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<h2>HL Paper 1</h2><div class="question">
<p>Which energy profile diagram represents an exothermic S<sub>N</sub>1 reaction?</p>
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wWpeYO8PEFIYR9X9k/Za4c3c/yZgj/P+T7uEiedSvZ5yX3dC/1YT2bveq9bzsdyQYBTRNKptN8/AAAf46zYK09Co9D7elb22hf0/c+71/lA7FX6uMJVsVee+3tBSYi8saKd+ChD/HhxZYnrihF7/Xdtdpz5uAqKM/N+3I63EiedCk72nfuay/98mWKvQpNOZfj+gV9gex3gCalDpGm+/dF53+pI0w5PWuWs18r9L74sfUKr5ryfcVaO/XuZvKuluSH9ZMjDNQvYJ3upXNvsEYkKCRLJSJWN357KmS5fR3ou+Up2790kkyILej/HH7n5drm3mvUgj7PfbpLkDK3LvUOi2tSTyjnTucpff5e0bKzvuE+WpH4ppS6O/TFdlqdoyW0TiX36Ibm+gA+y/PUPyZChTRxXJ2T74k0FnC5zh0Q2uenCf1/5K+Wmelc5Lk7I90f+V8xtbafk2w2psl0vQ9pK6/p5PxfqUrn+7nvlbr08kSZr0g87Ln6ULcs+dvwtQVJvaH9pe/2l+mx+5WtK26f7Wc1K83yOLuq0/Lj5I1mln4oiPv/XP9xfYvXzL59L8obvLvy3BofIrdcW8HEd+1LWLNrnuCj485zv4y6xkn1eygf3ksV6DPCOBGlX0GsoleTm2++U8z8jRSvD9w8AwHeVKfY6LP9e9IF8U+R9/Xpp1r294/54Xmzi9bGXk+IKZ8ZeZ7+TjYs/d1w4Xu9OLaR+5fP+r47XulHLBubyxKK1kn7M8X91SvxYGCfFdQXGXo64JH2tLDGvf0FxZt6PuxRCwqXxLXb7hHPK/6mW/FU/nY6v7SO/nOvu5ZrYqwzfP/ALBf3cA+Bxt0uXFxNk2uqV8o9et50XZPwm/9n7reNHsuNWXK+W/Kmw7+LyNaRe85scFztkw1eHcuYKZDW2TE52vL0rI9r2kLe0/3I+joDkq/ScxEu1O6XezRfevERukHbT0h1B1R75Ir65VLFmS+r0D3skXS8K/XtUnhte5h7JOr/xYKHvW0mqXHm5dV1ch2TH+h3mqmrz2+Xmgl7vayPlH3qD3vuxjGruCKxO/yh7tuqLeJPce3uNQn/Qngsyv5fdWcXtHnRKftiz21wV+vGo3M//Cfl294ELekQU9rVzevfnkqJfXEW8/oUFxxfljM+LaWypX6uOt6Q4addhouRtwXlxzv7+AQD4hyJir7M/y3fb9V5wlfy11pUXv69f9OQ7b4q9nBNXODX2+nGnbDDJtsLiqIqO0Gui+Xfv3vGSNK9S3jnxY2GcFNcVHHeckN2fbzFxSeGvf2kSPTkK/X8GVZEr/2BdX0xZYy+nf//A1xT2OQfgSuEJst4kKey3b2T9otHSpa4uOQRJne6dpP1DraR5cEHhw2n55YhW0zhuU7Mel9ACV+z0rZ5ETdjp+FNHJH3Pj473sukJKGl5TqPQ1b0BEhszxPE2Kk9zw7wcf+fRnL/TtU7LoX17cm5kd94s11c0kwWqeP3NEqoXJ47If0+4cDnk7P/k6E+/Wg+K6dA+2WGCx9py8/WFBT4OFa+Rm+/Uu+sv8p+juiJmn7x2/udS36wTSByvzvdf6UpeNQm9+RpH2FWYSnL9zbXN1YmDR00wk9elV1ZxfKWd76ycOHbUEQo7FPX6l79cqtW88L1dQ085STp30sv/hUnUQP1adbxd0Iy1OMr6/QMA8Ellib0cscCRfXon3SdzezUo4J5hvdXuaCWPdsueH/JWunhz7OWcuMKZij5IpyBliR+tk9fO/1yat0Gy5KAjAih1XJdfwbHXKTn28/8cY9Gvf/krqsmN1rXrOTn2KvP3D3wdSSfAK1wq14Z2lVHvL5AR4VXkm1nDJer+YbLkh9KdrlE4R9CT/rZ0evDxfKdRBIUPktcTE2Rc4gxJ2bZAnjKrNEAhyl8uVa8u7vJYWRyV9ITHJaLXS3kC8mvl/sGvOr5WHV+vSatk66JBpVr5AwAEOmIv+I7yV1SVq61r1yL2gvORdAK8SeXbpMfLw6SFLoOcSJbY3u9I+gWlvxXlimrVzVXVwQvl63yrdgW//XtIaM7KyfGtMm34FLOnuk73BEn58lvz/BfThkj7yEhpF9lMgk9lWas5eTn+zqo5f6drVZSrat6ccyPbukd+KKK8JLeMOqia/DHIhT/KSpNguaqm3GqCx4us1OSWa18hf6qqK2d5ysUveEuXf0Te4PgzVeXG2651jBerwDlXLh90bdUCVtYKUl6CqlR1hOEORb3+uR+3K2mQPlNGTNDP8u3SJfFfss28DpvkH0M6Ob5WHV+vzW+Wk/bKZrGV4fsHAOB/ihN75Vb41pWnFm0v8F6R/22FxIRaG/S8PvZyZVxROiVPsJQlfjy3RfHCt4nS7lpHBFDquK447O2HRb/+uR+3S7ko9irL9w/8AkknwMuUv76VvDCpj9TRBzunyIipW8/bN3+p/KnWLeZmfzTtC9lTgp1lp3etl1m6ahH0iDw79GEJPr8xo0PBJc0V5ZrbQnOaIx7ZKtv3FHTDPSvH0kbK7Voee+tISdOmjqWQW/Zc6N+jTsmeL7bm3PCCb5YaBfw7nOcqubXpreaq8Nf7kKTF3WtKg2+PS5NjueXV38nHX2Q5XpmCnd3zhXxsgswbpXaN4t5cz5W3F/n5P5sl29O+c1wEyS21r7uwIXghKta+QyL0i6uI1//cx+1KJ2TXxymmhDuo+xB5NrJOAf+G0mw9KP33DwDAP1009spthl30fb0g3h97uTauKJVr6koT07S8iNf7WJqMuFW3Zd0rI9IOuTZ+dGlcFyS172hwkbgkz8ftUi6Kvcrw/QP/QNIJ8DqXyrXNn5RRg/XWeUK+mfCqTEvPe5spL1VC75N2enfKeEcSPtxX8A/v41sk0ezFzrkZF8vZfbJ0/Ds5TSvPU/662+Re0/fgc1mwbPuFDSTP7pe181eZPf5BHe6T0Cr5f7z89vOx4u3/vyZUWkfoitsGGTf+X/JDAf+4sz/8SxJe2+C4CpJ67cPkFpf+JLtUrru9UU4gmrFUlm+78JZ/9of1ssCc+FZT2oX/VarINdKgzb2Oj+6EbH9tiiwtqFQ/72tdyMkiBXMEoQ3vz1mRLfTz/5v88OEUGWedeFPgaTKFqfJXeaBDTcdFYa//Udm2bGmBXyPudu7roCj/k5+P5Q0+Xfj9AwDwUReLvapLaHjzou/rjrvJ8fQ3pXVJE0Aej71cHFeURvk/Sb3mf3FcOF5vx79v2wVV/46P56MlOSe+BTWXB0Kruzh+dGVcV4y45Ph2WT5fT/PzvGLFXr8elWP5+q268PsHPsGlPy8AlFZVCe37d3nKBBrp8lb3l/L3GKjSWAaMiXT88D4oq2IGysikNMnMvSHriSjJkhgzSN7SlbWQx+WxZrq6kKeK5cQH8vprH174Pk90klhz3Kw6KDv25Qm4KodIVL8W5obxzYRB8nTC6nPvfzxTPpowSkbYR9X2vPuCE1RObN0uuy8IGgpQ/gZ5oG9Xk+Q5kTJc+r6QJGmZ9iHAOY0NR/YennO0b93+MuKRYBf/ICsvleu3kydMIKOfi2clcU2mFfg5bpCZq2XiC2Oto4bt1/pSuT68q/xNP3+mVP9lmZGW933SZMYLA63XOlSeGhkpwSX4R5S/vrn06auBcQGff8fnIi3pZekbk+z4TAVJncGDpWNwcQMfdZU0ix5igs+c13+OpB+0vvb085zwrPQyZdeudm7l78SsBHk9+ZtzwbaeopKcIP3Dh+S87urIHvn+UEFF6Yck/fM9+QP1Un7/AAD8WVGxV3mp0qy3jNJY4IL7uoO5L02Qp7uPN9vo6g3tKs2sBJAvxF6ujStKo6rU79QjJxG2c7z0inlbPsobC655R158PufjyX2tXRo/ujauuyAumblFDpqXPyfOzI1JXM5JsdeJL2Xbbvu1V6X//oGfyAbgJr9nH1g8MPuWm2pl39J7cfYBa7ZwZ7J/2Toxu5X+ecdbvf6Ls7POWE8Z/83++r3+2fWs5wt8eyg+e+2BX60/r37NzlocU8T7PJwdtzglO6n3HY7rW7Mj3/va8VHkdbG/8+HskWuz8r3PmV3vZUfm+zMDs5MP/O545pfsreMjzNyd47c6Xp28fs0+sDY+999e4NsF/zbHK7x1fPad+lz98dlb8/8PLUX9nRfxy5eO1+XuCz8O+62Aj+fMgdTskQ/dWvCfN28Xvl7FdiYre+0LDxfw/7Tfbs1u9UJq9oF8//Pi/vuLev3vzu77j8nZcfX1OiI7Yesv1vsU/vqX+vNy5rvs5P5FveYvZCevnZ7d1zzulp2066T1jupk9q73uuX/8/m+70rz/QMA8C1Ojr0uFgsUeO/1kdirVHGFK2Mvx+fi65nZfeue/3HYbwW/1qWJH4urdHFdMf/9Rb3+dftn/2P6sBLEWMX4O3/fmp1QQCxXptjrzNfZSQ/nfX3uyO67+HvrSYdSff/AH5BCBLxWeakc2sMq9dZVm7ESn6/ktorU6fW2bFw9Q14fHG5WJXLV7SYj3lwo65cPl+bXmrbQlkvl+sixsmpRgjwVrpU7lqBweWr8ZFnw6fsyKvJ+edAuIV68Sb7Nt0Cmf+cEx/tPPu/v1FMtXpNpq2fKi82vz7dyVD64g7w2/Wm5P/cPH5ajvxTR4dHQMvfhsvTThZL4YrecrW0Wc9pLgf82F6t8m/T8x2JZ8OarBbx2MyTl/ecu+HjKX/uAvLh8jeN9RlhHMlvyvN7nv17FVv56af7S+7J+0dsyovvt1qTKOWEkcdEaWfrSA3Jtqf7n517/cXk/z/p1lfRPGf94Q7nSmnKp8jWl3duO1zxxUJ6vn7xfAy9Ju2bhVjn955K84bs83x+VJPiRkfKPvB//T0fll9w/UJrvHwCAf7tI7KWxwLSVkpL0Wv5YwHEXqdN9RCH3Xh+JvVwaV5SG43NRp7tM+cgRC44vIA5ISpb5BbzWrowf3RPX5f060a+rkTJtyVh5vP6frDkXK0vsVT5YOr6RmOfj/9URev2vjN8/8AflNPNkXQMAAAAAAABOQR4RAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gkAAAAAAABOR9IJAAAAAAAATkfSCQAAAAAAAE5H0gn5nDx5UjZt2mRGAAAAuNbhw4dN7AUAgD8i6YR83nrzTenRpassWrjQmgEAAICrPDlggIm9UlNTrRkAAPxHuWwH6xoBLiMjQzq2i7QeiaSsXiXBwcHWIwAAADjTkuRkiY0ZYq5r1rpJlqekyGWXXWYeAwDgD6h0gqHb6V4dM8Z6lOOFuDjrCgAAAM6UlZVlEk6abFL79n5nKs4BAPAnJJ1g6Ha6LZ9tlpfiR5nH/aIHmMe6AgcAAADnmjxpkhmftxb5GjRqKO9MmmwqzwEA8BcknSCZmZkyMm6EWWnr0LGjmXtq4EDzWFfgdCUOAAAAzqH9m+bNniOdu3WV8PBwM/dyfLwZtfKcA10AAP6CpBMkMSHBjAkTJuT2EdDRXnmzV+IAAABQNnpa3RgrwfR0bKwZlfbR1IpzrTTnQBcAgL8g6RTgdPvcyhUpZjtdSEiINZtDV950BU5X4jhRBQAAoOymT5tm+jeNS0yQ6tWrW7M5tOJcK821Al0r0QEA8HUknQKYrrTZDSx79+ljzeZnr8Dpipz+eQAAAJSO9mvSvk0tW0VIu8hzJwbbtNJcK8+VXYkOAIAvI+kUwMaPG2dG3UZ3/kqbTed1JU5X5HRlDgAAACWnfZqGDB5srmOGDDFjQbTyXCvQtRKdA10AAL6OpFOAKqiBZWF0JU5X5DhRBQAAoHS0T5Mu4mnfJu3fVBStQLcPdKHSHADgy0g6BSBdabMbWA6IjjbjxdgrcvYKHQAAAIpHTwLWPk0NGjXMPSm4KFppbh/oQqU5AMCXkXQKUBGtWsnCJclSo0YNa6ZouiI3ZdrUQns/AQAAoGDaq0m3zL0cH597UvDFaCW6tji4IzTUmgEAwPeUy3awrgGjdq2bZffePdYjAAAAuBKxFwDAX7k/6XT2oKQv3yjbP5sho2Z9YU061O0mI/o1lXp33y+h115qTcITCHwAAPBVxyU9IUqiJuy0HhciKFyeiu8ozRoTd3kDYi8AgL9yY9LpNzm45V15oedY+eiENVWg26VL4msyLLKOVLZm4F4EPgAA+KpiJp1yEXd5A2IvAIC/clNPp2PyTdJgafGoJpyCpE73EZK4aJPsctxc9Qa7e++3sm31ezKi++2OP/uFzI3pJUOT98nZnHcGAABACVUdvFC+zo218r5p3DVDXh8cLkFW3PV00ldy3Ho/AAAAZ3FD0umsHE+fIU+/+C85IbdL96TVsjT+b9Im9No8f3l5qRzcXHrGz5TlLz7kCIAOyqrnE2TpD79ZzwMAAMA5NO5qJu2HvC3/Sow0cddHL74iCzNPWc8DAAA4h+uTTmczZeFLU+QbuVZaJL4pLzS/voi/tIrUeSxGYkOCRE4ky4hJG+WY9QwAAACc6VK5PnKkJA3W09E2yLgZnxJ3AQAAp3Jx0umsHN+2ShZknBAJaiFR999w8b+wfLC0HxIt3V8cJ6MaVZET7LEDAABwkapSv01bqee4OrForaQfI/ACAADO4+Kk029y4IvP5BvHVVCH+yS0SnH+uvJSpfmT8mKvDtKubahc6+KPEAAAIJCVvyVMIk2V+RbZtrvI014AAABKxMUpnUOyY/0Ox1hN7r6rtlTJmQQAAIC3KH+5VL36D46Lg7Jj39GcOQAAACdwbdLp7P/k6E+/Oi6ulVtrVs2ZAwAAgBepKjfedq1jPCLpe36U0zmTAOC3srKyJDU1VZYkJ0vc8OEFvk2ZPMU8n5mZKSdPnrTeE0BJlct2sK6d73S6JDboKG8dqStPLVogMaGVrSfgzWrXutkcqQzfpTfG/fv3W49EgoKCpEaNGtYjAID/Oi7pCVESNWGnVB28UD4dEioVrWcKV5r3gTMRewGut2nTJsnYliEL5s+TfXu/s2aLr2WrCGnfoYM0adJELrvsMmsWwMW4ttKp4jVy853VHBf/k5+PcQwv4Eq6YjN71izp0qmT1Kt7q0Q82CL37d4mTU1Aq6s2uqpz+PBh670AALAFyY3VLnd17wUAcBuNebVi6f7mzaVHl67yxtixZr5f9ACZMm2qpKxeJdt37jBJ3/PfPt6wXhYuSZaX4keZhNPKFSnSv09fE2fr/5N4Gige11Y6ySFJi+sofWb9Ivcnfij/iLzBmoc3Y7XNt+gNb/y4cTJv9hxrRqRzt65St25dqVw5p7pw165dsnfvXnOztD0zbJhEdYqS6tWrWzMAAN9Xmqql/bKkz8MSmyrEax5C7AU4l26Jm5GUlBsf16x1kyPu7SxtH25b6up/jbnXffKJzJs7V7Z8ttnMEU8DF+fipNMpyUzqIxEvbpCg7u/J+vjmxWsmfvagpC//VL6/4jZ5oHmwsCnPvQh8fIfuM4+NGWKuGzRqKINiYqR+/fqFlvzqzTI9PV2mT52ae7PU1ZsOHTtSJgwAfqEUSSfaIXgcsRfgHFr5P3nSpNxkU3Hi49LQrXoTExNNPK0Jrefj4iQ8PNx6FkBeLq6griS3NAmXeo6rE4vWSvqxsznTF3H223/JqIFDJLbXS7Iwk215wPm0Z9OT0dEm4aQ3Oi0Pnjt/voSFhRV5Q9VVGL0h6p+dOXeOed+RcSPkb716mRUhAEDgObvnC/n4iOMiqIHUrx2UMwkAPkRjY20zoS0lNOGkySaNdYsTH5eG/j/1/z0uMcH0h9Jtd9rGgobjwIVcvm2//C1hEhniCGBOfCCvT98qx635wh2ST2a8J9sdV0ERj8iDt1TKmQZg6ApO64icfeW6jW55SkqpVlb0Zqnvq5VOukqjvZ+0cgoAEEjsuCtI6vRtI3dVoaMTAN+iC6e6gKoLqbqgmjfZ5GrtIiNN7yft+aTJLv04NFYHcI7rI4vywdJxZH+pIyfkmwnx8kbaD1J4vdMx+SZphAyatc9xHSp/69tcrif2AXLpTaxHt25mRUX3kMePHl2mlRt9327du5smiXqT1sopbYwIAAgEv8nBtHfkdY27glrIE51CaGkAwKfogqkunOoCqsbGuqDqjmRTXtoj6u1Jk8zfrx+HxursIADOcUNKp7xUDu0p4198SILkC5nV60FpG/euLEs/mCf55Ah60lfIjLge0vrFf8kJuVbuf/Fl6RNa1XoeQN6Ek67g9B/Q33qm7EJCQmTm7NlmlUZP9dCte5QHA4C/0rjrX7I44Ulp0WuafOOIu1qMGSJtr7/Ueh4AvJvGqbpQarea0AVUjY2dvY2uJPTv1xhdY3VNhGnfJwAubySe1zHJTB4nMTH/dAQ3RblduiS+JsMi61yw2nY6PUHu7jBRjgqNLl2JZpbe5/yEk6tWcPQG/kxsrNm6ZxJQ48Z59OYNACipc43Ei6fwuEsRe7kHsRdQfOfHq88PH17qE+lcQZNNPbp0NdeaDNPFXSCQuXHzWhUJjnxJln66UBITX5Wnwq+15i1B4fLU+Mmy4NP3ZVQhgQ8QiPTGOmb0aJNw0maFriwZ1gSTJpr0Bq43cr2hAwD8T1D4IHk9kbgLgG8paIHUmxJOSmN1XSRWQwYPpscTAp4bK53gK1ht8y5aOqxb3vpFD5Bnhw61Zl0r7w1d96c7cysfAADIj9gLuDhfq8i3K550+5/2mmL3AAIVbboBL5aRkWESTnrs61MDB1qzrpe34kn//tTUVOsZAAAAwP1Gx8f7TMJJacWTLt6aA4DYPYAARtIJ8FK6mqMlueplx03W3TdW/ft0j7yuzvTv05dTOAAAAOARWvk/b/Ycn0k42XS3QOduXU2yTE/aAwIRSSfASy1auNCsjLwUP0qCg4OtWffSPfIJEyaY6xfi4kwiDAAAAHAX3aamlfe6EOpLCSfb07Gx5mPXk/bo74RARNIJ8EJ6QxoZN8LcoDp07GjNeoaeuKGlwVs+22wSYQAAAIA7aEw8/LnnzPXM2bN9LuGkqlevnruIq4cDAYGGpBPghSZPmmTG0a+84hU31569epq+UpoIY5sdAAAAXE0r7O0TnPU0OG87pa4kdBHX3manlVtAICHpBHgZbR6ue9b1xqQNCL2BJr60r5Rimx0AAABcTSvsNUmjJzh7S0xcFrrNTk1MTDQjEChIOgFe5tUxY8zYs1cvM3oL7SvFNjsAAAC4mlbWa4W9u09wdiXdZmfH0lQ7IZCQdAK8iN6A9EakVU6eah5eFN1mp32m2GYHAAAAV9CKeq2sV544wdmVojpFmZFqJwQSkk6AF7FvQHb5rbfRm77dCDExIcGMAAAAgLNoRb0uwnryBGdX0WonXVzWfx8LuAgUJJ0AL2FXOWnZrd6QvJU2QtS99brHfklysjULAAAAlE3ebXWePsHZVewWGjOSkswI+DuSToCXsKuc7LJbb9a7Tx+zzW6C42M+fPiwNQsAAACUnr9uq8tLq7c0qaYHBxFHIxCQdAK8gK9UOdn0YxwcE2OOsJ0+bZo1CwAAAJSOVtBrPKwV9f62re58gxxxtFowf4EZAX9G0gnwAr5U5WRrFxlpVmnemTSZPekAAAAoNW0erhX0Sivq/V1YWJjZNbBg/jzzbwf8GUknwMMyMjLMqo42FfSFKqe8tPRZ0VQcAAAApbVq5UpTQe8rVf/OYO8a2LBhgzUD+CeSToCHvb8gp6zWbiroS7T0WZNl2lRctwgCAAAAJWVXOflS1X9Z3dOsmRmnT51qRsBfkXQCPCgrK8s0EWzZKsJn967byTJ7iyAAAABQXLpwGWhVTkr/rdq/Snc86M4HwF+RdAI8aOmHS83YvUcPM/oiTZZpkKA3TKqdAAAAUBKzZs40YyBVOdki27c3o73zAfBHJJ0AD9GmgW+MHWuaCGozQV/W9uG2ZqTaCQAAAMWlh9FomwZf7G3qDLp4qwfz6M6Hw4cPW7OAfyHpBHiI3TRQmwj6uho1aphgQaudOMkOAAAAxbEmdY0ZW7dpY8ZA1LtvXzOmrFhhRsDfkHQCPMRuGmg3EfR1dm+nGUlJZgQAAAAKY1f9a6WPr1f9l0WTJk3Mzofp06ZZM4B/IekEeIBWA2lVkDYP9JdSYsqDAQAAUFx21X/nLl3MGKguu+wyierU2TRTpz8q/BFJJ8AD7FLiFi1bmtFfDLK2ClIeDAAAgKL4W9V/Wdj9UZcvW2ZGwJ+QdALcLG8pcUhIiDXrH+rXr095MAAAAIrkj1X/ZaH9UVu2imDHAPwSSSfAzfy5lDhveXBGRoY1CwAAAJxjV/03veceM0Kke48eZmTHAPwNSSfAzfy9lPiB8AfMuGrlSjMCAAAANq36XzB/nqmOD+QG4udjxwD8FUknwI2ysrL8vpTYbij+zqTJJqgAAAAAbNu2bTNV8b379LFmoGgoDn9F0glwo6UfLjWjv5cSt2mb0wxRgwoAAADAZjfLbn7ffWbEOfaOgfXr1pkR8AcknQA3CpRSYjuImDVzphkBAAAAbZKtzbK1abY2z0Z+eXcM0FAc/oKkE+AmWiar5bJaNuvv7BM4Vq5I4YYJAAAAw26S3b5DBzPiQr379jXjuk8+MSPg60g6AW5il8m2fThn65m/s4MJbpgAAABQy5bmtJpo0qSJGXGh0NBQM86bO9eMgK8j6QS4gVb7aJmslssGSimxHUxwwwQAAEBmZmbugTraNBsF08OG9DXS10pfM8DXkXQC3CA9Pd2MdrlsINBgwr5h6ql9AAAACFxrUteYsUXLlmZE4ezXyH7NAF9G0glwg8WLFpnRLpcNFPYpffapfQAAAAg8J0+ezD1QJyQkxJpFYfQ10tdKXzN97QBfRtIJcDHdWqcNtbWxtpbLBhI9pc++YQIAACAwbdu2zRyo07tPH2sGF6OHD+lrpq8d4MtIOgEuZp/S0b1HDzMGGvuGqaf3AQAAIPAsX7bMjM3vu8+MuDj78CH7MCLAV5F0AlzMPqWjfv36Zgw03DABAAACl1b9z5s9x1T9B8qBOs6gr5UeQqSHEelrCPgqkk6AC2kD7UA/pSPvDZM96QAAAIHFPlCnfYcOZkTx2YcQ2a8h4ItIOgEulLZ2rRnthtqBqnOXLmbcsGGDGQEAABAYpk+dasZAO1DHGezXzD6UCPBFJJ0AFwr0rXW2e5o1MyM3TAAAgMCRt+o/0A7UcQZ9zXRboh5KxBY7+CqSToCLZGRkmJvsM8OGBezWOhs3TAAAgMCz9MOcBdhAr/ovC/swIvtwIsDXkHQCXGTTxpzT2sIah5kx0HHDBAAACCwL5s+TmrVuCviq/7KwXzt7BwXga0g6AS5i32RDQkKsmcDGDRMAACBwaNX/vr3fSVSnzgFf9V8W+trp9kTdQaHbFQFfQ9IJcIG8N1nk4IYJAAAQOFatXGlGqv7Lzt6eaB9SBPgSkk6AC3y5fbsZucnmZ98w7f39AAAA8D8nT56UdyZNlgaNGlL17wTsGIAvI+kEuIB9Q+Amm19YWJjZcqhbDwEAAOCftm3bZsY2bduaEWWTd8dAZmamNQv4BpJOgJPlPRoWF9Ith7r1ULcgovR0BVGDjiXJyRe86WvLFkYAAOAps2bONGNEq1ZmRNm1aNnSjGtS15gR8BXlsh2sa8CoXetm2b13j/UIJTV71iwZGTdCZs6dYyp7kJ8mRDq2i5Rnhg2T/gP6W7MoLk00JS9ebErWi0OTn7qtUcuyaeIJAN6J2Av+5PDhw9Iw9E5p2SpC3p40yZqFM9zfvLkZP0pLMyPgC0g64QIEPmXTpVMnU+m0fecOfskvBK9RyWnl0mRH4DZv9hzzWHskaMn6/91yi1x11VVmzrbjq6/kwIGD8nHaWvM6K93WqFVmUZ2ipHr16mYOAOAdiL3gT7TqOjZmiEyZNlXCw8OtWTjDlMlT5I2xY2XhkmTaeMBnsL0OcKK8W+tIphTO3t9v7/dH0VJTU+XeJk1Nwqlzt66SsnqVzJ0/X7p1726q6YKDg/O9tYuMNFVk+mc+3rBeXoofZf4/GqToyqMGg7o9DwAAwNnmzZ1rxiZNmpgRzmMfUrRp4yYzAr6ApBPgRP/essWM9iltKFjz++4z4/Jly8yIwumKVv8+fU2lkq4Yxo8ebRJLxVWjRg2TnFqekiLjEhPM/0dXH1tHRMimTQQsAADAeViAdS2tbuJQHvgakk6AE61atcqMderUMSMKpokQ3eevlTu67x8X0kqkJ6OjTXWSbqWbOXt2mUrUNfDTCihNPmnlkzZz79Glq/k7aDoOAACcYemHOSc4swDrOvahPMRv8BUknQAn0eTJyhUpJplCz5yLa9+hgxnT09PNiHM04fRMbGzu19O7SUkmUecMmnzSyqfN6VvNVj39O3TrHlvuAABAWWkFjlbicJiO64TUz+nllLZ2rRkBb0fSCXASO3liJ1NQtNDQUDNOnzrVjMiRN+GkpelvjBvnkvJ0TYzqVj09ZdHecve3Xr1YNQMAAKWiJxRrBY5W4sB19ERitWxpTlUZ4O1IOgFOsnjRIjPayRQUTZMemlTRff8kOs7Jm3B6duhQl/dD0JVI3XJnfy7sqicAAICSsJtb282u4RoaGxJDw5eQdAKcQKtT2FpXcvZ+f8qDc2jTcPvr6KmBA61Z19PgRRNcevyuXfUUN3w42+0AAECxaMxg96HkKH/XI4aGLyHpBDiBffR/ixYtzIji0fJgTXJMnzbNmglcqampucGaq7bUXYwGiR8sWpTb5J3tdgAAoDjsWLhN27ZmhGvZW+w2btxoRsCbkXQCnGD9unVmvKtBAzOieDSxYp/AoX0AAlVmZqb079PXJODeGD/eIwknm1bqadLrmWHDTNl2j27dAvpzAwAALs6OhZvfd58Z4VoaK9oHwnASNLwdSSegjLSc+J1Jk02FirNOGAsk9r5/uw9AoNGvn359+5rrhAkTvOJrSAOZ/gP6y5RpU01CsGO7SNm0KTA/PwAAoGjEwp5hJ/g4CRrejqQTUEa7du0yI+XEpaNbusyWsrFjA7KH0Oj4eJPYeSl+lNf1QAgPDzen26keXbqSeAIAABfYsGGDGTt36WJGuId9eNHnJJ3g5Ug6AWVkV+j8tV49M6Lk7ISd3Q8gUOgpcdo7SXsodeve3Zr1Lnq63ccb1putfySeAADA+ewTnO9p1syMcA9tiaALt1plFogLt/AdJJ2AMlowf575hZyTOkrPLg9evmyZGQOB9nHSU+L0a2dUfLw16520VH7m7NkkngAAQD7aT4gTnD3HXri1d14A3oikE1AGmjjQrVHaDBulp0kNXanRqp9AaIaoq1EvxMWZa+3j5AtBGoknAABwPrufUPsOHcwI97J3WgRqb1T4BpJOQBls/uwzM9rNsFF6va1m2oHQDHFG0gxzMpyeEOdLFXJ24klp4olT7QAACGz21jq7vxDcy44jP05ba0bAG5F0Aspg2dKlZvzzn/9sRpSeHazYwYu/0kSNNk3Xyq6evXpas77DJJ6s5uJDBg+WrKwscw0AAAILW+u8Q7/oAWYxk5gM3oqkE1BK+oNdf8DrD3o9Yh5lo8FK525dTfDirzdN3VaniRr1cny8z37daHPxKdOmmq2lzzz9NM0rAQAIQGyt8w53WAu3O3fuNCPgbUg6AaX07y1bzNj0nnvMiLJr3aaNGdPW+meJ8FtvvmkSNS/Fj5Lg4GBr1jeFh4eb7YGaeB3t5Y3QAQCA87G1zjvYr7+/xs/wfSSdgFJatWqVGevUqWNGlF39+vVNo+rp06ZZM/5Dt9Xpkba6ra5Dx47WrG/rP6C/KanXBvBLkpOtWQAA4O+0ypmtdd5BX3/7QB6qz+GNSDoBpcAedtfQ7WZ6EqBWA/lTk+q82+reGD/er7ZjjoqPN4nC2Jgh5jRHAADg/7Zt22bGFi1amBGe1aZtWzPu2rXLjIA3IekElAJ72F3HPglw1cqVZvQH9ra6cYkJphG3P9Gka8KECeb6hbg4VtgAAAgA69etM+NdDRqYEZ7113r1zLhp4yYzAt6EpBNQCp9bSae6deuaEc6jR79qibBuRfOHBEbebXUtWra0Zv2Lfs60T5X2d1q0cKE1CwAA/JHGZ3Zs42+Lab5KYzH1cRp9neB9SDoBJcSN1vU6d+lixg0bNpjRV+nXyqtjxphrXz6trji0T5V+T4yMG8E2OwAA/Ji9tc7e0gXvoCdq6wKgtgEBvAlJJ6CE7L3S3Ghd555mzcxon4riq3SLoN789ZQ3Xz+t7mI0oaaJNcU2OwAA/FfGtpy+mw0bNTIjvMMd1il2dhsQwFuQdAJKyN4rzY3WdbRPUOduXU2z9qysLGvWt+gqkzbX1ibbPXv1tGb9mybW7FU2f+rJBQAAzlkwf56Jb/x9Qc3X2G0/7DYggLcg6QSUEDda92jdpo0Zl3641Iy+Zvy4cWZ8Pi7Or7fVne+pgQNzT7OjvBsAAP+iW+j1cBQ9bRjeRdt+2H1RAW9C0gkoAW607hMWFmaSF5rk87WtWvp1Mm/2HHPjDw8Pt2YDgybYBsfEmOsF8xeYEQAA+IfNn31mxpD6OY2r4V3ubX6fGemvCW9C0gkoAW607qXJPU3y2Q0rfUViQoIZ7R5HgaZdZKRJuL0xdixBDwAAfmTjxo1mrF+/vhnhXcIah5nR/p0F8AYknYASWLY0Z6sXN1r3aPtwTrP25cuWmdEXbNq0yfSi0p5UgbwFc5BV7TQjKcmMAADAt+m2eTvGCaTWAb7kz3/+sxnt5CDgDUg6AcWkN1ptkKyNkrnRuofuTW/ZKsJsVfOV/kATExPNOCA62oyBSrdHalCqnzuqnQAA8H3ffPONGZvfl7OFC95Hf0fR2FmTg5wkDG9B0gkoJvv4Ufs4UrhH9x49zJiyYoUZvVlqaqpJTD4zbJhJmAW6nr16mZFqJwAAfN/6devMaJ+SBu/UokULM/paewr4L5JOQDEtXrTIjKEkndxKtzJqQ/Hp06ZZM95JV5PGWD2cojpFmTHQ6fZCqp0AAPAPeiqa9mxkYc273XrbbWbM2JZhRsDTSDoBxaAJBS1T1XLV6tWrW7NwBy0TthuKa78kb7Vq5UrzMWqVE18j57Ru08aMVDsBAOC7MjJyEhj26WjwXrropwu2H6ettWYAzyLpBBSDXZ7auHFjM8K9vL2huCYlJyQmmhs8VU75aW8nXRX1pb5cAAAgv00bcxb+7NPR4N0iWrUyLR+ysrKsGcBzSDoBxWDvYadxomd4e0Nxu8ppcEwMVU4FsE+yWzB/gRkBAIBvWTB/nllcCwkJsWbgzewetDt37jQj4EkknTzk9BezZFjCAkn7Yr8cP51tzcJbaRNrvdGyh91zvLWheN4qpxYtW1qzyMuudnpj7FiqnQB4yP9k+4x4SVyQJtv3H5PT1iyAi9Otdbq4pu0O4BvsZu+fWwchAZ5E0slTTv8kayYMkz4P3yN33v+4vDxtuWzO/ElOkX/yOtxovUPehuLedATsjKQZuVVO2n8KBevcpYsZfeEUQgD+KFt+P7xR3hr6uLRvGibh3V+UaSs+k8xDpxzPACgKW+t8jy6U64IfcRe8AUknDyl/ze3Sue3tUtVxfWbfx/LP+Kek64Nh0rRNDKtwXubL7dvNyI3Ws/I2FPeWI2C1akerd6hyujh9fbwxaQggUFwi19SPkNa3Xem4PiH718+QV6M7S8RdTeXhQQnyftoXsv84kRdQELbW+SZt+q5xMycIw9NIOnlI+RsekGfeXCzr/71KZicOlS5Nb5IKckaOfrWEVTgvs2zpUjNyo/U8u6H4rJkzzehpdo8iqpwuTl8ffZ00+NEeWADgXn+QG+4bKBOWrZdPV8+VcUO7SeOaQY75n2XnhxPluV7tpHlIuDz20nRJ+SxTDp06m/NuQIDTk4Op+PdNIfVzfnfZ8dVXZgQ8pVy2g3UNjzotx/fvkE8//pcsnbNAln/1szWvrpS6D3eTxzo8IGF33So3VK5ozbtG7Vo3y+69e6xHgU1PfLi3SVPpFz1Anh061JqFJ8UNH24aiqesXmWOhPUUrXJqGHqnWflbnpJC0qkYtMKpXt1bec0AeIfTx2T/ji3yScoSmTtvhew8csZ6wqHa7dLmsW4S+UBjuevWGlK5YjnrCdcg9oK3ev211+SdSZM9Hneh5OxYtXO3rhI/erQ1C7gflU5eo6JUvuF2Ce821FqFmydvvtjfKgPPuwoXIf3HL5D1mUfYfucG9okPTe+5x4zwvNZt2phxTeoaM3qKXeX0fFwcyZNi0tfpmWHDvGqLJIAAVrGK3HD7A9J12ET5cNMmSZn/towY0FbqVqsgcuQLWWb33gyPloQF6yXz6O/WOwKBQZMWmnDS3kAknHyPnqhsn/5MawN4Ekknb1SuklwVfKfcE95WOj3ZX7rcebX1hMOZ3ZI6cZj0erCldImbJZsP/mo9AVdYvGiRGevUqWNGeJ43nISme+P179ePIzw83JpFcUR1ijLjxMREMwKANyhX6WoJvrOpPNC2s0Q/2Vnu0MST5czef8nbQ3tIxH3dZcSMz+Qgpw4jQKRbJ5/Zh4HA9zRu3NiMu3btMiPgCSSdvMpZOXUoUz5LniwjuofLnU1by2PRo2Xu1p9EqjWQjs++Jv94b7zEdm8mN1T4ST6fNUJ69J4g63+i5skVNKGxckWKWSHQlQJ4j959+5rRrjZytxlJSWYcFBNjRhSffi9ptdOWzzabPhEA4FHZp+RQ5qeyZFKcPHZ/mDRv1U0Gxs+Wz4+IVL0zSp5+/R8yze69eWSzzB3ZR/q++on8RN4JAWD61KlmvKdZMzPC9/y1Xj0z2gcjAZ5ATyeP00TTt/LF5g2SlrJYFiz9Qo5az0iFm6Rxl0fl4YfCpfldwXJVJTtH6Hif71Pljf6xkvTVr3LLs+/L0idD5FLr2bKir0AO/YW4R5euMmXaVKpZvIyWCLeOiDDbtDanb3VrUjA1NVX69+nL/vgy0EqxiAdbmEqxufPnW7MA4CaaaNqdIVs2pMm/3n8/Xx/NCjWbSVSnh6Xl/c3krr9cLZXsVk7ZJ+T71AkS3f8fsvNMqDz94QyJvr2y9WTZEXvB29j3avqa+ja7n6Yuor89aZI1C7gXlU4ekn3qgGxPe18mxT0uDzVqIV2jX5J/mIRTkNzQtKf8fdI8SfnsXzIj/kl5pGmdPAknVV4q3Rgug57t4PjTv8u3n+8Rz2wy8m/r160