tag:blogger.com,1999:blog-42331348309893139522024-02-19T01:12:18.208-08:00ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙΟΥΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙΟΥΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.comBlogger62125tag:blogger.com,1999:blog-4233134830989313952.post-33752555979090733762014-01-27T06:22:00.001-08:002014-01-27T06:22:38.967-08:00ΣΕΜΙΝΑΡΙΟ ΕΠΑΓΓΕΛΜΑΤΙΚΟΥ ΠΡΟΣΑΝΑΤΟΛΙΣΜΟΥ<div dir="ltr" style="text-align: left;" trbidi="on">
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<a href="https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEjcQBHE5LtHjYO1uZBh6_O13MIQVC1WylN0SDsbpjL6En4hCYVi4cxFAU_BaXB05WV28ouI0zM_DvfyPPxvufBt5YSpHEBZTltLxodWE3sVCfRQb3RQcdstigdtdZI3p6NgxFXJwgV_3nQ/s1600/P1261000.JPG" imageanchor="1" style="margin-left: 1em; margin-right: 1em;"><span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Με πολυ μέγαλη επιτυχία πραγματοποιηθήκε και φέτος το σεμινάριο επαγγελματικού προσανατολισμού των φροντιστηρίων μας.</span></span></a></div>
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ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-7174453894569272262014-01-21T09:17:00.002-08:002014-01-21T09:25:20.082-08:00ΣΕΜΙΝΑΡΙΟ ΕΠΑΓΓΕΛΜΑΤΙΚΟΥ ΠΡΟΣΑΝΑΤΟΛΙΣΜΟΥ<div dir="ltr" style="text-align: left;" trbidi="on">
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XaUv3HDxGpv0VH+01Fjvh3lc+19fsdh4afBj2i0/23rF0iNon/7Vo0l/+zwmya8vc3stVT3cZrHr3XN5c3OvKzN+WNLb/wsqakxx4ZM03394GfNXvsJqfEWc+cWTo23Og0WflhYfXj3DX19NpTVb0avZxar9yqWGqw+SLHU+IDFUoPVBymWGh+wWGqw+iDFUuMDFksNVh+kWGp8wJqmxo37PQfO3LFkr1J7ioQaN4TZhBoPhDsg1MRHjAKVQ27OxOy5Yp0fwixciZon0/KVFoHaKcJMKBUUIjohZhagFGrL0XnyMUvEGCpTkD4F6ZMQLgluShcp04VomhBJEyjShUquVA0pSBFukaqtErWVJ9fxYIIjxnmwlgtrINQIa10KUwQ1hVWOHJUzV24Mqd35ZKBEqnFINA5IaRIo9GlCJA2Sp4uUPJgQoBRHjPFkWp5My1cYYDIgUhq5UjVXqoa1LjKjSoiQsNatNGUo9B5DeDliiWKOGGLNlmgcXAku1Xqs0eXrDlzMrtknUVlEKrtc71vKk/Jg1fJtJ8o3HZUZQ5gtS6ZzcyU4T6aFUEqAWSHMJsQsApQSq20QSkkIN2oKu/Lr3AXrPQW1VKiUCpYsg2RitU2itovVdi5MpAtRCDHwYE26COOIsTSBfBkkW8aXLYPkaQJFmkCRJkA4YowrUXOlap5Mx5GouDDBlWogxCDErXw5CSEGidomwswyvZcvIzgSFUeCCxADTAZEKrsQtyyDZCgVkqhtUjKgtGWpXHmIwQ9rXRKNE6FCMkNAbgzF1h7cfPjK+i8u5dYe3nz4au3+CzlrDtYduKgw+HkynVBlR23Z5qzVvrLtldtPHT3fcKf5YU//WN/wZP/w5MDIk4GRJ4MjTwZHngyNPRscedI/8qRveLJveLJ3YLynf7zr8Wjno5HORyPtvcMdD0eAuh6PdveNdveN9g6MPxoYfzw0MTDyZGB4cnDkycDIk4HhJwMjTwZGn9LvTGtg1pPBkSeDo08HR58OjT0DT6YXgtUYC8Fo+4cmHw9NPBwc7+kf6+4bBSPseDgCxgmG2t473NY9BJ6DV8EKHQ/jr9LrgL+t3UMPeoZaugZbugbbe4dbu4fauofaeobauhPqGQIr01s96B0Gf+NPeuKvgl3QGzZ3DrR0DTZ39Dd29Dc8eHyv9dH1hu6r9zov3W4/d7Pt62stX168f+xCw9HzDYfP3Ttyvh7o2IWGo+frj55vOHKu/si5+iPn6w+dvXvo3L2jFxoOn7sHFn558f7JK01nb7RduNV+9V7n9Ybum409DQ8eN3cOtHUPdfWNPRwcHxh5Mjz+bHTy+eSzqWcvXj7/7uWLqb989/1fp17+berlX6de/nWaGlfudm48dJnwlSrMmQKVA8KsApVDoDTxZDqByiE3RTBHTE6FBSpHugjjy3WoNUtCBgUqB1eM4fYcmdaJmkJKcwR35UvUNsTggxSkSGkEEiCkQK5dBsl5Ug0XJngwwYOJNCGSLkQ4IqVYZVOaI5gtS0FlwHofSoUwS0RG+qU6L6x1y3Vu3JGr9ZfIjSG+XMcR4zyZlivVLOVJ04RImhDlyXSQ0swR4+BtldYo7sgRoEaORMVHTbDOo3LmyY0hCeFCLJkIFdIFy2VUWEaFBSq7WOtVGHwqV364ateqvef85dvFGCXAzBLc/BlHlAbJ/UV1mw5fpqIrMWuUI1Iu48s4YpwLa3hyvUjtEKgcPLmeL9eLcCuEGJS2bLW7kPQXZ1Ru1wcrjJFqQDG5zi1WWQUoxZGoIYWeJ9MCRHLEOFeqThdhHDHOESk5YgygJF2IcsRYepwdGi5McGECvFWCrRoIMUKIQYBSAtTIgwmBkuJKcJHawVeQApSCZARM2KU6n8wURswRfbBc5cjWOLKlapsrvy629lB09cFVe89Fqveu2Pn12s8vrNz9Tc6aQ5sPX9X6S8SEW6Lzyakw4Ss1Rlb4yrav2nP28t2OrsejwCDjdjg82T88CSwToOTRIDDL8a7Ho8DkaHsAltn1eLSnf6y3f+zR4MTjoYnHQxM0g5hoGKAtn7EE7De+kMYEvXzuDcE4Hw9N9PaPdT0eBaKRQUMNjBMYc1vPEBg5IAi9sJUBBdrIW7unMfGgh8GLnqG27sEHTIh0D7X3Dnc8GgGweNA73MpgygPwhgkMtXQNNnX0NyXAcbup93pD95W7nRdvt5/5tuX0tZaTV5pOXmr86krTV1eaTl5pOnGp8eSVphOXG09cajx+Kf73+MX7Jy43fnmh4cuL949fajx5ufH0tZZzN9su3mq/fLcDIONe66PG9j6Ay57+scdDE4MjT4bHn40//e7J8++fvfj+xdRfADVoTVPj4u32qm2nNN5i2JgBYRa+0gKhFBcmBCqHwpyJO2IyKixSO/lyUoAalbYcfahSSgYFKgesdakdOVypBiXdcipDYQhgpiBfpo17FkJkGSTnSVUKvVtpDiuNfrnWASnINCEKKUhIYeBKcAFq4MIajhjnSFQ8WCtQmmC9T6rzIFSIcOepHLkSwskR4+lClCPGuVINR6L6jCtOF6I8uV6AmcQaFx8xQkqTzBgyZFTh5gyuVC3ETALEINE4UWtUqvWglkzEEpWbIrgzBhtCUp1XpHbIqDBijhC+Ek/hhpo9Z73Fm1FTiK8gBahxKU+aLlLKtc7Ve856S7ZonDkCxLCUB/PlOgFqECAGEWbmybRClV2kdohwq8wQlOr9Slu2xpnjKdmC2bIIb5HcEFgGyaQ6L0eMSbUerlTDl+sFqJErUYGPkyZE0kXKdDGWLlJyJTgP1qSLMY4Y40hUXKmaJ9Py5HourOFI1FypmivV8GQ6voLkyfVxl0pOposwjgjjy3R8uY4LEwLEwIMJCKUkKoucsMn0XqnWIyMDuCWs95coTSG9v4QMlNhj63JWH/CXbvYWb1qz77w+WJ6z5mD++mNrPr/gyF+v9ZfizjzMEdMHK6w5a72l28q3njpzvbW9d3hw9Onw+DNglsAaae+jf3jy4cA4uJgDs6QvzsDRAMjo6R97ODj+cHD88eBEHwMZs6mRwsUYfcpkBHA0ZvgmA8l/B0ae9A3TXkZ8bABqtE/B9CZmuhU9CWMGgOgaBNRo6Rps7U4CBNMHaekaZJKCXg28P5MgM1wYIICM5s6B5o7+5s6Bxva+xva+e62PbjX1Xm/ovnyn4+Lt9nM3285cbz1zvfXMty1xXW89823L19dazlxrAS99fa0F8AUsP32t5cz11jgy7nRcvdd5437PneaHDQ8egwF3PBzp7R/rG56MU+PJi8nnU89evATUmPr+r1Pf//XlX/728i9/m6bGmW9bsms+V3uKJDofX07yECNfrocwC2LJInylsDEDUprTxRikNOOufFturdZfqjBHhWqnSGWTad1KcwbuiKGmsETjkOncyyAZV6oG1ABxhAA1cqWaNIFCpDQqLVHUkomYwlKNXaF3o8YASgWlOi+s90GoSaSywVonastRmCJ8uZ4rVXNEGFeCpwkQHqxJF6JLuZJlfBkXWA5CAVuS6jy6QKlArgVBEA/WIOYIbAiK1E61pxC1ROXGIOEtkui8YMxqdyFqy0Es0VD5ljX7zttjtVKtW6SySwkXV6qGUIonVeeu2hdavlvrLZAQLiFqgBQkZonog+UKgx9SkJDSxFcYBCq7UGUXquwilUOu9xgyKjTOHAWVISMDcr2HJyeFuFWEmYQquwC3CpQmrgTny7QCpZmvIPmIEVKQPFgrwkxCpYkjxnmADjDBhQmuRJ0uRABTgFfCkWq4UjVwqTgilCPGIMQoUJq5YixNgPBkWkihTxOiHAkuVjswc0aaEJEQHjkVJrzFhCffFik3hquUpgxrdg1mjcKGYMG6w8GKHWKNq2bX15sOX1nz+YVg1W5X4UZdsJzMWO4u3uwt3eYt3bZ855nT11pae4YGR5+OTr4YmXgO2MG8mMev5wMgBBijgxRagBqALExfo39G1JN4WyYRkv5lhiGzltOv9g9N0lx7NDjxcCApNqFt9UHP0GxkgCv/g95h4Cm0MowZ2DN40sp0K3qGWroG4/hgsqZnqJUBERou0ztKBCnM0KY1saOm9r5GwI6O/nutj4DHca2+69Kdjou32y/ebr9w88HFW+0Xb7VfuNUeX3Kr/cKt9vM3H5y/2XbuZtv5m23nbj44F3/+4NJtgIyu6w3dt5sfgtgEjKHz0Uhv/xj4LmhqPP/u5fMXL7+b+svU93/9/i9/A5qmxsnLTa78OswRE6gcfMTIRyg+QonUTpUrH7VlC1UOjkQFoRRiyTJnrTJGVuCOmFTvl2rdckNAQfo0zhy5wY/ZsrgSlVChSxeiaQJFmhBNE6I8mODJdDypWoBSAqUJoUJi3CzCzRBi5EnVfLmeB2sgBSlUmqRal8IUxp15ckOAL9cJUWOaQJEGydOECPDn0wSKZXxZmkDBleBciYon0/FkWkhBEp4CnTsvXYikQXIuTIhUdljnEWucIrVDac0iQxVSrQez54o1bhHhFqvtmD1X5Srwl2xesfPrsk1fmjNXSAmH0patMEWEKhtfrk8XoZbM5Vk1+w0ZlUKUMmRUqV15VVu+zK3ZI0SNHJESRA18hBLiVqHKJiLcEq1HaQ6r3fkCzCohPDIqA9Z5+YhRhFsV5kwIs0AoxZFq+HJSiFu4Ug2Is3hynUhlk+u9Mr1XQrhkeh+s88r0XgUVUjlyDMFSQ6icCle58tZ6Cmp9hevcsZUGf6HKni0jfUKlSYCQHLFSgBqFmIUn0wF3jCNS8uU6tTOXK1YKUKOEcKlc+aGqXbglIjMEQeSo8RaRocrV+87rQ5VKW86O49c3HbpSuf2Uq3CTt3SbPlRpzVlbuuWrjOp9oardaz6/cOxCQ0vX4ODo07EnL4BGJ59P+x1Dk4+HJh4PToBAAAQp9FUd+BpxZAyMA/ekf2jy8WA8QpmRpxgaezY09mx4/Bl4Qi+MZysSet3ypNhk8uHgOKAG7QfNcIWYvJihVgYvWhi8ANfn1h46GJlOZNDrAF7E+dIzTY3piCaVr8F0N5o6Bpo7B1o6B1o6B4DHcbup98b9nusN3d82dF+91/VtQ9e1+q5r9V1X73UCXb7TcflOx5W7nZfvdoDnwD25fLfj8t2Oq/c6v23ovtEY9zIaO/pbuwbBALoej/YOjNPUGJ18PgGClO9exn2Nl7MilCPnG8xZq2BDEMKsEn1AqHHLjBkabzFizYJQU7oQ5ctJuSlijKzQBcuV9hypzmvKrCZ9BYjBDyn0cr0XMfgVejckI7gSbBkk48KaeCgu1wuUJkiuE6ttamcupNDz5Xq+Qg9r7IglilqiUr0PJv1SnVdBhWSkny/TAgNIEyJciSpdpEwXKsGTNCHCEWFpAoQLExBmAaZIuPOkuAk4NRBikBlDItwsUtmEuFWi9WCOXLU7X6h2CnGrUO2UUWFjpDpctStYsaNow7Fo9R7Uli0lA7AhiFqzZGRAqLJDShNiCldsOWmL1cJatyV7Vf66w4fO3lu79xtY5wXWDiFGECkIMBsfMYq1XpHajpojEo0LwmxCpQlzxoSYGYxBTLgFSgq4MAKUglBKpHZItW7UElUYAjDhEKJGvkIPIQa+goQQgwg3SzROsdoOE3bEGFBSIdToR6ggQgVxc0jrzDYGishgOZVRoTAEBLiVL9fxYIKnILkSFUekTBeiApSCtW5jqDQNkovUDoU5E9bYAKo0jmxjpFpuCPhKt6z9/II+WOEt3rTv1K31By9lrvzcVbjJGFmB2rId+etX7v4mZ83B0PI9RRtP7Dh+/Xbzw4GRJ6OTL8affjf+9LuxyedJ4BiefDgw3ts/BqgB7JOJj96B8d7+MQCXvqGJvqEJwIuh8WfgTYbHnzEFPBpagA7Mf4fGp+EyTY1ZmRcQnoDQiXY3mK4QMyphXu1BghMAAvgXTR39gB3NnQljTnChpWuwlZGSaE6sCQTw0ZpwW5g7ejArezqdDU1AatrvaO+7/+DxvdZH91of3Wl+eKf54VUiddUAACAASURBVK2m3ltNvTfu99C63tCdeN79bUP3tfppslxv6L7Z1HurqfdOwsugHR9A9ocD431DE+BLAdSYfDb19Pn3zxNxykxqHPzmjjlrlUQfkBpCsDFDRHhU7gLcEROo7DyYEGAWzBGjojX6UCXmiOHWTHfBOn/ZNpkhyIcJSKFDTWGBkkqD5OkiVIKbuLAGQikIMUKIkQdrRUqjzltIuGJSnU9GhSVat9wUIbzFsM4jUjsEKqcQt0IoxZVpBZgZUhh4sJYrVXMkao5YlS5C00XKNAGSLgKJAIwLExBu4yNGAWaW6dzpQoQjxpdBMiFukWrdPFjDk+mEKhus98M6L+7MQ6gMAW6V6TymzOqc1V+EyjYRnoJw1S5HbK3CnAkbgog1Sxco0/pKJDqvALeJNS5/6eZA+XaNKyZR24rWHz16oX7N7lMyQ0BMuIQqB4RScSnNApWDj1KwISglXEp7jlDtlGpdYrUdMWdCiEGkdkjJgFTnhVBKpLJDiEGAWYQqm0DtFChNHOAuyUmeTMeDCcAjvkwHKXRCzAwhRkhhgFCKryD5ClKAmTFz2BAqp8KVzqwqlSkAybUilIR1brHaDhKlPJk2TYgAj0Okdsi0brnGCilIscYh07og1AQpSFus1pBRiVkzozUHCtYfy1l9YN+pWyt2nSnZfDJYtSdQscuctdoYqQ5W7lq+85tAxS538eZAxa7Ve8/fuN/TNzwJkBHXkxdjk9PRCl2k6Okf7+4bo6/ttKPR2z/2cGCcToIOjj4dGnsKADEy8Xx0EuhF4sm0wDrM50y4gIW0bzI8Pu1r9NERyuA4wBYAR0//OMAHM2VLRxYPGC5DPMWQyC9Mq6O/sb2vqWOguaO/sb2vOYGSpo5++jnITYA3edAz1NYz1JrwOGjcgCiJTri2dA22JodCdD0FPG9MsKPhweOGB48b2/saHjy+/6Dvfnt/fdvjhgeP77Y8utvyEDAFYOVGY8/Nxp5bjb13mh/eaXkEVmMigw4hQV6jb3hyaOzZyMTz8ScvJp9NPX3x/fMX8TgFaJoaR883WLJXSXQ+qSEkIryIJaq050AoxZPphLhNSgYN4Wp9sAJ35gkxC2bPdhdvtsVqZYYgT6YVqe1CzMKVqpdBMr5MK8EoHkwIEAMQpNAbQ+UyvRfWeUUaF6x16/ylZEal0poFGzNEWi9sCEoJp0hl58u0fLlOrHFAqEmAWYAN8GTadKEyXYikCRQClIK1HgFm5ko1Yo0TUpAcsVKstglRI2bNlFMZCiqEmiMaT6ExUq3xFmu8RcbICo2nyJy1KmfNwUjVTtQUwm3Z/vLtZEal1l+q9ZfCer+UDOhDlTK9lwdruDAhN4Y8JVvMWaskKou7oO7AmTsrdp6Wax0cMcYRYwLMLDNmQLiNj1IQSglwu1jrlWg9mD0HAEJOZSDmTJneJ9X7pWRQrPWKNU6JxsmX6yHUKNK4JISbryD5ShMfNQlQo0LvIT15VKiUCpXqvfkGf5HOV6QPVag9hWp3AeEtMmdW+wtroxWbwmUbMss3hMo2u/JrvSWbbTmrCV+x3BAQq+2QguTLtTxYzZXg6UIkXaQUqWyQjID1vqU8qRAzo5aoggohprA+WIHasr2l2/TBikD5jpo9Z9d8fiFYtcdXto3KXGkIV5uiNY68uozle8Mr9pGhKl2g3FO8ZeXus1fvdT4cGB+dfD7+5MXE0+8mEtQYnXw+NPYMUAM4FzQs6DwCgAjwNegsBrDw0cnnY09ejD/9jmYEHQSNxd//BXBwxiafjz15MTLxHMRHo5PPZzwHGhp7CsYzkKjvgBzK46EJkFUBgRKdf2FGUnS2khEj9N9/8Pj+g8e0rda3Pb7XGre9Bob1MmkCVgZPgFcST3x0DzHdk5auwQez8qCtDFRNB0eMJcDvoKlEQ435lykwwvsP+sAHaU64SMwAjYb746EJkBAdGns2Ovl8/Ol3E0+/e/riezot+oJJjX2nbqK2HInOJ9b5pIYQassRq2x8lJJRGTJThPCVaANlqC1biFtUjlx/+Q5X4UZDeLlEY5eobXwZIcLNXFjDg4l0ISrVOPgybboIBWVXU3SlROMUKimYcOj8peas1fpQhdKWLSWDUjIAk36xxiHGrZBCD2vdEp1XrPVIdT6p1s2XETy5jiPGBQipNPqNoXIyVEl4i6jMarUrT+OKKakQbokgVAZuy5JrHRLcJCf9sM4j1npFuIUHE0LM7CpY7yvb7i7erPEUysiAyl1gz6sjfCWGjCrUGOTLdIg5U2nLlui8fNQkVNnFGpfSkmmO1qDmsELv3nL48tYjl+U6N0+mgxADhFIC3CZU2WFDUEK4xRqnVOcTa1yIORO1RKVkQEZlyKmw0p6jtGUrzJlinU9uikgIF4SZRWqn3BSWGYIiwq20ZWOOGO7IwR05qDks0XokhAvWumCtG9a6hZiJL9PxZFqQuAEZUK5UnS5S8mQ6idqKmwLOSHGwdKO/bJsxUq33l2hcuSgVhLVOKeEQKQ2QXCtADBLcLFCQIqURQgwyvdcYqdYFyzWeIiBTtCa6+mDOmkM5aw6Fq/dp/WUaTxFqy0Zt2YSvxF282ZFXp/EWm6I1vrLtldu/Pn2t+UHP0NDYs/En8SBlAoQqT14Ad4OOBWanNrr7Rh8OjNOJDLqlAjgLAAfTyJh8Tmv8yQtw7k4vB0/A8sRzemXgetAxCw0OJjseD8bx0Rsv+kzXVuKl1p7pfCRtdSAuoKODuf4FazKZQls4kxr0kweMtEgrkxEd/bR/keRxzEIJM2iaBk0igIqvk3i1NTmfwiyQg4jyUeJrAhkicFQnn01NPp969t3LZy9ePnvxcpoa6w5ckBqCYp1fRmVI9AEx4YFwm5QMwoaQRB9QuwvVniKR2oGYI86CDeas1cbICo23WKK282SEADPzFSQX1ogwii/TCXGLVOeRUxnGSLUxUi1EjVK1jXDn22PrLNmrNd5iqd4vMwTlpojMEJSorZBcJ9d7VK58hTkTtUTFuJUjUQtQo9KSiduijrx1jrw6KrKcChSpTH4hauCIlUvShJ9xJSBHwJfr04QoT6YVqR1SnU+gcoAyBGqJOPLXe0q2khlVGm8x5ojpguVUdKXaU6Q0ZfDlOoXBR2ZUIqYwYspQUCE+SglVdrHa4SzYQPhKYK27dOOxrUevGf1FPJlWovXIqbCIcIs0bkhpFuB2mAwgliwx4UYsWSpXnsqVp/WXabzFKlce4S9FbdmIJQu1ZcuNGSBpgjliqDWK2rJRaxboH5GbwjIyICEDsDEko8IKUxjW+6U6H6z3SwiXlHCI1HYINUFKE4Sa+EozX2mG5Hrc5LcE8tW2qFhtE+IWWO9Vu/IwSwTW+4S4BUIMYrVNgFJC1CgjHOlCFLVk8mRavoJUu/OpzJVaf6lM55VoHLZYbWTlfq2/1F++A3xklbsAc8S0/lIqc6U1Z60uUK4PVZqzVrsKN2bWHNh54vqd5od9w5Njk88BNSafTdHUoN0NcEkH4UnvwDjo7Ho0ODG7VjKUiDKS45EXNJXiO3qSWPLkBcBE/C9Ykhwu0VEMnXAZYEQr8cLN0CSNj97+sQTm4vEUXR+dgYwZPv+Nxh6QMrje0H29ofvGfZBN6L4ZzzJ0g7pmfRvD42BYeyuDHXSxhulx0GrrHmpq72P+O+PJjBztTHVP74jeaWtXvG7yIFEPZiatwZcFqlfgSNJfN9A0NSq3nhDrfELCIyUDUjIo0fsVprBI4xYTbtyZpzBHhbiVryDBmaT1lxG+EtSWLcTMoEQCKUgxRsn1boHSJMDMEo1T7YyJVVaxyopaMs1Zqw0ZVSpnTEI4hSq7whTBXflKS6YA0fMVpNKSqXbny4whCeEENREBZpESTjJQTGZUKk0ZMsImUVvFmEmIGgWYhSfXCzCLSOMEKUmuRM2DCaHKzkeMAsTAlaphndcUXekr264LVpAZVc78OgWVgdpyFKYwbAjK9V6ZzmPPXRuq2u0u2mSJVmOWCKQgQe5Wacn0lW0nfCXBsm3VO894ijeDUoWEcCvMmVKdD0JNkNIsxCwyY4bSloNaswlficZTBK7kuDPPEK4GR4nwlWp9JVp/KbBAzJ6rtOcg5ky1uwBzxAhfsdZXaggvN4ar9IESMliq8xXjzhhqy1baspSWTKU1CzFFMHsO4S3SeQu0nnzMEtZYwzLCwZfrBUpKrLYDSbVuEeGRGTOkOp+Y8Ei0HjmVgViiYsyULkQEmJkPE0K1A1RGdMFyBRWyZK92FW60ZK+2ZK/2lm4Dy2FDSKLzorYclasAsWajtmytv8wUrbHFam2x2qL1R89829LaPTQ4+jR+/Xk2BcAxMvE8qTliYDr7CAQyoP3Dk/3x2CSe0UiUY2hH47uZ1Eg8H02gaiwBjvEnL8YAUGhfgxHm0MUX2ulgpkgHZkQu8XRp3D8CedDmjv6mjv57rY/utDy6DWBxv+fG/W5QsKDLnODJpdvtoKhJ68rdzmv1Xbcae++2xKsVzYw0KkgrtHYNtnQnqMH0OGZlQ5l0aOmOA6K16/GFDWX/sJj6B82Gmn13bzN4xOwZaU2uzjDZROd9wULQxgJ6apihyvD4M/pSMf70u2lqZK3YI1DZxTqflAyK1E4BboNQE4RZYGOGwpwpUJq5sBa1ZRsj1QpzVOMtRm05fDnJVxjShQiEGJVGr9aTL9E4JIQHJv1aTz5ChQzh5YbwckOkWmEMQYiRJ9PBZAB35iHmiJRwcsS43BAgfCVqT5HCFOYrSEhpFmuchK/YGK7SuvNEake6SLmUB6dBctBFyhFjaZAc9HpxYYKPGNNFGEekFOIW4MZLCDfhK7bn1dli6wzh5bpAqcLgx50xGZUBaz1SnU9uDJKB0rItJ1bvPectXAerzWlCRIBZIKUJUpDpIkzrKw5U7HIXbXLm12Wv/gLWuoSYGTYERWqHALeBJIUAtynMUdiYITdFjJFq+spsCC+35dbqAuX22Dp7rNacVWPJWUNFVxLeYn2wwhBeTmWutMVqtf4yrb9UFyjVBctVrgKlLVvtLlA583B7DmbPxh0x3JmntGWhlghqjsipDLkhiFujhCtXH6wgvIWYOUOicQhxK4RZBLgdUlriXXmYBcKsfNQEIQaYcKKmsFhlTRehkIKU4Cah0qQPVVDRGl2gnAxVgTDNXbQpULHTnlcXqNhlyVmjMGfyFQY+YhSqnVJDCHzdrsKN5qzV+lClLbZu69GrV+91dT4aGR5/BngBLvKjk88HR5/2J5DR0z8GsmsgtUGnM/qHJweGJ+n66GjC1JlmP57IaEzQvgbIaNAuBk0N2g1J1tiT74C7MbM0m9wzBqq//cOTfXTKIzHyB73DIBygA5ObjT03G3uu1XddvtNx4Vb72RttoG/q1NXm01ebz3zbApZ8fa3l7I22b663ngEtmLfbr9V33bjfAyKXxo7+eBqio58uzTJdALpMO8NroKszybWV/tvHNv2vxS581f3hH/7+t6mpkcFRZuMZDYvp3pMeRlW4O95gQjsprYnW+K7Ho919Yw8Hxx8NjNOhSiLx/GJ08sU0Ney5ayDcChtCclMEUpr5ChLCbKCeAiFGLkzAep/WXyY3RaRajz5YIVTZ+IhRqDQJFDqB0iTCrTBhFyqNMr2X8BSoXHlqd76UcEkJF4RSEGIQ4RY5lUH4SmQ6N0w4YL0XteXoguWoNSrELQjpVTlj+lCF3lsoIxygasOX69OF6DJItpQrWcqVpEGydCECyocClIIUJEeMg1khXImarzDIqAxjpDpUtcsWqyU8+bDawhHjItyq9hRK1Dap1q31l+au2rfp8JWiukMGf6HGka0PVWD2XIUlEyb9EGKEUMpbvDm/7ihiyggv36MPlkOYBSYDQpVdgFkFuE1GZcipDIUpLDMGUWsWGarS+kv1wQqNt9iSs8ZTvMUeq/WVbcuq2W+PrXUXbXTk1TkLNniKN/vKtntLtthjtbacNc6CDa7CTbZYrS23FoCV8JWoXAWEr0QXLNd4i1XuAsJXSviKNd4itbsAs2XLTWEx4RYTLoU5E3fGNO58icYJYRYItwtwm0Tnl+r9IsIjIjxCjVtqCIrUDtSSiZgjIKOMGP2Q0gTr/Yg1W2nP1frLPCVbHfnrAekCFTszlu81RWsQSxZszBDgdqHGBRszCF+pNWctoIYxUu3IX1+65atDZ+81PHg8MPKEvvLQ13bQ5TWjcZtuIU+KTcaejUzGExPTAQgzJGFWahJsoklB51Pi7kaCO/R46MIKs91jdn8Hs84CAhY6SGnrHmrqGAAlCdCUCfyLczfaTl9tPnml6fjF+0fPNxw933DsQsOxCw1fXrwPurZPJHTycuPZG20Xb7dfvdd5q6mXznQwExCtjLgjZXiSMu5IUKPvdmNf/9R/v/r7fz0fGWP2hsTfMJF/be0epJvQUoQwjORIayJgATkO4HEwI0pwGKepYY6uhI0ZCktURHj4CgO4jsHGDJHKxpVqhJhZ4ymCDUEBShHeIqUlkytV82CNMVBsCZdpnDkqR47KGZPq/VpvkdwQEChNEEoJcasQt/JgtdwQkBuDmC2bL9OJcKs+VKn1lyrtOZg9xxSusGTVUKFSud4DIUa+HFQZrRwxvowvW8qT0loGydOFKE+mhVDTMr4MNJWni1CuBBfiVoUp4syvy13zhdZbJCOsS/kwV6qRaL0KY5AnVSPWLEN4ec3uMwfO3CmsO2zNWROs2KEPlsNaN1+uhzArR6Lio5Q+WF5QdwS3Zald+Z7izTIqLNF5wdEQqR1iwoOYIogpojBFEGu22l1oyKiyZK+y5Kzxlm4LVu6OVO8uXH80VLkjvHx32ebjBeuPFW86kVt7JFi1y5FX5yvdFl7xua9su7NggzVnjSN/PZW50pZba85abYrWgN45cGRUrnyVM0/jKVC7CzSeAq2/FLPn4M6Y0p4jJQOwIaRy5JqyanS+YoHKIdZ6RVqvRB9QWKJgfo1E58XsubgzDzFnCpUUV6rGzGFIQSLmCOaIqT1FoEpij61TOWOYIzdnzRe5tUeozJUyKgJTYbkpAhszUGu2OWuVp3iLq3CjI6/Okr3aVbQpt/bwtmPXrjd0PxwYnw4TJp8PjT0dGHnSNzQByqsgl0G3kD9Kbh4HFgsKe9OMoEmRgAJdpqHTrnQmZZzphjC8Err9bIyR3aCLsszqbBwijFZ0Orbq7htt7x1u6RwAFRPQVXX1XueFW+1nrrce31rzj4upRYu9+o3X95++vf/0mZDUumgxtejTFVWn7x785tra4tJ/mTFJFN13oqGb7qoCoUpTe19zZ9/ts3vhf009r/T/1uTzZy/MvdzYNdjSeL1Y45y5yb/mZx5tae5oObD5yJqNR9ZsPLb9fHdb91Bbz8Dtc2fWbDyyasORVXvv3O7qT7nTf9Bs3fftwxZGxxdABohTBhhteEnU0AXLVa58KRmEMIsAt0EoJSI8ILPIV5Bqd4HCnAmhlILKIHzFEGLgiJRpAoUjd5W3sFamc8tIv8aVh9myRSorT6YDGVAxbhHjFljnlRsCIswsVds07nxTtMYUrdEHy3W+QtTo48sIjgQHs7NA6zRfQXLEOCDFZ1zxUq74M65kKR9OE8iV5jBqjiyDZGkCBYQY+IhBrHHKTGHcmRes3OUuXC9SUulCNF2IcmFCrPNJ1DauRA2TAVvumnX7L2w8dLlo/dFw9T5z5nKxypouxjgiJVeqFqgcQpVdSgZssbWO/HVC3EZlrlS58gS4XaRxCzVuidYr1fsV5kzUlq3xFGj9ZbpAuT5UoQuUe0u3ZtbsD1buzFl9oKDuSNbKfSWbjldtP1W1/XT51q+yVu3Pqz1UvOFYwbrD0Zr9GdV7AhU7AxU7wys/D1TsClTs9JVtdxdtchZssOXWGsLVZKjKnL2aylxJZa40hJfrAmW6QKnOX6zzlyptObgjBhKWMiqMO/P0wQp7rFbtLkAsUbkpU+UqQG3ZuDMPtWXDhhBiycKdeVKNnSNRS9U2rlSNWqIyvU9mDIGmG8JXYovVGiLVnuLNjvz1Wn+Z2l2IOWKIJQtzxMhQlb98Z2j5XuBrOPLqfGXb8+uObTx05Vp9V0//GG3e40+/Gx5/xuzXANQA6kmEJ7SXMV1wTVj+BMOnmGD8C57T2ZOJWWuCv2PJZGGkRV/Mpsb0kvEkN4TOdMSp0TUIejFvNvZeq++6eLv97I22k1eaDm+p+38WU4sWh6vOtez+8tudx7/OIeyLFlOL/rz7dH397i1rP52NANuFhyN9txp777U+anjQN50c7bhdLLDMNRv999ZSZPbCVQ2POntPLs9OvZXs0JVHw91NF/2QZdFiahG0btfNvqZvjyCAEdDOc/1PHnXdmmOn1vS19c1dg6B9A3xxdHaDxv1MasTtRO2EMJsAt0GYRaB2gilSciqMWrN4ClKstuuDFcARSBehHDGeUbYxVrMTMXiVtiyFISinMqS4GTdnqGyZOl+RxpWnceUZw5Xm6AoqXGEMleG2LInayoU1HDHGl+u4EhVPpuXB2jSBIl2IgMQqR4x9xhEv5UmXxpEhXgbJ+LBG6ytGzREerOXJtAgVArUezBFzFm4MVO6y5aziiJSg8ZyvIMVaD6TQ81FKqvf7Sras2Xt236mbq/eeC5asF8i1aQKEI1FxpRqOGBeqHSKVTag0Ke05hnC1xlss0fmoaI1I4xJpXKCKpLTnqN2FSluOxlOk8RYbwtXmrFWuwo3h6n3Byl1Zq/aXbPqyoO5o2Zbjtfsv1O6/sHL3N2WbT6zcfaZm95nl209FV+7LrtlXuvn4qj3frNj9TdGGYwXrj+XXHYmtPZS79lDWqgMZVbs9xZvdhRusOWvNWatssVoqc6U+WGEMV4MCkMpVQPhLCV+p1l8qN2Ui1iy5KYI7Ys6CDcbIChDjEL5SQ3i5xlOkC5aToSpDeLnSlo0Y/BwxDhMOjkiJWrP0oUrCVyJADHLSr/EWuwo3RVd9YclZI9EHFOZMjbdY4ynS+ssM4WpjpDpYudtbus0YWWHJXu0p2Rqo2JW95tCGg5cv3m7vfDQyMvF8IpGGiFNjcOLhwHhiKgpjrloiPKbBAajB9CyAHzHBYAETGcwnzFcnEu8wwQhbJhg5UdDBMbvfdHa3GHA9Hg7GfY227iGQCr3V2Hvlbue5mw9OX20+dqFh/8Z1cWqcbdp2+OrWI19laeLU+Or27a2rln+8mFq02Jd5adq0Xr36+8uhR9cT7gbomGju6G9uu5LzJ2rRYupj28n2qR9evfphqv7zZXE6tP3X3//rb//591cjF8nF1KLFDvLLkVevXr36+1/6u7oP5AYXLaYWfVq5rXPq1atXr6ZaqsXWRYupRX/ee2tyorV7pKfpBPkptWgx9Tuy2si1LFpMLfq05sjQX1+MjDQ/uJI9105r6nt7hhJ5jeneDcBT5rQgRoSStRo2hEBeja+0Qrgd5C8ler/KlQ8hBh6slVFhlTMGIQYw2UFtz6aCxXp3TIBSsCEg1rgkGKUw+OWkT0kF4+UVmIjPvJLgEEoJMAsX1nIkOFeqFqmsdHaTLyfBLLU0SL6MDwMXYylXspQnTReiCBXCHTkClOJKNZCCVLvyZMaQwhSh4m5LhTG8nJu4JwVfYYAwK4QY+QpSpHYaM6o2H75y4Os7q/ee1Tuz0oQIFyZ4cpILazgSFWiUEKhsMlNEqvPacmtlpghqy8GdeVIyKKfCCksWYokqzJnAJnXBclBTCFTs8pfvyFi+p3Tz8eU7vi7fenLN3rPrD15af/BS3YGLaz6/sGbf+RW7vlm+49Tqfec2Hb686dCVui8urdh1ZsWur+u+uLR2/4WKbafy1x3OXXsoWrPfX749VLkrWLU7VLnTVbjRFK2hojWW7NWmaI0xsoLKXKH1l5GhSpUr3xBe7sirozJXaP2lhK+U8JW6izbZY+ssOWsIXymZUUWGqnBXvswUwRwxjacQJb0cESZQmtIEiNZfSmZUqdwFukCZ2l1oiFSHV3xui9WSGVWIJaq052L2XIHKIaMy9MEKe2yds2ADZs8RquwqV4Ele7WzYEN01RcbD10+e6OtvXd4ZGI6jwCIEKdGvKl8unoS9zUS2QQaGTN8ByY1xp9+N/l8ii7T0L7GeAIlE4mVZwYvjKrK6Kw4hUYG3R7C7CsFccrDgfGux6NtPUPNnQP3Wh/daOy5eq/z3M0Hp640HT3fsG8DTY3GzQcvbzx0MjNOjV1f3bq1aQVNjb768zf3f337yPn6r6+1XLjVTs8Wu0+nNh5cyf0TYETTxDBIZN4q/XPCp+gebOkabLv5JQ6ocbi7K96+1Rmnxp/33n059ah3sKWr53BJRnzJsycPuodae0fajqz8eNqPyMq+NPqXJ+MtyTsdGwB1opsl8Z3e73s4TN/NgHkrA7pPf6avITOFIaVZgNkgxMhXmiHMwpPrpTqfxlssQI08mVas9YgItwAzQ4iBJ9MJMZMANRozKvShSikZEKlsApQS4lauTEvPagfNlOlCVIiZIaWFJ9NxYQ0P1nIk6nQR+hlXzJPr+QqSC2v5CjJNoFgmkKcJFJ9xEsjgSgQKncqeLcItfDkpUNnFhEdKuISYRe0uMGet0vpLYL3fGKmGFLp0McYR43yFgY8YeFI1V6IWoJTCkrlq77kDZ+5UbDkBE3a+guQrLWAkHAku1fsVBj+kNCntuRKNS05l6ALlEn0Ad+Ujlihqy1a58nFXvtpTpPYU6UMV9tg6V+FGT/Hm8IrPwyv2Za8+WLzpBIhHNh++svnw1U2Hrmw9em3L0Wt7vrqx++SNncevbz16befx6zuOX1/7+YUtR65sOXJ127Frmw5d2XT4yo7j3647cLFi28nyLSeKNhzLW3cke/UXuWsOlm0+kbVqv798p7dkqyt/vbdkq79sm6dwvb94Y0bFNlfBentsHSCFPVbryKvTBcsdeXU0O+yxdVS0horWnzZs7wAAIABJREFUqD2FCnMmqENxpRqeVO0u2mTLrXXk1Tny1zvy6oKVuwzhKjHh0gcrjJEVZEaVwhyFDSEINYm1HjkVxhwxMeGR6HwKcyZiydL6SwMVu+q+uHT6Wktb9xCoxsV7Q8enTQ60P/QyJsVPTzlJzCWhJ7MwHQqaGvF/n08xX5pkYGKGmEABeZBEFTZe052BDNoNYT4B/R39w5N0QrS5c6C+7fGtpt6r9zrP3Ww7fbX56Pn6fetrE9S4v/XQlU0zqLFli+j/neH5x2LHmy7ear96r+vG/R46G9rSNdjSfjX2p4S5gmxlx7WESTc87hlq6RxouUFTo6sj3ujZsTcnSDOiuWOgpatnP82RZ5PxukxfzwGrA4zh49idp3953t010NI50NJ+ld7Fo+7Bxva+pjaaI/cH+kZ7E4EJkxeMo5dcQ4GUJgiz8BEjHzXzURNHqhEozYg1S6p182RaSGkWEW4+ahJrnFypho+a+DKdWGVxxNaKdT6R2ilW2wSoEUwwSxeiHImKI8YgBQkpSIHSFJ+RKcLSRUqQleBK1VxYy5VqIJTiStWfcSXL+LJ0IbqML1vKlSyD5FKVBaFCMtIvUJpEBACWVaiyE94iZ8EGU3QlrPMIMYsxUi1RW7lSNV+m4ytIjkSVLlLy5Xo+YpAagrHVn28+dNmVtw4xR1BLJkz6eTIdV6pOF2MyMoDbojyZTmoIoqawALPizjzMmae052KOmNpTqHIXKO25KneB2l1ojKxwFW7ylW3LqN6bs+Zg6eaT2asOlG4+Wb3zTO3+C+v2X9h69NqO49e3Hr2679St/advHzhz59C5ewe/uXPg69v034Pf3Nl36ubn4NVv7uz96ua2L7/defz6hoOXNx++UvfFpZV7zlZuP5237kjO6i/y1h4MVOzMWb0/umKvv3yHt3Srv2Knq3Cjs2CDs2CDt2Srr2w7FV0ZqtzhK9tui9U68tfbYrXOgg2maI0xUm3OWm3OWkV4i2EysAyScSVqlAo6Cze6Cjf6y3eas1Z7S7Z6SrbK9F7MnmOMVNtitZgjhrvyUVuO3BRRuQoUlijuyleYo4g1W6L3C3Ab5sxzFW5avuPrYxcamjsH6JbwkYnnQ2PPmPPE6K7tWbNOkqgxw+AnEu7GbEbQsQm9Pr0ms0BL12gZrsSLGbPgZsxzGWOkTgdBamZgvOvx6IPe4ebOgYYHj281Amo8+OpK05Hz9XuTqbHlyFfT1Lh9a/PWzdyZicbqI49G7txuv97QfauptyHR0N3cOdDace011HjUNdDSNcigRndHvJ+dQY2nE03tfY3tnUxqtHT0t3T23Tq26d+nx5Cdd7IzXjFhUONhR19z50Bj6zQ1BgfGwK1PaN8w3rybnDmapgZfQfJRE6S0QKiZB2t5MCHR+eWmCE9O8uWkQO3iKy0gp8CV4FypWmHOFMgJ1BIRa9witZMHE0t5cJpAwRFjaUIEUuiFuBXcgI8rUXElKjB3Pl2Igi7pNAHIYmg/44o/44o5IqUAMQiUlBAzSwknaokilkwINQnULgFu4ysMsNZljq4whJc789eToQqhys6DCbW7QIybIAUJYRYurF0GyTkSFV9BQkqLALfZY2u3Hr3mLqgzhJerXHkSwsVXGPhyPV+mE6nsiCXKgwmpzic3RaR6P2bPJUNViDVbYYkqzFGVu0DjLbbl1jry49f2YNXuUNXuvHVHijediNbsX7nrm8ptp9Z8fqE2gYx9p27t+ermobN3j5yr//Jiw6Gz946dr//yYsOxC/VHz987ebnp2IWGY+frD529eyQBlL1f3dxz8saO49dr919YvfdcxfbTJZtPlmw8XrThy8K6w8u3nyqsO5y/7tCqPd+s2Xc+v/ZQ9pqD4apdkRX7gpW7vSVbPcVbzNGVwcqd/vId5qxV9rw6c9ZqKlpjzlpFZlRR0RqNtwi3ZS3lSdNFGGLN0gXKPSVbbbm1wardjvz1oao9/vIdvrLtwcpdhK+UDFUpzJmIOZPMqCJ8xRJ9ANTUVK4CmSkiIty6YHmgclfZ1q8OfnO3vu0xuCEgmFVNN4Y+SnRbgulq9J3+BhlXrXgD6KyUZzz6eJ6EDLpoMhscM5IgdPF1LJEHpZ0Ixvy3F2OJrvMxMI0l4W6A1Ay4iSGgRlN7H6ihXLnTce5G26krTV9evL+3DlDDurT41PrDV7cePZXFpMbKqn9cTC1aHK6un267fvWXiXt3O643dIN2r3hnd89QW4IaH1uPXW4dbO3qv/Pl5v9v8bQj0NI50HwdUIP62PHVpeZH9W2P77W278mO5zW2NvTdf/C4/t75AMcyzZGO/sZrhxXxDGh42afUosXUIkHdjuuPmGHRx9ajF+8/bu7su3V0U2KnjUMDY/Hva/Tp0NhTOpAEHH/64vunz79/+vz7aWrw5CQfpUBgwhFjEGqSGkICxMCFtUK1C8LtPLmek5i3ni5SinAzGSxTGHyQglwGyZZBsqU8KVei4st1oEdgGV8G7q8BYJEuQoEPki5EuVINR4KnCRRL0kUgElnKh9OFCKQgwVxyAWYVqmxcCc6RqCRqq8adh1JBWOfV+0sUhgCYGyqnMmAyACbLg5uSilU2idYj0rghzEJ4i/JqDwXKt3uKN2lcMZHaIVDZ+QgVvweqKVOEW8WEG7Vly01hXaDMEF5O+EqFGg9MhTXeYnPWKl2w3F20yZ5XZ8ut9VfsDFfvy6zZX7rlZHTFvrItJ0u3nFy999z6g5c2Hbqy4/j1vV/d3Hfq5r5Tt46cu3fycuOJy/dPXWk6fa355KXGk5fun7h8//TVpi8vNpy60nT6avPX15q/utJ48nLjycv3j16o33/69q4TN7Yfu7bh4OWa3d+s2Pn1yt1nl+88U7zxy+U7TheuP1JQdyRctStv7cGSDUezVu6N1R7OrzuSveZQsHJXsHK3PbY2ULHLVbjJmrPWGKkGH4TwlWj9pZgjV0FlLOPLpGob4SvFnXm4M8+RV+ct2Vq44Viwandu7ZFw9T5nwQYyo8oYWWGPrVPaslWufJ5MJ1Q5xDofastRuQtwZx7hK3Hkrw9X74vWHNh98uatpt723mGABvp+FnQ7eS/j1jvMuWp0c1fc+J9NjSeHJ5PJ2Qpm+nN8br+DXp957w+aBUzRtwWZMZ+FnoAHgqzORyNtPfFs6I37PZdAAeVy45Hz9QlqzFKcGsv/r9kvoXuP3eu8cb/nbsvDhgd9dHt4W+fdFbA1ZTmDv7P9cfdgS9dgc/05z6eMl/AvTjd3Hi7PTV1DURzveD5xn4bI4pzq+qfP7saTnf9Ifn7ifl9Lx53qOXfaOZqodtHNoJPPpp6Au4e+eAnu0POcOQ8lTg2E4kpUXCkh0rjFGgdHjEH/P2Pv+dRWorcJfvA/sF92Z/ZWTW3tTvnbvHdma25NbdXuvt02oJxzTkhCCCEJEDlnk0wyGGySScZEkYNIQkISQoCEEDk7YZxDd7u7b7f3w086CHDf2q5TKiwkQSOd5/zCExjhKLoMRZOEknghOGYInnULA2ZZPF5UOpGrwjDDQwgsMK27jaX/EEb8AUX6AUW6jWOAfe4PKCB30kMJ7FAi9xaW9u8h+B9QpH8Pwf0QSggj8XDsCHp4AkedTuIqEWu8EBwdz5JTpXEUsQ5F5mMZMr42lyKJQdOlYSQ+jqNiqlLRNEkIgQPLF2p4Ap6nwXLUKLqMJNLrC1sS7nYll3dxNVlUmYEg1KGZchRdiqbLCEIdjqvG8zREcSw1PCE6r1GZWs1SZ7CjMrEcNUUWLzYUR2beV2XUxtxp1eQ+jLnTGlfSkXnfmFHTn3i3s7h5vLBprKRlsr7HDIVG55ijY9TRPmJ/PLY0NOcemncPza31T7sAOwBERszuyUXv5OLGjGPLZPONWbxTto2xBQ/s8/pMrq5xZ9uIrXnQWt9jrmg3lT6aKG+bKm4eK2udLG835T0YzqkfSqvqzqh+klPbG3enOfHu44SyTn1BU2RmbXxppzq7Xpp4l6/L52nzBDEFNHkiQagnCXUsVVoIgQ3UDxjThCeVJ93tNJR2FDaORaTfA+a7MrU69s4jfUETX5ePoYlRjHAMW0UUxzIiUnnaXLGhBKah6qx6TW5DfY95wbUDnGjf3nOoZi8UYs9eHz09R2z+gttjv/466JwPbkmCu48rj0EecGVuegU1zoMg4/oQFPYpCIE9ABn+6iNItvsKUMO9fbrsPbSu7M0ubU0ubgybPX2mldZ/iRoNfVMPCvL+duVbypnDl6dA9HIDK3T3mW//+ebB880V/7Ij+Pibcnjr46ejvYB2ztJ98Rjl1Nr24dKSvUIedfUX+Pudxp3Pvz9byuQAlSMq3Pji10+v13dPlpvv/O2m9MZNxf+t7x9eO/W5Bv/ih355FYAMQHZwAESU8h8//XRV8xpGFqCoYrC0QFFFeIEWTRWjKCIgKaMoohA8039KoykheAZDEi3U5WBoYjRNTJfGsJWJNIHqNo7+I4r8A4p0G0sHK7oQAgu2obdxjBAc4zaWGkbioCl8PFtJFOpo4fGU8AQ8LwqUnaFE7m0cHU3m0WUGjjqdItLi2Eo8V43nqjmabKosHsOQgVqELIvHcVShBFYInkUS6kgiPY4XhWYqMEwFnqeRJ1dk1w3qCx/xdXk8bS5JpMNx1RhOJIYRjhdEY9kqLFNOlcULYwvTq3sk8SWwwaXI4jEsJVOVpkyrjki7p0ytlqdUanIbYovaDKUdCWWd2XXGgsbRvIfDlR3TFR0zlR2mJqO1ddjWPmLvHHN0jjkejy0NzKz2mlwDMyvG2TXjzMqo2T1mWQf4mLB6xy3rJtvGqNkDIAK3cP/Q/FrP1HJDv6VxwNIyuFjTNVPebrrTOFr4cLisdbL2yVxxy3hGzUBBw3B61ZOsmp7kiieZtQMJpe36wpbIrDpNbkNk5n1h7B2aPImlzuBEZZEkcSSRni5PIAk0wtg7An2BIqUKBqWiuCJ9QZMypTIivUYUV8TX5XE02TxdnjShTJ5SSRRoUTQJmi7D8TQkSRxVngTzYEFMgSiuSJ1VX9ExPW7xLq7uOdwH7u3To6fnTwMe5cfPAqgRaE9OL2/7ATWQPUhwiYEUEdeXrFfri7eXhqnBLNXzwNr1e6uTj4HtyccrA9HgNRCghnf3GZjuAVljwuo1zq71mZBa43IP8u3bt2+/n7ocDf2Wltn9k89/XP7Wnz+/PHW4D1Z8x+Drc+EGePj2/W9/frvy35+/vXv2EpHGuw/evvuKPObr851D5/rRyuHHX64/7+un3e2nu+9+/dP/zw9bm8ermyeek0/+F/jn1/NnL9f3Xr/99dqTv/3+6fVlF6+As4bfj+fzz5+//HLVXwOMYSAcAM2QYziRYSQ+miZB0WUoujSUwAHI+BFFvoWlhRJYzPDY8Pg7OFY4U5mMoghCiRw8W86OTGMokxnhBro0li6NpQijKcJoAkdJ4kcRuJEEQTSeF4WmSTBg7Y9nhRBYt7E0IH3eQlNwrHC2Ol1sKCJwVWiamCjSY1lyNF3KicqiKZJwLEUYRYiiSQhCHZ4bCX7/YRQhlqXEsBRolhLNkOP50dzonNjidm1+kzShjK/NwfOiQDCCpolp8gQcJ5Io0tPkScrUqoSyx1HZ9VR5EleTzdFkk8SxaIZMEFPA1+UrUqo0uQ2G4rbY4vaUiic59UP5DSP5DSN320zl7dPVj2drumZbBhcf9i20Dtt6TSs9U66eSWfPlOvJhHNgZtU4uwr9CDjBmmw+ICPP2H3g0Ta7tDXn3DYv7yy4dkw236TVO7m4YZxd65la7hhzdIw62oZtzUZr67CtedBa32uu7zFXP56+3z1X0DBc0WFKutuRUzdoKG5LruzWFzYDYx1suKQJZZyoLI4mixOVRZEaqOEJHE02SFcNpR3a/OaYorbIzPtgKRyeVC7Q59PkiUxVKkmoFcQUAAEEy44Io4qxnEiSOBbHjaLI4lmR6cLYO5L4EnVWfVp1X32vuW9mdXTBY13d2z99FZwecPTs9fGz1zAQPbmsi3929u4saHIZXDtc2aFcYX8FDz6ucMAuM7uubkyuMDWQnSti3hGMMkA5Ab7G+s7Ttc0T5/qhZWV3xrEFYQI9JlfrvYtpaGPvQkO/paHf8rDP3NBvaTJaGwcsMORqG7F3Ty4Pz7knFzfml7ctK7vIKHQ9ABzBBsVXPI0RSatn+ynYeYDRjsN94AiYccGtc/1w2XsI34WHgXAGnoV8DQ4gfhr7ZcMh395zv4vXizdPX75Fqgyw8ILG5FPAbRiOoGkoXRpK5EAaADjohhI5YTQJiirxFxoE1o9oyg8o0i0sDc+UsdXp/Kg0pjKJItLiuZEosn/3CUEnoURuKIHtrzUI7DAiJ4zEu4Wh/HsI/odQAuxZ/DkgYaQfwogYqpAuT2CpUkgiHU0Wz1KlUiSxKKoYw1RwNFlMVWoYVRxKYIeR+AS+hiKLh1s8V4VmyrFsFZoRjudr0Ew5U5WqzqoPTyqXJpYJdLkYpoImT2QoU4hCHV2RBOp1miKJr8vX5jfp8ptIkjhGRCovOoenzSVJ4nDsiIj0Gl1Bc0xRaxJ4T1T1pFb15j4YKWwcvdc1V/NkrqLd1DhgedC30D7qeDRk6xh1tA7beiaX+6ZXjLNrQ3PuninX8Pza0NzaqNljsvnGFjwTVq/Jvjm5uAH6yPnl7WnHJpCUzcs7frt6y/r4wvrw/JpxdtU4s/p4zPFkwtk8uAhL3OrHM/CzKjuni5rGKjum7zSO5tYNxhY9Sq/u0Re2xJe0R2bej0i7p0ipEhuKARSkCWVQXIDbeHhSudhQHJF2T5pQBgoaaUJZRHqN/s4jjjo9jMTBc9WiuKLo3Aa+Ng/MyghCHZYTSRDq6cpkgb4gPKlClVEbnddoKO0obh6v7zGPWbzurRM/FwhxD332+uoCJciD5/ogE6k7rqxIrrA5rrBIEZIYImk7uwwcyFwDvgiuLF4FbDvOghYoT1++RQRsIF1bWj/0c8mt3oGZ1a4J56ML1HA391sALJqN1oZ+S9OAtWnACrv2thFbr8k1POeesvkgQwAx3YMTFbRkm0Gew1f8Sr1BeSgrvmNnQHQLYLEUAI4lzwGCFNeP1c2TZe8RkETWNk+8O083LtsCre88Rfjj/nFGkH/Xx88/f/z00ycIQ/nyy5efv/78y68///LrBWpgWBFhFFEokQPmNGBRgaJKwkiQ08O+jaX9iCL/EEYisWVcdTovOpsblUELjyeLdCShFsOQAbHqNs7vu4WoSH5EU35Ek8NI3FAC6xaWBnPTH8KI/x5KuI2j41lyklBL4mtwvCiyOEYYe4cmTyTyNThOJJalIEsNTFUabGehb8KyI0jiWLLUgKII0XQplhOJZUegmXIMI5wVma7JbZCnVEriS0RxxXiOiqvJpiuSKTIDTZ7A0+ZSwxP4ujyBviAq+4GuoIWvyxfFFYEGJDypnCTSk0R6/Z1HsUVtCXe7DKUdqdV96ff68htGsuuHylony1ona7vnap/M1feYH/SamwYsXRPO1qHFrglnz9Ty4Jx72OwZNntGzO7BubWxBc/w/Nqk1Ttl2wCkACGTZWUHTF8trh24Bz6UE1bv6IJn3LI+bPaMmD39066eKVfPlKttxNY2Yu+edHaMOhr7FzpG7Y/HHA39ltZhW9mjyZw6Y1pVjya7Pq2qR5fXGJ3bEJ5UEZ5UEZl5HyTw6qx6GElI4kvoyhRRbJEkvpQqixfFFokNJQR+NEGkBzmMMKYQz9MQ+ZrwpPLIzPtUWXwYRYjnqoFgzonKgj+XPLlCnlIJfzRdQXN9r3l2aWvz4AViIHz49Pzo2euDpxfTUMRS3O/U8PbjeRBT60pjcn2rcr02QR6DaGECq5PvUEIvXL8CHj9nQUJbAA5YAyFrV6B4IWvXabtvxOwB1Ggd3T3949u3b9/+eLHd3G+B4qKh3wLAASDSOmzrGHP0T6+Mmj1TNt+8048aoEDxBsx4tg5e+Pae+a7hBSJvB2tyRHe75LkoNJbWLzz+gkuM68eKz29E5r1s4bUViF8BhSG8TWcBr9D3ny7Ck7789BXBi2uowY6ArWQANThhFGEYBRgQzNs4xo8YSgiOEUriCiKTeJEpAm0OTRbHjkwli/V0eSJZHIOmiYCmAbqyH1GkW2gKiNx/CCMByzMEzwohsFBkHpYhJfDUWHYEUaAlCHV0ZTLo2cDDAseJQFFFWJaCpkhCM8LRNCmWE0kU6dF0GZatJIr0oEBFM8JRNAmKJsGyI3ja3Oi8RmlCGV2RxNVkU8MTuJosYUwhW53JiEgVxRZR5YkcTbbYUAzrRnVWHYAFXDwj0msIPA1ZEqsvbIktbk+u7Emt7su+b8xvGM19AI2Jqbh5oubJ3MO+hZonc3Bt6RhzNA9ah+bcXRPO4Xn38Nxa/7Rr1OwZW/CMmD2TixsjZjdABvhHO9wHC65d6+oeaKgXV/fAOXrG7m9hwIp+wuqFj2n/tKvP5OoByBiwPBpabDRaW4cWWwattU/mmgcXS1vGy9qmovMa0qp60u/16QpaEu52RWbej8p5GJl5PzqvMb7ssaG0I6WqN6GsU1fQHJFeo0ipUmXUCmIK6MpkdlQmSRJHFOllSeU0RTJRHINhRRAE0QAuOG5kGEVEkSWIDcXSxLtiQ7Ew9o7YUCyJLxHFFfG0uWJDcXadccLqXds8QWigYAYFzl0gdUX8XfyKtbcfr9C3YNt6fRcbPM64NNQIWBAi/3x1uUMJXqAEm5JetCeID1gAaBAdDaCGf4Hi3jcv75hsvmGzZ2Bm9fHYUuuwraHf8qB34WHfQkMANZqg1jBamwag0LB3jS/1Ta+MLayb7D5IHoGwIr+0NKBSB/jwFxoB+EBcS8GRdC3gCYRAxpXjrwuNY0Ro6/c6D9iUIlkKWwcv9k78iuRnZ+/OEXvhoLy1n3/59Zdff/v56/dQA89VEzgKFCMcx41CUQQoihAifMKIXBRVFEJggcFfKJFDE2kkhmJaeDxblcKLTEHTJESukhedTRbpsHRxGJl/C0MFbRugBtC6QnCMEBwzlMAJJXHBUxvLVlJl8VxNNicqgxoej+dp8AItWagFSjiOE0lTJGGYcjRHjeNGYblqPE/DVmeQJbEYtgrWOii6DMOUE4Q6uiJZmlAqiCmgyRPwXDVFFs9SZ0jiS2AHKUu8y4pMh5kfnEua3AZ5ckVUzgNVRq2uoEWb3ySJL8Fyo0iSWG1eY2JFd2pVb9q9/sz7gwWNo/kNI1WdM3fbTGWtkzVP5up7zM1Ga+vQYtuIrX3E/njM0TW+1DPp7DOtDM+7B+fWxizeccv65KJ33OIFFID5xYJr17Lit5+3re0tBpzp/W2Lc2vavmle3pl1bJpsvgmrd3jebZxd65509k+7uiacrcM2GJe2Di029C20jdhruufvdc1m1fanVHQVNgxl3x8oaBhJvPs4trg98W6XoaTdUNKRVN5lKOnQFz4CCrw2vykivUaaUCbQF7DUGWx1JqTt8bS53OgcglCPZkVg2CoCX8PX53OjcwhCHUkSR5LEcTTZYOEDzwXjL1ni3dTq3j7TCgCid/fZ9uHL4JwkxAIHdNZ+i9DLqHGJ1nVNqPY6sKC9BBPfk7EhRAykHwmARUBND+PSIIktsqZF3JKhPdnYew7StcXVPWTt2mtydY4ttQ7bHvYtAGo0DlzMMqA3gS/aR+zdk8vG2bUJi3fGsWUNDDWCaw2Aic1ADMpGwEB0I6h9ABfS1SDUuA4ZMNe4UlwAWCCQgUw0fNeim0ARf/zs9UUGyvvP0Jt8Cio0fvn1t5+/XhwXqEES6rAsBY4fTZIaIMsHLuMoqug2julnW+CZYWQBS5HAUaXg2QqqWCeLv4OlS1AUIZYmYqvTqdI4kjAaQ5eiyPwwIgc8ykOJHJCWomliNFOOoonRTDlJqCPLDHRFElmsx7CUGE4klqVEMxVoqhgaIjRDhueq0UwFjhuJ4UTiuFFMVSqeH41h+/24MSwlhqXEMMLJYr1AXyCMKQxPKkdTRXi+hiKL5+vywcxOEl/K0WSDqYQ8uUKb36TJeShNvCtPqVRn1RlKO7T5Tdr8JlniXYJIjxdEa/MbY4ra0muMGTUDWXVDxY8mS1omKjqmqx/P1jyZr30yd797vslohcahY8zRNe7sMbn6TCv90y7j7NqI2T1q9kwt+rOwTPbNGcfmvHNrfnl7zrllXt4B7/ml9UOwhILbeecW2MnN2H0zji0ADpPNN7m4Mbaw3jPl6hxf6jW5+qdXOsccPSZX67CtZWixrme+ccBS2jJW2WG61zVb2TGdWdOfVt2bXmvMfTCUWt1T2DiWXTcUX/Y4KudBVE69vvBRUnlX4t0uVUat2FDM1+XTFMl0ZQpPm0tTJPN1eWRZPI4XjabL0HQZnqsGjzKCIBrNkGPYEcCR5Wnz6MoUpiqNrc5Upt3Lrh962LfQa3JN2Xy2tX339qlv7znk8VxhJT8PNAsIOlxhi78J0DeuFheXJ6Dn14agr4IonsHqEsSLOOgBfsxCjDmuoMbeyRnY/61uHjvXDxdX92CBMjTn7jG5OkYdoBJAag0EKZqM1qYBa+OA5dGQDUGNcYsXikpYoABqXE8zANccX2DSgUwcIK4xOMcAjqVg+PAeXelQEMiA3iQYNa4ky4Jz10GAiQeQelFofP75y09fvwRqDTiuogY7KpPA19CVKUS+5jaOEUbiY1nyUAI7BM+ETeptHBOgRKTLUqVV0SV6niYDx5TxotLJklgCV4WhiXjaHIYiiSKJJfEiCfxoHDcKx43CMsOJ/CgCPxrGlhiGjCDQksUxOE4EiiZB06VoFnwhw7JVWI4fI4CshWGrsNwoDCsCz9Og6TIUVey/ZSqAf0ES6YUxhXANJPI1aIYMx9OAcJOvy4dyA7Qk0oQydVZdRNq98KQKeUplVHY9KFZBsS5PrsByozBMeUxhc3JlT3rNQO7VxEa2AAAgAElEQVSDkdwHw4WN4yWPJiraTZWdM7XdczAtbx5cfDS42DHq6BxzdE04uyedvaaV/mnXiNltnF0dMbvHLOvjlnWI1Zu2bwI6+McZKzuWlV27ez9gJ7cDWRXzy9vm5R2LH0d2wVpuyuabtHqH59eMs2v90ytd40vG2dUek6trwtk1vtQ6bHs0ZGsdtt3rmm0yWqs6TM2Di1WPZ/IfDhc2jpU+msx7OJL7YDipojv9Xl9Z62Ru/ZChtJ2nzVWkVPF1eWx1JlOVRpLEsVRpdGWKf1HFj0YzlWiGHM1UEIQ6mjwJwi4gp4IiNdCVyWSpgRGRytVkq9Jr0u71FzeP13bPd4w65pa24Hro3X22e3yG1BqAGn5icuCyf6U9ucIHva5/DfbdCIYVqBeQKiN4rnHRkiBHoJfxs0hP1srF6qvEh9C75VM7gBqwdh2fmtBQVDduRvw/qocZzeZmoxVBjWajtWnAiiBIs9HaOmTrGHX0TC4PBY1CkZQzbyBPAAlVuj4H9e0999n7SNcpIbdKikY2ljwHzkB2wfURRvAXMAS9VGtccgl9vjbbSfkv0hv/lpXabF976R9UI6gB6xJAjZ+/XgDHL78GoYYw9g5FFs/X52NoohA8O4wivI1j+oegsBnFUFF0GYoixFCFEn2OUJtNFevRdAmWIcUwZBSpQajPpYr1VEkMTazjRabgOBEYphzDlOPYCjRVBDQwLDMcy4lEM+Eezm086zaOGUriYphyFFUcRhGhGeEouhTLVqGZ4TgOgIgaywxHUYQoighFk6IAL6giNE2C52u50TkR6TWS+FIwEyIJdUBkhCacrc5kRabzdfmCmALghitTq0HBFVfSEZ3XqM1v0hc+ii1uj8y8j+NGoSiiqOy65KretHv9uQ+Gi5rHSx9Ngvd/zZP5+h7z/e755sHFlsBqo2t8qdfk6p5c7ppw9k+vDgYWrsNmz4TVO7u0NW5Zh+GFZWXXurqHmNMCjtg9B1Bi2Nz7trU9i2sHPmQLrh3rys788va03Te/vG2yb05avQMzK33TK4Nz7j7TSu/UMghbekyulkFrQ//Ck0ln27CtfcTeYrS2jdhrumbLWifzHo5k1vRn3x+o6pxOrewCGpgotkgUW6RKvxeeVC5PqeRqsgX6Ak5UFicqixWZThDq0WwVhhOJZshRVBGGHUESx3KisogCLYoqIgp1jIhUktRAksSx1ZmyxLsxdx6lVvXm1A8XNo13TTjHLV7Lyq5n+3T3+OyKAuWK92RgdRLQtn4IEp5cKz1eXwMLpMs4uzwEPbsWnhKMGgin4/ztx9fv3thr079PsiR0Dnn9urXpRWuhXH/jv2QVOl//8ecvpzvb/QN+yID6oqHf4u9WBqwN/ZZHQzAKXfWPQpe3wXYYaU+8forXCwQ1thDf0IDjVkDqeu3Atxvd/2qo8d3UBYSNuhlIftk+fOlzjKtC5f9B+mTp5W/ffv/100f/m/I2CDW+/Pz1p58vag0EOy5QA0p6aXzpbRwz4HPBCiVwfkRTYDyBoopRVHEInsUKj2UqEsVxd5iKRAxdQpfo8Gw5jqXAseQoMg9FEd7CUH9EU27jGNBroMgCNCMcw5RjWfJQIhtGHj+iyDDyuI1jhJF4oFsBRgao4yBAAEURhRA4oUQuigIymXAUTYKiivFcNUGk5+vyIjPvsyLTcTwNcOFZkek8bZ4kvgRc+VjqDJ42D1AD8CIivSYivSa2uF2X36TJbYAla3xZV1R2PUGoCyVy5cl3M2qNmbXGnPrh3AfDpa2T5e2mmidzdb0LwJtoHQL+uKNtxNY9tdw1vtRnWuk1ufqmV0bMHoCMyUWvye4z2XzTdh9cryyuHbNz27KygxhYW1Z24Z+Lq3uWlR372h7MRwFQIMtzfnnbZPPNObfBlnJ43j00t2acWUWCwntMrrbhxa7xpf5p1/D82sDMat/0SteE88nkcseoo7JzpmnAUts9X9Y6mVTeFVfcpi9sUabdExtKpIl3VRm1QPoEay+uJpsqTyRJDXh+NF6gw3HUaLosjCbF8TQsVRpRFIOiikjiGKYqDcfTAC9GFFcUkXZPX9hiKO1MreqtfjzbZ1qZd267t0/3Tv4Vavj1rB8+X5HDB0vgr09AL003AguUs4CLVzBTAyk94Itgc/OgTueV6Y4hwLz+9O3btz9eOpL9RhWt0/snDs+BeXnHNLfa73zx5rc///zyxmZeAoxA1iV+gobR2my0tgwuNgxYWodtj8eW+qdXxxbWp+2b88vbSG578AX/Yvx5udbY8GPHq1fBRKw/jhqp/l/MtHd8fXsSzM5A0hUuhhrbp4g16ebBi52jl1sHz1a9x0dvv/7z25+//fzp7OVbqAT9zK4AavwUQA0EL65OQ4UxhRRZPDcyFUI3QgicUCIvBMf4AUX6AUUOIwtQNEkInkXiKEiCaKY8nhudTZHEkiWxWE4kmhEO7vv08HgUVRhG5ofgGD+iKbdxzNs4ZgiBE0Lg3MbSwRAYRRHexrNAOQLuOCGBIHUURYDnqkmSWDRTjmaEh+AYoQQQv0tQFCHo6PB8LUEUQ5LE8aJzlGnVdEUShh2BZkVgWAo0Q+aXkOgLwD6Hr8sTxBRI4kvEhhLIVYDxp77wEcxE9YWP4ko6EsufaHIeksSxYSQeX5OZXTeYWWvMfTBc+mjybvt0eft0ZedMZedM7ZO5lsHFlsHF1mEbHI/HHN2Tzj6Tq2dqudfkGp53j1m8g7Nrw/PusQXPpNU769iESSe0J+blHevKDvjfQ5FpD3jhL3kOYEQKKXvQudjW9i2unQXXzqxjc8q2MW7xjpo9E4sb4wvrI2bP0Jx70uodnne3j9iH5tYmrd5xy/rU4sbYwvrQnBu6p9ZhW8uQrXHAWtM1k1s/WNIyoS9shr+DKLZIlng3Iu2e2FACth1iQzEjIpUojsXxNFhOJAp4N0QujhtFFMWgGOEUWTxTlYZh+/cs4Unl8IfV5jcZSjqKWia6J5cXJjuJ1y6S/1ve0rM3Z6aC2GvXTzW72O57+/FkxdLSMdbSMT6wchZoRj4cuRZaOkabO0Zb549efbfWeOr5Tovxb9nZpoMXbz6cvXl36BzRoK9aV/1HSa/t6Yfzd69MRQYQfTm/fHn24s3R0+2mcNWNm9Ib/2ibOz61PK6+yg2/Kf2fcKXJDbMPgocagZ1rQ7+l+cmAjq+9/BQltnJpdXO7M0X/3brmP6WZ1/efLk9Plt/vK78/Mep5ivA1kFHosne7twB+1dbZw2Pn+r55+BH+uosf+0Gred9l7qb8F+mNm9L/WT1i2TxZ2zxZ3zlZMtb/j5vSGzfl/yN9vCUj5vq7wCy0brz59Ob95/cfv3z4+NPnL798+ilQayCQcX0ayovOwbAiMHRpGImPpstAkAqytBACO4wqDsGzUBQhV5OJpknwbEUYiYdjhePYERimHEMTY+hSoHVRpXEEngbLlIWR+X6iB44B1n6gYceyI7BspZ8bQpNgWEoMU4FmRZCEOrI4BkiKaJoECGNhZAGKLkMx5GimAs1SYbhRZKmBpkiWxJcKYwtJkjgcL4oqi6fJk1AUEVkSG55cIYkv4Wqymao0njZPoC8AXRaIwRUpVbqCFliaxBS16gqaDSUdwM7QFz5iRKSgyAKqWJ/3cCSj1ljYOHanaaykZaLk0URt91z145nqrtkHvQsN/Qstg4sdo3ZQuPaYXH0mV/fkcq9pxS88mXOPW7xTtg2gdS24dhZX96yBssK2tm9f27Ov7QWuGH6wsAcKEOuKP5UTFi7A75hd2pp2bE7ZfDOOTZPdB6bYYwueyUXfhNXbNb7UNeGcX94eW1gHyOgzrYwtrPeZVh6POVoGF+93z5W1ThQ1jcYVtaZVdWfX9sM0VBh7B0wAQCML3DAcJxJFl6HoMhD7oagiFF2K40fjuGpOVBZLnYGiS6myeHAe5Wnz/JVLek12nbF/2mU19Vyvrv9zueftu7NpOEuvHpk1a+/enC7owH4qYmLrLZA4nvbHR9+4Kb3x95qx858/fvx8BTJevTm3/VWLQe61n70/O/eWE7+v1Aqt9529e+X/ff7RZn39/vjZ6/1T330JCFjbZo9OFx7f+0/fe+7tyvm+AT9qNA74j4Z+S5NxvjA27trjVSLj6dnBzuPs69+Cv8zayf7p7P28GzelN24Wtvhe7ew997oXszjXnEEBNY5Olj3W9GtQ6P/dKpZWtnZ6k7U3bkpv/P1e1+qRZ+vEu+NrjNbcuCm98fe6mXdvJrKuY7f0xs3MuvX3SKQrskC5MtG42qHg+NFYdgSKJkazlGi6LIwiCsGzf0CRQgksqDJCSTyaSMuPTEHTpRiaCMeU4bkqNFWIpYtRFD6aKgwj8fAcJVORIIhKxbOVaKrwNp51G88C46/bOMYtDCUEz/wRTUZRhWiGjMDXEAXRWHYEjq0kCHUEoZ4qi6fLE1CQKU3mo+gyDCsCw4lE0cPRLBVRFEMUxdCVKZL4Ur42jySJY0Sk0BXJFFk8QagLJXC4mmxo3TmabGBzAV5I4ksUKVXK1OqonAewfdQXPoq505pQ9jjmTmtMUWvC3S5DSQdLnYGmSbAMSXJ5V+6DofyGkZJHE2Wtk2WtUzVP5u53z9c+mQss5G3tI/au8aXHY0tPJpa6JpzG2bU+k2vY7BkObF7HFtaB32Ve3ra4duac24AO0KGAh63Nve9w7we6ld3F1V0oNByegwBw7NrdB7NLWwuuXeh0Zhxb03YfUNQnF30mm2/asTnj2Gw0Wo2zq32mlbZhW8/Ussnum1rcGDG7e00r3ZPLTUZrRbspv2Gkon06p87IVKVB6AkrMl0SXyJLvBud2xCeVC6JL+Hr8piqNIJAi2IqMJxINCsCRZeFkQUohpwg0EriS5mq1DASj6fN1RW0KFKqQPMi0BeEJ5XnPRgyzq7Z3E9ff8e67rcPbwOo8Y921+/fvn37vNUCqiqVsOfozfu3zgeZN25Kb9zMerjx4c37z+cn5uh/k964Kf1bmvPj77+8vQoZH87fvTLdibtx87teeG3W1x9eni3n/APGAZ2uq253ntcXHcr1k7Nt9vB4vhNQAyQnf3zeGfaLvpQTi4v2h30LUGU0Dvg7lIb+mcwIrf/k/BgsRfn17GCnKycu6P/927fffSUBB63j/dP5uvwbN6U3bpb0nb4/2DsaKU75i1+sde7oxLk2m/BXLn5ly9tbJ25bH+qm9MZNRUi1c3XrZH1lTO7/Sy6dvTnpzYj97rsgGnj6CYYa0KH89MtPAXIXghdff/v962+/X6AGlhOJ50VhWEo0sCGoIkhdRlFFoSQeaNvCyHyRPoetTGQpE+myOAIrnMBR4rmRGJoYw5RBdYChiaXxRVRR9G0cA1qPWxhqCJ51CyYdeCZ456Bo4jASF8uOIIpiyFIDXhBN4GswzHA0XQam4ViWAseJRDPlKEY4UaAlSeLAShec7+jKFJo8iSKLJ4pjqfJEiJsFn37QWQliCnjaXDCbkCaURWbeV6RUaXIeanIbdAUthtLOmKLW2OL22OL2hLtdCXe7kiu6BfoCtioljMiJyqnPqR8ubBwrah4vbpm43z1/7/Fs7ZO5up55P7lr1NExaofxweMxx/C8GwYKA9MrIHIds3jHFjxzzgs+qMW1Y13ddXj2oRlxePad64d2t7/6cHj2l71HUFxYV/cWoUlxQXkSGHa4dszL2/PL27OOrWn7psnum7JtTNl8wFWfsvnaRuyPhhb7plch1AcULhMWr3F27fH4UvPgYkO/Jeu+EaI2xYYSmBlzojIFMQWKlCpFShVPmydNvMuKTKeGJ6DosjASD7bvYSReGEVIlRnUWXWcqAwMQyZLvBtb3C5NvAvow4nKCk8qL2kZHzF7XBtHu8dnh2vDXPgs9h2f+9XxF9d2+4cvr999Orc++j/gMf2n799/fuXqCb0pvXFTgWree//+49FI9X+8Kb1xM6Vk5eNvP31Bxp+Bvcmnszcvp+74X9Dx6cur1x9enJ/NlfrvWXz74eyVHzX+c/nGl8+fX735cP56rdB/z/rbd6+m/gVqHJ3MdVT7UcP10jm93D44EPF/AmpM7+6sIbUGMMqbjdYm40y2SgeoMf30dMHmm13aCnDJtwOo0WZ+9tK3d2GuAbVGMGrs7+4/8Rcm/oHLt28/ucoNwaiRFHDxe3l04to4cvlsgf/T1f2t41Wfq5KiuHFTeoPSPbN9GMCgrMbdz69OjhDUWP744ejZ+fF00//ux/fnv3z+AqoTWLvCRMOPGl/9kHEJNdBMOYajRtNlGFYEii4FESqKLgvBgwqeexvHQDPCSZJYqsyAYyuwdAmEOaMoohAC6zaO8UMo4RaWfhtHD8HRedFZbFUKninFM6WAERiGDPoRFE2M46hwLAVZasCyI3A8DZohg50umqlAM+RhFGEYiY+iSzGMcKJIT1cmEyWxdGWy2FDMUmfQlclMVRpNnkiTJ0HSDzsqE8uOwDJk3Ogcgb5AEl8C7hLCmEKIC1Kl1wAnUpPzEGzB40o6DKWd8WWPgQaaXNmTXNEtS7wrjS8JIXIlcYVlrZOlrVNFzeOlrVO13fPVj2eBFVrfa24asHSMgsh1CTw1ek2u/mnX6IJf2zpi9oxbvNOOTaBvAcXL4Tmwu/ftnv1AhNe+w7O/tH5oW9t3rh8gdy64du1re4AmDs+BZWXH4d5fXN0zL28DMRlyvUx2n8num3Fszi5tTS0Cdvhm7Jvzy9tQldjc+4A1k4u+EbPHOLPaMeao7zHnPhiOKWrV5jcaSjuSy58wlMk4noYankhXJitTq4H0ydflkyRxeH50GFkQSmCFkQWhBE4IgcVRZ2jzGhnKJIYyWVfQnFzRLTaUgBM6X5cXndvQNGCdXdry7jzdOXp5gRr9x+d+r8CXM0Go8eb95zNzC4Ia795/fvN2vz0i6sZN6Q2qcf2drwKaC+rgzj9/+/Q+KA/FP/v8GIwai29hFPpiInCP7d3HszMENTxv3308f/vx/NVybhBq+GsN5Pr/7WWfUoXUGjPtCGq8cEw5W43dnP8GqDGzu7PWFNCe+PevRmtD/1xlZs5/uAJAzMcTG0drwajx/KVv7/nWrjWAGqsn+6dz9y9QY293/0nAB9Tx7rXbe+Tw+Nqy4hDUcHnmAqixsuc7cm0cuTxzyf/9AjVWfMdrI7V/uym9cTM5e3Q6B+f/S26+f7t9cHiBGp8+Hj97fTzVgKDG1y8/XSxQrqDGd2sNglCHZinRrAg0U4miisIoQrDhgRFmCIGNoopRjHAMR81RpeC5qhA8C9JDb2HpITjGD2HEH0IJIXgmeBHjWHK6zEDmRZJ5kXR5Ak0WR5HFE4R6LEuBZatwbCVEK6KZ4ZAYhvAvUBQhmiEnCqLh40iVGkjiGLY6na3OIPA0ZKmBpc4gimMhs4MRkcLRZPO0uZBFxtfmgfmd2FAiiCmQJt4VG0oiwFMzvQbcaPy9yd2uhLtdSeVPEsoep1T1pVT1GUo7Vek1uvwmNE1M5KryHwyVtppKHk2Wt0+D7Xh11+z97vm6HnPz4GKT0Qpasq4JZ6/J1T+9OjCzMmz2TC5ujFnWpxY3pmwbQBIH+ta8c8u2tm/3HAAiLHsPYa7hgHs8B/aAMMnu3oMR6eLqnsW1sxRICVzyHCwGahAoJcyB8epCQM8yu7RlW9sD3rFtbd+6smdd3Z1b2ppa3DDZfEPz7rYRe32P+V7XbO6DoYSyx5EZtWJDCV2ZQpUnkkR6UewddVYd/OnoymS8QAsDUTRDHkrk3cbSRXFF6ux6PEclii3Kuj+QXNEtiClgRKQyIlKFMYVpVT3G2VWbe38DyBpBtcYbPyUU6VDabB8+v3736eV88wVqvPt0/u7DwWjN/3pTeuOmNqb0/i2oO1qOfv/60+vL/K6A1P3l5L9EjVcXGOF5++7j+btP5+euoHvOENCxnr89OH21e7xRG5hrzBwczQajxuRS60A3578Gao1dT0O/pXHAiijWGvotzYMLVZlZ/8sV1FDOHJ2/cG/tXKDGi7OtgxdBqLF2fHA6Vx+EGjt7AdRomzt5uuw9XApGjeNT59osghHfRY3VzePV1ZkYmBNhYv9xU3rjpjZh7s37l2c7R0d9mReocfL8Mmp89hcafq3a118Dx28/f/3eXIOvyyMIdUDWDgVvcRwzBM9GMkrQTAWaLiMItGRhNFkYjeco0TQxDE1RMPjEs0LJfAxdiqIK0VQRnqMUxeSLYvLJvAgoSVB0KbQ5oSQuiibBctUYlhJFlwWyFJRYngbL07DVGazIdIo0jsDXcDXZnKgsojgGx9PgBTr/R1wSR5bFMyJSgRMtii3CsuRYdgTo1mCwr0ipAutdRUqVMq06KucB2G3GFrXFFLUaSjqSKnuSKnqSyrvSa/qzao2JFd0R6TVxRa00aQyKIorJbyh5NFnRPl3aOlnZOVPRMVPfY67rMT/oNdf3mJsGrE0Dlo5RR/fkMhDJh+bWxhY84xbvmGV9zLJusm/OO7dmHFvzy9sW1w5c+WEIanPvW1f3YG22tH5wiSzsPQLzKJibApRYV3ftngOIF11c219w7VhXdxdcO8ABQZa188vb8JrIEg5ednF1z7y8M+PYGltYN86uPR5zVHbOpFR259UPpVb3wtIE8JckjpUl3pUnV7DVmWx1JjU8EctVQ/QviirCsRWqjFp5ciWOHSFPqcyuG4rKecCKTEfKwOLmMZPNd0Hx8qOG9G+RE95zWLhe6lDefPh8BTVev/t0frIQE2wY8/e6mY+///zpsnD+wrDrpR8j/n6nbvXFi/P3L48dGRj/XGPx3cdXFx3K+tt3n87ffTieb/l/b17rUP5+p3b56f7pqx3fQiLav+Cc2T80tQWhxsRSq7Gb/V8vao2HfQtABoUOpWnA2jw4mxupvVy8fPv27c9fXr/wbO8Go4Zv7/nmzqUOZfZyrYE8eO74dNl76NrYQlBj9uhk2e3vUP6m6Dc5910bBws9df/XzQscWd08Xt08NPvnRP6/5PT5+72DF9uHR8G1xnXUQPhdCFMjuNb49bfffw2uNRJL27maLDRbhabLwkh8IIOC318YRYSmSzGcyBACG00To2mSEAKLxFeTBRoUmR9CYIXgmSBsBUtRNE38I5oMvO8wEo8qjWMok5mKBBI/CsdV49gRBF4kVWagiGMYymRudDY7KgPk8DRFEjU8gSDUkyWxrMh0tjqdxI/CcaMgOBJ8w+nKFKI4lq5MYakzIJNZGHsHy5AReFHSxLvy5EoQZUZm3o9Ir4lIu6dMq45Ir1Fn1UOaaVxJh6GsM7a4PbGiO6WqL7WqJ/O+MatuKKWyOzLzvjqrThRbGEYRsVWpFe2mu21Td9tMMNe43z3/sM/cPLjYOmwDy7/HY0vdk8v9065hs8c4uzZs9owteMYs3pGA0hFqjUA/crC0frjs9XOB7e59+9qec/3A4dlf9h46PPuujSOHe9+fWu6GbmVnwbVjX9tzePYBbgLx5fu2tf0ZxyaCGvPL24A7gBew011aP0T6lLmlLZPdN7qw3jO5DIbpVZ0z8aWdYkOJ35JHm4vnaThRmcrUathAsVRpZKmBJk8iimKwnEiWKk2b3xSeXMHVZEfnNeoKmvm6fIJARxDqyVKDPLmivG1q2u5b8R1vHbzYOzk73J7VB5//4hHPlQ7lw6UO5b1fqPbGGfRZhznom2vpJ0DTePn63FYfdGIEH1Tj+oePyFzj2qFAtey9f/fmr58+4Dw4mGq9QA37uKO5r4t1UWu4L7atg4vAKG8ZnM2L1F17NSW+etmzvYuUD+ZnL7cOXgTNNVaP9k4uocbOXgA1WmePTpa9h8EdyuzRybLHducvdkOols2DLT+5a8XcHXZx/+HnN+dbBy+2Lncopy/enJi+U2t8+Tmgcw3eoXy9VmsUN49TZQYsRx1C4ITgmGC9BTnMoBMJowh/RFNC8Gw0XXobS0dRxaEkHoYmAuBAkXlhRA6aLoF1KY4dgaGJwaMBOFoYZjiaKsKylBimHMtS4LlqsiSOJIkj8KOIfA1ZEksU6ihQQajSaLI4HEdF4GtI0jiSJA6cb+nKZKI4liQ1cKKy4IMOPHGeNg/HVhD40fLkSlV6DeSnqjJq1Vn1kZn3NTkPVRm1mtwGZVp1dG5DfNnjhLtdhtLOlKq+5KrelKq+tHsD2XVDGTUD+sJmZUqlobQDx5CiqcKU8seVnTMVHdPgQl7fa240WttH7CBq7Bh1AEdjaN49bPZMWr2TVu+YxTu1uGGybcB2AxoHUHZBiwE0QZh9+t1WNo6c6wcwxYCGxba2b3fvO9cPHO59QBPXxpF9bQ/JNIfXmV3agkcCSczh3re791d8x66NQzBWAE60MyB4AU1t79Ty4zFHx6ijunNGm98UkXYPSPfShDK+Lo8TlSlNvCuIKQClCU2RTA1PhFgmcVwRdH8QyCY2lJCkBiw3CsOOpMjitfnNjUbrgmvHs/00EEp+tmULtq6bPvgYVGt8/PLm/dVawz+z8M9EYXr39befvlxRzQMx3C9sfb75UPldL7yPP334eBboUK6cWj+mze58+vr+zYezF997Or6ub/fD2e5+MGrYxuwt/U++ixpQa8Ampb1zLEtx5QVVIuPpq+P9fzENPb6EGu92d/b8a9p/tM4enTjXD53rm62ZQXONjSO38y9c/D582AugxuqWt0Wu8v8lt9+dHr64jhonz19fR42LocYv31m7XkKNgoYRhiIJTZf6bf4wVDj/wyhCPD8aRRX9iCbfxtIwVAGOrbyNY2Do0lACx8/yxFBxTCmJp6IIo/3pZ2QBgRtJEulIIh1dnkCTJ9LlCQRBtH+EwVZhuVEEoZ4o0hOFOqJQR5LEkqVxJEE0linHc1UMZQorMp0iiydLDbCUpUgNVHkijPeZqjSuJhtWAKK4IrGhhCLWM5TJUF9AIDPcRuc2wIVRnV2vTKsGa+/Y4sWstloAACAASURBVPaYO48SK7qTK3uy6obSqvsMxa2G4ra06l5lalVO/ZAypSIEz2IoEstaJ2CiUds9/6B3oWnA2jK4CF5bj8ccfSageK+NWbxjFu+k1Tth9U7bfbOOrVnn1oxjE5qIxdU9m3vftXG0tH7o8OwveQ4gvA/BCGegT1nyHMBkFGkuEBag3XPgXD8MSFd2/cvawMLFvLwDBMTVzeO1rdNggmDgWfsQhj5s9nRNOJuN1vJ2U2JFd0TaPWFMIUudAbtYujJFnlIpiS/FspV4fjRHk82NzkF4HDR5Il+XD64C7KhMvFCH4UZh2Cq+Lj+zdsA4u2p37/v2n++d+CNCn77+8vPvCMHxnz99/PTmC/z7z1+/fHnz/vPrdz/7aYb//PXdxeTi84evgbXlH799uCxFCeaAPn/1/sX5xzc///Pb1f/+/P2XL69efzi7mGv4fr/0/X/+9Onzqzcf/uLp//z06oXDtTNt3/W8+ee3b9++/fFucdTWZLQ2Lr/549u3b9/+/BjYoSBrlCajtXlwsXPMZdp4++Wqvd5vr46fbbz8+c9v3759++PT2Uvv7jPf3svnX+DFfnm698y7++ocyKC/ftrdeep5/tOf3759+/bPd6cnYKvhOv2C3ONcP1zeOnv99boF4K+vT56CdM21ceTeXqsWR9y4icxB/aK1rcP3n+Ft+Pnjs5dvn718/9HPQ/3jotb46RKX/C9Ro3XYLo0vAgY3EDrRNAmKJkEzwvEC7S0M9QcUGWSvWHZECIETRhbcDnDDf0SRw0i8UCKXpUwicSNwLDmercAwZDiOCsdRoekyFEWEponBIgzHVaNZKgw7kiSJRVQnGLoEx1XTFUkCfT5flwcUDKIoBi/Q4rhR1PAEtjqTpkgiivRUeSJXkw1ze2HsHbCKIYtjSIJoWK8qU6vBFxdE8cAZBy9/bX6TobQz4W5XUsWT6LzGhLLO5Ion6dU9mbUDhY1jhY2j6qy6wsbRvIfDbEU8miLU5tTV9czf756rfTLXaLQ2G62Phmxtw7aOMUfPpLNncnlgZmVofm1wdnXC6p20eqdsvslFP7nLAgQt5xYYLiEM37WtU6f3CIoO5/oBlAagy3ZtHC17/eHj7u1T29qef0LhPXJ49pH+xX7ZlwVUlSu+4+WA/HF183g94AEFt9CqAFts1OxpG7HVds9n1xkNJe0wAWWq0piqNIosAXjiBKEOy1FjWEqOJpunzaPIEshSA12ZIowphARJkjgWx4vGsCJI4lhJfElJ87jJ7nNvnUDYX3Cwq197+uYDIpB//S+0atfT5IPvCRh2XTf4Q+JjEYvQF+fvX7x05l6aawRe8O3H1wH0efry7cnzN4fPzneOXm7uP/dsn674ju2eA1hUDc+5+0wuMJFv6LfU95iD1a4IKxRmon4u+czqsNljsvlA3wzvuxdRoOxdUrsGh7wjxnye7VP31gmc+UsBWw34FAVzyZ3rh8veo2ApCrzdQZ+0VT9qKE1bz/0KFETwCq5/AaPQj4itxsUoFNw0vl6lk19ilI9bvLGFjf6ARQIHzVTAZBRWG7ewNCBchJH5GJoIy5CGEFgQoXYbSw/BMbA0MY4lx1BFYn2OUJuFZyvCKELQXBNFMXR5EludwVZnkEU6DBOkq1KSSEuVxLAi0xkRKWx1JkeTzVCmEEV6vECL56pJ4lg8PxrH05ClBq4mm6vJ9medK5Mh2ZgbnSOJLxXoCwQxBeyoDJJIH5FeAxPQiPSaqJwHUGho85ti7rTGFrfrClo0uQ3qrHqwL0+p6k2u6s2qNaZW9+Y9HC5sGituHk8q70qt6Krums2q6cVQBQRuZEnLWH2PuWnAAqK1jlHHk4mljjHH4zHHwMyKcWZlaN49DE3Kom/G4S8x5p3+3mTBtWNd2XW49x0eP0DAOMO1ceh/azePVzYO1zaP13dOkQJhxefvXJa9h+BtDZ8YmIBAhRI4QOq261w/AHH0iu94LRBBDD8CsYGyrOya7L6heXf31HLHqKPk0aShpANW0bLEu0C7YESkCmIK+Lo8cFGDvOjwpAqWKo3Aj6b6M+u1GLYKxVTgeNGwsoXw1xXfsV8j/+z1s4BX6BXXvyvewleWI8Flxfnl+xGxCWK9FXxcz38+e/Ph0g7l7Yfr1sSAGkcBh+GNQCL0RZqB2dM3vdIx5gCPWAjN80tR+ixXyo2WQRAErY6aPdMBMx5Et4ZYun/H6S+AKYjDMLxx/iFXADKu2IUCalyRrsFFwi913V6750eNqY3TYFuN59uHL/dOzo6evQZnxvOA69/HTz99/PQTsEKDueR/qZSfsvmSyjrQdBmaJsEwlRhOJIoiRNGkkGASgmdBQlIYWYBjqzBs5S0sLQTP+gFF+iGUgCLzcSwFWRxD4KpRFAGGJmbI4tiR6ZyoTE5UJjMynRYez5AnMOUJzHADLzobhA+S+FL/5k8WTxDqcNwoNCOcwIuiyOKJIj2Op8Fy1eAMDNUHTZFM8ceXZrNUaRxNtjCmEPYmwphCokgvT6lUplYrUqrUWXXRuQ0QUOZHjaI2OAylnTF3WrX5TUkVT/IbRjJqjZn3B4uaxwsaRktaJgobR6Oy6yo7Z+51zcYVNoaRuGxVau2TWXDcaxlcBHFHz6QTdq4DM6vG2bXhefe4xTtp9YIZl8nmm3Fszjo2zcs7lpXdOecWTDGd6wfurROH2z+qAOuEwDt9FCxtRq4Y7kBAMbIfQVxYQD675DlY9h4trR841w/giZAz6DfFD5jHrW4eL3sPbe79+eVt8JjpmnDWdc/lPhiJLW6PynkAZqKwk6Irk0VxRRAxzdFkq7PqtPlN8E6h6FIURRSgjSpx/Gh2VKahpOPRkG12aWvZe7h18OIgYCcXlJn04dWbDwg6XDEcv2IgfKm+ePsxePz5Vykn/qSVy97CZ28+vHz98QPU3n/+9vHdR+QFEcgA1EC8Qr27z9aCbTUC/s/to45mo/Vh38KDvgXYoAVMhhcuHAAHF9tG7E8mnGCrMePYgkZyxXfsQWx+d59t7l8YCyP1hT+NLQAuyBu3HLDVcLgP7O79pcuuPMvXBPLIex3QrZ3uvoUz/LfXQagBArb901dHT/1eoaAtBmNhv+vfz9/vUK6jxkZJ8wiGoyaIYiDZLIzED8GzIA8JJG0oqgi0ZBhWBIoqCiVwbuPotzBULF1C4CgJPDWGJkKRBSF4VgiBE4JjhJEFYWQBmiHDsZVEQTRZpCNyIwhsvyUPURRDEOqI4hgCT4PlqgkCLUkSRw1PDFhsqIkCLVGgZakzhDGFrMh0yBOkK1PoymROVBZUy8BNCk8qp0jjIH8MViEIZICjX1xJR0xRK8BHcmUPkEGTK3uSyp+k3evPuj+Q93Akp36o5NFEZGZtbr2x+vHs/e55XU5tGFkgTyx90GuG7VrbiL112NY14QTblVEzLE3cI2bPiNkzsbhhsvtMtg1wxwCyBjA+YfMKlrMgXnZtHHl3nyHv8drmMRQXMOaAYgEAAnkAVCjO9cOl9QOkwYFP+Zq/SDle8R2B6gmcoOB1kHJ3wbUL6R7G2bWOMUftk7ns+uHYojZ5SqUotoinzRXoC2ClDVHSipQqVXoNALEitYouT0JRRSiaBM1SYrhRJKkhPKn8TtP44zHHtN3n2jjaPnwJQQdIOCO0JwhqBCPF1VoD4XEFEbquKOKv9CNIMhMiq73qSB5IY0PMu5BC4+VrvxkPeIVuBSIa/bYaAV/yrgln24i9eXDxQe9Cfa/5Qe/CFdkr+Gs0G60do44nE86hOfeFGQ9YeAWhhi9g9rsR9E+kf0GceADlL2oN9/eblO8WGsgs3L19un45SOEKapwE0k/O3316++HLe7Aj//LLp///09DZpa267nmK1ICiScMoojCKCIadP6DIP6JIP6KpIFoNIbDRTAWKKsKwFGFkQSiRG0rk4NlKkkCDoQnRVBGKIsRz1WFUUSiZH0oWhJIFEHQSRuJjWUqqJIYqTySIYwlCPY4fTRLHEEV6RkQKNzqbpc5gqdKo4QlEkZ6lziCJYyjiGDCbkyaU0ZXJFFk8TZFEkycxIlL91M+4Ikl8iTy5AuZzkH4EtK7ovMaonAdgewdiE0NpZ2xxe2L5k6TKnuTKnoxaY07dYO6DkdwHQ7kPhhD+eEpFlyyx7H73fG33fG33nDa7BkuXarPvNxstTUZrx6gdOBr9M6vG2dWhubXheffQvHvSn2Dgp2nOLW1BjWpe3ra59+Et97+7G4fwsfAEri1rmyfwKUE6FPCVhsvOWpBRQsBC8gAmIIjFE1zTXBtHTq+/HkaeuLZ5DD8OXhn6lBn75vjCev/0auuwraJzJvP+oK6gWZ5SKYwp5GqygawBTmg8ba4orkiaUMaNzmZHZbKjMglCXRhFiGbICUI9KzId8qL7pldml7ZcG0c7Ry+Pn79GepPgUxepI65bgfoP5FuBXPgL362AQcaV+gJ+CoIXz68p5c9e+814ENQ4C+jrkYhGJGwNyjRnwJd81OwB2wHwCoWhRn2PGXEARCoO/5h81AFpBmCtEhzsGtyDIKdxcEuCHDBYWfH5UcMe+PAEowaCHf+i0EBQA3E2RiYacHvw9Pz42Wska+Lt+88XXqGBucYvX6/ixVVu6IJrp7xtkiZPQjMVKIoQgtSQYedtHCMExwwhcMLIfBRN4gcCMj+MIgohcFBUIYGvwbEVtzBUDFOOpUvCyAIMQ4ZlyrBMGY4TSRTq6YpEsjiGJk8iSeIIAh2OrcIw5TiumhWZztFkczXZdGUyWRJHlsTR5IlEQTSBp+Fpc3naPFFckUBfQBDpqfJERkQqTZHM0WSDXlMUVxSeVIHIvTlRmZqch5qchwAZuoIWKC5Anxbgj/dm1Q2lVPUmV/bkNYwVNo7lN4wUNY9XPZ4ta52CIzrnQUZ1t98idHAx9W47RajRZtU0Ga3A0YC054GZFePsKkhOwHQLSlMYOk7ZfAsu8N3ZQcgUnu1Tz9YJckpDObC2dQqXo/Wdp57tp0ilABbVUF8Ebo/c26er/oCMA6QBgReHyhZ5KfhEQo8DPxE+i4gX5tC8u8fkah5cLGubiivpUKXXwDKbrc4Ezy5qeCJRHEuWGnCcSAwjHMWQkyRxNEUylh2BZikhpC6turd12GacXbOs7Lq3TvxXsLN3SMvwEjlvvwcW59eGoAjKBJtrIE7CEJJ2daJxfvWLSyaAyAsGkAhZxDw9cNfpr0hRsgumdxZcO1M234jZ02tyBRyGF+p7zXBAq9LQf4Ea/qDf/qE44RW+RnaZ5fASauz5UWMjaA7qhQcEFRqABbBrt7v3ATugVVm65jkMH4aFnvv//ab0xs1YcbXVunm8FmTG81270MNn56cv3iABmkiUwacgitfXrxeNyfc7lMXVvUdDNoYyGUUVQU1xC035EU2BxSpY7EDcQRhFdBtHhwkIiipGkQU4jgpNFYWR+WRh9C0M5TaWQeRHEflRRJ6ayIOWR4WiSbGcSLxAi+dF4TiRNFk8NzqHp8vjaLKZEak0eQJNnkTga0jiGMiO52qyBDEFPG0OZJ1TZAk0eRIwyvm6fDAKlSaUyZMrwpMqgM3F0WSrMmqR3kSb3xRb3AbJJrA6SbjblVjRnftgKPP+YEp1X3pNf37DSEHj2J2m8bLWybI2U2XnzN02U/7DkeLm8arOmQe95tZhe/PgYm3XjDazWhSTr8utbxqw9E4t90w6gdkFrNApm2/KtjG+sD7j2Jpc3ICZKPA44ZoDpYF/WrF14seLzWP31smK78jf0G6fQpGMDDKDetQTGNQhcINMyxDjpjXkChOADE+g7oB7PNun4NZvXd2ddWyBpv7J5HJ9r7mgcVST28DT5tLkSQxlCmy78QItnh+NZin9NmtMBaSxkaQGDFtFVySL40sKHo60Dtv6plds7n3vzlNoT/yo8epiMHl9IXLdeifYNefCsC9QGgSHFbw4f4/EMvnh49x/GzwNRUIMkNcJ3sI8Ozubr0y7xuYoebx+BHriYbOn1+TqGPMPNWq75+t65ut6zGCuEewb2tBvaR40l8XHX3+1rs1nyNmL+JIHb0yQKsN9GTKg1gDUCO5NgC4Y7MrjXD90LZt0IXJ/aONPH/Z2T9YuZ69cKTT2T18dPn2FoAYSgIKsXb8gxNCAp8b3UcPm3u8aX2KrM1BUURiJdwsyTdAUSDwKwTEhCz4EzwojC25haWiaBM2QoekSLEsRRubRpfpQPBNFEeI4KixLgaIIfkSRMTQRhiYKI/HQjHAcT0MU6UmSOJ42TxhTyNPm8rS5DEUSQRCN40XRlSkkcQyeHw0DUWhAWOoMiiyerkzhafOo8kSiOJapSoMJvzCmUGwoFhuKpQllQB5XZ9XJkysE+gJtfhM4aMSVdICkNamiJ77scWL5k+TKnpSq3sz7g1l1Q2n3+rPrh2CWUdIyWfJoouTRRHm7qbJzprhlor7XXNY6Wdk5A6oTMINsG7YVPhxMr+4ubBi693gaTMMHZlaH5z1jC+tTNt+YZR162tmlrXkn4hK6g2xMAqf3ydrmCXxKkFMaPKnXNo+9e347FpiiBY9IPdv+dgZukUIU7oFxvb/W2D4FH/3g6hfBGofnAMaiYxbvwMxq24i9ot2UcLdL+f8x9qZPieZtuuCH/APOfDln3n7nzPTp6MgvE6ff091xZnqiT0RPZaaKiIqIiCuK+77v+77hvuO+4AaCCMgim6ACIgKKuO+75mJuVZlVb1U5H+6HR1yq50QQGRYpKFk8F/fvuq8lr8UvocwzLAtDjnYmRzl7R2C8wpCWXzcfR3wAxjvKxS/eLTgF6xPtGZ4VkddS3i3o5y5wFSYQa0BuLVoHfY8az+1E7JmLt+8f5ABf2ypO4HCBZo5f3NyeX38AgEBR4x47Hq5R7JNK0UQvG0Xy6fz6QlAORvt69jl6Jfz+0+UJkBpTciMsmwA1Olkq+qS6hzPfZXc2sfUbLAzwlBWpyU+f7fu7S/stCVqttr57bnmyOoEPEvu1l868rzHvac1IbpPe1pyELlCWLQeG9X21UNwxppDvfP52e71m9+GBhgzb37YPL3ePrwDfoWvi3ccHEV4PClAeOlC+ff/lmz1qaM17rFkDJbXKiUABYzt0O0OmzmsXkpNnsCM+4AcnvIO73ytngiPeH+MV6oQPcPaOcCFHOHkEOOID3uBIWK8QDCHIySMQQwzGkiOw5AhnUrgrJYkYkU1JqQpIqvCOzveJLcJTEp1J4RivUNeARDw1zTM8C0sMhpBhakZdUGolPjgFT00lReVBiw8hLJMYkQ3xXP6JZbCCCU6vjchtCctujMxrjcpviy3pAtN3QnlfUtVgSg0jpWYYgCO7eTK3hZ3bMpnfNpXfximm88p7Zgo7uGXdAtqgpH54tnZIQhuQ1A1BeJe0bUIJGTxdk6q+qYX+6cV+7sKocGlMqBviaZgSPUOgHeJrxkRLTMky9LZCTqRofk2mtUIhI5xNULEWzAvIpwpyScNcgFzV67tn0B6Mfs/aNoIC5s3j1a2TVbthxLSBSDxgzwqnm3uMgDjsvfP7z7HNY4ASGH3Vhm25dgOQblJqGJheLO6cji2mA1i7U9NwAYm4gARcQCLOP97FJxoSDFx8Y9yCUlwpyVifaGJEdnRhR+2QpIutFqjMi8bdte3TvZNrqF+z71sDFHimmsDGfT4qQ7qfPpDTxLm6teyxlxS5xZEoWU/uTCmQX16+/bC/xCL9wzOP+i8Vy8fXH84uzwQVgBod4uNrix0VKtdtzqh0rQ2DKcW9SdX8jqkFOmuuoanx//k/Hz/V/+JSm9s318OZHxbMVWWmwLPNbO3NG7aByULqi7aPl6TskDePo3T+oy9j2gQnyu3pmqL/+PhXjcZmC/krezqjNP4fqS9eUv9zplS7dqBf2xU2F794SX3xMjGRtWlY31dLpPQhfu+AlLe8b9w4MhrUhc+G+vxT5+TOxdaedbKk8Mm/Z6TP2OHnhyHDj0woz7ChGtPeyIw2MLkCQwx57eL1AwZvU4j6vnEhvXElY7zCHPEB0Cb/ytnTwd0X4xUCtSlu/nEYIhVLCnH0CMT5RpPCM3G+UbiABGgzI0XmkiJzyTH5HiHp+KBkHDncmRTqTI7EEKlulCRiRI5nWKZHcDLGM4gUlRuUVk0MTccHJeP8Yr0icz3Ds0CA5BWZ6xNbBP0mUFMclFYTYjOegKYrpogeU9TpG18C3tY02kiqzaWW1zqV18rJa+UUd/IK2rkldH5lr6iiV1jVJ6wdmm1gyBoZ0kaGrGVMXj8sbRlTNI7I6DbOHBjyYYEWvCcjM7oRoW5crGdLV7gK05R8ZUa1Kpq3iMGxrrFKNda55S3V8hZiGzHvASuG3lash+iabW37FM66FruLfG37dH3H9p9Ag++dA+ggNRmbx8aNo7XtkxXrEdwJY7B178EnGPR3AQyZNo7gscaNI5C3z+m3ZjVWUCWMi/QtY/JUGiMwpQr8bHhqmkdIBjEimxxT6B1T4BtfEphS5Rtf4hNbRAjLdA1MIscUxpX2lPUIuybVvDmT2rBt2jjaOrw8OL05Pn97dv2YEL1GOc6Hqi1kvWJrQru2nSPQpoIL/cQPz0MG9cXLhMCwpwE2aTW6d1fXa3WuzwZeUf++wfr54+3p+S6v5kn/+8toTKaAubghVM9lECJevKS+8GMLF/V05mTgvz0fn/VvJaLB6cUhnrgqp/hvnjyba75EsXlq2VoqdX7+4Q4dRuvOmXl26H88/wLzKyXb2hVp/D/Bb265OT7Sr+2KWkrhldJW3h5Y98TtEAVW0WU4WrHuTlVlP//P9d+HVRdXW3OMf3vmb6Mo3PPvP/705eu3zzZe49kgr0eosTvE13hHZmOIoa+cCa+cPd+4eL3GegHH4eDq4+DuhyFS37iSnQgUB3dfrHe4gysZS45wIoZgiCFORCqGQHH0CIRZA+cb4x2dB8ouUmQuKSrXzT8WQ6C8ciZgCBQXvzhnIhXnF0eKynUNSHCnJOEDYskxBYHJ5W4BCe6Bia7+ce5BKZ7hWcSIHN+4Yq/IXFB2BSZXAqMBiXVhOYhXLSq/La6kO7aYnljRH1vSFZHbklI9nFLDSKsdhaVJZiMzr41b2MEr6uQVd/JKu/jlPYK6IUl1v7iRIa0dlDQwZK3jytZxZcuYomVM0c6cQ4dPm9dgfoivAZ6cKVmelBq4CtOU3ChQrU4rTFCYNKtZn9Wszy1vKfVb4BaZN2xrTLuIQMu8Z946Wds+gaEA6sXh2l63z6fePbeVcd6z7us7p5adM6DQVrdOAWWM1iPTBnxSnaADMEykgDjw5Na98zXbnIJWpUOUrmJpU6q1wjTeNzWf28yKzGslxxZCrIGLf7xrYBLMejD0EUIzvKPzQUXqn1ieVDlY1SccEy7JdBvLlkPr7vnB2Y39lIHykW/RhjQbOjxYrNrdEPLSbuVxKu//u5fUFy9jKQO7X+7u7u4+GxpybNfMj7//+uuvd79ecGnAI7Avf727u/v9+9fra30BGENjFGegUL+Pz7J++fTxaLbnb//gQi3hr/FVynRixIuXiMO1fXw89J+oL56Nz6pdEPMWh1pqn4aMwrPRVIeWTVXaP1NfvHwuVaxh7fr03MTt+i9/8BqrFAe6FWmCHWroVneEzShqvDvc2BfTK+Dlj1tPV6xbI+CFvz8roaE+w6qLq80Z+n95SX3xMiFDeftQkf7b9x+RvjWU1/j+y1/txRrPoMaEeJkYnulEpL5y9nyDI8GI4eBKfuPqA0uT1y5eWHIUZHa5+ka9xhIxXiEuPtFQX+DqE4nzjcb5RLr6RnmGZfonlhGoKQRqirNnkDMx2Mkj8A3O+5WzJy4gHkMMwflGu/gnEEIzcH6xXpE5gcmVAUnlnqHpzt4RroFJeGoqITQDzGwQng6DBuxNgtJqQrMaqJn1YdmNkAYaVdAeW0yHzPHEioGkygHUqJbZyMxqZOa2sPNaOcWd08WdPGgJqe4T0gbEFb0zjaPyplF524SyfULZOq5oHVfSWSo6W93FVndNqgemF/umFoZ4i0N86FtdZkkNzNnlcbGebVN5ieYtApvhdXZxXa7dgMWbankLpD42Y+s+HBCMG0dwkW/uX1jsdvgb+xcb++frO6dwqW8dXFr3zjb2L9b3ztd3Ti22wcQ2aJwabU1867aeYWSrZyv1gu9ZtzH2AByrW8goDl5YmXYDCiJHZpZK6LzYYrpPXDEhNNODmuYamIjYhYJSMKRwkGkQwjIhjTWmqLOsm8+ULMu1G8aNo439i4PTmxN0gWLHMkD72fWjRYldNcnVO4SktG8tQeVhJ3IwuaXR9Lfv3t6eX9+eqAb/Hpkp3p5ffTi7emscrobLhnlg+6HX+kLEHmb99tPXmw+fr66X0Xs+f7w9kkKGVWwo9+K3uzu7LLy0Suk2X6lIe4AazKh/hscaNxd1PZz5bp44FzCoXjvHX7R1zT/zbFWqk/VNVSrycOv3rx+2d88tm/O5yC+z/v7y0jTV/Xfwipaud7aO9GsHeiHyqmtUhzrDY9QQtZShqHFg3btHjfVTw/rmCGJ+G9Zc32zsnm/uH0yWIfeoL683Z7psqPH284ePb99/em+LC/1kLyd/snZ9Jm1YY9obFS55RWRBfpeDm+8bHNnB1eeNKxlpWnTzfeVMcCJQXMiRGGKIEz7AmUh1cPPBkiPdg5LxlCSsF9XRI9DJIxBLjoCOAhw5HEcOd/IIdML7I3XzxBA3SrIzKcw1IN41IN49MNErIjsyv40ck48PSiaGZ2F9ot2Dkj3DsmDtB0cScmyhT1xxQFIFJaUaAnKhPTA06wFqxJf1JlYMgDQjzZbWldPMzm2dym+bKuzgltB5+W1TRZ288m5BVZ+wdkgChxQwtraMKeqGJC1jckjfQUpx+JpB0JILdXBjSZahn5EtW5lWmHhKM2T8zi6uy7VWIDWgvXXBiGR/6lb3QI4FlMTK2KEaTQAAIABJREFU+gHS97lzZt48Rul0y86ZZefUuneGslZWtJJz93xj/wI9bsABB0GTnTPrLtL3t314uX14uXVwubF/sb57vrlvGz12z812TP7a9ikQLjYT/YZ4wcKSLNcNz6bUMILTaYSwTFdKMs4/Afp0sd7hju7+4EgixxaGZjUkVQ7UDUpGZnSieYtudR8kocd2TWvoDuW+WMBuyri225W8RYqdPwF23I8ktv0oiho1uregzji2u+fy5vbi5p09aly+/Xj57tPl1T1qfP3y+erdp2t71Li9PZjtQy/U3e0T48axQdALT1ut3OHJ5XaoYaRPsBDUqNcquOputrqHxYq23aPiLzLakK75Gs3JyvLWonFvRdCH/JILZ+u2WePvG9Y/XILn9f6e95cXJq4NNeZPjOuH+rWD+XGYCBDUeHRCmWkqtUcNUec9ahg3tlDUmDu72ACfK4oaF9fbqpFXT2aiP1FHFXufkIrGHx+rQu0njgezhm51f1S4RI7KwZKjnAhBTkSqg5uvgyv5NdbrNZaIBI67eDni/bDEIHJ0PpYQQAhKcvOLdvONdCZS3f1jX7t4YUlhWO+wN65kR7w/lhyBIVAwBIozkQpxG29w3ji/WPfgFJx/PJYc6RmW6RtfQs2o848vxpIj3SlJ4D0hhmcTI3IIoZme4dnAnkKhCexNqBl1gSlVIZn1INOIyG2JKaJHFbTHlXRDZQGk+yFpXY0ssMPnt3NLOqeL2rkVvTMVvcJiOh9KkuqGJJW9wqZReSNDCsmgdJaqhzPfw1H3Ti30TiGnkmFgNIS6USHSnMhC5eSqVZ7SLFSvCtVrUu2GVLuh0G3O2RJD0Y418LwvW2yqCnR7sn1q3jze2DuHU8aGTb23aWvZ2T683Dm62j683Ng7g80ZSnnYCjXO4NvW984t2ydwPNnYP4e+8tXNY+vuGdRtoeXDa9un4IJDE31mNdYpubGBIY0v7wtOr4UVLLTMOHmFOhGpr3EkR3d/nH98QHJFQnl/Rbegf3pxXLTEmzNrTHsb+xew/z+ztZ+gs8ajEiMUPuBPtKL1yn7WsGtgfIQa51cfnkUN88g9aoB1zX6y+Prl8/W7j/bTx+fb230UNRYvgApdZCIXarVihyeXJ3vezxr2qKHkLfRw5rvtUEMt1I60I6hRPbe3YNjWmPaWOV1/h6LGxpw9aqzvnD1AjYtz8/Q9ahgg3+AhajyaNf591LAZ7cGVf7Z1cMixQ429oy1RXfnT89Tf5Gguvn5DkzXsjyR/yGvo1w44MiMlucLFL9aJEIy0yWOJsEZx8gh0cPV5gyP94IR3cCW7+kYSghId3XycCIGOHoGuAQnOxGBHdz9HNx8MgYIhhTq4+biQIwE13uC8HVzJb1zJju5+7kHJbgHx+OBUclQuaJYJoel4ShIuIN41INGWvpMFdT5ekbkwaEBHQVAaLSSzPjSrEYo8wnOaY4rokNMVW0yHhWtS5WB63VgqbSSjfjyzYSKrYSKnmZ3Xyilo55bQeRW9wtIuAQwaZV38mn5R3ZCkfljaOCKjs1TQFN/NVvdOIaU4QIJCRChLsgykBgoWXIVJoFqFQUM0b0GoUC3KhiK9BLZYDSja2wfUWLYc3m9JbeU6QIii88XO0RW4jNCvN/cvrHtncGyx7p1v7iMHk/Xds439i52jK+vemWXnbOvgwrhxtHVwuXV4uXN0Zdk5BdxBgQNlN7RmxP+m0G3yVatdk+qMujFqRp1vfIl3dD4xIsc1IBHjFQb9BhivUDw1Lbqos6idSxsUw1GuhzMvXrCsbZ8iO9eH21B7scZbu/3Iw0r3+6MKKgC3l2bYUCM2sGdt9/r27OpEVJb14iFqmBDUiKVO7J6DnNyGEX+O4K9e3l6/+/jghHL7wTZrxIZMbJq3Tgzr1rGykj8hqLHNlclSENSQbW8ZO2wnlD+HTwyPq7rZqra62n96aYcaHa1ATISMmNSGbd3qOruq9E/PzhpXl9bd0yUu/f96+RQ1YgM79Qvrh7rVtb6MjBf3qDELs8YL3Ihi8+Ahr/F2f31P2GFDDcvJitU2a/ylqm1h37r3+ISyf3pzcvPlPsTARve8iFCc/vzd7oTyM7pq/fZHCYAa096k1BBd0AbVh44egYARP2A83riSbZmAXq8wHm9cyV4R2a5+0a6+0YTgZBw5jBCa4eIX+xpLdPQIxJLCnPABON8oJ48ABzeygxv5Dc7bySPAEe/v7BXiHZ1Pisjyjs4PSCr3Syh1C0wgReW6+Me7B6W4UZI8QtKJ4dlekTnu1DRieHZAUjkpKs83vsQvoQxitaF6AxhQiNKAhStKZyRXDaXSRuCWUT8Oja15rZzCDh4wGuXdglI6v7pfBJ3PDQxp85iinTnXwZxDHY09nHmkLYmnGRboxoRL4yL9pNQALdBTciPcUOzgq1aF6jXoKJEsWGTaDbluY1azrrTJiqESCVI/UU3n6taJYf0QRobN/QuYCDb2LwALdo6udg4vd46uwCKxsX++dXBpuW8eRxQZpo1j0+bx+u6ZceNowbi7aNoFVBLNr+nX9iWL65adU8vO2cHpNVQBo1IfMMKAjgiySIXqtYHpxZwmZkReS0BSBSRu4KlpsHN1IlKdfWK8o/PTakcaGNKqPmFx53QxnUcbELOlKyvWo8MnpMb9rAGrVhQa3n+6egfNrBAaDDquTyjfcWUnHr98+/FsCc3peXQr6ln/cHF9e37zfpvfare/iCQN71xcrf1BGYrthLLIfPMHT9ut3+NIZpNsqLGzZWwfn8rA/UF8Vr95XqAZG+j7g0VPUY/5AkWNZx4+sH97cWaWjr3+o4cbT5ZsO5QntzTaytt9y+49aqyfGjd2eU0Fz75wQI0DI5f43N/+OU9/+/N31O2KeORtkPF8p7zGtDcq1FEzap19op2IIYgJxdH9lTMB/CZgogelBik6P7qww90vwsU7FB+YgPEMxniFQv0SnpKI9Q7D+UTivMNeYT1fYT2hVhrjFUqOyiVH53uGZ3lF5gQklTt7hRJCM7yjcl38Yj1C0vEhaYSwTEJoBiE00yMkHVwP5JjCgKQK0I8HpdWEZTeCJDTKljwOZQX3RjVYndRBiAYzq5GV08wq7uQVd/LKe2bKe2YqemYqe4WNDFnd0GzzmKJpVN4ypqBPqjqYSjpL1ctdAMgY4muglnFECKixxJQsc+TGKbmRIzdyFaZphWlKbpxRrcJNqF6zKUStsxqrVLM+t7wFtCiIRNWGbd3qnm51zyYDP0ClOOu2gwlKYcCYsH14CQiybhPqrO+ere+cggpAv7YPDUzzKzt8aG+aM0sWLUzJ8pR8pWFAMCHSAmYtGHe3Di5gXwvAAUESqHYD4Ay6EUq7BXEl3cHpNK/IXDw1DU9Ndw1MciIEObj5uvjFUVKrc1smG0dkRZ28nGZ2Ycd0CZ0/yNPoVvcRVagdr4EaQ+x3IrBSQYWb1w8PJjd2XnjUWnJ+fWXsr3oyUcdSBnY//fTFZmM7XWhBp24IRn+/uzwV+CTw6n7WONmXNz0d1GMpLaajs/3J2dkEAjprrHQw5zmKqefjs95fyGe0LIme1/D8s51+eIueRx5Bxg95iu0vP78/PTdvH2n7nn2NOx/enWsN/x5qPGJDjRtHps3VrqcZZYAaVzcHxmnS07/C9cgvf/kVRY1v95Bx70b5/sv3n3/5bj9rLBh3uQpTaFY9zj/ByTP4jQsJqWvFEh3d/R3cfB3cfd+4+oDiC+MV4huTF1PYTgpL9wrPwngGO3uHO5PCHN39cKRQDIGCIQQ64QNeOXu+cvZ85UxwC0x09YvGByURwzLB6YD1icaQIjzDs7zCs1wDEz1C0ogR2fiQdIAMqD6xGzRooVkNYDmJyG2JyGuJKaJDWldsMT2+tCepcgCMauCFT68bg51rTvNkQftUYQe3mM6v6hNV94sqemdoA+JGhqyRIWselXeyVHSWCrEk2a1a0U7GcbF+ZEbHmjUA/Tkh1qOMBm/ODCUGcEhBDSmIWV5rVSxtyrVWaEVZNO5CkJfGvKczI1bIpdU9tLbXuntu3T1b30P0v0BwwpkCZT3Xtk/1a/umzWOtaVdl2JZqrVyFUbywzpEZ+HNmjnRZoFrt5agKm8c6x6X1gyJav6B9bLZhUCjVWoXzqxv755v7F+s7Z1uHl+ghBeSG8ys7s4vr42J9WTc/obwvIq+FklpNisrDU9PcglKcSWGOeH8X3xhKanVxB7eBISum84s7eXD6a5tQqg3bO0dXKK+Bbl7RYne7dclHWy/BA8W3fegOmE1QM8vZ1YfL2+8PwriQ0fr725v709DNp5/vv+fXbzc3txc3n94/E9V1d3f3+4+3H/ZP3x6//fZMINZPt0b9KnN2eUh19unu7u7ut49bxg7mHJ2/vvPlt6fPtKvVMwTaSalRtfnhx2fitX48PT63bt/vUB6+kN9+fP92Y/t0dfN47fjzt6cP//5x03qgMczaeA3r43+H37/ure0v7dx+u7u7u/v92835ivXIvHW+f/vLkye7u7v77eu7t4dn7y6/PPPP+fuvv3y1X7t+f7w9+fbzE9SY028JVOaKLp5XZI6ju/8rZwKUQr/GEh1cfRzxSP6wE5HqhPdzdPfHelLIYWnUtCq/+GJ8cAqUxTt5BjsRqRjPoNcuXi7kcLxfJN4v0j0gDksKwXgGEUPTA5Ir8JREckwBhhTu4hNNCM0ghKQRQjMIYZkeIemEsCx8SLpHSLpPbBExIgcq1PwTy6kZdSGZ9dSMOsgEhdhxSAaF6J2kysGkyoHk6qGU6mFYuOY0T+a1cvLbpgraucWdvIremcpeIW1AUjs028iQgZSrZVzRyVJB2gqEjw9MLw7yNIM8zbBACy7GcbF+XKRnIZ2MBmiBBtQQQGGSeg0+5yFlQ4gIN2wpG0ubc8tbct2m2rANtQNLawd6y6HGvAeqQXAKmLdOQOtl3jy+bw/eRVazsDHVre6pDNs68552dV84v8afM7Oly13MWfrEbD9X3TwiSSzvya4daBoW5tT0AB3DEGjaGMLCppGiVuYQf1Gm29jct7Enu+fmrRPEKbt2oDHtyXWbLKmhslcYW9IVlEYD0yApKg/6op08g1394qiZ9WVd/Nqh2eo+UWWvKLeFnV43Vt0vEs5bNvbOoQv69OG4gTAUbz9e22VkPC2CR9kNZL6w2eHPbKb7s4eDjP056JFNHpWfo2Ecj+YXSOLZPb6CyQtFT0gtEqrXOHLjuFgPSTw29/Mc3fYB02XrCYfz7CBPMyZcYs0aphVGqdY6t7xla0669wRZ7jev6x8uL9dtkhxkpbV1srp1YrI5UGx1FkiLuMa0p3m4Q0GNsKiBTWcLbUJTWuy9+WiKFxjkgYGyD+MBLfkntKXRluJ1jxoPVyr3qCFZsHDkxpoBUXA6DeMZBD6UV1hPaEvDeIW9diG9wnpiPIM8Q9N9IrM8/MJf40gOrmTfmHxqRq1/YrkHNdUR7++E93Py8IewchfvUBfv0NcuXhgCxd0vmkBNhVWrm1+Ms080eOQ9wzK9o/Pdg1Ngb+IamOQZno00etm2reiqFe2Fh/pFNK0LInBTqodTaSOAGhn14xl1Y4Ud0wXtU6Vdgup+EW1wljYI3Ke8aUQKDYxt48quSXUXW90+oaRPqgZ4msHpRYZAC4Jx6FgbEy7BiMGWrnBkKxyZcUpunEQ4jhWuwsRTmvmqVf6cSaAyA46IFyyzmnWp1qrQb4EtRW3YhosTJg5wnYEkfNWmGTdtHJs2jmCsgDcTGEyWLQdLtihziCadUhi7J5UtDNG4aKmun5fXONo3pa7umS5rm4jMptGZ8k6msrpnOq9+uKyT0zM1X9AyMTA9P8RfNG2e7J9cA/kKag4UNeaWt3hKc9uEMpXGoGbW+yWU+SeWUVKq/RPLSZG5WJ9o9+DUyLzWnObJ2iFJ7ZCksk+UWT+eRhsp6pxmSpbNm8fHD2cN1E4GV+yVbdC4fhYy3n1Ew3IeuVoRyLABx6P77VHjaZzXOYQSv71PADu7+nBy/u7o/O3eyTVQRaubx/q1A415D0qn+EozS2pgCLR93AX6pKptQgnuZxQy0BvoAAemF8eES5NSg1C9JtUgEV5oQgqKGg/ZUBtk2Lhws+3AuGw5RBtt7m8PUQO1oqDRG0s24EDtkQjF/tDtCr41FDVgh3X7+b456bN9edJDYejzvIZctzkq1JV0cn3jijGkCEe04sTNxxEf8Abn/Rrr9Qrr+RpHCkqtCkwsccT7Obr7YohUjFeoi08UxjPY1S8aR47A+UQ6eQQ6uJJdyBFQ14olhTrhA4hh6VhylKt/nFdkjqMHBesTjQuI94rM9Ykt9IrMIYRmgJAZQAQYDfC2hmTWQzp2WHYjGNWiCzuiCzviShFGI7lqKKlyAPTj6XVjoNTIbWFnN7HyWjmFHdPFdF5pl6BuWNrAkDYyZE2jcjibdE2q220kKLQxQrbKmHAJgIMh0IJ4HNzxrNlllmQZCFGW1DApNfCU5im5kYtmbSjNPKWZZwMO8eI6ZAKiZjaNeW8JmpNMu6jAHDjRte0T08YRcKWQoGGzS++ZNo5MG0c6897c8pZk0TouWmoflZR1sOksxQB3vrRzqqBlIjilIjq/KaOqt3FgOofWn1M/XN83PTg9z5EZODJDx4R8TKSr6uGL5tfkuk3z1ok9aixbDoETlSxaezjzOU2siLwWWL56R+fDwhtGv5iiztIuXsuYooEhK6HzkquHEisGcppYvVMLGtPu/sk1OhE8TfG00Z+AIJ9gHLDNAnBm+fQ0PgMAAp1fYPqw9639+wa2Z1K/Lt+fXLw7tCXx2Od3wQaaqzCxJMsMgbZnagE2a9Dyi0IGvGEANbrZ6iGeZky4xJGtiOYtUu0GoAZ84K9unYAqx7p3br38hqQNX1/BJmvdTj5j3jw22fjpJVtANNpioTHvaQ+/IGnDx0da8x645h/l9KCJGyhqbOxf2NZt6KxxA6gBZ8N3t18ANT6js4Z9t6sdqfHT9/t9yj1qKPRbbNlKbjPLMywTKXb1CHTE+zu4+b7Beb9xIb3GEv9fRzdnYrCbX3RsSRclpcqNkoz1Dnf1j8d4hToRAt/gSA5uvs5eVEd3v9c4kjMRYjh8sN5hrn4xbv5xWO8wz9AMN/9YJ2IIzi/WNTDJL6EUOuI9w7Oht9UjJJ0cUwgR5JA/HprVSM2oi8htCctpAo0G7E3ikPzxAQgThsCujPpxoEKh7iSvdaqgnVvSxS/t4lf1CesZ0uZROSobp7NU7cw5dG8C4fRQqjYs0CI8qFg/JlwaEy3B8YQjNzJnl21V8its2QoAx5TcyFetwp/8ObNk0SpUr4rn1ySL61LNunJpc06P6ESh3