Gegeben sei das untenstehende Wechselstromnetzwerk, das aus drei einzelnen Blöcken besteht. Die Blöcke beschreiben von links nach rechts eine Signalquelle , einen Tastkopf mit der Innenbeschaltung besteht aus und und die Eingangsbeschaltung eines Oszilloskops bestehend aus und . Im folgenden soll der Tastkopf mit dem Oszilloskop abgeglichen werden.
![Abbildung](data:image/jpeg;base64,/9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgICAgMCAgIDAwMDBAYEBAQEBAgGBgUGCQgKCgkICQkKDA8MCgsOCwkJDRENDg8QEBEQCgwSExIQEw8QEBD/2wBDAQMDAwQDBAgEBAgQCwkLEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBAQEBD/wAARCAFVAnQDASIAAhEBAxEB/8QAHgABAAIDAQEBAQEAAAAAAAAAAAcIAQUGAwIECQr/xABtEAAABQQAAwQEBgwGCwoKCAcBAgMEBQAGBxEIEiETMUFRCRQiYRUYV3GBlBYjMjg5QlJ3lbO00hczYnWR0RkkN0dUVnaCobXTQ0VlcnSEkpaxwScoNDVGU1VmpOElJjZkc5Oy8URIY4OiwuL/xAAUAQEAAAAAAAAAAAAAAAAAAAAA/8QAFBEBAAAAAAAAAAAAAAAAAAAAAP/aAAwDAQACEQMRAD8A/qgssi3RO4cKkSSTKJznOYAKUodRERHuCtFP3/ZVrRDWfuG6I5jGvXKbNu7VXL2Sq5xECJlMHQRESiAfNX1f0Vbs7Y1xQd3OhawUjEvGsmuC4oCk0URMVY3aBrs9EEw82+mt1wmOsO4PVw9blhW0zaXTZUQt63EnduhflFYqpzAqCoiImMU5j6HfTu8KCQZq8LYtx5FR87ONGLmcceqRySynKZ0trfIQPEdday/u62Yu4I21JGbaN5iZIsowZKKaVclSDagkL4gUBARrznbLte5nsTIz0CzfOYFz65GKrJgYzRfl5e0THwHXSkhZtry1yRd3yUC0cTUIVZOOfKJgKrUqpeVQCG8AMAAA0GS3nahruNYRZ5mNxFY/CYxvafbwa84E7bl/J5hAN+YhWGF6WpKXNKWbHTzNxOQpEVJBgmptZsVUvOmJy+AGL1CvgtjWkW8hyEW3WQXKZh8GDKdmHrAtecD9jzfk8wAOvMKR1jWlE3TK3vG28ybT84milJSCaelnRES8iRTm8QKUAAKD0gb0tS55CWiren2cg8gXIspNFBTmO0X/APVqB4G91LfvS1LrjHMzbc+zkWLNdVsu4bqAYiaqQ6UII+AlHvDwrzt+xrStWRmJe3beZx724HXrsougmBTu1/8A1ig+I++s25Y9pWhGOoa2beZRrF6uq5cIN0uUiiqo7UOYPETD30HkzyHY8hZp8hsroj1raTQUcmlCKgLcEkxEDn5vIBKID81YkMi2NE2SXJEldMe2tc7ZB4WVUVAG4oLCUElOb8kwnJof5QV8MsbWJHWQfGzG1I5C11EFGpokiQerCioIicnL5CJjCPvEaxI40sOXsRPGMnacc5tRJsgzLEKJbbAgiJRSIBfySiQmg/khQfpuK+7OtKJaT1zXGxjY98ui2bOXCoEIqqqG0yFHxE2ugV7TV4WxbjyKj52caMXM449UjkllOUzpbW+QgeI661+W5Mf2ZeEOzt+6LaYycawXRctWzhLmIiql/FnKHgJdjoffXvO2Xa9zPYmRnoFm+cwLn1yMVWTAxmi/Ly9omPgOulB6P7utmLuCNtSRm2jeYmSLKMGSimlXJUg2oJC+IFAQEa+C3nahruNYRZ5mNxFY/CYxvafbwa84E7bl/J5hAN+YhWJCzbXlrki7vkoFo4moQqycc+UTAVWpVS8qgEN4AYAABr4LY1pFvIchFt1kFymYfBgynZh6wLXnA/Y835PMADrzCg+2F6WpKXNKWbHTzNxOQpEVJBgmptZsVUvOmJy+AGL1CswN6Wpc8hLRVvT7OQeQLkWUmigpzHaL/wDq1A8De6vOOsa0om6ZW9423mTafnE0UpKQTT0s6IiXkSKc3iBSgABS37GtK1ZGYl7dt5nHvbgdeuyi6CYFO7X/APWKD4j76D0t+9LUuuMczNtz7ORYs11Wy7huoBiJqpDpQgj4CUe8PCvzs8h2PIWafIbK6I9a2k0FHJpQioC3BJMRA5+byASiA/NXrblj2laEY6hrZt5lGsXq6rlwg3S5SKKqjtQ5g8RMPfX5mWNrEjrIPjZjakcha6iCjU0SRIPVhRUEROTl8hExhH3iNB9yGRbGibJLkiSumPbWudsg8LKqKgDcUFhKCSnN+SYTk0P8oK9bivuzrSiWk9c1xsY2PfLotmzlwqBCKqqhtMhR8RNroFfmkcaWHL2InjGTtOOc2ok2QZliFEttgQREopEAv5JRITQfyQr1uTH9mXhDs7fui2mMnGsF0XLVs4S5iIqpfxZyh4CXY6H30H6pq8LYtx5FR87ONGLmcceqRySynKZ0trfIQPEdday/u62Yu4I21JGbaN5iZIsowZKKaVclSDagkL4gUBARrznbLte5nsTIz0CzfOYFz65GKrJgYzRfl5e0THwHXSkhZtry1yRd3yUC0cTUIVZOOfKJgKrUqpeVQCG8AMAAA0AL0tQbuGwgn2Y3EVj8JjG9p9vBrzgTtuX8nmEA35iFaeTzLiuFuGVtSVvyHazEGzGQkmSjgAVatgIU4qnDwLyHIbfkYK2pbHtIl5GyEW3mQXIZh8GGk+z/ALYFpzgfseb8nmAB15hUYSshi6Rz1M4jksPqu5O7bd+EJi4FIvmZu24ADf1VVfWhPyFKHJv7kAoJHeZLsFhZAZKe3ZGo2sZFNwEsdYAbCmoYpSG5/IxjlAPnClzZLsGzYBjdN1XZHRcRJrJN2bxysBEl1FSiZMpR8RMUphD5q8nuL8fSVhFxa9tCNXtIqCTYsOoltsCSRinTJyeRTEKIB5gFZufFuPb0t2PtK67OjZSGilUV2TFyiBkm6iRRImYoeAlKYQD56D9k/fdn2q/h4u47iZRzu4HHqkWi4U5TO1unsJh4j7Rf6QrMlfVnxF0RVlSdxMm07OEUUjo9RTSzoqZTGOJC+OgKYR+Ya8rjx9Zl3SELK3LbTCSeW459ciVnCQGMzX6fbEx8B9kv9AVmTsCzZm64m+ZW22LmfgSKpxkiontdqVQpinAhvADFOYB+caD0NfVnkvAtgGuJkFxnZ+vljBU+3i35uXtOX8nfTdGN9WfJXXJWMwuJk4uCHSTXfxxFNrt01CgYhjl7wAQMUQ+cK8zWBZp70LkY9tMDXORn8HFlBSD1gG3Nzdlzfk78KR9gWbF3fJ39H22xQuKaRSbyEkRIAcOUkygUhDm8QKBSgHzBQZty/wCy7vlJmFti5WEm/t5yLOVbt1QOdmuBjFFNQPxTbIYNfyRr4tvIljXhCvbjte6Y+TjI5VVB27bKgdNFRINqFMPgJQHY+VYtjHNkWZKzc5a1rx8XIXI6F7LOG6XKd6uJjGFRQfE2zmH6Rr5tnGth2ZBvratS1I6LipJVVZ40bJAVNY6oaUMYPETAGhoMx2SbCl7KPkaMuuOc2wmksseVTWAW5SJGMVQwm8AKYhgH5hrDzJdgx9jlyU9uyORtYyKTkssdYAbCkoYpCH5/IxjlAPnCviMxfj+GsVTGcXZ8Y1tZVJZA8SmiANjJrGMZQol8QMY5hH5xr5e4tx9I2EXFz2z4xe0yoJNghzogLUEkjFOmXk8imIUQ95QoPW5sl2DZsAxum6rsjouIk1km7N45WAiS6ipRMmUo+ImKUwh81fon77s+1X8PF3HcTKOd3A49Ui0XCnKZ2t09hMPEfaL/AEhX47nxbj29Ldj7Suuzo2UhopVFdkxcogZJuokUSJmKHgJSmEA+ev0XHj6zLukIWVuW2mEk8txz65ErOEgMZmv0+2Jj4D7Jf6AoPWSvqz4i6IqypO4mTadnCKKR0eoppZ0VMpjHEhfHQFMI/MNDX1Z5LwLYBriZBcZ2fr5YwVPt4t+bl7Tl/J303XnJ2BZszdcTfMrbbFzPwJFU4yRUT2u1KoUxTgQ3gBinMA/ONDWBZp70LkY9tMDXORn8HFlBSD1gG3Nzdlzfk78KD0Y31Z8ldclYzC4mTi4IdJNd/HEU2u3TUKBiGOXvABAxRD5wr4ty/wCy7vlJmFti5WEm/t5yLOVbt1QOdmuBjFFNQPxTbIYNfyRrEfYFmxd3yd/R9tsULimkUm8hJESAHDlJMoFIQ5vECgUoB8wV8WxjmyLMlZucta14+LkLkdC9lnDdLlO9XExjCooPibZzD9I0GbbyJY14Qr247XumPk4yOVVQdu2yoHTRUSDahTD4CUB2PlXzHZJsKXso+Roy645zbCaSyx5VNYBblIkYxVDCbwApiGAfmGsWzjWw7Mg31tWpakdFxUkqqs8aNkgKmsdUNKGMHiJgDQ18RmL8fw1iqYzi7PjGtrKpLIHiU0QBsZNYxjKFEviBjHMI/ONB9u8l2CwscuSnt2RyNrHRSclljrADYUlDFIQ/P5GMcoB84VvWj1pJsm8gxcJrtnKZF0VSjspyGABKYB8hAQGuFv8As/H8DhObtl1jptNWrCQyi5LZboAYjpNqXtk26afX2hMkUCh58tfvw/dKF7Yzt65mdpPrYQesiGSh3pOzWZED2SpmLoNaAA+jVBz/AA9cR+NuJu05K8sYKSR42KlVIdwL5r6up6wRJNQdF2Oy8qpOu+/flXriDiEx5nCUvCHsZSRMvZEseGlvW23Yh6yUTAPZjseYuyj7XTuqQIqChoJA7WEiGUeiocVTptUCIlOcQAOYQIAAI6AA339AoxhIiKO4ViopmzO8UFZwZugRMVlB/GMJQDmH3jQcBiviEx7mK778sezlJA0njmWNDTZXTXsiA4BRQg9kbY85eZE/XQeHnXhY3EfjfIWXrvwhbqsmNy2QUppUqzXs0AAwgAdmpzDzd4eHnUjsIWIi3Dp1GxDNos+U7Z0oggQh11NjsxxAAEw9RHY7HqNYawUKykHEsziGSD53r1h0k3IRVb/jnANm7g7xoOAjOIPHktnuW4cGakj9mMNDhOuSmbaberD2IAJVN9Tfb0+mvPyrwluI/G8LnyI4bnqskF4zcaaUZkK122FACqCImV30NpE/TXlUjkhIhOUUnCRLMkisn2SjsqBAWOTp7Iqa5hD2S9N66BWFIKGVlE5xSIZGkUiimR2ZuQVikHfsgfXMAdR6APiPnQRxc3Efja088Wtw4yykkW8LvjjycaRNpzNhRIVwJudXm9kdNVumh/F86zlHiPxth+/7Hxrd60kE1kJ2LKGBs07VMVAOQg9oYBDkDaheuvOpFXgoZxKIza8OyVkmxBTQeHQIKyRBAQEpFBDmKGjG6AP4w+dHsFDSTps/kohi7dMjc7ZdZuQ6iBt75iGMAiUegd2u6g4HM3EHjzA6tqI36pIkNeMwnBxnqjXtg9ZOJQLz9Q5S7MHWvPiG4i8c8Mljtcg5PVkk4h5JpRKYsGnrCnbqJqKF2XYaDlRP1336qRJGFiJcUBlYpm8FqoCyAuECKdioHccvMA8pveHWsS0HDT7YrOch2Ug3KcFCpO25FiFOACAGApgEN6EQ339RoI/zxxB464csfJZMyOpIEhlXiLIDMW3bq9oqU5i7LsOmiG678q/dlHNlkYhxI/zVeCr0ttx7dq5XM1b9qvyOFU0k+VPYbHmVJvr0ABrspODh5toDCbiWcg2AwH7F2iVUnMAaAeUwCG9CP9Nfb6KjZNgaLkY5s7ZHACnbrolOkYCiAgAlEBDQCACHzBQcXOZrsi3MLHz1JKPfsVJDJTomI35nAtVCFMX7Xv7rRw6b86xaWbbHvbDKed4NR99iykSvNFMq35F/VkiGMf7Xv7rlIbpvyrtVImMVjvgdaNaqMRTBEWpkSiiJA/F5BDXL7ta6UQiYxrHBENY1qixAgpA2TRKVECD3l5ADXL39NaoOCxdnmwcvYfRzhaCj89sLoPXBRct+zX5Gqiiau0xER3zJH1169POs4HzzYHEbYgZExwo/PEC8WZAL5t2CnaJDo3s7Hp17913bKHio2PCJjoto1YgBig2RRIRIAMIiYOQoAGhER3067GsRkNFQjX1KFimjBvzCfsWqBUicw948pQANjQR/gjiEx7xFwEzcuOFJA7OCmFoN0L5t2BgdJJpnNoNjsulS9fn8q8MO8SGNc5XFelrWIpJHfWFJfBcwDxr2JQX5lC/ax2POXaRuvTw86kaLhImERUbw0UzYJLKCqoRqgVIpziGhOIFANiOg69/QKR8HDRKzlxFQ7Jmq8P2rk7duRMy59j7RxKACYeo9R8xoOAsPiEx5kXKN64fttWRG4bBMiWXKu17NEBV2BezPsef7kfAK9rdztYlzZmurAsWo/G6bNZtX0mU7blbgk4TIonyKc3tDyqF2GvOu5bQcOyeuZNnFM27x4IC5cJIFIouId3OYA2bx7xr6RholvIrzCEW0SfuilIu6IiUFlSlAAKU59cxgDQd4+AUEbtOI7G73P73hrQVkvsyj4wJdYotP7VBuJUzbBXfU2lSdNedLn4j8bWnnm1+HCWWkgvC7488nGppteZsKBCuBHnV5vZHTVbpofxfOpFCChiypp0sOyCSOTszPAQJ24k1rlFTXMIaAOm9dArK8FDOJNGbXiGSsi2IKaDs6BBXSKICAlKoIcxQEDG7h/GHzoOAyLxB48xdkWyMXXQrIBOZBXVbwwINe0SE6fLzdofYcge0Hh5145r4j8a4DkrPicgqyRF75lAiIn1Rr2wC4EyZftg7DkLtUnXr3j5VIruEiX7ttIP4pm5dshEzZdVuQ6iIj3iQwhsv0apIwUNLnbqSsQyfHaH7RsZy3IoKJ+ntEEwDyj0DqHXoFBHWcuI3G3D0jba+RVZEhbqkyRMf6k17cRcG1rn6hyl9oOvWvfPfEDj3hxsEmSckqSJIc71FgAsW3bq9qoUxi+zsOmiG2O/Cu+k4OGmgRLMQ7J8Dc/aIg5QIr2Z/yi8wDofeFZlIWInGvqM3Es5BtzAfsXSBFScwdw8pgEN9e/wB9BxmZ812TgbGr7K1/KPSwUeZEqpmiHbK7VOUhNF2G+pgDv7qzOZssi3cLnz1IqvvsWJDJTonI35nHqqhCnKPZ7+60cOm67SRiY2XZmjpaOavWqmudBwkVRM2u7ZTAIDr5qKRUYtG/A68a1UYimCItTolFEUw6AXkEOXl14a10oOEbZ4sF1gwOIdNV/wDYkMGa4ecW+nHqgEE/8Xv7rl/F3XrjfNtj5SxE2zZahnw205ZOXyZnDbslxSQE4Kfa9jodpm0G67UIeKLGfAhIxoEf2XYA0BEoIgnrXJya5eXXhrVZaRMXHx5YlhGNWzIhRIDZFEpEgKO9hyAGtDsdhrxoOJwfm2x+ITH7XJmPVHp4V2us3SM+b9irzoqCQ+y7HQcwDrr761vD1xH424m7TkryxgpJHjYqVUh3Avmvq6nrBEk1B0XY7Lyqk6779+VSPHREXDNAYQ0Y1YNiiIlRbIlSTAR6iIFKAAGx34eNfMVBQ0EgdrCRDKPRUOKp02qBESnOIAHMIEAAEdAAb7+gUEf4g4hMeZwlLwh7GUkTL2RLHhpb1tt2IeslEwD2Y7HmLso+107q+sVcQmPcw3fflkWceRNJ45ljQ02Dlr2RCuQUVIPZG2POXmRP16eFd8xhIiKO4ViopmzO8UFZwZugRMVlB/GMJQDmH3jUX5UbZgt26bNWwXZ1tHj5aeIN7OHBCIreoionzqkEA2dTlMsOx67150EvAPvpWA5u8DB9IUoNDkILRGwrkC/xQC1xiHnw2LjfZAw7E/rHPrry9nz7111XP4FLiMmKIEuCVGKljAmr8EmZc/YCTtT8/LzgA/xnP3+NdDf8nbsJYtxTV3tgcwMfEvHUoiKXago0IiYyxeT8faYGDl8d6rQYJujHF5Yrg7kxLGlYWo8TVGObg09W7MoKnKYOz/F9sDD9NB31KxunMXzCgzSsbDzpQZpSlApSlApSsbCgzSsAID3VmgUpSgUpSgUrGw7t0AQHQ+dBmlYAd9azQfJvCo9VyLdxM4JYxLjaRNbikIMmN0gqX1UrkFOX1US9/Pr2qkI3eFR4rcuXS5uStVOyY02OjQgulJ/1g3rRZHn0CHZ93Jy9ebVBIgeNZr5KPUelZEQDvoM0rGwpzB50GaVjdZoFKVgRAO+gzSsbpsO8OtBmlY2A91ZoFKUoFKVjdBmlY3us0GmvSUmYO0JyatyEUmZaPjXLphGpmApnrhNIxk0AEegCcwAUN9ParW4ruS67usCFuS97QVtacftwVew6qgHOzU2IcgiAiAjoA8a2V5uLka2jNurNZNnlwIxzlSKbuT8iKzwEjCiQ5g6gUT8oCPgAjWsxW+v+SsCGfZSiWEZdSzfmlGjFUVEEltj0IYe8NaoOspSlApSlApSlApSlApSsb130GaVjYedAEB7qDNKUoFKwIgFNh50GaVjYd+6AID3DQZpWN7rNApSsCIBQZpWAEB7qzQKUpQKUpQKUpQKUpQKibNt+5ns25MfR2K8YJXXFz84myud2dQS/A7AVEimcgAGDYgU6ptdfuKlmo1y3ku9LCnbJirVxbJ3a1uaXJHSjtmoUpIduY6ZRcK77ygBzD0/IGgkbpsd9OvupWdgXoIhSg0eQJ9C1LFuK6HMMvLow8S8kFI9BPtFXhUkTHFEhdDzGPy8oBodiOtVocGX+zyhi2DvmPsx/ajeTTUOSIfN+wXbcqhi6MTQa3y83cGwHddJekrMQVoTk3bsIeZlY+NdOmMamYCmeuE0jGTQAR6AJzAUux/KrTYhum8b1x5EXNf8AZC1oTz0ihnkMsoCh2hiqGKUBMAiA7KUpv86g9MkZKt7GsYydy4quH0u8JGxEa3ADOZF4cBEqKRfmKYxjD0KUoiNcHevEBcOK7Vm71ypih9DQ8QyXeFcsZJOQKoZMgmKmcCkKKQnEvKAjsNmDfeNRvx4R2V7bf4s4gcV2oe6lcWzD55IwiYCY7hs7bAgZUpQ6mMQvPrXUBOA+FcrZ/pEuGriIj5DDV9oSdjydzsV4pVnPtgKhtZMSGIKg6DfUe8A+fyCx2Ts/WJhjFLfL2RFnbWHVBqTlatxXV7VfXIQpQ7+8eoiHQPPpUixz1KQZIP0QOVNwmVUhVC8pgAwbDZfAevdUM8RWR08BYY+yxfGA35blvtUjyKXraKRkEUxTKmoBFCmBQeYQHprWt10eTs72ViLF7TJ93C4RZvzNGzFoiXnWcunAB2KBQ7uYR317gABHwoJL2FOYB7qhS8M+T9oXTatjS9gJR8vfhF0YBdxKkO1M9STBQ6KwlKAl0Uegh91oQDrqucyDxS3ph2yLRvPJ+GHDNnNyLaIl3CcskmSKcLOTIlOYhgETJCUoKb5ugGAB67oLHCIAAj5U2HnUMX9xHMMZ2nDX/eVmyMda0tMtooXyipQVapuDCRFyqjrmKQTa2G9lAwCPlXQ5uzTbeErPZXTcGjllpRrDMCmOJEjunHNyAdQAHsy6Ib2tD10HiFBIomAe7rqogzFxCkw3c1qQs1j+bex12XBHW22l250wbou3inImBwEd6DqI9PD5q+D51k7QyNa+O8rW22h1b3BVKBk2Trtmy7pIvOdqfYbIflEBKPcbrrQ9B4zjm/8As5iEfLMdo9P+dmoLKl6fTWeYA2Ij3d9R/ljM9q4lSiGssC76cuN2EfBwzMoHdyDjv5SFHuIUOpjj0KHUa4q/uJaSxDFnl8s4xcQTZwqg1i1W0qm8TeulXBESoCYpA7M+lO0AB2AlIfr0oJ15g8/dTYVDWaM+TGG56zUHuN15SAu+4Yu2iS6EommZo7erdmXnQMQTCUodeYDde7p31nPOe5jBj23XLnGjmbt6clY+FVlW8mkkZo6drikUDImKJjFD2TCYB/G14UEybDzrBh33VHuWswxOMG0LHgzGVua63xYy34VJQCKPnIgJjCJh3yJEKAnOoIeyUB6b0Fc0TN102lke2seZdsttEkvM6jeDmI5z27Q7wpDKC0VA2jEUEhTco9QNoda7qD3tviHSms8rYClbCmYSWJb69yIPHR0xQctE3JG+ycux6mPvr+SPmFfTPiFbqcQCfD/JWHNRz9zFupdnJrmJ6q6bIKlSExNDvqYwd/UK4iT6+kZgem//AAOSHj/wy3rN6l/8f7HHfsMdzY78v7cbUFlAEKzuooubNDlzkZ1h7F0WynbqjGJJKYFw4FJrFoKCIIgqYoCIqKCA6IGh0AjX3ijNxb5u25cYXVbxrdva0+wWfxorAsks1XARRcoKB92Q2h34lHoNBKZtd4+FR4qlmoc3pKJuIUMX/AggomJQ9fGU5+gh0/i+T399SGIh3gNR4raeVDZuSvJPILUtglgxZntv1Qe1NIdpsHPagPdy9NUEhl/0UMIB31kPEf8ATQwbDu3QQ9bOWckXjft6WxA44akhrRlAiQmHT/kK8W7EipuRLW9FBQpRHffuuXsDiXvHIGcsg4MZ4/ZNZDHpGqjx6pI8yS4OC8yfIXW/ud733dKnSAtmJtoZEYpE5BlHysi5ExxNzrqCAmH3dwdPIAqn/DXv+yHcTv8AyeA/ZzUE92Xl28pTMsviG9bBShFWMKlNsX6L4F0n6J1hSMBQ0AlEgh7QD+UXzDcsgIB491RNn+4mWJ7eWzszsqUuS4IBkMQ0axyR1VFEnjpsBuZMnU4FOmmbp1AObWtiNc9l7NV38P8AIWNLXUincFsXhOtbaeKIIgi4jHjnYIKFAOh0tlOBt+1vXn0Ce9h7/wCisDodf01BmZs1Ht3J9tYZa3tF2Q4uSLcSxZ+SRIqUexWTIDZAqogmKhuYwiJ9gBQ2Ab1W9hpXLv2VSdqpy8JLsErZQexE2q0MUjmQMssQ/rAJCBOUAImPKmIbAw0HbxF6wU5dVwWcwVUPI20LUH5RJ7JBcJdqmAD58ogPu6edQtxJcQOSMG31jePjrVgJG277u6KtQ7hdZUHaCjpUCnUKUvs+yXfKA9499QVwnL8TE7m3PhhvOzV5BjeiLGbcu49cQVBFIEyFbFKYAIQqZAAObY+dd76Qnfr/AA68whv+GW3tiH/4o/10FwC6DfXfWs8wVX+/shZ8uHLpLIwChaL2AjGYFuKUlyLHTYPu0N/a5RTEAVPycoiQogJNDzDsdBuDZlnbhzMtgWySM3MnbEU2krvmVQEUmPrBR7BBJMO9VTlE/teyBQ69dUE0bDxGnMAjrfWoNeZsnMYZrt7EWVFGzljfhF/sUnG6PZio6QADLNHJA6FNymKJDFDQ9w9ajRDOXE014s5DhqVTs2QTVtNS42Mkm3VTI0S9ZImUyxd7OIAIl5S6ATHKPcFBb3mDz76ivLOWZK176sXFFps2y1x32q+FJw65hQYtGqQHWXMBepjbOmUpd9RHY9AGuRnc8XdhnK9lY0y+yj3sTkJwpHQlwx5BRBJ+UoCDZymPQOcTFAhi+/YVFeZmWeDca2ME4ycsorpWLuY0CquyciCLPbcRI5AD+2py8oAJdBvfSgsxha6cg3XbD5xkqzV7dlGMu9YIkVMUReNUlRKi60URAvaE0IgGg3vQAGq7+tfAJzaUIwTuRdotLFbJA+UaEMVA6/KHaGTA3UCibegHw1WwoNLejW4n1oTjGz5FGPnnEa5Si3a5OdNB4ZIwIqHL+MUqglEQ8QCtdiyMv2HsCGjcnz7SauhBvyyT9oj2SS6ux9opPANarZXnEStwWhNwMFNrQ0lJRrpozkkP4xkuokYia5P5RDGAwe8tazFdrXJZVgQ1r3feLu65iPbgk7mHYaWeH2I85g89aD6KDrKUpQKUpQKUpQKUpQKjHNudLfw+2howzU8xdd1uwjrdgkDgVZ+4HWxER6ETIAgY5x6AFSaNUZUlnN9elpJATp0xZ49x8dzDpD3FWX7AVD6H8cQdHDf5JQoLFAnxOkalnO2sZVwohzqQZk1ykTU6DyEcgOxN3lExg5fEAr9eD8+21mZGaiU2i0LdlqO/g64oF0YBXYOQDroQ6KJiO+VQOhtVJ4hsO7oHhqqBKyxrA9L0SKhQU7DIdnFCURRH2O2SbmORQ4eemgAAj4qe+gv/ALDW9hqmw791XLF2Y53M1zzb+KyvCW6MBNv4b7DlGqJ3KvqrhVEFHJ1PtpRV5Cn0loAKIeO62B8iZ4d2HYKEbHW83vO5LidRsuL1JUrRm2RB0ZU6Zfuza7FMpN94GAd0E+CID41FFyZvl4HiEtXCDfGE+/Y3HGOJBa5kiaYMRTBQQTOOvuh7PXeA7UL4b1ENzcQ+bIziEtbh6tD7FrtnXJ039zqNmyqaEHGgYOYypuYftpgH2C779efTe3xmvL1hcYGM8OPT288s3I/wqogdJA5XrYrRkdblOYREo7OBeoeHv3QbLK3EDkbGPEnjDEqtrQLm18mO3jVrIAsqDxAWrYiquy75OpzgAe73165mzpk7FOZ8d2cW2beeWpkCdLCovDKrA9biCHOcxigPL91vXu1XA8W+/jhcJH883P8AsTettxk/3YOGgPPIB/p/tY1BanYAPUe/urOwEN7qI8jZrViMrW1geykGbq8LjZLTCpnYiKEdGpHAp1zlL1MYxhEpC7DYgIj0DroMi5wnMB5HsyEyU6byVo3/ACJYJjLkSKgrGyZg2mmsUPZMmp3AYNcuhEelBPewrgc53bfViYynL0x9FRElIQLReSXbSiihElGyKJ1DgUSdef2SgHh31Gw5klb3zvdGLozKUPYxLHcNm549w3QWezRl0El+1DtuhUQBTkDs/aEQMI6DVe8vcuQJzC+eYvIbNqi6gEJuOYnaoGTRXZDFEWSUKJvutgsOxDoA7DvDQB2fDTleSzjg60srTEU2jXlxsQdKtW5zGTSNzGDRRN1EOnjUm7DzqkeAshX1ZvAjimPxA2i5W/pKPRLFw70DCVykK5iqnMJB2mQhREwqD09jXURAKlu7M2ZHwtYFvBlJhATeQb0nUISCiYYTpNzLLFL/ABhz7ESpe0Y5w/F1oN0FgeYB11DrTYVCOZMgZSwhYCuWpAI+5IqCKRzccW2biiom02AKqtjjsTCTfMJT95SjoQriuJfiCybj63Mf5UxRIW3KWZd0vDxBkFkTneKi9Oce1SUA3Z67MCABRAfaER3qgtHzFHuEKAID3DVfsnZC4gsPY+kMuzEXbdxR0NzP5eCjiKJLoRwBsxkVjCIHUTAeY3MHKIFMIa7ql/Hd925k6yIXINouzOYefZJP2ahg5RFNQvMACHgIb0IeAgIeFB0dKUoFKUoFRNm3OzjD1yY+t5DG89c5b7nCQp3UaQTJxQGUSJ6w40U2kw7XY93QhutSzUaZdzva+HZ6x7euCKmHbi/JgkKwOwaismgsY6ZAOsIfcEAVSjsfAB8qCRxKIjsBEN/P/wBw0r6DmHuHWqUGnvVxcjSz5x1ZjNs7uBGNdKRTdyfkRWeAkYUSHN4FFQCgI+ADWnxBIZJlMeRD7L0NHRN3KkOMkzj1RUQSN2hgJyGHv2QCD8+63F6I3M4tCcRsp02a3CpGuSRK7onOik9FI3YHUKP3RAU5BEPIBrT4gaZOY48iWuY5aNkrvIQ/wk6jkARbqG7Q3KJCB0D2OX6d0HM5JzRGY6zTjewrilWcfFXxHTpSKOBAoHfNRYmRJzj0KAprOe/oIgXx1XFcZuJ8H3Fw8X5PXzbkG1Mwgnb1nKEbpprpOiJidASKAACJjKAUADx5teNTLdeMrGviXjZu7bbZyrqJavGbQXKYHKkk67LtwAB6AJuwT694a6Vy7Dhrw7HuWqwWmVyixOVRq0duFF2yJigIAJUjmEvQB8QHw8qCv2RC3e19Fe9TyGZYk8XHjYrz1gRBXnEifKCm+vPoSgbfUTbrp+LCwbdyTwpWy2mLiRhE4yRt6SaTCg8zdguChEgWU13k5VTh362YB8KnrImJMdZajEofJFpMp9ihzcjZ3zCn7Wt7KAgA/cl7991RDmjEURb9v2XaNu2MLnFbeVX+zC32AGU9YanQMVERTERFRIq3IJyAO9AUQDpQaVxCt87ZYx1dN8XzYiDDGzxzJMY6HnEnS0k9UTBNJQ2jewUnLzAXWxEwgPdWn9KWLcOFk6bgyYFVuiHLo4h7X27r8/QB37t1zF4YY4E5e25aNxjihwW6DNFQjkrch3zN4VyBR7MxFDkKQBA/LsRHVTlaPD9EZGwvZMDxP2jF3bc0bEsiSYvRMsX1lIhgAR6gBjh2h9m8RMI0EZ+lFWTQ4IboOKpCGFzFAlsQARN60kOg9+gHu8ArtuKLKby0IfGVlQkBEyb/ACJcjOIbPpRAq7SO0TnM5Eo+yZQAD2A7t7qRLk4dsK3ha7Sy7qx1FysGxMU6DF0B1EyGKJxAdCbqICqfv/KH3VtVcP41Xs5rj9xZsetb7E3O1YqlExETbEwCQRETFHYj1AelBUzjAt93CZW4aiyN3Ss7KGyG0M6MqYCppl9kOcqRA5UeYREOnQQAQDurreK29Y+98a4auhqT1ds6zRbCaYHOA85UpBRPmKPiBuzEwD5DU3PeHTDcjAK21IWMycsl3KDxQFTHOoKyJtpnBQR5iiHhoQ7xrF08N+D72QjGt141iJJGFIinHpKlPyNQS32YkADAACXY6HWw2PWghLiGRWtbjWwRk25EThaJWUpAA8OX+12Em4IPZGObuIKgCBCmHXUNb61+H0nMixTw9ZEYd0kV2vkKDWTR5w5zJkUOBjgHfoBOUBHzMAeNWfXxvYzmzi4+d2wyc26RMEgj1yiomBQHYa5hEdgPcO9h51S/j5xpY1p2LARGN7Ak3lzK3VCyrsI9i4eKBHNjrb9oeYpSlENAQBAe4RAeg0EuccZgQsfFEgsPI2Y5atFw6VENFRSB11ObyANh/TXnx/SjNri6zmyqoAdXINtriG/uUU36fOobyIAnIAj3AJy+YVOKSFk5gsJNKRiE5eBk0+U7Z+1MTYkNrqmoAGKJTF6D07th4Vz0pw24Zm4F1bMvY7V3HPRJ26C6qigGKVQFCk2YwiBQOUpgAPEpfIKCvXFrbL1Diy4e8my0o+Z2cU0jb7mRYuOwGNeOETdgr2ofcAqYxU9joBAohvrUtZGxhi+KlbCe35dd7zjxC62S1tslZlRyJ5IpVOVTs+gmIRIyx1B3oCAYR7gqUmWNLGYWWnjtG2GZ7dTTFMsesXtUwKIiI/d7HexEd94D3ar8ts4hx3aEgnLQNrtUHqBTJoLHMZU6JDd5SCcR5A8OnXWw3oRCghiTVSL6RuATFQoG/gckPZ5uv/nlDw+gf6BrN7Kpf2QLHCfOXnDHU2PLvr/5Y38PoH+gfKpJfcNGC5G7Bvt5jaLWuAR38ImMqC/3fPoDAboXm9rXdvwrMzw04MuG6j3xM43jHU+oc5zSJxUBYBMbmNowG6AJuogGg3QVow/Ya7bjaz7bl7XFc0BJXQtHT0A4j5AzMJOPKRQolKYP4zsRMUuvxdj076nay8eYrs7iEfPY2buibv51axCSDmQklHibeNBwHYkVER0Q51O0FMBDYlTU7tdZIu7G9k34VqF1240fqMDCdosculW4iGhEhw0Yv0DX6LTsS1LIQWb2vBt2AODAZc5NioqJe7nOOzG1sdbHpsdd9Bve7xGo5VxgspnVLLQZGmCppwQxP2MAoX1E21Of1nl3vtPDfdUjddBsNe6oyVxxjpTiDRyee6Vi3oS3xiyxHwoAEFl2nMKvqu99/Tn19NBJwVmsBWaDV3Dc9vWmwCUuWYaxrQTgmCzg4EKJxARAN+fQao3w9ZEsuK47+Im65O4EGkNOIQpY5+uUxEHIpIiVTkOIaHlEetXwfR7GSRBvIskHSQGA4EWSKcvMHcOh6br8RrXtsxRKa3owxRDXKLRMQ15d1BX/AI1cxXxj7FtqSWMX52jW7LmjYmTuNBLtixEW4Ee1dh4F0GtHHoG/mqIOLuycWW5j2yHWOyllXUNe9vzE1LJvjvVEY8rwOdZc/MYNCc5TdwdCiPcFXpcRcc7Ymi3TBssyMQExbqJFMmJQ7iiQQ1roHTXhX42dp21Hs3EeygI5Fq6/j0SticivlzBrRte+gqTkS+sG59yCbD3EHa8US3TtHLu3ZlfmSAizeTcMzGB13J9qVEhiG2BTABtb2FbjhxxbHYTz/LWPia85ufxu+tYJVwi7kRftYyR9b7NFNFbY+0dMq4mJvYAUg6DYbs69tK2JJA7V/bcY4RUSBAyarRMxRTAwmAuhDWgMYTa8x3X6YqDiIJqVjCRbVg3KID2bZIqZemg7i+OgCgpViGfc4YyhxbGkhI1nnEwe4rfauA5TSQLN1DNwQKPVbanKQQLvQiADrdefpEJRhKR+C4CWmjJSLDJEC+mRZiJV2TfQ9o5AADZClAREDeAh9FXWeW5BSEi3l30MxXfNf4lyo3IZVPrv2TCGw6gA/Poay7gISQX9ZkIVi5WEvL2izchza8A2IboKbNcn2ZwjZxYxUZOEfYky92kqzTa87g0DKcwAquOtm9WcDs2x3o5TCHTdbbGPq2IOMrJ95XFIJFs3NkVDTVvXCoppkKjVJQqjY6o+yQ4grzF5hDZQAA69Ktgpa9tq9kKtvRp+wTBFLmaJjyE6+wXYdC9R6B06jX29gISRjSw8hDMXLAgAUrVVAh0igAaAAIIaDQd2u7woKl5ubI8RHFXhSAx6unLROMnzu6LjmGawKNWpjFIVu2BQuymVMdIREoCIgUeut1+CUueDtb0p5nU9IpMm7vEItirrDyplOMkmYOc/cUNEHqOg7utXBhbeg7baepQEOzjUO8U2qJUyiOtbECgGx949aqGwtTL0zxwjnCbwa7JaL+zC2Ycrl2goYhjPU1hcnIICAkApB6d40HtxTIE4hs14ZxdjVcJY9m3YheNyybM4HbxbRsJTETMsHs9ooOygQBEegbAAr9OXMoWC1438SrrXI2K3gIa42MmvowpM3B+xAqShwDRDCKR+gj4Va6Jt+EgU1EIOIZsCHEBOVsiVPnHXeYQDYj7x3Xwe17dVVVXVt+NMouYTqmM1TEVDD3iYddRHY7330Gwaum75sk8aKlVRXIVRM5e4xRDYCHzhXrXymmRIoETKBSgAAAAGgAPKvqg0V9QTe6LLnrYdyy8WhLxjpgq+QUAirUiqRiCsQw9CmIBuYB8BDdazEdmMce45g7NjbmeXC2imwIJybxcFlnIbEecxw6GHrWxv+Jt2esa4oO73ItoKRiXjWUWBcUOyaKImKsbtA0KeiCYeYO7v8K1WGrasSz8ZwNtYzkRf2zHtQRjXIvBdiolzCO+2ERE/UR67oO0pSlApSlApSlApSlBgd66d9Ur4q7Au7EPEnZHGrYlvOJeMjm3wBfLNoUTrljjbKDsCB1OBAEN62P2tPprdXVr4VSIsQyShCnIcBKYpg2AgPeAh40HA/wAPeGPsP+zr+Eu3vgTsAcesevJ7Amt65N83P4cuubfhVaOGPFd25X4or042L8iXMTGP0AhrHYOS8ixo8CFJ60cg9Sc5CAIAIAP2w+wq1RcS4xI/GULYED60I8wn9RT6j561rfv1XVETAgAQgAUoAAAUA6Br3f0UFFonGHCZxZtV8k3yoWz8iGVctX7plJDDOlTorqIpuQDZQVKIEKIGDYDoAEa3KHEBeeB+Ea3H94GWuLIcpJPYKzjyxezWfF9aUTaPHAn0CRAbiic4mEOhigOuYatq6sKy3qzZw7tKHWVZgJW5lGSZhTKO+gdO7YiOvMRr98jAw0wmmlLw7F+RHfZlctyKATu3rmAdb0Hd5BQU5xWvj7hssFqkhlS3bozHki6Iks7JN3Kb5Z25dv0E10y8ojypJInV5diABrffoK/PxI3xabTjv4dpJzONyNLXC5Eplx17NidWPORMFR1ogmMIAG+/YVcBrYllMFyOWFnwbZZIwHIolHpEMUwDsBAQLsB3oelfqc2zbz1ZVw8gI1ZRYQFQ6rUhzH6a9oRAd+VBTLi9yDZyXFrwxSIziBmtuyc24lVSAYxWSTpk27A6ogHsgffQRrYcZWSrH/hZ4enCVxt1k4a9E38iZHZ/VGyzb7WqpygPKQ3OUdj4DVvXFs246VOs6t+NWOoAFOc7VMwmAAAAARENjoAAPcABWFLXtxc5lF7djFDmKUhjGaJiIlKAAUB2HcAAAB5a6UFTr3jz2Jx02RxKKu0XGPr1spW1lJcD7bsHPaFXRMc/cmkqUpAKYfZ2J9iGw3njFaRfEncWJ8I45fNJ10zvVldU47ZKFXbxsW0Ir2naqE2UplBUApC72JgDprrVuFYiMcR/wSvGtVGPIVP1Y6JRS5Q1ovIIa0Gg0GvAK/PDWxb9uEMlb8EwjSqjtQGrciQHHr1NygG+8e/zoKjX9jDhf4i8o3vFZrQZwd22hKFi46XSfjFunTIGjdYhwW2UFRTMsYB0IiHTegEK9LJXlLA4ZM1WneGQHU/bzBWahrOnJRbnWkWp4wDESIcf43lWMsmUQ3zcnTYaq1shY9nyxiKStrRbw5FzOSmXaJnMCph2Y2xDex0G/PQV+1SBhVmSMatDMjtG4gZJuZuQU0xDYAJS60HQR8PGg/mridtH484UcfcRuNpshcg4zYgW4YZ2ucBko1c/KswUIIfazciHaJdPuyCHeapTz/ekVm9rg7iZxiR5MxWNblTk7ljEkzg8YMnZCEUVUR1zCZLszDoAEdb1urpBbFulSWRJb8aCbjl7YgNE+VXl+55g111sdb8692cNFR5VSMYpm2Kt/GgiiUgH/wCMAAG+8e+grnxd5atG5OHa5bMx9Ksrrua/WAwUFExbgi7hws6Dk5xKQdplIUTmExtAHLoaizidsZzhvg/wNYL0DuXdqXnZrJwCHtGWXR5gU5PMRMA6q6MdZVow0geWiLXimb1X7pwg0Imp3aEOYA2Aa8qrtxxWvlXIsLZ1pY3xu6nwh7qiLpdPCvE0UwI0WOJkNG6icQ5dCHTr7hoOl4l8zWOhw/XXHW9LNZ+buqBdQ0JDMFAWdvHTpEUUyAkXZgABUAxuYAAAAdiFdJwmYymsOcOtiY4uM+5WHiUyPigfmAi59nOQB8QKJhKHuKFdVY0XGy0azuySxy1tubV5+1QVRRM4QEDGL/GED8YOvTXQdeFdiUB8aDNKUoFKUoFRpl3NuMMTT1kQOQFDlf3tMEiIHladsHrZlEiBs3+5hzKp+1/VUl1HuUrzwras3ZzHK8hCtpOZliNLYLIIdodV+J0wKVEeUeU/MZLr06iHWgkANDvoA6pQNeY/00oNRecZNTdoTkLbc0MPLv41y1YSIF5hZuTpGKktrx5DiU2vdWmxBa952ZjyItrIV6Huy4GZFCvZg6fILowqGMUeXw0USl/za2d/2+ldli3Fay804h05iJdx55FucCqsyrImIK5BHoBic3MAj3CFaLBlgNsX4tg7GZ3q/u1GMTUISYfKlUWdcypj7MYvQdc3L08ACg7ylKUCsGDfdWaUHzyjvvrIBrpWaUClKUClKUGB3XzyjsR/0190oPkoAHgAV9UpQKUpQKUpQKUpQYMIAHWooWhcEm4kEZxZwy/hYC2zIJo9sf1gYntdibk7tc/j31Kxt+FRStc+Di8SKNqKx7IcqmtwXabj1X+2PgvtdCUFfyefwoJXLrXSs18hrY6r6oFKVgRAO+gzStSvdtqtl1Gzm5opJZIwkUTUeplMQwDoQEBHYDXx9mlnD/6Vw315L96g3NK032Z2f/jXD/Xkv3qfZnZ/+NcN9eS/eoNzStN9mlnf42Q319L96n2Z2f8A41w319L96g3NK032Z2f/AI1w315L96n2Z2f/AI1w319L96g3Bg3TVaf7M7P/AMa4f68l+9WyZPmUk2K8j3iLpuffKqioByG0Oh0YOg6EBD6KD2ANVmlKBSlKDnMjntJPH1znv8qRrXLDPRmwVARILDsD+scwB15ey5968K0uClMYK4nttTDBW4WWLMPgcG5TAn2HMOuUDddb331v79mYO3bIuG4LnZqO4eMiXb2RbpodsdZqkiY6pCp/jiJCmAC+O9eNanDl12dfGNoK68fxK0Zb8i1BZg0WZ+qHST2PQUvxOu+lB2lKUoFKUoFKUoFKUoFKUoFKUoFKUoFKUoFKUoFKUoFKUoFKUoMCG6xoa+qUGAD3VmlKBSlKBSlKBUa5bcYJRnrILmAYIJZSYIW0/hInMp8I9oly9h0HSnP2Ovfy1JVR5lO3sJTc1ZznLTK3l5SOlSr2saUOUqib8DpiUW+xDanMVLu8QLQSBsweH/bSsh7/APRSg0d/RVuztjXFB3c6FrBSMS8aya4LigKTRRExVjdoGuz0QTDzb6a3WgwZamO7IxdB2vimUGRtZimoWPdC+F52hRVOY49sIiJ/bE3j07vCt7kILRGwrkC/xQC1xiHnw2LjfZAw7E/rHPrry9nz7111XP4FLiMmKIEuCVGKljAmr8EmZc/YCTtT8/LzgA/xnP3+NBIFKUoFKUoFKUoFKUoFKUoFYEQDvrNYHfSgbCgDuqScV/EJxRW3xVWfw6cOgW0Zzc1q/DQFmEi8oqlXdAp9sEB0HZty6DXfuvwgb0uodCtsT+/7eTv/AOhQXqpVFef0u3+DYn+