Bill Adongo


BIOGRAPHICAL PROFILE:
An A/E Authority, BillAdongo (is a Ghanaian who was born, 1983) from changed name William Ayine Adongo in time name BillHandson, “The Judicial of God”, is under 20 years who propound the General Truth as Omniscient; a Government Equivalent ever propounded that must be circumspect linear, or circulate of auto variable in complete full cycle. Under 20 years who propound the general Truth which all subjects, literates, institutions, and things being accurately changed. He introduced a language Afrenish which stays the meaning Arithematic From Extended Nations Intense English. The one who solved the solution of unique infinite variables which should be auto prediction of all single equations when one setreal unique variable is known in stated principle of auto existence truth, that there is only one interactive integersline of truth to predict precisely in multiplicand principle of the set real value. The one who disproved the overall subject matter from 300BC to 21 century delusion in complete changed to actuate literate of all institutionary matter. Image result for bill adongo
The one who propounded the Auto Existence Variable in natural unnatural, and artificial path of the natural universe in exist Interactive Integers for discovering various language responds; a knowledge variable for setting natures, setting an institution, setting an educational subject, and setting examinations institutions. The moral legal he propounded is That Shall Not against Separate Interest or Government which is unavoidable voting of interest needs in variable structural institutions, educational subjects; and employment. He owns the total Truth Mathematical Equations and SolutionsLawof Art, Humanity, Business, Management, Engineering, Technology, Life Science, Medicine, Natural Science and Social Sciences. His laboratory demonstration is observed system to natural system in separation view in physics, chemistry, and biochemistry (or medicine). A social mathematician or statistician who owns the Truth Law of Linguistic Science. His linear line of Automation engineering or solvent statics is the instinct ants in scatter plot of natural force to then engineering which was the reconvert to its copy instinct in new bath which should as the scatter plots in actuate allowable gauged force. The one who write to dear nations, that his language tree is reconvert point balance traits who once speaks real trait tongue or likeness and oppositely speaks other real tongues or likeness in positive blame balance; dear nations is star stars who fill the moon. 
Image result for bill adongo
More than eight years on strict persecution from Lt. (Co). Dr. Samuel Odonkor, a later period when opportune of nations is on his strict since a petition to him by Dr.Samuel, if he can be the government than the old. Subduing his A/E authority on Wealth salary of Nations to all coupling populate to marriage. He later put all effort wounds though many assassination attempts to him to build the moral faithful of his goods which he originated the Brutinist Faith and Circumspect Results in fixity important which employed people at least 35years in wealthsalary being Ghc1,028.60 per month when set ever registration in marriage isGhc600.00, called Moral General Wealth Regime Model in the year 2015. Moral Circumspect Circulate Taxable Income system of modeling belongs to him. This Circumspect Result is what him Billhandson, TheJudicialGod warned that the Live Slope or Monotheistic Guidant is not to eat sensory limit called other animals which animal should not be killed intentionally.  A finished real solved in complete new Mathematics, English and Laboratory Functional Fitting which exist Epistemology of true government, tracing origin of truth which the Moral General Wealth Regime of 10main institution in Art. Medicine, Natural science and Social Science.
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/4XYjwvn4y4O7ZkLuxAY/OhzyKD3x2PjDpUsiry6EvE0Kexfs/OuP56Ix74innG9HHrpw4dj7s+Nlg51P+x6O8jsZ6HT/rdvTMoV/P/vt/bvzxS7LH0Qw/t1yvozXBzoO3YhVZz3VlqUrIB1VVjqaxRImB6NoQJmrz4jB5aZxmHxu2Dg0aaf2mrj4bgWLGtKvRRBEaP43GcDpaFwUcYHMJ2F4GNhY+6SRm1uD8SJedNWhn9c8PkRc5zHUZ/5NO/cWg/TSvcjK1txnaiPpWvKmDYOsmLlBbLN3NRjLG0IXVUbB6KsHU37E0TtuYpu/OTe3w5lZm5zZE0h9mPbCg3VBML3J6FieItr4GPR4khKUysp8IKzLmanJLbp885/JfZ/1+Px3kmhAbfv1cxKVI76snPJ5fCPlw40Ta1dCs62H5t0+A7kWBH54sexBTkhhZcDMi/3pIboLfx/NeKWc9k2I9Hpz0vBnleSncMz7E46SX88UA7wQf9zOHfj3z6//cOv7nK3+PnGCv3GP/wkb5MJ5dVxan6KrztPXFGhRY01xhpDQZurBGaoupt8PcRzFSu/RdXaZ2srmBaKjDSxGYmcamKVKLgjm2bdYCnzaBlYWfFt2WkGMepRmGqY6p4VXe+OLc2KZauKmT7epVO1rFtlLqpMaiNbgmHb7J0NJkJKEMxEYtoVbdXK1orlK1IHRkzMJAxwZzeGeGucOZ3JhlL07OrIvkGzLxsmjayqGpRzCKznJjO0RWk8bKujeT81gASSW9ufU8zPmCz79vn/G7GON/+UzYzbjQxLjA5/GB6VeDi+6EQe6F1T6Kako6TXwX15p6vuVNPObFGeSzWPTTWOTdE4ibYdArIQWXgjMuhLyKC3l0JvTWqZC4IO+E8ICbUaE3wvwvehyLO/rbVbfDr/1c89z+hHkdIcZHctJfmOpKTBiYvhmuI9ZaqFhDF1bfhTdSSZbeTnMPWd/ZZiAQFxAEcxWOD0eyGpqEg/0rBuXXbcfPbccXq35XIV6bZi6M9tvG+5dnRjekk9vzPGDd9GPV9G3J+MU6/82ocRLVgqX1UBUarsVVa3GVKjRMigQL60GCRrAUW6XtRC+Ndm3PjO1xWZscpn2auS6Wbis01tkpA3NgeW7QNIzjoXJEdekc0Iup3Mfqmo/MotcpEa4JLv+8H+1zK9rn7umgG5Fe9096v0sIy7oelpXgW3jFG57oj0uOJqecHchJGMq70pN+ofPduba358gp8W3PY4iPIlGJEdW3IsDXT+ReCX9/IexVXNj7a3EPT4XcjvC9Fxlw3d/t1KF/nj3yz8feR0GB7qDjf9QEeU4k37fUlS221OqItepOlJ5G0vSS5qmt5p6Oxf4uex/F1EEw4jAOJMFUg5uFI1gojGZ26tunDeDnp+0V68/VpQONan2W42