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<h2>HL Paper 1</h2><div class="question">
<p>The graph shows values of Δ<em>G</em> for a reaction at different temperatures.</p>
<p><img src="data:image/png;base64,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"></p>
<p>Which statement is correct?</p>
<p>A.     The standard entropy change of the reaction is negative.</p>
<p>B.     The standard enthalpy change of the reaction is positive.</p>
<p>C.     At higher temperatures, the reaction becomes less spontaneous.</p>
<p>D.     The standard enthalpy change of the reaction is negative.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The graph shows Gibbs free energy of a mixture of N<sub>2</sub>O<sub>4 </sub>(g) and NO<sub>2 </sub>(g) in different proportions.</p>
<p style="text-align:center;">N<sub>2</sub>O<sub>4 </sub>(g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> 2NO<sub>2 </sub>(g)</p>
<p>Which point shows the system at equilibrium?</p>
<p style="text-align:center;"><img 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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which energy profile diagram represents an exothermic S<sub>N</sub>1 reaction?</p>
<p><img 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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>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which technique is used to determine the bond lengths and bond angles of a molecule?</p>
<p>A.     X-ray crystallography</p>
<p>B.     Infrared (IR) spectroscopy</p>
<p>C.     Mass spectroscopy</p>
<p>D.     <sup>1</sup>H NMR spectroscopy</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;"><img 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"></span></p>
<p><span style="background-color: #ffffff;">Which shows the first ionization energies of successive elements across period 2, from left to right?</span></p>
<p><span style="background-color: #ffffff;"> </span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Which technique involves breaking covalent bonds when carried out on an organic compound?</span></p>
<p><span style="background-color: #ffffff;">A. infrared spectroscopy</span></p>
<p><span style="background-color: #ffffff;">B. nuclear magnetic resonance spectroscopy</span></p>
<p><span style="background-color: #ffffff;">C. X-ray crystallography</span></p>
<p><span style="background-color: #ffffff;">D. mass spectrometry</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This question challenged candidates to think about analytical techniques more deeply. 67 % of the candidates recognized that mass spectrometry involves breaking covalent bonds. The most commonly chosen distractor was X-ray crystallography (option C).</p>
</div>
<br><hr><br><div class="question">
<p>Given equimolar concentrations, which substance would produce the strongest signal in a <sup>1</sup>H NMR spectrum?</p>
<p><br>A.  (CH<sub>3</sub>)<sub>3</sub>CH</p>
<p>B.  C<sub>6</sub>H<sub>6</sub></p>
<p>C.  C<sub>8</sub>H<sub>18</sub></p>
<p>D.  Si(CH<sub>3</sub>)<sub>4</sub></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>47% of the candidates identified TMS as the substance producing the strongest signal in a <sup>1</sup>H NMR spectrum. The wording of this question was not ideal and several teachers commented on this. We do not usually refer to the strength but the area under the signal.</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What can be deduced from the infrared (IR) spectrum of a compound?</span></p>
