BU PAZAR SEÇİM OLSA NE OLUR?

<p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Hepimizin en &ccedil;ok merak ettiği soru. <strong>&#39;&#39;Bu pazar se&ccedil;im olsa hangi parti iktidar olur?&#39;&#39;</strong> </span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Son yıllarda yaptığı isabetli se&ccedil;im tahminleriyle diğer araştırma şirketlerini geride bırakan Andy-Ar&#39;ın kurucusu <strong>Faruk Acar,</strong> Ekim ayı başında yaptıkları son anket verilerini a&ccedil;ıkladı.</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">İnternethaber&#39;den <strong>Nesrin Yılmaz</strong>&#39;ın haberine g&ouml;re; işte Andy-Ar&#39;ın 31 ilde 2037 denekle yaptığı <strong>&#39;&#39;Bu pazar se&ccedil;im olsa ne olur&#39;&#39;</strong> araştırması sonu&ccedil;ları ve Acar&#39;ın a&ccedil;ıklamaları;</span></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">Y&Uuml;ZDE 98 G&Uuml;VEN ARALIĞINDA BİR &Ccedil;ALIŞMA</span></strong></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">T&uuml;rkiye&#39;de Eyl&uuml;l ayının sonu itibariyle T&uuml;rkiye&#39;nin g&uuml;ndemine paralel bir &ccedil;alışma yapıldı. T&uuml;rkiye&#39;nin siyasi g&uuml;ndem Eyl&uuml;l ayı &ccedil;alışması. Toplam 2037 denek ile, telefonla g&ouml;r&uuml;şmeyle yapılmış olan ve toplam 31 ilde, y&uuml;zde 98 g&uuml;ven aralığında yapılmış olan bir &ccedil;alışma, hata payımız y&uuml;zde 2 civarında.</span></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">BU PAZAR SE&Ccedil;İM OLSA NE OLUR?</span></strong></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Tabii bu &ccedil;alışmanın i&ccedil;erisinde biz T&uuml;rkiye&#39;nin i&ccedil;inde bulunduğu şartları vatandaşa soruyoruz, y&ouml;nlendirmeli olan sorular ve a&ccedil;ık u&ccedil;lu sorular olmak &uuml;zere değerlendirmeler alıyoruz. Hen&uuml;z değişim g&ouml;stermiş olan bir iktidar partisi, se&ccedil;imlerin akabinde acaba yeni Genel Başkan&#39;ın liderlik pozisyonu partili taban tarafından kabul g&ouml;rm&uuml;ş m&uuml;? Bunun dışında IŞİD meselesi &ouml;zellikle son birka&ccedil; aydır belkide T&uuml;rkiye&#39;nin g&uuml;ndemini oluşturan bir noktaya ilerledi, onunla ilgili de bir değerlendirme aldık.</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Ama aslında en dikkat &ccedil;ekici olan, bizim m&uuml;şterilerimizin de araştırmanın başlangıcında g&ouml;rmediği ama en dikkat &ccedil;ekici olduğunu d&uuml;ş&uuml;nd&uuml;ğ&uuml; ve son sayfayı a&ccedil;arak g&ouml;rebildiği ve T&uuml;rk halkının da yakından takip ettiği <strong>&#39;&#39;Bu pazar se&ccedil;im olsa ne olur&#39;&#39;</strong> şeklinde bir sonu&ccedil;la başlayalım;</span></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">HANGİ SONUCA G&Ouml;RE BAŞARI</span></strong></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Şu an itibariyle AK Parti&#39;nin başarılı olup olmaması, cumhurbaşkanlığı se&ccedil;iminde elde edilen y&uuml;zde 52&#39;yle mi, bir &ouml;nceki yerel se&ccedil;imlerde alınan y&uuml;zde 43 k&uuml;su oyla mı, yoksa son 2011 se&ccedil;imlerinde alınan y&uuml;zde 52&#39;lik bir oy oranı ile mi test edilecek. Tabi bu herkese g&ouml;re değişkenlik g&ouml;sterebilir fakat en doğrusu y&uuml;zde 50 civaraında olan ve bu bantlarda gezinen bir AK Parti oranından s&ouml;z edebilirdik. Cumhurbaşkanlığı se&ccedil;imleri ve yerel se&ccedil;imler biraz daha adayların &ouml;n plana &ccedil;ıkmasıyla beraber partilerin oy oranlarını &ouml;nemli &ouml;l&ccedil;&uuml;de etkileyecek fakt&ouml;rlerdir.</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Ama 2011 se&ccedil;imlerinde AK Parti&#39;nin oy oranını y&uuml;zde 50 olarak kabul edersek, kararsızlar dağıtıldıktan sonra bug&uuml;n itibariyle;</span></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">AK PARTİ - % 46,4</span></strong></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">CHP - % 24,8</span></strong></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">MHP - % 14,3</span></strong></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">HDP -&nbsp; % 8,8</span></strong></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;"><span class="storyimage globalleft inlineimage" data-mce-style="font-size: medium;" style="font-size: medium;"><span class="image" data-attrib="DHA" data-caption="Cumhurbaşkanlığı seçim sonuçlarını nokta atışla tahmin eden Andy- Ar Araştırma şirketi yaptığı ankette &quot;Bu pazar seçim olsa hangi parti iktidar olur?&quot; sorusunu yanıtladı."><img alt="" data-mce-="" 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IK9aAtTf2zjnnP8AMO710y6Poaslgx4tOnISzAdv8mI5VmzxxR4pc+g6lz+z+zNRrsvBiHDEbzyS2hjj3nv/AKqeeZfzYitJZLPy9Cty6HibyT+6JHH+7A+3+2uczuG1LWLhrzU7h5ZW/blNTQktxUfsrU/ZwVZaQFUSTbsN/cHDNYYwDRRv175qsuWeU/vLI6Qjy/489np8Wi0EeDRwufKWaW+SXz+n/NSqDTVUclQtTu2DFtDQAsBXtgwjGkjegG34HK+MjYDh8llnyTNk/apC0TbkSabntXKMMUZIPgaFjiqgrVmNPEk+3c+2JzlBQU37mlaeHX3OIJJq2IlImrKGZVHIKakHr0p7Yw9Nt/1ZbENuT7Ad/mT3xrGrfhUnLg2279WVXKOwrSh7V+XfN13PTcf5/fhRe66u/tTL+eN965ZPbx64sgXE1PHG/V/XanAsTTlTpSv9uOVWY0UFiegG5yr7UIdNgMUDq9y4oSKEAj6ffG6s3TGUq3HPzUdRvItIi9OAB7iTY/5IpTIlPJJO5MpqWJ2Phis0kk5ZmJZm69yCN+tevf4sQC+rIEj5sWPBVjoSWPRQF7/LlkAbNtE5k3vsolWG32d+Ow70qKZ1LyJ+XUUnpazrylWJ5WunuAPhAVkeT3/yMW8mfl+tkYtW1xA90PjgtWPIRk/tP/xZnRFZlOzca9803amulLHPBpZ8MiCJTH+5i6XW9oCziwm/50v0RTBFCKFGwHYbDpTYZbMANzTKVlKBiwp/NX8csgkjw71/pnCEESIlzBN/B1ynUkBl5/6v8cyyEsOJoVIPMbFT9Pjm9Lm3xHkg6b7fLiP14k7hCKgAj4VFfhX/ACqkbn/iOWQJjISgSJRNgjYg9EHzTq1v1lcQy0DkfAw6NsK/Tg3IvJxclYyOTVKUI2K0puPi3C/8a4caXfG8hpKQJkJDL0NB+1noXs527LVj8pqz