0
Hallo
Kann mir jemand mit dieser Aufgabe helfen? Ich nehme an man muss eine Funktion aufstellen, aber ich weiss nicht wie man diese ausrechnen kann:
I) 2=ab^0
II) 2=ab^18
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f1m/zcYYcdEutZ1nsgvgecdr766qunviuvDUCgmKa+g/w4+eSTM/fgu3lKX8FYFCjuLd5lx6JK+/04ee2JPqnIHnD6HWSXpLGPsMkmm5gxJ60+Mk7Y8qVM7rvvvhIfJwTkmnLlBZFOqyngrhCDwOUWKsqTbUR0wnkFXgsFHEGQCs8RaNwjMMDzGSHuFA6BP60js2HppZf299prr+j3kjqRJ598MnEgSAvHHXdcYgNyFYXtt98+sRNyg6tkxKHj32mnnXLfQeDItiwBqBzIY36TfLeOicpRwN08QGnLejaJahXw0047Lfo+xxLFv+/GL6lOM3jbPLDPpYV+/fplDiZ5VJPWbo7juTPOOKPku/VQwJmQQDCyv5kW0tqGfQ/tOJ7vKB0LL7xw9I54u2DA43sMuvYZBkvbL8TfV7Q9o/jeddddZeW7SzUKOPlp832FFVYo67tQLwX8vPPOi55NC/SpacfzMJHJBGPS92wg33GUWDT+SbjxXHPNNcvOP5dFFlkkihsTnpXUB+pBVh0vUl4Im0mKSzxYwT4N3pMmANrAO44++ugoTmljNgpq3hhLoE6kHYvoKuBMXOa9j7hV4xSP/iRL8Y6HnXfeObE8qu1HqaMdO3Y06Uaxsr9n+y3CbbfdVlZ9Qy7o2bNn9Ftp4fDDD4+eoV0n/QZtlb4n710ElPSkd7hjBOllcjrrfSuuuKIZY/PSQB2oVLm65557ojghx/zvf/8L79QWV1lk8SaeHsqcMcJy5JFHFsprAn1kkqLmKuB77rlnSV+L3Byv97zn8ccfTyw7VwEn/kXaZVY7KJq+VVddNdXxqJun1Ceb1rSQNRYVgfZURFaPt6ek8YZ+x3X6lxaoFzgDTCoTVwHneo455mjxfcq9mvFOlNJqCvgxxxwTVap4B8vM6AILLBAV+quvvhreSaYWCriliLDCrKbbYfTp08d/5ZVXzD1moZjRSprVjXcgPOs2Gs5+RLhhkLD3mQF2lTIaUNJKiavc2eeIv/1NZtFoyG68L7jggsT0uSucDCLnnHNOJJQQpyuuuMIM4PY9xDvpPeXAb9jfdFd425IC7npuZ0CKd1RZCjidsVvOrJBwVrMVBJhtZlBw61XSKntRKk3rCy+8UDIwuZYrUA8F3E6KkSdnn322WWFDuGCijjPJuUegzr/11lvhG/7Evoc66+Z7nvLtUiRdY8aMKRm0sIigPdOfAauvbv+DUv/888+be+VSqQJOPVt55ZWj77GqWW4dKtJHWvKetW3CljFlyKQlfTNpHD16dAsB8/jjj2/xHtLFZK19pn379kYZZHKQe1g5uGVoQ178k2Dyy74nbgFSLvSd9l2ks5J3UQ/S6jjklQH9ljsuoBQigJNvNu/cFTbKKqkN0J7c+s9q23PPPWfewZhGv+6OGzYkjcOMMfb3qBOsbNLugfY0cuTIkrPXEZ6//vprc9/FljnKgJ1EY9WO1TLq19ixY02euOmvpO8H0umurmPhx6ojYyaQB6z0xRVAPotTq34U3HHnt99+Cz8tH1cRID9ZRbbKDGWfpAgmKeDkg2tZhyJzyy23+N988425j6yCTOhO5CTJKu4YMddcc0XvYjWc+Pz3v//1Tz/99JKypUyII/0Diyj2OcYVt+4eddRRhftUF1eupc1U8o4iWGURxZT2wTV5jSzKxAYLI/a36QdtPlFup556qkm3hXYQl1lZLY3H3VXAbSAe7skPH330UYlSifyYVCddBdwG+gtWXW27pA64k4I77rhjYn4yHth30cb5/+233zb3qGvICe7kDEr4pEmTzH0Xm6fljEXIUZX0FXDEEUdE7yqnPcXzAIs7dyIXq9wHHnggWhjjXcg2bjvgtKd4vBknbPkia/GX+kW+c5Y97ZG+qtL0ipa0igLOQOUqnkkKpVv5GHyzCr3RCrgrwMZXAC1UencSgRDviM4999zotxDW09JIfrnC5eWXX97i2bgCnmamjEmL/U06x7jQQgdo79P40lYW4qtNSQ26KAhWs8wyi3lPXJl3FcU8Ydk95ovBuVwqVUotKFjuABXvKLMUcHdVEiHCmsvFoV65SiO/WQmVpJXfdsucQS2ejloJjq5wRVhllVUiAc0FYRyBwz43aNCgFmmx73GVk3g+ZinfUCRd7naUrPexsmffxRFB8TwsAgJBVl1LgryiL7W/TWBCpVzqoYATEHhQWJLeh9Bo30MdjKf3+uuvj+4jXKetcjCD76Y/L/5JuHUhqb6Vg6vUYP5dybuoB0l13JJVBtQJdyxmki8tDu4xoZiFxp8j/vZ+2sQE40bcrDM+DvOMVYaoE2ljGeOiq8weeOCBLZ5zy4pAXiS9C+sD+xzCcJKAnsfdd98dvWO55ZbLfIerpLB6lxXvavpRqIUCjlJsj8eiTNJWNt18JCQp4IzT9hnkmrRVRKyJrBKOYhVv0/ExArks6V3UeTdOKFpJ/QOykX0fEymV9MuMpfa3kGEreUcRrLJISGojdtIHGDttnOgnk8oNkMNs+nmnXQiyxBXwtHwEJnbtb5In8XyIK+DIwknxcsuEdhm3KEBRt/WS+2n1krSwBcn+JhMu8efiefrwww8nvouxyMYJWa2SMqY9zTjjjNFvZbUnN8+TFHB3GwDyc1q/w0SMzStk+3j50je6vxVvm26dErWhVRRwZsxshaEhJlU8d38ciuKPP/4Y3mlJIxVwVqTt/TzhmVVY+ywhPjgeeuih0axjfCUxzllnnZUZL3eQzVOoXEEprsy7+/LThBWLmxdxE/2iuKsGzLrFTb/KUcCrpVoFPK4UxSeWshRwVwhG8MjCXR2qJJ7gppWBibrKvsykgGl3fO8Yg0bS/rxaCY5x4SpplcjC7H1Wftj3WOUEAd/N7zzlG/LS5bYFBuU8Ad5tZ1jUlEu8rmWVH8INk1LuhANhjz32qKju5PWRLnnPum0C5TjtXQgLVnggxNuPm59Zk4G8x10tqKRPcc9VrsTSxsVth0nKShGoB/E67pJVBldeeWV0jzqe9fv01W55vfvuu+Gd0i1lCHdZ4zXjrlt34+Owu4qYV0cRCq2yjgAeV8DcdsuqXta73HqR13clMXjw4KiN5W0noI7aeCX1WbXqR6EWCrhbJkx0ZMk9rrVEvE7T/uxkO2OIW4eSoL7ad9FW3HfFx4i0M/jfeOONkudQRJKeYzLK7rWlLlWSV65iSdyz8qkaXGXx3//+d2J6gAUW+ismMNjqmZcmnrXxj5dNXAHP2t9Ou5x33nnNc/w2Y66Lm0/rrrtuZj65acVawcW11jzppJNS4wP0UbZ86SfjeeH+TpapNXXYKs+ESuqJW6/z2pPrEyuugLtpYuX+q6++Cu8k4+bXVVddVZJfjBNu+cbzWtSe8lwz1gg8LlvwIpwEHlM5sxKCTiTyutza4CnRss8++0SeEpPYYYcdMj2r4ln5008/9YIGbbx4ZhEo6uFVPvvuu29mvHbZZZfwyvMCQSC8muw9NBCGzPXcc8/tbbvttpnvCYTeKF58L+h0zXU5BB2R8VYMeD3H8+XUBh6f8XQJ1Pm8uoAXclsu9913X9XtgrKjTuAZOing5fmee+4x3mohEJzM+aT2zP56EwwsxktxGoHCG+XH999P9jKfxueff248Tr/33nvm/0D59s4444zMel4Et18IlN3M816hZ8+e0W+St9WWYVb57b///h7etj/++OPwac+cCX7WWWdVne5agqffNPDAvZjjyZi+yhLvt/Cwm5Yu3mNPtqgUvMxOKeAR37LXXnuFV8lMP/30JeeIu32Pexwh9X/mmWc210l07949GtuTcI/GCwThzLIKlG/vX//6l3mGcTRQElLbUqCAh1fJ4Jnc/pZbv4oSCNLmzOZAkcsdOxnnsu43G26ZBApfZtz79u0bXrUEj8rkD1AebptOAhnK/taIESNSy5Z2jzySFK927dqFV5NJ6x8CRTGKD3WpEdAPd+zYMTfYEwmSyOo355prLu/FF180eY7Hd3tiQhpF5S+8atOO0+oB7ZJ4cZ/+MlDWU8surz9eZpllovvIy+573D5ojz32yHwPnsQ5TYNnAsXVeBxPwx4Dl0TWWFQU6rIlrz3Rn6bdd/tdZApOWcgCD/32Xe534yBTdejQIfxP1IuGK+BUVpQ+Cn622WYrGdDjIDzae5eER4O1NnRmNh62MaeBwGKPV8gi6XgXOi06CPKKgX3gwIGF0k+ecnRDFm68OfrAvtdN26KLLmo6bASarMCRcfDbb7+ZoxrKge+jBPCbnP296aab5uZVM4Ny57Kwc152Fs8991yU70xocBREPJ/dQJlxtATwm65iVU+oWyj/L7zwghHWG1VWroKdR9ZgiFC1/vrrmyM6LEWOgyuC23ZQvvPK0MU9/qzecJQIxz8y+FKezUSnTp0qKme332GiJm/ygzpQDRzFYuPJ5HCt4MicRvPss89G9fbXX3/NrbduHDn2yEIfZlljjTXCq3TSxkXGPfoXC+WcFA83uMeU0g7TKKcfyZvIywJFjrHfhclLjiNksu3II480k/d/hEcItgVsWTP5inyRlY+Uf9r9UaNGhVeeN/vss+fWN7d9ufUijjt5EofysKBUuP/HIX3V4NZFZKI8mHhHGcwLWe+yx4HlkdTfc1QX+coRwIyFlI/tD7JA+c6jS5cuUbzc8TFO1mQcMLmSBO3J1g8m6cePH59Yh9zgvmvs2LGpcap0LCqKlbupb6Q/67ey2tPzzz8fpYG6l9eefvrpJ/MsZKU/r0xEbWi4An7TTTdFM6B0KiuttFLijB/hzDPPjCoIleeNN94w163JxPC8Tcg7Vw/SOg8XhA7OjUSpYXWOGVtWEBAYmKA455xzzJl+RaAjysM9V/H9998Pr0rTxoBLJ4uglBVQ0i3M/qc16DicRbnrrrsawYSZyUGDBhXu8JqVzz77LEp/kXK3uAo0ZzwWyXf3O265VcJaa63lDRs2zLvmmmsSw/3332/a3ldffWXab6M757xZ+6IwWRHvQziL+Zdffgn/qxy3DFhxTiozNzDhZOsKZVm03aSRVX4333yzaadYqHB2de/evXOV1NagUuEXawabf3ZiKgsmuarpa1yrpqyVqSJMmDAhvJqs2DeaTz75JLyavNqYVFfdcOKJJ0Z57dZ5d/KxSP6mWYZxdrML42FSPNxw+eWXR3FiDEqjWuWqKIxpKNr77befWZ1HlqG9LbHEEmZljbHOnbxoduifrAKYt2INrKKm5bVbT6699tpCY52dqCAOrIAm0RqTV0nYBQlw23YaLHQwKZAUilJE5gNkvdNPP92sgtpz75FhuWZCaPjw4ZFsnkeWZafFjVd8caIW0FfYds/7kWOS6o8bXGszV/aNU8++ol7tCYvavPbE2fK2PVmryySK1ilRHQ1XwBEIbQNA8Uya7bPBFQ6gWVbBLbUwl77tttvMbBvCz9ChQ71HH320pGNgthYzpa222qrpFdRJkyaFV/kcffTRpoyB9GHCy4AcD8zSWbi2nzPT12y4QtWyyy7bsPKqVoFkAgQzqLSw8cYbmxWG+KpOWwUF2Qo4L7/8cmSF0VrQD1YLqxdJZUfAHHbllVc2ZoFTIlmrQ0kUUdKz6Ny5c3jlea+99lp4VRlYOdm6RxtrS6T19+VMPtaaWkymVQMm1vT9KNrnn3++MTW14xwgSLOixZaRtjLh/Pvvv4dXxSmiWFQCVhrNDH2DLdf//ve/5m8WDz30kFlcSQpFJ57z+nUWOw466CAjZx522GHeDTfcYFa9XeuChRZayIwVSy65ZPhJNoyfefUX8/dmhv6rNcb9ZmlPWXLHlCorNBsNVcBZfWIlGzCHQfHKCwiOFkwnq92bU8sBOmsGqQgonQjHdjWTPNlss828//znP2afPMoBq44jR440M1e1wu7lhTRhif0krCwxGVA0lDNJ4K5EMrES37dqAxMUtpO84447or2ul156aVNNxoBrXoepbyWgHJab724baUvQFhtdhuz5Pvvss72LLrooqqsnnXSSMV+rFfRxSeWUFhDap5mmVdxx1J1aTC7k4ZpWFunfq12NwYTd1h32nlc6JtG3u2a1jHdF+896wIpdUv1MC0yEJsW3WqsAC0JnuXGqhT+HSsHMdqONNor6Ejt5fsABB5gxDusTlB7Gif79+9csnvXuR939/EXbc3zxJAkmPssd64pu62ot3L6B+pBlkdEosDTEitLKfSjPrIJjiYFMhbKPDMriGG2uSL1kUimvzrkWMvW2PmFSq9y+gkmJ1hh369WesHQrtz3VyrpQVEZDax9mkrbRbr/99sbcFuUyKyDg2NkYBJ3rr7++qsGmWnNd10ywyLvSnqEzxOzHpqVfv37GvOruu+82QgSOF9hrZfcrYd5chCINlQ7XwuqnxU0bv4d5VDkhaS/71AID2COPPBKVp3VAUgR3dhMBLSlvs0LWnrZmplaCelHIZ0zwKJcNN9wwWoViEMRxUDWTc5ge2vLmPUnllBaaXaisBgb5erP44otHeY8Qljc+uFtFKoHJNcoNqDt5YxKWMUmCFpOs9nusPLXGCrjb92BJEK+bWcHdysQKmqXIViQ76RzHtU7gGUxkk347LdTCKq1ScH5qV2jxZ8JYjAzDhB8Ooqg3drKIvbfV1EGXevej5KmdqCdNrKhmwZ7YNMXCrSdMQNFvJpVjWmh2KyzkKbZV2v6IhYLW3OuPBcbtt99u6hpyAos+7J3G3Pzwww/3tthiixJzd+plESi7PJiIsnWc7Rc2T2oF/Y99J22g3LrUWqu89WpPPJeUzqwgWpeGKeAonNddd13UIDF3KdIg6TRQ1u2zePPNGriyBn/ikOV4oAgMojYuDz/8cOa7aDSYSic9gxMGqyyz3wKv0lmeY13HUVnwm3n7yxAKbJxcRxko/HaAYxWvSGfMjD/mduxfLzpJAMx+P/nkk2Y1ICuwR9fGj0kJ+50jjjiiUP1pFOyNtDPMeO0sZwXcdYqHt9k8Mzs6bGZ88Q+A0Fd031ajyZqgYgBvhHLmEp+Fpw5aL/6sTuGIptK+wbVCQMjJe88tt9xi9qxhOn711VdX/LutTd6EX7Um2kVYaqmlIsWGFeU84ZCJsmph9cS22RNOOCH1BAj6BPYBM7mJ8y37HHFkMsiWeyOdGrp07do1+t0i3vhZSWOVDz8Cbj2nP7IUyV/68KTfYvyxfScTAnljLBxyyCFmQo1JNJzKtQZMnltHdPQzyClZHonL2QPeDP3o6quvHtWTLI/WwBiddp99qBbXE3QapI06iqUg7SevLjQD7ik05557bupkUyNgQcfmGVYXWY5ukR0xmy+Sx5jO5z1HG7fU48QUJjvsXmWsURlr8uJEv0V/zIJXLa3eyqVW7cntv7O8mlvoH+mr2fI6ePDg3OdFfWmYAs5AajsiZl6KeFG0oHjZSsYgh2m2i+swwB5plQQCRpGZuyzcYzEw2clSfi6++OJUb6ruahsdSdbMLiaTrrCTt9caISmtYdHJYn5r72PObdPDjCAKNf8j/LhO8JJg5YeOmHwlfnlHILiwT46OIC+4Tk24tp8zo9osYPrj+icod3KAlS+UdqCsXadCSQwZMsQojHjIx7lWsziggXhbTEuH6wuitcCRjF0Rh+OOO65iYdY9dghLnyyhC6WMo90YWFmJyJsBbzbcVcosoceuANa7nOk77SQt/RbtI+03WSVwLbEqZffdd49Wjkgn/WjSxBnjFW0ayxZMPlnppr9ki48di+jLeF85fUatoN5a2LOcZU5P3uHoBwWbPHQntFhJsxPIbBvKmrxlRS7rxAz3ZJRTTz01c0Ly3XffNeMZ4xBKb2tZYblxZHUry0kV7d21mkiyvGm2frRXr17h1eSJy6zfRP5Ig0lHmzekK09poM0wqcYxtK7lXjODjMgxutRh2hPHbJXrVZ+2VgvcupW3b5sFMleezbIIQ3nFX1Fa2eGdm61V3Kd/cxd6aol7hBlbybLqEjIT22aY+OFva+5Rd48Dy2tPTOKk3cfS0uoOTLa4pxolgdxBPuD0OX6km2g8DVPA2b9tKfccVmbEXecQl112WUnF4fxHC0pv0swWK7qsMlRb4TjygX3axJ/ZQvbXJAkIzGoh0Kf9nrv3mgEmzcM7QhpCkivQ5O1hZFBOEkJRvomvzR8GQ2biXFzlEeUkTZglvnh5tfcwp29tz8pMAlgnbUU8kFYLShb7+xD+bT5wxijCSjn1G9x8Zx942rn31CvOTrf38s58bzRMjlioP0lWEZTTUUcdlZi+RoPitO6665o8RFhisi8vXq7zGgueZFmF4z3c54zbJCUc5Zt96NaiBUG7kvrSmiBM2UGfGfUkE2yUUhQp99iTeoJzIRunU045xXjrj8cJxQdrnaJmlllgmcVYY38TRYLVpXiZM9HIhJodo+i7iYPdroISS3/lHl/USFCc7eQfyiwCXdJqPmMHbcW2Z07ocPe7Uo/tJAL1nzE+SZln3KDPympjrE65lim0yaSJbpQUBFlbx2h/Ni2NhslrOyFBGbO9LimN1EHyyZVRksbzov0ozkyz8rJW4IPGymBsCzz00EMTFTTaobsVKw7thv7P7r1FHklT5OhX3Ilt5I220E/SJ7C9hGPWAPmOlX8my/PKivEB+Q1rxEqcdcVxt2TQJ6ZNZlFmlItrLu96GU+C1eQkWRu52PW2jYVKvfZaY4lkJ/6wKsNKIqleMh6x5czGCQvc1tyuQv7YRSQm4rPaU5YVENvX6B9pF0w+M+amWcvSj9h+iXZIPzul+p5pMwSFUXcCgccPBAxqkAljxowJ7xTn5JNP9oNKZr4/22yz+cHgG97x/WBw9tu1axe9n/sDBgzwg47Mv+CCC/xAyIi+Gyjz0XPBQBK+4U8CYSh6NlB0/KDBhnf+5P333/eDxhu9J1DK/XPOOccfNWqUf/fdd/tBQ/eDTtjcCwbl6LlAKQzfMBk3LgsttJA/dOhQPxBQzPsDwdYPOhN/nnnmMfcDhT16NhCEWsSrU6dO5l7QsKLfDBqjH3S6Jl6BsOgHwkn0Dn7v7bffDr9dyjHHHBPlASFQUPxAiDTvuf/++/1AQfSDTi+6HwwuftB5hN+uLQMHDswtD4vNA8KwYcMyn03C/a2gc/SDji0xUJ/cvLSha9eu/vfffx++rSVu/ILBNfz0T3baaaeSfKf8hg8fnlivCIHwWXYaLW5aAyGo4vfECQRFPxBGozgGgrkfDCKmLZ577rl+oIhE9wKlNbqOtw3SHAwO5l4g6GfGL+9Ze69Dhw6J+f7OO++U9E/0GfF39O3bt6Ru0DaPO+64knpPu11kkUWi99BmDz/8cNNmbBsMlNfoPu00EKIrynt+y6aLkJSuerL99tuX1NUddtjBpC8QPP099tgj6h9oE/aZpPbrtol4HYiT9yx9sBun7bbbzuQveX/mmWf6gQIR3bMhr0/J49Zbby1pk5R5IHD6zz//vB8ooOaZQKH1AyHL79atW8lvE0499dSqfh+oB1l1PG9MCxQEP1AWojgxNpx44on+Qw89lJh3jK+BMhF++09IZ8eOHaPn2rdvb9L32GOPtRg33HExaRy+5557SvKVNnfGGWeYdxFOOukkPxA+o/vEOalOBEp5lPak33Ep59kk3DZBHpFvr7zyimmrL7/8spFhbJzd8Zw+MV4maf0o45rtR+1vZfWj4LabQEgPPy2fZ555xp9hhhmid/G7V199takjxIu+18bJhqT+OFAC/bXWWit6lroQKET+7bffbt518803+1tvvXXJu4466qgW7+FZt9/P6gPzxgAL9cz+ZjV5BcTPLUPCJptsYvIsUFLDp3x/4sSJpk4HSlhJnbYhUIz9SZMmhU9Pxo1nVnrGjh1bUmbk03333WfqJOPeHXfcUZLXbr0MlPKSPH/qqadKxhwC9ZwxbuTIkaa/YFx0+5JNN900MX4bbbRR9Ju0tXjZuuy2226Zz1566aUl8VpxxRX9IUOGmD7XxsnK0YSll17a//rrr8Nv/4mbp++++274aTLlPJsGMn4l7Smen/S7nTt3jp5BB9h3332jsS/pXega8XxknLD5yDiRVa9EbWiIAs6AYQufgbySgv3oo49KGlm8AtHY3IafFOjEUQTcxhyniAIO/N78889f8v546Nevn7/BBhtE74sPjuPHj0/scOMBRQxl2aZ/5ZVXbpGHdpBlgLnwwgtLGls8IBiNGzcu/GYyCAuuAJQWSF+W0lktraWAlxtQzPPywY1fUhtAMGHiqEgcmISpZtKjXgo4xJWSeEDgoo6iwNo4xNtGXLjKil/es/ZelvA1aNCgKC4IFR9++GF4ZzIILUnl8tprr4VPTIY2vfzyy7d4Lh74DQTNSvO9tRVwFISkSSg30DeQPzaeSe03T6l2KfLsaaedllv3UARtWeb1KUUYMWJE7liQFqgHSRM+5UD+ZtXxImMaytViiy1WErekgCKYpZxS/4lD0ndtQCjv1atXFKe096GEu4JzWsgazxqpgBdpE4Tu3bub+msn8VF6ktpvkX6UupPVj4LbbqpVKqnreWWCwmjjk9Z3Mzm1zTbbRM9lhSTlG+L9flYfmNU+XGqpgMPrr79uFlqKpDMeUMiefvrpxLQXVcABZdSmPy3QD5133nlGVrfPnn322SW/7Srgq666qlmYyUoXk7LuQplLLRVwYOLXnURPCyussIKZ8Eii0Qo40J7cxbykEG9PSeVN37P22mvn1jPbZyTloRTwxtMQ+4OgYCMTiqLO1+JgamH3J0PcGRsmPpypuvfee0fmaxBUOPM99n3gKKuS306C38PUA7Md4uaC+Rj7gjnXG3M8N54uQSM2+6CIc/wdwaBs8op9NOyZCwaOyDkNJk1ZZ0zibAOzLtc0H3gHe0BwALNkznmPmPLwHHFzPeUC5iuYWrOPBJOWoPMO70w9kAeUB6bU7IPF5KzafAiELbMPE7NezKXcegy8n6PecNSG467WNvlPA/NT8oQ0WDM8IM+IPyZXreV0Kg3acaA4m2tMZ+PbVXDcgjlkvJ3iUdZ9jjaNqSHP0v5IswttEJO8V199tWTfeFsDk2PSibk3TtBcMFFn6wpm2Y3uGzDlo39kW0hS3SPO2223XU3znb4QU8xAaGnRZuPg/4S9ipzFS/yoa2zfoa4Q79aCvow2i2MetiUxbrpg2j1w4EAz5mX5b6H+M24w1nbs2DH8dDK0L8ZE9ioWcRyJST/5ipM79tTGIc74KSkynjUC2gRb3RgT4mm3fTd+OxjT27VrF5nwIyMkmZk2Yz9KXWcbQZLcw5Y25J4iR8GxVx+TYeQHzHHtvnCLlX8YC2kvbbWfZKtGoDQaXx/IjHnpsGVL34n/CNdZV6XQv+AjYeONN27h6Jf4UV8Zx9gawjYO+3uUZZrsSvndf//9Zn+yKx8Sf+Rt/FyQZrfe1pM+ffqYeonJdnw8oi+jbtL3kKfu6Q2tDe0pTY9w21OgGIefJkPfw/ZEthlQzvF8x1v6nnvuGcn0bbU9TWn8JWhgyS2shrjnZXOsSFwoLQp7vlznFFlu9HEwwH4XHAah2FjYg8WAB0lxce+zr4tQBPYVIlQwcLiOYBBI6NwA52kzzjijuU7CvoNOMml/ir0P8d9h7+Hvv/9uzvVzG7JNT9o7i2LzPv7+euOWeV552DyAeP4Uwf2tLCrNSzd+RY+AsGWOsl3LgcNNa7V1Iw+b7nia3TjE2yl7TtmDBnlpz3vW9j95ddeND8TjZLF9CxSpZ/b3K6mTabBX0PWOXLQ+1Qubd/E0uvFMar9um0jLb0s5z1ps3rv549aXvD6lXHg3Qh6Bs3LZl8f+bhQuPAG73vKJG/vw3H15pLFc50Du+JpUxysZ09xyq8WYHf9dhHSUAtLN+BhXWJNwy61o+bttNS8d5TxbBJv2tP7L3oci5VJJPwpuu6l1P2HzLJ5ftk6WM27ZdxUdj8oZI2x88saAeuYV8H4mFZiAtXFCJqT+41+ISaUik5bVxNP+blodd/sT992c6MPk2x9//GEmj+i3rGJoy64e7dKVe4u2S7fPK5o/bp7WYywqQi3bk41jkb4FKtV9ROU0RAGfkpgwYYJxmsKsX15DQIhBmMJJDJ0A382byRJCCDH1wGrRySef7HXr1s2s6LbF1QnGRCzQUCSKTNCy8sbzrE7h9K21nNAJIYqRpYALIcpHradMmLnELIhZrzxvrpgK25k796xnIYQQAjhVA2/fbdnUFi/D6623njnvHM/qWePi2LFjI+/JWAQUWdESQgghpiQasgLOvuMpZaGdmX72kpAe9l2wryJNaOK4NMxAgL0edg+3aCyYfrLHUhMgQghRezAHxmwSay8Uas4B7ty5c3j3Txg/MT/nvFrgzOi2cryUEFMzWgEXorY0RAFn3w2NVojWAOdIOBCSkCeEEPXh8MMPN2fNIlKghHPeNU6d8AuAszkclOE81U5KMyGN46AsvyhCiOZACrgQtUWtRwghhBBVgefzXr16mYlOVsQ50aFHjx7G+zOnCGBib5XvDTbYwHhDl/IthBBiakRO2CoEB2u33nqrOQ6KY0UQOCzM+DNDOGDAAHOUgBBCCDE1gFO5q666yhs5cqT3/fffh59OPoqL7UB77LGHt/nmm8siSYg2BEffnnbaacbC5R//+If3n//8R21YiCqQAl4jrMv/eh/pJIQQQrQF7LE65RyfI4QQQkzpSAEXQgghhBBCCCEagPaACyGEEEIIIYQQDUAKuBBCCCGEEEII0QCkgAshhBBCCCGEEA1ACrgQQgghhBBCCNEApIALIYQQQgghhBANQF7QhQj57rvvvNdeey38r3zmnXdeb4kllgj/a044y/OLL74w1507d/bmmGMOc11rGvU7QkwtfPDBB96HH34Y/pfNdNNN5y2yyCLewgsvHH4yZeHmRadOnbz55pvPXIu2w48//ug98MAD3lNPPeW9++673k8//WQ+//vf/+4tvfTS3kYbbeQtt9xy5rMsmqUufP75595bb71lrmeccUavS5cu0TnZTz/9tDk/G5ZZZhlvzjnnNNfNCDIQshBQFosuuqi5zkrf1IAr01RShm49nX322Y1cRP7973//815++eWofqy44ormOOOiUFavv/66+b773nrg/hZ069Yt+q0XX3zRmzRpkrlWn1yQICOFEAGjRo3yp5lmGnqWisKuu+7q//HHH+HbmpO+ffv6QYdp4vvEE0+En1ZGIDilvqOWvyNEJbzxxhumTbvhyy+/DO8W54cffvD79+/vB0KRHwgV/l133VXSzq+55hp/scUWM3V95MiRdesDBg4cGLWpomHuuec2/dK4cePCt7Qd3n//fZO3Sfnp5sWwYcOavt8Vf/Lzzz+b8ptnnnla1Nd4WGmllfxHH300/GYybl24+uqrW60uXHvttZH80KFDB/+3334L7/j+tNNOG6Wp2cfDjTbaKMrPY4891v/999/N51npmxrYbbfdSmSacuuZW0/XX3/9KF/p59z68e6775rPi4IcZsvFfW89cH+L4NaBJZZYIvq8NdthW0Im6EKIsvjqq6+8QKj31lxzTe+9996LZkOFaCYuuOACb5NNNjH11Aa7glEOgeDlvfPOO96WW25pvn/EEUdEdT4QSr1ddtnFC4Qo8z8rI4GQZa6bga+//tq76qqrzKrKLbfc0iba6v/93/95p556qvePf/zDe/jhh8NPxZQAq97//Oc/veOPP96MI3m89NJL3rrrruudf/75GmeEEFMUUsCFSGDuuef2jj32WO+4444rHBDQpwaGDBniDRs2TAKRaGqop2+++aY3zTSTh7mFFlqo7C0iH3/8sTERvPPOO40iu9hiixkTPMwRMblDOT/hhBOMaeFZZ53lLbDAAuE36wsKdVb/tOeee3qbbbZZZMpIGnbccUdvzJgx5v9m5vnnn/eOOuoo7+effw4/EVMKBxxwgDdq1CgzdrBN4sADD/SeeOIJ75tvvjGfEWhbl1xyibfkkkuG3/K8/fbbz7v33ns15gghphyCDk0IEYCJqmtiVU9TntaiFqbhRcw/x48fH5n9fvvtt+GnQjQe26ZrsUXEtp9zzjnHmJ2fd955DTO1c9td0bR8/PHH/nLLLWe+Q9hwww2b3jTQ7YfT0onZpu1fPvvss/BT0cy8/vrrUbkGyrf/+OOPZ9ZFtn7861//iuo8Jq5JY3Kz1AWZoE/ZyARdJui1RivgQoiaw0rjGmusYYIcsInWghVwC6as1WLfwUoeFi8DBgxoKpPzOKz6X3PNNZEVwMiRI71vv/3WXLdlcAxl+xc5+2kbjBgxIlrBtluYstrOrLPOaqxOrBUHK+OBkm2uXZqlLvztb38LrzyvXbt2JWlz44VzxGZmnnnmCa88r3379lE6stIn8qEO2DzDuZ0Fa0sLViELLrhg+F/zMddcc0Vp6NChg/lroX7Ye4svvrj5K7KRAi6EEGKKZOzYsZHQ371796qFxq5du5p3IIicdtppVb+vEeBJGkXcMm7cuPBKiMbB1g1L0baI0sJEl33W9SbebOCzwMZzqaWWMn8tyy67rLk322yzRV7FmxXX9J94W7LSJ/JZfvnlwyvPePm3eclEk1Vm8SEywwwzmOtmpGPHjmaSAOL+TqgfFhZg3HsiGSngQtSJww47zNtwww1NmDhxYvhpMlnPvvrqq+ZIFu6xgoUAwp5OVgf69u1rPv/Xv/7l7bvvvt6jjz5atYDCKoP9PcIdd9xh3nnmmWeaz9393ygh9lmUHYt9Nv55EqNHj/aOOeYYb9tttzXPb7755mZv4P333+/9+uuv4VPJsJLCdw499NAoTs8884x30EEHmfdwb6eddvKuuOKKKWLlT5THU089Zf4i4LB/u1pwukY9Y8+qPaqnLTDTTDOFV17uETf0LTfeeKO31157mX7FtiH2uH/00UfhU9ngSO2ee+4xe3ftO1Cksto1DtfoM7Au+OOPP8xnDz74YNSPuP0O5WA/t32i5dNPP23xHdLEd2x/Qd+AMz2c68VhpbZfv37mOeJOnHEG5v6Gi9vX2WfeeOMN78gjj4z6oN69e3vDhw9vkW6OdjrllFNM3vDcDjvsYPY///DDD+ET2fD9iy66yLyf7xMotyuvvDL3HW68bX5zHBg+DWxfzN+TTz7ZONuslllmmSW88kqOXcpj00039bbffnuvT58+JUqMJasuxMFZ4umnn27qM8/bcfOmm26q2ucAirVtZ1bhtqC4AJNh1SomlBFO6fr372/SYNNBuddinHOPsXIVqaz0FcGtb6+88kpmOWU9S/vGkR/3bPumv8HJ5N577x3lCflx11135coQFtrSeeedZ3xl8H3qPvH48ssvwyeqw7UmWGGFFcxfCxMa3EMxrwWkZfDgwd52221n0kK/glPSzz77LHyiMqaffnozQUNc45Mwtq4w2etaS4gMgsorhAhgD5m7x6navTRBxxft+ZkwYUL4aTJZz7rxYs/1k08+GR17lBRWX311Pxikwm+XkrcHnH16c8wxR/Sugw8+ONrL4343KbjvK7LXnL1O7FnKeif7irKOoenUqZN5jvd8//33fo8ePVLfx5FMt912W9V7k8hbyiQQSsNPpk4CwSY66mvs2LHmfwvHfVVy5Fet6dq1qyl7jhFzyz1QvEy809pJEkOGDPEXXnhhf7311jN1LH4cWb2pZA84UA4zzDBD1AYmTZoU3mnJrbfeatJo20w8sHf30EMP9X/55ZfwGy3J658IgTDv33fffSVpYI9pVl/AflT7fJYfCvZU2v6S7wTKnh8IjSXvsoH0XHjhheb77B9ea621Ep8jHHbYYYljgtvXkbeBYu8HgmqL7xMCwdufOHGi+V6gLJmj7ZKeI3+yjo6jrZ100kmp3ydQ1uRpWj1x97Syl/P4449PjTf5dNxxx6W+qwg33HBD9HuzzTab//DDD1f1PotbF9L2nrKf/IADDkhNH4E8v/fee6uKE/0NcXnuuedK3oOvCOok/VClcgX1eosttojSmhYo90svvbTidLz66qsmrssss0yLuKalrwjl7KHOetbdM037pp107tw5Sn88BEqt/+abb4bfTgafHrPMMkvi98lP+sW4TFNJ/s4777zm+x999FH4yWQOOugg8+5TTjml7PfG94Aj4wQKcBR/N8w000wV/YZLoNSbuN54440l77nnnntMPDbddNO67kOfkpACLkRIW1DA999/f3/22Wc31whFq622mr/BBhuYQYLPbEAJzxMW44oxjtNc4dtVvuHOO+80Qtg666wTPbPllluazwiuQpqngCOk23QQSAuDR58+ffxtttmmxb2bb745cdCwCjhxWnPNNaPvUH7kC0KE/YzAuxAwKgGh95BDDikR4qzwHofziylT4kDYbLPN/J9++im827ZBmD3xxBP9+eefvyRvqYNHHnmkEc5QwEh3NQN9tRBPq3jedNNNJi4vvPCCv8Yaa0RxLqpYoHxT7pzzfeaZZ5q6PWDAgOh71Od6U4kCTp3t3bt39D1XiY1DGu1zBBSS7bff3rRJt20RaG9JSnh8Ag/F174jqV0//fTT4Td9/5VXXjFpdPuOFVdc0cSZMnrkkUeiuBdVwHfeeefoNxE+6S/XXXddc81nBOJB+dm+gv/tcyiK9jlC0rnkbnz33nvv6Jr8ow3ElX8E2Msuuyx6bqGFFkrsq1AckiZLKFPy1H6fsPzyy/u77LKLCfHfS6vfrpJz1FFHRde0Y+JDHpAX7ruGDh2aWn/y4Pzvdu3aRe/i3YwfjCtMnlZKngJOP9C9e/fodwmkjTrZq1evkski4lRNGhlbGK/jfT2TO3xO3awEnCkussgiUTypv3a8tO0zXlb3339/RemgnFDqmFSNfz8tfUWohwJO2l2ZpUuXLqbu0qbsZ4T27dv7P/74Y/iGUhiz7G8RaD/0G7QxO8aRt7RH+0ylCjjjD/kX/y5p4vNKnAi6Cvh8880X1QOue/bsafqEpZZaKoo7IW0ysQjWwe4333wTfjIZnO0SF+6LYkgBFyKETqXZFXAb9ttvP/+LL74In5gslDGL6w4kDz74YIuOPk0xzlO+XbKEX0uWAs6KnCtM/POf/2wxI0xnfuCBB0bvYFBxhXWLVcBtQGB/9tlnw7uTYdBzhawddtihosGT+KCEMblh34Ug9Pnnn4dP/AmKyE477VQS/6TnsiAPKPtahVoMjLzDKgoI6tSFxx57zAh7bh0mINhUks+1gnjZ+HzyySf+LbfcYlYMadtxgTU+mw8oBrQJhDzeM3jwYPMMgintESGPMkUpQ2hLE/BqhdvuNtlkE6M0JpUz4e677/ZPPfVUI5DaNJLmNMGZlT+3rl5wwQUtFGwUZFdJpA+K55mrGNr8ckEZQih00xF/hvjb/i5toqGoAm5Dv379SvpL2la8HfMXhdC1iuC5zTffPPotVsjj44Lb1xGoFw888EBJnJgAcuPE76HcUyfd5ygHd1XbnXSwsMJuf4/feuihh1o8wyqYO9mRNIHpKjkEBHZWqd1yRyFgIsI+w+9VMy7GJ15toM4xMYZigGVJOQp5ngLu1jeUqNGjR4d3JsPYyYqxnayzY038Pa0JY5ZNAyuMX3/9dXjnT1DSqZ/2uY022qhqGaaW1EMBt2Hbbbf1P/jgg/CJyQwfPjwqU0LSxAoykm2XlDsTY+4zTEYcffTRUVxsqFQBrweuAm7DPvvs02I8uuiii0ryo9IJGlE7pIALEeIKfghIzKQWCcwwJnVk9VLAMQFN6ziJi30Pq+Xx55IU43KUb6hWAef99h4rE1nmrK4SjiAY/y1XAWeW+7vvvgvvlIIZu30PimO5ggkmaCjfViB28znN7NGa8vEMq15ZeZpEvNyrDeWYLSeBMG5XsBBkkyZNXDO+uIlxo8FElzJCaaTcaNMXX3xxFCcENFuGa6+9dos64da9eJtgBc2mE6Uky1y4VrjtrtxAn5GmfKOAuCskWUfIUAfs5BkCa/zIHLv6zYREWhtDqLUmknPNNVeLVd5aK+BYnyS945lnnil5DuUlqS+iXs8444zmGdIcT1dcAX/++efDO6X8yzlSi5AmAFNW9jksTdxn2Dph40J9zjKtdfs8tvLE4+0qOaTrpZdeCu+UQvpdq4YxY8YkxrsoTIhiiu/mRTwQH9rk2Wef3WKlLU6WAo7Cb8uYdmrN/5NgIs0+y3hc7hhRL5iwtmXO2PXVV1+Fd1pCn2yVUyZ4mumosHop4CjfaWWF9Yd9z9Zbb93iOeQPex8LoLQ4uWMBoZkVcFbv0/IDJdw+y3aCZqnjUytywiZEAjjteeihhwqFoAM0jkAaRTAYpDpA6dmzZ3jlFXIShbOOYGDyPv74Y/N/oGh4Z5xxRur7a8F1110X5VcgYGV6/cQBkD0WBQdzSU6TLDhOwstsEuuss070nq+//tr8LYcOHToYJya8h7wJFPDwjucFAnd4VQp5a9O55557mr/lMPvss3vrr7++t8EGG9QkuF5KK2GPPfYwTowCwd846Vp44YXDO5PhuLlAyA3/87xASa1rPcojEPTNX47MwQnN0KFDTRpsnHC2Y+tEUhniqfnYY4/1Hn/8ceOMx03LnXfeaRwQ8jkOugKFM7zTnOCw8Zxzzkl0SET/NX78eHO96qqrev/+979Tyw2v1Dg34n4g3HuBwlPS99FvwieffGLqfxLUH7xZf/HFF6YtBspFeKc+4GwtKT3Uz0DRC/+b3PdNP/304X9/Qr2mfG2aP/jgg/BOS3ActfLKK4f/lbKmc+zWSiutZJ5Nihee9i3x/o78tmXIEXg4PkqDvgpnVfyGPcIrbZwiLnHHUBbSHyikUVy///5787dSunTpYtobDrK22WYb08/FIZ9pd4x19L2ME5WMsZdddln0PZzizT///OY6Ceq9dSyFM7daOJ6rBYGSZBzj0XdRlzmBIQ36ZNsH/1DQkV9b5z//+U9iOwIcqdl7cXkIZ3bWq/6iiy7qBUp/6nsCRb7EiWCzQt/KuBQo2eEnpZDGxUJnpLTBLHlK1B8p4EK0IfBQihCcxpxzzhkNInme1xGA11tvveh4GBTYeivfr776aiSYI9SuuOKK5joNBpQePXpEcXrggQdSBTHOaM6Kuyu42AmHouB911XeUFTs9YsvvpgYp2effdb8Rdi2ins54GkWL9AIg7UIeIovNw4WJj/uvvtuk87DDz/cHEGSBfcR3Cth7Nix3lZbbWUmOT6rwmurVTjuvfdeI4jtvPPOLdK/dOh1FsUxXieIw8CBA7211lor/ORPaIPkJ0pbllBfL2g3TA4gGCYFTlXYfvvtoyOPaHNHHXWU8bYdV8KpYxY8TufVkU022SR65rHHHjN/Ld26dTN/Ef45l5lJqyRFplOnTg3xlIuCjcKXhhVGIWvCaIEFFgivsuEdabi/tfrqq2f+Vto9N7+pn3llheJsyeo7mRzIwlWSi3rCz4KJjs0228x4rsarNW31+OOPN/GNe+lnkoZTLZhcTot/Go888kj0HXccSYOJSvsMfV65v1cPbF+Dd/wsZRO++uqrpohzo0A+YMIrLU+ot/Ye9dbNmyeeeCL6Hy/yWQsBjGXISnn1p7UhjlnjEe2OtNp0ZPUJov5IARciAWbdmXmmc8oLb7/9duqMY62hcy06CLCKkMWuu+5acjYrynHSClktmTBhgskzQKktkhZ3Zeatt94Kr1qSNTERh7KtBs7utCtdbh66oPSSVhSiZh+482BWHVBomKhJSg9HwbDyCdWsflMvOfrummuuMUdS2fpSDqz4WUsHVoROOumkxPiw+mo/r7ZONBLaDpMDaeHUU0/1brjhBmOxwJFUdmWXI8BQdNw8ffPNN8Mrz1j0sErSt2/f1MC77fdRrt13cZygzU9WmFilXXzxxc3KIlYgt99+e0NX5lB6k1a1k6jFhIA9bioPa3lRLkxO2fzGoiGvrLDUsM9/+OGH5m8ScWuWLPLGlXJBiWKyhgklJoO+/PJLUw/pZ1xlHGX9wgsvLKlvWfAe2x8B70/KIzcwEWCh/hb9rUbDau6YMWMiSxzivsoqq3jzzjtvTSZI2gquxVUe8XrLGGHLl/4pb7zKm3RuBorE0T1mDtm1Wev41IAUcCGmUqwgjAAEnJ9djoBTCa7wHV/pSGPuuecOr4qZ1TcKO4FAmuITAwzuzLCz+s1KT97g3sywMmwnEzBpTZthHzduXGSCbFdCKwHB14KVRiVY00Jg9QjLkCTcVRG7WjylwYQGZx/bOog5r9sOf/rpp/Bq8qoQCntWYPuBzTMUfBdWYFD84womJu4XX3yx2e5C/eEv537Xs6+ZEnHLjbOrk8rHDZSnxVVGmxnGI7beUF+YHMJawMKZ6UUniePnerMNIymP3OCe995s+YUVC9ZHWI/Qn2EFg0ULnxF3ttyoPRXH3SLjyhhpLLjggk0/jv/1r38Nr9JxrVmaSZ6aGpECLsRUDCa0CHJ2YMFMNS5Ui2Rc83l3Nh3OPfdc8/+UsPrtmmK6Jq1xMLm3z7km+uXirrBjNl4JKODAin2vXr1S42L382LxMiWz++67RyvBTJKwbSIJrDrivgPyQjxvMRVmtRVFPGmPL7/PSjjfPeSQQ6Q0VEi5/iGYDGwtMJ3fb7/9vJ122qnEB0geTIqx8m3336IUM9FXLij1SXmSFfCZ0Sx99z333GNWN1ntZtXSBeVx4403NpYv9Hso6KL2pPmXEaJSpIAL0QS0xt6t/fff3+z5ZoV2u+22M8IGwnGfPn3qFhd3EIuvUKTh7gMux8y83rj7OK0TK2BmHWdJOPGqZvWb2WkcZNUqMElQCVaZBYT4tPTcdttt5i8CYTUO31itZSUKBzG9e/euKP/svnxM4dPMfdlyYVfscXxVaTm1Bdgy4e5Bdlf+3VWTQYMGle13ICnfUHjYg273+D755JPG9B1fCC5nnXWWd9999zW872urWGslYJtGUnmkBdpVo7ZKxaGtDRkyxBs+fLjxyVBOeWNm7E7oFXUC5+7pxf8H+12T8iUtVOMzo5YwSYiDOEzqAd8gtFPaFBZCyA5sLWGyN8u3QFuiEkep5eLKEkV8jbAw0ez9VJHtIW7elmPCL2qPFHAhGsAvv/wSXiWT5Vm3XrA6ZQfr888/P1JUWK246KKL6jLYsB/U/uYrr7xS6DdQxizNZCaMEznrRdlVwNlryOQCe2WrEXhfe+014wAMB0m1CAhtlZSp60Tr73//e3hVCmbjKG68vxZCIPv+27dvH/5XHnZ/JGStxCNk2/zYfPPNzd8pGdd82VW68RJvsY4Ds2DSAtPgH3/8MfykFBRu17wTpZH6R7vAmoL65JoVY9IuioHXc1uf3f3gaVAOtE38M7QmWAvZeLOaW3Ty1YJiYdNa1Gs+zuzshC8r50UcbzIOt8ZYnMV5550XTTowgTV69Ghjdk6bivstoJzbgmfrSZMmhVfJlOsktRJcHzRvvPFGbltqFq/4WcStI5Jw5S6sKqodq0XlSAEXok64R9xgkpnWwbM60IgZ3yyYDXb3iTLA12MQZPbezjyjtL788svmOg2UKddTZyXexOsFioV1EGcHPlZe2Y+HyW+WR+QiYLrbDMeQubPq7INLwjUlRultTdy9kAipabCCyHMI6UW8f7dlaGeuUoz3d5tejqCysGKd1k9Zrr32WiO4kW/sQbXPo0jjLZg6Mnjw4NT3sBLvOsVrK3uTmwFOerBg4p9XVhzjhWM4VoOxNsh7vl7QJ7jHY5144oneH3/8Yf7PA4XYTgzR59qjwopAv2frGVut8tLPSjMTUnwHi57Wyi8X5APLvvvum+mt293D3my48pDr5yMOK/pFJ+ergbHB1g2scLImhZh0bAsew1k8yUuHa3Hk5oFoPFLAhagTrkdczjxNg71bzdCxY3q+9tprm2uEJM77rUe82AdoO30ExCynOnhVZkAGzJ+rPcu61thZdMy7SQdm/Zj7cn55tQNbMx1DZkka3BFUObPX1pW0c5AbBeb2FoT+pDRjvmmfY7JkSt7fx6oYxxfZ8kF5dtsRkzzWCzaCr/VfkARtkTOJ7X2OtLHghdmuiuPB/ttvvzXXSbirdOUoVFM77pYMrJSyLBao366S3pqTTPgf4Bxu+/tM9rIlIc+hGvWNM/ztc2xrKKetkl8WHLhlKX7XX3+9yTPyC0W/mSZ7La4VSxzaOccPum3Xmq03A671BlYQaX0MdaOoo71qoM9jApE4MTnJdry0SSEcV1ZzJGajyEsHeYuFEmD1tcgii5hr0TpIARdCCCGEEEIIIRqAFHAh6oRr2slqBabJ7qwvs/Hsw8YjcNpscKPh6BfrcZZZ6mHDhrWIm+sIiJXVcjniiCOiFTdWInv06NHC3B3Tc7zm4riH38d8DRPK1nIilIb1hI4ZLTPPOCzD/LYWZwo3C7Y+QHx/JCv/nEG79957R6sb7N221+RJ1qpNPXBXBTGJjsNKEXWQVQJWyN2zq+sBJtv0BXiQxwqhUW2dlY6bb77ZbIV45JFHot8l7W56ac+sDtrPDjroIGOVE7d2oL9i1cSeM4wZOya7brljIs3/tAfaddKq0XPPPWfy3MZnxx13LImPu8f3+eefb3j9aWawiqG9kV9sDcH7tXssnIW99qwW25UwrJvwWdGaYGli6wdgSUF68OzNfnbrEBErCraRcCIHceZ4TKCtutukioATTPubbPPCp0bS8Xe0Eyy+bH6xBQvHbc0AeWShnSa1KdrmFltsYY6dc9NW7l77euLKQ8gWlLu70s3qLeMIY0a8fOoFddCeDsF13CqDsYLxnP4qbVW52SAdyErxdJA2AnmLPEVdapQ8hT8bjjBlDCS0lbysO0FhCCECRo0a5QcdEj2/36FDB//3338P71RG0AH6Xbp0Me+zIRAi/A022MBfeeWVSz7bY489/EBIMP9PmDAhfMNk3Hitv/76ftB5hXdakvdsILxFvxMM1uGnpZx00knRM3PPPbf/4YcfhncmM2LEiOg+Yb755jP59eCDD0a/l/c7geLtzz777NE7ggHBxDcQFP1tttmmxb3zzjsvMd2dOnWKnovnW5xyni1KoOxF+U0IBL7M8mmLnHzyyVFZ9uvXL0ofaV944YX94447zr/mmmuiZ8aMGWPq/oEHHmjKcfTo0eb5RhEo3VF5DB8+vKQ8iFfPnj1NXKlXI0eOrHt5BcpslDd57TcL9z2Vhp133jn19w855JCS99OuaYu0Sfos8sveo88aN25c+M0/CRSBkvznO+uss455xy677OIvv/zy0T1CIHC3iM+3337rzzDDDNEzs802m+lfAuExetbNi2HDhpW84/333y/cj7t9QtZzgfIQ/V6873D7unhcXK699tooXscee2zqc24fvuuuu7Z47ocffvADRbKkrAJF1e/Vq5fJ53ger7nmmv73338ffvtPdtttt+gdV199dWp8oGga8yDu6623XknciwTqW1o/4taFpHQECqu/zDLLlLyPPKI+EpZaaqmSe9tuu60/adKk8NutD/XZbVOMybRj+t3DDjvMDxQbP1Aizb1FF13UX2WVVaL8oC+utKzqwRZbbFFS9qSFPnG11VaL0kB7P/jgg6PnkB/cNJAf0047rblH+/7tt9/COy0p8uwVV1xRMoZT13bccUfTnhZbbLHoc+Jlr+Nxak2eeuqpKP7IlTbfqAtJ6aBPvummmxoafzeOhKwym5qQAi5ESK0VcGDwX3vttaOOJx5WXHFF/5133ikRIlpbAf/555/9zp07m2cICCTue1BiunfvHt23YdCgQdFzRX7n9ddf97t169biPW5YYokl/EcffTT8RktaWwFHWbD5nTRZMSVAHXYFQIRXBCauEZQo84ceeqhk4Kf9ILA88MADmfW11owdO7ZkoEeYGjp0qGkXKA52Qoy43XbbbQ2JWzMo4NTNwYMH5/42wug888yT+A4bVl99ddNnpYHQH1d44mGmmWbyTznlFP+XX34Jv1XKMccc0yKtm266aRT/qVkBB/poJkys0pIWUMiTlG9oDQUcGD8uvPBCM3nnxjUpoCyQB1988UX47ZbkKeBAP927d+/ouaTAbx166KFNpXxbqBOLLLJIYrwJxJ1J/M8//9w/7bTTovpz/vnnV1VWtYYJGCb10sqhffv2/vPPP28mdG0a6q2Awz333JOZv+TtUUcdFcW7WRVw+pVLLrnEn2WWWUribwNj87333tvwuEsBT2baoPMaGGSIEFM9mD2/9dZbxpQSR0VbbbVVWeZuSWC+GwgQxqELXq0DQdh4WcUcC7MmjqrCXBmzTkwt+W3O5A4UhPANpfHCERkmPGnxynuWe0G7N/cxEZ1//vnDO3+CSRbevfHcznMcGYKptX02GNBMHIk38cScnOdwOrfGGmuY3yvyO/POO68XCIHGORDv4hnehWnrJptsYkykzjzzTHN0WRp4Hec9/E483+KU82xRyIsLLrjAmE8GyssUcw6rC3WY+jBixAiTTkwgAyHamINax0ocT4YHVkzUqYN4wsbLOGehNzI/cHbImbjnnHOOaXcc2UO5ENjqgWMw2jXXmGY3Im5u285rv1m47ykSSB/tCFNejjIqUha0czwtY/bKMU62v+JzTFwxbeQ4sSzzXL4XCKzeeuutZ048oC7YPmL99df3BgwY4A0dOtSYJNJ+ksBsGPNjHBraNkv/YJ0muXnBe/hr00YdxZkcn+X1426fsMsuu6Q+9/rrrxtTfZ6L9x1uXxePiwtnNmOaz33GA+vAMY7bh+M93PapLvTR1KP+/fub58hn+lCuKXccXV566aXGCVnasV1sH7HxxpSdv2npL5rGIlDmOOyjntl34Rnfxh9nXXgvxxw5UCa8Xr16eTPPPHP47Za4dSEtHRy7R92hT6CvsuMNz+IJmvp62WWXmWcCZTb8VvPA8ZuMlbQJjgsl2Lj369fPbHGjzOmraZuUF+Mm+eZ6gm9t8ODes2dPM+YTTwJpw/kr23NwAEl/47YVtr1QVjYNtn2TPtq37ROSKPosdY4tCMgwc845p+kTkEPo83DARjubOHFiVM/icWpN6C84hYU00q/06dPHbOth+xWB/KWesKWPftc9AaNRuHEk/3beeeemyLvW5i9Bp8qMhBBCiDJhkuDoo482gt3ll18+RQ8qCDMoIgioCDMoAS7sM0PYQeB39y02EuKIoMQgb8G/AGe4Ei88bqPUCSGEEEK0FlLAhRCiAu68806zuoayiTM5LByEEEIIIYTIQgq4EEKUyahRo4wZHavBeGru0KFDeEcIIYQQQoh0dAyZEEJkgFkze/bvu+8+sw/ytttuM8o3R7zccsstJebOQgghhBBCZKEVcCGEyGDMmDFely5djHMpnLOwz5mV7+uvv96c4y5nIkIIIYQQoihaARdCiAyeeeYZs/KNV1aUb7yK4mlbyrcQQgghhCgXrYALIUQGw4cP96666ipzpMtaa63l9e3b1xxVIoQQQgghRLlIARdCCCGEEEIIIRqATNCFEEIIIYQQQogGIAVcCCGEEEIIIYRoAFLAhRBCCCGEEEKIBiAFXAghhBBCCCGEaABSwIUQQgghhBBCiAYgBVwIIYQQQgghhGgAUsCFEEIIIYQQQogGIAVcCCGEEEIIIYRoAFLAhRBCCCGEEEKIBiAFXAghhBBCCCGEaABSwIUQQgghhBBCiAYgBVwIIYQQQgghhGgAUsCFEEIIIYQQQogGIAVcCCGEEEIIIYRoAFLAhRBCCCGEEEKIBiAFXAghhBBCCCGEaABSwIUQQgghhBBCiAYgBVwIIYQQQgghhGgAUsCFEEIIIYQQQogGIAVcCCGEEEIIIYRoAFLAhRBCCCGEEEKIBiAFXAghhBBCCCGEaABSwIUQQgghhBBCiAYgBVwIIYQQQgghhGgAUsCFEEIIIYQQQogGIAVcCCGEEEIIIYRoAFLAhRBCCCGEEEKIBiAFXAghhBBCCCGEaABSwIUQQgghhBBCiAYgBVwIIYQQQgghhGgAUsCFEEIIIYQQQogGIAVcCCGEEEIIIYRoAFLAhRBCCCGEEEKIBiAFXAghhBBCCCGEaABSwIUQQgghhBBCiAYgBVwIIYQQQgghhGgAUsCFEEIIIYQQQogGIAVcCCGEEEIIIYRoAFLAhRBCCCGEEEKIBiAFXAghhBBCCCGEaABSwIUQQgghhBBCiAYgBVwIIYQQQgghhGgAUsCFEEIIIYQQQogG8Bc/ILwWUynvvvuuN3HiRG/BBRf02rdvH34qpka+++4777XXXvNmnHFGb+WVVw4/FV999ZU3btw4b5ZZZvFWWGGF8FPRbHzwwQfehx9+aK5nn312b/HFF/dmnXVW8/+UiG2voDZbH/7v//7PGz16tIeotMoqq3gzzDBDeEcIIYSoDCngwnvxxRe9rl27egsssIA3ZswYb9555w3vTF1ce+213rBhw4yglQeK2Hzzzed17tzZ23TTTb0OHTqEd9o2W2yxhXf33Xd7AwcO9I455hjvL3/5S3inlMcee8y77bbbvLfeesv77bffTF6sv/763tZbb+3NOeec4VPNxY8//ujdcccd3lNPPeW99957Jt5zzDGH16lTJ2+rrbYybSANvvuPf/zD+/TTT72RI0d666yzTnhHFIF822WXXUzbWnHFFb3TTjsttW6Vy4gRI7yrrrrKu//++73vv/8+/PRPVlttNW/LLbf0+vfv37R1s1Jse4WsNltN3W82Tj/9dO+hhx7yDjnkEG+DDTYoXI/ef/9978Ybb/ReeuklM6H217/+1evYsaPXo0cP056z3kP9ueuuu7yTTjrJO+KII2pWd4UQQkyloIAL0bt3bz8QKvxtt93W/+OPP8JPpy4CAdbkAc2i3LDddtv5gZIRvqltMmzYMJP+hRZayA8E9vDTUj777DN/vfXWS82nueee2w8U86arQxdddJE/zzzzJMbZhnXXXdcPlJPwGy254oorTLrbt2/vf/fdd+GnogiB8uNPM800Jp/XX3/9mtSPMWPG+N26dWtRjmmBunnBBRdMMf2b216z2mwt6n6z8Oijj/rTTz+9iTPpL1KWv/76qx8o69H3kkLXrl39cePGhd9oyfjx4/0ZZpjBn2666fxAgQ8/FUIIISpDCrgwvPPOO/4ss8xihJERI0ZMlUp4NQo4Yemll/Y///zz8G1tiy+//NJfYIEFTDquuuqqxPLnmc6dO0fpRaHp2bOnv8suu/gdOnSIPkdIbSYl/Igjjigp10UXXdTffvvt/T59+vjrrLOOia+9hyLz9ttvh98sBUHepv/II4+cKttIpdRaAb/11lv92WefPSo3QpcuXfyDDz7YTJRcc801/qmnnupvscUW/swzz1zy3I477uj/8ssv4ZvaJvH2mtZma1X3mwGU4IUXXjiKb1EFfKeddirJg+WXX96kf5tttimpQ3np33PPPc17Vl99df/3338PPxVCCCHKRwq4iEB4RcBYYokl/EmTJoWfTj24Cviuu+6aKdz98MMP/ssvv+wPGDCgRLjL+16zYtORVfa9evWK0rrlllv633zzTXhnsnJ61llnRfdRzidOnBjebT3uu+++KE4oGxdffHEL5YvJJ4RqW4ZZAvbdd99t3se73nrrrfBTkUctFXB3FZRAnX388cfDuy3BasNa+NjvoIS3xXZqibfXpDZb67rfmmDt4CrfhCIK+PDhw6M8mG222Uz7db/DREb37t2jd2aln3o066yzmufSJjyEEEKIIkgBFxGYIGJmh4BxzjnnTHUCRjkKuIv7PQTdDz74ILzTNkAIt+U+dOjQxHS/8sorkQKF0J9mgu3mxYEHHtjqdYhVPuJCQAFJi8+3337rL7LIItGzjzzySOqzSy21lHmGSYjWTl9boVYKOOXUrl27qJzWXHNN//vvvw/vZjNkyJCobhLS6nqzk9Rek9JRj7rfGlx55ZUtrB0IRRRwV7m+7LLLEp9nMtVN/1NPPRXeaUn//v1NHcoy+RdCCCHy0DFkImKxxRbzNt98c+NgZvDgwd6vv/4a3hFZHHrood4888xjrnFudN999xlnU20FHGLh6Xfuuef2/v3vfyc6GAoE+ChNBx10kDfbbLOZ6zjkxfzzz2+ur776au/nn382163Bl19+6T3xxBPmGidxvXv3TnWehEOqvfbaK7p/5513mr9J2OdwajV+/PjwU9EIBg0aZJxpASc23Hvvval1Mc4+++zj7b///lEZH3nkkV6gfJrrtkRSe43X63rV/UbC6Rw4uOzbt2/kXC9QfM3fIpBHOJ0D6kha34aX/B133DG6R76l9d8DBgwwz33yySfGaWdb6ueFEEI0D1LApzAQWhA6CC+88IIRxMph1113NX85zgdBTAJGPjPNNJO35pprRgIcnsHbCngDvu6660w548F85plnDu+U4k4q8FySIAvkBd7Quf/11197Tz/9dKvVobFjx0a/jSfsvOODeMYyYcKE8KolO+20kzf99NOb63PPPbch6fvf//4XtetXX301/DSZvGf/+9//Rvdd+B7P2+/xf7nQ3zz33HPmHeX2PXngyfvyyy+P8vvss88urHxbTjzxRG/hhRc219TPK664otXqZyUUba/1qvuNgtM4OHXA9jvTTTedmRTeY489UvueOBytaWESwrbZJPAGb8mq95x60aVLF3N9/vnnt6m6I4QQonmQAj4F8Oijj3rbbrutWcngOCyUQQJnlnKk2FJLLWUUhSIr2ihPVqhj1VMUg9UoC4pCubhKUSWhUoYNGxatUvfs2dP8jfPxxx+bCRlAALWr/WmsscYa4dXk48pai/XWW8/76aefzIrpGWeckSu4u+XGEUVpkP61117bvA9l6Icffgjv1I8vvvjCW2uttUy7PvDAAzMF/7xnWUHt3r27uf/HH3+Y1bzddtvN+9vf/uYtt9xy5nP+YsmAwkP558HRbOuuu67pb1DmeAfX66yzjvfss8+GT1UHq90ooLDkkkt6m222WWFlzMJqZ79+/aLvXX/99RUpUc3cXqFedb9REHesiYBj6ziHm7pcTnkvuuiiZkIQyIesftmdNLXfScPWu9dff9178sknw0+FEEKIMgiED9FGwfFV3LlQVgiE4kLefzfffPPonW1tP3M1VLoHHAKFJ8rnQYMGlb2Hsm/fvoXLMSlU6jjJHuMUCJ2pexoDJTqKW48ePXLT9vDDD0fP4yW93LxoLQLFLIp3npfzQImNnsXRU73TWM4e6rxn3br25ptvtnBuFQ/sd50wYUL47ZbEPW3HA34RBg8eHD1T6R5w15v1/vvvX3Gejx07NsofAs61yqWZ22sllFP3G8GoUaNMvWSPuztmuX10kT3ggbIcPX/66acnPh/fA//CCy+Ed5IZPXp0VH923333Vs8rIYQQbQ+tgLdhAoHCrIgE5WhWYDGvfP75581s/zvvvOPdf//9Xq9evaJVg0Co8S699NLcFR9WryysbOU9P7WD2b+7yrfqqquGV81NoHhE8e7atWuqOetHH30UXk025cyDlU9b5z7//HPzt9lhhd+a9kKPHj0yV9tYYbT3MZNtq7DHlhVuVrxZKaWPoN9gr7Q12WWFPG3VHcuaU0891dzDTHjfffeN+iD6DvIxUDaNb4Bq+xHM4u07XCuLcll22WVLTNdffPHFquPWCIq213Ipt+43guWXX96Ywvfv3z/XfD6Lk046Kcon9vwz/rmWYPTd//rXv6I+buedd/ZWWmklc50GcbP158EHH2wTdUcIIURz8Zdg8NDo0QbBnG6BBRYwpnoIvgi9mOolccopp3hHH320ERT++c9/GgE7S8B65JFHvA022MA8j0CCM63WFsgawfHHH28C6WYvPPtD89KNSSyO65555hnzP1sAME2cccYZzf9Fueuuu7yXXnop/K98jjvuuLLLiN/ccsstTXpRuNhTm/QOJnoOP/xw89yxxx7rDRw4MPO3EOgXX3xxY95MfmCuO800zTvXh7MmzErtZBOm1A8//HBmGtknijkzacTUFWWhnml085RtIsQ1LX55z2JufuWVV5q0wt57723KPq7o3HbbbWZri32OPdNzzTWXuQYmV3CERh8EN998s7fNNtu0iJdbfyAv/mnQpqzyhG+B1Vdf3VxXAgo874AhQ4aYPCgnPs3cXsuhkrrfmrh9NJPPaY7VXNgGQ3/OpBAwWY2SjQM+/KRY2G5xzjnnFJrYYAuKdXKH+XrHjh3NtRBCCFGIYCATbRDMfO1ZuDvssEOmGdxHH30UmcwFClGu+SPnN9vnV1hhhaY8F7YeuOaNm2yyif/kk08aU8ikgPnjnnvu6c8zzzzmeRsCJaTNmCQecsghUXqzjily8yVQwHPT55pAF6lvrQ3Hpdn0zTbbbMYsuwjLLbec+Q6hEjPmcsgzK3fJe9Y1n1500UUzz/xfccUVozQGCkf46WQw6bXvyduy4R6JlRf/JDATtmkiZJnEF2HDDTcsq043A0XbazlUWvdbi3JN0C233367P//885vvJYVevXr533zzTfh0PnvttVcUD97dFuqPEEKI5kEm6G0UTGBZDWJW/6yzzspcBbBef4vCyjqr6vDaa6+Zv1MbmBVbR1VJYZdddvGGDh0aOYUCrAySVgCbFdfbMV6A20q8awmm0ax6BX2hqfNYe+Dgqwi0K5tnbPloi2y11VaZJr5Y1dg0YnVDPlnuueee6P8879R77rlnVfXru+++C6+mXmrdXqup+20FrDRYraaeY8JPOnEM2KdPH9NX2y01w4cPN9Y6d999d0kdT2ORRRYJr6beMVIIIUTlSAFv42D+mnY2KqZxt9xyi9lHV0SocOFMcMAT7aeffmquRTLs+UYZOeGEE6oWihsJwqmtF0X2dk9JYHrLeeZnnnlmlAccc4SJb9EyXHDBBcOryfvky21jzcDSSy8dXuUTP1aMvdMWezRTGkxaVdM26OdcrNl7Lcg6nqqZqFV7rUXdbwuwTYQtV9ZUHO/848aNM6eGsL2IsfG9994zPgyoA2yx