqUKDqpRlOUbVFXeuy13su3vbu2uy1vZ7Jn6q/ss/tffBn9r/wAJ694o+El/r0Vx4R1keHvGnhDxhokvh3xl4O1mRJZYLHXdJae8tl+0xwXH2e607UNQsZJrS+s/tQvbC+trf6hr+en/AIIjXOoXXxz/AOCl02reO9N+J+pz/FrwFc6h8SdGsrDTdH+IeoT+MP2h2vvHek6bpX/ErsNN8W3BbXrKy03On2lrfwwWf+jpFX9C1HDuY181yfCY7EqCr1ZYqnU9nFRi3hsZiMKpcsalWMXONFTkoVZwUpPkk42Ca5ZNLbRr5pP9Qooor2yQrLlublda0+zVc2c+l6vczt5ZOLm1u9EitF83om6K8vDsPMmzcP8AVGtSs2W+ePV7HTRGpS703Vb5pSTuRtPutGt0jC9Csg1N2YnkGJAOGNa0U3N2gp/uq7s3ZJKjUbnr1ppe0it3KKS1ZMnpu170dV5ySt89n5M0qKKKyKCiiigAryT40f8AIr+FP+y5/sz/APrRvwrr1uvJPjR/yK/hT/suf7M//rRvwrqKn8Op/gl/6Sz6rgX/AJLfg7/squHv/Vvgz67ooor+Qj+tgooooAKKKKAMvQ7m5vdF0e8vF23l3pen3N0vlmLbcz2kMs48s8x4lZhsPKfd7VqVm6NfPqej6VqUkaxPqGm2N88SElI3u7WK4aNSeSqGQqpPJABPNaVa101WrJwVNqrUTpxd4wam/cTWjUdk1o0iYu8Yu7furV7vTd+b3CiiisigooooA/Q7/glH/wAiz+2L/wBngQf+sf8A7Ilfq1X5S/8ABKP/AJFn9sX/ALPAg/8AWP8A9kSv1ar+XvFD/kuM3/68ZJ/6oMrPxLjf/kpsw/69Zb/6qsCFFFFfAHygUViab4a8OaLbXVno+gaJpNpfZ+22um6VY2NteZjMR+1QWsEUVxmJmjPmq+YyU+6SKZpHhbwx4fkmm0Hw5oOiTXCLFcS6Ro+n6bJPGrb1jmeyt4WlRW+ZUcsobkDPNdEo4VKry1sQ2nH2ClhqcVUTtz+1axU/YuOvKoKvzaXcL6SnPS8Y/wB60m7dre4ub58tvM/Ob/gsB/yYn4r/AOzhf2Ef/W8v2aa/G6v6W/if8FP2f/HfhDVvCvxY+DPwt8f+CfFWqeGNP8QeFfGHw78KeKvD3iG8n8YaFdaAuu6HrGlXmnatBa+LYNE1dV1C3uIob2xt78o0tsjDw7/h2X/wTd/6R9fsQ/8AiKHwH/8AmCr+vfBjx44G8OvDePCGfYHi/EYlcb8ScSUcdlOU5PicJVo5xkPBWWfVJLGcSZfVhiMJV4dqVajjGpCdLGUGnCUZxPnsyyvF4zGvEUpYZL6rQouFSrVUk6dXEz5vdoTTUlWstneLPwVor96v+HZf/BN3/pH1+xD/AOIofAf/AOYKj/h2X/wTd/6R9fsQ/wDiKHwH/wDmCr9M/wCJq/Cr/oA8Qf8AxH+HP/o1OL+wsw/mwf8A4Orf/Mp+CtFfvV/w7L/4Ju/9I+v2If8AxFD4D/8AzBUf8Oy/+Cbv/SPr9iH/AMRQ+A//AMwVH/E1fhV/0AeIP/iP8Of/AEah/YWYfzYP/wAHVv8A5lPwVrP0m7i1DStMv4Ifs8F7p9ndwwYUeRFc20c0cOEwg8tHCYQBfl+XjFfv1/w7L/4Ju/8ASPr9iH/xFD4D/wDzBVl6H/wTb/4Jo6touj6pp3/BPz9ih9P1LS9P1Cxe5/ZS+BjXL2d5aQ3Fq1w0/gWWdp2gkQytNJJKZCxkd3yx1X0qfCv2NSX9m+IbSq0o+0XD/DvJFyjWahL/AIzS3NU5XKF9bU526i/sLMOZLnwW0tPbVrvWOq/2XZXs/VH4U0V+9X/Dsv8A4Ju/9I+v2If/ABFD4D//ADBUf8Oy/wDgm7/0j6/Yh/8AEUPgP/8AMFWX/E1fhV/0AeIP/iP8Of8A0aj/ALCzD+bB/wDg6t/8yn4K0V+9X/Dsv/gm7/0j6/Yh/wDEUPgP/wDMFR/w7L/4Ju/9I+v2If8AxFD4D/8AzBUf8TV+FX/QB4g/+I/w5/8ARqH9hZh/Ng//AAdW/wDmU/BWviL4r/8ABP8A/Yv/AGiPiJq3xG+KvwF8PeI/Hlnf2NnqfiKDWfF3hmXX57bSdJvLW61+z8I+ItB07xHNDZ3NpYef4gs9RuHtbSO0eRrOOKFf6x/+HZf/AATd/wCkfX7EP/iKHwH/APmCrL0//gm3/wAE0by71y3tf+Cfn7FDT6TqkOn6iJf2UvgYY0vJNF0fVEW2EngV0WA6fqVi7LAsUX2