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Los números naturales: Para contar los elementos de un conjunto se utiliza el conjunto de los NUMEROS NATURALES (N). el conjunto de los números naturales se representa por extensión así:N = {1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11,…}El conjunto de los naturales se representa en la semirrecta: <img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAkgAAAB4CAYAAAAJ+w0rAAAgAElEQVR4Aex9B5xWxdW+MeWfmJiY5PtSLLEbo4kdENhlQYy9xESNqcZobIkmsXxqookV6aiA9O0VWHpfemfZyi7bqNLLsgUW2GXL8/89Z+bcO++778LuAkLMO3B32plzzpw5c+bcuXPve0YTAMgfE9mkV8bqcAhLICyBsATCEghLICyBsAT+myRwRthB+m8a7nBfwxIISyAsgbAEwhIIS6A1Egg7SK2RUhgmLIGwBMISCEsgLIGwBP6rJBB2kP6rhjvc2bAEwhIISyAsgbAEwhJojQTCDlJrpBSGCUsgLIGwBMISCEsgLIH/KgmEHaT/quEOdzYsgbAEwhIISyAsgbAEWiOBz7aDpK/kadwaiZzWMCe+I8TY0nVai+K0Ys5KsEkl2Vbm2tvO0GHr/8ag/XZjlaSWtSSXY9W31M6Ut5bK0bF8ZmuPT7ifWbGEO/afJ4HPqINkDZguWBI3Agi6XDsXalIH12u+hXE+RnULrQKLFYcfN6LJ47s+qA8+lIclRJFXZxMuSAMA/2pCAxrRABOTrrmawH+eK+Uk3eJgOsfKc1jM1YSmZmOkRFrGIk1C9ElberHS8XsgbDfa8pYptLbGSrBJJal6phwcDQ9hOK5sS3nrP0/awquPQXEybpR/HDN/nI79hQ7F4OM8FakWBiWAFe0X40B5MK/9phRM3tdljoC2EZSS0RJ/RrFE9MDSVZ1UNiQvuHRcSK0eTTiCxibGhnZjEykafda2woDHCPurGQ/CmVd+mUmRs5aCWyc9QJPoHtPO5dFTGJ3FJiZ2SdlOyhykMKQfnJN2fgZiRZPgZV8aTdohGdhn29BgFHjPBqtgg3G7TaSdoSPJ8J+wBD5lCXw2HaTgCStzXldDZuykk/JmM9IfglB4tI0P5aUU3CtoZ0JJmFgNRHCsUEFEWsmEgjWPdTFy6bVAQ1nQOAjMzXrG1sIah8iFoDFuRFOjNbqs0kaBycBGtk7AbY2yw1jTjRaXlDU1gQuaLhcuQvJFUA1uWsuaxQLkyqvRX1maAYcqIEFtH6q+pTL2Qa9QvQndTmQQuupTLLV9lnGxA+XI3TCifWPsj6Wm/b6bekrQuJkBboLfJwc/k9QJtpRip44NGmUIaTP85kyJfvAmorHe6Cv1hf+Ii40EyGHWlLT9bx2Aw0HXIQC8au2l6bZj91rInLNKbvrRiMbGBts3zkUjgMbGJjTInGFT1VXbX3ZXBKZTVp1B1pv2Bo/bjuVG9ialkB5rtkDbOOXhZFgCn5IEPpsO0lGEZ6arPxndvE7UozT/9KpCMaZl1uwovxob5vS2zy/1Uw77Wqj251ixwjN2gskGFTr1oZKyJjqOiCw6Ln6bbmpsAi+xseQvBIxXxwXN9kFsuvoohhiaaPQbGwyQs9Mj5dLQcGp4aVt/QvHVagzH6FMAbitMt0ko+Qa0OSZwSAyfQiEZU6XTnTeNWd5CsOPZYh+1vyGae1XE4W0fmvniOwoGSvINVomUTZdlLQtBxytqBBoON6LuQD327azEppIt2FayE8Ury5A1Nwc58/Owek4OVk7KxsoJOVg5MVeuFek5yIhbhsnD5mPayEWYPmoxpo5YhKnDF2LqiIWSnzZiEaYMX4CZ0UuwJD0PKyblYDmvyTlYMS0HqzNykUX8C/JQmrUBW4p3YseG3ajZexD1+xuAIx6XoRPi7LEDvMwcFJnImFlHUSaaaW5cWe4+86q3u2zcYbM7ozLnDJS6pca1VBfVjo6Mb9BcD81huDQsgZMugc+sg6T2Kzi25s/c9Vkr2/w+xk7Wky7+EASUdEux18QF0F6ah2OeUbLb/wFNmGFTBm0WHCtqLRdD6BZq2sZi1ILKjrmC+fDmztVny7WRZFMgnR0feaQieWUwVKz4aYB5R0xDbcrEUZLHWtaravLvmBVGvC2PhuIKFXstAnrs8e0mAppbR5b1NrjVLGKvGLTcZv0CrQiOLaDqtRuLrK32G0Qe1k81YfiwY+M85PX2gIL7pHlKQ/TRYVfrGKsquGUWVKskSwegUR9tct6Yx2Z8dOY/8nRouEkiojrtBw7tqkf5+v3YlLcTuYuKkZG+BDOSF2B64jxMGD0DSYMnIm5gKuI/GIuUIRMwbsRUpA2fhOTB45EyNB1T42ZjdspCzEldhNmpCzEreQHmT1iCxdOWY+GU5VgweSkWTVkh1+JpK6DXItZPXY4FArMcs9IWY2bqQsxMXYQZKQswOW4OEodOQMrHkzB2xFQkDk1H0uDxSBqUhuQP0jD+48mYFj0HMxPnYtGkFchfUIxtBbtRtaUGDZW2f26fg9JGvMa5MQ96rdsjNz52jILsgq97DjJBpCOjDjLHg1gDh9NpFU6GJfCpSOAz6SCZyWsmbOAk4xR1SzTNFkxrrOWfyhi0jghZCwjKK40KDT0v17hrfwIahchoX2nsAtdeA6x0FI70NG1peA1tQhYwx0h6i5oubtqAuJhuvuaFYPQkFzlbUELJ7h6wr9KfFmLDfoDsQjKqXQ6OpaWRqb+AGC1VSWsTwauZ4NirNGNjtN8s/Lyn5529OJb2kZzKPSSvn0KhYZ89Jif825JOBSklQW1wko7iGozeeR+bZRNNyi6hPBLSEsXoIK5vQn1tA2oP1KJq135sLt6GwlUlWDhtKdLHTELS4DQkDRqPmD6piO49FkmDpmDSiHmYk7ASC9JykDW9GAXzy1C0vBRrV5VgU8EnKN9Ugb1bylFTdRD1hxtQV1Nvuh1E/oRkG4EjBxvQcKgRB8prsPuTPdixYSfW521A0cpiFC5YizWzi7FifDbmRC/BtOELkDZgKuJ6jUVC3/FIGTweE2OnY97kxVi7eh12b67A4apa1B+uN6YmFJMqzuDYESurvODCeTqgzqrRWc4B30p4LcOJsAQ+FQl8Jh0kYwp1armG16bdiRkq7Yk+uK1XcdIS6tYFs9WMoC7aYj7qgSa9G6YTYlcDz+hoPygTdaYUnnfO5jJ1Csu4NcEj1hrgo8MQVX2Tuejr2av+UAMOVh1Czb4aMfYH9h3EgYqDkLj8IGr2HTJplpf75VLPsr01OFR5WBYLOdfB8x3EzbMcTJ/kEEpCfhlTIWSuAKFicdrcFZ8dMDhcx0jHVXbQpJ7ITo8Q3K0WuWqJZReB15iFKkud/wroATVLNBxqQvWeA9izsRxb83YhP2MdFqZlYtyQ6Yh+PwXx/ccjum8KxvRNwtTEDCyYuhTZS/PFadr9yV6U79iH6vL9qN1fa/SJpNsYgrtpzuxwKut5OSJ05rbtlrcxym673VeEGrfEDzfS6ppQe6AO1Xv3S1+2le1G8aqNWD4zB1PiMxA3aCzG9E5F3PvjkP7RDCxIXI51iz/BjuKd2Le1AvUHaEsCA2+3DEtHYYBV7mVRmCLpudn9DbtIgcIN5z41CXyGHSR35uluRtCEdECYlMkaIHoHoHllAOSJytCsmCf5ZqlrkQM1iALg90/hPcPjJdhAFw0TKwVjzJjTemOc2twnJX4YqK9swpHKRlRsqcbOdXuwe0M5ynI2IG9ZAQpWFiF/SSFWZ+Rh1excrJyVgxUzsjAvfQmmJszBlPhZmJaQgSnxszEjyTwCmBwzC+NGTpHHE2OHT8bYEVMg8fApGDecjy1YF3SNmIy0EZORMnwSpiXOw+IpmZiVuhCT42ZjasJsiafEzcaCCcuxYmY2Vs3OwYpZ2cick4u8xQVYs3wt1ixbK/xuL92FXetNPw7vPYL6qiY0HWjH7a2scZSvK2MVXIgF0I6zdxZLdoD88ZMxUh3wliQfP0fVeyRFOOLTq80DfOIaKMva81ArpfuERlknnPSJes1C80dis0dmHs/4+IJ4rgP276rBuryNyFlQgMVTVmFKbAaSP5qA0b0TkTAoHWnDJmNm0nysnl2ArXl7cGjrEdTvq0fDgQbjVFN+IYNyqTcfHCc96GzHxNtd5biYwQ0+9+bmpbdyENwSVIGZpl43LSpF6ZWb6W/sg8HrVhlZGnmG6BDZrwMaDjagdk899hRVoXBBGWbEzcX4IVMQ3y8N0e8nY9KoWVg0cQUKlhVjx/rdaDwYApdbpH2QMTS8abVXxQJRAJWTQoTjsAQ+PQl8Nh0ktVNBRsSzpZSvzkQby9utanMd+Uu1ncPqSDjVgUnFGVjappw5P2QMqxjXIFb1zLK3gcQ+2otlmvVYYYIgtg9ic2yZ4LDpVjFZCxzaV4uKrVXYWroDRZmlyF1SgDnp8zF/7CLMjVuIjJiFmDYsA6n9pmDiR7Mx4cNZGDdwOqYMnSvp5D6TpG7y0LmYM2YB5kQvxuyYhZidsABz0hZh7oSlyBi/BBnjF2HWuPmYP3EpCpaVoHjVehSvWofiTF5lzlWKoswSFK0uDXGVoWh1GYoEfh3ylxdh4bTlmD1+Pman81qAOeMXImPsQmTELsKsUYswJ2aR9GHK0Ayk9Z8qvI4dMA2Th2Qg/YOZGD9oBiYNnoO0flMx/sMZmBu7CBlx87EgbSEy0uZiydSlKFpVjA15G1G+uRz7d+1HfXX90Q/FumPgDCAXPXNQ3cTUPy5mAf/kLI3RAdl1cHB5eeJkOS+qlq7fLD9VgfqofJE1yfgzTMSgZ6mt/vLoL+dHI7f/+Iq9vG3lni9r3pkj+5uwa91eZGfkYk7iPEweOhspfSchsdd4jB80FbPi5mHJ1OVYl70euzbuQf1BR4AuOhYLU1pojYXK1Y0paG9yaSMK3s5rmYTOmLRAUin5g+cS8dN+ykD67TSlEJq3sRYzZlDjoLEtbimqrazHpoJtWD59NWbFLcDYAdMx5s0UpA2YjAVpi1CwfC0O7K4JbK5j7vk9JG4K5a1CK1bRVRarKVQeA7GFc2EJnFQJfCYdJO8OzJlUTLLcfbWXyw3vN/Vpt9m54eu7oY2XFvsGK2hsfICgijZk5WyEY6zsyqao+Xp6Q5M5UcLFkhdfOXa/w2J2G9iCpse4XCYXxAcLuVgeARoONaChsh71PHRaXI0tObuwemY+5o9bhnQeLB0yEckfjkP8oFTE9EuSA6bpI6dgesIsTI2bidmp87Fs5mqsmJ0lTlP+8rUoWlmKrSXbsWv9XuzZsA+H9tahoRqysySPutzFOoi1Tz1LWfCxmxrwwxBeyS93w/Z9UoVdG/di5/rdWJezEWtWrEX+0kJkzc3DytnZWDJlJabFz8KUuBkYP2oykoeMQ0z/JIzuE4/4QWlIGzIJaUMniiwXjluB3DnF2Ji5A3tLD+AwdygqG+wOBR8xhu69Dpcntia+ZGRfyxaVNa4T9Zqw1HV1kiQmWla4V2hSJ7lUuPNWPzNf/flJ4uYbQxSEPv4170c10CmSQWIdB8sGPio62IhDu45ga8FeLJq4CsmDJyCufxrG9ElC6uCJmJM0H9lz87AudyMqt+8HuAN41KAOm7ESxlqoY6RxkDxVtgF4zYiYUWkBXttpHDBIRg4qC//RqT4e10aMj4LfaIW/Ayf5UPDq4FG+vIysRZ9svxqohJacLUJDdRM+KdqKnAVrkJG6EEl8NNcrEenDpmHF1GyUl1ShcT8HSlsQBf/x7VLzxmoTH7HzrTm+PFdP20ab3YyUjyCcCkvgJErgM+kgUV5qjIxTxIXDlOjcNBOT5eaOVN9iEWOg9sbe5Xh38uI5ETuxBFkHQzRkcZvGT2lrTFrOK7KNTUfkDpp30Q1Ndfb8kDHg4tlpB4OINh0B6g4cQcXuKuxYvwefFO5A3qJCLJywGBlp8xA/MAnxfZOR3G8c4nunIfb9NMwYswAL01Yha3ohSpduwpbcHdhRtAu7NuxGxY5K1Ow7iLr9de0+d+GxKKJkP92zVPwmkr19lAEIZcidMg9ZKxMqX9pifk7AjqekZDuxlXgUjPjoaNY2oqbyIKp2V2P35j3YsXEXtq7dgQ2rtiEvowyrp67FgpRMTB+9EEn9JyPm/bFIHDAOsf1SMbpPojxWnDdpKVbPz8PGwm3YsWEP9m4rx8GKw6g/HLi4KGnGRiNNp9wNAJawTpb6Jn7LxjgYxslg7akIXPTq0NTED/kcMbtHhnXtiNH5Jh4Qq0VTEw+LBSl2E+TczN6t5fIa+9zxi8WJj+mdivh+4zFlRAayZ67Flvwd2L15Lw5VHjK7EUHdFQlY2pxmspHlwJibkHo0cL7JRWfB0Tvl242d9m5SQUTVNMP4qME4aWYE6RAxr86hGVkjG0c+Lm4XRAhzTtl5FcqGNePFR+ChtTt7xmEytkd29dwxOgIc2FWD7QW7kD9zHSYMnYHR7yUgtn8SZqXOx5biHXJYPYAFOkL8Dpp1ghuamsyRxOaj34zLcEFYAidDAp9JB4lGhI6PMSac4L4VEh9Hi1jMxVAugtlblWAbopbBGwHfaLi4hYxPyoNuU0JpaSxISc/cLTY0cGGhI6E8BGFvNI7Qnq37sGHNJhQtKcHqyQWYPWYZpn08H4m9JyKu13gkD5iAlMHpmBw3DQsnLULJ6jLsWLcL+7ZV4vD+wzhccxiNdXwVJkB8QcSC6uQukIu4fr/Iytb2pYnfVNHbQRubR0i63856fWTiOIZHdZDEqloTyjbMu5cdYx1bF5zsC6927IN48/th4Nw8h8Xj3Xsjqrl4mpVYP7ChrhF1h4/g8P5a7N97EFvKtqMoex2WzszEtOS5SP14IpIGTkRC3wmIeTcNk4dmYPaYxVicshKFGcUoXVGGzfmbsW9XJRo4RqGC7auqJJ0/zot6HEE96iQdqtnJLyMnR9AkXz2kE0RG7brNuSfrfxOa6tURMBw1HQZ2bNqFgqUl4rhPGDITo99JRFy/VEyKnYmCxaUo31wtTntjrcXpdYYE6FzQITN4zc6VlY61Cb4+BOq22hLGzQNxGPyBzoeWWxoWSpxwccmZMi2PFlMkWu+R0QLGRwlmzA0dr62aDheHFVdQkUdXyPCPzBfK0ey883bNfPXI3GpKewF2mOK0rmvEgT0HkLuoEONHT8boXgmI7z0Wy8ZnYl3OBhykA2sDdbNBrgbQSeL0CoewBE6FBD6jDpJMU29X4MQLViyFXZQda2DIHjc5g901xQ4NFzvveKuAPaWVWLOkBAsmLMX0hLkYO3wSEj8ch6QPxmLskImYHpOBuWmLkJWxBruK96F2d6O0kxtJF98x0uaciO/jaHcltlvkgsJW8G6wUT62Zyy8LD7qqFhaLJMvEGsX+cVe+5iR/opYaMJ6j4v0sZHGPARrbv2FP367SBwqczhWHi1Z3OJTKk5dP7068qHOsqk0i6UtIw/ktYGPtOjl0EGyNOSut7kVl91Lse6GaKPdvTFdt4StHJpFrD4AGavKjTUoXr4BK6atxszE2Zg4ciqSPxiLuAEpSB4yAWOHT8HslEVYOnUVshfmY3vxbtSXt/yGHjWLy1mzXZlmTJysArNsc1/GPBq2DrWK0BFNXWUTynI2Y8mUFXIYf9T7CUj5aKIcFF41Kw/71lejab/rQTg6I+wbb4CyN4+i69HYSCfJfPuKX43meMqXoGUn0Wnv8EFUzPpFfsqvIS3XndEWVBaFZ9+D//kYnBaGni2Q1lppuhTYyA6VgpjY0DF7UEw7nVBA247IAv+FQK83HoKJTBgbpeyw2OumTBflwjhUHimqZnkD8heuxbTo2Rj1bjwSBo3FoknLsH3dLhfMMiGcB5aHc2EJfAoSOP0dJJ3IwbEIxy0MIS07c+sPNGLP5goUZZXJl2VnjpuL9JipGD96CtLHTMWEMVORPnoq0kdNxYSYaZgzaT5WLFiFsjXrUbmjGg08uElczYLSN/O4WbVXoHBu7FV6CdZ6xsYrtYkGc8aifGM18pYWY2bKPIwfMRXx/SdgTK9xmPDxfMyOW4oVk7OQt7AAm9d+gupd+8G77qMGZYmEjV/gGTk1dhoTjzgcNqYjYi672NCJMWjE2Iph9srcOpLSny4wjo70XekLfmsbjV/i4PXLDS1jfH26wfWGluAXqqHy9H3M+TQXzi3jzyyomTePFkx/TNpIWOXEWNKyI0UZ8UAxdy3oyPGyjxIl7Xe6yX6xWBq3tENIUo18vHQE5dsqsSFvM7IycrFi8mrMiVuEScNmIWXABCT2HYfxQydj0pjpcj5qQ/YmVG2rQSN1mWt4K4PpZSuB2wJmj5oEN+HTtIptB7Bybi7So2cguv94jOk7DlOi5yEzIxebC7aikQ5RcBAFcPXR34nUnSJxgAnHYOVrHCWeOzQ7zmaUA3XIwFvFNq3tTPUyTkIJOEWaFB5tRtMai4br7NdCJxaFcvLNZoQSOXocSIGjS5wspVKo02yhlByzVk1lZ95TdNtUkWozmUvmnCTPd5odJpM3kiWgHyq2ViN/fiEmD8uQ3dLkD9LlS+C1Fa34BofyqLGPNpwKS+C4JXD6OkiyynDOejMzcA5zQshjtMBteJ6JqdpShQ3LtmJR2iqkfjgR8X1TENM3CalDJ2BSzCxkpC3EkmkrsXjqSqyem4sSviG1cj2Wz8rEoqlLsXDKUqTHTkbswCTE9U1BXJ+xmDhsBvLnFGNP6T4cqjoc4DCJI0Bb4a11XPTVWljDw0NAfHYgiyN/9qIlp8uAHKw+hIptlVifuRUrJudj4sezkNgnHXHvj0Xah5MxO3kRchauxbrCT7B9yy4c5FmgQLsTQjnUiojwQtSbIs/+hQBTBylwCWkOGFwSKi8Ll8OFDjmLguEdsDYng3EF54MRhnIKDK9+Sz8V3NrkVYY2Z3vEVqoXFoODqLlsqTsEcIBCkzOlPA62/wh4Lmdz0ScoXlGGxZNXIH3UdET3S0JM7xTE9hmLqaPmY9WUQmxctVMOn9eU16DhoNkVC0TPHQI6DmbPyXDi86J5j28WsHumwkv7LVjl5syU4JmtbUV7MHfcSsQOSMfo3qlI+DAdiyatxMY1m1G+oxJyDCmQuRC5YAaCaIVo4Re1BdZvdXJS5CXoEoUKKguAaR0nisGHZglD8xpbYaqcjDfebrPg5nYC6E1FoCNmbxaCdIFH0nZt2oNlUzIxuncCRrwXg7mpi7FnXTkaajkXTKiuPIhDB3guTdk2j+bp9Oq882yx7jwb6PDftkhAxzQ4bguO/3DY09ZBEgfCGxg6E/bwnvcIhZUm1O2vx+birciclYvkD8dj1LsJSOw7HtPHzEPu7CLsLa5AzY6DqK2sNR810zOf/pxTVMYYHAHqD9bj0L7DqN58EDvWlGPVtFykfJiO0b2SEdc/FYsnrZAzO/KxQbYmiw2coMYU8K/usHCl4A6COE185MLZ64YGYP+eGmxeuwXZi9ZiRspCxH4wVg7tJgwcj/HDpiN3Vgn2FlWjZtdB1FUcMT9k6eLwDFwQ7gCYcOazKIGjjni9eUPxUMVhHNhWg2255ciavhYThs1EbL+xiO6bjKQPx2NK7Gwsm7Zabha2l+3EwfLAmwDKTelwEZKHdFbXpU6mqNkNlDctG/lIyzhXzZyiJqB6z36sy1qHBemLMLJ3NEb1TkDq8KlYPa8YVdsOoK6GJ96DR4uPN3l26Zh3AsENw/nTQQJUIPFgzE0Cx1HspKdZlknukFbWomT5BowdPAnD/jUa44ZNxLrVG1Bf2YiVM9Zg7PBp2L/DfkKAb77x5ZUmnqsz2qGqI7rYQIcsHNosARkvdUKduM2I/nMbnLYOkry+rHchTfoWCSeAfyKV3y1ZNS0bqf2mYvjrSUgfNh2Lp63Eng2VxoFw7aha94CxMqabm1S6USXVIWHNDnTF1hpkzVmDtIFTMPJfKZgwZDqKlhejgT8AySC3LmahOBoufkNkQ+EWrJiViRmx85A6cAJieyVj3EeTMTV+JgqXl6BqK3/syVmZDAX/L/lkHzn/AzfSfJhw6jMtAb1jNp1UhaAu8qJyBCkzs7aIj19rdh/CxjWfYP6kRZgyZrrsuHKnMnXAVMyNX44V0zJRmrUeVTsOeO08gYZAzccpR+QQuPl4huscHdxbi7XLizEnfiHie6UjodcETI2ZhdzF+Ti8Tw/p+pOWKTnCxYR2iYuhPQPm8RFO/GdIwNE9MsysjLGNpRM6zqq+9cCOkt2YFZ+B6DeTMfOjZYh5eSIGPD4GUz+Yj9od/CaWwcaXD/iuoXnXj8V0nMz5xP8MAYW5PN0kcBo7SPzFCfPlET699gxtPbC5YDumRM/EyLfikPLBRNk52r2+orkBl10c/2xBgzhaxEbjbQy4Phmng6R2WGywfYBn6lljn5/pCNYBW4p2YlbSPIx8K1YexZUsX2/e+lIYxmoUeLZicw0yMwrkhyxH903FmL6pSB8xDYsnLUfRyhJUbakGgr5CK98FsQaAr/dy+dHL7FCRcXuuROBc4uH0Z14CVjWNnqkGU+d5GX3RV9S5gPCdI1PHR2qEDwyNNcCeTRVYw49qTlyB9JHTkTBwLEb1ikf6sKmYnTQPG1d+gv2fHDRflXZ0jkllR7HWVzegZOV6zEqYi7i+aRjzXiJmJc7F2pVlOOgtbjpPuC91GA2NteCZL34DRxxAFzHVXT7CoxTC8X+MBKgcqiDecQRjIo2FNy9A6NMDieko2VBdVIMRf09Gv99FY9Dv4tH/0VGYPHA2Du0wZ5V0V7NevGrSol3k793xaINiCcdhCbReAqetgyQbMXRSqOMNkB9J3LRmO8YPn4ZRbyVjxpj52JK/DXXu7wDRmvI/D9TKoUu+JcNdJy4UTKu7w9jMGL0D51rBi/O32RNyNdAy5xrQELRlu297BeanLMHgV0ZjWtxs7NlcjobDjThccRg7SssxL30Zkj5Mx6j3kpE6eDqWTspDyeoN2LOlHI2HQsxc780vvt1jrIq8qWXfPjLnQozj51uc1g96GPIzJAGqj+hnoANvis2r2PXQf7wpMGnRIfsmF6XBGxCWBYfGWqByRxU2FGxCfkaRfGk8pd9ExL8/FkkfjJOXBdauKJOXIA4fqAU/XVR36Ah2lu7GrOT5iH4/EbHvpSAjfjFKV21A5c4qo7JKiA5PfZP91Jd19gTb3aAAACAASURBVDkpvc8vGEA6TPVyUN58KDXErFGM4fh0lYDqqsOfFlH/5AZWXmYwabHh1onnD+7OG78QQ1+Lw8A/x+DDJxMw4I+j8e/f9kNsrxRUbzvgbZqqLUd9I5qO1NldJIdoOBmWQCslcJo6SLwX4F2B8fzrquqweMIyDHlzFCZEz8DujZV85OwHmWU08LxD5scT+QaL3Z43HpO8yiuvZ2srrid0iNQ465au+CNa6ZthmXTiIJnHZ3JQkW2cNYVfWZ44ZgZG/DtJvl+T0H8CovukyG+I5S0pQvnWKvm4nfXNLCdcHGr9N5u8p+ikY263TKyMm5icmeftZm9NDU0gVDj32ZcAz72ZtwiD+0rfWp5GyU2DOlK6W2OgvV1I6hM/y2DvGEya+hcY+I5BTfVB7N1WicIVZcgYuxjR7ychodc4jOs/FXNHL0Vqv0kY9VY8xg6bgKKV6+SDonzS4QaS8W5EmOF/nU+i3LrDZfpH5423NWb/y/iELr5w+j9bAsZ+GVsmb4+Kw84PRZqb2YaGRvlB4PIt+7EpfzeKFn+CBamr5COrI96Olq/Y1+3jgTsxjP5Ng+we8THbf7Z8TgX3uqZofCp4ONU0T1MHiRPF/N4St3TqDtRhQ+5G7Fy3O+DuU/wHSlDsK50q/uSGPoH2FwJu1YrddxcKa5SlQieV2awxBwnl2bUZHioId7R4CTn5eJl960fbmCp5xFa4eD0mR89CycpN8r2PUB9bNK8V64rA2HWILCHFaWPpg6bZwqwrMvf/m5U4SEwnLeu+veOmj5fg8eHSkfd1RnVdFUOce9VTV9dtExfePN6gbrPSNBInSnYvzQIW0F/iOwTs33gYRQvWy/mi5RNW4+C2WuMBOcDEZrg1B2ktdvkYoMhAKnWS2rlhvSa2IHV+OFBYc/CGkydeAsenk6H4kdFzDpNZ5SOoTRrdUB3RG0CvujlSNqCaHAZqK47g4D7zYoE+YWMfzM0yNe34Q7BMgvPHT8HHILyfYkUPHg9ydzL77Pf+9Emdpg6S65FwmIIU3Le0IkljtrWwZeH6A66TlW30TtXUmt0a3ZvxJ6uhoRgsLWaPFajkCidpN+87Ocp98JxQiopCyZ3sCeTiPxmTwsXp0tL+tSdWnC4+N90enNrGxaN0WOemFbYtMdu7O5uKj7Gmj4ZP9SMkDCvFsxdGjbLJlhI/qsXd2UCt9nFYrCH0VZ0uhQ3WSy1vFocE9AsNRfKjc8+coVInzaNLQE6W4wgqW5WvxkSpdceB3sPh4j1ZuF0abro9/GvfNW4PjpbamJHlm7zmm1OeUdTxNAoQ0JxFXlA4jpGogMHoW2hCGn3W4xnUJLPvaMo9XO1M6DxVOWu+negCmqnMFbfmA4BOQSaYj9ONv5MtktPXQbITxuwL8QyRYxVtnRSxWKpYaA6n+vusWmliThP3H18B5RU8fVwY917XOFP2DpfknBDYxkxV8hyMW5toFzQmh5rWWGHdCn5MUD8oaM4neVAqCLegTWkqf0MDH9e0bnFuC3IXp06ytrRvDWxLeFsqbw1OhWkJR0vl2u5YsdveTR+rXavrqUwSgrVKD2trvRMrqMY6jTTvxOrQu3rOOWN0X/WfDQwSlnPRMr8npg/ZLG3F62WVMGMnEO4EhWCZB+dPEJlPBc3pzrvayGbC4PDq2LtxQGFgK4OLesTPPuhFfQpUDn2eEFgaiOtYuaPJ9Wh1x8LLerZvCcfR6lqD+3hhhC/rbZqnMEaKp5qv4+1XW9qfvg6S7QUNMOdPxf5qLF6xDAXFRajnIWl3Ion9ZEGw4WWFe/lmXJrbzZz6+kbk5OYhc3UWDtTUBKAOaO/StGkTcUkwB2AZyzN07gxY6sXr1mHBokXYtXuP9CoEmgCaZvI7w+g2kMOr+tMMDdizeweWLF2A9RtK7H4zgdsXVPE1rqmpQWZmJnJzc8Vxah/W0K2IOz8/H0uWLEF1dXVooDaWKt91dXUoLS3F6tWrUVlZ2UYsocGJW87lNDZi27ZtWLVqlcShodtWqnyz1datW0XmJSUlqJffImsbLoVWlfFdlCbs3bcHWTlZKF1XgtojfK1eNTRIZ7RxMDIt1wN5fLxhm9YcPoD8ojzkFuag8kCFzAfOADPjCERaPE9i5smxHCRfJvy5miPYtGEdcrKysWdX4GN2ZbEtsY/btFq/fr3o4e7du9uCJiSs6olW7t27F4sXL8a6detaXAgVtjUx8Wuora315ifTxxtcuRw5cgQFBQVYuXIlDhw4cLyozXEAyzq7sHnzFixZsgw7t9ufFmGde0lG9dPYdfMCvzXaCmt/o1LPnpLRfeWVWLE0E8XF6wKOJB1vJzj/KyoqkJWVJfaFN5MnKlD2hw4dQmFhIXJyckD7eMqDLr4qa9kbMPJ39fCU83kSGThtHSQ5C2FsqnQ/NycXXz37bNzzwP04UHvYmz6ebHQQWaDpUDGriZd1jHkU/Eg9br65Cy44/yIUFhaZQv3r4tB2TnMuAeIU2Ykqj+i0DZeExiY8/cyfcebnv4iY2HjBqtUm5hKiiFkSHFjGer1oLDgxmQcS4mLxuTPOwEsv/D24YZvzqvQac7JeeOGF6Nix43Et1i4jui2dl5eH7t274xvf+IYYBBemPWnyrHzv2rULjz/+OK655hrMnTu3PegC2ri4uRB9+OGHuOKKKzBgwIAAuPZmlG+27927Ny677DI89thjqKqqai9Krx1tnK6pM2bNwhVXXYUnnn4ae8r3WRjVK6PJxjkP/OtPFsI62quqCWDT5k24/Y7bEBXVDWvWrDG4HVBp5nEViMbUEdjotnGsDCU2oaP40osv40dX/BDj08b6FS6+NqZdmT/77LP4whe+gLFjx7YRS2hwV1+I84wzzsDf/va30MDtKNU5RGf6vPPOQ5cuXXAinDuyonLZv38/7rzzTpmf3ni2g1e3iWd3Abzz9rsil2HDhrsgNq2KpfrGNy9rUYdaOWfq2W5VXQH3FX3u7Pk4+yvfwMMP/SoE7rYXqUzYcvbs2WJXnnzyyRPkOPp2i4763XffjYiICHFO287pCW6hcpXH9NYx4seQ7U26Z1hOMNnTCd3p6SBxLPSkHScBgLzsXJx91ldx//33o+bgQWumAw05xzPAEJsxlTKvTnDbCik0DlKnjjfjgvPPR4Ead0PWv/PxmrCRoSsgilhWIXuSW9NicBrx9FNP48zPnYl46yB57aStznIbuyuaC6jlEluhAEiKTxQH6cW/v2g5Pr7INQZFRUWeg8Q7yuMJhn0rcECcIjpIZ511ltyRHR9u38gQz549e8RBuvrqq0+Ig6QLEnHTQRo8eDAuueQS9O/f/3jYlraiSRSODXSQLr74YnGQ2r77RTxBl6MvM2fOxA9/+CM8+eRTKN/LX7NVcCq3fxkHxez+BM8wF7vMAztPN2/ajNt+ejuiunVHQX6h7U0giYBCpe3FxEzHn06SeQFCdbG+vgEvvPgSLr/8CnFiyNPxBOLVi3j+8pe/4Mwzz0RqaurxoA1oq7yPHz9eHIHnnnsuoL69GZfv7du347zzz0enTp3Am4LjDcoz8XDX6I477sDZZ58tuxosc+vbSkvaqk0H8O7b74hchg8fJqjMiwDB2qbaTI0wxyFMiS1XZbRvaypPGRkZOOsrX8HDDz1kinxzqSBtil1tmzNnDn784x/jiSeeOCG7PILbEqCDdNddd4nDy5tThuOReZs6GQpYbILc5fNOPxREi2WuzFoE+g+oOD0dJCs4UQ4r6dzsHHzjq1/DQz97AIcP6NcUjUH17zwNMP8e7SJ6mZByS8M71CO4+eaOuPiiC1BQkB8wbIqH6mGmr09TqBDAVHox+TbfLTKO3rNPP4MvfeGLSIyN83ErYm9niEj0YqUJHhizQotnkAhnQkJsIj7/uS/g5Zde0aLjil1ngJP0oosuws03d0bLDpLPazDhwBrKxPaBDlJuLqK6d8c555yD7Ozs4KZtzgtqIQDs2btXDBgN2dF3kByGWqRoeqGGinKgg8RdnhOxg6Qc6KLft29fXH755fjjY39EVWXgDlIgrOaCGaduuDrKx9E8mwHMnjkDP7nqKvzl6WdQoTtIisaNPT0MxO2CMM2gfG/e9AnuvONu9LzlpygsWGtrFcaorsIGVHoZYlT9tw6SreP8fOnll3Dl1VdhbPo4u+PqNTzuxF+ffx5f/MIXkcbdqRaC4V0l0AKQLSas9jV9wgSc+bnP4W9/PXE7SEqdDtJFF14oC+quozwe9HnXcVAMgbG+oMLS/Qf2y27Gt875JgrXBo5nYKtW5mSx9e3We++YHaQRI42D5J5ZUylrLBQCMs1pcpNDw6y5s3D217+KRx552BQ5dQrTpthpT+fr2uuuw+NPPCHHMVrGcwyGvYYcHSOX9RvW495770XXrl2xpqDAgzhlCd4zca2xwt23dTv2rduAhv3VQB3fGKSdscHaXua8nmvCkZ+C/6fEp62D5H0Y0Qo+NzcPZ3/1bDz0s5+j7qD+LAGP4JnDpjIsHAjqmj23ZJPOWBCAg8oFg58E4K5IExrq6xBxc2dc8oOLUZSvxkBHlVjM44cAA+4Zc7u15GgGlcoYG6MsTz/zNL5w5plIiDOP2IQhohcSBj/5MecyLLuWvKkNom8dO0KmxCbgi2ecif974WWnoeJsR+zgLiosxsUXXoKbO3WWx5A+32SOuM3ZALPjYBlmZEVi9iAsnLyuzclmJlVeDh2kHjjnG99ETnaO5b0d/Bohyl/9hs+e3bvNI7afXIN5c+cb3ERteTMJ8m4Od3oM2y6wgekTe2COeaoRO1JXh48++kicmIEDBlq+2bCdvDs0iaxfv3647NLL8MQfHkd1pX82SymYUzzkibprv+/CSg+P6jdjI3v9vPusmdPxkx9djWefegbl5Xst723l2zYLijZv2og77rgLPXr0RP4au4OkfIk+cAlUeZNvy7DHNxPkWflWvppQ33AYL7/4Iq760dUYO45ODOsYFKYtsUfQE9nzz/4FXz7zC0gPdpAI6vGuMnfOP1ouXF6oJ3rOiuXp48fh83wE/lf3EXhb+HVhAwhix7btuPDc8xHVuSuo8wHB412/HkXZm28KEaMERS1jYfTG6HsT9tfsxz1334Nvf/1bWFuoi7U2aE/sO42k/f7bvXDmGWdg5AjziE1ex/dGxPIneWOr1Y2Q0eMfsiB9ZIIwdueRNwJzM/D1r30dv/rlLy0ibdAOvikbbQ6ADtJ1114r9mV/jTmbxWovSEZ5MnOURQZGmXZUV7TFfAl844Z14iB16RLhOUjG7rSD73bNjSA67DtfCrIdqKvaj+X9+2Huo7/E3j7/xuEFs3Bo4zo0VQfeyKkdNh8aNG+Jm2+12Z1bWldB6knttE2ctg6S/giTUSyAZ5C+edZZ+OP9PwP4dVQJHFDXqB5LzsTGNmZC+Ya2AbfdeCOuOe987C3iYWcGpUx4zVtNMTNTZ6gTK5y2MS1ff+ZJnH3GGZie4OwgBeAkvF6mjfmr9LROY+UNyIiLwzfPOANvvfyCbaht2hKzKXEbI6kc7C0pxrXnn4tbO96kRQ4N5SWoyssqfYXT2ABsLszH3VFd8b2zvoLiPN21c9sQjm1CxcFwzCssUFexDy8/8Rg6/+gKZC5cYHFopHy4sdYxdnErDOViQ1MDkj/+CNdddAFiB7pnkLRdW2LiJLwfhvXvg59ceiFeePRRHNmvO6VaT1jliXFgW5O3jpM2ERjqO7AkYyY6XPkjvP7002iotI/YvP66fBOa+I8W22rLw55tn+DBO+7Afd2jsH1t4CM2hYR+/NUvcFKqe26ftI9H8Pb/vYQOV/wQi8aPd/qtPLq8HyvtkLTJ/3vuWXztjDMwP6WlR2zKm/Lj4iA91rt8M89xAGZOHI+zzjgDbz73vNPoWDwG12s/HRQAKvfswA/P/R5u63ATmvaYF0ACIYjHtXXEEwoX4Viu/QRwsAaP3HkvvvfVc7ChuNiiZb22bykO5p15Bi03uWHvvIcvnnEG4kaOMAXq8NuciVSOqtOKywVimfJteMrNmIv//crX8ehD6iAp38pDW2LS8ukSd5cfX4UXnvoTGmsPO4woTi1Sefptm+sJYcmbOWBftWkjfnvnXbita1dsLHbPwhKXi78l2QeXa5v2xsSnOMlqPZCbibX39cDa6y9BXveOyPr5Pdj2zuvYN2MSDmZnAnv5qJd9YlP+BAb1z+CRs0v21tOVigE+Pf+eng4SpWd1WrdOc3Oy8IOvfRW/79AB2bGxWJsYj+K40SiJG4Hi+GEojh+O4rhhKIkbjtLYESiNHYnSuJEoiRtlrthRUlYWMxKl0UyPRnHsGBQmxyEnJR73X3ohIr7zTcwe2AeFKfEoiR3pXKOctFseKk36HwsPxfFxyE1OxAs/7YErvnQmhj33DPLTUlEcF4+ymNEoiyXvI1AUPwqlMaOxLno0hL/YEdIv9q1E+8L+xBBuDEpio1EUH481qckY8+c/4aovfg5/u+925E+dgKK40dLPQP5D8emWsX+UmaUXF421SYmYN+B9RH33bNx5+XnITItFUXIcymJGoSxmBErjDN/FcdEojYlFSRx5GoHiOIPHjAH7MRLFcSOlj0VxY1AaHYvixBRM6fcu7rrucvzk7C8hvXcvrE1PC5KxyrylWPk3vBeTf8o0MQkrhw/FX3pG4NYLv4vEf72CNRPGylizj0Y/hqOMOhATjWLqUvxorE0wfVoXPUL6x3HgVRI7CkXxRlfK4hKQHxeNvk/8Ct3O/Sb6/fbXWJOWjOJ4jony08aY8pGxjUFRYiL+9Ydf4oYffAt/7t4Vq0aNQFFygvBQEjtceKdOUHfLomOwLpqyZ/95jUZx3HAUxw8xfYyOQWl0DIpjqQ8jUDI2EdH/eBmdL7oAL912K3KHDUFxUmwLfLckc7d8FIqF7kiUJcVi3kcDcN9N1+KBa67C4t7voTgxVsZd+BJ9HYGihKEyF0uj40T2hm/Df3H8xyiOHyp9o46UcGziRqI0fhTy4kfjrz+7BxE/OA8pf3sea+NZN9ryrjy1Tu6ltAMyj0bJ3CucnIyn7u2JC778RcQ89xeUJCSiJI6yHInimGiUyDwdirLYj4Wnkpg4lMSMQSntSMxIsT3sV1E87UoCSqON7SiNG4ay9CQMf+F5nPflL+Hvd9+JgoSY49AV2ixjJyi34tQYzBsxANec+03c/qPLkTuE4x5n59so4bU0ZgTKYoeY8SffcWNQEm9sE/WHY0O+aQc5F0RP4oaiNGEk8keNwIM3dsIV53wbU/r1RmlqLEqpg6LnKvOW4uCxIO9sOxzFiaNRkBKPtx55GN/7f/8P7z/5OEompaKEehs/ROwb5VhGGYs9Iq5RKImnbR+GsujRwmtRHOcl+xlj2sQOMzCJsUh/9TVc+rVv4pGISBSOS3T4DuarFXnqQfwwrI0fjsLEOEx67TV0v+wCPH5Hd2SNGY2yuHijC7Fm3SmR+Uh7wIvrk+op+af+08ZSr6jj1AfOi8EoSonGioED8bsbb8TtV1+FqX37oCw5SextoG1pSeYtlbeijy3ZLtoT2nnqehzlPBIbRg7Chnu6Yee1F2PPtZdhzw1XYvP1l6Dwuoux4c4obH3lr1gfOwLlmStwpLxcdoqbGuvRaJ8c8KgCfzZIjyycnm6Rz9Xp6SDRX+ZPgDTpfRiQl5OFy845G/dc8AP0uaUnRvfogfhuEUjo1gnx3TogLqoD4qM6ICHqJiRH3oSUyJuQ1O0mJHRjeUfERXVEYreOSI7siOSunZDSrQviunXBqB7d8OHtt+Le73wLUd8+Gy9064SRPSOQFNmxXVdCtxuQ2P06JHTvgJiorhh06y349WWXoPPXvoQ/3fATDL6tB+KjIpAS0QkpkR0QJ3CdkBTRBWldOyMlgjyyH+ZK7NZBeE6K7ISkyJuRFNkVCZERiOneHUNu6Y7nr7saEWd9Hr+68hIMvedWxEXdbOHbxj9lkxhlZJnUvStG9YjEPyM64Nb/+Qru+P7Z6HNnN0TfEoGUyE7CY1K3joghfGQXJEdEIqFbZ8R0vwnxUTcK/+yb9COyI+KjOiE26mbERUUguUsk4rvdgpcjOqLbRf+Dzt/4Mt6I6IKYn3Zvl7w5Thx/0k7sdjNSu0VhQGQkfnHZBej5vXPwYucbMOK2KKlL6nYj4qNuQHK3m0T+yRERiI+MxJjunTCmRwckdeuAtIgOMi6iJ5GdRL+iRVe6Iq1rFD7uHoVHb/ihOI7P/vgqDO/J8ezcPt4p8+6G/+SuXRDT8xb89vorceN5Z+OXl/4Ag6IiEHNLV9HbJOpVtxtEj+O7dUFKRCRSu1JPyWNHuWK734iYHteJ7qR1iRRZJ3SlznRE4q3d8NdON6DD97+Dhy+9GB9FRSChR1cktlPPqS/xkR2QGNkBqT26oldkJ0Rd9H3cesF30atLR8T1jJA5KfOvWyfEdL8R0T2uR2JkZ6R1jkJyRBfpF3mX8etxPWJ7XI/kiM5I69INSV27Ip5zIepmDO0ZiQeuuhydv/e/eOmG6zCmZzckdDP9aus85bhy7iVHUHdvwug7IvDQVRfj6m99Hc9fdz1io7oZfe1+E+K6dZbxT+52LVIir0diRAQSI7pLH6j/tC/x3a9D9C3XILZ7ByR37YGULtTjTkiMvAEpPW/Gix2uw1XnfBMP/vCHGHoLZdI+vtlPw7tpH9+jI3r17IQO3/8Wepx/LvpTl6mnUR2EF9q2ROp5t58gOaIDEiKikNCtCxKibkAS7WPEzaIzMd07IL5bVyRFRiIpqhMSu9+AxKgOoh+3XXAprvv2ufh3105I7EH72aF9ek7e2TaK8uqAEbdG4LdXX4mrvv4NPH3tNUi4NQLx3a+Ri/qRFBGFZNq6btQvjgH5vlF4l7GLpD3piJjunZBAviO7IrF7ByRG3YD47p3xfzd1wDXnfB/3XnIFRt7K+cO1oG32UPWKfY7rfj1ietyI0bdE4h833Yhu3/827r38BxgcFYXUyAjRA85P4ZdzmjzTTpPvbpQzbfn1iI+6DnGUAccmMgKJkV0R1/0mjLnlBkT37IJ+nbvgvgsuQPfzzsVbXTojNSpSdFV5+TRjzu/YqJsQ24Nr582Io53pfhOmRv4Ya7tehfKOV6LqxitQff2lqLruQuy77kJsv+5yZP7kCqR3vhEzXngOm1euQANf7qFD1Oh/X4/7Hzy8ECqwNHRNKOiTX3baOkgUE58q11px0UE696tn4U89eqCc37dZk4/KnNWoylmFypyVqMw1V1XOSlRlrzBX7gpU5a1AZd5Kc+WuhNTnrER19ipUZa9GRcEa7MnPwf1XXoEu3/sfFE9JR8XaPFTlrvJgtU2r4rxlqMpbjMq85agoyEP5mjV448Ff4KIzP4cJvd7BvtK1qMzPRlXOCrkMb5moys5CdVYWqsm/5Zu8S5p5lucQbjWqcrNQmZ+HfcVFmPzu27j0zDPwz0d/jYpPNqAqN9PgEHi/v63iPdfIqiovCxVr87Fu8nh0++43cPdVl2J3QRYqC/MNDxY3ea/KXS28yzgIv8tRbeUvMcdF5L8KVVmrUbU6F1VripAzIQ0/63gNfvyVL2F5Wioq15W0T94ce+JfswyVuatQvaYQ2xYsxMsP3Iuel5yPOdHDUbGh2OJejsq8JajKXYaq7FWozuY4ZKMybxUq8814CM8cG5V5biYq81ajMnc1qnPyUZ6VhZGvv4gu5/8PRr3wd1QUFYHyapV8Q42JyJy0s1GZvwYfvPQ8Olz4Hbx8z13YtmwpKtfmW16oV8tQuYZjRJnnoIr8U09F7itRmb8clWvYvxWoXp2N6qxsoy/ZK1FVVoipI4aiy6UX418PP4jdi+ajqjBX5k+7eZf+rEBVUR4KZ0/DQ5E345cdbkBp+lhU8ntI5IvzjzqQT96XoCo7E9WZecJfFeej1q9Ziso1S1HN+tW2b9T3vEzszc3EP//4e0RcfCEyBvSXsaiiDELJszVlMvarRE6Vm9bixV8/jHM//3lM69MHlWvXoHJNpuhDZR7pk8fFqM4l75Qn50AWhHeZp+R7kelr1hpUrWY9cS9D1cZCpA3sh++c+QW88evfYt+abFQWHAff7Ft2pul3cTZK5s/Edd/9Du75yU+wd948VBbkGL7zOSfI+3JU5y00tiY7z/BN+5S73OCRucnxyUJVNnWBfV2KqoKV2LdsEX7btScuO+t/sWpSOqrK2K822hMHvjpnOapyDO6KwmwM/vOf8d0zP4/hr/8LVZvKUJm/GJX5i8R+GV4oQ7ahvLLsOHDeGhlQt8T+5Og8WI6qNctRuTYbS4cNxyVf/hb+cNs9qFi31rR1eGlTP2SMaVuov7lYMXwYbrvsErzw4APYsXIlqgryzPwTuVo7ncsxoo6Qb87P5SLXyvwlZnxoM1mfQ9tCm8R5notPpk3Hn7pG4mfXXovsCRNQXVzkj3d7+W9vO9UN2sX81aignc1eiNrMOdj3+IPYecNl+OSGS1F83UVY1/kqlNzSEcX33Yaad/6F/XOmyRp6qKIcTQ2BX06Xs2RHOX8UdpBa6fTxoCMPqDXI4V5gdWamvBZ63y09gMN6NoPP4fQZO9PH8j1Zz+ehhLXP8MhPQwOuu+IK/O/Xvo51esC0lXw2ByONQF6e/P3vhPfE0fq8na2Cnu82R2RLFI6xqo/fz9SRowT33555pkUMbasgHRM2FhbgO187C9de+UP/UK1WSqz8KI+aZ6xlbmwPPAIozMlGx+uvkU8U5GZmBWBte4Y0qAdGLtV7y/HoI4/govPOxYKMOQ461uvYK69OtZd0eWYh8zbUN+DDgf3w3W+dg0G9emnpccSGZ0XQ5+138L1vfRt/ePBhHKx2P9AXzFNgO9N3hQmuM/zPnDEN5597Lp743W+xf5+eQVLK7Y0N7i2fbEJk1y7odMMNKM3Ps8hUxoxV7gY+kBrrQ/Fu+9HUgOf/gSlUowAAIABJREFU8mec973vYkJycmDTdueUJvD0Hx6XOTQxPtHB5vJJ3TJnihwAmyScY0ukVPsLjEtLEdx/eeLJ5k3bW2JfpNi9Yzu+9eWv4cYrrsb+XXoGifxYuYlMeV7T7QvrtN5NkxnmzTyqr6lGz4juOOOMM1FUoGfKtF17GGdbn7der70ucvn4gyEWmcpRcQfCm1K3H26atcybsgUzZwju++64z8GteNsTE6/p+6LpM3H5+T/AY7/6DWq9l4Vc+gpLeNPGxMqflikfzFN/gO3r1+OOrpG48eofo3iNHoxXuFMRk2er99KdI6iaNg5renbG+uuuwPr7uiPvmd9i06DeOLJqGer37gQO77dtqEf6Uo75Me1GPS8T3BXBbQqdZDDUKcmftjtI5i0wfjGag2S+MPy3v/4dw4cPx5EjPNRGUQYpnZWuCjk4NhLWdvRsOfj8QnID+vbri3/+43Vs277juAeC9ktfBqPHnJiSiGf+/DRWrFruTJpAMsorpwrTGrTclBre6TgSL8tWrVyJZ55+GulyeFVbtTN2CaMJO3buxD9ffx29+/RBg/MNE2WQXPCdHd9JbU5X+SSkGAJxeJuwZesWDBg0EH9/4UVJN2/ZthJh3fLPj9zFJSTgrXffAb9ILcGIyyJlRt9QM8bJijOIqGlk5E3++UbVEcxdMA9v/PsNzJ13Aj5CGUQxY04G3nj9DcQnJODwYfO2prJuJGhkbt54ZEmQwtgCn2fDN3lfs7YA/37nTSSlJh3jFWWDti1/9+7biw8Hf4QBHwzEtu3b/KbKvAjYlbnvLPvATBmtMvpu+tfQWI9x6ePx77ffRFZutqpfYLN25MgaQ1pyCp579s/IztK3KQ111hGGXPCGzXPyvD75cAaTVlDrTTo7JxtPP/MUxo3n5wlObKiqqsQ/XnkVA/r1R/V+/40qpcPYn6PWshi2QjBiKsx7bsChusMY8vEQvPDiC9ixY3sI+LYXWW2VhjNmzsDTTz+FJYuXeIiUNY1d6QsQK0IGI2/FX1i6Fn/7+98wesyoUJMjJIZjFao9Lyouwbvv9TLzs66lr5eTE8rbv2lrGT+PkhjO9+7dg48/Hop+/frYOWSsZsttT26N6DB3e2x39m/dhvm930XWG69i98ghaFq1GKgqBxr4GM0MDntsXCPOb7sQypkjc+4o5Nkjf8DtrDm5/WoL9tPWQfIkFWJSqDw1lg5rxsJzTCXJP8xogQwkh5DOkQ4n48DgomtLWogG0LILsIfeYmPkBZox7pjRPDl8uzDkWyaSY6iFfw+JtgwQXWt5FywEFgZIyyVuaQQh880SeWIfDO+KhqhMoZaYPuodUzDnbvu2pANk7nERjN3y4gmY/FIH7OT2ypVnxj7f5JnjE8y7kYHf7zbx7cnHjrkIP4hvRajF5EkOPJJ3/uhskH7TJvHtXKtRhl/qd2g9VPTtiYUlbShyVyat7FinImNa3Ol6NPB1f+qy8s46K3+OivmwAguU72DeWdc+mSu7GqvkPc6VJ5LUtEdN9cXnN7DbbETuXa3wMNsF48TwLeJ0UAtW5Vd594BYwZ0k8wPF3nxhscDwj5U1k147JaCIj493xdYsVl1Q2m4sfDl8s075Fj6ZIe9U/BC8yzfABNCrVrDWxMKrCxjAPAXNyzr7HhwT5Im2xX6Kw+XZg1O5ahyA3JsJHrjt3qeV97gRR6cB+7dvQ8X6MqBe3yL35U2eVMBiNpVJHRcPWYiEB+uhCAF0aopOXwdJFcqXu8g/WEwqWxO7fy1kIIBXqEbMjYNxn4i8iz/AbAbPKV2Aya8NTlJ1T6usJrnYT5ByOfJyks1k7/JGplxYN68VagJ0WBVey4Px+R1tZcoiMHgVuymUnBZZdCbL5ZgcmBAEosUSax1j8UDECph+BwC2NWMRkwtjbs3ej9ARWo5wFbdUWkkqoBMz6a+R1BEH1ib9EVOkbYtJIxAVSwL1UcaeQBaQ0qbjxtgLmrQxQe2SYyGZszg8gky0PxhO/fb65SLhi5VEr7QcYCNJ9iAwKIjRJkK5wZeJVARWuoCtSistAjPNX7bjP0HLPy3wbvpoDi54sI4NkobifPt9N/3hX2nRKv6OCkQ09iKbxoknT+TO0nBgTJGBNPz77VmnoIZ3v+/yppSnZxbvURk7dqXS8mNKhbppnTOi0EqyLBnWW/3VIsKwXmPpu9m30yJWG3lYp/XY7J0UCN7E6JOcxkann+wAmdXAtFx2x0jrvXIFDGxm2mhbA6NN/BanNnX6OkiUVJCaSZFK0NZTkYzRNWrla58jWNuG81+bE1rVV2Ot81taIgHa4Ne2lHJxM614jx5b/i0QI/KlbVwehS77IjsF/hQlhuMJnPLKLwkH0CQjdm4bvhxh2qRH2+mDdoB4dYqxmvkA/AGNmbEEW4y9BpJQfMq/ZSGwdSDLypoXu/y47TXtUdQCxscTFI+VB+Wj+5oeaoWxBS3xaOaBeRAkMvD6akZVFjniUAF5vQ7VAaXecswanxcDp2U6zoKZhf4uvVBluS2W2Cx+Zrlx56hxpezSSb55SfASjp5oXdtj9kPlLphd5pw04dg3Xkw7VZ4sXM7IiQejibazZ1sQQWBgifKu/PgEfeKUKXmuQ5NchPXgrFi9fjPBy45ZwFhKI218tDiQT0EWOLDe/KfcyZfZNXT4sjwQEzWgDvw5WsO28q79F8nwj+Vd7aInk2B22pgnau/ivPLmFjkj57wsjJcgEWowd0wdB9AU+7xaCOm/M0/YFX+GaaP2xIKoXX/oaPLiRx3FUWriCNTJl7WbGowQKAu/83SQ9Mv9VnNYb4OCat5vZ3E4qDyYU5w4bR0kCpNKQiW3ei/y9ITKQit8I3hd3hXaB3BxBeMzbS0qi8+MibZ3Yxd36LSZEpwWnDaGd49nSyyAplUAWcC0p1RI21ZhSU15Z5niVC58PdKWWtP62Ex3w7PSdWmRhsFG/qyVYIEAMVbr4VkQjy3lQvEp/oCOCnbWKNKjxT5GtqCsKZ+QwRJTmhorrMkbmTOtmIkvlMxV9h6gWAlt1cbYWhilG8CbZmzMiP2kmSIV5pUaf+nc/KNBcwBkeaE2Bo+XAikGN9a6o8WGvtkFMLJzSRCbBsVMbB7Tlh0uHoZv7oPYp8jSmNCybBg0ikRymmGsPLplR0mLjtpmwpBBr1h0zjKvlySsSFnvO1PsN2eN6b9y4zc0uDXv4ZOCo/DojaoL48wpH5EQYFZ1Vas0JimtN98x18WapSYoFY8tbRxE0pc1AbS3oWLFqLFFKLoeSJQ15KveOhFKWvlmnn07InpiZG348PtFmKPzTgjlpe2xO8aeMGUThTck5JwXNdmXiumHWQ2o30a7bd9NpdhL3hbwH3vm9YGIpFNMuBZIK9oSE7Y9V5P80Drnt7ArjyprgaZa87tsoRxoeRTH2aFX4E6TdttKwfRRC6W/fpEHc4oTp62DRLlYmTkisoOlJQRQXRFBs56q5poL39KJbfSQegmLzSqolzN5oahVrYjJtU5jZdPEoZQ0kAftnYl9vo2Gal46GoiaOYtKahWkFfxKM/1DeG3rESXfRC9Ahq4HY7LBE5ASEIacJh46beLFPjJf1obxlvOKXjvo+2ZOB3xePVotJIQF23llR7NuH1pozmIB89nxpKXoWBAAo3nPeAUTYu/9f0JaeNLP9FsEQoBwZh/VW4OUGOcCDVfIYPCzSsH92OAnhKkPzCs6mVMWwtMDjwmFMhgsKvuROMVn5qvZzg+Cp2wsLqHj4TU8KbTPs+qFqVEorVd4PyYP9hLmzB2zXx+UcsANK8RsLyXmNXHqgsfRgzEJbSqxEYtU+OWa0obMB/LNvCceBXNi6SZbSYJyNQtvkIa5LcSSeQY2mAUHkknRk2DenXwguOVdeDF8C+9CQwnZPqqELaw5+EveDefNNdu0MzaoeW0gHzbn8OlSV30NbqOsUDb+WhOalszLJuPoa4+UQzO3lKKzlqlOeXEgB76sDeMt543whIL2sYU4GIYU2aN62T2iCeHHHrnXZ79rJKjpbPOfznxK3ebEWVJihn/Tb6cvWqCxjrUDcqqTp7WD5AvHVz5HlmIjdDyMLpkB4iB5izSRaCONvQKfgmcIbJGCtjV2MTZP8/5TL70zMOwRlrTM1A/BM0VAAPNHUJs+OlSk3kC0i2+lIXiYUW7M4muJeqIyNAjHPpn+kCdzBU4OFbllMYhp4mgf3x4+YYZ/DC6fgFSYrCY1dpnSslCxjyxkKlSTtpS5YxrozND0qS5bAfFtQl5igFyhWWeC3Sdx+cNMoDyCdaYtfAraYAl4CJhQ3XaBnFZkUf5ZXqUt9YR9CtIXRWGbGzkQv4PPwggaVxQtpBWlH6t8bNyiI6mEgmSsrCgDPuIA+QeMYQCMyWjzo8XNm4XgXVZuC6m8SZaydZ6Zy+MRzlfrVIeQqdm9M3s7okMB+AK5ORrfoZuRttUVGXurps2Are6ynEkxMUywrTMvAtgx9eZ3Fgl39NA23g200WFlyvIYioyAU2es3njaS40I1Y4NVDaMjx4MN2ZGnKy0qIpFbn4f1Th7lL43hsFcBzNju6HFXq+0QGNn3nowpzhxyh0kuaOhYDiBg8LO7TuQGB+PgQMGIDUlBeX8dHlwUOHa5poNBpO8Q4K/yj5nzmzExcVg9uxZqA34XZ2QrVtdyB80Xbp4KYYOHoKPPvwIGRlzcPBgjW3PiRFqcphqh0W/QDtlK3fv3o2U1BSRC+WzacNGC9ustaXZysjScceisnIf5s3LQEODM2EDyDDD/gQUNifoVC9duhRjRo1GfFwsYmNGY+7cOTh0SL9t1bxpq0qEBZ9IVtZq5ObmBjR1+xVQoRltrrEt37ZtK+LiYhEXF4eYmBjExEQjISEBSUlJSExMxLJlyzz9JY3GRv+V1mPStDRqDhzA9KnT8OGgDzBixAgUFbm/xaQMOhYkiEcRP8sCLgPU2NCA7KxsjBwxAh9+9AEmTpiAXTv5m0lm3h2LR+mPZaG2thZz5sxBdHQ0Zs2aFdBvWbSsk7Fzx06RTf/+/TF27Fjs27fPo6d0JW5skl8M5+80MWzcuBGpqSki2w0bNnj4jUyNXKurqzF23DgkJCZiVWamtBNc2n17dkLHQn8Ys6KiAjNmzMCoUaOQlZWFBv62VFCgXVi6ZCmGDh2KIUOGyI+THjhgX6EXx9Q6cuJzmB2nhvoGGfN1ZWWCe+LEidi2zXzqwOyMmb6RFD87MXr0aHww6ANMSE/3bBp5lcvyo2NSb+cd5ZeSkiIyLSws9ORiDtFyDeYzD4NDu/TJJ59gyRLzGr3Uk2cLx0+b6M8/ULbLly+XMZ08eTIqKjhWxMXv13De+3rEvsWMiUZsrJkPq1ev9nghXe0HcWrgOHLupKamoqyszBZb3OrUkYQV04IF81Faaj7PQXyCy/Iuvy5P58iuF9RH/oBsdEwMpk2bZnETUaOM75o1a0TeOnfJN+ducnKyyLK0tFTZ9HhX3KzIyckReM7zysoKD9ZN1NTUYPr0afjggw8wZvQYcHw0iDysjmuZdrSisgIzZ8zEqBEjsTpzNThPTZ3GwMGDBzF37lx8PGQohn08zOhjjVlLXD593Cc75Y+rsfsmr8Nnh/BkM/Gp4T+lDpI7idw0e19WUorf/OrXeOqJJ9G71/v4/e9/jyeeeAI7dpyA7xQ1NYFGlgp933334ec//znodJyIcOjgQXw06APccdvt+Ncbb+Cdt9/Bvffeh3/+85/Yu1d/Qb39lDZt2oTf/e53eOSRR9Cvbz88/tgf8dAvHkRW5ur2I7UtZTJbQ80iGp9///vfeOONN1AvPzp43CSwc+dOPPzww3j4oYfwz3/8E6/+3yuIi40Dv110PEF5J46pU6fijjvuwKRJk1tE6cK3CGQruKi9/vrreOWVV2QcX331Nbz22mu4/fbbcdNNN2HRokUCqTipy22RF52j1155FQ/94iG89+57eOmll3DnnXfK4hY8L47Fq1dvF3Aa7xHDhuPuO+/CP159DX3e741Hf/t7/O43v0Vujv/dH7Yj/wxKU/PaL9Zx3tDpuffee3HrrbcKvAvHAjp3jz32GB599FG8//77oqt/+tOfwAU7OGhbljO9cOFCvPHGv3DllVfKIqb1jDVNPBwL0v/73//uoXRhFFafOzHPxZC8d+rUCS+88AIOHNCbFoOCzlG/fv3FJlDn3333XfzsZz/Dq6++CjpXyqPiZkxZMTY3XHOkzz169MD06dM9vjQxb9483HXnXXjmyafQr09f/OKBn+P5557Dli1bFMT00faVuHUsCgoK8Mbrr6NLly4YOHCg0PP54bduzQ2M8saFlXy//PLLHm6FV571w33knc7+Aw88gJ/+9KfejYXi0pj6Etk1An959s/4x2uviV1gP7WeseLWMtLkDcTjjz+OqKgojBkzRvjR+uCYzjfn1ZQpUwTOxaey0DYEoPNKedx///3o3r27xwvrCE994nzifOVFO0yZ3HDDDTK2xfaHeJUO2xG/0qBzz3Xnih9eATpbwYHzizh/8Ytf4O2338bzzz8veBcs8H8kW3EpXs2vX79eeL/55pvx3HPPiTOk9BnTKX71lVdET9568y3wIh3q7q5d5gYnmJ9w/sRK4JQ5SKok7I6mNeZiyUn41+eeR8MRc5dXWVmJp59+WhTweEWgdIiHdxJ0ONTxcuvaQ2f2rFniHE1xFmfeNd1yyy1yJ9IenG4bGtknn3wSe+yvdx88UIMnn/iTyMqFa0+afXf7P3DQQPzgBz8QQ6jGqT142UbxUt5/+MMfsHXr1vaiatZOcbNi5cqVYui5w3G04LY5GlxLdTRuDz74oNxJK4wrI+JvLY0F8+bjvnvuDXBy33nnHdF36v3xBOohnaNZM2Z6aA7WHJT5RUOrOzstLRBuP9z+cOG47bbbvD4qHHd5X3zxRTz77LM4fNj82jlp/PGPf5SF6dAh8/FLMkOarszcNB1E3u27waVPh+C9995r5iARnnCKW9tozPp//etfMoeUF6XL3ZZu3bo5OxHA5s2bERkZifT0dI9X4lJ8jLU9cdOZ5s2L7mawTmE+/vhjvPXmm+AOM8OGdevR85aenl1QvIqbMC5u5inXAQMGoM7i0DYKyzzrBg8ejHPOOQf/+Mc/WOXxS3yUnbZz8dPRJ++cQ24byQB47+135YZG86Fixa3ttS/cUaOTzA/9ukHrWZaZmSnOKXd43HLFxZj86uXimTRpkthY7Q/jYBwKzxsoOoN0ntygeBWH1vGmlDrAXUcGF++KFSvQuXNncJdMQ58+ffDLX/5Ss83iYPx0xGkTdadSG/Tr1w+PPPxLlBQVaxG279ghNyfUJd7AhsPJlcApd5CobKpwGq9atQrdukagtNh+BdnKgApNR8Pdwjxe8XDrlbtT6iAdLz7eDebm5AZ8hp6KzDtuKvXxBt7Bu48a9+0tF+fojX+8fryovXEgoskTJyGiawTuuvNOuTPSsTkeIjQMdHJ5F8ydjCkTJ2N/VfXxoAxoW1S4FnfdcSd+8fNfYNnSpZ4T6QK5+sbytvRLYXn3xgWfd6Ra5uJlmn11y1wegtNLFi3Gww8+hPxc/YkOgEaWd75VVVXB4G3Kv/9uL/z6kV/hSK1ZlPUxBseXiyEfITCo0Va+lYjmNdZyLmK809egcuDjAO7ecbFzA3cauHPIRzkMwTJS+tqGOOjkuuVumjdRvGOnk6dB5a2xwmueMQOdhqeeegrqIGk55y7lQcdOywh/9913y8Kuu4IuPoVTWnl5ebI46g6SW09H0V0Ead9+/sDP5XFhS31gueIgX+oguYuj1isOOq9c0Dk+1FEN5FFhg2PCzJ49G7/61a+8sSOM9ouO+k973oqf/+wBDP7wIyxetMjbtWJbwobCqWXr1q2TXSQ+PmZweWGeu44cc+oIHbVQu+0uDbc9y/n4rmfPnh6/SldjIQqAawufGvBROYPWM3Yv7TdhuPMYERER4CBpu+zsbHDHUB0k7sbxyQQdHg0uXnUgtYww3KWn88hdPwbF/dBDD4mdVDwa00F+5plnvJsbLQ/HJ14Cp8xBYldUEdw0FYh3jvffex/qgow6d2LozNA4H09w6cbHx+M3v/mN5yC5dcdDw23LMwc0Vro4uHVtSbu80VhOmDAB9951N/7w+0exZbO/Td8WnKFgly1ZKo5GSlKK3DG++eabnuEJBd/aMj4a4cLPq3+//mJsH/3d77FxvX/31VpcwXDbtmzFnx5/Alf98EqRxxN/fBz33nOPnH3Qu+3gNsy7Mg1Vr2UKxy117kBQD3V3R+sYB6c1r3hCxTwX8sY/X8c9d92N3u/3lkWfjzpozI83JCUk4rZbf4oF8+d7qLi48pEedyI/cR7veABWLsq7uxgpDM9kBO8gsY6PULgABRt7LjJcfN1dIRev0lL8nC+cm+5CRRiFo6Px1ltvBThIbMt6xauwbjnTdJC4wKiDRHiXjvLAmDdQHIv8/Hy3WNLB+FlIB4u7B9ylaCnwpmbk8BHo2rmLPDahTjGEwueWk186dgE7SPbsltKic/HAzx4Q55KPCelke8GRH8tUTlrPM2XkXZ1brSdfPGtEHR3y0WC8/e83ceftd4gcVYbE4fKvbRV32bqyZjtICr9712788bHHcPnll4tjwUez9993n9h5dQQJq5fi1PaMeT6L4xTsxCosY+4Ecd7SIVE45VNxuzi1LZ23yIhI0BnSoHBH6o6Io865MGjQIPz1r3/F7bfd7smQ8P+/ve+Ar6rI/v+3XeuqWyQJyIrignUttNBLQugl9KZiQEBAEFQEK6T395KXnuA23VVRd3+6gDTrqru6xWXXXV1KSAjFQgu95fv/fOe+8zK5vJf3kryQBzv385l35s6cOTP3vLl3vvfMmbkim3VJkHRSPk8IkKQfcAzkwam7aVOmYsuX4rcFNdXL8YpWJ7nHFLP5aRYNhARAkg7EK2TnoBPlpImTQOdHdbg9v+jAyflgAo5gHXwAcopt167gfG+Ib+jKEdLdwF+/+KKyehHMBPMgQOJDePLEScpCoFsfmlIPHb4JTumIeeTwEeW3suK55W4HwqZIhnoo8QHBg//5rp1Van49KaFpNzsfdnxwEwj86Y9/UlMMnEZ64VcvqLfeV19d1bSGa6U5aHP6x/ONN+0BKA9NvT9rRX1GaUVb8tjjGD1ylJrO5EOWb9N8o5eHpc/CfjJotSDAHTZ0GNJT0/CbF17E3DkPoXu3SOVkLcWlzXINTJc0/T8TfgIkbxYkOjfTT0LkCCU4njZtmrq3RYbIJ2Udwst8Dji8N/U0pos+BCBxOk8OXYYuW4+Tl7453ixI9rpWrVqlrBKcXpM8nepx0ZFYkGSKTdomvDz/9utvsbKsTAHiRx55xPNypvPq/CKb9/xDs+fAme3AyePu6RXeTm7L2L8//xfGjRmrwNeJ4yfUy83iRW4LG5+hGsigfL0O1s3+RquiACTmi075kiHPNabxPqM1n07bIstO5XpIt/xni3qBKSkusZJVe6w20ceU08B//Phj6949ehSrXn4FPXv0sKaG3dcn7RUqeqFAWs3YHgE+wiNtIJig3xotO+JPJtdGHuEXquf9+1//Rt9effCXT90f1dae8Qf3H1AvGyOGj8BzzzyL+Q/Nw/AhQ7Fm9RrPdeqy9LqkbQRIHNcEIEk6rVIPTH9APeO54Ofnz/9M+W7yvqNFzhzNr4GQAEj2DrR2zRr079sPfNNShxsgcVUSzd105GvKITcBZfCNlm8VdB7moec1pg69/Au//BUGxcQo/4XGyAqkDE26Ty17ErMfnKUeZv7K6O2z8377zbeIm/4AsjOzPFl0ok5NCsZX6z0i60RynDmq7bLqp05mgCecGqHFKCMt45wSc2bNxuPut2i5dlKJn1OgngRO8fLh9LZmjRF2kafL1uPC542WlZSqh+B/tDdFWmKGDx/u6ZfeygWaxrd8DtjJScnqzbz9DTeAdZ52+/dJ2ylP2ixU6rDz0KmXupB0oa+++qoCd/Td0Q9aT2mdEOdbyWM5uf9FBvPEB4l5PPQ8nvsCSMKvCvm4HrEgEXDoh14HLRKcOiE4sh86nx4nHy1NBBm6BcnOI9OcB/bvV9PBhYWFqgry6bx6nAxsL/uzIysbtFwoOW7wwBW/BL6cuuZBMEOn/CeXWT5IKtH9I/XolFkESPyPArFccsqW05sc3PkM0g9drlwDffZmzZiJ4iJris3dbBzcdwCxo0arVVq6DMZpEU5ckYBjR90fbbYBJZ1ftyBJnUIJmgjc6XAvLzbS50SG8AqVdNIvPv8Xevfohb/+xb2owT0enT1zFr958dcK3FXtrP1A8y9//gsMGhiDfd9aKzcpQ+TqVOK0aNGJXQdIkvfN19+oF7345SvQq0dP3HXXXXj//ff15pl4M2qgRQGS/jDjm6F0Cg54YsWQa2debm6uMt831S9DZJISINGCJABJz2tK/OXfvKTeJP5Hc9ZuijyWpd8FHwT2t1M+FCeOG+95wwukHupT9E1+mrJpxWjb5jq1wunh+fMVcOnTq7eaCnj2mWc9b+8i3y5D0r1RvrVx0LRPdz2yYCEeW/yo563OW1l/aVyBqFbWLK31t2AZ+mtxxdby55YrEdJeuW6h/uQzn29snDqidZNHQ8r6k8+HH9u/f1/tMmJuhUBfLTvQ8CdLz2cb9XuM1qTZc+YgPS0NXG0ZyEEZ9mvluUyxiQzh4aqgKVOmKCdhySOlQzUtSIH6+tGCxntT5FKGfi38b+mDpE8hCa9QvX49LgBJpijIr5ehPwvrFz8ivazOp6dL3JcFiRa04pJi/PlTbbVpTQ0mTpiIlFQL1IgMX1RZkHSA5GakFYMvMte3/THunTIV8+bOw8wZM9WA2vmeTmrriP3aYO1Lvt2CJHz0ubMvqtj39TfKUsitEPzphHK2btmqAA9XVPJQ1qgaKPAzddJkLH/mWalOUYIHyI4YAAAgAElEQVR3rs5VYNAGwOowuk9efvlltapRLEg6D0H50KFDwQUucrAvSX/y1346SfM5qFuQKOfUiVPIysjEfdPuxVmZ7eBCkY8+Ro/I7rXbr0ilPigBkjcLkt6uf27+h3qJ4tYQ5jh/GmhRgKR3AMb1Dvu713+r/GBeW/WqmjvmwMROvnZt7WqcxqpJr7ekpAR0hgv0we2vTj506V/Q8ScdsPiRRfjkT5+oZa5c9smHpF63P1n2fL6p8YFEh0He9JxypI8JzdO0CPg79LoZl3NSvr1s2rgJa1evweuvvobfvvY6fvGzn2PE0OEKGHCwkP9H6pHycl4fpdWFeubcOZfL/mPzZiQnJqn/+OMPP/K0pT4ZvvLYjnVrrdWDnH7gnP1nf/sMjy5+VA3Km/9uLc8ln7RZj/uSK+kEYHyALVmy5BwTvsgT3sZQ+nzRl4xLv//z5ZdqeT/9dVhfU7Y/YNvkP+MUMt9S+dZPcBHIIdcmVGTxnA7UPXv29IjReTg1xXuVKxbZR3mP0RrG6Rgewusp7CVCJ2MBo5It9fOc10AH5Pnz50u2khuIbIIqWo3FYZplGHjv0prTsWNHteKOK5S4RJ1v7ASqev2eSm0R+iBxyblcq5ThCwKXco8bO1YNoFu3bFHbl3Dq8z23RcBf2wmQpt8/HampqXWsNrwOOsfz2fj6a69j1SurFLgkoKdfDq13x7XVg7Yme0754sW2230l+V9zKxRO8dCxnAsg+GJDS5k8N/21nT5oBM55rjyrPm2ainsvsa3ZWdn44ssv1DYDy5YuU9asf33uYz8wT6utCAE7V5PJFCxT2SauPOOKNfZBOZgu7RUqed4ofZDuvvtu9SxnvpQh/fOnf1Y6pv8RfWT5nL932r1qtbU3sOZNPqd8qRuxIIl84aX7BA0GRQWFdeqWfEObTwMtBpD0TuAtzg3BuDSZ6JwmWD7cmzq1JmqUhxbP+VDhoM23a7ZDzxP+hlDuFcLpnpHDhqsb5b5771NO4LxJ+QDSr7UhcoWXD0NOv9BRL3b0aOWQ/MpLL3u2QxA+b5R12+uXc2/XTR8wvvHR76apBy1UnHagMyIfwhMnTMATjy/B5s/OdX5tbF0EWgsXLFSDEN8+af6XjenkOimb16qf+6uPD1nutyOrB1lWygv1J8NnvtvJ9v1331NTJNQNV/LQkd3bSh6fcrxk6O2kdYD9nCCdR0PaLbwij/qjPIItX7okoGYf5cDHFX8yLemL3958ghj9fpG6pS0EMxy4+cIgh/DIuS/KlVTULwEHD5FJcMNVlgRz9FUhiCII4OBFH0L7VJI3+bQ00iIgIENkk5fTyCnJycrvjnsgcUrsg/etjRy9ybKn0frKpd+0lkhbdPk6P3kJ9uzL6nUee5yAkG2XvYFENi329PukwzBXsXF/OvoNid8m/1N/B6+dwI5giIfqB2ozSmu+ikCUvncEYtw+gw7msjLMn2zm0zpEfy5pM9MIUOibxH6vH+TRg57nLc57hqsHCfJ46HXwnACaPm1sO/3v0tPTG7TCjLqlbvT+qNdRUlSCwvwC0K9S6pf2qwTz02waCBmApHcIdbXueV7ug3TowMEmAxdvGrTXGciN7k2OpNnlSbpOA+HR+fW4XpY3f/Uh2+aKbp3pZexxXQbj+rmd166P+njry7PL5du/Z4WiPTMI5xw89dU1dpHq4VyPP4Od334u1yrUnt+gcwIk7X/jYGSfhmyQPBsz28jQkP9SF6GXE1n6ddt1ac/jSj+7DP1cr6u+uL0eb7zSPm95vtKkvUJ98Ul6oHzk99UeOlhz/zL74Yvfzsdz0SHLSNwbH9NELmmghzdeTovxWexZPOOW7a9+e531tZn3rr3/e2uLXWZjzim3MbJ9laG1V4CrtMcXr+TrlLzedGntHm5x6n9hQ2Tr9Zh44BpoMYDEJvIPtv/J7CA1DGfc32fSrsXOq2U1KCr1BkveOZXzOSTPIn4BQHvDCkadujzLUZPfnuT3fs5pSZ0EuW4m6nGeK73X1CgTtbRR6rHz1hEa4IlPGbquApTljU3arOfpdcr16fne0vR8e1yvg3HRj52vQed84sn/JlQbABskywuzrgNmy7l+LV6KqSThlXJyvXpZiQuvTnW5UlZk6Xm+4rps4akvTXgCobocto1B0ryVZ159+f7K+Czv/s+Z768Neh0iTyjzfMnwla7L0+MN5WdZ/f/VZXmLC6/edl98DdGJyBC5Uo89nee6XPIHerCcyNX9ZvXyoj89rb64tJc80hY9TX1Cxv0iJXXrvPXJNnlN00CLAyRp/jkdg31W3q45hrgfUEKlXGOo1MWyvuKNkStl+KYlTogc/ILRZpFNKjeJkis6CgAg6TIY19slcVL9ISD1MV0/hF/S7PmSbqeU7eGlSPmf7YyNPJd2kUpdkkaR9nhDqpGypHLocUlrEJXr176jJTKFNkiejZkydDkSt6fbitU5lTKiT2ZKecljmuRLHs/taVK2TgVeTnS5Ehe5IsOeznPW5+/Q5YgsKSMydB6Jy7UIbyCUZXmIDHXONAb3vVsnLwChejtEvl6HiGioXCkn1FNepsK0vsr7Vte13g4p74t65Gp9U0+T69PTfMmyp+vtkPLkkXRJ06ldhv1cyooce/skXcqJXqQOSfdF7fLPOT9Do4GMKXXvZ18yTXpwNNCiACk4l2CkGA0YDRgNGA0YDRgNGA0EVwMGIAVXn0aa0YDRgNGA0YDRgNHARaABA5Augj/RXILRgNGA0YDRgNGA0UBwNWAAUnD1aaQZDRgNGA0YDRgNGA1cBBowAOki+BPNJRgNGA0YDRgNGA0YDQRXAwYgBVefRprRgNGA0YDRgNGA0cBFoAEDkC6CP9FcgtGA0YDRgNGA0YDRQHA1YABScPVppBkNGA0YDRgNGA0YDVwEGjAA6SL4E80lGA0YDRgNGA0YDRgNBFcDBiAFV59GmtGA0YDRgNGA0YDRwEWgAQOQLoI/0VyC0YDRgNGA0YDRgNFAcDVgAFJw9WmkGQ0YDRgNGA0YDRgNXAQauPAAEj+YaH3/8QJRv/rCo/VxygukxaaZRgNGA0YDRgNGA//tGghZgFSDsxYOcgMiDyaqOXsu2FBfzOZXvPmV7BD4Sz1tYOQMgNNWm93pJBJUa1U6289r0zJN3Ogj5PuANNC672o8Hbi2HysO9491X7vv1RC4VU0TLgwNSC8TGmirG8ofqFzD99+hgZAFSAos8D8g5qmxYAYfqxaIYLfXjhACSGyZBXU4FDB2uhYguccF8hA2MahDXY67pLoW90XLxTeWBlPWhdqGxrY7mOWCKaux/2mw28DuqgfPKRPZs90vK0IUL+ETX3zcN4L0f0ONBvxoQO9qjAd6SLlA+Q2f0YCugdAESKpXuy1F7gesAArrAVt7izBmPXIJR+qmKzGeB3fd53lz5dVCorM4IzBIWb3cDXET8p07TFip1gAiA0njqWimJWlL1l07GDdeh8H4L4Iho6l6DH4bam1Fci9ZdxjvVL4UsC/rOIlc5/Z4/WFk4kYDvjRQ28d8cPhl8FHOJBsN1KOB0ARI6kF6GjU4raww1vuoNcgxjY9medyeQQ3OKC7mW+nW9cod44+6H+TyQPdJ/clhvlazYq8BzjJoKM3TcqlXChEQuqfYmCTimkKbUvZiaUOwrqMpcppSNlj/YdDbwHtNgKcI5516yh0Y119KLP7ajq2yzY/RQIAa4PPSS+D9oYcApRk2o4FANBDyAEnAj2eqSr2dWu/DfATzEV1749gBkpcbyttN5pEhsnxRf/JYznbDShF3lnU3s+V8y/YkusGRAUgelYhqmkrl/2hJ2pJ1i/6aoQ11ARI7Ovt0LUBi1RJ4n/JeVneo3ia2yxxGA341IA9SG5UOJtSvHMNgNBC4BkITILGzn7H8cPhAteAQHZ3P1D5xPbCIzGJ90QCS3DDnm3pgj7tdHCIYrXNInjvLli+nTaWssqkymlq+pdvQ1PYHo3wwZDRVj83RBsoUuVaEgxfBvxWse9fq+NZd7AZIMsZZWebXaCAADbCnScfx9Do/5aRMoPx+xJns/zoNhC5A4r1gDqMBowGjAaMBo4HGaoCLGoKAj2rU4gguGKpRgc3R0+o7b2zTpZy9TqlX8oNN9fooW86lXv2c8bNnz56ji2C3qaXkhSZA4p9ypgbHq4/hyIGDOLx/P47s34cj+/bh6LeHcOSbahzddxhH9ler/KP7D+LoPgmHcGQ/w8EWoVZbDqi6j1UfxuHD3+BgdRUOHapE9cFdqD7wFaoPfoXqQ3vc4StUVzPs0cJeVB9imje6150eAD0UAI+qQ/h81WlPF/4AaEu3oc71BdBerzq3X7+cByjvgmuDXF99dA8OH9pl9en9VThcvQ+Hjx7Dvupq7PeEQzhYfQjVh6pVOFRdjeqD1ajeZ1F1fqga55Oez7p43d7q85bmi7e50i+4NlRbumS7D/gIBw9V48DBahw6VI0Tx09YYyrBkRvcNGWQtYMCkSXpPGdcqJ4uvI2hIocgRD+kLj2tsXFdltQn1J9MnU+Aki7PX/lQzw9ZgFS1ezeGd+2B2TffjSUd78bjHe/C4g534dGOXbDoJ53xaIcueLRDJzza8R48xsB4h85Y3LEzFt/cCYs7Bhruscp09EcDk/f4zV2wuEMnzLk9EpPuvBNje9yEyUNvwuRhN2Ly4PaYMqg9pgxuj0lDbsSkIe0xefBNmDLIHQbfhKnufF9UygdE3bIC4h3c3m/d0qZA5Sm+lm6DpvNA2y3X6Y8GKo//d8C8fv5/e5sCltuANtjr8HY+dciNmDb0Bkwb1B7TBt6Ekf07oGfPbogZFouBg0cheuhI9B86HFFDhmPg4BGIGjoMA4YOVTRm8HAMGjwcMUOGgfGYIcPPocwfOGSY4vNHvZX3JbdBvKYNnv/G338g+Q3Sr5f/3df/Jv1h4BCrT7FfecLg4YgeOgLMGzxsJLr36IUHH5xljb0KIDXvMKyDFx0c6OnN24KmSddBjrRfqD/J5Dtz5ozHyiT8gZYX/lClIQuQtu3Yhn4RbVDaMRJrb+yKt27qirXtI/H79r3w+5/0wpvte+D37bthdfsuWEN6Y6RKs9K748323bH6xvNP17Tvif+5qSd+edcATP/+D/H00LZ4NbMLXki6Gb9OvhUvJt+MF1Jvxi/TOuBXaR3wYsrN+E3S7Xgp8ad4KfF2vJR0G15KusUEo4OQ7gO/SbwFLyZ0wMtJt+K1tM5YOuN2dOnUAckZTiQkO7A82YFnU7PxXKoDz6U48UxaJp7KSMczGel4Li0dy1MzsCIlEytSsnyEbHd+INSXjGCks42mDdZ/FRp6WJ6SDYbnUt2U8ZQsxKdkIiXTifviHsTQYSOtMTcIAEkf7D/55BMUFBQgMTERv/nNb7Bnz55zxnad/5zMBiaIrOrqarz55ptITk5GTk4OPv300wZKOpedsn2FkydP4q233lLX+vzzz2PlypUoKysD47/+9a/x0ksv4bPPPlPgiJIJBnVAqMfPrfnCSQlZgLSjYivGtmmHd2/qhaq2PbEjogsqWkdiW+se2NqmB7Zd1x3br+uK8jadUd6mK8pbd8O2Nt2xrU0PbG/TA+VtIlHeOvL80jaR2B4eiS/a9sCHdw7EUz+IQM6IH+EPhddjffZV2JB5FdZlX43VzqvwZu7l+H3OZVjnuAIbsq7Cxszvq7Ah8xqYYHRwIfSBjY5rsCHrGmzKuQ4pD7dD7943I8NViJSsAqQ4ipHsKEKSsxiJjmIk5BRghcuF5a5cxOfmIsGZh0RnPpIcBUhyFpxDkx2FSHLmIzB6bnlfcr3V5ZNXtc20wdJPy+kh2VmAZPd/keQoVH2C/SLRWRvneaqjANmuIsyetxCxY8d7RmFr4stz2uCIgJTCwkJER0fj4YcfRnx8PCZPnowpU6bgn//8Zx2ZOuiok9HIk4MHD2LRokUYMWIEnn76aSxcuBAxMTFYtWoVTp3iqtHGHdJOliagkevk+dGjR5Gfn48ZM2ao62WdCxYswOLFi3HHHXfg5ptvxjvvvOMBSCKLVCxKjWtVaJUKWYBUWb4dU8NuwEdte2BPWCR2EiC16ow94T2ws1U3VIV3xa7wztgd3gm7ScO6oCq8G3aGRyq6K4z5XXG+6Z7wbtjRpgc+uj0aS69ujZzhP8AH+a2wMfMSvJt2JTalX4n1GVfgraxL8VbWd7Ax4zt4O/272JR+CTalXYqNGZdigwlGBxdCH2C/zfgO3sv5EVLmt0bnyA5ILShFak4xErMKkOhgKERidhESs4qQmF2IeEchVjgL3JTnRVjhPH/0fNbl69pMG6z/PFA9sM+oPpRtUepV6dZNmZ/gJBgvQEZuER6cuwAjYscGbaTloE+LTbdu3ZTVSAR/9dVXmD59OubPn48TJyyfJ7GcCFAQ3qbQV155BUOGDMEf//hHjxiCtUGDBoFtOJ/HRx99pEDiq6++ek61+rXz+i+GI2QBUtX2Ctwf3gEf/rg3doX1UBak8oguqAyPxE4CpvCu2BnexRa6ojLCClY+ec5zCOuCrW264Q+3x2Dp99vCMfIHeC8/DJsyL8d7KVfhvZSr8Xb6VdiYcYUCQ5vSL8OmDAKjy1XYkHk5TDA6uBD6wPqMS7CBACnvR0icG4Eeve5AWn4ZEh35WihwD25FSMoqRlJWiQoJjmIFjFa4AdJ5o85CnLe6fF2baYP13zdADwkE2e4g4Ej9j26QlECLo6MQGXklmPHQQoweO9EzPgdjrN68eTNefPFFZVnxCAbUFNTAgQNx+PBhTzLBgVhk7EDh9OnT2Pftt+CUWaBHaWkpJk6YiJ07d3qKrF2zFn369MGuXbtUmr0eD6M7QqvOvn37QGuUHCwj5exx4dFpZWUlRo0ahZSUFI/lSi+n84pcPe1CjIcsQNq5owJTwjrgg3Z9sCu8ByrDu6KCgeAorAcqwyJRER6JHRHdURFByxHBUudawBTWzQJSit8NqrzGhc8frU+G5Fnt2HpdF3x4ezSeuuY65A7/Pj7Ia4X1mZcp69Hb6ZfjnfRLVHjbDYzWZ16OdZlXYF2WBQxoRdqYcZkCUOdSy8pk8QQ77qtOe3qw69Xl2evyda6XCXbcV5329GDXq8uz1+XrXC8TrLivumrTN2ReBtVvsy7FJtePkDy3DfpG3oGs3DIkZ+cjKdsCSfGOfFihAGqQUyCpGBzQaEnyHZif7x5I/dH65DQ1z1/dkt/UeuorL3X4o/XJaGqev7olv6n1eCufj4RsAu0CJCkrklgiLcujgKckRxHS80ox86GFiI2tnWJr6jJ/X4P93r17ERsbi2XLloE+O3LYLSk1Z7hPn2VR2VG+A/PnzkNhfoHFzi8tiJ+UxIW6jTCVOyow+8FZWLrkCby19i28tupVTJowEc5sB44dO6bkSBt9Ubb1scceQ3p6uuIXACdtZjm9rJzLtRAAxsXFYc6cOfjmm2+k2DllmCFyPEwXcCRkAVJFxQ6Mb30j3ruhp5om2x3WGVVhnVEZZlmEdnOarRWBSXdUcTotrBN2hd+DqohOHpBUGd7NsijVS2mVIp8/2tXN55sSqFVGdMPW1t3x0W2D8PTVbeEa9gN84ApXAEmsRAQ3luXocjXIvJXFKbcr1NTbhowrsD6LA9G5lIPShgyCqABpA3h91WlPD7huaWNLt0HaESC1X6+v8wbpIcC6RaavOu3pwh8QbUAbvPW9c+u2wPy6jEvwtutaJM9tjb7dbkVWTomaWktwA6MVjnwsdzK4BzNOlzgKkOAoQLyToKnQJyV4Yr4/6k+Onq/H66tb+PzVLfnCHwgNhEdvm9ThjzZEbkN4A/kPpG0NkRsor+orjnywTyVls09YU7TSp2hJIkiKzylCWl4ZZsxbiNGx42qH5SbO9ugDvsRpjZk7dy7GjBmD8vJyT10CKJhgByFM27tnrwI7RQWFnjKM1Jyt8QQCJp6rfTEBnDxxEs898yx