zY926dc0I72GfhKbcWe2k1W9j4uPN9dOxsWZEyWlfCE3aabUTx/gCcI+zcurgl5L2/tsyosdD0uTBzjLwxSk5CSdd5Hs8Tt6cv0o2rHpPRj3ZUZrWzZNwUuWC5MYH+0psl5qOB3tk2//LXSIE/FLy4sVmbNGypRnhmzRm1oST7t6grxM8haSTh5zZMU8e7zVUxs/6RPafqSBVb2srT7w4WRas2ySps16UPq0aSfBVlaTws1LKS1CVqqa66ZJql8sfcibhJPpD2W6cWKNGDWsW3kSDILu3k7sSFyPi4kx11bjEBLZcllHPXr3MaG9VBADXOiE75g6VPs++IXPXfydn9GTgtv1lxOSFsjYjVf45srdENMpbVV6QSlLlyssd42VS9XJn1ZcD3idvA/GQkJxj9+G76OsETyPp5El6HO/gsTLtwzRJWzJBhvZ6SEJvrCIVraeLdlZOXVJXnkn8h0yPbiBVrVk4h32yVpu2bc0I76MrN39//nlznZiQ4PLVm9mzZplVIq3QaRcZac2itOxqJz1RhWonAO5RTqre1k6eeu09Wbz+I1n85jDpGREqN1YuXuQlclouqfO4jJs6XgY0YOEB/mvdJ5+Y0e6hCd/WsFEjM9LXCZ5CTycPyT5+WI5UrCrVi1xR8wz6Coi8/tprZoXn4w3rqXTycvbnSptT9x/Q35p1Lru/V81aN8nylBST8ELZ2a8r/bEAuN4ZOf7zMalYvVr+bXNegtgL3sLum6mIefyH/oyhrxM8hUonDylXubpXJpzA1jpf89TAgSYZpNvsXHEamp0YUTNnzyb4cqKwsDDzfabVTlrKDwCuU0EqX+mdCSfAm2i1v7YSiOrUmZjHj+gCn1bsE2/BE8h6AOdha51v0YBIk0GaeNLkkDMTT/kSTnPnkIR0gUEeaAgPAAAKNjEx0YxRnaLMCP/QoEEDM37zzTdmBNyJ7XUecmbPapmc/KWcth4Xzx+k2g3XyzVX15BatetI8A3F7f9UMoFe4s3WOt+UkZEhHdvl9FqaMm2qhIeHm+vSSk1Nlf59cnoZaMJJq3LgGl06dTIn2W1O30qDdgAuckr2rp4pyV8etx4X06XV5IYaf5Krrq8ltW8NlhuK3f+pZNheB29gL7a5smUBPEP7Z0Y82ILPLTyCpJOHnE5PkLs7TJTSH7h7vTSNeUVeeeoeua6ic2vFAznw0a119erearb8zJ0/35qFr9Abar++fU1ZeL/oAWbrXUlLw/Vr4K033zSJR62eSpgwgZNbXIwgF4DrHZf0hCiJmrDTelwKV94nAyeMkieb1nD6oh9JJ++QlZUlJ06csB7luOGGGwJmm5m9CJSyepU58AP+RX/O8DsOPIGkk4eYSqfF6+WLDz+Qj/bqzS1IbrizsTQMqSPXX1Fefvt5r3y5daNs3Pmz+fMV6raVv7W4Wf7w28+yZ3u6bFi/U45KZakb/Y7889nGUs2JeadADnzsX35fih8l3bp3t2bhSzRgHDN6tNm3rkmj5+PiilX1pMmmVStXyoTERJO00maLzw8fTrWbG9hNS/V1p9oJgGvkVDot3rhZlv4zVfadcUxVqCl33NdQbr/1ermi3K/y8//7UtLXfyrfHNEnK0udtp3kwf8Lyh+TVQiVfnPekWcaXSXOXPIj6eR+2ttGtxqtX7dO0rduNcmWomhPnLp168pf69Xzy8UoOwbmcA//FeeIa7WPJrEW3I2kk8eclD3vPyednl0jf+oxQl6KbiN3XBeUP4DJPiWHvk6TWa+OkrfWX5snyPld/rtrpUwc8pzM+PouGZHytvT8c5D1TmUXyIGP/cOYrXW+b0lyssTGDDHXmnzq3aePOTI274qlJqj27dsnGdsyTCNy27jEBGnRsiUNNN3I/nzpa98uMmebJAA41e+75YOBj8vfV18lXV+NkwFt75DrzjvUJfvUT/L1J7Nl7HNvyaZro+WfswZLo2oVRE4fkcyVb8vTg6bLrrtelGWzHpPgS5yXdiLp5D5aFZ28eLGpaLZpnNC4SRNHjHCjXHfdtdasyPHjx2Xnzp3y7e7d+ZJSdlwR0aqV3/zyTpWT/7NjLdpGwN1IOnnI2X3vS58HnpMd7SfK4jERRW6Ryz6yTka37y1Jl8TI4uUDpN6l+mfPyLENr0lEt/fkiuHJsrzvreIIiZwiUAMfXfFqGHonx4n6Ef2caoPqvAmlwmi5cecuXeSeZs1Y/fEAu9pJcUQzAOf7Vb5/f4i0ePYbeXjSezK6Vc0itsidkSMbXpeO3d6VS559X5Y+GSKX6nT2z7Ihvpv0nP5HGZaSJH3rOu/nFEkn19Nk04ykJLO4qPS+37tvX1O9VJyFRr1P7dq1SzZt3OSILeaZ6lylW8O16bYvxw5UOQUG+jrBUzi9ziN+lX3rU+ST30Pkse7NLtqTqVy1BtKpV0PHT4qNkv7dr9ZsBalyRzN56IrfZc8Xe4XDL8suPT3djO07dDAjfJ8GgHpT3b5zhyxckmyqaDSgst+075PO6aqe7m/XChsSTp6hSabBMTEmiNdtjgDgVNn7Zd0H6+T34I7SPfzGi/RkqiDVwtpLz5BL5NtVn8t3Z63pctXljvubSmXZI1/uKX1XTriXJoumTJ5iftnWhJPe/+37vm6/L25lu96ndFudxhW6OKKHlmjiShe2dNFSq0h8lX1i3YDoaDPCP9kVbB+nrTUj4C4knTzidzn8n4OOsYbUuKZSzlSRKsoVVfUX4cNy5Jc8591deplc4Yiazpz8TbT7AMpm8aJFZgwNDTUj/IcdKGpSSVfw7Ldnhw41c5SRewfd0qhbFrSvlv6SAABOc+a/8uOu4yI3XS9Xm4rxiyh/uVS9+g8i+47IL3bSSco5Qq/LHVHZaTn5G5GXL9DKjr/16mUSQ5og0gUovf+X9b6vcYUmrDRxpYtXeu/SbUtPRkebrfu+RJNluq1Oq19oLeH/NOmqn2/dDQC4C0knj6goV1TTJNLnsnH7z3LR/Y3ZP8v2jZ87LqpLNc0y2X75WX5wxE+XVLtcHGERykADBG08rT+IqXQBPEOD+KhOnal2AuB85S+XajWDRDZuke2HL54wyj68UzZuPCJSs5pckRstn3GEXj/K/+QyqXq52XAHL6bJFK1u0l+w9YCYd5OSXNIAXBevtPJJq6c1luzRrZvZruYLdIFHF3qUbhGE/2vQoIEZtYk+4C4knTziD3JTaGO5RfZLcuJ78vEBe8tcQX6VA2nvycSF+0WCG0voTXZ66ZR8n7pUlv4eJH+5rab80ZpF6aStzSkzbd2mjRkBeIYd9NpBMAA4RfkaEtriLyInPpSJb6fJgdNFLPmdzpKP354syScukVta3CE32dHy6e9kzQdr5He5WW6rVcWahDfS7XRaeaQVSFrdpCcS68KGq+j/W6undcudLpxofyRfSDzNSJphPl6t1mLRNTDcetttZtRDdAB3IenkEeXk0nrt5ZlO/ydnvnpH+rR6TEZMWyYbd+yRAwcPykF9258pX2xYLjNefkLaPf6O7Dzzf/LI0Pby10vLydmDn8nMVwdLz78vld8rNJTIxjfyiSyjZUuXmrF+/fpmBOAZGvRqib8Gwb6yUgzAF1SWv0b1k0euPik7p/eTtp1GyLQVG2XHnh9y4q6DB2R/ZoZsWJEko3pFSZ/pn8uZqzvJM1G3yaXymxz8bI6M7d9Phq/8SSo0elAa16LG3Btp5Y6eRKzb6fRgmJmzZ7ukuqkwuuVO+0VpssvbE0+69dDedqjb2xEY6OsET+D0Og/KPv6lzH0+Vl76cFfRPZkq1JOOr74qIx65VSqXOyM/rRgqTaMXOd7nj3Ln0Pdk+oA7HPPWn3WCQDtBJSMjQzq2izRl0bpKBcCz7JMkNRDWfhkA4Bxn5PiOBRIXHS/L9p6w5gpWoW5XGT1+qHSs+0cpJwckZWA7Gbj0J8cTTSR28VvS//aqjnnn4fS6stOE0zOxsWaLmyac3hg3zqXVTUXRtg26zU4XUD7esN4reyVp/yl9rbQSzJ2JOXieJma1qf7m9K1UuMEtKJDxoHKV/ypdx8+TZbPekKe7N5MbKlhPWCrUvFs6DH5D5nw8T159VBNOOnta/vfbH+W+R6Pl5RmLnJ5wCkR69K1ilQfwDna1k/bhoNoJgPNUkMq3dpY3kpMl6fVnpEvTmxwzeQXJDQ0fkadenydrFo+SR0zCyeHsSfnt8gbSYUC8TE+d7PSEE5xDt4p5Q8JJaZJp9CuvmGtNPnnb4Rja70pfK11wJeEUeOy+Tt9//70ZAVej0slDzu6ZLwNf/X/SMLK1tHqwnlxd0RG+nD4uhw4dF3M+XblKUvWaqlLJA1FNIK22aRDQOiLCXH+UlmZGAJ5HtRMA5/pV9sx9QcZ+V1fatWolD95+jVSUbEfodVgOHf/d/IlylarKNVUreSShRKVT2cyeNUtGxo3wioRTXnk/rrcnTbJmPUursO5t0tRsAfxg0SIqXQKQbq3UJvvaYF/7nQGuRqWTR5yS/9/e3cBFVeWPH/9K1qprrg+Vpq0P/6SWWsVwM80yK9LQNUlLy4eftkqpmwpStgpmJdZaIWCmlpa4qRWljj3IqphUmqULaaWW2GoaiT2oKYtW4vzvOXMHBpgZYJiBGfi8X6/x3jnDODN3hrlfvuec7/n6/bdl/fqX5MX/nJTfnWeGN/Uby0WtWkkrdWlZMwmnumbnzp166LNaMQuA/1BBsOqBZbQTAK84d1A+eO0dyVj0mmSdOs8c4VTPCL1a2OIu49KyhhJOqBpVJkEldlQSZVZCgt8knBT1B71aGVmNKlLFzf3Bk7Nn6+30+HgSTnWUva7TRx99pLeAr5F0qhFn5dTxY8a2iVzdqb00IcKpMVs+/FBvB9wxQG8B+I/IO+/U23msZAegqs79T44fUnWcrpBOl5vT5hDw1KjYmMmT9f4Lixf7ZRIlLj5eJ8RU0e6a7kRRI69UAkwlwlTRc9RdavSd+iz429RP1E4knWpEI7ni+lukrRyXD9M/kcPulu2Fz6hA5YUFC/X0HX8s8AjUdaonTgXGarST6skGAI/V7yDX39PJ2PlY0j88ZCtlgIA3NzGxaMl/++gNf6NGXqlV9JS4adP09LaaoKZU2UeEqUQY6rbrr79eb/ft26e3gC+RdKoRQdK42/3yQvIo6ZjxiAwenSDL1m2R7L0H5IhettfV5Xv5+cw58/9AVWVnZ+vtmKgovQXgf0aNHq23b6Sl6S0AeKaZXPv3ZyRxZBvZ/PBI+dsTqZK+NVv2HvjOSbzlcDl6Qs7QN+iXMjIy9ApcasTGwMhIs9U/qc7NV15dqRNkD02ZUu2jS9TjPWDGu2pEmD9NQUTN+HMnlYQX+eLzz/UW8CUKideQwr0rZXLiRjm6b7t8qod7V0SIPLg6TaLDGpvXfaOuFLO0LxXLcqGAf7Mv7Zu+cYPf9mQD8HcFsnflE5K0KUf2ZWbLt4Vmc3maTZK0HTESVt+87iMUEq8cNVpIrQqnqFFEgTJiXdV1UtPs1CjeBLO2UnWwx7wUjoadSkR2CrnKr4rco/ZipFMNsZ4+Kh9nZFYi4QRvUsGKfU47CSfAv9lHOy1LTdVbAKi8c3L66Gfy3qZKJJzgt1QxbDVqSBXDDqQSCaNGj9J/5KuOlLUWi9nqWyrRZY95STjBTo12s9d1AnyNkU41xHrmhHx/4oxU7uAHScOmF8kfGvg2V1gXetvsS9iqoc49evQwWwH4K0Y7Aaiac3LmxI9yorJlCuo1kKaX+H5FYUY6VZw9hlMrnD48darZGjhUTdG7Bg3SSbNVay0SGhpq3uJ9agriuLFRun7py6mpTKtDCfbfJWIr+BpJJ5RRFwKfW3r31tt309M5AQMBQBVAjbitT7VPSQCA6kDSqWLUohKDB0bqYtiBHMPZz2nqdfhqeqBaKW/kvcN8+hgIbPbPiCrE7+910RDYmF6HOkd9warepSFD7yHhBAQI1QNnn5KggnUAQN2iatDETJ6s9wO9GLY6py1asthnhcXtyQRFHSsSTnDmyiuv1NsdO3boLeArJJ38glXO5udJzmefSOa6t2St5QPJyVfDv61y5ugh+TafhX29acuHH+rtreG36i2AwDBi5Ei9pbYTgKo7K/l5++XzTzIl3WKRtZk5kq/bT8vRA99J/lkmAvib2QkJOkmjimHXhqlA4eHh8tAjj8iOT7bLQ7GxZmvVOSacVBkJpk3BFVXXVk29VB16gC+RdKph1vyvZePzU+TOG2+QiDvukbETJkts9JuyRyedTkvOm5Ol9033S8qWXCM8QlWpefQvLFiov2A5CQOBRdVfswdHjHYC4JlCyT+QIQsmDZbe3W+TO4feJxOjYyR2+W5b0qkwR1aN7C23jJkvW478ou+BmqeKbqvvfjXitTYVwx43flxRMWdV8Luq1HFyTDhRtxTluan3zXqrFlkCfIWkUw2y/vC+PDk0UsY/Y5G9xwvlvLadJbRtI/NWpUB+OnJM5KfN8tyoiTJny9FKFh5HaR9+8IHejomK0lsAgWVSdLTeMtoJQOWdlR+2JMq94VEy963P5IQ0ksvCOstl55k3K/87JkeO/SbH3p8rY8amyJYf6PKraaqTITY6RtcmmpWQYLbWHs8mJurE07Nz5niceFLT8555+umi46QKQ5NwQkV0DO6ot3v37tVbwBdIOtUU67fy74RHZenuc9J2wDRZkr5ddr2/QuLubGf+gHKR3BS/UlbGR0jzwk9lacwS+ehUJVddQQmvvfqq3vbs2VNvAQQWRjsB8JT1yHp5cvKLsleukP7Tl8g7/8mSzWkzJbKJ+QNKk14St+lV+Uffy6Rw94vy0MKP5ZR5E6qfSqY8YHYUJqWk6OlAtY2qTTU9Lk4ni1TiSY1Wqgw1na5/RIQeya+SV6poOKP5UVEhISF6+2l2tt4CvkDSqUZY5dfP35LktYfk/N7xsmRulPQOudjpcrz1GrSRbmMSZP6EziI/bJB/Zx0zb0FlqRVP9Lz5Rx6hgDgQwOyjnSxr1ugtAJQvX75Y/bK8/VNTuXHWfHn2/lvlTxc1kLKhV5A0uLS7jHn2GXng8iD58bWNknWSDr+a4ljHKTQ01GytfVShb5UsUoknNVpJjVpyN91JlYvIyMiQe4cO1dPp7MdIjZqiaDgqQ31e1OcuOyvLbAG8j6RTjfhVvvviP/K1hMh94yPk/53vJNvkqF5z6Trgr9JRjsiOnO+l0GxG5byRlqa3FBAHApt9tJPq1VWBNwCUy3pUPv9gn8ilQ2V8ZEc532x2pd6FofLXe64RKfhScnKp7VQTVixfXivrOLliTzyp16vObzf1vEEnleLj4vToJzX1Tu3/fcIE6RbWVcaNjdKdqQ9MGC/bs7P0MaJTFZ64vmdP/VkipoKvkHSqEb/JsaN5xrajXNmusa2pHOc1u1jaGvf7Mf8MdZ08oL5EVeBCAXGgdrCPdkp73ZZMBgC3Cn+W7/fli1wdLG0bldPZp50vzS5uaWxPyf9O091X3dTo9JnxM2xTzhITzdbaTyWenl+wQBcBV8kklQhQ8asa/aSm3ql9VXT8nuHDZNGSxTrZ9PDUqbVy2iGqz7XXXqu3X331ld4C3kbSqUYEyfkX/M7Y5lc4kDl36oT8IOfJ7y+o72QoOMpj/8PU/ocqgMBmH+2kgnB65gCUq159ueD354mcKpAzFeq9OyunTqjvlt/JBfUJl6uTmlYWM3my3n9h8eI6OXpHneNUMmn/wQPy+d49ujD4+1u36OvqkjB7toSHh5NsgldcdfXVevvfr7/WW8DbOIvWiN/JZVf8Sc6XnbJh2yEjrCnPKdm9IV0+l5Zy3RWtxHGRFZRPFaFMe/013VvWpUsXsxVAoGO0E4AKO6+VBPdoKfKf9+Wjg2fMRjfOfCkb3/hU5Pw/SfAfVUchqoOK2Z6cPVvXKEpMTmJ0ukEl3dRxoFYTfOWyyy7T248++khvAW8j6VQjzpOmf+kjd198UrYkJsvKPT+7mTL3ixzZ/LxMn7vdCHyul5u70KNRWRvWr9fBy2TjD1TmugO1B6OdAFRcC/lL/75yUeEmSf7nm7In381I87O5kvnME5Kyu0DOj7hRujSlu6+6LEtdpqePqallAyMjzVYAvqT+PlK1xNTvHuALJJ1qSL1m3eW+qX+V5j+tkycGjJRHFr8jH+35Rn489Ztxa4Gc+P6g7Nn6rix74n4ZeN8Lsrewhdz4+P0SfnF923+AClE9ZinJyXr/xl699BZA7cFoJwAVc5406zlMHrr9Ujm2fobcefc0WbzuI9lz8Hs5pRanO3NCvj+wWz5alyqzRg+RsS99KoXn95UZ0TfLxdQ1qBZqNTbViaD++H1w4kSzFUB1uP766/U2JydHbwFvqmc1mPuobtafZc+/psvomevEfR99a7kh+il56sEb5dL6vo98OrbvoOeL1wbbtm3TS8k+9MgjMm78OLMVQG2iVvdRxVZVQVXqWwBwx5r/ubwSO0GeWP+t2eJCi5tlYsos+fsNbaQ6uvtqU+zlCfWHbsRtfXQpBLWCG1PJgOpl/5tJTWtllCG8jZFONaneH+SqUcmycWOqPDF+gIQ0KzV8+7x2cv2IqTJ39RuyaHKvakk41TbzzFFOQ4YO0VsAtQ+jnQBUVL3GneT/nn9L0lMT5P4BnaWp2W53Xttecu/UeZL2znyZVE0Jp7pOFQ5/ICpK7yelpJBwAmpA27Zt9Xbfvn16C3gTI538ylnJ//EnyT9rvCX1GkjTS5pKgxrIM9WW3jZGOQF1B6OdAHjkbL78+GO+XtSlXoOmcknTBjWySnBdHemkyiA8FBura8kwwgKoWbf07i0tW7aUV19/3WwBvIORTn6lvjS+qKW0atVKWrWsmYRTbaGCGEY5AXUHo50AeKR+Y7lIxV3GpWUNJZzqstkJCTrhpDoISTgBNev6nj11Bx6Ls8DbGOlUo87Jmbw98snHWbL7wDH51Wx1rbFcHTlSbuvQwLzuG7Wht22txSKx0TGMcgLqEEY7ASiXtUDyvtghn2TtlgPHfzEb3aj/Z4mccJu09/ECdnVxpNOihYuKCoc/m5jICsNADbP//bRqrUVCQ0PNVqDqSDrVmF/kyOYkuX+sWpnObCpXiDy4Ok2iwxqb130j0AMfNcqpf0SEHDr4DX98AnUIU2oBuHU2VzKfmigPqJXpzKZyNZskaTtiJMzHxZ3qWtLJ/n2tCoe/m55OwgnwA7t27ZLBAyOZ6gqvI+lUQ6xHLDKhV4xs/M24cl5bueb2G+Xaji3kAtvNLjDSqSJWLF8uM+Nn8IUJ1EGMdgLg3G9yxPKw3BK91thTode1cluvMOnY4ne2m11hpJPXOSacWKkO8B9qWl23sK5yz/BhkjB7ttkKVB1Jpxpx1gh8YqV39FtS2CJSEl59XIZe0cRv6ggEcuCjVkC5qecN9JwBdRSjnQA4ZT0sa8fdKbHrT0jzAbNlxVN3SXBjH2eSKqGuJJ1UnDZy+HA9Gp0pPID/sXfe1aWRl/A9ConXiDNy5ECOFMr5cvnfRssgP0o4BbqFCxbo7eynniLhBNRBPXr0kGuv66brhFAIE0CRwh/kwPafjJ1QGR3V368STnWFY8LplVdXknAC/NBNvW/W25ycHL0FvIGkU404Txo2vtDYNpZ2bcqbUoeKUiMcXluxUg8JVX94AqibWMkOQBn1GsjvLz7f2GkjbS7xbZkClOWYcFLlD4jTAP8U2sWWDN6ze7feAt5A0qlGNJB2nf8iLeWk7P4qVwrMVnhOFQ+PmzZN74+fMEFvAdRNjHYCUMZ5rSX01o7Gzn756pt8WxuqhYrRnpw9Wyec1NRn6m0C/qtLly56u2HDBr0FvIGkU42oJ4263iVT72gjR9PelI2Hz5jt8NT8554r6j2jICUA+2inuYmJegugrvuDhA27X/7aYr+8uSJTDp+lpGl1UAmnh2JjZf26dGrtAQFAlSfp2y9C/87ScQdvoZB4DbGeOSFHD30ir8TPkCXfd5VxE+6Snp3+n/yxWUM39Z2CpGHTi+QPDXybKwy0Ypb25T3VyIaXU1Op5QRAsxfDTN+4QYKDg81WAHXTOTlz4qgc3rFC4qcukx+6jZbx9/SSP7dvI80auomr6jWQppc0lQY+Lr5ZGwuJk3ACAlNGRoaMGxsli5YslvDwcLMV8BxJpxpyNjtJug+aJyfM6xUTIg+uTpPosMbmdd8IpMBHZeDvGjRIj3J6f+sWRjkBKGJfyY6lfwGI5Et20hAZkrLXvF5BzSZJ2o4YCatvXveR2pZ0UjWcHpoyRSf+STgBgUX9fdUtrKse8fS8uUgTUBVMr0NAmxEfz7Q6AE7ZazupBQZYhQUAqoe9aDgJJyAwNW/enCl28CpGOtUQNb3u+xNnpHIHn+l1jhYtXKQLBTOKAYArjHYCYKOm1/0oJ86cM69XENPrKkUl+B+IiioqGk7CCQhMTLGDN5F0QhmBEPjY/5Bs276dvJueTh0nAC5R2wmAv6sNSSd7bKa88upKPdoUQGCyT7FTI8Zfff11sxXwDNPrEHAcE06vrFhBwgmAW/+YPl1vl6Wm6i0AwLvU6POi2IyEExDw1BS7ByaM1512lChAVZF0CghnJf/Ho5KX9738XNlh4bWMYy/a7Keeoo4TgHKFhobq6XXUdgJQYWfz5ce8PMk7ekLOMCfAJTUa4u8TJuhyB2pEhOoMJOEE1A59+vbV200Zm/QW8BRJJ58rlJ+z0yQ5KUnmbzxgXPNEnmz6R4Tc0H20LN1TYLbVPQzbBuCpUaNH6y2jnYC64Jhkr3zOiL0Wy8YDZ8y2SvoxQ6Z37yE33L5U9ngWvNV6Ki5TKwirYsMqsf+y8f1KZyBQe6hOO5VMVkllCoqjKkg6+ZxVTh/aIvNT5knqF8edFA4/K3mWSXou/1+Sso1rcGbF8uUM2wbgMVXLidFOQF1RIIffW2rEXmtk93FnkdW3snZsmBF79ZPk7HyzDRV1+vRpeebpp3VcZl9BWC3UQLkDoPYZExWltx9+8IHeAp4g6QS/Zh+2PTN+RlENJxJOADxhH+2kRp4CACpPrWjVPyJCXliwUC+p/v7WLTIwMtK8FUBt07NnT/03WEpystkCVB5JJ/ittRZLiWHbapU6hm0D8JR9tJP6TlHTQgAAFaNGiKpOQLWEun100/MLFhCXAbWcGsE4ZOg9+vee2AmeIukEv6KGbKsvNLXEeWx0jG5j2DYAb7GPdppHjx0AlEslm+Lj4iTitj5FnYDbs7MY3QTUIUOGDtFbYid4iqQTakxubq4OZnbt2qVHNan6AGrItqoRoJbnfOiRR+TN1asJbAB4jX20k/qOoccOAJxTsZk92aRq4aliwukbN+hOQLWUOoC6Q/3O22Mn6mLCEySdUGUqKFGF0Ct7uannDTqYGTwwUo9qUvUBlMcTZuletHHjxxHYAPC6KbGxekuPHQAUU3U0VSegGm2uYjOVbFJ1m9QCLq++/rpO2gOom+4eYhvtZFmzRm+ByiDphCoLCQnR2e/KXtRIJjV1Tl1WrbXoRNN7mZkyfMQIkk0AfEZ9v6jvH0Y7Aajr1KgFlWhS9Zq6hXXVnYDqu/GBCeP1yCZVt4kFXACEhobqEY9qkIBKUAOVUc9qMPfhE2clzzJFboh+W5pOXiUfx4RJffMWm/JuV9TSvndIbEYreXB1mkSHNTbbfUONQtp/8IB5DQBqHxUwqT+w1IosapECasYBtUl5cVMF4qo8i9zfPUbeazZJ0nbESFjZ4MyrKhp7qe+un376ybxWeXt275b8/HzZu3evHsnkSI1qunPQIL1aFd+JAEpTq1eqxQTUrBQ1SACoKEY6AQDqHPtoJ7Uay4b1681WAPBvH37wgS5N4OlFjWSaGT+jaOqc+h5U0+c+37tHj2oKDw8n4QTAKZWQVp11Ly1Zohd/AiqKpBMAoE6yr8aSkpxM8AQgIFx19dVFpQk8uagEk5o2p0ZVqSSTqp+pps+RaAJQHvU9MWToPbrDbufOnWYrUD6m1/lc8fS587veJVE3tC6V6Tsnp3avk2UZ/3Vxu/Kz7FmzUt471JHpdQDgRaqWier5V3+MsVImUFvYp8+JXHP3UOnZ+gKz3c4eVzV2cbvh1B6xvJwh3/rZ9DoAqEn28gSqvpNaYACoCJJOPlecdKq6EJJOAOBFaoRT/4gIvU9tJ6C2sCedjpvXq4CkEwCUoFYuV1N01ahJVrVERZB08rlC+TEzRaYv32ter4oW0jv2URkW0si87hsEPgDqEvtoJ1XbRE01ARDojkrmnCdkZc6v5vUq+N3NEjNvmIScZ173EWIvAIFi165dMnhgpF7l8uGpU81WwDWSTiiDwAdAXWIf7aRqFGzPztJFxgGgOhF7AQgk9w4dKjs+2U7chAqhkDgAoE5TU+qmx8fr/bTX0/QWAAAAzk2KjtZb4iZUBEknAECdp5YJV0Uxn50zR3Jzc81WAAAAlNalSxdp276dpL3+GisAo1wknQAAMNh77RYuWKC3AAAAKEuNEh8zdqwuTbB161azFXCOpBMAAIYePXro0U5qRZacnByzFQAAAKVF9Ounty8tXqy3gCsknQAAMD2RkKC3y1JT9RYAAABlqQLiauVfVVB827ZtZitQFkknAABMwcHBcs/wYXq0k1oSGAAAAM7dGn6r3r77zjt6CzhD0gkAAAejRo/W238++aTeAgAAoCzVWde3XwSlCeAWSScAAByoAOqBCeMZLg4AAFCOESNH6u2mjE16C5RG0gkAgFLUiixK3LRpLAUMAADggn0hlmfnzJFjx46ZrUAxkk4AAJRiL46plgLesH692QoAAIDSxkRF6W36unV6Czgi6QQAgBOjRo+Stu3bSUpyMqOdAAAAXOjZs6eOmV5asoSYCWWQdAIAwImGDRvK5OhoPdppWeoysxUAAACOHGMmRoijNJJOAAC40KdvX91zR50CAAAA127s1UtvGSGO0kg6AQDgguq5m/3UU3pfDRkHAABAWY71MHfu3Gm2AiSdAABwy74qywsLFkpOTo7ZCgAAAEdDhg7R23nJyXoLKCSdAAAoxxMJCXq7LDVVbwEAAFCSfbTTjk+2y7Zt28xW1HUknQAAKEdwcLDcM3yYvLZiJUEUAACAC4x2QmkknQAAqIDxEyboLUEUAACAc46jnTIyMsxW1GUknQAAqIA2bdoUBVFrLRazFQAAAI7so52eTEhgJTuQdAIAoKJUENW2fTuWAwYAAHBBjXZ6PGGWXsluw/r1ZivqKpJOAABUkAqiJkdH6yBq9apVZisAAAAcDRo8WHfUxUbHyLFjx8xW1EUknQAAqIQ+ffvKtdd1k5nxMwiiAAAAnGjYsKHuqFPSXk/TW9RNJJ0AAKgEFURNMoOouYmJegsAAICSBkZG6o66Z+fMkZycHLMVdQ1JJwAAKqlHjx5yz/Bh8tqKlQRRAAAALvxj+nS9XZaaqreoe0g6AQDggVGjR+vto/HxegsAAICSQkNDizrqtm3bZraiLiHpBACAB4KDg+WhRx6RHZ9sl4yMDLMVAAAAjuwddfOSk/UWdQtJJwAAPDRk6BC9MsuTCQly+vRpsxUAAAB2jh11ay0WsxV1BUknAAA81Lx5c70yy6GD38jqVavMVgAAADhSHXVKSnIyHXV1DEknAACqoE/fvnpllpnxMyQ3N9dsBQAAgJ3qqEtMTqKjrg4i6QQAQBU0bNhQJkVH6/2FCxboLQAAAEpSHXWqLIHqqDt27JjZitqOpBMAAFXUo0ePopVZdu3aZbYCAADATnXUzX7qKb0/NzFRb1H7kXQCAMALxk+YoLf/fPJJahUAAAA4oTrq+vaL0B11OTk5ZitqM5JOAAB4QZs2beTxhFl6ZZYN69ebrQAAAHAUHROjt4/Gx+stajeSTgAAeMmgwYN1rYLY6BhqFQAAADgRHBwsD0wYrzvq1losZitqK5JOAAB4CbUKAAAAyjdm7Fi9TUlOpixBLUfSCQAAL3KsVUBRcQAAgLKaN28uiclJcujgN7IsdZnZitqIpBMAAF5mr1VAUXEAAADn+vTtK9de102enTOHouK1GEknAAC8TNUqoKg4AACAa6oswT+mT9f7FBWvvUg6AQDgA45FxXNzc81WAAAA2IWGhlJUvJYj6QQAgA84FhVfuGCB3gIAAKAkVVScjrrai6QTAAA+ooqK3zN8mC4qvm3bNrMVAAAAdqqo+HRzeh0ddbUPSScAAHxo/IQJehs3bRpFxQEAAJwIDw8v6qjLyMgwW1EbkHQCAMCH2rRpU7Qk8PznnjNbAQAA4GhKbKyeZjdubBTT7GoRkk4AAPiYfUngFxYsZElgAAAAJxyn2T05e7beIvCRdAIAwMdUUfEnEhL0vloSmGl2AAAAZalpdmo1u/Xr0mXF8uVmKwIZSScAAKpBcHBw0ZLAq1etMlsBAADg6MGJE/U0u5nxM2TXrl1mKwIVSScAAKqJYxBFrQIAAICy1AjxFxYv1vsxkycTMwU4kk4AAFQTFUQlpaTofWoVAAAAOKdGiNsXYlExE6UJAhdJJwAAqlFoaKheEljVKlhrsZitAAAAcDQwMrKovhMrAAcukk4AAFQz+5LAsdExDBkHAABwQZUm6NsvQq8AvGjhIrMVgYSkEwAA1YwlgQEAAMqnShM8m5ioO+uenTNHMjIyzFsQKEg6AQBQA9SSwEyzAwAAcE8lnl5ZsUInnsaNjZJt27aZtyAQkHQCAKCGMM0OAACgfG3atClKPI28dxiJpwBC0gkAgBriOM3uoSlTWJkFAADABRJPgYmkEwAANUhNs1Mrs+z4ZLusXrXKbAUAAEBppRNP1HjyfySdAACoYWplFhU8zYyfIbt27TJbAQAAUJpj4knVeGJVO/9G0gkAgBqmCmQmpaTo/ZjJk5lmBwAA4IZj4kmtahcfF0f85KdIOgEA4AdCQ0Pl8YRZcujgNzI7IcFsBQAAgDMq8fRuerr07Rchr61YKX8bPZqFWfwQSScAAPzEoMGDiwInahQAAAC4p0aLP5uYKA898oiuj3lTzxuIofwMSScAAPyECpymx8UV1Sigtw4AAMA9FT+NGz9OXnl1ZVEM9czTTzPdzk+QdAIAwI+ooeKzn3pK7z80ZQoBEwAAQAX06NFD13lSo8ZfWLBQ+kdEMOrJD5B0AgDAz6igyT5MnPpOAAAAFaM6755fsEASk5N0nUw16kkVGT927Jj5E6huJJ0AAPBDo0aPKqrvtGL5crMVAAAA5RkYGSnvb91SFEt1C+sqay0W81ZUp3pWg7kPaB3bd5D9Bw+Y1wAANUX1yt01aJDuqVN1CtQIKAC1D7EXAPiOmmL3ZEKCjqeuva6b/GP6dL1qMKoHI50AAPBTzZs3lxcWL9b7cdOmUVgcAACgksLDw+XN1avlgQnjdemCwQMjmXJXjUg6AQDgx4KDg/UoJ9U7N3L4cAqLAwAAVJLqyHt46lRJ37ihxJS7RQsXEVv5GEknAAD8nL2wuEo8PRQbS3AEAADgAdWZpwqNqw69tu3bybNz5uhV7lS9J+Ir3yDpBABAABg3fpweFr5+XTqJJwAAgCpQHXrvpqfrVe6U2OgYkk8+QtIJAIAA8eDEiXpIuEo8zX/uObMVAAAAldWwYUO9yp09+aRGlJN88j6STgAABAgVHD2bmKgTTy8sWKjrEAAAAMBz9uTT9uysonIGJJ+8p57VYO4DGsv2AoB/U8GPmmKnRjypBJRKRKmACUBgIvYCAP+hVrVLX7dOXlqyRCegFJWMGjJ0iC5Ijsoh6YQyCHwAwP+VTjzNSkggEAICFLEXAPgfFWttWL9eUpKTi5JP9wwfJncPGSKhoaH6OspH0gllEPgAQGBQwdCy1GV65RW1AktSSgpBEBCAiL0AwH+peGvnzp0yLzlZdnyyXbdde103uefee+XGXr3o9CsHSSeUQeADAIFF1RtQtQcUtcLdmLFjCYCAAELsBQCBIScnRyxr1ujamnZqxPmdgwZJWFgY8ZcTJJ1QBoEPAASe3NxceXL2bD3dTlHJp2uM4Kddu3bSokULt0GQum9BQYF5zb1GjRpJmzZtzGsAvIHYCwACixr9tHXrVlmzenVR7KWoEVBhXbvKFVdcIe07dNBxU3BwsHlr3UTSCWUQ+ABA4Nq2bVuJ4d/epmoZJMyebV4D4A3EXgAQuFTh8ezsbPnUuKgC5Pb6T6WphNTlHTua17wnJCREho8YYV7zPySdUAaBDwAEPjV6ae/evfK//HzZt2+f/Pzzz+YtZV122R/l0ktbmdfcu6RlS+nRo4d5DYA3EHsBQO2hklCHDx+WgwcOyJEjefLtt4d1+2srVuqtt/l7hyBJJ5RB4AMAAFB9iL0AALVVkLkFAAAAAAAAvIakEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAAAAAAALyOpBMAAAAAAAC8jqQTAAAAAAAAvI6kEwAA8Kpjx47Jtm3b5PTp02YLAAAAfCU3N1fHXv6IpBMAAPCqw4cPy8h7h0n/iAjZtWuX2QoAAABfyNy8Wcdef58wQXJycsxW/0DSCQAAeNUVV1whjyfMkkMHv5HBAyMlPi5Oj34CAACA90X06ycPTBgv69elS8RtfWTF8uV+M+KcpBMAAPCqhg0byvARI+T9rVukb78IeW3FSrlr0CDJyMgwfwIAAADe0rx5c3l46lRZtdYibdu3k5nxM+Rvo0f7xYhzkk4AAMAn2rRpI88vWCCJyUn6+rixUXrYt6o7AAAAAO8KDQ2Vd9PT9YjzHZ9s1yPOn3n66Rod9UTSCQAA+NTAyEh5c/VquWf4MD3s+6aeN8hai4VC4wAAAF5mH3GevnGDXHtdN3lhwUJdZ7OmRpzXsxrMfUDr2L6D7D94wLwGAID3qJVV4qZN0/WeVCD0REKCBAcHm7cCdROxFwDAV1RHX2x0jN5XHYBTYmP1dLzqwkgnAABQbXr06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" width="665" height="447"></p>
</div>
<br><hr><br><div class="question">
<p>Which is true of an Arrhenius plot of <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\ln k">
  <mi>ln</mi>
  <mo>⁡</mo>
  <mi>k</mi>
</math></span> (<em>y</em>-axis) against <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{T}">
  <mfrac>
    <mn>1</mn>
    <mi>T</mi>
  </mfrac>
</math></span>?</p>