sE/2dOf0u3+DYn+sE/wBnQXqpVFef0u3+DYn+sE/2dOf0u3+DYn+sE/2dBeqlUV5/S7f4Nif6wT/Z05/S7f4Nif6wT/Z0F6De6oxVyVbqfEEjiw2P5E0ye3zShbjCO/tUqIKcvq3rHL93vryc30VWQTel111bYo+sE/crnjXr6W8l8Fsb7FLCFQzMXoSYET9QAObXZCtr+M8eXl7qD+hQCAd4hWa/n7eV2+ldsOzp697gQxaEXbsa6lXpkVCHP6ugkZVTlLyBseUg6DxGtZirJ3pTsxY/hcmWWhjE0LPtgdMxcmIkqJNiHtF5B13edB/Ravk2g6/RVF+f0u3+DYn+sE/2dOb0uw97bE/1gn7lBwmFOHHGXEbxO8S6eUWsq9Lb15crAG0ms3BIqplhOX2B0IbTDXl1qex9GfwrD1+Arj/6wOf3qi30aI3+OYeJMcpgwC7vslZ/DAMBAW4Otue07MQAPZ3vXSr9h3UFVDejM4Vh/wB5Ll/6wuf3q+B9GRwrD/vPdAfNcbr96rX0oKnD6MXhWH/eq6g+a5HX71fA+jB4VR/3tu3/AKyuv3qtpSgqSPoveFUf977v/wCs7r96vgfRc8Kg/wD8HeX/AFodfvVbmlBQ7OPo4OGyxsL39e1vI3inK2/a8rKsTqXK6OUrhBooqmJiibRgAxAEQHv1UsejbcLuuC/HDh0soqqds7Ex1DiYw/24t3iPWpL4odfFoy1sNh9gs9v9HrVQzgy4ieKyyuG2zbYx7wjyl3QLJBwVpMpPk0yOgM4UMIgUTAIaMIl7vCg/qDWN1Sr41/HIPdwJyofPJp/v1+Ce4wuNyAhJCekuCN2zZxrRZ24cLSRBIkmmQTmMbR96ACiNBeTdNh51QiwuNzjRyNaMdelqcGgScVKpis1eN5LSaxNiACAGMAh3eNdAPFHx7j9zwQnD/jShf36C3l8TpbYsyeuU0OvLBExjp8Me3LzKu+ySMfsSB4mPy8oB5jWsxLeRMg47hLyJar22glWwL/BT1IE12vUQ5DlAA0PTf01VJfih9IAVFQ6XBGQTFIIlAZMB2Idwa56+GfE/6QhduRRTglbJnMGxKaUEBD//ADoLv0qkvxl/SEj3cFseH/GlR/frHxkvSID9zwZxIfPKm/foLtUqkvxjvSLD9zwbwYfPKn/frHxi/SOj9zwd26Hzyqn79BdylUi+MN6SM33PB/a4f8aWV/foPEF6Sce7hEtEPnl1f36C7tKpD/D56S43dwm2aX55ZX9+sDnX0mJu7hVswvzyqv71Bd+lUf8A4bvSam7uF+yi/PKKfvU/ho9J0bu4aLHL88mp+9QXgrGwqj/8MHpPTd3DlYpfnk1P66fws+lBN/8Ay+WGXp/7SP8A10F4NhSv5xyXF76QWKzBF4LeYXsZK7pmJNNtWvragkM0Kc5BMJ99B5kz9P8A5V3Q5M9KSYdhg7HwfPImoLx0qjn8IvpTjd2F8eF+d+asfZ/6VE396HHRf+fj/VQXj3TYedUcG+PSqm+5xZjgvzvh/qrH2ZelaN3Y1xsX533/AMqC8mw86zVGfsq9K6b+9/jMv/Pf/wDmn2SeliN3WRjEvzvA/doLy7DzrNUY+HfSzG7rRxeX53Yfu1j4W9LUbutvFpf+dh+5QXorAiACACPf3VRj4Q9LcbuhcVl+dyX9ysC49Lib/e3FAfO5L+5QXo5g86zVB8V8QfGdb/GDZfDtxFfYgkhckO5mxLDJlU5kCpuCk+2AAcpu0QMIh5AFX3CgzSlKBSlKBSlKBUbZaw7irKE7ZM3kZumpI2dMElreEzzsOV6VRIxRAN+37Safs/11JNRtlrBFnZinbJuG6XMok5sOYJNRgM3hkCHcFOmcAVAPuy7SL0H3+dBI/Tw2PzDSsCYAHqcAH30oNHf8nbsJYtxTV3tgcwMfEvHUoiKXago0IiYyxeT8faYGDl8d6rQYJujHF5Yrg7kxLGlYWo8TVGObg09W7MoKnKYOz/F9sDD9Nb/IE+hali3FdDmGXl0YeJeSCkegn2irwqSJjiiQuh5jH5eUA0OxHWq0ODL/AGeUMWwd8x9mP7UbyaahyRD5v2C7blUMXRiaDW+Xm7g2A7oO9pSlApSlApSlApSlApSlArA1msDQUWy3+Fuw5+bt1+skqvT51RbLf4W7Dn5u3X6ySq9PnQZpSlApSlApSlB8m7wqPFbly6XNyVqp2TGmx0aEF0pP+sG9aLI8+gQ7Pu5OXrzaqQzeY1HiqWahzekom4hQxf8AAggomJQ9fGU5+gh0/i+T399B+XifH/xact9P/QWe/YFq4b0fH3m2Lf5lL+sNXc8T33tOW/L7BZ79gWrhvR8febYt/mUv6w1BYisD0rNYEO4Q8KCjPBvc1uW7xQcVg3BcEbGesXokCXrjpNDtOUzjm5ecQ3rYb15h51cIMmY31/dBtr9LIfv1Bt6ejv4YcgXdM3zc9qya0vPvlZF8qnKrJlUXUNswgUB0HX/RqtN/YweEb/E+Y/TS/wDXQWL/AITMb/KDbf6VQ/fp/CZjcO/INt/pVD9+q5j6MLhGDutCY34f/TS/9dRdm3hL4CuH2NTnciWHeaMMYoGVkmbtdZs3ExwIUqhucBAwiIaDQ+NBd3+E3G3yg21+lkP36fwmY4DvyBbYfPKofvVR0eFXgITh0rge46yA0jFWwPPWlhe8hUeXm5zAURMAcvXuqQLU9HbwQ3xAtLotGJeSsU/TBRu7azqx01C+4QGgtF/CZjf5Qba/SyH79P4TMb/KDbX6WQ/fqun9jB4Rv8UJj9NL/wBdP7GDwjf4oTH6aX/roJC4mMiWA84ccqNGd828uutZM4mkknJoGOc4sVgAoABtiIiOgAA67rkPRqBrgpxsH/3V2P8A8YvWrN6L/hEOUSHs2XMUQ0IDMriAh5D1qweKcXWjhiw4zG9iM1WsFEAoVoiqsKpiAdQyhg5h6iHMcdUHW1wueA/8B+QxHr/9VJf9jVru64XPH9w7If8AkpL/ALGrQRl6Pv7zrGGgD/zMHu/3Q9WG1VefR9fedYw/mYP1h6sPQaa817kaWhOObMaN3dwJRrlSKbuTiVJZ4CRhRIce8CipygI+QjWsxW+yBJ2BDPspRLCMupZuBpNowUFRBFbY7KUw94a1WyvRrcT60JxjZ8ijHzziNcpRbtcnOmg8MkYEVDl/GKVQSiIeIBWuxZGX7D2BDRuT59pNXQg35ZJ+0R7JJdXY+0UngGtUHVdaVmlBjXvprz61mlBjQeVNVmlBjVKzSgxTrWaUCsDus1gaClGQg16WDG3T+9Y4/a3tXXANf/KqVZD/AAsGNvzWOf2t7V1qDHWmqzSgxqmvKs0oMa8xpWaUGKdazSgxqlZrA0FFst/hbsO/m7c/rJKr0+dUWy3+Fuw5+bt1+skqvT50GaUpQKUpQKUpQKifNuAmuZ7kx9cTi+p23zWDOpzZG8aoBU5ISqJH7BcPEg9lr5jGqWKi7MeHpvJ9w2HNxWSJi2EbPmiSrtqwEAJLJlUSOLdb+QIJCUfccaCTe/u3/wBlK+g7u/VKDUXpKzEFaE5N27CHmZWPjXTpjGpmApnrhNIxk0AEegCcwFLsfyq02IbpvG9ceRFzX/ZC1oTz0ihnkMsoCh2hiqGKUBMAiA7KUpv86txeri5GlnzjqzGbZ3cCMa6Uim7k/Iis8BIwokObwKKgFAR8AGtPiCQyTKY8iH2XoaOibuVIcZJnHqiogkbtDATkMPfsgEH590HZUpSgUpSgUpSgUpSgUpSgVgazWBoKLZb/AAt2HPzduv1klV6fOqLZb/C3Yc/N26/WSVXp86DNKUoFKUoFKUoMG86jtW08qGzcleSeQWpbBLBizPbfqg9qaQ7TYOe1Ae7l6aqRBqOFcYLKZ1Sy0GRpgqacEMT9jAKF9RNtTn9Z5d77Tw33UHhxP/e05bH/ANxZ/r/zBeuG9Hx95ti3+ZS/rDV3PE/97Tlv/IWe/wBXrVw3o+PvNsW/zKX9YagsRSlKBSlKDBg3VH/SdT7KZj8P4HcvkUEMgXyyGTMooBSlj25yAsY4iOgKHbFMIj+RV4BEAEAEe/uqk8gk0zN6Tn4KeN272FxFY2lUliAon6+9EDdSiGtiktr/APth5UE+5C4gMZ2TZkkvAzsdc8m0ZGIwhYZUrxZ2tyCVJHkSEwEAxgANm0ABvyqOPR1YPyRgfAB7eykoVGYmZp1NFjim5gjkVSpgVDYdAHZDHEA6AKgh4Vw3Ho8b45uzACWNY1nb9yz+RmLEj9k3KiUzYTkTVRVAgBzlMKyY6H8gdeNW/lhQnUXtrsbhUZSSSSCqyjQ325AhziJRDe9c3ZnD5uvlQbys1CvDAtIGjsgsZGYfyYxt+zLBFd6sKqoooqFIQBN46KUA+ipp3QZpSlArhc8f3Dsh/wCSkv8Asatd1XC54/uHZD/yUl/2NWgjL0fX3nWMP5mD9YerD1Xj0fX3nWMP5mD9YerD0GmvOIlbgtCbgYKbWhpKSjXTRnJIfxjJdRIxE1yfyiGMBg95a1mK7WuSyrAhrXu+8Xd1zEe3BJ3MOw0s8PsR5zB560H0V+++oJvdFlz1sO5ZeLQl4x0wVfIKARVqRVIxBWIYehTEA3MA+AhutZiOzGOPccwdmxtzPLhbRTYEE5N4uCyzkNiPOY4dDD1oOwpSlApSlApSlApSlApSlArA1msDQUqyH+Fgxt+axz+1vautVKch/hYMbfmsc/tb2rrUClKUClKUClKUClKUCsDWawNBRbLf4W7Dn5u3X6ySq9PnVFst/hbsOfm7dfrJKr0+dBmlKUClKUClKUConzbjjLd9XJj2UxplhWz4+3J1N/cTMhDGCbZAokYzUeUQ0AlIoXY/l1LFRbmSFznLXDYa+Iboi4qJZTRFrrReJc53kcCiQmTSHwOJCqhv+UFBJhiAYQHX+jf/AHDSvvoHeIB8+qUGovRG5nFoTiNlOmzW4VI1ySJXdE50UnopG7A6hR+6ICnIIh5ANafEDTJzHHkS1zHLRsld5CH+EnUcgCLdQ3aG5RIQOgexy/TutzecZNTdoTkLbc0MPLv41y1YSIF5hZuTpGKktrx5DiU2vdWmxBa952ZjyItrIV6Huy4GZFCvZg6fILowqGMUeXw0USl/zaDsqUpQKUpQKUpQKUpQKUpQKwNZrA0FFst/hbsOfm7dfrJKr0+dUWy3+Fuw5+bt1+skqvT50GaUpQKUpQKUpQYNUYq44x0pxBo5PPdKxb0Jb4xZYj4UACCy7TmFX1Xe+/pz6+mpOMIAHWooWhcEm4kEZxZwy/hYC2zIJo9sf1gYntdibk7tc/j30H6uJ/72nLf+Qs/+wLVwvo+PvNsW/wAyl/WGrueJ/XxaMta/xFn/ANgWrhvR8febYt/mUv6w1BYilKUClKUH5ZJiEkzUZi5cNwU5dqN1RTUDRgHoYO7etD7hEKjS0OGzGNi3tLZDtdrKMrgn103Es9LIKCd+YhhEoK7+6L7RunvqVaUEdZkwTYWdIuHj74aOu3t6TRmIl8zcCg5ZPEh2RVM4dQ6gA69wVsYu2YLFsVLzTRvLyruQXTdSC5jC6evFAKRImxEQ3ylKUADoAAHz77MBAe6sG34UEBcOMjOREnecVcFhXNDmuO9pmYYrPWZSInarHFRM4mKYdCIF1ofEan0tYAvhrp/3V9AAgHWgzSlKBXC54/uHZD/yUl/2NWu6rhc8f3Dsh/5KS/7GrQRl6Pr7zrGH8zB+sPVh6rx6Pr7zrGH8zB+sPVh6DQX/ABNuz1jXFB3e5FtBSMS8ayiwLih2TRRExVjdoGhT0QTDzB3d/hWqw1bViWfjOBtrGciL+2Y9qCMa5F4LsVEuYR32wiIn6iPXdbHI57STx9c57/Kka1ywz0ZsFQESCw7A/rHMAdeXsufevCtLgpTGCuJ7bUwwVuFlizD4HBuUwJ9hzDrlA3XW999B3tKUoFKUoFKUoFKUoFKUoFYGs1gaClWQ/wALBjb81jn9re1daqU5D/CwY2/NY5/a3tXWoFKUoFKUoFKUoFKUoFYGs1gaCi2W/wALdhz83br9ZJVenzqi2W/wt2HPzduv1klV6fOgzSlKBSlKBSlKBUTZtd8QLW5MelwqyiHEOrOplvEXwgByRnaJc4o7D7vk7bu8dVLNRNm2czxEXLj1DDltx0pEvp1NG7VXRgAzWNFRIDKJ7/G5BVH6KCVunjr6QpTu/GAPnpQaO/7fSuyxbitZeacQ6cxEu488i3OBVWZVkTEFcgj0AxObmAR7hCtFgywG2L8WwdjM71f3ajGJqEJMPlSqLOuZUx9mMXoOubl6eABW+v6Kt2dsa4oO7nQtYKRiXjWTXBcUBSaKImKsbtA12eiCYebfTW60GDLUx3ZGLoO18UygyNrMU1Cx7oXwvO0KKpzHHthERP7Ym8end4UHe0pSgUpSgUpSgUpSgUpSgVgazWBoKLZb/C3Yc/N26/WSVXp86otlv8Ldhz83br9ZJVenzoM0pSgUpSgUpSg+Tb8Kila58HF4kUbUVj2Q5VNbgu03Hqv9sfBfa6EoK/k8/hUrGqMVclW6nxBI4tNj+QNMqQBpQLjCPD1UqIK8vqwuOXoffXk5vfqgzxP6+LTlv/IWe/YFq4b0fH3m2Lf5lL+sNXc8T4/+LRlvf+Is9/q9auG9Hx95ti4PKFL/APrNQWIpSlApSlArmsm3S4sbHF13s0apuV7ehH0qkgoYQIqdBA6oEMIdQARIADqulqPuIYf/AAA5M/yPmf2JWg1nC/mCQz3g22MtSkQ3i3NwIqrHaNzCZNPkWOmGhN16gQB+mscUObfi6YQuLMQwfwwWA9W5mfa9mKoLOU0ehvDXab+io+9HB95djX/kLj9qVrWelB+8eyN80X/rJtQWPsqdVui0IW5VkConlY9u9MmUdgQVEwMJQ+bdbquRxB/cps4P+AmP6glddQKUpQK4XPH9w