BOLNJHFpjDDh5zQ83dMSu2jLJNnWxHJ/9sUDntDGE2+1ErVIStHa7BgIR1ebyaPEF9kYJQKSPWiUmIhQnqTw1/jcfQ0/vWpHN2udguFS0L5lZm6EvDnca2eimigAt5P1mURC9MEtQVVD+4ePHQ/7yMDb3oceRNfPTraJ93kW7vY9yzz3oVXvAGXfGpvOOHehpKeB3VlhLTlXGGlnthsCCBlnuRnHGmLSUG/yIU+zgQ9SCo8V4wIjGs6kZI2cWA/DO+uWeCss+FfjwXkhobmHTCOzHg2GX3X68e+luezxFEqFfhH3/HRgcaYAXrFPTiWKdhqk86QdNMjippvavj49aOtrUesra5To9FzNfWKavrevMLtmWSr5ur+wdbP4Fva2srDqNJx+Euzgo2eKKFCcbyNGtHynPwp7/b9Lt6xZZWvm/UfLManDSY7IXO8sWOcmVTrgSRrcaWKtDgmZpcTStC3lq/x6N/V3HVg53qUeqqlK2dHrHIhDapcFkwtzpFXxkgW0mNmvpSCTybVfxmKC95qOx9RnzoLd+jT04E3gnySz0b8z7CIzP0aPaJY0WnXUDxHuWXPWvv+jc9C8O/jiC+i+xMP92dE9eXd6En73zXx7MdH05hkgJRT/wb7/s03PVpvO1fe9UXes4DFONaEuNZdMon/7Rv5imft5Eej4OO3fT+49bxv39w/x0e4AI+9hsq2Gsi+T4w0bM01WsRMdW8yXn+rGZk1DFGN7a0LLTiFA1gRQNYUQPjwSsmquE/LAbgYHvvYHv/26eNnW2T1qCY4RnYvKVZoZnOWJqePlDIdhXiHZVsWcK3i7lrSvH2vMJpsuw5tyZFUp/Jr00XIrKUWJAaD5NgIfOdyB+yScAoXueOGxn91tlxh3BqSTJnkwrtMum6SLAxxVymUSxEpB4J09SDePBsBjgNn5L4KPBocnRAYpDni5jwlNMnPoR7ZIYe/XjiWEGsW+l5L9hV37p7QdikE6R3J9vSTnVmnKHkxFNzznflnu/KiqN8PId/HY59Edz0yL8x0b/xtn/tZR/YWY+SaJfCSJeCKM/caK/MGO+USM+kMOcHgUceev3+6tg/QN5H4V7H4d7OiKgAgNG7LRjb0Alsav6iQmhhMpaGh7VYzDy6VlRTIKou4kOK52BQNbkd2NkAPm3v7W8urTm2drYXzQt6oczKFTu4Ivs0Z53P+6ZVfzWoN2SiJRHXLpzbUEp2dEonVXMhtzaNj8iYbwErm0s5NVmiptKFAfwagwqYJZ/E09phyrp45qtJta7krynFS3LZqkq5K5VssacdfV1mAtLYVKVDlWsx5WIkqPz26USfP1POhT4I8UyOCXsVGfgh3CMz9PjHE86FZ9zBF33gNwOQj0+0vI0lZ54nZ13szrvUnZ/QnX+lK+9yV95lat6VzowzrakxzckRmMehTYlB9df84XFeZSdd8sOP5YU755xw/xjp+T7C7XWY6/Ng56SAI0nH/lngdQTu5wb2OJrv/pe8Dvxdyf5sk62bZKsa6RJ7ykrr1WBRCgSUX5MnqClg5GUKa6p3ZqaAT7s/t1cP9resC5a1jfXd9U37vNEqEDv44nWhZFsm2VVItxWidanQIeatSAU7WsUn87zT3mTLQh/C3F1t70fOd1TxkEVyYtUmi/pdOrnI6FmdGVsXTi3Osb5b5gGHWckaX9eodzS6fblih8129FHNhCZ9U6UOVT6PhUqbyt7HeD4OOvI6xjcpyv/5icCXYT7pEe4Z4c5ZkS7FZ73LLwfW3AnDvDjd9uFSR+alrryrfcW3aKV3aaWJtNLEfvDDQciD/uKbvTmXOt7HtiRFNT8KR94MqjrvBT7lkh96OC/saHaYS2a4a1qY69sw55chzq+Cj790/yPX16XMxxXs7ZLncaT2Sux3JfuHXfVtVb9jVG7MzZioZC2mUVxVwqvO5lblDGalqrFoQCEFDrYOlsw/Pu9srC9vb20cbG059Eb9HM86x92Wy7flUjt3xjRFdwjmFvgch5i/rVEcGLROpl6EfRi9MIiep9RoKYjFoZbNqZ4d9sDW7MjG7NiuaOZAKdhVibY10lWFaH6GtanS7ii1+yLp5uTkUg/VhEdrG+CK+jJeVd5oacqzwEPJ4S5JER7vTgYmR/i/DvfOOOGRGeGSE+1WEu9bcS0E8SAK//YCJecmOftab0niWOULFuLdZGMqszFtEpU+g06frE2il9+n5V3tfB9PfHESnRhSk+ANPeNaHHm0KOJYfoRLdphLeqjz+1CXtyHH34a4vPU9nunnmu95HBrgCQp0T3b5bWduBHCogb3Fz2bFNm9G10GaxyH4FXkceDoLnDZRnG3ubPss5ADrjm2j5svW8reDnW8HO1+3NjctFgOXZ+FyP+k0+xqFbZZlnBxfmJuxcmeWhbwttfxgXu00hSwQEqHS9ipZR/XCaNt3KeuHbGp9enB5chCwab6ohYuciQOtdFXG17HpGyrZikS+JpRtzHDX6PSl7i5jc5MCARVWFTJK32OTr7054foywvVtlPe7aN/U6IC3EV5ZUV5ZkW65pzxKL/hX3gpveHKKlHa1p+jBKPzlNDJd3A5SUWGqnkppN1zSVSGjQCWkPG5TChP2ZCD/Vtf7C6RnMahbwTUXfWCn3cCnXEuiXQpOOGeFu6SHOqeFHn8f6pYS5J7iffyj29GKEL/SII93Hn8ZaARgbR7YtR3MizbZDBUBbWhG8GDZnKqMMdBreVPVEo1qG+oDrPpVmdAm439eXfy2tQbs7Xxdddhl0kUh/5Nxfk8tt82y7NzphVn2wtzMioC3rZTtqRROnNYKFq50tqXCONr2Rc4CtHM7fLp1jPpDLfismPuk5C+yx8U08gKXdWBU2IVzS1yuY4a7zJx0DA3bu8jGZqS0DsKF5dJLUuC3T+VeCHkZ4ZxxLvB1hEdmbHBquGd2tGdWtGveac+yhMDKuyeQL861Zt7oAz0RthSqqZULExjHTKt9utVIx2tGsdoh5DytUtlRxEWlMaBPBnJvUt7FEx6dQN0Mqo73rDzrCTntVhzlnHvC5WOYc3rY8Q9hrimhnknuR9Jdj1SEBxT6OpdG+0sINcCmHlg1bElmViaG5U11Rnw9vzKXW5c1Cn5r7yWtDPZIWzCAVubgsAT9XWsa6cGiEdheBzZWVpQSG5+zo5KtCDkGxugKl22eZFimWEtzsxti4ZZU7MShNMiGCAsz/dsy1mf17HfN3A8tH9AKlD0kZQ9JRWsz0mkrPOaOgnswLz7QSj+rFCvs6U9c7nw7SYfHyBEwZSN0GvJxpjI7N84vNdqtICH847mAtxHurwKds6J9C2J98067F8f5wK6H1D8+jX93qavg/gj8laav2jSOXpwimVhE7RhO2o+aJdeyWsrElHJuc9Zk3bsJ2HNa7g1i8il0YgjmTnDFmWNVcW5V532gZz2Lo92yw49nBh/7EOKSEu6VEuCRcvQPkI8LOMi9Lj6i/cMTYEnxbZ7/RcldHumztOHN+AYePIcBS1G2Vewx+7i1MBUJLcYj6YgKeV+HgTlsm2Pu6hUHVu1ni3ZHK1sVzS7M0o30fk1/t3500MZirHBmNvjcdT7XaUHM2FBzvtrkwPI8YNd8nReuCyYWJ/sVVIK4E8NvRUrIWMMoZYU7tidnf1bxfmqlB0IuIOWvDfcZWppkiHIuLHcoJ5kBfv8x1utNxPGPcX7pp33SozzTQtxyo30KzniXxHtDrwXXPohqeHa66XV8W85tGvSFiAxV9CPmx3E6FtEwTdZNU2T0Vn4fktWcz0CmjVa+6i99RM2+Tnp9Bvc4AnsvBHXTH30joPFaUF1CAOycT0mMe8EJ16wT7mmRvh9CfD64HIb4uZcHuMIifWpvn11ndW/xx9dnRlcGe+ydpMVWtBZXISdADFTEQk+zEFGuQNeOl+a0p7+eqoMpu1vt7LFl4eS6jLMq5yzymEbWoGG8TzdI1vR2GIdptvHR5UnmGntqhT3p9Nmh+75mALZtwP4SsGn5YpDaZ0e1g+3qPpKgtWEKCWHWl3JwFXIy0jDQYhlu3xOwtjnjq+M99l6SsKZMVF00B89hgdOGS95knvV8E3k8/bRnWpRbzknfrBOe+dFeRWc9IJd96x9GNb8535KaQPp4vQf8dKIxjYnJnWwpmSHDuX31ohG8eKx1pr95or16GJM/0vihtyKpM/9ue+bl9rTz7W/OkJ5HEp9E4O+HoW4G1CX4VcR5l552L4x0yQp3yYj2y4zwzXI/UhnkWRXkVh7kkh/pwWsEWYfbTb1t9q4ORyfJ3oZd7cUvjxMt/Wg5GjoLLWAVZ7Yn3ye+uMcAZUkwNZbBDhuDujgztMAZ1jN7tIPt2r5WI63dQiObaN2WQZp9bNhBH10aH3H6sb/ybXvp+9YCsLHwY9m4pxWZJofkPQQltVnQUstuBE03FPExEHlrpbq9WtVRYx1ssY90qNvqF7sxs7AsQVUurzqXXZnRX5SUe8Ev46z3x7M+H6Lc8k755Ed6F0R5wq4EVN0Jbnp2kvThIjn3Fq3s0UR9Kqe1kE8GC/tr5XSsgtWqYnepZ2my6V7BGGmur3aOUs7AZvdVJvWV3jmzw8IAACAASURBVB8sSxwsvNGTfoHy6jTpSUTTrYDaBO+KeC/wabeCyGMfw5wzY/w/hvtkux+qDfZChnpWhbjm+B8aK3qrI6OVRKS1Fb9AbLYQkDsj5D1Or5GGUuHgUyUfKC/utD64OpaaNFOUMQfNk+OqDT3NptE24wRZNdgi70JrKRhjd7OVSjR0tZp6ydb+7oXBnsWhXifg56efX7e/768CO8vfVy0bGqF2vJfXhpwjVHMx5bwmkIoEX6Q1bozjNsfQjkGkrqt2YQinbq3YGMFLGwtEtdn8mqwJ8Jve/Ce5l3yz4n1yzwdkRrnnn/QpjvItPeXdcC+y7kEw6tmJtoyLA+CHzPo3cy05IirYPIVzSKib8xMbhuk1/cyambdhE29b+UuKoSVxt2UGPz+GUPWUSUnZHEQyvexOf/p5yuuT+Pthjdf9qi/5QM95lJx0zTnhkh3jlx3ulePye42fS1OwGyLYJc/796HMZ6b2Ji2+0UrEWXFoA6Zha4SyM0fT9jSa2upmS9LI9xP6n97kpCdPf3jBKUhRI8EKPExNrlP2ICXkOgmxWt5SoyPU6wgNujacrrPFQCGZqe22PrLT56/7X77u/fy2B3zfBz5vfrXrlvjM+aEOLr6S21TGRxVqWsqWems3hupXe6stnRBzT5Wxp2auPsPQBpE0ZgvqMmxdlZqWspHyV7mXfD/EumfH+2Sf9CqJ9S+N9oee8a+7FVid6I9Jiuorus1pSpV3Fc0Pw42Mxj1N//fFaWBD8m1Vursk3ltWftk2AvumH2uSzwuT+4bRAw1tU9BiHCznN71jQROHcxNo6ec6kmKwd0NqL/tAz3kUxxzPPXE8/7R/QYRX7tF/V7r/hfQ+XO9/JM/9XwMp94zEekNLk60ZY8agrQTs5lD3ymSPrg+tbgLP5r3ue3x18lUi+9U9VtIdY1X+XjdKhiyWtkBEJBifUC7CQVQ4+DwGrmmq0uIb1XiUhtCkI2FNHQSnnU+7u/s7B/tbP7/sAl+2gd0VYFH7c16wzOg29zap8GXyprz55gI9PleDyhDVvp1vK5K15DPKX0jRWQZSmaa5CBD1HEyTNORy8J2wdzFHs+K8i+ICIfEh4OiAirMBVdd8EY8CKR8vTCNeyjvylNQSWU+pqA+8IqFs6kZ2LNMb5pl1G293VfXjwAZ8X/y+IV1WDepniPpptGoQOol+OwS+PVxybao8kVl8Yygjof3FSeTNIFicZ8lJ5/wol8LTfsWRXvnHfqly+Q3p/kejz6FC138Nv70nqy3TYeoMKKQRiVzuaFsf6DYPtZkHW1SNpTLwB3bqI0HaE/aLW4J3D/dx8A0CXIbI4yPzZhrzphpyeMgiJabcgIbNIytUTdUyVLUUWaVA12qaG5x+Al8+f9rZ21z+tGL9uboAbCwBW3Zg0wYsKj6Lx039TTIiWI4v0hCKNdg8OTKD15DKR30QNHxYGagFBNT1oUbAwNibbPnK725MikuNcc6N84FcCoMnRJSd9IPEejckBrW8iR6F3BM0Zwhassca35GhjwigxH7Uh1FCHqsTzKHVyadIDg3jk0MKbKm+WFlKOmIEk96HeN0JeYBMO4d8e6otJ4Hf9I7b8GoS+oT28Sr+aUztlUDoWU9wrHfxab+SSN98539XuP/e4P0X0v9Iqee/Gan3ZotSVbVgdTVU11CzTu1cplG0PQTbSPsyFbOEr1RCPiqKUmfePJDnvtpGQyc/PBTC0mahb+llL8dASWxYigyRN99QpK4tVjSUi+vLhXUQEaJc0ljh9GPf8W178eea+adt/qta+lkqAOYVgN0A7CwBOxZgWbEmG1cNNfNbKgQ4sLwZLGjMlGGymZBkYcPHfSZxub9R2wb7we/VtMGHQK8K4v3Kr4Zlx7jBLoZUJoRA4r3gl91Jb2PmkCm20TrTOGpDQuV1w+Yo5YSSeyTQPVLJne6KJwxMhna0blPUDehH7GNwdsOztpyLHUW3sNnXButStmTUPVXvjowy15o3jniFS42D3wxAJUbCzvlk+v8FOhWcF+b1/ti/Sv2Ogjx+bYx0K3D5L0HmYyP8o6w0TV8H0jVC53F1RnKzrqtlg9UvaCxXoGCCyiJG7tvJ3DdyWK66Mk9QkqKsyuCBX7PyHjLz7nFBzxTwN/N1abqGLEVDEb86X1BXrMRWakkNTt82DDsW6ap4emlqdGlscGVsZGd2+qtSCKyagR0bsG/94lCsSCe0I63SjgYJHmomVxpIZVOwNxOQZGVzqYoIMVBqAfEQIKMLUSVZJ92gV8JK4/2yo4+BznrW3gwhJkVhn0c0vzsnp0AAG3tLPugQ9rDbwdI+2CQugwa53/zhXD/knrQtd5/fCmioOmLKSEEcKSUKmxLLIxVuirrNM+37RrqF27osbBuofd2ac70j7Sok3qsk0rkwzC0nxKMsNjzb3xkU5l7s/2eJz79RJ925aXcYL69MpyWa6wsXCJV6Qp2qpZ7XVK3pbNa0obl14PHizElwjhZdudqFXSejFvBwZeVHMfgtt+DpbN69uYIHQtATIfiJEPKCW/6WA0uTNhYtUBq3RzucvjnUdjFTRmvnElACDFLegtNROy1j/ZtSzoFJCmzqgF0jsCTbk04sjLbpKPW27hpTG0TalDtTncqu/MCuyZipy+Y25m9PtJso9flnvbOiXaEJwTXXw5B3okFnnNEPQpuTIgmp8d2ljynQV8TSZHThY1Ru4hDiHQudysen4z+cacuM7ym8sThSBYiIM/A75NRwTFJIT8FNPrGQ1wlpBj3PeRKd8yg89brng/C/Pw/9n7yzzqVn3eGx3nXx4SUng/KjAl47/7syNgh7KazU7zd8nF/Leb+qsMOt108oyj+YMeWaJrgIWTFVDZbgG1aGKJKmSmZZzlxlsaG5drGtcYmEWGqp1SNLNDU54vIUTvGzyfxHkwUP2MUPZ0FPVfVZGmSeiQBZ7WncHCQ4fTFJTFMDcy0oZm0FuwbOa6wTYpDCFrS4m6ilU1dljO82IbAkA0zcb6LR3Umyqb1CjStU4gqFjTmTsFQGLKU75zHkRgT4asQcIr/p6fmSeN+i025ZEYeRdyNrrweC4499iPg7/F4I4lX8JY//zLkXfd7nv2n16Y3pCb3lD2WtOfiUGGLKSdTzMCk+c4lWRnkXhn7gVnHDWUbIGq9+i8+7x24vv3Xit/un/nh06telySYpsSD39LHycx45fr9Bor0qzkelBbm/cv+t68XN7ofn6097QgN/L/f7pcz3F9z5QGHha2VNvqQaJESUc2qh6lacvafD1IZVNtUKqsvmoAVzkFxZdbGhCWrBwfVNIEVtLg/ydqr4Bavw6SToGQeSzClLEsDeqBqyzUTwEqXGaW1uTN1H4qBrOfWVYmSdtKleiETMNlaxkJUzhDopDWedpu5LRwENE1AxAdnY9hhG1wKSoHI4NenM8nccRNZAYVJ+nH9xfCDx9c2ic77FcT6IWyc+hv4FOesBv+hVcPL3iuueMkKhcbDxQcShRyddki54A1/nJ9AZQ1XP6fBH0JvOmKSQpqeBs9VPebVP2pMCENcP5Z/8xzj4YWfu3S5I0hf1eFt58iW///0w6l/LU2gBJiMn6s/6K0HQSGf4Kb/8KL+C0yEVFyNZea8b4gMpd08VuP0NceJobfjR1qsRgvyXUuhHUUWhuB7KR8C1JNw8HrNIbjO3EnhwCLMwi1teqG2AGzHVKkSZFlmmbYJomkpkDfm8mgw2/N009DUHkiyCv1E2ZM5j883EMic1BS9qruejahVYpIHYbGjBKbBIQVMNB1k5g4ZzCJUScr1pGLc5Tf7GHwAkg4Cod3OkyUap1rSUidCF8mbwWFlKyaWQ7oxHXRn3oVdC0sMOI25E1F0Nrk7wzzvxR/UVj5rb/vVPT7Zk3cNkP0LlPKFUp3M6yvntJeM1yX1FV6E3jiEf+iDve44WXGaVXKO+DkbdPFp27jfwZbe2jze5LSWKvjpZP6ILljRQ+xqbFl+c4AY579pw2b821jM/4NCHEDfoldOgcyGEhxdz/H6byXxY5vtLVcifJR5/R53yYqbemyt4yy/PkzfCJY3V80ScgUhY6Gifx2LYYNBMWZG6odqIq1fWw4TwIjUKau9s3BwkbA7jF6gIBaGM35CpbsoxYHLn0bmy+gxRzQcnEaZOhKqRY+pNbc12Sru1nagnYjSEJmkzQtxcI2iuEDRDpUSYrqt2aQC1NYb7MUP+OtX+ZbJtawxv62nUtVcxYenIpxcR92N7Mh/OwNLK4nwzQ/4sjjledyWw/pp/0cnf0Y/CG56dwn64xSbBdMz2PS2D31U121I4Cn9OzbmIeRqAfuCBuutKTYlkFl5oe+KFvHGk9roL6PxxctZtBQUu7apycNqGEO/4HYWkrEtNzyObn0RCTx+rjHIpj/LIOuFdmhBz/+h/F5/0AUUcp6fcAvn+UuTxt+wj/1F3wmXi9e2ZrGROyUdlA1yBqrO0ty5RKJbWVkVD4xwMyofB5HU1ivpqURVEUgtWYyoXu9C79I4vM727k+SFAayuA86pTBXXponq0mcq3k1CXjkpMfUqbIOBhF3sanV0d9o6SMZWnKkNqyY0qgh1clylGF0mRJVIsMVqQqm+Derord8dx3+abN8cbbb1NOo7qqVY8HRVVvWdmIwTxwnPLkDifKoTAqou+pbGHIWdc0Fc8y6/5NKUdIbVmMXtrLbOUtXjxAPt+MosiY1Mxb6MQD70an7k3ZEc2P02bCQjpvdlED7RrebK8epbfmXXA9pz7tsYBOM4emWOOFr3eqj8YXfWZdTdwLrz7tDQvyARzh8jPYsuRF795f+pvBSBuR5Zd8Yr2/n/wIJ+qwk70nktUpibzC94xynKlNWWK1B1ts52O6VbTyAqUWh5fYOouoYPg0lrqnSYellDhRwF0+KrrFTU2ihpg9G+MkZc7EeKUXlqfLEKV8JDfJyGpzlpcU2GFpyts9VBJa/0djmo5MWuVmsn3kTCaDA1ssZyWWOpHFUiRRXK0YXqZpC6GWRqr7T3IlcGMKvDhJUhvK2rUdsCJ766BrsaXnczEnzOG3bOqy4hoOTEX41XfFC3/bBPwjoyrjLqM/V04o6KsTc/uSrpX5lrHa9JpnyM70yNak8ObE/yo74OZuSc6XsV3HzXvebKcdhl98anp0fhKVwSeBKXrx+tk3WXcJpSxkrvkl+eQl7xro05DotyyT3pmx8X/tjln/S8V9O5z8tCD4EDfoOH/FEdepj58jr34zN+wTsRJF9SDTa0YPQteDu1b57QrsW1qNBYCQKhbkKZiXhjS5OZ1KTGVkkay2RosL6jdnkYtzXZusvuOJgiOwYwUiyYUZFOr8hwMuCbza0EK6XD3kdZolHtfZSF7o4FCsnSitVjajUNUE1DmQpZIm8skCLz5OhCObpYgwfr2yqNHdWW7saF3iYrpUFHqsI8vaAjlM9BUysv+oFPuVTFeVSfc6s979ryKIj87vRY2SMxCWTnUD4Z2J9MM5uqka/aofl+KL3iPiE5uP720fYkP2b+WQn8Vu/LIOID75qEY5jHEaTUK8Owt6o+hJACUdIqBO150w2vx8sSe1Pimm8HNJ51rTrlUXg6oPhC5GOXf/a9fziSerc05C9wwG+woN+qQg4xX17nZT0XFb+XVBRJa8vNrc2m9jYTpUdD7DS2d5k7KDp8i4nYskgmWVqxCx1YLa6SV5M/BU3j1GSqCaWOwYa9SdL+NPk7r/9gttdCw/Fx5U5mEsnc2WahUhb6qQsDvdb+bmsPxdbVbiNhjeg6fUOFvhEy31gmr8+X1udIkHkSZIEMA5JjS+XYUlVLhZGMsJDrje21mKcXgFmqClmAuBZSdd4HFutSf9G79rxzx7PQgcy4mZqXmm7YMq/7QD+5Z2Jvace+Gcb3RO0SQjo2OaQ84d+YBy5DmdGMvDP9b0LRN51LYn5B3gtrz7jBQmTamM2yXriADGI3p9GrnwyDbvalxRHvhTTFu1eddi88HVB0Lvz27/+74fpJ3I2oQt9/Q/x/hQX8Whn8FyP5GjfnhbgsXVJZLKqFGFtxBnK7sbtXR6Zae/vttAEzmWzr6lzroyx3E+0daB2ugleZQS98PpL3YAr8QtaUaeooN3ch9ia7ADnzu3B0lUFxsnSSzd1dVlqvZZBmGqIZB3vMvV3W7k4zAWNE1Rrr4