wS+gE8G+N8MkAH36NcONCakr2BueUuqWefNmYYFmo6xWfqEtGFQWNHFbR2V5DaMxhc0hWbUeEfmhGTQMmv6aD3crJq+XraSJV0ZmF7oZquaGeKyjsku1lzDsKiRMVvawakfFMGssb57jib9wIebVGsdEeoK26fiSnuC02s9w7PcKMmkqDxqRl1oVmNcaU9Vn7CLrR7iaxoZ0rxWTnL1UEJ5f1rdaOOITKqxbu5fPCVE7WJy7uPF0S0JihrXdjld9ohwevkeTK6Pphj777GnTp9OHOiwg/jrL98fX7zbO7neObqy7p4/ze/iKc1MyTIk8XSyVG3jyrYJ5f2WzYYdqOF1YHpxXKSfkhtF8xaIYgLfGrgK7w3yNscA8Fb24RpgLIR3Auho4HhiE/sAfNyHxT6K6oGcnmUL4oJ9kB5mH+G1d74NLiGbQf7th8/vb79AhNfHzz8iswboNb7/jGYLo18/06KkWNrkyo2VfcLgtBoMgeLg7ufkEejg5uvg5gtLkFfOnq+xxNdYTwd3X0JIOtoJSozI9ghJcw1IcCaFupAjMZ5BTgSKg5svtDdiPIOc8P74wHhnciTOL5YQmuFMCsV4hboGJnqGZfrGFbsHpUC6n3dMgWd4FiEk3Te+BBqeIV4UGI3QrAYgQWOKOgEy4GACC1egMwA4MhsmQN8FXF1OC7u0i1/SOV3ZK6wdkjQwpC1j8vYJZbvtrQCWEyBEUeX4yIxuiK+xLVB0TMnyhFg/KTVMzi6zpAZoQmHLVliz4EZZmVYYBapVgQqhOcDJJl5clyyuy4Dm0FpVy9uq5W1b8eI2vDNswwUS6Da/soN2F6gN23KtVaAyj4uW6CwlfULWOCjIpvVn0QZovdMFzeMZ1b1hWbXUdFp8cUdGdW8Ora+2b3pasTLIWxziayalhi7WXHUfP716oKZvpqCFWdXDbxuTihfWNabdZcuBfWCH3nK4tLqvWNocEy2VdvHjSnsi89sCkyvdg1Nc/OMDksrjSnuKOqZ7OOoJsb5vaqF+WJrTzAblfnLVUGWvcEpuXNs+RQhRu9HgKctgH7f1bBooylw8oDNsIwyqCkHpUrg9ig49u/pwfv0B/VlgsT+7+gCDBoIae+eQMwCLJLnNIA/OZsjUgIrfDntqY/L+nAKhkONi/bQtwguC/1asdqSGzTSw/jBk2P6QAtEHBrvGvPsKPvOeBm42pmMJzR82o675+1kDPglQlh2FDFi9I2K8qw+Xbz++/fD5w8evtxDhhWjJUd/aMxIvdKtyjxpS7QZbtkIbECeU95Gj8jBeoZAQCSLR1zjvH5zwr7DEH5zwTvgArHe4q1+MZ3i2f2I5kZoCbhRiaJpnSKqTRwCGGAL7FCw5EkuOxJEjXH2jkaqkoGRnUiiWHAVx5L7xJa5+SJyXV2QuISzTMywD0itB1gX+tChbGii0ItmvWkGjkUYbSQNGo2Eiq3Eio348t4WT3cQqaJvKa+UUdU5X9YlogxLaoKRpFOk3aRlXtE0o0RLG9gklsnPlLcLOFcaNkRndhGQZkuAg+48lWebIVjhyI1u2gnrY4FQCNwQyFixC9ZpkcV2qtYKUQ7G0qVremjdsA9OhMe3pzHsAEDAhLxp3oY1RqrGKFywz6tXJ2eVRoY4+Odc6rqjtn8mm9SeVdiSV90TlNkbm1FNTyuKLO+MKWzOq+6ronNpBEa2Xl1jWlVHdX9oyWtg4nFXTn1jSBiNG7YCok6WsHRT1TalhhN46uLRFgSFhgmrDNkdmrB+WpteNxRR1huU0+SWUuvjFeYSkRxW0l3Xzh/makRldD2e+sleY2TCRWNEPktyijukhvmZpdf/g9Mb+mj+/vp8y7GN10OMJihqPzxFXH9B0nwdcBnpOeeZs8mDuePCEN/c8CKAGaOcstlByiA6Qaq0C1SpbujImXIJMjdZxJZxQ2plztncLQoXao8aEWA9tBvZU6L2n+WGhAZKy8TCVx2QHGVoz0ulrX7Vnz48is4bZPqz8Pq8cTWaBAWfjYazGwenNyfm7++C/jwgVihYa/PjTc2zo93ta9EGzgWJpky1daRyRxZf1+sYVuwWlYIhUqDKATMDXLl6vnD1Ar+Hg6u3kGeRMCnMmhXuGZ3lH52PJETjfKHxwindElqtPJM4n0j04BcwmeEqia0ACPjjF1S/WNTAR6xNNCE3Hh6S5UZLIMQX4oCRybCEox0lReV5hmb5xxZSUakpqdWhWQ3hOc3hOMxAZscV0SPeLt7nUQNMFpnhYtQIPmtfKyW2dym/lFHVOQ/ROeY+QNiBuYEgbGDJwxMO7AcQaMGpCpQVkkT/YvAp142L9mGiJJVlmzRpQQnRKbpySr3BtW1hU7iVUr0E3CjJ3LFikWit/zgwEu0K/pbCVLapsXa2QSKw2bCt0G1BGP6tZZ0n0w/zFttHZ6m5uWftEXgMjtqAlvrgjvoQemdcand8ckVWbVEovaGHm1g3n1A0WNI8VtoxX9fD7pubrBoVZtUOReS1lHey0qr5Gxiydqehmq7kKo1RjXd061pr3tg4uUdM9vOEWjbt8pbl+WJpSPQyIEJRGg0KJiLzW/FZO16Sqhz1PG5AU03lZjazkqqG4ku6E8r6c5slOlkq1vL17fHX6BycUgAx77Liy2U8eQQaCDg8ZUPtF7NMQwGcPJg9Q4wZBopPzdwdnNlJj+9S4cbS8fqg17wFq8FWrIALum1qAzxLkhDKh7GSpOu7VgAi70Tu1MCzQsqQGgWrVtinbA9Qw2SWGAouBOAAekhqWnbO17e2pqsIn4RrJ/g0q2TPAcZ8J+DQKECnTecCGnqi7K/7TS+oLh9qKiZV1JPjvw/Uj1Pj67YtdYuijKvk/RA2pxjou1reOK9NoIz6xhc7ekRivUPDIOxGCnAgUJ7z/D07Q5Orn5EFxcPdzcPV2cPN1xAe4Bibh/OKcSWEQBeriF+tKSXLxifIISoKbs3ekq1+se2C8W1AyzjeGFIUkOPgllBKCkvwTy0DC7JdQ6h2RBbKu4PRaMKdBKxLIxsHVmlw1BEuT5OqhzIaJtLrRNNpIeu1oZv14dvNkNhImPJXfxi3s4Fb0zpT3CKr7xTWDkrphadOIrGVM3jymaGciLFc3W90/vdjNVvdNzaOogQwaQt24WA9TBgwabNkKV26EEYOnNLNlK1yFiSMzcBVGvmoVBOY8pRkssOIFCzjopVqraH5NOI8sVoAfhT9Vy9uKpS25bkOmtYoWLPw5M1dhHOJrWkYk5R2Thc1jyeXdmbSh2ML2wORyv4QS35j86PzmyLyWhJLO8OyGwOSKsExaQEJJYHJFUGp1dGF7QnFHbGFbYklnTS+vtl+QXNGb1zRe3Stom1COCnUjQp1QvaY2bOvMe+COM22emGyooTHtzS6u01mq9NrR6MKOhPK+mCI6JaWaGJEdltOU1cgs7eKX0Hm5zZNl3YJSOi+tdjS2tDuutCe9bqx+WCpesGwAtXH1AcKvz68/2NYon9BdBnpwQInSx2eTy/dwhZ/arUjs87vsx41nS5XgR9ujBsqSwPYEdq4oqaEx7ynRKgOpYViAxAu3jimaR+XtzDmADJQWBb8SfVLVx12kJKl0AAAgAElEQVQYmdGxZSt81apct6la3tbY6Crz1ol91smD3JMHkHFqnh361+eFoXmlM1sIWNiwQ2ve15r3kNRy8+PwYfvgWOvu+eb+2Qqv6/9+GePfbLr47befvny+PL9BFyiwdr21NSd9/vrty4/ffrSRGo+ihu1B5B41hPMWOktV2iXIbmJFFbQTI3IwpHBHQhCyQMF5O7r7OyIhwwEO7n5vXMmvsZ6OeH9nUiiemobxjoRkUCw5EusdjvONwgclE6ipBGoqFDI5k8IhARBPTSOEZhBCM/Ah6X4JZV4R2RCNDWn65MicwJQqSkp1WE6TTZTRGVPUCdwnCLqSq4cQGahNnZFGG8lqZOW2sHNsq5O8Vg5EdVX0InrQmn5RA0PayJA2MKTNo3JYp3Uw5zqYSnSLNsRbHOZroEQLbszZZZZkeVysZ8tWQLIxJTdOK81chYkjN4JalC01QMsBoAb/wRdm4fyaeMEiUJlF82uwl5XpNmZUq0L1Km/OJFmwQAnTtNI8JtQN8TW9HHXLqLSgeTynYTSlsi86r4maVklNryZH5QYmV0Cusn9iqUdQondUblxRe2RuY3pFR2x+U1ZVd3HreER2Q3JZV2X3dG7DSHJZV/2QeIi/2MNRs6WGPq5aMGcybhzNLW+hRCCct4GOhSa3UeE9tRFTRI/IbfFPLKNm1sNhMKG8r6iD286caxqV5zRPxpZ0xxR3JVcPV/WJgNo4tTtEoCHA9pQkynGgC9H7EQNdpv6hOuMDnETQQ8ejOQX9cY9EHOj2BEWN9d17UmNhZVeu3RDNW6aVZgglB6UGEOcAFh12kg2U4Bi0LVBmVKvI2tW8B2yReevEPkIFPaes28AC+XP7dIUDRrXwHxosX+7u7n67lhciRpsqxT7gBTCjOlAJ2vUq6cz7wEktW+4TZFdtSU6b+6crG9eff737/ZefLs+v0bXrxc09asAC5TOMGz8+qJJ/kBhqi9t4kFHOka00MKSxxfTI/LaogvbwnGbf+GKMV5ijB8XBzdfB1fs1lvjaxesVFpF7vnElv8J6OuIDvCJy8NQ0J2KIo0eAs3cEeKvdA+MxhEBodXX2iXYNTHINTHQPSoHiP7egFAgr940vIYVnUVJrSFF5fgklAckVvrEFsOoDDSjE7cAYnFDeh5CglYPJVUOZDRNptJGMhonMBiZkjhd38iBHI79tKrd5sphu8570CGkDkrrh2UaGtHlM3jwq72DOwRqlZUwOEi+UD2cItMM2sQYIyVkSZGMyIdajPhSOzDAlN07JVtAFyox6DcACulGAHOWrVgFEeHNmaJ9nSw0MgZarNAnVa1U9PNbsMmt2eVysH+Qtto3Ly+lTmdV9iaUdyZX94TlNgQnF/rH5xLAM76icwMQSn5h8j+BkfFAyISjBPSCemkELSS6OzKlPq+pvH5dV9vBiC5qre6Y7JhS0fkFe41jbuKKfO9/NnmNLDf3Ti+NiPZhcgY6F9/Ha9gkovkDstGjcZc0aaAPi9LqxuJJuSHJGswii8ttSqodbxhVMyfKIUAfgElNET6ocLO+ZYUqWDeuHkGF7dvXhbI3v+w/UFy+p/2uqchu5et/vyvv+9SX1xcuwfy3X7R+vTw4LeoaEzKWz85vb80NjHSXmmY/cf+4RXdxHCt/jiIXv9eSb/7Zs6fjqw8WzT/UPRfminf3Tm92DhfR/or54Sf3POQq99Ui/djCvl0T+N+qLl9Q/xU0xhEsDXFFuZPp/eCIA/5dMLsBHp626cWB6cUy0xJnlhv436ouX1P8tTTxv2jNu7M+2lbx4SX3xMimVu2fZOVmeHXH/r89ME/977pxx83jF5o6l6d/uWQ8WjTuy3ipADTC8xv3jk8f+17yksRXd2q6opfjJ0yalTO1adk4McnaYw6MAsXK6+frsfFdYVfynx4+K9J04ug/+Q3wovzyb6HWPGmzpCm1AElfa4xNX7B1TQEmpDkyuJIRlYn2inTwor7DEH5w9XjkTfsDgX2E9IbL8Bye8g5uve1CyZ1ime1Cye0C8W0ACzjcGH5SMJUc6eYU5k6OcyVHOPtEAGeAuAVerKyXJPTjVOzqfGJ7ll1BGisoLTKnyic4LSqsJTK6EjQkqGE+s6Ifk8aTKQXCawMYko348s3Eip3kyv22qqHO6tEtQ1M4tbOcWd06X0HmlXfzKXlFVv7iyV1jVJwR7a/OoHMAC6k7gA8S+qhMggwEOFNEScjyZRYShMHpw5EaAD67ChLChSjN/zgRb2Bn1Gn/OzFOaETWHwsSSLA/xNZOzy6ABGRfrR4W6qi4OnaXsmlS1js6Wdk6lVvbGFnWkVvUnlXYGJhT7JZSQo3K9o3Lw1FRCSBoxNB1HjiCFpnoGJbr7xxKpyZHZdZGZlWVt4xm0wfSaoUzaQGZ1TwtD3D4mpfXPtI7JBnka1uzywPTCjGqVNbvMkujFC+uSRWQ1aM/Sbe5f2LxwR7rVfdG8pWlUntnIhHLcoLSayPy2xIqB2GJ6UuVgRc/MpNQg1Vp5SnMjQ5ZQMRBT1JlUOVBC5zME2qXV/aPzt7Zr+1SQk/DiJfXFX9r5h+8vbm4vbo5YafEvXlJf/KVTfvv9dmOGDO/X8f3Lm+v5lqeJ4eCeYCx//XrxUPd1cXN7bpnxfcZjsnpzc73Qmv/8U+GZ6uObnf1FW5+7cWf9UGvem9dLU+Ge+qVF8VJfZ/M/PvPwKMr4Coel6mSpgBDt4cwP8TTjYv3ULD8FEXEZdiwHhvU9WXclctkvnK1vLZU8H/9H/fsG4+HOqQH11KuPdKa9ReMWv73CHjWeN6HgmfKtfZtvzf6WVrNwZt1aKsU+/aE05u77E+34c0a7KAr3/Jfv357CxL+HGly5sXFElkobCcmsdwtK8QjNcA9OwfpEu/jFOfvEYEjhjh6BDu5+Du5+jm4+DmCix3o6EYI8QtJdfKKwpFA3vyiP4GR8UJKLb7QzKczFOxzrE431icb6xrr4xbkFpYDikxCaQYzIQaO6yDEFAckVvnHFlJRKv/jiwORKYDQgBzTOpv6E8RggI6V6OI02ktnIzGyYyGliFrRzs5smC9u5kCFc3i0o6xaUd8+U0HnV/WKwt0JrQSMD6S5ot31idNiS/hCTK18zOL04xEf0XaDXAFKDZVugwOpkctbAVZi4ciNTop+SG/nAhs6ZppVmABGuwgQAMSk19HDUA9ML7RMK+qSqd2q+g6ns4y4kldHprLmqXkFSeU9cMT2uhJ5a0R2cVOwVkU2OzsdTkgjUFDf/OL/4IgI1hRAYS/CPcvIIwBAC3f2ivMMzyZFZvtE5UXlNCUVtwamVtF5uP3ehpH2ynD7VMS5lzRqYEv3IjG5aaZqQ6IEu4chX5LrNOf0mqAmg2BEUx9bdcxAOGNYP5/RbA9OL2U0sOI+EZjWEZjXElfbEFtMLWjljwiXYLyqWNof42uxGZmwxPbFioKhzum9qQWPaPTi9QY8nl+Ypp5fUFy/DHemWs5vbi31l3D9QX7yk/jlv6e2XTxfrcNlHUThHN9cXorI/yq1jLH/9ev6Q0bi4uT2/+fzl17u7SwUFedNf3t3d3f3+y4e3F+JKxCreu/3l7u7u7ouFBo7V/z6kunprjxq71kONaU+9JEUU3/VLC2JdT2Pj//GS+kxG3pdjlt0KFvxKE2I9VypAUWN7bd+4sS/rskONTXX2H2YRGg+2jm2o8fT2KJLH+te7u7svu72IM43G3Dwz7N5+exqA+OX9xrYassL+nKf/ZOc1+eXLx2NZ7989++rufv/l+8Nu1//ffI1BnqamX5RWOxqUVuMWlOLsG+tICHJwJTu4+Ti4+WGIIU6kcMi5x3iFYrxC3+C8X7t4YYhUPDXNLTDRzSfc2SvULTDRLSjZmRTm4hvr4hsD34khR2H94vEh6YSwLO/ofO/ofGJkjndULik6nxxTCOpD/8RSr7CMgKQK/8QymIqhQg2CM2DKSKONAF5k1I1lNbIgcSevhV3QNpXXOlXaLSih80q7BKVdgoremcremYremYremep+Uc2gpLpf1Dwqbx6VN43Im0flNipUCZ2d/VzEsdbPXQBO1B41wHjClq6AuIsjM7KlK1yliaswcWRGjgxk5kCLrnDlK2zpCmvWMDKjnZAs93MX2icUXWx124SyZVQ+ML1Y3D7ZOi7PoA1m148UtLCi8priizuD0qopaTX+CSUewSluAQnE8ExiWIZ/Yhk5MsvB3e8NjuTmG+XuH0sIjA1NKiRHZpKjcmIKWlLLO9Oq+ivo7JaR2eoeXlnnVMeEvH9KBXrQfq4aDlmzmnW21MCaNdhY2E1IyoftIEQNAjUIaeaLxl22dKWiW5BYORBf1huR2xKa1RBd1Jlaw6Cz5sSL60gk6soOV2Gq6RcllPclVvTntXJ6OPNqw/b+yTVKgl5cWds9wl+8pL7wYOsuruaREaCod+fHT+8/3qMG++j66lyIZEAwDN++XV++P7s6F9nuAdSwbzNAsePSKkSf5AZBqwtxFRKTqfv89fL69uLmSl6L3DN//XZ7b+F+1rAcaEx7c9rZFBtqzIt0vU3NfwvX1bRxaMK2fLWpNton7kdUWLvyZIJUu1nDuLE/S79HjY0tNOxv9eL4fG37dG1DZbvHeLB1vPw/ixqW66ND3eoGIz8FwYjjdxaILEed8hu2vNhNdR6CGprd44vN/Qtk7Xrx7ljaY0ONdz99+RHtkf/840Nh6JNxA2U67lGDNbtc0MaJLuwISK5woyRDjesbHAnEXW9wJEd3fycPihMxxMkrzIkQ/MbF640r2dEj0MUvFuefgCFSXQPicf7xOL84Z3Kkg7ufo7s/6DUwXqFYvzj34FQodvZPLINKFK/IHHJsoX9iuX9ieWByRXB6Lai5ogs7YorpqPQzqXIQpJ9ptaNZDRM5zZNZjSwIzshunixo5xZ2cIs6uJCdUdE7U94tqO4XV/YJaQPimgEJbUBSPyxtGJ6lDc42jcrBHd/IkHYw56Czs9dW9oucU7gL/dOLjBkdwxZKDlmhtrWrcVykh3smpQaOfAUU5bZlCoIvqMuezpqj9Qtr+mfqhyTtTGVpBzuvaSKxtIuaXlPYyorKbfCJK4TJghiWgfOLIQQluvrFuPlF4XwinL1CMB4BzqRQz+AkZ0IghkAhh2dQkkqSyrpy6oYzavrzGxiV3Vw6S9HJVPRyVHTW3KhQx58zc2QrMGhwFUbJgmVGvSbVWqXajVnNuly7AcXFoEQCNhT0PyhLp1vdF6rXmkbkGfXjEN0MAUi0ATFXYQKhGvD5Uq21f3oxq2EiqXIgr5VDZ6vnV3b2Tq7Rhejl29tDScefX1JfvMwpVyzUQeAFYXrzx6+Xb/8QNZa/fDm/+nB2eSZ8iBpnD28I67lmP7DAz71HjcX3H8+uPpxdnYsqbbE0VzePUGPRuKvQ3KOGekbT3dnzNMX7PzjXZHTJ2ibmYFDtmlT3cxcYAu2k1CBQzCAHnAbDzvrhI9RY31TbMMJ0uHv2x6iRRlv58e7u7u5+dngm/k+3ah3ITEZRY33tQL+2a582jJjWtle7H5vlIz37Nk4u3p3qJp5mefwpZEx58Pnrkx55e0MKKhK9Rw2VfmtctJRaMxSURvMMh95GioMr+bWL12us1yss8bWLF9Q+O7j5QucrcKJY31icb4yTZzCWHIULSHQhRzkRgqBsCXaxrv5IYRdk+fknlkPaOPijoBceDs8xRZ0xRfTEin64JZT3AV5AFGhmw0ROMzurYSK7eTKnhQ1+1vIeARxJYLgo75mpGZRU9gprByXV/SKkhHF4FhyujSOyplF544i8cUTWPCq3iYLVMG5AflcfdwGOKojQa0Y3LtJPiPWIh02iZ0qWWbPLY8IlFoodMiNwHxyZkSXRw1l3iK/pZM2V06cLW1nF7ZzaAVF8WU9GdV9wWk1kXnNMQUtYdmNiKR3rHUYMSydH5+FIIU4eFAyR6u4f4x2e4eoTiSFQnInBLuQIfGACjhRMjsyKL27Pb2Zm1A5n1Q5l0/rgbDUyo2UItO1M5aTUwJo1DHDnx8X6aYWRKdHPqNfkuk1QpkKyqUK3qTYgElWk53HrZGP/AlRPoEEybhwpljYHeZq8Vk5S5WBUYUd0YUdqzTCdpZpRrcp1m0r9lkK3Ob+yozZsT8mNNQPiVNpIXiuna1KFoIb9RuNwIe0v1BcvqX/jkvovyEfc+58+fbq4ubVHjaur8xk7jDi7fH92efZg1gA3rV23K4weD445yALlAsWIZ1Fjc2ch1w411IZt+SKKGjqVQNPNWWA9E5ZB/U/ho412OtE+7sKIUMeRrQgUM2nIE67sWg+NG/vSP0KNnVPz1snahirH9gvsbR7dZwWqDoHX4LU94DUSHswa1oGse9Swrh8+njW2Tiw7Zxs75vawR6gRRWEfXl2+P7/clz336v4mV3tt1yOPEKLfnrndo4becqjQb7VPKAJTqsgxhbiABCw5EkMKd3D3feNCeuNCgtXJK1uHI+CCIz4AF5CAIYU5uPng/OJwAYkYUpiLTzTGM9jJgwInFBe/OJx/PCH0Xr4Vlt1ISakOz2mOLekKSCqPKaLHl/XCfsSe9QQrWlbjRE4LO6eZndvCyWvl5LdzizqnC9qmyrsFpd2C8h6QY4hqhyTV/SLaoKRuSNLAkNEGxY0MaQNDhkpCaYPiljFFO1MJG3hgNFCxRicSF4rABzCjIzZOFHGvSQ02yNBB6AY4X8fFeqZEPy7Wj4uWJsR6hkA7ML3YOiqr7OZVdPPzmiey64ZTqgepaVWRuY3hWXWUhMKEsm5KUqmzZ5BXSCqekoQhBDoTqRhCoLt/tAuR4uQRgCUGu/vH4AMTcOSIwLj8jOr+jPrxzIbxnCZmfgurqm+mkSGFBVD/9GL/9MKwQDMs0AwLtBz5CmvWwJEZRPMWyYIFhGdoQKFctynXbc4uriuWNtEdISQSIwmDu+ercEiRrVT0zsC4F1fak1E/3jahnBAv8ZRmgepePS1ZtPZOLeS3TeU0s+ls9aJx9+D05qF04q2ht+j+3fmXTvn7r9cAKxY71EAni79U9axdAWoIS1PsZ41TO5U6uny1oQb1z1HitSsENZBZ4y9VnSvn59e3ZweaPOfwp6jx5xjRonlfbdjmM/td/8GGGvxFOmuBpb/+iAZUoBl54QIBHzHOd02q+6cXR4VLbNmKUCkE1HiBG+QZDp7yGsiPC+cozcdr26fm9XvU2N860bO7kPi/jiWlaW/RuNqbk2mHGrOPZo3BrMezhi03NDaYYTHB2nULIVMeRHL89ccrKJH/+NP3X59JADz75YH35NGs8QyvYdo4Wlrd56tWcxrHgtJqfOKK3CjJ7sGpLj7RDq4+ju5+b3AkKItGa1/fuJAwXqGugUnOpDAnAsUtKMXFLx5DDHEhRzri/R0JQRgiFUOkot1rvnHFUFAentMcmdcalFaTUsPwjS9OqR4CB1oabSSlhgErEsTtXj+e18rJb+XkNLEyG5kldF5R53RpF7+oc7qsZ6a8W1AzIK7uF9X0i2iD4rohCW1QXDc02zgia4J0v1F524QSvCeNDBloydsmlLBJQSMSOphzncy5fu5CH3cBzin9UGjA1/RNzds7X5mSZZQiZUn0ExKE6WBJDSyJvoM5xxBoB3majgll86i0rJOTVT+aWTscklnnn1jqG1+cVNHnHZpKSSolBie6+UY4E4O9IzLd/aMJ1BR33wjf6BzPwFhCUCLeP4YUlkYKTQvPouXUj6ZUDSRVDqTXjeW1cnKbWSV0XkW3oHZIQp9UdbHV/dOLwwLtmFDHEGiZs8tchYmnNPHmzHzVKtQ7Ieb9xXU01hQOKaiKcXXrxD5JzLJzprccihcsPZz5tNrRxIr+pMqB5Orh8p6Ztok5MIazZSuieYtyaVOxtMmaNdQOivPbpno484vG3cPTm0cyzXMjxwlBjXCngYNvXz4jAoo1+xPKlbr5DxYfKK9xfb95RXVf5/tzSfYRWxS+6fp6obPw+acicE3XN5u7Bpr7H8X5rar4ix3d7f/y3MP/nKdemFW1jSs7mHP0SdXA9OKEWM9VmERzIgQ1nhITC2eWjaU/+HHIrGGQjP7PxP8hqGF+ekLZUzKa7AIQI9w7zBvb83nP/ErlXas3F+t87+dfnf7jX3951ib/6MByjxpguZtf2WHNLhe1sbMaxqnptTi/OGdylJNnMDhfX7t4vXYhvsF5v3HxcnT3f+3i5YgPANbTmUh1pSThAhKx5Cg3/1hwr4FTHkMKh4pWckxhYEpVcDotMq81rqQ7Mr8turDDL6Eko3Ykq2Eiq5GZUjOc3TyZRmNAJ2tmIzOvlZPXws5tnsxv5RS2c/NaOdBmUtzJq+ydKaHzyrsFlX3C2kExkBeg42pkSFvH5AAWzWPyBoYUvm4dk7eMK9onlCAWhmNLO1PZyZprGpWD3AssBj0cNYAIOnSMi/VAc8DoAcMF0i8/u8yRrYzM6MDz1sOZ72bPFbQwSzunsusYoRm08OxG37iisOwG7/AM/5jcgPgiYkgajhzmF5NLCErwjcnDkkJcvEO9QtPcA+Nx3uGUhOKYgrbEin4YwVJqGGm1Ixl1Y9mNzPxWdmEbp6J3prJPCC+2aUTWzlR2MJVdbDXoTSDolCnRT0oNIHUXqFbFi+uieYt43iLVWhVLmwr91qJxd2ntYNlyaNw4smyfosGim/sXq1sn8ys7bNlKdb8olTaSUN4XW9qd1cis7BU2jsrpkyqGQMuWrcxqrHPLWzOqVXCm9HDmtav7R+dvLx7Lug5Gw6PgMujd/vLOJsF6gBqX78/2V9vDn82tu+c17N2utkXsux0t8z6bL0K28+H2/Mz65FQPK5VPHy+vNvfPrYbpP4jzu5RMzbd397s+/TVwPfKLt1qBCh1Uh/gapmSZpzSL1aL0P0aN9Z2zZ3/cPWpYDzTPxP9lZXAPPry70K08ZEOfQY0DvXVH2WwXgDi5t797alQxn/xQGnP/9mpDQH721V3+8tsvP9ufUB5Axvf7ex6gBize1IZtrsLUMiZvZEiDUiqdCEFOXqEYUrgTIRgKoh3cfF9jvRzxAU4EiiMhCEMMAaIUF5jo5BXq6O6P842Gw4sTMcSJGILxjsJT00hReX7xJVBNANqtmCJ6bElXWE5TZt0o4jRrYec2szJqRwraOAXt3KxGZn4rO6+Vk9symdnIzGlhF7RzIWUHbKwVvcJS+nRF70zNgLiBIa0bltYNScBd0j6hhHGjgSFtHJGjmRotY4rWcUXbuBI40UaGrJ051zwqrx+ebWDI6oZmm0ZkQHZAKTR452GrAkeAcdESAMSYUDcu0o0Jl0aFS2hWYBdb3c+dr+jhZ9QOV3TzUip6Eku7KCmVYdmNXhHZeEpSZF4zMSSVEJTgERjnG1sQnFGLI4UEJxQQQ9Pc/WPxAXER2XXxpT1xpT2oSS+5eiixoj+pchBNEgFszWvlpNeOFHVM57dxSui8yt6ZuqHZljF516RqABlAlsbFyGKYP2cWqFb5qlXUSgfCDWA3HnUIW3bOli2HwnlL16SqoH0qobwvprgrpYaR18qp7BU1MGTtzLkhvmZKbgRv3rhY3zKu6OMu6NcOUNSwk3Vv94dEvXhJfUGY3vz6BXWmnl19+gzT819/ugK/yftvz0TT3d39/u3LUzYUCI6zqw/nH378hs7bd79+/nB7dvXx3TPZf7//8vXj7sGldfd8be/t2+fC//Z0y12T6g6m0fT5Sdjf3c+XZkPbmAI8KbBAQVEj7elxAJ7yy3vL9una3tv3Pz+XyPf7j4ebR8uWI9Php58e//3vf/36wWrZ15h2dUdfIVzj/dGhzryvW7v+AN/8/XYNkZMfbZx9vQ8Q/Pnzwf7F5snt58cxgL//9eun63cfb789fXV3v//212+27D9UtWHPbjxzQoH4MAggUyxtcuQrbRPKks5pj8B4J49AJ0IwyC6gLcXBzeeNq4+TV6gzKRxDDHHE+zsRQ3ABCU6ewY4eFKxXyBuc92ss8Y2rzxtXHwwpwp2aRo4p8I0vQbUY4HOPKeqkpFZlNYznNk8Wd07nt3FyW9jFnbzsxoncJmZBGye3mZXbNFHYxslr5WTUjRV1cAva2LnNkyDiKqHzaockNf2iyt4Z2qC4qk/UOCKrG5ptGpVDmHAjQ9bAkIKsq2VMAdjRbtulwVTSMiZvGpHVD88CZNisSnOoqw36DYYFGsgEHBHqhmw4MsTXjMxoB6YXh/jaUeHSsEDTyJA2DEvKu3gl7eycxrHo/KZ0GoOSVBKaVe8RnEJJKvWLK/CkJgclFJKjcgPiC30iMnDkCEJgnH9cYVhWfUJ5f3xZL5huYorokMMeXdgRld8GcURh2Y2hWfXUzDq/2IKg1KrA5HJqBi0gqSwotYqaURuR2xyZ25RQ1lPUzqnuF3WyVABnHBmSqC5Qrc5qrDKtVWnzdOvXDvRr+6tb/x9j7/mVaJ5FC/9pM11VghkFCZIRBSQnQTFnMSDmnDDnjAFRFHNAzJapDGV1pU7T0z09d90P98Ph+fGA9rzvWqxall1dditsztlnB/8JFh7ei4flnYve2e2SdrvROqQq6tSV9RqtQxm143lN0xW2hfohV+/s9uzqkWPrbGL50Da92W/f3jv98PDpe5ANxI8aoqXbX3BRF7jH46fvKEAQ73ZFH6BPBshDv/7yMdACi8Tp+Knk6cefHj59h9Q/EKccYVbXdc/V8s7F7NrxuNPTb9/pntlqGV2DObS6f7lmYLkG+7W2f7kOC1iAs2vPzNbwwt7M6pFjfT4FY0NvLu4Pcdl/SFQOD6j49l48QHgXCMD3sMxnLEXhCvPFYw/vDQRHg6j8lXANzO2K/HLIJg/dWjePX+58vrVffvz26/dffkd9a0GN0CAJDcCLv/7Pn3/XbOALFDu63T66XTu4mnOftE2s68v72OpCQiwvJJpJiOWFx8vCWYoonjackUyI4XYQkYAAACAASURBVEawVTECfThdRIjlvYuOD2fKwOcWGpfwNjzun6ExEM9BpImxA0oBpHKJM+tUxZ1pVcO6st6U8h59aXdW3Xh+83Rh62xZ50J69YipalBf2i3NbdKX9+rLug2W/pSyHk1xp7a4PaN6KK9xMrt+PLdpKrtuNLN2NLdhorBlurB1Jq9pqqBlxtwxX2FbLLctlHUtVNgWyzrnK2yLld2LFbYFGD2q+pxVfc6yroXKnqWilhn4pLljrrxroXZgBa/+aht3Q6185+RGx+RG1+RG9/RW7+y2bWrTNuV7M++Y3LBNbzaPrNYOLLeMrlp7HBbbQnrVQGWPw1jenaAv0RS28FS5QkO5IMUs0BayFNkcVV6CsVyZ10BO0MVLM7g6syzH5+hNzm4QZ9YlmaoFRovAUMHRFDGVeQxpJjlBH8VRMRV58fKcBEOZPKdemVuvyK2XZFSXtU2XdcxUdNlr+5aK22YsXfMmS1+SqUqUXp1eM1LZ4+iYWB+c3wWHFcQjO7cvVnYuQFoOWYRgeUI5ceAH3Ty8GXUcVPc5s+rHkZ8YlsfcxqmK7sXWMfeo42Bx82xm9WhoYW906WD/9AN+1sDsre87MdS4+eW3AC/8jz8BIqBgjgDIwD7zhPO/BuwpX4IDRF86YlESD0INZJD3hZhsX8yuHY8uHfTZtyH1r6bfCU+Smv7l6j5nzcBy7cAyvNPAB03Dqx0T670zW6OOg9kA1PDcnN8DKOBfwMg1j/Di8PweoQZKRULWeJzP9RocrpuYO3776BYMrzsINY7v9nAeeRQXCjb50+vnV4P/fgbUwAyvAdl/AWeU/4Ppyl/reUWxpQB7q3vvRxz7+rKeOLGJQBGA/oIQwyHSxNF8XWyiMYqriRboKSJTOC0phMR6E0GLZCtCon2xgG/CyD+Exr6LpL+LpIfSRFE8LTS28lPKEk1V0pxGVVGnwTKQWjmQXT9hqhrKbZwyd8wVts7mNoynVvYby3sUec2qwjZpToPObBNn1iZn16da+lW+TI0uTUmXvrzXZB0wVPRlVA9mVA+bqoYMlv7cxomchgmQhBa1zZo75kHHUWFbKO9aMLfPmTvmStrtIBjNrB3Nrh+vsC0Utc1m1o5W2BzWHkeFbbG632ntWbL2OHwex5HVhiFX88hqx+QGSEjhRtszswXF0fVDKxVd83mNE0Wt09V9jrL2WW1xe0HTpDKv0VDaZTC3UwQaZV6j0FAuzqiWZlaJ0qvFGdXx0kyhsQKUr4r8VkhdTzBaWMo8skAbxZJHMuXRbAWJp6WI0kh8HYmvpSVnxPA1sUIDRaCJZiVHs5JZ8ix5ToMkozqrelBV0Nw0sto54e6d3e6c3ChoHONoig0VvSXts23jbohWB+e+c9vXtwAJlyhCJqBg4eZ5++h2evWoaWQ1v3naVDOaUTuWVjUCoQSm6tGClpnqPieUNs6vn4wteSaWPfvYrBGIGr98/QP2hf/7r5/8R9MnnLf15ZTxPz4fkL7x2gNvooffPn76fvfxKxA3kPqHYjUA9VBWKGSvINQA4KgdWKkZWK6DXwdXmoZX28bdvfbtUceBfe3YuX19+cv/RRvHIS7v9wSr14Q+cC/2OMQyCiC/C80a64G+eB9kYB9DEg/yvOLzNfBJpb6SPV9m9fP7Dz/ePn758DHQt4bzyINv7WViKPrYP30EX16x/4It782G59q1ezm9elTUOhMvzyVQEghxQgIlgUDmhzGkkRxVvCKPIjJRRCa6NCuMKQ+Jjg+JZoYz5SHRzLeRdEIMF260byOobyOoBIogkqOmSbMgBBQkQ6qiTmPlYKp1MLt+vKhlCvzs+U2TpqpBTXGHJKteltvI1RbHiU1MZT7ka4jSqxPTqrg6c3JOo7KwLTm7QZJVrzPbNCVdsrzmlIp+XWm3urgzvWYsvXpEa7Zl1IymWvoNloGs+nHQiZa0z+U1T5e0zepLuzNrR9JrRlOtQwUtM4bynqLW2ZKO+fymKVPVUAmOaKwbXIHnEMgBYbvpmtrs9Jnr1y3djoYhV17jRH7TZH7TRHnXQn7DSGHzVE7DeEqZzVBqk+fUqwuapdn1spx6fWkXX1esKmg1VPQbLQPa0h51caeysF2W15yQWklJ0IVSE0PjhBFsZTRfR+JrSQJ9GDUxhqcmxiW8i6SHUvghJBYxhk2M5b6Lin8XxQinJxFiOOF0EVdbQuGrkjJqDBV92XWjFtu8ud2uN3dydSWKgjZzx1zHhHtoYXdy+XDOfQKqjXXP9Q7eXo1dUtCe4r14cG6dd89sVdgWM2rHM+vG06pGNCU2cABl1o2X2xY6JzemVrzzcOJ1nwBq4IO5XsbtBAUII1wIiDh/iRr49HNcTk9QaOjLWQP+9fuP324fv+BjNXZPPmwe3qzuvV/cPJtePRpx7PfMbIHV1TdiwK+AHQPLtQO+QaN+cAVOV4Pzu2NOz5zbH+GFvpmwmPjGDUx0i2VK+2DFg0LJfUGh1+uea2jbQiZX/Kriywr13vrXAq/fIw/SGy82a5xiAWJQ3Hf38evDp+/ABH356TcUF4qAAxU1YltJAJ3hx5GXqLF34vPqQ7b60ta5bXpLkdcEfZ++5r64xHCWgpyYytWa4SwSzlK8jaARYjjhjGTogn0XxXgTSv4ngfQmgvomghpC5kdyNbTkTF+xs6lKmtOkKbGlWodSyvuy6sYs3YvlnfPVvUtpll55bhNXW8RRZHNVOSAYZaoKePpSnqaAIUkTpJRxtcWwxjOVeVxtsSSrTmAoF6ZawPAmz29Jzq6X5jSqi7tg5teW9mhKuhQFbYaK/tTKweyGyYzaMX15n7q4I71mJKWiP69pOjHVklEzmlU3mtMwnlo5YKoaSrX0ZVQNgLm+rGuhpN1e0+8s7ZyrHXBCLnHzyFrd4EpZ10JV71LdwHJO3Uh+40R513xJ22yFbaG4ZTKlrDu7diSrdkSeUyvLrlMVtJoq+4zl3Tn1YzkN4xk1o0brkLq4S57fKs6opQi0RIoglJEczlLEJBhiElLCaEnhdBExhh0SzQyJZhJjOWFxCdEsGYktjWYmh5I5IdGMUDKPzFfF8lQ0oTaUzCXEcqM5KpJAl2AoM5TZ0qtHcupGSjvspe32+qGV1jE3OP3xQXW7x7e7x3eH2BPd30d//Xx+83xy9dF9cDW0sNc0slrYOpNVPwFZoVCLmVE7Xm5bbB1zT614FzfP5twnjs0zz9n9I27WeMa1CgSIwYO2j9fQ4elV7MBmE5SXEUBzvIYavliNj99uMNQ4fv+0f/ph9+TDhud6eedifv1kasU7MLfTNbXZOuauH1wB/gs9/BzHwHLtwApERnZObgzM704sH6LvJ7yCPJhH/vjy8RgjNdB6coRtJQAfKL8LtpL1FxFeW7i4ULShwMc7uCXFhxoXD0eXT3jUQFXBEBf68fPPP37DhfG8muKFQ42ACqX/YqtKEGrA10YP6Mio7ltiqQoIFAEhlkeI4RBieUQyP5KtYshy2OoimjSLnGgMiWYSyAICJeFNeNwPYZS3EbQfiDFvoIk+kkEg8yLYShCGCgwViaYqWW6TxmwzWAYKmqdzGsZr+p21A8u6ohZFTh1XU8BW5kqy6gTGCrYiJ5qroopSo9mKeGkmS5ZBEWioIiNVlEZONLJUBWx5Fl2cFpeYQpekM+Q5bE0RU5nH05uFqZVQ58HRliSZqsBHm5hWmZhWKcttluY06cp64dArz2/hqPOTTFXS3CZ42zdU9KdVDec2TuY1TmbVjec1TeU1TuY3TRW1TDePrlX3OVvH1sq75su7Fqw9jsruxarepfyGscLmKXPbjMU21zDkKu9asNjmCpomrD2L8sxKS9ec0Fhe0j5bO7Bi7pjLbRjPrB1Nqx7Rl/cpC9sFKaWhcQIiNSmCrSIJ9HHidIrIFMVRvYukh5BYBBKLGCeMiJdG83URLEU0X8tPKZXl1AsMFUx5dgRdpC3pqOpZzKzo0BXUR8WLQsk8aL0KieHEcJU8nVmSUZNe2ZtbP1ZhW2gaXh1bOljcPANGY/PwBs6uwN55Lx9RdwbAx9n1897Jh+kVr216s6rPWdQ6m9s4ZbAMQKpzdv1EhW2xbdw9uXwIVZWOrXPP+T1+Q3k5aLwKCh8DR4zHF1MGHizwu8lTINPx6geI1ICuXESF7mBUqN19Mrbk6Z3d7pjcaBxerYX7Wp+P2qjCZg0sWmEZ2jD8Z9f1E9fu5brnCp+LAw98Mih8hz3nDzBlHJ7fe84f8AUowIOue64CeQ1/3h/MF4jUQBMHChmGtegMl+UBqHF173OgQIjRt5//9f2X3xFq/Pb7n6hHHn8r8QtDAweNANRANxT0gODmgfldZX4LkSJ4h1ld30bQQ0jscKacrS6Kl+dCJA+RKgIhOYrheBtBe+srhY4Pi5dSJRlsTRGE+snymjUlNoNlILNurLRzrrRjTlvUJtCX0EXGeEUuXWKKS0yJoAljE/RUsYkmMkazFeQEHSXRQOJrI9mKCIYkVqClJOhoyZkkvjY2ISUiPjmKJQujJcXw1HGitGiWPJqjoopNFFEaiaeOYski4qUxfG0MT02XpFNFaQAiysI2UXqN0FjG1xXDjTM5u95Q3gs3nVRLvySjSlXYqi/vNVr6IUDQ2rtU2DJt7XFYex1AfBQ0T1i7FwqbJy22+cLmyaaR1Zo+Z8uYu6bfWdI+U9E5W945l1c/UtphL+9aKG6bzamfSKse0Zf1yvKa+XozkcwLZUgjOGpyUhpdmh0nTg+ji6CDhhDDjWTKSQJ9aJyQSBGExgnIwhRdqU2SbuVqS0h8LZHMM5Z1TywfDi3sds9sto6tZVUNkPkaEksay1WE05Pik02M5HRRenVh81TrmHt4YW969cgJ6fveGzRRo3c/vNzr/Ob57ObZe/Hg3L4YmN+F+piqPmdG7bixcjC9Ziyvecbas2Sb3pxa8Tq3zkG3HsSGvp7T9RpeoN/CMQWdVPx/HuHFa8eUl7wGHlkePn2H9SSICoVc8pnVo9Glgz77TsfEetPwak3/srXPWYk1YFRjp7cqbOjwiTWmfKixuHkGhb7offfw3M+GHr9/Osa2FaBCPX7UuD84/YA4AciCXPcPGtdBG0rADcXr7zRA5Un4snEIHASTEWwoCDVg1vj5t3+jDpTf//2fP3C+tUBC9BV5qB81EFgcnN2jSq4Nz/XE8mFKWU8EQ/wukgHueDChhJDYJIGeqSyI5KjD6JIwhjQkhgMdCFBGD61LAB/EuERyYipbUyQwWpJM1Yr8VhAdFLRMl3bOGUo7qeI0vq6YmqCNYcsi4pNpiSkseRZZoAunJUbGi8kJ+oj45FC6hEDmESkJITEcAlkQQmITyfxQmgj6BENp4lBaEuSMESkCQiw3JIZDjEsMpyX5IkvZCorYREk0kAQ6iiiNo8oXpdfEy3NpyZlcbZE0p1FgKE80VSWmVYkyaoWplQnGcllOvbq4U5bbWNxmz64bK+2YK2qdre5zWnschU0TLaNrlT2OnNrhltG10s654pYpa48DXC22qY2OyY22ifW6geX6oZW6AWdZ53xx62xB83RW/URKRb8sr1mYWkmM5UaylZFcNTkpNV6eGy/PjeKoQkisd5GM8HhZJEfFkOeQ+NqQWC58MoanzrD2ZVQPmawDOXUjKeU9TcOuzcPrDc/1zKq3Y3JDmtPIkOXwU8qFqZUZ1j55erlQW6A3dzUMuTom1yeWPWic3jy8hq344Mz3DIbnNLw7wYYCnSlr++9HHPtt427ofDC3z6XXQICzvX7I1T+3Y8fcLktb557ze7zKC18p8IwrUnvCH1kDJ4vHT98fcKgRPHQEBnx9xMnMAy61uI8h9c+fFXr10XN+v3dyBweUpa1zoEIhRRl0w1acxsc3bgwsI7KjbnAFxBrDC3vTLi+csYFXBq2tD4IvHo6w++sxjgfFYBoXSo7FCwOpEbCkYBFeWN3BDX7i2H6R/YdOvL5Z4+b54vbTzePXDx+/weYIpMbP2Nk1mNQIyAr9LxJ3BQFHwKyBYo7hfwZQY3hxX1PSFc1RgdwTUONNOPVtBC2ExIrmaRiynDhxekxCClB0byMZ8Gd+CI2Fx5vwOEIsF5K7EtOskqx6CArOrB3NbZzMqRvl64ppyRl0kZEhNkZz1RHx0giGODJeEklPfBdJI5CYb8Pj3kYyQkhsIpkXQmKFRLPeRTEIJGZINPNdFCMkmkkgsd9G0N5GUN9FMQgkNhjtQqIY76LjCTHssLiE0LgE0LZHsRXxsmxKUipDlsXRFLEUOYzkjDhRKkOWnWiqYiryhKmV/JQygaFcWdCWUtHH1xbozLa0quGMGmAuFuCsW9w22zjsym8cK2yaaB1bq+lfqu1b6praqO5zNA27moZdkCTYMbkOz8L6wRVzx1x+85SxclBd3CnKqCHxNaE0URRfS05KY8hzmcqCKI4qLkEXxZKFUgRUSTpNksHRFDOkWSEk9rsoxttIeihNxFYXQnpATv2Evryvd3bbe/Gw5b2ZWjnMb5yAADRhaqW2qC2/cXx4cW/UsVfTM9c6umab2ph2eVewWhYYNBBFB09ieNohXgNCNzY819OrR2DkG17Yq+lfzm6YymuaLrctto27Rxz7ixunKzsXjq3zV2cNfD540KARBBYAE/hfX15kX+4s+AaWoOnjZeofkDVY48wN1CZNrXgHF/Y6JzeAq6rqc4LMB/DC2uNAzCgICBuxZI0Rxz7Y+Vy7l5vem13cpgAAcYSfMi4egMvw4HhQPKmBZo2gbGEfRnhvfSHD3tuAncV7i+dTjnGZgzBuBLQ0fv3ly0+/obMrqlz7959//YH3p+Fh4q8AjfmrbGgwaqx7rsedHl2pLTZBT4jhvItkvAmnwg7yNpIOT+WIeCktORNssiHRzLfhlH8SY34II/+TSPonMeafxJg34XFvoxiRbBVDnpuY5pd4KQvakrPqE4wVlMSUWJ4yiiUjC3SxCfporioyXkyI4RJiOYRYLjEuISwuIYKW+C4q/k0YGc40byNogB1vI+kh0PlE5hPIfICPd5BvGsWAFSmCJgyNSwhnJBNiuREMcTRLHk4XR7IVdEm6wGihJRmoYlOcMEVgKI/mqnl6szijVpJVLzCUJWc3sFUF4L5NrexPrRzIqBkpty2Y22fLuxZqBpaLW2cKGsereharepe6ZzaHF/f67JAbuNtv3+6c3Oic2qgbXIGpJLN21FQ9qi3tkee3MpUFoXQxSaCHijmmMp+SlBbBlHFVeQxpRihFEJOQwlLmJ6ZZ+SnlJI7ibSSdEMMJZ8rZ6kKoFDBa+pOzGzom1jc81wsbZ9Zeh6qwXWvuzq4fL++at01vFrVMNY2sLm6cTrm8y5g6A6h4VOyGBmn0tPZePPjiLbHo/d3jO8fm2ZjTM7bkmV496phYz2+eLmydsfY6bVObM6tHq3vvIeB7cfNs9/ju/uO3V+gMHA2BhwM8OvixIxA4XtKlQVfbVy+y+CqDu49fbx6/AqkBQYdw6VzZuYCb8cD8bsfkBqwnlb1LEGTvq+nDbShwUwM6HEKG7WvHyzsXawdXm94bfB3JIa7ZAJEauEHjHg0aW4GoAQ80bmx7bzcP/dnC+NxQlFTunzVwDSwwbpzffrq6/4xQA6jQ77/8/suvuG5XAI4//kJgEdSf9DLU629njb2TD3snd9veW/vacUbVIEmgI5D5IST2u0gG9LC9jaC9jYBKx3hCnDCMIQXNKGwlYJB9E0bBIIYRSpfQpFlcnVmW26QpsRks/QJjRXJmdZwolSYxxSUZaZIMmiSdpykkcRThdFEUU0riqqM5ymi2gsTTkDhKQiw3jCokxHDeRtCg5wmDMAoYZOAB3Mq7SFoIiU0gsQkk9tsIagiJHcEQR7IVkQxRFFMaxVHFCnTRXDWJq4xgycmJxgiGmKMpYsiymfJspjIvObuBoy4QZ9RyNMXq4q7knIasujF1UXtR22xJu72odaam31nT77T2LmVUDbSOuZuGV8DI5KtuXD0acez323c6Jtwdkxv1AytFbbOZdeOm6hFtaU9imjUmwRDBVtKkWUxlPktVSBGZYgQ6lqogOasuOachnCFhKvMSTVWgbeGnlFNEaXRZNkOey08pUxV1aMw2UXp1grFiauVwfOmgqGVKX9GXWjmQ2zCeUzdc3DLVb9+ZWPbASgLqDPfB1bb3FlVm+N4SsQh8X9csdrpDhOjp1ceDs/uVnQvQpC9snA0u7FXYFiq6HfVDruGFPef2BTzjIcJj//QDHjUgGfilBOPhxfaBHzfwaPL0Kfi88hI4go64+CaEpx9/enj2X0/wBSjrniuoTRpb8oBar2HIVd3nrOxxWLodlT1LVkyvUdW7VNXnrOrzXVIah1eR2xXOrqhvDUONBySdgCXl6PIpCDLwDbubhzfrHh9erB8E16AgOsP3W+/tztGtb3PxAhvqX4uO3z+dYpBxig4ouLMrNEL/+tsfaNb414saFEzThdtK0G+DWpQQGwq7mU9dfnxndx8XNE/FCg1EahKBxH4TTv2BGPNDaOwb3xpCfuNjLoQQ5AMv4B9CyW/CKT7UCKMAslCS0pjKAmlOI9Q4K/Ka4iUmrqYgRqAjcVVcnZmrLoxmSmK4ykiWPJavieVropjSKIYolquM5amIFMG76PgwqjCUzCPEsENITLhKvo2k+zx1ETQYNAgxbCKFT4jlhsRwwyj8UIrgbQTtbSQtPI4fES8lxgkjGUkxHAWZpyILtHRpJl2WTU0yxInS+CnldIkpXpELqaVcnTnRVKUpsamLu1RFHcaKvqI2e2nnXGbNSGWPo2l4tbrPWdw2A8b5oQVfAdf8+sm0yzvqOBha2B2Y2+mY3KgbXClut2c3TJiqhlVFnVydOSYhhZyUxtGW8PSlFFFaBEtBS86U5TalVw/nNE5ytcWRLLnAaIHcPY62hKksYGuK4MFPKRMYKqiJBqGhrKrXkVU7mlEzUtg8Vd3nqO1fqu5bqupZGF7cn3Z5ndvn8+snIAOFclB4R/JiGHH8/gnUhPAZmJ9BuHGO+V8Pz+/dB1fQC+XYOhtx7Ft7nTX9y6DvAqUzzBqOrTPgNT5ihQP4N3//TPHplTXk8dnHZTzgh45AKcdHrOvAf0YJZDqecB/DegI3V6hNOse1umLVduezq0cjOFKjqtdp7VlCCSxWtKf0LoFnuqZ/uWHI5Tu7Oj3zG6fLgVQo2lAAL/xKUKyTEV5cwB6CUgO7ngT8GqTy2sb0XTtHt0G0KPrbfBsKroEFiTUesZZGmDV+xsnJQRUacHYNur/695QX7dCAGqjoHJs47lx7l61jbmGqJZQuCSGx3oTF/RAa+09i7JtwCpTOA0CExHCIkMcTSYdhxPdPIZo4gg7sKUdbkpzdYKjoT68e0Zq7BCllTEVunCg1kq2I5amiWDKaJCNGoKckGuLlOUxFLldbzFEXMKQZ0SwpkSIgkvnhNGEMWxpOSwqjJkJuTQRNGEFNCCGxQqKZISTW20jGm/C4kGgmlkJGC4lmEmLYRDIvNE4QGS8hcZRRbGU4XUTiqMgJOkqika0uZKkKYxNSeDozP6U8Xp4DSZlcnVme16Iu7oKlIL1mJM06kF0/XtY5Z7EtgGC0fnC5aXgF+lDsa8fO7XPn9oV97di+djTuhJCejZp+Z2nHXEHztNHSL89vZakKKCIT5IzQZdmRbGU4U85PKdeW9uQ2ThW32bPqxmhiU4xAJzBaILKIqSzg6UtZqgKmMj9ekRvDU3Hkmfqybn15b0qpTVvcZiztaBlx9c5uT60cDi/udU9vgi9+aesM7K1o6z66fASkCNpNDrHpA3WRQyPp4fn95uH10tb54ubZwsbpwNxu3eCKbXpzdvVobf89KJpdu5fgf/VePn54+vrxM9Y/gDt/4ocI/D6CPn548Y+C9hS0jCDtlr9pCbek+LVkgBoYqQHkLh41QN81vLjXPbMFqGHtXarsWYIDitU3YvivsNV9ztr+5eaRNfCtgRUQUAM2BXRS9eKo0KNA1wkq90VF0Ouea/+sgeNE8bMGIjj81AaAiP9wc4++4un18+n18+nNcyBq/Pz5+2/ff/n9O9bt6mdD/8DNGniJ19+kbOBR4wPqbkJnFDhQza+fFDVPUcXpYXQJgSwIieGGxHAJZAEhhkuI4UA3Skg0k0hNAu352wjaD2FkbB7xnWBDSOxItoqjKU7ObtCV9aZXj7BV+UxFLlVsYkjSKcIUujSTkmiIZMlpyZkMeQ450UARaMg8VSRDEs1RxCUZE3RFXHVhYqpFoC/haQqYihymMo+lLKCI0mL4OrJARxOlkgVaEktG4ioj6CICmU+gJIRSk0KpwjBaYjgjOYotD6MlQV1LJFMWwZRHxMtIfB0l0RCboI+XZVFFqfyUcn5KeZKpWpJZJzBaVEUdUN0kz29VFbXnNoznNU6Wds6jYI72ifU++/bEsmcOmdB3LhY3z2ZXj8adnt7Z7eaR1YahFXPHXEHztL68T5bbxFYXcTTFovQajrYkJiEllC6OYCuFqVZNiS21chBaJnVlPZQEfQRDEidKExgqOJpitrqQnKCLoIvoIqOqsC29ejizZiinbriuf7F/bqe80940ujbi2J9Y9ixtnw8v7s25jx1bZ67dS9fuJTD8ASIC3OP0+tmnd754QJ3GCDgOzx82D29cu5d298nUirdndrtjcmPK5UWWWffB1fz6iWPrfMNzfXr9DBnlfjVXIJ3xEiwCJo4X1xN0c33lkvLS24Z9OSQke/rxJxg03n/4ESpg0F6Ao0J9BSh1gyvAg1p7lxBkIE60CjuggMQLUMOxdbayc7GOQw20LPg2FNwQh4YCPBW65b3BMxrrmK58/eAKrSSbOF05Em4g1Qb8tXgmBUk2ADX8B5Tvv37DBo2AHvk/gosacfDximv+lctr0P11++h2cfOsqs+ZZKomJ6VF83VRXE1ovIxIExPIfEIMF/Sg0O1IiEsEh695igAAIABJREFUdgMkG2/C496Ex0E2x7uo+HCmDFDDWDmYWTuaaLLGJhpjhQa2ulCgN8MtI16aGSPQkxNSeNoipqqAoy2R5jSIM2uS0qx8fWlSenWSqZpvKOfpSxMM5VA3n2C08PRlbHURU5kPtQy05EyqOJ2ckBLDU0cxkyMZ4gh6UihFEEoVhtGSollysjCFJskAWgEebHUhVMCBxS7BaFEWtoPNVFvaoymxqYo6UquGtaU9WXWjEAvWObHeMeHumtocccA6cAErLipqHV06gMSNusEVc7u9uN2uL++T5jbz9GWKglZ5fktckhG0thFsFTkxla0u4upKwRYsTLUmplnZqnxWcjpbnsVV5wkNpbKc+jTrYG7DeKqlT1fUbCpry6nqza0fqR9cnlw5bBt3T7kOFzdPIVJ4agXE4+fAaMCR1YP5I/yHfexE58VN1Og5d3r9fHh+v+W9cW5fwNrVb98Zd3pce5dApu4c30FlmWPrbPf47uL2E2woeDsZeqkHLSAPL46sPih5DvjtK2AReI4JYjfQF4Uv8eEjrjbp4uHg7H7n6HbDc+3au4T/8oG5nc7JjaaR1WrYRIANRaiBfQCEaN2A7+w64tgH1EDdrkisgTyveNPaIW49QVQAzBGQpYjHDv+4EWR+PQy8oXj9VCj6yaJuN/gJ4nxrP3/+jrld/+WfNX77/c/fcZfXgEHjL7+cHD90vK7X8FE1Jz7JhmPrfGBuN716mK0uIglSwuJlxDhhSDQLUkXReRUyAYnURF9dG+SMgtYrghYSzSLSxHRZtiSrXlNiM1UNpVYOGCx9ydn1PH0pW1NMSTLGy7O5WrM4s45vKBcaK7iaAra6gKMpEhgroLpRnFmnKGiT57WI0msSjBZhaiVPX8bRFLPVRVCPQEk0wOWSEMsF40wIWUCkJBApCQQyHyy5ISQ2sCGhZB6Jp6GITLTkTIYsB5KQOZpigaEiMc0qSq+R5TYpCtrUxV368r4061BGzaiurCerbszcMdcwtNI8sgp++akVL6re2vBcrx9cQerEsGO/e3qzcdhl6V40d8zlN07qy3r1ZT2SrPpU6xBfX0ria7mawiiuhipJj2QrYxONDFkOqp6TZNbBf0Bydr2yoEVT0iXJrOPrzYYym6myX2fuSqvsK24asXTNjS0djDr27e6T4cV959bZwsYpbBOLG6cru77nNHp6+TTOuD5BX7MBKhCE++uNryjMe/GweXjj2DqHvqjRpQPn9sXB2T1gze7x3cLGyfTq0fL2hffi4frhMxBvfnUG7mKCxws8VRHwSRz9iadO0XARhCMBqPHiD4BSA5nW4IkNqLG8g6NCJ9abRlar+pyoCRg90AnWF7Mw5D+gzGKosXl4A2/7qP3M51i7fDy+fDzCjGp4yMArNQAm4P1mPVC1EbShBCg4MKHXwRnaiXy2F/j5YmKNL/eYb+3z91+///o79MijceP3P/56jQ0NOKaggPL/j1kDDrEIDp1b561j7kRTFTkpLYwpJ1AEIdGst74sYgrQB+8iGb4ccxBuRNBAUQ5BPiEkFjFOSE5KFWfWaUt7shom85tndKU2rblLklXPTymX5jTydCVsdYHAUAGBPdACB43QysJ2eV6LJLNOnFkHFrjENGuC0cLTl7LVhXGi1CiWlBiXEMaQhDKkYfGyMKY8nKUIY0gj4mVhdDGRJiJQk4g0MZEmJtJEkAMCOghCLC+KrYjDsIOpzI9X5PH0ZYAa8rwWSDA1VY+kVw/nN4MZfw6ojbpBV3WvY3hx37525Nw+d+1ebh5euw+uXHuXC+sn0ETfOuausC1U2BZyGyfTq4fTrINas81g6YPtjCXPimQponlaclIaXZbN05exNUWQcpac3ZCcXQ/MMT+lLLVyQJnfYqrslWY3ZNaO5jdN1A+tZFf39dm3B+d3p13eOffJ1Mrh/Mapfe3Y7j6BOnskW9w7uTu8eDjCWLojbKCAd6STwObRE8w3iWJEUQfq9OrRuufq+P3T9cPnm8cvABzrnqv90w9nN883j18en7/jDSBB28fDp++Pry0mD5++Pzx/e0XchUAECTfwVxWcfT7okz7Eef52i7W6BlldndsXeCq03ndAWbJ0O9B8AaMHUKFgmW8YcnVMbgBqQOYAMM1AAiJZN/omH+EOrvj1ZA9blAA11vbfr+1fBaEGJi3HKTi8fucrYAf+3BvkzT8L9Mj7UeO3f/+CQQZyu740oQQwo4GfD0aNl0MUyF0dm2f1gyvirHqaNCuarwtjSAlkPqhF/0mM/SGU/CaC9jac+i6S/i6S8S6KAeIOX+tSLNdntCcLSAK9KKNGU2LTl/cVt81mVA9pzV2K/FZxRq0ovUaa05Sc3QDvtNCiJM1pBLyAIiV5fktydoMovUZgqODqzAxpJomjDKUlhTOk0XxdnDg9TpxOS86ME6dTRGlUSUYkRx3N00bxtJFcdTRPG8FSRnLU4fEyIl1CpEmI1EQCJYEQAypSYTRXTZVk0GXZdFk2U5nP05cmplnFGbWqoo6Uin6jZSCzbjy3aaq4bRbiiy3di00jq/327XHnwZz7GGkuEdM25fIOzu92TG5Yuh3FbfaM2jFdWS9AT0bNCFdbHMVV0yTp8fLceEUeWPsERguKO+MbypPSq6U5jbK8ZnFmrTSnUWPuVhd3plb2F7ZM1w4sNw2vDi3stgwvDy/uz64ezW+cTq94oW52evVo2uVd3DyF+Rme1ujaenT5hKQZ57ef3n/4Ea39MHQc41DDe/Gw4bmec59A0dz8xunW0e3Z9TM8He+x+R/qNsAl9RR4+wzSib9KiD58ekWdgRd34OEgaH7Bn07w7Mbj8/f752+3T18RFerBUaGOrfNpDDWA1ECzBl6vAahRDZfXPmfTyGrH5Eb/3M6E04NQYxt7z0ezBniIj+Bb/drNdR+HGoAXaEnZ8FzD/TUAL3BVr1tHfrM8CCaQGhUJ2OEtAX4uaNaAs+tPvwagBphQ/vgzIIU8wOcazHT8/YYCZbMwyy1tnU+ueEs75ySZdQx5bqzQGBYvJcTywaX2j5CofxCi/0mMgeByn4KDIoQeaXiA7IpASYjkqoWpVo3ZpivrTa8aKmieruhe1Jq71MVdioI2aU4jRN3J81qgqFFj7pblNoPsCmpfhalWjraEKkoLoyUR44QkgZ4uywZKAlqmqZIMiiiNJNCRhYYIpjSCpQilConUxAimPJKjiuJpYxJSonjacJYylC4h0iVEqohAERDIfGJcYli8DBYWujQbEtVF6TWgSdOX9abXjBW0zOQ0Tlb2OFrH1ppGViEKEMpcndvnyKQI1MaUyzu8sNc9s9k07MqqH8+sGy9qnTFU9Be2TGfWjooz69jqIp6+NNFUlZhmFWXUAJchTK0UGCqEqdYkU3WC0ZJoqoI7js5sM1UP5zdPF7VMV9gWWsfWumc2B+Z2eme3xpye0aWD0aWDUcfB5Ip3yuUFVxUoNUAstHeCpTDg1M3HmIT84vZTUNE5euZ5Lx7W9t+juPPlnYv90w/wjPzw9BUTZeIUGdh6gsgF/OyAd5fAb+8/+kaMIM0o/s8E7SxPuOHipR4ELz+9f/aZ1k4xpQYs3XD0mXJ5hxb2bNObzSNrNf3LMGjAZIGurVYcqQEJ1ShkGMnzd44C+AV8Kg/eexJ8QDm6hckUIGN17z2e1Fh/DTWQvsv32xe8hhc59C8fUYrXw6fvEDXiO7v+5uM18KgBiPDHyzNK4KzxegIgcsLg4XDz8Nq1ezmxfJjfOCEwlHM0xRxtCUmgJ5L5/wiJ/se7yH+8i/xHSNQ/iTG+PSWGQ4hLhFNLSAyXEMMF3wqRKopgKXj6Un15X3rNaEnHvKXbUdAyXdAynVLRD5ZTeV4LZE+oijqhPh7uF4r8Vhgx6MkZ4YzkcEZyFE9LS84ERoOtKSInGuNEaXFiUwRdFEpLIlL476IYIdGsd9FMCD1+G0F9FxVPJPPCGckkgZ4k0EfxtZFcTQRbFQbkbpyQSBOHsxTkpDSqJIOWnBkvz+WnlIEEHlIzoWOlqs/ZPLLaPu5G24Fj62xt//3m4fX20c3W4TUoiOzuk9Glg56ZrcZhV3G7PbN2tLRzvnZgpXl0Lb95Sl3cKc1plGTVQ8afOLNOnFErMFpEGTVJpmooZE7ObpDnt6qLOw2WAVP1SG7jVGHrjLXHUdPnhIggSDMdmNvttW9DwvDQwt7w4v706hFUGcBT0H1wtYUTL/qVoJePMGugBBf8qgK2V+/Fw7rnann7wjeNH93C3n5683x1/znI4frxtRnh5d3kJZ3xEff5l6rzj7iBIgh3gojSJ9xd9uHT97unr1f3ny8//AhOPLwqdHHjdNzpGZjfBS15Tf+ytXcJ4mNh1qhCItHeJd8NZWAZhQzDd9i1ewmogcQaPi0MZiQ7wr7PoNl/qSV3H1yhWWNt/2pt3y/ZQBPHBk6+gR86gmR7XnRQv3yEHfPq/vMt5nb1eeQBNdCs8fufsJ7gPa9//vXfP/786/UNJUhRjt9K/HqN0w97J3fIkzLlOuyc3GgYWrHYFjTFHeREw5vwuB+IMf8Iif5HSPQ/CaQ3YXHvopghJDYhlgdkJIHMB/tmSAyXSE8OY8rjFXnq4i54BULeb17TlKl6GHoYDZYBrblbVdQJYAGhxJCayVIVRDJlYZgQm6ksgKmepSok8bWxQgOB5CNoI6gJYXRxKDUplC4OpYvDGMlEmigkhvs2kvE2gkqMS4DOpzCmPIqnJQn02PShCKWJwxjSSI4agIMqyWAqCxKMFnlei7FyMKdxsrjNXmFbrBtcaR5dax93Dy7sDS3szqweAWrAIrBzfLfhuXZuX8y5jyeWDwfmd9vH3ZU9S/nN0xW2BQj7sXQ7susn1MVd0IANACFMrYSdCHgN+KQsr1ljtqVah/KbZ0o65it7HNaepYahlaZhV/PoWuvoGqzZffbt3tmtwfndsSUPULOuvUtwnQBwIKeTBycJBSoUb3L1Qcb1x5P3TxDT4Dm/BwYO/8SAv+Ti9hNYsJ8CX+dBHtagsyuQFPjP4/HiJRsa8Be+cL4+fcLRojim4wnTkkNBFCI1Nr037oOr5d3LOffJ6NJBr327fXy9fsgF9hOfKhQkG9g9BeQbgBp4sYZj62x19xLuGkgOg0R08M7vSwnF2FC8KhSmhnXPNVpP0MTho9U9wTpR/wkWN2iAWMP35bBz7wlmQoEfEEi8vmFuV6QK/e33PwOo0CA3yn9eozleOuXxKi98TBB8Hq7cyzsXixun7RPryoLWSIYYFNzQrvQmjEKI4YZEM30nDIqQQBESYrmEWC6BzA+licOZcorIpCxsz6wbt/Ys1Q+tlLTN5jdOQgp5WvWIqXo4tXJQa+7WmG2aEps0p1GcWScwVFDF6eHxydF8HTAOAkMFaKVIHEUYLYlITQQaJZSaGCs0RPO1EQwJgcwnUgShcQkxCXpFfjM1yRAalxBCYkXES0l8LYmrCqVLiNSk8HhZFFcTIzSQk9JiBPoItjKSo47iaX0ThzSLrSmSZNXrynohL7Okfa5u0NU5tdkzs9UxuTG2tD+9egSBevDt2ju5gwjFOffJlMsL99e6wRULFqEOVHxpx5zBMqAoaFMUtAlTrfyUMramCNSisKSIM2qhU0pTYjNah3IhFbV9rrh9rrLHUTe4Uj+0AjXFqNFneHFvauVw2uWdXz9xbJ4t7/g2FLxLAmXSosiW64fPoGi4vPvx/Ob5FGHH+6eT909HFw++lraLB6AG0FPi+P3T1f3n28cvdx+/3n38ev/87f75G9xQ8K/klxwnOsQ+ffLDhB9HPvlNa8Fq8UDmAv9A9xo0aDxiswYk8UCuL2Z1PbOvHcOPBlldQUsOWwlW07cEKi/YWeoGV9rH13tntyEu1LkF/PcNgmO8dc1/yb58RNb4AKsr7uyKjRsBJpSNl6jxwtj2qgnlCLMFXN1//hCYrPETSLxwhleUGPpy4gjAjv/BhqIlBVn3d4/9KQwosGz94P3M6pG1d4mtLgyJ5YWQfPeUt+Fx76KZoOMgUASEuEQohSXE8ghkAZEmCmUkk5PSZLlN6TUjZV3zTcOrtf1Oa68zr2naVDNqrByEkwFIJCB9V2C0xInSwmgiuiybqzPDfBGvyI3h6yJZciJF8EMYGRTl4QxJrNDIVOZFC/SQ9/EumvkuKj5OlKotbtebu0gJegJFSE40cjTF8YrcOLEpiqMi0sQgBoP6BaokA/aXaIGeJs2CblphaiVcUgpaZsq6FkBTDHnlU65DEHdteK5BKbdzfLd5eL28c+HYOptznww79ocWdrumNrFkFycEplf2OPTlvamVA8nZDaKMGn5KGUdbAqjBTykTplYmmqpE6TWwpEAcSUbNSFbdeGHLrLl9rqRjvrjdDnt4w5DLNr0FIgLodoVeRUgGRaJjLELqARHsF5i76ebxC7zAUN4k0nQcXT7695rLR+C8gJPbP/0AaaNX95/hAXc+/+s8cPv4O5ozeA0J3DiecPARRGQE/5lARdn987e7J9/Z9fj9k+f8AY6dQIXOrB6NOPa7Z7bax9frB1cs3WA/ccCUUdUbsJvAo2HI1T7u7rVvjy158A4U/EsXjRsIOHCQ4Zds7B7fwQS3fnC9tv8ejEJB8lD8rLHlvUFmeTzNgd868QoRQA34sQKvgeJCfw5MJ/fnDL9mew0YNF6iBt66Busfur8i1MBg5QPcmWdXj4papqiiNCJZEBLDgWsrtBwQqSIiNYlIkxBpEgJFSKAkEClCIk1MpEmiBXpxZl1a1XC5bbFpeLV+yFXZs1TQPJNRO5ZWNQz1a7CeiDPrBEYLXZodHi+NE6ez1UVcrZmjKWYpC2ITUqK5qhAS610UgxDNDCGx30XFwwmTJslgyHIimDJCLPAprFihgS7NEqZWxiSkRLAVDFmWrrQnMc2amGaNE5sg35AQyyOQ2GF0cZzYFK/IoyVnkpPSaNIsqjidIc8VGCqUhe3GysHC1llrj6N5ZK1rarPfvj3qOJh2eZe2z127lxuea/w2B0sKiESHF/cH5nbgPQ3ibWr6nRW2xdz6MVVRu768F5hgcUYt9GMDLQqQIcttUuS3qou79GW9RutQWtVwRu14Vv1EfvOUud1u7V2qG1hpGl7tmdkaWtgDYfvi5hlABvDzeFM8eDFgysBqk55BdHz7+OXm8cvl3Y+nmLIQMaMe7GAJUzEMyeC43z/9AOb6c0y/DIz9/2BA//88Xkq2gpSg6DP4PEE8r/Hgs7p+ubr/fI4dULYxfdfC+sn0infUcdA9s9U66q71kxoOxGUgrRecXasBNSbWoWJmHosL3fLeoDkdXam8mF4DLlYYqfHgd3jhBg0wDaM9BY0YIDN/bda4RoPG3on//eAIF4yOJF5IGPr15399+/lf33/9/dd//fF6p8HL9eQlJ/r3s4bvgQcRzwuwhDl8zn1S2jFLFZuIccIQEpsQw0G986H0ZCI8qEnwGSJVFMpIjubrEk1VpurRwtZZePutsC3kN0+nVQ2j9F2gRZNM1ZD6Q+LrwIjBVhdRklKjWbLQuIR3UYy3EdSQaAZXUxAr0L6LZkZxNeREAyUpNV6RF5uYGsGUhVETI9lKWnJmgtHCTymPE6eH0iWJaVbQekIoaRRXE0pNgqaoMEZyJEcNqg3QfdGlWQxZjsBQIcttMlYO5jfPVPcvQxfG2JLHvna8sHEK7znugyvQxe2d+M7Vzu3z5Z2LOffxuPMA3tZgSIF+tvKuhdKOuYKW6dTKAX1pt7KwXVHYLs9rSc6ql+e1QCWKLK9ZUdAOJldoFcioHcuoHStsnTV3zMGlsHZgpWNivde+Pby4N40NPqt77+GdCimdIVES+IvLux9h0ID15ObxK4TEXT98vrr/fIrdXE+xieMAG+yBunNjYmd47h7ilvmL208INYKNJJ++vzzEPv0YoNHyOdO+BOAF/iiD5zVegRjcxBFcgHLpQw1I/YOs0MH5XTig1A6AlnzJ0r1Y2btU2eNAWwleG9qIHVCmXd55TEG3/fKAgqNC0QCC9hekNMPOrj4uA7AjaOJYP/BBBr7xAFbOoBnHZ0LBTIl4scZH3NkVZo1/BXrk8YryP/7zX3/s8GvG+VdyQxFYBMWIovUEhyAPnvP7zcPrieXD7Nohqjg9gqUgUkWEuCQCmU+I5fs3lLhEAkVIpCYRqYlEmiSCo+bqzMbKwXLbYtPIatPwqqXbkd88Y6oZNVgG1MVdqqJORX6rJKuepy+lSjKieFoWBA7ry+jS7Ci2MiyOD4p1Eis5Mc0izqhNMFpCopkRLIU4owbEnXCgZWuKuDozS1XA1ZrZ6qIojjqSKVcWtmvN3bLcJq7OHCdOD6NLiHEJYXQRkSYixiWGUpPixOnwr3C0JRCxJUytlOY06cv7chomq/qcHZMbA/O70yveGawoAN4otg6vfTPayYetw2v3wXvX7uWc+2RqxQt0vW16s318vXNyo2tqs3lkrbLHUdoxV9I+W9g6k1k3nlLRn1LeqymxwaFXX95nsAykWYdSrUPp1cPZDRP5zdNlnfNQ7AIXQUjZ77PvAL0CvWrOrXPn9jnMGuiNCA4iABkg0LjANgt4T4a35av7z+iecnr1EW0o7oMrpJdHYtOdo1tYYOG3h+f3oCgPWkNe7iAISnww8VJz8WqiH6I2gjiOwL/86fPPcNAFHAzSd/lQA7Tk87udU5vQyFeJo0IxVShaUpbQ2dU2vTm8uDeN8c2oiQqPGkjoheNBHxBqHJzd75/e/Y9ZA8AiQFf+QrUBalQ8M32ECwEC1ICzK+yGn77+AnGhP4EwFGNDf//3f/717z//+POvP16mDb+6qrxkQ18GDgfpvpCOBcUxeM7vt45up1a81h6HJLMuNtEYyVYRqSICWRBCYhFi+YRYfihD6ltVqKJQhiyCpWSri3RlPZDR0DDkAhEUpGmqijoU+a1QMsbVmenSbJo0i59SxtWZSQJdKF0EN9Q3YZQYtkyYWgnBVuriTprISKAk8HUlPJ2ZpSqU5TWL0mt4+jKB0SJMraRKMkh8HZEiYKsK5Hkt4oxamjQriqeN4mnDmfKweFkoXRIWLwuPl0XzdbFCI0OWw9Wa+SnlHE0xU5kvTLVKsuq1pT0FLbNVfc7mkbVeu08d6Ng4BSoUnkDorrZzdAv7qnPr3L52NOXyjizuDy3sQusSVMDD0GHtdZZ1zlu6HUUtM7mNE+k1o4aK/qz68ZyGidyGicJWe1HbbFHrdEm7vbRzvsK2aO1Zah5ZqxlYhlaOYcf+2NL+zOrR+NLBlMsLz+bto1vfkxjeeW6e0YgBrOfV/ef3H35EkAFTBuAIvDmf3TyjmNy9kw8geHUfXG3hqHsYOUGnuOm98V4+Xt1/DjqvBqAG3E0/vTYjBOb3+YcLtIYERv4FPZ5wfwy++sPzt1s4u975YzXghbq0fW5fOx5zeiArtH7IBftIuQ07u/YuoYgNxG7UYg6U0aWD2bXjpa0z1+7lNi4lHM1cSHD18noCjx2sAGVt/wqePP4zysEVXFXw2g38DSWI1EB/5xFGoxxhZ9f3H368efz6gM0a4HbFW9d+/+Ov3//461///vPff/wH2FCEC37d10uC43/wGgjG8PIND+YCRrsTfGvA4dY07BJn1NJl2eREYxRPG83TRLCUPjkmUx4aLwulS0IZ0nCmgi7LVha2l9sWGoddzSNrVX3Oss757IaJVOuwpsSmKGhLzm5INFXx9GVgyuDqSsgCX7v92wjqm/C4UKqQLs1OMFqSsxvUxZ1QgEriKGniNLa6UJrTmJzdIM6o5enLePoygaEiNkH/LppJ4ihAsh0rNIIig5yUFpNgIAn0sUIjHE3o0myWqgAiThOMFpg4RBk1MKHkNU9Dm1m/fRvGDcfWOcwa8OPE36Fgqod5GAyjA/O7A3M7XVMbHZMbkMoxMLdrm9poHl2z9jhAMlDZ46jASmdLO+eL22bNHXOlHXPQ4VrT72wZXWsaWbVNb0JPNZSqAb0C69L6wfu9kzs0tYIfAfDi+uHz9cMXxFzCuzGgxvXDZ3iqwSXl7MYHHIcXD1ACsOG53jq6BfkfzJ7I6A25/idXH++evv7d3TRYgoGP88OAAM0U0Kv2KkDgYQK/2gTxoy+zQoGAXN3zacnh7IqqDJBMAwEHXh5a1eesH3K1j6/Du4XdfbKEKXR2jnGkxsWj37eGS9Y4vAgI18AOKNewmOBnjbWDqzVMwYFOsPgqNvTxLu7r4kkNsBrBj/Lu6evD8zd0dkWzxm9+OflfoCgPajbAjCevi8pfT+UJIjKC2A1044E59vjy8ejyact7M7t6lNswIUythL1AmFrJ1Zq5WjNNmkUS6CNYCiJNHBYvi2ApKCKTNKepwrYIfZm1AyuVPUtFbbMZtWP6sl5lYTuoFcSZdaL0Gra6kCw0RHLUIdHMH0JjgbOMYClA5QXmVG1pj7a0J6WsmyZOi+GpGfIccUZtQmolT1/KkGaGUvhhFH4sX0NLzqRKMhjyXLo0i59SDrJ0prIgXp7LUhUylQWQrAVYA8ZT8L9KcxrleS26st68pqnqPiecOcednoX1E+fWuWvvcv3gasNzDUMjeofZPb51H7x3bp9DOt60yzu5cjju9EBQYO/sVu/sdvfMZr99G8ofoZapfsjVObHeNLzaPLLaNu5uGV2rH1iGQhOYkHvt272z290zW4MLe8MLu7O+vvhjx9b58s7F2v7VpvcGzqLox4TmC3QxAe7zw8dvHz5++/Dko0JBGw6vNFQT7b14AKcJYuCwecrn8objruf8/ur+M6wneB1XEFgg5XjQBPHxbzaUV6JAP//sD+Z58a+grwJSd1/qH+i7vPD27hP7Dy/u9cxut46tQQGwr0gcT4XilpSqPmfjsKtjcqPPvj0BTVRYp0ygGeTBP25cPh2e3x+ePyCZeRBqACi49i5de5dIpgFCL7yZ7aVqY8t7s3mIdyT99offAAAgAElEQVT6p5tjrLfJhxpBeTy//o6KGoEH/f0PXOvaf/yDRhBY/Oe//1PlFSR99QS69BCwoacjcknundwt71y0jK7J85pBH60sbJflNslymxKMFoY8N1qgD4V+aaY8JiFFlFFT2jnfPLLWMbHeOuau7l+u6F7MaZwCs4aysF2UUcNU5tOSM+MVuWSe+l10fGgshyLU0yXQ+ZbNkOXEK/JY6kKu1pyYZk00VSkLWqW5TRxVHjVBS03QknmqWK6CItDQJKZ4eW6s0AgAwZBls1SFXK05XpFHl2X7bCCaYpaqgKUq5GhLgDoVGCoEhgrI7wUjjL68L7t+oty20DyyOriwO7YEprULF3awgFnDBxyXj0C/uQ+uFjdPFzfPYDC2rx1Prx5NuQ4nlj1TrsNRx8GoY3/M6Rl3eoYd+/32nX77DhTW99l3+uzb4LW3TW3YpjfbJ9Z7Z7eHFvaGF/cGF/YG5ncnlj32teP5jVOYdyAse/f4bvfE1xUMap8LzGwShBp3T1/hVur77cev8AcusGJh2FC2vDeuXd8z22ffxs4o8OLZO/lwdvMMdP3DC3v7y7njKWi4eC1GGO+1//iiXQ0v3ECggyQbCDXAXwNZocgg79jyoYZterN5dK1ucKXSN2I40A0FP30gUgMcKFMr3vmNU1SvvYN1C6AN5ShQqYHwwhNIhb4kNfByL7wt5RXhhvcGf9/Ef1EADnzlGkINEGv8gok1fLUGfwCp8d/XtV5Bko1XUQOfyoP//8SPG4c4Jz9CDc/5PdQgZFQPSbLqZblNENKrLGyX5jQJDBVUSUYkVx0aLwtlSEkCPVdnzm+eBn1uy+hq/cByTb/T3DGX0zCRVjWkKupQF3dKc5o4mqJorjqUmhTDVVKSUnl6M19flphmFRgtkqz6JFM1KL74KWV8Q7kovRrgI8FoSUitFKVXy/Na4JNMRW6cyMTWFMG4AeZ6hjyXIcthqQoZ8tx4eS5bXcRSFXB1Zp6+TJhaCTVxydkN4KADWXd2wwSMSD0zW1Mur33t2LV3ubx9sbrn5whRz8jB6Qf4tsCTdXnnwr527Ng6s7tPgIaYXT0aXzqYcB5MrRxOuw4hm3PKdTjuPBhe3JtwHows7o06DkYc+0MLe0MLu9OrR2NLB+NLBxPLhyOO/akV7/SKF9wQ8Kpe9/i5FRBTnF0/X3748fLuR2AuYD25efx89/T15vHr3ZNPnQVDB0g2ru4/A3UKuaHey0fX7iXCppWdi+XtC9fe5fLuJUDVzvHd6c0zvK09fvr+iCms8AfXYPICByj+jePLKyNGEL68/BX/F+Lzu4IKUHYxKgEWRh8VisVqWLodcD0BeSg8oBUFZo2a/uXmkVXb1Obwwt7EsgeCy8Dggx80jpE6Eytz9WBhPPhNHxhNgAbX3iW86+B05X7IwOu+NnH10WhDQa0UyPYCnOjF7afrhy93H79+/PGn5y8/g1gDn/2HlBpBvjVf7PCr8PF3qIHnbPChQwg1Ds99sxBCDSxP9XHv5M6xdVbVuyQvaJPnt2rMNhA+yvKaE01VHE1xrNAIBEckR8XWFOU0TIDSrm3c3TrmrhlYruxxlNsWCltmoFRRltcsyapnq4vADAJ/D1g2uDqzOKNWZKrip5Ql5zRydWaWIluQUi5MreTpSxNTK4SpFra6kKnMFxgtfEM5P6WcKjaxlAUcbQnMFPHyXLC30pIzadIshiyHLstmq4tgxOCnlCWZqhFkaEpsWnN3qnUor2mqrHO+fsjVb9+eXPZMrRza3cdw7Fzbf7/hudrwXO8c38GbDCRHbXt9P2z3wZVr99KxdTbt8gITMbt6hB529/Hs2vH8+smc+wQ+M7F8OLlyOO06nHOfzLlPJpcPwXUKtxL72vGc+9ixebawcebcPvdpQLGgB/ipHZ77NIIXOCEWyECBy7h7+gq+1Q8fv6GkPNQODbPG3skHx9YZlEvD2cjuPrG7TxY3T1f3LneP706vfZBx/9H3Vz08f/O5SwI1F09BMPH37Ob/uqTgRo+XEwdAFei70AEF6U1QrMa409Nv32kfX28c9qEGNm5gWV7+6WPJ2rNUP7jSOubutW8PY2E8+FvSPk5Ljt7zPS9iePz6LtzNFYADmziu8LMGit7AwML360t9l+c8IA4Wpsvrh8/IIw9ijZ+wUmh/zjCYUIJUof95MXf83Q0FP2gE6jKCBw0As9NAf+Tx5aPn/N59cDW8uJdR4+sQVhd3qos7gZ4AuUQ4Ux7OVERyNfGKvPTqkdaxtYH53V77dsfEesvoat3gSrltobRjPq9pOrNu3GAZkOe3Gir69OW9adYhfXmfrrRHV9qjLGxXFbUrizqTs+vVxV0Co0VgrJBk1QlTKyWZdQnGCpa6kKcvTTRZGbJsGEwgaAdZ0ZnKAqYiDw40dGk27DtMZT5HWyIwWmArSc5ukOe1qIo69GW9oLAyVY8WtcxU2Hza0KEFn3x7YePMtXvp2rsE+Q062p9cfdzHxo2tQ9+Q6dw6h7c7uNrOr5/Y146mXV772tHi5tnkyqF97Whh/cS+dmR3nwAuLG6e2deOZla9s6tHCxtn9rUjx+aZc/tiafvcsXUOz7N1zxUw8zvHdx4ss+v4/dMpVqWDNhQYOoK2lfuP3x6ev8PCAhFep9fPl3efgOqec590TKzbpjZ77dtDC3sgVFnde79/+gGlRYGW/OHTd/gY74sPRgfc+BC8d2B8x981MOKFGwEJg4EnWLwqFJQa8Fp1H1w5ty9mVo/Gljy99u22cXfd4IrVN2s4rIgH7V2q6nVW9jjAigIJw23j67327TGnB1qjYLrcOboFnRVk8CFJKBo08DM7HjUQqYFjNIJ3Ex/BgTujoIljF+tyRzwjShtEZ9fbxy+Pz1gj9PdfoQbll9/++A2HGv/CWtf++PO//w4K5sEhCAIREHf4UQOPF/7skBeKLy9Of3Z6/XyCk757Lx52ju/s7pPKHoexchDk4VpztzSnUZhqFRgtLFVhFE8bzlRE8bQ0aZautKdtYr3Xvt1n34EbJJS2V/c5K2wLxW324va5orbZ2v5lc8d8buNkWvWIwTKgL+s1WAZSKvrSrEOKgrachklNSRdPZ06p6AdnfXJOoySrPjmnUZrTJM9rkWTVw0klObsBjPb8lHK2poilKqTLsuMVeQAZLFUhT1+aYLSAc0ya06Qu7oIaZKN1yFQzaqoezayfKGydrexxQDQLZMDNuU/m3MdwlYRLyt7JHURFwjcKbNHbR8Bg+TgwCOlbWD+B4G+7+3hx8xSmhoX1E2Q/c2yeuvYunVtnjs2z+Y1TiOeEaNKV3Quwmfhpdu8NUk94sIgHeDLhbyiXdz7JIJhH7j5+hRnh/iMcHX6EqR7Z5LePblf33k+vHo06DiaWD+3uk6Xtc6A/kfrww9PXD09+HwoCjgecLuPVAcH/GewFjw8cDYKPl7xGwBUG41+xQeMLCOThrLCDcsm3L2awBvnWMTdQoWglQacTMBkiUgP0XX32bXyJ/Kb3FdEE2hRe3hPQ5A6osbr3HvbKIF4DwcfLehS/xMt7i1ShAd0reLfr4xew9qEDys84scbvf/wnEDX+CgKIV1Hj9VkDn7y+jzOwoXsb6q32uZuw8lv4fu2ffnDtXvbZdzJqRo2VgwbLgMEyoCxsTzJV81PKefpScmJqOFMRzddRJRnKgraGIRecMG3Tmx2TG61j7qaR1ZqBZdAv1Q6sNAytIAVOfvO0wTIA2idAJV1pt6GiP71mRGu2pVUNm6qHM+smdKXd2tIeVXGnqqhDX94nz2tRFXWC1FKSVZ+Y5vOJsVSF8Yq8eHkueGch2AJMH/L8Vo25W1/RB+743Map7IbJ7IbJvKbpko55a48DiLERx7597QjyeJa2ztz77zcPr4EKRRMj6g33nPl0+rvHvtA3MKqs7F4u71wsbZ0Djqztv59zn0DTMgwa6I8tbZ0vbZ/DhR8d+dc9V+BtBZHihucavhy83aEk4ZOrj5fYcOFTdj356AzgNeClDg7Rm8cv57efTnCpUEeXj8ijuXt8B5oxbFQJ5kdg5UGjB3D4QbILeP1Dx5I/cPwFmuBh4vnLL8+BVQkBD0ww9oj9j8A8BVlkB2f3mD4CyyV37HfPbDWPIoO8w9LtqOz1x/CgLK/q/uWa/uXm0bUuSBh2eRexNoMt783e6Qe8phsFavxdrAZalND1BD2CIjZg0EB++QBC1EeF3uHR6gRDKzwV+vTpJ3CgfPt/jL1nd1tnljXo/1T9F6Z7zZqerrenp6q6QleXu6pdjkpWpESRokRSJMUAgpkAAYIAkXPOOWeAAHMmbUuOkiXb76eaD/s+Bw8u5OpZ6y4tiAQTcO++5+yzz97MWeNbzjEUeg0eNURIIY47+DnUoD+yl9GgX1FEhTa7XVWxnzKtDvbNmnFtw0gCl+uv3n8Aa5xfvf/go6GVOV0UxhAbruyGK6uwpRS21IopsWyMwwR81ZxYNSdWTInZzfCo3DOwaO+Tmu9JjHdmDKg7bk1q++ctd6d1d2cMDxds/fPWvlnz7SkdVlqg/hAE2kMr2BPDwPU/bjz9w7WR318dxpD4/YcLHz+WwdTj5rPNB1Lzfal5aNkxsGh7vOJ6vOIclrmZaCKybIxrPXlTsGQNVxyxqjcpLJiS2hrjSbydVL4R3QCmAzecWGEnmt+O5LdjhW2cPYHMVjDTQhniT7fCuW30I+HcdqywjVtTNL8dzrVJg4yzkK7qzpmElOD9y+buOdUaaCjQj/DdxNH580M2VemUG0xL2j78DG0OpGLodECOHJy9wBoLsIMQBMAhFn321B2XL7rYil5w4eFDhBS91ClQ47A7NolQA77ktkhV7yusOzJItMGqq1BrdGcaCGkGumhnQT5WC2ZavJYc10uVi0ER5Rjw40jevwtvPdhQRojuJsp7olojUXoLG5pnwpnO2gtn7Eg58kDY51yt8V23MPS1MED5CUIvHjLespzy4/8W56GI8l3QnvDL8vhUnVvIJbCgwgzlRji3rXblBhZs96Xm+1LzzQnNx49luM//7pOhf3n35r/86dN/e6/vg4FFqTai9eQNgeKmJ6d2ZVXOzLo9rbSnFfY0XGfWbClgh8ySlGhCj5bsfbPmvlkTqphro8oPHy2DdMBxe0p3a1J789nm9TEVJjhXhtdg6oN1OHIb/eOnYwhJ+vPdmQ8Hl6+NKm+Mqz+d0NybNT2ctw4s2h8uWB+vOEdk7ierrhG5e2LdN67wzmoj8/rosimucmahlXDB/ybbohtFtrqfrR1AbMO0lcKVXOL8SvL1Qzw/UuiYm/tSTZzZ/vSWN9nwpZpoZ4As8eIuSYOAUPz0DnoKpOyQQQuxoVAKAjKOLl6cXQoW4aesj4BZHulEt5ilKE5BcASk+9g/FYRhwA5UHPhyAT4Yz3rKuW907Zv1kpoi/QX3mKoSEYKIHnR3KLQg32XGAytDna+ABPlZVmtMc7ZdM+ou1MCC/IYrKyzI54Q3gr80SNMtTE+43oTPCQFqCHuuhBqsckyWu9jQt7cn1X2IRDo8I/MZrrMNFJBWx+cvzpG39s0rQazx8vW3L9nCKxxDWU0h6lN41cabHux4ywyF/jyc34A0niVuMB9kMg6q00u2fQpO1BIqjSm8/fPW/nnrvVnT1VHlR0Mr7/fPv3t78jcfDvyv/7r1b+/d++uDOclmGKih8wnlhsqZwb8wqtK4cwp7Gh+RasODS447M4a7EuPtKd2NcTUi0T5+LPtoaBWJ03DluDaqhK/PlWEFBsAfD61+9GgZQnVBi3Fn6v3++Q8Hlz95LMNu2N0Zw+CSY2jZMbzqGpG7R+SeCaV/XOmbUPqGZa5JVWCK7T6umOJYRTEGSq54DYrMcG6b5mQo43ETqHOu9iKpD3HpSEVAfAluZbHCTpTdf2g7DoNVYtSp0Ojof7hTucHcxptMHrp38jmuZ6oFeAM+LG4csusNeg1CHNJ9odYgzRiHHS8YgjwXHDe4Wua8x8iPn8V2SUK7KYzeAqS3f7lgui9BqdEzQCk2j7L1Q1ChnkQDVCiFrXUiGtmGq0TT5fq3aIjJrUmtJ28Nlz3JZoRJgenS5dWPot5EZFiT41z/YoWdSG47mt8GwSGiNvhVFKoyUpWOwRL96Do3dgX/jTsELAsoR54Xa5DP8PdvfoRHORUdVG687kGTt6AG7ocltlxAjRNPanSSQbvLDXK+JoG5L9WUW1NPVt1PVt0P5qy3JrW457//cOHPd2d+d+Xxv73X9+6dqQmlT+crwMBO7cqqXdlNJnOCXHLTk9N4cmpXjvZEH684+iQGdB/XnwoFBeADe19XR+AbqITS/OqI4pMn8o8fy8CGwizrvftS8ii9NakFeTEq90wofWMK75jCO6kKTqz7xxTeqY3gxLqfDe2F4M9FQ1RpT2968qZg2RWvBdNb8eJuJL+dKgtVRm37tLkvBAi09i+rLDG4wokF4RabZhbVNL5NlHaT5V3oO9D9gntjN6LdbP0wzTzvcRYmSns4I3P1w0LzGBUHboAU8gyGDFsnQA1UHAJkXH6JGuGYXW/YYQNeCJsp+5dtBhy4m/HAAcYEDw7ZgR8k0m70YodI1vH3AYIY07d0LoQaF91mPM1jGqC4MUBhZjwdUkMdnFaHZsmDR0hsDEl1kSVDTGlPaz15e7QmxEGXdnlNN7rRjhMPguzYDKULNViUgVBosHIDmrFuNlSw2EiJhV771AJXuMV8Ihy3aNv14ktQoZTS+A0LhX7FBigkJxfWXmkP5YefxIFsXPPSNUPh/7w8M4zj1V9VjtQQ1nK5LR1U483d82r7JFHaNQZL4+v+8XX/sMyNzbRro0ooOP5yb+Y3Hw788dOxoWW7xpPT+QrC4c1rPXmdr4AqQ+PO6rx5jSencmQ2XFn4O8qsyWVzYlLlH5a5+mZNd2YMNyc010bXUWhg1gt5BYqOK8NrHw2t0BgFfCdE6Leebd6bMWCXdEzhnVj3z6iDsAUFrz6u9MOtT7IZXtBH5/VRqTayoI8qbKk1W8oQKKJkDWRa8eIupL7FreNy66TQOEStuLV30Tq4RC4GVN5oswXgqB9mBZngLo3oU5W9eHGHwAJ9Lx5ECztQdqeZcQsDjgMwGoXGEUX44Y5U2znbOrikGC4YSR4ybSioB5QYoCdOWBTA7vHn7YPLjnyDhS1R9cHPcUmrzovWD85eHJ8LAxqCJyCUKGNN9IDGqL1iDVExcvniW35rlo9NElBj54zEGlRrWMMVtSu7ak5glUEQa2gEr1Ch1tCEqD1ZMSVUjozeV3BEa+QVyjsq0qydDtG0la816D5BwMEvsL11dJLqnrySs0aFfMM4zGr/TLbrt6/eiIIav3/zk+A23F1WiPDiDZ+x9NYOhebARN0RVVvh3NObfIAlE7d0sGP7NFM98KWa4DJH5J4nq667M4Yb42r0ER8Prf7h+sh/XB8dmLdo3Fmdr6D3FzWenNaTR62h9eS0DEE07tyaLaWwCQvm0PNNa0IgRx/MWYSJ7LPN62OqG2Mb10aVGKB88kT+yWPZx0OrvOP5jXH17Unt/Vnj4KJ9cNE2LHNNqvxw1gI6wMpUoglOq4OTKj/K1CVjHG46COyDOM3gL1pDZZiGklyPRnEwmIfNASoOoGqVaYrZRPYwW+8UHUkuUIfOIY4G2w9mWzQuyTKGDzxorn6Qre3jTMqyKSzoFVzhQv4A24unPgVFAdUaiB3CAAK55JQA2GZ9CtUaItTgKNLnh9QKXXSmKviJNGE5ZYbDIonHOe/lw2nGz7liRDR/pa/FWg1+T7zmxGvAuICEoYuGGAlABXFXNxUq0YQW9NFVc2LDlTUGirCV5oNdiz12obgoqj0dCrxXUPJQrQFOKlbcSZT2aATLU6G0hMJalX2UqF0bKKzAoYwb0nddfPHNF1+9FFCDbbvywtDveY9yrsQQVRkiZrSLDSX6k0cNvtbg25PG7jk4mI4ojas4Co2jSH5b5y3ovIVJVeDZOkoD8/Ux1Y1xNcIQf3/1yX2JYcOVRZWhceewhaHzFQyBotaT13nzaldWaU/LrUlax9hwZdcdGZSX4wrv/VnjrUnt9aeqq6PKa6NKSNE/fiK/OqK8Nrp+ZViBhuXms80707oHc5YHc+ZhmfvpmmdY5oLdMXpXFBEw45zdDC8YojPq4LwuuqCPLuijy8b4qjmxbIwvGWMySxL2fzpvwRoqe5NNNA6M2RbcX2vbp1t7F819wc4XZpwomGvbp7hR4HXGF+LMAFuBM4lsO+LFnVihU8FCGgQxKGiRLDNeI+gHMBUaR0JtuH8BuScUFmwD5QWPHWz/9QXKe/zaGMRgpMI7dKBPIbUYIQgxo/jmHTXHxZc0lz3jsINUHvw0pwtQLnu6G15yytmFsed/eczGQCJnjUyt4xhqDBQhSl4yxiWb4TldVKqNzLIzAVUGHs/rozJLctOTNwZLuEOQvqtr63TnjHQT6FBEhQZsEzNcAIqICmUDlA5kpCv7cOURTV7pjaZLkqgN1p68OLp4AZlMJxGaz5FnLl5vfvjphx9/es3JQ1+/+amX/vwf2NBOe9w9PamyGoyPIyekoD0/ckkGJ+qI1Ryx2rIxjrfkmSowuOSAC/lf++d/f/XJ9afra9akIVBEb6L15Ddc2U1PXucrYJVL48ltuLKgPAAoeI7Snlba0zJzAhHNks3w6JpnaNnxQGq+JzHekxjvTuseSM0PF6yPlhwDi7ahZcfEum9i3Tex7seMDRO1ZVN82RRfNccXDTGpNrxoiMosSSykLxnjC4bYjCZMk2CwYnJrat2R2XBmNJ6cLVINZ9u8FXi+fkjnCsrF1sFl+/CzGt2COLFguXVSbAr+kVS44vvECjtIM6FVhc6KZGEH25AkOkYUC7sFdd417LBBm0fsJlSDR6ymgMoLV/j+6RcoEEjsUNo63mKBr4CMtzYpqDgOzl7snT5n7YlQuQAXji5eHENvfv7ihCNKgSkk8aAPnrBFOMx6ensZ/jjjUOb4QrDVQLArTV6JUxCMvGI1g78I09BlU3zFnID/wIIhtmSML+ij8/qYVBfBDQNWaYhoDGfbRIX2Xr08G4qfy6GG2L8LvUkvD8rZeb1FryEaoFCUvLCJvn9BpMY55a19+/3X371+S7zrm5/YprxQcXRGKj1IQePYLm0osTXEaFC5QWc5xTph/aQDFvzBmFGYbgQyrQ1XdsEQWzDE5vVRAMeNcfV7D6S/u/Lko6EVqTas8xa0nrzeX9xwZTccaYHp8Oa0npzWkzP4i3pfAchiDJTQs+h8Bb2voPHkVM6sxp1V2tMyS1JmSSwj2EIdYsR4EHTmpCowLbQeoUVDDG5AS8a4zJJcdwgCs1VzXGZNLRhiy8b4ijkBreqiIbZmTcmtSaU9vWpOoEVCvKvOV8BKCNisRGk3U93PshVmNLdNNvusMaslPKhuC71ogZmM4haUFExZmH4028ZmWrqyHy8KejBKrif7lmztkHgNlM2QewEvmrvn9Z2zFictJw4CZMch31Ocv4BkA3ablfZJizUprW5xOs9rwEOQfdvPAT20gy9MbZgaFbwDqhua6fBCjyOwIawS4UOkf+7A84/Yyj8t++NErbYpteggXtjB8rEtUjUGSihmyWCNhv0r5gRsHOCpYQyWHLGaP91iCXsHvRso1KdzpMYpleqoNQQqlGk0BODoqji6aw22KU8dCtUaRGp0FuRZmgEGKPwGyjcvWaAB/HhAhUKy8cNPonADKj1e/8wWbAc1+N6k2Dzmrb0ElpjTklOLjn+r3f7ItL2DF8IcLCNEc04XlWhCE0r/A6n56ojivfvSj4ZWZtQhna+g9ea13rzald1wZTWenN5XMPoLxkBR5ytg4xPBYiBNTcGSJVQxh8rGQMnoL+IJEAgvGWO41FF5LhnjUl1kyRhbNcfRZcCxAraxa7YURrzAHaU9vcJuODJLUmZJLhqidOpgiLNmTakcGTC1Rn+Bd4LD0XUr2D4jewveWAD3BFI6i7gMjGMiuW1vshnIbGEnBWDhSWJprelLNb3JRji3Hc4JlQ5rcA5y9UPkv2GGItqJbOyeg+OkzoJABMBxzLhSmlzSDKXNqgxen07EJ1oSYMQhc+7oIALDBUGQSmBxLijEBFaF/xSTuh9fdPbrIADBA+pfTtingHcHZ8IGSltAjfNyS6ij4ecKRYwrXreGKwQcWk8eszyNO4fzcN2RgZuJKViyR6qwekQXKZp9dly8ds6w9sJToXxsEt4mxmXsxnsKDb7cECVFk1iDOqMqxwzgVg1Mp5AaJCcJMShsgCLmNX74iY43P/xvshF9zUhQntQQz1AIMtCcoz8nCxZSoXWUXYwKpdBQgRYlq9Wdc3CE7nhdZklObQQnlH6pNiLVRZ4qfPckRgw+xxTeTW8ePOiGK4dCw+AvABTMobIpWDIHy5ZQyRwsI5fQGq5gbdQSKllDZVOwhAYHbz/UYmAfFPa03Jqkt3/DlVXY0ypHRsWVDBuuzAaEIbbkiimxYIjJrSkAx7Ixjp4FJiAKWwq3I5RC5nDFHqmEcm2exKL+DjUFgoiwEIGRCk2gtvYvq+2TbHU/U92Psn0E1BcYxDrjdRccd1JNe6TiSTa8yYY7Xg9lhZ0UlCGR/DYtpxC3D9YNYxqqZlE4bO1doG/C+jwoAH72gXJAQA0mKiW1GEEGycbQRQtKjfMudDg+fyFgAVUT/H8vXvBPIHmYCDjw+xyx+gXPF775xYujC6Yu4woNoAbBNC5gnNu52mGqsh/JCbkTjljNGChhoxcWJ6ZgyRgo4Y5lDBQt4YojVgtkWiTT4Ctxfj8NVwfNXHuX1rpqDZBThY6WXJT2SnoNkSuPKKeCuwyFBXlRchKo0K9YDMorLtCAyUN/fP2mU3FQlSFSavDFCIcazWOc8b2kBv2W0HSh3KBGnSgPUb0EU4NC4yic29a4c9Pq4NM1z7Q6CCZiRO6+PS5lqdkAACAASURBVKW7/lQ1uGiXWZJoMjdcGY07p/cXjcGSMVgyC+9l2RwqW0IlW7hii1QdsZo32XTFa5Zw2RQsYZ3cHCrbI1UUI+Zg2RgsgVs1+MGY5ECLAJIwrMF/AVikRkU1oRQaFqFGXTEnFPYUEEftyq470kZ/wRIq2yIV5LYHsy0qMnFa4FoluzMhZOTgguLO2oef4VWCUhB7aNhnCWS23PG6LVIxh8qoLByxqjNWMwfLlnAFRlL+9JY/3RKAo7iDoSzZl9Kvwb+JKGjpsm8fftbavwBYkP6C+IjDzsLomaAo52wEGcS8ODjrutQFkoLxF3jMFxqEFPjUMY8IXOkhLNedd4AGvxLNjOmrDoUy5znVSvQXUa1BlS+AA/kMqDgQPeFLNr3JpifREFK143W4Q8OUgDc9okuDBotMNHHKd+uVnxP11QRSQ2C1Czuxwk68R0suRo2yEOCITXka9woiEe66Y7YaXWNX2kARBiiv3rzqtCc/EJEhqDbeNkPpVW10UAPSIOjbRZBR2jqqtE8r7dOuDoUjQavd82oSt+KFS5b3zKEyllmxwbHpyS+b4sOrrnsSY/+cRdiXd+dwYMXDEqpYwxVnvO6MCaYSjmjNHqm6E3Uq1B3RmjteJ4MsV7xuC5dtkao9UrFGqrZwxRquoFqxhCpGfwEON3pfQecrGPxFg7+I3TmtN4/SQ+lIr9lSKmd2xZRYMSVklqTClgT5umZLKe3pDRdKoaIlVLaEKv5UE71DsrwXK2x34nxrB9X2aWP3DEIv4fTdOQMzipshkJdMH6Au9SYbcH8wBkubnpw5WDb4izpvQePOGvxFo79oCZXxl3qTjWAWwLETyW8jRQHVB6EGL7oBauC9o5wkokjbB5eY2JHNF3ZPCo0jXutFVQnZjgqU54Xg68NLTum/nRLjvIMaQAR0HwIusG8orMMxUGCFzIvD7qcJhQYjX+kX4wUmItSgcUaeWyHD6xbJbYezbTBxcDCA4TsWC3EnoOVvSCIJMiqc1KrCDC96USNbOwAEoEPheVCO2uA3UDogwoCjy1lDYMdY/ApG7HyawRdffccHGrxkgQavOEaDFlIAHN+/+fH1Dz+++eHHNz3tyc+gBoejIlsNYReLDVB4pUavyqXBzk78FwYN644MWExbpGoMljSenNyamtVGxhTeZWNc7yuo2awE9YItUrWGK45YzRWv26M1d6LhSdTdzLwf/r14gBtFINPyJhu4OcDDxhGrWcIVU6Bk8BeF+jNQNIfKen/BGCiag2VjoGgMlDTu3KYnr3FnsbCvsKdVzqzMklDY0xvOjNKeVjoya9ak0p5WObM6bx6Q4YzWvMmmP90Ksto1Vz8UXLzrh7n6QaF53Ny7aB1c7B5/3tn32z0XLr/jz1sHl2DpqGSNFXfc8Zo/3fIkGigu0BapnBm8epuenDFYskcq7njdk2z60lu+9JaLBUGjT4HNVII5EtJyCrfVdi4kJLGSEIJCiEdJcIHLL1c/xHorVRmkBCXOUqS/4Cem/JD1hB+XMNbjmF3/byE7zjt8xyHHnhyyaghdycHZcyzF49cTrJL3L7eYQEZQavYYTUHkkuaMOQVeqbADrTcCGRPMfafE/Nl4sk988nNKjUq3jSZQA6LPeHE3ynTAIolX7ySFF32JBje8MLTBpRlArEG1Bm/GQxko5BtKtOir151hypsffnr9w48/pysX1xq8uJA/aBZN4M3jRbV9UmmfEvEBHUeDWSdCuwF7O1e87ojWDP6izldQu3MqZ2bZGFs0xGjIqnHnjP6iMVCyRaq2aNURrTnjdUCAMyp8B1jaeJONQKblSTYC6a1gpgU0wSKZJ9m0RaqWUAlpN+Zg2RGrouw0+IvYVWW2ekWDv7jpyW04M8LSrT29ZhVW5hT21JottWZNrdlSq+a4ypHR+QrmYMkWqcJry5NsCm4X+e1EaRfCTVhsVJhPIr/Hgfs5gAMaJMB0prqfqe4ny7uJ0l4w2w5mtpzxuiVY2nBloENV2FI6rwBqGnfO6C9YQhW9r2AJV1zxui1a9SYbvvRWILMVyQm/D66EbO0wWd6j8HGgf4uNJAnLUH202W9Isa+52mFz74JciPfZYFUk3xJNOk67lVo8oMDm64TJN/g2RMSD8DXF4XmXBoQhiLBxSxo22pFpHQgRUPD75W/+IgE0NPgkhiYJZoqxj3lOiMlQoPPdqEOvsFUUvtbgxRr4zp3K4m3OGvhIvLibYNuufOmRLO9lawf5+iEG6vxPR62xRWY8yMf84pvnXwsSL6FDefmGlBpMUf7T92+EWuN7Bhn8YKUXOLrYULIVKzSEbNcSW2Yrc95QPBzQL13lEJesEwUShHl8BbMt2FLZozWdN7/hyqocGVwV87ook3jljP6iOVg2+ougMGDMC6yBTaYn0XAnGt5k05NsuOL1YKblSdQZZGwFs218HDa81nDZk2z4Uk1ruNyBrVjNHCwb/ZCE5PAvjMLXHRm5NSm3JhcMMQxfIevC0F7tymo8OaO/YI9UQEx6k01YaeIq7SSS1Q7r7JpsH37WZpujtOJBg4lq+wRJ9KWt4zybDiZKu0BGM4JIbSmZJSGzJBX29LIpvmZLoSLT+QpoWHyppisOuqceSG9hKZOZEu5n2GI+Cd75fSeBwOaUrFCd7x5/3jq4rLRP2oefiaTitNJ6xiQSAmpw+s5TTjzeiykdkSjDneNuBQfhBboV4BSw45CVGHxXAsjgRycNli3Qe9vnj0LzuNg8wkHTgAInd+S10Uxr00GNzlXAWnLMDXrbE9pbo7qS2FACCzZKo4HaHsEHdShUNvJlDk+FUoeCAUrHLpRXajDI6Jq/vunABDdV+YnEo2/Ra+QZD8r3JuTuxc9HiPIBCQQ4B6LXmH9Ug1uoR7mBXW9/essWqWrcWYU9vWpOKGwpCGw07pwxUNJ68yCxTcGSJVyBLx46DhTtrngd14Yn0UCT4k9v4bPYB4Gzli/VdCca4LE8ibozWnUz3MFhiwjm4NZwGVUP+FEMX5DDqrSnIfJZMsZWTHFEnBmDJTsLbSf3XRi0wEKW3tHG7nmLaaK29s5RPJMDON0VUW7gaLBE1Uz1IFbc8aWa9kgFL9SKKY5fbNEQg2xE5UjrvAVzqGwMlsD72CMVT6LhSTaD2RaWaCP57UhhJ1Hahf8gYv54gVClfYJNZao7iLmAyqu5d7EvCDo62i3ShqMTwePTbv8uvtzoqjguOyJO0pLznU5H6EWcyIUwyiX7jwOOyyC2hS/oyEyI/kx+CPr3D956q9JN9vPfjb9o6eQXMRp0+UDixeu7osyH7eeaFNG+vFBrsLk+jdXJcLBjq3EhhMg/Z6QGBigvuQ7lFTte//ATTWFfM1AQoQZvLIoPvl2vIXoRq8xOjm+GeR6UxzxSlzfYPAWSXogdsQWA1ZJFQ0yQXRrjWOuAdsvoL4KJQGXBAKIBaPAmm/DdQxGB6wTOvXDlBXZ4Eg2MHpzxOiJzBKIkWrNFqpB7IEVR5ytg7WXdkVk1x2WWJAKNpNqwRBOa3ghMq4NSXQTBRdZwxRaugFIRLku2lQAuGbcpehdb+5et/QvezGb76LM261BaB5dNFvCD1619+Flz/6K2fZqrHUaEte6y1pNHn7JsjC8Z4zJLYo3NgJGBgMm0LVKxRaqeRMMRrflSzUBmK8JMX5AznODiF3Aqd857BhwsPEWQSLUOLqkdOGRNRFelcCnMTUTtiejfk8vOE865CFi+eeELE8DKCWtnaBCDAQq1J1RiiCAD9yqy/KWWhE5v2ucudRtQ8VVJhclqK9zFyaNDZ/DJrgXRwJVQo0TOGtwMRRij9My/RGwoL/qi9fxOdU/brmThdS6gBiRe2JGHxAuo0Vl4Za1Kt9zrR4IPSM57LQLFbGievbIk06BbEz9S5du5qlB3nBDyUa3Bj2DDuW1fqumM163hisaTW7MmocWSW5Ok7NKDaAgUdb4CrmrwGsALKjqADq543RWvu+Ow6m2A1PAL/r0NHPigN9lwxGq2SNUZq2HCgnmK3lcw+IsY3CgdaYVNaAGw2zqh9I3K3Y+WHWMKL4BjzZYyB0vOaBUXJC2wUy4WH7/W2r+AFptKx93jz5v7F6w9+YwWPeiuhdMd45Vi8whScVuksu5Iy62ClmTZGF8yxJZNCYVNEKRo3Dk9lG/hiilQtEWqVIv5Us0gR45iEMBHhIpWNhuUwXMg5GO1Dz8DdyCMMC5eQF7F1wWn3WUCNSY8M4qnnX3WpfLkW5VT7iM81pCs64jNcQXzjosXh4y1FRqTA2HITb0J357wWmceOAhT+GJETFvQUul214SVF1nxM5Teg2tShOErEwF3BijMZWOPOhRstRGUgKXKc6YehFO1TprBF3iDRHlrIhcv8vKiuoPfZBOpy/kq4y2oIXpZef6MT3ZqkAsz97oQK0OqeMFYdFfI8g5mW53uIFTWeHJw64Lttc6bx0RT7ytARW70F+1RoVKgisMVq+GScHIfFMpyNjPDx92JBkLJnLGaPVpzRKtOIXykgnwAyMZ0vsKmJweBBhbVZtShSVVgYt2PLLi+WfOwzDWx7pNqwxp3zhquoAUg971M9SBDSSiMdIQj2/ZhxwsLAm3cvdvczihYyfrOOQ7wCO2Dy2r7NFc/TJR2bZGq0p5eMkTRJc3ro1JteE4XXTLGYV+qcmSwKIyJsjVcsUUq9kjFFa95Eo2QEMi2CwkpuU6S6IguGNEMb2vvoto+AWoccpMO3kz4uKezOOH7Dr6R4b7qpIf+IH3nKV+JXHYhyyl7Gk1bDrpRA7XbFksRpfT24lYXSUH8RW9vQgusoh6kymZPXZpGRgnBkqrKqTbeWnHg55KpEje46fLvEtUa5NjGFxqiHrPKUAOyvWOGGs85iRfVGmRNzoOFQIj+8BPNVkStyhuO9XiLNpR/EfneTJCskltRTz1WZY1f1xhl56yxc4YLADIE1A6ueB1bAJZwxRoqW8IVAg5y5RGalLgwbfUmm85YzUkCjSQI0aYv2cQT4LXpTTZ9ySY9wRWv28IVZ6xmi1RskQpEH5ZQRefN48dp3Fm5NYUNWqk2Mq70j6/7n655Hy05+ucttye1Nyc0T1ZdKDc07ixEVoFMi0TcpOkqt06aexfggMpbR7XtU7yGtDOGgSv4AiQVoaIut44r7ZNs7QAEKkv6Oyk0jrL1Q3e8jtS1FVNi2Rib10dn2XL3vD66aIhiwqJyZnTewqYnb2FMB1VbZGVO8mTBlaPWCeMhPSuAA1ajVUaFCkMNpuCiBTPc1o5Ze8LjAlGkPFLwLsSdYe1FlzuxaOXkglbgLzsFCMYuIiXo9uFnzf0LOkWJ+MS1SrDO6xgL3VvCfNFR6lGLA9Ppftnx4GGfJYKjytOl26dY1ecnvnl2ZGtk0iWIx0VDk0RZjBodk2GGULjo0FpiR/7ss6+QnNSV7cpRoXxjAh9Awghy6yFbDYKMt9QaRCB3oy+rYPmOo8eCmZCFRsfACyAxOpRgtmUMFDGz9CabnkTdzdRZlpDAL8C5Cw0LRL7QcQkajfQWehP6r6DGSW8FMi0v17l4Eg3QqFi6RVlhj1ScsZopWDJCe+ovaD35dUd60RDFwuu0OjQq94zK3INLjnsS46cTmmuj6/dmDCNyj1QbUdrTOm8ev78/1WTragcY3ZXY4iMutgJzTMFL0eI3ODhZwe7xFzvHn5NLHd3wG7vnuPVlqgfOeF3lSK/ZUqBC4ffxTOWfVofmdNEFfXTZFF81J6BSE+SwrL8TMDcphNGy83KXdMq4fqjMJD83Mk/B2PWEOX1RQUGTVxErcfozVEVvxUF9zWl3vyMiRzoP2JiGnk8SL+I1IKVrMDpDuL0zpMhW97PMxEgkg6a5Ia8TL/GaCFaIVZilcJ3r6ahheStdyvcpPL1SYC5KkKtmWV487aqJxBqYzXU0e9x3bnAZKCcsOakLNShKvkudIQxZO9rQ7j4FjYlIZt6FGnnudRRVHMR0Qt8lGiyJXiOKYqP6DXfdZHnPEirp/UVbpAqa0xWvO6M1S6hsCBRhF4oqAwNOaL0wNPGnmsRZkGjPl94KZlvhbDuYbfnTrWC2TYlk8FxCewKFKDoja7gCeagpWNJ5CwhnllkSi4bYtDo4ofQPy9wP5iy3p3S3p/VXR5RXR5X3JMaJdf+GK6P3F7SenDlYCue2/ektrLHnaoe4XcPePs98BnL1wyI7BXH329q7AG/X2D3HUBOy7m0u8RwNDpgFLHdn64f+9NaGKyO3ppT2NLqS2c3wpCowrvRPqgKTqsC8Pjqvjy0aYjJLAkpWnbdgCpYwjbJFq4iJDDHZe6y4kyxDZcS0Q11GLyd0H8MdDOpM3nBU0INzfsInHHN50nN5n3XzFKKO5uhnglTEYNQtJEM5A46Wyg3aCQQCYs00WzukNPZkeTfds9YBzUHvLkVHxMUxGlX6CDvqrNDgYYLftKgLnxInpJAIm9QidA0SgnSlNNY6wXqi665Je2tsgPLFV98JvMZ333/13fdw1mBJKCTx+onGKKKlNfoUjylv71CYoEXc8oEK5esxjoxhr9H2GY8avYwUyg3gAigMyKWhCpVZknJrCiKOTU+ukxsQrXmTTV96C/W2P9VEPnsgvRXItMLZNlGeAkzE66FsO5BpIQPRHq1BFcpWWgTU0LizUExhQVaiCY0pfKNy78MF2+1p/Y1xtWDkM2OYVAXk1qTWk0ORYg1XkKjoY8ARYyuneF/TQprREZN7CQmgsEuhrAC8x7XtU7KcYmzcMe7wte3TYvM4WzvwJBoySxL6N7k1Kbello1xiSY0rQ7BAHlqIzijCWMUxa3k5kAYGYMlc6jsjNcDGW4cy1ykqG3JcoFApa3jKru1tvYvsQjbtXvGVKFnzKyYn6GcffY1DxZUWYi4z15C5ITLjuw856Kro+lqcBg5CnaDqFCGGsJeFd20eb0236+RmAUgkuOuAhJfcN0HzvyOzqB3hiJcC9z1Qm0LMRG9OcpFTmxWaAj4heKI96/AqisvLevaduVQgxNrfE8uXkSF8gfAgnx6CEHe/EDSrx/fXmsQXfTWWgPJt6KhdG+tUeV6mRpTnVeZT0+ufuhPtxT2NDbQFYIpRnLZGIdTI5QIUHxZQhVHrOaM1YSuJNkMYFWMk4HiU/70lj+95Us1odf0pZq2SMURq9kjFQwjUa4bgyU21i1oPLl1R1phTy8YolJtZFTuHZW7H6+67s2a7k7rgRe3p3QP563LxviGM4M9fXOwZAtXLKFyIL0VyW2Hc9uhbAvFf4xbV+ddVYgDw/va4hxucIqD/Ec5VmMvFF5AvGLGQGnFFFe7suZgWeUU1nnxa09tBCdVHeuQeX0UziAwSUTyNr6Q6BhUZ8zWuDOO5SztjhjSCWMdDPOg7+ZdMHohgGc3RBf5qQgpemnU7o8ItMhlN+HaTX+cfvYVVlQwgqX0k0r7RGSBk+DiEcnGmXjHLou92kGm1jFhpW6F+nHRPAVUaI27QQqpKHz/wlMh3EVR48Zn/BXHq8s6vUyzU/6Uto4F2No5q7RPYDKMuf7J5ZcXTEv+ghugkGMob+T1qqdPAYvB6746kMFByVtqDTp1iuwXrbFhPmhkAkj6G0S8Ue9Ba7LZ6r47Xl8yxseV/hm1YAw9se4fXfOOyD1SXQR7pXphFiBQeuAyoJIIZFqhbMuXagq7RgwyApktT6KBvHVnrG6P1hC8jlrd6C+iwNn05LHcsWJOLBiiks3w+Lp/cMn+eNV1X2ruk5rvzhjvTOs/ndDcfLb5ZNUFKyBHtArFhzted8SqoFSwxo7SBtdkAp7AQqLiDlEJEHFU2ifQODdZbB1HLZ8Wm0f4VImFEoAiVTmzcmsSu3ymQBEORgp7etmUgLflpMo/tREEduAjc7rovD5KL6bWk0evh8FTMNvCqhsTGnVCeoiiJykHeA1mDvicrzhEJUPXlOSCA5FurvT44i1Dli7UuOhSbYinvN3lBgofoAbtnlTYbiv8jcgPLcpWBMO5bejuiSSmYoScbzLVgzzXrfR24nT9oz2BLqnWvcnJLCM67Qx9nHGoHYqQGFxqYXhNGrtDn5KpTY3RKCTP4/fWugYo3wly8pccZHRWUbqbFB4g6DG6lb/nrwFLHr7WqJKghf2F/OoO/5rWuqG3U2vsnOE6qe2cZWoH/lRT5cw8U/kfLdkHFmwP5sx3Jca+WfOE0q+wp1XOjClYcsbqrrjAmKKgQI0tMBoZhJJtCStk2ZYn2WTPryOxHduumEdCDwLHc6U9Pa+PzuujM+rQ9Ebg8Yrr4YINSXF3p/W3JrWfTmhuTWrvzRjmdBGdN28JV9zxusFfMAVLpkDRm2q64jXanQtkWv50yyd45Gyn4d2QaSHogGby6cp+qryH16reffaUW4KtuejULDaPstV9jSeHrCZIXUxBwc1MYUuumBMLhtjEun9yIzAq94zKvePr/kmVX6qLSDQhCNWw+G/wCzoO4C/Eo0zLLJRFAA4mrxbe+ubeBSavtIou2F4Qo8F4DV4netbNSvDcJz2fj4btwAGHCGL9aPco9+yyM4hF0lqLzVxLW8cFFmVASx/R/HY4tw1bgyBqLrawg4ME3fDd4alHupLFZTVrTPhLg2coO7lKTJRQ45yBCU34UTH/nXkepHNB0dCX4U6T+ZIfnD0//eyrC44KfQEXr245+es3PyEDBUhB2yivf/jp1ZsfKWj+DScV/f7NT9+//oHKkLegRu/4mi8iCCYIAin0gKeaa5wCl0B3i0l9C83jRGnXk2xuevIyS2JGExxZdfXPW5+sumSWBJYsbBFhdY3mJiA4wETSRjPNZUE3OGM1e6TqjNX0vjy0T5uevMqRxohB484pbKklY2zBEIMb4KjcPbjk6Js13ZMYbz7bvDGuvvls8+aE5p7EOLrm0bizTBhWtYQr5lDZEq44olVPsulJNvGDoDFzJxqsmWoQ5YFdWFQcmeo+bfpU26ei21dp65iI/ULjKFc/KDSOstX9YKbliteCmZY/3XLEqr5UE+yM3lcgExCpLjKtDo6v+5FH+2jJMQ73I21kVhtBw6L15M2hMnV8ADuyFySWnvoUUn8BNXA/F4IRuNW1U646OBWxmBddpUGn1oAg/eJnywcBLy6+pHQ4/pkiuQd++gGfz8gcyVP8IjzbgkeRiBMpkGmFcm3ABzE+jC0WxHs8cLyFImXMBcu7edt+Cte2CF/CJmtCihAXtsgfwCC+chEGN1zZQgulHS35pYAaL9je2tffvf6Gy1vjteSvf/jp1esfRB+BdoMY0G6zrx/FqMFPoURKGKoaRIxGmaXPk8VAh17mkLLKtj+3mEE+uhVcKonSbiDTMofKMktyTOGd00WFGWe4gvIBugxUHOjMA5mtYLblS2/50y0YUrjjdQxZHbGqJVSyhiumQMnoL2KVVunIkDGkzJKQaiMLhtjURnBC6Xu65hlctN2VmO7OGFBlfDqhuTG20ScxTKz7db6CIyZsymKoaQlVjAHBkdASrqCNwh4t/gscCWZbwWxbIG4zWzgp2bLzAU34cHLHWS/Dy42x5gSBCay9ghk4ANbJdUrjzqkc6RVTQrIZntoITKz7h2Wup2ueCaVvaiOIP3PZFFfY02p3btOTR8UBkYtAjua2RW63fKRYtS10KDTdxA3tkLGh/zO7efnl8cWXXYXGZZesg2cr3vq1PC3aJQzj5RvnXZlJpa1jJK0lSruoI/BG0GBeUP2wuxFK11C2Fcy2w6xz6ZDEHS1pp/qm67naXRRQ507G5RV+YsCujjrzoOFTnfnYU35xvME1OPgq/kuIXwdqnF52TIZffPPqy29fff3t99++esOzob2q0NdvyGWDDL46inJ6AsW1iVEjz02SuQ6lgxq9HddbWj7O1IDIIbIpJt9a3BnQvUfy25ZQRaIJjco98/rohivLkxpYXRNmKGyAAlceJ6veLaEKNllNwRLcA3GpIyNWbk0qbCk42c/roxPrPlxmQ8vOwSUHIiCvja7fGFffGNu4MbbRP2eWbIa1npwpUEJ8BjhakXsQTEyxzwJtlS1ccURr8LxA84IlukCmxQslEkJewU4w2woIvEzLnxKKKbRjnkSjY1Ne2IkXd0PZViS/jYmSO9EAZaPx5NZsqWVzAhzHsMw1pvBNKP0IH5zVRkA8rzsy2L6zhiueRANtXTjbRocP0wco1vKc9SmhBvZo+DV5iinoFVzAoefvDEpEjuQ00D1mpsHUxXSmJxddtQxPeaAUah1c8qiRquyj0CDIwIYOakasF7gZ10NIitsSRWSSCw4vQueriRo3znhrz/7Wg99t4VXXNe4x/3EeUAhxGsyAdottKgsbKJyzBjPX+J5IDTLm6RJ6cccrkn5xxAfbkf1RvL2W59jQbtQ4JcK2xgn7RXOWLnZDQI1TOICJa42DS8IOrujYD2ZaKmdmRh16OG+d2ggYA0VHtOZNNnBPIGcN0KJupiu3R6q4Vo2BkilYsoTg+1g00njVllqzJuGasWpOzOuj8CIcXnU9WXU9WnI8XLDdntJ9OqHBtPXms80bYxu3J7UrpjgWwyA8UzkzG64MwlnQGsityTVrCjFxeALu5zA6hSeIoApLt4KZVqywnSjt4lYWzrWD2ZaLLaraIhVjoGQMlPS+Ah7ofIVAeoscscO5NrlOkRcRVgGt4YrOm99wZVbNcclmeFjmfiA1P5CaBxdtYwrf1EYQ6WGwONT5CtZQ2RGt+lNNf1ogOKLC+kPHyAfL++XWSevgEv7jmBajW8FV3WkfLjrXP0k5OpOObkaj8yXc7JYwiMcj+hKCpzPW+5yRqPTyy5PLLw/OXuwcf94+uKRVSfgqwi4gmG0DgtFm4jwxMrM4CHkA9LQ5Hcq2osxnINc1IujSSlDvUOUuCl6Wzl8gvCdgp2Dp7Ti6PcdpcZwEbI3ukoT3NyBeA6hBKi8iRAk4hELj+x/Qj5Co/FXPMluH9eAUHOLt+gx4ZwAAIABJREFUtV6xLXEWf2fjuHcEK+KN6C9sMv91eiGAu8XmUaqy50s14TA6ofRp3DlYhHoTDey5d5Ue8bozXsdGiTlUtobLUH8IhUawpHHnYD6OTfNVc3zNmkJyytRGcGzNOyL3DC07+qTmuxIjwILS2z6d0NwYVy8ZYxuujDFQ0nry647MhitL6fZwOV9mmyCYH8PfmGXH5SHQhOwVdRPoCWzZu2I1R6xmDhSfrtpvjK7dntTel5ruS413pjYlmuCcLmqLVLB4lmbhwInyHoyIkSANNwA4FQkNiye37sgsGKJjCu/NCc2VYcU9iXFoyTGh9Em1kWVjHGFU0IzaozV3vA7f0wjjAkWZgJX2Sevg8uhCSH4VglRY6pJoOMLbiHchAv9xxmscdYcnkYEwtuN41Dhha2+9PMgJU4iigQIbCiU+UaHIggD/5YzVLDSAD3SAwxKu2KJCkQj4CDIZPl6TbO2ANozobCcKD+05pKi8dqv34KFEVJXUOtsuXZbdfNGBra4uyNg9hyp05+jz/dPnh2fPAalwJ0cSStceyktu7ZWWXzth0T/xjhvElYosAntQQ6yxPWKXfRegUoNXaBzyDQuHHWIxXJ1jbuigkBv65snyXjDbtoYrSnt6w5WFxAsTBEi2aIfFGathowT8gilYwrVqYkNWtYAaOehBVs2JJWMMifAz6tAzVWBE7h5YtN+Xmu/MGEBnICwWj6+PqZ7KXdgoxSEzJ5ZNcfhcLBvj0+rgM1VgUuWf3ghOq0NSbWReF0WIhsqZUTmEwBS9r6D3FczBMtwM+W3dZUP4+vDqu7cn+yTGYZlnXOEdWnY8WXFOqgJaT86XaoLagLcgdD5IRSGSz59uueJ1oIbwagTLOl9BZkmOrLqujij+u2/2yvBa36x5RO6e2gguGmLrjozBX3REa7ZIBUliYaFD6cwOMHTECY1aA2oIwSv04gWFj9AIlq5nwhGekjjmvALRe4sblm4EESKXep7DupKun4L2BBZHUAZAM55iSVSgwGisZgyWDIEiRIa8672VsVT2SNXLafCFeUq3ZprnKSpspVXk7kNNDUkZelWnhBqQk/E+HV3cx96FqMToqjWYETRU/6eXX8H+j5+/UjT0t6/evOTmKXxS9Ft3YXmilECkgxrE4fOqDR4L+UKDJCj/f8oNGk3zdZfoMcXPwDwa+b3mUBlXhT1aAyvpjNZQX6Ayt4bKcDPXsohpirFA0IkQqKWPLhpi0+oQqpgJpX9c6RtZ8wws2u5JjDcnN6+PqRAlfWNs4+aE5vak9tbk5t0Z/aIhtmKKw8xixZxYMsaWjPElY3xGHZxRB4eWnY+WHY9XHINLjhG5+5kq8EwVkGrDiH1cs6UU9jScijXuHOhSR6zmiNbs0ZrKke6fMw3OmZ7K3ZLN8KIhhrjZEZlL485ZQpVQru1PN/3prUR5j0+Exi0UaiVcDyi/UT4IerZAadOTn1EHB+Yt7z9c+GBg8f6s6anCN6+Pyq0pjTtnDpWdsZqn08m3I4UdXijJTBxOtw8/Ozx/AfG7IPc6e35CIYxcc8HxnV1c5olIgc74CwpM4rsSqkR6Ry08NhHBAeRCKbR1cFklN/CqMEARUIMpAKHcMbIu0hISgMMSqlhCFVukCm80oAZE9x3vVU73xY9dK2xMXmCbxEQRklA9zzkVl7rdPejaEd10u8YuFIfKqFCqQdChkIsX3AzAbnz+5XfPv35JxjxkAojlVzpesmilrgKEgQitt/E40lVr8EeB/ZHVbtSg3oR/FUTA0TNhEbQob8XLJounx4Pq9lmhceRLNdWurM5bAGrwSGGLVGHwDwWXXrDVEXhKEBlCLoEpvmyKLxvjiH2bUPqeqQJPFb5xhXdY5h5YtPfPW+9M629P6a6PqZALe2N84/aU7p7EeHda/2DO8kzpm9dHl03xFVNiwRCVasPT6iCEmCNyT/+89b7UfE9ivD2l65s1980acUufVAWQD7piisutyRVTHCJ6Y6BkChSt4YrKkZ5U+ed0EYkmJLckFgxRpK4sG+MGf8EWrtgiFaQKRvLbcaY6hTgaJteoQaL57VCuDQI1mG2jLSdndkuoYvAXl82JWxMb7/fPDyzaJ5T+BX1U5cwIalGI8dNbFO9GWw+52mEROY9Hn+2fPm+zpTsyGe4YfJ4/F7UbHZqTK0aItuBjZU9od5Y9WTxVueh+fNmpOCAbheqsM3bdPsVkCrM5aLr86S1Psol+FuaS8JoGwpI/Ex7DFc2fFiS/HdSoHfL3UWpPKu1T+BtRfhC1+Vgnod05+iaFnlBUam1Et94a+V11K8QaTANCjnk8tYFXGNHQJBLlKw4oOAhEXjL44LnSV5Q7LyZEf/qedwDsfzgYjBcIMngpPv0ZtEdYYEaBhJr4m4n44dUcVY7aIPcNQkoePsjKOF3ZNwfLG66snfn6EmrgdmEOlYEUeh+W0IS4E7k1iRAThT1NqYsSTWhGE5ZqIxPrvjGFd0zhHVi0350xgAS9Ma6+/lQlHGOqW5PavlnzwKJtcMk+sGCFenVGE5pY90+s+yfWfZMbwRGZe0TmHl51PZy34MvvSYwP5iwDi7bHK85RuXtC6ZtWB8FQSDYFqRVMxtWurNyalGrD2ENbs6XWHWmNO6dmBu62SAVu7P50y59usbyvAyZ83o2yOHL0KWgxcFPFZIQULo5Y1RquyCyJq8PyDwYWBxdsyKPBD/ImmxgP09RAMNplu/+N3XPcwcignCIdu3qTiy5l5wmrI6iLEdIbuTS2TqABV2h0JKeXHa6EHotkIKeXXwEySKzRYPHx+CsYFSpYrqBWtYTKxoBAfgFYARloIa3hij1SdcXr/vRWJNcmridT68oTqHQXGqxb78ABvoRW5vjBNl/N8U691Mj8HbqQ5pI1al5YCY/ZQqeLPH9xikhtBhzPGXYgh62jNH/15puXr799+QYZS0Il8vLNy24E4XFEbzC88847Uqn0hx9+eOc3v/n3f/iHf0iW2vlOTXXEW6fyfw/1aTz3U+l5Jo8a9EeSZKXRze40uVyy0taxN9lUu3O4K4LypMRGS6gM8gLp8/AWV7JQtTVrClEmyHNeNMSkusjEuu+Zyj8q9wzLXFBD3WPK8Wujymuj6zhuTm7entL1z1uHVpwDi3bESg/LXIMLtmGZe1jmGpYJ7l4DC5b/vDn27x8N/ubDgV9/+PDXH/R/8lh2T2IAcIwpfBBNDMtcREaqHBm1OwcadWojKNWGpdrImjWl8+ZB0cH93BapOGM1R7QayGx5k41gpoVzF44MSRbkFy/uAi+C2RZkF+Hcti/Z8CQaAXipMj9ka7gi1Ybevf3s5rPNMYV31ZzQevOmYAnjXqhsRdtcQI36ztlbUOOic6l3AtD4tDR2/R+xqKQOD3IheIJRQUGCMao1jruDVES8Cf/4uDuSllaHQYXi9Qlm2/5UE6muIDX0vgJ505pDZeTaoIalJQZfeiuSa3dcl3qyoEn3SEwfrauSsRs6SiRjddCZsUj0ggvMQE1EDnS5E/IRCrycrMEWHXHhkAUU2buef/41zMqh4CD4EFjS777vFCBsVwXcBzUywAvSegAy/va3v/3iF7+4devWO0LJ8c47/I7d2zbzep3UjvmhFEEvYQcp50hv31V07ECvck7R062Dy8bOWaK0u+nJGQMl1JZGFkEAmy8tM+/ZcGXlttSaNYUSA8FueLBgiC0ZY7PaCFa8xhTeMYVvROZ+vOIcWLT3zZrvzBhuTmiuja5/MrwGXuP2pLZv1tQ/b3205ABwDC7ZBxdsAwvW/nnL4JJjRO4ZU3hvjm/8+0eDv7vy+I+fjv3x07HffjL020+Gfn91+E+3nn3yeLVPYhhTeJ+pAthtGVxyPF3zLhqiULI/UwWm1aFnKv+8PooFM407awqW9P6CwV9wJxpADW+yEckLyvRwthUv7mbrh8nyLhnkU2ASucUF2e6vJ9m0IE0qWnPFa770liVUGpw3/fXB3OMVB1xabZGqM1b1MZ0+3QZp+AqTIfiqc2EonyO0nWIZ0VwcUlYjjyDnL47PO4Z9WIGjlEZRtFoXo8HFu76V1zi9/IqAhh+gwF4AqIGtkyATEDtiNXOojCCLDmoEy9TNoT1xMDdJcngXdmE51OA10ESF5uuHWcEjYx+/QKy4g2xNkpa54nXkvOFlD2ZbMc4xVNidYz+LX73lJy+86x8/shUM8Q8Ebx4ksJ0wezTiRzFb+eKr7xB6AATp4AhLnxfYU74AefXmu1dvABmEFe9cu3btnXfeiefqecK85lvmzAQWogGtCB1F1QdVViTa71AbO2db3XNp1FqFxpE9UtV68tZQmeJLCCzAd6qcGRZWkoB3MR5gYjKvjyKPenIj+HTNO6bwjcg9wzLPk1XXwKL93qzp5rPN609VnzxZ+/ix7JMn8muj632zpsElx8CC7cmq69GS/fGK8/GK8+G8tX/OfF9qvj9rvDut++Dhwr/+5c6//OnTf/3Lnd9+/OjXH/T/5sOB31158p83x/98d/r9/vkPB5c+eSIfXLQPLtmHZR6INUdkrv4589Cy49GSY0Tuwbrq9EZg2RhX2JIyS0LlzOh8BW+iAdI3wnqQeHEHafI4ETPV/Sxzu06W96KFHdrsRMMSyLT86S1ruGwNCyaA7njdGi6rHOn3++fuTGmn1UHYJtNOCjoU8KwprtaA5xivCmVJaC8OuLAS+FwcsdAj5iTOYIJ/zsWL426woD1aPsCVQpVOLr88Zs2OuFW5/PIEGyinz7FM3GBbwnSTD+cE1MAKD0pUeDLBMAEhmIQaNOeilo2fQ1OHUtvurJARaghERv2QMAs2Dk62RYlimfYkXMjBYvFuMLtnOsA90c/lZakiKSr0qURwwLFl9/jzw/OOzyuvi0PbguoDBchzdkAV9iXBx7fff/Py9Tcvv/+WQOTVm5kZyS9+8Yu//e1vv/3tb3/5y1++8w//8A9Gq4vvtXr7DqJ8eNW5aNtNqEe6LRhJjS+yXeQ3fKhPgUlvY/c8nNtGojc03Uh4xkgV+YlKbtd+0RCb00UXDLEFfXTJGJ/TRaXayLQ6OLURHFOAzvANy9yoIGC9c31MdWV4DSHV15+qbk/p+mZNaDGGlh1QWD5d847KvfjIfan5yvDaf92Z+uOnY7+78vhXH/T/7srj31998puPBv5wbeRPt5795d7Mh4NLHwwsfvJEfvPZ5v1Z0wPGmIJGGVxyPFX4nqw4R+XuJyvOGXVwXh9dMSfUrqzGnTUGis543RIqu+P1YKYlFBq5NnpslBg0CARY0INkeS+UawezbYTRkwzMk2gIpXi4fH9Ge2V4bULpV9hS1nDFk6jD7oivmXHTg9fG1v7l/unzbeZyetAJVe1UCgcsbYBOU4IDQoSuB1xJwoe2dmCCi1/j46C7xrRsca5rA2X7FMZIAoYWhBhXUKGWkMCIGfxFUBtADYHXYIQoBihBltKIdKscu4mKPOtqbMO9wDkJA7CQWQ+8QESpho35AFsW5l8Lx2xaDqJZOLEqVHTgF+id2gry652ueQofqcmXbGc8fHQjiAAiX7988fVLIAgpxL55KRQgn3/x1aef3nznnXd++ctfnp+fvyMYkzAvSVEXxxcaQApe1pFndoYi1OD+SLiZn0EqymdMCHs73HgFXmat/ctc7dAcLBFqwJ1YaU8rbakVUxz8xao5AfPuBX0U3p9SXWReF4U0A73AuNI3ofSPyt3989aBRcd9qeX2lO7mhObqiPKTJ/JPnsivj6k+ndD0zZrvSYyPlhxPFb5RuWdSFZjaCE6rQ0/XPGMK77DMNbTsuD2pvTqiuDK89v7Dhf+8NfGH6yN/uvXsD9dG3r09+ee7M+/3z380tHJleO36U9WtZ5t9s+b+eeuDOWvfrPnerOnujPG+1Dy4aBtcsD2ct44pvKNyz5wusmiILZvi0Hd4EnVnrBbs6Jr3/OktOnvo7hctbENVkakeFLeO88Jdbp/2+jyJhiteMwdLRn8BolWdNzc4Z/zo0fL4ul9hT1vDFTpNqdMhagNSHVgNQ0vOx0cLE77zTqARChBkpsCVD3BwyNKPyOaTjIJ5KoR/IITIc13MyQWnCuOE6gi+x1S4uX9R3z4tt05y9UOQGpH8djjbhqLfEa2Zg2VDoAjRsIAXQQQAC6iB0ZUjVvMlm8FsK8r2hug+Wtw6Lm0doePmdNKnmJugrcOPDmZb7njdGq4Y/UW1K4tVBvgzbLiyMLjUkow4VMbvQGHUHrZvBaUZvnPvcmmpW41Nw5T2AURfHWeDDj99Ie71/gcE+eq7590IguMteg2RD6AwjubakEK3hLR3BPt2a5/OIiyLkyBmtNuPYGvvAqqVxu55INPSMSsdGqnCrRsHpqqwk5BqI5B+zqhDmIBOqvwTSv/YmvfJinNoxTWwaOuft96bNWHr5JMn8o+GVj55LLs2un57SndnWo85yPCqa2LdP6MOQo4t2QxPq4MjcvfwqvO+1HxjbOP6U9W10fUPBhbfvTP17p2p/+6bfb9//q8MMq6NrkNgentK93DBdl9qGpi3PJizPFywPpy39s0aBxet/fO2YZl7VO6RbIbl1hT8ATZcGY07aw6WoNqEfhzB8eFcG0oWtNmkPqK2gviOeGEnlG1ZQ2WtJ6ewp6W6iGQzLNEEZzfDd6c2r40qn655Vc4MaD9svkZ7ag1QWtBodNcazyEqPyBoYEv0xHTyyEL/PeKSWUXVhyjt+YDqETZhEaHGGdtYg2gV+YyoNUSqUOhZeCoUF6qxp8pAk2ILV5yxui/VDCHhtduts+MO2+2byxQiwvuCt8wRrRn9RexYL5viC4bYkjEOkh7yH7zjZHaJPSbwLEIXE6v50lvwbRQJ20W6jwpbzKcOhU1hXxB8d0CZdn+oguO8js4YCXLB5i8iBAEV0oUamZrwAvWiBnimv3+UmIsZ3wQSM8LZB3ACOOZoUufWhylApLV/iREsakuVM4M3YF4fnddFEKci3Qwv6KMSpvicVPkn1n3j6/5xhe/pmufpmmdE7hmRe56sugaXHAOL9rszRkg/P3ki/2BgERzEtdH1mxOauxJT/7xleNU1ofRPq4Ozm+GZzfDkRnByIyDRhCZVwScrzv458z2J8e60DktuV4bXPhpa+ejR8oeDwnFtVIlZ7M1nm/dmTeiG7s8a78+a7s4YgEoP5y0PF2zDq64nK07JZnh2MwxFqd5f0PuLVizjJxph5tPhT2+Fc21cCVR0JMu7yfJetibEeaUq+6nKPu5OnkRjzZp8uua5N627NqoEfg0s2q+OKG5NascVPpUzg0RLQFKChYwmWThgvn5YaZ8ALPi4ST73jPuvsEfPf4o+SzwIfQn1KXz4s7jc4Ea8IgkpCdXhGApVKOZuuHoBr5HCDigedAqWUNngL+q8BbCh2EYReI1gZ4ziYlaJvF9RtnaAG2GFbVc0OBt0nO0Zhubh3LYn0bCGK1pPXmFL4saGd1mqjdAiwrIxLrem1qxJmDaqHBkUIHp/Ue8vmgIlS6jijNV8yWYo24KaRmSPjBEnFewkEqXQDOKh6GU8YjlYNAjvaGqYrIagpFODcAjy+Zffff7ldz21BrPPxWXPh0fxc2mifygR861P6B07dxRvfG4bU63Uub8fJ2ulfeKM1piDeV5mSYCzmFGHUFnM6aISTXhGE5rZDD9TBUbXPKAwJpT+MYX3qcL3eMU5tOIaXLL3z1v7pOY70/ob4+qrI4oPB5fBXF4dUUKmcV9qGVi0jcjdE0ofYGjREMNPmdkMT20EpjYCQ8uOgUVHn8TwQGq+PaklcuSDgcUPBhaZVEx9a1J7a1J7T2LsX7Ddl5puPtu8Pa2/PaUDcPTPWx9IzY9XHI9XHNCGLhhiM+qgzJLQ+wq2SNUaKiOrIZhtBzMtf3qLehaABasIDguNo2ztMFXZg/dMONt2RGsyS+KToZX37kv/fHfmvQfSj4ZWro4o7kmMHz+R350xTKtDGnfOEatirAtDGmjG6LaWqx/Wds5wJ8e9iwLlgRE8fBx2EOQF8IJDkA4PgnZmvwMlAmn6lrrj4gXO7EPGkh6ePe+INS6/PGVWwyiF2geXcPTN1w8ztYNkeQ8vBaQrLqbvMgSKsICkPgVgQaYHjmjNjbErt4TCTL2E8AoeMqhtzzN/4ERpN5zbdsfroDNo9YkOyP/m9dEFQwyZWChA0L+oHBmy3YbbNkJ8MeQiiSqJ02kiSdsomJR34nhFjclFR93PdX/PSYBzTERSz8ybB5HuWqPb8Z1GPr2ZdwXOT5nHiM4TOF6Dp3AqLKut139RNENqMXvecG5b581BLS6zJOd10Wl1EO6BYwovWpJJlV9oRhTepwrfiNwzKvcOr7oerziHV10Di/a+WdNdienOjOHG2MbHj2UfDCz+d98sXVE3JzS3p3R9UvPQivPRkuPJimtM4Z1RByWb4WVjfEodhPhidM0zLHM9kOiHlh2DC7Y+iQEVByw5boyr70zp7kzp7kmM9yTGh/OW/nnLwILt7rT+9uTm9TFV36wJUlR4lz2ctz5atI0pvM+UXqk2PKeLrFmTy6a4MVACIepJNlBr4LyJF3f96a1ITnDuC2Zameq+ABa5bU+yaQ1XNO7cvD76x6uP/vkPV/79o4E/353+5LHs+pjqxrj6+tjGleG1vlmTVBtRu7J0OpKjFxnSwDUTfjzbrOIFHBBe7J925UVTUDOMv7infYFP8RBz1HkCa1uo4uDYU/jZ8fIQIYHlUohEOWSo0dq/7KZC9yL57VBOcGYkVlLP1oJoLxnAYQmVTcEStteEsWtuO1HaTfWkkPDbIqDq0CaQRynSeZ3xuilQ2nBl16wpKjQkPQePIKg+VkwJRHNiF0HrycOxhVnD7cHvg788oZbkqwzaMKQtYTQdHQM0TvJ/fP7imFwdiVRiEZmHXLfIcyId1CDWh0cNvtYobh3nuSqDBPbkbF5g9hy98Qgi4KgwFx9KbOMtv/CgjVzlg8ts7QBKUK0nv2JKzOmiYwrvjDr0TOV/pgpMqoIT6/4xhXdE7h6Ve56sujAufbzifLTkwCJ8/7z1/qwJStArw2t/fTD3l3szf747/df++SvDa9fHVLendHdnjH1Sc/+85cmqa0Tunlj3SzQhqTYMukSqjcyog1JtGF0PiMyBBevDBfsDqfnWpBaU54M5y4M5y71Z070ZPcYuD+etEJ4/nLfentTemdajQrk9pbsnMTxZdU2q/BJNSLIZllmSGndO581venJaT84erXoSdU+yGcm1o/ltb7IRyLTCubY32QxmWp5Ewx2vBTIta6iMrZMNV3bVnJBogn+6+uj//PV7v3r/wbu3Jz96vHpnxtA/b7s5uXl1RHF9bGNo2bFgiOl8BbiWR1gpTrstkJMXmsetg0ugBhUaaJWpmqCagitDOtjBdzSEEdSq8N0KahACDliid8iO807PIpKf01odb/IEVSjvxIOxlJEtHxjYAAUVB6lCMRZ1x+sYoKBf41GDFN9EhXYiV7Avx6YnjmjN4C/iJregj0q1ER41ZjbDswxH8GCW4EMfXTTElk2JZVNCYUupXVmDv2gLVzAMpnKDWxQ6gXABbxPtFp5yQ9bL598Sx3nxxTdAEArZJSDojL25EdghT35fdD7I1Rq1Lja0V3whKjF4LQqwo7h1zKMJDxk/M23u2tJp7JzBvwh8B6UrV9onnmQTyyZKe1qiCY0pvJinPl3zPlX4nq55ocJ4uGAdWLQ/XnUNLNoeLTlAZDyYs8Bw/OaE5tqo8r0H0v+48fRPt56990D64eDytdF1OJL3zZr7pOaH81ZADyy/53TRZWN8xRRfMsakusi8PjqrDUu1kUmV/5nKPyJzDsxbBxasAwu2wSXHw3krftY9iXFg0T4i94zKPQ8XbI+WHPel5v45843xjVuTm3emdTfG1TcnNA/nrcMyt0QTkmhC6440WDFToGgMFA3+oiNadUSrzlgtkN5yJxqWUEnnzVNkjM5X0HrzMPtYNsZnNOHJjcDQouVX/3X9H//1P//vP17746fjHz1avjGhebTkGJG7BxZsYDeGV10r5oQ5VPaw+SLqC0KNZHkPyQytg0tck/wMhbQblDtPzoBAEB4ygAusSOmgxv7pF3unXczIIVdUH7LymNehA1ao4mAy0+dIaawztVWmepCq7MUKO6g1/OmWJ9l0RGvk0kTtiTFQhIACeAFyFDvWpF4RNG+1zuyTBhbVnmw3okIhxjX4i0pHZtkYFzpcdUiqi/BIIVg0boZp3jeni8ImGgcsUXTePPqUQKYVzW9jKJ5n1xcYDbjy4No+ZYF1vCKDDki8AB8XX3xzwcEHeZfQdg96QP7dIddYca1Byla6zkUcJ9UXuR74ED0oshJDNCWqdBu3Vtun1e2zjvMyeajuXeDEbR1cJst7xkBR7cpCXoldklG5e1jmGl51jcg9j5Yc/Qv2gUUH7vYP5m3989aHC/b7UvNdifHOjOHms82rI4q/9El+f3X43TtTf7k388HA4rVR5c1nmzcnN+/MGO7NmgYWHcMy14jcM74O380wIANTG6k2jO01TFUkmtC0OvhM5R9TeMeVvoFF24M5y8MF2/1ZU9+s8fGy4/GKc3DJPrhouzuteyA13ZMYH0jNgwu2/jlz36zp/qwRHApaoXVHWuPOyiwJnTev9xdUjrQ1VN705PT+otqV3XBlZJbkkhHcR3JOF4VYfkYdnFQFJpS+JyuOa0Pz/9ev/uuffvWXf/nPG3+4PvLB4NLNcfWTVZdkMzytDg2vuoGMM+qQ0p6GxAsRsNiOg0IMqAEviW0WfA+kAC3PHyL4EAGKCESEB8efi9oWYMphN0tCnP8h/19G6R2ePT+++BKFBihzZCkWmFIjXtyN5Nq0geKM1bDIB5N6Y6AIyOidvzpZ9Ccv8eKFocQ+4rzl9V0CFZptC1SoN7/uyCCXF6hBXQkds6xJkeois9rIrDYi1UWerQ3SAAAgAElEQVSkugiwY8EQk1mSKDcc0Rp4a5itkfsJtOSkIkdXQgNUYef1m1fCgcdfv3zxzavnX78EjogQBCBCJAj/ynMsFVdrECLwUlYWEtVZOcmzrRta5gNDk6sd0mqwKJKn0n4LcJCcHlFM/GBFWFoBcOxfbh9+Vto6dsSqmHWvmuNTG8FhmfvRsnNY5hpYtD0WRqqW+1LLfanlrsR0f856X2q+L7XclRhBf2JQ+tuPH717Z+qvD+Y+HFy6OqK4Ma7+dELTN2saWLA9XLAPLNon1v3jSp9kMywzJ2DAs2KKqxwZmTmxZIyvmBMSTQjSrHGFV6IJzmrDo2uewQXr0LKjf878cN5yb9aI1ZVhmat/zvxo0Tq07BxctA0t2R/MmamHAk07LHONK7zITxN0a46Mwp6WaEKLhhhsx2bUIQDWmNI3qQpMKL0T6/5pdWhi3Te07BxZdV5/vPTPv/7z//G//vhPv37/l+/e/PPd6SvDa/elpscrjklVQKqLLBpiYwrfXYnx8Ypr0RDVeHJIjaFJAYYv6FZSlf1c/bDSPiHUIF6DkEJUehBY4DmEL7vHn1NxwfU1nSqDJ0r444gTa/BTQ+qu0cLg19vau6jvnAkDlBq/6tpNhfqLhkDRgEKDBdMZ2TYK5q/uRMML10W2ZwxuOM9WwOluVxVToYJaN5hpueJ1U7CEmeuCITanjQAsZjfDks3ILPuv6IAoEeUtUsqXjHGlPa125ZDy4UtvgW2hxdnS1nFt+3TrQFhaOzp/ga7kktNrQW1BgnHILr785hV0XC++fvni65fPv/ru8y+/Q2GCdgaNTGeHkLk0Hp6jWuRqDZ6YIGlGsbs9ybFAymw3ahS63QP5P0x0EILQOJZPduDHsfwItrl3ES/uajw5lSOzak5MbwTGlf5Hy87hVdfwqgtJzg/mLHdnDH2z5rszhj6p+f6s6cGc9Z7EeGdaf+2p6uPHsj9+OvbvHw2+90AK7ebVESVqjQdzVqi8R+XecYUXDOiSMQbfQJklAdPNFVN8Wh1cMESlm2HpZliiCc1uhidV/jGFZ0zhhXL03oyhf94ytOwYXLQ+VfjG1rxDy47hVeejJfu4wvdk1Tksc0EwNip3DyzYnq37B+YtAwvWcaVvWOYelbsn1/1Dy44HUvOo3D2u8I7K3U9WnZPrfmDQ1Eawf848InM/XXPfn9H+7srQP//h6j/+P3/6x//3L//0mw/+5d2b796ZujG28XDBOqbwzaiDc9qwVBtZMsQmlP6BRceE0i+zJA3+opPdu0jfJbjssglfbeeMgmlpJ4ovK0TdCpACJQl9sLf04HkN/JfoD36Oe8C0YYdMk04xCDh9ce4CNUgViht+vLgbLeyEsu0go0LRg2DsyiJ+u4avMNqwhisuYog51GC8Bt32OvbCfHuSqR5AIeLkUINmcF2Fhi5CZJnwmD6iiwA7wI/KrUm1K2sKlpBAKtQabMpZaZ/gGtk9/hx4ikKD5BUEFl8zfSeE4V3wwVUi1MV89uLbSyAIV4B0ZDLnL7pqjRK3dUbUQ6l7C5gEHb0VBzEavH6+VwPGdSg9wfTtzl4QyGE6a0tbx9ZwBYsnUm1kQukbXHI8WcUSqvP/Y+89o9q60+3hD3z1l/k4a921/utMAracO26ZGY/jOI4dj+3Ejh3HJa4Y4m5j44JNb6JXNXpHIARqqBckJJBAjSIJCQGHYmzc4riAbeaW987k/fCc89ORwDM3933nZt3/Za3fYoEoAqGz9Tz72c/e6ZXylLLOBJYwkSVMYIngHdhPi2d03MxrupxafuRS8tm4wivplTH0Wig0bhVwE5gCerU8q0aRU6fOq1flNWhKWroA8mvE5goyNqVaRKzG1Yh6KzpMZe1GRksXh29k8QzFzbqCBnV2jSKvXp1Tqyxs0hY260q4XaANK2rWMVr1hU1akJzl1aszKmXZtcqCBlV6pTSzqjO3XhXPaE9gtCcyBQmMjmS2KJktzKiUZtUocmsV2XXKvAZ1RmVnEluYxBZnVHbSq+WFjRqp0UUvF+4/E7v7yIU9Ry98dTLmm+i4s3GF8aXtxdyuoiYtu60bhPblHaYqYS8QxoxWQ4O0T6gbkPcQz0ITmaWEOhTzIG73TLvHHvgpkBFSWSCmA8EEamSWbVio1QeVCkHDF0rR8Xzm0XPkE4HwBe2qUQrm59C9eslaA/LZ0YI8YVYEpIZuAPkqAG0kJOVeaPlVanRBiARyeA6Sk1P8eEKk0khLjqhQYdcAmMjBAIXanrCCSQ0W5X2oOAheo90E5vKwUSE3udUWr9FJVIIOskMZIZNQZuaew1gUERnPkaBzHm2UvEP+Gi/Jt5ACCwgC5/mrN1QqBPGpCEHmqJPXwffQEEOjswO++5B1DBgR6jVC/hmBzwbbCALHEQIfId4BVHaamKegFVgy3LDbPkYMXztMhY2arBpFbr2KXi3PrlVmVMkSWSKYTQBJkcwRg0I8rrjtZl5TdHzp0cspF5LY17PqbuZzQVUBEu/MKllGpTSrRplbp2IROnR9lbCnWthTJzE3dPbVinurhb21EsJkuKzdCE0KNA5FTVomz8Bs1QPVklUjz6tXAfOSU6so5nbl1avy6tV5DWp6tZxeJUsrEyeD1qOEfyOnIZ4puFfCB9fSFI44iS28U8RLq5AmMAVZ1bKMSll2jTy9opNeJUuvkJZwdYxWvczktrqmCmo79xw5t+foxX2nY789n3DiOv1WfnNBk7ZG1FsjMjfLrTy1HeIdYQ8YJEZchVViGA4eoBBiDSO5L29zTw37Z2GG5Z96PL4cHABYIOygwgRgCuShhVAhITQqIkqp0xYogxGUUCcpSLuBrExHJx+PjD8EWbfNPYUIGj3pFSo3uWHvsV1DoIaAXGBDkCEit0JUpFgWJRsgNTc8aVGOQaA9WUKFSruHO7TOZll/jchc3m5i8QxMnoFNgQxWWzfcEjKOBXYDSHfYh24kg2yUZK4wSuSFzVIv/mj8/tOphz/AeJXgMl7M/0D6d1EX4effLCLseEmWHvMLxI1Qj7yYDy1DoM0JIUECqLFkOBo4zpEZu3sKwSpRYkCr4gZ/kUAQNhU4qLWGk3RP/BvYgXZy0CAW2Y148UdW16RAN8CVWysFPaUt+tx6NTAa9Go5vVoBDqAgDE9kixLZonuMDvAEvZHTEH2v5NjVtIspHNB0weLJ3RL+vdJ2IDKzYGRbLStrN0JgKlxv9Z19dRIzKL7Y/O6ydiO7rbtSYAKFBeES1qwDmMivV4HMjF4tL2rWZdUo0iulCYz29AopBLvdK+XHFfFuF7beyGm4ld98Oa3idkELYXScz00vlySzhfdK+AlMQWqZhF4tT6+U5tSpoWwpbNYxeAaJYQjK1JJ6yZ5vo769kHgiJvNETObl1PLCRk2dxMJT22HfAaRx7Rpng7SvRmRGnDzKfEViDXh9hgIY+DbgNQA1/KRCGZUYiPKAW+BAuUG9fSlqLCVBgucsweIxUoSOvHyo+/VUVShMQEFkBQMUtCAvM7lh5srXOGDsCgQHdZgCu2QyU9COfCBIacnCK7UAJ1FjMkgVqnE0yfprRGZACgZZa6ByAxIn2AG+g6g4oMgtbzdVCHpqxeYmWX+7xgn7KV39PtQ/IlJjlJyeIPOupz/OA1uBzLteL7wj/DIWFsGDJ2D/t7CIjHleLbx7/WYRAOXl/FvEgxAnmEP9W6iBYlxDZq5W15TNTX0/gBTow6BCwzvjCF5XCTH7ouIFtVVBCzngSzw0Ottl9UEAPcxfs8l0gpxaZUoZYecHC6ZAc4BGIza3MTq+9HhM5o2cBmBA7xTx4op4d0v4twq48UzBPUZHAlOQUSktatLBPw+oDUhpJ4huvhEoj1qxuVrYA68YUErk1Kmya+SlLV0ZlVLw7AB3r7sl/PjSdnDuiM1tis1tupXPjcmqu5ZZfbug5XpW3fWsursl/NjcpnhGR1wRL4EpSGB0gMFHapk4tUySW6+qFvYqej3g09Uk6++2j8F/pLBaeOT8vXMJzPOJzEspZenl4hqxuYPMbSG8l7sGYFe4obMPQhhE+kFyrXMUcRkmZ2CAAq9mwGuAdgitUS7tR6gYQQWLZbnSZecvVIUYIAW5QPF8irIIhyYpSDKAVl1haQ205Gj9BCJmFL0eWD9p1zrb1PZ2rbNjyc4rsZZiGJKb3JDjB0bwqNZwhIxdg2sNJKc2D07AAEWsH2pT2xuWkBrUmStUFkBkwMAVEaJwwO2BK7e2a5wSwzCsF8DeM4qDgy4SNoAekrXGM4pn14v5t1BiUA0yFt7+OQg1SBAByHi9QAAHqlCQec/y22vBqEFEmVAVnyHTViq1AX4k1HIDlM4h2LGUHB1c4lY0TKFFR8gxim/qsW/q8cjEnHNkRmp0NUj7IHKxqEmXXavMrFakVUgTWcJkjiSe0QHa8ES2CKJboUM5l8A8FZt9q4B7M6/pVj73bgk/gSmEBXm4JZkjzq5VMVoNbL6xUmACggqyy2B3gMUzVHSYGDxDUbO2sFEDlhnQXyQyBXcKW+KKeDdyGuBco9fczGuKyaqLyaoD+WlsbmNsbtPNfO7NvKZrmdU385pgaQVOIlNwu7A1kSmIZ3RkVsvz6lVpFdKsGmWdxGJyjoMk0TkyA1FMg7773faxzEpJbF7T9ay6GHptIktYKzZDQhJPZRfqBqRGF9jbgQasVWmDrBYxoToNJKEgD0ETaTgMvAbUGmiHErUkaLCCKA8qfIQUIEtBJKRDQQPaEGkAtCozD3xTjdyp+pZJgT1kCoj0XZ7xh0CFwhSDVGr41GaPwuQGy792DVlrkJMUYo0NMvQMwxLDsAKJNexjMFcCsQaV10fK5kFyRZOaXK+3jarMI0LdAORahZAaiM4IMKPtgX4EgQirrRuoqDqJmauwQVyeqteDVF6I1KAGNQYVGmSB8OL125fzb6mosfD2zwsh8LEQCiUEdpDpsK+CEeTl67cvqagRwmWgQoOqE3dQ1J+I+ETYQXolBqxZA9qNJesqIYkqaLyCfgequhwt0bv8D/S20ValvUJAhCHlN2pB0JXEESeyhNCkQIeSyBKBVDyuiHcts/r0rVxYb71V0HIzrxmE5AActwtbUzjivHp1UbOO3dZdIYBao7da1Av/VEZLV3YtMUxNYgnuFLUi00DYPbmWWX09q+5qZjVssl3LrL6SXhmb2xhDr72aUQXQcCufe7ug5VYBNza3kfBDL2m7V9p+r5SfVSMvazc1y/u5CiurrTu/QV3UrCtrN2n7vIO++wCdIxMPCT7CMVYl7EmvlGdUyeIZHYksIaNV365xQNpDh25ACProHjeMD3hqe7vGwVc7IB1O0etRW7wQ4waGV6BSR64wds+0Z/zh2PQTP1luIIUoXKvUZsRPfgG6HX09FThQlUFVhSHygjJnISa10w9/mHwwNVl6Hse+nqyzEoUGCRlAmhBeoaTDMJAaKMpA1euRmwZUVXmuT9bjGI0839ia+mH5lRi+6gbEpFhDY/GinIe+IWKAEkqFBntqOMktW0SFdmj75HcOUu6RhmO0iT8l8xv1hMqLJDjK2okXJxJQDDV5t0Yx2sSeWENhZ73E0qLs72wq9WxdH/TT1pz1KrxAhY5NP5l6SDj9AamBepMX829fzr9FpQSYgIKjH/oQuYHOk3EH82QLA30NUYC8WURdzHtRA5kGh0AGte8IaL3IgmKp7os6i0UDXSp2UFUh1ErHRTYpIfkp4Bho90xLuodBdUeyjAp6tSKzSp7IFoFjeAJTmFLWmcQRA3MRz+iIyaqLvF0Am+yX0youJLGvZlTDyhkY89wr4aeVd+bUqgjXr1plXoM6vbwzmSNOYHSklneCwyiUElczqi+lll9Oq7icWn4lvRKmuYAUl9MqLqZwYNXlRk7D9ez6O0W8BEbHrQLu9ay669n1MfTay6nl1zKrY3Ob7ha3JbNFzFa9QDegIpPlLEN4h26gvMMk6R62DOG+qcdwkXgn5sp4Oq68v7zDlEcu8mbVKouadS1KG+QwgmkVjANAqoBs0Dq0TpgUoDqcmKE4x4kZipMQiVpdU/CMRKQSqjIQfxEyl0VI8TcalvePY4MWVcgC5NGUumOyjjdpng7xJQWgIfVdEMF1nwhAGRg32olsOrV5RN4tc2wPvuRWXzF1OqiSDaQoJxhH2JGneJo5KEsfVK9QRGpQnXikRpdAZ9Cf+CQENXDs8748FZNnYLYa2MGlB9Gw8A3VpSnuiD+4z1Vw201Vwt6GTgtPIbR/tn7Jj/rdOMfm8s+OTj6euP9smkxppKIG0Z4svHs1/w7BARU43pCoQX07H/yVgWKEPAhBglBj2UIgZBpip3iiBilBvfcdFI15SG/i9AakYu8Lp0Kbcgg7QjIQYCI7NDrbbR/jyvvBsze3XpVVo4A+BZIK4hkd8UxBWqU8gSVMZIug+riZ13wxhXM5reJqRtXZuKITMZnfnk849P3dA1F3DkTdOXw+4dSNrMup5XeKeCDlvJHTSAJEFXhnXM2oBt+dy2kVsMkCGlNAn4vJnMup5Vczqq9n1QF7EpvbGEOvgU/FZNVdyagmDHsKuLcKuPcYHekVnQWN2jqJWWp06a2jyLkTWtYWpdXoGBvw3R+feTo993zi/tOh0dkrySVXMyrp1YoSblelwMRs1aeWieskFpF+EMygFGTEFEgVQBmJRoxykxs8uINQwzHWMzBuIrQbuHkIt3mmQ1CDWkeEQIb/PfBBbWqWRY0ALTqowk9uDbowrndOPZye7GjFa5sn1d6ph4+nVSWTNNqS62fDRIHeLcgfWxN8+7bbVtmwqtcja8n2YzQcO2itt7RrKAOULquyLNW7Ovi7Pr1lkw8b7SP9zVn+kB+4q9TtDbyewdVhdznciaeDISnGrBjkqx2N0j6kJWfnXB/HaHjEOUWDgV1ZZtn9h6Aa5CizrqpGezdXF5enYCrL2k1lbeLOhFxDfKGuSs/jFXsxGo7tczfZewbG+y1t/jU0HPtsrMnlGR0cS4sMuve1iQ/vP3tqYE2vDf7ldzOeP3v3et79aP/G4Edv2wx/YhkXcuqHbwK5B9QTQA07Rc2J8GKQdP4IxQ6KpTK1jqAqPpZ+V0ihEfLFIfwoOIyiCBUPJRXC6ppS9Xog1rSoSZtbrwJONLtWCVZdCYyOZI4E6o54piCJI75X2h6b23gxmXM+kfl9fOmJ6/TDF5OOXk45fDHxQHTcvtM39hz+ftfXx786+v3xSwnRdwsvJrMBHS4mc66kV34fX3oxmXMphXP6Zs6p2JzI2wVnbucfj8k8djXtu2vpJ67Tz9zO/z6+FG24RN0tPp/EgnLjXgk/hSPKrVPm1avyG9R5DWoQoZZwdVyFVdvnBZZr0HefMCWafDwyMQcmTu6xBzBiHPbPavt8MfRaerU8q1pR1m7iKqwsnr6E29WitELfC6ghI1K1PWqLV2MeQfEoYsOQzOgCzg8GKNDDw6Y8dSHF7pmGTANAjaWVBRUpQjoUKmpQlR0hVQZqTCbu+ydvbA9+Nv8er3VN3rfiezbg2PZJwfi0X7ocZNBw7Du/kBsKGRgNxz4d4VgUpn599jV/SKewP1sttQs6a1yrl/uu8n6jsmJ06Q+81D5EGaAMjc4OeKcHG26FftlBjsowIKorGfzjutBPbUlq43XKj2wJvn2T+257Tfq5CYyGf5LEbzNy+EZOda4bo+HYiR5ur7jg8gRGwz/PtfSPmhxjfbLicYyGY+e8Pbi3JS70Lk7zntxXzaxd+nfte2h5Pj8pmFn6AEYJX1AilBbegx3URiYUNVAhQL2GkXlXCAQ4lry/lN0MEYBQk+zQFJbMj1lmHOuipl2SOg74zwEd2KK0lrebSlu68urVWbXKzCo5vUaZVaNMrZAmssVguhfP6EhgCqEAic1tvJjCOZ/Eio4vPX0rF1zFT8Vmn7yR9e35+C9Pxuw9dnH34e93H4rc9fWJL/Yd+2Lf0c/3HNy++8COPd/s+vr4l8cv7zl6Yc/RC8eupJ6+lXsqNvtUbM6JmMwzt/LOxhVdTOFcTi2HVuVqZs01es2NnMYktgjU4s1yK5E4b3QpetwQrVQl7FVbvJYh3DkyAwsFVFmU1TVpdU8N+2dHpx4P+2dNzvFKgamgUQNrMpWCHp7KXt5uqhT0iA1DMEnVkbmEYBoKICI3ueU9bsALgAyNZQTS5LvtY1BxACGKtBvOkRm0Ojg69ZiqKwdmFKHG6NRj/1RQPUJ+ZRBRSp3aUlmMiftPcV8nTqPh2N5J9X3UquCzz6b8skkaDceOT5pnpwTxOEbDaVcnBx5Nzz2fMpfhGA3Hjo/pJz3cOzhGw9dccOv85sEJo6hgDKPh2OFB/pCCl+Nfep1gOwcqeqTFVyYwGr76bF+7Tagf7GzO8mM0HPt2SDDUW3kDx2j4P6cODkwikyr0nKREGQx7Ln2GY7SJu3Lr8CQk7yp7PSKdpH/b0p6CNh5Vw6lnOiOIVoWy+aoSR30OX1DON3L4hjoAkbW31J096ruh/AiO0fBdJR6fa/Tqdhyj4Wl66sz1mTEfx2j42htzYy9fvl54YS6dwmg4dnrO9eq1pWgSo+Ebip6/WlxYmHhyfhuO0fB7utdv/7xAyU8KSYFdoBYdFOAIqjVCygEqdjgp9sJO0j4DnAXIkmT5fZPhJUEq6Oej98lApqBuZZiSDjsyMUexApsd9s9ahnCFyV0jMjNbDYT7TrUim1CXS5PY4gSWMIkjvlfCB3koDERjcxsvpZRF3S2KulsUdbf4YjLnfBLrXALz9K3c766mH4yO++pkzN7jV/YcvbD7yPndh6P/dODkjr3fbN+1//PdB3cfitxz9MLuoxcORt25nFp+MZkTHV965lbeuQRGDL0mgdGRXtGZUdGZzBYlc8TxjI7MKjmzVQ/O43KTGzhwpFOWGIbE+kHz4MSwf9Y7MTeGEvce/gD9iM09aR7EYSalt442ya0lXH1+g7q8wwQ79eXtxkqBCe28a/u82n6frn9U2+fV9fs0Fq/GMkK09ya3vMet6HGrej1EoWHzG+3E6ATeARk1GO0j/tUfXEpQGxYf+QWALIQkjNLLULHmb+y/TXgleFAdsQEvsU4+eDalzsExGk67N+WfnSw9gWM0PFYGXCnew8ExGk67OzqEe/KO4RgNv8jvB9c/QI3V163aIV1OJI7R8E8SuqR2vtomLro8gdFw7LSl3ay99w2O0SbO1EpB38XN9mM0fHWM3eDuK4oOvUqPMt3OaepzD1DDfemzoC/bkd9t9Ag6SkcwGo7t6S9QMnkGRkuzccs6HNviTJWwCNRAZ53vKpfN45o+WYdjG913Bay27vJ2Hf/afhyjTXzHaVfIzPs/XgY1Lne4/C7/teAC7avKx89/eFJ+CsdoeGT7D6DUMJNI8fr1j1Wnobh49fbPb95OPo76A479YYY/GVJfoAQ2KnAsTVQKqjWcwR7C6EM74dkVyJtDjMYAkagUGjYXovtYduYaYlmMuiFyxBVwLUcejeRUeNbumdZbR3kqO4ffXczVZdcqc2pV9Go50BwAHIksYUpZJ7ChSRwxiKmu0WvOJzJB5nCNXnONXhNDr72UUnYugXkhiX08JvPwxaQDUXe+PHFt7/Gre45d2n34+537jm7ftX/H3kO7D0XuPvz9niPnLyZz7hTxUss74wpbb+Q0pJd3stq6a8Rm8IPk8I3FXF0JV8dT2SFq2GAbhYQR9BcN+u6rLSOId8SD7W1Gpx7zFJbK9i65cZivcTJaugoaNTl1qhqxuVne3yjrF+oGYPNVqBuAykLZ64Y1VqgyAES6rMQ0QWFyq8DJ1jxCKDWCIYP40DHWMzDuHJkBgEDutdR+ZJQECPgaKpT4l6M5oO5AUBLMazzBjRXBqLEXV87gsw8mS4/jGA0/yZ16ODYV+zmObcAZtum551MPn07UXMIxGr6bPTru9V75DMc2jGcZLEO4edBvgWt+R15Pj9ly9lMcW++/K2pT2/lqmwRQY1umRmvoObMVx9b74zsl+iGR3qHJOoNjNPzzvL5+n1lcHEpqYHtGhaPUp7FzZMbp0HmPBFGeE7FCmXFIXHh5AqPhtJviNiOTZygty3ZhNBzbZ2KoK0uSXUGosb0vR0lCyX4TU8fhG9ltHV27N+HYutFYfqug0rWahmNfuBqcRvuYedDsOfI7oELdQ4ax74KZoKzeZy9m5uJ24NjGqfLhF6/fvpp/+bwSIcXc07s7cGzjVJV7/s3iwhPd7FroXH58Q5nFEhhBKT0W/i5qEDsm3vvUogOZjhBEBjLUgBEJJSabqgpHo1MXxS40ZKw7SMINqjvQVAVRGx5yJwVZJ6GfYPdMm5zjYsNQncTCaDUUNGrBiSe3Xp1RJUurlKVXypPY4pSyznimIJ4pSGAKYLcNpqSQmRxDr72R03AjpxFGGwSCpJZH3ik4ein5QNSd/WdufnXy+pcnru05HL1j76GdXx7efShy96Go0zcyk9jCvHoNq607r0HNbutu6OwT6AYg50LV6+Gp7FyFTdHjRkmI8AKO2ET/9BMw9fVNPg6RafsmH1tdk9ll/HPxJZmV0qJmXV6Dhl4tL2jUQPA1RMAweIYWpRW2rfS2UQgl1Fq8hIjLOqq3jeqJXQwXNeuAqDUcY0b7GKxdQLdC7qFMDHhnAC/ArIB6/GTR4SOV/iHvL0tzjAWvz6KDz87gaXtxjIZflwSrOfz49e04tgEvtU7dN0yuowFqTD38YXp2GD+zFcdoeIrO7VP7f0vDsQ3jdL15EO+xmwaPbsEx2sRNkcokd25fD6jRoXHwlXLzwc04Rps4XdOp5g18RMOx9f57EolhSNylth76I1z2RsremtU1ZZUjHmEKPb1htcLZkY5jNHzNzWHLBKhCNRZvZ7ddFXcQx2gTR9m1fCOjtasy5fsJjIbTrou4SlHkdhyjTRxh1rR1o2FKed6NcYyGY/tNDC2Hb2RX5LZ65A0AACAASURBVLgiaDj2ub1U31aX4cdoOHZosH3I6Bjtl5SOraHh2FGfetwlyoBqa2rs2QO0sfZ8cParjTi2Y0Yx+2L+7asng3NR2wApFhY8j/ZvxLGds+q5hTeLb9x1UxgNX5vy7Mm7BRIpEChQm5SQAS06S/w1KEZexDzVHdCP2z3TNvekneKvQYJLqDwcQQYyziA200hMQXoQtE04SMS4wc8JWJZTk7upsrwe57jc5G6Q9pV3mBithvxGbX6Dml4tT6uQghlPAkuUwBSmlEmSOGJIewaO42Zecwy99lpmdQy9FgQUtwtb7xS1gvl4XBHvdgH3clr5sSup355POHIp+dvzCYfOx38defNPB07u/Oro7kNnvz59I5ktKubqqoW9YNbUqrRJjS407e9xjoFvLaiSnSMzMCpDK+eTD56BVJ9MhJmDR8bmnu5xjgu7BjIqJHn16oJGTW6dKqdWVSno4fC7YSeNq7AWN2sbpX1iw1A3WSMAWkGJobeNGsiIQIhE0VpGuvp9sNNlJHNh4ehtRIoKfGgenBjw3vcGh1pBfeGbfOybeuzFH1FhgkCNKfL94Ooj5FAnuOMzT8emh/ATvw9+Yd+AF/fj03p8HQ3HtuPtYxPO5mWqdGz7eKvXbakfX+ZTn45wLIpOtm+ZT211FemFHaXeZb+rzNLdLxn552V4BPdIoGseGp0d8E4Nsc6FftnnuVqt2rxvE46t811vLeMbmTxN65V9OEabOMyo4rVrd4eMMNb5rjY0xX23zF8XcV7X3tuZdmqZT625NeKc9FZcCL39q6rHPv70Mn/Xjln1HEmFnn7kfr3w5u28OgXHaPj+2h/nl/CgIeHy75mwBNcalL1V1IzYyEVgihJ0ykHaapCptgH702HSx5kabIdCDKiHih0hI1iw2KB+e0i1AqghNboaZf0NnX3stu7CJohWU4HrXxJblMyRJJd1JnHEyRwJ2PPB+7AFC7EmABlgDgzy83ul7ckccVwR72pGNcxKTt/MJdnT7CPn4r48fHbvsUvfx5fSq+WlLXoWz5BdqwCrG7V5BG1zQH6PyTFmdU3BrhH8LV5ykdc5Mg3tgN09DQa5ettou8bB4RuBoMmokqVVSOnVcg6/myvv5yqspS36Jll/Q2cf7JtoyOQOID6hytD1+7qsoyDigiUuiAjU20YNdj/4CXbb/GDGq+snRKLdNr/e5gfUgLLISzFwDdQdk4+pCho4gBo+Ek0AX6DuWIogwKeShdXDcX5y8LP8ON7zgGAusEu489HU7Mjkza9DLn48Xekbf+QeHfBc3Rf8qS2jd/jdvV55t94ctSf4U5tHrjUoNANCrcYUuTv4U3/03Wrt6Rs1igpCYWj7rRHlCHpiB/Rd3bzR7RsoX7nenygTyWqHV9NwbEd/gYbZ1s1slcgObwH+gtWqbUi5NBr0w/ebmDp2ZanjD8EDl4hvrYXSZll/W2tFsD6Nhq857WtzDPrue/sFEzup975xkjPwFKjQoLNtpmro1Zu3rwAmNhQ9f/3nhbc//pC3D8cCVChVoPHeEWwwpgRQo394EgAC7cKjQwbeTiHbQqov8YA3aIA6TCkx4ICizjM+RwUCT3CoBFlEzFB5UGqaJnVXhUCNgXG5yQ1ZShWCnmKurqBRC8KntAopOG4kskWp5Z2JbDEYbSSxRbCccruw9WZe060C7u2ClgSmMJFNWH4lccQJTEFqhTStvDOZLbqaUXXmdv65BCawISDrOp/IPPx93IHT1y8kse4UtSayBFfSK1M5wlalTawf0li84DrZ1e/r0DlVZo/B5oclMVhYIPd0ppW9bqF+oNs+pu33ifWDVcKeomZdTp06vVKazJEkc8QpZRKYzrYobc3yfngLKwxchVXV6+m2EzUCEBZq84iODHw2OscBCyDnlXQ8J0YngBRQehhsfoNtFBKMIb9+0EfUGigKz4s/8k4GIQVqTKjggqJGqZVISM8SQnOECMMQe0qd11I33GD9ZJQ0JXeOzFgpq64GGxFlgFJd27VOSAyA1CLwKBeRljxg/AfrfIC/VMYaDVDQaG/AG7g0IAIaNOzafp/c5BbqB7kKa63YTPh38QzMVgOTZwBdOXqfEJXzDCyKgSjFoae7TmJpllvbtU6Q/+tto70DE3B5QuIEcGGTD57NPv6RNPt79qjsFI7R8DjNi/l3xAbKwrvXC+8gIJ6qIg/MRILj4xeWtCdvliM1glAjUE0EgwX0eDbXJBU7qF8MjczS6UlIiAHy2kE1OVWCQX4L6SSK2hOy0ED6UbgX58hM78CEsteDUmqYrfqiZh3wGumV0oxKaVqFLIkjTquUJ3MkiWxxEoeYxcYVt90BLXkBF/IHsmoUGVXy9ApZEluUyBZlVMmzahTpFdJkjhhUnlczqm/lc28VcIEKiaHXXkhiHb2YcPDszcMX4o/HZEbeKbhX1FLcpGlRWtu1TqnRpbGM3MptKOPrxWSyFpCUih63rt/boXUklbRcSuZcSmbHZFYns0XplTIwOk1ii2GFv4SrqxWb29SONrUDEqQapX2VAlOL0iYxDOptoyCFBKUGKigguhXaFgP5qS7raJfVh24HagOAg9rOINRAo6sAUpA4Enr70tKDpFGhtYFRCxrBUNdYqGCByJ2x5ZwH0bwWrZ9Qs6BRPqOeYkou7Brs0Dp5ajtPbedrHB1ap6BrAK2iCEmbcopdqN8YghrB9reo0LCRmxOwfgKkhtToatc6uXIrrLoyWg2QtsHkEWARssbGouAFm+IJWNFhgia0XeuE6hXFGlBtNQBMH5AWoU9/nJm7Q6VC3wXttlLOG8r6SRAJGowsC8EFyAL1durkFcVMhdYXZEw25cNA3WGj7MUjmQZiLhEbSuSekDCBcgyIDyFrfvwh4f1HQgY8OYbJlaGh0VkgQVxjD4ZG7/cPT2rMIw3SviphL+wXFjVp8xs1YE1OxheJUspIZ0CmIJkjhrWUuOI20GjGFfESWaL0CmlOnTqvXp1SJkmrlKWWS7JqlHn1mtw6VWq59E5RK/QyKRxxdo2cyKAv4F7PbriYzDl5g/7NuXuHzsUfv5ZxKjb7Slp5GoufXye7k1d/Nq4w+l7J7dyG3BpZRXs3u7WLXiFKY7adT2SeuZ0fdbfoSnplPFOQUi5N4ogTWELwSU9ii9MrZcy27obOPgip5KnsNaJentpe0tLVIO3r0A3AxgRon/W2UbVlBBUUgE1QVgCIwCHnrH4qqYEqjq5+H3xoGcIHvDMItb0Tc56xB96JOS/lP0LtX6hIQbw/FWhnECeCio6Q5TekEwtZYEFWHUshY2z6iXdiDvl3waVrchB/i8biVfa4IS2RWmiAWzWgBnjzQFI0ALra4jXY/cgudGkoNBqgoNdU+DLLEK4nvUJ5anujrB9UoYxWA6NVz+QZGFBltBGRPVRbjZD9V9hbqxT0NCB3cqML/tGWIRy2zAe8M66xB1780fgM4d9FrLo+HwpQoaR5F2yyhgLHQpDy4s3bP6NiJKRbmQ/+cGFZXgM9WCEH3U6+M4luDy65gxRiS+evyOkP2fyhJoVIMyDzUEAJOjIxh6KkQzZi4Xa7Z1pvG21R2iB/gM03lrboi5p0ufUqCBNIKetMKZOAPU8KSXDcLeHDmnxcEQ8sNhLZInAALGzWZdUoM6sV6ZWyZI6YXqMEp4xElvB2YWtsblNKWSfEGmRUStPLJbBvCtslVzOqzyexou4WnU9iRd0tPhtXGHm74FRszskbWaAKib5XHJNZfSu3Piaj6lJK2a385iS2KKWsM7lMklohhQ3d1PLO3DplQaOmhKsv7zBxFVauwlrRYWrotLRrnQ3SvjqJpV3rVFu8XdZAGpu2z6s2e2A+AknlBCLY/IAIoAE1kotqkGAO7xhso/A12n6f3uaHJfEBL2F+jQAC/UcCKXkoKG9p6RHcsyD4QHqw981ZUDHiD9aJIX0HYRQ6+Rj0O3ANo1VXIguaXMYRdg3w1Q6IRESpiEStoRtA3jwScm/NENyhUNNVA1oB330HxfLPMoSbnON6m1/V6xHrh3iqwII8gAU4a8DaK5uyNR8CHMj7r6zdVBliMmzxojGcnfQl9+KPwL/rAbmB8owMhUera8SOPNpwpay3LoTUHeSnUBkSgIyQvmbpDAU1IyFggW5HqAFvbYSzwKQ9uNwgFtJCRiohbCgYkZPkBTwFQ56R3om5pdwHSmYbnXw86LtvtI+1Ku0QVgJAnt+oza5VpVfKkjiSRJYwiS1K4YgTmMJ4piCBKUyEiIPiNrAmBylHPKMjtUKaV68uataCf2dGlTyBKUgt76RXy3PqVGkV0nimAEiQFI6IXq1g8rqZrfq8BnUiS3A9uz42txGanXim4G4JP57RkcwRJzAFEAcLxhmZVXJGqx5yp0HJmlYhA742pawzmSPJa1AXc8mkyFZ9lbAHgvzA1qlJ1l8nMbcorXKTq8vqg6qVLDS8aLCqthCFBtQasMqF5izgWAMqciTWgHoEyg29bRQ6FGpViBIn0L8JOkfkCA3r6lCYUIkPKEyAAfFRyFRCHgbjGKT1mHrsQ70MBVZCpOioPSFIDUqqa7fN32UdVfV6ZEaXxDDcoXW2qR08lb0N3EY0DlR0UB29QnLkzZQYFBvZgCOhgBNBhnuqbxg3D+I9znFdn1fR6xHqB2FBvqzdGNKhsNAJ6VP4yGKDgIxy2FuT9gFHJu9xQxAcmJ7A9QWZSeAVutQolFyQJ3bbXy8ElRsLSzCCiguouHizpGFBqAFrbKEdSghG9A9P9g3hfcN44MMAcIR2K0jiQVVwhKi/XBTKw4WyGqltCyo9iFe2OcStEmQb1Kj4I6g1eGo7q62bwTMwWvWMVkNxsy63XpVZJU8p60yvkCWwhBC5BraAKWUS4DWQV+A9RkcCS5jMEefUqYuatMVcXWGTrqBRk1ElTy3vhDST7FolbMHdKeLFMzoyqmSFzTrwDWa26rOr5ZlV0gQG/3Zhy828ZhjHEEMZRkcCU5jAFCayRWnlnRBPDx7lKWUS6KFy65SQQZtRJcupUxU1aSsEPfn1qkqBqbyjp7zD1Kq0cfjdDdK+Znm/QOcEhQXh30/JCkKQoev36W2jepvfYPMb7H49WNoBXoBGg1SRm4jUdZ/W4gWJh8HmhxkKdQMIHc/YAw/l3wSH6FneT3b4Jh97J+Z8gB2Tj6l8B5rgAmpQp7wh4g7EjI5NP0GFhoMgNYIW5GETR2wYgjwqnsoO2VTIqQhQo13jEJCoEZTtSqZhQreOpM/UjQry6hgeiPsa/zbZyVGpjK4OrZOrsNaIzGA0W8LtAkaDaFJ4BhalQ4HkJOTlhagNZPzXprajGJQe57ilSxAkKqNdwR1z9+eeP3zyAuJXg2oNWJAnmYvXC29fWUqnsG9mq3Q/Pn1L9dp4swQaqI4boeQopdwIoAYoC4DpQRgBqIGCRdE71FYFoQb1IQ7ZQxkOzUAJ6laAJaXGygeeqSSOwFMQqlb/9JNh/2zfMK7t83IVVg7fWNKiL23RM1oNJVwdXJng05PEFieC+TBHDMblsAJLCEbZYnD9SimTZFbJCho1JdwuaHPyG7WZ1fKMKllGlSyrWpFa3pnEFgGNmsQWpVd0FjSoi5oh/K2rlKsrbekq7zClsIUQ4wi9z93S9tuFrQksYSJLVMLVsfnG/EZtVo0ytbwzq0ZOr1Hm1asARDKq5PRqeQm3i9mqrxCYGC1dJVxdhaCnpKULfNKBIZObXNBE9A5MoDoCzGAUpF4DJqxQbuhJ+RZRVlhHkQePkSQCQEIKjQzI3olaY+yBl1JWICgPGLuSnyUAhSwePaR1I5VD9YHXAQn9RD0yRVGIkaVHSDuDRi3QoQC4wOqzg7KlDhQvMiUXdg20a52tShvUGm1qB+pQOshgFIhx7+weBpW93jYKPBHy/rORRhBUFSLcbnXh/VL+MENqto6pLV5J9zBf42iU9cM4j03a/DHbupnBA5SAixffyA6JOGg3Vgh6asDCS+sUGwjUMA96B7KO4tgBX4d7aBQ2ULbjHWP35wJmPODu+Zy0/IQd+dcL714vLM5PWp+0iZ+6ns0vLLPAijqXUOwI+bLgkUoQalCrjL4hAiPQgQe0b3gS3vYPT/YN42RtQrJH3vtOysIbQhCEHUjQEVB2kFSoh/LiBuwadLBokwqeOmPTT1z+B1bXlMkxJjO66jv72G3dLJ6+tNXAaDWUcLvAiBiyoGGeCu1JAosw3QADDtBlJHMkqRXS9Appdq0yr14NkbHF3K7SFn1+gyavXp1S1plaIc2sVmRWywnTc6YANGP0ajl4CxcRSSVaaDGqRb1snr6gQVXUrC3h6rJrZPkNquJmHcTT5tarcuqUxVxdZpWcXg1Fhzy9UpZZJc+pU2bVKAoateUdprRycQlXB56DDdI+rsIqNgx1WX3ghdFD8eDSk7mEQGrABQDMRTdl2YSKF0GoQQ5rATUsQ/gwKZYJjLGC6wvXWGCC7kWUB8lxUIcsSx1SqG0OFURQ6eEnPQeDJymgFt0+wfONTMy5zfVja2j4kZJBRgyOrR9L1xiUjSOfUtUNW4eL9DyoNdR2vrrLeGorjm0dLuziqx2CtpKR1bSJ/dldzRVuqufNmnPDaoV753p8zU1XH273TNsVJePYhokrFSNZUZQvu+nqdw5d2IZjh4eFfaa8mDGqdiumpawd2FCi1mCS3QqMY0kjL13btf04tsWZ1lnWLlUc3YJj+3tYqo7sq0FLd6uvD5o0I19swNfc9NinXT7T2O4NOO3upK9v+kuqZOPwfZPrUdyOwC27S59OOubObgvcclf9YlgwSxWb7a/9cSFYNh4ME/MLi8vWIwHUgDhcKDdQWUGBDBxBBsAH4o0AQYDaAJm5g0zTRZrxYUrKNFU/iuoLL9kAo4UopA6ivtqAOY3dM907MKGxeMX6Ia7CWiHoYbQaWDwDENcFjVp6tTy1vBOQAmxE4WoH0VciWwz7bAlMAYxXMqpkEBMLKdCMVgNErhQ0ajOrZCA2pVfLM6rkGVXyBKYwgSm4x+hIYgvhRnq1vKhZCyObjAppXr26pKUrv0GdX68qbdEzW/X1nZb8BjWrrbus3chsNRQ1aTOr5OmV0lQy/DWBJYSs+dw6VU6dqrRVn1urgH3ZOom5RWEV6JyKHrfBNto7MBHQg5NkJ/hoqM0jRKC0HTUjo2gzDWEHggyDzU/BC7+BnLwO+2dHiNkWUWgsGaI/RFiPeNMA90G2M16yvkAAAV+2DG86FSQeQ20LWngbn3k8zr+LYxsmCi1e3D+SeBBfc9GjdzvpR3DssEvUY//+U3z193bJoLTb1HtmK459Y62zQK3BVzvI7bX1/ruidk237vKX+OrIPr6m58xWfHWUo3Ooy9rvOLcNxw67O82D57fh2JERmd/u6hs5/gm+5uKIrHlsDQ2/1D5AuoT2D+o9O9fjOwsteq5nNW3iTK1QbW+S9VcJezl8I5NnKG3RM+BtK9GkIMggSVCp4sgWYgOljWv6ZB0ecV5dzRqMoE18XaTUDUqV9SOrafiOArupNXR5fw9n2i+botHwm4rHhFJj41TZ4IvXDx7H7cCxUw+HX754vfBCmUxoQwl2Y+7p3R342pSnj9+iQoOKFKE1CMl9vKFQG6EzFGqt0bcMakxQ35qDP0WdVDmWeHZRe5aQwYp7/KGPfH4Q6iBy2YG6LonIMCBBLUO43jYqN7nF+qF2rbNa2Mto1UOEIrSU+Q3qrBoFSLagJUlgColFWLaI2IJldMAefSJLBNEqufXqgkYN8CNMnqGoWVfUpIUg6Nx6NaQ9p5RJQNORwBRAt5JZLU8tE2fXyHPrlKll4nul7fGl7SllEkiWB4e+RJYwrUKaU6cqaNTk1Wty69UpZRKofUB1BmNXSDxIq5CWtOghAbtSYIK5CfTewIMCZwHkX7d9jMgl7PWozR5tH4xXiIgTA4kaJtJSGOEFARm20cAqis1vdI73D08Ok7gAgI46SnSLi0Jve4L7SkSRjlD0HW5K5YKaGm9wVRI0dgm2AhqfeTp+/+m4kYNjNPya0NuZPYFtmIiX2V2DQxe24WtinQbV8I71+I68nl6v1CCzf7YeX33ZKLK1KO08pa1VaeOrHfy6TD9GmzhVIS+P92Pr/Ve4Eo3Y/tl6fHt2T89IV5/atXM9viZ2sNfjoB/BsW2jddYB5gUc+2SM1TeoLp0IXLRHR2R+i5nnW0PDz7eYBPl+jDZxplagtEHmLjF2JYg2ifww8tTYZ2RoWTwD0aG0cY1b1uER5xSNhvImljOCNnGUzS1LHcXWjd4RivSDspbsMYyGn2uxSYvHsQ3j2YZB332PloFjNPy6ZNpcPoltmGQPPHn+7HH5KRzbMSObefHS9XDfRnxt8pNHb17Nv/yxkmIatK/mx5fuuX0b8bUpTx+9pRYOb4LfX6BMUt4E9yzLdChQTVhdU33DeB8FEagH5Y9TxTAOcqCN1kaCBvvBxp/EoGT8oWd8zkfyFLDoOXGf6FphHB2i8IGBnHvsQf/wJMy6oCYX6gZgR4PFA8jQFRIpsGqoC+CVnAoTRJcBTl+MjiS2OLVckl7Rmd+ozSepDaBISri6gkZtXr0qr16V36gtatLm1qszqxXZtUoYlN4rbU/iiNMrpJlVsuwaRSJbdK+0HXgNiIC+XdgK5Gt8aXt+oyaeKUirlAEPCi7qkNiSwBLeK21PYovvlbZn1yoLGrVw79XCXhi1Kns9eutol3VURUDDKBxtn1dt8YKnBtzSTRmyUqcnIGowOYJlGvAt4LVhHzM6xqyuKZhVQYmBdDRgd+ICUoMU5lFrEOqYDPEgbrLQoC4HBLADDW6DEcS3hBOduP90zCOZoNHwHafGP9+Af541bJ/st7T51tDwnYVWQcEYRpuIbtL2uKXKetdqGr4tUyG3QcQnUBs8UdXwahr+yWHvJ+vxT+J1EltHfaYfo01E1nWZR/SGZu8aGr6z0O4c76+5iWMbxu/m+7ZvwI/XDLnH3LnHcOwzf8OQnfAWnrDV3oTOSN8tGKL2OJtviZuguICKFTblQSp+Tl6vh9EJm2/kNDKdEYQZTxkzyYet88XUi298jWOfDBd0CfVONevaBLZ+LF3qoB/Bsc/89YPD/hlvSxyObcCLLTPCeBz7fLpz+smzgQdfbcTXJs3Nvv7xgfr+Whq+r+b568X5124CQeYWXoHn8JsnP+QdodQsRx5angRaD+pcdmER9SZLhylBHQpZawR4UIQa0KHACRHbuslCFCmI0fswb/MtmdgjrxdY5QJXyMkHz/yQvjf+EFADuVoThg6Tj0cm5uye6Z6B8a5+n6LXozaPaCxeoX6wTmIBwqmE21XcrCvh6vIa1GDwBXEHRMVRwkejE0ANqEESOWIIdoYkt8JGDYPkVouadIXNOriGIcie0WqAugOIUpjRpFXI0ipkhK8HUxBXxLtd2HK7oOV2QQvENSFDY0AQGKAkccTpldKMKjkMawE10solObXKoiYts9XA4RsbZf0SwyDspMGURG0eQVvwEGUKtxML8v2+bsrOu5HcpgMC1bSUzgDG1EZIv3qc4xCGAlLxADQEU9cuMrXQ5SdpqWBQoC4fuSiVC7VgCTmI2CLYU/IJQ7HqGB2PAVOJg6MCj90zbZEWjWM0/FyTueIGjtEmopo0vR4pN9uPrR+NE7Wp7M2y/hYoNNQOnlpnPAXb5V86OQa0Oz8RWa+3eIxNqePY+rF0jXkQt5h5ZEdw1KscG/QNj1z+DN4nUWMU6hFvpU3b7wNVaKtc0Lt1HUADo5XoTRhIUY7GrjwgRA3VaecmMNrEEWYt31CfcW4C2zKQwdV+9wmghlhvMyYdguZr+MI2wKxB38ho0kEcO473uGZufo5jJ+/bnz2ZVs6speFfVT158ebHweopjIbvq/nh9bvXj3X319LwfbU/zgeGr6Rg9NWPVaeJ5iV4dBLCgAZUXsFVSShqILywLCk3qPEQaFcNWtOQDC6It/FPhW46+cglhTHSkX3mERF4Pzb9BBg4YiI9+dgPPlFEJB8xn4feBCTDUJkL9YONsv5KgQlSV4u5XcXN2rx6NZ0UiYMeFJbT7jE6ADVgHJtAsqRpFdI0khAtgbFIi55BJrYXNelAzVHaoi/mdjFa9TCahXohiSMGwQXMdKGiuVNEIAVEQwJ2EGlJBVwitwVE7ixhXBEvniBKxPRqeV6DpqhJW95hapRahLoBtcUr73Erez1yk1tqdKnNI6pej9biBdCEtwqTW9vvM9j8gAUByLAHnMdB1GC0j3Xb/KAWRaiht/lBCdbjHLN7pl3+WS/hij5H1hoPXBQOmwIfsx4qagTvK7rIhaNAR0OV7VCaIOoJYTcomQn3/YXf4diGiUTFwMiMzY3bam/CpWtUlo8GOfptHS7Q8VR2rsIKk1ee2s5XW1RxB3Fsvf9ys1jjaFPbO9pKRqjfte3OgNbbOzBhGejyfLEBxzaM3+0cGJkZ8OLD7IsUKvSCW9cPnZGju98W9Snlfnc50oVMUt8F/TIxc201MElqg9lqYLVpwX2HuszWy9F0JJ2eoN645saAyeNgUDdct+Lpyslp69TeDTgtYXbyxVNH1SRGw++ofnj15se5XoLsXHvjkd/z6ByFCj3Pf65IoS68TSWoX8wvozdfCC4xQtSiy89Q0AClL7jWsLqmIDieKgYjrOsmH6HaIaDzm3rsxR+FbJ3BiwkKjJp++AMkVuOzz7wTczDWQhUyPHWGkR+0ZxqiNGG/s7N7GK4ZkX6Qq7BCoCmLiGvW5DVosmoUmVXytEp5Mkd8t4QP/QKyLAdOIZkjTuJI4OKH139QbZQStYa+hNtVzO2CWgNQA9hNUKBmVivo1Yr0SlkSWwRgBD8fGhMIQLmeVQehSrfyuSD3gCwlInKhhA98bSJLlMQWp1ZIM6rk+Q3qCoGpUdrHVzuEXYRvILh+yowuRa9HYxlRW7zIZUducoNOSdvvZxByGgAAIABJREFU05M5jCgjHjHZRC4ZuaxB6MGshLIDVSUEapCjUwCOwEYiAg4KIUp9i9AhwIagZYLgQQyS8LlDBH6oT8GDnlejUz7/te04dmxUM4H0XfCXdtvHwL4M8hlBSN6itAFq8NWONrWDr+7qPrUVxw5a6yztGgdfQ6TDoEVhiCmiakOR4hm9RboEyxDeOzDRbR9TW7wSwzBf7UBacmarobRFX9pqKCWwgzgIONht3ay2TsWRLWBBDAFdEAcNoXkQIg/pE8SrtZu41nz4I+joQUtOGP+9oFiTgzAUkhnJM79ASSpYIKJeobgIlZyTfcqbEHFXcJOyDGrA/wNBBupH0KYQouX7hnFYp6G+YsBTzU2mVNg90yASs7sJPSwY2FITgEGyBT+51zkOarwhUvaPeqXegQlgNKRGl1g/BN2+WD/IVdjqJJZKgYnF64YZSn6DJqtGnlElSy2XJnPECSzh3eI2uFCJIFiWKIktAn40mSNJKetMYothLb2gQVPM1cEIFmCitEWfU6csataVtOgLGzWFTdqCRm1Bo5bIFqhRgngMibvI7bimm3nNMVl1sblNMfTaW/nc2NzG2wUtsblNcUU8wki9QppeKc2tV+XUqXLrVLn1qqwaJYvXXSs2t2udfLWdr3Z06Jxi/ZDEMCgxDIOLH9Gn9PtIFy+PyjyisYyAOsPkHIeyAix2ELGNZNewQac2j6gthCQM+FFY1UWeY+jVHl32FBr7AYkUD6jQEKLio4KFK6QeIUkTKrEK7yDBWMiWvW/cPPanDfifGG4vER9PBKDY/MDOqC1eucktNgy1a51QaHAV1laFjae2t6kdfKXIum09vi1TpXRA9dGhdYr1Q4HwJPIRC0ldox40LgBpGZS9km4CNaqEvSDTIF91oE/RMyilB9Gk1DGcETT8k2TCYZhv5LQbq0W9jaEbKH4YXIKmwT32AFShKKLxMcqCpgQavJh/+5KS5BqINSE/nH+z+HohFCnmSTrj9ULo5lug1iC/MlTlRZ2hwNVO1caBbZGKNMJGoZhIJE9VZ9g9031Dk31Dkwh9HKQkdoz0vJu4/3RkYs7qmjI6xkChCPpZWEOGFQNYZ4RnvNrilZncoAVWm0dA0tOqtNWKzZWCHnZbNwxQ8gjqgRh5JLCECSzh7YIWsNJAvAbFdEOcwpGkV8hSyzvp1YrCJh05Kusmyw1NYbOO2Wpg8bqhTykhsxpzapUwggHsIJZcitsgzPVGTkNsbtP1nAaIX4OK4x6jI7WcGKkUNWsLGjQQE8toNUC+bIvSylc7mmT9fI2jXeMU6QdhyQrsglW9Hg1Ra3hQkwIdB7nShiPrYKgc0bKG3jaq6HFDpmngu8haA1ADnqBeilkGIjgQP0rFEVfAb21JgB5JbYRYurkopk2B1SSKIJgKGVBroMIHnlpWMp+x2z4G+YzEqqt+kK92QKHBlVthgALaUICPNpWdr3a0a5wC3YCke1hJLKH4EWdMxLu6p+EpDZ7YDnKlk3wNw3sGxvXWUVWvB8LWUII8g6TYAC8AOFik3AvFvsIkhYySN5Z3mAA1eGq7EDZQ+rzg1YIurmH/rJesNSAOGglDn79cQHlrRCg0efGjDNfXbxZfL7yDaKXXwSQo9bymZDi+j/UIoIaDDEOyuaeQQg64MTgD3hnzEK7t8wq6BrgKa4fWif42qIStrqkBykIxko0StQa554t4DXC7c47MdNvH4PqXm9yoUETCJD1pIdNlHVX2eqTdw7B9BONGsSFoa6i0hch2J6wAK2SQwxZP2mqghNd7pe2JTGEiR5zIFiWXddJrlJlV8vQKaXqlLLtWVcztYrYaGK36kmYdiPzgFvh/l7Z0lXJ1Jdyu3DpVVo0ivUKWWa3IqVNmVEjTK2XQpMBm/c28Zig9YFkOLDxgylvUrAW3rsJGDTzVYHkJAiJrxeY6iYWvdgi6BiSGYUANsCBXo60T8whkIKvJtGf0v4Dioo9kqfqGqU4QLkhFAeAAdgNcfIjSErakxh7AkAtm4SPkWhBCDSg6XBQ0cVEG6lTsGKa4t7mC3g9afQYkCuE10GaKD380Mv7Q5X+AKlCYLuttflhaU/Z6xIYhAbm0BqjRorS1kXgRAA61Hew2JN1Dil4POAyQJmyEAyCgBtWdH9pz6uYL+JIL9YM8lb1OYqnoMDHbusnpW1dpix6wA6qPZbfmkbQcbRvx1HaRflBhcndZR+FfaSPxyz32YHTyMbiNwN7a4+evH//w6gcy2zUodW3+3auFd68X3r1aePty/u3L10SoEjVHHsEEtbhYpmdZeD9quPwPYOkDbAvgBR9+15GJuUHffZt7qtvml5vcgOUCnVNmcqOnHdQI9uV0+7DzM+i776KEU1KE4ZNqixeqSrClAOkRTAe0/T5UioMCUmp0tWscIGFQm0ckhmGe2l7faUGoAXHz2bXKjCpZeqUstVwKSlDgHcDm73ZhK3QrCSwRbMSmlEkyq+QZ1YqsGiWovEHxyWzrLm3pYpJPBWZbNzQvkPNewu3Ka1DDmmxahSyRJUwt74TcWVi6Ta+QppZ3JrHFSWwRFD6p5Z0pZZL0SmlevaaYqytq1jHbujl8Y7Wwp1rYy+F3s/ndlYIeUGoAmdfZPSwzuTu7h4HaQGZ/un4fXPkGgsskUtTMgxPAZVA1OLCsobF4ZSY3UCFqwneDEHohdwloSEHrNToVkHV7lwg9gSUF+AAgWLo3QC0xBoNzOV1LyA40l/WRkIG8OdBMB/gFYBaMjjHggIHfQTY8XLm1SdZPTF7VdsJlQ+2Apy6swKIlFG0fsSYP5kmBDmVkxkGx5kdtUf/wJCj6tf0+mdEF+du1YjOn3YhaWoAMKDTQPAVKD8RulLWb2BQtOaAGX+1AqzGo7rZ7plCRPvmA3HZ99gry1p69WADggCoDAOLFPLEvT4TFk9DwGg1TFqhTFQpABIoOsu5YUo8EUMNL2UqEUhC2leBFICDHNAwBZiMfJGLHBrrooQBwhAq6xh6A+QK15hzw3e8ZGFf0uKHGg+BCeN0AgICZIjFfNI/AYhL8+2GgAHnIDWTaFaPVAA1FTp0qs1qeVa0gfEOZwgSmIK64La6IB8AB3CTaLkuvlIKmO6NKBpd6br26qElHvmIYYBoKTwXqMwMQKr1Sllklg6381HJJeqUM4p0BjCBQMqNKBuKO9EpZeqU0t15d2kI8scBYgdGq57Qbq4W98Byqk1jAXEOgGxB1DUL2ohTKBIsXJTwCqQkFNkIKWAig7hP1DIxr+7wKk1vR65H3EJblEIag6ws09lBgOsgXN7T7Mz7zFFqVQd8MdBNouI6gIcQ7FjEgIcY2yz43ApHgwbwGVDrwtPSMz5Fl7GRQqmufV20egfYEAIKrsAKzCLQomqRA3cFT2/lqOzyYKsrq2nvYUOL1D6jQAElkH9P2eeE1jGLGE8AL2EsAYSji1xlkWDSTZwC8YLd1c9qNlYKeGpG5WW7lqx1iw5CSvKZgaQP+HQg17j/6MWhv7eVCYOGVpELhnZdAZCwsviJ7E8ARgvUgz2sSTV5TMOL1El+fZdhQIFrw2WeQ6z0+83R06vHI+MOh0dn+4UmgM4T6QVgK4iqsfI2DsELqcYMGyegY63WOI/YULb+6yPhFmLyidRIv/sg5MmN0jCl6PWBX1aK0QugmTA0khiEFOSlAvgkCHVGCSrqH1eYRsWGIp7ZDRh44ejFa9UVNWkRtpFVIU8o6E1miRKYwMOMoaIE+BaawiSwhvP5n1SigcADHjaJmHcAQOXMF9Y6+tEXP5HWXtnRRlKPK1HJJeqUU8CKzSp5eKU8r70yvlGZVI4ZFnFElS2KL0iqkefVqRGcUc3WgiOfwu0lrFlON2Iye9wRvR6YxwgUPDlSg0dD2eY32IEeZELtGqKhRjCO8RfNXOEa7n3CaI5cD0BQcJHZe/JF77AG8zts90y4/gSleCnBQD6o+EFIsfScEO9DWHHX/Fab13mBSA1GhekhvIFGDr3Hw1PYm0s2oRWlrJSGDOCo7qjXghQcGTyZS2NJHKpLQEMBJZscD1wZ3DUJ+iYHYW6sW9cLudVGzroTbVdSkK+ESSFHcrCtt6UICcwalT0EuXhWCnvrOPq7cClSo2jyitxH/DvQyDI82UKEU1FiA1TWADGJTHqiNeQIjXs2/e7XwNgQmiPfJBHm45fVCqJcP4MjC+2qNRTq2clbOylk5f/esoMbKWTkr5+edFdRYOStn5fy8s4IaK2flrJyfd/43owat78CZsPBo7MC2BTq2SP/IdujUqvDosLXH2uJW/3K/1YdP7mztu7bVkxjxj/j5C9e+wcKjw9Z+05fxiz/+7z9pGwevbeu7/vHzX/w3WTnLnRXUANT4zcvYr/dFRIeFn4k7v/HdL/hbZf6x4ndRYRu+6Uv7zfu/LPxx7BcV+7/bty4qLCJy3xfftF1fv0D57JNbnzcfOnJuyxks/EzONRr1e/8noMZvfrzy7UfhZyPPfPz/5R+xkLRFduzbK5sjV4VHbdx8LPfM1gfkn7yQsK15//Hta6OxTScST2x7EHgo1kxf25OzLXJV4LWEcjK2VGyOCguPDgs/3hb/4S/9KP2SZwU1orED2xYyNtdtjQoLj9q+//PHv+hv9fbW/l3hkXfOr/+bF8wG2a6zYeFR27ac3LsuKiw8OiziZMWtNfBHec4c3RYRHRYete3To+kHvpbdCaqb/iegBs1+6PTfw82/ez6c+/7or8OjsU2nTvwhclV4dFh41P5jW+bp2CLxvz6794sj1/5wNiw8auehT1/QsUX6Wng+wFmCGqvHTx3/FS0Ki1hBjRXUCI/GDnzuO3X8V+HRqz4+aEn5YJGOLWb+oW5zVFh45O3z6xbpHzz6/uivwqN/vXvnUzq2SMcWkrYIDx47silq1bpT1w7usSVAK/Fx26dRYeFRJ898vEjHFulrxs8fuLY5ctXa0+cP7VIdPhUWfibnGu3trf27wqPD1hzuSv3NIgWqHsZ+/Ul49K++2GuF74qIPPTl3kH4ZZY5H/wQ+1nPvTXv6Nhixu+bt50NC4/+5MiWN3Rs/tb+/RHRYWuPV1xfF/pSCb98EGp88DJuZ/EXpzZGRG3fcUBz/uCu8GjswOeeEyfDwqPDNn81mokt0j+cPnM8cBVlbOg7dQhewLd9erjy0scv/87DtexdwAUZ/jh2d+6uk9vWBtcC8XtOUl/Pf/Y9kidls/7Kppd0jLjgw6PDNn49mPnB0/NHfh0eveqTr3wZ2Lt7eyIjosPWHFGnfLBI//DB99/cObZLfeTkUtR4l7Dr+kdRm/cfurd2BTVWUCM8+p+2f3fho+iw8NM51z4iPxUEAW9iv/4EXWlpnxZ9HBUWHo1tOgWv86s2fz2Y9pvgb/nw8aVvPw6PDos4c27fkZNQDoSfLrq+hnJJrJ79/mhEePSqzQdsKR8Qt9OisIjIvVvOYOHRYeHRmw9se/H3/4qPTPsjSdT4bdeXkWHhZ8+f2Kk99XXuwa+bL25+ElxTUFHjXdKOxHXRYeFR2z4/kvApvCBHrz+0dR6gLeKoLOmDRXr4xKkT5M9fZ9x/elV49KpNx9P2f7d3bXRYeOT17ze+e//D9b67eEP/zYvrB3dCTbTl9MaI6LDwqH1HPnlJD0GNn32Pyz5Kr658+38I1IB/etSuY398Syf7wfDI9CvoXx+MksRZ3/XlmbCI79rituesoMYKaqCKNFDB0rHQwoF6qUcd+1V49K+27nOlffAuZXvGhmjyFY/yLZm/b94aFRZ+9vSp3y/QsfnYr3eiywD9qNgvEtdFh639rvnOGspdnM648tt39NW+EydWhUeH/W6/J/Pv/BXk73A659pHi+mfpdOiw8KjsLWBP2rnwc+eUb6eghrh46eOrwqP/tW2veMZ2GLGJ6yP0e9PXEsJl367SCBR5O3z697e+erriOiwiO/a7oUv0sOnznz3K+KXfN/Dtea9d0HfJNpxNiw86uixLS/oHzy7cmhzOPmaT0GNn3+Py17MvzXtP02icEhJGPIhthxqAOcVtfPQpy8ytq2gxuIKaoSFR4dFnEo9dHRzOHp2Yu9Hjd+a9keGhUcdOfW7d3QMvc6vP7T1DfVbknZdi4gOCz/RfDd8kY4tUp9qxI86c/LTyLDwyJioj4mnZvDz/j/LPmR8LNtzJiw8OmLXrtlM9EMiYyJ//5Ie/ujSt+QfFXiKU37yBtkXZyl/C/EifPLMx4v01Z5jJ8PCo397YNtrQJCIY6KECGgEwj7dM039nSO+EyX8/j0P16b33gUBcORDRHwYUo79F+5x6cUcMf39kY/Do8M+OipL+HAJTPwnUAMayY+OqJM+XFxBDTq2uIIaYeHR//Tl5z9mftz22dmw8OiPv9zxmI6FPJkIMmLtN30ZIU8y4id8cmRLEGoQT+KQS4KKGkQhsG3XXg9wfv8F1MjYpPry9Krw6A+37SMYEAKtECMAT/GgMQrlJxO/cDACBv/Jm7/y3ty/Kzz617t2zdE/fBD13aplruGjsqTf/e2Ha5m7CCUv4Fc9xYoNQo2ff48hj1LE9Plvt0dEh609Xhn7ERW5gjsU6kMUihpvrh9cH/iXoRM6nPpfdVZQg5i8vrj2zebAMGKdendkWHj05v3bn5H9wq9373xKQsP2Q5++pGOLaZ8WbYoK6VCOnPrdu8wtrI3RZIdCchwAIuQl0XxjR87HUe9p5oNRA8QLV7ZMUy6Jdyl/bNtzelV41LZdXwZIU7Izivl+wzs6SfVFHBMlLFtrrBk8ciqMbB8QAUFc4elbizZEh0WcSNh7GjE+JJULP/DD+1HHfh0evWrrl+OZ73u43n8XxN97quj62kX6b15eP7g9tEM50Xw3/OffI/X/+5H7zJHtEdGrNh1tJiADW6STbOjWL8czQ9hQ+IIlqHFnV8GBb3KIc2xvRHRYeOTJLw/I7qx+Gf/HvmvbemI3zP+MZ93/DWcFNcjnR+ZG2a7IsPDoX322Zyrzw0fnj0SEU7i6iJOs2LUkNESHhZ89tPvb21vOhoVHr/r4oC3tNwhowtYelSWu9Z048avAt5/dtulsWHjUtv2fP6G8kBLNPODU+1EDmLxf7fjTLPrN07bUbTtLVCtbTpz89MTJT0+c3L/zIf2DZ1cP7oyIDlt76tr+wzBWDJklU3/y/O2vjkZEI2b3w01n1odHr9p0yJj8ATH+DI8mHxBskY4tZm5U7zkTRuUmI05nXF73jv6+h+v9dxG7l6i51p68feDoobXRgQloys7ba6LDwqOxL3Y9/Pn3iP657hPHPwwn7pp4iD49pE78kJRdBCavBHATZ1k2lDxBHQqUTmfPR236JQU+v8RZQY3A84MYW4afSby0/h19re/7g9c2R64Kj9r++aHmaxsW6BgqKHbv/jZhS+SqtWdOfrnPFA+T19+8vLU3ZlNU2D9/a0r9zWLGRuORY9vXRq9adzLh9Cdzt/deWBf1T19+/iMVHTI/Fu2IDAuP/nDHnvG496EGUAzBCo6gNoc8RBkf8eD6ntwvTm2MiMY2Hc84RZUwYYuhvU/E9OX91zZFhcGgN2lz247IVTAVpmOvrx/8Y3jIaAlbzNhoOnb45CZCXdZ8dSN5aS37cL3/Lm4Bapy+feDIoXVR2KYTCce2k8UUzX3q6Pa10R/t3/7jf+Ue4SB8px7y4SVUXlEbN3+35CH6T6MGdDfAd/zyT+b/1vO/GTX+C2cpefYPOUHsw7aosA0H7em/+N/+/+v5O1OP/wHn3b09pyOi/3ho6+tf+jf57z8rqPGzzn83alju/Snm4xO5l/62VPR/4PkfjxofzkYd3bn1YNf/vkJjcQU1fuYJGjT8A0/Cn85FkBLSX/6v/gcc6lzpF/9lVs7PPCuosXJWzsr5eWcFNVbOylk5P++soMbKWTkr5+edFdT4x5+sC/82M/eXyZo/Z/2yv0nEn6Xdf3nl+/fmLYvtpr/+9Je/Plf/a/E/xPtn5fzffVZQ4x9/agR/+evCfyi/+aV/k8P/dv/tT89F/5KFLTJu/tvIg59++o+/upL+sXfKTPv3yQd//Y+//vTT3L/Xb1ykY4v0T/9FY/jLu3//6af/5y+O68Ff/6d/Hfnhp59++uk/hv41D1tsN/0VPT1fSf/lF/8/rpz/l703j2rq2vv/113PWs8//b9//ZZDv31626e1rbetVy5e7fDYXmvtgEMnrbVW5XrV2ioi2KIyiajMUECZQZmFkDCFeZBB5kkICVNmQgZIzpQz7N8fOxwOSYhAFazG9V4ucrLPHs45n9f57M8eMisnNZ5VBUdRNAB4M371cY5iZFYzhIlDjZfQvDoGMMDQZRbewGNdOYlfRFL5NOQEpAa/HYBpuodnbikwC8+iq37FnJqVkxqPTzvxgUkAFGTGu4jvi0hWFQMoZugG6rsBzS2iTGYAAKDUlPA44rsDbxExAADKyGAUoPuJENhxOEjIUTDvH0m3/GJz+r+wxl6GYgBggGnQnOuG+G7BqjoYau5VDUb5xMgUAAAABmgLMT/2Ta4nC3bMS0+Nk52DADDMgD+SUEADAOTJ6JX/zJ4O/xmptgYGMIxpmgEAUFOU8DDiuwHNFdAYBQCYa8KVXWjoz2YdOUuNr4kJBDAysvQanrIT8V2PJOTSFMUM3UD9TponMaDtpvQkoNrxKxuxFikAWqouCAvdMHdVYZV0BdiVEIqa5YvvesQXpifplpMIvx0AAMQhq/0APLVyUuOxKTiUMjPAWEXcGwNgmiwMJo0UoPuJuAgKZwAxQrY20gQDyD6CV8kABkzWEPXtDOBawgY0JZkyUQBoqc4uBgBgaiVS4+2dDoC2gaisoUkGIPV4jtBypExIkwxAus31HQwAwNBM8KOIgiOI7w58SA8hwgwFIwE+JEIDRk3WRBLlgVhph8XqoGWau809KgAIeiCd6BwBgGJGM7BMPg0AIEbI9m6GAQCpxpNyaYoB6KBZGEXwT3Ncg5Nz1IAOjuUfxYwnYomZNIEzA6FY1QAAk2Sen1kHqbEV79HMpkTotouWDJ3UeALkpMZjk+X5FuAtUgCMFN/XYjx1zYzlmd6Bi40AYLROb3ncrS1hPeJ3njRSgO4m0got1pLbsODpFvtUUmLl/CNj5sRA0khZ3AT+DuRqMIkzYKqfMlIAb8avfmgJKAAAxCEoa3XQyJFR2jBr9rBRmmzU2nq7zI1iACim7RebS8GhBjzL1IhHnzNP4gDoyNwPOGk4/yyBDFc09y6F0YAREzEbOFfVSY3VlJMaj00B/iTGAFpNK6cBIBnpMMMAMFOOF7cD+NovvUuZKEANm+vbGMAAldDia9Bi883ZDr/FbqvxxFlr4ducXtNscVWgZzEjxO/WzzuCNBGtYwAWwY8maoOwwmYGUExnED6gA0BP1pfTAAByhCwNI6oScb6QAQBMd5sHRhjAMEM38YEpADC6J9XiawwE2lgvpAbNDATYXAoONQK8yRkKkCNk2R3SQAJm3Fx8lyZQuvM6lhmM80NwfhZlogA9QuZ44XXZREkoLqygCQbgbfiNlxDfWWrgA+baZoYBgB4kcgtoimKGIrEWKQAMMyEghtQAACC/gzdKANCSBZ+t/sPwdMlJjcenDWheBU0xgFJSEikDACDGyDw3y5uQIgGMCFT9B/E7bIkaUApKLAMAoUpmB1wyyhnAgNFoNCKZpgEwCDA7p7vh9wctcQ1jB5GwZd4RGOmIiyW18Ed9GTDTTo4YANCRudsRfhsADCPKJgZlligIpSLzjuOdYwwAANDMZBketgEJ8zfLdQAAAMyMvAgP22DnnR93iyIYAEhG0002h2BX2CArhxq+LyIJyZTRPFf5lEKaohhxJMpNTLXjQT+btbilwsY+c9bsBYHlAgAoLS1XA2Ck2mpoimLEsXiLdDb9CK3HAdVvbhsDQEfx9632k/C0yUmNFdcf9J+fNPd7rqewAc1IJCcmGQAA3U0EP56hGUgNO82HPRQjxd+x+tfkaZeTGisuOHixbLP/g6c/csHICxtf8Dtl1pJgMht7TFPaoM81GmUzEPsqWjU4z01z6rHJSQ2nHq02oCnX8LR/rXY1nHqMclLDKaecWpqc1HDKKaeWpj87NfYTcgwAjK7aj/iuR/w+xxtbaSMGAMnohsg6zxWZhgx71Db/kGo8YKEKz/9HDxIRrz6Gijnl1GPR00SNl9CSLgAAMA2QLTxyaIhqsZ1x9Dg0Sw1MSonbKXE7JdcsTI1deEuTJZl4kCZoABjLijKYICSaIhmgvPO4ookLCs7F5MzCfAYF58gSI+aspQ7EcEaUgZkZT13x27eiepqo8SKSIaApBlAKsvTYCtZhlhryZIu9wWEO+9RgxdZ23JzxwexBCD41mbX9D9fqDbSkgVby8euhFAWnWr6IpBTQFAOMjXjYBpv0G9CUUPOE4RGVvhQF+JCImem5vNwc5s8rtR1dun6FNFKAHCBi3kD8DhFyZME2+u3E+DwKpYCxCg/ijhy7YG1yQIqI+IV2fvwQH5oGQE81RuHCbHPV2YfUOeg3s1JCluxf0ev86PQ0UWM9AldAAQAATg/Gzk402oBmZVMqLQNoZnqALDmG+MLV6wCQXUTIS5bXO9lHhG/HezQA0EyPjzULrhwnBscZimIM3eZeyWwaWIdlUcNSVYoZuIL6zroYxjZzez9D0ICQkcLjiO96xPdFJC7YPDzCEHPrNwBSg5d1AUAxQyWkchoAmtE2EQlb5uUfdJk04kzbWct8Cl0Bdt2PNJCAHDYnblmwVvHZNMMw4rAVdTcyyhlo0ss7PcCHREhmNA/nh+D8G5ZFcfO0AS3pYADF9Piic2sIF8pwI9Y4AsD8nQ38zpNGhG5zsKvAS2hWmWUZTtZihn5dsDa5DZv+NHqKqOF3mBg3AIAzox00SgFAMcORqN/s7aR09KiYoRgA9FTpfsuwPwwo+P3bPEkAoCcL9i9Ajc/wIS0AFKNqJoe+hStVAAAgAElEQVQmGAAAIOjGf8/WYRnUeAOtGgAAAKQVD9+A+M76xrCbM6FkAADMiDl+I3LjBolQAMzQA+WkfBoAmtG0mmt90Sy4YpViNAOUDgEAWE+RyG1gwIQ54S0LNfSN5mEdADqK/yXiu36+R43QA7OE5cLUdz0yt9SVZjR1RMIWxPdzYhQBjJiIcUFLOxh4kYOskv2bmEC4YRumxw/NK6Mt4EPozkDUD652JZnBG5bNisJjKJxkRuKx0i4ASKbtLOILp7QZKf5PxAQKCAU9hQAAANozD5HBURRtphsdepd+xwglCkgVPYUBooeIfgPxXY+EBZKTCAAAUEpKrgfmZjxw/Sw1GDAajfquR3w3zNacAVoRbaKYoWRi1AiA3JziYlkKRLXjV7iLhtVU6Q+I73rEz212iu3stGDL0iGpOWEjkiJg5pbh/Mn01FDjAFLQzAAAtHzsyksWVxzIzSmHiFEjABjdeHLOViezsUgONeYyOWGfGuE3KZKZdXHPmg3knHfju3451AiPpBAKAISqOmQ5YqGGnizYMUsxjK46hAr7AGCAPBn1m/VHoEnDIuDuGNDU54VUN2ItUoA14AGzczdpcl4Ngy6TRgqg/ebSSGJANnt9XLA2OQAAACNVsnt2jxwD1RKHVzfQFIy/zD73eakUQQOtAAv60CZZAZ7qjxeX0zQApnaCH4xnZVMkA7QNBD/WPKoFYJri/4D3aABQkxnvogU8apiHh7nh4hnAiInkOIpkgLYA89uA1okBUJMZX+NiIwAkM3QHb+xm5kx6PeLLmWMOzMxEvr3O13rO5h0oXXcM8V1v6arAZb4t/QyYXS9nub+z6IxJpkgGGJoJfpx5wgAASbf8hJZ0AUDSLacQ3x8IFQ6MQjy7ygLQxDQKpQAlIuK2oFUDAOD0QDpecpcyUQBvw298MkeNAH8SM9vsS/Tn0FNDDa7Bc45XR5kNJAAaMnMr4sux5yhbahipkh/tU2MeBeb3iXzXL50acN8NBkwWzC3WsFAD1nOBRnHTcIvg+k2WInbgYqPFDCA1gImZxgCYJPN2Ir7QE6GYzvOI73okJJ6iAVBloNBgtGO0mQHyZBSuvjOWY37rEd8viQkUMGIi5nNcbAQAZUw4QDuI6DcQ+8k2zPWMLNcHpYRfIr7rkRQBAxhmKM+sMXP20ZCaE7bOTgn/ER/SA2bEHL+fGDUCrAEP4Lyi57KdvZ6RZ3F+CM6/aR5WWFbW2bnmcH8TAADJdP6K+K5HYjJoBoCJeNR3PeL3i9lAWfJMETCAoFVyADC66ge0Tjy/5iTdctKyYngyGwuJpkiaGYjEB3QAqMkM19mHAafrAgg5NrvPyDtYmwKAabLgh7mGwHDMkzPHdyl6aqjxo8WxhK9l+C4FajInZO4dzvU14HubGTcnvoPcCKNwBjAj5vgdeI/GsuUElwUWv31ZvkaoB9GQjMexm1bNBkGtAnL2qfHjPG/ZUucRc/zGJVNDV4BF36IIBhjr8Osv2adGZjUDCLoxgBg1AnqQiL6yMDXA3Eq5h1Nj/gqRjHIGMMxAllljBnQ3EfzWLDU+xDrVljV1Bc0MwOimQookmU7veY69LTVYOfrqnFlrBriEUiKAkpgT3kHismkwOzMdTorXFWBwIIkZMafdpEgGyNOxxrG5WeoZ5RZqwN1JaJG5vgcAFZmxj0ONl1BhPwA4XRc5u1HIesTXdbZpB53UeBLEefNHx1IoDAGUkaNqy4hmILRGBhh6yLYmGqMscQ2/o4QSA4AB02JKYwSAYkZiUb/ZnWCwEbKtnjbhAACAdhAxZyyRS3m9WawAMKAwnji7e7ADasxufsMGHdh4LaGcHX9tp4bz8dBL9qjBbRSMa8B6rn8YNVyxTrXl2zlbegurE1letjBcMtdDQagqD3xAC4DcnLJl9rn/DR/Szut6yJNRSw9FZuZnUigFjI142D57ydYjgVdJMwPQbiJlj2UNu7KC4Meb5UYAtGTBAaxNDgBG9+SRKhQAlO4qpoyUZUU8fJmDWVI7osZLaGaCuToa50cTPSMMIOk2D8TXFc28QVQGzN4g+LbA6MZTyO0yhoGelDc5QwFKRlbP9lCMVfiNABKhgUGA+X1JTKCAHjYXVzEA9q1gD4Viei4ivi9ausOWt9RLaEETAyhmoojgp5NaHJADRMwZs44EwER3JuGlJTTBAKRptocyRRa4WYK4ENx/Nj1F1PB9EUmIJicUDMUATEH1xGHXX519hyO0fIKhGICOk3XnLQ9TmJ95RMpQDCAm6f547MqLs3MWaAZDGHScrIwgRqYAkJtTXJGEaHJikgEkM9lI5N0itQgwCLCHU+MNtKSVoUx0y+zDAS3c6h89SET52qeGdaOiLZ2ah1DjJVTYb/POn2UWoyBv70Sz8ueioZ2BaHAwiTOWRsEMJ7Ox8IvmCS2somXJ/JwBu6L8VgZSzE6y9YjvDrxTCgDDDIViLVIAKAaDw1szdJs/6rceuX7ePKEFgAHGfrJXMreTADx3SA8ANTsc64AaW7A22ex1nA3rQmBN3LTcjvAYCmdmByw+x8XTAExTJd+imTzLfoWYhBwaB8BEDfUzlkAsvKcE3ehj2ZwRUIyymVSjFvfBwjXWYWQ3YQQAGzbnullcCQZlLEXAg6+i/FYGMMzQVSQmg2Zg/GjVjWjJ+rNT42Ga5/k/ND2kBrf3sSqyDZ04lB1qwO4MRtcdXv1b8GjXsDvohrDKKGfAqm8Kf5LTQ7HVG2jd8NxY1Z9NTmpw9RRRw/cDrFMBDGXY6s8IgEMhj4ga8IbOOXq2egtrGQdawWo3/AdChS9IjaBfSQNqicv+CfW0U8MyirlIasCx+lWnBoQXd0qIQ1n2Ch4xx29c/Qvu1DOgp50aTjnl1KOWkxpOOeXU0uSkhlNOObU0OanhlFNOLU1OajjllFNL0xw1gKbKKaeccurhclLDKaecWpqc1HDKKaeWJic1nHLKqaXJSQ2nnnERqjruR0zVTE7eW6pQRSOmWP22rJCc1HDqGZdW2jEja2A/KkY69EqxUTO6JMlH+2QP+KvelhWSkxpOPePC1J2iwU6zqgZ+pCerRYPtOIaCpfy7d/+ekxrPopjJykVqeZks5qxH3pBltHqpV2MZWmqtHvlt4gpTd2pUE2PD7ewRRF4nGuqiKcpJDft6xqkBHy9aXUEqhbi8HB24jXYnIt0JSNc8mSZKTBOlqLQMl5eblUJKXWH1XDKTlbS6klRW4PJytDsJ6U60nDiUjUyU4vJySmV9CnsipaogFOWYrAyXl5MLJFt8c2h1BaEQYrIyTFZGKoW0esHcmMlKWlZC9CUj/RnTo8XG8RK2nrS6kuhPRruTbC+FY5kkhYi0lJCXE0N3sOFcZKIUk5WZFUKzVMB+JJVCeuE2sk1ARbnIRCkqLTMrLK2g1ZUkvFYP4G1KtC3dNFGKSEsxWRmhEC50za2EqTsxo14uG9WMNbMHNWPNcpnESQ37epapwUxW0rJivPEqmvUNFrXuodJGbpxI2DdWcd0wIsBkZexDSctK8NaIhTIRhB0ZaEwxjAgIhdD2tWluuoZFrTNG/2/P79+MtqboxEWYrAxSaRnNIftT0OxvsKh1qsjNxamXNaJCZKIU1tNOenkJFv8WrKTsxhuFiT6K/vyZsWKzUojl7F/MBbHVTNQrGbG/6Yu94N93Q/8tas0wlF6AH4tjTku7c6aGeZisjLZpI7yYeK0vFvcWTC8M+36oJX1ysMAkKcQarsKmLaYO8pufjZZf04qLkIlSUil0zA5IDZqiREPdiHwuMjo23GYwaJ3UsKNnlhrMZKW5LRI+oEtVw6V/3K+I04/wCXk5KcrEkj5wkDjp0Now/5Pi+7f1Ej6pqrCqA5bzLZuy/vz/3Ll5UdGfh0yU2hrVQ5tDDWdyyz2/c21G7G/SnhzTRAmttuPj4MWnuemLT63NTvAd7cicHhUs77JAvbBmjTJ2O/y779I6f+8juuTPuB8f3EtVP7iLy8utekNkfwqW9D43q5qza7/8/AORMAyNfXMZNWnz29Rc9vuUiIfagxQrSA0AAI6hosEOerIaHjerakSDHWYz4aSGtZ5ZalDDWcs2DCxq3fVvX7lfET85VIjOf9Ct1Oq99oU1a36/fqa96pa8N5drKkBTRasrrTyUtKN/rcgPlfflobKypVFDXmIFr/M71wb5uPfWJ00OFpiVQuvmD6Ta1vb0J//bVPq7tDtH2/L78i5L5Ddr39n4qiruQxYT3325Q3NrJ/djc1mspO22abwENpCZrKTG7nLpySZ+d8OasPNfm2I2LPs2xR56pbowXNGfh0hLbdEJxVIDAKDVTkolbexXM7I6yXCPkxrWegapYfGEOW/avkvrAnev3fWP/z2wb4f/haMBF44G/Ho0kKNQn8MpZ7YPBvwvFwenjuyRVIY7yASeG+J3srYosq3yprQnx5YaSNbXVg/6+X1vd1TdmhwssO3ROGgRXnjUOp+da/0vHL0vjJf1WNOKmazEbn9ua2OSgHUnDu/ub0iZ6M4ebs2ICf7lym/u3OswGrKZbewLa9b4ex/x955rKVRukt/krY/ZZAf27Zi8uYP7sV4QNdicNj1aTKsraVkJXuFlVQ1F8LrzO9e+8+ar133/M5byPbd6kd9YrvCvvxy0vU2Bvx697bWz6/Jr3FMOfb2ztz5Z9eAuMf8isOJSAwAwNjqonWhiv1WNNquUE05qzNMzSw0s+1v2GX1hzZoLvxys5kU0FEe3lMe2Vd7sqLrVWT1PHdW32itvamK2cM8au3McftSHrnthzZpfjn9VXRjRIIhuKY9tr7zZWX2rsyahsyahuzZR1JI+JeKZlcKHUkMfus7L3U3Ukq6X8Enlw/spbHDEDjW8j7SUx413ZVt1B7jpc9zX5p94ifsxI/Y3UUu6tCdH0nanryG5qyaBvQjapE+51KgqDK8XRN+viO+Yf624yexS40FTmmFEQNwLZgMrbNsjv1kLeVSWc71eEDWVuIu94O9uWPPL8a9Kc67X86Oay36/XxFv/zZV3WKdHSxq3Qtr1tTwIoZbM2bGiu26G1bUoClKNNSFK2st92iyWjLUPjNjcFJjTs8gNWh1Ja2uRGfNte/Suu3bNlUXRjSXxfY3pox1Zsl7c5UD+aqBu1wpB/LlfXmTPA/u4yhJO2plRfdKYvoakkc7MuV9eaqBu6oHd1UP7qoHC/QSPiYrt3pq7VIDviFv+J4Y7cicGSteKJbJym5fg0ON2PGubEzGoQYnCArZd933P/qYd9gTT3/yv81lsRPdOVpx0ZSIp34wdxFm0vdy21vDi2ivvDnSfkfZP+9ycZPZoQY/arT8Gpr4rlWFc9zXvrthjfv3nxdmXKnjR7aUx/U1JBvS3OZd4YLwxuLonrokSdsdWU+uVblQiv78qaJz3Nt0O/5ib33S1DCPmh9XgrKiBgAAQYwSUScb4MCVtaLBTscDsU5qPOWC1EAyv+Y+ynX8KOjHIhOlhLzcrBCalfOlEOLycqPwN+7jKE49YmVFndUJ8r4800QpoShnzyWV9kcBudSQBKwbDfofNvPiU2uzEy7LenMddMjBfARgUetqzq51TA1mshIv+Zmbxu2Td6sLw7vzLnGZde7Ut4NNadrhIkJezr0CXNS+sGZNbVFkb32SZqgQn5/M6tpyqeH1/XY2zMGq1Xvtvs1rDuzbkfr7rzW8iKbS37trE0fa70wOFZrufGXNqapb0p6cmbESXF5O2N4mpZBQCJHKi9zblB7n01mdoH5wl7SJ7wB71AAAqFRS1dhcgEM73jA20u+khkXPJDUqaHUFkvkVayRh7u/15F0aFV43tMVjPUl4b/JCMvFOOKBGbVFkT12SZqiQUJSTSiGprHAkVQWprOAaWMCPH8xEvszmH/v9y43F0ar5ww1cMZOVOGeItObs2vM7H0INrmNSfGrtC2vWZCVebhBEd9UmqnP+Pa/bkuI/3pWFTMwxi5msRGe7dWx7+xqSdeIiWl3BrRUb4rWihj7U2iHqu7Tu/M6127dtirr6M+whdlTdErVmqAbuGsdKCIWQHW3lcko7zHPggjGTlVjN5XnUiP2to+qWauCubVQYLEANAIBE3Dcjv8cmk4pbNJNyJzWAxkmNPyAuNZYq/a3/66+J10v4xjtfcg2s7/acI6APXXfpu63dtYlacRGptDPXg6jz4zoI725Yc+fyXKNsqcENgupD1727YY2/95EaXkR71c3xrmxVTyZ3tOL83rfvC+PVnKDsH6cGV4rgdZHfrH3nzVf9vY+U5lyv40e1CuMG7qXKenINIwJCXg7HSq1KrONH9jUk6yR8bom2wm2o0V51SzmQvyRqmM2EaKhrkTPNndR4yvUkUAOLWldzdm3mzYuG1Ll++4F9O6oLwycSv+SywP/MNyPtd6wCHMxkJdl9k8sX9/fXHNi3oz3rVwfU4FImcPfa7ds2leZcbyr9XdSaYRgRoNKyqfpQNkHfpXWXPQ8Pt2ZMjwrY7tWjooY+dN35nWt/Of5VQXpgbVFkU9nvPXVJox2ZU8M8dHb6HLDHKQ41HMV6Hgk1AAAGg3ZM3MmmROR1CwU4nNR4yvWEUCPHfe33X++cSviEa2C1RZH3hfFTsdvYZK3ea2Ovn53ozoGdBWhO9HgBN5wBX9ql2de6cuf681bU4J4CLTD1919riyK7ahMV/flw3vf0aLE+5Qs2h6RDawtSA6Q9Oai07NFSA6rNb1Nphn9redxQS7r6QYFpohSOGXHhuLrUAADIZaOaibkAh2asUTo+5KTGs04NScC68zvXLlLccCOXGjCTMPf3Fq8D+3ZEXf3FampDvSCqtz55tCHeGD03NyTHfW1FfqhqwBLgYCYrcc5si5qza1kEPCgKWIAaZXjhsaVyTR+67t+fvdNReUsjKoRjxn88rmEV2tCHrmu5/ulQc9r0aLHdXtiqU8PeTPP72imVkxrPNDXgk11VEFbDi6jnRzUIoh1oJMPdLjXgM10JMxFENRZHNxbHPFwlMZr5vkaDIHqwKU314K6yMphrXRf3vNJdk6gd5pmVQqLCmz0Owxn+3keqeRGtwriJqhC71EB7kpbnEPVdWud7/rCkzdJF+oPU6Lu07sS3HzUGWbseymsvNCee0kv4+Gw4Yy6r1aYGsMw075w/09w6wOGkxlMuu9So4UW0CuP6GpIfNKU+aEpbQKmKvNPcx9GKGtWF4c1lsb31yUMt6aLFie0RWKhRHD3UnK4fEegkfE3ef7jv5N9+3CFpu2NsvME9CMMZcJ7IYHOatiXWvq/hcNq7YyUdWsvLuKLoy8NkZbYjGkulBqxtXXbAwNW/WxU0dOW1rsJA41iJeXa92YpRAzfOm8TFMIBh5oFDp9VIR+YCHDOyOslwNzfA4aTGUy7bHorbJ+82CKIHGlNUD+4aRviGEcEC4ptSLa4BnB/FUgPODa0piuiqSZD35RlGBTNjxQ/V9Gix8fa8MZSG4uihlvSZsWJcXj45WKC/Obe0RBKw7o7v19x1XDCcUZJ9rV4Q1VOXpHpwF+lOtKUGO+VJH7oucPfagG82PrT3dPPkXGBFH7ruzNfbHjSlTQ3zEJv5GsugBgR0d21iS/r5iWuvWrGj88oWSVMSKi0lVRW0eo4a8IIvhhrMZCVWPA/uD6UGOmNZ20rTDE5QMyZi2kiYULOZpJlZfoyIBybH5gZiVaPNKsWIkxqrXZWVkmWWV95h9sFq9V7bkHRW1JI+PVpMKisolR2ZRZnctR5wWRo3GtrqvZYX59lbnzQl4pFKIWSTY1GqCqsJUSw1aHUFKi1TdN0xRr/KNWD2bzacASdoTnRnIxOleF+yFTU6BCHILGhy3C2UqS4MryuKrBdEORC3L9Z3ad0N3xMj7ZkmzjjxsqkBJ9RJe3LGu7L7G1Oaf//REPYCFxz60HUdEXuV/fmYrAwp8+RWoyz0+9765KlheIUrbUUNZxGcaWySgHUvrFnDy7jieL4GpIaZYkryqu5ei7556uKdnz3veAdkx2ROahEIDpqixMN982eat81M65zUeCYEHy9jxy27DvlM3D+0SZ9qkz6DMiRst5vs/M61B/btaMwL5Fo1lDH6VW4OdqVJ/VLUmGiaKOXOfeRQowTu1mMcL1HUhduWPhfOKAxvLosV379tGBFQqgqi35oaU4mfcO3nuu9/angRzWW/d9clDtxLfbCw+htTuJ5O5Ddry/NCptN2/3Fq1AuiHtxL1Un4yETplIg32pHZVx3fFLzLqo3Kay80pnhMdafbXfNqdZu0SZ/ZvU2R36zdvm1TNS/C8dxQdEZL00zaLYHo151dl364GlmRnFQVcyFS5vNunFfopMqCBrMZlwx3syfiylp2Kb2TGk+5LB1maala6D8d8T92nzbHgiusshIv1xZFDuT+urxMkg6tzU/xn07fsxA1mMlKUlmhl/DVBWesXsWWcEZBWENx9EBjikZUaFYImclKK2pwJ31xIyAP7qWqBu7qJQ76YgLtcJH83lyURBG8bu+n73N3yvhD1GhKmx4V0OoKs1JoGi9RPbg73JrRwb8xeM3VqqX/+Xr7SPm16YiX7F5Dx4KTX2+GecIZpQ7WoaAz2o724SbPg4jv+mu/JQhqx8QThoZ2eeWFn6cu/e3WjTtmkoZ2olJJVeMd7Lna8YaxkT4nNZ5+QYM0K4UaUeFg3a2m4E9GAl9YzFOoCF5Xc3btvs1rtm/blJV4GfbP+xtT+qrjm4I/UV5bVCZcahz+dtdE1gkWBO7ff86lBqwqoSifHCyQZp3Uh62HdQjcbelo1BVFwjAKNrsZh1kphIESOPUzPfAQ134K0gPr+FHdtYnK/nxMVk6rK+w6+VCkqmJmrHgq/yTMwdIjy/yJ5eY7b766EDXYZSDQI4P9OLaNLDVmt1+sJBTlhhGBrDd34F5qW+aFiWuWUWfoUt0K82zmhzUGfbyk2wQnqt8M86wqDG8q/V18/7ZxzM7uRABSY3oqLzIV8V0v+nXn5cC74olp3EwbZojumEDEd32hp6fWgLOmIhH3W880V0ud1HgmRKsrMVmZciB/4F5qPT/q9+tnE87tcjy94sC+Hf7eR7ISL1cVhtcWRbaUx4laMtQPChT9eQ+aUusFUUk3TjvOxCrD6OBfGgtDmlLPBR754MC+HQXpgQ3F0aKWdOMsNWA9UWmZrDf3fklklt+327dt8vc+UpJ9rYYXcb8ifrQj0zhewo5WksqKyb7s+7e9vQ9td//+85Lsa625vrfPf/zOxlejrv5cXRhxX8iesogF+BCsRYGtl9/at3mN+/efVxeG37/tDWublXjZ7vxuZrLSJCkcLAq4cmw7TFabf60hxcP7e0uV6gVRg01p06PF3BFWSlWBycq0w7zRjsyeuiThLY/w4+9/9+WOX88crOFF1AuiW8pj6/hRcTc8Un/d4+Cqnvj2I3ibboZ5woHweyUx/Y0p6oX3K8HUnSbDVOnVYMR3fbf3Xt/4ZqUGIUh6xkTEXogy+a7v8tobFNcwJp+haQYOxI6OPmAHYunJatGDttb2Zic1nn7BXW0xWRnsWvfWJ98XxjeWxNTzo2qLIhdSHT8K7sHRVZMgabs9NczD5eWYrGxqmDfWmdXXkHy/Iv7ewzLhqrEkplUY11Ie11AcXcePaimPG2nPRCZKrSzKOFYy3pXdVZN4rySmjh8JV22IWjJ08/fgoFQVeglf1JLeWh5XL4iq40fdK4lpLou9VxJTx49qKv0drmQ128ynWugSodIyWU9uV01CQWpgDS+itigSZthYbMlwqCUd7q/DPQuTlcl6c7tqExuLY+r4kQ2C6Oay2JbyOHhWc1msuO22cbyEmb9REDNZSXI6LJ01CU2lv9fxo+r4Ufcr4kUt6SPtmQP3UtsrbzaV/l4viK7jO7hNkQ2C6KbS39urbg02p6kG7qLSMgd7ec3oNLf9IqCv8fPPiWd+STpzJsndPS76pJ/u0gtan5ckxb7322ofjGhNKMkwDI6j4yPdQGMBByKv6+luclLjmRDbVTGNl2iGCse7skWtGQONKb31Sd21ibbqqUvqb0gZak4b7chUDdydGS2G0QTL4z5ROiXiTXRni1oz+htTeursZ2KV4WBz2lhn1mhH5mBTGpzooR4sIBTWW2+RMDLalydqSe+tT+prSJa03ZkS8azen8xkJS4v1wwVjrTf6W9M6WtIHmpJH2m/M9SS3lufBOePcffaeOj1gcCS9uT0N6a0V93qrEmwZNic3lef/KApVdE/1z/injUzVizrzR1sTuutTx64lzrSfme0IxOeNdScttBC3tkOi3B6VKDozxu+n9HXkNxbnyxpuz0l4hnHS7TiIllvrvj+7Qf3Uvvqk+1e5J66pL6G5AdNaZK22/K+XNvJY1bC1J3TOs3dgBDoa1wLzI6L5MVHFfnFt/j8FGX4z1/R5FfQiSByOqPr3t3WXpVqCkEwcmRkSD06108ZG6ybeFCy6o/0CulZpgYUfFLNSiEqLZsZK9aJ+VMinmaocNJGGhFPKy6aHhUgE6WEQmg1i5FWV5JKISaDmRRpRHZysMmw0DAiQCZKkYlSvYQ/NczTS/gL7d9NqStwefn0qGBKxJsS8WbGiu1ueg6tDhrY1DBvelRgGi8xjAg0Q4U6cZHjfXftXhxKVYFIS6dEPHlfnrI/Xy/hwwynhnk6MR+R2tkDHZ6FysrYZMbxEmSiFH7US/iOqwFPx+XlM2PF2mHelIg3PVpMKMppdQWpqsDl5cbxEr2Erx1e4DYNFWqHeYYRvonzWw0Omgx9jezASEiNr31KTwRXn7xWfTa0TnD2l5lfXsbzXyGMdxliJPLmzR/8yjMEgx0DkyhmHhjoRBSNbD6o/NH8nM2fQE5qQLGROTiNgrQnSlVBqSvgErKFNryAmVALZ2KVIT370yqwXNtfWrHJ3DJ/5CE/dKKu5CaD9ub4LMdXhlQKCXk5oSiHmcxVQ5VPCs2bucEAACAASURBVK9TI9YjmnZry350bMb2WlHBzhbl5rzgbVI5uk1WgnGNm+H5U5f+JvN59+ezyds9Cv/Po3Dvb8VZ/zlj+PGv6K2X8cGDyo7P3ztb6PN7E4KaddOYagpFUXR0ZIANcDxDclLjaVQpzd9j8t+Phb+FpMcxc8crmNpDJt9/kxIh0FQBWSQW+BM5wR2MrGBaf0LObUSun6eUiyhIEo5ded3k8YLJezfRWfTo6l9EpuzF2xYXJmg9YfJ4GckLJK6/ZvI6QaqqgKYKDPujHhuQ4E9RftpDc4BjKM1dyhTvq4jv+tgL4W5ncv7Po9Dd47bwzKfT37w0c+5lJOtbUYzbe2cLT16rrmmV6QxY16CGphmDXisd6V5UPZ8mOanxdEoeh1/6H9OFw+ZRIdPugfy2wXTuNbQ0C0ymEv6vIfmpQH4LD3rb5PU/ppDLVNV3psvueOo/kTvxTMMxk8crSOINWlVOV36PeG9AgjyoPj/UY4952MqhKKFytpviDmNef0ODt5pirjOiYOzS66bfduHtRUyPD+rzNuKzC6++iJ3fjuccMv32E9l6HvV52eTzBSE8h3rsMQ8XUYV7EZ+3TB6vI1kX8OvvmM69g+Zdxq+9ZvJ5y+T/CyXn1EGeaQ55Gy1Npgr3Ij5vI0EeFOwRtJ4webxg+u1txNuKGrYVti84X2NKhzXfH4k8HyH6dWehp2ei55X8X365esq/4fSZ6W9e0l46MHzp6C4v3ntnC/8dVHUmtK5rUAPnjI6NDhnk91f/jq+kHjc1RM0Zbts/Q6Wlq9/UZ0qQGuf2mUVF1J13TemXiJC30dIs0OWBeLxguvQz2Xwa8XI38/eYQvzp0evouVdMXluxxgj8sgtWdhE7/y7enmIOeRvlX8K93sWF3rNGWErxD6KhP5FjFUAjpKsOmoL+hZx/BfF5G8m5SZfuMYV4mdP/idyJINO3mNJDyfR/IneummPeMnm9hqTEMJpiMn2LKT3eYtWDMbjXFrwpFPd6F28vBq0nTF4nSFWWOeRtNN0d9dhjHr49V4e5+nBO0VQyDUdM/u8j519G4vaj5w+ZR/PpIcGsr7EHb8hmBnIYh9cKUsNMMThB9Yt1EdFlMVfSU68m+AUXZZcN55YPlwsH8mMLDvqWByW2HA6o+PpiyZXE++MK4+yEUUI01IOrGh/NjftTaAWo8fxzrkc+c3OCYwVVQhV+Ybp2HI9zRRJDqHsnEK+NiM9bSE40eef/kJuHsfPv4zVXMd/XTZf/jlz2oNQ55siNpiAvSlVE5exCfN5GQn0oeaY55DWT1wYkyIMSh2MX3sPbi20KKqKEx1Hvt9HMKFolpEv3mM69avE12j0Qn7cRn71ETxEt/MZ07hOipwRoyujCXaag3+jxCOzCe3h7rqU46Dj0/4ac20X0p8+nxmwd5AVkgityJ4ycq2El0Ajp0j2mG4ex6+9jfA/U4wu88JAp6Dd6aLaHkvUT9uunRH+Zg8s1OdYck5ERfftOzO07N5LTAuKSLkUnXIy65RkSfj40wjsswisswjMk/HxouFdYhGdoOJR3WMSF8MgL4ZHpBfnJeTllVc/MAIrm8VOjpzbZ4+MPQz/e5ATHn01ZZuieLDa9kC7dYwrxpx9J6ZYuxu0l1mE5MoxXjvbyuBrp4Ul6eIukhuwBX/aAP/FAgMkdbWX6VOlxU+PYge88Pv4Q8XnNCY4/m1aVGpIg9NwKUcOpJetxU+P551xPb/8A8XkN8XntjOvmo3v2rX6bnXLKqT+iFaCGu8sWSI0p7w2HN7lGXTy9+s126ikVJeHN3Ak03LxAdN5Z9co8tVoBahx+azOkhhMcTj1Waf2OKT79h2KXi2KXCyXhrXp9nlqtMDUWCQ5pd27+rcDAn454fLnb5ZX3nn/O9fnnXD2+3H3u+2/zYy93VSet/oVz6knSzJ1AxRdbIC+gnL7GY9TKUwOC4/NXXaN8z1gl1op4KSHeX7h8+Pmb20I/3lR56G/dJ96UebwOT+k+8WbTsY23Pn/n8CbX559zjbpwQtScsfpX0KlVFSXhqY/s4vJCsctl8tTeVa/Y06xVoQbi89rw6TdcXvhn2e0bMBkqLY3yPfP8c66hH28aPv2GbXoryTxez9z3tsu6Lee+/1banbv619Gp1dDMnUC2S+J0NFZOq0UNFhwNBVGd5fEuf33X94O/Q7di8Zry3pC57+3nn3PNj728+pfSqZXV5Km9trxQ7HLR+h1b9bo95VpFakBwPP+c65v/35amYxuXxAurTA5vcj3itsc5GeQZESXhKfe9ZxcZygMfrXr1nn6tLjVCP9707c6vN/3P+5WH/rZsakCnwzmL7BkRWnfLbq9EsctFue8959DJSmgVqRH68aYjuw+iKNbV2fv8c66i8NMzDbyZcfHU6DzNiHoWyQ4nOJ4FKQ98ZBcZii+2GG5eWPXqPRNaLWpUHvqby6vbURSDxet1ep1OLyyvDgoM9/L050ohU+B3bywSHL4f/D3wF/fVv6xOaao0oqLuhozuhoyh+1n9zXdGOnNHOnOVAwV6iYArkvNrA5is3OpbvUTAzZOS8BbyMlTff+yMaKyQVoUaMo/XXV7cJhoSW9YaE8TdfAGclGErYXm1uYm3+K7K56/PDc04tVrSSwRlBbGs2mtTuR+XpKaKZEiWBcMZn/4DTtYw8cNWveHPhFaFGme3bcnPyIQFkwQRE53IxQTX0QgKDAcAECXxi49xdJ940+Wv7zr7Kaur7oYMK+O/X52ybHD0N98x8cNs52VYsWPVW/2saOWp0X3iTbZvgo8PikQSFhbiYQkAYFolnxkXmybEhnHx1Kh4prd5qcFR3w/+7hyLXV3VlyaUFcRW8eP7m+/0Nt1uq0ltr1m+u9F/4agjXjgHXFdYK0+NM66b87PyYakG6Sh0NPa4HQEAYJI+WiEpCPz18KYtugsblj2kIvN43eUlp7uxmoLUuCdMKiuIreTHV/Hjl42MliifhyJDue+9VW/yM6QVpobM4/Xnn3OFjgatkU2Nir08/Z9/zvVuvkCv1bK1iQoKObxpy5T38sFxdptrQ0HU6l/fZ1VtNallBbHVgpsWy69MhhGKZSHD/jirc8B11bTC1Cja/1bAGS9YJC0b5lIDzP+3eHCgV/81I+oxTYi50oyKpWNj6IwGyqRXmA1DQNc0r3pT9WbD0MzUOJsM1Q7bbQWh60dnNLiqCWiqgP6+blKqnVTalW5SalUKqh1G9FIwVb/kq2foMukVxFTXggl0TSbDpEmvsG7XE6CJ3nxo9g3lSSwvWquWFtqovh0md9vqRMYTpxWmhu8Hf29saFkMNRYPjhmVPC0122q81kppqdn3GlsAAJh+DFaM0PWbCbyrq5d77ujIKDBYWykjLzXjeEx0osk4A3RNRu3k3XzBQgXdzRegMxr2XFx2HwBwr7HFbCZsc3Ygk6oPx/G7+QKCIOxDwdBF4HhaavbdfMGMTr36T9J8kaoK1rOA4FiGRo66PQQZu7daIaOzOj4y6JTHia88TnwVGXQqL/myVlTATVCWHZyXfNmxhppTbVsk7c5qEETAzAMuHC7LDkal8/YKHWpOXShDaXeWgzSwhlpRgd2aSLuzFlPhBkHEUnNe/v1dYWq4vLhNq9UtkhoAgKPfHDvjuuDUUigAwPPPubof9XBAjT1uR2D0RCFXYvoxZqoNxzBYNHfUprenD9E8sDaA2hBYhGxighmt0g/1wHHiLZvd7uYLrCQelnAdFvW9EmF59fPPuaalZhundYu8aIyqDgDgftQDFmoXN4hq4m6+YMtmt+efczXoDcA4+FgpsAyRqoqJ3vyJ3vyx7jyNqEg9yFsSMhoSrtgfZOV81IX8zBaHSks8Tnz1l//67x/378xLvtxZHZ8Sdf6zHa5/+a//zku+zFo4Ki3JS778l//677/813+/s/FlyBdWbHpuQ1BpSWTQKTbnvOTLARcOv7Px5Xc2vtxZHc9NmZd8+Z2NL8PMuSn/8l///dkOV8iOsuxgNs1nO1y5OQw1p/64fyf8ilsN9mDAhcMwT9sKw3axOf+4fyeXC0PNqTAlbHWDIOIP3dwVpsbzz7myRS6GGiRJVgur2kv55iaerdCr/2KpIRJJplVyq3mlrEgcM+j07kc9YNh1eqBZWF69ZbObSGQZtYHJNGP9tk0wCwPnqDHVhiWfMmMYDOLGRCcCALBJubq2SF1bpL5Xgo3P2+FeXVvETkVRyJUL9YCsZFSOs2fZpQajaiIwbMtmt3uNLV6e/jHRiShifHz2/0ikHChYEjXGvv/EDjI+38L9yDoaWlEBNJjIoFPcQrko4boG8KDHia+sKolKSz7b4cqlhlZUsBBKoDFblcgiybYO72x8Gb78GwQRMI3tCx+VlsCvUqLOcw/C1r2z8WUrBwd+xdaNLd0qGdBUDTWnwq+sSLccrSQ1uk+8eeTTL+1SA/r2S1JXV+/MuJhLDfy2D9cHqTr0t7rY83RfOt2XTvB9TFW3xcMSiC3UoHM/6iEsr0bkYvpBDkxDi3LsNoFLDWDookU5eOo5M47da2x5/jnXoMBwHMcJnR3cgFlqQD/I/agHAADoH/KLO4SsQ6fTb9nslpaavRA1DOKeu/kCSEDYKIVcaTYMPaab+Egkup+1pIiGnf7Il+8vNNRq14BZQbMPuHCYPQLNmHuEFfQRrFLazZk1Zq4dskTgptSKCuDBsuxgwDFgu7W1a9vsKbak41a4szp+oZyl3VkLoWrJWmFqeHx70C41licAgANqZO57Oz85mK2JWRgjlYhZZweesphYgxU1gKaKFuVgcUdMavm9xpYtm93cj3rgOM5GTLiC1PDy9Ndp9bBHg5kMjoqbqjfjGIsYu9RgZBWso4GI7qMGXUx0openP2kmlhNzXSktydGwM0HjM9d53ROOo8EaKhs+sJLtux2ywMp9AJoqVFqCSktYi2VPtAqOsII9F64LsBARuB7EYqhha9tl2cFWPRe2zmzi5eW8ZP15qbFls9tqUQNoqhh5KZ7kbpoQK2QKCA6FXInopVbnstQAAMBOh2OnwCgXQxcGTnizSw3oaLgf9TATODNRYhTE63R62JxF9oBWXtzg6EPV4/eT+MTX1o7G/EVrto7Gj/t3Ak1VWXYw18I7q+OHmlNt3f6AC4ftUiMy6BTXqBbqyLBirRQ6EWABu2UrAAMKy7ZtWG0HvYynkxoL9VBiohPHxWKpZAma0esM9yuXQI3aFLaHMkcNXAWQcUcydNmlBoDguH1iprdZp9O7H/XYstlNIVcap0a4zWepgRr0MMDp5em/0LAIo2rCMQz2TbAZg/1CZx0NlhFEngd0N9yPepiJJ9TdsFqW8pC+yWeu8s9crfsmCzgarDHA7kZe8mUYCIQuwzsbX4ZGYuXew/4/Sw1pd9ZQcyp8mXMjArADYgsXViwO2M6OXbtNiTrPjWuwaYaaU23lwLZh2AVmZdexWnbOS9OTEw01TIyQA02ONd0qbIz0kyVexG/7YAk/ccdQRCIJUX0bv+3DKsnfT9ItBIYuYBJj+jEzjgUFhsNYADwlJjrxodETzaSabEld6LUPoNHe48ERmS2b3Qx6AzcNSw2tUjrTwIPYEpZXc0dnLZqqR6cNMdGJWza74RhOduTYLdQg7hGWV3t5+psJHAKCGSskSuINOv3zz7nea2zBZ+SP6Vb+ES0+FNpx3VOxy8V6ZtehnQs5GqwxQNtmw4GsoJGw8Uh4lm0yVmzObCDAATWADY+41NCKCuBI8F84YyjcNA60kG2ztbIbavkjOS9BK0wNlxe3SaVyu9RgR2Qd/5NK5S5/nbeLD7QuYXm1SCSxq3uNLdClh3ZlGO2HpyxG9xpbZvprHFADaKqoBwIzhsEOiEQ8wh27naPGpBJP+gEz6NJSsyFcrPop6Fg3ZMq9xhaTTm6/WySrAADscTsiHpaQ0yPsuUSeB27QxUQnWpj45E36GunMXQwyhs4enKXGnGS733XgaNhS452NL8OZGpAU0EjYwUt4lpWvoRUVsL4GmzMbwlyMr8HasK3dBlw43CCI4Lowf6QfAd2Nz3a42o6S/MGcl6AVpoaDWV6LpIYtOBaJAPejHl1dvThiNNeEzfVQHvbPqJ9aqIcCRej6CRyHA7FpqdmoaYb7LZcazFghnuMP+yBenv5mTvCSmWyCOPDy9Ie9DLuFGsQ9cKgVADBj0M7NSVXLUYNep9VDes5MjT+mu7lsLZIasj3v2q46kX7zoYNValYxCzhTg/3W48RXi+mhsIoMOsUNi8AeymLiGmxWju12MWkc23Zk0KmFuid/MOclaIWp4WBG+eKpAQCA2391n3iT62s4CIIAAFCD3jTazjVIkUhCduSYhYELiWyOAQtEQ6EQ7TiOYTCoca+xBTNOWw2scqkBNFVkbchMb3NXV6/Fp9ArYDLTlAq6KnqdHvogtoWyjgaEi11t2ey2ZbMbgeNLmoe6AlokNeS7t41/97GCE9SQ7X1/Xm9lvqMBBbv6MBpqZU5aUQGUlUewEDVgYvajg+kPUGzA4qFjKFwtY+QVCnpDDiZcPJ3UmLd6bX40dGbGuHhqAAAaaupcXtiq8nwd2ItrtEVfVpbeIjtyoKjudEZuWQLLpcayx1DAVD02o1PIFFs2u+1xO6KQKRCtwjYSaUUNoKnCk9zh2CqMX4DpPkLWoZApIDpNevVChRpHeu41tjhABguOu/kCk2HyMd3Q5WmR1Bg7uHOWFBZMwCOs0LpbtpmzQ5ILjY+yxv/QkVc2Q/gHG320m5Kdr8H99lFRw7ZEeJbdmizS0/mzUgN2UuCWPLRseEbUA+cywSFJAidIklwSOPK/2QRsxlDgxjwLVYk1yK6u3sVMxLZDDf191DgNh0i9PP1xDEPVIrvn2lKDFuUYBfEGnX7LZregwHDSTECIWEISs66KVaGso2HQ6R1MgUUMOjjNHMeeLHdj8XENLiPkn7nOEeTTf+jCrH92i5WDWV6sbXM7Gg6GVGG4EczO3ZB2Z8HTbTsF0NGAhbLv/yVRwy7m7FIDTn61Oy2tQRDBRnntzjGzyvlPSY3uE2+6/PV96G4QFSnQfiA4ggLDHQQ1rYRh+Mz0zEjqVVtqnN3m6BdSyNoQEsfcj3oEBYabCQLVDoPpPmDosi9dkzU1DF1mHIewS0vNBgCQRrmdE/X3gT1qAE0VwfeZGRfD9SldXb3wD5FIwp0nZlUoOtZ7r7ElJjoRR4yWmaz2hCWfIjBsj9uRmOhEAjM9pnu6DC2SGlZrTyT/tvziifyLrRMHdxpzri6UP2vbViss2HnfVuFDB9T4cf9O2NmBhtogiJB2Z3mc+MpqNje01QZBBFwbZjvyulDoAcwfH7X91pYasBVw2YvVYCp0o6ziNXa7VGwA6E82o5zrbqRExQIAiOoM04RYJJKw4Fi84OaA5qZCK2o0Hdvo8sp7DrbkofvSkT5LcMHL098xp4wz02Rj3DwDnjawi1AcnKjX6fUqsV1qMPJSLPkUAAAGRKDTgZpmuB2ceYtfdL0WR0Ovd+wckc0x+p5m6ATpdfqF5rmvvBY/X0P61f+x1Bg+9Y1il8vYQcuCFGWdo9/3RaUlcBJUZNCpBkEEtCjYv4gMOsW1IrZHA5eccAURwxohdy3ZX+avDbEaKIG00ooK2FOsCmXFTfPj/p1cd4NdJgdjJSxT2IMLCVaYu/gt4MLhhXK2Wti2HK0KNWQer7u8sLWrs5chUDz9woyox6DTw6kKi6fGHrcjJElCasBZT9PpF6e8N7i88M+H/nw0nuRuUstFIslDZ6ZyR141k2p6ohUAsMj5rAAAdUOJLTWAporqSEDv8diwCI5hYLqPm4ClhmZSTU90iESSRS5Rgzza43bkbr7gyRlMMY6XLHG+hsvENx9J3PewBBGf+Kq+NOGhBcGlrtA18DjxVUrUeSsLYdfROxZM3CCI4B5k4x1AU2WVHo7depz4igVQStR5K9MFmiqYJiXqPJuMHeUBmiq4mBUOG8O/y7KDO6vjH1rblKjzZdnB3JzhRWBXysPc4Le2bVmyVoUaFo/gr+9LpXKGQM1NhXhu0NRgDwBAKVcssoeikCtmpmfIgSZdUfyMXjdjmP5p1+7v337Ir9VDMfJS/PbPMw08xKAjMMzB4ItWJSNrQ2bGxTN6vU49SuR5zIyLFxl2mZkat+trQBF5HjMNPALDzDhmUvVZfUvWhujqeZMKBYaa8DwvEsfMOI5Ptj20aWRzzEwDz6DTK+SKJ8fXAEtZhwInhj449wOLjJEjX1TkRJUVxI50On/T9wnQalEDzvj+x2sfwUlfDIGSA01EQ665OmORYjQyWHWys4ISdwAAvvrXVxvWbF38dqG0KMcsDCQb49ihFitRDwRA18TIS801YfRwGYA79Cw8UssV3ZcOFohrsCKbY8zVkYyy0m71zMJA6oEATNXTohyyNoRR1S2yXWZhoFEQQyg7Vv/x4qhtcbsN9184Cjfj6Q48DZHRHfgz+20VPx6Tla96W551rSI1EJ/XQj/e5PLqdna26LL/oSh25MsfD2/aEvzRY/z5Na2IZ5UzKi11/Iv2jqnxqOS4Dk+I2D0BF+NryN22Dp05OOB9pPp2qNW3TRXJtpnTslJdyGmN5wETP3zK75jG88B06mVdyOnp1MuGOG+N5wFjztUpv2OGOG/1cTeN54Epv2Mz2VdV+z+cTr1siPWCR6aTLsEj6uNuMDftleNTfsdQYYwu5LQu5LS5Pxdoqkz8cEOsly7k9MydgCm/Y1N+x8z9ufAPpDwanjudcll93G069TKsjPq4myHOWxdy2sQP03ge0Hge0IWchlWa8jtmiPVS7f8QFgE0VbDm6uNuJn440FTB/OERNr0+7Iwh1muujbFehjhv+K32ynG2vbqwM7A4Y85V2EZDrBesISxrmVpdasB5Xy4vvVcmKF02MkRDYrf3vgj9eNOU94Yp7w2HN7k+jp9fQ6Wlxw58pxXxRM0ZWhGvURCrFfF6apOjg7zLc8KBpqqrOqlREAs0VVoRLz85GPLFihrlOeHlOeHS7lxUWpqfHCxqzmBPFDVnSLtzu6qTSjJD85ODy3PCYW7lOeHwY35ycH5ycKMgNj85mM2hqzpJ1JyRGuXbKIiVdueKmjN6apNh3WDmT44WH9oY+/4T8Ymvu66eHfA+2pBwxTaBbT/FxA9nTXTmToAu5LQu6MSU3zGgqdJ4HoCmYoj1omWlU37HaFmpMecq0Z4B7Z+S8Ij2DGPOVVpWCpNN+R2DZgYtTRdymmjPINozDLFeQFOl2OUCv4IIgHaLVsYS7RnQbnUhp6eTLsGsYLawUFgf1f4P4R9serQyFmtM0ngeoMQ8eFy1/0M4YESJeZCA3JrD6pn7c1X7P8SbUxS7XNTH3RS7XIy5war9H9KyUm571cfdzP25bFnwRPVxN1r2B96sK0CND1/8h+Mt/LpPvPn561vPHf2J/TW2Rf7TanVRQSEuL24r2v8WmxsEx2KiG0vS+ZPu+cnB8P/85OBjB77rqU2+FXrx2IHvzp90r+PFwD+q7kbt/ngP+/LHb/so5QrxsMSk6hE1Z5w/6b774z0wk+gg790f7+mpTT5/0v38Sfee2mSYAywLQio/OTg1ynf3x3tQaen5k+5aEQ/+v/vjPTCHYwe+q+PFwDRXLvycGuWbGuULM3wCHZBFLpaf+OajHr+fevx+cpBGIyri5kyJebqQ0/CNbcy5ijUmUWIeNBj4zodmAzRVGs8DQFMFj0CDxBqTiPaM6dTL8FuY0phzFdotfFGb+OHcI2hlLKQG5IIh4TfIDkguWlYKM8Eak6DBw0I1ngcoCQ+CxhDrBb+F2ULnBToXWGMS9CzM/bkwf8gCjecBSA2ISKCpUuxyoWWlqv0fEu0Z6uNulIQH28i2F8IIfrRb1jK1AtR4/jlXx9SApp65722XF7edO/pTV2fvQ3khlcqjgkKef8419ONNMo/XbXN7HOCAQzPwzd9VnSTvyeupTYbdFq2IpxXxoKFqRbzoIG/oa5iFgWRzDqPphTloRbxjB76DmeQnB2tFPKCpknbnsn/As+ARUXMGKi3tqk6CB2FvCBbBwgueyKaENXxov2m1tMhOitxta13qNcdpqvjxxvF545qUmEe0Z0CLhV0JSswz8cPJ/jx4nBLz4LcwJd6cAj0ISsyDb2N4HP5NdN429+ey6dHKWLQyFhZEy0pN/HBzf64lZXuGeSAXngjLosQ8mBWbP9GeAT0aovMOtwjL6f25kFyw2vBbc38u3pTMns7mbJUtbJeJH84WCguCx9nEbFWJ9gxuWcvUE0IN1tqL9r91eNMWl7++H3DGKz8js6uzVzQkZpWflR/lf/WLrZ9+vvG9W5+/Y8uLxw0Op/6ISFXFQ39OCe79txi41JcmcH9Z2qmV0xNFDe6EjspDf8vc9/YZ181nP9rusXOHx84dZ1w3h368qWj/W8On31gkg1zWuKaE+6z+VXZqVg+dJNrj95Ns7/uO03Rc94T7fU388Kly/4eTZ76ePLVXeeAj+LPydteqPAUy9+ey3Qpzfy7sbpj4Ycacq2hlrDHnKiXmsfEa+C08DrtssGvDHmFdp+XoyaTGo9Lw6TdcXvin80fYnhw91N0Qn/jalhoNCVf6Lxwd+/4TudtWudvWse8/gTtxVN8OY39x/qkXDNDC3gfQVCl2ucB+ExxbgcFREz9cscvFMqoS6wVjNzBSC48Yc67Cb7HGh8yEdKSVoUbmvrcfrUI/3nTGdfNi9PkrLs8/5wrHI5x6EuTY3ZDtfZ+lRkuUz8hRNzgQO3LUreO6p91TnhFwqI+7wfEXONSi2OVi4odjjUnq427q425wMAUO4hoSfoPjsnBAGgY1WGrAv2Emy9TKUGO1lBkfKGrOgFr1u+4UFKmqgL8dvRA1Ro669V84KnfbKv/MdejsQbuDr3bBoZcIJnrzRzpzJ3rzV72Zj1xw6FTjeQBrTIID+9yaSAAAGV5JREFUscacq8a8YF3IabQyVhdy2pDoA2EBR5QhI9jBXXYMRRdyesrvGByFWaYeNzWccspWDhazSf69V7Z729j3nyzkWViNpDRVJLfVpMJfn+aqu8H5nnhsclLDqVXRQj+q1JBwxYFzUVty654wqa0mtbUqpbbklmOmPAvdltWRkxpOrZYcTPqq4se31aR21KV1N2S01aTer05pLE98qOthJeeKlcclJzWcWi1hsnK74yndDRkPWjMbhcv8JXqoxSyrd2qZclLDqVWUcbykrSaVGxxlHZBKfnzlw6aELeSndDdkWM0cdepRykkNp1ZXGlER1+bvCZNZB6S1KmWRmGirSR3pzNWIipy9kpWQkxpOrbqsfpmtuyH9XnnS/eqU9toFt+Roq0kV3c9SDhQ4MbEKclLDqSdBdn/S8X71nK/RVJHc33xHOVDg7HqsvpzUcOoJEYxxcJEB+x16icA5hvpk6fFRgxnLzDp7Zu/Jy+e+PuNTUEDaJKDaY04eDKgdsv9AEM2hP3rESMbs747n1NMq43iJXiJwOhRPtB4bNfh1Xqfd0/JJTRWQp1/bdrFyxNb+hROJXt+l3bV3eqWxO3fCiQynnHoC9bioIU/138SS4m7ewQvZBdc+u5iKq7MTPvHK6069tsWvSc6v8zq+7mIqrkq/tsW3mBfy83fH3zp48VqY37G3j72z1/Pk17/4lxUZG0O//5fHr2cDUuIubvFKml71S+aUU8+4Hhc1+qO/OxitgH+PJJzb5FuY7vNNYh4zHP/TR9f6OiK/PBgtaw/bvc39ja8jx7sjvzwYrdCUD0V5/pTLA/3R323yrRstn0j0+u5mxLWPfOtGnU6HU045EiarLCsskPfZ/6VboKma6cnWt6RRj2Qj7sfoa2yD1l4uS7uw0SuuMdTrWmXJtMD3jZPxijK/jf5R+e4//VYYd83Fh5/tuzEgndTwK8+c+/1eGVkZuPFiKq7hlZ70TCgI++6TkCH16t8Vp5x6YoXJKj/an7F1T8LBoxHcH3yT1twq3POvjDXrhP/a1rj7o/ZP3p9K9H0EJT62uEa5osDvUzdv35OnXd3D+8by8g4eees7zyNfnnI9FduXeeH//e3H/7cnTKK+m3fwZ08vD9eAdFxTUHTs1OG07FEY7JCn+v/Dr0nGq7t0du/JgITs6PC9nqntzsF5p5yyVvC1265ut3rr06yOU9LSgaN7J15/Xb3xTc3GjVMbN+KlMY+gxBUaeVWlX/tnYJtqCacwlm5LFdBUKNIu7I7LoVb73jjl1BMonUS49cs7Udf9rI5ra241bf175/v/ULzxBksNsjX9ERT6xFKDrAx8KyAdjteSIt6UcvVvj1NOPYEKvnZ7665AbseElJaOxP5a99JLA5vfUr75hurNN9Ub3zR4/qj96N1HU6hzlpdTTv0ppJMI3X5I27o3NS0+kntw65d30uOC2CNTNbeavtje+tHWkQ0bFG++oXzzDfWH29C7oUBTRQ//gV3/uHriqKHOLzrn+Z+4TGLVa/LIVKkTBH1/KLBy0DnB0SmL+puLLvveOuMZrxUVYrLKxLhknbgYaKoqeHm/RyZAx6GthpcQl8EOiwQEpv1zT+qlX/1jIlMGmiyznOJ/z/zHZzFaUSHQVJXn34495pn4z/+/vXOPauLe9rhrzb/85X92ybrnHu8stJVyffZYQwAViAZIRT0xSoNjwARCIDExkAQIkEyEBIHIM0CCJAFCSITwCOGRVEGoVPCohHuUClpBQFO9tbbaU4/k/jGIaNVrWix9/Pb6/JHM/Gb2njDznZk9ezaUvi34CT+/dv/DaduTp8VxsxO2x5P2oTOvLIz6WSyRanRP6VIgOIaqa5y9Ws7ZjEAbRebLnW6XY3aogOTDVQ90/FIXI8VUGIGii6fuWmxJcRDMYOjMP61P/VVotXMZq3nqe0vjHfCb4/5YF35vzScUOX5vzeiAjsUuwe+tUSlz+YJToX8vwyb22JrCKOX4vTW0mIz5RaIO5YRHVUVSZPi9Nc11pW6XI2S/dv9BkdvlMJ8oDIg8hduVRw7OwkeeurB2LTtCht9bU1+ldLsc8hw9fm9Nh2kxUqGuJVeN6mpbUhzkk4h2tM4uros51Tj5D1P6apgWlHHq/lLvKwCA2+V4PNHNYJ0K/kTZ0dQYsFvfKj86dOY0PlJ/hFn2CVk+eMayZVehprT8E7J8bNCIj9SzElC3yyGVVuM+qQr9uzonM/X+WBc+Uq9S5g73WwN266sy+D0R2wJ26+kbo8Y//LBz66GA3fqLJ3i6yjp/UtWlMxW9tqaA3XpcmGryinFxtuKdqYbZQImB1qS2/6NaQaR5ESR258KHpphq0HAk1mo4llxQ+9DlcLtsY4asiPUIBCOrSOL6fqOdGwfByBw+tFV+CASnmEe6Hg+VpUfGQjACrWcnVxkeuhyzNw2GxAQvGIHguLS2NrfrmWrsSCRuRpZTTgzftLtdNmf+US+fY9jj2x8H8kg+tGCJIptIg3zF9vGuKV0KBDMV9tYpC4qFMY/X88+xdIPxmjY90AeB1jOJoTGQn0CRyYZgBt/SOuf0pfFylAoj0D5B4suOml/cXuusy/6wv5AdSoNgBPLL7PkK1Lb9Abk90oEnafftF0cfkqgKFJNnKlVZSjxJi9+Z/WiivbJEiwtX79hdPtyr62lvxJO0puqyx5PdeJIWF67OyRS5XY6e9kZcuPrSmQpBYtEWgrJp87qmv1H9CcqLaz8Y//DDI5HKj4IVjybapZKqzdvQ+2Ndn1BUB6JP4kMXo1ID452pRqM5OgaC4/eR46DNaS3Ol+osMNWYO64OaUxPXI6nQwW7fZD3EMVnLScYmxGvMHn/hbrzKpE3jHizCs73VKmpMRCcYh6u1+6NgXz5pc0VagYD8uGUnqtvYTAgH1ayWvOFtebGpN3tcswfwBCMLEcKv5p2uG/rFR8j0J68/lqhF8xSnqnR7qFBfqlKGRuCmdIOy0g+G/JJMbacmAujvSBpM+JFlNjOGS51FST5IZCfSNtluHE2b7cPsppx4rMGWYQPAq2XDfTnhcCIr7j6Yb8CB8dGF1UtHH9roJAKI1B0gb2I82pHc9urGL5YGrcR8SKI61q1vfbTj5d6/wa8CypLtFsJJY8m2h9PdkuzqnrbKvdEluCIlYYymdvliI5R48Or84+jbpeDz1fjw6szhFnNBiM+vJqGpGNriDyg3h6aZQ/fFrqzFB9eXfdhUGaAIGIL5xaZOKQvx4dXH6EJ3S7Hfmr5/oOKA9El9ZqCkMiqDOHvRjUQCJ4/1S+cO3etEZQul0fGQBtTW5wd85mOZ8ummEe6n9hlq2BkFap/Mj/RXjiXsJi/zTmRnbQGgSiFtxa6wFSDkFkp5XjBjDhD4+zcPUvh4Nyp3oCt0Niat9sH8UvLySXSlh8u/KL6xTB8hC1Xu90zesV6BFovG5x5npF5PnGqQbs3BvpYXCpjQ2sEZmfXgvHPMyyTQwVvcgTzi/IFy+EYssa8yDdrgN8SlcXaQGIph10eGFZZJM+6f73Tn3iKSEiu8v6PLqnAn3hqV7jg0UQ7Nt1/R8ajifZoWuVH2+T3Ri01eUVxlDzczor0v4UMrlnjTzy11T/tytq1UcQT4WGSNqOWRK70D829N2oZ6bf4E0/576rIyRAN97X576q4dKZi0bbiHavGsRJVxiYYWc1Tf+0sjdsYEyyv+d7lWJANNd9vk2yCkdW8yulzihAfZDXjxBnsJL+3YOyO49892etgxJtVfOOm2RwdA8Gck12akjAatFmgblFrWXGQD0/bVZK0BoGIipGFNR3z2dDrmvSAw9DmDPu12tIdhyFfLp/NguDYfclp+9YgXnsLxmbMhoOYwLEUduu/+l4MI0zhnHK4Z2qVOATyE9X/o/2HnpytMLKaVXAOu9bwS235Z/tXGr4XjEDw4S2o7nvXwvG2ObUiyS/daHiTo715A8bU5TAtOL/ux6XeswHvjvvXrUJ+IYuR2dtW4XY5bjttLEbm5BXj/14xWpD9ezYwdORdI1qpo6Z8R6ist+7EZK8OT9AcDo4z/+dfkwNZ+3DJ3P+mjKz94H/WfpAcwK1nHnn0hf7+dWumSLl/f3b0p5ljg/Vul2NsqIXDyuloKHa7HNIMNX6beDG34h2rRorZaTIfjoV82NlqObIxJgjVPnQ5Fj5Dcd9tbGEwIJiFdpicVWIidp8fic7lQW7VKIk0CGYpe1rGNAIYjiFrTN/2FyWTsLwGB7U0PXG19AiZEIysIqRIi0oHRzrdrgWq4eqaMqTC8OEtGVWT5/IPbUSgjTyJJGWTD+IVINT2WWddXdgxDzNKp+463C7ryHwYc+kGh9vVfknO9oKRdfLaf99t7snkrIIRaCNfLk2G4Xhph3X2ciHFB4E2prY4u9wvjZ9uMBymQzDfcNn2WkeRqN3ZOYsJHBwbRJdU6vVToLDtz8ed7rILybTPIkPORIY4wrc7wreXhrFwO8pO/fW/hta8f/n996988P7wB+9PZDG/sRU/fYtX0R5PdvuHqKWpaYsZ52+uXuNnMXvT5CjK2OdPg+B4aYd1yeP5udgfDmnUAu4GHwRaJ/n89pLHA1gyvv1C/83ZyikdKjyUi9sqmtbJZnSyB2fVj4cbPFpPvab2o60oVtCxaPwxVMPtcmDXL15rRC2/+2KqRjMSu5xRdmfpIwEsPcEhZZy41J+37G2nbdv20nz05VdUfil/INVwzN48ff6P8OjB/vByzeDFxeiD8Geh0zVQd+3ab+V96CfXGoYGWhelpPC2sx0foFLl5bzN4McT3Y8nuhcuGxJcujNEuPAVlcXhnamGbRBlLieJclCZAs3vcXa5p00GhrDsbNuLDwg6pywoJVpAf30DUberc7xOTBVpXG/+U9llq9YkJklkCvR4eVvT01eNeTp08iAp+Vg0m29pfcVK7pgMn7LpR3lbueq36xjW7WrNTlZq74IExJLy46CSRlNem/xtlLdMG7U0kXZgcUT/8UQ3PkBlrJS+zeA+q3H7ttyS3JIhe0PlSU1QUAkeJ1q0yq6FvLtrjafDxTTc8zZcszeb/nnZ9vIzxRtVaRE5l6asn4t5CvsbfmizgSI0j7zx1uPOaTMtKa3tVXLwjNmrZXFhL9WbLaSphfHqxsivodP1hckFJOMZT5xqdE/CzgiGlw/jQJ5Sw0gM+nsiAdX/8MKsWAhGIHrZ3ZFiKk6Ulsik6k5/15YJH5EWzo3Xft2njItM3BnATsvPDPMV28dbewSJSXU6ewY3MCJxZwAdn1PWmcENjGBt8KFtiErnRyXwLU1TFpQUyiJGxK8LVozcsd8zpXqzyu9dLaP7pTd3KRkE1h4SV2FvfzpUzCExvHwYRLqAGhyLJ7GD/OPjShU83xTzSEuPADuj2K6pRUEEdjCMQIF0Lx8GkZ5t0kmerT+nu0boza2YfBanuNXy/cBJBoG1h8Q+Qmd7c9VfY9tLYm3CcUr7f9HrEUeQgrc/8qecLdyE3B3bs/H+MhE3c5HTGfO8yzsU2yU5h6xqeDL/2vuMXuEvG+jPm28gWm/KJmQV2WXJBFHVg7tWZ7GQzBSS92TZnW2DKE9ht80teKMqbTNT2mGdvVmrpvFYHB6JXzF1x+osTgmKTk/OUGGtBv/Vk4OjKMemW88XpUf5x1MFMrVJpabxWEdTIoJTDJdbnCpxnCCdGo72j1sHUZ604/QCjx0P+5Qchjg1mot2tP7oVKMH+VwmDymqfbjQ6bRRvQf9/HbntSIetbxAipMNTmNhpyZEJhzQmL6d63Iqa3X+3tMrnmKxJbIOaUw/Xi4kr0lts+WG+M03jl04i8fnMNfJa58MFZDCss3Ko+vk6l4xO0aQGoyNv2s2HEyUdrRO6VK8DqfxdiQq2yukuOTysnRfinJs2myg0HfuT/JFCr+aNhso8Un6Iuk6nvZMRdoWvnao/ZaG/x5X/cDVMZLPxuUb/tWTvS4s26zkePPU38zFaf+uLdObUnhrplaJS1TYmwZRVoiyUBWWpGyvkOJELVe73XeM6rD4ZEvL7Pzg8aoF6y/pRFkhhaU183HSC88WYS6sn4sTSKrqswIWWdXw4+VCsu8r+2z/znmHqnGnyZ4sEDc1PZlvCDqu5pNy+4ziZw1Es21VIqqucXa8Kh2X1tIg9eOpv8Eal59SqSPSbV92P7BkEItqRlX8Tf4MsqbuAno02dIy6zIbKAK9Thr4QvPhrqkmCSKqnJp2uO8Y1RHpti9tI/k8hqFpdkav8Jd9bs/GHVN/4+q8VsSjatUGitCgkzz3qClW7siwj9ufDuSFRB8vZfGUPTb3jF7hn64QzzsVms+VJUUV3nI121i8kroT5OjiiX5FIKPsjss2iPIUVvWft8vpTK0Sx5R2tD1oy/LdfvzsZ/mHApj7kOye6/YXZwn4tHiqznRbJ8DL9dOm1FWf8g6EHz/blTc3/mIF3zfFPNI6iLIJRZpObjwuNB6XUd4lZa5C9U++LGf7MveRGX8Rax+PV6VvSSrQKch+mfZmdNV62eB0sy0xnqQyzbqabax4qs54rYjrLSg5X5yyKZRzCK2673K4XZ3jKt5fxNofrpbR/cT28aYWegLfUmdjJRyM5hDkNd+7HLM3a9UIM5CcomhrxAZ/Z5ctWL+qlsJMqzm5IM7qy5gLaW4+hZlmUSnWMxV26z1T2nt7CsbvvvxbNVZLSuQcXYmoSYfWV4obqyWttceb9bLe1pNdplzvFSt1JcISOae+UtzZoPBesbKxWlJfKa6vFDfp0CYd2lgt0ZUIL52p6DLlYsvWV4ovdJZhI5v1aJMOVaIsbCls4tlm5WLeqrwz1bA6i1MZRdgLJo3maIHhcueDtqxAVDP0vIFooRXlKew29x2jOowvlyaTNeZZV1MLg63Q5VEphbdcrT0Cnry2gPFxlr1R6stVqKIFhstds1fLGJslZo0gpMj4LH9hf9hXEMfId2JFqONqPkExcqfRHC0yj3Q/GcjbzSob1gnJGvOsq7VHwJVaVFKcxKwR/sSj/UFb1iZeRjJONjjjeDqQR0AkOdR5p7LzPQoCdu3zcVpjbVZIfs2ETkTVNbqn69V7023nCv/EXU47xrSpQQRWEEGk7Wu53ZC+JSAxipqssLa+OMtyXSNY7c/cSZH1XO3+d0/2Oh+2wt48P/64IjNk3ZFAQvwmJN950zqIMqEASc/1rof240EbmRHR/KhQbnFdQRwhgUhIZKjqvjmfR/DhG/qqFAR6YCQvlsoiFBmfztQqcYdXBbP2RCb4MnOqkhI2kbhRB4/33rC7XZ1jKt7yHTkXrOiqPQXjM4bSHezS/pZLcpYXMfvCDbvb5Zh1qjhB8UQqj4JWXlTxlu/IuTSqfb5+ZaEqnH7wqDB4Ps4bp9sxF/uY8JoYskb/BcqGQ9nUWG5g+Mv7w71RS3YaffKKcXRA19t6sq32eImc81lTXp+1CFMETDV0JUJbvbyuPM17xcrsNHq+NKG39WRng6KuPL3PWpSdRr90pgJTH1u9vMuUm51G916xss9aVFeepi7gjw7odCXC1trj3itWdply86UJowMv9wf8+bwb1eia1Anem8tNyvJNdSMqEZkpOMQoeLGBaHYRQocjko8hHLqq7oGzQkBJFrJ4tOLah7frtTQei8U/hKpsOZzdqoanI8XUMHn3aQkZSU2iCNV91tlrGpTMTULzbQPtT4eLab4xRJZEgcoUOeXjw6X0HSLzxbZrKkFEbAqFxMQfLr59TYNGC4Qs3oEszZSzlL79+MDFBR7vNvdkpNCTheSo4581yXcGsw7SU8h7JHZn+1TTvNPWKV0K5M+lxx4lbheVFQq2orpvBwoORvJZBxMDg4VmZ9Ncl1OT8eHSH8a/R+zftWX+hV52d+6rbRBlkVQmj0vsr5bR179dwctXVWnrU21fenp5+FKci8/kFeP1C/rJK0Znr2Z0QPdooh3j3peWySvG28NG7xUrvVesvD1sHB3Q3Ru1XL9Q866yGD/l137yurAV4IxeEa4Y+UVn5kYzLUU7uMiP3H7okKx71nzwRWxYtuWNi4Mup7+E7ildyqrnP36jOTph7iVmjxgppq5/u46Tbz/yTXEuPvsitgnZn3qvWCk+hmACgXEsgbIvYpsgKQr7KuJQsQ+CpKjFfNPkzSyxatCf/c+Un0nn1yNti/2X657CbjpeMettVAN0OQUsAvdGLfdGLZNXjNjFhfeKlVjZBfYVy2Jg1xrYB2ev5tcL749U5QUAAH4NgGoAAADPAKoBAAA8Y141Fja8AwAAgNcBVAMAAHgGUA0AAOAZQDUAAIBnANUAAACeAVQDAAB4BlANAADgGUA1AACAZwDVAAAAngFUAwAAeAZQDQAA4BlANQAAgGcA1QAAAJ4BVAMAAHgGUA0AAOAZQDUAAIBnANUAAACeAVQDAAB4BlANAADgGUA1AACAZwDVAAAAnvFcNeZtyWMCAAC/QZb91JY8JgAA8LvgtXcoQEcAAADGS2oAVAPwao4ek27YsGHZsmUxsfRN2xKWPB7AEgJUA/D/s2lbwoYNG3btImIZL35K5pKHBFhCXqsa7hdt2bKXpwD78xiW6lr4dQmDAbbk9rodAKgGsBeMRCL5+fm53e5ly5adO3duqcMBtpQGVAPYW9nExASKosuWLTObzUsdC7AlNqAawIAB88xepwb/B1h4Phitu+DYAAAAAElFTkSuQmCC" 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ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-55148709518862459342013-12-26T01:35:00.001-08:002013-12-26T01:35:57.305-08:00ΕΥΧΕΣ<div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-size: medium;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;"></span></i></b></span><img class="rg_i" data-sz="f" name="4nO8gi9dFBVkuM:" 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" style="height: 177px; margin-left: 0px; margin-right: 0px; margin-top: 0px; width: 284px;" /></div>
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<span style="font-size: medium;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;">Οι
γραμματείες των </span></i></b></span></div>
<div align="center" class="MsoNormal" style="margin: 0cm -87.95pt 10pt -90pt; text-align: center;">
<span style="font-size: medium;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;">φροντιστηρίων
<span style="color: #e36c0a;"><span style="color: blue;">ΘΕΜΑΤΙΚΟ</span> </span></span></i></b></span></div>
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<span style="font-size: medium;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;">θα
παραμείνουν κλειστές</span></i></b></span></div>
<div align="center" class="MsoNormal" style="margin: 0cm -87.95pt 10pt -90pt; text-align: center;">
<span style="font-size: medium;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;">από
την Τρίτη 24/12/13 έως και την Πέμπτη 02/01/13 </span></i></b></span></div>
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<span style="font-size: medium;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;">λόγω
των Χριστουγεννιάτικων διακοπών. </span></i></b></span></div>
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<span style="font-size: medium;"><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;"></span></span></div>
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<span style="font-size: medium;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;">Σας
ευχόμαστε </span></i></b></span></div>
<div style="text-align: center;">
<span style="font-size: large;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;">Καλά Χριστούγεννα &
Ευτυχισμένο το νέο έτος!!!</span></i></b></span></div>
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<span style="font-size: large;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;"> </span></i></b></span></div>
<div style="text-align: center;">
<span style="font-size: large;"><b><i><span style="font-family: "Palatino Linotype","serif"; line-height: 115%;"> </span></i></b></span><img class="rg_i" data-src="https://encrypted-tbn2.gstatic.com/images?q=tbn:ANd9GcRHOKDdS1jINaMjiyr2-tyRZ5O-HWMR8BLmOE8PhNls73BSpy1MjQ" data-sz="f" name="p6yCyQhXKD8EDM:" src="https://encrypted-tbn2.gstatic.com/images?q=tbn:ANd9GcRHOKDdS1jINaMjiyr2-tyRZ5O-HWMR8BLmOE8PhNls73BSpy1MjQ" style="height: 181px; margin-left: -10px; margin-right: -10px; margin-top: 0px; width: 181px;" /></div>
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ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-2059078681642106872013-09-23T02:58:00.000-07:002013-09-23T02:58:39.861-07:00ΤΟ ΝΟΜΟΣΧΕΔΙΟ ΓΙΑ ΤΟ ΝΕΟ ΛΥΚΕΙΟ<div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;">Δημοσιεύθηκε στην Εφημερίδα της Κυβέρνησης ο νόμος 4186-2013 (Α 193) για
το Νέο Λύκειο «Αναδιάρθρωση της Δευτεροβάθμιας Εκπαίδευσης και λοιπές
διατάξεις», ο οποίος δεν αφορά μόνο την Δευτεροβάθμια Εκπαίδευση , αλλά
και την Τριτοβάθμια. </span></span></div>
<div style="text-align: justify;">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;"><a href="http://www.esos.gr/uploads/dthmia/nomos-4186-2013-fek193.pdf" target="_blank">Για να ανοίξετε το ΦΕΚ κάνετε κλικ εδώ</a></span></span></div>
</div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-79872092820887677622013-08-29T00:31:00.000-07:002013-08-29T00:31:06.076-07:00Οι βάσεις εισαγωγής κατά τμήμα και κατηγορία 2013<div dir="ltr" style="text-align: left;" trbidi="on">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;">Ανακοινώθηκαν απ το υπουργείο Παιδείας οι βάσεις εισαγωγής των υποψηφίων στα ΑΕΙ.</span></span><br />
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;"><br /></span></span><span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;"><b> </b><a href="http://www.likio.gr/uploads/kcfinder/file/vaseis2013.zip" target="_blank"><b>Για να δείτε τις βάσεις κάνετε κλικ ΕΔΩ</b></a></span></span><br /><span style="font-family: Arial,Helvetica,sans-serif;"></span><span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;"><b> </b><br />Οι ενδιαφερόμενοι μπορούν να πληροφορούνται τα αποτελέσματα μέσω της ιστοσελίδας του Υπουργείου <a href="http://results.minedu.gov.gr/" target="_blank">http://results.minedu.gov.gr</a> πληκτρολογώντας <br />α) τον οκταψήφιο κωδικό αριθμό τους <br /> β) τα τέσσερα αρχικά γράμματα των προσωπικών τους στοιχείων (Επώνυμο – Όνομα –Πατρώνυμο - Μητρώνυμο). <br />
Ταυτόχρονα, τα αποτελέσματα αποστέλλονται σήμερα ηλεκτρονικά και στις
Διευθύνσεις Δευτεροβάθμιας Εκπαίδευσης, για να εκτυπωθούν ονομαστικές
καταστάσεις των επιτυχόντων και να προωθηθούν στα σχολεία ευθύνης τους,
στα οποία θα αναρτηθούν εντός της ημέρας.<br /> Β. Επίσης σήμερα
ανακοινώθηκαν τα αποτελέσματα των εισαγόμενων στην Τριτοβάθμια
Εκπαίδευση με τις ειδικές κατηγορίες των αλλοδαπών-αλλογενών και των
αποφοίτων Λυκείων ή αντίστοιχων σχολείων Κρατών-Μελών της Ε.Ε. μη
ελληνικής καταγωγής. <br />Τα αποτελέσματα θα αναρτηθούν στην ιστοσελίδα του Υπουργείου http://moreresults.minedu.gov.gr . <br /><b>ΟΙ ΑΘΛΗΤΕΣ</b><br />
Γ. Οι αθλητές που επιθυμούν να κάνουν χρήση των διατάξεων της παρ. 12 α
του άρθρου 18 του Ν.3708/2008 (ΦΕΚ 210 Α΄), όπως αυτή αντικαταστάθηκε
με την παρ. Γ2 του άρθρου 45 του Ν.3773/2009 (ΦΕΚ 120 Α΄) ή των
διατάξεων του άρθρου 34 του Ν.2725/1999 (ΦΕΚ 121 Α΄), όπως
αντικαταστάθηκε με το άρθρο 8 του Ν.3708/2008 (ΦΕΚ 210 Α΄) και
τροποποιήθηκε με το άρθρο 38 του Ν.4115/2013 (ΦΕΚ 24 Α΄) για εισαγωγή
στην Τριτοβάθμια Εκπαίδευση, καλούνται να υποβάλουν σχετική αίτηση και
τα προβλεπόμενα δικαιολογητικά στην κεντρική υπηρεσία του Υ.ΠΑΙ.Θ. από
13 Σεπτεμβρίου μέχρι και 23 Σεπτεμβρίου αποκλειστικά και μόνο με
ταχυμεταφορά ή με συστημένη επιστολή. <br />Υπενθυμίζεται η σχετική
εγκύκλιος Φ.151/111884/Β6/12.8.2013 ΑΔΑ: ΒΛΩΗ9-1ΙΦ που είχε αναρτηθεί
στην ιστοσελίδα του Υπουργείου Παιδείας (www.minedu.gov.gr, στην ενότητα
ΕΞΕΤΑΣΕΙΣ, υποενότητα ΑΘΛΗΤΕΣ, στο σημείο ΕΓΓΡΑΦΑ ΕΞΕΤΑΣΕΩΝ ΑΘΛΗΤΩΝ).<br /><b>ΟΙ ΠΑΣΧΟΝΤΕΣ ΑΠΟ ΣΟΒΑΡΕΣ ΠΑΘΗΣΕΙΣ</b><br />
Δ. Οι πάσχοντες από σοβαρές παθήσεις, που έχουν αποκτήσει το
πιστοποιητικό της πάθησής τους από τις αρμόδιες επταμελείς επιτροπές
πιστοποίησης, για εισαγωγή στην Τριτοβάθμια Εκπαίδευση σε ποσοστό 5%
επιπλέον των θέσεων εισακτέων, θα κληθούν να υποβάλουν το ηλεκτρονικό
μηχανογραφικό τους δελτίο από τις 9 μέχρι και τις 16 Σεπτεμβρίου 2013,
όπως έχει ήδη ανακοινωθεί με το σχετικό Δελτίο Τύπου, της 26.8.2013. </span></span></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-85557334232513962492013-08-26T09:14:00.002-07:002013-08-26T09:14:59.573-07:00Την Πέμπτη οι βάσεις και τα ονόματα των επιτυχόντων στα ΑΕΙ<div dir="ltr" style="text-align: left;" trbidi="on">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;">Την περασμένη Παρασκευή η Μηχανογράφηση του υπουργείου Παιδείας , οι
υπάλληλοι της οποίας εργάζονται για να εκδώσουν τις βάσεις και
τα ονόματα των επιτυχόντων στα ΑΕΙ , έλαβε εντολή από την πολιτική
ηγεσία, να εκδώσει για σήμερα Δευτέρα τις μετατάξεις των εκπαιδευτικών
από τη Δευτεροβάθμια στην Πρωτοβάθμια Εκπαίδευση.</span></span><br />
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;">Η έκτακτη αυτή
εργασία θα καθυστερήσει για μια ή δύο ημέρες από την αρχική πρόβλεψη να
ανακοινωθούν οι βάσεις στις 27 ή 28 Αυγούστου.<br />Η πρόβλεψη που
υπάρχει σήμερα είναι ότι καταβάλλεται προσπάθεια η ανακοίνωση των βάσεων
να γίνει μέχρι την Πέμπτη 29 Αυγούστου.</span></span></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-34975302444422353322013-06-30T13:01:00.004-07:002013-06-30T13:01:59.727-07:00ΠΡΩΤΕΣ ΕΚΤΙΜΗΣΕΙΣ ΓΙΑ ΤΙΣ ΒΑΣΕΙΣ<div dir="ltr" style="text-align: left;" trbidi="on">
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Πτώση των βάσεων αναμένεται στην πλειοψηφία των σχολών.</span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Αναλυτικούς πίνακες θα βρείτε <a href="http://www.real.gr/Files/Articles/Document/243974.pdf" target="_blank">εδώ</a></span></span></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-31111047532714609342013-06-24T05:04:00.002-07:002013-06-24T05:04:21.823-07:00Το Νέο Μηχανογραφικό και ο αριθμός των Εισακτέων για το 2013-2014<div dir="ltr" style="text-align: left;" trbidi="on">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;">Δημοσιοποιήθηκε από το υπουργείο Παιδείας το νέο Μηχανογραφικό Δελτίο
που θα συμπληρώσουν φέτος οι υποψήφιοι για τα ΑΕΙ,τις σχολές που
επιθυμούν να εισαχθούν.<br />1.<a href="http://www.esos.gr/uploads/panelladikes/mhxanografiko-2013-14.pdf" target="_blank"><b>Δείτε εδώ το </b></a><b> </b> Μηχανογραφικό Δελτίο ΓΕΛ και ΕΠΑΛ (Ομάδα Β’) <br />2.<b><a href="http://www.esos.gr/uploads/panelladikes/mhxanografiko-epal-2013-14.pdf" target="_blank">Δείτε εδώ </a><u>το </u></b> Μηχανογραφικό Δελτίο ΕΠΑΛ (Ομάδα Α΄)<br />3.<b><a href="http://www.esos.gr/uploads/panelladikes/130611_ya_arithmoy_eisaktewn_2013_2014__1.doc" target="_blank">Δείτε εδώ </a><u>
</u></b>την Υπουργική Απόφαση καθορισμού αριθμού εισακτέων σπουδαστών στις
Σχολές, τα Τμήματα και τις Εισαγωγικές Κατευθύνσεις Τμημάτων της
τριτοβάθμιας εκπαίδευσης για το ακαδ. έτος 2013-2014<br />Από τα μέσα της
επόμενης εβδομάδας, στην ηλεκτρονική διεύθυνση
http://exams.minedu.gov.gr, όλοι οι υποψήφιοι θα μπορούν να υποβάλουν
ηλεκτρονικά το μηχανογραφικό τους δελτίο και σε αποκλειστική προθεσμία
που θα ανακοινωθεί την Τρίτη.<br />Υπενθυμίζεται ότι από την Παρασκευή
21-6-2013 ως και την Παρασκευή 28-6-2013, όσοι υποψήφιοι ΓΕΛ ή ΕΠΑΛ δεν
απέκτησαν προσωπικό κωδικό ασφάλειας (password) ή δεν χαρακτηρίστηκαν ως
υποψήφιοι ειδικών περιπτώσεων (πολύτεκνοι, τρίτεκνοι, κοινωνικά
κριτήρια), πρέπει να προσέλθουν στο Λύκειό τους για την ολοκλήρωση των
σχετικών διαδικασιών.</span></span></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-24836176032763136492013-06-11T05:22:00.000-07:002013-06-11T05:22:02.662-07:00Ανακοινώθηκαν οι εισακτέοι για το ακαδημαϊκό έτος 2013 - 2014<div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Ο υπουργός Παιδείας, Θρησκευμάτων, Πολιτισμού
και Αθλητισμού, Κωνσταντίνος Αρβανιτόπουλος ανακοίνωσε το μεσημέρι της
Τρίτης τον αριθμό των εισακτέων στα Πανεπιστήμια, στις Ανώτατες
Εκκλησιαστικές Ακαδημίες, στα ΤΕΙ, στην Ανώτατη Σχολή Παιδαγωγικής και
Τεχνολογικής Εκπαίδευσης (ΑΣΠΑΙΤΕ) και στις ΑΣΤΕ για το ακαδημαϊκό έτος
2013-2014.</span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">
</span></span><span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Αξίζει να σημειωθεί ότι ο τελικός αριθμός εισακτέων στην
τριτοβάθμια εκπαίδευση, παρ' ότι τα Τμήματα των Πανεπιστημίων και των
ΤΕΙ μειώθηκαν κατά 25%, μειώνεται μόλις κατά 8,94%.</span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">
</span></span><span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Ειδικότερα, στα Πανεπιστήμια αυξάνεται σε σχέση με το προηγούμενο έτος κατά 4,76%, ενώ στα ΤΕΙ μειώνεται κατά 28,1%.</span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">
</span></span><span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Παράλληλα στην ειδική σειρά δηλαδή στις κατηγορίες των
πολυτέκνων, των τριτέκνων και των ειδικών περιπτώσεων με κοινωνικά
κριτήρια οι εισακτέοι ανέρχονται σε ποσοστό 20%.</span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">
</span></span><span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Πιο συγκεκριμένα, ο αριθμός των εισακτέων στην Τριτοβάθμια
Εκπαίδευση για το ακαδημαϊκό έτος 2013-2014 ανέρχεται στις 69.288 άτομα.</span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">
</span></span><span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;"><strong><a href="https://docs.google.com/file/d/0Bw3z_tNMEH5BOVlZNXJwSjIxVUk/edit" title="">Αναλυτικά οι εισακτέοι σε κάθε σχολή ΑΕΙ και ΤΕΙ.</a></strong></span></span><br />
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ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-5166954893624599682013-06-09T02:04:00.001-07:002013-06-09T02:04:35.800-07:00Υπ. Παιδείας: Δέσμες και βάση του "10" ξανά στο τραπέζι<div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">"Τα μαθήματα στις Πανελλαδικές πρέπει να είναι λιγότερα κατά
δυο, δηλαδή να μειωθούν από έξι σε τέσσερα", δηλώνει στο "Πρώτο Θέμα" ο
υπουργός Παιδείας Κ. Αρβανιτόπουλος, σε μία συνέντευξη εφ' όλης της
ύλης.</span><br />
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<span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">
</span><span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">Όπως προσθέτει: "Οι εξετάσεις δεν πρέπει να αποτελούν
δοκιμασία των αντοχών των μαθητών μας, αλλά και δοκιμασία των γνώσεων
και της κριτικής τους σκέψης στα βασικά μαθήματα".</span><br />
<span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">
</span><span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">Ο υπουργός Παιδείας αφήνει ανοικτό το ενδεχόμενο να
επανεξετάσει την επαναφορά της βάσης του δέκα, ανάλογα με τα
αποτελέσματα των φετινών εξετάσεων.</span><br />
<span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">
</span><span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">Σημειώνεται ότι και παλιότερα, ο υπουργός Παιδείας, Κ.