l7hihnaaSSKv0nfCDHUa1PGZHx3jaVOMaqjX4Z4Yr0qM1WpQjWlCrxlKP23Si7XU6sbMP7DzFONp4ON3b+PXTejdl/svlf0R/M58If2SP2dfgH428X/EL4NfDHS/hz4k8d6Ro2heKU8Mar4ksfDOoab4ehtoNHig8Df2y/gfSbiyjtgUv9H8O6fqEstzqdxPdSz6vqsl59G1+9X/Dsv8A4Ju/9I+v2If/ABFD4D//ADBUf8Oy/wDgm7/0j6/Yh/8AEUPgP/8AMFU0PpR+EeGp+yw2U8eYelzTn7Ohw1wzSp89STnOXJT4zjHmnNuU5WvKTcm222H9hZg95YN/9x6//wAyn4K0V+9X/Dsv/gm7/wBI+v2If/EUPgP/APMFR/w7L/4Ju/8ASPr9iH/xFD4D/wDzBVr/AMTV+FX/AEAeIP8A4j/Dn/0ah/YWYfzYP/wdW/8AmU/BWs+S7iTVbOwMO6e50/U7uOfC/u4rK50mGaHJ+f8AfvqED4U7T9n+fJCY/fr/AIdl/wDBN3/pH1+xD/4ih8B//mCrLm/4Jt/8E0Y9a0/S3/4J+fsUDULzS9Y1C1Rf2UvgZ9maz0270O3vmlUeBRAZ0n1bThbtJG8qxvciF40adZdaX0qfCuUmllviHU/d1pcsOH+HbpRo1JObtxp8NNL2k+nJGV9LilkWYW+PBL3o6utW6ySt/uu72Xm0fhTRX71f8Oy/+Cbv/SPr9iH/AMRQ+A//AMwVH/Dsv/gm7/0j6/Yh/wDEUPgP/wDMFWX/ABNX4Vf9AHiD/wCI/wAOf/RqP+wsw/mwf/g6t/8AMp+CtFfvV/w7L/4Ju/8ASPr9iH/xFD4D/wDzBUf8Oy/+Cbv/AEj6/Yh/8RQ+A/8A8wVH/E1fhV/0AeIP/iP8Of8A0ah/YWYfzYP/AMHVv/mU/BWvJPjR/wAiv4U/7Ln+zP8A+tG/Cuv6Rf8Ah2X/AME3f+kfX7EP/iKHwH/+YKqd9/wTl/4Jt+H47bUm/YF/YvsW/tTRtPt7nTf2WPgha3aXms6vY6PYqs1p4HhmWCa8v4IbxfM8qSzknjuElt3lieZ/Sn8MasJ0sNlnH9bE1Iyp4elPIuHqcKteacaVOVSHGFacIzqOMZTjRqyim5RpzaUX7PDmExWS8Q5FnGJWHqYfKc5yvMq9OjWqOrOjgMbQxVWFJTw8IOpKFKUYKc4R5muaUVdr8gaK/aj/AId6/sCf9GO/sf8A/iNHwX/+Yqj/AId6/sCf9GO/sf8A/iNHwX/+YqvwP/iLnCP/AED8R/8Ahuyz/wCfh+9/6/ZB/wA+c4/8I8F/88/X+np+K9FftR/w71/YE/6Md/Y//wDEaPgv/wDMVR/w71/YE/6Md/Y//wDEaPgv/wDMVR/xFzhH/oH4j/8ADdln/wA/A/1+yD/nznH/AIR4L/55+v8AT0/Feiv2o/4d6/sCf9GO/sf/APiNHwX/APmKo/4d6/sCf9GO/sf/APiNHwX/APmKo/4i5wj/ANA/Ef8A4bss/wDn4H+v2Qf8+c4/8I8F/wDPP1/p6fiPpN3FqGlaZfwQ/Z4L3T7K7ht8KPIiubaOaOHCAIPKRwmEAX5flAGK0K/ZTQ/2BP8Agnxq2i6PqmnfsP8A7Iz6fqWl6fqFi9z+zV8HGuXs7y0huLVrhp/Bss7TtBIhlaaSSUyFjI7vljqf8O9f2BP+jHf2P/8AxGj4L/8AzFVrW8WuEo1qsXhOJabjVqRdOeXZbz02pNck755fmj8Mr63TuTHj/IHGL9lm70WqweCs9Fqv+FPZ6tfL5fivRX7Uf8O9f2BP+jHf2P8A/wARo+C//wAxVH/DvX9gT/ox39j/AP8AEaPgv/8AMVWX/EXOEf8AoH4j/wDDdln/AM/Cv9fsg/585x/4R4L/AOefr/T0/Feiv2o/4d6/sCf9GO/sf/8AiNHwX/8AmKo/4d6/sCf9GO/sf/8AiNHwX/8AmKo/4i5wj/0D8R/+G7LP/n4H+v2Qf8+c4/8ACPBf/PP1/p6fMv8AwSj/AORZ/bF/7PAg/wDWP/2RK/VqvBfhj8Af2bvhpb+IPDvwj+BPwg+G+nWHilb3V9I8DfDHwb4P0lvE9z4d8N3R1aKw0HRrCyN9Jop0CGW/igSZzZxRuzPbhq9c1fwt4Y8QSQza94c0HW5rdGit5dX0fT9SkgjZt7Rwve28zRIzfMyIVUtyRnmvx3jLNcuz/iXF5rR/tDDYbF0cB+7xODw6xMIYfK8FhqM1Thj5U5rERoqt/Gj7OFSKTq7n5lxDmkM4zfGZhhqUoUa31