OYGmAEJUTcUyhpypah8WVOJDAOSYUBSdIkCD9W115g66gyk6vY3N7nwdMqrK8ibYfi7J6rOutacdUZf8SI+8O5Li5mufCptKzEwmpelg+taxrpm9IuJ/llN5eJSG18EQq/8gXroMp5/dhZ8ZbbkUuPVI6DTv4LOu+DeXND21m4JunSjDaJu0GTz++GKB/2FV6kpZwj3AhvinCtijhed8i2MDb31y/8LivaGx3gU+fxSEfxnTdghxInjzDc3BfkvZbAsRW2ZCFGub8XpKe2WwSFD/7B9lL4yNmbpoS72kreGqVuD7XpshaaxSFSZxi55NpF3ZzznOj33xnjBXW5NhpIAWx4ifJ4bACRMJ0tPr5VGMw8PmseGDfRh3QhNR6OaqGQdDm1oqDXVwK31cDMSqkOWqpqKldhiBaZU1QxVNUOVuHJVC1zbWq1tgSvQ4P6sJ8WxntA4H9zdqOZb4Q3nvSqiD+Fv+BDuuna/DRkH3+KgP0j6ak0cyrJybEM3Dqxz9zW9tIoHNc/80S8CujKjja0p35gwI+Zl+9MgyptToIuu0MSwRTpuX0bbEJK1o9W8jpzxmke9hQmdb2Nwd/zqzx2viDlefNK3LC4yyeUX+NngulhfaOhhWNAf1aF/4eJ82e8TBQWvpPBsVQNUioSbyC3mfqp5ZNQywdzlCz4JResTo46hnvWBzmUqTlyTK6p4L4QkC8oe80vusvMuj76P7X4ZxSx+Nl2eKkeDHH2YT9NUJ+vA0MLIqI3FsE6zzNNMHWNEN0gzUskGfLOhAWGurbQh4FYkzNgEnseUagkQdTNknlipb63Wkaq0rdXa1moFFiJEFDJAb/OjXBpuRLQ8OFUb79VwwaP65FHcVXfSPZfut8HDRVeYiJdcSrlmmrSkGtkyTQKrc9vK7k7w7ZaPsaPQG/Tya2ZK5tfJCj325WD6GV7Vs6anUfkJXjwiaJXXuaPotU6hZLSSqabkAdC1zrcx6DveiLijVadd88LcSs+Ef/Q/3nTlJCo+qCL0SLH7/0B8/9X/4Iwg99lsznNu6XtRdYmgAWrqJi2M9utGR+yzXMBkBmy2L6K55dEeSxdOg4XNQd7NlTyfK7gvLL4rK70tAV2dzT47nnpq+P1leu4jHjxViy0xkiqd7KN0B2tyaW7WLuQuCOaMMyz9+JCJ1mMmkSyoJmttzSKieqERbkSV63HlOiLU2FZlIddbupHmrkYTpcHQiVDjK8QNxSJEfuera4QHZwh3o+sv+tacda4/64pOcCEmHut65UPLix+tfDLdWiRn4qzS/uX5cbui1yFuby+7TS6+PNnwpB90car67lz1PU75jYEPsfSim/0Fd8oTwzqKHtumCIZJjJ5ZL+0rnsG+Hi6/2Zka03TbCxF3tOaMa16oa2FUYIb3kbq4sKpoj1K/3wpd/1YfecxWlbmKBsnA7+dK3/OqigRI2MIAeXWKbmKyVkUSYNEOOOy7PLapt02JrxZU5U4VPp8teMAvuCstvq0qvaECXZEWnuPnxI2lxI9/uDFb9FRamaZA5DgtTDIds+xVMX9NLlqWCRa5MxbGmHmgb4HcacHjjI115sYaY1PVPLpCjYNqSJWmHrSNRlgcIC7SCIu9+MVunKG1QYGBa4g1nOqcyhuRiFsn8A9PQU4718Z7oC674W4dbX/uTc04MwS+O4nLkA/XmudIdhFZN9Vkn8Xiss6j3kX2l17ryDg9VHxlIDd+JOc8+U0U9nHwbPXLjoyr+A+X19h4cWexagAsImezm16OQG51vItpvOVVc/Zo1Wnn8hjv0givdJd/w8I9yvwOl3r9Dgs81HPvLMDuBdg0K6FKVA8SoOESEmp5cviTTGCfm92USwCrAdArHfQeFbFW0lAsgKZMZifyCu8pyh5qyh9qwHfkxVeFBZd4eZd5RfcZWXfoWYlcyGsFIsdpQTC1ruTvzst3NdJtmXBLyFlnsxzjQ47BPiulTU/E6IlN820obQdK34029reYxilmeu/yxMAWY3hzpH+pu9PUQdRRCLo+oprWXPXq6serwXkJftDrgfnRR+AXXFHXPVseBXW/ix3Mv86uS5IQsySt2Rzce3VXgawtU4B9J0C9lmFSNM0fNNg0BeqdoC5ppuKRqC6ZV/ViPO/GNOShHJU6V5fMrHjAqHw4Vft0qOQW5nFozWWPmvNu8JijlSeOZx35P7VhzqXuv5a6/17meWTi1cN1YhMgYgNmFSCfE5FxY01V8kHKtpz/WSc/0Mo3RTNf5HOAmrNIRXHL34ohL7l5dyX5t+VFd9WlD5WljyVlTwRlT7ngF3PlL6dKk1mglyzQazb4PQee6eRQzW3oRQdm5WeD4qtW9lUu2uexNxhjK6MD1h6KjkzUUQi6bvw8lWDsJ5rGyGbWoJk55GCObjLH14eHF7uppi6KgdZlmugDHMplyRi68Bn46dn3p52Lznk23AitueyJvh1IehrVlXputPD6dNVDdvUjOvS2tPntdM3DMfCtCUjiFOzxdPmjOegzblUyv+HtYPHNscJb7LJ7zPwb04U3ZkvvjuYmjBRc6c+/MlB0oyvzUuO94KoEr+p4d1jU4caTLlCvX+oDj1S4/wrzOAz3d5cX5/8cHQBmpwCbAdhYOtDJrNwpK396gc82TtMPtNItEfurZOoTp1+CyB1Ju8HNuyfJvy3NvSkvuKMqeSQrey4Cv+KC38yUp05DM2YqPrLhH2cqs3l1BeLGMqcNo3jXIv9sVX4zKwGTCtDJv4jmtlj0dfqwvb/H0tNh6Wu3DrRbBjsWR7scrAHHLH1phr46xdhg0B1Dw9bePtvgoH1yfInPBJbVwDc7sC4H7Hzc+9vFcX7gOM/aBG/kDT/c/VDS80hyamxv7gVa/iVqznlm1QN6RSKz6hG75ikT+nCk5C4b+kyKTuciU7ryrnZ+OD+Sf4NZeJNRcGMkK6Hz7anOtDP4V5HNr6MxLyJrrvvBz3tWnXWHRhyuDv2rLugQ3PPXSs8//++XqRL6c3Tgy9QEMC8HVmyAw/jJrNkzq/eNqh2t7LNObmeP2ejd6rZ62sfH3S8vTX+8LSq4L81PVBQ9UJU9U0JfSWGpfPgHblXWXE0eF1HMbwCJmyBKfOV8a73TjlW+b1Me2JRfrSrAogYMyi+iuQ3m6Dp9eGmg19rbudjftTTc7RjrXmP0bbBHdkUzmzz22jRzmT5qHRiwDA44ppjbMiGwZto0ioDPC8CeAfhsGan8WBwfBLsQWHPRr/GKT9OtQMz9ENzTcOKb6Pb3sa3pp6kFl1k1TwTYd+z6ZFrRre7ca3TIIx4yjVb2gPjxIu7NadK7Mz0fzo/mXBvNudabfqH17WnEg4DKO75Vt/0qLnnD47wqYz2goYfLPP/ZFHYccvwfCN+jFZ5HKgM89HDISjthnzW2zZ3clvO35sU7RuVXuwHYWQY+b383qbXDVGEraqQ8qyX5Rm/KzamcB/z8h7KSp8qyFxrYO3VVhqI2W4ooECNBIlS5AAkV46rUbY0mavNCf6vTrl31aUnzeVH9zaYGLCpAL/8snF2bGF4e6bf1ka3d7Qs0ytJw9/JY7zpjYIs9/lXK3+ZyViaZtrER0/CwhUFflwi+2nTAvgP4sgx8Wf66KPuqnZvDVoDOR5THhcDjvKvjPWsTvBHXfOpvByAfheJfRbdlnKUWXKVXP5mofk7Jv07KutQPfsiseUOvfkUG3aPBHncV3MK+PoVPOtmTfmm04Da9OLEjLb46MQByxRN21bfivHfFOa+qU17QoKMQj18IUV6Q4/9o8HeBex3HnIywIaqXiPi1sf5F5tACl7Wi4u9a1F8cRmBjAdhe/mHWGMZpmt62IUgW+skV6rt79I+PuAXPpaVvFNBUdVWmBlGgbADJm8plWLgUXyturlO2YUy9bY7Rng3msNO+Q/N1Rfd9WfdzQf3DpPihFe5xWSvj/bY+srGLaOwk2qht9gGKY4S6PtG/PTX2RcjbnGUvMei2iTEri2HnzW7pld/WrV+2LMDBEnBgB76uASu6pXFq1smggki/yriA6jjvuos+iKt+dTcDGu6HkN6d6S24xq5/NVH7ogd0pz3vOqPxrY1evz5DMI0i5H0wE6NeSSkdgT3tzrpGSbvYk3mFDnrQk3W99n5I6SUPyCWf8nOesFOe8CjPisDjcO8/cBEe4EN/r3T/q9z1SN/t66tY1EYPeXmk30If0E2PWiXsTYvq27oV2LIDG4tfDcplDuOLlCPC1+Ff36emPRlKfzJb/EYM+SCv+KiqK1Q1limboLL/v477ao7rStMFjZu5mogz02c6oqdPV1e1qkpeokR5L1EURdF7kQRBgDCEtwkkkAbpvffeZ+7MvdN77+G9SXgPEI4gCRJ0IiVRwlxw5sTcnH+w4on3i/dbF2tpeDmDKGeUT4DaeTe0GfO/fIGQ92Rj8reduT9vz7+4NfHr3NAvY527neHNkGPZYVoA1QuAZtVu2vJat4OOuzH/g0zsSVfXnVR6I5HY7uq4MzKwO5d7tDH3dHf1j2fbWyujS2OZF1uz+2tT9zvCmB+/ZZz4jn/yc+HJD8SnP5Jc/ER6+RNF0RcQ7GSUXpQV1/jphVbi5ZCgYtRB3uxQ3xsA7gwAK1nVaod62sPu16Kz/AZry3l99U8RYqEHfVVQ8BXp5AHKyYPUI+/RvjvA/voA5+M3Oe/+TfbhPxn//B/st15hHXizp6n+rl7zwOfcCLqXEv65zsjKaMfD9en9X3b2n93Zv7f2ZGb0bk9qf3V2LeiI0TGDImqGAu+hjVZ2AQAAIABJREFUtY7zcNNi6qySM6cRzuklMyb5tEU9BRmnHNCC37uRiN3tzN7v6crbWxl9vjn5x9b0b0vDv+Q6HvRFd+KOVY9xyaqeB+RzJtmqTb/ptewEHHejvr107F4isRGJrsfjOwO9D+cnH67P7m3NP7y7cHdz6pfdxd93Fvam+3+d6t/PDchuXGMcP8Q59gnv6Hv84wf5Zz7kn/tAdOUTc8OJCK3I1HpK2fijqf1CSFQTEtdbqEUQvSSibPHJm23cKjPpRlRQ3ylpMTScltz4LkK84UFf41/7inDsAOXYQfKhA5Sv3mV/8dLrFdHBf4rfe1368QHZFx/P00jbevUdt33OBS6lg+ujXfeWx/98tLH/4sEfu6u3c70PJwZXo779mdHtuG8G1DyIeyaUvC4mblLOnVULFw2KRbN2CTIu2kyLTnDeZZ90OOZ8/rVYfCuT3s5k83ane+5Pdu5NZPdGEw/6Q7eTjhWPdh6UzuoFcwbhIiBbtWlfem0HXZsBz51o4nY8daen5/F07uHyzL3VyXubU092F3Y3c6vjqZ1cx95Y5/2uyJOu2IiEi/76A+aPH/J/el927jP2sQO80+9L8z9TlnwbpdzwEq65SQWa1jMA4aqLW+ET13eCxBSA63ExI1qkk1XpIBfbMQXGxjNB/I0ViGFtucS/9hXu6DvEHw/QfjhI+epd+idv8z59l/Tqf8g+fZvx+l/pb/4jWVK0xGYsyoSrViBnM272p56uTf96d3n/2c7+b7sP1ybH456luG856F4Nurai/vvJ0E7YM2/WDYi4w1JBTiWdMWrnQdOiHVx0QPNO24zLMePxzociq4nUy1868hbTzpWM41bacSsBrgR18w7JlJEzqWHM6tjzBu4SIFqFVLcc+g2PedNv2wp67iRSm4nMTm/Pg+nxR2sz9zen97ann+/O7a0NLfZ4V9OurbRrO2x/mPTM6SWq62cphw5Qv3mNf/wg8+g73FPvSS9/Ir76qaP1/LKDNgURorwqP78yIm1M6pBTUfFUXDrfoV3IakccjJigyUMsNsMuWBrOBjCF2opjrIufYH94h3TkAP3wh5TP3yYffJN58E3uB6/zDr7OevdV80+HZnDo2wrJklq+YgNyDtOt3sQvG7P7Dzf+3Ft/vDl7a6xrJuFdifnm3dCcw7IZ8txPRu7Fw5s+94rDOmU05HTaca1mwqCfhaBFl2vR455zexaDkcVIYiWeXE2kVuLJvJxTOe1RzXnUcw7JJMAZ11BySsKEgjCrJi9oGUsm3hIgWrDIl6zqNTewGfLczXZsdnZtD/Y9WMg92Zp7emf28e3JX7ZG92ayU0F9DhTPWSULFukdr37dpuiktjB/+gD/xSuMw2+xjrzNP/W+5OJHvAsHdRXfR8jXg5TrxtYzVlJBTNY06qY/mna/WI3vTfufzgRn/AIHoVhdc0JTeUxRclhS+K2o4Bva2Q/wPx6gHH2f9v0HpE/fJL73Ou3Aa+wP3iS99lfxp+9315bflYvv6JTLOuUcZNhIhx5M9u8/WN9/fvfZzuL6RM98b3StO3Yr5pk0a4Y0sgWbeScSuBuN7MYTj7MdG77gvNUxpjMN64yTFmjB7Vny+uY9vgVfaM4XnPMF5/2hhUA4L2fmz0DiOatoxsTKKQkjEsSEFDmjxEzK0LNKwoKONqtjTWnY00bxslN3K+S829211ddzZ2L48a3ZX+8vPt+debw+9HAuu9PrGjWyBkTYnJw4o6SsGDlroGBeSzUVH6N+9xrt0Ovso29xT74juXBQeOF9bck36rJvDXU/SioP6VtPW0kFXl7VoJ0y7GZMBAXTQWFMBJNVHxMXf68p/0lZfFhS8I3w6leMsx+SfzpA/vE92ncHCB+/TjzwT8qBV8lv/4N24DX3z2fXGJT7GuWGRrFk1M7ZgF9nRvZvL+4/3v7t3sqd+eGVwcytgdTucMd23DOkFCSYpCGVdNVt3/QH7kQTv3T376U7t8LJBYdvGnROQc5Zu2ve6Zlzeyft7jGrYwy0j9vs005vXk7LmNGzZvWMCSVuRAAf4tSPcusnxU05QdOUtG1KgZlUEnMq2qSBu+TQrIXtG52pzaG+3fmJ53eW/ny88sf9mUdLHXcG3cse6bAI3U+rm+K1zkrQM7L2WTV+QUfK4ss4x98jH3qN9sPrjB9e5Z9+R3zxoKH0G3PNEUfbGWPTMRB1wdR+SY08Z2eUQvQSG6PcyagA2wuA5guutqv2xvO6sh/VxYeFV79knP2Q+OM7mG/fwH32GubgP/Dv/J30zj9wb/zNdPLwDBG9p5FtSIXzEv6SSbfotu6vTO/fu/Xb7cX1iZ7FgdTORN+jmaGHo93bYXuvgOLDwDv4jDkIuOXxbodiDzI9DzsG9joH7qV7NsKpRXdgxuaetjpm7a4pu3Pcahs1g6MgOGlz5M2qqLMq6qySMClGjnIbh1k1Y+yqCV7tKKc6J2zISRA5BXZSS50181fd2vWoc60rtZ0bfnxr/rf7y38+Wnx+e2Q3F95I6idU+CFG/RC+fJpRtyRqnRTCRkVNU0pETtDMO/ke4ZtXKIf/Qfz6L+yfXhWdO6Ar+tJYfsjecgpsOuHGXfZRiwKc8kGIOO6iD1iIWSUyQCv344tDmCJL1Unp1a9UhYf4lz4ln3gX9c3f4R//pe39v6AO/BX71t+wr/8V+ep/hMsKdpXiexr5FJM2yKROaRXLfscfi1MvthYeLI0vDqU3x3v+3Frc35x/MtK55ND28oghfGsXjzEDGFZd7nVfaDuSuZPo2esYetIzttcxtBlJL7j8cw73vNOz7A3MuT0zdseE1TYJWfPm5cQ5GW5Ggp4UtE5wGyY4NTl25QSnapxTOc6rnRDDJ1XYeYC54pZvhU2bKfeDyeEn64u/P1j//cHKk9u53bnMSsY0A7GHOU1jpIpRdNEMuXxN2DQnahgT1kwpWnIiGPPY2/iv/4tx9HXSN//JOPJ34em3VfkfuRqPhTGXvKgLYWphjFOelTWsRIV3unS/jDm2E+pBJSpCKHW3/Kwt+o5/7gPp5c+YZw7ij7ze8ul/NL7/b23v/wVz8BX8O6+gXvtL09/+NVxRuCnhrom5E2z6AIs6oZXf6Yg9nRndmx+9Oze8uzC6v7O8/2Drj8WJ7XRwQicYFlH6eORBMWdcq5oyAbOgc97uX/bEN6Kdux1De90ju5nerWjqViC86gsuub0Lbte8wzEJgeMmU96kqC0naB7jNI6z6yZZ1VPM6glG+TitLMeuHuc1jIvbpjTEBbt4LWzYyjg3uoK/317bf3Jv/9fdFw+WHyz1rvc5p1y8IVnbILVijFAyjLycw11fFtUuyuonZTVz2tYxXhPthzcJ37zCO/Uu5fAr9J/+yT3zjuTqx7bGEwFsvrc9P8q4mRTU9qhbt9LyR4PAvaz2dlw5YSQm6VV+1HVj+XHehU/pZz4gn3oPdfjVxk//R/0H/3fbJ3/HffEW7sPXEG/9V91//qu/NH+OSVoQspfU0nGlZNpq+m129M5oz9pwx/ZU/4vbS/u/PNjfWbvbk5mw6Adl7HEVb0ItGVNJBiWifolsUK4Z0ZhmIM+SK7IV6bif7XvUPfSgo3cnkd0IxyYt0DRkmwLBHAAM6zV5Y5K6OVXLuKBmgFo8wSifoVdNUStn6XUjxMpJLnxBy1iySWa86vk4uDWafLw++efTe/vP9/af7vx+e+7eWGzeJx+QIbroZX2kghHStV7k+UH8z/OSmnHBzT7ujSUdYpBUIz72Ce7z/5Jf+kJ57Qvi8dfxJ95kX/tCfPOoHnbFga8Isht7tfjlkGivR/9kwPjrsOV2TJozEFLsJhuiSHLzNP3KIfKlL4mXPit8719KDv5f7ccOYH482Pr1W82fvtPw9t+xB16Vff/lbZVoRSXsFdByoPbJ9OD2eNdkV3huMPNwdXr/l/v7j/deTE/cCgQmAWDKbMoZtaNa5YhKPqpWjKtUY0rlqFw1qdFPGy0LVseqL7gZiW8nszuZrjuZriWPf9buGgPM/Rp1r1KSNywsz8lqxgTlo6yyGU71BK1iFFeWI9dNs1qnRfh5A3fJo1lO2jZHEo83xl883vjz2e6Lx3d+3Vm8P9m5EjXmDKRBfv0Ao3iQnD9AuNjdfqaPfHlCVJGTVPWLKsZlMFfFBd6Pn1IOvaW4+rWx4oji5neMqx/Df3qdXvCtqOqsHlFkJ1XHBPABA2HSRp6y4ScsmFEdskfeluTCrOhSXvFx5KmPGn948+yr/1vBwf8DceIt+rWvMKc+qf/6nbrP32n+6G3Eq38TfvlRZ0vdlJAxZZA+GsruTvSsjmQWR7L3lif297b2n+7ury3e6couuF1TILjk9c273NMQNGU2TZuMs0b9jE47o1FPqJTTWs08aFl1udeD4c14YiuVvp3J3gpGlty+SQs0qNH0ykR5Q9ybo4LKMUHlvLRpXYOeFTSNM+vnxeh5BWlWy5wHxSshYGcg8nR5aH9vaf/Z9v6znd/vLt6f7FyMmkYM5H5B4zC7fJJTOkq50os53Ys9N0ArGOLeHFc2DynhKUY1/cRn1B8+Yp78WFbwDdh0KkS8ZoQdR5z4J+zHf+AvfCQsPwEgrofZtX0a9JgFO25pdxOv+igFYerNILnM1PQz88rXbT++0fjt32588N/w5w8ISr+lXv0McfyDxkPvIY59K7pyvvlv/0l9523Bd191oOF3ffb9jYW1bGihM3x3bnj/wa393+7/eWdla7BjKuyeDtiXIr6tTHo9Hl8JBZY8ziW7bQEyz5v0M3pNTi6dUClnDLoFCFxxO28FAuvR2GY8sR2Nr/uCc1briFbdKxXkjfGrx/jV44K6VT3mro25qiMsqPC3HeINp3zVo14LmXd6/L8sDOzvLu4/Xt9/uLb/YPnJQu9KEhgxUvpFTcOcimlOyTynaIJyqRd9fIDw8yDzRg+3akyHHdASIGx57edvtB46SDn3uaDwW3PLyQyvLM0t1TcdaTv6t/aTbxAuHGQWfCmuPKJpPmVEnDahTtvxl6zt583wM/Lyw5Sz7zd++e/Vn/xL7Wf/oq/9wYY8q6z+nnDpA+SZT2A/fYY6f9xUX417733sa6/C//kPx83S39Lx/aXZWa9tqy/z263Z/Qcb+7u3tid7cgn3RNSx2hW6M9Rxb3hgp7dnM51ai4RWfO5FOzgH6Kd16jGpMCcXT6gVM0btPAgsOa3LXtdawHs7FN7wehatlpxONSwX5i2pkLPSlgkhbEGNWbPQp9SEMQ1xxS3fSVvv9fj3RhO/Lg7t7y7v/3p3/5etP3dmny10b2XBUSOph187zL05yytZ4hQs0C9Ok8/3o08MUa4O86q7xS0DRnpKw1Siaq5+/HrJl2+hzn8uqvzRhDiV4F4f1tQOKaskJR9yr71PvvA24dzbpJ/fZRR+xCv/QlzzNbf0E2bhQerld/En/4k4/B/I7/+dee6fqtKP/NiTnvaTqtrvuGXfUG4cqT3xRe2JH6XVNcLjp9pefRP2jzfk5y/+Eok+7ciuBbz7SzP7d9f3by/fm+6fyHiHotBCf/DeTMfewsCj6dyD8dG7/b3b2dStaHDFbZ+zGGf0qjEZf0zGH5cLxpWiCa18yqSeBfULVuMtp3XValkAdNM6+aRKmHffyt4yUWfl7TkpalxF6Ja2Z2W4IYh/q8N5dyz5bGnoz+2Z/Yfr+79s/3l36eFMz0baPA0yevi1PbTCSVbhKr9olXVplnRyhnx2CH9mgHZ9UNLcp6V2AkKnjM3HtBYe//bq9x80Xfpa3HoeJF4Ksq8MaisWbLAJbXWSdkVX/Q3j57eRx//a+MO/1f/wr40//Zu8/htp9Zfim5+Kiz+SFR7Ul38SRh8b5F0NoH+A4N9pG7+VNR4jlR6vOvVtw+VLaiRGll/U8MaB+jcPoL46NMATLUK2h53d+3du7z+892Jl5lZvYjxhn+7y3J7OPFrte7w2/MuthSfzcw8mxu4N9tzOJtZDnmWnZcGizSn44