Αρβανιτόπουλος είχε προαναγγείλει την επαναφορά της βάσης του 10 για την
εισαγωγή σε πανεπιστήμια και ΤΕΙ και είχε περιγράψει αναλυτικά το νέο
τοπίο που θα προκύψει από τις συγχωνεύσεις, όπως αυτό θα αποτυπωθεί και
στο νέο μηχανογραφικό που θα πάρουν για πρώτη φορά στα χέρια τους οι
υποψήφιοι στις πανελλαδικές φέτος.</span><br />
<span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">
</span><span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">Όσον αφορά στις συγχωνεύσεις σχολείων, ο υπουργός Παιδείας
τονίζει πως θα γίνουν, χωρίς όμως να αγγίξουν ορεινές και νησιωτικές
περιοχές της Ελλάδας, ενώ για τις συγχωνεύσεις σε ΑΕΙ και ΤΕΙ
ξεκαθαρίζει πως τα κριτήρια θα αφορούν τη χωροταξική κατανομή, το
γνωστικό αντικείμενο, την ποιότητα των σπουδών και τη βιωσιμότητα.</span><br />
<span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">
</span><span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">Όσον αφορά τους επίορκους εκπαιδευτικούς, ο κ.
Αρβανιτόπουλος, ξεκαθαρίζει πως όσοι καταδικάζονται αμετάκλητα θα
απολύονται αυτόματα.</span><br />
<span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">
</span><span style="font-family: Arial,Helvetica,sans-serif; font-size: large;">Πηγή: ΑΠΕ</span></div>
</div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-50655330018768259272013-06-05T13:11:00.000-07:002013-06-05T13:11:06.584-07:00Στα μέσα Ιουνίου οι κωδικοί και η συμπλήρωση του Μηχανογραφικού <div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;">Η διαδικασία για την απόκτηση προσωπικού κωδικού ασφαλείας (password)
για υποβολή μηχανογραφικού από τους υποψηφίους των Γενικών και
Επαγγελματικών Λυκείων, αλλά και την υπαγωγή τους σε μία ειδική
περίπτωση (πολύτεκνοι, τρίτεκνοι, κοινωνικά κριτήρια), θα ξεκινήσει εκ
νέου περί τα μέσα Ιουνίου, όταν θα ξεκινήσει και η ηλεκτρονική υποβολή
του μηχανογραφικού δελτίου για εισαγωγή στην τριτοβάθμια εκπαίδευση.<br />Αυτό ανακοινώθηκε από τη <b>Διεύθυνση Οργάνωσης και Διεξαγωγής Εξετάσεων του υπουργείου Παιδείας.</b><br />Υπενθυμίζεται
ότι για τη διευκόλυνση των υποψηφίων, η διαδικασία για την απόκτηση του
κωδικού ασφαλείας αλλά και την υπαγωγή τους σε μία ειδική περίπτωση,
διακόπηκε προσωρινά από τις 27-4-2013.<br /> Ολοι οι υποψήφιοι είτε των
Γενικών Λυκείων (90% και 10%) είτε των Επαγγελματικών Λυκείων (ομάδες Α΄
και Β΄) πρέπει να προσέλθουν στο Λύκειό τους για να αποκτήσουν
προσωπικό κωδικό ασφαλείας (password), που θα δημιουργήσουν οι ίδιοι.
Παράλληλα, όσοι από τους υποψηφίους εμπίπτουν σε κάποια ειδική περίπτωση
(πολύτεκνοι, τρίτεκνοι, κοινωνικά κριτήρια), πρέπει να προσκομίσουν στο
Λύκειό τους τα απαραίτητα δικαιολογητικά για να ελεγχθούν και να
χαρακτηριστούν ως ειδική περίπτωση. <br /> Τέλος, υπενθυμίζεται ότι
στην ηλεκτρονική διεύθυνση http://exams.minedu.gov.gr και στην
ιστοσελίδα του Υπουργείου Παιδείας www.minedu.gov.gr στο σύνδεσμο
ΕΞΕΤΑΣΕΙΣ, οι υποψήφιοι μπορούν να ενημερώνονται για τη διαδικασία
(δικαιολογητικά, εγκύκλιοι, συχνές ερωτήσεις κλπ.) και αργότερα να
επεξεργαστούν και να υποβάλουν οριστικά το μηχανογραφικό τους δελτίο, σε
προθεσμία που θα ανακοινωθεί (περί τα μέσα Ιουνίου).</span></span></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-76021722404473170152013-06-05T13:03:00.000-07:002013-06-05T13:03:23.682-07:00Απόφαση υπ. Παιδείας: Έξι τα επιστημονικά πεδία στις επόμενες Πανελλήνιες<div dir="ltr" style="text-align: left;" trbidi="on">
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<span style="font-size: large;">Ένα νέο επιστημονικό πεδίο θα δημιουργηθεί από την ερχόμενη
σχολική χρονιά, στο οποίο θα περιλαμβάνονται οι στρατιωτικές σχολές, οι
αστυνομικές και η πυροσβεστική ακαδημία.</span><br />
<span style="font-size: large;">
</span></div>
<span style="font-size: large;">
</span><span style="font-size: large;">Αυτό ανακοίνωσε την Τετάρτη ο υπουργός Παιδείας Κωνσταντίνος
Αρβανιτόπουλος, σε συνέντευξή του στον ραδιοφωνικό σταθμό "Αθήνα 9,84".</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">Ακόμη, όπως έγινε σήμερα γνωστό, φέτος στις Σχολές
αξιωματικών και αστυφυλάκων της Ελληνικής Αστυνομίας θα εισαχθούν
συνολικά 580 άτομα, που όμως δεν θα φοιτήσουν από την νέα ακαδημαϊκή
χρονιά, αλλά το 2015-16.</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">"Έχουμε εκπονήσει μελέτη και πρόθεση μας αποτελεί η
συγκρότηση ενός πεδίου που θα συμπεριλάβει όλες τις στρατιωτικές σχολές,
καθώς και τις αστυνομικές και την πυροσβεστική ακαδημία", δήλωσε ο κ.
Αρβανιτόπουλος σχετικά με την δημιουργία του νέου επιστημονικού πεδίου.</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">"Από το επόμενο σχολικό έτος, οι μαθητές θα μπορούν να
επιλέξουν τις στρατιωτικές σχολές από ένα πεδίο. Διότι, αυτό το σχέδιο
ικανοποιεί το αίτημα, οι υποψήφιοι για αυτές τις συγκεκριμένες σχολές να
είναι προσηλωμένοι σε αυτή την επιλογή, δηλαδή να είναι
συνειδητοποιημένοι για την επιλογή τους και να μην εισάγονται μόνο και
μόνο επειδή έχουν τα απαραίτητα μόρια", τόνισε.</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;"><strong>Τα σενάρια επαναφοράς της βάσης του 10</strong></span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">Ο υπουργός Παιδείας ρωτήθηκε και για το ενδεχόμενο
επαναφοράς της βάσης του 10 για την εισαγωγή στα πανεπιστήμια και τα ΤΕΙ
της χώρας.</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">"Σε πρώτη φάση το αποκλείσαμε" απάντησε.</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">"Το εξετάσαμε, αλλά το απορρίψαμε διότι ήταν ένα οριζόντιο
μέτρο, το οποίο δεν επέφερε κάποιον εξορθολογισμό όσον αφορά στην
εισαγωγή στις σχολές".</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">Άλλωστε ο κ. Αρβανιτόπουλος εκτιμά ότι "με το σχέδιο
'Αθηνά', αυτό θα διορθωθεί. Θα δούμε πώς θα κυλήσει η πρώτη χρονιά και
θα πάρουμε οριστικές αποφάσεις".</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">Όπως είπε "αν από εκεί και πέρα δούμε - με την εμπειρία της
φετινής χρονιάς - ότι υπάρχουν αυτά τα ζητήματα, θα το ξαναμελετήσουμε".</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;"><strong>Το επίμαχο σχέδιο "Αθηνά"</strong></span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">Σχετικά με το θέμα του σχεδιασμού της "Αθηνάς" ο υπουργός Παιδείας παρατήρησε:</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">"Δώσαμε τη φιλοσοφία του σχεδίου 'Αθηνά', και αυτό που
προσπαθήσαμε σε πρώτη φάση ήταν να πετύχουμε τον απαραίτητο
εξορθολογισμό του ακαδημαϊκού χάρτη της χώρας. Συζητήσαμε με όλους τους
φορείς και τα κόμματα και εξηγήσαμε τις παθογένειες των τελευταίων
δεκαετιών, καθώς και τους λόγους που οδήγησαν στην αναγκαιότητα αυτών
των αλλαγών. Έγινε ένα γενναίο πρώτο βήμα".</span><br />
<span style="font-size: large;">
</span><span style="font-size: large;">Σύμφωνα με τον κ. Αρβανιτόπουλο, "υπάρχει ήδη ένας
εξορθολογισμός του ακαδημαϊκού χάρτη της χώρας, σε πολύ μεγάλο βαθμό,
ιδιαίτερα σε ό,τι αφορά στην τεχνολογική εκπαίδευση. Οι αλλαγές στην
ανώτατη εκπαίδευση δεν σταματούν. Η διαδικασία των αλλαγών, της
μεταρρύθμισης, της αξιολόγησης, της προσαρμογής στα νέα δεδομένα στο
χώρο της Παιδείας πρέπει να είναι συνεχής".</span></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-61906924421805862552013-05-31T14:21:00.001-07:002013-05-31T14:21:38.042-07:00ΑΥΛΑΙΑ ΠΑΝΕΛΛΑΔΙΚΩΝ<div dir="ltr" style="text-align: left;" trbidi="on">
<a href="http://www.minedu.gov.gr/publications/docs2013/them_oik_epil_c_hmer_no_1305.pdf" target="_blank">ΑΡΧΕΣ ΟΙΚΟΝΟΜΙΚΗΣ ΘΕΩΡΙΑΣ</a></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-65759727309594109712013-05-29T13:27:00.000-07:002013-05-29T13:27:21.963-07:0029/05/2013 ΕΚΤΗ ΗΜΕΡΑ ΠΑΝΕΛΛΑΔΙΚΩΝ ΕΞΕΤΑΣΕΩΝ<div dir="ltr" style="text-align: left;" trbidi="on">
<a href="http://www.minedu.gov.gr/publications/docs2013/them_xhm_kat_c_hmer_no_1305.pdf" target="_blank">ΧΗΜΕΙΑ ΘΕΤΙΚΗΣ ΚΑΤΕΥΘΥΝΣΗΣ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_plir_kat_c_hmer_no_1305.pdf" target="_blank">ΑΝΑΠΤΥΞΗ ΕΦΑΡΜΟΓΩΝ ΣΕ ΠΡΟΓΡΑΜΜΑΤΙΣΤΙΚΟ ΠΕΡΙΒΑΛΛΟΝ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_hlek_kat_c_hmer_d_esp_1305.pdf" target="_blank">ΗΛΕΚΤΡΟΛΟΓΙΑ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_lat_kat_c_hmer_no_1305.pdf" target="_blank">ΛΑΤΙΝΙΚΑ</a></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-14497125293502586062013-05-27T05:48:00.000-07:002013-05-27T05:48:00.488-07:00ΣΧΟΛΙΑ ΓΙΑ ΤΑ ΜΑΘΗΜΑΤΙΚΑ ΚΑΤΕΥΘΥΝΣΗΣ<div dir="ltr" style="text-align: left;" trbidi="on">
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Τα σημερινά θέματα ήταν για πολύ καλά προετοιμασμένους υποψηφίους. Ειδικότερα:<b></b><br />Θέμα Α: Η θεωρία ήταν αναμενόμενη χωρίς προβλήματα.<br />Θέμα Β:Τα
ερωτήματα Β1, Β2 εξετάζουν βασικές γνώσεις. Το ερώτημα Β3 είναι το πιο δύσκολο από όλα τα θέματα.<br />Θέμα Γ: Απευθύνεται σε σωστά προετοιμασμένους υποψηφίους.<br />Θέμα Δ: Η επίλυση του θέματος αυτού απαιτεί πολύ καλή
κατανόηση των εννοιών. </span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Γενικό σχόλιο: <br />Καλύπτεται αρκετά μεγάλο μέρος της ύλης της Γ Λυκείου, ενώ είναι απαραίτητη και η καλη γνωση υλης προηγούμενων τάξεων. Η σωστή διαχείριση του χρόνου ήταν ένας σημαντικός παράγοντας επιτυχία (ειδικά με την άστοχη επιλογή το δυσκολότερο ερώτημα να είναι το Β3)</span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Κλείνοντας να παραθέσουμε & το σχόλιο της Ελληνικής Μαθηματικής Εταιρείας: " Τα θέματα είναι τα δυσκολότερα των τελευταίων ετών και
απαιτούν ειδικές τεχνικές, που ίσως δεν προωθούν την έλξη και την αγάπη
των μαθητών στα Μαθηματικά. Η Ελληνική Μαθηματική Εταιρεία
προτίθεται να ανοίξει ουσιαστικό διάλογο με μελέτη και διερεύνηση, για
το περιεχόμενο και τον τρόπο εξέτασης των Μαθηματικών στις Πανελλήνιες
Εξετάσεις για την εισαγωγή στην Τριτοβάθμια εκπαίδευση". </span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;"> </span></span></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-37772533257947386622013-05-27T05:18:00.001-07:002013-05-27T05:18:51.835-07:0027/05/2013 ΠΕΜΠΤΗ ΗΜΕΡΑ ΠΑΝΕΛΛΑΔΙΚΩΝ ΕΞΕΤΑΣΕΩΝ<div dir="ltr" style="text-align: left;" trbidi="on">
<a href="http://www.minedu.gov.gr/publications/docs2013/them_mat_kat_c_hmer_no_1305.pdf" target="_blank">ΜΑΘΗΜΑΤΙΚΑ ΚΑΤΕΥΘΥΝΣΗΣ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_arx_kat_c_hmer_no_1305.pdf" target="_blank">ΑΡΧΑΙΑ ΚΑΤΕΥΘΥΝΣΗΣ</a></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-2857183208867827772013-05-24T03:02:00.001-07:002013-05-24T03:02:49.294-07:0024/05/2013 ΤΕΤΑΡΤΗ ΗΜΕΡΑ ΠΑΝΕΛΛΑΔΙΚΩΝ ΕΞΕΤΑΣΕΩΝ<div dir="ltr" style="text-align: left;" trbidi="on">
<a href="http://www.minedu.gov.gr/publications/docs2013/them_bio_kat_c_hmer_no_1305.pdf" target="_blank">ΒΙΟΛΟΓΙΑ ΚΑΤΕΥΘΥΝΣΗΣ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_ist_kat_c_hmer_no_1305.pdf" target="_blank">ΙΣΤΟΡΙΑ ΚΑΤΕΥΘΥΝΣΗΣ</a><br />
<br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_org_kat_c_hmer_no_1305.pdf" target="_blank">ΑΡΧΕΣ ΟΡΓΑΝΩΣΗΣ & ΔΙΟΙΚΗΣΗΣ ΕΠΙΧΕΙΡΗΣΕΩΝ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_biox_kat_c_hmer_no_1305.pdf" target="_blank">ΧΗΜΕΙΑ-ΒΙΟΧΗΜΕΙΑ</a><br />
<br />
<br /></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-38118615016179080212013-05-22T01:20:00.000-07:002013-05-22T01:20:11.462-07:0022/05/2013 ΤΡΙΤΗ ΗΜΕΡΑ ΠΑΝΕΛΛΑΔΙΚΩΝ ΕΞΕΤΑΣΕΩΝ<div dir="ltr" style="text-align: left;" trbidi="on">
<a href="http://www.minedu.gov.gr/publications/docs2013/them_fis_kat_c_hmer_no_1305.pdf" target="_blank">ΦΥΣΙΚΗ ΚΑΤΕΥΘΥΝΣΗΣ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_neoel_kat_c_hmer_d_esp_no_1305.pdf" target="_blank">ΝΕΟΕΛΛΗΝΙΚΗ ΛΟΓΟΤΕΧΝΙΑ</a></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-10037283331339478122013-05-20T06:20:00.003-07:002013-05-20T06:20:57.474-07:00ΕΚΤΙΜΗΣΕΙΣ ΓΙΑ ΤΑ ΜΑΘΗΜΑΤΙΚΑ ΓΕΝΙΚΗΣ ΠΑΙΔΕΙΑΣ<div dir="ltr" style="text-align: left;" trbidi="on">
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Τα
θέματα καλύπτουν το σύνολο σχεδόν της ύλης με πολλά ερωτήματα
κλιμακούμενης δυσκολίας.</span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Το πρώτο θέμα είναι τυπικό θέμα θεωρίας, χωρίς καμιά δυσκολία. Το δεύτερο και το τέταρτο θέμα απαιτεί καλή γνώση των εννοιών και δυνατότητα συνδυασμού γνώσεων από διαφορετικά κεφάλαια. Το τρίτο θέμα είναι κλασικό θέμα στατιστικής χωρίς ιδιαίτερες δυσκολίες με εξαίρεση το ερώτημα Γ3.<br />Συγκριτικά με τα θέματα των τελευταίων ετών χαρακτηρίζονται μεγαλύτερου βαθμού δυσκολίας <span style="font-size: large;">(ειδικά για μαθητές Θεωρητικής κατεύθυνσης) </span>και απαιτούσαν περισσότερο χρόνο.</span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Τέλος πρέπ<span style="font-size: large;">ει να<span style="font-size: large;"> σχολιάσουμε την παθογένεια του συγκεκριμένου συστήματος Πανελλαδικών εξετάσεων που δεν εξασφαλίζει ίδιο επίπεδο δυσκολίας στα θέματα των τεσσάρων μαθημάτων Γενικής Παιδείας.</span></span> </span></span></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-8175908124940426072013-05-20T06:09:00.000-07:002013-05-20T06:09:13.953-07:00ΕΚΤΙΜΗΣΕΙΣ ΣΤΑ ΘΕΜΑΤΑ ΒΙΟΛΟΓΙΑΣ ΓΕΝΙΚΗΣ ΠΑΙΔΕΙΑΣ<div dir="ltr" style="text-align: left;" trbidi="on">
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Τα θέματα σε σχέση με πέρυσι ήταν σαφέστερα. </span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Το επίπεδο δυσκολίας δεν ήταν υψηλό και τα θέματα προσφέρονταν για υψηλές βαθμολογίες, ιδιαίτερα για τους καλά προετοιμασμένους μαθητές. </span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Μοναδική δυσκολία αποτελούσε ο όγκος των απαντήσεων. </span></span><br />
<span style="font-size: large;"><span style="font-family: Arial,Helvetica,sans-serif;">Στην κλιμάκωση των βαθμών ιδιαίτερο ρόλο θα έχουν τα ερωτήματα Γ4 & Δ3</span></span></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-36192827323824890992013-05-20T01:35:00.001-07:002013-05-20T01:39:08.620-07:0020/05/2013 ΔΕΥΤΕΡΗ ΜΕΡΑ ΠΑΝΕΛΛΑΔΙΚΩΝ ΕΞΕΤΑΣΕΩΝ<div dir="ltr" style="text-align: left;" trbidi="on">
<a href="http://www.minedu.gov.gr/publications/docs2013/them_mat_gen_c_hmer_no_1305.pdf" target="_blank">ΜΑΘΗΜΑΤΙΚΑ ΓΕΝΙΚΗΣ ΠΑΙΔΕΙΑΣ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_bio_gen_c_hmer_no_1305.pdf" target="_blank">ΒΙΟΛΟΓΙΑ ΓΕΝΙΚΗΣ ΠΑΙΔΕΙΑΣ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_fis_gen_c_hmer_d_esp_no_1305.pdf" target="_blank">ΦΥΣΙΚΗ ΓΕΝΙΚΗΣ ΠΑΙΔΕΙΑΣ</a><br />
<br />
<a href="http://www.minedu.gov.gr/publications/docs2013/them_ist_gen_c_hmer_no_1305.pdf" target="_blank">ΙΣΤΟΡΙΑ ΓΕΝΙΚΗΣ ΠΑΙΔΕΙΑΣ</a><br />
<br /></div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-46722201897843134402013-05-19T08:36:00.004-07:002013-05-19T08:38:08.088-07:00 Πρόγραμμα Σπουδών Άλγεβρας και Γεωμετρίας Γενικής Παιδείας Β΄ τάξης Γενικού Λυκείου-ΦΕΚ <div dir="ltr" style="text-align: left;" trbidi="on">
<div style="text-align: left;">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: large;">Δημοσιεύθηκε στην Εφημερίδα της Κυβέρνησης το Πρόγραμμα Σπουδών Άλγεβρας
και Γεωμετρίας Γενικής Παιδείας Β΄ τάξης Γενικού Λυκείου. Για να
ανοίξετε το ΦΕΚ <a href="http://www.esos.gr/uploads/dthmia/programma-spoydon-mathimatikon.pdf" target="_blank"><b>κάνετε κλικ εδώ</b></a></span></span><a href="http://www.esos.gr/uploads/dthmia/programma-spoydon-mathimatikon.pdf" target="_blank"><b><br /></b></a></div>
</div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-91262337894579050482013-05-17T02:51:00.000-07:002013-05-17T02:51:26.132-07:00ΕΚΤΙΜΗΣΕΙΣ ΓΙΑ ΘΕΜΑΤΑ ΝΕΟΕΛΛΗΝΙΚΗΣ ΓΛΩΣΣΑΣ<div dir="ltr" style="text-align: left;" trbidi="on">
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<![endif]--><span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: 14pt;">Τα θέματα του μαθήματος της Νεοελληνικής Γλώσσας
χαρακτηρίζονται σε γενικές γραμμές αναμενόμενα.</span></span><span style="font-family: Arial,Helvetica,sans-serif;">
</span><br />
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<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: 14pt;">Το κείμενο του Γεωργίου Γραμματικάκη (δοκίμιο)
χαρακτηρίζεται κατανοητό, με απλή γλώσσα. </span></span></div>
<span style="font-family: Arial,Helvetica,sans-serif;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 3.0pt; text-align: justify;">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: 14pt;">Οι καλά προετοιμασμένοι μαθητές δεν θα αντιμετώπισαν
πρόβλημα στην πύκνωση του κειμένου, στο απαιτούμενο όριο των λέξεων. </span></span></div>
<span style="font-family: Arial,Helvetica,sans-serif;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 3.0pt; text-align: justify;">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: 14pt;">Η ανάπτυξη παραγράφου (Β1) ήταν ιδιαίτερα επίκαιρη και
βιωματική.</span></span></div>
<span style="font-family: Arial,Helvetica,sans-serif;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 3.0pt; text-align: justify;">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: 14pt;">Οι ερωτήσεις Β2, Β3, Β4 ήταν στο ίδιο επίπεδο ευκολίας
με τις αντίστοιχες περσινές και προέρχονται κυρίως από την ύλη της Α΄ & Β΄ λυκείου.</span></span></div>
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</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 3.0pt; text-align: justify;">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: 14pt;">Το θέμα της έκθεσης είχε σαφή διατύπωση, τα ζητούμενα
ήταν ευδιάκριτα & αφορούσαν ένα θέμα επίκαιρο & διαχρονικό ταυτόχρονα.</span></span></div>
<span style="font-family: Arial,Helvetica,sans-serif;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 3.0pt; text-align: justify;">
<span style="font-family: Arial,Helvetica,sans-serif;"><span style="font-size: 14pt;">Θεωρούμε ότι ένας μαθητής ο οποίος είχε μελετήσει
συστηματικά σε όλη την διάρκεια της σχολικής χρονιάς δεν θα αντιμετώπισε
ιδιαίτερες δυσκολίες στην προσέγγιση του θέματος.</span><span style="font-size: 12pt;"></span></span></div>
<span style="font-family: Arial,Helvetica,sans-serif;">
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ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-64680709574712071172013-05-17T02:32:00.001-07:002013-05-17T02:32:33.933-07:00Ο Γ. Γραμματικάκης για το βιβλίο «Ενας αστρολάβος του Ουρανού και της Ζωής» <div dir="ltr" style="text-align: left;" trbidi="on">
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<img align="left" alt="" border="2" height="420" hspace="5" src="http://www.esos.gr/uploads/foto-genikes/biblio-grammatikaki.jpg" style="height: 420px; width: 300px;" vspace="5" width="300" />Πρόσφατα
ο καθηγητής Γ. Γραμματικάκης για το βιβλίο του «Ενας αστρολάβος του
Ουρανού και της Ζωής», (πανεπιστημιακών εκδόσεων Κρήτης σελίδων 345),
από το οποίο επιλέχθηκε απόσπασμα για την επιλογή του <a href="http://www.esos.gr/uploads/panelladikes/them_glo_gen_c_hmer_no_1305.pdf" target="_blank">θέματος στη Νεοελληνική γλώσσα που διαγωνίστηκαν σήμερα οι υποψήφιοι, </a>παραχώρησε την ακόλουθη συνέντευξη στο δημοσιογράφο Σπύρο Μανουσέλη και στην εφημερίδα των Συντακτών (σ.σ.:<br /><b>Στο
τελευταίο βιβλίο σας «Ενας αστρολάβος του Ουρανού και της Ζωής»
εξετάζετε από πολλές πτυχές την κατάσταση του σύγχρονου ανθρώπου, τον
οποίο εύστοχα αποκαλείτε «ο μετέωρος άνθρωπος». Αυτή η επισφαλής
κατάσταση «μετεωρισμού», που εκδηλώνεται ως απουσία σταθερών αναφορών,
πόσο απειλητική μπορεί να αποδειχτεί για το μέλλον μας;</b> <br />Ο
σύγχρονος άνθρωπος αισθάνεται πράγματι «μετέωρος». Xωρίς έρμα, χωρίς
προφανή σημεία ισορροπίας. Γνωρίζει πια ότι ο πλανήτης που τον φιλοξενεί
αποτελεί μια απειροελάχιστη κουκκίδα σε ένα απέραντο και αδιάφορο
Σύμπαν. Ενώ παράλληλα έχουν κλονιστεί οι τυφλές βεβαιότητες που του
προσέφεραν οι ιδεολογίες ή τα θρησκευτικά του στηρίγματα. Στην κοσμική
και ψυχολογική αυτή μοναξιά του ανθρώπου έμελλε να προστεθεί και η
κυριαρχία ενός ανάλγητου οικονομικού συστήματος, που ενισχύει τις
αδικίες και την ανασφάλεια. Ακόμα και τον ίδιο τον πλανήτη απειλεί ο
παραλογισμός της εποχής. <br />Ποια είναι λοιπόν η έξοδος –αν υπάρχει– σε
αυτό το απειλητικό μέλλον, που είναι ήδη παρόν; Θα το πω επιγραμματικά:
μόνον η αποκατάσταση κάποιων αξιών, που για την ώρα βρίσκονται
εξόριστες` κι ωστόσο δεν έχει παύσει να τις λαχταρά η ανθρώπινη ψυχή. <br />Ο
μετέωρος άνθρωπος υποπτεύεται ήδη ότι μόνον ένας κόσμος που ξεκινά από
αυτόν και καταλήγει στον άλλο –τους άλλους μετέωρους ανθρώπους– έχει
κάποια λογική ύπαρξης ή την ικανότητα να επιβιώσει. <br />Υπονοείται έτσι η
ανάγκη ενός καινούργιου ανθρωπισμού, που θα στηρίζεται στην αδιάψευστη
επιστημονική γνώση αλλά και στον σεβασμό του περιβάλλοντος ή τις αξίες
του πολιτισμού, που ελάμπρυναν μέχρι τώρα την ανθρώπινη πορεία. Οσο κι
αν ηχεί ουτοπική, μόνον μια παρόμοια οπτική θα επαναφέρει τον άνθρωπο,
όχι βέβαια στο κέντρο του Σύμπαντος, αλλά στο κέντρο της ίδιας του της
ιστορίας` και στην ισορροπία με τους άλλους και τον εαυτό του.<br /><br /><b>Ζούμε
σε μια εποχή μεγάλης κοινωνικής ανασφάλειας και
γνωσιολογικής-πολιτισμικής αβεβαιότητας. Η γνωσιολογική αβεβαιότητα
μάλιστα εισάγεται για πρώτη φορά στην καρδιά της σύγχρονης επιστήμης με
την κβαντική φυσική. Αλλά και η βιολογία δεν πάει πίσω, π.χ. με την
εξελικτική αβεβαιότητα ή με την τυχαιότητα στη μοριακή βιολογία. Σε ποιο
βαθμό οι εξελίξεις της σύγχρονης επιστήμης συμβάλλουν και ενδεχομένως
«νομιμοποιούν» αυτή την επώδυνη αίσθηση αβεβαιότητας; Αραγε, όσο θα
βαθαίνουν οι γνώσεις μας αυτή η αβεβαιότητα θα μεγαλώνει;</b><br /><br />Νομίζω
ότι η αίσθηση της αβεβαιότητας έχει περισσότερο τις ρίζες της στη δίνη
της εποχής και λιγότερο στην κβαντική επανάσταση ή στις εξελίξεις στη
μοριακή βιολογία. Λίγο έχουν αφομοιωθεί από την ευρύτερη κοινωνία οι
επιστημονικές αυτές ανατροπές. <br />Θα περιοριστώ μόνον στη φυσική: ο
κόσμος της καθημερινότητας υπακούει χωρίς διαμαρτυρίες στην παλιά,
κλασική «νομολογία» της φυσικής, που μαθαίναμε στα σχολεία. Αν όμως
διεισδύσει κανείς στον μικρόκοσμο της ύλης, αν διερωτηθεί ποιοι νόμοι
διέπουν τα μικροσκοπικά άτομα ή τις κινήσεις των ηλεκτρονίων, με ποιες
διαδικασίες τα άτομα εκπέμπουν φως και γιατί κάποιοι πυρήνες είναι
ραδιενεργοί, τότε μόνον η κβαντική φυσική είναι σε θέση να δώσει
απαντήσεις. Είναι η εκπληκτικότερη από τις θεωρίες που διαμόρφωσε ο
ανθρώπινος νους για να ερμηνεύσει τον κόσμο. Δύσκολα όμως γίνεται
αποδεκτή. Διότι η θεωρία αυτή παραβιάζει συχνά την κοινή λογική, εισάγει
τις πιθανότητες εκεί που ίσχυε αυστηρά η αιτιοκρατία, στηρίζεται σε
αξιώματα και εξισώσεις που μοιάζει να έρχονται εξ ουρανού. <br />Η ισχύς
της είναι όμως πια αδιαπραγμάτευτη: δεν υπάρχει τεχνολογικό επίτευγμα
της σύγχρονης εποχής, από την τηλεόραση έως τα κινητά τηλέφωνα, και από
τις ακτίνες λέιζερ έως τα νέα υλικά, που να μην αποτελεί συνέπεια, άμεση
η έμμεση, της κβαντικής επανάστασης. Και μολονότι συστατικό της
επανάστασης αυτής είναι η αβεβαιότητα, η κβαντική φυσική είναι η μόνη
που ερμηνεύει πειστικά τη σταθερότητα της ύλης! <br />Αν λοιπόν
ξεπεράσουμε τις επιφανειακές αβεβαιότητες της σύγχρονης φυσικής, που
δίκαια ίσως κλονίζουν ή επηρεάζουν τον άνθρωπο, μας αποκαλύπτεται ένας
κόσμος πολύπλοκος αλλά συνεκτικός, μαγικός αλλά στο βάθος στέρεος. Το
μήνυμα είναι πολυδιάστατο: ότι η αναζήτηση της αλήθειας δεν πρέπει να
περιορίζεται στην επιφάνεια των πραγμάτων ούτε στη συμβατική λογική μας.<br /><br /><b>Ωστόσο,
παράλληλα με την εκρηκτική πρόοδο της επιστήμης, στην εποχή μας
γνωρίζουν εντυπωσιακή έξαρση και ποικίλα «αντιεπιστημονικά» ρεύματα:
αστρολογία και προφητείες καταστροφής –όπως η πρόσφατη για τη συντέλεια
του κόσμου το 2012– δεισιδαιμονίες και γιατροσόφια` ακόμα και φόβοι ότι
μας επιβουλεύονται οι εξωγήινοι! Πώς ερμηνεύετε εσείς αυτή την άνθηση
του ανορθολογισμού;</b> <br />Φοβούμαι ότι τα πράγματα είναι χειρότερα από
ό,τι τα περιγράφετε. Διότι, όταν ακόμα και επίσημοι θεσμοί –στις
Ηνωμένες Πολιτείες της Αμερικής, για παράδειγμα– αμφισβητούν τη Θεωρία
της Εξέλιξης, ή εδώ, στα πάτρια εδάφη, την εξορίζουν από τα σχολικά
βιβλία, τότε η «άνθηση» αυτή ξεπερνά τα όρια της γραφικότητας. Γίνεται
συχνά επικίνδυνη. Στην ελαφρότερη πλευρά της ανήκει η εκμετάλλευση των
αφελών από αστρολόγους, χειρομάντεις, εμβριθείς μελετητές των ζωδίων.
Καμιά φορά όμως, το αντιορθολογικό αυτό ρεύμα φτάνει στα άκρα. Οταν ο
λαμπρός κομήτης Hale-Bopp πλησίαζε τη Γη το 1997, νέοι άνθρωποι, οπαδοί
μιας αίρεσης στην Αμερική, αυτοκτόνησαν για να συναντηθούν με τους
εξωγήινους που, όπως πίστευαν, κατοικούσαν στην ουρά του κομήτη! <br />Το
φαινόμενο έχει πολλαπλές ερμηνείες. Είναι πρώτα αναντίρρητο ότι η ισχύς
της επιστήμης έχει περιορισμένο πεδίο δράσης. Μεγάλη ευθύνη γι’ αυτό
έχει μια σχολική παιδεία που κάνει τις επιστημονικές ιδέες απωθητικές
και τις περιορίζει σε ορισμούς και απομνημόνευση τύπων. Επίσης, ενώ έχει
απαλυνθεί ο δογματισμός της Εκκλησίας και δεν λείπουν και τα φωτεινά
μυαλά της, υπάρχει ένας ισχυρός πυρήνας που αισθάνεται πάντα εχθρικός
προς την επιστημονική πρόοδο. Αρκεί να θυμηθεί κανείς τα όσα
κωμικοτραγικά γράφτηκαν και ακούστηκαν σε σχέση με το «Σωματίδιο του
Θεού» και την πρόσφατη ανακάλυψή του. <br />Ευθύνες όμως για την άνθηση
αυτής της ιδιότυπης υποκουλτούρας υπάρχουν και στην άλλη πλευρά. Ο
αποκαλούμενος «ορθολογισμός» υπερασπίζεται συχνά τις επιστημονικές ιδέες
με φανατισμό και αλαζονεία, που δεν αφήνουν περιθώρια στον διάλογο και
την πειθώ. Η ανθρώπινη ζωή έχει όμως ανάγκη από κάποια μεταφυσική αύρα,
ακόμα και από μύθους` αρκεί να μην κρύβουν ιδιοτέλεια. Φοβούμαι λοιπόν
ότι η «συμπόρευση» της επιστήμης με την ίδια της την άρνηση θα
διαρκέσει. <br />Είναι θέμα πολιτισμού, αλλά και ευρύτερης παιδείας. Σε
αυτό το πλαίσιο αξίζει να επισημάνω την πολυετή παρουσία των
καλοδουλεμένων σελίδων επιστήμης που εσείς υπογράφετε –στην παλιά
«Ελευθεροτυπία» και σήμερα στην «Εφημερίδα των Συντακτών»– διότι
προβάλλουν τα επιστημονικά επιτεύγματα με πληρότητα και τεκμηρίωση και
συντελούν στην ευεργετική τους διάδοση.<br /><b><br />Στη συγγραφική σας
πορεία –από την «Κόμη της Βερενίκης» στην «Αυτοβιογραφία του φωτός» και
σήμερα στον «Αστρολάβο»– αναζητήσατε επίπονα το προσωπικό νόημα του
Κόσμου. Σε όλα σας τα βιβλία, ωστόσο, η ορθολογική προσέγγιση της
επιστήμης διαπλέκεται με τη μυθολογική και την καλλιτεχνική προσέγγιση
της πραγματικότητας. Θεωρείτε πως είναι πλέον εφικτή η υπέρβαση του
σχιζοειδούς διαχωρισμού της επιστήμης από την τέχνη και τον πολιτισμό,
που αιώνες τώρα στοιχειώνει τη δυτική σκέψη;</b><br /> Ο διαχωρισμός της
επιστήμης από την τέχνη δεν στοιχειώνει μόνον –όπως σωστά παρατηρείτε–
τη δυτική σκέψη. Στερεί επίσης και από τις δύο τη δυνατότητα
αλληλεπίδρασης, ενώ στενεύει επικίνδυνα και τους ορίζοντες του ανθρώπου.
Την υπέρβαση λοιπόν αυτού του διαχωρισμού δεν τη θεωρώ απλώς εφικτή
αλλά και αναγκαία. Ισως να μη βρίσκεται εκεί το νόημα του κόσμου,
ευκολύνεται όμως ουσιαστικά η αναζήτησή του.<br /> Αξίζει πρώτα απ’ όλα να
επισημανθεί ότι παρά το επιφανειακό χάσμα που τις χωρίζει, η επιστήμη
και η τέχνη εδράζονται σε ένα κοινό έδαφος. Οπως έχει παρατηρήσει από
παλιά ο Αρθουρ Kέσλερ, το μεγαλείο της επιστήμης δεν βρίσκεται σε μια
αλήθεια πιο απόλυτη από την αλήθεια του Μπαχ ή του Τολστόι. Βρίσκεται σ’
αυτήν καθ’ εαυτήν την πράξη της δημιουργίας της. Η επιστήμη είναι
πράγματι στον πυρήνα της μια διαδικασία δημιουργίας. Το γεγονός αυτό
υποδεικνύει ότι το χάσμα που τη χωρίζει από τις άλλες εκφράσεις του
ανθρώπινου πολιτισμού είναι εν πολλοίς τεχνητό. <br />Εχω όμως την αίσθηση
ότι το χάσμα αυτό αρχίζει ίσως να γεφυρώνεται. Ετσι, τα βιβλία
εκλαϊκευμένης επιστήμης –που είναι ένας αδόκιμος όρος!– γνωρίζουν
πραγματική άνθηση, ενώ η λογοτεχνία και η ποίηση εμπνέονται συχνά από
τις ιδέες και τα πρόσωπα της επιστήμης. Δύο σπουδαίες, τέλος, μορφές
τέχνης, το θέατρο και ο κινηματογράφος, έχουν πρόσφατα περιλάβει στη
δραματουργία τους τις επιστημονικές μορφές του Χάιζενμπεργκ και του
Γκέντελ, του Φέινμαν ή του Νάις. Προς αυτή την κατεύθυνση, της γεφύρωσης
του χάσματος, έχει συμβάλει με ποικίλες εκδηλώσεις και η Ενωση Ελλήνων
Φυσικών. <br />Δεν έχομε άλλωστε χρείαν άλλων μαρτύρων. Οπως ήδη
επισημάνατε, ο συνομιλητής σας σήμερα προσπαθεί με τα βιβλία του να
προσεγγίσει την επιστήμη με τρόπο ποιητικό –έτσι λέγεται!– και με συχνές
αναφορές στην τέχνη ή τη φιλοσοφία. Η μεγάλη απήχησή τους στο κοινό
δείχνει ότι ο δρόμος αυτός, που συνενώνει τα επιφανειακώς αντίθετα,
αποτελεί μια αδήριτη ανάγκη. Παρατηρήθηκε όμως και το αντίστροφο. Η
«Κόμη της Βερενίκης» και η «Αυτοβιογραφία του φωτός» υπήρξαν πηγή
έμπνευσης για προικισμένους καλλιτέχνες και έγιναν τηλεοπτική σειρά αλλά
και πίνακες ζωγραφικής, θεατρικά δρώμενα αλλά και σπουδαίες συνθέσεις
μουσικής. <br />Τον ίδιο δρόμο φαίνεται να ακολουθεί και ο «Αστρολάβος».
Ας σημειωθεί ότι αυτή η προσπάθεια σύγκλισης του επιστημονικού λόγου με
τη μουσική ή τις άλλες μορφές τέχνης γίνεται δεκτή από τον κόσμο με
ενδιαφέρον και μέθεξη.<br /> Οσο όμως και αν υπάρχουν κάποια δείγματα
σύγκλισης, ο δρόμος είναι ακόμα μακρύς και ανηφορικός. Η κάθε έκφραση
του πολιτισμού έχει τη δική της ταυτότητα και η συνομιλία της με την
επιστήμη έχει συχνά τη μορφή ψιθύρων.<br /> <b><br />Τέλος, μια ερώτηση, όχι
στον συγγραφέα αλλά στον πανεπιστημιακό δάσκαλο. Η τρέχουσα
οικονομική-πολιτική κρίση επηρεάζει αρνητικά και υπονομεύει εμφανώς το
μέλλον της επιστημονικής παιδείας και έρευνας στην Ελλάδα. Υπάρχει ορατή
έξοδος;</b> <br />Η επιστημονική έρευνα δεν έχαιρε ποτέ ιδιαίτερης εκτίμησης ούτε από την ελληνική κοινωνία ούτε από το πολιτικό μας σύστημα. <br />Χάρη
όμως στο αξιόλογο δυναμικό, που στελέχωσε τα τελευταία χρόνια τα
ελληνικά πανεπιστήμια, αλλά και στη συνδρομή των ευρωπαϊκών
προγραμμάτων, που αφθονούσαν κατά το ίδιο διάστημα –και, για να είμαστε
ειλικρινείς, συχνά διέφθειραν το ερευνητικό μας «ήθος»– έγινε μια
ουσιώδης πρόοδος. Ετσι δημιουργήθηκαν νησίδες εξαιρετικής «ποιότητας»
στην έρευνα, που ανακλούσαν βέβαια και στον χώρο της Παιδείας. <br />Είναι
ένα από τα καλά κρυμμένα μυστικά, αφού μόνον τα δεινά και τα ευτελή
κυριαρχούν στα μέσα ενημέρωσης: Τα στοιχεία πάντως δείχνουν ότι η Ελλάδα
είχε και έχει ακόμα μια ερευνητική παρουσία πολύ πιο σημαντική από ό,τι
θα προϋπέθεταν ο πληθυσμός και η ερευνητική της παράδοση. <br />Τώρα
βέβαια που οι ιερές αγελάδες σχεδόν στέρεψαν και η «κρίση» κόβει την
ανάσα και τις ζωές μας, ηχεί παράλογο να μιλά κανείς για έρευνα και
επιστήμη. Δεν είναι όμως έτσι. Τα σοβαρά έθνη γνωρίζουν –και το
εφαρμόζουν– ότι «ανάπτυξη» χωρίς την ενίσχυση της πρωτογενούς έρευνας
δεν νοείται. Η Ελλάδα έχει επιπλέον το πλεονέκτημα ότι διαθέτει
εξαίρετους νέους ερευνητές, που σήμερα βλέπουν τα όνειρά τους να
συντρίβονται και αναζητούν δρόμους διαφυγής. <br />Ορατή πάντως έξοδος
προς το παρόν δεν φαίνεται να υπάρχει. Υπάρχει όμως η αδήριτη ανάγκη να
συντηρηθούν, όσο γίνεται, με επιμονή και με πάθος οι ερευνητικές
«εστίες» στη χώρα μας. Κι ακόμα να συντηρηθεί η ελπίδα ότι όταν έλθουν
καλύτερες μέρες –γιατί δεν μπορεί, θα έλθουν!– η επιστημονική έρευνα θα
παύσει να είναι ο παρίας της ελληνικής «ανάπτυξης» και θα αποκτήσει
ερείσματα και προοπτικές.</div>
ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0tag:blogger.com,1999:blog-4233134830989313952.post-1893403581062068382013-05-17T02:29:00.000-07:002013-05-17T02:29:07.150-07:0017-05-13 Νεοελληνική Γλώσσα Γενικής Παιδείας <div dir="ltr" style="text-align: left;" trbidi="on">
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(ΟΜΑΔΑ Β΄)</span></b><span style="font-family: "Times New Roman","serif";"></span></span></div>
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<span style="font-size: small;"><b><span style="font-family: "Verdana","sans-serif";">ΠΑΡΑΣΚΕΥΗ 17 ΜΑΪΟΥ 2013 - ΕΞΕΤΑΖΟΜΕΝΟ ΜΑΘΗΜΑ:</span></b><span style="font-family: "Times New Roman","serif";"></span></span></div>
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<span style="font-size: small;"><b><span style="font-family: "Verdana","sans-serif";">ΝΕΟΕΛΛΗΝΙΚΗ ΓΛΩΣΣΑ ΓΕΝΙΚΗΣ ΠΑΙΔΕΙΑΣ</span></b><span style="font-family: "Times New Roman","serif";"></span></span></div>
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<span style="font-size: small;"><b><span style="font-family: "Verdana","sans-serif";">ΣΥΝΟΛΟ ΣΕΛΙΔΩΝ: ΤΡΕΙΣ (3)</span></b><span style="font-family: "Times New Roman","serif";"></span></span></div>
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<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">ΚΕΙΜΕΝΟ</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
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<br /></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Τη ζωή στη Γη ο
άνθρωπος ελάχιστα την σέβεται, η ζωή όμως σε άλλους κόσμουςδιεγείρει το
ενδιαφέρον και τη φαντασία του. Είναι άραγε περιέργεια, κατακτητική διάθεση ή απλώς
ένα διανοητικό παιχνίδι; Ίσως όλα μαζί, <b>ταυτόχρονα </b>όμως κι ένα βαθύ
αίσθημα μοναξιάς. Άλλωστε τη ζωή του εδώ ο άνθρωπος την έχει καταστήσει
πιεστική και ανούσια. Περιμένει λοιπόν ένα χέρι βοηθείας και παρηγοριάς από
τους πλανήτες και τα μακρινά άστρα. </span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Ακόμη όμως και
αν δεχθούμε με αισιοδοξία ότι η ζωή δεν ανθίζει μόνον στη Γη, αλλά ότι αφθονεί
στο Σύμπαν, ένας άλλος καθοριστικός παράγοντας ορθώνεται. Είναι ανάγκη να συνειδητοποιηθεί
–όσο και αν αντιτίθεται στις ενδόμυχες επιθυμίες μας– ότι με τη ζωή αυτή η επικοινωνία
<u>εμφανίζεται,</u> για το ορατό τουλάχιστον μέλλον, <u>ανέφικτη</u>.</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Με τη ζωή
λοιπόν στο Σύμπαν είναι αδύνατο να επικοινωνήσουμε, η ζωή όμως γύρω μας ανθίζει.
Η ζωή εδώ, σ’ έναν μικρό και πανέμορφο πλανήτη, ανέδειξε ύστερα από σιωπηλές διεργασίες
που διήρκεσαν δισεκατομμύρια χρόνια μια θαυμαστή ποικιλία έμβιων όντων. Οι θάλασσες
και τα δάση της Γης, τα βουνά και οι πεδιάδες της αποκαλύπτουν κάθε στιγμή τη γοητεία
που κρύβουν τα χιλιάδες όμοια ή ανόμοια δημιουργήματα της εξελίξεως. Η ανεμώνη και
το δελφίνι, ο αίλουρος αλλά και ο γυπαετός, τα ανθρώπινα όντα στις πολλαπλές
φυλετικές τους παραλλαγές, είναι δίπλα μας, συμμέτοχα του ίδιου πλανήτη και του
μέλλοντός του. </span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Αποκαλύπτεται
όμως επίσης σε όλη του την τραγική αντίφαση ότι ο άνθρωπος, αυτή η περιούσια
κορύφωση της εξελίξεως, έχει διπλή υπόσταση. Από τη μια είναι ικανός για
μεγάλες πράξεις, έμαθε με την επιστημονική του γνώση να κατανοεί τον κόσμο αλλά
και <b>γέννησε </b>αριστουργήματα στον λόγο και στην τέχνη. Από την άλλη, ο
ίδιος ο άνθρωπος σφραγίζει την ιστορική πορεία του με πολέμους και αγριότητες,
θεοποιεί τα υλικά αγαθά και συντηρεί την</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">αδικία και τις
ανισότητες. Ελάχιστα, τέλος, σέβεται τις πολλαπλές εκφράσεις της ζωής, ενώ η φύση
και οι θάλασσες του πλανήτη είναι συχνά τα θύματα των συμφερόντων του. Η υπερφίαλη
αυτή στάση του ανθρώπου έχει αλλοιώσει έτσι ένα θαυμαστό περιβάλλον, που ωστόσο
υπήρξε και το λίκνο της δικής του υπάρξεως.</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Είναι λοιπόν
καιρός να κατανοήσει ο άνθρωπος ότι η ζωή αλλού ίσως υπάρχει, αλλά η προσδοκία
να την συναντήσει δεν θα πραγματωθεί εύκολα. Η ζωή όμως στη Γη ανθίζει ακόμα και
τον περιμένει. Αν όσο είναι ακόμα καιρός τείνει το χέρι του προς τη ζωή αυτή,
το φυτικό και ζωικό της θαύμα, τον Άλλο και τους άλλους, ίσως <b>αισθανθεί</b>
λίγο πιο άξιος έποικος της Γης.</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Έτσι είναι
σοφότερο να εξαντλήσουμε τις προσπάθειες για καλύτερη επικοινωνία, εδώ στη Γη.
Το περίεργο ωστόσο είναι ότι, όσο η επικοινωνία αυτή <u>πυκνώνει</u> με το
ηλεκτρονικό ταχυδρομείο, το διαδίκτυο και τα κινητά τηλέφωνα, τόσο η μοναξιά
μας, η ανθρώπινη, μεγαλώνει και η αποξένωση κυριαρχεί. Φαίνεται ότι αυτό που
απαιτείται είναι κάτι περισσότερο από την τεχνολογική έκρηξη της εποχής:
απαιτείται βαθύτερη παιδεία και ουσιαστικότερες αξίες του πολιτισμού. Οι
εφιάλτες, άλλωστε, από τα περιβαλλοντικά προβλήματα <b>πληθαίνουν</b>, και η Γη
δεν φαίνεται να αντέχει για καιρό ακόμα την αφροσύνη μας.</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Σημασία
επομένως δεν έχει να συναντηθούμε –αν ποτέ συναντηθούμε– στο πολύ μακρινό
μέλλον με κάποια όμοια ή ανόμοια με μας δημιουργήματα της εξελίξεως. Το
σπουδαίο θα ήταν να μπορούμε τότε να υπερηφανευθούμε, σε χιλιάδες ή εκατομμύρια
χρόνια, ότι το ανθρώπινο είδος έχει κατακτήσει <u>υψηλά</u> επίπεδα ισότητας
και αξιών, και ότι οι πόλεμοι έχουν εκλείψει και ότι η Γη, το λίκνο της
ανθρώπινης ζωής, έχει επουλώσει τις πληγές στις θάλασσες, τα δάση ή την
ατμόσφαιρά της, και είναι πάλι ένας πανέμορφος πλανήτης. Διάσπαρτα άλλωστε, εδώ
ή εκεί, θα βρίσκονται πάντοτε τα επιτεύγματα των σπουδαίων πολιτισμών, που αιώνες
τώρα συνοδεύουν τη διαδρομή του ανθρώπου.</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Η «εξωγήινη
μοναξιά», λοιπόν, δεν φαίνεται ότι θα εγκαταλείψει εύκολα τον άνθρωπο. Η γήινή
του ωστόσο μοναξιά, που είναι επικίνδυνη και πιο <b>ανάλγητη</b>, είναι μεγάλη
ανάγκη να απαλυνθεί. Τότε θα αναδειχθεί η μοναδικότητα του κάθε ανθρώπου, και η
αναζήτηση της εξωγήινης ζωής θα αποκτήσει άλλο περιεχόμενο και νόημα.</span></span></div>
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</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<br /></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Γιώργος
Γραμματικάκης, Ένας Αστρολάβος του Ουρανού και της Ζωής.</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Πανεπιστημιακές
Εκδόσεις Κρήτης, Ηράκλειο 2013. 2η</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">έκδοση
(Διασκευή).</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
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<br /></div>
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</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 1cm; text-align: justify; text-indent: -1cm;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">A1.<span> </span>Να γράψετε στο τετράδιό σας την περίληψη του
κειμένου που σας δόθηκε (100-120 λέξεις).</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: right;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Μονάδες 25</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<br /></div>
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</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 1cm; text-align: justify; text-indent: -1cm;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Β1.<span> </span>Να αναπτύξετε σε μία παράγραφο 100 έως 120
λέξεων το περιεχόμενο του αποσπάσματος που ακολουθεί: «…όσο η επικοινωνία […]
πυκνώνει με το ηλεκτρονικό ταχυδρομείο, το διαδίκτυο και τα κινητά τηλέφωνα,
τόσο η μοναξιά μας, η ανθρώπινη, μεγαλώνει και η αποξένωση κυριαρχεί».</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: right;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Μονάδες 10</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
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</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<br /></div>
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</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 49.65pt; text-align: justify; text-indent: -49.65pt;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Β2.<span> </span>α)<span> </span>Να
βρείτε τα δομικά στοιχεία της τρίτης παραγράφου του κειμένου: «Αποκαλύπτεται
όμως…υπάρξεως».</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: right;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Μονάδες 3</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 49.65pt; text-align: justify; text-indent: -49.65pt;">
<span style="font-size: small;"><span lang="EN-US" style="font-family: "Verdana","sans-serif";"><span> </span></span><span style="font-family: "Verdana","sans-serif";">β)<span> </span> Να βρείτε μέσα στο κείμενο τέσσερα
παραδείγματα μεταφορικής χρήσης του λόγου.</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: right;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Μονάδες 4</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<br /></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 49.65pt; text-align: justify; text-indent: -49.65pt;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Β3.<span> </span>α)<span> </span>Να
γράψετε ένα συνώνυμο για καθεμιά από τις παρακάτω λέξεις του κειμένου: </span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 49.65pt; text-align: justify; text-indent: -49.65pt;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";"><span> </span>ταυτόχρονα, γέννησε, αισθανθεί,
πληθαίνουν, ανάλγητη</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: right;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Μονάδες 5</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 49.65pt; text-align: justify; text-indent: -49.65pt;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";"><span> </span>β) Να γράψετε ένα αντώνυμο για καθεμιά από
τις παρακάτω λέξεις του κειμένου:</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";"><span> </span><span> </span>ανούσια,
εμφανίζεται, ανέφικτη, πυκνώνει, υψηλά</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: right;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Μονάδες 5</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<br /></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 49.65pt; text-align: justify; text-indent: -49.65pt;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Β4.<span> </span>α)<span> </span>Να
αιτιολογήσετε τη χρήση του ερωτηματικού («Είναι άραγε περιέργεια, κατακτητική
διάθεση ή απλώς ένα διανοητικό παιχνίδι;») (μονάδες 3), καθώς και της διπλής
παύλας («−όσο και αν αντιτίθεται στις ενδόμυχες επιθυμίες μας−») που υπάρχουν
στην πρώτη παράγραφο του κειμένου (μονάδες 2).</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: right;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Μονάδες 5</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<br /></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 49.65pt; text-align: justify; text-indent: -49.65pt;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";"><span> </span>β)<span> </span>Να
μετατρέψετε την ενεργητική σύνταξη σε παθητική στο απόσπασμα που ακολουθεί:
«Από την άλλη, ο ίδιος ο άνθρωπος σφραγίζει την ιστορική πορεία του με πολέμους
και αγριότητες, θεοποιεί τα υλικά αγαθά και συντηρεί την αδικία και τις
ανισότητες».</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: right;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Μονάδες 3</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<br /></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 1cm; text-align: justify; text-indent: -1cm;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Γ1.<span> </span>Σε άρθρο που πρόκειται να αναρτηθεί στην
επίσημη ιστοσελίδα του σχολείου σας να εκθέσετε τις απόψεις σας σχετικά
με:</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 49.65pt; text-align: justify; text-indent: -49.65pt;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";"><span> </span>α)<span> </span>τις
επιπτώσεις που έχει προκαλέσει η έλλειψη σεβασμού του ανθρώπου προς το φυσικό
περιβάλλον και</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin: 0cm 0cm 0.0001pt 49.65pt; text-align: justify; text-indent: -49.65pt;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";"><span> </span>β)<span> </span>τους
τρόπους με τους οποίους μπορεί ο άνθρωπος να αποκαταστήσει τη σχέση του με αυτό
(500-600 λέξεις).</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div align="right" class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: right;">
<span style="font-size: small;"><span style="font-family: "Verdana","sans-serif";">Μονάδες 40</span><span style="font-family: "Times New Roman","serif";"></span></span></div>
<span style="font-size: small;">
</span><div class="MsoNormal" style="line-height: normal; margin-bottom: 0.0001pt; text-align: justify;">
<br /></div>
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ΘΕΜΑΤΙΚΟ ΧΑΛΑΝΔΡΙhttp://www.blogger.com/profile/15684910042266632802noreply@blogger.com0