++iLjM7eJHz/AKf+6cXNi4fVHl3Jhl5WXnUNDs2bNirs2bNirRFQR45x78s7hPJfmnXfy1vj6atcNf6M7bCWKRR8C1+0/pqn+zjkzsWcU/Ny98u6prUOlWlpqFx5q0qNbhL/AEqL1jbA/FElwq1d05FZGX4OHNeL/Hjz2V7Pmzz/AKX+fGvaejw67YWmpi2UCa5t5vqkrE+MNwFZmH7XpwZLfLv58+U9cv4NNube5064upFihaQLJFybZQzoeS8n+Bf3eQ4CGVvU85J+bXlBNPtZPzB8sj6jrOnAteeiKLcQvSOQyKKD4I+XL+dc63kd8+qj+SfMCyfYNhccu23pnBEmwpYz+Rhj/wCVeWXp9fXn5/63LOkZyz8gbu3m8iC2ikDTW11L60dRyXnRkJHg2dTxlzUPJPzH/wDJneQP+Mx/4mMf+a//ACnn5Z/9tKT/AJPWWN/NsDTvNPkPzDIDHbW2oCC8um/uoo2kiNZD9lPgMzf7DA/nPUtP80fmh5DsNFuYtSXT5Jb64e0kWVI15xyVeSMldvqteHL/AJOfFYNwPcxexZh1zYhd3cFhaz3106xwW6NLLI5CqFUcjUnplXVk+aPIIkH5s6eWrwN1qXp+GzTcqf7LPT2ebfJdpPb/AJj+Vrq4jMR1KO81CONgQVjuWnkjBr/k56Syc/4fcgMHtNX/AET+Zd/5cmr9X1y0j1GzY9Bcwgw3CD/XhSJv+eeTjOMfnlPeaBqflXzhYsFlsJ5IaU+1ypJxZv5SsbrnXdOvodS0+11C3dXiuoklRo2DL8QB2ZdjTpgPIH4JHck6Rmx86SSKhWHVrJWdx0M9s3H7/RZMkWJSW0Ms0Nw61lg5ek/ccwAw/wBlTFcBNq8o/Kb/AJTX8x/+2mP+Tt1nW85J+U3/ACmv5j/9tMf8nbrOt5YxdmzZsVdmzZsVdmzZsVdmzZsVdmzZsVdmzZsVf//T7/mzZsVdmzVGbFWsD3t7a6fay3l5IIoIQWd2OwGKTTRW8LzTOI4owWd2NAAOpOcH8z+aNU81ag1lHKPqEMz/AFdI9l4g8Udj+0xX4v8AJ55TnzDGBtcjtEd5dj2Z2Zk1uUjiEMeOjkmeg7o/0lvm7zJdec9SWK3T0rK2JWBD1IPV3/yj/L+zjbLT4bRB8IaT9p+pP6sdZWENkhCbu322PU4JJ6ZjQxb+Nm3nLp3eT1sskMeKGl0w4MOMUB1l3yl5yaApsP8AOtcad/8AP2zN/mMafwyrJkocNct/Id3uDUA4nERyahrQjp88e/T6e+VXapO+9CdvwGYdk7tg2czBKDoCNxuR1Vf44DLcvjIFPY03oCRv/n/rYpO3IV36kH5UxByKkkePToAT2+/LYRbYihdLS2x3PLatf8zjB8u/T/MZtqdfnX+GV1OW0pK6gqK9em3v1zDpuev6+/45gO1NssAUp8hXAkWd3GteVD9+OWJ5CFSu/Wnh/DLijeQ8R18fD54jf362CelbUMp2ZjvkZTpPkOdWe4BUv7+LTYjFCQ056t4HIk7vI5kclmYg77dTXcnw/lxaV3lYu7VJO5+eVZ2d1qF1HbWcRmuJjRIh1G2xP8q/a+LKjK/IBpyGuuw3JP3qMcMty6RQqZJGYDiByqakUXbOteTvJEOjomp6oiy6ow+BeqQr2C/5fvgzyt5LtPLqJdTkXGpsgDyHdI+h4xL4/wCXknJr1zWazXHfFiNd8v0B0Gu7Q8S8WEkR5GX873f0XfPNmzH7I38ajNQeY97rERbs4ITl8Ndx4Gv2fpwS9DRT3PhX9XTAcLFXBBp096/7eCxVvioARtU7bZpdfDhy3VWLNAD1FsgdlNx/NEGp9kmrffQMRjOMZC8KBSQDSoJPU1Ucdx/q/wDAfbxQ+lyC0LMNzQn78SlIYqpqwLCqg9Qdj8P05jxJ25hk5GJYURkCrsKkFu/2a9j0+LjgYSSQ3KuD8a0YkGh2+0OXU1xcFqFhUEKKcgB+yOn3VwPOFEqkMSvZutf865maUmIyThtKHDKJHONczbE/eyy2uEuoVmj+yw6HrXuMXyN6Ncyx3Qt60ik5EqR0YDscklc9M7H7QGu0kc1VMemf9cc+H+i4WSHDKunR2bNmzZMHZs2bFXHYE5yL8oD+ltf86+a6l0vNQNvauevpIzMAf+efo/tZ1t15oyVK8gRyHUV7jOI6Npv5l/lTbvpun6XB5h0BZWn521UuPjpzYrUty4qvw8X/ANbE8ir12+0TRtT4/pLT7a74/Z9eJJKV8OanErPy15d06dbqw0mztbhQQs0NvGjgHrRlUNnPYvz20KM8NV0fUrCTurw8t+46jBB/PjyNx+H64zV+yLdq08cr9Xmy2enZzv8AObXk0nybPpkRDX+tsLC1g6swk/vmp1osf7X+/HTCiX83tX11fqXkjyzeXN3NWOO7uk4QRsworvTrwPxHky4d6B+X1/d6tbebfP14NS122CmztYQEtLSg6Kg/vJOZ58/5/wCbDGJuyglh6pdflBr+h311HTy7qVhBp2qOi/3VzHVzJIR1bnI3xf77ztkM0NzDHcW8iywyqHikQgqyncFT3GIaxo2m6/p0+latbrc2dwvGSNvwZT1V1/ZYZzibyx56/L6EnyLcDWdCjb1Dod7vPGv7SW0wp8J/lyUhagvSNR03T9XspdO1S2ju7OcAS28yh0ahDKSD3VhyVv2Wws0Hyb5Y8rvLLoOmQ2csw4yyoCXK1rx5uWYJX9j7OQaP88dPtD6PmHQdR0y4UUdDFzHKvRfsdvixST8+PKZBWxs7+8l/3WkcBHLen7R/z5ZDcbG/gnZ6jnKPzU8wza3d2v5Y+XX9TUdVdRqciE0gt/tMrlenJfif/Jx9v5h/M/zvL9X0bTB5W0tqh9TvV5z0/wCKozx+P+X4Ml3lH8v9C8nme5s/UutTu97zUrluc0hO7UP7Cs3xcVyUR1KCWBalarYfnR5RsUYuttpvoqx6kRxSrX8M7JnJfzCtNb0Tz/o3nqy0mbV7C1t3t5orXeRXPNRUCu3x/ax//K4tW/6kjVf+BP8AzRjIE1XRQt/PdVfTPLauAVbV4gQdwQUcbjH/AJbanc+XfMWsfltrDKHt5ZLzSH2VXgmb1GSMHsOXJV/18jvmjWfMX5mz6Jo9l5XvtOa0v47uW5uhxjCKCrcmKrT7XLJv+ZvlG/1BbTzb5YQ/4n0Zg9uF/wB3RA/HEy/t/wCThA2orb0HNnJo/wA4dcWNBP5I1T1gAJeKHjzA+LjVOlcd/wAri1b/AKkjVf8AgT/zRkeEpt35Tf8AKa/mP/20x/ydus63nLPyh0zWFv8AzX5l1Swl06HXrxbizt7jaTjymkbkvXb1lWv7WdTybF2bNmxV2bNmxV2bNmxV2bNmxV2bNmxV2bNmxV//1O/5s2bFWsosqgsxAAFSTsABl5CfzK1lbDRhYpLwmvWo4FKmFftjrVebcV/4PIzmIxMj0DdpdPLUZ8eCHPJID3d5Yp+YPnNNWYaNpVWtlerSgkCZxVf+RKE/89H/ANXCHT7FbOEct5n+KQnrU74G0q15E3860eQURD+ytNsNPl0zExRlOXjZP80eXe9pHHj0uEaTT2IxNzPWc+tu6Y3vmJBNMaTTp17eOObIOXQc2IDVf8/fbGkjHEn+P8cYaUNenfMDJLeu/mzDiF+k4jIw+yTQL3xWp3NdzsB74FlPY1G9PevUZCA3bIDfdTdhUH/J+13+L/b44kSPp/lHbr45bkmrAdjQ9tx4eHxLjTX9ff3pvl4FNh7nEj226075W3XMfDvlgd+3v1ySN7bFAd/ox6RvI3FR2qf7cb036Dx/HA9xqKxR+nb0qaF367+A6ZCUuEW2RjI7Ae++Spe6jHaxm2gPKTo7jxwhdmclmNSepOW7F2LHqfHBmkaRea1erY2S1c/E7n7KL/M2YxJkWUjDHCRJAiBZkfvtD6fpl/q10LPToTNORy4dAB05Ox+FVzsHljyvZeWrWiUlvpABNcEbilRwj8FGC9C0Gw8u2YtrVeUrCtxcH7bt7+38q4ZHrmv1mqIj4eM89pHq8nr+0DqJHHjuOP8A2U/f/RazZs2ap17ssd/8+xzDqCOvbtm2O3h1b2HYUwGyaAv3KujqXqKeJwchG471J/twLFBcMKiJuNKlj8IIPu22KSSPCtZ5YYj4M2/4VXMbV9m6vMeKGMiIFb+kf7JlCQ5fduuPWpAFagjr9/hiYUjiNxUmq9KH7QK17Vwvutc02KokuPVYbAIvj9oNhZP5nhUkW0BZugZzlUOyZD+8zQj0Ij6z9jfDDmn9OOXvOwZErElVVa1NAa1rTx2xGSJzIilCKMQR2G3c5FJfMepyfZZY160Vf64Y6FrcnrNZajJ6kVyRxY9Ufs2w2zPwdnaap4ozmJZImInKuDi/huPn/WZz0eohA5CI7b8INmk7oySCSE0dDUe5yTWlwl1AkyHqPiHcHuDhA8aoTG9BIlD8PfwNenHBujScXlhC/A1HVx3NN+WZHs1qsmk7QnoM1xGUmJB24csN4/6Zws44ocY6Jzl5WXXO/cR2bNXNXFXZs1c1cVUpLeCX+9iR/wDWUH9eIrpemoeSWUCnxESA/qwXXNiq1UVBxRQo8FFB+GOzZsVdmzVzYqpyQxS/3sav/rKD+vAa2lpBfwLDbxxj0ZiAiKv7cXgMMK4Fc/7kIP8AjDN/xKHFUTmy65WKsT82+f8AR/Kc8GnSRzX+sXgrZ6ZaJzlk3pv+yg/1sJT5r/NCGt/ceTojp4AJtobxXu9yPspT43/4rwn8nxpq/wCcPm/Ur5fUudKWO1sSekaGqEj3Kp/xPOt5Ayo1skBIPKXnbQ/OdtLNpMjrPbEJeWc6mOaFyPsuh8G5LyGSLOQwRR6L+fbW+nqI4ta00z3yKKAyDm3P/ZNArZ14ZIcrQ3mzZsKuzZs1cVdmzZsVdmzZsVdmzZsVdmzZsVdmzZsVdmzZsVf/1e/5s2auKoTUb2HTrKe/nNI4ELt13p0GwPU5wa8u7jXtVe5vmMpc+o/LcAD7EXZeIU5M/wAzNeSWVNEh3WAiW4YNQFj9lCvTb7W+RGwt/QjMj0MkhqfYfLMTKfEyCHMDm9V2Npfy+nOqmKyZRUO+MPL+sigFCinQClOlPD6MxP3n+ObGk13yc5cIc1onauMJr7ZZPbqMqua7Nks1ZoMwGjlEAmvce/cZfencZthmOyUpmCjfpTft/XArb1IHXr26++xpik7Enc7dsRY8id9vHpSuXQFBvgKC01c07bEjsNxjQCR8vx+WXVS+/Qnf3H+Zxp+8/rplifN1Cfn1xwoBvsB1yjQCp6DqfDCu9vPWPCMkRDqfHIzmIiy3YMXGTvwxHOR6N3d40rMkbcYwNz/NTARqdyfkDmY1+Q7YZ6Boz67qC2KzLBUF3kfsB9qg7nMSUjLeR/UGzPlxxia9OPGDK++ucpKnl7y3e+Ybn0oAUt03nuCNlA6/7LOu6Voml6HCIdPiVHIAkmO8j0/nY