zL2qIQ5ImaMSJhjL2tUI5rXyea00hm1eFotmFJw834LqJ4FlBsWzrSWMmFij4LcAZtoLGxY6PHemev+9fb0i7sLL3bmf92avTfdv5p1T4GccUXrAPvmML1wjnVtjZu/yrgwTzk9RTo3QrnSzSjrU2CG7MoIoFJw2SwqiYpDVt04V1d4lIu6bGEVhkVFA/ryWbBuSl/dyysIE8+GiOcT7IIeecU4CF8MEHK2tgF9fVZwI0w654YfdjV9GUEe7qSe6qSfdqIOGdqOSFtO426ehpdeprS1qWlcSXUT7OvDlR9/UfrBZ+xrxTOQa39ucf/2zv6dneczufXu+Fpv5M5E9vFy//ONoedbueeby09WV/ZmJ3fHhnZ6MhuJwJoXXLbpJtW8CTlzXEQd5uEHOdgBHm5IQBgRkSYk9EkxfVJMnxDRciJy3n7UvJ+2PgzoVh2ytbBhvdN1q9+/NZlZyaUfbU/tP1n/8/7ys43pvfnhtf7kbNA4qsZNSmA5QdUUt2SBc32Fc22FfWWReWWEfGmIVZpm13Vq6INBmxswMhk8Glto97oxeHhlxXkC4rKBWxrT1g5aGsaBmhUHfFhelqBdipDORagXIsyf48KCDlVZj64yJSkK0y/68Sd8yB/CqMPdtJM5aX4f/4IHdxTAnlFir9LgRQwsgk3jYOB4KY6CKSyt+On01c++Lf7myHI8u7/3bH/rzv7qrSfjo3f6O/Zyvb8ujf62NvzHxsj+vYVnWyuP11YezM/sjg/v9GU3k8FbPmjFqpnR8KYVtHEhfoSDHGDABxjNQyz4CAeZ42FzPOw4FzPOxYxx2vNuA4IHLvVeGNgOm5Yj5pUOz93pzkebk789XH3+YPnZ3YVn27MPl0c3RzKTEcegRTwgRkyIm6clDbOi6lle2QyncJp9fYpbMsAqSdIrEyLMeNiW9Xt4XDGOJibyVVS5Es0kVTbdqK8/L+WUB03NPZbmMSts1YedA1v6xGUJ+s8p9tUu2Y2UON/LOO1jnIvxrqT5+RHK6QDmSJJ4fEhweVpb2i26kpbe0OHPy8mlNGydUiGjMMRtGBYKiWPTWPi29sbS6vaa5rIzV0COdCHZvdU7tNndtzcy/OfS7P7K9G/zw38uj+7fXX6+uba7tHR/fu7Jwsyj8YGtVGgjAN0LmGdVjAkhdoAO6yPXDVHrxpiNY8zGEXp9P6l6lA4bZ7YMUZr6CHV5MxLKjJI+BwjXAobbXYHdiY6Hq2NPd+Z+3Vt7dn/llzvzTzenH84PrfdGxzymXi17REnMyZDjYnhO1DghasgJa4f4NT382iiztkNLTZulPrPOoAP4chNJaIbR5EihgqxR4oVUFKmex22waVuTIGLIgRkDkVNWVM7Y0ikqjbEuJ3g/d0jyOxTXkqLLHfKCLsn1FOdSgnaul58/pa1cgJp6VGUO1hVIWEVGXteoeCQWlyYGajG8FgoHwxaQuGKR0ghBPiyCiIW1w4prsBVNagJ9xBv8bXFxf3vzz6XpZ9PDzxcm9vcePFlb386Nbw/27fRkthP+dR+wblNMyyg5btsgpbYXXzaALx0klvTjb/RgrnejC7uxJT3txZ3okl5cRV6W2pqktPRIyMtB06PxjmdLI0/Xp55uz//xcP33B2sv7i39fnv+16Xxe0PpxTCYA6VTRk5OSx1WEIYU2CElrl+N61ISEkpCWM2wyhgmpUir1XOkOgRdDqNrUBKojiNn211St5Wp5nIkGKUC5dRjMjZSL0gYt5MnIGy/pjErKu6QFAzqboyby/o1hQPa4h759RTvaoZ7rV9WPmpoHIPaYsoaSFAhoZdLRFiumE+RamF0TRVJiVYAFRROCYbaypYJTU6OzCRTgSQch0fhw0pqS09fwlfUhBSq9e7uP5YX9+/s3Jueuzu9cDc3dWdoYLev435HdCcIrkPSGQlugtMyQq4YwN0YwBYMYPP7MD/3oC/2YvK70Pnplkuxxguplqt5IVJjmArvVbM20s6nUz1P5of3Fsef3Jp+cXft952lF1sLL25N/b4w8nS8c7fTvxmzzjvUUzbFOCQdtIi7AUEaEMUAacCickN6sVjIkcioIhWSpaglSaopSoI+UC/UUyGv0OsXOQGJRSrRULVKgtdE7/OI+22cfiOhX9c2YmyaBOunoIpJsGwKqhg33exTFKf4BWnBjS5FfZeuOaWFO6QNRkkzg1avtcgIfBFOCpRiFVUsS6vKWcGR1wl0CLm5TWRoFxn4Bi9dDBDpUqnYoJUaaChS+YWrN09flONIo6HYXEff1ujU7tjkerZjwedZcpjXrOo1I39KgJpg1A8TigfarwygLg22XxjCnB/EXhzEXxnAX+3F5Gdbf063XMpL8FC9asZSGHg8mn46O/Bgqu/h3Oivt+afLk8/mh97kBvYHe641xfb7fTvpt07KddK1LGY8E7H3AN+e8IOuM0m0AKYILsMsEkgtxAK3sRxC9qYKKkdLrY2CSwonRdtcBFMDonfb06E1FadRMUBDPy4S5OCRFkjtdeEG7UgclD9DFgxDZbO2yqnzBX9ypKMpCQjq+nQIZN6rE+LMSvbBQKkFpSyNTK+1VOGl1SzbLV8TzUfrBGasEAYB4TKWZoGoRmn8hDVTpElzFHaOBKjUmnRKcwcErumsOLcdz/hqptVBGZUqR+wQDN224rTsmgQTfAxk+yWcWrFEDa/F3Gut/VEP+LEIOrEIOZUH/rMGOXaDPvmJPPmOK0sb8jCW44Bj8cSLxYGns0PPZkdfr40ub+5/HBy5N5Iz2ZnbDnmWvKbV7yGdZ9hLWRZy4TnssmxVCITCrocbrXJztVZaTo72xrFG3wEIHy1nf8zkgOXO6oY2mqmDg/E0Hpfu94lCsSt3X1AJKwCTRar0WpUBgBZFhL2gfRuHaxTXjysuTYLlozpCoZVBV2S60lRaUrelDLggkYypKXotAypjquw6QV2B9ngrmSaKjjeZkWqig1VccwNEkeVELpGViKNEYwlxvJ0MmxJvMqBFugoEqPC4DKYPAqZUUATVpy7XnPqMuzMz7TCEjsa3S/kTEoZOS56jFo3Ri4bwV4dbj83iDw+iDw2hPppqP1YN/KnHP3akrByUVA1w6nMW++0PcrFf1/oeT7X+8vc4IvlyT9WZp7PTd4b7NnuSq1GfbNOYNKimAIk86B4xqGeCPu7AsGI2+d0+Az2oADwY5SOOgFIsGfLhNYGtT+fpr3B0CHUvhKKol5ghiu8ZFua4cpwPQlNvBNIdgChmC0QNJtNTqM6YpZ2mhnd+tastKhXdmlcd6VPeq5PerlTXJAUl8cVLRED0a1n6NQMpUGgdhjIGoUkEK3jm+CacAnD06zM1nHdCFkAoQrDZL4qkQPn7C5km0oEZlqgl+nvZrpSVJOXrIRYKkhqdFksvowjYiTyUBeLyr/8vv6rr2mnjgFlV2LNRbH6i1nYhf62c8Oo06PokyPoo8OoHwZRR7qRR4eI5yYY+aPk/H7clby9ud5fV0aeLgzcG+t4NNW7f2vqz8Xcbl96PRVciXpmvNCIRd2nF/dohQN6YZdFHXW6QYtLqbVKjS6ZLc62xluVnhI2UK8O1GkCWEfXJaKihGWQpyawhmC9wHyToeP6+pTJMaY9wbJHNNEuKNVvT3TZA1HAYrZoxCGA32tj9gOoLkV5l+DKqPzGqLJsUFXXqYandMQQwLWZRCqtSAlqmXoNE7TDZQaU3n+TB9VII1W8QJPQj9PGW6S+MgZQzAIIzp5CNtCgCRC93TRfN9PTyXAmGdYI3eglK2xkvl6ncljkoEMJ2UQaMRzdeuZs9Zcf13/+tuD8d9prh7zlP2aajvfBjw3Cf+iHfd3T+HUGdqgLcbQHeaKz9XgH/ETe49sbqxPD8/3ZvfnR/btL+1tTzyeyd7t9C0HjhEs9ZFf3QJqoVpKADEmbxQZYJAan0BrlWWNoKdjCN5dR5AQg0iCyEsBEq9pbL7bWiSCY1IHQeMhgnO3uqBca8QYf15nmu7MCT4c01K2O9qojXbpwVmZzeWJRpVJoVXGHfYaIEDNmoHXSq2fU7SlW47RDGtNwgqA64HepIQsPABkWR5vCRATDdSILTOWtFNpatRGUOlzNBlHqcIvc1yh2ESyZGr7tJstIc3ZhDFFZfJxqTWO1fq6zAyawMMwxrjWFEoE8IEwQGqk8rVQOUNvJuJra8iPfFX/4GuGHg6KT7/tvfJNrPdVf8cVIw6Eu2OFO+NHulqOdjT9k67/Pmx8bnRsZujU2tDc3/nxx5MlEZqfLu5YEF8PAuEfT69TGQa1do7QBAAQ6pHob354gmqNMZ7ZBaIHLHdUcAxmMN0ttBCBSLzDDJNZGEdgstbXI7BQoQTRHiCYf3RZi2RIsKMa2p0W+Hmm4Txzs4nvi7qEcWaYKpVNsMsEq5gWFXHt7S4LQlCQ2dgtIA0apmUlymXRGC6iAnGzQhVJbMEZfvcSCNAYq+ABc60No/WhduJYLojUhuMzTLHGRzKlmiauWCyJVAZjYKfAPUcAM3hhnu3qbJS6iJQVTeWukVjQQQel8KIWTofcxZACdLpQwOPTaGtzFUy1fvtX4xn+XHnkDOP5GT+3R7uYTsZrvIze/TlcfGoIfz5vMRLfH+p6tTD1fHN8d61jvDMzHrVNBy4jPkrHpojaT3WTQ6Qxao91gD/KMHo4t0SSGSJZYEVEKlzsahBaiOdooAonmaDlDg9J4WxXOFpm9jg9QoARMAvH8Wa4nQQejZFOQYY7xXB1Cf5fAlzV1jliyfd7OXqffzyWTZDiMlUQ0NteFcTAvstqKrBPUljJgtWI2A40nmUNJDuRFqSGUzl0pNLbpfdUiM0rvR+oCGEO0QWBDa0ItUner3EswJdq14WaJq44HVbPNbFcv2ZKm2zrZrl6E0k8AYjCZDa33tRv8FCiOlDvaJVaG2knhahg0sYjKU5OoelQbM/8s8+z31W//e92TNWIwAAARz0lEQVRb/6cp/3Nr4aeJ6iMjyIuTqEt5qxn/06m+/VtTz2cHt/rjC2n/WNDW4TKnPXa32WS3OmRqo0ALMtU2PhjGq1wUS7SMpkJrfT8jOQiVu1XhJFlidXyAZkuV0VQEIII1BP9n7soZapY7yXBG6dYY1RxmWuI8e0bg6RD6skJPnGVxGgMRWBsKXlMNy8/HX83nFhfiTxw2Nt6U1ZbymqocSikOjfr+xFmSVMMCfUSLr05sguvc5TwDUueDye3thgBGH2oU2lHqYJPIgVD627VhkjnVpvDV8aAajoXl7CGZUxx3H8PehdVHCUAMrXYybFGk0s52ZlolVhjXRFR5EUw9mWegMpQSnkbKEBpYXCkC0X71cvU3H1a992+ID/9VeOR1b+F3qbJjebud/qcjyadjmZ3e+FI2NJkMdgbcbgvosHvkOlABBvAiI0Zur+cY2xS+mwwD1hAuZ2jgckcRUYozhnDGEMvV0SgCabZUBVOLN4XJYLxV4WwSQ1RrsoZrQOoceMDDsMW5zjTPkeLYElxnWuTv4NhDvoHJGw2tlTWNsIoadMlNWmmFsLyCV3TNjIDxqsuYTXUkOPzojycuFleIbUEm5KfaIjAF1GbwVvENSL0XJrMi1W60NtAosiJU3jq+BaXxt8icDEcHQuVtFFlreWaqNY3WBtjubpIlQYFSFHMMo3EwLIEmgZ7rTCPkTrTKRzIlEFIPTuFroRvQDFMFjM4RWmhUuVoOCgm00i/fu/7qfyt95X/nfP9upvpq3uO+yP2u0HraOxN1j8cCPZGw3+XTmRx0sb6VIccrnBU0dZPEWcwwNqkCRTR9nQCs4RorWbp6gZkARPCmMN/fW8cHSJZYvcCMVHtothRc7sDoA3R7Gq311osNbSorDYry3VmBK8O2xrn2pMTXwbEG8XLjmevlBz78vOTydXRZdfPZy9TrpdSC69zKCpDBsEqkpflFBz/6soXCQYp1VCiAAwJUZ6peDqEMvnqRCa1zw+V2hMrdJLYhVN5qjqldF6zjW9ju7laFu1FkreECOGOkSWxjOjvR2gDT2UkFY0wwyAB9cKFR4OlAqLxUWwfWlELpEmU0cwPfjdUk6hkgSRmtwqqwQicMQVdQicyyy03fflT17j/a3nktb28gvZEOTQY9vT53zO4CDJBQbqFKLfVkRQFK2CRyXCOpG5W+GxwAboiVsIECvLRFZi/AifCmMN4UxugDwmD/y+nD6ANNYohmSzWKQKo1STRHabYkTAa2KiG8wceyJbj2JBOMsq1RgSuli/fmw7BS0Pvx598XXryOq25uv1ZuaCeDJJqRSAFYvJqC4m+/Onzs/DWOzk4HfO16D9YcYga64Do31hxolJhxei9CYWtTumASO1Lte6lTxTbyfH1wuatN6WkS2/CmaL0AZLm64HIXy9VFNIaFvizd7EcrHUJ/D0zqYnkGYIoQytRZxnMjgZ56abRBEq1gOYvJQBXTfqOVQyTR2RgUsfxm1aHvC197M2+jp2sqHuvxBUJ2r1ppxlIkdVhhFUHVwLUVkrRwdfQ6Td+kDRYxdDCN5zpJ/jOaizeF8zECQaCPDMbxprAiMVbHBxiODNOZrReYabZUDddIs6UQKjfDkW43eNtUVpTKQTYF2WCMaY4wwTDXHiVqHTUkntIRamwlfvju5/k/XWRUIyGaEKLxUyabiSv58v3PSkpqWRIDVmwkaF0wmZXiSBLscaa3o1kO4YEAUgFhNW6kwtUic6I0/lqemWiOVzD1gsAAXO4iADGUxk+1pmESO9fbC5PYmc5OtNbHtCfQaidS7eZ4e2uFVk5wtF4WJDiGClkOuLHzNFoN02VKOG68tR+uTlYwjEiemsaX4ZCksrPXLn94KC/XPeIyOqwmr1xhv1qGQPPANr7rHEzQLAtXCT0wVfgqSVXGMdSJzYVEYRVHU8HUNIkhjD7wcuKwhiDDkblJV9PtaZjECpc72O7ONqULbwo3S21MZwahcVJtEbzBRwFCBLVb7u9hW6NEnbNVZIDzVSydDUni8bnqY18eLz9TZGEqIKY4bXa1ltS9/9pBLJ7D19qZBi/FHKA70+xgb5PKTndn6M4kGYq0q+1YrROpdDaJIawh2CSG2pQuuNxBssTgcgdC5UZrfS0yO0YfIAARpjMrjQ7jjCG2twsHhIlQst0YxYEZmncAZclibb3FHFuNLFDMhODa2E22tVHugyuDFRygTmyuZilbaPJ2guTGxdo8CxhFYwVyfbACzitHS68jpG3y6AWUqkroqxS4q0SOIor6BkUOExkLsYxatgImsiBUbqI5SgAibHcnAYhwPF21PBPRHK3mGF7mC6XxUqBEm9LFcKRbVXaKNUww+plglKjxyHzdbGuUavKTAS/N5BbZw3S5Wa6yXbtYduNMCauFahdo7WJtfUHlmaMXyTSpxBxgm/xsZ4rr7xbGh9sMXra/i+lOM2xRgsFFMvkwWm+LzE4AIi0yO1LtaVU4XxYOXO5AabwtMjtK40VpvCRLTBwexJsjHH8f0hjBWBIoIIEB0zhrR7MmhDanSlnmJoXvJhPAA4lKNtCm8LXInDdZxmKx9RxBVskGakia0mpaHpyiu3gTh+Y7T5WTq2ngOZioQRQsZtqK6FCV0FVE1paztPloNkJiKkJTmziKdo0Low+QwTjRHGW7O/GmMM/X0ygCsYZgGU1VyzORLDGsIUi3p1EaLwWKw5U2MhQhm4Jce5Ks80g8WbY1yrBGaNYgzx3jOyJCKCg1+hqbyQUXqxqLW4Iam54hqi+sqi2HSeSgzp3imoOSUC8v0CNNj6OAACfQzXClmPYYGfDSwBAJCCLVbgoUR6rdWEMAqXZTrQmk2g2X21EaT7PUCpfbm6XWdp2P7+/BmyOs4GCjJtBiiKCABNqcbNGGKvlWlD5cyQaQGn8ly8CyZ2qYOpzKAxdYbjJ0pSrfIYysRhm6yQRhDGteMUpxrVVcgtOVEPRFeEMp1VKANzbJw/kEbZPUexUjgUmsV9oYOLWtBMtsE+nwhsDLhOOMIZothdb6Xu4TGH2ggqltVTgpUIIARMhgHKXxkizRVpWTBIbJpqDQnaUafCJXmmmLct0pPODh+lJUyCdyxzl6N00I1DWQEQ1EgKvkIwk3LxRdPVeoM7nNvg6G3qOI9tGdaVFiBGnyMzxZsjVKt0aoFj/TFmXY4hi9n+FIYw0BojmC0njo9lS7zofWejF6f5MYbBKDDUIzUu3meruwphDd11cpcdQpvUhTFGmK1krsJXQdWhesF4BEY7iWbeC5OqupKpzKA+ebK1imWiD5PU4Fh3rLOE6kPJxXRQcbBZ4yCoBURovwuiah92wzr1URvIZTINSBKygRWuu7huYTDcFKmgKtdBCN4XadH2sItuv8L5NPt6cbRSBK463mGIjmKN2eJoPxl6Avj06xhEnGgNjbSTcFhM4U0xYWBLMka0AY66K6IsJQB83kVTiSTIlVKgFZcAK7GVly+up7r74vU5gBT4qkhCTBLrw5LIj0I4w+mitNsITo1ggdCnKcCa47gzMGmc4MAQhToDha66XbUzhjkAzGCEC4UWRpEJrrBQBS7eZ4OtF6P9XdWS4AaqTWNn2gTR+oEVhKaRqcMQKXuyjmRJMAYlgzFRQdQuppETqquNZmc+YczYCydpdzbI1CVx5c5m+VB9oUQaQqXM+xNvKt+SgRTGgvaJdg9KH8dgnOECsiKHGGWC0fatdHiOZ4u86P0QdeesHlDpot1SSGECp3DdfIcGRothTNlsKbwhQowfV2kcEYFYwQdV6Jp5NlDgkcSaYtLI50UV0RfqKbHkgKop0Eo1fiyYrMUZ0xaODIPRI1sb7t4zc/pFB4Fl+KrIQErhTG4BVGB9otIYYnSwTDNHucZY9x3SmeJ/vSi2SJ0mzJl14EIEy3p6jWBFxubxKDNVxDi8zGdGZQOi/Vka7gG+slllaNC6521gqACqaWZEkgVF6CKQGX+XCGZBXTWstzt8jCFVwnwpKpkrnbgVSL3NfAg/LapD6YwInRhJAybwsfahVCNTRNM898DcXDaoPXMNJ2fayEBsDV8TppoE2fwAMJpNqD1vrQWh/JEmuW2ihQokkM4YyheoGZ5eogWWIMR4YARGi2FMuV5bo7aFAUp3aJ3R1sS1jgSDLsYUm8B28PkP1xejjLjXXjzUE6GKVr/SwhEAHc3ZBTTeNeP3v1+rVy0BtnaR18Z7xd7xHHh/C2GMvXSbCEqLYYHQqzHHGuO4PR++n2FMkSpdtTL72I5gjVmmA6M1hDAC63lzPU1Rw9GYy163wMV6pRamqWQy0KK0wGNgjNNVwjBUq1KgNobQytS7epkvXi6A2aq0nVWcpyI/QxrDGCkLtplnibAMqr51jrOJYWsROnCdbQNCRdoJkHIMTWK20stMpzDSNFqENlDEuDPFQrC8O1MYwh2qpwtildSLWHAERe3rQbhJaX+8TLBmA6s3hTmGqJk80RcbCHbo1hlA6hM8M2R4XOFNMWlcb6cKAfZw9wwp3iRB/LEacZ/SSJFUsQQiK1gyMSIXBtpbUfvfOpGfSLjW65O4nROKTxQZItyvJlcUCAYgmTAT/VHOa6O9BaL8OWfOmF0nhotiTJEiUAYY6nkwIlECp3MVleTJbjjCGM3s/xZuEqqE1lb5ZDTWKwQQzWC0AylGmW++DKMNbcBZMnWtSZfLKtWdN9g+5okriJxmg1Q8u1ZdpEUF4Fw9wodFUwzG1SXy3bjNeHW6V2hMJRgOG3Kpz5GEGz1FHNtbTrY7UCO8GSaZJaUTpvi8LepnbhgBBK58WbQnV8E8OWJBiDfG8X3ZqgWxNotZttT1PBGNOeIAFBNpQkanwCW4ZmDPIcKToYZbnTFGuY6YhIA2mpNaICw3KVQ0iT2fkKO5XrZEtEcNzRg99cOHrJboupzSGFO0kGvGxfmuKIM91pvMHHtScpxoDA04VWuwWeLozWSwVjJCBMh5JEYxhvCnM8XQi1jwylLqMFP6P4SI2/Re5iujuaZDa03l/NNyHUviaZo1Xpw1uSdUJHk9SLA7IlNKDd1HGTba8RegspRp5/uJptpoCZJpGjTeHLu0HQVzGtJWR9o9BZzQZxxghK48cagtfxojals5AgaZHZa3lmrCFcx4NIlkSjBELrfc1yW5vahdb72tQunDHYKLIw7Sm8IcB1d1AsUQaUwGq8bHuaBIRfejGtScL/6xXm2zN0MM5zZaiWIAsKSZxRGRBQGdxKKSgmC2xMiZ3EAglsfgPqwkeHL39/TiM2q7RutStBM7k53jTFGWX9f15UU1Dk7sKoPXx3J07ro1iiZHOEBiaIxnC7Lsh0drapvBRrugAvz8dKW5W+Gh5IdWSbZA6MKdIotWNMsRalt0XpxZhiDWJXo8SNNaXKGADGmCymGmr49go2iAdSJVQ9ShupZFtqeNa861hNGQW4QdRWsSyVTDNaG8DoQ0RztJSqQGk8pVQlXO6o5ZkJQKyGYyGDyQYxiNb7mqQQQuNuUdib5bZ2nQ8ut7McaZzez7SnCMYgHYzjdX6WLYXV+f5XXnx3lmIOsKAQD/SLDV6xEpKLzQICF6KLXFSuDknm1iGKvz+Xf+QiGc2WKe3/04vsiDBdKbzBx3OkaEBI5O7CarxcZ5agD5CAMMUSpVriJFMEofJSrekWuYtqy9wgq4tIqha5p5iiwVvidSIIY4o0K1w4c6JF6W2Sudo0AZjMWy9yYozJcpYFrY9fxSqquFaYzNeqDJQzAaQmXMOzVrDMeSUkYznNUkoxlFENN2nGZqkDpfHjjKEqtg6t9VZzDG1KVx3fQgaTlUwTGUzWiyztBn+9yIzSeeuEQIPYglS7URoP25nB6f10awKr89EsMaIhyLKlkErn/8pL5OsiA362NcwwOEV6D09ikovNPBzbzpIGORJ1K0HQiIZdKCk9fb2hvE2hdqpdCarRxfak/v9edHNY6OrEaX1se5psCuMNAbo1QTHHSKZIm9JDBpONYhvRkiimaEqo2ha5Jx8rbTeGq3gASh9skNjajdFGqbNWaIXJ3XBloFZgbzckKjkQUhs91yqoYIPthkSj2AWTetr1sSaJu5Jt+X8AevWLOyX5Z/ 