4Gg3TPDz2rIdH8H1kSGEEEIUQQr4FABOlHAugwMk9iPjZAiBYokllvC2224775JLLqlKOShyfNmUBit/7Hdmr2ZSuOCCC8xeeiYncIyEM6tqhNfWONbIPSd3lllmCa9akncsT1uDldwddtihZPXv2muv9QYMGFBxGU6aNCm8altUWrbUe3teMiuHeUpsuVY4SbhH/VF3q+nT3AkT4l8uzdxes6hH3W9WLrvsMu+VV14x10w0PfDAAy3Kmvp/2GGHeeedd55JPxPO++yzT1lj3i+//BJeCSGEEAUJBmHRRmFfZP/+/aO94EmBfX1bbbVVtF+t6J7cTp06Re+odr9lW8HdX1juMWTV0hrHGhUt40BAj+JGfcvLF/eYp0r2+9YT9mp37do1Sjft47bbbqsojm6ZlbMftRLqtQc8L95pz7q/UW6fUmmdWHfddc33CWeccUZF74AffvihZD/5iy++GN4pTjO31zRqWfdbi3L2gNsj2wi33nprbjpdfwePPPJI5vNun9josUIIIUTbRyvgbRRWnwJB1rv44ouNSSGwQoRH2wMOOMCs0L788stmjzLejANhwTwjRLm4+x2/+eab8CqdL774IlpdbCbTdlYt8X7MiQHA1g1WxdgfOiW1D1bx6o27b7zo71V7JJ1rxo7X7kp57rnnovoZKKHeMsssY66nZKaWuu/iejjHFD0vnZz8YZ+hjgghhBD1Qgp4GwUTQnsMjhWm2KOJExmOp+FYnRVWWMGYhlbrwKiac1hFMbbYYotMk/e8UIkQ7e5hztpTi4Ji348gb5WXNDiGzYKzqGZg1KhR3iqrrGK2awAmqU8++WRVR1m5/PWvfw2vWh/XVLle4KgR5RVwBGnN0dPA9PmHH34I/6sMttPYeshRiXl7b21Zx2G7joV2V0n/1sztNU69636z4k4MFdlq4Zr159Vnl3KPnBRCCCFkgt5GWWmllYz5G+Hqq6/ONIEbPXp02eai9vlAcKnIXLIt0pom6K0Bx9fZ9I4cOTIzvdb8dbrppvO/++678NNkdtppp+i9Dz74YKvn45gxY/w55pjDxIew5ppr+l988UV4t3Lco6yee+658NP64Jp8d+7cObNNXnjhhVG86mWCDm7680x2H3300cw4FYXv2vfsvPPOqe955513TH4RxxEjRkTPvfDCC36gcJvvEx577DHzeVugnPZqqVfdby3KMUEPFOoo3Xl9Fhx++OHRuwcNGpT5bjceec8KIYQQcbQC3kZxV5Pwwh0IA+F/LcHJTlDW5rqIuegHH3wQXk1e/RRTJu3atQuvPG/8+PHhVTKBImPqGPXnjjvuSF0FZ+UIawzus0LarVu3ilb7agVbMNiWYa1AMGPmiLm//e1v5v9qwIOyzYd6r/S7Dsg48ixrhe6mm25KLZ9agvmyBS/aWZx//vnhVXW4Jw1cc8015viopLTi4ZrPMVXfeOONvR49eph86927d+Rgi8/XWmstc90WKKe9Qj3rfluAVX/Lvffem9smHn/88egZxtQsNEYKIYSoBingbRRr/glZwsXNN99sPLza+5iL5vHmm29Gzy+//PKtqkCJ+oFAbqHMs9h9992jenD88cenmhOffvrp0dnou+66qzfzzDOb63JxvUy/+uqr4afl069fv8j0Fs/2tBW37VQKJtX27G/OTp5jjjnMdb2YddZZI0Ef5Zt8TmrzKKgoEo2A8rXezTmGb8iQIYlxwh/F7bffntpHlQMTOmyvsXWROCT9Lv4xOJt8nnnmMf8Tv6WWWiraHoFvAkzR21LfVk57hXrV/TRq1WZrRc+ePaPyPfroozO3QFx//fXmNAtgS1fexCHHmdk6x1avtlSPhBBCtD5SwNso2267bTToc4wK+77tnkiUg8cee8zbZpttvO23394IChw3UxT2DFoQZMWUCQK9rUOuY6okEODtOcHvvvuuOXbts88+C+9OPluYVVCUc96DoH/kkUdWLJiedtppXvfu3U0cDzzwwMy4pfHMM8+UrNajgBHHgQMH5gZWV7N+kzOw7X3i2QgBfMcdd4x+B0W7V69exucDCg9HDa688spmf/G8885bsmJeL9hXO3To0ChO++23nzlHmf3FrBDSj+y2227meMRKyi8NytDuB8cig99dZ511jLNJq2RxLjkOKm+99dZoksC1/rnhhhtqcjRaIymnvdaz7qdRizZbS5g0ZAIZ6LNwsub6pwD6LeowlhE2vuRTll8AJsCsgzcm39paPRJCCNEEBIOOaIP8/PPPfiDsIDFkhkAQN3vEA+Up2rP22muvhW9JJhBmzXPs9/3888/DT6d8AuEzyqOp5WgZW9aEr7/+Ovw0GY4xateuXfQ8/gEChcvfZZddjG8B+zn1ptrjjdy9x5XuGSZe9h3lhrzfPOaYY6J333nnnQ2pK0XaPO39iSee8Dt27Gj+T0pHrfaAW6644orMoxAJ2267bdXl6fLrr7/6AwYMSCzfxRZbzNRH6mf8ng2rrLKKP27cuPBtbYei7bWedT+NWrTZPNw+Oq/uwvjx4/1AQS5J32qrreb36dPH33777f1FF1205N7BBx+c+07Xn8EBBxxQl3QKIYSYstEKeBuF1Sf282FaN//884ef/kkgWHiHHHKI98Ybb3iBMFbi8RZzzKDsw/9KwXz46aefNtcbbbTRVLNfcGrFNdMcMWJE5qoVZrustmKeCawEseoYCMKROTYrr+xBtqvlrcmYMWPqtgpn84r0BspGQ9JKm2d//aBBg7xAyQw/nQz3WBXmZIRGrchbAmXG5DWr35y64EI/xIriddddV9M48TvsK8fcntVvF7bZxPfJY1Z88sknm76QeIwePdpYdWBJ8PPPP4dPNT9F22s9635bYoklljBtYpNNNonyDVPzK6+80rvxxhujvdy0Y3ylnHHGGbn1FKsTyw477FDTei2EEGLq4C/BIK1Regrgrbfeis7ZxVlP3CwORzyvvfaauZ599tm9ZZdd1lzHueqqq7y+ffsa4e3OO+/0Nt9886lGwEAY+/DDD801ZrwIb1M61AvqCsca4VQLk90i5c0WB5Rv6h2mvSjnKKIoYXPOOWf4VOWwn5TzxBGcu3bt6j344INl10PMRH/55Zfwv/LIaiOYs+J07Y8//jCmtmeddVartBHb5jk+qWPHjmafuMWmPSkdNm+BdGSd1V7Os8D2F/bH8ts86zqnY/IGsvK2UognE4uvvPKK98knn5jP2P+9+OKLm4lEzKLt5AAm1pSb9VWAAs+xZm2hnyvaXutV97OoRZvNw+2ji9RHF/al44uASWnKnm1ZjJVrr722cdJX1F8FdQoHjJyrzkTONNNoHUMIIUR5SAEXJeDt+uGHHzbCzdixY3XG6VTAPvvs41100UXmLGtWD5l8aAZQNliZwpkW8WsWBenEE080e62nnXZa4wwL5Ve0LVDAsCSgXl144YXRynhboFnbKzRrm60V+DVAYWfyjcnqtlRvhBBCNA+auhURrGCwEsScDA60shzRiCmHgw8+2KwOYrKLOXmzzMnhwZ+4sILZLOC06YorrjDx+ve//+116NAhvCPaEqyOn3nmmWa13DXrbgsktVe12caAwzbSh3WUzM+FEEJUihRwEYEprYSLqY/27dubfbyUN6tW9pzk1gTzdhQNPBdjatssdRGTX1YdMV896qij1EbaOBwfx/75tkRSe1WbrT+0e3u+vCaohRBCVIMUcGFgJQhHSQgXnDEs4WLqAmdUrArivIojmqgHrQkryzgR5CilZhHkWf22k1QcfaXVb9FaxNur2mz9Oeecc8xEB/vbNUEthBCiGrQHXBg4rxfPsJzvfNddd0m4mAq59NJLvf79+xsnQ+z/x7mX+BOcd3Fe8N///nfjZXquueYK7wjReNz2Cmqz9QPHi0svvbT3+++/e0888UTJqSJCCCFEuWgFXBjBjSNYcOaDUCfle+oEx0kbb7yxN2HCBOOYSnNzf8J+22OPPdbkyeWXX14TT+9CVIPbXtVm6wvbTVj9xvR8tdVWCz8VQgghKkMr4MLM7k+cONFbcMEFzf5CMfVij6tjJW2FFVYIPxV4zeZ4LeWLaCZsewXVzfrA1hOOG0NUWmWVVbQ9SwghRNVIARdCCCGEEEIIIeqO5/0/vvyxP9Wmq8wAAAAASUVORK5CYII=)
Kann mir jemand helfen? Danke
Kann mir jemand mit dieser Aufgabe helfen? Ich nehme an man muss eine Funktion aufstellen, aber ich weiss nicht wie man diese ausrechnen kann:
I) 2=ab^0
II) 2=ab^18
Kann mir jemand helfen? Danke
Diese Frage melden
gefragt
cosima2007
Punkte: 34
Punkte: 34