<p>A.     The graph goes through the origin.</p>
<p>B.     The activation energy can be determined from the gradient.</p>
<p>C.     The intercept on the <em>x</em>-axis is the activation energy.</p>
<p>D.     The intercept on the <em>y</em>-axis is the frequency factor, A.</p>
</div>
<br><hr><br><div class="question">
<p>The table gives rate data for the reaction in a suitable solvent.</p>
<p>C<sub>4</sub>H<sub>9</sub>Br + OH<sup>−</sup> → C<sub>4</sub>H<sub>9</sub>OH + Br<sup>−</sup></p>
<p><img 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"></p>
<p>Which statement is correct?</p>
<p>A.     The rate expression is rate = <em>k</em> [C<sub>4</sub>H<sub>9</sub>Br] [OH<sup>− </sup>].</p>
<p>B.     The rate increases by a factor of 4 when the [OH<sup>− </sup>] is doubled.</p>
<p>C.     C<sub>4</sub>H<sub>9</sub>Br is a primary halogenoalkane.</p>
<p>D.     The reaction occurs via S<sub>N</sub>1 mechanism.</p>
</div>
<br><hr><br><div class="question">
<p>Which statement describes the characteristics of a transition state relative to the potential energy of the reactants and products?</p>
<p>A. It is an unstable species with lower potential energy.</p>
<p>B. It is an unstable species with higher potential energy.</p>
<p>C. It is a stable species with lower potential energy.</p>
<p>D. It is a stable species with higher potential energy.</p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which graph represents the relationship between the rate constant, </span><span class="fontstyle2"><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>k</mi></math></span><span class="fontstyle0">, and temperature, </span><span class="fontstyle2"><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>T</mi></math></span><span class="fontstyle0">, in kelvin?</span></p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAe0AAAEtCAYAAAAlXDhPAAAgAElEQVR4Ae2dh1cU19+H3z/lpy7VXgBBVMQGVuwtdiWJsURjoqLGEruoMXYjWDCW2BKNGgUTxUQsCVbQ2BW72FCR/nnPHV1EZJe7u7O7Uz5zjmeXmTt37n2+s/M4M7f8H7iQAAmQAAmQAAnogsD/6aKULCQJkAAJkAAJkAAobZ4EJEACJEACJKATApS2TgLFYpIACZAACZAApc1zgARIgARIgAR0QoDS1kmgWEwSIAESIAESoLR5DpAACZAACZCATghQ2joJFItJAiRAAiRAApQ2zwESIAESIAES0AkBSlsngWIxSYAESIAESIDS5jlAAiRAAiRAAjohQGlLBionJwfp6emSqZmMBEiABNQj8NfRoyguLlYvQ+akWwKUtmToxoz6EnVr1sLjR48k92AyEiABEnCdwLmzZ+FXzYLVK1e5nhlz0D0BSlsihCeOn0CLZpGIbtUaI774QmIPJiEBEiAB1wkUFhaiQ5u2CK5fH00ahePunTuuZ8ocdE2A0q4kfHl5eYhq2QpJ69djUP8B6NOzFw6lpFSyFzeTAAmQgOsEVi5fgSmTv0WTRo2QtGEDBg8Y6HqmzEHXBCjtSsK3MD4e8+fMxZ9//KFI++aNG2ge0QwvX76sZE9uJgESIAHnCdy8ebP0WiOknZWVhdjBQ7Bn927nM+WeuidAadsJ4X+XLiGqRUuIu22rtEXyFcuWYdqUKXb25CYSIAEScI1A3959kHIwWcnEKu179+4hsmkEnj175lrm3Fu3BChtG6ETLTW7duqMY3//raQoK23xnql9dBu2JrfBjqtJgARcI7B92zYM/3xYaSZWaYsVG9atw7ixX5du4xdzEaC0bcT7TtYdLJgfX7q1rLTFyvPnziExIaF0O7+QAAmQgFoEZs+ciUdleqqUlba4oZgwbjwKCgrUOhzz0REBSlsyWOWlLbkbk5EACZCAywTKStvlzJiBrglQ2pLho7QlQTEZCZCA6gQobdWR6jZDSlsydJS2JCgmIwESUJ0Apa06Ut1mSGlLho7SlgTFZCRAAqoToLRVR6rbDCltydBR2pKgmIwESEB1ApS26kh1myGlLRk6SlsSFJORAAmoToDSVh2pbjOktCVDR2lLgmIyEiAB1QlQ2qoj1W2GlLZk6ChtSVBMRgIkoDoBSlt1pLrNkNKWDB2lLQmKyUiABFQnQGmrjlS3GVLakqGjtCVBMRkJkIDqBCht1ZHqNkNKWzJ0lLYkKCYjARJQnQClrTpS3WZIaUuGjtKWBMVkJEACqhOgtFVHqtsMKW3J0FHakqCYjARIQHUClLbqSHWbIaUtGTpKWxKUZDIxU9HTp08lUzMZCZibAKVt7viXrT2lXZaGne+Uth04Dm4qKSlR5gPmnMAOgmNy0xKgtE0b+o8qTml/hKTiFZR2xVwcXSuEPeGbcejdowdyc3Md3Z3pScCUBChtU4a9wkpT2hVi+Xglpf0xE0fXKMIeNx69unfH69evHd2d6UnAtAQobdOG/qOKU9ofIal4BaVdMRfZtULYcePHo2c3CluWGdORgJUApW0lwU9KW/IcoLQlQVWQTAh7UlwcenTthlevXlWQgqtIgATsEaC07dEx1zZKWzLelLYkqHLJhLAnx01E9y5dKexybPgnCcgSoLRlSRk/HaUtGWNKWxJUuWRTJk1Gt85d8PLly3Jb+CcJkIAsAUpblpTx01HakjGmtCVBlUk2ZfK36NqpM4Vdhgm/koAzBChtZ6gZcx9KWzKulLYkqHfJpn47BV1jOiEnJ8exHZmaBEjgIwKU9kdITLuC0pYMPaUtCQrA9KlT0SUmhsKWR8aUJGCXAKVtF4+pNlLakuGmtOVAfTdtGjp3jEHOixdyOzAVCZBApQQo7UoRmSYBpS0Zakq7clAzpk1Hpw4dKezKUTEFCThEgNJ2CJehE1PakuGltO2DmvndDMS074AXvMO2D4pbScAJAuGhobh9+7YTe3IXoxGgtCUjSmnbBjVrxkx0bNeewraNiFtIwCUCdWvWQtuoaKT/+69L+XBn/ROgtCVjSGlXDGrOrFno0LYdnj9/XnECriUBEnCZQOOwMCSuSUB4w1CMHjkK9+/fdzlPZqBPApS2ZNwo7Y9BzZ09Gx3atKWwP0bDNSSgKgHrO20x0c7C+Hg0qFMXSxb/gDdv3qh6HGamfQKUtmSMKO0PQc2fM1cR9rNnzz7cwL9IgARUJ2CVtjXjO1l3MGLYFxDr9+75zbqanyYgQGlLBpnSfg9q/tx5aB/dBhT2eyb8RgLuJFBe2tZjnTh+QvktitnzLly4YF3NTwMToLQlg0tpvwW1YH482kVH4+nTp5LkmIwESMBVArakLfItLi7Glk2b0bBBECaMG4/sx49dPRz31zABSlsyOJQ2lHdpogUrhS150jAZCahEwJ60rYcQQwaLnhxBdevhx1WrkZ+fb93ETwMRoLQlg2l2aX+/cCHatI7CkydPJIkxGQmQgFoEZKRtPdb1a9cwdNBgNI9ohpTkZOtqfhqEAKUtGUgzS3vxokWIbtUa2dnZkrSYjARIQE0CjkjbetzUw0fQunkLDOjbF5cvX7au5qfOCVDakgE0q7R/+H4xolq2orAlzxMmIwF3EHBG2qIchYWFWJe4FsH16mPalCnsnumO4Hg4T0pbErgZpS36gUa1aMmGLZLnCJORgLsIOCtta3lEO5QpkyYjuH4DJK1fj6KiIusmfuqMgHmkXXwba2N80ei7dBQ6ESSzSXvZkiXKo7XHjx45QYu7kAAJvCdQjNsJMQgImYF0Zy4+gNIfOysr632WTn7779Il9O3dR3nd9dfRo07mwt28ScA80s5NxugAP3y227kpI80k7eVLl1LY3vxV8tgGI5CLlJGBCBy6BzlO1szVO+3yh00+cBCRTZoidsgQ3Lx5s/xm/q1hAqaRdlHmAjT3icaKq8VOhcMs0l6xfDlaRTbHI95hO3WecCcS+IhAUSYWRfii3fJrcO7qo96ddtmyiS5hK5evULqIiTkEXr58WXYzv2uUgGmk/XR7fwTUGo+/3nVdzM1cg09q+yLyq324J/HIygzSFj/glpGRFLZGf6wslk4JPN2BgT61EXe09OKDhF51ENB0LPbLXHxUfDxeEUHxH/RxY79GaFAwft66VRmspaJ0XKcNAiaRdiGOT66PgN5b8LgEyLu8HgPr+qFlXDIeSrbHMLq0V69chRbNIvHw4UNtnJksBQkYhEBh2rcI9umDrY+Uiw+S+tVDYGQcUmQvPm6WthXz+XPn0L1LV2Wa3X9OnbKu5qfGCJhD2sW3kdjRF83mnsfr65sR2yAA0VOOINuBZ1VGlrYYPUkMxPDgwQONnZ4sDgnoncC7RmiN5+HC6+vYOiQINVpNQepjBy4+HpK2lfTuX39FeGgYRg4fjnt371pX81MjBMwhbaURWgBiFyfg8+Aq8I1JwC3HfjMwqrQTfvxRETbn59XIL5LFMBiBt43Qagz+AYmxIbBUjUGioxcfD0tbBCA3NxdiUCUxBaj4FH9z0QYBU0i7KCMezatUhb/FD42bhMLffwh2PSlxKAJGlHbCmjWIbBoBCtuhU4GJSUCeQFEmFkZUhY/FB4FhTRFuCUDszidw7OrjnoZoMpUQd9qjho9A47BGEHfgXLxPwATSLsGTbf3h/7+a6DI3DdmPd+OzAF/0SrrnUEtOo0k7MSFB6fJx794975+FLAEJGJRAyZPtGGipgjox83A8+zH2DA1EQPck3HPwSZ/aXb4cxX3q5EnlXbd45y3efXPxHgETSLsAxyfVh3/MWmQpP5SXSBlVC77RK3DDgR+OkaQthjUUfTT5vsp7Pzwe2RwECtImI9jSCeveXnzw8uCXqFu1DVZed+Di44XH4xVFR0wBKlqXi1bmorU5u4VWRMn964wv7eJbSOjog9BpJ0tHQntzdAKCq0ZiYYZEX693MTCKtNevXYdmjZvg7p077j+7eAQSMDWBYtxaEwP/oGk4Zb3UvDmKifWqoUV8Run1SAaRt++0y5ZR9OeeO3u20r9bdBPlFKBl6bj/u/GlnXsQX/r7Yuiu5+9p5p/CjNCqCJ96Annv19r9ZgRpizGHI8IbU9h2I82NJKAWgVwkjwhAwKBdeH/1ycc/08Lg03AqTshefDRyp12eihhJ7dOhQ5WndgcPHCi/mX+7iYDxpa0SOL1Le2NSEpo2Coca4xerhJTZkAAJSBLQ0p12+SKLMczFTIBiTHMxtjkX9xKgtCX56lnaP23cqNqEA5K4mIwESEBFAlqWtqimmDVMPMkTs4iJ2cTErGJc3EPAIWkXXVmGGEsV+DWbhfR3I/K5p1jay1Wv0t780yZF2Ldv39YeVJaIBBwlUHQRP0T7wPK/Ku//VbGgRp3G6PxZPA7ccOCZs6PH9mJ6rUvbiubZs2fKvN1C3qLBq5jPm4u6BByQdiEyFkahequ2iPYNxaRUc3W216O0t2zarPSvvHXrlrpnDXMjAW8ReCftwKG/4NW7MpQU5uLJ1UOY37kWApp9hxOvvVU49x1XL9K2Erh8+TIG9O2LqBYtkXok1bqanyoQkJd2QTrmNPNF08nrML+1L4JG7MMLR0cIUKHA3spCb9LeuvmtsDntnrfOGB7XLQQqkLb1OLnJY9CgWji+O1FgXWWYT71J2wo+JTlZGXFx6KDBuHH9unU1P10gIC3tvLQpaFKtLr46+BzpsyPhV30QtokB8E2y6Enaoi+lGDuYwjbJyWmmatqR9ptDYxHs3x2JNx3rA60HfHqVtmAruoSJ+Q2C6tbDrBkzkZPj7KzieoiU+8soKe3XODIuBH7B43D4FVB4IR7R1fzQM+GWQ6OKub867juCXqS97eef3wr7xg33wWDOJOAtAhVJuzgPz64mY17vthi2PgNGfHGnZ2lbT5Xsx48x4ZtxaNggCOLVnRishYvjBOSknXMAX9XzQfOZ/0Jpf1Z8C4nd/OAfvRiXJKe2dLxo2tpDD9Levm0bwhuG8jGUtk4dlkZNAu+k/UFDNGujNN8Q9Jx+AHcM2PbJCNK2ngYXLlxAz27d0aFNW5w4fsK6mp+SBCSkXYKnv36Ouj7tseyy1dAlyN4+FHWqRWDWP+ZoRq51ae/cvkMR9vVr1yRDz2QkoEMCFd1pl+Qj5+5pbP+mNapXqY4+a28a7gmgkaRtPev27vlN6dkyYtgXuJPFERqtXCr7rFzaJY+wbWD1990rrP+rVT6rImzcYRiwseZH3LQs7V07dqJRSENcu0phfxQ4rjAWgYqkba1hbiomhlRFQI/1Dk/IYc1Cq59GlLZgnZeXhyWLf1CmAF0YH4/Xr81gE9fOskqlXXw3CX39a+LzX56Vm06uEOfmtoB/7S+w95nxG6RpVdq7dlLYrv0EuLeuCNiTdnEWErv6wr/jClyzPhTUVeVsF9ao0rbWWMw2OGbUl8rTQnFNKykxvlOsdXf0sxJpF+Pmj10RGDgYO7I/hlh4dh5aVauOgZsflBO6o8XQfnotSvuXXbsQFhyCq1evah8gS0gCahCwJ+03f+HbUAtCvv7TcI3RjC5t66mR/u+/6NShI7rGdMKZ06etq/lZhoB9aRddxvJ2vqjRbzMefuxsoPAM5kdaENjlRxiwl0UZTIDWpC0mpBfCvnLlygfl5B8kYGgCFUq7BPlP/8O+b9uhVvVOWJHJftp6PgfEXfaObduVV35jx4zBw4cP9Vwd1ctuV9qFFxYoXbs+2XDPRsOOQpyd0xx+1aLwvZjmsigTiyKqwH/wr6oX1NsZaknae3bvVoQtRh3iQgKmIvBO2h+2Hq+KgBoN0aZvHNaffIz3T8aLkLmgGSyWIdj9Qt+UzHKnXTZKr169wvy585T33cuXLlXef5fdbtbvdqVtVigV1Vsr0v5t9x5lEvrL//1XUTG5jgRIwIAEzChtaxjFvAnDPv1MmVZ4/7591tWm/aS0JUOvBWmLLhKhQcGc/k4yZkxGAkYhYGZpW2OYduwY2kZFo3ePnsjMyLSuNt0npS0Zcm9Le9/evYqwL128KFliJiMBEjAKAUr7bSTFFKBiquGQBkGYOGECnjx5YpQQS9eD0pZE5U1pi0dCYui/i5nm/d+lZJiYjAQMSYDS/jCsL168wIxp0xFcrz4S1qxBQYHxGh9+WOP3f1Ha71nY/eYtaf++fz+FbTcy3EgCxidAaVccYzGg1KD+A9AyMlLp4VNxKmOtpbQl4+kNaR/4/XdF2GZ+fyMZHiYjAUMToLTth1dcn4W4hcCNPm4FpW3/XCjd6mlpHzxwQBF2RkZGaRn4hQRIwJwEKO3K4y4ekYtH5eKRuXh0Lh6hG3GhtCWj6klppxxMVhpaiNlwuJAACZAApS1/DojGaZPi4pRrqGi0JhqvGWmhtCWj6SlppyS/E/b585IlYzISIAGjE6C0HY+weK0ouoeJbmKiu5hRFkpbMpKekPahlBTlf4fnz52TLBWTkQAJmIEApe18lEXvm4jwxsoALWKgFr0vlLZkBN0t7T8OHVKEfe7sWckSMRkJkIBZCFDarkVaTAEqhkJtUKcu5s+ZCzFEql4XSlsycu6Utsg7uH4DnD1zRrI0TEYCJGAmApS2OtEWk4+ISUgahTRUJiXR4xSglLbkueAuaR/+809F2JyGTjIQTEYCJiRAaasbdHG9FdN/imlAxXSgeloobclouUPaqYePKMI+nc55YyXDwGQkYEoClLb6YRd32bt27kR4w1CMHjkK9+/fV/8gbsiR0paEqra0U4+kKsJOT0+XLAGTkQAJmJUApe2+yL9+/RoL4+OV991LFv+AN2/euO9gKuRMaUtCVFPaR1PfCVtnj2UkUTEZCZCAygQobZWBVpDdnaw7GDHsCwjWYkZFrS6UtmRk1JL2X0ePKnfY//7zj+SRmYwESMDsBChtz50BJ46fQPvoNujZrTu0OMAVpS15Lqgh7b//+ksZYu+fU6ckj8pkJEACJADl7i8rK4soPESguLgYWzZtVoaSnjBuPLIfP/bQkSs/DKVdOSMlhavSPvb338od9qmTJyWPyGQkQAIk8JYA77S9cybk5ORg1oyZCKpbD6tXrkJ+fr53ClLmqJR2GRj2vroibTGEnhjE/uSJE/YOwW0kQAIkUCEBSrtCLB5beeP6dQwdNBiRTSMg5obw5kJpS9J3VtrH09KUO2zxnoQLCZAACThDgNJ2hpr6+4hePxMnTFA/YwdypLQlYTkj7eNpx5U7bPHJhQRIgAScJUBpO0vOePtR2pIxdVTa4s5aDE0q7rS5kAAJkIArBChtV+gZa19KWzKejkhbvLsW77CNNB2cJCYmIwEScAMBStsNUHWaJaUtGThZaYvW4eIOW7QW50ICJEACahCgtNWgaIw8KG3JOMpIW/S/FnfYoj82FxIgARJQiwClrRZJ/edDaUvGsDJpixHOxB22GKKUCwmQAAmoSYDSVpOmvvOitCXjZ0/aYmo3IWzRHYALCZAACahNgNJWm6h+86O0JWNnS9pili5F2IePSObEZCRAAiTgGAFK2zFeRk5NaUtGtyJpi3mwhbCPHD4smQuTkQAJkIDjBChtx5kZdQ9KWzKy5aV95vRbYR/+80/JHJjM0wQuZmYilU9API2dx3MDAUrbDVDdmGVJSQk2JiVBzNWt9kJpSxItK+2zZ84od9hiHRftEhCzIvXo2g2jho/Q1Cw92iXGkmmVAKWt1chUXC4h7cWLvkfLyEjV2zpR2hUz/2itVdrnzp5FSIMg/HHo0EdpuEJ7BMQUe5s2/oSI8MbY9vPPED8mLiSgNwKUtt4i9ra8l//7D906d8FXX45Gdna2KpWgtCUxCmkL+ELYh1JSJPdiMq0QePDgAYZ9+hn69u6DmzduaKVYLAcJSBGgtKUwaTKRuHFI2rABzRo3wa4dO12+caC0JcP8+/79sPyvCoYMHIRpU6bwn04ZDB44UBkAR0xwz4UE9EKgdvUayn86ee3R77X3m7FjlSd+n/Tq7dK7bkpb8ld7J+sOli9dhnWJa/lPpwwS1yQgdvAQhAWHgO0RJE98JtMEge3btvG6o9PrjtUZM7+bgUYhDZWpPfPz850+ryhtp9FxRz0RuHD+PDq0bYfJcROR8+KFnorOspIACeiYwKtXrzBj2nS0aR0FMXKmqwul7SpB7q9pAqLLxawZMxHdqjXEZC5cSIAESMBTBESX4BbNIrFk8Q9w5e66bHkp7bI0+N1QBDIyMpQuF4sXLUJeXp6h6sbKkAAJaJeAaHwmWoz37NYdV69eVbWglLaqOJmZlgjcvXMHV65c0VKRWBYSIAETEBBdS8XkUULeai+UttpEmR8JkAAJkAAJuIkApe0msMyWBEiABEiABNQmQGmrTZT5kQAJkAAJkICbCFDabgKrq2wLT2NepEUZPEYMIFPhP0t7LL9SpKtqsbAkQAJaJ1CIM3Mi4WfruqOs90HHpWybYo0kpW0lwc9SAjm7P0etaq2w4Hxh6Tp+IQESIAG3E8jZjS8CLYiafx68+lRMm9KumIuJ1xbi9OxI+NUYjv3qzypnYq6sOgmQQGUECtNno0W1mhi5jxcfW6wobVtkzLq+5DG29vODf8cVuM6n4WY9C1hvEvACgRJkb+6HQEsMVl7jxcdWAChtW2TMuj7/b0wJsSB43BFwOBKzngSsNwl4g0A+jk1qCL/645HKi4/NAFDaNtGYc0PxrTXo7uOLTzbch/rDApiTKWtNAiQgQaD4FhK6+CKg1wbc58XHJjBK2yYac254c3A06lVrjJknC8wJgLUmARLwDoE3yfiqlgUR00+CVx/bIaC0bbMx4ZYiXPq+Dfz9h2DX8xIT1p9VJgES8BaBoouL0d4SgNgdz8Grj+0oUNq22Zhwywv8GhsI/9YLkMH+FiaMP6tMAt4jkPPLp6hpicIiXnzsBoHStovHZBsL/sXsphbUGfk7ck1WdVaXBEjAmwQKkD4zAn41R+EALz52A0Fp28Vjro0lj35Cf18fdF11A+xwYa7Ys7Yk4FUCJY+w6RM/+Mesxk1efOyGgtK2i8dcG/OPxiG0WhAmpuabq+KsLQmQgHcJ5B/FpCALGk5IBa8+9kNBadvnw60kQAIkQAIkoBkClLZmQsGCkAAJkAAJkIB9ApS2fT7cSgIkQAIkQAKaIUBpayYULAgJkAAJkAAJ2CdAadvnw60kQAIkQAIkoBkClLZmQsGCkAAJkAAJkIB9ApS2fT7cSgIkQAIkQAKaIUBpayYULAgJkAAJkAAJ2CdAadvnw60kQAIkQAIkoBkClLZmQsGCkAAJkAAJkIB9ApS2fT7cSgIkQAIkQAKaIUBpayYULAgJkAAJkAAJ2CdAadvnw60kQAIkQAIkoBkClLZmQsGCkAAJkAAJkIB9ApS2fT7cSgIkQAIkQAKaIUBpayYULAgJkAAJkAAJ2CdAadvnw60kQAIkQAIkoBkClLZmQsGCkAAJkAAJkIB9ApS2fT7cSgIkQAIkQAKaIUBpayYULAgJkAAJkAAJ2CdAadvnw60kQAIkQAIkoBkClLZmQsGCkAAJkAAJkIB9ApS2fT7cSgIkQAIkQAKaIUBpayYULAgJkAAJkAAJ2CdAadvnw60kQAIkQAIkoBkClLZmQsGCkAAJkAAJkIB9ApS2fT7cSgIkQAIkQAKaIUBpS4bi77/+wtdffSWZmslIgARIQB0C+fn5GNC3L27evKlOhsxF1wQobYnw5ebmoklYI4TUb4D9+/ZJ7MEkJEACJKAOgR++X4x6teugZ7fu6mTIXHRNgNKWCN+cWbMweuQo9O7RE5FNI/DixQuJvZiEBEiABFwjcPXqVbSMjER4aCgGDRiAHdu2u5Yh99Y9AUq7khBeuHABbVpHIfngQQzqPwAJP/6IiRMmVLIXN5MACZCAawRKSkqUu+vUw0fQpFEjnD1zBpFNmiI7O9u1jLm3rglQ2nbCV1RUhJj2HfDPqVP4848/FGmLdZ06dMSJ4yfs7MlNJEACJOAagU0bf8KYUV8qmQhpZ2VlYcumzcpTP9dy5t56JkBp24nemtWrMTluopLCKm3xR0ZGBqJbtUZeXp6dvbmJBEiABJwj8ODBgw/uqq3SFnffvXv0wJHDh53LmHvpngClbSOEDx8+RPOIZsjJyVFSlJW2WDF39mwsW7LExt5cTQIkQALOE/hyxEjs3L6jNAOrtMWKa1evKe+5CwsLS7fzi3kIUNo2Yi3uom9cv166tby0y28vTcgvJEACJOAigUsXL36QQ1lpiw3/Xbr0wXb+YR4ClLZkrMtLW3I3JiMBEiABlwmUl7bLGTID3RKgtCVDR2lLgmIyEiAB1QlQ2qoj1W2GlLZk6ChtSVBMRgIkoDoBSlt1pLrNkNKWDB2lLQmKyUiABFQnQGmrjlS3GVLakqGjtCVBMRkJkIDqBCht1ZHqNkNKWzJ0lLYkKCYjARJQnQClrTpS3WZIaUuGjtKWBMVkJEACqhOgtFVHqtsMKW3J0FHakqCYjARIQHUClLbqSHWbIaUtGTpKWxIUk5EACahOgNJWHaluM6S0JUNHaUuCYjISIAHVCVDaqiPVbYaUtmToKG1JUExGAiSgOgFKW3Wkus2Q0pYMHaUtCYrJSIAEVCdAaauOVLcZUtqSoaO0JUExGQmQgOoEKG3Vkeo2Q0pbMnSUtiQoJiMBElCdAKWtOlLdZkhpS4aO0pYExWQkQAKqE6C0VUeq2wwpbcnQUdqSoJiMBEhAdQKUtupIdZshpS0ZOkpbEhSTkQAJqE6A0lYdqW4zpLQlQ0dpS4JiMhIgAdUJUNqqI9VthpS2ZOgobUlQTEYCJKA6AUpbdaS6zZDSlgwdpS0JislIgARUJ0Bpq45UtxlS2pKho7QlQTEZCZCA6gQobdWR6jZDSlsydJS2JCgPJtv80yasWLbMg0fkoUjAOwTq1KiJtYmJ3jk4j6opApS2ZDgobUlQHkwW1bIV0o4d8+AReSgS8A6B4Hr10S66jUzG/6EAABedSURBVHcOzqNqigClLRkOSlsSlIeSCVkLaXMhATMQaBwWhiZhjXA6/bQZqss62iFAaduBU3YTpV2Whve/D/v0M2xMSvJ+QVgCEvAAAfFOe2H8AoweOcoDR+MhtEyA0paMDqUtCcoDye7dvYv6tevg9evXHjgaD0EC3icgpH3x4kXlvH/48KH3C8QSeI0ApS2JntKWBOWBZPHz5mP61KkeOBIPQQLaIGBtPT5l0mR8v3ChNgrFUniFAKUtiZ3SlgTl5mR5eXkIaRCEG9evu/lIzJ4EtEPAKu2rV6+iYYMg5Ofna6dwLIlHCVDakrgpbUlQbk62a8dODOjXz81HYfYkoC0CVmmLUg3o2xfid8DFnAQobcm4U9qSoNycrFOHjjiUkuLmozB7EtAWgbLSFteiDm3baauALI3HCFDakqgpbUlQbkx2NDUVrZu3QHFxsRuPwqxJQHsEykq7pKQE7aKj+Z9X7YXJIyWitCUxU9qSoNyYrGe37vj1l1/ceARmTQLaJFBW2qKEv+/fj5j2HbRZWJbKrQQobUm8lLYkKDclO56WhhbNIlFUVOSmIzBbEtAugfLS5t22dmPl7pJR2pKEKW1JUG5K1qdnL+zYtt1NuTNbEtA2gfLSFqXl3ba2Y+au0lHakmQpbUlQbkh26uRJRDZpisLCQjfkzixJQPsEKpI277a1Hzd3lJDSlqRKaUuCckOy/p/0xdYtW9yQM7MkAX0QqEjaouS829ZH/NQsJaUtSZPSlgSlcrL09HQ0bRSOgoIClXNmdiSgHwK2pM27bf3EUK2SUtqSJCltSVAqJxvUfwA2bfxJ5VyZHQnoi4AtaYta8G5bX7F0tbTmkXbxbayN8UWj79LhzJtRStvVU83x/c+dPYvw0DAO2eg4Ou6hKQLFuJ0Qg4CQGUh35uIDwJ60ebetqWC7vTDmkXZuMkYH+OGz3S+cgkppO4XNpZ1ihwxB0vr1LuXBnUnA+wRykTIyEIFD9yDHycLYk7bIknfbToLV4W6mkXZR5gI094nGiqvOjaZFaXv27M7IyECjkIYQE4RwIQFdEyjKxKIIX7Rbfg3OXX3s32kLNrzb1vUZ4lDhTSPtp9v7I6DWePz1bnKc3Mw1+KS2LyK/2od7Eo+sKG2HziuXE38e+ynWJiS6nA8zIAGvE3i6AwN9aiPuaOnFBwm96iCg6Vjsl7n4VPJ43Fq/gwcOKMObcphfKxFjfppE2oU4Prk+AnpvweMSIO/yegys64eWccl4KDnAFqXtuR/AieMnlBbjvMv2HHMeyX0ECtO+RbBPH2x9pFx8kNSvHgIj45Aie/GRlLaoQe8ePbBl02b3VYY5e52AOaRdfBuJHX3RbO55vL6+GbENAhA95QiyHXhWRWl75lwVj/k6tmuP33bv8cwBeRQScCuBd43QGs/DhdfXsXVIEGq0moLUxw5cfByQtnitJObbzslx9u25W2EwcxUImEPaSiO0AMQuTsDnwVXgG5OAW479ZkBpq3C2SWSxc/sOdO3UWSIlk5CAHgi8bYRWY/APSIwNgaVqDBIdvfg4IG1BJG78eMyaMVMPcFhGJwiYQtpFGfFoXqUq/C1+aNwkFP7+Q7DrSYlDuChth3A5lTg3NxfhDUNxOv20U/tzJxLQHIGiTCyMqAofiw8Cw5oi3BKA2J1P4NjVp/KGaGXrnf34MYLq1sON69fLruZ3gxAwgbRL8GRbf/j/rya6zE1D9uPd+CzAF72S7jnUkpPSdv8Zv3jRInw5YqT7D8QjkICHCJQ82Y6BliqoEzMPx7MfY8/QQAR0T8I9B5/0Vdblq3x1fly1GrGDh5Rfzb8NQMAE0i7A8Un14R+zFlnKD+UlUkbVgm/0Ctxw4IdDabv3bL9//z4a1KmLu3fuuPdAzJ0EPEigIG0ygi2dsO7txQcvD36JulXbYOV1By4+Dj4eF9XLz89H84hmOJqa6sHa8lCeIGB8aRffQkJHH4ROO1k6EtqboxMQXDUSCzMk+nq9iwKl7d7TceyYMYifN9+9B2HuJOBRAsW4tSYG/kHTcMp6qXlzFBPrVUOL+IzS65FMkRy90xZ5phxMRuvmLTiioAxgHaUxvrRzD+JLf18M3fX8fVjyT2FGaFWETz0B2aE7KO33+NT+djwtTRmu9NWrV2pnzfxIwIsEcpE8IgABg3bh/dUnH/9MC4NPw6k4IXvxceJO21ppMd7Bwvh465/8NAAB40tbpSBR2iqBLJeN6IstHuOlJCeX28I/SYAErAScudMW+z569AjB9RtAdAXjYgwCDkk77+4xbJwei86N66OGxQc1G7TCgLhEHLv/bqQfYzCpsBaUdoVYXF45b84cjBw+3OV8mIFJCBTfwbruvrD8r8r7f1V8UL1WGNr1m4h1aQ8deuysF2rOSlvUb8e27ejQpi0KC63P6PVSa5azIgKS0i7B87RZ6BBQB91n7Ma5+69QWFyAnFtpSBwaBt86/bH5mrHFTWlXdPq4tu7ChQsIaRAE0UWFCwlIEXgn7YBeG3D/XVuukqI85Nw7j99mdUOwTyOM+vUOJAc6lDqkFhK5Im1R/oH9+mP50qVaqArL4CIBKWmXPP0do+r6IGrOaeSWP2DeOcRHVkX13psd7sZQPist/01pqxudoqIidGjbTrkLUDdn5mZoAhVIu7S+JdlI+aoR/OqPwL6njvaELs1Fk19clfa9u3eVvttXrlzRZP1YKHkCEtIuxq2EGPj4DrQxIEkJso9vx/aUS3juWC8G+VJqICWlrW4QVq1YiQF9+6qbKXMzPgF70gZQlPk92lkCMWRbtsMDmGgZnqvSFnXbmJSErjGdwAlFtBzpyssmIe1n2DXABz4d1uCmgaVcGSpKuzJC8tvFSE1ixKasrCz5nZiSBASBSqSNvD8wrk41hMX9BSO9sFND2mJc/z49e2HZkiU8l3RMoHJpF1/B8tZV4B+7Fy91XFFXi05pu0rw7f5i0AcxIUjShg3qZMhczEWgMmkXpGNORDUExv4KI3UgVEPa4kR58OABQoOCIbpZctEnAQlpX8OK6CrwH/obpd1/gD6jrKFST586FcM+/UxDJWJRdEWgUmmfxMzwaqg+bC/e6Kpi9gurlrTFUcQoaY1CGrIBqH3kmt1aubTxEvti/eDTfrXtx+MFecg3+KNz3mm7fg4nHziIiPDGePHiheuZMQdzEqhM2rkHMLqmBU2nnUCBgQipKW2BRQy40rd3H77f1uE5IiHtEtzf2BP+vv2xM7uiFpklePBTL1Sv9zl2i0neDbpQ2q4FVowpLrp3cQYv1ziafu9KpF1wZi5aWWpjxB5j/cdQbWmL3hu9e/TE4kXfm/6U0hsACWkDeH4Qo+tUQ9TcMx8/cnpzGvMjqyCw50/s8qW36HuovGJQh26du2D1ylUeOiIPY1gC9qRd8gwpY8PgHzYBqQZrgKO2tMX5IUZLCwsOwbG//zbs6WLEislJGyXI/mM8In3rosf0nUi/m4P8wjw8vZyCxX3qw6feYPx8w9ij7fBO2/nTf/6cuRg8YCBE61UuJOASgYqkXZyHnDunsWd2T4T4NcOEA48cmnbXpfJ4aGd3SFsUXQhbiPtOFmfX81AoXT6MpLTFcYqRk7kL87/ogsg6/vD5XzXUDGqNgZPW48Sjsm+PipC5oBksliHYbaAnVJS2c+favr170TisEZ48eeJcBtyLBMoSeCftD4YxreqLWvWbovOQqUg6+ejD0dCKMrEoogr8B/9aNhfdfXeXtAWIdYlrEdWiJdua6OSscEDaOqmRm4pJaTsONj09XZmsIDMj0/GduQcJkEApAXdKWxxk5ncz0LtHD4gJfLhomwClLRkfSlsS1Ltkt2/fVvqDHv7zT8d2ZGoSIIGPCLhb2uLV1fDPh+HLESP5Gusj+tpaQWlLxoPSlgQl2i0+f45Wkc2VYRPl92JKEiABWwTcLW1xXHGX3b1LV4iZ97holwClLRkbSlsOlBjxTHQlmTVjptwOTEUCJFApAU9IWxTi2bNnaBkZyf9wVxoR7yWgtCXZU9pyoMaOGaOMeMaW4nK8mIoEZAh4StqiLOLVlhgxbdeOnTJFYxoPE6C0JYFT2vZBCUlPmfwtunbqjDdvjDSApP16cysJeIKAJ6Ut6nP16lWENwzF1s2bPVE9HsMBApS2JCxK2zYoIezJcROVAVRevjTYqBa2q80tJOAxAp6WtqjYzZs3IY6btH69x+rJA1VOgNKunJGSgtKuGJQQdtz48ejZrTtevTLSvEoV15drScAbBLwhbVFPMehKs8ZNkPDjj96oNo9ZAQFKuwIoFa2itD+mUlxcjHFjv1b6d75+/frjBFxDAiSgCgFvSVsU/t69e2jRLBLLly5VpS7MxDUClLYkP0r7Q1BC2KLR2Se9eiM3N/fDjfyLBEhAVQLelLaoiBinXIyaNmfWLM4MpmpkHc+M0pZkRmm/ByUamomBGPr1+YSNzt5j4TcScBsBb0tbVOzp06fo07OXMo9ADqfXdVusK8uY0q6M0LvtlPZbEPfv30fHdu2Vu2wOeSh58jAZCbhIQAvSFlUQM/ZN/XaKMnjS9WvXXKwVd3eGAKUtSY3SBs6cPq3031y1YqUkNSYjARJQg4BWpG2ty9YtW5R5BY4cPmxdxU8PEaC0JUGbXdq//vKL8iM9lJIiSYzJSIAE1CKgNWmLev37zz/KtJ6rV65Sq5rMR4IApS0BSSQxq7RFl675c+cp3T4u//efJC0mIwESUJOAFqUt6idalse074DPhsYi+/FjNavMvGwQoLRtgCm/2ozSFu+vB/Tti17du3M+7PInBP8mAQ8S0Kq0BQIx30D8vPlo2CAI+37b60Eq5jwUpS0Zd7NJ2/o4fOkPS1BUVCRJiclIgATcQUDL0rbWV7R5EbP7jRw+XGlpbl3PT3UJUNqSPM0ibTHLz4gvvlD6ZF44f16SDpORAAm4k4AepC3qL3qUiBn+woJDkHIw2Z1ITJs3pS0ZejNI+/Cffyqtw2d+N0P58UmiYTISIAE3E9CLtK0Y/jl1CpFNIzB65Cjlvbd1PT9dJ0BpSzI0srSzs7MxYdx4NG0UjuNpxyWJMBkJkICnCOhN2oKLGClx0YIFaFCnrtKYNScnx1O4DH0cSlsyvEaUtniUtXL5CgTVrYcZ06aDM3RJngxMRgIeJqBHaVsRPXjwAOO//kZpqCZmDBMDtHBxngClLcnOaNL+bfceRIQ3xuexn+LmjRuSFJiMBEjAGwT0LG0rr4uZmUpvlJaRkTh44IB1NT8dJEBpSwIzirRPp59W5r0WQ5GeOH5CsvZMRgIk4E0CRpC2lV/qkVS0jYpGl5gY7N3zG3unWMFIflLakqD0Lm3RHUNM8hEeGoad23dADJrChQRIQB8EjCRtQVzMEph84KAyBoSo25rVq8FJSOTORUpbjpMuR0QTPwzxGKpH127Ko/B1iWs5jaZkvJmMBLREwGjSLstWdC0dM+pL1K9dB99Nm4bbt2+X3czv5QhQ2uWA2PpTT3faYurMjUlJaB7RTHkEtW/vXj6CshVYricBHRAwsrSt+MUIjPPnzFUaxoq2NuKGgzMJWum8/6S037Ow+00P0r558yYWxscjuF59ZSxg0VeSCwmQgP4JmEHa1iiJrmJbN29W5u4Wd9/ffDUW4j04R2Z8S4jStp4plXxqVdqPHz2CeOwtGnWENAjC9KlTceP69Upqw80kQAJ6ImAmaZeNy8OHD7E2IbH0+jZl0mScOnnS1G1yKO2yZ4id71qStuhPvWPbdqX7RN2atfDV6NFIPXyE/xO1Ez9uIgE9EzCrtMvGTLzrXrFsGdq0jkJ4w1CMG/s1ftm1C48ePSqbzPDfKW3JEHtb2vfu3sXPW7dixLAvUKdmLXw6dKjSXUK8v+ZCAiRgbAKU9ofxvX7tGpI2bMCwTz9TGrBFtWiJaVOmKC3Sjd4KndL+8Fyw+Zenpf3ixQv8vn8/vp04SWlQFly/AUYNH4FtP/+M58+f2ywnN7wnwG5t71nwm74JUNq24yd6yZw/dw6rVqxUnj7Wrl4DnTvGKBOX7NqxE5cuXvTKKGzuuv5Q2rbPhQ+2uFvaYvxv0dhCzEsrTrg6NWpiYL/+Sv/FzIxMU7/D+SAQDvwhZhnq07MXxP/KuZCAnglQ2vLRE/N7izkUVixfrkwTKqYLreEfgA5t2ynDqa5fu04ZWMqdY6GL/0i0j26j3GSpLW9KW/JcUEvaIoC3bt3C/n37sGB+PIYMHKRMY1evVm307tFTWXc8LU2ZWF6yaExmh8Afhw4pTyqWLVlCpnY4cZO2CVDarsVHtEgXo0Fu2vgTJsdNRNdOnVErsDoE1949emDsmDHK5CZbt2zBX0ePKo15Xe1uJhrRiQGtPunVW9WhoiltyXPBUWmLeanFoAEHfv8dCWvWKO9benXvrryPFqOSxQ4Zgu8XLlT6It7JuiNZCiZzhoBouCda1beLjlZ+uM7kwX1IwJsEKG316Yu7YXEDlXbsGLZv24bFi75XGrcJyUY2aYpAXz9lkhPRM0fId1JcnDJbmRi9TbymTE9PlyqUeOInpikVd/4FBQVS+9hLRGnbo1Nmm5C2eNQqHmNfu3oV//7zL8Rd3M4dOyDu4iZOmKA8zhYNIsT/4ESr7rZRUcqd9LeTJmPVihVK+rt37+L169f85wUGaWlpSsvTbydN4oxmZc5tftU+AdFa+vJ///G64cHrxqtXr3Djxg0c+/tv7Nq5E2sTE5UbLdHgbfSoUVi2dKl0PMRdt3CEcIIYUtqVhdKWpCfeN1v+V6X0n0+VqvCtWk3551fNAn+LDwJ8fJX/nVX381feoYj3KPynLQYiNuI/VRO+GScZeSYjAe8TaBTSULn28HqireuJo/EQrqjuH+BSY2JK24HfI+eBdQCWBpNa328v/YHvtzUYHhaJBAxLwPp+W7RbcrVhLKVt2NOEFbMSEKPGjRw+XJlR6NpVtiS3cuEnCZCAewmI9+ZbNm1WJmwS42yo0ZKc0nZvzJi7FwmIH4j4oUSEN1Z+OOIHxIUESIAEPEFA3CCIxsfihkHcOKi1UNpqkWQ+miOQkpysjCAnHk1xIQESIAFPERA3CGJKZPFKTu2F0labKPMjARIgARIgATcRoLTdBJbZkgAJkAAJkIDaBChttYkyPxIgARIgARJwEwFK201gdZVt4WnMi7SU9kEv2x+99LulPZZfKdJVtVhYEiABrRMoxJk5kfArMwZG6TWndJ0POi69ovWKeKx8lLbHUOvnQDm7P0etaq2w4HyhfgrNkpIACeifQM5ufBFoQdT88+DVp+JwUtoVczHx2kKcnh0JvxrDsf+1iTGw6iRAAh4nUJg+Gy2q1cTIfbz42IJPadsiY9b1JY+xtZ8f/DuuwHU+DTfrWcB6k4AXCJQge3M/BFpisPIaLz62AkBp2yJj1vX5f2NKiAXB444gz6wMWG8SIAEvEMjHsUkN4Vd/PFJ58bHJn9K2icacG4pvrUF3H198suE+OH6YOc8B1poEvEKg+BYSuvgioNcG3OfFx2YIKG2baMy54c3B0ahXrTFmnnR93ldzEmStSYAEnCLwJhlf1bIgYvpJ8OpjmyClbZuNCbcU4dL3beDvPwS7npeYsP6sMgmQgLcIFF1cjPaWAMTueA5efWxHgdK2zcaEW17g19hA+LdegAz2tzBh/FllEvAegZxfPkVNSxQW8eJjNwiUtl08JttY8C9mN7WgzsjfkWuyqrO6JEAC3iRQgPSZEfCrOQoHePGxGwhK2y4ec20sefQT+vv6oOuqG2CHC3PFnrUlAa8SKHmETZ/4wT9mNW7y4mM3FJS2XTzm2ph/NA6h1YIwMTXfXBVnbUmABLxLIP8oJgVZ0HBCKnj1sR8KSts+H24lARIgARIgAc0QoLQ1EwoWhARIgARIgATsE6C07fPhVhIgARIgARLQDAFKWzOhYEFIgARIgARIwD4BSts+H24lARIgARIgAc0QoLQ1EwoWhARIgARIgATsE6C07fPhVhIgARIgARLQDAFKWzOhYEFIgARIgARIwD4BSts+H24lARIgARIgAc0QoLQ1EwoWhARIgARIgATsE/h//g7nuPbjj6cAAAAASUVORK5CYII=" width="446" height="272"></p>
</div>
<br><hr><br><div class="question">
<p>Decomposition of hydrogen peroxide in an aqueous solution proceeds as follows.</p>
<p>2H<sub>2</sub>O<sub>2</sub>(aq) → 2H<sub>2</sub>O(l) + O<sub>2</sub>(g)</p>
<p>The rate expression for the reaction was found to be: rate = <em>k </em>[H<sub>2</sub>O<sub>2</sub>].</p>
<p>Which graph is consistent with the given rate expression?</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">What are the units of the rate constant, </span><span class="fontstyle2"><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>k</mi></math></span><span class="fontstyle0">, if the rate equation is </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>Rate</mi><mo>=</mo><mi>k</mi><mfenced open="[" close="]"><mi mathvariant="normal">A</mi></mfenced><msup><mfenced open="[" close="]"><mi mathvariant="normal">B</mi></mfenced><mn>2</mn></msup></math><span class="fontstyle0">?</span></p>
<p><span class="fontstyle0">A.  <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi>mol</mi><mo> </mo><msup><mi>dm</mi><mrow><mo>-</mo><mn>3</mn></mrow></msup><mo> </mo><msup><mi mathvariant="normal">s</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math></span><span class="fontstyle0"><br></span></p>
<p><span class="fontstyle0">B.  </span><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><msup><mi>dm</mi><mn>3</mn></msup><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>1</mn><mo> </mo></mrow></msup><msup><mi mathvariant="normal">s</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math><span class="fontstyle0"><br></span></p>
<p><span class="fontstyle0">C.  </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msup><mi>dm</mi><mn>6</mn></msup><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>2</mn><mo> </mo></mrow></msup><msup><mi mathvariant="normal">s</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math><span class="fontstyle0"><br></span></p>
<p><span class="fontstyle0">D.  </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msup><mi>dm</mi><mn>9</mn></msup><mo> </mo><msup><mi>mol</mi><mrow><mo>-</mo><mn>3</mn><mo> </mo></mrow></msup><msup><mi mathvariant="normal">s</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math></p>
</div>
<br><hr><br><div class="question">
<p>Which pair of statements explains the increase in rate of reaction when the temperature is increased or a catalyst is added?</p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>What is the effect of increasing temperature on the rate constant, <em>k</em>? </p>
<p>A.     The rate constant does not change.</p>
<p>B.     The rate constant decreases linearly.</p>
<p>C.     The rate constant increases exponentially.</p>
<p>D.     The rate constant increases proportionally with temperature.</p>
</div>
<br><hr><br><div class="question">
<p>Compounds <strong>X</strong> and <strong>Y</strong> were mixed and the time taken for a colour to appear was recorded at various reactant concentrations.</p>
<p style="text-align: center;"><img 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"></p>
<p>What are the orders of reaction with respect to <strong>X</strong> and <strong>Y</strong>?</p>
<p> </p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which graph is obtained from a first order reaction?</span></p>
<p><span style="background-color: #ffffff;"><img 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" 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</div>
<br><hr><br><div class="question">
<p>Which is the first step in the CFC-catalysed destruction of ozone in UV light?</p>
<p>A.     CCl<sub>2</sub>F<sub>2</sub> → CClF<sub>2</sub><sup>+</sup> + Cl<sup>–</sup></p>
<p>B.     CCl<sub>2</sub>F<sub>2</sub> → •CClF<sub>2</sub> + Cl•</p>
<p>C.     CCl<sub>2</sub>F<sub>2</sub> → CCl<sub>2</sub>F<sup>+</sup> + F<sup>–</sup></p>
<p>D.     CCl<sub>2</sub>F<sub>2</sub> → •CCl<sub>2</sub>F + F•</p>
</div>
<br><hr><br><div class="question">
<p>The rate expression for the reaction is: rate = <em>k</em> [NO]<sup>2</sup>[O<sub>2</sub>].</p>
<p style="text-align: center;">2NO (g) + O<sub>2</sub> (g) → 2NO<sub>2</sub> (g)</p>
<p>Which mechanism is <strong>not</strong> consistent with this rate expression?</p>
<p> </p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which is correct for the reaction mechanism shown?</span></p>
<p><span style="background-color: #ffffff;"><img 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" width="484" height="320"></span></p>
</div>
<br><hr><br><div class="question">
<p>The rate expression for the reaction X (g) + 2Y (g) → 3Z (g) is </p>
<p>rate = <em>k</em>[X]<sup>0</sup> [Y]<sup>2</sup></p>
<p>By which factor will the rate of reaction increase when the concentrations of X and Y are both increased by a factor of 3?</p>
<p>A. 6</p>
<p>B. 9</p>
<p>C. 18</p>
<p>D. 27</p>
</div>
<br><hr><br><div class="question">
<p>The reaction between NO<sub>2</sub> and F<sub>2</sub> gives the following rate data at a certain temperature.</p>
<p><img style="margin-right:auto;margin-left:auto;display: block;" src="images/Schermafbeelding_2018-08-07_om_09.47.13.png" alt="M18/4/CHEMI/HPM/ENG/TZ1/20"></p>
<p>What is the overall order of reaction?</p>