The functioning practical of automation Mathematics, new models of calculator, computer and automobile exist through him. The one whose design the table computer or calculator in real fit engineering though moment day, that computer will stay prior or future days at moment staying on. The one who perfectly propounded that, the existence of regular solids and irregular solids have first, the variable in correspondent and second, the calibration states of each variable in direct measurement, and to mark precision measurement by beam balance, spring balance, tape measure, and digital measurement invention in the constant path. His Separation Test of Exact solution is unavoidable of system separate interest to 195 countries in governmental interest employment of finite total populate of the world; imagine 3 billion where employed out of 7 .4 billion at latest Century, were lacking hundred percentages separate interest on the 3 billion employees.  Government Cycle in education and working rate where employing only point university as exist only one student per year, lacking government equivalent to employ all university  graduate after graduation,  and there were not least 30minute effort to name famers in balance market systems sales of food to people. 
Image result for bill adongo
He is for modeling pure courses called Pure Examination, educational used of modeling institutions separate interest called Applied Examination and the learning formulator or processor principle from primary to university called Model Examinations. He was extreme matching mad and yet perfect normal relation based on his neuron central ejection in his discovered law to be the original first and last to be the Billhandson, The Judicial of God. The highest accuracy intellectual protection right in true achievement when Lt. (co). Dr. Samuel odonkor betrayed him to international charged to achieve the billion years as exist government at one to one interest needs as whole government. How defending letter to members needs as whole government. How defending letter to members needs of the right genuine government at last in the lawful of 7,400,000,000,000,000,000 years which problem should been the eight sense language which he established his regime tree from; full structural called Moral General Wealth Model Government at his time already.
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He is the one who propounded the Pure Model Theorem and Model Theorem for discoveries and modelling the structural of pure and applied courses in observed writings. He owns the perfect interrelated solutions law equations of sciences and structurallaydownsciences in words which stated that the world was not division and multiplication of different variables units without inter relation in unit agreementscience which should be [mass/volume]≠desnsity; [voltage/current]≠resistant and f≠ma from then mark of ancient who did not breakthrough this impossibility.No wounder he disproved calculus that there is perfect inter related to known how much dy is to whole of dx in this functional put dy/dx  and it referred integration.

INCLUSIVE LEGACY OF FAMILY
Nbolilaris mother of Bill Adongo, Denis and Daniel twine brothers, Florence Adongo his sister, DonalsonAdongo is the youngest brother of Bill Adongo. Story says Bill Adongo as prodigy started thinking that Subtraction, addition, division and multiplication x and y had not existed at old mathematical endorsement as a must requirement but the need practical requirement must be x - y∩(intersection). His axiom later extended to measured accurate auto existence of real units. In illustration 5goats minus 3sheep had answer in only one real unit. One who says 4cattle plus 5goats minus 3sheep has single real unit to name; not justan animal in unit: Direct Genius in prodigy age in the year 2005, when thought come to him in teaching his junior brother Donaldson. He married MissPart to have the bless HandSon. The similarity meaning thinks fain in separate interest as indisputable individual fence but unity interest was reminded from his mother.

HIS GENUINE COERSIVE INSPIRATION
Prove that all things must be probabilities of certainty yet they are not in probable certain, and separate interest or need as self law as different lives is always one in probabilities measured called certainty genuine government. Authenticity to be genuine certainty, validity, truth, honesty, accuracy, correctness, faithfulness, fidelity reliable, dependable, trustworthiness, legality, and legitimacy to be the ruling sovereignty, sway, direction, management, superintendence, supervision, surveillance, law , charge, authority, guidance, conduct, dominion, control, power, regulation, restraint which all government elevated in obedient rule, and sublimity in disobedient rules to be chargedIn Separate Interest (or need of live).

REFERENCE
http://billadongowill.blogspot.com/
http:/adongowillbill.blogspot.com/2017/03/adongo-bill.html
https://gh.linkedin.com/in/bill-adongo-2a492786

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