/qyrMaRoVlFp9q44QijOFozsdy7Uym122FeMTse3QZi6jVYgOCMwOdnv9zx+u1eo1k6xxlHENgOXF/SkmB32ruMctvO9SkbGnXbCeXX5CAIoFWncnr/AK2A5tU1CenqTsadB4VPvmtnPTA2TKZ8tvvcWOjzHmBH3smeFIRW5mjhp1qan6QtaYEm1PRbfrO03hxAAr8/i/4jkYkLPu7M59zWmIMFY/ZBNd9tyTj+YxivDwxHnK5FvhoI/wAcyfdsyCfzTaIGFrZAnpykHI08fiqN/wDVwum806ozMbcrbcuvpih26frwt9M8q7AHbapp/nuMZ6W3Wpr8XfrSg996YnU5Cfq4f6oET/sXMx6TTR/gv+sbV5tY1ac/vb2ZuoA5tTfr0wIzSPQOxbuATj2jRPtOErupJoOp3+7C641fS7day3Scj2WrH7hmRi0eu1RHhYM2YnkeGUv9kWUtRo8P1Tx469wKM6fPLA6ivTw+Rwhm82abGSIkkkFOoHHf6cDS+couLLBaMCaAF28O5C5s8Psn21kIrSmF9ZERpxMnb3Z0Af33FXSItk5pTt2I7nw/tywDy60NakgUpkE1DzpqNvcqiJGqEAyIq9u4qT9rJtpd5FqllFf29VjkJrWlQR1Wnjlfavs9rezMMM+fhlGR4SYG+CR5cTLRdr6fWSlDFYNWOIfUGa6Bqj30ItJ2L3UQJic9WRe3xdhh3byiCZZk4heQEhIIADUH47f8DkBs7ie1mS4T+9i6U7798l9rex38LSRgRsah0r9lqbCvhX4s0GpjKZxa3Cf3+nkJSr+OEPVGfvj/ABNGrwCEjKI9E/8AYyZjXCLzR5v0HydYrfa7c+ikhKQRKpeSRgK8Y0H/AFzj9e8xWnl7y3deY70EwWsPrGNdmZmoI41r+1I7Kmcy8r6Je+ZtQ/5WB5vEdxcXqB9H0xgXjsoS37tuLfBzdF/l/wCLM9AyanHjwjMdxIAxHWV7uoAs0jD+bnmbV1MnlPyZd3NrWiXt43pIfEcFHH/kviX+OPzkX94/lKxMYoSizfHQ9h+/PxfzfDk4Jr1NffKzXntTJe0I0y4B1LDE/OHXtK/5S3yde2kQ63VoTKm1A9A4Ve/+/smmkfmB5a13Qr3X9MuTJbacjPeRupSWIqpfi6N/NT4WHwZgSpqDT5ZynydGH8tfmnqEdBBcXFwsQQUWieu3w0ovSRczNHqzn4gYiPCByYyjTIU/OfXJlSW28iajLBKvqQSB2+NKVD7QHL/5XJ5hC8z5C1LjQNXm3Q9D/cYfeVyf8MaN/wAwUH/EBhrU5intSQJHhjY97Lg82G/8ri8x8in+ANS5BghHNvtN9kf7z98ofnJ5ibjx8g6keZIWjtuR1p/o/auTPLqfHB/Ks/8AUx818PzSXyj+akPmPWV0DU9GutE1GWNprZLk8lkVftUYrE3L/YZ0FmVFLMQqqKsx2AA7k5xm9r/yufy5UCn1SWhHXo3XBPmPzDf/AJh6ze+S9BlNnoNg3DXtTX7c29DbW5oQvL9pv822MM8TgGafpBjZ8mBG9BOte/ObyjpVybDTjNrl+Dx9DTk9RAx6AzbJ/wAi/Uwif8wvzM1GVb3SPJQt4QjJF9flIYhuLksCbb7Sx/u/+N8kmh+XNE8t2/1XRbRLZaUeQCsr/wDGSQ/E3/EcNMwMnam/7uG3fJmMfewpfzH/ADO0889X8krcxD7X6PlJbcbEcTc/Z/b/AONcONC/Ojypql1Hp2prPoWoOwQQ36cIy52oJh8K/wDPX0sPRsajanTIB+bsdtdaFZWEkCS32pX0FpbTsAZY+TDkUY/HRq/s5LT9oTyZI45Yx6jVhBhQJYp5g8zatc+dpPNnkHRb3gshsr91RpLe+aI8G5CKq/5P2n/nyXTfmp5ibTi1v5M1M37Bw8bo/oVVVLEuirKeP7S8fsL8LIjYp+VFqbHyrJZE1Ntf3cJPj6chT+GTipyGo1tZZQOO+AkXZF0kR25vIPy/8zXOl+cG1jz9pl6ur6+4trXVbhCkMKsTxhijcCiNTj8DfAnw8MmFz+c941zcpo3lDUNSs7eZ7Y3anipkjYowASOYdR/PhT+bPTyvX/q7R/8AEThl+Wm2kap/21r3/k62ZB1pGljn4BZlw1eyOH1U4fnJ5hL+mPIOpc9xx5tXbr/x75h+cnmIhSPIOpHkCy/G24WvI/7z9qZMZZVhjaSQkKtK/wCyYKPxbH7+OY38qz/1MfNPApeRvPtl52ivEjs59O1DTWSO/srkDkjPy48W25j4G+0iYVeavzOm0LW5ND0fy/da9cWyI969qSFhMv8AdoeMcvxMP9XI/wCWJDo/51azaMAsWvWCXUKrsA0YXkdz/NDPi3kW+j1bV/OerICDNqohWp34RIUHTb7SZnZdSIafx4i7Aoe9iBZpo/nL5gABPkLUqGoB5t26/wDHvl/8rk8w7n/AOpbKHPxt9k/tf3HvkyL0ZV7vUCntl1OYP8qz/wBTHzZeGO9JfKv5qx67rsXlvV9Eu9C1O6jaWyjuPiWVFQyN8RWJk+FW4fBxb+fOiZxe8/8AJ4+Vf+2fP/xG7ztGbPDkOTFDJVcQumBFGnZs2bLEOzZs2KuzZs2KuzZs2Kv/1u/4x3VFZ2NFUEk+wx2RzzzfnT/Ld06MUlnAgjZfFzTf6MEjwxMj0FtmHEcuWGIc5yER8TTyO+lXUdYu7iMH05p3kHLcha98GVoOPbAOnxgBnHQfCMGEgfTmJg2iZyP1G3t8lDhxx5YwIj4Obc9NuuNJFMuvc18cYSMpzZBubG45EsQFpNeubNmJ/wAzmASTzZtDxpQnrjJT06V9/DH9B8XbrTAs7Bn6ggD9ficMRZZRFlTdtz3p2xhJJ3+Inb7+2W9K+J8cadxTLw5AGzW/3f51zU3pmxe1TnMDXZPiPyyQsmgg0AT3JZqLmJAh+Gp+KvenbCotyNenhiHma+M176UZ/uzyqOxzWs3rQJIftHZvnlGfGRU+h2Zwz3+6qgN/f3q2K288ltOk8LlHjIZWG247Yka+G/h1O3h9GCUsL2T7ED8T0Y7Kd+m+RxabNmvwsUsg5EgXH4nkwz6rTYI3qM2LECCKyTjAkeUZG5PTLG7j1fTob9WX1mX99GvZh1+nLI/rkR0CHVdHuTOvp+k4pJbsSeX3dKYcT393KWeqx+yAAg/P+XKz7La/LksQhjid7nL9EeN47V9t9m4Mko4s3jR/h8OJ2/oXLhTbiaVptjar4r94yPy3E8lWeZgSOLFTQEHoD2qcBlV+k9z0+ff/AD55nYfYiRF5tWAe6EP0kuvl7SxuseA0P5xZM97aRgF5lodgFNT9wwFLrloh+BWc169BT2wkNKdhibkdOvtm203sb2bD+9OXMevFLhH+w4XB1HtHrKPhiGMe7i/3SY3HmCahEcSgn7JY9v8AjbCi41rUZiw9TgrDjRQAePXEpmp3oR0+gVwFNIEVpOw6AnsB9n58c6DR9idm4KOHS4xLvIs/Muul2jrMw/eZ5yB3q+EfIIS/u53ZU9Z269Sdv2afThdj2JJ5Hdm3J+fbGZv8eOOOIjEAe4U48pGXMk+/d3yx8Sh3Abp1PyG+MzOeFpPNWtBxT5sf6HJSIESSir276A+KW3kwnupJB0JovyGwyV+RtdFrP+irl+ME7ViNaBXPjXIZl+42I6HNNrtLh1uDLp88eKGUEHvif4ZR84uz0+WeCcMmM0YVX6nvvDqQOuxp1I8QcFWVzJZzLIDVTtInYg9sJfyw5+brB7aW5SKXTyqyqd5WQj4XUV7fZ5Z0mHyXZI9Z7iWVKU4Cib+NVzyvN7PdoafVTxRECMcqjImhOHSVf0o/U9THtLT5cUZSv1x3iBdHqGB/nTeSXHkTRrO3k21LUoIWG9HiVZWHL/ZpE2TgQx2wFtCOMMAEMSjoEQcFH0KuQr879GWx8j2VxpyMqaZqcFzLIWJZVdZIeVT4yyQ5NUnjukS7hNYrhVnjPikgEi/8K2bLXxnHFpoS5xgYmuXEBF1grilw8r2vnShf3sOnWNxqFwGaG1jMsixqWcheyKPtNnL/APleenNcG3i0S6Z+XFVZ0VutBVT0zrAJBBGxHQ4ButG0a+5fXNOtZy5q7SQxlifduPLMXFPDEHxcZnZ2IlwpN9CwnT/zh0C6ufqd5p99ZzceW0YuNujnjBzeity/ZxPyHYXdp+S/mK5vominvzfXHxqVYrwWOpDb/bSTDHVvyx0aZor3yxI/lvVrepgu7EsqMSQaTIG5caj9jENO866tq3lLzV5R81oE8yaPYzmSUCi3MAWgnGwHLdeRX7afvP5822hOmImcFgmjKMjv8GEr6sp8r/8AKM6N/wAwUH/EBhrhV5X/AOUZ0b/mCg/4gMNc0k/qPvLYOTBtf/Nby35c1a50a/humubUhZGiVShqAw4kkdjhb/yvHyf/AL4vf+AT/mrJJqn5e+Udav5tU1OwM95cENLL6jCpA4jYewwIPyo8hV/45Z/5Gv8A1zLhLQiI44ZOKhxUevXqx9fewW+83pq/mb/Gui2k8VlpGmT87mdeA9RwY4+JJ4O3OT4VXJ7+WeijR/KVm8i/6XqI+u3Tncs0u61+S5BtV/0f8mJbGIkQjXpraNSahY0nPFd/2RTOw2UXoWNrDUH04IlqOmyDMntAjHgxYYWInz6BENySVfIn5n8/WHly+i0iGzudV1WVPVNnZryMaEgI0p/Z5/s/83rksyFeUFB/O/zU1NxpdqA1Oxhse/0Zi6HBDNlMZ3UYk7dUyNDZAw/mvAkwi1Xy7qliG6SeiXH0gUb/AIHAl7q9j5489+ULXR1muLKwna6vS8MkXBk+MCRZFXjTjnd98pURSSqgFjViBSp982uPRYMcxkgCCO83zYGROxeUflya6NqB8dVv/wDk+2S/Ih+XH/HFv/8Atq3/APyebJfml1X+MZf65+9sjyDzn82enlf/ALa0f6jhn+Wv/HI1X/trXv8AydbCz82enlf/ALa0f6jhn+Wv/HI1X/trXv8AydbMqX/GdD+v+koH1n3Mi16ZrbR7u5QVMIicgfyrNGX/AOE5YYKQyhh0YAj6cKPNyl/KmuKpoxsbgg+BCE/wwTod2t/ounXqfZuLaKQUrT4kB75hEfuxLulTIc2B+cbtPL/5keWNfc8EuLe4s5ZPAcWXf/pIww/KC1kh8mR3c/8AfahczXLkihIJ4q1f2q/FhZ+eNibjyva3iL8dpdqSwBJ4yK0dK9viKZOvLVl+jvLmk2AXj6FpCOPWhZfUO/zfMzLlvQ4odTIj/Sf2sQPUSuvJ1Gs6ZZ1o7JPNSo3UAJ08K4ZZFnmaf8x47cNtZaT6hB7+vKen3ZKcwpxrhHfEH5+pkwG8/wDJ4+Vf+2fP/wARu87RnF7z/wAnj5V/7Z8//EbvO0Z0Gk/xbF/VaZcy7NmzZkIdmzZsVdmzZsVdmzZsVf/X79nOvzS1AiKx0pDtITcS7ChCbLv9r7Rzoucj/My49XX4YONBbwAA9zzav/GuUakkYpedB2nYmMT1+OxfAJS+IGx+aRWy8IEA6Hff3x/fKj2iQHagFRl1/wA/pyokRxxHcAfselO8ifMrWxp+/N4ewGVmvyz4pE/oZB2UF6Hv08cxIG++3YZeVJUpZQo4gcmJpx8a+GBXPwnx7nrt/mcUkZmkau1CRXxKk0P0bcv5uOIE9RXbsK7bZdAbN8I0Gs2bNk2x2C7hhpujXF49PVZCY6itNu+JWsP1idI+xI5ewwv89aiI4k06MgAj4hk47Ay+AHvcfPP1RgP6x9w5MFmlaaVpm+05rgmwuvRcIfsOfuPjgP275YBJCqKkmgA61y84xKBhViug6tAkYy4rrqzzy7biS5edlr6S0Ff5m8Pko/4bJKeop0I7Dc9sAaPaNY6bFFIaysvKVjXcnxwaxG+b/Q6b8tp4YechvIjkZS5/J817f7R/PdoZs0foFQxj/a8ewP8Annil/nNE9T496Yk7kGlKj/PbHk8QScDPXc+B/HM6IdPEWbK12O1T0H+e/wBGI/Pr137Dr/HLY1O23gMblwDkRFBax8O2IuQAfADtj2NP8/bA08lEIB69xlsA0ZDcq70NK9TRTShwuvZN1hKVGzk+wrsMGO1N2PTck/2YU3TGSUsOgAoOux32PzOZ2GO/ubBsKUCamp3J3JzZs2ZarlUuwVepwLqlwvJbSL7Ee7HpVu+DGlFpbvM3222jU/rwiZizFjuTuTmNnyV6Q3YIXLiPKOw/rd7srNmzEcpkPkrzI3lPzHa6yE9SFCYrmOpFYnoHb4f2k+2uetbO9tdQtIL6ylWa2uEWSGVN1ZWFQRninPUv5SWt1a+QtLF0xYyh5oqsWpFI5aNd/s0X9nNV2tiiYRzX6gRD+tE2fscrTTNmPTmyXzDoVl5l0S90LUAfq17GYmZaclPVJE5VXnG4WRP8pc5HofmG+8i3I8m+euNtbWw9LRdaoxinjDHjHK4qqlEYfyenx4P/AD50zz5rjeXPJ+saxE/pz29s4tn8JpP3UB3/AOLnTOK2H5V3eteWtP1IazNDqN/B9Yuku6zxM0pYo9H+JX9Ip8Wc3rPAOMRzkxEpekgfTKubmxu9nrdrqWnX0YlsryC4jPRopUYH5UOCaEfT0zgVx+S/m4So1pPZIEFA8UjxE0/aNanlnR/y88s+Z/LdvdReYdRF4kpUwQB2lEZH2jzf+b+XNRmw4IRM8eeM+VRrdsBPUUzbOSfmlHLp3mbSNVtGKPqNrc6beHs0TKRxp/qSSZ1vOSfm3OZ9f8vWEP7x4EuLqdF3ZIwAA7fypxD/APA5Ls/i/MxruPyRPkXovlf/AJRjRf8AmCg/4gMNsKfK3/KMaN/zBQf8QGG2Ysz6pHnuWQSDUPO3lTSbyXT9R1SK3u4TSWF+VVJFfDAw/MfyPX/jtQf8N/TIt5m/K7Wdb8x6hrljqttax3zI3ozQmRhwULuSrL92Ff8Ayp3zP/1fbL/pFH/NGZmPDojCJlmkJECxXX/SsSZdzWooLz8l7q+t/jii12e5VgDQxmc0bp0o2dd06cXOnWdyKESwROKdN0HTOSajaectFNp5D1PVINV03zBDJbQW0cIhELoOUbIQicW55MPyx1f695Zi0y5bhqWjs1ndwPs68DRCVPxZkdogZMGPNjPFEEi/f/YiGxILNMhPlF1X88PNCNs0ml2pjr+0Fisg1Mm2QrzR5R1m616082+U9QXTtbt4jbTGUco5Yt6VFG+IK3H7P8v2HTMXQZ4YsxMzQlExvoOu6ZCxs9ewJDq2mXF5Jp8F7BLeRDlJbJIrSKPFkB5DOQzaB+aOvr9V8w+Z0s7Ej94mnJxkenT40CdftN8WEmueVtO/LvUPLPmTRTMDDfpDqVxLIWaWOUgM0h+yFoWzbDWYJZI4oyMjI1sNvmw4TRLLPy4/44t//wBtW/8A+T7ZL8h35bOkmh30kRDI+qX7Iw6EGZiDkxGaTVf4xl2/jl97ZHkPc85/Nnp5X/7a0X6jhn+Wv/HI1X/trXv/ACdbCz82Onlf/trR/qOGf5a/8cjVP+2te/8AJ1sypf8AGbD+v+koH1n3Mj15Fk0HVo33U2N1UfKF2H6sjv5WakdT8j6WzkGS2VrRgBSghYolf+efDJJrX/HE1Xx+o3f/ACYkzmX5Daisuj6rpRb95bXC3CgnokycPhHhyhb/AILMeEOLS5SBvGcT8DYT/EGVfmfbm58nXUY7TWzkHuFmTbJiI/SCwAU9MLHQf5IC0/DC7XNP/SelXFlTkZACoFNyrBh1+WGNxMsfrXLGioHlLeAUFsqM7xxh/NJI/wA5PW3nnlq9/Sf5n+aLhamK1t4rSNu1Ebeu53rnQ847+TN21/rvma9c1a4cSE/6zsc7Flusjw5uAfwxiP8AYhEeXxYBef8Ak8fKv/bPn/4jd52nOLXn/k8fKv8A2z5/+I3edpzc6P8AxbHf81qlzLs2bNmSh2bNmxV2bNmxV2bNmxV//9Dvxzj35jKV8zFjsGgjofkTnYc5Z+bMMkV9pN6WBikEluUHUE0fl8tso1I/dH3h23YMq18I/wA+M4j5cQ+5jpIopB2Kjf6MYTtv8vpyoz+5jIFKAUByia9OlajMPNPhjEA/w7eez0YG5HmWv8zmzZRJqAO/U+GYJ3/azDgQa08d8TnfihoQD7+H0YoxCip2GAywY8/2fE9K18O+SiLNs4Rs+5Y5I+DwI/Cv/NTYzLYgkkdO3sPDKy8OQHZs2ORS7qg6sQMV80y05ltrS4vZOiVp8hT/AI2Ocw1e8a+v5Z2PKpNN6965OvNl6bCyh02BgpkWrk+54oP+C/4XOcsoWm+/ceByzrXcPtcEniJn/PN/5o5NA74f+U9PN7qQmYVithzavj+zhAM6P5Vs0tNIjlC0luPjkJ/4UfLNn2dj48okeUBxf538P/FOk9otb+W0E4xNTznwx5A/Wf8AS+lOyev/AAuNNK/qHWmWT4/j3ys3r5tI2sc0UnAj79B/mPY98WnkpSnbpsev0YFbYCu5B2J6/TlsBtfe2Y47W0SK+3amNJ/zH0Y4+/0Yi5p8/wCo3y6IZzNBTZgASTsB/nTC92qx36fSK4rPOrfCp2Hh3qMASzEHgo+ZzKxQLVH0+o8yp3Eo+z1XvQ7e++AnJPIHr9wruW/Vijk7069iAO/hiZrxK1+fyFWzNhGgyG+56qWL20PqNzbaJN3Y9M0UBkl9MDau7DwGBtTvwE+pWhHojZ5O7H54ZzoGugsnuDIAzlwQ5nmf5oQWo3IurgsgpGo4qP44EzZswJGzbnxiIxERyAp2bNmwJCvZ2rX15bWSVDXMqQgqORHNgtaDrxrXPZmm2UWnWFtYQALFbxJEoVQooop9kdM8zflFpo1HzzYs6uY7NZLgsm3FlFE5Gh+HfPUmaXtfJcseLpEGXxl/0i5mljsZd+zyf8/7qWPyjY2Sn04r7UoIriVqiMRqkktHbt8aI3+wyS2VzY3FujaXLHcWcaqkLwsrr6aqFj3Q/wAgXJNqmk6brVnJp+rW0d3aSijwyryX5j+Vv8pcgyfkv5XspJp9DvNR0iaUhq2lyQgp0HpsGDqP8vlnOa/RS1IhwZfDML6WJcVc/k5kJcN7Xac+p9+YPv44UD8uvM0ShLfzzfhB9kS29vJt8yAcx/LrzJKvC588agyH7SxW9vFUfMAnNT/I+v8A9WxfOX/EM/Ej3F3mLzTo/lWyN7rM4iBB9GAbzSsB9mOPqeq/F9hP2shGjaHq2p6H5s/MnzFCbW41HT54NJtGrWK1KEc9+nJPgX+f95J+3nQNP/KTyjZ6imrXi3Or3sYHCTU5jcAMN+QRgF/2LfBkzvrG31GznsLpedvcxtDKnirjic2+i0I0wJlM5JyFGRHCAP6Ia5SvpTB/K4k/w1o1Ean1KDt/kDDWkn++2+44Ux/k/wCXoo1ii1PWUjQBURdQkCqo6KoAoBjv+VR6D/1dta/7iMuYEuxsxlIjUgWTtwf8eZ+IO5NKSf77b7jmpL/I33YV/wDKo9B/6u2tf9xGXN/yqPQf+rtrX/cRlyP8i5v+Ur/Yf8eXxB3faxHziGH5heR+QK/6Q1CRTDD8wPLd/wCWNfH5leXUaSEAL5h06OimWHo0yj9pv5/+CyS6b+VflrTdWtNaM9/e3diS1t9eunnRGIpyCuMmzKGBVhyVhQqdwR75tdPpvD0w0+Q+IKIkT/FxG2BNmw8+0LzRonmW2+t6PdpOtKyRVpLGf5ZIz8S4bepTObajo2jQ/nXBbaNax2IsrJ7y+W3qqySyinxqDxUUmjPFPh+HOhvIkSNJIwWNAWdjsAoFSTnMdpwOm1IxY8kp2BKiPUOL+H+k3QPFGyFbkTsBU+2QX8z9Z8vf4X1HSL6+hF9Mim2tEYSTGVWBj+BOTKP8o4n5Rs9V/NG41PVNQ1G7sPK0Mxt9NtLJ/QacpWsjyger/KWX/K/yMm3l/wDKjyT5cufrtrYG6vOfqLc3rGd1Y915fB78uPLNpo+ys4MMuozUQRPggPjUpS/2XpYSyDkAwj8mVkHkeEBG2uZwdu/LOg0l/kb7jhV/yqDy2sk0kF/qtuJ5HmeOC+eNOcjFnIRAFG5y/wDlUeg/9XbWv+4jLk8/ZGXJlnkGo4RORlXDyvp9SBkAAFMN/NjmB5X5KR/uVi3Ip+ycM/y1D/onVOKkj9LXvQf8Wth/F+UHldbu1vLm61K9azlWeGK7vHmj5oaiqOMo/lB5aWWeW3vtVthcSvPJFb30kcfORizEIo8Tl8uz8h0cdL43qEuLj4fO64bRxjiulfWxINE1WqkD6jddj/viTOI/ks0uneZYoZK8Na0+aS3Sn2mgnZa+/FLe5zsz/lB5fkRo5NU1l0cFXRtQlIIIoQQRuDj5vyf8nyQaXDD9ctX0iKSC0uLa4aObhK7zOHkUb/vJpun+/Xwafs6ePBnwyzcRy1UuH6aUzBIIFUmdJT+w33HI55+vpNN8naxdUZT6BiU07yHh/HB//Ko9C/6u2tf9xGXEp/ya8sXcfo3l/q1zCSC0M19I6GnirCmUY+x8sckZy1FgSBI4eddOafEFECLzX8lbX6pqWswxKxAgtmO1d2HI52Okn8jeHQ4X3f5SeVbm/m1G3kvtOlnVFlSwungQhFCL8Kj2xP8A5VHoP/V21r/uIy5Zq+zMufPLLHPwCVenhuqHD/OWMwABTFbvl/yvDyryBB/R8+x/1bvO05C9F/LLy5oWtw+YIpb271C2R44Jb65afgrgq3HmP5Xf/g8W1L8z/IekXf1K81uAThgjrGTIEJFau0YZQM2GnxHFhhiMuMwFGXK/gwJs2y7NgHStZ0rW7Rb7SLuK9tm6SwsGHyam6n/WwdlyHZs2bFXZs2bFXZs2bFX/0e+5EPzI0aTVfLkktsitc2LC4jJ68V/vFVv2arkwpidzbRXVvLbTryimUo6nuGFDkckeOEo94Ib9Lnlp9Rizx545iXfy6PAdOnE9qB7BgfngjcYXywPoWs3mkyBh9WlZYw9KmMmqn4f8nDBiKBwaqehzUZLMB3w2L3GWMRLih9GQccPdLcNZuu+atKZRIHX+uY7BZK/EADqT0wHIwalPEk4pPUHkWBPYDwPzxDLoR2DfjjQt2bNmybY7B2mxD1DcybRxbmv44BAqaDqemCdYuV03SxCppJKPiB265KG3qPKP4DVmO3AP4j9nVinmXUP0hqLSKf3SL6a7dAOR5U/yOPLCCVahiVFRtuelNuvitcGNydTuDyoK7ftfAKqK/wAzL/scRcVSoI3Hwio/mX7XvtkRLc+ZcYgdOTek6dJqN9FbR7jlVz4KOpzqaqI0WNdlQAKB0oPDI55R076vbyXjijSkrGR/KPfJGetPuOdR2fg8LBG/qmOKX+9HyfOvaTX/AJnWyxxN48Fwj/W/jPza3yie+XXE5TxQmlab/dvmaBu8/wAzSHmYFtx1oQOlARXECRXfbwx7t8RrselevTEnan8MyIjk5A2j7lrMKU6YBuLgDZR1NfYrTx79cfNcKlS1NxsPpphU0hb2HbMrFivctMsgJs9OS6aYbKo2+eBHbbbY71x7t2HyxE1+/p/HMyMaYgkmytPj3NNh1rj0heVmSNRUGhI7Anf6BlxQPM3FBlajdizj+qWxHNv7xh2P8opk7JIjHclmCZSEIbyP2DvLV3fQWUJtrVuUpHF37AZH37fhipJJLHcnriL75LNAQwkDcnn73NwYxjGxsnck8yVhzZs2a5vdm/zpmybfll5Pm81eYIWnt2k0myYSXslSq7bxx8u7M37I/ZyM5xxwlORoRFsoxJNDq9e/JzylP5e0F9Rvl4XmqFZeBoSkIH7oHbblXky50rGKqoqqooqigA7AYlc3tpZqrXlxFbhjRTK6oCR4ciM5bNlllySyS5y+7oHYwiIxER0RGbC/9O6L/wBXK1/5Hx/81Yrb6np12/p2t3BPJSvCKRHNPGik5WyRebKrlFgqlmICjck7ADFV2bC/9O6L0Oo2v/I+P/mrN+ndF/6uVr/yPj/5qxVMM2MjlSVFkiZXjYVV1NQR4gjEbm/s7Liby4it+dePquqVp4ciK4qic2F/6d0X/q5Wv/I+P/mrBFte2l4rPaTx3CqaM0Tq4B8DxJxVEZRwFLrGlQSGGe+t4pF+0jyorD5gtjf05ov/AFcrX/kfH/zViQryrUtA87aR+YGt+YtN0QazbakkaW8onjh9NVA5IVc1rUccC+YIvzO8waZNoEflpdOfUAI5Lv63E/GGqib4Qa/EG4/6rZ2i3urW8Qy2k8dwgPEtE6uAfCqk74FvLyzs763e8uIrdWimCmV1QE8oenIiuYuTQ6bJmGonj4sgIIJJ/h5bfSyEjVA7KflrQrXy1odjodmP3VnEsZbpzfrJIf8AjI5ZsNcL/wBOaJ/1crX/AJHx/wDNWPi1fSp5FhgvreWV9ljSVGYn2VWrmUxRubAL6zpETtHLf2ySIaMjTRgg+BBbG/p3Rf8Aq5Wv/I+P/mrFUwzYX/p3RP8Aq5Wv/I+P/mrN+ndE/wCrla/8j4/+asVTDNgaDULG7V3tbqGdY/7xopFcL/rcSeOIfp3Rf+rja/8AI+P/AJqxVMM2F/6d0X/q5Wv/ACPj/wCasv8ATuif9XK1/wCR8f8AzViqPzYX/p3Rf+rla/8AI+P/AJqzfp3Rf+rla/8AI+P/AJqxVgH5x63qUdrpXk7RJTDqPmW4+rtMp4lLdSol+Ibp6jSIvL/ffq4lpXkDylo9mtlFpcFxxULNc3KCSSQ92Zm6cv5VwN+dEb2EvlnzzacJv0JdcpoQwDSQStG3NN6uqtHx+D/f3P7GHul67o+tWS6hpl3HNbMA1eQBj26SpX4H/wAls532gnqonCMRmMZBJMLHrvlIx/o/S3YhHe2CX1kv5X+atL8x6Fyt9D1ScWeq6eCTGC52dVJ268l/kzvKsGUMpqCKg+xzgnnDVLHzn5j0PyZpFxHOsV2t1qN2HX00Cf7rD8uLt/q/tZMfMX5qSaTrlx5c8v6HPrU+nKgvXhbisZYfCgFGO37WbHsvJm/I456s0RfqnseD+HithMDiIj9j0zNnIf8Albnmz/qR7v8A4M+3+R742T84fNEKNNN5Ju0ijBeVi52Vd2P2O1MzPzGA7DLjP+cGPCe57Bmwu0LV4de0ey1m2Ro4b6FZ0R/tKGHQ0wxy1Ds2bNir/9Lv+bNmxVgH5l+VzqmnjWNOg5alZ7v6Y+OSL9ruOXD7X7Wcv0zUBMPRkPEjYg9a56NIBBBFQeoOcJ8/eV5fLOr/AKQtqfo6/d2hCg/u22LRMN/H4f5swNXh4T40eRoT/wCKep7B18MuP+T9RKjucEz3/wCpf8SpUAJJNadBjWINNjTr1pgS3vOUK+ovIU26Hb3xR+TAvGQ/sOtD3bMAwo77O38OUSRLbzUZSCR/mKHGZs2XAbN4FUHZs2bFVa2UNKGb7KfETkb1y+e9u2qx4pXiCT08eIyQXEy2dhJL+3ItB477ZDSxapbqTsKAgmtcjKZrh82jIdye/YfpWMqGoYbbggVLU2rsP9gcVtLUXl1FbN1kcKSGrux40qf9Xl/r41idlB3FNzuakgdNq/aw98s2HqTi7YcUtjVRWvxsfHvmRoMMs2oxwHIHil5Ri6rtbVx0mizZiaJiYw7/ABJ7RZTFFHaxR28ShUjAVQPbHdNumYkmv3ZWdc+UylZJJv3u9sCzMGBBG4Ndj7hSPni00oiUEsFJ/m8KYUXGpRJQKCWBABFBQDYb/Q2XYscpHYJiRHeRr71d5AKk0p+H0YV3d/UlID/sx/DAtzdSTsamidl9vfEM2GPAI7y+TGeUy2GwbJJ6knGsabAdevb7vuy6gD2HXGorSnioLHqe23+r/n9nMgV7gwA6nkFEioFCa1AAHc4vDbySH1HHBFFan2/jltHFZ0e4b1GP2Y1/jXAt1ePcGg+GMdEH9mSHFL6eXezHFPaH0/zv1Lri+K/u7X92nQsNmPvXCebduRJJPeta1GC3O1KgdCSfCu+ApSS2/SnTsD3p9OZOGIjy+bmYICI2FfeVhOJOd9sUPTEm69a5TrJVADvcmK3NmzZr2S+OJ5pEhiUvJIwRFHUkmgGesPy/8qr5Q8uW+nyKv16X99fOtDWVv2eQC8ljX4RkH/KL8uX04QebdYCtNcQ8tPtWU8oQ5P75ydubRisXH9iT+fOxZo+09WJnwIH0xPqPfLu/zXN0+KhxnmeSySVIo3llIWONSzsegUCpOcN8o6Xa/mHq2veavMUIvrWS5a30qCc844ooz1jX7NP2c6F+amrXGkeSNSlswTc3QSyh4kAhrhvSrv8A62B/JuhDy35a0/SNvUhjBnI2Blf45D/wRzifartCWk0MYYpcOTPOgQaIhD1TI/2LnYIcUrPIIL/lW/kuu2iWlN9/THtT+ORvz15H0nSPLlzrXlm0TTdU00rdRXFqCklEILp8FOozpqurFgpqUPFvY0DU/wCBbGXVvHd201rMKxzo0bj2YcTnEaXtnW4dRhyTzTlGE4ylEk+qN7j5OTLHEggAInynrKeYfLemawhqbqBGk3qeYHGQGn+WMgv57XE8XlrTYYpGSK41GGO4RSQJEoTwen2l/wAnEvyavJdLfWvIV6SZ9GuGltiejQSnbjXfr8X+yy/z6/5R7R/+2nD+o56txxni8SBuMocUSOokLBcHkaKMi/LnyU8cbfoW1PJQW/djuPauPH5b+Stq6Jadq0jH05KYv7tP9Ufqx2eRy7V11kDPk5n+IueIR7g818uXE/5efmAfLkzsvlnX/j0tWYmOCf8A32nI0Sp+H/gMGXmj6d5l/MfzBaa7bpfwWVva/U45xzWLmtW9MH7PI/aphn+YHlQ+atDaG0Ii1S0YXGnznYiRN+PKlfjyM/lpr0/mTzNrup3cRhvBbWlveRt19aAGKQ/Sy51w7ZlqvZ3PkEzHUacQhMg1L6oiOT/Ocfw+HKB0Nsm/5Vv5Lr/xxLT/AJFjwyA65aQ+U/zAitPLinS4J9Du5ZorViiu6xXLKzBabo0acf8AVztOcd8/f+TKtv8AtgXv/Jq7zX+yuu1OftMY82Wc4+FM0SSL23Z54gQ2Fbo78u/JnlnW/J2nalqemQXV7MJDNcTLydzzO7MftZKf+Vb+Sv8AqyWnt+7GBfyl/wCUB0r5Sf8AE2ya5rO0u0tbDX6qEM8wI5pgASPISLOEImMTQ5B5XpK6Z5R/Nq6hs+Om6LDo73V5DESkNI1V2kdB8JK4L8t6Jp/5gyX/AJ78xWiXSatKU0mymJZba0tibdRxJZVmmeLnNx+D9tP7x8ivnLQr/wA4fmpcaHp8rW9ubSCPVbgCqrbrwmYf6zSLGqL/AL8/yM7XYWNrpllb6fZRiG1to1ihjXoEUUGbztXtmeDsjR6bHkI1GbHCeQg+qOOr3PfMtUMYOSUiNgdmOH8t/JddtEtSO/7sZzb8xdK0GzuovLPlHSYI9aEbXt3eQKA1tDCpkryX4o2NOXLOrecPM0PlPRZNUkhe5kLLBbQR0q8sm0Y+Vcj+geSbvQfKXmTzHr8nr+Y9Zsp5bhzUmCNoywt1J8K/H/wOT9lcWt1eT85qcszhxmoAy/vMn6oLnMYjhiBZUvK3kbypqnlzTNQvdKt7i6uYFknnkWrO7DdmY1qSeuHH/Kt/JW/+4S09vgGC/Iv/ACh+i/8AMJF+rJBnN6ztPWx1WeEc8wI5ZgDiPISbowjwjYcgxT/lW/kr/qyWn/ADK/5Vv5Lp/wAcS0r/AMYxkllvrKBzHNcwxuN+DyKrUPsxrjP0npv/AC22/wDyNT/mrIDXdqkAiecg8iOLdeGHk8H/ADZ0jTvLWsaNaaFbjT4LyMreRW5KLMPVG0oWnPOpw/lz5LeKNzoloSyqSeA9i3TOa/nhcW0+v+X2hmjlVUPJo2VgP3o68Sc7ZDqWmiGMG9t68QP75PD/AFs3faGp18ey+zJwOXxJRy8dcXF9e3E1xEOOYNVtSQ/8q38l0/44lpXv+7GYflv5K76JaV/1BkohnguFL28qTKDQtGwYV8KqTimaCXanaETwyz5ARzBJBbeCHcGJ/wDKt/Jf/VktPn6YzD8uPJQYE6JaEAj/AHWOmSiaeCBec8qRKTQNIwUV+bEYgNS02ope2/8AyNT/AJqyyOv7TmOKGTNIcrHEQvDDuD5+/KnTrPzJ5n1DTdchF/Z2NlL9St56ukNLqLaJWNE/vJP+DzsQ/LvyctQNGtgp6gLSv0DOT/kYQfO2tEGo+pTUP/RzBnoHN17Ua7U4e0RjxZZwj4UDQJq92rBEGG46vOfOXkTynp/lXWL200m2huIbZ3hmROLI4Ioy06HIj+Rd1daprHmG8vpnuLmWK3Mszmrt8Tipbx2zqPn/AP5QvXP+YR/4Zyn/AJx7/wB79d/4w2//ABKTLdBqs+b2e7RyZJynKMogGRvb0IlEDLChVvcvQr18d6Ejv+qmF+vQgaHqZO/+izV3/