Đường cong trong hình bên dưới là đồ thị của một h...
Câu hỏi: Đường cong trong hình bên dưới là đồ thị của một hàm số trong bốn hàm số dược liệt kê ở bốn phương án A, B, C, D dưới đây. Hỏi hàm số đó là hàm số nào?![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAANYAAAD+CAYAAABGHPt1AAAACXBIWXMAAA7EAAAOxAGVKw4bAAAgAElEQVR4nOy9e5BlR3kn+Ms859x7q/rdaqm7pe5W6w1IsiUEshBICzIGAQM2I8w6WDye+WdnZwIt6x0TRGyswzHh8JogFgIizDq83hiM7THjDbOMWZsZgyVb4mEjA0KL3o9+qEvd6la/qqur7r3nkbl/3P5uffe7X+Y5t6q61YL7KUpVnXkyv1dmnszf+TLTeO89pjSlKa0p2VdbgClN6SeRph1rSlM6DzTtWFOa0nmgacea0pTOA0071pSmdB5o2rGmNKXzQNOONaUpnQeadqwpTek80LRjTWlK54FqO5ZzDmVZwjk3ku69R1VVKIpirIz3HnmeQwvqKIoCVVWNpfd6PRw9enSEj/d+pC6qz3sP5xzyPFflKooCZVmO8SB5pVzOORw6dEiVqygKOOfG5CqKYqwu5xyqqlJ5O+fQ7/dV3rJ+WUYjaV+yT6/Xg3NuJI9k0vTr9/s4fPiw6itNXkqXPMgmVVWNpZOvtPS5uTnVh3mewxUO/apEWS0i7ztUCws48b/9e5z4qwdQlSVylPBu2VbUTqXMlE58yFbz8/M4derUiMwk16TtWlJtxzLGoKoq1fEkhEZa4wIQbUS9Xi9YhmThpDUUel5TngYDLT3UgMnokrdGxhh471XdQ7yNMdi/fz8WFxfVMnxA4VSWZSMHEw/N7rHBMcYj5HOqLzR4aM8vLS2pdZGtzLn/fAL4U6dQ/egpWOdgvEfqAWeW6yrLUvUTtV+exwdHTa6QD0PtWlJtx6JGRZ2IGi0Zj/LkD5XlP7ws/5t+SPG6MkQxuTSZQnmUFsrjtuCyaOmhejTdqEPfd999+Na3vhWUWfuR9YXkjOVpvpb6NZGF217Tk6dpg16wbnjAelifwFnAHzqIzlIf63dtBxIDU3lUGNVFvnm0NytvPyG/1KXVUVr3QFEUyPMcAJAkyVAYYqC9zfjbx9rlvkujBL0F+QiS5/nY9Irqpbq897DWDnnneY6qqoY8SC7iIeXiUxXOm1792uhF0yHpgKIoYK1FmqYjvGPTiF6vN+JM0u348eN47rnncM8994yU4W8TORLneT42ApO8NHInSTLMp5FWvjXJ7iQbr494cB9ym1hrh3pTXUmSwFo7LEMNm/uVl6mqStVlMOUalLcFsNT2WH9wPxwqVJetx9mih019g34LcKiGU0FO5H+azpNMXF7ixeUiH0qb05TWWouZmRnEqLZjtVqtoXHJUSRAVVWoqgrtdntMAGMM2u32WMeizkkOIKqqCmmaIsuyMQNQXQBGOpa1duR56kzk2CzLRpVNU1RVNdRJ480bIxHx4A2C5OeDTVmWePjhh/GWt7wFjzzyCG655RZs3LhxaBPn3NAm1OCWlpZw6tQpfP/738f9998/0mCrqkKSJGi322NO9t4P9eADnTFmRF7iTf/mNiEfpmmKTqejdlTpQ85bs4n0LelJevD2Q3JJHtR+kiyFNYBNLGZNH9VLx5Fu24b80q2YSWaAWY9OkiIz2XCAlTahNpNl2bAdU3qWZSN25H5JkgSdTmdEb+qosr1r1GiNRb/laBtad2jPynQtr0md/G9qSFqeVk+IR2z9VFe//Puv/uqvsLi4iC9/+csjnVQrBwBPPfUUer0evvvd746t82K6SN5SP5ke80fIJjE7xtpB0zYSK2+MAQxgvAGMQSvvozpyDNmOnTBJG5mzcIkBFdXalkxr6sM6vWPthWgKt68xve1tb8Nf/uVfotPpjI14nGj0e/jhh+G9x9zcHJ5//vkgMPDTSBYGsICzHnapj/z4UVR79yBBAgsPBwd7kZpr2rHWkLz3eOtb34ovfOELeMc73hF9lqZ63/72t4fz/EceeWRs2vXTTMYbOFgU8KhePoqsexbZtdfAwQLewRnA6MDwq06NUEH++yeBzpcu1lps3boV1157LW6//fYoH+89zpw5g0cffXSY9tBDD62ZbK8lf8XtBHgAxZEjsL6C2bMbznmgfja2Kr6rpVWhgvRBVBJHBTW0h9A0nkdoFvGieiiPz4E5KkiLfZ5HiI4EL+gjqYYKlmWpflimj6FycV0UBZIkGUE3q6rCV7/6Vdx+++3YuHHjyMdw+thLC37nHB5//HGcOHFiaNNHHnkECwsLmJmZGb7RSEc5ryckTdqX5KXFOPEmW0p/kYxyfee9R7fbHbEvEX2EDqGCZVmO8KY8Iml7sotm99SlcGkBv+9Z5J31SDZsQFLk6CcJ0Af63sG4ZR9yW3FUkIAg0o3AJkL6SC4CdELfscjusWk+0KBjJUkybKDUsbhROOTMBXDOjXUeImPMWJksy5Cm6Ug6f1vKTkJ5aZqqqJUmFzU2rS7iLeV1zg0RJclb8rDW4r777hsij8QzZJMXX3wRN954I55++mns3r0bW7ZswcmTJ7F3795hfWQbSa1WS00nXXino8ZCiB23R1mWY3YnqqpqTHeSh6Ox0iYSWeW+knak9iV5VFWFLM1gkaDtCyzOHUV2+U4k69chUdBb6iycB38jae0kTdMRexFRO9dsorVFjWo7Fo1K0mAckQs1bA75yvpCyJLmLJ4vjca/mUjemlzy7cPr0nQJ6UgNNYQuhRoXt8lHP/pR3Hfffbj55pvx2c9+Fvfee+8YH00PKZu0lWYT+RbjdWhvJV6P5kPuR+KhIXBSLuIJLEPxkscwzRp472DyHpKXT8L8zE3AuUYt5aW3kyYvvUF5Gf4ML1PXfmTZENV2rBCEK/O0cjGINwbZBuHXmrxJeHPSOvBq9GgK19IbhBqF7Ix18O5a6B7Se6W6a3LxTqfxivHwAPyZ0zCvnEZ7z25UiYXF5J9yNN40qGg2mNRWkqYQ1EVA2ptkSgAckHsPHHgF1nfhr9wF718bdnptSDmln07yDtYC5f6DKGfasDu2wzZ4W1wMVDsVLMtyiLbIYEZCYuQUhqNmckpAiJ1EuijmkEco07qAZABG5+cUSydRwVCUM6GCch5Oc30tMpvq0mIe5ZqBI0qaTUgPzptsq8W6cf20dQOvi+Tm8vK8WOQ35XPiOsq3KflQooL0PF+zkW25TeQaS8pGvJFaJK6P3nNPo9q+G5jtoGQxfNKHtJbSbAJgTF7Z5iiPt1/pw6IohuFvMartWDIKnStPnUM2Ru15ns6V5nmhv0N1yTqb8NDqkvXVleER0015a7Ly9Lqob41iz4dAmqZ1AaO+j8kVs+dKeNOzhfEwi4tI5g7B33ArqiyFryoASaO21cRHshNy3WJtro5qOxZBkkmSjKGC9H1kJXC7fJtR4KYGtxO8Kw1B0Kd8m9CIqcHtxox/36JGKAODgTDkDIzD7Rzh0mxCnxTkm5rsIcvE4HatLtKF5JW20uSKQcsE6Use5A+NBw9M5une+5GdACQr6a6hmEgT+LMLcCdOIrv6KphWG1npAYx/MuHBsxo4pcHt1J4lRE/tTvMhBS3XUWO4PYS2yCkdz1sJoiT/1soSSbRpEt4yPcQ7hmSF/r4QSJ7UnY+iGhjSRK6QrJP6UPOTzOekTXWNMbDwwEtHUCFFe+9l8MhgUA2CcxvKpMnG03hsZhNUMGbDEZ3qHpCvziavQXo2VlfTMmtJTaahPG2SaVNdHqXLYwaayLASu0xapsl07nxRiI+FQ7HvIIp1HaQ7tiPxBt7oZdayva2F3o3OvCBm2tyV3lpNfng9Wh7faxWax0tjNeUdKwOw7yYN5ebUREdg0Kk+8YlPBHdFN+Wh6VL3bMgm2nRupT9kx1h74Xkh3kTGO5hn98Nedgn8JVvgHeACOsX0b+LHpjpqmIJGtVPBPM9VpAlYjkGT8Wfe+5H4Pk6EKMl5KsUKyp2slEdKcR4U6xVCrSQP2pgpt2YQksd5k/H4QTo8jxAojqZRJ9GACGMMfv/3fx9HjhwZif8j3fI8Hzvzg1AozZGhcyr6/f5IVAiXyxgzhv71er3hDmKtLq43LxOyuxahA+jnZxAip/l8EL9XoL//ILIbr8ZiWSKp+uiZHCnMWJvjbVH6kPtc+hAAut2uGguq2Z38teodxKdPn8bS0pIaJkM/WvhOWZbqolsLLwEGTllYWFDn2wRxagabJHyHjK/FPC4uLuLo0aNjZSRMTLypsfLOS3zlAjdJEjz66KPYvn07NmzYgPn5+aEzaUCZn5/HsWPHxuwYWiwXRTG2G9gYgzzPh0AP34kd8lW/3x/qrjVuDbzQoHNKB0ZDqvibWepRliW63S6OHTs2ADEqgzx1sB4wBZAdm0P7lZfQ3XEnlo6fwkxpsIgCWZKO8ebhUZpcmg+73e4wYFy2oVD7pba4d+/esTxOtR1rx44d6Pf7Y9vWyemhrfm9Xm8Ypc3LhKLbl5aWcOzYMezZs2fMKXmeq9vQe73eyLZuWozSGzYU3a5tzS/LEnv27BlreN1ud2wbOhmeEC0uF9XV6XRGph8PPfQQfvzjH+OHP/whDhw4gDe/+c3DjpVlGbZt24Yrr7xyhDd9xyL+nJaWltDpdMZs1e/3R+SlPHrDUXAwpS8tLeGVV17BlVdeOearbrc7woOo1+upxxUQD94ZuU20rfnPP//8ss8rh8qeC2Na6sEfnkO31cHGW28F9uyB9QZlWcAao6KrRVGM8CDq9/tDVJvSq6rC6dOn4ZzD1q1bR3ShN5a2Nb/f7zfaml+PGwLDswC0AFltjiuf4aShWPTvujxteqWhT7G5sJzvE/G1ZJ28VLfkLefs/PkPf/jD+OAHP4gHHngAt91229jaIiZvbF4vdY7pGrJhyCaaLlq9ofo0+WM8nK1gqwS9BMh8geLpfSg3b0Vy2WVw3sCZCgYeVEXMvzJNysDX85pOoXbdZH0FTBCEG4JEQ/CjjH7WytRBtbKx1EGpdXLVpcfq0uBrTaYQDyr/3ve+V607JJdm99XoGKtL0iQ+lAOJHHRC9uJpFTwSAA4GlevDPX8AuGInzOb1sG6ACDpvALuyIFyZH0rnuje11Zjt6h6IjTSx0Sf0vDay140O8plYmZhsq9ElJHMoT5LmTJp2TGKvSeRqWk9Tvet01PLq/ASwj7tucACn9R6+uwDMHUH72iuRJymMAwwAj2bIbEzPmP9iMjfRhaj2jRVzlva3Vn416dqUCxh/s03CQ+ZxHk3LhKahMd7aW7GJHlpenU1C9TWZvjXhHZK56RuMaGSPlDfIDdD2DktHj8KcWUB27VWATeErD2cMjAGwAr+Hpnh8jdqkHm0ZoFHjrfkSWibG2rnuwPLWcSkcwaEccDDGDLdP87Ox6bdWlzFm5OBI3rgIbp9EXuKt6UGG5Dw4CMPTQ1CtMWYM0iZZCSaW+d4vgw6yPvqcEbKJlJfgbg2ZI8hbytb03HhpEw0lJpvIcrx9FShQmgSmrFA+tR/elOhcsQtFXqJfGZSugi0KeMW3/LOP5EHoJm8nxJvrw2cSIR3JJquG2+mwyFCsID+IkecZY9SDJqnRa5B3kiQjCBj/9iDRHnKSdigozY8lKsgPwOTEectGYe3ooaDc2BTfx2WiTwAaolRV1djBmMQjTdMxZ1Fdmh0BjKRzuTiCSnmhmEDKk7zJv9qBncaY4GGhEvGlemQZ0o/8Ya2F9SlmvIUzfdhnDiDdvQ3YeQVaaQt5K0WGDIlJADseP0kDmkR8yb4ythEYIKvUhqQuZHdpE+997XkXwEW0H6vp3HVKP7lkYQbHmRV94OAckit3oGzPAA7wBjgfLeR8tbuLpmMRhdYfq6lnLYkjebH8pulNeK1El9XqTzo2qaeJnLH85XSLKgHMy3OwR0+gvOln0bIWppWiY4COBdbi2LMLQRddx5rSTy8Z7wE4FPteRL9l0L5qLwiroJ/XSsdqhAoCUD8QS5CBiEKHNKQsFG6kIXMx5JGeD4X9awtlHsunfesI8QlByBI84HprvEO6xOSlH220D01jZFycFkjNSS7qYzJRfZpvNJvEfMjXNQCACnCmgntyH8ptG5FsvyyItkqbxNpMyF+a3NQ+tPbLy60aFaRrXmQjJgFCB3YS0iOVp3RpGLpGhwfvkmLywE7iIa9nobzQNT78VkMJnBB/aTB5KCh/XobJaIGgvAyF1sj6KeRHopIUpqNNo7QDO8lWsQM7pU3yPB/+SArxoGdDW/O1jY7ywE5K59f4JAWQ2x6SJ59Htms7inYbXgQb07Oy/dQd2EkAFclE6fRbgi386AXJXwM2JNV2rIyd46ahgoS4cCKjaQGc5CiJClKgpIwzA5Z38VJ5zkOLo6PntB25ZVmOxMsBy6igtsuUduRqyJjWiMjBmk24Hrx+QtJkHtUt5eU2kbbKsmzMJsQbGN8VSwd2agGnod3TPN5S8o/tIJY+5O3HGANnPFqnF4DDLyP9+XfDttbDpvpqRbMjIcHa20TzYZZlQ/+SXPztpvmQdk/X0UQHdmqxgqGzFeh5DfrUFsYcFNCcpR3cEpJLS5dySQqBEvS8lt5EXslbvgH4wl+TKyZvjHfTiH8qH+Ot+VDqwvWTclEb0XzIbeltiXL/C0iLHJ3X3QB4C2vsyLqK6mhik5i89Lz84XB7aLnSBNCZghdTumgo8UD+/z2OasclKHfuxfkB2C8MTTvWlC4ackWJ9hNPw1+1C+W6LTCmwmu1c00UhKuhY6EyMZQplNeUJCKp1RnjsZb8m+bV1T+pvVYqX1O56nzVpB3EGdMvD+8GW0HKUyfhD72E9o3Xo7AtwBRj3Srmw5ick/ikqd4xahQrSAgJh3FpQcwv1ybiqFkIFZSQJT88kT9PMmiHPYYO7NTQPWAZFZTzZNJLiyMk5CiECnI9uE3k1nmSS27QI8SK6uRUd2Cnpie/DJyHYdHGTNkh6MBOTV7ylfRvkwM7JXgxdsCpH3QqB4+ql8OlKfKnfoT2ItC/8XVod3MszeZolxkMzBhv2X7IfhqgIn3IQTHeXqje2IGdZHcNUOLUaD8W/xkaBuHFolaGiC8iQ+VCMkjeMbli9cs8viDWyoSAlhDYEfruFOIt5a+Tl8sV4yH9JHlotmvKW8trUmbIy3jAexhY9DKDtu/D/OgpmEt2ALt2A85jpsqAbPSrcIx3HTDF+fOOGfNvrJ4YNT6wk8PtXDDtTAZ6m2j3IVG50J1EEqolGfhhjyQP8ZBvLM5Dksab3lJaZDYFimofxzVomUZBzSbaHVz8oB7tgFGqSzpTfkOTtpLIXMgm9FzsgFHZWCUPPt2S9qU3gPShg0NVeSQugUsTpGfPIH/yKfRveRPS9ibYIkeazACJHW4TITuGfOi9V21Cn1NkB6K3q3ahYsiH9HmijmrXWLG3QKjn1r15QnlNSY4+odElpsta8W+aV1f/pPZaqXxN5arzVZN2ECMHj8o4pJVF4j2qA3Mo5o/B3HYzMmNhUKJKDDx0vzbhGXsjx+poqneMpqjglF4VSjxgvYMzFrOVR/+pJ2DaW9G6YQ9Ka2FchtyWgynja5CmHWtKrwoZD8AZnG05oCzRf/xZ2F1Xwm7eAGc8LAyylaCNFwnVThYJ5eLzdGA0VlA7sJPmovLVyS9+1ubIoQMXtRg/LhvnrV3gzZ/XDnskfTT9ZZAq8aB1XlObULrUgZeTcml1UTluS2krCaBoaCjXXeMR8iHXQ64vNZtw3YFzUyrvYXyCflrAnToOu28O9uffjiptwbsKpa+QlglcMn64KqBflSoPY+U20aJR6Eei3U18WLfOanQ/Fo/Y5ou8WEPVGhF1OK1jkVEm6Vi0mJTghdawSBdqkLKeUESz1rGIr/wEQLy1BW7IJrxTSzvyu7ZCjVvrQNqdXjLinT+v8SZfcftyO/IwIQlfS5toHcsDQAWsy3MUT++HnZ9H5403wzmLqizRQ4l1pYHx1UhIE7/LStpRtkXSmd/oQjJRXdpgHgIpOI9VdywZhMsFoDQtWJGCG0OLQO17TpqmYwdKkkIygBNYDgbVYhhDKJu1duwbBCFATYNwaYDRbELoU1ObUMfQ7EgNQftmQoG+IXnl24T0nzQIV9vqvpIgXAAjPnQAnPXYaNpwTzyG1vatsNdejaTVhrEeFRyStI1Egc95XVxvYPxKHv68hm6S7/mbnwf0cuI+rKMVB+FSXuibjRb0KNMlsiRHO04S3eHPaohgiLcmL3d+k7o0VLKON38bNpWX7B6yhxaEy/Oa8KCyk/iQ16WhgzJd6m2MGQAX3sOd6cM99QO0f/YuYN3GQef3wAwS2ABv/jsmkyaP1uZkXkhvTbcQXXTgxYrCY14DZIzBqVOnMD8/PxYaM0mozE8Klcag9MDGZ55DcaaEfdOtGF/lnV86nzZvvINYawxaukzT8kLpNHpoz2jP07OagUJyaXUB4fPl+CJXo6bPP/PMM/j0pz8N5xw+97nPYePGjeq2hKa86/Tjb+aYP2gErnuTa/y5r0J6BNsPPCxK2Gd+DLNxG/wN1w/DnLjeMb9rsobkpY/E8s2uyduk7da9tRrdQSyRN54X20UcStdep9QYeEwZKSDRHv4833YueWigSmihTjyknnWghjbl03js3r0bv/Vbv4VPfepTw4ZMAEHIXnX21VBMStfk0mzCQZCmPCgaRbNVaMo+rMsDMIMTmdDr4sz+J3HZTbcB6zfCVBUqM8o7xCNkq5Ae2tSUA0cyP4TGEg8tdIpTbcc6cuQIzp49OzaHpZ5N4SqcqMHE4HbZuYqiwNLS0ggKxYNjJbBAPOQGOjKKtiYkQ8oO4b3HmTNncODAgWE6R5RkOBUZl6OCfBTVdhATqHH11VfjBz/4AXbt2oUkSdDv99Hr9XD06FEcOHBgzI4hXegGFv4s2ZHklQty0p3nlWWJhYWFIIKr+ZDzkHrzNTnnXVYVWmk2+DAMg8oYtJ95HP7lQzj2gf8OSy++hI4rUCZplDfpIdeRPIyO5OI+lCim9354uOnp06fHfKghf1yu6667DjGq7ViXX3750GBaHJ2Gkng/iIzWzgXQLicDMLxOZs+ePWMOpqtTpJHpChzZ4SS8SkTG1xClffv24Zprrhnjod0RRQbmMWa8Lm37/+OPP46/+Iu/ADDoZNdddx2MGZys2ul0sHPnTlxzzTWN5AUwvMKoiU2A5burZGPpdrs4evQo9u7dO8aDrgSaxCbGjCOPzjmU5yLCnRlA7cY79B54AGe3bMelb78TfuNm+BaQYPAmpPu/JO9YLKZmd5JXG5hPnjwJ5xwuueSSRoMjteu6yHZggttGZBp/nYaQplB5LU9DbrQ5reStyUqv6tB0U5OLRjG51uJrP44i8be1XMtoc/A3vOENuPfee2GtxZve9KYgmigpJm/IVvJ5TaYmvEM+5G8NaRMqx2cd3nug8vAwKAeJSBfPwj36GKprXgdsWAfnDEpjkGIc9W1ijyY2Iblke5I2CE2ntWljiBp3LM34Megxlh4TrAkP7sxJ5Io9H5JDlpG/J9HvlltuUY+Yrqsrpsuk6U0axaQ8Yv4YSTMDGDqtDPKn9sGdPILqnXehylJYZ4edisqFZGoqaxMfaoPgpLbVaFW3jcTQkybISoznJHmhtKa8m+gSkqnp89wp2sgakncS3po+dfrF6orxbiLDyL8N4NFDUmUoYND71rdhNm8FbrgeBhYm8Uj8ANsItTmql78dpawxeWQ5OSOSs5S6umJ00XzHijWsmBJ1jm9KmrNitBK+K2nwk9Y/qXx1jagJL07hkT6Bg4NxDn7hJPDoPyF94x3odlpAZc5NFccRvbWi0CAbmjY2qSNGtW+sfr+vXs9C880QFK7ddA8sgxdyDZTnuXqdDMmgKdbr9UbmzZyHtojmsY1yDUIHZkp56Rb60PZ07daU0I3rUjdr7fBA0Koav8anri7NvnRgJzDayEPgRVEUKMtSvbKnjoec8sWu8am6gDcttKslFA89BH92EclbbkEXDt2yROYdXLm8+6rO7hp4EbJVnucjt+XQM2R7fiBsXV3ko1Vf40MIiLzGhwTQkBgSSLvuhDqU1iCzLAueMKohMd57FRkL7YqNyZumafC6HA1lC/GgxqDp4ZwbSTdm+cOsVoYgfU1351zwOhmJ5NHgo8nrvQ/aPWRfjQfpE2z0pkSWprClR/Xd7yK57lpkr7senbnDaHVSpN7AwI8E3E5idwKsQnJpcaCE+sl405jdySZ11GgH8SQL3iZlVgp6xOo7n9QUbJhUFm6Hug+Oq6GV+JCXXQsqbY6kAoqDL6J8YT+S/+ZtcK11mCktEgCVNfANeNXJ01Re+bZdSR0xanyYjLafhedxiiF2sSBc/gzVo8mi8ZDp2kdVnseJT2VDI2QsqHUS3iH0SuNBeVq6/MjO1wyyTMxXIb01Hk10D6V7tIHKY+nBv8X69euAO+8CAHTPbWpMDLWB5TNNNDvGBqKYvFoeD8qmH27HmA/rqP5UjClNaQ0ocxXc/GnYR55FdecdyDatG2QYwBi8Vm7naUyNYgXpdyhodC3g9knhYBlkqj1/McHtoTL0rBYXdyHg9pjdVwq3a7yTqsDit/4Oydk+0ne+E97a4XEWsm2dD7hdC8I9n3B7o+9YFHRZFwhbl04KavuieOPSOpFEunjQpbbDl4ABrR4tXXte8tbKyKlBTHfKk/Vof8fk5XnSwWRDDfnU+JPdJuURC/SVU0HnHNzSWSRf+ybSW69Dd8/V6FQegB95RuOhyRTzbaj9aNNm/lv6Ica/Ceze6MwL2sIseztB19qbLHQSrnaHEvGhOqXi2km4VBfNhfkoIrfeS11inUEaU25z5zJJvlSPdooqldFQRConb4KvqvBJuAQhy8bCT8flfpF1E5HOWr7mQ85DrkuGvL2H8w6FTTCTe3SzPvyD34RbOIvOu96FhSRBVi7fYSb9Rb4FMGbH2Em4/LgEWUZ7a1O7Jt2p3pAPebvW+HBqvDVfVkadoCxLFSbWoFpalBqjH7go76jixiAesiFxeJWPZNr2eHrzSkiW3nppmqoG47AvX9xqh2aG4HZylgaFU8eVZXhdsnHLYwm4XGRbnjfp5wHSJcsytYGRTXjHIrAhSQN3DewAACAASURBVBJU3iH1FkgKzJxZRPdvH0H1xhthb349ttgEaANwGELkcipIdpe8qTPL9kNbPDQfcl9R/d4vH4TKjxmgjhXyofxkEqLGB3aeb4rN1ZuuJYB4TFyTNcMkNEldMURuLYl3sNVQnR21tOEPAMAidR7O9lF84++RvNzFhvffi7Mdi6TvUfmVy6fxbyIvLyfftmtNq/J0SJG69JjTeV4TaLNJnSt5dqV1rKT+UKeL8VprGSapR6ZrclpnUFmH9OgJVH/9AHpvugGt170BKRL41A8ulGPlJ+W9Eps0qWMSvWPUuGOtRc9ugpitFV0IHhrPlfANlVuNvdbSX7XPnfttPP14GFehgEP1lw8gPXMWsx9+J4ztoOMS5Nlow1tL/S6k3jFqBLdrDuZISgjF0yBRQmi0MrKu0N/0bz4nBpbXWBpSyHXREEm5dtP0589rZUamQzU24b9Jj5C9Qk7WPoFQuga4hHho/uC8tbwRewwOqwCoLufh0Yd9fg7l334TePtbkey9ET4byNPyhkpFdQ/ZkeukPa/ZWOqpPcf1DrVfDTjRqPH9WMA4skQLXA36pKBODVGy1o7BwVowKClGgY9cIQIDtANASU55ZgEd2Kl1rDzP1cBLuu2dO4WjRhwMIGcR2qTZkutnrUVRFEN0NRSEqzmRAoYln16vN9x5yzsWX9xLmYqiUIOfKahWUrfbHTnzw5xbV3WrAiZJkFqLdi9H90t/BrfJYP0v3ouFwmMGvaEticjnUsdQEC4/I0TaSnY6+p3n+Uhd1I7IT9LvGlLJ7eu9X5sgXHKSRAWpEWlBrSE0S7uuh5RJ03QksJQrq6GCIUSJ6tYQsBCKSbehayE0oe3pEp2i0S5JEhVl834UKaU3LCGSMqg2VJe0ibSVZpPQtnnvvcqb89Aa2MiBnW7w/qmQInFAx1l0v/UQzPPPoPMv/jmKK/eiUwKdbPk8Cq6f3PxJDV/zRyy6nbbTS3kJIZZrpKWlJTjnhu2Xvz2Looj6sI5WtYM4hkCFFog8XS4otb8l71heXXpMphjvGN8mC/mYXKF6mtRVJ9ckda3Kh+dCKGwFtAqD8vBxuD//MvCzVyO5530oAbSrRZjW5qjMTXmH6mhS16R+qXsuRBfNRscpvXapQg44B+tTVEsnceYPPwu0Wpj9tV+Fbc+gUwGFjX9Q/Umjacea0qrJuhYKY5AUxzH/n/4E5sB+dP7Vv4LfcRWsA7wBigvwDe9ioomCcPnrtg41iqGCGmKnIYB1aJaWV4fMhVBB7W9Zn0zTyoZ4x9JDOobQqZjcVI8MUtbkleUkhXhLWXMLoOjB/emfYOYbD8P86i+jvON2OJsiKw1Ka2B8+GOsFoQba1tURvpQ85MmLzAKRmmoYJ0PV40K9vv9sbMASajYaaGE9GjoGy3WeR5tzddQQY4aSVSQO4XkogWuDGkiVFAahnTp9/tji2XtiAGOCoaugJHkvR/Wz+ui+rXt8RQryPXm5TTn8m3zWqwg9xfZinSX8hJSKG3S6/VGAlvTvIuFr/5n4K//AbP3vBv5ez6Awldo5RV63sMUDsgL9DujfiLwRh6JQLYicIMTPatdh6Sh1lSGtxMOUFCblD4ku3Pi7XrVqGC73R6JAeOGoY6loWxUVhosFCtIJ49yBI6PKBoqKJEjkot4aKfRalfTcPRNg5e1Q0HJHjJWcBJUkOuolSGIWEPsvPdBW/E4Ps3uy5UA3jmkSYJ2a8DbGQ+cu/nXe4d2uwUYC+sBbwwK45EhRzttwxkgPbuI3p/9OfDg38G+++eR/NpH0emsR4YSSDwKa5CUFikS2PYy+kZ2X6tYQV6XtAm1BTnQLy0tjdiRz8RCsYIA1gYV5Dtotd212vYBfliMRFrqdhDHUB3+nOQln9ciwkne0K5Urf6QrLwzN0UFQ3XF5NXSZVlN99iOZ1EL/OBL7YDn4B8AgMwbOBjk1qDjBmFKqQdM0UaeAa2X9mPp//gPcM89i/Yvvg/ZB+5Dd2YWswaAyWAMkHkPZx3KBGhHfNhUd9KryY5u2aY029MAzfNivJuigtMdxBeItPl8Ewethl9d/d4AzgxOH3Pnbiuw3g6iKOwAyes4i9nKoJd5uMSj4zzM/Bmk/+Xv4f+f/xdV26D1P//3aN/2NhSujawycJlHch51Wwk1scda0rRjXSDq9/v4/Oc/j9OnT+M3fuM3sGXLlto9PeeLhp3bA9YD6bnfMB6VqWAszoUoFSiNh7EVWv0+cOgV5N/9IY7/4zew+aXTMG/9Ocx+5CMwO3fDWYO0W8EU546XToCLZb99aLYTSlsLmnasC0Qvv/wy3vGOd2B+fh4PPPAAPvShD62uQk/RdiwBZvBrmDMIN4J3gKuGT+Fcmq8c0sUussUezMISYIDUdeHzHOVSDnNiHuXpk0gOPI/e48/Azb0EYytsfP21aP3rfw17462ATWF8CYMUi60SMBYzSXIx9atXhWo71rFjx9DtdsdQJnq1apcgAxjeFiEpdK9UnudYXFzE4cOHx+BPAjaIJ+etrSf4ZkdOfGEqAYSzZ8/i5ZdfHoNYST85lSBUSlt0a1fAZFmG66+/Hn/wB3+A97///Thy5AiMMcMYxRMnTmBubm5MXvUiaQ+4ooJrGzhToVV5pFUL3ibIyx7SzMN6h3Vn+iiOHIY5PAd/6CDSE8dRnV2EL0uYogIqB1+WQK+PkzMzMACywsM7j15VoO8rZCZFateh2L0D+T1vR+u2m1Fs3YYznQ7w8rFlgWBRVAWSZHACuzHmHAAysBu1B2nHpaUlzM3NjbWHUPsJ+ZYgcjrXgtcnfUhgzsLCwlAGGbAcusCb5Nq1a9dYHqfajjU7Ozvc1StjBUMCEHwcux9Lg3DLssSGDRvUTkd18Y4VumZGa/RA/f1Y69evHytDV9YAo7FktBtZ67zaFTDOOfzxH/8x7r77blxzzTXDzw4E9c7OzmLTpk1jdan2hUe37GM26SAtDAw8nElQphbrzpyA+8FjKL/9CLD/OfheH0lnBp0N61Feug3YeyWQpbBpCpulcKlDtbSE9qZBuFE/S2HXdTCzYR3Wd9rAtkuRX3o5OjMzKG2CAgZpr4eWEpOnnQ5M9tJiSp1zOHPmDDZt2jTmD7Kv5ME7kEwPXXmktR+iqqqwefNyqFVdx+LtIUa1HWvdunXIsky9X4iU0YJw6d4nSaH7sZIkwdLSEtavXz9mZO2UWkqfJOC0LghX61ih+6Y0Pfh3LMnjRz/6ER588EE88cQT8N7jzjvvBDCINqcg2PXr14/Jpd/55DGz5JG21sHPWpRJBbt4Ev7vv42lr/wtZk+ewuyurch/8e3YctPPwOzejf6GTUiNRTtJUAFw1gDw8L0uFl45hq27rwQAzJYGBhYeQJH3kbTaaFsDAwf4Ch4euZ1FSwnOrTv+WfuckCSJ6nNqwFp0O31SaMID0O/HonTvPdatWzeC9oXq4m2xjhof2El/yzwtPZYXg7YlP/5Kj9VXV49Mm0SmGHzOv5PUPX/TTTfhy1/+8nBKIkfEmFxjvM+BDUViYKsS9sdPovcnfwz/wkHMvu71aP8PH4G/+TqYmU1wSJGWBp2eG3g7TZCeW3YBwJIvYVwGgwweQD81w6sJ+j7DbGLQMiUqAAUMKgC2WN6ywX2lya5FW4TgcPnMSnyr2itgSw1u1+D3UF0xuqjBi1AIzGuR6FpUuVeqCVUAjPOwcKgMYGDQsx2k5QKqv/om8j//OopLt2D2N+4HfvYm5DOb0K4sZnMDk3iUaYnubA6LBG1rYQHYc33DwsHCITkHd6QeINghLStkNoWxLaSe8oAexvdurYYuBBQ+hdt/gok61KQOdvCw8HDeoGeBtjfIiiX0v/Sf4L/5APBzP4fN//JfwGy7FP08RwsGbrj93SDxKTpuwD+luOthv7aDHzqDgonmLHTYXD9J7aKlixJu5/GA8g0SO5MuFEcoY7zob9rZy8tQVEesrtAO5lBQaSimjHjLcoRi8qBMkkmbLlA9mk2kfsaYkcDg0A7tpCrgnUFuElSlQ9IrcOaP/0+0v/FDZO/7BVQf/efodzYjcw6Vq5BUFeAG0zauh9aIyH6SdxO7y3URneun3WjPbcLXMtzuElSgSBnJm2Tjz1M9IXm5nCQD2V7TJeRD4qEBG5wadSypHDEnw8h8nifTuRJSGfot/w7VBYxHOZPMoUZPDuB5/BwOzZHyaGIqozme6g/ZjHjzIFRuM01eV1Uw3sAZYKZ7Fgt/+ucoH/weZu57H8oP/yKK1gbMFgZleq6TVg7WnFsrmbBNyL58oJC6a+kkl1xHyR0QnAf3IUffeAPX7Bj6lMJ5jNhKsbvWcXi6tE2szQU/gQiq7VhUQQhlI0RNCqClUz1aXTzqndcDLG/bp/KkIKFDoVd86HBKDVEiXTVHaogoNUgtmNiY8QBgkpUjfDTKk7yqXAbIshTeW8y6Cme/8/cwD/4N1r/n3bC/8kH4bBM2Vhau7QFj4Ss3uIcKBt6awTdj1oilTQhB1e6CIvha61iarci3GtwOjN9xRrB5yO4aKhjSg/tQykt8JBKdpqnKh+qapF1LahSES79lr+cjr6QmKB7P44rV1cc7l3yep2m8NXljiJKGEPE0OdLF5vNSXr7mGtrXA3DAua+sqIyBrxxyY2AfewLZf/gzFLe/Del/+xGk7fWD+3vtYKVkMAA6YAxgLbgIIaSrbv0RQ+b4bxkDqflElqW3QqhtTSKv5g9O8sAhTT/ZPkLrrybrsp+ubZ2vFWJ+sx5wSYb2qTM486U/gtm2FZ1/+VEUrQwGZtB5jChmRuuY0oWnRqggn3ppaXJEoldmCEBouoOY/83fkJp8TeUi2UKjTgigCa1NpIx1O19jMg2fOcfKVw7GefiqwOKf/d/YMHcE+Pcfh9+2DabXD34jkvz5myFkv5CvYs839Ucsn/hMuoM41Oa0bUGUL+VdiQ+l70O04q35kpEUgP/WlAw5UlsUa/Xx6YR8lYd4hBzODRmTWZO/aUPVysiph/eD4NnKsKlE5WB+9Dj6D/8N0l9+H6rX3462OxcFEbGh914Nt4o1liZ6hMpQg5QXaMt8rjcHByaxo9ahQ4OxrEcbqEOdLsajjhod2EnxbKHLvTUKbR0PhTTRNns6ILNJXbRFPHSoYwj21QxWlqV60Ka2NT+mR2hbNzB+AKYxZniY5MjWfO9QJH2YYhbl/GlUf/RFlJdfCrzvfUiXEuRJH72igEl0W9Fgw2XWbEKImHYsgCYvT6fyTWzivVf9aowJHtgpt9NzPUhuTrG2SDYmdJcGnVCba9Ku1+TATgDBRhS6XRzQtzDzAzs5eT9AzTqdjtrw2+32WAOndDnFCfEIBWp6P9ieHUIYtUBfdas74jYhebXneQya84A1QGUTVA99D9WpE9j67+5Hsf4SdAqDNGkDJnydjCYv2UILmG61Wo0OBY3x4ACMZhNjjOrbLMtqDwWVeoR8G7I7ySQ7aZZlcM6pVyvRlUuSNB9q1DjyggzHGdCoqE05NIRGpmuwKDB+uXcMgdPSNXljcvG1hHb8QEz3kExNefPpoLXngl8d0K46MMcPofraf0V6+88hvfkW5CYBUo8EBYwZj6tsYitNLk1vWVcovYk/JPJGf/ODfbQzRTR5qexq5NWm5DKvzod11Oh+rKaVNanr1aYmC886Wml5bY4+Zl/vkWKwV6r46n9B353FzAd/CejMogMLZz1cg8MvLwZbN6ULIasczNaqTYfovFzjM8mid7X11wEoWtpa8m+SHq2LfrwHPGA8YKsK5fEjSL75Pay75y1wV+4GPJBUDg4WhUnOnaPUTL5JZeJ1NNFzJfXL+iZ9dq1AplAdq9Wp0eXeHD2RzEMITQyBor8lachM7G85DVqNXHIqECsz6d/832Pp8HBmlIfxFr2//RratkLnne8DbDKIoKDNHR7oR5CxkLyhBqPpHdJd5sn6m/pQ8tZ8GBswYwOp9oyWFms/IR586h6jRgd20kXSMpgxFBfnnFMPe/R++XBECRTQFnWO0FC9HLHijiC0R86RCc2SIAUdTikN4/3ygZ3SYBrySMgfhWBRGRlUqtlETkHKXo5WMYjv6+Z9WO+RHjuGpQe/j+T2W7G0YzPWL3bRz8Z3XHM9iB9tTQGWAQse9yZ92O/3VVTQ+/oDO2kdRP6gQ0z5DnHiSyifXH9VVTV2YCfpoaGC1D5k+yGf8PhCzpufUUjyEuIrr2riB6VKm5CdQrezEDU6sJNQmKa7Zcnhk1zjo128zRtn6HJvecim937oWIlOpWka3EGcJIl6QCQwfmAn10O7xidkE+/HD+w0zsNaA5slaGUZksJj4Vt/h07hkX3oA+h3NiA1HqkdR9p4XdxWk+yqpsYbQwU1kGnkGp9zaTGbUHsARnc0EG850IXsTv/W4iqttUEEt+4aHz4we6/vFKa8EArOqfEO4jq0JVauSX1N+NDfk/Bomi75rIUeTWzijUFhgdJicL75mS7Md/4RrZuuRrFnF9b3EpTr+shMVlvXWqavVveYTbTfK/FVE5kmkVfLC9mkjqaxghcDJQ6dMseSMage/Rbs3DFk7/p5ZCZD6j0q1EdTT+niomnHepXJAPDeokgSzBQ5lh58ALhmL5I3vA4eBt46JNOI2tccrepy7xh6spIgXJrj8jTtb/7vSRClWHCltlaR9ck0Td4YmqXaywNwbfRsC+b5Z2CePwD7qx+Bb3XgUKG0JTK0gshcSFYZcxnyFRBGBScJwo3ZhP8t8zXevP1MggpqzzeRjefV8eZ1xajx5d4ELkgm2lZojszJRSmPJ+PzZYrV42gMR3WoM/LGQrF9cq8NHcOl7QYmeblchChp8WFaXBxHwDQe2sXQVIajnsYY9Mou4EukvQq9Bx9A2emg/eY3w+eAMT30yuLc+c/jsZVa9AG/9ofLELoUm/TWYvk0H3KbyAiZ0NVGvAzJRumECvLBliN12rFz5FvpQ2l30pWu69EO5STfc3m1urhc1uo3wHBqtIOYEB8NFTRG3/kaOosQWI7d4gYmmFYiSlSftoNYxnnxPE0uamwaVEv6hXYQU1nufA1up781m9AZgiN6pxbWlFi/cAb5oz9A+7bbkFy6HYm3AApUBsjSwVU6nPj2cNlQiYdsSJpc1BlCO561GDs6jJXD7dzG3I7kpzRNRw4+5fbiNqROQ2W0mFJZhuoCoLYfSpfy8thG7t/QDmLuwzqqfYJGIHl6LW/0WjyXvDuKC0dO53ljO2kZD86b59HzIbhdg8hpkJBEhtXg3VBdUl7uHM0mVA/XOzUZKgvYH/0TqqXTaL3jbqRpC7CAdRZpYWGTcTfFbCUHCJInpB//LXXUfMjTOX/iIbfmczuS7JQnn6f80EBHvtN8qNmX20S+xa1dvtaJ+446d6xd19EUvLiApK3BrLdInEfy2LOwl18DvP7qV1nKKa0FTTvWBSIaAY8cOTISrWK8xY7SYMviAjbfdAeSdMOrLOmU1oKmHesCUZ7n+MIXvoA/+qM/Wp6SeeCML5D5As/7eVRvvx19kwy35k/ptUu1a6xTp04NL6XW5uESLSRayTU+S0tLOHHixEg6oX8aEMFvkeCIIcGl2sKXbx/n6Xme4+TJk2Ny0YY3CdPS4ZQhZE67WPymm27CY48+hhPzp5CUHglS/O9f+D30N12OT710ClsOH8INGzegBQOwhfQk9iUwgq8njFk+4FLW1e/30ev18Morr4ytc0I3a0jeZPvQTTIhecnux48fH7N76HooetNrIBOBZhImD8l75syZkeckiir5c5ts27ZtTDZOjaPbtQNYyPGhzXNamdBBLtp3CAlx8+8NvNHIZ4hH6DuEdjhM6LRfjhJJm0h9Q99vgMFie9euXXjsR48igUFuHBJTonv6KLDR4hWT4tTCAtqVhzMAbNi+RFIPzT9Sh9D3Kk1+zVayjJYnA2E10EvKJp8J8Q59R+JlNNLOUqEBJyRXrP3UUW3H2rJlyzC6XR6mSd+FtGDFXq+HTqejvpk0uHRpaQllWWLr1q1qFDIFanJInaeToeh7kQa3l2U5vHZIQrWnTp0a4U3U6/XGgnP59wwJLdN3LPmdo6oqnD59Gt44bFm3EXlmYV2OX3/r3fhf/6//iA/+u3+L9//Ce2CTc+ikscO6tMDSbrc7EoBMjYBfO8QbUsgmS0tLyPMcl156KSR1u13Vh8RbfoKgb2gcoqc3CQ9MpvrKssSpU6dw6aWXjnUs0kM7G4V4cLkoIl0LGu73+2NwO39hbN26dSSPvm1JH3rv0e12a8+7ACYMwtXyYuVi9YUotBU7NjI3lU2rayXyymlW3fNEO3bswC//yodhKwObWCRFgc2PPY3bkhS33n4bUpPCoRqusWLyrkbmSeppks47l+TThG/IH5O0r0me5216rWwlaQpeXECy1mLXnqvgU4/UeZgTCyj2PY1n0MeZ1AAVYJybRgb+BNC0Y10gGn7l9wmQOBjr0H/ieZheD8/BAGYwTfIGGF8FTem1Ro2CcLVz6mguGlrcy8M3iTgqGAMeKI3naaBBiDfJrumilaF8DWzR+PBgYrkQD/FwzsFUDpVJUPo+3He/j2TzpTg620YOB5+cO8nCObiIvFyXEKAkKbTw5rpLou9tmk203cBkEy0AmPOW/tXApJjemrzcViF5ZTyibHN8jRXzYQip5TRREC4PSaGFekh52uYuDaYF4QLLW7f5oZn0WwvCpXQePkR5oSBcAi/4s8SHgBgZVBwKwiVAZ9Ig3H5iYFyGqvsK2k8/id7tN+Ps3/9XJLlDr+wj8YPTcHEOseJBtVIXbfs43wLP16uhINyyLOGcflBqKAiXtrTL2LtQEC7pTiSBI7k1n8ALrQHXBeHKzkN68HbCdadPJ5x3KAiXZLXWrv7ATn5+AinJO5aGCpLSElHizpCBsBQ8yhEwPsKFtubz7dvc4NqZFzFUkI4F0MATuUWc9JCxdPz7lkSU6M2HtkXLZei/8DL8mROwt90MIMN6ZGi3WzCD+0MAs/yNMHagZSjQlncs+n5FaKyUS4vWpgYmjz6gPOLNOxYhpNo1PvwwTe5f0k/al+wuOxbfmq91UO4rkouCpSVSSraQW/PJ7poPqV3XUaNrfGLoiUYxFFEbASlPfjeQnUgSOSCE+Gg8YnKH+Gj1aPICy4GdId7tCujDAz98HP2tKTpXvwFAhSIBrLEjC6yYLtq3HF4u9O2rKdX5Stpc+5bHZY2lT4IKToIkhv7mz2q+iundlKbgxQWmMrFIyhzVo88iu+4G+M3nYgMHLykYM/h7Sq9tahR5Efs6HvtCraXLRaTGT/ub/1tbgDaVC9AXyyGeNIXTePC/adSu4w1vkZyaQ3bgEKp7PgR/LmZwEjtyuTTbaCBQrC5Nb42Hpn/IJpoOId5a29LszusOAR4heWnayf0Vizip80fd26vx2e1SgCbpWl6oQdeViU01tPSYI2NyrUTHEH+N0hxYfO7HyFDA3nITfGkHh3YqjSKmc528oby18OFa1hfSY1L9eGNfSbvi+XVtrQnVdqw8z4eojfbGCiGDhBxJIuSGrx+MMcMDO7VydEgi52OMGUGneBlCebSFuob8ee+H/KUu/FoczpvQTXk4p/derYfkNR2L5JGn4bZuQbFlM5J+ObQjHZDJ5SXUTpJ8VtpEEskpbULHBWj1aVf7AMsom+TND3aV+YQ6yk5FPpdrU34YKydC6+QxChxR1njzMCvqhISgaoeVxnwIALOzs6ptiBof2EloD2dODVW7tDmEnhBcqh3YSYckypHH2vCBkhqSRzy0y701eZ1bPkpAQ6FCB0dqu0k5kidtAgCp66P//EtIXn8dZtZtQmXckIeEcClmTdOdkFI5A+CIq0QrNZsAUHmHeMRswlFBqbu8YofaD13jo6GuGo+Qb8lWoat/tKMlSB4tDjXmwybX+DQCL1bzSmxC8u0l02P8J0FqmsgxybOT2GX4/KE5lMdPAbfehBQpkOjrgpVQDAVba5oEWdXeIty3IQRwLUlDBblcdYhxXZ6kRmusOrh9Elg01Im0sk3XFtq6bRJ5m8CyTQzOG4l8ntZQxeNPolVWMDe+DnAJKuui9q2zU8gek9RVl95U9ybpPE/+WxtUJ/FhnY6ynIwSkR1d1iM7YYxq31ixhVxskRgbuUIoTIy3RJ0mBRNWq0sMOdLyBv+gfztU3sPAA8+/gNbWbehvuxS+cij9+G0bMd6TyNW0nqZ6qzrW5DX1VdNyIbli8lJ+6NlQXXW6xajxG0sTgPKavll4usyL/S1HFCIt6iAmV2iE5zxihtPeCqE3hvce8EAJIHElSqTwvSXYp55G/sa3wmYtmH4Bj+Ud0JPYUds8SGthTd5YWig95sPYm5Lbnv4dkzdk/5APQzJP6sNQfbEliBZap1Hja3y0RWkIZaNymmAaqkP/putk5EiioVPe+5EYRs6LeDSV1/vl62Q0PUKooNSDy+WcA7xBYYC2K+A8kBw8iKWFBXSu3Ysqz+EqD1cuyxVCBbVOp9nXGDPcICgdH0MFNd7GmOFVQZJiqGAIvCCbyHL88niex2MeOa0GFaTvWFwm78cvHh/xYcAmq44V7HQ6KgLmffjKGjKgFitIxpc7QMnpHOXjsYKEMMr1jIYoxXYQa7t7eaxgHSrInUa7qrlM1NE7nQ7gAQuHxGXISoPuC/tgswztG69DO52FaZVY1wujgrFdseQbbZSe5Bof7wcImORN/tViBTkP/ralN1DoGh959Q9HUJuigqEd6JOigsBgJ7T3fgwVHPGhsAm16zqahjSdd/JwxsA4j/yFfehs3gq/bQuSyqIPAPXHJ0zpNUjnrWPVIX6Smi4KLxZqggw5eGSVg/ElinIR6b6D6N1wI2wyizIFLLKLemhrouNrgUIgRShtLfQ+L25dC/g2Vk9TGZrKNWm9TSFwGD/YEWwszCsvo3rlNFo3XAeTJPDGI/MWgyOZVsbrSD46pgAAIABJREFUfNIk8HxTv0462MaendQmk/JYrc0bBeEC+hntTeBKLS/2dxOkUD7fFBpdqbyhuuSCe7wef27osrAv7EPpHDZcdxV8agaR7N7D+OWg2dVAyDGb8DXQJDzqePP6QjxiPiQKta2mdpe6N5FXlpG6aHXJ52PU+H4s+lsyokbRJJ3q0PYsaY2C89WUpoWmVHQl8pJhtS3fMp3/O7rdGyXgPUpYJM88Cb9pFtixHd47GA9UACo7etBoHW8pg3RwSN7Q86TDJNv/YzYxZnR3L+etbc0P2T3mq5Ct6rbmS5L+krrE7F633622YxEyJSFt3rClIt4v76SVREG40gC0pV1uk6YyBKVypxDSJUcWqkOmE6ytyRvaUs+DhrV0WQ+Xy/gScIAvLfJnn0a6+3K4LIMrSgAezhrkrho6MQQha06U9iXbaPLyN6JmK2l3ySOmu/SH936EP7eJViZmd0C/H0vbdsS308u66FgAiTzSoEy8eFuK3T9GyGeMajsWBSpOAreTcKEbzOkbk+xYcms+fxPIbd3ksNC2bk15cqL2eYDuiNIGAw32JQdq0PIwaNinyOHQOTyP7qnTyG69A2m7A2PZ+sQt37OlyRUKQHbORW3VFG4PBQ1TOQ3qJx68EfMOFYLb5fEKBGtr8obszrfma7bS2hw9LzsdHUctt+ZTG9LaNX2CqKOJ9mNNaULydjDlO3wQZd+jc+01r7ZEUxIUWlfJt/ukYMZFDPb+BJA3g6PM9j8Bk8zAXLkL023343QxwPreeywtLY1EcFD6Smj6xjqf5ABfVujtfxbrt16K3iVb0KovNaVXgcqyxPvf/35s3boVb3vb23D77bfj5ptvxuzs7Io6fm3Heumll3D8+PHgRkfvx+PPQuElfMEoQ1J6vR7m5+exsLCgLljlfbvGGPVqGI4MaZsQQxsz5+bmgpd7h+4gBsYXxMQ/yzJ4B7T6ZzH72LPo7r4Oh/YfwKw5Asv0pp3LL774Ip588skxeWn9p4X2aPcDy/MfuU2A0V3V3g/Cv06dOoWlpaUxm8jjxIjo/ECpfygekWIztdhNsrtsJ+Rz7SxA8gXPozeNvOeY5LV2+RpV8t3CwgKcczh27BjKssTBgwfx0EMP4Stf+QrSNMWOHTvw5je/GXfffTduueUWXHLJJbjiiivU0DdJxte86z7xiU/gi1/84lDhkcJGv94nRlRHCJnT0BYOy/Lfa0mhe740nqS3pscoGVzlKtzvKjxYeXxttg1b+rHp4OnTp7Fu3Tr1LqpJKWQbDT0lagIfN6lP4x3zGflcu4M41K5C+mltk+fJzyLchxScu7i4OBJ8S3VQLGWr1cKXvvQlvPe9761tf7Uda35+HvPz8yoqGDuwM89zFVEKbc3vdrs4ceIEdu7cOXKNDzB4mxEPMhAfobQgXA0VpPMjtMMeDxw4gL179wbfDBIB0070pTfD0CbewX3nu/B/8h/R+V/+J5y5/Gp0bAqTjL6p7777bnzqU5/CPffcM8I7do0PXS8kR2F6y3B5+WcGaROy+65du0bSvR+cRqsdfdDr9VRUkEPk5EN6W2l6VFWFgwcP4qqrrhrrCCHeoWt8qD1obzkedc/LnDp1Cs45bNmyBUVR4F3veheee+45JEmCvXv34i1veQvuuusu3HHHHdiyZQuSJMH69euxbt261X/H2rRpE2ZmZiaG2+XdVdwwoY5lrcXOnTvHIsnpri1gdEs1TQWbdiwaCLSOtbi4iB07dowZjN83xUmLsh6ziSvRW1hEtekSpK+/Hu10K9Z3WoAd7VhJkmDLli3YsWPHCI/YmRfUuKWtqEFqjT7Usay1Y7yJh+bDWMeiKZrcoaAtDaqqwsLCArZv3z7mw9g0FNDh9lB0Ox1yI2ckBLdv3boVeZ7jl37pl3D99dfjjjvuwM6dO7Fx40YAGLZV7wf3vjWZLV1U4AVftwH1MVval/EmPEJ18TUSbxwTVI4SQGmAtgN8VcLvfwHFFTvRas2gbVI4dy7UCeMfP9dCj5VQu91ek+l1SCYOXfOpofceGzZsGNo+dALtaknjTd8BSY5Wq4Xf/d3fHT5Hb7mV0kUDt9Mi/fd+7/fwsY99DA899FDw2boOV0faXD9NU8zNzeHTn/70yhvZueWTN4PIdvS68C/Oodq7C735Hu7/9f8R/+bf/hu88sora9IxYjI2kZ/e7p/5zGfUzaprIVdIDhr9P/OZz+DXf/3XcfDgwTUdLGIyEf9vfOMb+NjHPoavf/3rAEaPU6eBdaWdfaIzL7SfWF7TH75Qveuuu/Dbv/3b+OY3v1lbt5bP5W7K2/vBZr+/+Zu/waFDh8aiO5ryhzdICw9bVShMjuroMeDMItbt3YvHnngat915J97z/n+G733veyNlV2LDMd4NfKXV8b3vfQ/PPPPMqn1Y5xOZZsxgN+5HP/pRfOQjH8HDDz+8Jm0pJhP/TcuO3/zN38Q//MM/NObN64hRo635fKHOGy4tiiUj59xwq3fdGqvb7eLhhx9Gnue44YYbcOONN+JP//RP8YEPfGC4JZ+uBOL10ZyaI1qURzzkKEy3jZBj+/0+HnjgARhjsGvXLnzoQx/Cs88+C+/9CG+JmhFvedtIBYNOt0Rhu3DWotr3IlxRwu66AqefO4QtmzZj0+YNeHHf/uEhlbTFvqqqsSMIKE6T5JV+kfb13o9saed5BCxIm9x111342te+psbsaTyAwRqLbCKBE/o0INdYfPs71Tc7O4tdu3bhD//wD/Frv/ZrI37W7E71kG/lOlm71ojKyNhK5xyuv/56fO1rX0O73R7yJl9on16oXRhTf+NIo1hBHgPGmVDH0g7ABDC28PV+eR7Nr5V517veNfye86UvfQk7d+7EG97whmG93vuRODMaPQig4B2L85ALdTqllRa4WZbhPe95D7z3OHny5HAxKxEkuYgmh8uO1YWH8QYtX8Jag+6Lc2htmEF1+U5cejrH977/XcxvnMHuK3YPYxx5lLwEKeibVCheTzvclPSSwELIh9yWpAsvp/Gm9YnsWNShtGt8jDFjPux2u/jc5z6HD3zgA9i8efOwTqqvaYwm94kGXlB74/I65/DVr34Vv/ALv4Df+Z3fgXMOs7OzwzwCQjQKpXOqnQqSYnz+yX+4snJ+qqXLtDRNMTMzgzRNcfr0aTzxxBP4zne+g69//evResgBci4ckonz5517ZmYGnU4HS0tLSNMUt9xyS7A8/fAPtjw9MwbIKvSzFmzZBl7ch2rHNnRmNuINt74eZ/sLOHH4GO68886gTJqeWl5IRkoP+Us+673HrbfeOhwkmpSTMtXZPiTr4cOHMT8/j6985Sv4wQ9+0Jh3U/04f/k8ANxwww34whe+gPvuuw8zMzNjPPhWFHn4UR1dVKhgmqb47Gc/20jw80FZluFXfuVX1KlXEzLn/me8R9LPUR45gs7P/Ax8YpHZBPd//OOYRQs+WdlH2fNBeZ7j3e9+96siy1VXXYVPfvKT2Llz5/BNcqF8b4zBNddcg09+8pPYsGGD+sxDDz2EG264AWVZYm5uDnfeeWfj+i+ajiVHlldLhrpQlTryAKx3wMkTSE8vwF+5F5UFMm/RLwGTJbgI+hOA5dmIth/qQlG32x2bgp5vIj/za3M13rt378bnP/95AMD9998/EY+LxMUD0l7hr5YMq6vDIX/5CFp5iezKvShMAmMGWPyrrd/FQto08dWQgf+WtHfvXnjvsX37duzcubMRGkjU+HJvAiqICD0JbYWOXe5NayueRwdHcmSHFCEEjk8VeF3cQJTOgQGiusu9eT5R6HJvbSer8yWSPEU/KWBeeApFO4O5bDtsWaBwFVxeIEcObi5uW3lwJNlDczwPhJXpHKzgugOTXe5NqKCGzJFNyObEm+zO/cR9xW1JQMGkl3uTHrwM30HM6yF5ySacKBKHy8bBi3379mFmZgaHDh3Ciy++iMsvv3z44bhus2OjqSBfMEqhKZ8TX+BrnY4vEHkZGe0g0SZO3vshIijL8EU/Jx6RLR0Q+hio6RHiYbwHTIIUBu7QHFqX70SyaQMAD5MkSI2FtaODDa9bW+eE1mJaxDvVoU2tOAglnw9FmWjxdbyMBEFC1/jwSJYmdqe6NB3p39qgEtJDfgLQ8oDRnRPU4T7+8Y+j1+vh5MmTQZk0qu1YSZIMRw4J1dLorm0bkafEUhnqWDKPHCiDWimPDEnKe798roY0DBkndC6BBtVSxw7ddyU7L4fcqa7SlzDeoLOU4+zhE0iv3I12qwXDGoPkzQNXtdhGsqVs3HwrBMnEbcUHwphN6BnthFw6llkboCR8TXaUHZUfMMO3/pB+VJ+0L9ld66SynVA6dUje2TV5KY/+5gMR+TZJEtx6663DdIojpUDfOmoEt4fmwKG5aez5SeqqqydWZ4zH6tdQulzOWDjrYRfOwryyALNnN5KkPixmJfai/FD6alG+Ol/J2Yb2OyajrK+OR4hXXb2h52M2ojw+sMgdDnV0UYEXr30y8HBwx15GstjDzJV74BvsxefhMmtBa1nXhaALIe+FtknjjkUfyriAoQYhY6t4eui8Nm0kaNLgNF6TyhUjqTfpoNVhfIoEHuXcAbQrALuWz7io4zupvCEZNF4r0Tum50rq1/Jjb4A63qG2NQImMd9JeXk7lHU11TtGjc4V5LFnfI5KeaFrcTQBaR4uY714XXKOLNN5XbKTktGoTu35UBm+bpRlQmvF0boM4D36+1/E+m0b4DdsRFW5QcR7YFCh2MUQ79Dl6dpA10RezVeaD5vwkCgtySnllXaXbUi7ID00ADfhwQdBypPtR8pLunB7xGy16nMFy7Ic7qINMdHuiAodxMgbkuxYWuMiGTh4AYzedSVHklBj1OBVqgvQD2nU7t/iPEag5Qpw5SKSF19C/4otyGwGV5bDyaAMjSGeobyQffnz0r6xA1E1kodWyrwQD207PR9MeecJDbQcgdMGHO2w0tChnKHOoOnO33pap4vZnXisyYGdpEjTIFwSOnTbu4bqkBG1AEcK+qTylGaMCQZdaghY6DAZXpcG68eCQUf0qICyWIA9dhrJnT+LpNNGktiRjqXxJnQxJlfIJlJ3TV5qwJpNyO7aZXUxHqGDMaVN+CCq7fqldClvnd01JJrq0uTSEMbFxUUAepB1zO5NziZpHNIUQ94mQW/4lFKOeLIMH914Hn9tSx48LYYU1vHW5NWI51XeozpzFK35syivvBbGGdjEnJshelVers+kvHldIVvV1UVpGkK2Uv6xdCkXoIexxeTV6gi1K60c9wN/s0tfaAOKxluj2o4V6zyvFq1WlvOli02A6vAR2KpEtntXfQEmz0pkatLgXw3SBo5Xm0KD6vmixtf4xJA3DaGJ5U2SLvO1fzdFcFYqbwwNGpEDHv7FoyjWzSK7ZBt8EpZN1q+BBJPwDulTp5/2fF16nQxNfEOkdTyut5ZXVyYkpyzHbcLzmtYVo0Zb85sYOFR2kmdjDX4teMTKTDqyas86XyA98DLcls2wmzepC/VQQ1kLqmvQoTIr0X2t3kKxzwZrSXVtq25gr8uTVPvGyvN8GHgor9gJwcHe++GWc9lo5KmkRBQAq93Izm9v53N34iFROx7oy4nAC01eQgvl9u5+vz9yuqzkMQJemB6w/zDstm0ojEFV5OB4VLfbHanDGDPcSq/dXE/BoJpD6WJqad+QvOQ7Dbwoy3LsWABg2e4aj5BvQ8BCSA/yY1M9VsJDOzXYez98XgYgx+oiH8nL0CXVdizaQi7j6Khjhc4VNMao27q1mEAqQ8iYXPgSQqMtejVEieSd5BofQiQ1FCp0nczYWYvdJeSnzyK96XrYTgcZAGMSAMvfR7TjCsge8hwFilkLXbHT6XTURbxmE