anSjWklUccNhaGFcqigpxhKToOfJGdRR5uXnduZ71FYmpeGvDmtW1rZ6xoGiataWOPsVrqWlWN9bWeIxEPssF1BLFb4iVYx5SpiMBPugCmReFfDEMccMPhvQYoYkSKKKLR9PjjjjjUKkcaLbhURFAVEUBVUAAACvlVHDcicq1dVLy5orDU5QUb+61N4qMm2tZJ04qL0UpbnjXnf4Y278zv93I/zN6iiisCjE1+HSrixgj1mXyLRdb8NTwvvaPdqtt4j0q40KHcoYn7RrcWnweXjEvmeUxVXLDbrE1/TbfVrGC1urr7HFFrfhrUllyg33Oi+I9K1iztf3hC/6dd2MFlgHzD9oxEGlKKdut5NfVqK56jkq+JbpNP2UIunhVGpB2t7So4yjUSbajSpXSunKdeZ6K3LHXq9ZXT8lpbTq9+hRRRWBQUUUUAFYnhqHSrbw5oFvoUv2jRLfRNKg0afe0vn6VFYwR6fN5rBWk8y0WF/MZVL7txAJxW3WJ4a0230Xw5oGj2d19utNJ0TStNtb3KH7ZbWNjBawXWYi0R+0RRLLmNjGd/yErg1vFr6tVj7SopOvh2qST9lOKp4lSqT0t7Sm5RjTu0+WrVsnZ2l3546K3LLXqtYWS8nq35pG3RRRWBQUUUUAFYmlQ6VFfeJZNPl8y7udbgn11N7P9n1VfDmgW8MO0gCLdolvo0/lqWB8/zc7pGVdusTStNt7G+8S3UF19ol1rW4NSvIsofsNzF4c0DR1tfkJYb7TSbW9xKFk/0zIHlGNjvRaVPFJzqQcqEVGME+WrL6zhn7OrZO0FFSqptxXtadNXu0nLveOifva36e7LVed7Lro36rbooorAoKKKKACsSeHSm8R6VcTS7dbi0TX4NPg3sPM0q4vvDUmszeVja/kXdtoSeYWBj+0bVDCViu3WJPptvL4j0rWGutl3Y6Jr+mwWWU/wBIttWvvDV1dXWCfNP2OXRbOLKKYx9u/eEMYg2+HaVSTlUqU17DErmpp8zlLDVYxpuyfuVZNUqvRUpzu0rtTK9lZJ+9DR7fHG79UtV5pG3RRRWBQUUUUAFYmvw6VcWMEesy+RaLrfhqeF97R7tVtvEelXGhQ7lDE/aNbi0+Dy8Yl8zymKq5YbdYmv6bb6tYwWt1dfY4otb8NaksuUG+50XxHpWsWdr+8IX/AE67sYLLAPmH7RiINKUU74VqOJwzlOpSiq9Fyq0k3VpxVSLdSmkpN1IL3oJJvmSsnsTK/LKyTfK7J7PTZ7aPrqjbooorAoKKKKACiiigDE8NQ6VbeHNAt9Cl+0aJb6JpUGjT72l8/SorGCPT5vNYK0nmWiwv5jKpfduIBOK26xPDWm2+i+HNA0ezuvt1ppOiaVptre5Q/bLaxsYLWC6zEWiP2iKJZcxsYzv+QlcGtut8S1LE4iUalSrF16rjVqpqrUi6kmqlS6T9pNe9O6T5m7pEwvyRuknyxulstFovJbLyCiiisCgooooAxNKh0qK+8SyafL5l3c63BPrqb2f7Pqq+HNAt4YdpAEW7RLfRp/LUsD5/m53SMq7dYmlabb2N94luoLr7RLrWtwaleRZQ/YbmLw5oGjra/ISw32mk2t7iULJ/pmQPKMbHbrfEtOpFxnUqL2GFXNUTUlKOGoqVNXS9ylJOlSdrOlCDTkrNzG9tUl70tv8AE7Prq1q/NvbYKKKKwKCiiigDB8R6RLren29lFMkDQ694W1cvIrMrR+H/ABPpGvTQgLzvuIdNe3ib7qySozfKDW9XG+O5ZItEsWikeNj4y+HURaNmRjHN8QfDEM0ZKkEpLDI8Uqfdkjd0YFWIPZV1T5/qdC870/rWL5YcqTjP2WC55897y54+zSi0lH2bab53aV8ctNeWF35XnZW8tdet/IKKKK5SgooooAKwfC2kS+H/AAx4c0GaZLibRNB0jSJbiJWWOeTTdPt7J5o1b5lSVoS6K3zBWAPNb1cb8OpZJvh94EmmkeWaXwb4YllllZpJJJJNEsWeSR2JZ3diWd2JZmJJJJrpjz/U69p2p/WcLzQ5U+afssZ7OfPvHkj7RcqVpe0TduRXh2546a8k7Psr07q3npr0t5nZUUUVzFhRRRQAVg6RpEum6h4pvXmSVfEGvW+rwoisGt44fDHhzQTDKTwztNoktwGX5fLnjX7ytW9XG+GJZJNb+IqvI7rD4ysYoVdmZYoz8PvAkxjiBJEaGaWWUouFMkkj43OxPVQ5/ZY3lnyx+rQ9ouVS9pD65hLQTbXI1U5J8yu2oOFrSbUy3hdfadvJ8k9fPS