wAg4b4XeYf+OFqf/MLN/wAQbOa0+qynPiBl/HH/AHTcQKPuVfy1/wCUC8vf8wUX6slWRX8tv+UC8vf8wUX6slWexl17s2bNir//0+/5s2bFWsjfnny8/mXy9PYQsVuYiLm1A6PLGG4xtX9mTlwyS5VO+CURKJieRFM8WSWOcckNpRII+D5Vs7x7dysnjRlO249uxw5hnSRRJG256jD/APNry2NM1ePXbaPja6l8MwFKLdItdvD14k5/68U3+/MgCMy0INDmkycWGZxy3A5e577R6qOqwQy9437xWxiWR17n781R44Ri5kK8SxyjLIvetcHjw7i5+LS+J9M433dU9zYSx3kyGqsT4/13wVHeAQuzPVhsoP05KOSEvKu9cmky4xZ3HkEPrN0WZIAeXEdBhN03b5EdyD28MUkczO7MSQTU0/VjGAqa18G9h/TIE2XW5JAyNchsPd3u4sRRaltwKA05CgA+mnTJ7plmtjYxxLQ8qux9zv8AxyI6WgWYXDAfuxUd15Gg7/6uHUt/cT1DOeJP2RsB2OdX2HoJDT+OaBzHa/5keVe9889r+1Iy1MdFEkxwC5VyOSX/ABMU7kniiBLuAR18cL59UO4hX/ZNhXyNd/u6nKpSn6yc3kdPEc/U8fLOT9Ir7V89y8nxMxPYHsMAytsB4k9Pag/41xdzUjYnsfkx2xi2089AFp1JJ8SBXMqAERvQARE16pH3kobMAW2AqfbfBhtrWH+/l5OOqr2xNrz9mACMdyOpHzyYnf0gnz5BmJE/SCfM7BalsVoZW4L1PjTEJ74RAJboEB6t3IH6sZLICrA7/T92ApG5Madttsthjs3Ldtx47Nz38ujTMzmrGp8fljc2bL3JUpCPo8f8/ngSSpbfY4Ik79KnAp33r88ujsLLk4xs0TsTiJ3OKkVqOxxKnbMLWXcRtW/zDdFrOo/lD5EvNX1iDzHqFuBpNg7NGk6mk8wUhOCt+zC7epz/AJ0xX8q/yyh8wj9P6+hbS0Ypb2hBHrMNi7nb90vbj9ts9CxRRwxrFEoSNAFVRsABnP6/XiAlhxbyIqR/m+Q/pOVgw3U5cunm5VVFCKAFUUAGwAHYDHZeNZgoLMaKoJJ9hmkcx5p5+u4tV85eV/KRcGJJH1W8j619AEQIw925NkvzmnkJm8y+cfM3nWUcoTN9Q08mm0cexK/QFzpeea+2GqGXtLwYm46fGIeXGfXL/dOZp41C+8sT8r6wl/5n84afG3NbK8tm8QC9rHbuo+Utm/w5Lc4h+X+qLB+ZuoTI7NYebVvruxoKBvSvJ/Tc1/yLa5/4PO35g9v6M6TWQx9JafCRtvUcccMr/wA/FJnilxRvzLzbUn/wt+bmj6wP3dlr8Jsbp6/CZRsnKvT9jB359f8AKPaR/wBtOH9Rx35saU2o+Trq5h2udMZb6F+4MRq1P9jhX+bd0995D8rXkjBpJ7qzkdh0JaOpzuPZrWfmeyIxP1YOLEfdEXD/AGLi5o1k9+70qL+7T/VH6sSN5CL1bAmkzxNMg7FEZUff2LpisX92n+qP1ZDvP15caPL5f1+3FVs9QSG6HdoLpWt3X73XPOtJpxqNT4HWYmI/1wDKPzrhcsmo33MzyAWenweXvzRnNvRYfMdk05jGwWa3YeofD4+XLJ+djTI75o0wTz6RrKf3+k3aydaVimHoSrX/AGaNlnZ2UQnlwTNQ1GKeMjkOOuLD/wBLYwWQuj3G/wBbI8455+/8mVbf9sC9/wCTV3nYhnHfP3/kyrb/ALYF7/yau82vsf8A8aw/4VP9DDUf3fxDLfyl/wCUB0r5Sf8AE2ya5Cvyl/5QHSvlJ/xNsm2antX/AI0dZ/w/J/uizh9EfcEj0Ly/HpN3quoufUvNWuWuJn7rGPhhhB/ljT/hsOmZUUu5CqoqzMaAAdyTl4ncQQ3UEltcIJIZlMcsbCoZWFGU/PMbJmlmyCeaRN8IJHMRiOEUPKPJkBQ2ef6FcyfmD+YJu0i9Xyx5YLCF2/u5r4/Csg7P6e/D/g86P5u/5RbWv+YK4/5NtnKZtOl/KPV4df0a4Y+Vr2dINS0mR2IjaU8RNEd/7vOqeanWTynrEsbBkexnZWHcGIkHPWuxp6OWgwfkDeGI4RYqXGPr4/6fF9TgZOLiPFzY95G/5Q/Rf+YSL9WSDI/5F/5Q/Rf+YSP9WSDPKdd/jmo/4dP/AHRc6H0x9weLee/y48x675tvdXtLKC7s544kiEs7REFFCsfg+WR8flD5oJp+hrQV7/XJf656Jyx1GbvTe1mvwYcWnhDCY4oRgCYyJqA4d/U1nBAkk3u8g/K3yN5K8zWGrw6tovDUrGY2N1SeR0FPiEkBY1jf4acsl3/Khfy76/Vrrxp9ZfAP5Kf72+cv+2mf+Ns62emek4pmeOEzzlEE13kOGebxH8kokt9N1+3iBEUOpyJGpJNFVQoFT7DOpZzD8mP95PMf/bVl/VnTxnlPtF/xr6v+uP8AchzsX93H3MB/M3T7XVj5b0u+VntLzVI4Z0VipKMjVow6YN/5UL+Xn/LPdV/5iXxnnv8A46PlH/tsw/8AEHzqFM7f2S/4yMX9fJ/unGz/AN4fcHkWkeWtG8p/medI0O3+r2i+XBKQSWZnfUG5O7t8TNQKv+qudB7ZFb3/AMnFJ/4DKf8AdQbJV2zlfbH/AI1T/wAJh/vm7T/3fxLG/P8A/wAoXrn/ADCP/DOXeRIx5S8w+WLlfg07zXpaI5Oyi6jruxO3Iuvwj/i7Oo/mB/yhWuf8wj/wyG6poMmr/kVo19aVF/otvFqFs6D4gIifWof2eMf73/nlm29ldNHU9k63TT5ZZmN9xMBR+BYZyROJHR6tkM/NHWm0byfe+iaXd9SztlU0YtMeJKjvReWHnlfWk8xeXtO1pONbyFXkVa0WQfBMgr/vuVXTIZfxf4v/ADb0zRft6f5bi+vXgG6+u1GRHB2/31/weaLsLs2WbteGDLE1p5meXy8I/SffNtyzrGSOvL4vS/J2mzaP5V0fTLihmtrWJJKbUbjUj6MPM2bPU3BdmzZsVf/U7/mzZsVdmzZsVSrzDoVn5k0mfSb4ssU4BWRDR0dTyjkX/VYdG+HPM93bGyvLmyduTW00kJcCnL0nMfLia8eXHlxrnqvOZ/mX5EuNUYa9ocCveION7bRrSScCgWRd/iljA48ePxp/qJmHrtOckOOIuUftDuuxNfHT5ZYc0qx5ORJ9MJ/8eeNd8eh3NemNdHid45FKSIxV0YUKkbFSPHLHXNKQ9niO/f3KrKtKgV8KffibA04NsCMVHQ9zjH2ao69DkQXZYj4gOOfqEgeZ6+9AlSrlWHQ/CetP6ZVFZuJ7KW67/RTFbmOq8uNQv2h4jElYKByqKfEGNK0G/T2zJgQaJJAujXN0Oowzw5J46urMb24v5vzTmztJViBC05ULV+fzwSIXqPUIXruTQbDvhXdGW4to7qCtUBW4UVNG7de3FsLWllY8mdiT3JOenaLBjlp8X5ecfDERw0Oj4z2jpdVLWZp6qYGSUyZbHn3C2SsIIx8dwi+AAr/HA0t9pyfD6jSMNqgbV9tsISSxqTX8crMsaUfxTJ9wAcWOjiPqnI+6gm76xGlVgtwe3KSv30xCbVruZeLsFQ7lUou1aUwvzZYMGMb8IJ7zuW2ODFHlAEjqdz9qNWU8VDEMe5qP4tjZJtgAQPu/gWwLU0pXbwyslwC2XALte0hPQ9N6++MzZslXczdjXNF+fTHYk7A/5npkgGURZUZSd+vSn+30xDFHNRXsPw/28MtC8s675klMWjWMlyquqSyqP3cZc0HqP0X+Zv8AJyyU4Y4GWSQhEcyTQHvcqETyAtKOJeiqCWbYD3Phna/If5MWUltZ655nkaZ5AJo9LC8IwP2RcF/jkr/Ivpr/AMZMP/If5T6f5d9PU9b4X2qlBSJlDQwE9eANfUf/AIsb7P7H82dMGcn2p2sMk+DTGgPqyDbi/qf8U52DT0OKfXopwQQ20KW9vGsUMYCxxIAqqo6KqjYDFc2bNH5ly3ZCfzW8xv5c8m3s9v8A72XlLO1G/wBub4Sdip+Fa5Ns49+YHPzP+Y/l/wAqxqWs9LX9J6hQbDf93Unb9n/hsq1GaODDkzzNRxRMz/mi0gWQB1ZD5G0GPy55XsNNUfvRGJbgmlTLJ8b9B74eXUH1q1ntubRetG8XqRkB15qV5oTUc1rVcW/V4YSa95t0Hyy0Ees3XoSXPIwxhWd2C/aPFAxpvnj/ABajV6uWTHGWXNkmclRjxyMr4/p3dhtGNHYBjmmflVpel6hpeoxatqUraO1bKGWWNo0QsXkiAEQ4xyln5qv82T/IZ/ytPyV/y2yf9I83/NGSXSdWsNc0+HVNMmE9pPUxSgEV4sVOx3FGXMntP+VsvBm7Shm29EZ5Mfh8/Vw3wxYw4BtCvgUTcW8d1BLazCsU6NHIP8lxxPWvjnBta1gXn5e2OiM3KXQNeGnqW+20KljA7f5XE8Wzv2ecvzNsJdD85TwhWNrrVxa30TVoodGKygL/AKzZuvY3UiGbVaaRrxcfHH+tj/47Jr1A2jLuL6Ki/u0/1R+rIn+Z1mt35I1Vi5R7WMXcLqaESQMJENfmuSyP+7T/AFR+rI5+YX/KEa9/zBy/8RzntBIw7Q08omiM8N/fNtkLgfcUF+W3m9vNehKb2iatZUhvYzXkdhwmIb4v3q7/AOtkyZFcFWAKnqDvnJtQtpPIesaB54t0YaHrFla2uucFJWOQxIEmb/W+1yzq0U0c8STwuJIpFDxuu4ZSKgjNl7Sdl/kdaZ4o1hz+vHXKJ/jh/m/7ljhnxR35hUpTpnHPP3/kyrb/ALYF7/yau87HnHPP3/kyrb/tgXv/ACau8t9j/wDjWH/Cp/oRqPo+IZb+Uv8AygOlf6sn/E2ya5Cvyl/5QHSv9WT/AImcmuantX/jR1f/AA/J/uizh9EfcGA65+YR0f8AMDSvKskarZXSBbmdgeQmn2t+FD9nkERq/wC/f8jJ9nDfzA8uy+ZvzC1KwtFZtQi0cXenhCQxngKSBRT7TSRiWOP/AItdM6j5G1yTzF5T0zVp6i5li9O6BoD60LGGVqD7PN4/UVf5XzZ9rdlQxdmdn67DEAZMYjlrrOXrjM+/1Bhjnc5xPfsjPMuhWvmXRLzRrofBcIQj0BKON0da91bIj5O8w3V9+X/mLyzqtF1Xy7bT2co3q8QjYRyHr4cc6HnIPzBjm8oeZX8zW0f+47XbKfTdTpsolZCI3fbqfhzP9je0Tj1EtBkl6M3rx+WSP1D/AD4f7ljqIWOMcxt8Gf8AkX/lD9F/5hIv1ZIMj/kYU8oaMPC1j/VkhzmNcf8ADNR/w2f+6LdD6R7g8d866l+ZNv5qvI9EtdVm0gJH9XNjEOHPiC59R7e4Db8v9lhENa/NodNO8w1/1I/+yHO/5s3Wn9osGHDjwnszTZDjhGJnIDimYiuKXo5yaziJN8ZeTfln5mj8qakNE13QdT0q58