<p><span style="background-color: #ffffff;">A. Number of hydrogens</span></p>
<p><span style="background-color: #ffffff;">B. Number of hydrogen environments</span></p>
<p><span style="background-color: #ffffff;">C. Bonds present</span></p>
<p><span style="background-color: #ffffff;">D. Molar mass</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>82 % of the candidates identified the bonds present as the information that can be deduced from an infrared spectrum. The most commonly chosen distractor was B (the number of hydrogen environments).</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">The following data were recorded for determining the density of three samples of silicon, Si.</span></p>
<p><span style="background-color: #ffffff;"><img style="margin-right:auto;margin-left:auto;display: block;" src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAi0AAAEfCAYAAACNs/ZJAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAADuFSURBVHhe7d0NdBP3nS/8r10eLiU2cLllmzHpgYsdk/SYpsFecppwU2EaObssWR47JLtJkFNzd0kXurn1Bfk6Jd1sQ+Fg+TrbFLaheaRiSGgSIx1SQjeYldHuJel1ViJNYQtygAMNSKRkiW05hBBb88yMRvZI1rtfR/p+zpnDaN4spJmffvN/mzxRAiIiIqJJLl/9l4iIiGhSY9JCREREusCkhYiIiHSBSQsRERHpApMWIiIi0oWYvYfy8vLUOSIiIqLxFa9jc9wuz3LiEm8nIqJ4GDuIKFPJ4gerh4iIiEgXmLQQERGRLjBpISIiIl1g0kJERES6wKSFiIiIdIFJCxEREekCkxYiIiLSBSYtREREpAtMWoiIiEgXmLQQERGRLjBpISIiIl1g0kJERES6wKSFiIiIdIFJCxERka70oqvDhoZlRcpTkfPyqtDQ+g78QXV1FssT4zwDmo+XJ6JMMHYQjaUbuOSoxx/X7IRfXRIiwNDYin1b7oOg4+KIZPGDJS1ERER6ETyHw7scUsIiJSmWTgTEz3DRvl565Ydrmx2//rBf3TA7MWkhIiLSi2v5mP/wGhiwFGse+BoKcB2B7k9D6wwLMa8wu3/WmbSMmT54mpcpRV2RUxGqbKcRv+rxAzhqS2LsV4JaxwfqNjkmeBq2qnDd7TI0e/rUFURjoLcDDUXaa68CDR0fqSsTCaLP8xyWDe6Xh6KGDvSqazMXHUt4DaQkW+NGQSkq67bjqPga6hb8O5pLZuL2tTb4DY2w71qL8gImLTSq/Gh/9W2ciZe19L6PziNn1Rek6PPBe0KtvRW+gcW3Tg/NE42FGV9D1Zpy9YXMg72Hf5tC8nEV77z2MlzqK6Aca6q+hhnqKxpnuRA3rlzAifDPhcuDzpM+KcXNbkxaJkL7mzh25rr6QiuIXvc/Y29k66qc1//+cdjDn8l9Fbh9Bk9bGkuzUVFlhKC+kvn3/jPcvUm6ZvT+Fof3etQXEsGIqorZ6gsabzkRN4RqtIoDCJzaDZPQjqaajXjB062uzE6M/hPiHLwXY+XDN3D5/JmoFuG57jrOvfcOQjcTAozf/Cq+rMwTjZV8zKj4FtZEZC3tOOy+qr6IZfgNh7DmW6hggj1Bcilu5KPgthWoVUoHD+GFo2eRzU1xeUWNI8FgwN3KXJzi5uB5HHv1WGheuBuGu7VRM1ddwcl/Oa7OF+Hr87/Ek5bGXtpVRFfhPtyuueFg1dDEyta4EUTf6VbUym2uip5CR7LSvyzE+D+Opi9egj9W8xC//Tjej0qHg2fexqvtathb9MdYMj+FOtigH57X98PWUKU2ONNMyxpgc7jQ1Rf/xA76PXh9f3PoIojYvwoNtv143eNP0Gh45PsnpW3jk2lxu/IZvagZiKkIyxpeVN9bP/yOJzTv+wk4/NndZZBSkWYVUXTVkPFvsNbwJfWFKs61WlTbjP2ve0YwMFiKDXX7PWguGfq7eSXN8Aye6nGug74udERc3/K1Y0NHlyZ9S2WbWJTPYx+aaxep+8nTItQ275sccQM34Pf8Cvuba1E0+P6SvceojhS1ctdkKdHockUdR46PHZrYnMo2snxMzx/AZflnwn8Qrft/J337ciJzCK3K+VeOmsXzMEXZNkvJg8vFkmAVpSQgui0G5XMMT8WWV8RXTMXq69Wi1fupuq1sQOxxNopSkJTWCaLRekhsG9xWnopFk/336rYhA752sdEgaLaJMxmeEZ2+z9S9wj4Tfc5nREOs7SMmQTQ0tou+AXW3QSPdPzUDXqtoDB/LaBW9aR4n8WdUJpqsx0WvfZ1m2TrR7vtc3ZsyIX+OWaHHKZoF7flSLpqdV9SVWtprV57k6/eUtDRsQAx47aI52bUqmMSWTp9mv7DoWGIQLe6Auk6WbL3qc7doKQ5vI03FFtE9eKp/LvoiroM60dr+M9EU8f/XTkax0XlR/Dzh9RXaJtYlmzx2TWzcEAOnRLvZGPWeoifpPZrtojegPfjvRbs2bpt+JrZb6zTnRtSkxOZA4lg6LH5/LH3fK2JuK9TZxYsZfmaThfz/SIRJy5iJlbT8q/jv1tXq6+jAdkV0msvVdXJwdEee/NFJy8B50V5XplmfZIq6cAcu2sW6uAEpeioT6+znI4LPSPdPzaeiN+7nlYJAp2hJmtQViwZD+HOXJyYtIyV/jtlBe02GJsHsFHvUtUOit9PekEgJy6ndCX78o6cVUsLxsbpv2EQkLSlMwt2i4e5kiVij6OyJumpTui7lSUoKLJ3S/y5dI4wbAxdFZ2OyhCU8Rb/HqKQlhUkwGMS7