Module 1
What is the Hardy-Weinberg equation and genotypic frequencies?
p2+2pq+q2=1
p2=AA
2pq=Aa
q2=aa
What does Hamilton's Rule show? Write the equation and define all the variables.
Hamilton's Rule shows if altruism can occur via natural selection. rB>C
r=relatedness coefficient
B= benefit, number of extra offspring beneficiary produces
C= cost, number of fewer offspring altruist produces
Write the composition (elements) of each of the four macromolecules.
Lipids: C and H
Carbohydrates: C, H, and O
Proteins: C, H, O, N, and S
Nucleic Acids: C, H, O, N, and P
Describe Mendel's principles of segregation and independent assortment.
Segregation- each gamete carries only one allele for each trait since the parent's 2 alleles are segregated into different gametes
Independent assortment- Alleles for different traits are segregated into gametes independently of each other unless they are linked
Name the technology that allows researchers to add, delete, or replace bits of DNA in a cell.
CRISPR-Cas9
Name the five criteria for life.
Graph each type of survivorship curve and give an example of an organism that fits into each type.
Type I- humans
Type II- birds, backyard animals
Type III- trees
Draw a graph of an exergonic reaction with and without a catalyst. Label the axes, DeltaG, and activation energy.
<img class="fr-fic fr-dib" 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CInOsiY6Qut9RWDbKJGy/TWnp2bW/myGh3nyYDqvhRGJvRDNwfgzdIZ6U0CRsdMIfqoX/gowyRUDN5pOeNcdCY6JOqtWHYrEIpCORY3bBl7+c1PMU0yRNtbi3pVhU/Rl+r36WF/ss6G3nCKvfPAGXbZiYeoA/MTg2l76Y25jouaLj5OUZxfb6G65aJVHTJo1qiOHNFOoLEJ0xfZsoI1Ti/mFxJZm2y+d03VoWj1puEelebl1goX0RgciC+VdalGhgO5hGnWnHAu8AgaJ9X+kL2sUrkyHgkgDZ8WFK01q1a2wteus/cf/Ku1PXhPlSeyFF+SNUR7VEa95I9gffIrpei4QnkZSNWLjJCMr9PpP9l98CA6oYuZDKYtMfu+7ky6cGVVF9Gg48/L2GOvv68MGrxI9g133VFR1i6uW8PfnO3pTFvmiwcM6IjJc0QrbZ6zLhosgIclA4Yb4X26tBxre/tu2CU2rO/JEC/ZsVwQplPD9KcQqZxHbXpeSrKgnXjmHxEPbMOMtxPw3OSPhSM4MGZbkKs/QQ/keXPp0tasXnVruPN2LofxMxbYNytXyecxVEOqpazG9uU1OKmqOs263TS0CDf5XTnEU5jaZZ26lD3x2nvWZ/AbGoi9Yfka9CBb+ItbiGLgoB1wbMPf+FRPnTvrcMgecv41/HropDnOX5gizrOClRljup2cNbbd2m45/0jng7bwtmSApXPHI/ayb4dfYa/f+RdrBS76vfKxBgwdqbTkKd6hd9qcrxSBD7Vd5EjPvHW4jZ86zyqWK+Vt9P4D3exiyYy+AZ/IGAgDDg1iJ6sPqS2Qw0UdDnSaobcUssiV9nZi4Nxg5+2VLy3Zfm4rvv/BaQUn7eXrttCXwO8OyXuqGxiYksJshg0KmLO0zf1ytU/fctw4YKxd/8RE6xWNsMe/P9cNajBmweA2bVDbLjpuH+88TD8BLRQtXHR8Y2HF0WR9I0S8jkibzvuiwA3M9YOEX0ffgROtz6BJdv2QSXLKGuUqE51rnff3UJNHajowVKTghO959k2fgqVzHtu4tvKUsrEzP1enJOrLWlsZoww/EZgqdHwYdDf+YWjuBswHDdH03diZDAhY0zM7tsmuHk1hkJi09fhEeOjw7eQoZL6djmlzl0BkCDJkFBctLbBHrmK92Wzu1yvtzuemKF2DC+HFUCAFd0aizx2BysAmjgYY9wH8h7Q2h+zueZj6y4gCpwH6dLjR9FvJSvy6wyMU0z3RI47p1+R39/PvSN6Sn+7d+ZFdrYZ4IID2HfTqB3b94AnWe/BYtdl4u2HAG3bDoDd93Tw/w5ogP4CsQYUKfbviR3tRRp+BzcUdDhI9OIQ9sab2wqTZtmKlBmxFkLaJ05muzCqyrGUVK5RVfTKs4i0ffiPZp1nHkyN1XgSMu6CftmOdj/bkUcpKu1FGRmHTThhg5UmXGPIw7cVsgtc7bbHrA23RprF0RBcMrJRbbS18PrBM2XGNd3V9RYbT534T2gW90aBswdJV9pAiaZCwIe+e597y8jjE4BhVTsAAiqnVjLc1zlQ8iomwUUjZ8ESco/6RkyKh/wNemw6XvoSCjDoe3sDbY9GXy306nOg2q3wTps1xWmnjSzrs5+vFrIwb67jKT53Mr6ZTpX3pAmdMjbl0oW8IQtauN+oDDHJ3PaWf7XfewzaQvQjf/6jItqY9ckV7++SJC+3hy9oo6lQEjFzVPq7Hot911PuTBiDTsAFB3u2a7OE0Iw8fL0tuDPhgte1BeyifOFS5D+Z8p7TSPshLZaFVcobuBH53oGsnsAEB5aYDp4l03HpkbdFXy8OIepCc6WA5OjnUGwa9Icc6zsZPlwNR50tn6JjqtI4ga3V3ZdQZcDKxybSx2wh2PRJZqNNh4MKGBRmhbwqEE8cdnCkGurcMNtNsRLx0UDptmo4lRKDqO3C8lW7V2/IPvcFKHXqT5R16s132j1HCaT6Kvve8w0UKa1iY1TDN6p1dI3B28wLTP1tqh10+wA69ZIi1vmywtbx8kLW6bIgNeuX94EjU4eGHqDUvinpJZ7oOp4vDwVnl8jFoYco8JUdOfSkGGpHBqLljBbvY13vzXXbLVhYYNtSNGdXoLxGXiI2MKoOOSJyR4fY0HRj8tCLdUqLLjbUD9GD+5RwlJx8ciLLgsmFjrV/9mvwuRX4qVbHslnb7eYc6Lowfm1coA/7BMu69GfCordCJPjhY6QL3DJbC1LOchgzziClhYw1tfKwGBIyKj2kip6p7eHn8VeRMtBuiEhyOGkhGHR0MDpGfeixEX1QWdhmskC2f9pFccAoaIumv6KRxxCOSWqdU350qQ087MFCkvXwghZz1L0t+ngXxOgT9Z4MdSaLLSyFndDVk8shfdbuzFg54gaPaO1QuWte/XgPQglUrpQ9s8mJmAbrBQbSsiOy2rrZ2VA/74fXrvAbWKj0iwxMJUqxt+kXWPlv6g82c+6VustauqeQnaLjzDlapbNh1y3o7OHGsU+d+7byBpd4u2+tpqDslPANe/8AOvfQJa3XFY3aY9P3Qy/5prS990qZ++oXnQVYuSQkaHS6txl+ggSAO8YLj97c5Q863cXeeZqcfXs8qlyujtpHe44BpGGSBXJCpbAL0sMSDaKE7UESTRfQw2GADkvikXzE4DzmQ0hodGVsrvN5Eus4wcEzgd4dEqhsYMGR0jlx6Sxm40B2qb1fOrunczHp2bmo9OjXR0dTXTq/r0tTXV92BqGBGzgoEy1attsv7s4mE0moyRRasCS744ltZxFJuJMFcKKvlzkL/a21b3q4Vvp6dmgu/ji4tfJMKdTSPprkCPv0RfQD3GDNcBCP00HHTbtQ+G3yJVd9hG8/ndloHhtLXZWQoMFzwuvz7dRpJL9LgYIGN05mp6vHTFvo6UY6oh+q8dmHJlXYDAM1s6ML4+ohfz4g0gmEmqgnRjz/WPcY3lSpl13Vu6UZwxeof/bUeBhfOkvLmy8AQ3fmsrsp4fUJA1BU7TownJi/clPKoj9TwV6ZQcsHh+gCECIxIQ+khGsbJhpy/JD/gwg772twh51mNHSp5NMsubRw4QK7TDq9vvTs3sevUTuhEL7XTteKtZ+dDnFY3lspHdNHv2Xe5soa1t7fp876wMVMX2ox5n1uDWttRqw0YNUt8wCNyis2/SIRMP0sGeu4DGh5kxAc0oaNKZ8MbPPgUrBiiTSESTcAtoHsYepchZZSXndR4cK7JzKsrvoNZbRjamwPXEjagUQpaVbn+4kCD7GiNUJ/+iODQPlnrJd1lUFewujC0M06EfF638OjAYRMFUj6P3cDCnVGEiBycTwG1hSnPrI1840NvV5wXa/QeEYpmIj9g2Buz/Z6y0Ag9VIkj9Y1DjNBUfsYnX/kOeXR+7LR5upa+62i4K9PWtHRob7DAP/oEIjgbOfFju/e5d23+kgJPJx/5Q6QL/YFNBj3Ihwg5X/IXFToCH+gltJOGTtIOvn7MtSC0jy40MIUe19pooJGHUiTwuwMtk8AGBIxCoTo3gBlB/2vvWMl6yHhe1xln18yu6cK5sYxpc5/W9fUqHb4hQ0100QOvWcH3P1qFrbaw0Xd1tCpbbemva7D7linKeNTpkZmADsMmlOCoD/ED541DJY0NKJhIDKSrAP1MVz07HWJrxlxtP46+xuYOvMBxsV4047Ov/B1Z8mO8mter7YxQ78g3PlF9lHbufJ2PXZGjbjvNRt9xmnd/QH0dwqwZG1/8n9nwNz52I+hGXIaAPDk39qXsDRkq8hDBsPGJdakc9bjxJj1jFcuXdp5IZip93pffOC5oydgW4lCGXHSCA9rC6xgZayr+Q+Qp4znpU/2FTclQERDTjuTFoLGpaoUGNPDq08EyRkQNPsUWOWbygghc65MfbM+Y87VVKLdVkJPohz+fDYyed1WUcq0GWRy01bVdWlqvzo2lF01dLpEptPlLl6stluoqa9PmLVVENNgOYybgkifkYL/yPDNF8/yl4VUjZBE2E2VtogY2y1euDnzIMYAzdrkrC36099XGyL+U6IJM6Cq5NsQ9esWMgjHYkywC/TgqroIDyhOSrAYfzRpW1XN0AgcVomvocNz6E9xxnk2YNtfxquawBijaaCfHr2TyVS63pV2rgYYyevT+2dJlAR0OjqwQDqgc97x/DG53fCSDUw7SI1dl5f7JV8Ou3wZ1qljNnTRYzK71qL5t472cL1414h1srmkDCoZapH8qD/CMd2gzr/XQ0dOOZce7aKyxXXk9IQ9UqJxkTv9EVsDd5x1mNZVnwVcr/ZWhXTvfpwh3oE8HMyxkoMpAheGHy9WZpJ/Tb/Klv2FQDAx74zPXXR/EiS6kyjNMxzimiSMZ1a8jHiO6WX8OEA+5EvjtgN0JUHyVwAYBOgFb131zBt2EzqWDDo+DoqOFd/TCtgiiOaa/2NTAaHW8Rr9PvDrTcV1ywkE+7Xve8Qeo5XJ6tsBfrPdpSjZLpMJ6GiNwDH+4CfV5J9Q53vSQc0MhOuKOhZPMpn16io5drWold/oQRcR5x9A3odTWYZPT66zdgTtDvIz7Vzbhg7DOi9OtVCHfdzU3axR2h2LEMDDBKeWs7cF7eyfHKd01dIrzzzQg7+YyNYrx++DTLzzSBdgBy8vsPl2IsXVcGIrA0wUdDlQEWMXzXtafV1YY6yurnDPGydeleCi+ifQYrDSvv5PvnMaWj3hzti1b+YMVpvMV3SKL0CUK5ICOuHSI7X7K/dbvuckR32lbq/p9+tFp+XX5EbERufR77h3RrSdio5Dpc9EHIB+mt4m+8rkWWtUgmpnSD5EONMPTgNemRXyYNa1X01pKNk0b1vJdss0a1HF8wD3PvxXJOGfHNd7DyzIB+Pjr0y2XF3aegjOd00BJcK/y73/OQ3bAXx+1b74vdIPsa5feNgHY5MXgJD/HeQvhDIMK6GPKErnjKrPSWw0Z/JUT5EM7+VqoiIinbD1Glrzf/3Sx6zCybN5gB6sk5+lRIMSLf2YtfB1XxS7tcLDV2LaC13tF/5fBrOdqW/oR85leP86EocJancOAEb6hoVRmjXQrbOKZ/+X39t7cr7zPtD94L3dKlt5S5ddZ0wbVXC9AP/C1meI7P9rwozTBwFfVBgL0FLrx5zhZdk3P/FQDHqXxwRR6r+u26IKyfO+b7Bsw637cfjb3yQvt3QfPtE5HNPTB8vjpi+2MW1+0ym1usm63DbdFX36n3AyS0QaBiIIPnOtxTXYRxmBP7h7GfoKwwS6TZVCodNEwY7b6kPot08zNpB9sxiO/t5eoc9zxYCSB3wGK+0qwIAlsMGAql7WwMBqng2B4MMXqFrKOGM/QYeiPwQHgNHKFaVuxeq2ddcswpeRb/Z239WlcoLei2wa1me6TI7n/FVu++geVkUGRUWd6ivzpVNg8VNTpvSS4oUlnN1wq43QJmNLLkzlUGaabMGfdj9/Xam4vh6VCNz0+wRZ+udI7bC5byi488aCI5px16PWUDXpFBtsrQ6Uy/hJ968uG6B7kGDfYTMngbGftDtlD6RmbpOipQ4+nPMJkWgtzyOs2h142CNsEkdaTSFT0hynxoK7rXGZhYxSbQO46u7VS88NO18CWzhFfykf9gdYQwWCEeH+UOhZ+udxaX/GETZg+V/e0StrGTZ/nX2/6bnXGlq3+0RrsuoPLjQFPvhiJDabL6tfkt215x9l30Cib/4UMpZ75xhUZZejiLwMu8heqDl/HS61z449scYwMsHByg16eqlwp20tGfvwdnez12zuHd5vv6Gqjbj9FjmxX4UvZCI8MhVnlTzm6npXXAELDFrvi/lF2/YC3bDnRt+hd9v1K3xjVa/BE8ZenaLqUVSknwywnE1a2g7wDh9wLfGaEKcegW0T+YcOTnpFReCjXcOeqomdnXWdtwoxF1uG6pxX9rVSe8PGLYRM+tpZXDFGRIIfenVuA3Z97vbSbBh68XoMeFEoOdyoqxPGNeHOusFKhhElfQn5yxqxvsq7dZ9CbAZWe864uA4h1eVuIx0DzsEnRurRQHNNkd6VLv3zPQ54GhVvZ0Y13c35GTPpY5Kyxtk339p3IqBRfAWNT4cpV6nPCjl5MU0R7Wf/XbP7X6h/wvstOesLSiFCqP9C2DK6gI4/BVzrMPNSrs5MNuvxo++qFK+zhy4/ywejKHzL+8ZPBryhqzYRpWo9cI9vADBOvqbU9uI7zx6DkePWhz75YZqWkJ0T5zAywnyEGZsXIi0TymS7WFQMJBu8J/P6QurD7pcg4+UzhBoJgPBVdMMo/rG9ILAGxzDEsGFA6bo/TDrEeXVrbJfe/ZPcOfUftUcrG3H6yopLayssUVspmfPqV7XtO+EwdO1if73WSb0DIa3298KjTetQV4w80+LXo4dWNeL2VnamtLn+CRrdrOja1Hl1bBAei8ujBsMmz7YSez7pjY5fk89efLCzBSfGJvzNveyngVp1upbzzCnA2fs/uz13s0SvbWOXyZZWWsW9X5+zwSx+PvqYko6ls0AZeL+G6l2ePXH6MdT6ikTsZnPVhlz3h73o2a1DDRsuJuN8k+pMxwYiMn7rIcUBD+GxfHTeiW7TuozRFd/Vr2qi7OkUzA2lFBiP8nUQMf4mGcAi3abvr3Fa+JmoMUgSsYbF5h1kGzNObUxf+ovx4zeX4Xk+7fNocVNuG9znZ3VPvwezwneh14whxEkUyAIFoBHxFbtTVNlWGe99zHlNKvt15TgvrfsLBwanJ8PIOIzwPeXm6nX77C55n9B2n+LuuKUUvH8xdYq0vGWQrfmRnaDx9GfRAJOqc51Hg+w+fbpXKqI0cm+gXHexeTR9+kzLxmkZte/22U1VSLloOj4gcGbEJrq+cM1j5cEVz5YOj5d+vtpaqd8ZcpuUB2kYgXOgPdxk5mUcuO8a6HoGM5QCVergGNMyOsL9g9B1dnF6mnUvJebe8YpBHYI5GufkABfVBsesAO9UFmdd7eiSKk0E6Gup4G9BuNwyaYL10BJoCkAeVhQdoi/Vo3ahrvR3f++xzO1yDr+UrmWVQBuGl7YjXQ08TqHzt7Sr4YKf2jhX0nLVmSQhHysY2VeA746lIAC3MgPhsiveXtTZ/aYFHyDV3qCTdr+e6RG7kzK5nHD84vlu9RgO/gZItu5SRRMDpwKVoZGbh4cuPs05H7qkqS/k9g2n01ndsi6+SMkjgv4c53xRa/zd/TD5T+MeAOh7GK7oLuh/EHjqLzp6mPDghOqs6wPhpc92hAhd02MeaNayp/DI5crCMyuvvvKNdfPz+jmPkpNmKtPh2bagFg46hdrS/Akz1YRwwPWxeYQwdd1GMavtDdrO2GrljC15UJMgaqq93yZR0PWIf/2ITTj1EeThXPVbHr7BVaTcKo+Tcnr/+VH+dA6PCKzlVyqbsgwdOl2M/xL9cRGVQ7rIQjraqc+ytpwh/fckOmWC+dXJDBvCXiE7Rh4wDr7vcfu4xngeDHQPRqkf9yuslZNzA4YZKjvixq9rZI1ceZfVr76inxBPUL4HogqlrvnJ07vGNdR+mZwHk5TtghcejkV+RX7smu/k3YaF8xFtz7NnJREkYZhxSoDWsh/mlzkqL2hHAoUBvv+ff9TKU5TUmgOjKNxmJCAx0W9UFHl6ReewVotqwdtawzvb27kNnWZdDG1iFMsgSPKHuilttadd1PMTefviv/j5yLs3UKW5ZeeSAPdoiLyS5USZqDBFUgDBgdGzK48Y/yl6+XDl79+FzrEenlr6GCPhMCg+V72jpzahbT7VuRzVQ2lrXe9KLQVEo9Uve7sBV553n8h3gAKBBL4nj/RWRIrnhpKCJSFdpekZbICOcErMFlPOBIPXBipenLC1ImtrUWeR6re27azV75/7TrfPhe6g96KPOMTXrb75PwT9yRTv79MkLrPqOlb2svzfNdLQGYu4Mlc+i/RX0H2aq/NplEvLU2rGib1brdjgONSyHALQB+ZEFg+cqZba0aWpTBsY1tq2kemhVaAJX1todtJv3vTOOqOt8sl7MYAANDRoAPQlsCEg+qL/BQcZanTCM7KXU6iRu1H28GDb/eLigPP4qBD1bxsyNltoAp8A6UUqOJaytFbpjokvwWgSG3Q08U0REsaqFCIZRadgVGIxySSAV8GTqi+piPQv34IbaNLIWXU6lHDkdmlcn3Hh5acgUbp3JR2edzsae79f4xxl23qGCGwTopwxTdJzhC5y8/+hrnkL29fff24zPvrEKZUvbPrvtYOz8TcsKMAWObuI43bmoDt6l9A8hQG+gwvPgeJEDhiOuz5/qGUbER+c6u1xJjEHy9+m4woxNnLFIz/OsWT05WYwgBsw/1O4uxvFjcMHhRo76HIf+/hv5hbIYRF7xkJFX3br0KWKfmRCOtNqzUE6bNqUzUh7+MISBJ3RI16omozbmPuzADVODyCBMF0MXWIRLxrsQPtNrVI5pb0lA95T9bOl39vmS5VZjp8pWW20FUI8e+nMGTetUws2/5MN6N5wV6ayu0WuooY2dzqg9fPDBIERKFz4PiFz0JC9tKwq+t2mfLbWK5cIPNbgsXWI4D2URDyrouIRIaaWlP7zPKkcYPWcftOdT9eAtslXKT8BeqHt01afpJZogF0lEQifN86o++PK2EM+hfjbh4cSRJxu2mNqHPnGr8iHCQ7pKEY5pn36lSHyN1ZD8eL0LB+iDC9pZfT2rgV4A6kNSoWWgB7zIzb8Shu44Vt6SRkcpJ5lJftE4zvPQj4o+yk9dIjNeNgDf8lU/RrIt5bKFR+fL6w2IiNZZCIiB5zF9Cfw2KBmpJk51AwMGjq7J9n7f/i619qlBdRrcBJ/Oy1dn9B7kHQwngqnRPQZCHYaOE94FpIOovO9iDN2FEvK56szqNDryeJEtwlOyPTEEXGOccLJugGUoPCft7Rs76IrqdKqaVyu8y4pmNzwyLO4EeB8V3fA6cIqssHnFysPHAlRcz72eyMikCoWplOrAkQpnWK+Ddta7dK/iDBj0J/AV0Q8EpyMHoXrYyJOFHmh0mgIP4HVZsPbopCndS+uGwQi1qo6w5owUkAuRAiN4jAwGXDjUBjggpEKbhD4Q6PSNVLr3tkEWXkp16fgl+cGrR1vCV8SncjEAgmYHb3uZXLUvn5zEscXtRj6eucw9r5w07UclyEBnZi+IWtflqz7JyemBRm9oBjypol+MgT7opwZWsYlmcaF5cpa8VuOG3XEwBKTuEO2ikZH2uhGnnXEynksKSNtzHRzaOslaNKk9MNwMnPw9ZNoHfVYbFqa28teeIJF2ih0Y+X1wqHrzM9IPeUrk4DKXHILDimQoucEPt7S5sgiUht6pUuS0Tn/I4/XQ77z9lJe+pDR3Y6KD+h10zVQpbRZog17R5/STEMlBDj/2ep4NB69mcgeulNKSh0/tIssIPJ8A6h1oG+UJr0zFO3LpO+giOiaEwpvJ1yC0UO0VvTIETdiDVD4zKNJTHbyihX7HeyV8Q6Ta22n3gRCohFeyQY60PJKmvgR+OyTTv38gBCONQ5VBlqFihIxS+2hTOr2FDIc7WTcKobvRDcLOvwC8CuCvcmA1NHL3aSB1QnLTwde5Hcc5q4PQsx2UH0Osg7N3NZ19Fy6XGBHdh88HYoAY1YbINDgeOijTixE+4cXwBANGR4aGMHpOy6Gm5M2IIOm4GIpSmeAo/GMRCmXWuuMQ1TIgYPfdx6BVGtNj7oQJeVQvfDk9XpdwyoDgBGRP9TQ4HHcqSAp+lIeZAIy8Pxcd5PFoIaLH33uNDE6gXW7EScKAhVdJiPZ9k47Tyrg+1ATPvPsITcjH2yGCX5Wf5+IJzgz56DZqb+dVMsLsc8eIIJXewiMor5+mkv4wsAptr3ycqFM6ABCRUn8YIITnVBIGZtIhXbP73NcUpTPukJAJcnKHSS6cjNpA+pPvzlR8FLUF5lfXqltuN8hUwC/g+KyJ0tKqI97NTLO4EWeQ5fWHHeM4uQDiRQ4Xh+p86H6N6zOSpi1pRUXWagd48kGRaGYWx9PcC0Gb6EKG4PDC1McOW9EY6Sz1s1uZX96BRmZ4qAPZFPUDWyMuQl9zPCpLtItjdly0A9Wos1IWWviEo0fkysczoGT/RTL0A59lou08NQB1hDQd6BSDLd1Dvc8EqK0YJOVrsEe7E5LmxwNq2l7Pwc1H+oOu0n7qDRIJeke7gp8ZFmZO1sr5e/vpCE0A3wz3GDCFgWACvy8EzUpggwEdCyVGnzHAdMT4HqADeIfUdWz0yRPKhfLkCdEF+XjGk4CDNO5Dtwy4A0R1eX0RRHUHCEYB4+JOUimOR0cwFKE89fOMe56FvCXL6DmWQkYWU00a9pjpNsoE3mQYZHAwCPACxHg8j7gADwYrxovBDXySNxir8GGCCCK+4BuI5UA5cAAxLuouQiaIn8MnNFGG61B/qAvawAl9XpeOmKa4vYBfkx9AHsqGa/2hDn8m2UUONiQjIxk6MsmZBB0IxtmjFsFP8AhCBBfdgA+Z6iEpXl7X0BNwI6uYroAX8Pb0NsT8BkPrPjWiyw9kpCvqCnULFwMC6FE+59GL8Le4Dnknz89BPTFNjiKSi+sG9yXLCWeA0J7uTBhIOCLyBKAcODkHGalsSTz8VRmOYn6BUAbHG3bMB9SUY0Yi1A/toa64TNCPCI/yeZnoOk4HouSf1RnqCGk6hBvegqNGJtyDXxG9qg35kDpuM+DgOTiQB1AyHaA/BHmojGjC6Yaccb64nCooIccEfisUyzKRagIJJJBAAgn8JigeUCVONYEEEkgggQR+J+AVpwQSSCCBBBJI4HeAJFJNIIEEEkgggd8J4h3YCSSQQAIJJJDAb4QkUk0ggQQSSCCB3wkSp5pAAgkkkEACvxOkLrqwe46fvTp6V14a5j2s8BJ5Nl1oluPl8PAeYAIJJJBAAgkkUALkM/nK3LIfzd5ZuC58pvD8iy7Nmb98HJynv4Cc09lfZuZl6sSpJpBAAgkkkMD/gWyK77SEj6dYtvjbv3jbw/etJWcavpjin3HTOXzIPZkhTiCBBBJIIIGfg39JLJexb1ettXc+WRqc6oXdL87xaxz3ntM4fLbKI1QBn8GKPn2VQAIJJJBAAgn8FOLPRc75osDuHfmhO9W8Aw88uBeTvEfsW40s/sFnfouQ3/3Dv0Zf6UwggQQSSCCBBEoAYSc/dvBdAZHqF7Z1lUqWOu+iy3L8zNWd5xxkfBI7hzPNFVouj1+KYLNSEq0mkEACCSSQwP8FvGahfbpktd03ckaIVA86aP9ePDhmv+qKTMOvJLgb5Tcqc/x2QvGHghNIIIEEEkgggQC+Ypoz+27lD4pUv1KkWtnS/OaeP1RESlAafnmRDUspy4Rfm0oggQQSSCCBBH4G/Axf+NVE+csUv6+rwPTC7pf6omm/sw7yTPHv8gEswpa8T2DTA2YaGEkZv8lKgzO1n05ZOsvvY6bDDxf7D2WH39Hk54vD74jS/vGPaf954D/UnCn0H6mONwVAk/8gdCqiz9+n5ncj14ryfH9Wchf7hgTvULmwS57d8nk6F+o+X/8yoi+W5eYMyADjwnvu/mPgGoynozfxEvuRwOYO2KVPv1xl942Y7tO///Z9mdiAJbBpA04Gh5qTE41/MDmsk/PD4DzDQQXnJFfrP2ps/FC2Dozlnw3pkg5VDpKfsxa1xc5SvOBM3ammSvssS04WnnM2tuwbENyhSm5Z0ZjGm4iu/LQGKZLf/8pEDzJgAJOXKy1ZaFBWyOAteRUvgc0f1ucnE83fzCGr6MGn8yPHRCQKhCl+Ra04I0Wuwd/iuBRppEtLM+QqNoJxVSZfEZ9MNaoaaJcTk+PyCDbHJ0sYDBCdip9siAxT2Vw4/wHqDU1x3e7oRZNxLXkzE7C5A86UYQWSsNw66Q+DG11y/l8ZVSSQQAnIO/DAxr24OMpfqcGmbgThSQK/GyhmIHjydvW2ZQpYUaspmgotHb00pXuMI7EgV7KWclylPAr5M4EPkuBOIV2xoGVS+R5xs+cupDmpfg2jGd3kKQ8swM2GHhdAW1aVy4fKicY0hnrxKesbyW5OwMAlJQeKrmQlA9oLx5pSGyjVdS+BBDZ3+G7VWnt79lKrUqWK26QENnMoOVCKp4A5e4TFtF2Wd5KJ8uTAlJ5ViJpNy3mZIo8/HYKKZlN5VuhTqiFujX0Vd7k8BgEYcPGSRw7F4cqUVbS9oYFBiH9VRSTETtQHJf8rQEQqOecpSvWpcOka95ZjiFE65Ekggf8h+LcbleIRdkmDnMCmB2GaN0yJArRmoaKIfKZ+I9ufI2plylJ5cabk9QhVjgyj+WcDuujruwp74ilp3qdesWKFTf14se6yVqfqdlZjp208H/ymVYZ/G3wKWHIa+85s0ZixKhXLWoPd66j+sKYLrZt7/wltk++DHb9XW9A2aemTbjQmSuxHApsvxH6y5EalxKn+jwDtifOc9tFndvFNj1me2pXYVA/UxjjOtFUqv4XV36227bdXHTum9f7e9hvDuqrvLs0WWia9paJqRc9y/Gy8Gv3eTDusay/LF41Xn3uC9eh+iucLa6xhMnZD7/7FeZaue5LHps32q2vjB/aQTBmMrBONGqBs5vOfoW00iOAsaWStlHQr63vJaRcJgj8JJLBZwvqc6q+uqSZOddOGEEnQjkSfOZs993Pr8+DzNv/zr23Bkq9swRdf28LPv7H5X36jZ0tt0rsf2pMvT7ERo9+2k49uYlttwesqfx4Q+bCTtM/9z1qrrj2s+f71rJYiUudHzyuVK2tNDqhnLfff2+rsuLXSeaWFdVXWkAOODQkEYlkJuJXoar7/7tZojzpKRebsgGXAsnn3H3Zahy1hpWzs29Nt18O7+4Cn1QH1XfcS+5HA/wL8f62pJp1hc4G0HIxOubBRKceUriILnEHTA+paj/NPtp7nnWjXndvBrjnvJKu7W02ZyKxNnT3fLlFEG4/EopVMd3KFrhukhx3FvJ/ou3FRJ93jxDmTh+uAgw08cb44TaAMvobrZcJO5XAT8vCTShjux4aP9jQiH4/+dNTeaTu77vxTrPe5x1uzA/ZSScqliVM9JztTOfxadDtuHT7RHdEExDQGGpSug/uQP3qu8qS7HKLXRRy/kntfcKJdq6Nbh5ZRHugOZR18np0yQX4x76HO4teFHB/1KC9pIR/xX5y/JC/hWonFdEpOcbmQR+nRc6ZoA+4QXQPwxTXpMR2OV7R4G+sc4/Dn4PQ2JIloXHqkm4Cv0AYPnehXALjchuh5wB/SYplThrpIB3+gTc8kq0LVEbddkLfKqS6ekz+mjeeFpPs1z+MzRQLu+D4Daq51uBy9TWJZhDQ/RIfTonyxjMOMTjEPAU9Mo671wM9OYzEUyzaUi6GozRPY5GF9fjKZ/t3MAcPA5iN3qGrTse9+bK279vLNNNfKmeJQMVbuqGjzdNZqtr7QFn/xnTq/zMKM52QYhEVq8F3BGrtn8Agb986HyqpneXl2etuW1rWdnImbEOmLyn+3Yq0NGjrGnh//DuiUnrKGu9WwS7scZTV32t5tJ6+i8CGKeUu+sT73PG2Lln6tCDNtlcuXtnat9xfOI+S7MsIz1h4bOt4mvjsLdhQJ1rby5ctav7911F3aHT8bkrod11xlWitqVIV5aVuxYqX1fuB5++DjeaIhozx51nD3WnZRx2OtTrVtRFOYJh4wbLw9LlpTqmvMgBtt2OhJ1m/Qa+J3ndXeYUfrccFJVqvq1r7WnCfcYVAQO0bf62vNu/b2d2kb7lbd7v7b6UrHmErW78wW/aNt/pKvxKukqLLtWx8oWltYpfLlXIbeu+TwMqovj/eGccZyKgj8keFjbOSo92zFypWqJ2vlylWwDodKNse1dDqY6r745iH2wSdzbZ89alqPc0+wS28aZPO++Nqn7evvpbTzTrAq5cuHto0GVFM/+VQ8vmKfLVkqvGoHtX27FgdY1w7NrVyF8s4n7X3pTQPt3dnzbJ/da9tdf+tiN/R/xka/+xFuwlprQHbxKUdYucrlbebsBXbJjQPtvU/m28qCVVa9ahUNeHa0Lu2aWScNNKRdNvD5MTZ87NtWsPwHy+TlrM6O21mndq2s5YF7eDsgiwEjxtmA58e7fox/vJcNG/W23TPkBcnGrLby9zjvZLVdZfEiaajNmXae8PaHdofyLF/5o/NYp9p2du05J9rONbazjDtOOJTshfPeAS/YsDHvetulpCM1dtjOTm/f0prvt7ueK5/4nqbB5EW3DKRVrN9VnXyN3D+WIvE169qTyW2lVbM7/047B61/QzQ8OmyCLfhiacCNPFs2tjPaNbEKFSqordB2yZ7cwuNtR5/yr2QoIYFNFmI/mayp/g9BGHXz+kww1GPenm6tu12vJ2kZ4Q7uNFgDy8hQkSsnB9TqjD427u2PlV9Rw8xnlZ61zz7/2hqdcJmM5o9WqdxW1mDPOjb+neDounc6Rk6uqxu1bLqU7dPhMpv+8VzVbdZgj1o27eP5Xl/58lvZ/NcesCoVtnJjNEN5WsrBr1i1RkVTokOmhg9PCLq2O8weu/FM63n/89b3gafkLIMzA9DIMY/1tEKF4Id16+2Oose5J1mv809wAzj1w/kaOPSw5at+8LyKp5x/6MEhTxjYS4axhhxdyvrc97T1/MezbnpvvbKjXXXrQNFWXFel8lvap68/ZNuI9mAwqU642IyjnHI/VqruX5z3ZvvXtXEDejovA4aNttOvfcBxMDlateq2tvjzpbpLSybV7L3n7tbVOi8fvmoVoiTyEgV1ue4fivzGevlykheOZOX3q72eizsdbXdd2VU05Kxltx42/u3Z1my/vW3lqh81iPjMywRIK30PGz2IdeeAf8DQcXb6dY8ID1zGUuEVpTyrt1s1Gzuoj7cvYwcGCxPfniW+9vRp9uHj3lUJgZx/LlVozfdvYGMGXmPjpsywQ0+/UZhYxyaqC5uWep13vPW84C92sRxuvydeUXpKA5TKtrxgpZxg+GDH62qLQ/dlliFtvfs/qYHQMNe3O6RPF988wOvjGQBdc16737auWAaXZJfd/Kj1G/yy52m4ZzX7tmCtLfr8G8lrC5v23O1y7NvKIefs++VrrWm3a236pwuFTPzCsnNMNG/2eN8LpG9N1QZpyXKWtejmK2I2ekAva3HA3tITtYvKpOud6uWbHrCnjX20hwZS+TZw2OvW9dp/iAZRIf5q7FTFFmqgCNTds5ZNf+5WFZG2p7bUWQMnZyh8wczbOoFNGtbnVH+1VSmUHJvuUdRx48ES934pQ+rRF1dbuIHm6dRPFtt7Hy3w5w13qUlGQcrOuOY+Ge01ijS3sbmj/mFjH+9t78tgAPcOeclmfDTH6xj4/Gs20x1q2u78Wzf74LlblO9OYcjaypU/uLPBoHG06X6nHN9aa7Bbbft2yiO2dsYQ6965reMcOHy0HPtH1ufc4+31x3p5+ZQirdFyppmZT1uLA+taOiP+5FAZ+PkBa7pvf+GttuL7tVZBDvS952+y7Kx/2mejHnCjvEqO57gLbxK/ZE65Y4YW3Fl/GehXBvawbycPsLat