+evsdGDdmLAZGRav42tVr6shQcrStBvTMQ4cOKT8mWn/0Q4CQXlby9WtJSEhQ1qMvv/xSZXsrJ2kEix988AEyMzNVyM7OBkNWVhZSU1PVNOWBAwekmpCmIQuQdlSUYxydtG+MxO7wLtgTdjeqwu9GRXgnVKnzLtjbqiv2tOqGPa26YE+rexRIsqxInRXgqaDfUgCB4Ih8/qg/WSy/M6ybciT/6LbBeOpqWpCuxQeu1lifdamaOtuYcSU2ZHwPGzKuVFajt7IvAwMtTDKtQmvSelqUvFBlaXLnBTvuq057erDr1eXZ6/J1rpcJdtxXnfb0YNery7PX5etcLxOsuK+69HT2VQL99Znfwaa8HyJpXjj6dO+IDBetQ0VY4SAgclsDaC1yFCNeBYKjfGUNIB8HNm+U0ymcSgmEeivvS26DeE0bPP9NS/8XBGC0KArwJjh6Nsc9Xar6mwWQUgpK8cC8hRg5RixIYp5p/DgsoEiogCM6TX/xxRcewQKIyCdxZn779Td48YUXkeN0YvlzyxXAmTZlKly5LqSlpOLjP3xoWZgIjGhtEgsSKYAXfvkChg0Ziv/57e+Uz9GO8nKkJqdiyKDB+Ne//uWpXyLSToKil19+GU6nE0lJScqxm4DO5XIpoEInax7CL3H9nGlctda/f3+8/fbbil+/NvLa+ek4vn79ejz11FMqPPnkk4rSwXzJkiUoLi5W031KWIj/hCxA2llegcnhN+KDdj1QpfyKOmFH606gH1JFRFfliF3lnjLbFUaQ1BVVYd2wIyLSM+VWFWb5KJ1vuvW6rvjw9oFYds11cI74Ed7Nj1BO2bQObUy/CptUsHyQ1md9F+uyvosNWf8XG7K+gw2ZFpDi9AUHITsVENUc1F6Xr/PmqFtk+qrTni78zUHtdfk6b466RaavOu3pwh9Maq/D+/mlqr++lfV/sCH/+0iYH45e3W9Buut5JGSXIiG72O0zUqzO47NLEZ9dUhvog2Rztj0f5+ejDvGR8UVNGwigreBLR/Z0OnRbTt3W9NpzApDc6SovpwgpBSV4YN6CZgFIHMs5vTRr1ixMmDABW7du9QzvOlDQAQQZ6EhdVFiE+BXxePTRR9G7d2+MHj0aqSmpWLp0Kd7etEnJYTllPbKBjnunTlPTa/pU4aEDh9CtS1e13F4aocprgIdWGi7Np/XniSeeUCCHoI5bBbBebhsgh7RfwI7Qjz/+WJX75S9/KaznACJmSN2M04JEh3I6kpeUlCjKFXFFRUXIzc0FHbx1XyiP4BCMhDRAmhp2Iz66vif2hBEQdVYAaXtEF5S3dk9zuf2QagESfZJ6oiKCTtxd1NTb+aZs57Y2nfHxbdF4+uo2ahXbu/nhWJN9Kd7KvBLrlAXpCmzKsJyzOT3CAWh91iUaQKI1yQSjg1DuA5diUyadtP8fNub9EPHzI9Czx61Id5Up/yL6GKlVbNmFCizFK2tMoRsglWGFo8Q4aTfASVkBimDyB1OWL2d0f+kNaQN5nVzFVguQCJLqAKecAqTmlyBu3gKMCqIFScbtr7/+Gg899JACR9u2bVPJBAYMAih0qsdPnzmtlr8TVNGXx+FwqHJ0nmbgcbamdrdsfan8M089rabWPv9H7XYCv3/jTXTt0gUffvihKit18UTipCK/qqpKrbZbsWKFSqOzuNRBPgE4UpZy6ABOp+zly5d7nNMln1SCaoAGkuwWpGeeeQbPPvussiLRgkSgtH//fikW0jR0AVIFLUjt8fGPe+Lra7th77WWD1J5BIGSTJ3RH6kbBCDtok9SeA9UhFmO2xXh3ZQ1qX7a1XL4ppWKgMsn7Yb65dDJm22xANwnt0Rj+ffaIH8YnbTDsDb7MqzOvgJrsy/HW9mXWICI4CjjKqzLvAbrM69W0260BDSPA3awHHiNHPP/XIq30y/Du2lX4O20S/Fu7rVInNsGvXvcgvQ8TnU4sSInB/FOF+IdLsQ787DC6bICp93U9BsHOnHgPpfW+p3Q34RTK/XT+mQ1Nc9f3ZLf1HrqKy91+KP1yWhqnr+6Jb+p9Zxb3gJFtCp5VrK5wZGaMlXpBOSFSM8vwcx5CxDr8UFq+hQbR/AtW7Zg/Pjx+N73vqccs7kvEZf3EzARANBqogMGARICPAQFcCUYy3GzSf2QslJOz9u+dRtmPBCHUSNG4rmnn8XiRxYhKipK+fccP35csepATWTpMmj5IjihD5B+2HkF7HEfJF4bwZxsJSC8diryJF3OLwYaugBpRwUmRdyEP1zfG3tbdcfeVpHKIrQ9XDaGJBCxptu4tJ/TaJxi4xYA3AqAq94CC27n7HB/NDB5BGzcsPKPtw7Cc1ddh4KhP8CHuWHK8Xp91pVYR0tS9newLouWI65cs/yN6Ju0Mf1K91L/ULYcmLYZyxZXZF6Od7ivV9qleMd1LZLmtUafHrcgM68EiU6X28+I02zc0E98R+iYnY94Zy4SHC7PyiSuTrIHccYNhNrLBvOcDsGmDZZjdMvpgQCpCPGeadvafZAUYMoqQkJWIVJySpCaW4yZDy3AmDETPOMzB+6mHtu3b1fOxS+88AJ+/vOfg0vvOX1Eawh31KZFhoe9Lvs5gQc3ltyxY0dATZLyX+39Cq+uWqV8ibKzsvDuu+96rD4iSAdjUk7yuE/T559/roCepNVHuTpu9erV4HXLITKFMl2PC9/FREMWIFWW78D4MK5i64OqsJ5qc0iuNiuP6AYFkiI6g9ak7W5aEd4Zla24mWQ3VITRGsQVb13OK60I66KsTP9p3QMf3jYUT131Y7iGfh8fuq7Fhszvuvc+spZKW07aV2IdnbezuOEeV7ZZfkfB9CcxsoxOm6sPKFCfeTne5j5IBEjdb0W263kFKBIzC5GUVWrtfeSZZitRACnBmYtER54bFFnTJgpIuZdwm7jRSd0+IIBI/Nrk3KLKkZ8bk2YXIKOgDHFzF2J0kAFSSw36FzsAaSm9BlpvyAKkHbdEcJoAABg6SURBVOXbML71DXi/fR/sDO9ubRBJ36KwSM+y/50RnVDeuhMqIriC7W41vaU2hqQlibtqB0S71m48SadvbizplQYij+3rpj6F8tHtw7HsmnbIHnY13i/8PtY5/jc2ZnD/oyvwbtr31GaRXM22Psva/8iatnEvnfayeo3WJn0VEVcs+TsPhEdkBMor/IHSQOWSL1DeQOsmX0N4TRssfQWss4wrrS0p8q5B4rxw9Iv8KbJzf4Ek9abPXbS5F5J7KT9XsCnn7RI1TcKpkXinNcCdV9oSddqv1bTB+u8D1MMKJ3fetgLBkLWHVq3TtvJ3yynGiux8pOTRSXshRrin2IIzwRbocBp8PgFIQqUGntvTJO980Jas+3xcn9QRsgCpsmIrJkVcjw/bdsNXrbjUn/49kdgT1gN7f9gV3/6oC76+tov1uZGwTviq1T3Y26ozuD/SnlaR7uX/jJ+/sJvbDoR3xfbWXfGHW6Px1PfbImfk1Xi/6Bqsdf4vbMj6f9iUeSneybgC72RegrezvouNWZdhA/c9yv4uNtGSlHWpStuUeVmTaTBksH1NkdOUsk2tm+WDIaOp13CxtoFbV6zL+g42Ff4AyfMj0Lfbbch2/cLak4b7HuXmYUVuEVbklKqQ4CxBUnYJkrNLkeQoQUIOQVKx2r/mvNGWqNN+jaYN1n/eED3kFKr+It/mU9O2Oflq+jZRfcuvUE3rphWUYsZ8LvO39kGyAFLTp9hkwDzfVAciEieV+Plqj73O813/+bpOez2hC5DKtyK2VVusv6kXPm/THZvb9sBf2/bA39r2xuY2vfDv1t3xL6Zf1wOf/TgSn/24Kz5ry/Pe2HxdT2xu2w2br4vE5raRfqjw+aP+5Fh1/a1tV/yxfSRW3xOFhT+4FunDWmFTbke86QzHG44wvJEdgTezW2N19o+wJvtHWJ0ZgdWZ12F1VjjWZIVhTWaECm95oWszI9BcgfV6q9Oe3lz1U669Ll/npg3Wf9VcegikH6zJisBqRwTezAzDOldHxM/9CXp26YCs3GJwR2PuW7M8Nx/Lc4uxPGcllufwg7Uutct2Gv1FsvlpCP2TJPZ4rQVKLFH1U3v5YJ4H2pZg1mmXZdqQ7MhDWlY+UrJdSHa4kOS0qIpn56m0jIIixM2djxGjYtVYd/YsV4hd2ABJByc6MNF9juwDe3Od6/U3Vx2hJDdkAVJVZRV6/+QOTG13C+a0uxmzbrgFM9vdhgevvx1zbrgTs9vdhod+fDvmtr0Ds9vdghntO2LmDbdj9vV3Yvb1t2N2u5sx+/pbVF79lHy3uvnro7cEIO9WPNTuNsxsdysm33Q7Ym68ASPvaodJ/dthfP8IjI1qhdiBrTB6YBjGRbXCxP6tMLFfOCb0j8C4qDCMiW6l6LgBYRg/IAxNpcGQcaG3oantD0b5YMho6n8Z9DZIfx0QhikD2mJw5PW4666bMCAmGn37D8SA6MEYED0I/aKHog9DzCD0jYlG/+gYlc68/tGDTTA6CKgP9Bs4GP0GDkJU1BBERTE+GH1VmtWH+g4YhL7RMeg/aCjuuLszpk6eqsbZmpoz3Jb6QsZIdaxFOihqCbCig7VQAjLN1ZbQBEg1wJnTZ7Fnz1fYWbUTO3dXomJ3JXbu2oldVVXgng47d+/Crqpd2LWzCrt2VaKS+bsZd6fvYjzQsMvN64/6k+euu3KXauPuPXtRVbkbldt3orJ8JyordqKi0gqMV+7YaeWRVjJUWJR5JhgdhHIfkP5aUYGd2ypRtaMSu/ZUorxyOyoqKlBZUYmdOypRuaMSFZUM7Nvl7rADlW4e8plgdFBvH1D9pxJcIu/h85K2o6IS5eoZW4n9+/YDtB6dPcntqS9ogMTBXwcmery5gIEutyWAmF5/S8ZDEyC1pEZM3UYDRgNGA0YDF4EGzqCm5rQKF8HFmEtoAQ0YgNQCSjdVGg0YDRgNGA00rwZqzhIgncFZWpDMYTTQCA2ELED6+uu9mBM3BQumjcJj943CovtisfC+sXjk/olYeP8ELJw+WoVF943BI/ePxYLp47Dw/nFYfO8YLL43FovvGx1gGOXm80cDldcYPn91S35jZAdaRurwRwOV1xg+f3VLfmNkB1pG6vBHA5XXGD5/dUt+Y2QHWkbq8EF5j907Fo9NH4dH74vF/Psm4YEH4nD/A7PxQNwsxMXNwMy4OMyMm4G4GQ8ibsYsd5iNuBkMszAjzgSjA/99gH1l+sxZuH+m9KFZeGCmlUYaFzcL90+fifvjZuG+GbMxcfI0JCelenx3ai5gJ+1GjOmmSBA1ELIAadvWreh+wzV4Y8lw/OGJPvjD493xwZIeeOfxvnj3ib54Z2kvvLu0J957ohfeeaI33l7aW6W9t6QXrNAb7y0xwejA9IHm6AN/eLwXPnw8Eu8/GokPnx2C5CndcMdN12HhY8swZ9ETeGjREsxd9KgKDy1+DHMWL8GcRUsxa/EyPLh4GWa7echngtFBfX1gziL2HSvMe2QJ5j3yGB5a9DjmLLboXNXXnsCchY9jwRNPY9DIWMTEDA3iMGlE/bdqIGQB0vZt2xHbqR2q8qcCJUOB/L5AQX+gcDBq8mOAgoFAwWDUFAxR4WzhYJwtjEFN4UDUFMbAOmeavzDEzeOP+pPTlHx/dUt+U+rwV1bq8Ef9yWlKvr+6Jb8pdfgrK3X4o/7kNCXfX92S35Q6/JWVOrxTFPAejLbuw59PwJtLBiG66+1wFJQgLb8EKa5ipOVZITWvCMn5JUjOW4mkvJVIzC9DUn4ZkvNKTTA6CKgPcAPI1LwSZOSWIiO3SMVT8i2amleq+hvzMwtXYvbCxzAqdvx/65hurjuIGghZgLR123aM6tQO23PG4XRBDE66+uIUg7MvTjv74YyzH045YnDcOdQKOYNxImcgTuRE40RuNI7lRuN4zkAcyx0YAI1x8/mjgcoLpE67LH91S769nO/zwK9fZEgd/qjw+6ct3YbA/n/7dfi7fsm3l/N+fuG1Qa6vHsp7K2cgTubG4ExxLH67KAoDut6JdBd3ys5TG/hxn6OkbOtDs8sdhVjuLFKbSCbwi+zal9jli+yG1n6d3ujCrgv5rEih+pQNP3i83Gl9+Fg+fpzgLERKXrH61Ejs2InWMHmhb6UdxMHeiGq4BkIWIG3ftgVj74lApWs8TgjIUeAnCqdcA3AiZwCO5g5EtWsQDrsGqfjx3CjogWDpeG60Ak2+KWUNxPFcf9SfnLr5gdUtZfzVLfnCHxg1bQjk/7frUnTtj9rL+T733fd8lfFXt+T7Kn9uesPaEMj9MBDHXINxPCcaNSWj8LtFA9Cv851Ic5W4N4AsAL/ubn3hnYNZIZY7+JkIfvzVpYATP0CakG0NfOeLtkSd9mszbXB/YqYB//8Kfq7FUeT5TA3703N2kO0oRFp+KWbwW2xiQQoCQJJl7qRnzpzB4cOHcfz4ca9L75kvR3V1Nf7zn/9g7969klSH6nIlLgz6OeP6ufDolPlsF+uUcOjQIRXnh2ePHDkCfrCWhzd5kiZUZNvPpbzkX+w0ZAFS+bYvMfbuMFTmjscp9SAehOM5MW4ANABHXdGozhuIg3kxOJw3AMdz++F4bn8FdCyww0HEBKMD0weaow8cz6W1bBBOOKOA0pH43aL+6N+lFiAJMIp38EvsBEjFWO4orgOQ1PfY3AMfBz8TjA789QH1YVpHkQJHdoAUn1OI1PwSzJi3ALHub7GpAbyJIIkgQY5XXnkFY8eORXR0NH73u99BNm7UeU6dOoWXXnoJY8aMwciRIzFixAjEx8fj22+/tZrjBjwsw/IMOhCRc6lTz5M0oVLvgQMHEBcXh9jYWIwaNUrRcePGYcKECYiKilJpGzdulGKe+qQ8M6QeqV/O9Tx73CPwIo2ELkDavg2j7rkO5a7xOOkahNPOKDW1dtrZFydzBuB4Dq1GVqCl5IyzP045Oa1GEMU3YMt6YKjRg+kDzdMHTuTE4CQBUslIvPGIAKQyJPEzItnyaQxrim2Foxgr+P019SFbAU32aZS657QScKrJH23O6Sh/dUu+aUPd/y7Y+hDglJhdCAbKF4AkIDzBWeAdIHEVWy3GafBQrgOFHTt24E9/+hM6d+mMoqIiZVES0EBKcPHaa68hMjISv/rVr7Bv/z588MEHCqDMnTtXWZ6En3LJr5/rcebLocclTec9efIk/vGPf+Cvf/0r/va3v2Hz5s34/PPPsWrVKnTq1AlLly71aUGS6xOqy5U0Ur2tehsu5njoAqRtWzH6njbY7pqEY3lD3FNl/XAypzdO5vQHH84MBEQESKecA3AyJ0r5Hin/IwOQDEg0faDZ+gDvsWO5vP+icbZ0NH67aAD6d7lDOWYnOgqU1WiFo0ANZJweoQ8SfUUSsumX5EK8M98v8BHwEUwaTFkcpBsjrzFlGluXr3IXUht4DQKQCL4FIFnpFthOYN/SANJo3YLUFHREy8rZulNcp0+fRtSAKJQUF9cCpLMWmNlZuVOBoYz0jDq44f3338eQIUNACxQPAg6d6nHJUwx+furj5TTgY489hunTp+PgwYNKkp1fP9cBEOMMkq/HJc1P0y6K7JAFSDu2folxd0Wg3DURR/KH4IiLDqNROObqi+MuTqfRzyJKBcvvKBpHXVE44qJvEn2Rmuet2cg1ejV9wFoEccQ1EEdyo3BqZSxee7Q/BnS9DemuQqzIyVdv9886C/FsDqdDrCkROtUmOHKR7HAg0eFSIEre/g21Bnqjh/r1IBYk6kkHTirdYU2xxc1bgFFjxmkDdK0lRksMPMpPuZ05C7hB0PFjxxE9IAo/K1uJM6dOW3IsQxDWrX0LvXr0xI7t5Sqd4IoH/YMefvhh0IokhwANUokzj3H6ETmdTvz5z38Wdo8FR3gkQ4CNnk6LUlZWFgYPHoxt27YJqwf02Ov0MAQY0dsbYJELki1kAVL59i0Ye3c4KnPH4qQrGidpIXIOUCDJAkv0SeKKtb44kdtPOVofyxmkgNRRl5liM4O4AXLN2Qc4zc0VpSecfXGqbCxeWxyFqC63IsNVpN7krZVFBEScYstHPK1JjiJlRWLc7qNkgEH9wOC/XT+1TtqWBYkWpdo0y3k70VGkptji5i6ss8y/yRtFcoaOQMeNswiQovoPQGlxCc6ediMj8PuhZ5Cfm4dBA2M8YKrGPYVGdJCRkaH8kgiW5BCgIlTS6WDdu3dvNUUmaToVgGK39AjP66+/rsrrfkfMYzmWoTO51ElKC9Pu3buxZ8+ec8K+fftAq5nw69Ykqe9ipSEMkLYh9p7WqMgZg9Ou/jiT0w8nnXTCjlYr1o7kDrKsSLl9cCK3vzL302lUmf0bbD0Si5M/2pyDrr+6Jd+0oTkHfku26NofvVj/C3/XHaWmuU87+yiQdLY0Fq+rZf53ICOvVE2HcMojKTtPTadx2T/PawFSIGDAmqYjmLLAgT8aiMzG8virW/IbKz+QclKHPxqIrMby+Ktb8hsr31c5C1wTFNVakM4FSMnOYqTnlyBu7oI6AMmDbBo5iiuQQ3CkQg2OHT2G6KgolJWU1rHqECAV5hcogOQBRm5QxarT09NBx+mjR4+qltgBB1eZ0cfpiy++wCeffIL+/fsjNzcXW7ZsUavh9u/f77kClpVD5EgarU50zC4rKxMWD7gRHk8GAFqbCgoKlDP5xIkTMWnSJEyePBmM0yE9LS0NBEk8pLxQXc7FGA9ZgMSdtEff3QZVeeNxwjUAJ11ROJZDgGStVLP8jPor69GR3Ggccg3BYVftKrfmWLljZJoVYaYPSB+gv1+Uujdrykbit4v6oW+3u9RmkFyxFp9dgOTsHCQ6cpXViNMh9ElKcLhUGmm8sizRuuQtcLC1LE+BUW8ygpUWaFuCVZ83Of/NbdCBl7XSzwLbtSApIbsASY5CpLuKMXPeAoweOyFo47WAAaFcNi8ARF/WzwrXrVuHXr16KZCjN4AWIU6v2afYKFPkbt++HU8//TSmTZuGqVOn4rbbbsOgQYMwc+ZM3HvvvVi7dq3H58luxREZVVVVCtg8+eSTevX1xinr73//O2h1evPNN+uEN954Q4E1XrMcUpecX2xUv76QBUhbt27BqLtbYZcrFqc4hUYrkbIgReFk3kCccEWrh/MpprticChvGI66BitHbTprH2c+V7O5Bvqh5Itx89dH/cmpmx9Y3VLGtMHSV/D14P//l/9AqGlDIPcDeY5xFVvOAJwtGoY3FvVHvy53IzlnJRIdJUjJLkBqZg6SsvIQr1awFVubQ6qpEa5oo7VAH/js1gMOhMwPhNrLBvPctKHWgtdy/4UC2NwY0rOysUhtPMrNRy2wxFWTBcjIs5b5j9CctPUBr7GDOUEEAw86P9O6s3LlSs9UlcitrKxU02gJCQmSpOimTZswYMAABUL0DL1tnHr797//rVahvfPOO+jTp4/yIyJ4oVWI01/CTypB5BHE0Cl7ypQpICAL9OC2BD/72c9UuQcffFABMoIybhtAB29asXQLkr3eQOu5UPh0HYcsQNq+9UuMuacVdjpHoCa/P06plWsD1C7Zx+mcTefQnH44ndNX+SIdybV20lY7bCsrE6c/6ItkgtGB6QPB7gPcrZ73IKe9UTwCb3CKrctPkekqQ3JWAdKy85Ga5UJiFi1HpWqJPwfa5Y4SPOt8HssdZZ6VSbJCyVDLOmL0YNeDgGla1mq3fuDGowyWs3Yh4rPzFECKe+hhDI8dq8Zja1asdjqqMYO0HRAQiPTs2RP5+fkeiw55BEStXr1aAShuA1BeXo41a9Zg9OjRWLZsWZ2l9myLDMb2dtFJOyYmRu21pOcJSJM0KU/QlpOTo8pwiq4hB2Vyau/TTz/FX/7yFxW4XQADgRk3u+Q0HPmkvobIv5B5Qxcg/edLjL+7Nb4piwOeH4easljg+TFA2Si17wpKRwGlw6zvtJWOBMpGA2XDgLJBQNlQoIxpo0wwOjB9oFn6wHBg5TDg+aHAS1Px+yeHIKrbrXCVrkRmYSkyilYivfB5pBb+AklFv0Jq0c+t9MIypBU9j7Sin5lgdBBQH2A/4jfW2K9I0z3hZ0gvtEJmwfPIyC9F3spfYO6ixzBybO232JoGj84FMQQjtK5wvyMBLAQOOnjYsGGD2qRx+PDharNIrijTfY9YTqbnpJwugwApMTERH330UR18ofMyQ85pXZo9e7aa4qtToJ4Tvb562DxZOr9ctyfzIoro1xmyAKl8yxbcE3E5Mid3QeHUO5E/+U4UTb0TJVNuU6F4ym0onnwLSibfjJIpN6Noyq0omdwRpZNvQunkDiidfLMJRgemDzRXH5jSESWTO6BoSgeUxN2NhwZ2xE3XXYsJU+9F7MQpGDlxGkZMuh8jJk/HyEn3Y9SkaRgzcQrGTJyM2EmTETtxKkZPutcEowO/fSB24jTETpiG0RImTsNoFe7D6InuMIH9bhrGT74XXSJ7ITpmSO2Q3USEJAOmWFB0cMA8HpJXWymUtYhTbrIHkeSJPJ2yvMgQmcKvyxc+pgkf0wi25FMiOr8uw1dc5IhMaYecCyUf8+RcRS7yn5AFSNXVB1CUmwHniiVwLl+KrPhn4Ih/Fq74pciJX4bshKeQnfg0nAlPIidhKXITlsK1Yilc8cuskPAE8uKfgCveD01YYvH5o/7k2PIDqlvK+Ktb8oU/QGraEMD/b9el6NoftZer59xvH7SX9Ve35NvL1XMe9DbEL0Vu/DLkrliGXN6DKQlwZjmRkpSGlMRkJCenITE5C0nJGUhJSnWHNKQmpSI1KQUpKki6N5rmKWOV93fuTUaw0vzVLfnBqs+bHKnDH/VWNlhp/uqW/GDVJ3LSVH9KSk4DQ2JyOpKS0pGYnIGkpAyLpmQiMTFNpcevSMKrq173rDqr4ZjeRJAkwIBU4gIUBGCQStwXbpB8kSNlJN0uU87JLzx6GT0udTJNrFOS5ovq5RnnobeN58IjMoRPzi9mGrIA6WJWurk2owGjAaMBo4Fm1gDHezXo1+5hFKwamwoS7KDD3q5A5OsyhF+oXV5TzptDZlPac77K8gO/FwRAYj+v3Y7rFLfk8uhI3QPuM+EjNYfRgNFA82vg3HuO9yZ3Fz5rbRvjtwlyBxvqNnm4zR1GH9714bdDWQxKffwJgvkowCoN28WhAbHWkYYsQGLXVgftozVn6phI2eVrQ42CS3wsS/CUFRmGGg0YDTSDBqw7jb8M1ksM39ZPATWna+9ZvsWre/gMuKuxKiWFDPWOA4xe6upF9RvrqV/jfvr7ovroYABSM9z2F7lIsZhxmvL/A7usCGgK6ThaAAAAAElFTkSuQmCC" alt="">Para comparar dos números naturales se utilizan los signos mayor que (&gt;) y menor que (&lt;).Siempre que se suman o multiplican un par de números naturales se obtiene como resultado un número natural; sim embargo cuando se realizan una sustracción o una división, puede suceder que el resultado no pertenezca a los números naturales.Los números enteros: En la vida real algunas cantidades toman valores positivos y negativos, por lo tanto, se debe recurrir a los números enteros. Este conjunto se representa así:Z = {…, -5, -4, -3, -2, -1, 0, 1, 2, 3, 4, 5, 6,…}<img src="/web/uploads/9128/670b1f49e4-linea1.jpg">Valor absoluto: el valor absoluto de un número entero es el número natural que resulta al prescindir de su signo. Geométricamente el valor absoluto de un entero a es la distancia entre a y 0 y se denota por |a|. por ejemplo |8| = 8 y |- 6|= 6

Ejercicios

<ul><li>1. Representar cada uno de los conjuntos en una recta numérica:</li> <li>A = { n/n E N, n &lt; 6}</li><li>B = { n/n E N, 2 &lt; n &lt; 9}</li> <li>C = { n/n E N, n &gt; 5}</li> <li>D = { n/n E N, n &gt; 12}</li> <li></li> <li>2.colocar el paréntesis de manera que las igualdades sean ciertas:</li> <li></li> <li>a. 25 – 17 – 16 = 24</li> <li>b. 29 – 25 – 20 = 24</li> <li>c. 40 – 9 – 2 = 33</li> <li>d. 21 – 12 – 7 = 16</li><li><img src="/web/uploads/9128/96022fc549-ejercicios-11.png"><img src="/web/uploads/9128/200a5ead17-tabla1.png"> </li></ul> <ul><ul><li>5. Escribir, &gt;, &lt; o =; según corresponda:</li> <li>a. |- 20 | _____ | 20 |</li> <li>b.– 800 _____ - 200</li> <li>c. - | - 8 |____ 8</li> <li>d. - | 5 | ____5</li> <li>e.– 50 ÷ 5 ____ 20 x (- 2)</li> <li>f. – 150 ÷4 ____ - 35 ÷ 7.</li><li></li></ul><ul><li>6. Escribir V, si la afirmación es verdadera o F si es falsa. Luego, justificar la respuesta:</li> <li>a. Entre dos números enteros, siempre hay otro número entero.</li> <li>b. El mayor número entero negativo es el 1.</li> <li>c. El siguiente de cualquier número entero es un número mayor que él.</li> <li>d. El producto de dos enteros negativos es otro entro negativo.</li> <li></li> <li>7. Responda:</li> <li>a. Si n es un número natural par. ¿Cómo son? n + 1;n + 2;n + 3. Justificar la respuesta:</li> <li></li> <li>8. Completar los espacios en blanco con los números correspondientes:</li> <li> 4x5 + 35x2 - 8÷4 + 15 ÷3</li> <li>= ____ + ____ - ____+ ____</li> <li>= _____</li></ul></ul>

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