w3HMajqDBlluKfZ4+haemn+r6vxZ3XtnF/zI/5S3yP/wBtAf8AEkztB6Z3vZOtOt0OHVGAx8djgibjERlwj/cuLkjwyIu3in5Mf7yeY/8Atqy/qzp4zmH5Mf7yeY/+2rL+rOn55t7R/wDGvq/64/3IcvF/dxYX57/46PlH/tsw/wDEHzqOcu89/wDHR8o/9tmH/iD51DO49kv+MfF/Xyf7pxtR/eH3B5ze/wDk4pP/AAGU/wC6g2SrtkVvf/JxSf8AgMp/3UGyU5ynth/xqn/hMP8AfN+n/u/iWOef/wDlC9c/5hH/AIZEbLztd6H5F8oeV9CsItU13WrMKlrPUwrAeSu8wVk+Fhy/a+wru2S7z/8A8oXrn/MI/wDDOXflYZD5ys21EcJf0FAtiHHHlHRN0H7XwLmz9mdTLS9ja/UxjxyxSMgO8iAr4MMw4skI96f6L+T1zZWZjuvMV5bO9XW101jHbxO+7KvqmR5UU/tH02fA1iurfkzqTahdxx6zoerTomo6wUk+uxDcKrD1Gj4V+L/i3/gM69kS/M02/wDgXWvrPEL9XPp8/wDflR6fGv7XL7OYHZftJ2ie0MQzSjlhmyCE4cEI7TNekxjxelnPDDgNbULejwzR3EMdxCweKVVkjcdCrDkp+7FMjX5fCYeSdB9fl6n1OLly69Nq/Rklz0hw3Zs2bFX/1e/5s2bFXZs2bFWsqm/yx2bFXnP5g/l+dbJ1jR1RNQRCbiKlPrFOnt6g/m/azi9xBPaTPbXUTQXEe0kMgKsvzGercIPMPlDRPMqKNRgpKpBFzEeEtAKceY345hanRDIeOHpl17i7zsztuWmEcOcGeMfTIfVDuH9IPnONif1nM4r327DJ1rv5Va3pnOfSGGpW/wDvvZJ/2e2yN8Rb+X4FyF3NvcWc5tr2B7e4UmsMylH2NNgftCo+0vw5qMuDLiPriR59Hs9F2hps/DLT5Yy61/EL5jhPqQjLtQd/44EoVJTcEdzg1/btiFwpKhwd+48cYH7W/tLCZ445xuYWD38PT5IjS5JFuFtwryrOSpiX4mrueSr3oOXw/wAmAr+1azuXhI+EH4fl9P3Z1j8mNAs5/rnmOYmS5t5WsoYmAKpySOZ5B/llZPT/ANTl/PiP5q+TUtOWuWEZ9CZme4FRSOdztQHfjOzf7GT/AF87f2b10scIafMdp/QfuD5b7R4seTUyliFGIHH5z7/k8kzZtjmzsHlnZs2bFXZs2bFXZsvMivJKkEKNJLIQEjQFmJJCgKoB5HkePFcF1z2SASaCxzQbdcRJLMI1BLOQqBBViT+yoHjnR/LH5Sa7rJjutYJ06xbi3Fv96HQ0Pwp0j5K23P8A4DOq+Xfy38seW7g3dnA09xQBJbk+oUp3So+E5rtT2zpcFxifFmOkeV9xk5uDSZJUSKHeXlnlP8mdW1Vor3zG31CyNG+rDed132PaPltncNE0LS/Ltiun6Rbrb24PJlWpLPxVDI5P2nZUXk2GWXnNaztDUauX72VRHKEdoB2WPDDHy597WXmzZhtrs2bNirs5J5k03z/o/nXUte8t6TDrEGpQQRLJK4QwrFWsQXku3L4uWdbzUyrPgxajFLDniJwn9UT1rfokEg2Obxv9NfnN/wBSna/8jh/1Uxfyr5Y84a553h83+ddPhsItNtmt7G0Rw9ZHqpelW+Hi8v2v5s67mzF03ZOg0uXxtPp4450Y8QJujz5lkckpCibCHlsrSWN4mgjKupUjiOhFD2zimk6N+aXkKCfy/omjW+raak8k1pdtLRvTcjipUsnE0H2c7nmoMyNTpMGqx+DqcYywsHhPeOR2YxkYmwaLxv8ATX5zf9Sna/8AI4f9VMj3mby1+aXnl7L6/wCXrWxl05mnin9YfH0Pon4n6lc9C5qZi4OxuztPkGXBp4wnG6kDK99j1ZHJMiiSXjQ1n85lAX/CdrsKf3w7f89MCaofze8w6dc6Hd+Wba2t9QQ28twJQfTV9i/2z9nO4UzUyEOwuy4TjkjpYCUSJA3LaQ3B5qcsztxFIb7yzaan5U/wvf0lhNolq0lKfFGgRZB8mXnnLNKt/wA4fKdmmgW+i2+rW1mSltetLQtFX4B9tT8IzuOagzM1Wj0+rxjFqcYyxB4gJdJd+zGMjE3E08b/AE1+c3/Up2v/ACOH/VTAth5M88+bfNB1/wA02UOjRwafcWEaRvzLtMksaNQFvsmfk3+rnbs2UaXsnQaXJ42m08cc6I4hd0efMsjklIUTbwrQ7X83PKOmReXrLy5a3tvZlljuvW/vAWLcvtr4/wAuGP6a/Of/AKlO1/5HD/qpnZKDNTKsnYXZeScsmTSwlKZMpEmW8pbk81GWYFA8nkvkry35yvfPU3nXzVYxaWI7P6nFbRPzLsSvxdWooVT3wNf2H5geUvMWsweUNFg1DRdVuTqVsJJQDHJIkYuwByTirTn4E/ZXOx4Fcf7kIP8AjDN/xOHMqeg0uTTDSTxRlhiABA3Q4fp80CchLiB373kv6a/Ob/qU7X/kcP8Aqphdrtv+bHmvS59B1DyraRQXQA9czf3bA1WQfGd1zuuamYuPsLsvHOOTHpYxlAiUSDKxKPI/Uk5ZkUS8R02X84dDsLfR4PLFrcRWSCBJ/WHxhNg32164K/TX5zf9Sla/8jh/1UzsmbBPsHsqcpTlpYGUiSTctyefVfFmNuIvG/01+c3/AFKdr/yOH/VTN+mvzm/6lO1/5HD/AKqZ2TNg/wBD3ZH/ACiQ+cv+KT42T+cXikHl78xPOHmbQ73zLpVvo9lo0/1lpUk5s9KHgq8n7rnasvNmw0+nw6fFHBggMcIXwxHS9zzYEkmzuXhlhoH5meRL3VrLQNHt9XsL67kvIrppOJ4v9lWXklGp9rB/6a/Ob/qU7X/kcP8AqpnZKZsw8/YvZufLLNm00JzmblImW5+bIZJgUDs8YgsfzK8z67oY8w6FBpun6berey3EcoJoisONOTeOdmy82Zem0uDTYhh08BjgCSIjlcufNiZGRs7l5b520/zxZed4/M/lTSotTil0pNMlWSQJwZbl7lm41XtwGFv6a/Ob/qU7X/kd/wBfM7JmzH1PZOg1WTxtTp45J0BxEy5DlyLKOSURQNPDtXl/OHXdLu9Hn8rW0UV7GYXlWYVUN+1u5w11X8rNWPlvy5No12lt5r8t26xxTD+7mHVoWbw5FgudcoM2W6bQaTTY54tPhjCGT6o8xLbh34rQZSJsm6eKr+ZHmfTFW18weT74X4/d87ZS0UknT4aBqcv9bE10Hzt+aF7anzDZ/oHytbSrM9k5/f3BU9GHX787bQHqOnTLzG03YfZumzfmMOnjHINwblLh/qiR2ScsyKJ2WRRRwRJDCoSONQkaDoFUUAHyGPzZs2bB2bNmxV//1u/5s2bFXZs2bFXZs2bFWs2XmxVrAd/pOm6nGYtQtIbpDSqyordOn2hg3NgIB2ItlGUonigTEjkQaLBL38p/Klyregs9pIWLc4pSRv8As8ZRIgX/AFVyMXf5M6gsbmy1WGaQ/ZjmiaJSPeRWmp/yKzsWbKZ6XBLcwF942dlh7c7SxR4I6iUo/wA2frH+ySXytoEPlnQ7XSIiHaFazygEB5XPKWQBixAZz8K8vhXBWs6cmr6Vd6ZIeIuYmj5ilQSNiOQbv/k4YZRy+HoMTHbhqvg6ycjOUpSNmRJPxfKfmDRL7Rb+W1vYTDKh+NTutT3Rv2o2/wB1vhRnpDzx5Ej81rFLavHa3ikJNKyn95H4MV/aT9j4f9lkXT8jbMH49ZlIp2hUf8bnOp0/ben8GBzyInyIAvl1dRm0WQ5JeHGxzvo8XzZ3q2/JfyzHCq3VzdTyivKRGSNTv8PwcX+z8P7f2sPLL8tfJdiYnTS0lkj4n1J2eQsy/tMjN6W/7Sen6f8AkYcnb2lj9EZz+HCxj2fmP1cMfjb5thgmuJVhgjaWVyFREBZix6AAZJ7T8tvO95GsyaPIkbbj1niif6YpZElX/ZJnpC0sbOwi+r2NtFbQglhFCixpU9TxQKuCBmDl9oMx/uscYj+l6v1ORDs6G/HIn3bPHNC/JIkxXHmK/wBur2VoPcEK07eK/DJ6cf8Axjmzpei+VtB8vxelpVjHDWhaQjnI3Esy85X5SNx5tw5N8OHObNbqNdqc5/e5CR/NG0fk5WPT4sYHDHfvO5apmGXmzFbmssZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuwM/8Ax0IP+MM3/E4cE4Gf/joQf8YZv+Jw4qic2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNir//X7/mzZsVdmzZsVdmzZsVdmzZsVdmzZsVdmzZsVdmzZsVazZebFWs2XmxVrLGbNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirs2bNirsDP/wAdCD/jDN/xOHBOImJjdRz1HFI3QjvVyhH/ACbxVWzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2KuzZs2Kv/9Dv+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV9/5s8AZsVff+bPAGbFX3/mzwBmxV//Z" /></span></span></span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Fakat burada dikkat &ccedil;ekici olan bir konu var. Kararsızlar, <strong>&#39;&#39;cevap yok&#39;&#39;</strong> ve <strong>&#39;&#39;fikrim yok&#39;&#39;</strong>lar dağıtıldıktan sonra elde edilen sonu&ccedil; bu. Aslında <strong>&#39;&#39;kararsızları dağıtmadan&#39;&#39;</strong> diyebileceğimiz bir tablo var karşımızda. Bu da &ccedil;ok dikkat &ccedil;ekici, &ccedil;&uuml;nk&uuml; kararsızlar artık 2&#39;inci parti konumuna sahipler.