9vN0jP/IUW9JltRBf1Cq6PAAw9PCDACxB5EIGYiKemsgQHkGHJmZ/7KFr90jOdyu/DnJZ6EirOl6LhcknLx7m/WoVQVlwOd++ZUcqiI23T9375VW8OZjVjDlcbv78s56nraBcozfKTLLULfXm7YJiuRxipkPn7FlkweL/n1cZhPe/djemDLLp0kXfPGtHP2DchDrFLXXsG8mP2y5D/9lz/a73Gclpn+yQNHpY8Inp8kgRgMs2PxAg6IFS76TQ7vH5rzygNXacWvRYeJhms1b9K2vn2bFY1ryyBMfPc4/1XKznrGe555iny3+1u4b8qKwZOy4Vo1s7mv32dxXH7Ka1bZVmtn9g15y+THFz5oE8sTd36X0MY/3se+mDFTUt5/zUrBqtY0c+474Fl9vz7R+Q14WhrTdcWVne+fZu23Bq/dZu1b7auD3g110I3wIn553v+VRmz57kfhJ2WPXn2+Fs55WGz8m51hP9eVZt2vvswWLv/a2w9WhERwMdnwaX3wxm+Cb35hFEC3+wRTl79n/eZdF945H2rqPntGgsb8GTHKkyjVDchvz1mxdMauwzutSUeVn5kc4o2nj5Nh0j/UBPTKBzRhCwzNdiZmgwcMZGDj0NWt2ei9r3fnvPiXcsnMv2+f4y+37lYqIBHde00Wj+ZwtU2Qx/p2PhCbnU49Ebyk5ZKZTMc5EbY+OmOR1denQyl4b0EfO7zrr0q65G7UGu1WXERFCGaQXRjP9lrEX5Kg+//wrN0gXdT7SqpSvqLz51vO846y3Is4e55zgygn1+HtXXzdq7KhlLS04WUxg4C0rHxCmtxd98bXX0ef8E63Rrrs63to7VFJUfrLTuFAOYpwiEneUysdqIWuC13Vvb6322dsqVSxr9/yti8sKY77giy9Vl+I88c/6WDioX9wx3aycWZ7jE3WXrzqWyRlTduonc2zukq91nbZGe9S07Ix/2ZpZz1qL/fdSZtGu4uBOp8KGMIZBK1b8oDPRcFaR0wxbtqrQI67uXY6Ws/qXO/0qFcqKdlGoA4DW3uIX31Sp3BaK2sVr1NQT35lp+fL0A54f63VB4yM3XeBT0BlFnce3PsCO1SCC/ANG4MzlWmiwNFOWJmf2gz13z2VWu2pVnzq/7oLjfE2e/Is//0K85+sG2YRYlel2hgjZ/KztXHU7e0dOZtQjveyuq7uJq5RVrriVD86AoaPfdl1iqlbFvd2gkSi3xf57iMYyGpx1EdLSSMTmL/lCzi5tw8dMVmZ4z9olXdoozQUpnWsBBfbCuPfsOzlXrgcNHwc1PlDq1r6VO0va+I6rTgn16f7RkRN9cIMusEseyNA+vG7myks7Qx/TxJI2aRqIrFDfoG2nyoHOX7BUaWrn3epYbsazlpv5nLXYbzc9V+0SGPQzeEX+TAjzregENj/4VaeK8iTHJnzQhenIbgWJa5jqA9I274vv7I13PrRxckQT5DTHvy/HqfSmMmZECS32q+85pyuyilVlwNA3fMq2Zee/WfPT+9j8z7+VhVhn78+eF+qT49l5p61t4rszrEP3W5Svj7U8oxf+2AGHBHwwe6EbF8xLjaoysBlG8jmrUq6s9TjvFLvm4hOt+QF7B7pVN4bL40G+SSzPwdQtdWGocNaYLNY1x7891bFCS73d5MRk2Atl/HAQ++weRd4qwk5V1n/TMqQ4A/DX2qGq42ANumbVnYSRaTuiNmhQ7TLsTPnyDqxHHcrnJVU/snUHh4UWMJ0IvZMUqexyRHerefjZ1u7C2xSBj3fHl0uXskye8AsNETdy8NGv0uvvUcsHIvDdb/CrtvVBnaxh+6ut29UP2Li3ZnnduC2iQlXoZWtK5tWq76DbjGXz8qyhHLiQ+bP3PlH7icawFo68zPaVLJBRnuTJmuV+yEb3wLh3PvZyRY0mPHXURv7BEKXXRjagUTo/HcC0pud01KSFSCxdSCr5t7WZioIv7vuYteoqfejc06Z+NJcSAkk0VWildGZa2UE01qy6vbc9sWOdauIry3Qxj3DeaenPYtWFIzVr3qWndLG3tejaw3re/2yUz1THZzb+rRneDgwAGjEAjPhnSnefPXYNeYVvnAYv8bu2IULHcQb6HRmHA+0kqkEjpJ3lpHlC/9nl6POs1mHnWruLbvT1YepCZxi2kT+ftWrJK/QTtj8Fh50cm+6xPgiWMoHNF3AKMhph6kpmAyeCQZBx6KRR/euP97SxA26wR64/x50F0HD3OtbsgD2kNDLyjNZVJgYMOQYql4cRzFqDPWv5ul2j3WrIeORsxJj3befDz7de9w+zuZ9/I8Mow8K7paJBaqhzFAXxnVipX54br1JyfqXcCPFhegxpKeyb7oscpxtQFFlpMta+/oulQoN1csPpRozyFJXJIr8iNKI01oyZ2uM/kJ8q7VEidYCXWoLBpDSTlSEvTsfy+P4w+OX43YmIZhei0uQEuaR+LrDD4Ljr72da73OOsxo7bqeEjC36/Dufuux6zf22b4fL/cMV0JXO0C5hA5R31NxaN8BjB15vXY9tauXL8ZH6lM2a/ZlHXK3kPLpefY/yyhtTP/IQvbV22kGUBT75VR+Xk/OkSHPFapdJMYTvFTM4CXdgCPSHjKJHzwIOpTNo0BUyWqd64R+AZ1woziFEdyFvGiFE7xPPXfKt1TzsArvk1gG+Bu97hdVGoeHAGtoVedNCcXrcDnHUiM4BKblfdJlo2HOEbP6ckltX2FK6u6e12Hcvq1JxS2EPjhKS+B4zvIHFa4v4QBHQTr+M6oGmeBbDdcuxh/xEna4f4vuuv5/uSxQ1dtpO+fNswZJv1AemWrdr7rNGJ1yuaHkl0nF+6DPQ7n3KB4uhfRLYvCDSqgQ2VwidODghn5RzTwIQfWztuzibHrCrndGhlR3bcj8l56zfkBdtwtuzZQqY4sxa+Qp8bg7jZ9a5Q3MbM7CPjX24t014vJevrY4ddL31u6qz19Gr/9Me+dSsWsmmPXuHjR54nY2R08b4YrFyOUVowsyuSAwqW32yikIwkpjtnFwDa6nBCgYL587drzCQMkxycnHEG5HlhorIqXzZsiFBD3yDCVNs4gHa2EWLAcWk1vB3WqmRrAE7BlV+KpKX6lKyf9RA9DG9SH5o57OIfqV8PmCIwAcLctburBQxXnfBqTZndH+b+9r99ugN51vnts2VJ88++GS+Bh1PCZOwpLZwGtgJDW+OQ8C05yM3n28Fbw22d5+92W7/ezdrsf+eyst05ngbNmqK5/cvNMpAj313pmRSKDrlLuTMlq340fGSh8iXPBXkoB1EN7X46zC6QJas0bqdF9RQZEkI7Z9fdIcqEF1IsbRPd+NwlVn1MQ3uTs7lE9qJcqbBBvLpN2i4rVz5vV+PGdTTxg2Q7jzeQ1Hjzo6W/HlZBkDSBYQfpTGzQNNBo2+qonEEKTlepm8rVizv98D4AdfbhMf6+Kan0eij9G3U4J6K1nezKhXIJxq9YdVmYhJaOFavLAgIJKPaO7LGqzyRLnheBi5er8pHgwzAdUPty2Q37Xbt+Sfa3FH9bc6r/WxA33OsY7umojPtG/T63P9P1xl2fyM6NA79o379cXwJbF4QtHg9EHfuBDZ1iAy1OrBPN0XRCYZClsINKmtUwJ1/72oVy23l192uu8eWFayxQj3fd9davukHazf2nZluyHG+jNj7DR5uw15/3+YrEmOdc+rsuTIgRE47WsVKWznuMYpQMCXBSa9zA9fK3ysF0vbC2Pei63xfM2vVrZel9jpJjudfUkSMWRwFBWPkBty9Kmle0I0eDuCEQw9yvuDv8aHjPRp1Yy3jN2J02L1K5Nt6/72cd45Y13Eb5OfW0YPfceWJV2igbkVnPq2p3ETwPObOccDjWkWGP9iI19+23nKc0Fm72jYajDSzATedZ032251s/sENBgEexUiOGGGML0Z90edf24ARE2zwsAmYbWu0Rw27uNOxNkaDGI8aVX7e599KFhqSOLFI12zcZHZsB4KGjnnH08iPw6DZ2x/WWAlElyl7fMQ4saMITTQw+Bg2hs1YGmjtWMVqKupCxi4DlaM9g9zBJx6F09exSSdyRzbKHwY2Qd7QhhOa9vFC90ugarjbLo7wu4LvbfrsOU6L0yhA7u6kXI68WsQ0NinBUSNZl3WOX1BiV/NejpTcY9+Zob/r3AFPnb3Q7hkw3Ma99aFKFFr9PWs6P9D1+LAw9R63+bNj3lU5cGSt6YH11MY4byoJB5E1OsvGs3sGvBhoEPDbTqyrLlu52oaOfl+OM2xKq1l1B+t8XEsbfGN33yEMbYsWf+c6kFN9sY6w9k7siywT2LQhth0lAe1ZL/hIKoHNB9T4GJOMjFexKdO1QhUMB5FJzarb2SUdj/H0hYu/tnsGj8S8KVNK6UdgD2z8ux9Z52v6+7rb9fc9bZfcMtiOv+gmOYlvlU0OgE0aKjL+3Y+tz71P2Z2DXrQTL7zFGvhHJczmL15mE6bMkoGtY8333xt3ZXcPekkO6BkbLsN+/Hm3UKGc+JbWpV1rlRG1TGdCo5zHxbcOtEd59/PLr/VE0Z2/3qES2Chpc9WdtreLOx8J1TbghfF2yc2DfV2t87UP2MDhE0Rb2i7o0taqy9GxychfZ5GuM63okZkcBM4lbEAiIg1nX09UWjZP0R1ORHXlKVIrlFCJ8Nz8MwBQ1FUgY9vt6v7OE+vK48Tv+Lc+sXseHykns4DMvmmG93CJeHjfsqi/iYm3P1lop19znx839H/Kxrz9ieO4RLxTFvpOaL2vZ6ccHbuMItvju98kx/GqDRg21i695TFvh/Jlt7TT2zdXvpR1btfKX3FifuCSmx+3Owe/LJlPsZZdr7eFbO7Sk1v//ld/nZVxA3L1OnRwST3UFzYFIRdBDmdGlB0yk/fOIcNt8PAxNvbtjxQt1ojS09b+wpvtMTm21qf3tBrVto5ka/bM6Lds+cpVqo82YBih9laDshTu7SNgItazS2Y56cOZx7XwV7Sgsds199vjz4+z58e+Y6dffZ9PNffp/6wcKd8gTtkdf++iglnx+K0dd8EtNnLUO3bdA0/bFTc/AkJrsGtN63Jcc6+v4d41Al3ir/f9z7l+X37T49bzgaes7q5E19JHCQiOV9LO192rwd9zdsL5N8kJf2gT3p7lOs96LrQd23ofBd0MQGlj2jvIkGGUK1ECmzSsz08mrbqZg0/JRdaRzRFMDRKpBUPJKBzHoYg1t0YGLOVTWR5RqPP3kVOY+hHvmJr1uuAUu6jjUZ4+eNg4jyZxGhUrlLHH+55nzQ7aQ/aulF17QQeyUJn1fuBZu+y2gdapfUu746qwg5NPI7Y+o6euc/b8PVfZIQfsrcxpx3Vc91v9tY5q1arYuIG9rHbVHYUn5xuW2GVMBMOU2l+v/YctWPCVqJf6yrHFSoyCs5Hpziu7WvdOolVM9hsyUkb8eqcZw4rDvfeK02TkJAdFPFk6hejFKRKBuHOW0yA6gS7kxDo0v4+TyssLa6CAZMVrJ/kqy4whBtydjaB6tW3t1mu6amCwlQ2ToW91Rm9r3a2nXXzbYDncHyTHY3wXKpJ3yysjzdDGnZZScZiXnHaE13295NL69N52qGR29+CX/LWgx248x2po8IChDvFzznbdYXu7sMuxduY1j/p63grVU75iGet39ZlWpmJ5DagUFYu+sQOvs2aS54qCNXbZLYOsfffbbaIisvJlhPemc6yDnABho4YqET8hsiX69GlM0epnOXaaOZ+dVnlsNkoXDWZWFfyoQcVDGlhNtYs6tbEKopnB04hx79oZ1/aXzpS35+6+NnKKaTtJ7c4XvBi4MB0N36mMSvh1CROlez7uwUdHKlQoZ+Mek46Ib94LPb3ngxq83eZ4mu+/pw299yoVCFPqx7du7DIrV3YL0fCBtb/4Nut733OKNNd53lFD+BgKPOVbeenzozeep4qZRchav0EvaKAywQb2Pd+2iZZBcI75cu6so951ZTefxeEdXt6NbtGtj12uAU3ByrXehp2PPzQYXrUzuuUOlQ6i8/oMcgKbPvzqxx8S2PQhtCmd2GzFqu/t/Y95Z8+sdvWtw1qSnjOVySYZjOVnMlILFn8pe5SyOlW3t2o7bifngTHhlYZv/DWPuUuW2z67V7PmB9aVgdvSjUZ4sT1l8+Q4x06Z4e+1tjhgN0VHu7iBnPbhXFvmH2TI+s7ibJ4iRT344KO5Nu69WbZiBUZud2t5QD0ZVzlLjLqMNjQt+/4HGzr6TVvw+VJrtn8D23fPGm5wPyDyk1erLUdWe8etbV1+vuXL8cHzvM+/9qlBou599qxje+9R02rvtLXYKuXGmQiC9xPnfP6NaOejDDXcQLpj1WBjjKJDoHb17YR/uxCp4lyFmwEKgLN64+3p7lQqSw6NdtsZSau8aF7+g4z8PEUwM1x20FBvd9Egmcbrc6T79G9GLlaOHoflzkXlF4nXaR/Ns/c0kICmFgfU9civcrkKHuWyaYodr2EDkGiZNVRt+7Hu5yhPaWuxf12rqYjcp5bVvmm1rztxAV8OGv/WLFu+apU1Ub59RVulsmXDIIuI0dbZBx/OUwT5g3hOWesD9xD/oSzTnsgdavfec5fo9R7WV81eeP0d57mu2nwftVGtnarYsoJCOdgZav851uzA+v6dZKZm5y3+xhYt+VoYs1Z399pWIH1ZsPgLNXna6u9aw7auWE75pHeS7UTRCtRUW9TcYRuXD68u8Xys+J+gqLi8nHerg/by9dowkIRy5dElMlguuse8PdOmS57Vq29r++5WI/pVIWWgc/gQJcw4sMlu+Oh3rLIcPzpec6dtbcZHC533ikpruFctyZPlk6wtX0E7zxcNTEOHr37xBbEa0hnqD++4gj8MugCxxNglgc0E/qMvKiWwaQPtieFxw6q/Ra9hKOKIbKQcBKNn5SKZ68gQYcxYDwrRro581hPjKSwKKi9+Lz84KdaZsvmFPo0W1kGxGtSLk2OfrwyWv+NHRMK6FBXi0KlHeYQzm68khYnUCb1eRh4lqyiCVxLID4QXEpj+VSGVD/f+S6oejTNljKMLXLPGF/jD8WPMnD45goAvJLrxdbUPkRnRi0erLjOyko/64D96JtpweKSz7gofvpHJeQjZgTCtTGTJ4MRrhFIvT/uw9lwoGvK9kOSg/L6uqedBnkyKKkKCSxlk36AkRC0UxfLVI6pZ9+HTRV9O4tdiUj61rIxy2s6z5JLzX/GRbOU4kReyD192gnYmJXlGlFpMgwNEi0aYdYkqnbzg5o0gZjnghAEC8b1/ocvpZwhFW0c8qO3z9YwPOPgmJOUWBuULU+7MIKA3QSfJnyviiQGWP1M67ZzngqR9oFu4hJPBoc8maHDAb/CyvMFAAbkHwbtGqax0xaebhRIBO25hB43qJD2uM7SnF1WGqE7u+RkeZfHNbJ6cb9nMOt+B7tO9euZzENAHPuVDQ/NdJsgQkvQngU0e/qMvKqHAybHpHj5dFo2U3UnIIIRNN9idQqVjHXQI3Bir42PgWBtMs6NCgBFyg7IO41fabRPvQgLZPOGWow2rTKw9Ch316Jo6MSIYaHc2qsvxiy5+GJ3oKRhX0cFuUQyaG1PKKg+GMifDJy9CVJKhTjlC8HqkJ4NXKLrA6QZW4NED+HQNvzgXOAN86hLHIACHsIg6HsjkiudAADRRNhhhaHY5QoqXCfLAecQ8hh8YkLyddl2K5pCfZNIwrJK/+CIRp0RGd0B8FcpKuxzc4UOfOwMVllVOqx1wfAAOFY7yFNXGNDBVDdk4J5wPeBANOXFu3nBKdxwsqAOOT+V0uNNUO8cyZROS8xvRRj1OL0VwFORzh4VjFA84DhwPslQe30Cm+nBd8EgEju9htoGyuHBkkJcJET+Rnn/QA0ROo5y+5OibwEQP7Rpog0nR7K8woW/cB6frumCKwlU3O7Xx4LQreDL5uhIvQuH5vR04+5ux5ILfyFm78xU+6le/gQvq9aVvdAdZ6Oz0qIhrmfjy9mXQpDK89+wgGfgwj77kPKq05IdDpXzRkgwySo5N9lgf0FUS2IwhjSOSYcPWYQjpzGwGcQcnB0nHd6uMoZDZxhBjTnCablIxrlEa72uyZgnk+eYhjKHu/YczQwSFLyDa8NG5lA6H6ht4iEDkbNxwY1SEOy/HR+TBHqIwf/1F5YjH3N3JEPGaCIMAd7IyWhg1gFKOA+evK0xccD4ec+nMOmioA0flP8Mmx06EUrIzeN7sGvxFlC4aAFBGHQd6ea4Lv/e8OFAlYfSDM4NHhhCiTU7dd9VCq8s2GGt36KIxX3mhNX6NhsgqvDpCfchHeJTVozbliZ2xlxFfOAmXq/KH3aoC5QEFrWVy0s6HR18aZAif0+9/lIyMVJY2xVHgIZhlCK1MxBgccuxgcbzMMARHoOcayXikioPBSaiNoNedp9qQiDuX3kL5hYNBl9LZyQsE5ym6REuQKzLh/d8IN4Mbv1rnLLiOUY/rrPJniQSZeBYOpRdFsbx3jAx4pqp81kTtkacb/4EA5S8UbqdXckHO+q974VZeVx3hQh4+wBN67y9okb8epJbVc9qRgsiaiBsd9Y+BsHRC20XP4Qt62cWsC6UhM2ctwgO/CWyOEDQ4gc0WMAZuqDAiTLFGHT8YSxxWsZNxR6iOT1TIWB9z5RGmDJYbWjf2GHaBRuTB0Mg84ElUkOguNsIegYBHRotILEw7ythGBgWj5FOH3KmMsMkA4Yh4rnp0xv6SFycVl3VnJXaICjC2zo/KgYsoB2OIMWPqk8jOI1CMrs7BSGJUVUb5qcsdsfOiNB0YVepkIAC4r4vysk7qhlLAPUYdZ8KUIGUybqwhQOc0ETWCga0QvfiUo3KqoMsV48raKIdHZt4doZ2hjs44XdKVz+XoTlgt444UOrJ259+72OjH+9i4x3oIZ+CNdF0oioMbOfiUonVd06K0Ey6G8AuaocYdFg5U9XseaucH1hENgwedfZo6OuSlnH93rHoOfWx/gySw5IvmVAYnE+UR1nSOjWFIH35UXyRHStCuTNU63Q5UGOQb88OwBD0OG6agHZmhZwzAyB9kjYy8LYg6cWxKQwpZ7okk4UeyoN1pF/Ln8iRX2kJ1UTYlx01ZaCfd36EWL2EgQ7uQFznpXhEvtPPhB3/m+kidokf1gA+uXc+8AOUCvcUySGBzgtRFF12Sy6qh7znnIFcGlMeVQ+3OiK9odJVAAgkkkEACCfwEGCZ9+kWB3TtyZrRR6YJLcun8PLvrzIM0mvIxqo/sGJX5ukriVBNIIIEEEkjg/4D7Sv37dMkyOdUP3anmHdT4kF4syh+9f3V3uaw9MZUWZr/0J3GqCSSQQAIJJPB/gA/eMKX/7cof7O1PvrEqVaooEM3Fa2o5Xx8Jm0LkSVkn8DWeBBJIIIEEEkhgfcDcLl9aiyF1YffLcmwwOadNXSul9MKsvG+0nlq8XT+BBBJIIIEEEigJbCpkR/rCb9fYiMkLij/+4DsrlSGsqbITMmz150UHPpidQAIJJJBAAgn8HNiBHr0jbmuDUz3/oktzbB2vU5sfLeY9sLCIys8e+SsW0asFCSSQQAIJJJBAMfiLaKmM/fDDD7boy6+DU73owotzhXKg9/W9yqd6Ofw9rPQ63RClxu+OJZBAAgkkkEACMTCfyzzvp/MW2f0P/rN4+peH/W78W7R+Kt/LS9O8DO4vmSeQQAIJJJBAAv8X2HeUts/mLrB7H37CnWriNRNIIIEEEkjgd4LEqSaQQAIJJJDA7wQlpn+v9DD259O/nBNIIIEEEkgggZ8C+3iT6d8EEkgggQQS2ECQbFRKIIEEEkgggf8Kko1KCSSQQAIJJLDBIHGqCSSQQAIJJPA7wZ/uVMOUs4LoNGF02BTFjwj7NLTxucQEEkgggQQS2DRgI4hUI0eaS/tOqgBp/zX9TKpUdJ9AAgkkkEACGz9sFNO/4afnAJGT5rNPKTuizfE6TozSE0gggQQSSGDjh43iPdW0hd9wxbkyHcz1VpWrWU5Pflw2P8qVQAIJJJBAAhsPbJTvqeJIMzk5cByqnCk/mu7blEUaP6mTQAIJJJBAApsK/OnvqXo9/jNzmVBfGseasy0r17JcOmVrv1kQ5UwggQQSSCCBjQk2wvdU3YHLifITOqynFl0LFKv6OYEEEkgggQQ2Bdgo5lfjjUo41BC18uPoeZ6WQAIJJJBAApsKbBRONaylypGy6OtrqoDC6iwblxStKoKV6y2eno7eveHsG5uCT1a+OD2UC5usovVa5YnTw+Jy9CqPO/QoIiZSjssVXYe8oc6AC8il1/o50BXXFYHTG+qGJvYzW7w+zPQ2+fOK8YV3dGOayMv7uQFHlmJ5QSYxD05bujDg/RXwn9BVXsoE/qMHwgnumK+Yh0CH0oMow7X+hXJ6nheuwz0Q0ew8B4hxUdLvI1nFsg7tFtcVyhaVKcJTQtZKj9ss5iHGFdqcuvRXcnTZOT4luNxCPfAQ5ycfNMQ8xvWsHzd49SfC6XgdqDPUyxkd9rYGabThL6Y7vnZw/gJNMfh1xEeoQ+V07QBOUEa0OR7xGPQngF+TpmfkIa/XC06OnAaqlPP79fNYTBf1/vQoSovyALHeOK+Ss+uZ8qV0H9OB5nMOZZXf9TqUD3REuB1vcd6AO9TheDxdENEaZBHKFpcP+UPb/pxHdD/qh1w7GuiI6BSOmJ9QRml/UP8uwuXlQh6OIn39FXC5b9D+DQT6AJ4HmgU6O63IVnU7zigt1k+ui9Ki6wAlZA0OZfdzxEN4FpXxMznj+0Cf9/eNEDaKb/+WrCu+3nLrmm6ovtm2qq1RQ+TLMGRSay0vl28Z/UsrT7nB91np/ffxMpaW4bB1Si9lKzt2tzXvvKO8QogyyDmrlawwV2j5qXwrlBJu8+Fb4ZnGFe7IhZ+WXbH7IcLDfb6eqRFVt2cTLVldbHn+GbbVBX9VXgw279bSsGlbe9+j9v19DytPnqUzUnV1HGgE0sK7Tsc2H03hxutLZ1Ufj4X7270OtHRhfuBddaBguEzqz+PfAY2swsD7LJOXpUZVLRxibt2UD2xV5/O8jn8H5Qbdb6UOalRURhypv6WtoMsFlnn7A5dxTjSnshjGAPBZer/9rNwT9/jzoPBpJGWFk9+1ld26K8HvdM4Tr6JL8soKf1p4yko+pS84A0xejjP5fpB8fuz/qPKE9vBTNrQBhiYlXivOnkRlLt8wW6GyyviNZJSfVdtFbUh70DBOf6qUbXVeF9uy++lKwoGs0/N80Z2y1f0fsh/6DwoypyrhTZt0KKo7J5mWH3C/lT5wX6WtCzLIllIzZV2PCt/6IPAFHa4XpVw/2LGeVruUH3Sf5FUoXUMO7AsobWveestWd7rI2xL6aDXXBfEIljzxXmbQvbbFgY0sq3LI10H5V552nhW+PcNlCu+Uyyk9hbBI0Wmbj960jPQonstBE/PEyzd7Hhx4FBSVAY/XnbGtLvyr9PevNIUQUUrJerZa7bLu3kHCLf4l40w06MiXkNaK1lJCU3H2ZD1XGwm/60NeoHv5rgdKHnFfifQoIoJBcf6B+0hG9+iOdgnp4F47+X1b3fUC0W2/qX9T1Tqxp5pFgnDIGZbeX+3yxP2iSH0XMQpwPOvemm6rTjvfZYPOUQYR+S3tpIs/un/Tb7a4sIuVUZ3IxW0wDaR6V/V/RO3yCFX8W9jQ/RsZYoNyWfGbKu06UnZQP+nuASVoZZCgOrteKJv0nrRBdOihP6ZCBPFf9u+M8G+xf0MrO+Q+YfEhRMAVRrqO/c+FYOM2qW//ZkRwHooto5GvxnCHJ7JRlBxGKh4FSuB0AISe9TxkCwaNhqVcflrsqrFQZB/BqTHpAG4EuBc+IB4lccZJxIDw/JnnDb2VNDqL4gTVJCVRfjoZgoVGOm1OdKVUJx0OPoJyqDzOnKpQTPDpAGuhzhiMMBWuTiFjAi8+inOFJB8FwQFPv3B4TaFMmFbXtXCBE9zINkvHIg1D4nWocgEyc1bBI9pxGhkZU4yl3IiyhnagFnh23pWOLJBJcKgCXYPI6Y/TBMjW6YFCPwtoA/JCD/JRXbQVbaYEb0PogkJvW5ULjln4xCdXLn3Kp3GSyiM88EkdyAJ+9VgGWHnVOZ0/2oVr+AKZymQiHDhUOrfhcIQ9pfLOI3ITHnC5bPXcZRqxiJzAzXPqBjttms5QQIMQ2lK4Pa8uoY363QnrL8aMHfCg4+yDF/IrCnFeRaMbcCj2NLUlulGiDDoQ3EegLUXfcJ1GdiqhLAw+nBSkB7HC4/Tg7DCsKgfHwUGpAG2eFbWSqWtz1Ha0g9dPLoy8cKH/bgolqKATOoQvTTvq4W/t3z44wjijm8rrg1D9A2gb50t8BOfIJe1AGdrvz+/f5AScR+TMIb7cPqlO2u8XD68JmpEr+qVrlf+9+rcP6igvtGEgAApwxActE2ZJkGU80EAu6E/QDVHoZ8F/2L9x0Gnhhz7PD4/QDD7kvRHCn/6e6k/rIiVcx5Hqj8sWutAlQT3BOCqTGoITzelAo6Ce0Ug7peFvRoYrOCUpTp4aLDK8jkrgdaphGPGggg7eKUInC7QAwhx1SJLi13y8lDKRj2s6e4CQn/RQFworWsQTeTyvlDeVlrqoqvieJxh19D0tq5yT0QICHvCFel0+Ed2OJ67234DTp06dwziBHHoERTil5IpF/JnnVbUuZz2icwX+6Pq6AJSQ8kyOWOdQDjpi/QHiMqTTfnH5NPX61U/zF/EhQ1XUVvoX0438AOpyoJNlZOi98xfLn7zp/FKyAPDHQRRH1yweMIHTrbFD2r5dvMqWf7PWvlm8zKnx/q8LzjjtrHRi++oVrcI25Wyb6lt6mVh+GHKirECzCnnnj/TRecY0hDTuuU6l1d5EMoJY9+Ehh47oGbLAcON0HY90IS19gceQL8gj59PbojODAxIeeCsqI9lgoEQCr6zlK5Vygb5AF/XEfQTnSjlvVwFZVEIZXBuCE/W8oiuOzBmkSjaFH39ieXvu5jTF/FLaX5XzO/ErOXlfi9o8rjvmifz/Tf9GlvIEzj95oM/Z053TD16d6NqBf+SnNpCsqNbrF50Axf7w/s1gSOmMs2gvKIr5j+n6JXD6NmD/5omQez6UBMfMQDSdh/wih85f2t7roi1UBDwih3YBgqwE/2n/RofhywcmYQAZ0xquQx/4syDw+NNIdaN3qmuXLYoUIqQDXCNQOjyKUWzIMDwaNQlRaIzQCKG8FxUoBWsZNWxcJ2c6tGoJuP0ZDc61Ut1ghc7NOSNp5rm8Qj1BuNxFhiK6d4MhJdSdXwd8AHUKm3ecwBejcqmk+3WnEb68emiC3khGoh3DlsZZxOj+DYTqQ17wcU/d8EmnSRdiDNQZ9BhHAz7nQfl05/eBB+hnZB6mVsGRojPrGY9DuaDk8T35yYdxRbbw5LKJZOklvHzEv57BJ7IFhz/3M5dxmeJOGvCpIv1Niz6PWiPD72s/yJE/dOQcdKseXRd8tdrmTV9mn3ywyD7/ZKXkg2HLU061KVxDK4YFUDjr0784YQYR4qXOPttZ1V0rWb2Dd7AtymxRVF9KltH1R9VAH3yAt8hRum6InshAkMI/5B+DG16m8VQ9+uU8i3fnG1134KFkVIh8hS5fuHyQEOTodHId6ThqGl2KjqB3QZ/AFNrD+5/0OLSb/rg8A74gZ3gI92loj65/fP4VWzv0JSs/qJ/jio1gaPtQHzIJbR73R+H39uQ+aq//sn87n/430BiuY5zcCZeEzyDG+xeyF/hz9YsiXXb6qCOc/6j+nZJ+ZdSWrq4Z1cNAQXhA62WQwy9AqH7D9m+gqB45aJ4hI9cZ0jLUTT5kgy6jX8hRjDpNEf/oh47/rH9Thv6ido/aEHzgYbAS6+GfBdBJO/+b6d/1EwcDG/IoCUUCLgE0DDrriqCzd76oA4TGR+lDZ8jQGaUIoTNgaL0JXVlCGTq3GiO31hvRFVtAvRg/IgVvrKhzYsTiPF6f8LuySkODwQt0OC+ijzNKGg5oCconbXZDqRtPdwXyDgdmKT2dG0DTwYUyYZl1Dw9uCIUUBaNHgj82DvD5y0fISxnKgsPlIJzgdpvFqFr8Qws8uAGlLqcz6ICXJymiR3+VJqMIbeKJ53HeIlnArxK9PSSzIDt4ccaDbCNHQZ3I3ttAtMS64HlEB20WGy3S3HlCp/JxxpMhM28PJaZkoNIuV9LofPk2a8oSG9TnLXv0ujdtzFPTbcns772O0PZOtd9DDVOiOFScK2uTeTIa8ISHmjPta5v01Fzrf9EkG95/qn3+aYHnxbFiHOHTIw+XkdpQMgryiNC7Q9VJBgiNIh+QFm6Mhhs4NQcRqssW+pXGNX3AcUGzKvPD5UVZ2iCUp0xoF5WhXqII5AeX6Be0ISueeX4uhIDD9R6cyuVtJFkKOXQGHPBC+bStHTbSCt96z+zzL5Ua6yQsOmLPF+qIHWhoP3ijrt/av4NsvaaAQ2fyuxyc5yAfdAgc6BnPqSvua4DXh6xoiz+wfwf9kMNQExM9UhPlcnKSGacNOf3SsWH7N7SEa9WjZ65XkUy8LHTSP5WHtdpiOesa+I39W4L1+gL9yk9Nykd91ONt8yce64P1p25MoMiCqScE69GON0as3BgZFAs2YNJVyhvUGwJFT7GxRJmlwHFHoWOCJyiHcnu7gzgoZTD8alCUROXI60ZGo7RgWqglGEbA6VAmmpn8KI/T6cpBbuVlAc8NVUSnyqAgAcLI0DGLloyUOc8bDHpVFzxi1L2TUZ7c3FMP979wKI/nhR7KuhIHnM5/zDN/3SB4Ri+HDFy8GANPFJ95oXPGxll/HDcpLitdIQvHFYE7P/0NsiulIlGnAi+0IGtwOx3IlfJKQk7eRmQLBtkNqspRk7etsxM6XsBX3KG9rKLEDyd/aY9e84aNfnSOLVuwQjxhyEo7jfR58mHjuIEnoQj4oE31kJbRM9cTEYNPJPrM1/2c6d/as7e/a8/eMcWWfPSd6g7ywLn6NFkshqj9Yt59jRN5iEcnQpWGujCQSpdT8mhM10gNnrw8MkljgFQGfnVw7Wl6xjV5KRMbdgYI8Xov7e1llE7f8oheuZ1pqNcD+ASHn93YhWfOP4BHUv7M5wstM2Wq6s7ZDwOeUb4w5evODeGoHtdzCYyyXPshOrxa6P+N/VuYnRaeYbjzPCTzZopwCaLn1Idcip8FXfL7P6l/kw6QznS/612Jsv+nP//8ECHII+bH2wq9/Z36N3jJ5/XQ98jmOuqXDmn6r/AzkIUmbxuvK6LlN/RvpMvgM9ZPB/qp0xjo2dhg46SqJEQNztqDNw6GAMUDJNx4ZOVKTIN6Y0cKHCmpbytRuo/QXOki5fU1qaCcsRJwnc6GX8cpUg6/DiM0pjfC2k7Ig7K5couGDCNSlBaahYuuAY2uHCpD/VDhyqORV1BS0aoqoA8jSP5820I0r43ShEV1UbcruNMTeHX8+vtLB3nIy3WQEbwIFzgdV3jmHUidxWUKCyhzJJdsfqjbcXkIBhJFATENKLzzLPMiGSALlwmFBNSFzMLUXdTJBODmHkDmTidt43RClw5vd3BDHzKNDHSEi7rQCQ6ZZ3/uBilXyhZ+ssIe/dtke/3Rj2zltz+ItjBDkRPtrIWqsIwbtai88Gxfo4JV26WC7bRHZR2VrNrula36rhVtu2pbejk24fguSjee7IyNR985Wzx7lRzr+zb+mU9s7aoQmeBsMtgolyu6hNwD/e7cMCRqc/hNF9KWAtd3yZzIW7jz5HBc7lHbBLlsGeGJ2lTXnsYz8igvZSgL5NJrXHbeJrQdmF3GoiOa1g59K7QjfSfWBxwNuDCyuhAy8ulCda4dONTz8fzH4S+6HOK1W/DFOJj0dDrEOPdON22n54FfREE7g/s/699F08DogCCWrxJEMwOJUAc0+kyGbmkT6iYHeAFwUO8f37+ppTR/HKCLqCwsSZDCn39/QEPQieI2ddn+Xv0bIpAtfCqH9xXx7/i87ykvrQENrj9Bj9iB7Pijtvxv+7fTl6e2UJ3sOMf5el7oj3RnY4ON5JUaERLJJ643XlNd893C8CCB/0lw3fAeH3e6YAC4cnsmXSFw8jTPJ3O1OmdTXphj741arP6HYaELCpeQlbzHYdZqtK1tX728rrexXL46MtNMno/OQIdXXgYKivQWf/KtnOcy+2zaV/b1otV6DiZl9ysAU5+x8luXsbbn1rUq1cspRYY9D53WYzdGchrs5s4p/Q/sY/81YCiROg0hcBkzGChYbgUt21vhqu9l6DQQlbxK3/J3K3NcW7GJ0ZNjchkGw8r1z89MAXOO00rC+tLWBy5DcECW4w1O+f+3/O8HgY64zpiOBP5k8AFj3A7RPMTvqh8MZjbKV2owdAkk8H8BIx52eqoDEJEA6ig+cI6umXCIHepXi1fYc3e+a++NXuAOlMEsr23IPWrAnbNy22xlB7WpY6f3Pdg6XLGv7de6hlXbrTJ+QoNsdTnhwTESzdLpMNo+OhZU22MbO/C4Xe3UHgfYX288xHY/eAfhxphHxBCtyMEs/+4HRa3Tbd7Ub4VPxpYNIuTxKIx8IYrY6B2qwA2Q+Gfdz/tpGMnYmlET5VjXKB2ZiT/yPvuKzmv1PIo2XDY8+ek5NmickTc7lV3utOF/DDjtMNhiAODRIvoRnTc4YLTVlvDqu53Z2avrEHEldu3PBnSDAQ59LXaoMWyo9tn4e3UC/9sgr5jHZhwsVWyEZUCZRFNsJD/L9BVWLKVIcpk9f/t0+3LhKn/u+VSGd/W2KpNvzU/Y087o28T2b1vLym1XRsjlbNUDmFYKr63oBi8cGUmfriNPNM3FFCHrfzjZsopGj+xa1/4qfLs02lr14WuCg2FDxw+rf7SRD0y3D99YAhPeocP7fDjsMIVM+sYOwdExJCGyhgvJW/c/DvyXZTWagV8+1oDM1rz9vq2