<p>A.     3</p>
<p>B.     2</p>
<p>C.     1</p>
<p>D.     0</p>
</div>
<br><hr><br><div class="question">
<p>What are correct labels for the Maxwell−Boltzmann energy distribution curves?</p>
<p><img src="images/Schermafbeelding_2018-08-07_om_09.44.40.png" alt="M18/4/CHEMI/HPM/ENG/TZ1/19"></p>
</div>
<br><hr><br><div class="question">
<p>Which graph represents a second order reaction with respect to X?</p>
<p style="text-align:center;">X → Y</p>
<p><img 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" width="500" height="335"></p>
</div>
<br><hr><br><div class="question">
<p>A reaction proceeds by the following mechanism:</p>
<p style="text-align:center;">step 1:&nbsp;<math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi mathvariant="normal">A</mi><mo>+</mo><mi mathvariant="normal">A</mi><mo>→</mo><mi mathvariant="normal">B</mi></math><br>step 2:&nbsp;<math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mi mathvariant="normal">B</mi><mo>+</mo><mi mathvariant="normal">C</mi><mo>→</mo><mi mathvariant="normal">D</mi></math></p>
<p>Which rate equation is consistent with this mechanism?</p>
<p>A.&nbsp; Rate = <em>k</em>[B]<sup>2</sup>[C]</p>
<p>B.&nbsp; Rate = <em>k</em>[A]<sup>2</sup>[B][C]</p>
<p>C.&nbsp; Rate = <em>k</em>[A]<sup>2</sup></p>
<p>D.&nbsp; Rate = <em>k</em>[A][C]</p>
</div>
<br><hr><br><div class="question">
<p>When X reacts with Y to give Z, the following graph is plotted. What can be deduced from the graph?</p>
<p><img style="margin-right:auto;margin-left:auto;display: block;" src="images/Schermafbeelding_2018-08-08_om_11.19.32.png" alt="M18/4/CHEMI/HPM/ENG/TZ2/20"></p>
<p>A.     The concentration of X is directly proportional to time.</p>
<p>B.     The reaction is first order overall.</p>
<p>C.     The reaction is zero order with respect to X.</p>
<p>D.     The reaction is first order with respect to X.</p>
</div>
<br><hr><br><div class="question">
<p>What is the activation energy according to the following plot of the linear form of the Arrhenius equation?</p>
<p>Arrhenius equation: <math xmlns="http://www.w3.org/1998/Math/MathML"><mi>k</mi><mo>=</mo><mi>A</mi><msup><mi>e</mi><mfrac><mrow><mo mathvariant="italic">-</mo><mi>E</mi><mi>a</mi></mrow><mrow><mi>R</mi><mi>T</mi></mrow></mfrac></msup></math>.</p>
<p style="text-align:center;"><img 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"></p>
<p>A.  <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>E</mi><mi>a</mi></msub><mo>=</mo><mfrac><mrow><mn>2</mn><mo>×</mo><mn>8</mn><mo>.</mo><mn>31</mn></mrow><mrow><mn>0</mn><mo>.</mo><mn>06</mn></mrow></mfrac></math></p>
<p>B.  <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>E</mi><mi>a</mi></msub><mo>=</mo><mfrac><mrow><mo>-</mo><mn>2</mn><mo>×</mo><mn>8</mn><mo>.</mo><mn>31</mn></mrow><mrow><mn>0</mn><mo>.</mo><mn>06</mn></mrow></mfrac></math></p>
<p>C.  <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>E</mi><mi>a</mi></msub><mo>=</mo><msup><mi>e</mi><mfrac><mrow><mn>2</mn><mo>×</mo><mn>8</mn><mo>.</mo><mn>31</mn></mrow><mrow><mn>0</mn><mo>.</mo><mn>06</mn></mrow></mfrac></msup></math></p>
<p>D.  <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>E</mi><mi>a</mi></msub><mo>=</mo><msup><mi>e</mi><mfrac><mrow><mo>-</mo><mn>2</mn><mo>×</mo><mn>8</mn><mo>.</mo><mn>31</mn></mrow><mrow><mn>0</mn><mo>.</mo><mn>06</mn></mrow></mfrac></msup></math></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which is correct?</span></p>
<p><span style="background-color: #ffffff;"><img 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" width="613" height="182"></span></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the order with respect to each reactant?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">2NO (g) + Cl<sub>2</sub> (g) → 2NOCl (g)</span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><img 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width="683" height="394"></span></p>
<p> </p>
</div>
<br><hr><br><div class="question">
<p>Which is correct about reaction mechanisms?</p>
<p>A.     A species that is zero order does not take part in the reaction.</p>
<p>B.     A catalyst does not take part in the reaction.</p>
<p>C.     Reactants in a fast step before the slow step are included in the rate expression.</p>
<p>D.     Reactants in a fast step after the slow step are included in the rate expression.</p>
</div>
<br><hr><br><div class="question">
<p>Which statement is correct?</p>
<p>A.     The value of the rate constant, <em>k</em>, is independent of temperature and is deduced from the equilibrium constant, <em>K</em><sub>c</sub>.</p>
<p>B.     The value of the rate constant, <em>k</em>, is independent of temperature and the overall reaction order determines its units.</p>
<p>C.     The value of the rate constant, <em>k</em>, is temperature dependent and is deduced from the equilibrium constant, <em>K</em><sub>c</sub>.</p>
<p>D.     The value of the rate constant, <em>k</em>, is temperature dependent and the overall reaction order determines its units.</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the intercept on the <em>y</em>-axis when a graph of ln<em>k</em> is plotted against <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mi>T</mi></mfrac></math> on the <em>x</em>-axis?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>ln</mi><mi>k</mi><mo>=</mo><mo>-</mo><mfrac><msub><mi>E</mi><mi>a</mi></msub><mrow><mi>R</mi><mi>T</mi></mrow></mfrac><mo>+</mo><mi>ln</mi><mi>A</mi></math></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A.  ln<em>A</em></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B.  <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mfrac><msub><mi>E</mi><mi mathvariant="normal">a</mi></msub><mi>R</mi></mfrac></math></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C.  <math xmlns="http://www.w3.org/1998/Math/MathML"><mo>-</mo><mfrac><mi>R</mi><msub><mi>E</mi><mi mathvariant="normal">a</mi></msub></mfrac></math></span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D.  <em> <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>E</mi><mi mathvariant="normal">a</mi></msub></math></em></span></span></p>
</div>
<br><hr><br><div class="question">
<p>What are the units for the rate constant, <em>k</em>, in the expression?</p>
<p>Rate = <em>k</em> [X]<sup>2</sup>[Y]</p>
<p>A.     mol<sup>2</sup> dm<sup>−6</sup> s<sup>−1</sup></p>
<p>B.     mol<sup>−1</sup> dm<sup>3</sup> s<sup>−1</sup></p>
<p>C.     mol dm<sup>−3</sup> s<sup>−1</sup></p>
<p>D.     mol<sup>−2</sup> dm<sup>6</sup> s<sup>−1</sup></p>
</div>
<br><hr><br><div class="question">
<p>The rate equation for a reaction is:</p>
<p style="text-align:center;">rate = k[A][B]</p>
<p>Which mechanism is consistent with this rate equation?</p>
<p><br>A.  2A <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> I       Fast<br>     I + B → P    Slow</p>
<p>B.  A + B <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> I   Fast<br>     I + A → P    Slow</p>
<p>C.  A → I          Slow<br>     I + B → P    Fast</p>
<p>D.  B <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> I         Fast<br>     I + A → P    Slow</p>
</div>
<br><hr><br><div class="question">
<p>Which graph shows a first order reaction?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="question">
<p>Which graphs show a first order reaction?</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="611" height="585"></p>
<p>A.  V and X</p>
<p>B.  V and Y</p>
<p>C.  W and X</p>
<p>D.  W and Y</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which statement is correct about a catalyst?</span></p>
<p><span style="background-color: #ffffff;">A. It decreases the activation energy of the forward reaction but not the reverse.</span></p>
<p><span style="background-color: #ffffff;">B. It increases the proportion of products to reactants in an equilibrium.</span></p>
<p><span style="background-color: #ffffff;">C. It decreases the enthalpy change of the reaction.</span></p>
<p><span style="background-color: #ffffff;">D. It changes the mechanism of the reaction.</span></p>
</div>
<br><hr><br><div class="question">
<p>The table shows data for the hydrolysis of a halogenoalkane, RCl.</p>
<p style="text-align:center;"><img 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"></p>
<p>Which statements are correct?</p>
<p style="padding-left:30px;">I.   The reaction is first order with respect to RCl.<br>II.  The reaction is second order overall.<br>III. The reaction proceeds by an S<sub>N</sub>2 mechanism.</p>
<p><br>A.  I and II only</p>
<p>B.  I and III only</p>
<p>C.  II and III only</p>
<p>D.  I, II and III</p>
</div>
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