</span></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">Kararsızlar dağıtılmadan; Bu pazar se&ccedil;im olsa:</span></strong></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">AK Parti - % 34,4</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">CHP - % 18,5</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">MHP - % 11</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">HDP - %6</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">KARARSIZLAR - % 25,9</span></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">İKİNCİ PARTİ &#39;&#39;KARARSIZLAR PARTİSİ&#39;&#39;</span></strong></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Bu sonu&ccedil;lara g&ouml;re % 34,4 oy oranı olan AK Parti&#39;yi hemen takip eden parti CHP değil, kararsızlar partisi. Dolayısıyla bu kadar kararsızın oluştuğu bir d&ouml;nem akabinde genel se&ccedil;imlerde her an &ccedil;ok farklı s&uuml;rprizlerle de karşı karşıya kalabiliriz. Kararsızlar daha &ouml;nceki se&ccedil;imlerdeki gibi oransal olarak dağılmayabilir, yeni bir oluşum, yeni bir beklenti ya da insanların &ouml;zellikle dikkate değer bulacağı bir yapılanma s&ouml;z konusu olur ise bu kararsızların eğilimini &ouml;nemli &ouml;l&ccedil;&uuml;de etkiler.</span></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">İKTİDARDAN EDEBİLECEK BİR ORAN</span></strong></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Bug&uuml;n itibariyle edindiğimiz izlenim &ouml;zellikle MHP&#39;nin birka&ccedil; puan y&uuml;kselişe ge&ccedil;tiği. Dolayısıyla bu % 25,9 (karasızlar) oy oranı bir partiyi ikinci parti konumuna sokabilecek ya da partiyi iktidardan d&uuml;ş&uuml;rebilecek bir oy oranı. &Ccedil;ok y&uuml;ksek bir orandan s&ouml;z ediyoruz. Bu oran, CHP&#39;nin ya da MHP&#39;nin tarihi boyunca almadığı bir oran. Bir partinin % 25 gibi bir havuza sahip olması y&uuml;ksek bir oran ve &ccedil;ok &ouml;nemli bir oran, b&uuml;t&uuml;n dengeleri alt&uuml;st edebilir.</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">&Ouml;zellikle, genel se&ccedil;imlere giderken, bug&uuml;n T&uuml;rkiye&#39;nin g&uuml;ndemini oluşturan konular i&ccedil; siyasetin dışında d&uuml;nyanın i&ccedil;inde bulunduğu siyaset gelişmeleri konjonkt&uuml;r olarak Ortadoğu&#39;da yaşanan sıkıntılarla g&uuml;ndem bulmuş durumda. IŞİD meselesi tabi burada &ccedil;ok &ouml;nemli. Yanıbaşımızda yaşanan olayları T&uuml;rkiye şu an itibariyle izliyor, belki siyasi olarak politik adımlar ger&ccedil;ekleşiyor ama vatandaş şu anda bunları sadece izliyor.</span></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">ERDOĞAN&#39;IN YENİLMEZLİĞİ S&Uuml;RD&Uuml;R&Uuml;LEBİLECEK Mİ?</span></strong></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">&Ouml;zellikle AK Parti ve CHP se&ccedil;meni &uuml;zerinde bir yenilenme olduğunu kabul edersek. <em>-CHP&#39;de yaşanan kongre ve AK Parti&#39;de yaşanan lider değişikliğinden s&ouml;z ediyorum.-</em> <strong>&#39;&#39;Yeni bir s&uuml;re&ccedil; başlayacak mı, acaba Erdoğan&#39;ın yenilmezliği Erdoğan&#39;dan sonra s&uuml;rd&uuml;r&uuml;lebilecek mi&#39;&#39;</strong> şeklinde soru işaretleri var. Biz de bu &ccedil;alışmada bunun ne kadar ger&ccedil;ek olduğu ve AK Parti&#39;nin hangi noktada olduğu, CHP ve diğer muhalefet partilerinin hangi konuma sahip olduğuna dair bir &ccedil;alışmaydı bu. Bu oy oranlarına baktığımızda, <strong>&#39;&#39;Ahmet Davutoğlu nedeniyle oranlar b&ouml;yle&#39;&#39;</strong> ya da <strong>&#39;&#39;IŞİD meselesinden dolayı b&ouml;yle&#39;</strong>&#39; demek &ccedil;ok doğru bir yaklaşım değil. Bu bir rutin s&uuml;re&ccedil;.</span></p> <p> <strong><span data-mce-style="font-size: medium;" style="font-size: medium;">Y&Uuml;ZDE 85, &#39;&#39;IŞİD TER&Ouml;R &Ouml;RG&Uuml;T&Uuml;D&Uuml;R&#39;&#39;</span></strong></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Bizim bug&uuml;nlerde, &ouml;zelikle siyasetin g&uuml;ndemine ilişkin &uuml;zerinde durduğumuz bir mesele yok. Bu tamamen yanıbaşımızda yaşanan olayların T&uuml;rkiye&#39;ye yansımasıyla g&uuml;ndemi oluşturan olaylar haline gelmesiyle sonu&ccedil; buldu. &Ouml;zellikle son bir iki aydır yaşanan bu olaylar T&uuml;rkiye&#39;nin g&uuml;ndemini değişmez bir g&uuml;ndem haline getirdi. <strong>&#39;&#39;Peki bu ne kadar s&uuml;rer, T&uuml;rkiye&#39;de vatandaşlar bunu nasıl okuyor, bunun yansımaları K&uuml;rtler &uuml;zerinde nasıl etki bırakıyor, &ccedil;&ouml;z&uuml;m s&uuml;recine bir katkısı ya da zararı mı olacak, h&uuml;kumet bu s&uuml;reci nasıl y&ouml;nlendirebilecek&#39;&#39;</strong> gibi bazı soru işaretleri var ve bu olayların ana temelinde IŞİD gibi bir &ouml;rg&uuml;tten s&ouml;z ediliyor ve bu &ouml;rg&uuml;t&uuml;n T&uuml;rkiye&#39;deki okunması nasıl ger&ccedil;ekleşiyor.</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;">Biz bunları da halkımıza sorduk; IŞİD&#39;in ter&ouml;r &ouml;rg&uuml;t&uuml; olarak g&ouml;r&uuml;lmesi y&uuml;zde 85 oranına kadar &ccedil;ıkmış durumda.</span></p> <p> <span data-mce-style="font-size: medium;" style="font-size: medium;"><strong>&#39;&#39;IŞİD&#39;in T&uuml;rkiye &uuml;zerinde olumsuz etkileri olur mu&#39;&#39;</strong> şeklindeki yaklaşımlara da % 60 civarında &ouml;nemli bir kesim <strong>&#39;&#39;IŞİD bir ter&ouml;r &ouml;rg&uuml;t&uuml;d&uuml;r ve T&uuml;rkiye i&ccedil;in bir tehdit oluşturuyor&#39;&#39;</strong> gibi bir yoruma ge&ccedil;miş durumda. Dolayısıyla bu y&uuml;zde 25 gibi kararsız olan kitlenin aslında sadece lider değişikliği y&uuml;z&uuml;nden değil, &uuml;lkede dış politika gibi bir sorunun varlığına işaret ettiğini g&ouml;steren bir durum. Araştırmalarımızda, se&ccedil;menlerin olayları değerlendirirken, o anki ya da birka&ccedil; g&uuml;nd&uuml;r g&uuml;ndem duyduğu teredd&uuml;tle beraber bir tercih yaptığını g&ouml;r&uuml;yoruz.</span></p>