34UgsYjdIaD5kMA6rmCIbsTD4nsEswduopJszvZW0MYZfshIplkXCWladf4aHanvDW5xoeDFzFkTAqg5ZFgIdRFi5im3xpiKEeUGAoYk7kOUeLPadOHoUwnT6O7tIDZPVfAww6uQrUG1LFCfCeVV+UdkyvgDyAcC8rtG/N7aBqp+ZCXob9DuwrqeGt5k5bhwdtauzuvqGCMYtBmCCqNBaTWdZSmMkwqV4i/ViaGklYvHYH1OZLLL4MzFgajU840TUc+tvOP3pPC3TE7altyQvWE1g0xX4UGhLoGPQn/GG+NV13bCskbCq9roneMpkG4qyQPwPvBT/XSy0iyBObSS+CU4Nt//Md/xBe/+MXhtGlKP7nUKFYQGN+xyacAWq8n0oAC+h1CZfgrl6aBtA6S8WZaXVQuxFtLp/q0PFmXMQaDU29TlA5IyhJFZpHtn0O+/RKY2fXoo0LLeZybCWJpaQn/9E//NIx0kDqG5NXSpc4SSCBfNeFBo7CWrtlWkhb/p9lRKwMsXywemnbFdOdycXQxFAtKewslD2nHOh2aILmN7sciNEvOp8kh2ryd4sk0mFMuIgEMUTFCnKgeQuzSNB0xZpIkIwdEcgfHpjehvPn5eezbt08N7kzTdNxZzsOYDNYAKSp4U2Dd08+hnElw5qU5nDg1j+L4STz2+BOAAW6//Xbce++9+Ou//mscPHhw5FDRoihw5MgRPPfcc2Ny0UJak4vfykJTIbrEITTQ8DeltRZFUaDX640hkiSbpjvZhPuD+5xk4nxogyBfZ5Pdn3/+eZX3JO2HtwvZ2bX2A2CIyJ46dWrEjsYYNU6R7JWmKa6//nrEqLZjXXHFFWNwJXUogolD1/holzZr198Ag7it48ePY8+ePWNvD7q5hJQjA8mrXkguMkoIFdRuvdi/fz/27t07Fk9GDZUv1L0fBK1WxqCNDKWpgLPHUBUe1ZtuxOw112F7ex3s1Vfhtp+7HYAZ8vDe44orrhiuB6j+HTt24LrrrmskLzCA2zkqSLaiWzoAjDTy0G0jmt2pTOwaH3mFEPetvIGF68F96JzDCy+8gGuuuWYsVk+7SQaIX+MjbxuhTsTbL58FHT9+HACwdevWoVz05guhx7wtxqjR1nztLAPe0DSIOnReAr3h5EKTn0sgF6icNzcapXP+fNqoBdRq2++pXOiMBa0u5ypUCZCUFj1bob2wADe/iOTynShSixmfoDAO1hgYDGy1YcMGvPGNbxypk/TVeJC9Yuc7hGwlUS7OhxP//KHxCJ15ofHQfMunVdKH3O4yjb5haf4guetswnXU/E5vRI6Mht7uJFeo/YzJUvvETwnVrSU0SpyFtw4WBv7ISVRuCenlOwDTQmUrWAecu7EHxhhs3LgR73znO6fAxQUmuZbS8taaph5eMRlYb4GkgoVFdfQkyszBXnYZUKWorIP1gME4TB96O62pdA1h4Z8WutD2aBSEq6EwoXSZp9XHf8fKhBDEWN5K5JIIW9MydJx06iucPfISkg0b4dZvhPGDdI9kgMM3sMmkdpSySnuMbMBcgX6yXF06ByWa+qOurjq/r4Uesq6m7WfVqCDdAkJzXj4Ppdi78fWHG8YXygUxpWvHgNGiUSrOD6fki3V+dBjl0SJaQwApHlF+6IvtIKbFslxc50UJJAaJy2Eqj+rll5Bu3ISyNQOf50Cao/Id2KoCzPLiWupNsZHysFJg9MBO6UiSVUsnW3D0jMAL2YhoB7HkTeCFti6j2DoOBnCZtE7NbauBCxLkIrvI9Qwd7ikbN9mX24r7lddFMlHcKC9Hg5LWFig9FGbGqRF4oS36STFt4WutVW9DJ+G0RbG2iCbDp2k6hEv5Ip1gX+kUziOkk1wsEx9t4SvTrbVwHkBiYU0GU/VQHDuGjXuuRt5qIfUOiU0Bkwzn2jSYSN5UtyYvOVrbBk42CaVrnZH04aTdfabVVceD7K6d30c6aAAUIZVyACYesnGTzlJ3zVa8I2l1ydhGDsZpnVp+UohRbcei7xhjAafstS8ZUZrWsciIMo+jVnJE42sS6ZS6wzQlaQ2VI0IachRCBb3po7CzSLvHsP7kPPK7r0TbGpSpR5rMDKaKGEcxQ3prHSuECsZspdmEntUaC+kpSRsI6NkYKii35kt/UB4/sFN2LI5Gj9p9+RBXzVbaW1xDMSmdl+GfDjS7c7nqaAperIIMLIwB3IlTKIocrct3nDuR6dypVg3OFJzSTyZNO9aqyALGozp8BN4mwKWDD41TRG5K0461YjLwJgHg4Y8dh2m3kVyyZZAz7Vg/9dToXEFCjiTaEztXkNCTEJolUR3tXEFaN/DzAzl/7ew5QsC070T0vDZ3phAtDUnksYhD/coCJknQ7lsULx1CtnET/Mz64Y5cjQflaWioZkdCPrU5fegMPZJXridC5wryEB5JIR9qPKTdJXjx/7d3Lctx3Mj2oB7dLdp6U6R1rY3njjcTjrsYhx2zuOEv8Mqf5k/w1uEPcIRX/obrmLXp8VgvipIssh/VBdxF65DZWZmo6ialkD2dERQpoIBMJN4HiYQsn94XWs/vEKnT9ajzkOXQOpHtR+cl61w7ifX0LuuwzwXaYE+4Er/nRjF3NZ/xWmHMy4K8GW8pRr9rJTs2v5NwKfO0ymI5aGSeumPxewldp5QQ24gQgLAA5r/9hvr2LaRytObIM6cT6kDytuTlj9eQpE5kuG5Ink4svWv+unHLcAm3S+NXq2NZhtJywJaAmCyf5h1CcJ1synLwb8sLLsNl2TXvXB320WCHnRbcTgF072Wc5TxRom+MCyG4D9IBtqNLGW7ZdDEvSTwG8JxmWshcSsktRwoJqZmjfv47wt8/RlGPMQrJHdE0b9lAyrLspKGO+pyY6nDP0SXQham5grDkHY/HpgEwDa+9urWu5gPd1+YZTnllZ6PerZWHxyOErlNQ+b22KeUtAFm/cgLJtes+utTVfBlnpfPSWHFWuHVaruN0Pl54Tt5cGfU3F/9f/dOevkL59ATFg/tAKBBCNPORZdHlzsnrySTLaeV/WZ3k+Fvy67oaUodaJq89DJHXkmlIuly9DG0LFr3T4IW1NHuXqEBAevEUoQVGhwdI7xBm8S7rTdPbkPVt6+Od7ljvNgWkZUDx6Ain4z20BwdIRf/ae0dvn/pm5TdBf2gj3KuSa9s0ARHNkxPUe9eAGzcQI1C8Bd6WToboSn63DY9cuMdjaPk2SbNtOYa2uSHf93XIwQ47ucHWBdRvG8l0FhGS1RtJvh7P35KH5dARWDc4lUQ0yXteyFIYnYXqvKRzSrlXaZoGJVrMfn2Iau8aUlmiWbYI7dJ09sg0El0siuL8W89hp6dfeWwhedB4Ve8XCOtbDjtTSubVfMuJJ9CtW8pAI2Pr2RzpiFXOIIyT+mVeltsHth/NQ6KIWl+8Va0BEs9hJ9N4eg8hXN5hJxETCzEjJGmhJwBMJ5A5L7VExqyNKa2JGUelW6hVnydcC52q63ojB5hFUSC0Z5geP8fk8B6K9/YwKmuEdjVoeM4epU5SWr91aznsbJrGtaS25GK4BoEIjVtomsWb6XIOOy0DWY34soyWTmiPt4mj1D5PuJ7DTsvG7+zsDCmljvNR1olVhwCu5mq+nlkkE44ym6AwHgpkxevRWP6Wo89VoIJs+B50b6JOpwmjp/9C+sf/4lUxxs1lRCyGI3nsUDl5c+iUNsLVCOMQlK1TpgH8rTrUdZVD6ax25IVtUoe5MuqDa/6teeV4e+WxaDB48aY2eW8r/zdCZzOk2RmKgwOksLIb3IZylbgtDc3vXdD7uyDDVdOln/HxNnmWeZBcFnibUs3T4p3jP2Tzaa3drZFX59cJO36C0LRI9/YxQkAKETFeHXjBU35LXk+/lr7k/619gxdu8bDy93jmZNJ8LHMjjw/T6FkuV0a9T7ZkHML7ysALT9A+6lvmWXGe0N6SYBu/ETmFbCJzAIDjxyjaBBzeQxUDUgGEzGHW0GWN5p1bag/5vq8RbFO/HnnLbG9pvO1ya6hOLNLbhb6l6zY8BqGC8/ncvOjoGYLS/5oWhEgMN58yji4AZrPZGnIGYA2xkjPLbDZbs2VjJZKHBlVoUGyNduSvG5nmwfK1zQLh1yOkaoR0bYLlokUTGmDZfaSbaWazWWctP5/PzzfeGoXj1XyrAVInWld8/kbvVWnoquuLTxdRNqkTyqMHsNlstnZBkLx5xV7qnYOlRgX5N58Q0jMWy+FdzbdsBT0kcT6fr91gpkz8XrZVzljaVQHT0XntlaCCKdk3J2kFbD3uHUIXVQHgolO0ObRQKCI3QLejWt97PAgFWyjmaDQy7RRTsm3WUhFw9uwp4u07KO/cRhiXKDBBKtu1J2s0WcgYZbXQSi8vz14PsNHCHCo4Go3cp4Jy9TFU7zmUzatzqxzkAXRtHj0eJMuFA9096LLk9E6d9NEgW0GeO2nBOCp2Gp2DrMgKtpYsTKdHYRkmR2GLv8xjqFxyL+H5RejA2iEg/vsRint3gXq0UmRISMb35GEt/eTfnrzWkpc89N5Qhss46QLAoiE8pMxaj1q3Xrgss2eJT3ktPTKtJ6+3FJY/cgUgfzPO05UsSx/1blKGrimHUN/a1arEq6YhG8++9CklICaUj54i3buFtigRYgLgmzSRr77m4g1OjN9Gvm3Tvm3apKFelvRgZnWyq6SdreBASsDq8e4UkQDE0zNUp1NU9/ZXUDuAXMeKMeKHH37Ad999557q7+jPQ1s/4yPJuviVg5DpUi0HvwLrm1z9Wy/lLP7WRTXrezlqWXEpJSxTQpUWCG2Ls3ANk8fPsDx7gXj/L3g/ASkkRIyA1J7vPeVMdHR0hIcPHyKEgO+//x5ffvll54KldwnR09VQ+J56tHgwfpM6lLrUPDw9WjJz1rDalldXJE9XVpwFxZOvDNd/58rQN8v1dqxHjx51ECjJgB1Fh/PpFE3y5qmkpmnOTUysvLxr/t5lNG+N7C0/Xrx4gaOjo044n59ZokAd5wixxbzew81//h/QNGiaFsc//4IitWiLCgXS+bXuqqpwdnYGYIUiffXVV/j222+xv79S99CGAAALyElEQVSPX375BSGsbPiapsGTJ09wdHRklsXSF+WS3xZFsRYudclGZPkVPDs7c+3yvKv52s8jw839KGC2h5QSXr161dF7rv14dcjzPv2EkVUOpp9Op4gx4vT0FMD64KD1q/P66KOPOnGSejvW/v4+ZrOZiaoQxrVQQT7jY1WKtZ+azWY4Pj7GwcHBOR+OGIvFomMrSEjWeiqIFWyhmKwwXSnT6RQHBwcmvLvqvAWQFkhp9QBq2Uwxu3UHN/76VzT3DzCKLWIo1nTy8uVL/PzzzwCATz75BD/++CP29/fx6aefnlccoeBbt27hgw8+6MjL28haj7PZbA1NY4OQz/jIOK48dGOZTqc4Pj7G/fv3oYn61bz100ZS7yF0bQUJbVuPe0+nUxweHnbqkAa9ns8LCxX0dOU5JeW7WDdv3lzbc+Xa9ZU948PMrXMszlYWjEro0yqkVj7TVFWFyWTS6VghhHMjUY2CWS+uy3eaJPHcTSuf5ZhMJqYjyLquVw8fpAJtKFC1SyxOniDcuIXqzl1gMsa4jUivnc5QJ+PxGPv7+wCAn376CV9//TU+//xzPHjwAJ999tm53EWxerl9EyPclNKa0bAcpa0X7b33sWKM53q3KGeEq3lYZ5Ry1tWDI1ciss6ZhudhlhEugM5KZRsj3NFotKZH2bEsvVPHnq4kXepx76ukt7WZ35ZPCkBAQAwBiAHLx88Q7txAUQWElBAB0z0nK/njjz/GN998g7qucf369T8EavdnIbl38vZyV03vTMcieWc8b4rHUIphdRUfISEuI5qTl6g/uIViVKKICcnIU/IZj8e4ffu2eTXlTdAfqeP+GfXRC7drlEkjJzm0KodYWWmGyNAXt41cObpIs4LcSySE6SnC789R3TtEDCUQAgDfmFbmk5N7U3m35aXJanSblkXHe3FeOTblvWm5PR45/pvw1rSxX0HgAj3hnsVyNMnNp4Qs5f6H+cg0ci8gCyxtEmV+DNfwvGUPCFzYCmoHkdKKXCuNKGZEQJlaAC3iyxOkk2PEO3cxb4vVdfywREoFUvR14jnslPGat4fMef4GpSWDBi8sNJS6yjldtQAEaZVBnTGceySWi3HWU0w8NLfaicxb8pYHvFK/uj3I9sN9PcP5I30IyvbDupJEPVm+FjVt5PNCb/Ao+JAzC0264VvnEH0jCTuDNoHi30Pl0rOd/hYAYkoIMSEgAc9PEJoFiv0DtAUQ0io84SKfoec4Msw7d+vToyQCApYJFfVF0gCDJ++QsvA73aGs8sl69wZBjzfbodUW9N96RtK6t2QcWu4+2toIl4w9WJJnClph7Jx6FJYv3esZi8gV0zOO1+ytcxMPFQyh6wCTDcJCjlJ6/VZT0SLFCi1qpOcvUEQg3P9v7AVgURWoMEYAEFM0eXA21jqhTJ4RrpUX03m68nRioYJcQeScguo6lHWr4X4PFUypa0jNkV/zYCPPOR71UEHLkJrf61mOKyr51pecRKw6tIy4LdqZNA2kkAqkEFAiYvn0OdJkgur9PaQAFGH3ZM+O1mnXsQZSSAXa1/us6tExwo0bKN4bAQEogRXWvutbO3pNu441mFYWFyku0T5+hurGDcRJjdcI/I52tEa9eyxtKCppCFy5CRRrWRHk0ntybSqvx3s9cQOgxKIF6mf/xvTDw9Wu6nzNnof7+3Tl+bDIARe58BwgoMlC3yR/L9xLl5NNx/XxtnRipcm1GS8dw3S6IXXYdy426Gq+fKtIbvKWy6XZIHgNHeje+OX1bb3JnM/nnevp7NQyTHYAeUWccZKH3mQ2TdN7NV8Tr4jXaLAMeyjPpmieHyP8z98wn80QqvW3lSyoXepEb6DpELRtW/NqvuWAE8C5AamGvOXVfImWeiZNTdOcu1+QlNLqGnpKXZdwuav5ZVmuHalIe08LDWW5dX3QJYJluwnANEvTV/PJm6CGhNuBi+MX7TKhrw6BK7iar5/xkUqp6xrL5TLr2NCy29J5ARcol8xLdlhtZ8Z4y1aQPKyr+Za8RLm8Z2PqukYRSlxDifB8hrNmieLDBxiNJygMBMzTCeW1dKLLTrksW0zGWWUHbDs+6jvnEkFTSsm0FCHCp3lYdStnN8vpKm0IrZnDcuTJ/1uooEYYJUJs1e2rV6/O9Ss7Vq4OgSt02MmOZUGf1qGjTGc1Iiud97fkI+MkvOt9v0l4L++QULQJy6fHCG2LcO8AMQSURjk8nQyJ2+R7fQgsvx9aV1qvkoZedbfy0h3FqsNc2XO8c3lYfDzexWujaZ3O4+3JatEOvBhKqUQbgPbJYyAUiNev71DAHbm061gDKbQ1pgUw+vUh0rUJqpvv7dDAHbk0yAiXvy2zj6siD8nxvu1DcDbl1ZsmJIxSxOLpCRaTEcq99zfOY1OZtimbTPe2SCOem7aRTRDJTeXKIcGXya+PNkYFga6xqwVLek/AeBcdidjJdBLpIk+5p1gsFh1UUPLwLjpa8tLoUiODdKgZEJDiAvHJCdq9CZpUIM4X5nMyluNP6lLufUJY3fglCqWf0qHDTk+PNHiVRDRN77O8m7fUu+bNvCxEUj5tBFzUkzTa1eCF1IkGrSxU0HPYybod8oyPRCs1eBFCcJ/x8eowxngu66VRQTp+kVebdceybNysm7pUsgW30/pZP7TM39Z1c2AddqVc5GHB7SEEE6olHGv5yajrGqEAMF1g9vIU4/86QKjr104+u96BAfsh66qqTFtB2ijqNOwgls2ltHHT8vJKu96oA92ORTQ2Z9uodcI0Gm5nZ/ZQQW0rSDTWsxW0UEGSB7db9pMcZLWxNv12aFtBrw6lXH00qGPRWFLPWLIRW+n0qClhX6/iLSeUerbMxXEGs1BMOUjkkDZJzGeJAkU7BX4/Rtj/G+IkogrrKFGOt8xfNkYpu9Wp5fUMnZf80frwEEMLLbTqkHVllUWWUZfFQiu1c59cnCy3Vx+Sl6UT3YEsxFDORla9yJUQSdZvHw3yhNsH1ebSDAm/DFmQbx9Uug3/EBLC6SnifIbx4QFaFDS22Ii3/L+O31Tey0LCOdq0LJfZw2xSBrk6GSKXx0MOSF7cEDk92qGCQykBePkKsWkQ928ixLI3yY7+c2nXsQZSEYB4coIQE6q7twBUu2OsPwFd5epJUu9SkGiZvn0KXFxVttbnRK204AQQ9A1X74q4lEHzIGpmXR23lidEBS15yVuXkfI2ZUDx22PMq4Rr799c8SjC2mqQ+Xg8rHIQpbQQQG7IrTW9lZcsu96zEAixdEI+mvrq0NO7JurWukTKOC2bvIJv8bZ4eDZ+LJsFwpAXsI4d9Om977Lj4HMs7RNCoj1Wmk3OZWReFjqUy3Ob76z43L4kpYSYgOq3Yyyvj1HsXUco2te+3LtnNl7Zrd+eG4Ih8ubKqa+dezwA++WOHG8Zb31r6USnYRl4ZOC1iU3lkjzlZODln+Nh0dD95GC4nZClzJyjne69nBks77lEVgiXUkiJFmrLaOnulxVBA1V5bsKZkPJaowrDZSfirGF5XmU5KgDpyXPs3byLYjJBWTUoUaIqqzXeHAUtI1F9BEHInAicTkP9eB5hrSvldG0dwoXzFDlTa7idVucauueoLa3CSTKc5WYawu2yDllfVh2y7jXizPJZ3oy9OmReGillOONkm2M7kqgg24Nn6Dvkav4gVDAHUVu9V8OqMi+NNsnfHlJmGUXKOH3wZ/H2wkhs4B6F2GJ2+jvi7dtYjkqkOEUoRp2y5GY9TbJcuVk0p3cLEdV1xb+tUdta0sk0nh5lGnYUKw073hCjbE8GHZbTcQ4J1N96dBX7rkFemqyDUwrgYfqWQ3mg2xFkuHfwJs8lZKH1aCa/9yrFShOC/xIgR7k2LbH48B7qw7toywJlQgdu1zP7EN4A8MUXX+DOnTtmGq8heU5TLPIGRsrkjcAeD6/O5czNskrrcYs8d82erjydUO/W9oTtV3f+uq5NT0y5OvTadefbdJkDiB3taEcm7eD2He3oDdCuY+1oR2+Adh1rRzt6A7TrWDva0Rug/wc2U+rG7FD7sQAAAABJRU5ErkJggg==)
A. \(y = - {x^3} + 3{x^2} + 1\)
B. \(y = {x^3} - 3{x^2} + 3x + 1.\)
C. \(y = - {x^3} - 3{x^2} - 1.\)
D. \(y = {x^3} - 3x + 1.\)
Câu hỏi trên thuộc đề trắc nghiệm
Đề thi giữa học kì 1 Toán 12 THPT Việt Đức Hà Nội năm học 2017 - 2018