YyzXTsPPux7R296iOa+Monl3Z8ZJ3mQi/38SYfXQuBFQPPu/oGh+iVrk7Ef7v/wOHyrzkv4LOG4PFy9X4K7bExdnBs84sct2Un0lMTwDKRuXv21p6oHX3ggpcx/S/g5ODo6UeB1nDr8CW7gCXjBBusODdL7H2f8kbBt2wTVYND7S/VPVh4vec+p8uvXS19H1WjM2uYZaGcBgxm63+j4HfHDvNkvv8SxcLk2xPtGgGFVEMap1h1cN3Y+lJdNC831uvPCdRuwZPA0F6TTcA3f4Wg140W4xaf7GIWxauRmOSzfU1xNJ+17DPVTUVTL/23C97Zcu/x3ojLtNdAPmbnhe+KHmujRC+rGF9GOrfB4Dvk7sNhvVdX64Nv0wg94wI4kbQfS6duKxbe3qa4k8/om3J/R9ybGtvUXzf5TfYzNe64rVGzRM+3/swSlrXeQ55XLhbZTB1HIs/jbDqiZnoPS+76HVF/rcRPEwttcu0fXw/SmT/sMxJVhFKYm++1FLSrRFzpq7kOHFmdF3b9HVQ3KR81HRbn9ZtJikLDu62HrglGg1au9mtHdfUXcDMYtP5b9vFE2Wl6W/cUiUApe6XDbS/VMUcWeYZgnIsP9/rDvYz8SL9vVRRbcsaRkp+XPMGsOqiBJV68qT9s5++LrYVR49ovQjlaB6aYJKWgwtojui6iP670jTsJIUbSmHPEXFrYjPM05JSlRJTOzSrQRGM24I60X7xejYJf8fHxEN5p9Jse2A6PRq3110SUuM/2P09yBNw/6Pw+JX7sQl+f+bCEtaxltBERYuUnPowbuQ6zhz7E2Ec3vh6/Nxc/40zJxTqC6JJR8FpQZUVz+Cja1Sll0Z1egv/ybMujleQ945KPvmYnVe0r4WC5fLjXZf1zSe+xIqtx9G68ZHpL/xpygXpqrLZSPdPzXBc+9hcJw94xKUfTn15mURjZplxmo8cOcs9UXYVMz9VnVk11YirWG9iI7h1WPnNQ0wo3oNCY+j4cFS9c4+ukfRUqx5/L/FuBuegdsefFRzHiYZgHKcFK+4F3dEjK46DUULFqrzIcO7dU9B4SxtKfE1XO7+RP28oruFL8SKZV9FgfpqUMFXsWzF0N9JaYwcjZHEDXz4O/yLJm4Ia6rxrbnRsWsaSutextHtfyXFtj9HZWmiPmIx/o9T/ggL7ilWX8hi9DQbFr+vojvADgIyJi3jLf8W3HFf+IL04TfnP5IuZW33vJF0lQy1QHc45B4K/x01e8JXbrRpKKn6C9Rpf6xdTVhbswrLF85UWq4rPRocv4LHH6uYeqT7p6IfH558ZzCRK77vDixI42wNBq6qYzSExN1/xq246z5tACHSiq4iikoooqqGIn7EI6p8Jdpqo2jRyVFEde5EKMY9C/4oSS8UAYsWFg1POiL4cfZqOGmJHofKhU0VhUq8iJwKUbFpaFxh+M/g/OVU48jI4ka/7xzeUudT+/8lsxALiuJ854MWYOEtyf7KFVxl0qJg0jLupuPWxd9Qg6AaALu1Q/encgIPUbocO8Ldeb+AwoXLUFOzGmubNHWyMeTP/TP8cIf8ZNDY/Hs2YXXNClQUzceyhr3Dko+R7p9cN051utX5dLvx9ePKhTOapCVRAP6idEcTXQJDFBZjoLnBEa2jSw6ibji0Q6zLpPMs/rPsoktWvTjnS9ROYjKYLv2XbkrjR6QfgatX1Pl0pPODPZK4ES3d/1+mZmNWYebvMtcwaRl3+Si4pQSL1FdoPwjH/+cYCnzFS3DHgmSZuawXp21rcUtRBVbV/DWalIZtcsO5n8FuPwCn9wTspkQlCFMxt3orXE4rzIZ4qYfMD1eTCSs3v4FLESW0I90/ieBHOP8bn/oivUSOaFTFrSKKrhrisP0TjnEj6zFpGTezpKz9i8pc/oI7MFQjcQKHD/3fwcAn1CzGrUmT7hu45HgKlfKTPZXX4ZbnPk0960xlTWIzUFpZh+1HfRjwuXHAbkdbRE+GIX6bDb94N7oV/0j3jy+iTUqiYvWYpmDOvBIMpWxn8da5P0j3ebF8iu7L2f2sDhqpOFVE3QmqhmRz5mGR9r5BOs8CcRP36+i5ElDnZalUK6TpWg+uXFPnJwUDLO6A3OoyyXQUG8tTSz5GFjeiJYobNFGYtIybQsyZqV5AU+ZhcU34zk3b5VZbhzq80duQD9H5+puaO7yVqF37jRF1d8sXyvHn1dV4cGMrfFKgiOx6KEv8TIuR7h8piL6LZ6R0LiTUMFl9kaL8wtmapEX6lI+8h3OxfjD4VG1KKlYVUVQJKVZjy9q7I9uiRTe4jPugVMmwbtNpNiCNEMCVnhh/55Pu0EiqE0ZbNS6L8z4zNvK4MaVoAe5R52VnT1xAJhVaNHaYtEyIAtyycIE6r7UUDy+dn/xL6f8Dzr2V+Ic2eOnfcCjBj3GoLYwjNGx0lQ1dUT/o+cISPPrQfRE//Foj3T+xa3j/+K/VpKwY9911a9oNk/NL7sbDRs2vTLsDvxxW0nMDl/5Z+8NDFMewKqIDaNy0c+jGIeZdfVQvOxzD3t3/J8Zw/b04vf9lzXkowPjw3ShJOTpPQeHsOeq8LNzAX0s613/dgSPqq4kRVTUOD5q2/3JY7MjcyOMGvvxVfFMbN/a8gn8aNgaLlBx5nsMy5TEpDjg6uhDr8bc0Npi0TIhpKFl6P7TlEAqhBPNvTqFrcP5NmF2subD8u/Hsjw6oz6iQn5exF42PbRga/C1abwcay+W2MDVYvWkP/O3P4UcthyOecRH0v4WfPN+qacyqadQ20v2TCV7Ee0e86ovF+GaZNiCnKH8BqtZVa+7qDmHTxm1oDT8vRH7uSevTeKxG88NDFNfwgeaGxEsypqH0oY2wDLb58sO1rRaPNGoapvd14UjzdzVVvRLDJmx9KNxtOhVTcfPgoJUyP9o3b8OP35l853p+6QNoMGt7SW3GOu3nISVwXY6nsKyoFs37pYQgnWcyjUrcKMWDDY9rPss2rF33d0NxQ4mvL+PZjRa4lB6TNahZbkCN7XRUkkhjRowjwSpKSZIBn4YNWiVNJrvoU1cPH+xJO0hT9ABOqUza56bEGlQt8RT5TIuR7p+Ezy6awvtGDICVppSHC9dOHFxupOTPMSvFumaVKXrAOa0BMeBuSeEZXeEpk2H8JXHfW4Ip4eBy0YNZyjLZRn58iVtaOiS9R4CkMZT/aMWNtIbxl6aIQfiiB5eLFU8y2SbOgIFZSP7/JsKSlokybHwQ6W7tm1/Fl9VXicl3cD+A1VSmvo5BHnq6sw1SIFNpH62v9vyJHuo/DnmY7gNb/gxzB8+Wke6fSBC9p9yDxdipNUyOo2AJ6ve1ojFu7yYjzPZD0ueYWSUW5ZhhVUSqhA0+81FQ/iQOeu1JetlJlOHi92FjeQZd8Gcsxf946ZkE16PcWP8Q7NtSuWLHVv7cVfixK4XPQ4qJBvMO7HqiIoWxUkYxbuTPReUWG6TERV2QgPyd7VqL8ohB+Ggs8ZMeN9G9AaLru6OfkZGPm2bN1hRTRikoQ93P2+E+8LPIi99ghtV+FN6DW1BdUTY0+q4kcmTJGSiVEg+n0usn6hgKKchZXobd6UVX63osGTai7Uj3j0c7AFWG9dIa+cJ92HrQBWebRfO8EPm9vQKntw3bqxeBo7RQamJVEZXD3PAAShNGUnn06mpsd3qk67UN1ogG6nJSb0HbATd8zq2oTji6aiJTIVQ+LSVHR6N68IWuwwPudvz8e/diXqY/5KNK+3m8DMuwmy/pZsLaJr1nD5zbq1GaUkIwunFDSVy2HoTPfShGj0g1to34O6NM5MnFLep8BHlkwjiriLLIB3DULhsaPVhohPP0FlRGDE1O6WDsIKJMJYsfjMyUnfo9aC6pQoNtPxwRz0SKEvwE3Zc1g1csKsEtLOolIpqUGJ0pOyljZJxF09rVqFGfiVRU24rTmh5OSs+Nlm3YPPiAtHS7mhIR0Xhi9RBlqSB6OzbjtuXbUu/mKayH/d9aUD3sqa6UDsYOIsoUq4coR+VjRuX/Qoe1Ln5jZi3BhJYD38cqJixERJMWS1ooywXR1/WvaD/5Pjp/8nfqgyWHyD03nv/zCnzNeG+KvRQoGcYOIspUsvjBpIWIRhVjBxFlKln84K0lERER6QKTFiIiItIFJi1ERESkC0xaiIiISBeYtBAREZEuMGkhIiJKmTyMQgdsDVVKT5e8vCIsa9gLj/+Gup7GErs8E9GoYuygbBa85MBf/XENbNFDbRuegXNfIypTfqI9xcIuz0RERKPiOs4cfiWUsBha4A4MYOCiHXXysNuuvWj99YfKVjR2mLQQERGl5AYw/36YDcUwrvkT3FkAXAsE0K+suw2L5hUqczR2mLRkm74udOxvRm2RXNeqTssaYHvdA7/mAccZG83j93agYfA4y9Ds6VNXENHo60VXx6torl00dO3mVaHB9sYYtMf4CB0NFYN/p6TZo/6w690MlFbWYfvRMzhcdwvebV6Owtsfxx6/EWZ7M54on6VuR2NGbtMSS4JVNA7kzz88pWrA1y42GoSIfSMmwzOi0/eZunX6Rvf4H4tuywrN/gbR4g6o60jP5O+Txs7QNZPG5zxwUXQ2GiP2jZyMYqPzojigbj4yA2LA3SIaNMcvtrjFz9W12eP3ot1UrP4fBdFgtovewOh8grlM/jwTibs22Y40tsKff8rfQ6BTtCRKKNRJqLOLFzO5rkb1+D3iKWudKETsy6QlW8jfJ42d8Oeb+uccfYMQZxLWi/aLmd/UhEgJy6ndokmIPHZ2Ji2qwAnRaiqT/p9S4mLpFBnFRkY+XxJh9dCkFCpIzStpVv5N7jq6XmvGpqgnGMfit23F866P1FepGsXj952Go2E1bl9rQ/KjEVEstXnL1Lnkgl0OPLXpkPoqAf9ObHj+GHrVl+nrRZdjM1Yq1SXqolxQ8FU8WLsSghTRXC/8K7zZUQ82aTFpyQbB8zj26jH1hUyuXz0FKeOHOOBDZ4tJuqDCPGja/kt0pdP+ZDSOH/TD42hGbentqGlqVxcS0di6jjPH3sTQFSfAYLbDGxiQbmc/g69zB0xDFy/8TS9gf9d19VWqbsDvcaC59h4srNkGl7o0K/WdhE1pE1SBho50b/5oNDBpyQLBM2/j1fahWxvB3IDvV9+GAvlFvoAlTzZii1ETmU6cwcW+1LOWkR+/D56WR1BRs2mU78DkYPmGZpAnadI2CvY7pDvScIPDEtQ6PgjtRpQrom84hMfx9PdXobRADv1TISxZi+9vWR1apzgH78X0GsT3e57Hf6uowaY9J9Ulo0S+0Xl9X1TDYWkqqkXz/l/Fbjwc85qP0QBZjhMdXVJkCktlG8n0KcDl/5BmPNjbegin5TjX9zvsbz2olBwLNYtxq7QJjSG1mmiYBKtozH0eqgsutqTwPQyIPc5GTfuQYtFk/726LuxT0Wtdra6Xp3Taj4zG8QOi22LQrDeKZnun6IxYlmabliQNCwXTbvGUt000DS6L9b5pLMifN40d+fM1SddLSp9zj1M0a9uXmOyiT10VNuC1isbwemlKt/3J526LWDy4f6hB6r87t2mWpXvMATHgtYvmpG3o5DhyKrINic8eec1bD6jtTbT7hSfpvTa2i77PE8USdZvBdnrDGxkPTqPSJojkzzIRlrTo3g1cPn9G0z7kK1g07z+r82FTUDhrtjov+wAnLnysziczysc3mLHbvRvbqr+Kmeqi9HXD07IOy7fFr2by73kclet24oz6migXBS+fx280pZvFi+Zhjjofll84Czer87KzJy7gijqfHiPMuw9g37ZqlM7MvLgh6Hdi67oNaErahq4dTTUb8YKnW30d7Sz2rF2FtXFLgPxwbfsOHrnvzxPEEnmbRvzDYDu9fBSUP4mD3jdhMZWpy+Qqtz1we1pQPZej4Y41Ji2614/A1WQhZgrmzCuBdOeTgVE6/heWwGJ3w+fcjtpyYUQn3vCGhXKw7IR0NySl6J/B594D6S4NfpcLb6tbEOWiYOCq9NOdxJx5WJRZcFB9Ed+y2OH2HcT22iUQRvSr8hFc/9CIbYMJi7YNjnR9B7xot2jb0B3CpqccidvoKTdKPgwo+5+AdTDZkJ2Fy+WR/owJLZ3xtvFg7+HfahooS4lLaRU2tp4IvSfRh6Pb16Ccw/ePCyYtE2iw7nTY9P+oW4TE3iY0DbcQC4qmqfPxnMVb5/6Q4WBPmRy/AOXf246N1eUjDGiyGA0LLc/i6cFgORVC+Rpse2lHaGhtIh2Kda2HJ61Y68PTcMW4Z8EfSbcYSbx1Dr40gsOU8vV4YWP1qPxoB7t+ie1NUhKhEup24CW55EZpgyMpKMV99XIbuhUwW9tgtx+F1/44SuPGlRWwNDcO3SgVlMH0t7VRN1jlML/0v/G9JUPbPP7970m3QkP8l7vxiTpPEyvuV01jLYVGoWc3qTM0aFhPpqVY88DXQo2CNfLn3otH15Srr4j0JHnGsCcr++j048OT72huSMqx5tF7MTf6Vyr/NtQdfgPb6x5EdbVhKKGJpdiAZXdEjlI7pWgB7lHnFYIRVRXa6m3pT0RVmUFKWgKp912gMcSkZcJ8RS1ajDV9Htqk2KL8E3ub0JRzgp/g6lltJf0S3LEgVsnPLNx+V4U6T6QnU2Je6+FJZoJB+TfW+vCkP9fhO+dV52ULsPCW6NuRNN2zAEXJipYWleCWRImP7OxVJi2TBJOWrOPFOV+ycRZSLCaOaayPn8SVCzihraSPG5TycdOs2Zq6b6Jcl2K1cCo/9ONiNmYVjsMbuXkWCvlLqBv