7If+Skv+xq13VcJnnQYOyJsf/RSX/Y1aCM/R9fedYw/mYP1h6sPVefR9/edYw/mYP1h6sNQaG/ZmDt2yLhuC52ajuHjIl29kW6aHbHWapImOqQqf44iQpgAvjvXjWpw5ddnXxjaCuvH8StGW/ItQWYNFmfqh0k9j0FL8TrvpW4vidLa9mT1ymh3EsETGOnwx7cvMq77JIx+xIXxMfl5QDzGtZia8i5Ax5CXiS1XttBKNgX+CnqQJrteohyHKABoem/poOvpSlApSlApSlApSlApSlArA1msDQUqyH+Fgxt+axz+1vautVKch/hYMbfmsc/tb2rrUClKUClKUClKUClKUHg+etI1kvIyDlNu1apHWXWUNykTTKAmMYw+AAACIjXDJcQWDHAAKWXrQHY+MwgH/aavTPY6wZkU2u605cf/AINWqR8I/o9OF3LPDlYuQ70sp26mpqMBd4sR+omVQ/OYvNyh3dAD/TQftyfkXH8h6VLEdzMb4gF4htYDlBZ+nJImbpKCeR0QygG5Sm9ovQR31Dzq8KeV8Wq/xWSbVP8A8WYbj/8A71XD+xYcG3f/AAfv9+fwor/XXF5z9HDwr2PhHIV427aEm3lIG1JaTZKjKrGAjhBoqqmYQ310cpenuoLyR8jHyzNOQi3zd41WDaa6CpVEzhvWwMURAeoDX6arx6Po51ODrGCihhMY0MAiYR6iPaH6j76sPQKxsP6azWB3QfnUko5J4nHKv25HapeZNAypQUOXr1Au9iHQf6Br9ACA91UuyC7dl9KtjdiDlYG44wcqijzj2Yn9aehzcu9b149/dV0QDv6UGai7Ml+5Zs24rDjsb4tPdsdPzRGNxOyq8nwOyFRIpnIhsOYAKdQ2uv3FSjUW5lzRJ4quGw4JhjWcugl6TRIhd1HCHZxJTKJE9YX9kfYAFREe7oQ1BJwd3QN/0UpoB8RD6RClBo8hBaI2FcgX+KAWuMQ8+Gxcb7IGHYm9Y59deXs+feuuq5/ApcRkxRAlwSoxUsYE1fgkzHm7ESdqfn5eYAH+M5978a6HIEnbsJYtxzV3tvWIGPiXjqUR7Lte0ZkRMZYvJ+PtMDBy+O9Vz+CLnxxeWKoK5MSRgR9pvE1TRzYGnq3ZlBU5TB2X4vtgYfpoO/pSlApSlApSlArAjrrWawO/AaBsArNcNbWT2dyZSvTF6MUsg5s1vGOFnZlCiRwDxNQ5QKUA2HL2eh337Cu46BQZrAiFNgP0VCOUuL3D+MLiNZjhaYuW4kyc6kVbkeeQXRHwBUCdExEfyhDuHdBAmWxD+y24cHf97tz+skqvTsAEdjX8sMh53vm5PSM4zyJAYBuwH7CzF2rO336qTV5Ioc74RXT3sCh9sN0Nodpj5hVtmnHHbsO4KzynhzI1kKiYCmVeQ4uWqfXQidZERKUA67HWqCzIDvurNa+CnoW5YltO2/KtZGPeEBRu6bKlUTUKPiBi9Br94CA0GaUpQKUpQfJh1qo9VyLdxM3pYyLjWRNbikIMmN0goX1YrkFOX1US9/Pr2qkI1R6rcuXC5vStZOyY02OjQgujz3rBvWiyHPoEOz7uTl683fQfuzXaktfuGr9seAKiaTuG2JSJZdspyJiuu0UST5jfil5jhsfAN1R/FWNvSo4dx7B40s9ni8sPANStGoOHpVFOUBEdmMJOo7Ea/ooXxr6oKK8/pdv8GxP9YJ/s6c/pdv8ABsT/AFgn+zq9VKCivP6Xb/BsT/WCf7OnP6Xb/BsT/WCf7Or1UoKK8/pdv8GxP9YJ/s65XLBvSpDi28QvJvjAID7H5H4VFsuQVQZ+rKdtyByfdcnNr36r+ilR9xDf3Aclh/7nzP7ErQRV6ODfxLsab1/5C47vP1patZ6UD7yDIw7EOkX/AKybVs/RwDvguxr/AMhcftS1az0oP3j+Rg90X/rJtQRBYJvSufYPb/2ON8WjFfBjb1IVlyAoKHZF7Pm9jv5dbrfc/pdv8GxP9YJ/s6t5iD+5TZ38xMf1BK66gorz+l2/wbE/1gn+zpz+l2/wbE/1gn+zq9VKCivP6Xb/AAbE/wBYJ/s611yQXpZLst6UtaZZ4qOwmGS7B0UjohTGRVTMQ4AYCbAeUw9av3SgiPhNxndGHeHmyca3mRqSago4GzwGy3apdpzmH2T6DmDQh1qXKUoNNekpMwdoTk1bkIpMy0fGuXTCNTMBTPXCaRjJoAI9AE5gKUN9ParWYruS67usCGuO+LPVtWdftwVew6qgHOzU2IcgiAiAjoA8a2d5r3I1tGbc2azbu59GOcqRTdyflSWeAkYUSHN4FFTlARDuARrWYsfX/JWBDPspRLCMupZuBpRowVFRBJbY9CGHqIa1QdZSlKBSlKBSlKBSlKBSlKBWBrNYGgpVkP8ACwY2/NY5/a3tXWqlOQ/wsGNvzWOf2t7V1qBSlKBSlKDAiAd46pzAIb30rjctXfcth2Y+u23beaS4RKCz18m5fA1Km2SSMc5wMIDsfZDp5CNQ7iTiMzhmbGEVli08CMPgyYBRVo2dXGRFc6RTmJz9UxANiURDzAQoLKbrNRFhLiKg8vzl0WM8t9/bN6WWskjOQT8SmUQBUomTVIcvRRM4AIgbp81S4GvCg4LP48uB8jj5WlMfsatRx6Pz7zrGH8zB+sPUi8Qg6wHkofK0Jn9iVqOfR9/ec4vH/gYP1h6Cw1RjxQfe05a/yFnv9XrVJ1RjxQfe05a/yFnv9XrUHC+j4+82xb/Mpf1hqsRVd/R8CAcG2Lf5lL+sNVhxEA7x1QZrA1msDQUqyH+Fgxt+axz+1vautVKch/hYMbfmsc/tb2rrUCotzLn2BwzcNhW5MW9LSS1/zacI0VYo85GqhlEidosP4pAFYBEfIBqUqjfLGZcc4snbKhL5TXM+vKXJEwnZMu3AHZlEyAJjf7mHMqT2v6qCRgHe6VgOvcUBD3jSg0eQJ9C1LFuK6HMMvLow8S8kFI9BPtFXhUkTHFEhdDzGPy8oBodiOtVocGX+zyhi2DvmPsx/ajeTTUOSIfN+wXbcqhi6MTQa3y83cGwHddJekrMQVoTk3bsIeZlY+NdOmMamYCmeuE0jGTQAR6AJzAUux/KrTYhum8b1x5EXNf8AZC1oTz0ihnkMsoCh2hiqGKUBMAiA7KUpv86g7KlKUCsbrNeLpUUEFFwTUU7Ign5Ew2Y2g3oA8RGg9REA7x76bDvqNniGZbvEHDGTY2QyIPOikKBHztcQ7gVE3sEIPTYFDmDr18a39qS17Hdnhr1t9BJwklzkkmCnM0c60A6KYedI3XoURHehHdB1W991Zr5KIdetfVBAmLPvt86fzban7M4qedh3CNQNiz77fOn822p+zOK3PFnkS5MZYJnp2y3BEblfKsoSFOcvNyPHrpJsQ4B4iXtTHD3koOKvW4ci8RmQZvE+JL2UtWy7VMVldVzMUwUdPHpyiJmDI49CCmXl7RTroT8ode6WcTYOxrhOD+BLAt1NoCg87l4qYVnbtT8tZY2znN7xGvvCWKoPDGNYewoIDHBmkKrt0fqo8dqDzruFB7xOdQxjCI+furuqCiuWg16W3Doa/vduu7/8SSq8rlsi7RO2dIJrIqAJTpqFAxTB5CA9BqjeW/wt2HPzduv1klV6fOgrJfuB73woEplDhVkRZqolO+kbDcCJ4uXAoCY5W5d7brm17Il0UREQGplwzla281Y4hsj2uc5WkqhzKN1eizVco8qqCgd4HIcDFEB+fxCu1N3VWWzYwuEOMOUsGEVBvamW4Z3dqDHWiN5xssmR32QdwAqmqVQwdPaKNBZylYLvX/ZWaBSlKD5N5jUeKpZqHN6SibiFDF/wIIKJiUPXxlOfoIdP4vk9/fUiG86jtW08qGzcleSeQWpbBLBizPbfqg9qaQ7TYOe1Ae7l6aoJDL/or6rAeI/6azQKUpQKUpQK5HLttyd5YpvO0YUiZpCct6RjWpVDcpBWWbKJkAw+Acxg2PhXXVgRAO8dboIZ4OcXXXhfhwszGV8JNk5uDbLIuyt1u1T5jLqHDR9BvoYK1PHXi68sz8Ll5Y2sCPI+npf1H1VA6gJgfsnqCp9mHu9lM1T5zBre6/I1lYqQUUQYyTVyokOlCIrFOYg+8AHYUGmxpGPobHltREmgZB2yiWiC6ZtbIoREpTFHXkICFdLXyUQHYAIbDvr6oFKUoFKUoFKUoNLejW4n1oTjGz5FGPnnEa5Si3a5OdNB4ZIwIqHL+MUqglEQ8QCtdiyMv2HsCGjcnz7SauhBvyyT9oj2SS6ux9opPANarZXnEStwWhNwMFNrQ0lJRrpozkkP4xkuokYia5P5RDGAwe8tazFdrXJZVgQ1r3feLu65iPbgk7mHYaWeH2I85g89aD6KDrKUpQKUpQKxWa+Ta2AboM8wedNh51BkrxDvrzveQxlw+xUfdExCKdlOyztYxYqJOID9qUOT2lVe72CD08RCtlckpnPHkGve0nIwdzx8U3M6lYxqyOgv2BAEVDtjb9o4AG+U/wB1rQaEd0Ew7AazXAYIycrmXFcHlA0OeLQuIij1o1UHZyNRVMCAn/lGTAhh102YdV31BmsDUc5T4i8I4SesY7K2Rou23MkkZZom8E+1iFHQmDlKPQBEArhvj98HQ92fra7/ADW/coIpyH+Fgxt+axz+1vautX80b24rOHiR9I9YeV2OVoZa0Y7Hi8W6liip2CTszp0YEh9nfNo5B7tdatd8fvg57/4fra/pW/coLAUqIbA4uOG7Kd0NbLx9lyEnJt6U5kGTYVO0UAhRMbWygHQoCPf4VLoDugzWKzWB+fVBWn0id9P7N4Vroi4ITGm7zUbWnGJENoyyzxQCHIHntIFQ+mvzQecLD4ZMH2ZacvaVyt0oaMYQqKh2HYtTOQIRMoHWMIlSAx/xzdNjUYcVeT7ByXxccPeHkrygVoSFl3N2TTgJBIUEl26RjNSHPzcoHAyZtAI7+2BUnekekHCnBFkR7BIJyJHDNlpRIAVKCBniHMqXWwEAJseYO7v8KD9vDTgO7rdybfPEplCRZjd2SitwNGR5+dtGs0i8qKPaf7qYEypgJg8hqaY/KmNpO4BtWPvmFXlvaErQjwgqH5R0YC9faEB7wDYh41EGNnSN0cONmYJLdrgLrn8YopqSTUAXFppkiiK6pt7KJjrbKA9Tcp9fcjXC8VmNlVMY47w7jyLaPsqHlYtSImGbcqC0cVqYhnUmoJNCRMSEMUQHoYVNe0IUFg+IcdYAyYPlZ8z+xK1HPo+vvOMX/wAzB+sPXf8AEIBkuHbJgKG2YtlzPMPmPqKtcB6Pr7zjF38zF/WHoLD1GPFB97Tlr/IWe/1etUnVGPFB97Tlr/IWe/1etQRnwMXBCWxwSYxl5+TQYtEoQBFRU2tiBjjylDvMbQDooAIjroFd9C8Q8VKTJ27uwLwi4BX2WVwO4wxWjkwDofYARVIHUNGMUN9e7VQhwsXuW1OCvDrJpbzaVkncIu9RM9JpmwbteY67tdTQgQpAMUAAPaMJwAOnMISgvxKuGmDcdZQkbIWCWyLIQ8Y1hAU9oir4wbHY95SpAdQdhvQdaCdm66LlIrhuqRVM4bKchgEDfMIV6DXI3Xk7H2OjJNbpnEYwyiIuOzKgop2aQDoVFOzKYEyb37RtAPKbX3JtdOwfspVihJRrtJ00dJlWQXROByKEMGymKYOggID30FMch/hYMbfmsc/tb2rrVSnIf4WDG35rHP7W9q61AqOMr5cxRjSdsqFyO5RSkLulyRdvgo17YTPDHTKXQ6Hs/aUT9rw7/CpHqPMpXlha1puzWOVpCFbSczLEa2wWQQ7RRR+J0wKCA8o8p+cyXXp3h1oJBKOw2HXflSsaEfyQ8+lKDUXq4uRpZ846sxm2d3AjGulIpu5PyIrPASMKJDm8CioBQEfABrT4gkMkymPIh9l6Gjom7lSHGSZx6oqIJG7QwE5DD37IBB+fdbi9EbmcWhOI2U6bNbhUjXJIld0TnRSeikbsDqFH7ogKcgiHkA1p8QNMnMceRLXMctGyV3kIf4SdRyAIt1DdoblEhA6B7HL9O6DsqUpQK8HpnBWixmZCnXBMwpFMOgMfQ6AR8A341718n8OuqCr+CXkrbGSsmDLX/JzkDj2Ai4ibfPlO09fnEkVHb54O+hTFSWQTEodAAoB+KFfsxXmq4bZ4dbXvO/nTievG93yTmPihVL2xPhZ2qZgiJe8iKaXTm13IH1vVdVKcMsbIKXxFtb5mo+18huXL+chmpEyGVcuECoqnI512pCmAhR5AHXeHcNcbeXDlI2TZ9uzFqqP7wmrWumClzkUBNFdaNYJHalaolLov2tBZU5Sj90cTCI+0NBLFiZCuBzd7/GGRG8U3upjHozJDxRj+qO2CyqiZTkBQROU5TonKco717BgHRtBIodetQ3btry9w8SkxlxzDu2ETG2i1thgo5KBTO1TOVHS6hC7HSYAZEmx0ImKfprQjMZR3uggbFn32+dP5ttT9mcV+TiuIEvdWCbQdiCMfJ5JavHC5/uAOzZunKKQ+86qZNe8tfrxb99vnT+bbV/ZnFazjwFWEwrG5NblMKuObvgrp9kNj2STsiK30dkupv3boLGF8f9FZGvzsHreQZIP2qxFkHKZVU1EzAYpimDYCAh0EBDxr9GwHuoKLZb/C3Yc/N26/WSVXp86otlv8Ldhz83br9ZJVenzoA1WvioMaDzJw53qw+2SLe93MGCBfulGr9iqVc2vySdiQw/MFWUHoG6rXko6V88bWJrQRUIonYVvzd2vSgOwKs4BJm3A/kblOsYvj491BZQvurNYCs0ClKUGBqOFcYLKZ1Sy0GRpgqacEMT9jAKF9RNtTn9Z5d77Tw33VI5qjFXHGOlOINHJ57pWLehLfGLLEfCgAQWXacwq+q7339OfX00EnBWawFZoFKUoFKUoFa+fm4u2YV9cU29TZx0Y2UeOnChtESSTKJjmEfICgNbCqm+lGu2atPg2u40IVQDSzhlFuVU+9JuosUVB+YwEAn+fQaXEs/fHHfISd/wArJStq4WYvFGMFEsljN3VwimPKdy4VKIGBHm2AEL36691TPd+A7Gt+0XsrjmFSty4IRqd5EvmZzgYi6RROQpwE2lCGEoFMU3eUxutbbhispjjrh7x7ZrBNMhI23WJFBTHZTrGSKZU+/HmOYxt++u3ui5oS1osJOdcAk3VdN2JA5eYVF3CxEUkwDxEx1Ch9O+7rQR1wmvLqlOHex7gvmSVfT0/GFmn66gaMZV2YzgQ14AHaaAPAAAKlwB3UUZ5y+6wLjqXvRhYC8xHW/EqPjgguRuikVPRSp6107w0AB3VI1uSR5mAjphRMEzPmiTkxAHoUTkAwgHuDeqDZUpSgUpSgUpSg0V9QTe6LLnrYdyy8WhLxjpgq+QUAirUiqRiCsQw9CmIBuYB8BDdazEdmMce45g7NjbmeXC2imwIJybxcFlnIbEecxw6GHrWxv+Jt2esa4oO73ItoKRiXjWUWBcUOyaKImKsbtA0KeiCYeYO7v8K1WGrasSz8ZwNtYzkRf2zHtQRjXIvBdiolzCO+2ERE/UR67oO0pSlApSlAqAOO3Mr/AAXwvXne0K5FCYVbki4w4D7RXDg4J85feUgqHD/iVP8AUEcbmCpHiJ4cLoxzAimE2YiUjE846KZ0gcDlJvw5y85N+HPQfn4G8ORmGeG60oluUFZObZJzsw7MH2xy8clBQ4mEeo8vMBQEd9ChU5SzRvIxb1g7UAiDluokobp7JDFEBHr7hGoQwNxC2G9xhBRN8zTW07qg2CEdNQ0woDVw2dpEAihQA+gUKIgIlEuwEBAa2sjNPc8SDKBtJF61suNk0H0tMqpmSCTM2VIqk1agOhOkZQhe0UHpykEoAPNug30ZLY04erEtjHshcANmkJFN49kmCB1lzoIEKkBxTRKY2ugbNrWx7911doXzaGQIn4esu4GcuxBQyJlWx+bkUL90Qwd5Th4lEAEPKuSf2NbFm5MnuIeevF41SPbiES7QcrgDFsggqdXtgDvAwioIaDvEegCI1E3BjZF3oXRlnNcxFLQFv5Pnk5S3oRZMUlUWqYHKDpRP/czrlMQwl7+gbABGgnG98O4uyW8byF/2HDz7lmmKKCj5sCpkybERKXfcGx3XNDwpcOA/3lbT6/8AB5K0vEDxb2Bw4S8VDXlbl1SSss2M5RGFizuykKU3KIHEv3I77t9/Won/ALKTg75P8nf9WVaCcvipcOA9+FrU9/8AaBO//vrPxUuG/wCRW0/0eSoCP6V7h7TkSQ57PyIV+on2xGo2+cFjJ7EOYCb5hDYD11roNfq/spWDQ/vf5O/6sq0FiLX4fsK2PON7mtDGNvxEq05+weNGZU1UwMUSmADAHiURAfnqQQquWEuOTGGeL7RsC1rUvOPfqtlXJVpeHO1Q5UwATBzm/G69A8etWMLrroNdaD6r5MG9D5V9UoOcHHdgiqLgbFt8VRHYn+DEeb598u91tncPFyEUrCPo1stHqpdgdodIpkjJa1yCQemtdNV+2lByiVnRlmxEkvju1IpCUUa8jdMQ7JNU5QHsiHMHUCAYR6B3AI6qtKGNONpdGcbPxxyk6ulIzSVmkFnAvyIHDkN2BhHROQoiJCh7ICAVcGlBGvEUUyPDlk8pxERJZM0Ajvv0wV61wXo+vvOMXb/9il/WHrv+JUdcOeVBHwsmcH/4BauA9Hzv4nGL9/8AsYP1h6Cw9RjxQfe05a/yFnv9XrVJ1RjxQfe05a/yFnv9XrUFd8I2NdmSvRdw9iWK6TbT05ZizJkdQ3KBjHObmIJvDnKAl3/Kror8tzLty3jhi4LZxGuS18ekcOBjHjkiC5pMzUzVHnJ1AqCIGE4GARE3N4a644NnmTmnBpiAccQkHIieFP64Eo5OiBA7T2OTlDrv2978gqWPhrif3v7CLG+f4SXD/uoNXdrSDsxg6jpaZbyuQL6t9tBPFHK5Um6xEE1SGdnTEeVJIDOFTCAfdiIFDr1DoeH+2rbxXg+2rNj7vLNR9stRi1JVQ/sHVRVMmroR6AQqgHKHgAFDrrrUW31hG9cmTv2TX5gTGU1K9iRD1lzIuRMCZNiUoaEA0HMPh3iNSZjSzLoaWi7xveNiWxB2sVgZg0ZQzlQ5RSUAxVCCB+oBoe/e9jQV+yCYD+lfxqYo7AcWOBAQ/wCWPaug0fMn5TnYuknBUzimcyRwMAHDvLsPEPEPCv8AO3l5XPWM+JOUx0F83C4um3Xh7UiHfrRvWTszqj2CZD9/KcFCm1/Lr+9uBsbkxHiG1ce9udwvERqSTtwocTncOhDmWVMYephMoYw7Hr1oO+qPMp27hKcmrOdZaY284lI2VI4tY0ocpVU5ADpiUW+xDanOVLoHiBakOo5ytjLEN/zlmS2TG7BSStiWJJW4Ll2CJivinTMUUwEQ5zcxE/ZDfh50EibMHvpWO/r1+gaUGpvOMmpu0JyFtuaGHl38a5asJEC8ws3J0jFSW148hxKbXurTYgte87Mx5EW1kK9D3ZcDMihXswdPkF0YVDGKPL4aKJS/5tbO/wC30rssW4rWXmnEOnMRLuPPItzgVVmVZExBXII9AMTm5gEe4QrRYMsBti/FsHYzO9X92oxiahCTD5UqizrmVMfZjF6Drm5engAUHeUpSgV+eQZpyLFwwVOoRNykdE5kz8pwAwaESiHUB69Br9FKDgQwzbnjN3L+l1f66Dhm3PCcuXp/wur/AF131KDh2GJYGPfN36UzcJ1GqpFiApKqmIIlHYAYN6EN+HlXXP37OJYOZOScFQatEjrrKm7iJkARMYfmABEfmr9VeLtq3etlWbtEiyC5DJKpnLzFOQwCAlEPEBARoK04uyFYgcVuZHhbxhlEZZnabdgdN6mf1pQzdcoFT5RHnHYhvW9eOqsRc9uwt4W9I2tcTBN7FyzVVm8bKl2VVI5RKYNfMP0V/Lfgy4RJCzvSE5AbzCSqkFi053ccKvMYhjPAMLEevQeVAyhvcIBX9Wuo7oKo4FvpXhyvNfhNy9OCkxaj22O5+RU5SSsYcREGZlTez26A+xoR2YvLrfTdrgEPPe+u/OuOyniDHuaLWWtDI1tNpZgp7RBOXlVbqdBBRJQPaTOAgAgICHUAqBrdtXi84eFXVuWp6jl2xkeU0UWWkvVplikGw9X7QQEqwFAA0JvDp1oOBy0ID6W3DnX+926/WSVXo5gDxr+WuR89XIj6R3GV/wB6YPvCBkIuyl48LfTKm7eOhMd9yqJCmOhT2p39BDkGrfEzfxO3qAoWHwyLQJFSj2b67JdNApdh0P2KQGMOu/W+vd0oJMzTm+w8HWk4ua8ZQhV+xVNHxqftupFcpBEqKKYe0Yxta7tdaj/hLxVcsDEzWacpoF/hGyW4LKyxeo/B7XX9qsCb+5KkmIbAPxhNWxxlwyxkJc5srZZl/s6yI4KYPhR4kHq8eQf9xZoDsqJA7t94+dTgAa3QArNKUClKUGDCAB1qKFoXBJuJBGcWcMv4WAtsyCaPbH9YGJ7XYm5O7XP499SsbfhUUrXPg4vEijaiseyHKprcF2m49V/tj4L7XQlBX8nn8KCVy610rNfIa2Oq+qBSlKBSlKBXFZmxPbGccZT+LLwTMaLuBoLZU5NdoicBAyapN9OYhylMHvCu1rA0FcsQLcSuI7fZYrvLHzG82kCinHxFxx0oRsLtsmHKmLlI5RFMwF0URLsB1uu7g7Ivm77sj75yuZg0QhRFeFt1ioKqTVwYvKZw4VHosqBRMUmgApQMIh1HdSlryrGh6aDp89BA/Hb96DlTev8A7Pq9/d92WpcsIf8A6kQHX/exr+qLWvv7E+PMosvg7INqs51r2ZkRRdcwpmIbQmASgIAIDyh3+VfvtCxbUsNieNtGERjGqhgOZJIxhARANB90I60AAHSg39KUoFKUoFKUoOcyOe0k8fXOe/ypGtcsM9GbBUBEgsOwP6xzAHXl7Ln3rwrS4KUxgrie21MMFbhZYsw+BwblMCfYcw65QN11vffW/v2Zg7dsi4bgudmo7h4yJdvZFumh2x1mqSJjqkKn+OIkKYAL47141qcOXXZ18Y2grrx/ErRlvyLUFmDRZn6odJPY9BS/E676UHaUpSgUpSgV8mAR1rXz19UoNQ/tO2JZwDuVtuLergICCrhmmofoGg9owCO+7r7q2SaCaCZUUEipkKAFKUoaAADuAADuCvWlBA3EFh7OWU56FWsPJ1v29BxBgcjHSEL6+V05D7lRUDG5TATvKHgPWuhwtjvLlqSs9ceYslsrulpZFo0bHYR3qKDZugKpgDsgES8wmXOIm7x6eQVLFKD8y8cwdn7R2wbrHANAZRMphANj02P0/wBNeQwkN4xDL3/2uT+qv3VgaCkGQYyOL6VjG7UI9sCJsXODin2ReUTetvA3ru33f0VdP4Ehu74JZ/8A5BP6qptkP8LBjb81jn9re1dag/IlFRqChVm8e2SULvRyJFKYNhroIBvu/wC2v1BWaUClKUClKUClKUEa8TQ64bsrj5WRO/sC1cF6Pn7zfF38yl3/APmHru+J4eXhryyP/uPPfsC1QbwK5vw9a/CZjaCuLJttxsi1hylXauZFIiiQ8xh0YojsB6+NBb6ox4oPvactf5Cz3+r1q9/jH4D7v4YbR35fCqO//wBVR1xIZ+wlLcPGUYqMytazp49subbN0EpNIx1VTsVilIUAHqIiIAAUHp6Pj7zbFv8AMpf1hqsRVd/R8febYtDx+BS/rD1YigVgQ3WaUFM8tcHyN7ekCxxngGrc0K0hlpCWTEmxUkGBiJtjCPdsfWW4h7mxquWFYEoCIG0AiFZCgzUb5ZwfjfLk7ZM/fYPBfWPMEmITsH52xQdlUSOUTlKP2wOZJP2R9/nUkVGWX8D29mOfsa4Zubl2C1iTJJpkmxcmSTcKlUSOBFgAfbJtEoaHzGgkrlKPUSgPzgFKyHd1AaUGjv6Kt2dsa4oO7nQtYKRiXjWTXBcUBSaKImKsbtA12eiCYebfTW60GDLUx3ZGLoO18UygyNrMU1Cx7oXwvO0KKpzHHthERP7Ym8end4VvchBaI2FcgX+KAWuMQ8+Gxcb7IGHYn9Y59deXs+feuuq5/ApcRkxRAlwSoxUsYE1fgkzLn7ASdqfn5ecAH+M5+/xoJApSlApSlApSlArAhWaUH4GsLFMpF5LtY5BJ7IgmDtchAA6wJhyk5h8eUBEA33BX7grNKBXyYN66V9VgaCiuWgEPS2Yc8/4O3X6yTq9IBroFUXy3+Fuw5+bt1+skqvT50AN+VZpSgUpSgUpSg+TVGKuSrdT4gkcWmx/IGmVIA0oFxhHh6qVEFeX1YXHL0Pvryc3v1UnGHVR6rkW7yZvSxkXGsia3DwYyY3SCpfVSuQU5fVRL38+vaoJCL/VX1WCjvdZoFKUoFKUoFKUoFKUoFKUoFKUoFKUoFKUoNHfE6W17MnrlNDuJYImMdPhj25eZV32SRj9iQviY/LygHmNazE15FyBjyEvElqvbaCUbAv8ABT1IE12vUQ5DlAA0PTf01tb0lZmDtCcmrchFJmWj41y6YRqZgKZ64TSMZNABHoAnMAFAR6e1WtxZcl13dYENcd72era04/bgq9h1VAOdmpsQ5BEBEBHQB40HWUpSgUpSgUpSgUpSgUpSgVgazWBoKVZD/CwY2/NY5/a3tXWqlOQ/wsGNvzWOf2t7V1qBSlKBSlKBSlKBSlKDU3ZbERetrzFnXAgZeLnmDiMfJFOJRO3XTMmoUBDu2Uwhuquf2K/g11r+D99+lFelW5pQfyqvzga4dYPj2x3g6PtR0naM/ZzqWfNPXlBMo5Io5Apufew0CZOnuqzY+iv4NR/9AH4e74UVrQ5U/CqYi/N4+/Wvauv50HM41x1a+JrIiseWUzUaQkKj2DNFRUVDEJzCOuYeo99dPSlApSlApSlAqJs24PkMuXJj6fZZBl7bJY04SZWbMTaJJlKokfsFvMg9kICHkcalmotzLjnJt9XDYcnYGVnloMbcmiP51mgQTFmmYKJGM2P5AIEOG/5Y0En6Dw2Ae4KU2IB3f9v9VKDR3/J27CWLcU1d7b1mBj4l46lERS7UFGhETGWLyfj7TAwcvjvVaDBVz44vLFcFcmJY0sfajxNUY5uDT1bsygqcpg7P8X2wMP01v8gT6FqWLcV0OYZaXSh4l5IHj0Eu0VeFSROcUSF0PMY/LygGh2I61WhwXf7PKGLYO+Y+zH9qN5NNQ5Ih837BdtyqGLoxNBrfLzdwbAd0He0pSgUpSgUpSgUpSgUpSgVgazWBoKLZb/C3Yc/N26/WSVXp86otlv8AC3Yc/N26/WSVXp86DNKUoFKUoFKUoMD4B51Haty5eLm9K1iWTHGxyaDFyee9YN60Ej2mgQ7Pu5OXrzd9SGYddfDruo7VRzV/DemomvCBi8YQQVTEgevjKc/Qe7+L5Pf30EigPeFZr5L/AKK+qBSlKBSlKBSlKBSlKBSlKBSlKBSlKBSlKDTXmvcjW0JxzZrJs8n0Y1ypFN3J+RFZ4CRhRIcwdQKKgFAR8AEa1mK32QJKwIZ9lOKYRt1LNwNKNGKgqIJLbHoQw94a1WzvNpcT+0JxjaEijHzziNcpRbtcnOm3dmSMCKhy/jFKoJREPHVa3FsZfkPYENGZOn2k1dDduBZJ+1R7JJdXY+0UngGtUHV0pSgUpSgUpSgUpSgUpSgVgazWBoKVZD/CwY2/NY5/a3tXWqlOQ/wsGNvzWOf2t7V1qBSlKBSlKBSlKBSlKBSlKCk+VPwqmIvzePv1r2rr+dUoyp+FUxF+bx9+te1dfzoM0pSgUpSgUpSgVE2bbZzlP3Jj11iG8GcLFRk6m4utBcuzPo4FEhMkTyESFVD5zBUs1E+bYnP0lcmPVsMTkWwh2k6mpeCbwAE7