6t536HZUUUVylBRRRQAVg3GkSzeJ9I14TIsOm6D4j0h7cq3mSya3qHha9imRvuhIF8PzJIp+ZmuIivCtW9XG30sg+IPhiESOIZPBvjuV4gzCN5Itb+HSxSOmdrPGs0yxuQWRZZQpAkbPThef2svZz5JfVsZd8qleH1Ov7SFna3tKfNBS3hzc6u4pETtZXV/fp+WvPGz+Ts7dbWOyooormLCiiigArB8R6RLren29lFMkDQ694W1cvIrMrR+H/E+ka9NCAvO+4h017eJvurJKjN8oNb1cb47lki0SxaKR42PjL4dRFo2ZGMc3xB8MQzRkqQSksMjxSp92SN3RgVYg9WC5/rmE9nP2dT61Q5JuKmoT9rDlm4NpS5ZWfK2lK1m1cmfwTurrlldbXVndX6ep2VFFFcpQUUUUAFFFFAGD4W0iXw/wCGPDmgzTJcTaJoOkaRLcRKyxzyabp9vZPNGrfMqStCXRW+YKwB5rerjfh1LJN8PvAk00jyzS+DfDEsssrNJJJJJolizySOxLO7sSzuxLMxJJJNdlXTjOf65ivaT9pU+s1/aTUVDnn7WXNPkV1Hmld8qbUb2WxFO3JCysuSNlvZWVlfrbuFFFFcxYUUUUAYOkaRLpuoeKb15klXxBr1vq8KIrBreOHwx4c0Ewyk8M7TaJLcBl+Xy541+8rVvVxvhiWSTW/iKryO6w+MrGKFXZmWKM/D7wJMY4gSRGhmlllKLhTJJI+NzsT2VdWL5/aw5588vq2Cs1FRtD6nQ9nCybu6dPlg5bzcedpOTSmGzsre9Pz155Xfzd3bpsFFFFcpR//Z" width="182" height="190" /></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>El quadrat blau té els costats que mesuren a.</strong></span></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>El quadrat vermell té els costats que mesuren b</strong></span></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mrow»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»Si«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»a«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»a«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»i«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»b«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#00007F¨»#«/mo»«mi mathvariant=¨bold¨ mathcolor=¨#00007F¨»b«/mi»«/mrow»«/mstyle»«/math», </strong></span></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>a) Calcula (a+b)<sup>2</sup></strong></span></p> <p><span style="color: #000080;" data-mce-mark="1"><strong>b) Calcula a<sup>2</sup> + 2ab + b<sup>2</sup></strong></span></p> <p><span style="color: #000080;"><strong>c) És veritat que (a + b)<sup>2 </sup> = <strong>a<sup>2</sup> + 2ab + b<sup>2</sup></strong> (S per si, N per no)?</strong></span></p>
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Answer 1
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33.33333%
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16.66667%
14.28571%
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Answer 2
Answer
Grade
None
100%
90%
83.33333%
80%
75%
70%
66.66667%
60%
50%
40%
33.33333%
30%
25%
20%
16.66667%
14.28571%
12.5%
11.11111%
10%
5%
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100%
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33.33333%
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Hint 1
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<p><span style="color: #003300;"><strong>Si es calcula es comprova:</strong></span></p> <p><span style="color: #003300;"><strong>«math xmlns=¨http://www.w3.org/1998/Math/MathML¨»«mstyle mathsize=¨12px¨»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»(«/mo»«mrow mathcolor=¨#003300¨»«mi mathvariant=¨bold¨»a«/mi»«mo mathvariant=¨bold¨»+«/mo»«mi mathvariant=¨bold¨»b«/mi»«msup»«mo mathvariant=¨bold¨»)«/mo»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨»=«/mo»«msup»«mfenced»«mrow»«mo mathvariant=¨bold¨»#«/mo»«mi mathvariant=¨bold¨»s«/mi»«mn mathvariant=¨bold¨»1«/mn»«/mrow»«/mfenced»«mn mathvariant=¨bold¨»2«/mn»«/msup»«/mrow»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mspace linebreak=¨newline¨/»«mspace linebreak=¨newline¨/»«msup mathcolor=¨#003300¨»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»a«/mi»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»2«/mn»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»a«/mi»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»b«/mi»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«msup mathcolor=¨#003300¨»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»b«/mi»«mn mathvariant=¨bold¨»2«/mn»«/msup»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»=«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»a«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»2«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»2«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#183;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»p«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»1«/mn»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»§#160;«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»+«/mo»«mo mathvariant=¨bold¨ mathcolor=¨#003300¨»#«/mo»«mi mathvariant=¨bold-italic¨ mathcolor=¨#003300¨»b«/mi»«mn mathvariant=¨bold¨ mathcolor=¨#003300¨»2«/mn»«/mstyle»«/math»</strong></span></p>
Hint 2
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