8qnRvCgpnR/cHiNYv/dafSd4gL6axPj4RjZX8wtmJG8jLom8EiCYxJi26NxU3zy/RlCjE6m7cj0D3VXVeFqvbcjxjffw0Rfd0iNtoMIhPpPeUrNMkUTbLv3k+vq4pbozVnTkY6MZldV4Wq1v0xEilVJdyDZMW3ctHwS0lWKS+kouAjxz6N1zS1r8OGxXzG1h863T1RTJjffw05d+E2cXaKPwO3jsXK7B141SnW50nylEFRVi4SHO9HOnAry9pR5KN7o1XjprF88amajepaShasFCdl6UznhTlCiYtWSC/5G48rBlG32/bhecPnA4NPx30450fb8NmzTD8KTU80xjr46clfz6WPrxUfSE7hr2//G3kUNuS4KV/xct7h7pOEuWk6OvF78BPnn8DXcpjNm7A/44VP9rcFlqnGIXGrxmbgi+XLdF0NT6LPbuOxBiDpRue5v8XyxpehMPxOjq6Mn/EI+kPk5ZsMOyHXB4p8nYUyuM1fKEId9Xv0VSTlMPc8EDkuAb9HjSXaMZ4KGmGR1vlMtLjj6ppKKn6C80YLH64Nj2NZ1vfCT1vSHke0V40PrYBNtYNUc6Trpel92sSAel6aarBwsIvSNf6f0LRXRsingcmmJ/Ag6Xa3nh9UoKwbCg25C1Dsyf6FmH05Jc+gAazZqiC9s1Y17h36DlD8vOIWrdh46YD0v/jr1FTswrLF/532NJ+yCPpFZOWSUktnE15nJZpKH1oIywGTTFwHELdU/hbw5fUV6ka6+OnJ39uJf6mfoX6SiYlUY/fhaIvyEFVCsQVphSGACfSr3TGackvrcZWi/Z6iUNYjx1/uxQz1JcT40sw/I9taByMNXKSZUJF0X8KJU3STVLF402a/708uORGPBSRaFE2Y9IygYbuXoZPWrHWh6dBBUtQv69Vc7HHYHgGL235s+GDNaVirI+fllkor98FZ6N2zEoteejvV+C01qmvifQl1rUenrRirQ9PQ5JdLzIjGl9qxKpJ8OycfOE+bEkWaxTydb4Du56oGDa4JGUvJi0TJoURcRNap/47RL7Ytx50wWn/mfLsnUEGM6wH5Of+/B0qRzDU9lgfPy35c1G5tQ1e5yuaB5dJYcxkQZvThYPba3D7rMjHIRDpQxpj6McUo5Pz4PVih9WsTV6MMFsPKs8N2lo5d9L8ICixxumB+8DLEde3QjDB0mbHAbcHzu2aIf4pJ+SJcYZOlDN1fY6qqB+Rd0OZ4XcUTz/8jg0oqtmlvi6H2fkmtleObdUVMXaMBsYGylXJ4gdT1AkkfzEjnXKP3DCwSu054ICjo2tYz6GQ6LFjJrJXBFF6Yl3r6U5E2YhJC+mMPJbDf1V7DtSgZvlCFBathe20tttjL7qO/DSyK6fxfiwtYWM9IiI9Y/UQ6U9vBxpuW46mlDsIlaHO/gZerJ7HLH0cMHYQUaZYPUTZZ4YBT3fshilZ5wJFGUwtL2DLKiYsRER6x5IW0q++LnS0/xbnO1/E2qahgcgVcg+D56ux+GvLUFk6sSNP5BrGDiLKVLL4waSFiEYVYwcRZSpZ/GCJOREREekCkxYiIiLSBSYtREREpAtMWoiIiEgXmLQQERGRLjBpISIiIl1g0kJERES6wKSFiIiIdIFJCxEREekCkxYiIiLSBSYtREREpAsxnz0kj/1PRERENBHiPX+ID0wkolHF2EFEmeIDE4mIiCgrMGkhIiIiXWDSQkRERLrApIWIiIh0gUkLERER6QKTFiIiItIFJi1ERESkC0xaiIiISBeYtBAREZEuMGkhIiIiXWDSQkRERLrApIWIiIh0gUkLERER6QKTFiIiItIFJi1ERESkC0xaiIiISBeYtBAREZEuMGnJQv2eZpTk5SEv2VTrgF/dJ3034Pe8AVtDleaYRVjW8CJe9/gRVLdKVfCSA2uLRvqeiGjsBdHX5YLD1oBl2niSV4UGmwMdXb3qdpkL+j14fX8zauWYED5+US2a97vQ1ZdudKGsIsaRYBVNap+KXutq5ftLOpnsok/dKy2BU6LdbIx9TGUqE00tx0TfgLp9MgPnRXtdWWjfTN8TTRry90hZasAndraYRCHieo+epOvfekIMqLuk5zPR17lDNAmxjqtOQp1oPdWjbk/ZRv6OE2FJS9bpw0XvOXV+DAQvwPHkatQ0tasLYjmJPfVPYPOBC8lLXIKX0LH5r1FjO6kuIKLJ6QYuHfgRVtXvSVIaKl3/a/8STzpSuP6jBC+9gc2rNmBPoj/gt2Ft5VNwXLqhLqBcwqQl2wQ/wvnf+KQZAUbrKQxIiauUnMaeWqulrdIRRK9rFzYoCYYAg/lnOOD2Df2NAR/cdgukuyTJSdh+4sC7CYpyg/638Ny378fybYkSICKaFHqP4fkNO0MJi2CCpe0ovIGBwXgy4OvEbrNR2VS5/jfsgqs3nbSlG+/+wgab8gfKYLK8GXF8MeBFu8UUill+B37yi99It2iUc6STIaYEq2gy89lFk1KMWi6anVfUhaNk4JRoNQqhIlpDi+gOxKr/GRB7nI1q8fFq0er9VF2u1SN621tiFwGzekj35O+Rso32ul4hWtwfq8ujfSy6LSvU69kgbZdGJZEmvghmpxQlYrkiOs3loeMbraI31Spo0o1k8YMlLVmm33cObylzFbjr9lnK3GgJnnkbr7bLt0ErYGn+NsoLYp0++ZhRuRVS4iGdea+hrnSaujzsAzhqF2OhsT5UBGxohN17AnZTcWg1EU1C1/D+8V+HSlmM1XjgznixZRbufKAaofKWD3DiwsfKXEqCn+DqWeUvYPqcmZiuzEWbhplzCkOzZ68iwDa5OYdJS1bpx5ULZ3BWni0uwbw5U5Slo6MfH558B0pFTrEBy+4YaUJkhNnqhPfgFlSXzlSXEdHkVIDyjUflW2CIh+tQmuCXI79wFm5W59MyZR4W15Qrs9eu9EhpUizX0XMlEJq9ZwGKRjPEkS4wackq3TjV6VbmhJrFuPV6FzoiuiUuQm3zqxl2SbwO3zlvaDYcLPqk40d0S0zl+DNRVrsTbt9BbK+rRGnM0hoi0qtgoBuXlbnF+GbZHGUuNbOx5KFHYZDm/E1P4rvNhyO7Nwf98LRa8GyTR3pRDnPtvWm2yaOsEKolGi7BKpqstHXCpnqx3qC2Pxk2ZdIl8fei3VSs7F9s6RQ/PrU7QbfEdI8/dGy2adE/+XukXDXSNic9otfeKEqJixpLYk0j6VJNk538HSfC29xs0ueD90SoTti/pwUtrtD8cKEuiettJzNqfX/t3Z1YX/l4gm6JmXd5JCK9ugF/x061JGQFLFurE1YjxTYDpdX/Cz+11sUpRSmDyfoL7KwrQ4G6hHILk5Ys0v/+cdiVRELujmyF09sTqoMenHrgdVphNsjhQEosNr+A9gzGOvDv24N90t8RTBbYE3V5TrvLIxHpk5ywbMMjy5+BS44/lh/gifL0270pwyDU3oPb19rijAUj3xAtQmltK05zZNzcJP3YxJRgFencgNcqGpViVkE0Wk+JqZXgaqpwpEmos4sXY+44IAbcLWrxbqrdrlk9lE0YO3LNZ6LP+Yx6zQuiobE99dGwtbQjYwsm0WJ3Rx4n4BWdbZbBaun4MYj0LFn8YElLDsovvQ/rlC7GfrT/y+/wYWhxGlZjS8OfYm7MsycfBXf+CdYY5eIWD+zHL6A/tIKIsk4vTtu+g/JwCUtjK/ZtuQ9C2r8s2oErV8By8MfYWF0eeZyCUlQ+WI+dB1tCjXVtNvzi3e7QOsoZTFpy0n/GvEVfUedT9UXMulkt7i1egjsWRI+/opF/k7Rt7FEWiChL9J2Go2G1WpUzkoRFluo4MNqbouM48t5ltpvLMUxacpJmrIOUFeCWhQtCs9euoucaQwVRbpKf8uxAw8pK9RlkRpjtHTi4NdOEJYp0c1SY6DiDN0V+nL36CZOWHMOkJWt8hI6GitB4KVU2dCW6kgefTwQIUoC4SZlLZipunl8SatHvb8dh91VlaUz9f8C5t+Qh7gQUz76JJxlR1pAb3D6LlQtr0CT3ThTqYD3Vhu3Vt41eb57L3YlHug1+gu7LsYeeo+zH35OsoSkJaXfgl3HreqW7pHf/CXuV4fjLsabqa5gRWpFEPmZUfAtrlKzFg6Zn98ITs/X+DVz65c/RogzLuxQPL53Pk4woK0ixw7NT7SEk5SumHej0/BR1t6UWQRKbjlsXfyN0U9T+Jo6dua4sHS4yftUsngcOiptb+HuSNaahpOovUKdc9YewaeWTaD7SFTkOizyipKMF61fWK0EHxr/BWsOXlFUpmbEYD9WvCM276rFy/Y9xRDv6rXL85/FU+EmwxvuxtCRB2xci0o8+N17YaAnFDkMLDu78DpYIU5VVI6e9KWqT4tI6NO//FTx+zZAM0fFLMKKqYrayinKI2otomASraNL6TLxoX68+iTXJJNSJ1lPDn6P6udsiFivbFIsm++/VpRqBTtESd6Rd7ZToSbDR2OU5m8jfI2WbT0WvdbXm+k5tKra4xc/VI8gSx5c04hfKxDr7+RSHayA9kb/fRFjSklWmYm71VnTEHU1SJddDdzyXWbFuwRLU72tDi6lMXRCLEY3OXajPYHApIpqEgudx7NVj6ouxEopfLnuj0qU5Prnhbxt+XD2PVQU5iN951pmB2+peRJf3KOxWc+TFbzDDaj8Kb9eLI6qHzhfuwfd+3g73gZdhiUhe5Cc3H1Qehri1ci5PLqJsoXlEyNiSh/HfCqfPjQNt4dG1w4biy6g2/CVdyZOLW9T5CHIvlDiriIjiYuwgokwlix+8GSYiIiJdYNJCREREusCkhYiIiHSBSQsRERHpApMWIiIi0gUmLURERKQLTFqIiIhIF5i0EBERkS4waSEiIiJdYNJCREREusCkhYiIiHSBSQsRERHpApMWIiIi0gUmLURERKQLTFqIiIhIF5i0EBERkS4waSEiIiJdYNJCREREusCkhYiIiHQhT5So84Py8vLUOSIiIqLxFSM1UcRMWmRy4hJvJyKieBg7iChTyeIHq4eIiIhIF5i0EBERkS4waSEiIiJdYNJCREREusCkhYiIiHSBSQsRERHpApMWIiIi0gUmLURERKQLTFqIiIhIF5i0EBERkS4waSEiIiJdYNJCREREusCkhYiIiHSBSQsRERHpApMWIiIi0gUmLURERKQLTFqIiIhIF5i05Iwb8Hf8PZbl5SGv1gG/ujQz0rE8v8L+5loUycdTpiIsa3gRjo4u9KlbxRdEX5cLDltD6P0MTlVosDnQ0dWrbkdEehC85MDaIukazji2fABHbYkmFqQ4jTiWkd4wackRwUtvYPNjz8Clvs5Y0I93nvsrlFeswOpNezQBww9X01+jZrkBKxsc6OoLqsujKPt/G6ULl6FmbVPU+2lH09oaLF94D2ptJ1NIfohowgUv4MAP/g42Zg80Dpi05IJRCyo3cOnAj7CqXpusRJOTlxoYnjyAS8PyllT2l53EnrV/iScdFxAn9SGiySB4CR2bpZsV6SZj/AkwLLoFheoryg1MWrJeNzwt60cnqPQew/MbdoYSDoMZVqcXAVGEqEw98La3wCQoW8JvewWHz1wPvQjT7i+YYGk7Cm9gQN1fxICvE7vNRmVTOXGxbdgFVy/TFqLJKOh/C899+34s39auLhmJr6C69cxgLIg7BU7AaipT9hDqduCl+iUoUF5RzpBOhJgSrCLdGBAD7hbRIH2XQp1VbNtmUL5XmOyiT90idQNij7NRlHISEcJ60X7xM3W51tDfk0KKaLSekpaEafbHCtHi/lhdHu1j0W1ZEXqfMEjbSWkR6QpjR7brEaUbFFG6QVGvU82UUWxJlSY2xI1BpHfy95sIS1qyWNDvxNaNFriE9djxw1X4r1PUFRnJx4zKrZACEkTfDlTPnaou18pHwZ1/gjVGubjFj7NXP9FU71zD+8d/HSplMVbjgTtnKUuHm4U7H6hGqLzlA5y48LEyR0STgdxgdjEWGuuxR76YDY2we0/AbioOrR4zQfR5fo6Nmw5J82Wo27EJq2LGIMp2TFqyldyOZXM9trkWw3JwS5wkYywJKJ59k+YEK0D5xqOhIt7DdShNcOblF87Czeo8EU1GRpitTnjl2FI6U102hvrceEG+AZNmhbq/xw9XzeOPV47i956V5AavFmyw/QcMlh/gifJ4pRqjTbobevefsLddugUTqrGuakFGJ1gw0I3LytxifLNsjjJHRJPBTJTV7oTbdxDb6ypRWjAePyHX0fVaMza55KKd1djS8KeYy1+unMWvPuvIxag78VjNTsC0DT99omJ8Gqr1daHD1oiVFfXS3dBIim8/gsv6j1Ca9hnvx9KSacpSIpoMZqC0sgrlwviV3AYv/QrbN7dJc4J0E7YRD5UyJuQyJi3ZJlyMKrdj2fqXuG1M74T64Xc8ERrkqXAhlsvjrhjM2O1ux4vVmRTfygPg7cSzTR5pfgUsW6sTViMRUbbrxru/sIWGaxCq8d2//Dp7C+U4/iRkE3nMhK1PY5Prv4xTQ7V+BLqvQjBZ8IrFJN0HSVxNeLzCiG8/9xb8afVWlhOWbXhkuTwAnnxHNZ7VWkQ0KfUex2stcuNbKSbUm2Bk49ucx6Qla8jtWLbhsW0nYGhswZZxaag2DaV1r8HXuhEPb2yFT/wMPvcemA3/gT31q/HI5iMpJi5RCUtjK/Zx/AWiHCfFtH92YK/S5XAp1jzwNcYEYtKSLeRh+n8gD9xm2ITmp5ZDmJBvdiqE8kfxdPMmGOCHa1sj/sH1kbounl6ctn0H5dqEZct9E/T+iWjSCJ7D4V2hZwsJdX+BKrZvIwl/GrJCPz7sbA/V+7rqUVH4hVA7k4ipEBWb1Cf97KkZfNBhSbNH2ns05aOg/EF8Vxm3wQP78Qvxj993Go6G1bh9rU0KTExYiGhI8MzbeFXuiYhyrHn0XvYYIgVPAxpTZ09cwBV1foj8lGcHGlZWoqZJ7idkhNnegYNbmbAQkew6zhx7M9SLUDCiqmK2spSIPxGUoo/Q0VARKrWpsqErUVuV4CfovnxNmRVunoWblLkwuf3Ks1i5sAZN8rgLQh2sp9qwvfo21lcTkaoPF73nQrOLSnDLuIwHQ3rAMyErTIFQ/UJotNm4UwBuiyG0uckeGo5fms5sLJf2TsVsVFQZofQQav9HWOO2VZEbBO/AZqVYV8CihUWaZCQ0hkyowa201rQDnZ6fou62GaHVRESy/gs4bpeHPhBgfPhulPCXilQ8FShF+ZhR8S2sUbIWD5oe+59oPtIl3Q9pKAPMPa0MbCenLMNGxdUMxQ1DCw7u/A6WjOMgVUSkD8Fz7+HIWXmuCF+f/yX+UNEgngsUod/TjBKlkW4Jah0fqEtVM5bib3esD5W2+Pdgk3EhCtUGvcoUHmBO2diIxpcaNWPFaIfilsRtMBw5jX5DYSKaKAnjy6Ag+i6ewQllvgJ33c7xmmgIkxZKw1TMrd4Kl70RakVTHFLC4rRhS+XcoRMseB7HXj2mviAiiieIT7qvqqW1szHrJv5M0RCeDZSmGSit3oKD3qOwW82RyYvBDKv9kPIwta3ahEXW54P3hFrKQkQU13X4znlDs9NnY+Z0/kzRkDxRbo0Zg1w0H2cVEVFcjB1ElKlk8YMpLBEREekCkxYiIiLSBSYtREREpAtMWoiIiEgXmLQQERGRLjBpISIiIl1g0kJERES6wKSFiIiIdIFJCxEREekCkxYiIiLSBSYtREREpAtMWoiIiEgXmLQQERGRLjBpISIiIl1g0kJERES6wKSFiIiIdIFJCxEREekCkxYiIiLShTxRos4PysvLU+eIiIiIxleM1EQRM2mRyYlLvJ2IiOJh7CCiTCWLH6weIiIiIl1g0kJERES6wKSFiIiIdIFJCxEREekCkxYiIiLSBSYtREREpAtMWoiIiEgXmLQQERGRLjBpISIiIl1g0kJERES6wKSFiIiIdIFJCxEREekCkxYiIiLSBSYtREREpAtMWoiIiEgXmLQQERGRLjBpISIiIl1g0pK1bsDveQO2hirk5eWpUxGWNbyI1z1+BNWtMiMf+1fY31yLoqhjOzq60KduFekDOGpLNO8lxanWAb96BCKaDILo63LBYWvAsojrtQoNNgc6unrV7TIX9Hvw+v5m1BZpjl9Ui+b9LnT1jSx6kc6JcSRYRZNd4JRoNxuV7zD2VCaaWo6JvgF1+3QM+MTOFpMoxDyuPAmiwWwXvYHog/9etJuKY2yfZDLZRZ96BNIH+XujLJX0+pcnKb5YT4gBdZf0fCb6OneIJiHWcdVJqBOtp3rU7SnbyN9xIkxass3AedFeVxZ5kcecysQ6+3kxvbzlM/GifX2SgBWahDq7eDHi4JkkLVICZOnMMPjRRJG/O8pGqV//mcUXKXxdtIt1iRKW8CSsF+0XP1P3omwif7+JsHooqwTR69qFDbaT0rwAg/lnOOD2QQoc8lkA6S4JbrsF0l2M5CRsP3Hg3XSKWnuP4fkNO0PVNQYzrE4vpIQidGyxB972FvXYgN/2Cg6fuR56ofgKqlvPqNsmmAInYDWVKXsIdTvwUv0SFCiviGhCaa9/wQRL21F4AwOD1+6ArxO7zUZlUyW+bNgFV286VTndePcXNtiUP1AGk+XNiOOLAS/aLSYpskn8DvzkF7+JUxVNWU06GWJKsIomq4FTotUohO5EDC2ie1gVjWxA7HE2qndLq0Wr91N1eTKa/eLe5QyIAXeLaFCOLYhG66k077Q+Ft2WFaH3zzsp3WLsyEbauLFCtLg/VpdH01zDMEjbpVFOqolfgtkpxq4AuiI6zeWh4xutojfdohya9JLFD5a0ZJHgmbfxart8m7ICluZvo7wg1tebjxmVW+FT7l5eQ13pNHV5Mpr9fDtQPXequlwrHwV3/gnWGOV7IT/OXv0kjQa/QfR5fo6Nmw5J82Wo27EJq2L+DSIaf9fw/vFfh0pZjNV44M5ZytLhZuHOB6oRKm/5ACcufKzMpST4Ca6eVf4Cps+ZienKXLRpmDmnMDR79ioCbJObc5i0ZI1+fHjyHbTLs8UGLLsjXlAZLwKKZ9+U+gnW58YLGy1wSbNC3d/jh6vm8eQkmjQKUL7xqHwLDPFwHUoTXJz5hbNwszqflinzsLimXJm9dqVHSpNiuY6eK4HQ7D0LUDQlNEu5g78LWeM6fOe8odnwxdzXhY6IboOLUNv86qh0SYwtiL53/wl75dIeoRrrqhakeIJdR9drzdjkku+yVmNLw59iLs9MIl0KBrpxWZlbjG+WzVHmUjMbSx56FAZpzt/0JL7bfDiye3PQD0+rBc82eaQX5TDX3htq30K5JVRLNFyCVTQpDfXOKbZ0ih+f2p2g2+BIuiTGEfCKTqtZbc+SXs+BoR4D7C2UDeRzjHLVSNuc9Ihee6MaR+JNYxC/aNKQv+NEmLRkjaGkRXjEJD6StNtgZl0SI30u+uzrIo9rMIu73b40jsvGt9lG/i4pF30m+pzPqAlHosa6yfSIp6x1cbpWM2HJdsniBwvhs5B/3x7sk2toTBbYE3V5TrtLYrR+BLqvKn/nlXBXRFcTHq8w4tvPvQV/KofuPY7XWuTGtwIM9SYY2fiWSIduwN+xDY8sfwYu+Vq2/ABPlKffri7ofwvP1d6D29fa4oyEfRJ71i5CaW0rTnNk3NwUyl2GS7CKJqXIwduGD+4Wpu2WXC6anVfU5aNButNy7xHNBrnboiAaGtuTjLqrHawqne7XNJkxduQabQlLKtd9HNqBMQWTaLG7I48jV0G3WQarvePHONKzZPGDSUvW0CYtSRIAzXgIxRa3+Lm6eHSkkRRpx2VgAMoajB25RFuVM4KERYobqY0Do40vI6mCoskqWfxg9VDW+CJm3awWxxYvwR0LEoy/kn+TtG3sURBGLh8F5Q/iu6Ziad4D+/EL6A+tGGZoXJlyrHn0XvYYItKTvtNwNKxWq3IEGBpbsW/LfRAyuo5THQdGOxbUcRx573IaY0FRNuDPRNYowC0LF4Rmr11Fz7XJcSmfPXEBV9T5SNdx5tiboXFlBCOqKmYrS4lospOf8uxAw8pK1DTJV7ARZnsHDm7NNGGJIt18FSY6zuBNV7oDWFI2YNKSNabi5vklocaw/nYcdl9VlsbU/wece+usNJPOAHAfoaOhIjTeS5UNXYkiRfATdF8ODQ0lSAHoJmUuWh8ues+FZheV4JaYo/cS0eQiN7h9FisX1qBJHldJqIP1VBu2V982es8Iu9ydeKRbTXyh3MNfiqyRjxkV38IaJWvxoOnZvfDEbF1/A5d++XO0yDkLluLhpfNTPAlmo6LKGEqK2v8RVtdHytLhpOMf2IHNSrWPgEULi2IHs/4LOG6XB4kSYHz4bpTwTCSa5ORHbexUewhJV65pBzo9P0XdbTNCq0dkOm5d/A01vryJYxEPW9XSDGCJctQsngcOiptb+FORTWYsxkP1K0LzrnqsXP9jHNGOfiuPKOl4Hk+Fn9RqvB9LS9J49pA2KXrsf6L5SFfkU1blEXhtT+OxmvCTYOOPihs89x6OKIlTEb4+/0s8EYkmO82jNmBowcGd38ESYbSGKNDGlzasNaxD8/5fweO/oaxVKPGrBetX1ofeA6uVc5PaIHeYBKtoMgt0ihaly7Hcuj7RFLvl/edui1isrC8WTfbfq0vDtF2Uk01GsdF5Mc4gc9qeAutEu290+y/RxJK/f8o2n4pe62rN9Z3aFN07cfTiy2gMjkmTkfz9JsIb3GxTsAT1+9rQYipTF8RiRKNzF+rTHvxpKuZWb4XL3qg8HyQ++fg2bKmcG6cEJYhPuq+qpTGzMesmnoZEk1rwPI69ekx9MVZSjy9mext+XM2HquYifudZKF+4B9/7eTvcB16GJSJ5kS5260G4fQexNW5CkcwMlFZvwUHvUdit5sjgYjDDaj+UwvE1D3ecPhszp/M0JJrU+nzwnlBuM8aYHF+2wulz40BbePTusKH4NaoNf0lX8uTiFnU+gtxLJM4qIqK4GDuIKFPJ4gdvcYmIiEgXmLQQERGRLjBpISIiIl1g0kJERES6wKSFiIiIdIFJCxEREekCkxYiIiLSBSYtREREpAtMWoiIiEgXmLQQERGRLjBpISIiIl1g0kJERES6wKSFiIiIdIFJCxEREekCkxYiIiLSBSYtREREpAtMWoiIiEgXmLQQERGRLuSJEnV+UF5enjpHRERENL5ipCaKmEkLERER0WTD6iEiIiLSBSYtREREpAtMWoiIiEgXmLQQERGRLjBpISIiIl1g0kJEREQ6APz/u7C3wi3LVFUAAAAASUVORK5CYII=" width="291" height="150"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Which average density value, in g cm<sup>−3</sup>, has been calculated to the correct number of significant figures?</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. 2</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. 2.3</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. 2.27</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. 2.273</span></span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Candidates found this question relatively challenging and only 67&thinsp;% chose the answer with two significant figures. The most commonly chosen distractor was C which expressed the answer to three significant figures.</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">The dotted line represents the formation of oxygen, O<sub>2</sub> (g), from the uncatalysed complete decomposition of hydrogen peroxide, H<sub>2</sub>O<sub>2</sub> (aq).</span></p>
<p><span style="background-color: #ffffff;"><img 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" width="358" height="260"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Which curve represents a catalysed reaction under the same conditions?</span></span></p>
<p> </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Graphical representation of catalysis was also well answered.</p>
</div>
<br><hr><br><div class="question">
<p>The molar mass of a gas, determined experimentally, is 32 g mol<sup>−1</sup>. Its literature molar mass is 40 g mol<sup>−1</sup>.</p>
<p>What is the percentage error?</p>
<p>A.     80%</p>
<p>B.     25%</p>
<p>C.     20%</p>
<p>D.     8%</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">How should a measurement of 5.00 g from a balance be recorded?</span></p>
<p><span style="background-color: #ffffff;">A. 5.00 ± 0.1 g</span></p>
<p><span style="background-color: #ffffff;">B. 5.00 ± 0.01 g</span></p>
<p><span style="background-color: #ffffff;">C. 5.00 ± 1 g</span></p>
<p><span style="background-color: #ffffff;">D. 5.00 ± 0.001 g</span></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>More than 85&thinsp;% of candidates were able to identify a correct uncertainty, however not a good discriminating question.</p>
</div>
<br><hr><br>