mM7RLmIlsB0fkBYPnEKCVvp1Ssa8uUN9etKDU3pKzEFaE5N27CHmZWPjXTpjGpmApnrhNIxk0AEegCcwFLsfyq02IbpvG9ceRFzX/ZC1oTz0ihnkMsoCh2hiqGKUBMAiA7KUpv8AOrcXovcrSz5x1ZjNs7uBGNdKRTdyfkRWeAkYUSKG8CioBQEfABrT4gkMlSmPIh9l6Fjom7lSKDJM49UVEEjdoYCchh79k5B+fdB2VKUoFKUoFKUoFKUoFKUoFYGs1gaCi2W/wt2HPzduv1klV6fOqLZb/C3Yc/N26/WSVXp86DNKUoFKUoFKUoMG86jtW08qGzcleSeQWpbBLBizPbfqg9qaQ7TYOe1Ae7l6aqRBqOFcYLKZ1Sy0GRpgqacEMT9jAKF9RNtTn9Z5d77Tw33UEjh4j/prNYCs0ClKUClKUClKUClKUClKUClKUClKUClKUGmvOIlbgtCbgYKbWhpKSjXTRnJIfxjJdRIxE1yfyiGMBg95a1mK7WuSyrAhrXu+8Xd1zEe3BJ3MOw0s8PsR5zB560H0V+++oJvdFlz1sO5ZeLQl4x0wVfIKARVqRVIxBWIYehTEA3MA+AhutZiOzGOPccwdmxtzPLhbRTYEE5N4uCyzkNiPOY4dDD1oOwpSlApSlApSlApSlApSlArA1msDQUqyH+Fgxt+axz+1vautVKch/hYMbfmsc/tb2rrUClKUClKUClKUClKUClKUFJ8qfhVMRfm8ffrXtXX86pRlT8KpiL83j79a9q6/nQZpSlApSlApSlAqLsxyGd2Vw2Glh2Ghn0S5mk07tUfqcqiEcKiQGOj5n5BVH5wCpRqJ82X5mezrkx9HYrxgldcXPTibK53Z1BKMOwFRIpnIABg2IFOqbXX7iglYN95RAPopXz02PN06+6lBqb0RuZxaE4jZTps1uFSNckiV3ROdFJ6KRuwOoX8YgKcgiHkA1p8QNMnMceRLXMcrGyV3kIp8JOo5AEW6hu0Ny8hA6B7HL9O63N5xk1N2hOQttzQw8u/jXLVhIgXmFm5OkYqS2vHkOJTa91abEFr3nZmO4i2shXoe7LgZkUB7MHJyC6MKhjFHl8NFEpf82g7KlKUClKUClKUClKUClKUCsDWawNBRbLf4W7Dn5u3X6ySq9PnVFstiA+luw7r5O3X6ySq9IUGaUpQKUpQKUpQfJqjFbHWOD8QaOTj3UqW9SW+MWWI+FQ5DMhU5hV9V5t9/Tn19NSccQAA3UUrw2CTcSKM4s4ZfwsBbZkE0e0N6x8E9rsTAXu5efx76CVwrNYL3dKzQKUpQKUpQKUpQKUpQKUpQKUpQKUpQKUpQaC/4m3Z6xbig7vci2gpCJdtZRcHAodk0URMVY3aAICnogmHm8O/wrVYatqxLPxnAW1jORF/bEe1BGNci8F2KiXMI77YRET9RHrutjkc9pJ49udS/yomtcsM9GbBYBFMWHYH9Y5gDry9lz7111WmwUpi9XE9tnwwVuWyhZh8Dg3KYqfYbHXKBuvfvvoO8pSlApSlApSlApSlApSlArA1msDQUqyH+Fgxt+axz+1vautVKch/hYMbfmsc/tb2rrUClKUClKUClKUClKUClKxvWvfQUoyp+FUxF+bx9+te1dfzqlGUxD+yqYi/N4+/WvauuA0GaUpQKUpQKUpQKibNuZrgxXcePoKFxpK3Shek4SIeumQCJIlIyiRBcK6AdEAFRHw6EGpZqJs252c4euTH1vN8cTtzFvucThTuo0gmTigMokT1hfRR0mHaiPh0IaglYA35UpoB7xH6BGlBo7/t9K7LEuK1l5pxDpzMS7jzyLc4FVZlWRMQViCPQDE5uYBHuEK0ODLAa4vxbB2MyvR/diEWmoQkw+VKqs65lTH2Yxeg6E3L08ACt/f0Vbs9Y1xQd3uhbQUjEvGkmuC4oCk0URMVY3aBoU9EEw82+mt1oMGWpjux8XQdr4olBkbWYpqFj3QvhedoUVTmP9uERE/tibx6d3hQd7SlKBSlKBSlKBSlKBSlKBX55B41jmS8k+WKi2aJHWWUN3ETKGzGH3AACP0V+ivB8zbSLNePeoFWbuUzIrJmDYHIYNGKPuEBEKD+M9yekHsu7uP8AsrPy9tuWNq2wxUtcygq8yh2qijkBd6AO4Ac83IHXRfOv6fI8X3DGomCoZutQAOAGABfAAh/VX8vLh9HNBWtx2Wfgde8PXbauZqpc5edAQVIxSXVEzQ49xjGBES8weBvdX9SEuEnhoTIVMuEbSACABQ/+jyd1B8/G74ZPlvtP68Wnxu+GT5b7T+vFr0+KZw1fIlaX6PJT4pnDV8iVpfo8lB5/G74ZPlvtP68Wnxu+GT5b7T+vFr0+KZw1fIlaX6PJT4pnDV8iVpfo8lB5/G74ZPlvtP68Wnxu+GT5b7T+vFr0+KZw1fIlaX6PJT4pnDV8iVpfo8lB5G4u+GXYazfan18tcKpxT8EY5hTlT37aY3iEQKJZsNDppz7FDt/Aebry99d+PCbw1B/eStL9HkqPFMX8L6ebksJDwzx5nCsIM0EyEKAx5QA/J2Iq65QV8db3qg74OLrhkDvzdagD/wAuLWfjd8Mny32n9eLX2XhM4ae7+BK0v0cSs/FM4avkStL9HkoPP43fDJ8t9p/Xi0+N3wyfLfaf14tenxTOGr5ErS/R5KfFM4avkStL9HkoPP43fDJ8t9p/Xi0+N3wyfLfaf14tenxTOGr5ErS/R5KfFM4avkStL9HkoPP43fDJ8t9p/Xi0+N3wyfLfaf14tenxTOGr5ErS/R5KfFM4avkStL9HkoPP43fDJ8t9p/Xi0+N3wyfLfaf14tenxTOGr5ErS/R5KfFM4avkStL9HkoPP43fDJ8t9p/Xi0+N3wyfLfaf14tenxTOGr5ErS/R5KfFM4avkStL9HkoPP43fDJ8t9p/Xi0+N3wyfLfaf14tenxTOGr5ErS/R5KfFM4avkStL9HkoPP43fDJ8t9p/Xi0+N3wyfLfaf14tenxTOGr5ErS/R5KfFM4avkStL9HkoPP43fDJ8t9p/Xi0+N3wyfLfaf14tenxTOGr5ErS/R5KfFM4avkStL9HkoNNdnGHwqs7XmHkrlq2pNigwcKOmSC5V1HSRUzCdIqf45jFASgXxEdVr8ccZfCTK2VFSNuZMt2BjV0AM3jnRitFW5dj7Jkg6EHfhWwvThu4bLRtCcuonD7bcoaGjXMgDFrGkMu6FFIygJJhr7s3Lyh07xCtdi3AvDdkqwYa+FuG6Dt88u3BcY2QjCFcNuohynDXf08qDpvjd8Mny32n9eLT43fDJ8t9p/Xi16fFM4avkStL9Hkp8Uzhq+RK0v0eSg8/jd8Mny32n9eLT43fDJ8t9p/Xi16fFM4avkStL9Hkp8Uzhq+RK0v0eSg8/jd8Mny32n9eLT43fDJ8t9p/Xi16fFM4avkStL9Hkp8Uzhq+RK0v0eSg8/jd8Mny32n9eLT43fDJ8t9p/Xi16fFM4avkStL9Hkp8Uzhq+RK0v0eSg8/jd8Mny32n9eLT43fDJ8t9p/Xi16fFM4avkStL9Hkp8Uzhq+RK0v0eSg8/jd8Mny32n9eLQeLvhk+W61Prxa9PimcNXyJWl+jyVgeEzhr7gwjaXX/AIOJQVEvrP8AhZ56TCwMgNclwSluMscLsHEmVyHYJOBdOxBMxvA2jlHXvq3AcXfDIIb/AIbrU6//AH4K+/il8NXyI2j3/wDs0lZDhM4au8cI2lv+biUHn8bvhk+W+0/rxafG74ZPlvtP68WvT4pnDV8iVpfo8lPimcNXyJWl+jyUHn8bvhk+W+0/rxafG74ZPlvtP68WvT4pnDV8iVpfo8lPimcNXyJWl+jyUHn8bvhk+W+0/rxafG74ZPlvtP68WvT4pnDV8iVpfo8lPimcNXyJWl+jyUHn8bvhk+W+0/rxafG74ZPlvtP68WvT4pnDV8iVpfo8lPimcNXyJWl+jyUHn8bvhk+W+0/rxawbi74ZNf3brT14/wBvFr1+KZw1fIlaX6PJT4pvDXsNYStLp1/83koP5jZs9IhZpOO2BzjaNsOJe3rFi3NsAYq/IMimZRbmcJdOhftvsgPeABX9csfXvB5KsiDv+2l+2irhYISLQ4hoRSVIBy79+hr+QPET6O2DjuNO0MQWfdiUXC5VPJSjMgtt/BJEU1ljIgAfdF0kJS+Wwr+v2PLJhsbWNAWBbyYkjbejm8a1Ae/s0kwIAj7+lB0NKUoFKUoFKUoFRplzO9sYenrHt64IqYduL8mCQrA7BoKyaCxjpkA6wh9wQBVKOx8AHyqS6jTLmbcY4mnrIgcgKHK/vaYJEQPK07YPWzKJEDZvxPaVT9r+qgkkOYe7pSsB130AdedKDRZCC0RsK5AyAZuW1xiHnw2LjfZAw7E/rHPrry9nz7111XP4FLiMmKIEuCVGKljAmr8EmY83YCTtT8/LzAA/xnP3+NdDf8nbsJYtxTV3tgcQMfEvHUoiKXago0IiYyxeT8faYGDl8e6uExNl/BjyxbHPYjtpAw14ncoWzHKNhancHSOcVSES17IgIGNofOglqlc+8yBZkfejHHb24WiNySbM79pGmMPbLNyCIGUANa5QEBD6KIX/AGY5vV1jlvcTQ9zMmRZFxGAYe2TbGMBSqiGtcoiIB9NB0FK56FyBZlx3NO2bB3E0eTdsigEuyTMPaMxWKJku0DXTmAphD5q9LYvi0r0PMJ2tPNZI1vya0NJggYRFq9SAoqIH2HQxeYu/noN7SuZgcl2Hc9pur7gLoZPoBiDkXEgkYRSSBuJgW2OvxBIbfzV5J5Ux4rj8cqp3awNaQNheDLgcfV+xAdCfet6307qDq6VylwZVx3atip5MuK7WDC1lUUHBJVYwggKa3L2Rt63o3MXXTxCv23RfVoWUjFOLqn2kYnOSTeHjjLmEAcvV99iiX+UblHXzUG+pWinb4tK2ZqDt2enmrGSuRdRtEtlTCB3iqZOc5SdOogXrXw8yBZkfejHHb24WiNySbM79pGmMPbLNyCIGUANa5QEBD6KDoKVz6F/2Y5vV1jlvcTQ9zMmRZFxGAYe2TbGMBSqiGtcoiIB9NYhcgWZcVyztnQlxNHk1bIoBLskzCKrMViiZLtA105gKYQ+agqRlT8KpiL83j79a9q6/nVDLsve0709KvjpK1Z5rJnt+z5SGkwQMIi1epKuxUQPvuMXmLv56ubA5LsO57Td33AXQyfW+yByLiQSMIpJg3EwLbHX4nIbfzUHT0rlE8qY8Vx+OVU7tYGtIGwvBlwOPq/YgOhPvW9b6d1Lgyrju1bFTyZcV2sGFrKooOCSqxhBAU1uXsjb1vRuYuuniFB1dK0N0X1aFlIxTi6p9pGJzkk3h44y5hAHL1ffYol/lG5R181Znb4tK2ZqDt2enmrGSuRdRtEtlTCB3iqZOc5SdOogXrQb2lc+8yBZkfejHHb24WiNySbM79pGmMPbLNyCIGUANa5QEBD6KIX/Zjm9XWOW9xND3MyZFkXEYBh7ZNsYwFKqIa1yiIgH00G+N4VHquRbuJnBLGJcbSJrcUhBkxukFS+qlcgpy+qiXv59e1XRwt/2ZcdzTtmwdwtHs3bIoBLskzCKrLtiiZLnAQ6cwFMIfNUOLcUSCfEK1xuV5bA2W4MvBfC4vFPXPsmROQFI0EtaESlVTER/lB1oLBh41mualMjWPBXlD4+l7lZtLjuEiqkXHKGEFnZEimMoJA1oQKUph+gayjkexl78XxgjczI91NmHwmrFAYe3I15il7UQ1rl2cod/4wUHSUrm4fI9jXBdk1YsLczN3P24CRpVgmYRVaAoG0xOGtBzB3UtXI1j3vIzsTadys5N5bL48bLooGETM3RREDJH2HQwCA/0UHSUrlbTynj2+rfkLqtG7GErExSy7d67bmEU0FEQ5lSmEQ7yh1GvBhmHGMpjtTLMfekcvZ6Kaqp5ghx9XKRNQU1BEdb9k5RKPTvCg7GlcjM5bxtb2P2+VJq8Y9naTpu3dIyyhxBBRJfl7I4DrejcxddPGva7sn2BYULG3FeN1MYmNl3aDFi5cGECOF1iiZJMug6iYCmEPmoOopXN3RkexrKkoGHuq5mcY9ud36jEILmEDPF/Z+1k6dR9ov9IUlcjWPB3jDY+l7lZtbjuFNVWLjlDCCzoiRTGUEga/FKUwj81B0lK5tHI9jL34vjBG5mR7qbMPhNWKAw9uRrzFL2ohrXLs5Q7/AMYKQ+R7GuC7JqxYW5mbuftwEjSrBMwiq0BQNpicNaDmDuoOkpXN2rkax73kZ2JtO5Wcm8tl8eNl0UDCJmbooiBkj7DoYBAf6K8bTynj2+rfkLqtG7GErExSy7d67bmEU0FEQ5lSmEQ7yh1Gg6qlccwzDjGUx2plmPvSOXs9FNVU8wQ4+rlImoKagiOt+ycolHp3hX3M5bxtb2P2+VJq8Y9naTpu3dIyyhxBBRJfl7I4DrejcxddPGg66lcvd2T7AsKFjbivG6mMTGy7tBixcuDCBHC6xRMkmXQdRMBTCHzV6XRkexrKkoGHuq5mcY9ud36jEILmEDPF/Z+1k6dR9ov9IUH670lJmDtCcmrchFJmWj41y6YRqZgKZ64TSMZNABHoAnMAFDfT2q1uK7kuu7rAhbkve0FbWnH7cFXsOqoBzs1NiHIIgIgI6APGtbkjJsZbBjWTBzEUOQpuKfObWhnqop/CDpFBQ5CiIB0JzE9ofAAGtfhnKSt1xLK178lrdQyQ1Y+tT0LFPQXBobn5R146DZQ69d0Em0rnDZEsYl6Fx0a6I8LmO39bLFiqHrAo63zgXy1X3I3/AGXE3bG2HJXKwbXDMpHXYRyioAu5TKBhMYhfEAAhx/zRoOgpXOXFkaxbSmoi3LmumPjZOfV7CMauFQIo7U2AcqYeI7MUPpCvu67/ALLsY8and9ysYk0w6KyYA6VAnrC5hAATJ5mHYdPfQdBSudvfIdkY1h05+/bnYQUcsuVqm5eq9mmZUxTGKQBHxECGHXuGve670tSxoFa6Lvn2cTEtxICrxyoBEi84gBdj7xEA+mg3dK0kvetpwFrKXtMz7NnApIEcnkFVABEqRxACnE3kImLr56Nr1tN3aP2etbgZK276kaR+EiqAKHqpSCcVeb8kCgI78qDd0rSWve1pXrbiN32pcDKVhXAKCk+bKAdE4JmMU+je4xTAPzV82bfVn5Ch/sgsi4mU1HdqdH1lopzk7QvQxd+YUG9pXOWZkaxchoPXVj3VHTaMc4Fq7OzWA4IrAACJDeQ6EBr7ty/7Lu+UmYW2LlYSb63nIs5Ru3VA52a4CYBTUD8UdkMGvcNB0FK5yIyLY0/c8nZcLdMe8nYUAGQYJKgZZtvu5y+HfX23v+y3V5ucdtrlYqXKzag9Xiyq7cJoDy6UEvgX7YTr/KCg6Clc45yLYzO822O3V0R6VyvEBct4syunCiQAYROUviGim6+4a+5fIFlQNyxVnTNysGc3OAYY5iqrpZ0Bd83IXx1of6KDoKVzl0ZFsaypKFh7sumPintxOPVIpB0qBDvFuYheRMPxh2omHzmCvm+ck2FjONQmL/uuOgWTlb1dJd6sCZDqaEeUB89AI/RQdLStLdd6WpY0CrdF3z7OJiUBICjx0oBEi8wgBdm94iAfTWHl62owtMb6ez7NG3ytSvhkTqaQBuYAEqnN+SICA799Bu6VpG962m7tH7PW0+zUt31I0l8JFU2h6qUgnFXm/JAoCO/dS172tK9bcRu+1LgZSsK4BQUnzZQDonBMxin0b3GKYB+ag3dK0Vm31Z+Qof7ILIuJlNR3anR9ZaKc5O0L0MXfmFeNm5GsXIaD11Y91R02lHOBaOjs1gUBFYAARIbXcOhCgqXxB/hK+Gf+aZ/9id1dYKodmG9rSuz0m3D6wtufZyLiCbXDHSSaCnMZq5IydgZI/kYBDuq58PkWxp+55Sy4a6Y95OwuhkGCSoGWbb7ucvh30HR0rn29/wBlu7zc47bXKxUuVm1B84iyq7cJoDyaUEvgX7YT/pBR5f8AZcfeLLHz65WKNySTYXjSMOrpdZAOfahS+JftZ+v8kaDoKVzk5kWxrauOKtGfumPYTM4IhHMl1gKq60Oh5A8etfdz5Asqy3sRHXXczCKcz7oGUYk5VAhna4iUoJpgPebZyhr+UFB0FK5288iWPjtm2kL5uhhCNnrgGjdV4qCZVFhARAgCPjoBr1u++bQsGDNc153Eyh4ohyJmdu1ORMDG+5DfmNBvaj3KN54XtWbs5jlaQhm0nMyxGlsFkEO0Oq/E6YFKiPKPKfnMl16dRDrXUXFelqWlbK153LPs42DbkTUVfuFOVEhVDFKQRN5CYxQD5wrg8g3Fw6Ti2PJzIkhbb5WWkEHFkOnhe0FZ4cyRkjtTaH2hMKIgP/FoJT0Pkb+mlZ2If/tSg+XCCLpBRs4RIqkqUSHIcoGKYohoQEB6CAgPdWhe4/suRfQkm8tWNUc22ootEKdgUBZHUDlOZLXQomL0HQV0VKDROrGtJ7drO/HlvMlrhjmp2TWSMntdJA4iJkym8CiIiOqIWPaTW73N/t7eZJ3G8aFYLyRUw7dRuUQEEhN+SAlAde6t7Sg0MPY9pQFxTN2wtvMmczcXY/Cr1JMAVediUSpdob8blAxgDfmNfdu2Za9oqSitsQLSNPOSKstImbp8ouniuu0XP5nNyhsfdW7pQc5C48si3LYc2XBWuwYwTsHALx6KQFRVBcTCtsvjzic2/PY18J41sNKxxxonacaW1Rbi0+CQRD1bsRHYk5O7W+tdNSg5ibxpYVy2aTHc/aUc+tlJJFAkWukBm4Jpa7MvL5F5S6+YK/Xcdl2rd6UY3uaAZyScNIISseVwmBgbPEd9kuTyOXY6H3jW8pQaSZs217iloeenYFm+kbfVUXjHKxOY7RRQvKcyY+AiXoNfDqx7Re3azvx5bzJa4Y5qdk1kjJ7XRQMIiZMpvAoiIjqt9WB34UHFyCGI7Wvde9JZzbUVdL9iVmq+cuUkXSzUDeyQROYBEnMT5tlr8MRLYJgLhmbthbhs1nM3F2Pwq+Skm4KvOxKJUu0Nz+1ygYwB841H/EBwP4S4k7wa3xkpOdPJMo8kYiLGUUbEBAiiigAJS9BHmVMO/mr+clzW/wCjytS5JO2pDGGalXMS8WZrHQeOFEjHTOJBMQwd4CICID76Cyl1nxLa/pRMeT1pSFtMGMraMnJSzxq7RBFaQVVd86qqgG12hgAveOx6VcGFd8P9uWu5suDmrLYwTvtyrsEZFuVFUF+YVuYvP15xObfnsa/koZD0cAqAt/BNm8VChylOKzjYfT366/8AbX6GjT0dL10izRxZm8p11CpFE7pyBQEw6DY+VB/WqIjcHS1pBiSDPab231GxmpYNo6RVSMhvmEnZlMPs+I1upvGlhXLZpMdz1pxz62UkkUCRa6IGbgmlrsy8vkXlLr5gqEsGcA2A8CXy1yXj5C4SSyDZVun67KqOE+zVKAG2Q3TevGrKAA+NBpLjsu1bvSjG9zQDOSThpBCVjyuEwMDZ4jvslyeRy7HQ+8azM2ba9xS0PPTsCzfSNvqqLxjlYnMdoooXlOZMfARL0Gt3Sg0TqxrSe3azvx5bzJa4Y5qdk1kjJ7XSQOIiZMpvAoiIjqiFj2k1u9zf7e3mSdxvGhWC8kVMO3UblEBBITfkgJQHXure0oNDEWPaUBcMzdsLbrJnM3F2Pwq+ST0q87EolS7QfxuUDGAPnGtGOD8SGlSTQ48hRfJTS1xEXFsHMWTV5O0dB/8A1DdmTZu/2QruqUHPSdgWZM3ZE31KWyxdXBAkVTjZFVMBXaFUKYpwIbwAxTmAfcI0TsGzUL1WyOjbLEtzrsvg5SVBIPWDteYpuyE35OylHXuCuhpQc/FWBZkHdEvekPbTFpOz4JFk36SQAs7BMNEBQ3jyh3Vi2rAsyzpCZlbXtphFu7heGkJVZunymeOTCImVUH8YwiI9ffXQ0oOZtjGth2XBvbatS046LipJVVd40bJARNc6ocqhjB4iYOg+deDHFOOY2wj4uYWZFoWmomqkeIIiANjFUUFRQBJ5GOYxh94jXW0oOVlsXY9nbGQxnL2fGO7VbN0GqMSqiAtiIo8vZEAvgBeQuvLVe1045sa9olhA3ba0dKx0U6ResmzlIDkbrpFEqahQ8DFAxgAffXSUoOduPH9m3fIQsrc9ssJN3brn1yJWcJgY7Nfp9sTH8U3sl/orMnYFmzN1xN8yttMXVwQJVU4yRVSAV2hVCmKoCZvADFOYB+ca6GlBzydg2aheq2R0bZYluddl8HKSoJB6wdrzFN2Qm/J2Uo69wVmKsCzIO6Je9Ie2mLSdnwSLJv0kgBZ2CYaIChvHlDuroKUHPW1YFmWdITMra9tMIt3cLw0hKrN0+UzxyYREyqg/jGERHr768rYxrYdlwb22rUtOOi4qSVVXeNGyQETXOqHKoYweImDoPnXTUoOSY4pxzG2EfFzCzItC01E1UjxBEQBsYqigqKAJPIxzGMPvEa+5bF2PZ2xkMZy9nxju1WzdBqjEqogLYiKPL2RAL4AXkLry1XVUoObunHNjXtEsIG7bWjpWOinSL1k2cpAcjddIolTUKHgYoGMAD76+rjx/Zt3yELK3PbLCTd2659ciVnCYGOzX6fbEx/FN7Jf6K6KlBz0lYFmzN2RN9SttMXVwQJFU42RVTAV2hFCiVQEzeAGAxgH5xrj8f8NeIMYZAnMoWZaxWNyXGCpZF52xjiqCioKnDQ70AnABqUaUHAq4Nxorl1POqlukG9EmPwcSR5x5gb61ya7u4a9Z3C2O7kyjb2ZZmAIvdtrNlWkW/E48yCShVCnKAdw7BZQP86u5pQcBfuDMa5Lu+1L7vK3iv5qynIu4VwKgh6sqJimEdB39SFH6K9cmYWx5l5S31b9gSyR7XkiS0WJziHYOiCAlP079CUP6K7qlBwWZMIY2z3aqFl5Rt4kxENnxJFJA5xKBXBE1CFPsPIqpw+mv3ZNxTY+X7IdY7v6GLJQL0UhXaGOJQN2ZwOTqHkYof0V19KDj7oxTZF543XxNcUMVzbDhmixUZCcQAUUhIJC779AKZf6KzH4psiLxf/A2yhip2n8DngfUAOOvUjpCkZPm7/uDCFdfSg47HGJrGxPYDXGFiwpY63GRXBEGYHEwFBZQ6inUR31OocfprzxPh+wcI2oFlY2gyxUQDlV36uU4m+2qDs5tiPjXa0oOBxLg3GuD2MtG40t0kS3m3xpJ6QqhjAq4EoFE479xQr1sDC2OsZXHdl12ZAFYSd7yBpSbXA4mF05E5zicQHu9pQ49POu5pQcBauDca2Xke48s25bpGtz3YUpZZ4CgiLgAEBDYdwdwV6scLY7jcuSOcmcARO8pWNLEO5HnHmUah2Wia7v9xT/6Nd1Sg4CQwZjWUy5H50e28RS84pkaPaSPOPMmgIHASAHd3KH/AOkNet04Xx5eWQ7ayncMCV1cloFVLEPOcQFuCgGA2g7h2BhruqUHA5HwbjXLFxWhdN928SRkrFkBk4JYVBL6q450j84AHf7SCQ/5teeZsDYxz/b7S18qW6WYjWLsHqCJlDEAqwFEnN0H8kxg+mpCpQchk3FNj5gsh3jvIEMWTgXopCs1McSgbszlOTqA+AlD+iktimx5rGJsPyMMVW1TxqcQLHnHXqhClKVPffoAKUPorr6UHIR+KbIi8X/wNsoYqdp/A6kD6iBx16kdIUjJ77+pDCH01844xPY2J7AaYwsWFLHW4yK4IgzKcTAUFlDqKdRHfUyhx+muxrAhQRpj+z8KcOFtp4/tR5D2xHHWUfkZuZAiZjHUH2jgBzAI7Eo9fMK0+Jbb4a8HMZaNxrcFrxDebfmknxCzSJu0cCUCicdn6dChWp4heC7DHEzcUbc+TUJo7yKZeoNxYSKjYopdoY+jAXvHmOPWv5z5Asv0euOr5uCwpXGuaHLy3ZNzFrrNXbg6Kp0VBIY6ZvEoiUdD5aoJyv8AtrCWP/SXYXu+xZKEbkuU1xTVwPUpFM6R3qzR3zHOfm5SCYRDQCId9W8ta2+Gyy8j3Hli3Lhtdrc92AUsq9CZREXAAICGw5tB3BX8rzI+jhMoCpsT5vFQvQpxWcbD5h7w/wD3r7Avo5x3rFWch+Zw586D+rdv2lgNbND3MNuScA6v2bjQiF3LaTSVWXalBM3ICZTDvXYEHoHcSt5LYWx3N5XiM2yUAVa8YGPPFsJATiBkmxhUESa7uvbKf9KoYwh6Pzh5wxfMLlmw2txkmI5JQzX1yWUWTKCyJkzAYhug+ycfpGrQFDQaoOBvLBuNb+v62cm3VbpHlw2eYTQ7sTiAtxEdjoPHrXrkXC+PMqy1qzl8QBZB7ZckSXhVDKCX1V0UxDgfp3+0kQforuqUHA5cwdjXOcRHQWTbdJLsop8SSapHOJezcFKJQP0HroDDX6sq4gsHNVmKWBkeELKwaqqS52xjiUBOmOyDsPIa7SlBx9+4psjJmPHmK7yhivrafIoILsxOJQORFQiiYbDr0OmQforWr4DxE7h7Kg5KxI1+1x16uNsA5KKhowyAJgkZIRHoYvZJ9f5IVIVKDAB50rNKBSlKBSlKBSlKBSlKBSlKBSlKD5OOg379Vrhtq3TnMc8DHGMYdmMLVPYj7+lKUD7GLb/xfjfqqf8AVWDWvbQ6AbejOvT/AMkT/qpSg2RR2FfVKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUClKUGB7t+Va5S3bfXVOutBx6iihhMc5mpBMYR7xEddRpSgx9jFt/4vxv1VP+qvk9s20BREbejB6dwtE/6qUoNmQAKHKAaAOlfVKUClKUClKUClKUClKUH/2Q==)
a) Geben Sie eine Gleichung für die Messspannung in Abhängigkeit der Quellenspannung an.
Die Signalquelle liefert zunächst eine reine Gleichspannung .
b) Wie muss gewählt werden, damit die Messspannung genau ein Zehntel der Quellspannung beträgt?
Die Signalquelle liefert nun eine reine sinusförmige Wechselspannung mit sehr hoher Kreisfrequenz , so dass angenommen werden kann.
c) Wie muss gewählt werden, damit Messspannung genau ein Zehntel der Quellspannung beträgt?
Hinweis: Falls Sie die Teilaufgabe b) und/oder c) nicht lösen konnten verwenden Sie im Folgenden die Ersatzergebnisse: und .
d) Setzen Sie nun die Ergebnisse für und aus Teilaufgabe b) und c) in die allgemeine Gleichung aus Teilaufgabe a) ein. Was stellen Sie in Bezug auf die Frequenzabhängigkeit des Spannungsverhältnisses fest?
Durch einen Abgleichfehler liegt der Wert von etwas oberhalb des Abgleichwertes nach Teilaufgabe c).
e) Wird die Messspannung im Verhältnis zur Signalspannung durch den Abgleichfehler größer, kleiner oder bleibt sie gleich?