bPQ+fG8oiSj2PIb6OHWoM8Y7hYkdb7HR/HdRWkTzD4CbgAuLzhoS4Dur31568SYMeJPDng+sg/df7WnTEg68NBJvAe6rJ76n+L0PR6JJ1Hd9WL6PrkSOGXsZUhgxH+OHkJTbq8Y/lWymxTs9lZFUafdqndXVrfGwdK1VeOhaFuG74cZ65UmzoVbbgIMLINop89BcKOAcd5StNSqNP8GUlOUjw4JQ/e/dLGzXwE/tRztSYLmadTP2W1yWO7LK37dV4R9dvd0u+Zhcc9obuX78V6Iv6qwNZi6Fcafvhw9n2Y/tuRQ4FmbP6inMr3f4wK3trLxJ9Pa7IwSLTeOAiKOnwgtyDEw2OsTgttMG/B/IU4/ypQ6buDWk8gTA4EkgHi+rVEfTHH0TnBP4soF3CJlVmFeK0EuvxvwG8/wv3JvVFpQT+1yE4H4yTr9V5RBIMVSqtSFUdZdbkpfbawI/czfrUrUw8X0PaastSdvQFe1vzk3a1UmW38PVS3ln0AZzvAiktfHLAkUP1ejSKjTseoJw62NxBXhwFU8kypHk4TuFwx5yxOvtub11uPNC2r15J9YSdtirg5Sf8a5Z9/XlBcEoCd6jRxpqNHSDVBw95aYlJkZhklx38jB6EdWcf2BB98wUfyXzd2ClWuFy84tAkxyDXYNhi5xevpQKcXVYlwI2fjjjPLwE4wef41SLUGx+/1WD+/wD1+OyGdCGewvbp7IiGBP588FeKvFOjf0EHXRc30Hgn1OBQ4rIEYIA25FES1qeE6yuTHP87RxwxuvHWPQbM+wPGVGnLFq6ycU/NxvK7EfddqlKkHXYqbyf32Nd2q7e90nBt6kEy+pmoI/EN2TCRzCcr5ag12uQOQ8yh2r0++iJ153JrLJXhS0KKyjD6haTLyRClkUl0lSlbyo67rIFtV2MrpyGOQtesTtnTt71vq1cRQasWcEKI6CnJ68Z46K940YAGVkRvuqDA1r4+3j+I4VGgDBZT4lkNOvyTditW2LoxkxS9h2lwd77EsRE+/Jy/9qJ07uNz8XXWX7fxGQEGO9Gzf3eEiIMZBMk0arswZR0c9/rK/J6HO3+R7uDTivHg4Y+pPzl++QBiv+LtEd+wSzmyKb/lWB+sPzWBBDYS8EjG30nAwAdjyZYZrrMr19rTt79r636QAVMHyeM9Q3WabXcqZydcvq9V2KaMKz5OzD8EoI6kruDOLkzn4inCGmGIVok0iCBLOHMcoBwwHxPHgWSIipSWTvOKQJhkhh5/71J1ldmqtHW49ADbtmpFd7gehckZFf6wzkYN/NjxQjvVxFOdGzUwiEFmOnAWq4aNMFtVYOmdtrMyT/S3/P0aWiZVysrf+nfLb3+McuVZ4YCnnW82N3n74XiiMzhcJiWgZB6g5PX/D/zUaOLYpA0609obHtBNBlDUJUmpYakf+CMi5QR+DdA32iH0cwbdPvBm0+AG6n6JU01gowb/cAEGNse0L8ZWkRFrdfJkQ/8x09b8mJEBLfSOghGvXG0rO+nK/a1UGV7kl+N14xycci63hXcmdxKKokKnKjHiZBqvaCpYRWQoeW8P84wzdEfMtK8bTuGUs2RKOt87qvKkdOSnbMuy+XbS5fWtTGkNBPzVGax+yuZ+8I0teP8b0atOTVgNjo0c/D3FDLIV/4quc0Nfsq3+dqlVHvOsld5vX8mCSF0R+A7bWPlbrrIyg++1VIUyVvjW+5ZhNsFDXBxM8HwlHeq0adNswoQJtmzZsv/jbEte/xIg2hCdBseMQ0MXLr/iGjvsiDZRrg0HsRPnK0wDBz1hhx1+lE2bPst1J4E/H5gn8SUd6fGy5Sutzw232qFHtLXWh0s3og+F/N6wkbR8ooAJrB/CBxNwg0BkeHW8N26hff7pMqURG4VpttJl8uyEyxpZftngUH3jis7xVA3OEcf503RHLEAHo0N5SA/PQppfMz2ZDRuj4nuw8voNr8lE7+UoJWultyxrR3Xf2+mNHQQ8jHnmY58uFQZ88kYPyCgMPsJ1/pAHbYsuJ+kuGKQw3GCgooFFNs9KHdDQyg3pr0i2WhicMMVNxM6AJAhNaSkrWLbcWhx9gh+9b77DcblUlL/IISmfO0s2fkVlOXu0AU0MpnTmvk/f22zegoVI1Z08bVyowQty9hkI6gXAzzRx+KSTl/c6uPUGidPDEXZsk0xLUz83oUzvm262+fMXqka0rTCaEuejEZQLPDADzn340IzSqUL1xBuowOP1U68bf+kSfBNd6ex5eCZwOsDlh4D8opH7mN6QRpkwSxA/c7lFH6+IB6px2aIyER1cF+MKeaAB2kM6OJTK4NbriEF1qS0C3RE9TjvX4Xk4AvBFLPYZxPTwpSlvK5eRCujw+7iOiJ743ukswh/SQ1l0KKT5PJL6K8s999z3kPW+8VarVLm8NWvWTIWLafk9IdLePxs2DHMJbB7g0Y4iRP/spM4rv1pnk0fMk4NTBxbgtOhQJ1x6gJUpUzp0eO9sGx4w3rHB8DipyAAUWq2dd7BGR1QNHV3pbLBa8c0am/LiPBk4nMOmBfC5ZdkyzmM8UOD3UP03h3WNA8H1MNjIr75t+DqPwH8aLZILDpOyA558ylasWGHNmzW2AYOfdOmxFBn/vmzYkEYZlfWNXyAP9ablTHFjqlh5szZ/0XzredPttnAhTpWfgEvb3bddb+NeGSqjzZwCLSO8QuzlvaLg1MBTPD0IvZGzY61dt1lmRsiDc1X9GZ/SzsmBz5eBvlN1fy6a1/hae5dTTrbRr42whg3qizaccaDPefdf0gk8IB++8wueMCUZfSiDAZl7YQk1HV4Jcwcc1RlAOJnpcBBuBj04MqUj+/iXXfgKEV+Wjgcoyqm8Wxb1JV/cdifFQwaCohc6JC8cldehdFXv+xfY+FfkRJllEV5va0GRQ+Ng573LFl5xsJKr75KnrsB/cJQ6pB+0N98Mpl3yld95Fh5vE+GhjFOk/MUzEqG9OHgXncFOWu0U5AWfyB3Kgr4x7Gbz2IQ3JtKw9ty/hliPay7VpeSwASDvwAMb9+LiqNZNvEKRoRNCi85/BJSsK7q+4da7/fa6qy7xcwL/o0A/4af76MJRhPf6wA9t2eIfvDN7JKtnzU7a2X89xjuQjFAa4xW83YaHqAenWaeBXlHBdDAfQdipdkWb+saXllmjDowhkrEs+HqNNTq0uvp/MHgbM6RcjjpjTP0+OMVwI18x9GUrXLLESrU/xvKq7qi8Mn7Ky6cAZU/FI8aUsirjjhGec3Zyl7OsTo1qdvll3W3wE89a7Vo1rGHdvfScqWam0mlV6k75tN1Tzz9nw0a+bFOnz7IddtzOKlasINx5Nm36TPvXcyNs/ITJVr9BXfvxxzVWp2Z1mzptpn0ye7bVqlnTPpg+wz7+dIHVqrFTxA86I9D1iuXL7a233/NBTpUKVZSetuUFBfbPZ5+zkS++6niXKc8eu+2hZsZ4p4XvQ3vq2aE2fuKbVq/eXpZZm7Uawr1w0SLR86Fo28q22mIrmlt15dmyFcvtmeeG2rAXXrZx499wGdaoUVP4JEvxiVOYqnJLv1oq3nYU7TPs4UcG2NgJb6juFbbnXnvIf7hbdJV26Uv3XT6RPKFt+YpV9rToGj5ipOqZZNtUqmTbb7+daKbfhHh62oyZtuSrr22HHbax96Z9ZA8/Otin4L8r+N52331XNWjIyScAoX/hggU28Iln7LXXRovv6Sq3vVWW7JEdfo3od/yEKe70MirzoPDN/uRTDSz29Pb/bkWBeH/RRox4QQORJdawYT1bMP8z8TjLKleqbF9++ZV9IJoqV6hgpbco5f2DtmEYw3mMcBdIfjuKDyXxX1XzJOgmP3bBK22090OPDVT+ibZgwTyrJN4rV9pauTK2XDJ8+50PbJjac+lXX1mLJgfbgnmLrFbtmkIYcP33IIpEz7JlquP9GValinQoeU81gY0Z8FdELGHNLWOLPymwZ29/Wz2LB2Gz0E67l7UTrzgIO+Mjah8xyzj4dJd0acOCDJCICI5GNIoGulGchi7PmvyFjX58lhUq0uZ5KfFz6Bl72l4HhndXNwWInWr8OkyIGHL2fcfutuadd63coP625QH7yYQxoFFkqYgp/I4xERHRJwMg2jLnjqrVUcfbYw/dZV07nmq1d9/XKlYqa1PfGudr3f6akxwmbfvYkH/aZVdep2ZMWb2969qiBYttwaKF9tCD99kZnTpY68OPt3GTJgc9oS1kP7LfL7VmR3awiRMnW07X/e67zy65qrcNfWqgHXvM4crlCwYeQYG7X/8B9s6U12yfunvaB7M+tpaHtXX+6tevayuXfWfTlFZPDn/cK8PlMCtaq6PbyRG9GXBI34jWf/zha7v+hlusT987bdQrT1vrps1Fzzp7XA7p8iuvkRjS1qBRfVu+7FubMeMjq1tvbxv36nCrUrG8ZJKSPI61cRPftoceuseuuvJaq6v6Fi76whbLqZ1//ll21603oF1YR9FWrFv0AwZwM6Z/ZM0Pb2crVq6y5k2bqJ4Cmz5juhxIY3v2mUEaMFTweloe3UHyf8MeffBuu+KKnuKRehbY3IVL7KLzz7a7bu4dtW1KtD9pZ5x9qXgua43q1bd5CxfYgoWL7aIL/mp33iZ6MswK5FupMttZmzZHyXktVzQ42Zo1OcTGvva8TXt/luoTTStWWrOmjeXsFglXeWvZvJndc9+D9torQ23rSuVt34MOtUsvOMtuu/V6r5dWRFemTZ1u+xzc2u66pbd1F21h9kL8qqN7HmX6rmC5dTj5dJsonupJphUrV7CZGngtX15gj/zjHju984lytO/YoUe2df2llwLwWLjyK10Q9f734HqnDp+8p5rAJgN0rlS+rJaMLdeTR34qo51nhT4FlZGxzViLk/d0Y5/jowp4LY2Y1ffU7eJpsg0HxQ41QHCoMrYigyiFQeLejbf3zyPyk1d50TrgLP/S0oan77cCxit2oADX8X1s/DAi7jT1z5+zuYv5TbVDDBhAgN3ZAwb/yyqXL2PtjjnKne7pHU+2GTM/tg+mzvAAiIEQX7FijfTSK3taw/p727efz7GJrz1n8z5629odfaide/YFijaW2Bg5uh5XX+k0jHn5Gcus/tppw7kie8hu0/ZYarbnR7zogzMgK/zQOuyFl6x69e1sHzkXNsG1P+E05TH77MN3bfzLz9l7b423O27uIwc1y/rceItHfWNfGmbX/f0ysNvYF56zwlVfWn5mncuDOsGTFe8L5KguvfzvVqt6LZs7e6qNfflZmzZlnD3+YD+bKXyXytm6XOQYs2yiE/xLspkz612b8MpImzbpZauuiPbe/g/5VHk8oPlJW0hWK5Z/by2OaKvot4Z9vWSu6HvWpk4ZbY88eKeNlZPr1fd2ZZY8VA/T18ATQ56yTz96x0a/MsLefnO81ahezR3dMkWWDDbGTnrTzjjnYuvS8URb9sUcG/vq8zb3ww+sy2kna5DyqA0b8bLyhdepABz1rjWr27eLPrVxLw91Z9Pn5lvdoY595Xkdw23eh+/b8W2OsQGDnhXt0n61QcP69axhvbr2zPAXkZzkGza3oU8DnnzacR/Tlg1nDKpL6BOilrLc0Pc2d6iPP3ivTZ082sa/Msw+mfmuNai7t515TnebP2+htWpygBV+/5U1lWMHsquX2rqVS7yvbggogXb9NdBoG/IoCTTEz2F9ZZLjf+ig92WIKrK2+NMC/6g9r7Xkq0OjL3setL1tU61CeKUlim5YK0kzgifqWR/O3/EIzkLXrEEVGfKMG2Y6ra/piIc9D95eN4reCrf00fKiOcvt+29XrxfnxnTAX8zj+s5xn/V2is8ydjicouvIGXBepghi8JNPWbu2x1ilSoqelKVzx5OEK2f33P+gn8MO7TwbMfIVW1Gw0npcc7miQQ1G2CSmJ3fdebNdI6c2X5FTqFPOQnicFjkz1gAjcrzeWjWqW/MmB9qIF15WCs+oI+VThvMXfqFopqOX5fdahz47WM55qEeQXl7GvfsF5/j1+9NnuuF3xyn94tI/c8m0v0Uf/HCA36w9P/wlRY6r7dprrrTKFcqo5vARgs6nnSKjv6cNeuIppw+aw4dB0nbbLTdY5cqVpe85K195G+vc6S8uI3ZKxzukvYzyomfcM0hZvuJ763Xt32xrDVbIz7OuHTtaA0WYgwY/GdGnYab6DZp62y3Xq56KYiFjVSqVtW4dT4VwDR5mKi3P7rn3ASExu0P00JrwTd67bu/rvA0a/E+U2/Wb4RXO89ab+1oVRYrIl/zD1H7Nmh5izZs1dTnSL6+79iqrVLmcaKG2oEMXXHCmLVz8uQ0f+YLaWFGo+OSrY8OGv2zt2hxptdV+3mbC6jNUAvjmeHzIvzza7nzaXwI+9fmtpVc9VQ90DXjiGZUSxz5aC/6GcnlqM5f7enT+PznWB+tPTSCBjQakvDIidOjJIz7VOay5ABiPxsfuSg6WgpQQphqJdNz4/CHaHYwA9QHB4IWO61OfGB0RuvfBO8poaySORZOBwDa8Oyo4hY0ZkDH2DBlzjg/ueQafDCXcwYo/HCcOlc/CcZZ19AFP7FgHDH6WVDv/grO9LRFIjZo1rW2bozxqXFZQ4DiR6diJbwhx1lo0aaZK2egjQyqDXqtaDet13d+shQy2G/BCtbUMZ5Ejx1hif6FR5YEuHf8ix7PSho7kJ+qgNWcDB8upqVTn0zp4Gvn3qVvPGtXb25YXrLAxE9+ysRPe9GlkWjVa2RcN7kkjOTB4owb9UaXkC+2etQkT31Q+E50HkapyzKwoUpSBb99G0ZeejRs/QU9QVHhQ5Nagri7DR0KCgLkOT2Mdg78YyDJ+wiSvt3LFil7nuPE6RPOEcROsQf09bKUGJtOmzlS169QObF8ya9go7ExH/jgf6uOMHGiziROmWH3JYea06TZu3JteB7inTp1qdffeS9dvBUVwbFl3njhU+iGzDBMnTnSaDm12sGdxmdGG2bXi/VA9oZowjXvcsUdaxQrlbfAQRabRgGza9I99mr8d0/UgErg4RDPVMoidNmO6rVyxylo2berPfDd45HSPkz5R8RhFsW4HaJPICVI+tFmE+HeGUEsCCWysIAOSUS/4/JNltmT2SkyLd046zN4HVbXy226hjpYJSTmZPV6niH5o2aeCNzAQsWCo/FoG3Q12NIrlPsWzvIyijrK22z7bhek3f/UmZ7OmLPVyGzO4kxK4MYuuA5/RvSye86kjdqYYrXgKL87LKILo8+7+D3raiJEj7fq+N1vvPjf7tCobY1Yo2hqmaMUdVabQNww5qA5wxGtpAWe8ExQHHOjD+IZZgmDWcHFQhS4QGUP9yJGv0mief/gLr1qDvfe0GrVqC5fKyCg/P/Jlq733/lZlp93t0KPaW+ujO1irI9u6w1knBJHr8fJcsQOdAZ/PVPBOslMIQWkNEFZ43UTkgQc9Ybcr8hEv5HWQbPxH8HVJpAUgQ/jhV4LDMgEuHdmTK7SBnyXj5StXOa5WR7ezFkd1CDQfdby1POYkRcNPe31sloI+X+9WubSiftdROZswywKyaKeu6vhOjpgp7xZHC4+OVpJFi6NOcLwzZ33k08TIKyJHPLPeCeeiBHSZQC/tEd7TDu1BR61YYetAg+pHjmwqanfM0YpUXwl0CgZp8MX6a5fOnVQQeYd2DxDKLV+2wnFWqFQ+OFUBVXn0HOmHR70sRyidQQUkeF7JPKbr94aoVf9s2EjISOAPB0bg/kPFOsU6zqszjOj9WdRx3xo+T3cZNxDBmKbsoLZhByX64z+27YVlLDxs1WXc0zYkZJhyVv1UKcNYsp+6IWDkLAPDdPSeGgSg6vCRs1K2bvVa+/jNJc578Tt/MrYYXB2xAf1TAYFHgCEreY6fpeL7COAD0p0v8eppumc3K6+9IJcbbrzLet54u/W56Q7rfdPtNvzFV1Qgbff0f8TxY6QlgiJAxnlySGzKwWAiyECHzoiNzP4ci45zUBKyRDeUDQPd7dST7XlFw2Zrbfq0WTZ/4SLr3v0s3Qs02GH97fiTO1ul8uVs2D8HWeHqLy276isr/P5LxxXcJcZYjchgwtsq8OkoMORKCz+8ENk06OIQQb7/Ft6KxBUcPuADAeHJS8MfP9ZApM9bwAAOIsgx5rkIiDRdHllfN4Re1gwz3y/RNWd4+NJaNG+ifGEQQj3B2emM5yaKE/gbaxok+PS57pspwmajF+XBC66M18H9EgorVzjYlAUN3vY+MKD/OtvOrw9wGVjpJug17RK4o49063iy08PrVchp6IiXrP2xRwtByO9ldB0oCzj5IAmy9Wv6Ie8IC0mcB3xQ5iqhK2aKoBkaNqRtKNE6fyYE4Sbwvwe+05MOgaK7FZWhwvBkS6lrqOPLaHw+e4UtnFPgnSKPEX92ndU9ZCcrX6VsQLIRQ9bXAenEOdu14XaKWEvrToaHqUD190+nfePGBSMcjCOAwUESG67j/1HgTg7DL1ZYM4WjTz96yzcUBYMvI71SBnvlF9b1tBP9FZmpipBYU6zboL7nn/rBNOFgmhkjyisqBTZxwps2f8FiPZXOYLn1iI1r6Az3vlOU+vUoDFbYsHSkFaxYYSMUoQ4Y8pRSsnbc0Ue5/HFkg554Vmlpu+66KxTZHhZtwkkZu1aB4JQYMCg9cuxu0JXHdVb1hDpxtlmr32BP3aT99RHWTDOUwYmp0NTpM5w3pnvBIQS6j/C4Ew0OxJ2ggMi/GKI+Al9yiPs02MtxTZ82IzwtyhvVR5+JHK87p4Ay0As/nJWNHE57ptDXfKfP+Nj7XBhEQI/qdFmFMk438vdDoHb2H1xQvopVKioh3+YuYEMeeIWDQZj6OmvZlKFOp03t1azpwVaz+k42aMgzNmrCBFu06HPrfsFZXk/MT6A3EM91/fq8D2z+mhAbFuP+w2Bk2swPdZGyBvXqeorzDf06Qx8Ajg0BG4lTTeB/GYo6jjoYxjCM8ukg6sYa9U554TPvDEwR0qcY1R9wdA3Pv9EDztMHCzI26XW2a6Md3CjRtVN5Kfts2lIr+ObHyEAFYKzt5w3U6f9ICE4u41Eh03ttjznS6rDxhGlH8Yxs3IGoTS88/2wvc/d9TBHn7NAmjd3wDn3xVaTl7z0iu7seeMhaHnWcv77B81hOHjjLsHOPruBpgm7x8YSUtW1ztNWsUdOeHfGyDX3hNTuuzZFWudI2krbaQ0Y5GO9gwIPjAJdZn763qh6f0/TnPIuXIIIDDU4HYx3Tgg4ff/Qxfs00M7jDgLDQXz0J77juGTZrSalVnEpDeeUjfxEN/PP6RKnjD2fKQcoxxzC1nfI1Yu7ZjOQ/j6jQ85LLr/NXfSjD4bQ7CAeDA2gSXzFPjE/YuN2+zTH+WspIRYxepx7QBt8UfG/dzjnXX3VimSWmJ+AOSkxagwb1rGL5MjZh/Ju6F19sHtTfeQsX+vu6MYTBQZ7a3+yi88/193xvuOk2q15jR2tQP6z7ohvOawn8XLOhi/XqcRMm2Qp+GQkKeQNAwmSnN5Q1b9rY63XzEtPo9kV54X8DANgjWH8FQWk23FESitq7BKyvTHJsPgdTNowwfe0jUgc6Ad/q5PkXnyyzxbOXyxgpr2sr06g7WcXty+n6/+Lb2I7Y6GBYODdsVUt2LKTnMjIYMlYfvvWl5w0gJtXZg+EIDnljPn4OseGLAbZxMEMGEQWadep4ilo3/LpPcIB5Hg2hCY0UmdaXoxnx4iv23bICa3fs0da0ySF2w423uWNj+rhP39v91Y96is46duwgGtJWoUI5lTYb/MQzvvFn2YrvVKkcIGucoie0AXQoMj3mCJs4MUxDdz71L6IjbKxifHZc26MdT+8b7nCn+/wLI+24v5zqG4BqVqtqEya9ZZdcea3KLpLDCDuXBw152j/ogANiPVkVhrbT0ax5U38/83rR3Jv3V0XbwCeftdZHHG8rVvxgd9x+vdcND+54hC/uA05zUHjHCcR8AEHO/pkGa97iYDtZUf699z9qfz3rfBs/fryNE4/tT+jmr+O4Yy7ZLEID7QFHqDCmHSByvPDCv1qjentYt7PPlzxusQnCx27eQ49sZwOHPGc719rZ31P9qc1m0x7OTy5eun3phWf6ZqO2J59pYyZNsUfliBkMNWvWxHnJyfHLzXlJNjd17niySMv6e8y8Cwt/Qc8Cvd5IDDgY3Pg5Z9dce7ktlyxbHdFezvo1GzNxsl18eU855rutadMDrM2xGtgwbYyu6RzIRd7Uj+yDHv+3x/ogarUEEvhzIHRudUL1Lb6QgyNhM4//JJvS3hwxB2voncA7giLXA9vW9I6yKUA0I+UdGJrZWFV1t22CLSMy0L+Zkz5XZw8OwA2Hp2LoNw0efwloX5bY5i6Yb8cde7h1aHe0xBCmN30tT0eaaVvdEtX2vuYKa6QIZfr06W60hv9zgPW6+nJ7fNAz1vqYv9jd/R+wDop2eVeUTT9M0XbrdKoM6CH++sRxp3S1OXJ6DRvsbS0O2S/gld5gtHHiXTv+xXauWV3O7gA7rt2xbtTZQIWdJjJ6+MF7/J3QE07ubJde3ksRVyO7/Y6+9vxTj1mzQw7yqUZap0vnk61lkyZeZ4eTO9pnCxb5e6LNFV1XrMSATzqrOof981F/p5Wp5cOPOtlOP+siq15nR3tv8ut26MHNXEbQV6/uniGq0uCSLQGu66qnRs2drKXS+YpR6CtBJ/x5dF+KQcuD99l1V19io+RUWhzDhqL2Nnfh5/bIg3fb1ZKpf2NXB+/jtmgSdiO7cwGdyteqUU38HGBVKjFtGzZXjXp5uLVp004yf9haHN3B15vr1Kzm7502bXKgR7X0XWTZiCloxwXfgT5eJbrovLNsogYThx3eQYOhh/2jES2b7uf5LJ9vNOOE0YeU7x4+9tgjocratdEAJ7DqdTAw4MwR0uhYWTu0SVN/P7lazR2t/cld5fRPtOEjX7Kef+suOoeFwYLnDDurY94Dng3j/kp8Uelv3khU7+s7UugwDbfhoWRd8XX8RaU13y309AQ2T6C9eX/PUuv8t07pBOghbc9a6nN3vOf5CpUvP5tvex68gx3WLXRgjAQfcd+4QfrsBiEMDDAGs6YssdGPfRKiJPGbp7Sjz9vbdm2wg0fofPzbnaqO2IhsrLCy8wVW+DZfVLrf8g/cx2nGWIUoW5fikcFDRn2aLw/5dLB/WYooJUQbbEbDsCMn5OXGTgMQdMNx6bk7PgFy9KlSrpnmBB87rJGx5/USkbyD3B2IoOTdyR/WeVNKCj8HQBmvO5qSLgKnnd/dDd/m5RvETi8DHx8QBMeWx7x0NMjz90FVLthQT/Ky3PhnNmlzOU7/TV6led1yvkyl4vfZLMR6MmmUI6+PB1wWIFO66AjyDZEqU8VpCde/m0xd8OH8BgJcDioXZBHsLIMa6nd+xQ91hGAVZ0Ue+iXyCw4vhmI9DvyCm9358M+rU8U8Ocs6Ci2vUGn54BS1GjFc9Ler7b7+j9s7b74eXiHyuoIu7LzX/v7px2H/GqI02iqmN9TJIZEU1e8yQH7eJqJNNCMpv1V5nwZHR5QgyXkZ9MOn42lbGP9NQJsmX1RKYCMC74/8Uw8Mayd0HtbP0jb5xc+iXFFHlmFo7Dt+leRGIxjajRoUHRUbADjJWN3GVS2vjD+UgeRZyua9t8INFM6F/CUN16YM4Vd9/I1UcQlfOA+MG60e+CPiLAbxn5GTxNBHTiPNrk6VSWnUhVx86ljGM5UrDK+i5JV2o4oRxWDiNCkLfndwKkN5FIdrd1Aqy3P0LPzIPAY4GH5we7v57IFwij5/EwoHI5L9i1HKi3FndoXBYC5VGhPudAOgpC53LjhAdsNSL9OQOAFyQ5cDXFKBnpNH4HwqF3lx/kU6VEIncIw+FarBBf0HcKeoOnCw0OKpkoU7UNEKPcjIHVBUv+NENqLB+Suim8w4qdAWMQS5skcAvJIPDorlGuWP+ebc98ZbrPaeB9gHsz70+nn+bcEKn0YuX2Era1QfhypAvpJ5v/4PGpvCLr3gbKdHtQdawKeyP78G4CVLvVTofIsH0RJ0Ab0KeSnDQCb+ApTbGpjcAFAsqQQS+JMgdBApOfOE6g6YmEWffmtLPl7mxoIOkS5M214H7WAVtsYbBaOEY93YgSgnGHY6Ph18C6d+10bbikuluzHK2kdTvrDVq39QCXEf5fWwZbMAGTKMeJrfvtVZzsp5x0h6pBAirNhpYfDIjwF0h4SjUMSTjQw8+DCeWYVG/rF4ycoHYryDidwwrMIbcOMcImeIXFXc2yFyoLzKRFoA8uvQI3cWaifPozr5jrE7Fnf25JEGeh2KoqP2CnRTLuKLaFYQDw5iHt3Ylxg8hfSofJQWAHx6rivod8eosnE5v4dE1o9Fk9cCXwwQwKGyjCWyOUXaOHXk6IMPJUqWIaKFxiAn+hqfWAxyw+mQCK7AX5A9dfjT4KAYRAiXD5RcNqEMz4899lhbuWyltTzyOLvsymusz4032z6NW9rChYvtjttuUH74yNkNN95k3f56nn+Ssvv551jzJgc7Dfw8H/UW81ssG67DWTSrbZCvy9bbINCEDtFWwqRyus8E+fE8lA98/94gCjYG2EjISOAPB5+uQb/VIdP+rluIMNjxy/Z8nA4j8Uxexhq3qx11EHWayChu9MBmmWAH3IC4ARTd/EqNp/GQSEKn2ZO+0pOQ2Q2b87ipQ7GBjtfJMc9cY3xDRKl7F1Joe9I8v860tTsKf/fTMTlW9MXF6dGXzL1uMKqhXMjiz8Coe8ZrHqS4sgVA1sG5BgjllJqVHhI9oXsq74dodQdDXaCQYfbPDlIEPY2Mvt8KUUy7Ow4cBHThFJSFKCrmkXvSmfL3a+r3tJg/8SWcwZlAi0A4kRP3QT44VEXKkdN0JyecOBTGnfAYyz7suoaHgIvZnmIZhLZw3BQEv+QQngc58MxnGyAeJxo5J+dX+Yj6Y97q19vD3n17jHU97S/+Gs2Y8VOsZbNDbPSrw+z0TqcpP/WnbfzEyf561KMP3Stn2yeSW6gXPF63BlW8v+5TzQJ3jsiKe9rG6RM+8kO70hgwMYABj9eFGjEYV17nyZ1vkFPJw3E6voDzP4VijfpT4b8jPoFNH3wNEUXOsL5VShqZstlvLrbFnyxz5abvM0V3SJudrVzlMnqsjuYdOT5v3KDuLJox+G4dPAXYrmplq1ytrATAerL4SK2zWZOXSAZEZjJM0Yh6U4fgDMKZdayS9w4ljDymn4M0zqRhxIE4f5AjxjTIh+fxNQY0NqLk8bI80zUQpvyEw1EExwTeMBVLPoBU5Xfdi2jUvTsNRUQ8DThcMUM6Tka8/WRjmTKJK6c3dkJx3kAjWMmDg4VP9B+nCF3hHNLJGCL04BxEix4XXasPuGwz66I1TT0skh9ikRycziB7KIR+3wyVliN3QkgNToR7zxf1rSz7FuA1AmRIOzp9Ud3hzD26WxzZ8qxO9R3t7tv6ypEOt/GvDbfHHrzXNwtRrZCIq4y9/spwG/v6cOt26on+jWcV1nPRDC8uN2VVP8EOMM5Bjpk0X04L7f9L8vEvmEUyDW0WlwnyjfWGvLH+IBsfmMTN/x/CRuJUE/ifBSm1dwR1lHj67M2R89VzpOh6jKkrXTZn+7SsZelS6hxB473jxqPtjRncOEVfe4odqzuL9Bqrf8hOoWN7Wtq+WbzKvlq00nljExPnTR2c58hxutHnR7Qxakrzdsyj7ZVONqVzxNcYQMchWbiBVSpHrCd+LS0pNuTFeThcfK5fXpOucZfBcAZjGgwsxt8rjQDHF0SvHBhb6WaMNi4fO0oSMdjh93uVT8aYNJyF62iR08G5hmvXCYGnR8acM0ds5ONzqCcq45EhdUGjM6cj9B3kGPPi8nTayBjWScHn9UEHdeIcc+u8TC4T5MhBvrju+CiixemTDF3+8BOeBdpVRwzKE/MT1qVDG3h6JJOiQYQvccTtK/CNYfE0v3BosIn8+a1W8nE4rfCRZQPZL8snljng9TL4gXeftgj5Yr3hXCRDLyNE/wWUKBUq+Tm4Qm/AoySU0OsiWF+Z5Nh8jtAZdWa9LfejfTRlqRV8G17WD5FCnjU4tLocaym3o/RjnvlwVLA+nBvTETo2hjbod7yTlJH3XgdWlb9lZM59yDNt1OfesfkVHtbs1odzYzp+DrEBiwHWYiPGM66L8rgRjIyzG9DgRIJZIp8Kx9d+yR9JVNGMsLlBxhAiz/DKjPAhSh0uY5c9dVF3MJzF1wHIx2f1cOcYayDmi9Swwzz86pHvIo3Lu+MIuQIonbqFI64/5hkoKReexfSUNOolaS1KLzkg4V48KocfMa9ALKtYnuEW3pj2lUuUY8L5cnh+Nn0JC+C/exuV9Xunj/rDEd87feirl9PhTjKU8bIMKHxQUcKtAMjO5UcZ5Sty0iQx0An3lAt8BXm4/JXuTRtFpVSTza1VhUy9hyWEX5KPO3fXK3gIsvFAOx2twyqP61WkO0X1CifHz/X958f64GfcJ5DAHww+NaPe5d/uzFOUyo7fQnUkdZZ8jVnL5dm+rfmFfpRcJxk2lNk7W2QgNmZwI+AdPBht54HOLYNQqlza6h9Uja4d8slwzZv2ldsfPsXoEcFmAPAGLxg2HI0bYoyY+HXpRE6FM0fsXDjcjnPgKJBb5HTz8sIgKxjDYDiDUwjXaAjPYmfrOlZ0BgftQD2hPUJ9wel4WXLquUdauo2PGE+o10tAjdoubdffcJuVLrON/6KLB2FOF3XAczjHR5EzUh7XY9FUPO0Y0aDrkk6LemIe46PI+QrivEHGxenoHnQfemQHyyuzrdONGN2dcSHHVuQ0yUn/oryfi2XntKoM9xw8i9vOnyMvDicj5hXai9NjnAFUv3/8JdyH9FAm4I5sg9sInCdPFGWr7Vsd3tbyy+5QhOvfycfBHa9wSheokSMoTyhHPs7IwqPriJ7/FqJagRKXJSAO4zfUURKC0H4K6yuTHJvPERsPOttHb35pq77WKBTAcKl/NTp0Jyu9VTCCgEcVekSH42J9ODeqg44aKbY7DBkRNxi8QqE+V6tRZT0oJcZYB8uzH7/P2qzJX/qz9eLbyI6fQ7HBDIAZxkjRzhxhXRKDSdvpyo2dc+uHiyqKAv06jowiI8gZnJl1hXJaYWoRXSANfMGACq8bZQ29lIfICCccjCV0OyI/KAtlpOOA+T3Rw49oQw3edjwKxtoLOYjKomnsuH78Il9RchdDNT4dG54BfhZfQHAUwXkW0auDaKvkPdeOw50uuMKzmFevX1F0kB/4eY4zV33R60eAr/Uy1as+pisHojV/0Ull9Ed1BMfrIgopfo7r5AjOGn1mWlj0+M52ZYpoK2o/lfY0PQtlSdO16OEomvrVXxeJnKbjcgctLMLvbcWgQjrGJqfWh7cL5SM6OnU+2Xpcfakw/LJ8YhnIcPgp1BHA2035YpnHsgi0q7SOn+v7z4/1wfpTE0jgDwKUOXTIPJsyck7oiKSrw+dvlbb9WtYIyht1HFS2qJNuCtqL1fDReWSI1JFjwwXs1nAHK7dtYARDwzdoP+ILS258IkY3YYidCgBP8b0bSO69XUNkWWwg40hTxhXTqLQshtafB5x58hxuFCOjWXL6151D0TOMqVJ491VAmj8Hj46iPOiW6hk34U0bO/EtS+VvEZoOR4Sx9ny0k2iBBTfiqsM38iif6sfY85x0jlhfOWh7IMbjeZzHcEBTTJfj1tmvBZSBhvgZ+YpklNKALMIXAOco2TJ4Ub/RGFS585USBgaOooieMIAtyRt66g5XZ09TPegvrzD5u6hy1oG30DbkCYMVIMgaIM1xMEWvx/RvH21IeNQd92EXkQta+Gh7MnsepUVOjjaZMOld54d6wdXltFOt59WXO45fkk9oq5jWwBf5Yj3jHI5I3pRnoOIy+e8g1JRAAn8SxCM+HGrBt3TyqFNKsZn2LbXVluqYGsV6upRfxtS/4UnnKDHq3Jgh3kUaDA0GV3T7RqxCNxT1DtpJaUrHwij980+W23ffrhS7keXZhCE2TpwHDhpsfW+8ye+LAEc2foLd0PdGm79god/PnTffbrzpZkUo023a9I/sjLMutMOOaGsn/uU0GzHyJTd+bjgBGV4+K8hPxrU6/Dif4rz0Cr7Pu9AdXRzxfLdipfW770FFPG2U5zjr8JcuNmDw08KDDuEYMta3702i8Qnhz7Neffra4Cee9HowuvPmL/J3LVsf0c6PM866yH/E3Nf1qEOOJzam8Dpt+gzrc8NN/rnFIIPgsGIHBL8jR47010x633CbH3zXmKPX9bcWXRdHUMKuqHvQ4H/Z8Sd1slaKpjuc1Fn3T4oGnHBwDO6QdU868jpUEd6lV1xty1esUnmcC3oonOiaHHJMk9Oo8/hxE+xGySFMZ9/k06zvz5itZgkfmOCHymkP0lsf0d7uve+B8DF7x0O/DLwumL/QLrv8Kmtx+An+reNuZ11g4yZO0iOcXXB6vsNdQHq3s7pbyyPb+ycfBz3xhA+S4Kn3jbcHHiVffn838LvOBg35lz/7Nfnc2/9+W/Ydv9EanOe8+Qus7w03+i/6oF+nq97WR7b1MiNGvuJ8s95ajPc/h9/sVGE2CJPmQlw0sM7RL9x7I9N+LmwA44jAaNjYaCS+fXOF0PZ0op/qhTvHaLi69vsf7L3Ri5WsNKI1OaHy25SzhodF6438DJyrl7Qro3s6CDqnDrApgNPpQ2YMmnjUPXz5u5d6tPvBO1gppfOjzeHThSn7dNKXstMYHY23dY/s4j6ETP0+oNyoIbYN0DpwyDPW48a7IrqxAWJexmvchCnW88a7bf78+ZJBxh1izxvvsZ59b7Pj/tLJKlcsa02bN7Uxiljan3y6IsnJ0hWQZG3BgsVWe8995DAftvoN9vafEBs28jVr0LilfTA9/MTYsmXLrJUcKU6qfv261rTZwbZMTubMc7rLmF8qXQQX70tOsnmL5dgl4Inj31b5aZ7Ob6/y0YKhL7xizZs11XGIjZ8w0X/EfICMOAz52mtkzxguVahU0T+if9e9D+sxdnGdqwBtxxeFeom/ZQUrbf7CeTZhwhs27o03dUwSb5Ns3KS33GH0lkxiJ4UMu515vnU9+yLhKiUaDrbKqqPbuRfbvgfxDWGcOhuOTPXe6vm+EX5o5Vdx9j2ohX23TAO1GOQwPLrjoI+KRnRy3BuTrcdN98hxnu8/1cdPL4Lb2++Jp6zl0e01YJjleBs0aKB2utPq7Lmvtx1RMZzOkMNq1PgIe/6F16y52qNZ80NstHjke8SPD35CuBhIuxmwi6/QQOWo453Glk0P8W8Odz37Euty9qV6nvH16fmLFgtxSs73TXtfdWMfhgx58ifyAVnDg5p62QoVq1gzyadS5Yp28VU9/YfVl3/3rfeZuYsWiL+7rZd06/iTukiG5UVjEw0W3rYOp5zh78z6AFd2iIHCfwOi5rcBesR+iniRHWkRnvsP1eLpc+v87CNCN6xhxBALNgCONoHNEdwhoKQYVylL2I0YjK3+sD/JPhi9xNaulo7Q0WUw2NRy0LE1bMut6DCbNyCLiluXtx13q6SbsF5IVD5jCj8CHfpF5I8FP+0nGMONHX7S/iUGBX4mTbzFgyvfJSzu4zKT5Lj4KPodt95oPa+9wp57erDnGyJHFjYQpa37Vdd62phXnrV+t/a1nldfaR9MGePvNF585bWeZ9iLr9r0GbPsjtt62l2397XeV19l414dZk1kxDHO8+YucjpGvfKiNahXX9gKbfRrI5X/ZqVn7a77/qFoeKXqeF74LxUtV9k7b42T4yzr0VwMYfpXHIj22rVqWrtjj7ARL75k3yqSlnfyART1DB/5glXUQKHtMUfbGR1Ps1GvjrBxLw+3sS8Nd7r4JR1ENPAftwlbENbjQ562wU8+ZXffcr09/9RA63nNVfb4Q/fZXTf1sWkzZ9vd/R9VvVk5j2XGr/q0bNZYOIfadddeaY8+1N8uuOBMmzmDQUIMwQa7LY7kXRImThhvH380w8a8/KztK5nMXTjfo/P2xx5p704eaz2uudLuljzHvfy8LS9YYZdccZ3zBt67+j9sBQXfqu2esz7XXG49/3aJTZ8yzipVLG99brrN2592/kD09Lv/ETv//LO8bZnOffwf9/r5n0/+08aMm2yjXx9hDaPfROWaD/LHekI7BX3JWb97/mEzp39kd97S2wY83N96/F3yebC/3XFzH5s+c4bXw4cp0jgqOcvxb0yU3NGtvtZD+vCM6meAMWjQoKCnko17/f8CfrNTXbZcoy2NFgMh61wJw/oGC9pqLEZPPtohusD7Iwyey6BGRiOBzRfccKqt/ayIMxidsDGA4deaVWtt6uiFUT7G+BnbcutSVvcQolTyb97gxkG9cPdDtpOw8uRHWf/Kt5XfZG3xJ9/qmfqV+oxMXzDaHg3pTF6NvDd2iI01tiA4nQDF6UE3ANeByMBjztq0Pdbq1Kzu13wSj0iG5wuYJmakIdm8oOixpSKN2rXDD3AgG34lZowMZi85WEuttS6nnmSZ77+y0087VY8DHehfa0UzwKKFS1y+DGbQQOrLZdfICIs23Tz+yF2W/f4bq129pp7IjmWy/msuGPt5i5Y4TdCTlw76Gt937XiKLZczHj7iFaUVT4+OeOFla9fmSKtSkV+EiQH3qah9/BS7/Koe1vm0k61jp1P8CTIiwsMRX3j+OUoQn9GSwkUXnOXpw1980Wkd/8YUCtixRx8lSsWN+OS45MJz5dTCj/r/XG9i+XvQE8nwwvPPtW0UNUJvVrzwc2+m/nitHJ7/ILhwoLv8ss+xbRg8iEeaRGmPPNTPCn9YajVr0iaSZ16+aKxo9es1VNt97vSQj8EF0+andzrJP+qA5JETv6s76qWhVrtODf95OQA6+EAMbeJrxd5SAH4lZ8OkBwC/isNnKtmsxSckL+l+rpUvX96eH8lvuIapXWpq0+ZYq1VrJ6eD/C2aN/by/Dg69om8JfX1P4ESTnX9CBDeLx3TZ063Xfba1447uZuPphCK7z4TYb6wXAJ4FhOKIH7+ygBK8XNYX53Jsekcrld8DUVN7ZEouqHDjZjOb70wz35czbdJs1aozobCH9K2lmzGOncw68O5OR0+yJRc6jWu7pF5ms0gDDpsnc2a9GVwADIosUGO1+SwYH6/Hpx/5PFzKDLQJSCmP+7v3AcQjp/YgWDIwvOsG2VcDZGFcio9csB6zjW/G8pwo36DekW2JpZRwwZ7WYumMpTZLTxCIT9Tq3fd/7D1uvV269H3VhunSBj04A68QE+gDZrcIWgQk87k2/Jl39iYNyZYr5tuV7R1h/W6/nZbNH8ROZUvBAsx75yho60cZy0NCvhQPLiVxYaOGGErClZZx9P+EsqoXtKp9juld/hLV6tbby977KG7lUY0SRubvTFxihxTZZ/a7XHjLdbn5lus5403+TRxxUpV/MfAganT+Xh9zhohE4kEmxvLv379hiJX19GsodOkyuPnQJC9+Y+M+0yjHCrv6E4YL1lJJ0fIeV1/4x3W5/rbrM8Nd+v6ditYXuDtMOaNSWD0vr1y2Sqfrr/+xlv991iRG1PdyiinHHZtj5v4rt83qtfA68ymgn1gWruFBlC1qlVzvOw1kKScl7h9nGa/Cm02QW3bNPrpPOTmbaqy6NO+DerajBmzFMTxowYUzmiAVA1CvKw7WnilLhRCQD7UsqSur+9YH8Ta/F8De+ogZ6RGAmecfbFV2mFn63LWhT7vnka5olFJYJ4GCgIN60yBgQQ2X4g7LEcqH10IsxYcK79erSh1kZQTBdYoUmpSpXo52/sgRpBSdCn/5g7BSLBskrLaDbdVgmTkhi1lH05eYpkfw4wOcnSD531HTxmARB+M2NQgNuAAPMUD7cBjiOj83gdZGC+/jWQVTJYbQw3WeM4R/zQaqGKHSF5M7wezplvtPfb1tbV77nvAJo590ybK4H+24Eu3TIDrJ84bY6l7nIOjUB2PPvm01d57fzv0yJNs2IgX5Zwn2Ng33rRvV4Y1Stojhljf/VqndsccYdNnfGTziK6FdfiLr1m1ajtZq2bNnEa3g9Smci2PaKNChTb86YFe1qM3aCAqF6xYvtJ/YP2NiZNt7NjJ4uFt3zhUs8ZO1qJJ44iOIAd3D/yIuN8SoUWmHifprxkFnJwZFBQ9jyDIAxngoNRGabWL8LD2O3b8G6p3iq8rj5Yzo9+yxrt1hUpe74Anh1jNPerZEUedaM/LCVNmvOhmQxlAmzCIDjcl2luI4gGKA47fo+eQl2deGc6XawHyc9qRE7VHdDuobNCFgC9cq5x4zvM8lPtpGXSgCGIZ/YdQQpI/FWoMYe3z3x/Mt3c//0yroYaFsIKVBTboiadtn8atrf4hze3u+x+0b5evEiYx7w0dfaZM4EpbAkoqZwzrqzM5Np2DgRObk9xYsvEm6gyZ9BpFqZ9JoWVY0D1ZQyZ0Wpy4u57KuLEhSQZufTg3p4O+EP8E1T6H1ZB86NTcY/xS9ukHX0UzPxgXXZDXHYhkhrNdD84/8vg5FBm0CNwwxwY6Mm5AyBcMdlgegkfMdnF5L6ccbvR1FTsNxuIlI0M30OgZkV0edCkNQyyjyvUlV15nCxYutjEvP2dzP37bxr76vI5h1rnT8aok5Ad/SfoA6ij47lu7/IprrEqF8jb3w8n2wZSxNv7lYTZeOBoqooyBssEdB978WvVfxHSt7th5TDpTwV07nRzqEx9xvouvuM5mzPzE1xarV68qdogwwSkn447ErG7Dujbq1aG+fjxm1HAbpTPfzWUdduyrI7wedzoC1xfkgWdWOoMN6ne5R86iZPsRvZbkP+bBZSMnlgcdSh8D7y+NsLGvD7XRoiWue/Qrz/tGMdaPL728p1WuvLV9+tEUlxdlxr34nDVsQEQanFgmdnA6XK2pKBNel+E5aUAYcOkmIo1n0B1P/pIv4CFXkBnLkMgXHeBZ2GwVl/VLJOXP3UH7QCrYpXWKWF1GAmxWSV1f37E+WH/qfwDscut3600276P37d1Jo637eWdZg+h38mZohMbP+WxbdWc74S+dbdjwl3zEA9EhdOZIYPMGzKY6SvQyOjqNYv+wlI8cLPXnAC/O77h7Rau2R0XlI2+k/Zs5YPzi0fQ21SpYuW1LS0Dhw+1YivdGz/fO68ZVRtLlRWeOrzdycENGu+v874Cdo3Gen+TDKWIoxW9Ij3RF18inWbQONkGRmwSiQ89ZYtDzAU/+03r1vcV39o6fMNmaNj3EmjdpIp8TGW3hnDV9lpeh7njamQOI096fMcuWr1xhnTp3tNo16wQ6QymbFu0ujvN7WeGOVZe2rVmjurVoepCv+Q0c8i/f1MNaqzsCh6y/BnJv/4fsjpt7WYuDmcLMF53iA0NPhKjBKLto3xAfzOCwCYs6/APzyIUBBfXKCdSrGxz9+zNnBscEHvJIp4hy/RqXA62Sb7iOo7NiffLnAnAg66Z8BF/n8YrSEXWGtU6VD/igJeuy5VWVghUrrbN4rF2jtgpLb3Fuwjdt6gzPC0YGk60cJ+33ZnCewoeeL1j4ufVhen7sxIgOdB0dYPjNPfVyDnRySaQ+QbT58Etp8ewH5cZPeMOfBzxAMc9BbkLA97k1IPGgVyyRHvP2n0Jcy28ACQzCJLhGDfawu269wd6fPEZO9l2768YbFMHWcKaHvviKtT+tm+28VyN7d9pHqlijEkYKCWzWkMuT8mpkjOPgZ6f4xQymuF4eJIMmvfF+TT6NGBu32cWv6cTxKHGzB3Xk+GVzjn1aVfN7jDZR63cL19rSRd8Fx8vL+kpDNtnUWu9XmwLExok1UmDChAnBZojf+QsX2AsvvOD38PhTEM9MzyGK6Az4BjbkICm1bXOUjZ3wlk2dEb8PKictnKefdZmN43OBcjxs0OE3PP3j/aoHnWSKcgzrkCqybMVyL+tRTVQJRpmvMbG+xyBm3oIFpAYdlvx5rzIix3cGe3uVgHhQCEudTjvVFixa7GuLzZs1lrOp6dEnWabP+NAuurKHtTv2KLvogr8yG+r9xXlnCSSCrqeeJJxZ69m3r0deOB9InTpzutXeq6H1uPlWp38fD2jybfiLL0ebf0CYtn73PhDQQqY7rygajBxjiPICD0EWYdYAG428u3Q61cv0uulO8Y/rClPI8N7owGbW4ZTOSs9ZhcoaFCv/wvnzlFtlhYv17i7nXORrvEzTL1tRIJlm7Lhj2yqP2d33PSC+WRYMOtH7+lusz423KzM2ABwwIkcsYYb3V0V7FJEHpsw6dz7Z+bm3/8Py40wJh4Ep79HCf9s2x3o+hO4zAOpjAUSUBiUxPyIs8P4bTM9vKBpA9IkmRgtClcv3F7hhpNtfL7RLro5fwlZFkbLOX/ilHXZUG5un9PAL/sBvJiOBjRR4r9QjVXUipu3S6nCff7zKFs/mp93QCR1SkNoNdrBqe1YIZYhM6Eixx92MgQG1mzh1ZGDvg3d0GfHOKoYEwzB70pfe8d3i+nqSZxVsGv2G/k9bdj7tJD6wY13Pvth63niXXXLl1dbqiHZ2SNOmaAFuwts9nq6Lp++wlrgY+A0uQgZRcsDZ3X1LH6tQoYy1OCp89OGSK6+1hgcf6jti+916vRXK+Hbt2NEWyym2OKKN9ZBT6HBCF7vv3oftsYf6YUOt29kX2qVXXSca8q129R297vannGk9b7jZ6jZsYI3q7WVDhjxjXc690DcJ7X9QS8uTh7jogjM87z4HHmYDn/inrkJ7MLUZDwizuu7W8SSrWK6CzVu8RA6WDUqyl2pP5HKxHGrBihU2V3az1VEnWPPD24uX9tby6A7+MYRp06a57HDMXU79i/WV3Foc3kGR3J12yd/+ruvjbOXyFdbt1FPdqTBwufj8bjZRA4ZmRx8vOd/hH17AJrNRye21aHN5RlG9yxnpBy8r3Quy5pYrUWu1NBDgZ9vAW3vP/ey6G2+V47vV9mncwqbN/Ej0dRSZGcmqrtWvu4sNeOIZ6yy5Xqf69zu4mdo9axefd47r7r4HtfLn9Rru7TJ84YVXreURJ4rW263FkW1syJNPW5fTTrYmzQ9R5flWs3p1b+s2J3fyTVLQBc0xwFOXjqdZo732tsvV/t3O7m7X3XSLHfeXLv6eassmB0gmZ3nejA/IcKxhcBpA/NO1dMUMhvsyOVgXx38BeQce2LgXF0e1bhKwSoBMukCpn38VcnKUn9uAIUPsgosvt7/3vNleGTXe03hWr/6edtP119mj/+hnhx/WwkaMHKnRzSpX+pbNmyoLdTEaiuqK6r3h1rv99rqrLvFzApso5AWjyPQPo1SmgV8b9KGt+pafnWLXLwqctuMvamRbbFlaeeSA3XEwUgb+f3Rw0wX/fVhxis5j1PJL5dnXiwts+dJV3hNxHt9+9b0dcGRtdY1SLhvy+tqTyv/Z0lk79CXLfr7ESrc/xtLVdozo4a+o4wQLfifDXKeW1atXz776aql9+vFsK7PFFnbbbTdZyxbNbPttt7WWTQ+2KhXLgUDRZWVr3vQgRXU1FNVJRnIAab6nK71gKrdRQ0VkMoCVKlawc/7azSqWL2/j3phiX371jR0tO/OY7M2eu+/mr2AcfnhLq1CpvH38yTxbsGCRHXVEC7vjlhts3/oNfB2wds1qduB++9geu+1iLZo1E46ltvSLJZYvwtsfe4SdeHwHW7NmjX00+1NbWbDSOslJ8t5siyZNZccq2B577GotRPuO224jp1ZDOA62ykp3D4IDU8j41jsf2BdfLrGH7rnTthDfGHFkgnQa1t9btO4q51HVdq5dUw6sml/XrlndDt5/f6tYoZx4z1qbtkcJf1XxsMA+ES1Lv/zWzj7zdHv04ftsh+23ln5IjySrww9rZTVrVbMZU6fbQjnrOroePPARq1SprDWQPW7ZXLbeI764h0Wa5IPcnOqobi3k0OCBqJ6NQvTdBnX38g1JTO/OmD5DdCyxZk2b2D8HPGgHH7iP2oa+m7aTT2pva39YabM/nWcrly2zropye1z7N2umKL1SBclrt93Uto1tx+23tSMPbS2cTWzegrk2bfp00VjZrrzsIutx9ZWWnwuDp2YadH219Cv7ZulS8Zi1dm2OsTz5ifr19pSsG4tsvvaUtbPO7izadxJts6Rfn1qZLbd0XHfefouXY/DKzBCvMjVvcrDLEn+DzQlKmhNdh1jDBnV1q39Ew7/qWdHzlC1btsLefn+GValSxVIXdr8UiVq/G/8WlVfl7q3D+ddg3MSJijxP9Lls3wusUVXF8uWkjMdY9wv+ag3Vidxv6g9h/NARL9nxp57uc/RjXhnho6KSdcXXW24d3jtb8x275hLYZEGKyciYCSvU+qM3l9irj89yHSbyQtH3bLyTHdZtDzLrX1gvY+onneHzhMVTYJsnMEoWrwpZ4Rt5zJn2jb3Yf6Y7EJ/21bNjzmtouzXaJuSRPBmdM53G+c+ElZ0vsMK337Vyg+63fBlW2o929KlU+j3tJ4MG+D1RGo2vSADamYpjSi/NN2wxfLr3qF2GkvcHA+AsVCSjAUU8Teg4MeIBj4N0LTyLbYmforzUFcrmhNfp8IEJWhnwM7ULKhyDD/agg5R4itQR6hzRSHmw5NRGTrvTX4I/d1JZ+275StuZ1w6PPdoef7Cf10EEG+jSWfmYbva29jqhNdQJMqdNl7Q9uB1vjN+nLGP+Ijp15hsH4OMx8ZhH/OpTnNExZo/4G2gOEZvXR38VOnB4X0TXovo9D1UqnXvycPa29rIBD+UYILoc9CfosOqnJGkCJByiQhAH+n2g6PyHe28HbrmOaHOe/Z668SmKPsUkPw0XPsqPkywdVI4BKIN0x6lb/BP8RGk+Dey8iEFdIQ9oRSYeteNUmSH6RYCntH02d4Hd+/ATtssuu4iPIgiM/Bx8OuaXDgkykFPo0ySP/eNum/vhO/b4P+5xhxrw0nCOTiO78khEI7tmrtIlIRZ4SVhvncmxyRzuALyThY44ZeQ86QIKi5Kvs1JlSlnTk3bxZ7GCoshuBFD+9eDcnI7wGkEkH/iXYHZusIP/mIC/WsM0oc4fT16qSwxTLKdg1NaH8488fg6xAYsh/BpPyEcbBz1AL4Jd4N5/6zPKExvj+Fd8Yh4zRKoyeL6z040l6ciMdw+hBXQYWgy1simNfNTh+iZcOFMmALn3NJWnZs7eBiilwD+S7/UrLebRnRdlQ96gwNG9/1g2Ohs9wxDLERNoqHa7+KrrlCelaO1Kf4SO+8YenDJyEG/hYwVBLk6T0vya+nH2wquqivIoUWnKI1qDnPjpOKVTr/IhU/8YT2qdrx/y7d6cHvgEumSk0kFmAnD7a1sUUV5oCS2CfKEj5PEyTkegkUGIb4QCj+qlp5M34FYe8tE2kg/3xTuzQ72+6KvclOPwPq/70F7Kp4zelvCpa8pRfywL3XldadYUkFeWDV580hQcfIhIWaAxBskotBP4Qm/z+0gO/GAAMvM6vN7Axy8d64OgRb8BKikq7dLpZHtnylh7d8o463zqyVal0taqUESJ2WBUIUAqKSZbtmhqmVVfWa+rL1HblmA4gc0S6NDeQWUQp46aawXf/hDSUWR1gn0OrW5blVOUIgV1gyg9le57f1OK592cISM+6SEeT/hHMojMs7b3ITsiPJcL/z6b9oWt+x4jgCGWnPKi6GBjB9o1MpIAuhDTTXpwBlyHtNjABQgxVZzP9UG8B6dARslHMgtFEWQwkOByI51FVjwLeNFBDpwaNEALEBxTsFHU47/tqzP33jYYZuEOu7KpQ6lRHeRwZ0/kKKcRR2vgP/TINlZnz/1s8JCn/POItWrsqHLB8XCONxvFhyjwejgXpbvjATirdmUBt9OZk0yUCeNOmaA70IZj1WDDKVTfAifRubwl+SjrdpnOJqCeENXiBEM0j+qBi0VwcAWnFjlT0eDyp01cFroWxHSH9hJdHhkHnqgzQ0NH9Hle+NAVEB4h89A+Ln86BzWxwUxpPnvh5cNg2585XcV1Ah5l+jvMwYnGz52vqP2CHJQvjvQJDtXMvv/D6w94/xsQpTGUuCwBQfj//tinQQN7VFHpvvX38JEJI6QMuxRZSxPBTFE5iGKeeWNFyv/zqb31MbG+OpNj0zn8Yx9qaz5HOOWFRWpQDBgj9TzboqycaquqliqUgfCOToMHvQkdEcVeP97N5YgNskddGLZCRthp279lbRkljAmmMXSiDyd94aLhvd8ci3KYiJ/h+6OPn0Ns2GLAqPtUHcZNvMQfskAnigxrkXEDwnNhDzKhXAm74AY1wgf4bnIZRHcGGRl/HIVGbG485RCYosVg4wxYXw0RIvLGsIJH+HyEFwC6Aj0hOspwLfyOV86FstBI2XAE4wsffmDfBNDftGlT30Dz2Yfv6vwX5QzyCk4w1A2tHj2WOCPXEMXi6EL90OvTzd5P0BnR55EzaZQRRujg1TVdu15Rn+Tq9eg6RIKBVoDZTdAHCISHe5VT//N70VPyt2iLZa8hAdEglUY0+zV4qBPakZV4jWUDTWEWINgAP1KlXBZ51AdP3n4ZL5tKE3XGddKWOH2V928dBOdI3TFdzhdMMftDvZRxugNOJ08A/V7enTZ0RBDJGQBXLOtfOtYH60/9D+C9GdOs5ZHtrNURx/tuteZHtrXWR51orQ7jJ3/a+88ktTzqJD/4ZYCJE8K7Ur6l3IcnCWzO4E5A7T197AL7cXV4JSTu3M1P3MVKly3tAzDy0BFCh6WThI64+QNdEL7hd60bHuxA2W1K29bVy7iVQyTYmg8kQ9+DoMFoMKK/uftueJAxw8gRlWEo8/IUEYiX2NDHxrskBENIHtofoxwb8gDhMc5RxjjSp0x2XTDayhf0CPuicqrXp5clN+qnPsfHpZtpXF1sPKmLdsBZKR9Oy418MLChVmgKcqc8NDgOJTkOfySnKSZ7XXuVjkutDh/GAU8UBVK38+NyKMEXz3TvdesagAfqpy548agxjtzkBByJ00cZ6I5odUcnOciJ+Tub4jnwGWRDuVBDgFjmzr8unQ5loAzvpHpkGDkrYVBO5CUa6ODIlCSvk0fIhO/0IsN8l1GQo2hx5IqeoVlpgWd0OqZGuV0mCCc8C3n91p08/AU5Kg98OG0RDSpfUo5AkA1p8A8e2keOmUaL9C8uE589LZz+Y3AV+C1QsGyFTeSzWXy2atIUfxF7/IQ3bfwbk23cG2/5wcu3vDTc+8ZbrdXRx/vv8ZUcHSawGYO0eOU3q23SyAVSVm7VyXRRfpt829OnOEMndlXESOBwpej+kv7/gooUGUSEg7FADpKJIrD9Wtait/tGDN6ZXPH1D/b15wWSSxipbwpQZADFI9fYd1/vk4H96ZoneYM5KjJqMsxeNjKobnwjx+EgG4LxdmcGbndwoR6PYCRHgDIu3ljO0q9wrefImrMg1IuBDrjCFCK443pxYsHoh7TisnE6m2Vcf5mKza7RoTz+oX09Z23Ts8M/6aw1UiN0qCxV/uw+OFAcWUgTFi/rztEdVajf6aX/eLTlSU4PO3LdeRDhRTzEeYvyCQWHR8rcc8NgiFrFH8UBrpE1NIT6S6QrtYhuIQYX9flzrwckQUZFDs0h1OFyVFnaA/oCnwzEkCVDihhXGF7EtHOmPqdBBPn6MXTR/siYEyUkR6ePMuT1+1Au8EMZdCnINObtv4GYs/8aKlWqZM2bNPbPFIoFMaZGUXqgSQT6ETcXAjEb8MRT/pWTWDC/TIZEkS70aZ6Qn3PxtSu331MPChEJnAbyBNYDJED/VF5xYwQ8oVFiHJ7q00nkK1FP1DmBuAzPQjlSA5+ujALHFXfoCA80hLMaMKrbOzR543tAURs0kCvmwXGwewAoUaaIx18CzxNoKKKJnXKOQxDxCu0x/UzZF9cnakvchzwlcMV4HGJeMTrKr7IYznFPfRa1PJzL6GikekSXejoHvkOH4Jk6jgyZd0bwqAMXy5e6qB96QpvStoGWUB91F9Oja6ZJo/vwPOCIeUbWcbn/x95ZAOpRXG//XIsrTjwBCgRieCAKFIK7tEiwQlscWmixQosUCsX7L6W4FA8upRAlOFGsFOJB454r+Z7fM7v3XkIECBS+8p5k77s7O3PmzNGZ2dnZHE9NHeSTkVKNrtP9JO/8Oskp1ZkcltoIv2wHKQ9kci99szPxmV/wVNdB71vGnDsOOwS1fb3NVqcy246Dh3r9I59N35YU8R6FUA9H2goytS
Two parents who are heterozygous for traits A, B, C, and D have an offspring. What is the chance that the child's phenotype will be ABcd?
9/256
Name five symptoms of cloned offspring syndrome.
Placental abnormalities
Fetus too large
High rate of spontaneous abortion
Premature aging
Early death
Shorter telomeres
Name the requirements for natural selection.
1. Trait must be variable (more than one allele)
2. Trait must be heritable (encoded in DNA)
3. There must be a struggle for existence (more offspring born than the environment can support)
4. Different alleles have different rates of survival and reproduction
Draw and explain a Hadley cell.
1. Sunlight at equator heats water and air
2. Water evaporates and rises with heated air
3. Rising air cools, raining in equatorial regions
4. Warm dry air is pushed out of the way by hotter air
5. Cool dry air falls back to earth
6. High pressure of falling air redistributes to locations of lower pressure
What are the reduced and oxidized electron carriers? Define and give an example of a terminal electron acceptor.
NAD+ is the oxidized electron carrier
NADH is the reduced electron carrier
A terminal electron acceptor is a molecule that accepts electrons at the end of the electron transport chain. Oxygen is the terminal electron acceptor in eukaryotes.
Give an example for incomplete dominance, codominance, quantitative traits, multiple allelism, epistasis, and pleiotropy.
Incomplete dominance- white flower mates with a red flower to produce a pink flower
Codominance- type AB blood has type A sugars and type B sugars
Quantitative traits- height is determined by how many additive dominant height alleles an individual has
Multiple allelism- there are multiple versions/alleles of the HLA gene
Epistasis- labrador coat color is dependent on hair pigment genes and melanin deposition genes
Pleiotropy- the frizzle allele causes chickens to have curly feathers, abnormal body temperature, and fewer eggs
What is therapeutic cloning?
Therapeutic cloning is a process that uses enucleated eggs and somatic cell nuclear transfer technology to create a human embryo clone. The embryo can be destroyed to obtain embryonic stem cells with the same genotype as the patient.
Give an example for all prezygotic reproduction barriers.
Behavioral- birds sing different mating songs
Habitat- walking sticks only breed on their preferred plant species
Temporal- some toads only mate during the day and others only mate at night
Mechanical- the genitalia of two snails are incompatible
What are primary and secondary production? Which organisms are primary and secondary producers?
Primary production- formation of organic matter from inorganic matter by autotrophs
Secondary production- formation of biomass from preformed organic matter by all heterotrophs
Draw and label a diagram of a mitochondrion and chloroplast. Which locations have the highest concentration of protons?
Mitochondria- matrix, inner membrane, intermembrane space, outer membrane, cristae
Chloroplasts- Thylakoid lumen, thylakoid, thylakoid membrane, stroma, inner membrane, outer membrane
The most protons are in the intermembrane space and the thylakoid lumen
Draw the products of the Meselson and Stahl experiment. What did the results indicate?
No replication- all DNA on bottom of the test tube
1st round of replication- all DNA in the middle of the test tube
2nd round of replication- half the DNA on the top of the test tube, half in the middle
This proved that DNA replication is semi-conservative.
What was the first mammal to be cloned, and what is the success rate of cloning mammals?
Dolly, a sheep, was the first cloned mammal.
The success rate of cloning is about 10%.
Besides natural selection, describe 8 other mechanisms of evolution.
1. Mutation- source of variation
2. Genetic drift- random change in allele frequency generation to generation
3. Bottleneck effect- natural disaster kills a majority of a population
4. Founder event- a few individuals in a population move to create a new population
5. Gene flow- movement of alleles between populations
6. Non-random mating- individuals have preference to certain traits
7. Positive/negative assortative mating- choose mate who looks phenotypically similar/different from you
8. Inbreeding- mating between relatives
What is the MacArthur-Wilson theory? Draw a graph that illustrates it.
The number of species on an island is determined by a dynamic balance of immigration and extinction. Extinction rates are lower on bigger islands, and immigration rates are higher for closer islands.
Briefly explain the pathway of electrons in C3 photosynthesis.
Water --> Photosystem II --> Electron Transport Chain --> Photosystem I --> NADPH --> Calvin Cycle to produce G3P and glucose
Describe five methods of gene regulation in eukaryotes.
Co-regulated genes have the same DNA regulatory element sequences associated with each gene.
Chromatin compaction determines how much a gene is transcribed.
mRNA must be processed with the 5' cap, splicing out introns, and addition of polyA tail, or else the mRNA won't be translated.
Binding of activators and repressors control the amount of transcription.
Alternative splicing of mRNA produces different translated protein products.
Outline the steps to alter DNA in the CRISPR-Cas9 system.
1. Cas9 binds to short guide RNA (sgRNA)
2. sgRNA binds to a complementary DNA sequence inside the target cell
3. Cas9 cuts both strands of DNA 3 bases upstream of PAM
4. Homology directed repair replaces fixes the double stranded break using a template, incorporating the desired allele into the DNA.