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<h2>HL Paper 1</h2><div class="question">
<p><span style="background-color: #ffffff;">When equal masses of X and Y absorb the same amount of energy, their temperatures rise by 5 °C and 10 °C respectively. Which is correct?</span></p>
<p><span style="background-color: #ffffff;">A. The specific heat capacity of X is twice that of Y.</span></p>
<p><span style="background-color: #ffffff;">B. The specific heat capacity of X is half that of Y.</span></p>
<p><span style="background-color: #ffffff;">C. The specific heat capacity of X is one fifth that of Y.</span></p>
<p><span style="background-color: #ffffff;">D. The specific heat capacity of X is the same as Y.</span></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which statements about bond strength and activation energy are correct for this reaction?</span></p>
<p style="text-align: center;"><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><msub><mi>CH</mi><mn>4</mn></msub><mo> </mo><mo>(</mo><mi mathvariant="normal">g</mi><mo>)</mo><mo>+</mo><mn>2</mn><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub><mo> </mo><mo>(</mo><mi mathvariant="normal">g</mi><mo>)</mo><mo>→</mo><msub><mi>CO</mi><mn>2</mn></msub><mo> </mo><mo>(</mo><mi mathvariant="normal">g</mi><mo>)</mo><mo>+</mo><mn>2</mn><msub><mi mathvariant="normal">H</mi><mn>2</mn></msub><mi mathvariant="normal">O</mi><mo> </mo><mo>(</mo><mi mathvariant="normal">l</mi><mo>)</mo></math>      <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msup><mi>H</mi><mo>⦵</mo></msup><mo>=</mo><mo>−</mo><mn>891</mn><mo> </mo><mi>kJ</mi></math></p>
<p><img 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QxsVpMwQyTN+szjwOnldFHmUOoHsF0dan4FocQHP7WD8E/Wjk4kLtRAaEQDOo1azq9LeqtTF1xCqbjsA459NYQ2MWbCIuNoO2AWu77/iFoaz1sv5l3fx8Jh7WgUYcSoj6Bxp7Gs/eN5mftQ5t34jWVjutMyJgyzPpzYVknM3uHYh9JeHiKUPupl8VsilCWzeQs+Ka0hds09eSc2BHYTyvHrtjKjZxNqGozUaNCFT5MvkOG40Cilnn+Ho8vG06tpLXXD4ah6bRg8czupbgdZLnxByxANhpaz+WX3bAYrGwHrjdRu2o8vDty194IU16CCW/uZP6AldUwGIuu24+PlO/iyY1lD3jZepKzl027NqBuqx6APp37Lfny+8z/7L2Vn76TrV7guahz/Kyjg2IRa6IL0dJm+lLEJ0YQaa9Fh/lmU61lZG/6WJ1+Fdw/z1aBW1DMbiYrrwrQdl/nl40h1KL/XunvO3knnr31NNJ8cLsC9h/KDHy+ya1o34sONhNVswaD5h7lf8lZxb8F3suwsiFCWzUiOqAwCGewcaO8V1NUawa67+RTlP+PSmv6qsHkuhqmM+CXM6k5AhLK6l2Cp6fctlO/khsAOoQwKQe+9ua8mmv6OOYjWu+wcWvel4RdFiqISvyKleGqTQ7y0OgNmrw2GtaF92Kzu7KtMzTnGtMZeQ01BIRjUNJQ8h9L2eCcfKBPm3YZ21OchDZhyNANbmUKpQR/sWNFpZsDmx1j92PDX33yRfZY5zYuH8xxpDKlPfKzynh7/hDKEOrVreQ1NRjDox4dl9iSUWu2r+YcilNW8AKtt8q3cSe5NlOP77PGoo+kM+4/Saps9SXilExChrHTErzMCl1C+JCbFjcU7syGwUyg1hLWayq9p6WQ+OMOyXjHqRGxDkzkoCySzDo+3ryTUNuLDDX/yODOdG4e+oGukIncGOi2/phaoU7yCdMR/tIN/X+Tw6Oh0WqmT8MP5eL+yR5yNR5v6qrdb0xoSmPzTVV5kPODs0t7UViW0ZKEs+N84YjTKbdo+5/SzfApz7nJsRmt1CCgiabv9jiBOqdTjmkPp6KHUoDV2YHHKMzLvX+NulsWvDX/9zdfTbUlEKnXI0Iqpv6TxIuMep7/p6cxXr3UPlMlszl5Kk885lBqMTcay578Mcp+cZb6yqXOQhuiPfnOuHH2d357XFbcI5esiL/FifcLvqyfQp2VdovQh6IIN1Ihtxwfzf+XGS0P2wksIeBIQofTk8Za9KkUo37UNgZ1CGcaIPc61lhSen2XfjFfXnfUP8jgxUVkNqCF84Da7tKk1wsKFuU3VnjRT17X2d4qHvLW6jqx27ezLLHX7CwOD1Y3YXHIXMWQ3rr14U5jTSOk9LFkoi66tpLO6qbKR+q37MXbmN2zce46bmW7jwWUIpbnXBh47hvJt/m346xTKMvLl5DRoJ64dPP5kXhP7JsD+CaW7CFv4c068ylhZ6KCsrXhX/4lQvqslL/kWAtWbgAhl9S6/MlLvEsp3fkNgh1AG12Oa28a11jur6aZMONe2Y1laFj8NUXrJQmgw7Yy6kbEdsI2nm/rY97ZrvkB9yyle+iE4t06zpPJVS/t2OIO3KfqYz68jlPv3BhM7+aR9lahytvUua7uUNYcyn2u7ptKtnkkVXEcPsy6sGaM3/WvvwStDKGuMOeTq6Svyb8Nfv/M13Fe+7rO+mz1f/gmlgaG7HOro2u7DPHC7S77LqOFv48cilG9jqUqehMDbT0CE8q0uYy+hfJc3BHYIZZCJQW631rI4bium782mx/mcLKOH0tztB7XGOMXLMJxfHbfdVfaWa+UulAWcnGi/P2z4oB1uPXkpzG1ceg+ls1pas7l/8Qg7V3/JlD5N7MPnoUPZrXQL2h6S/NK2QY5e0WDqTzzhklibfxv++puv458qC380eObrT+Z69FDaeLje322DLFwp3j9OhPI5NSOjnFVAnggBISAEqgMBEcrqUEoVTqMvoVSm9r2DGwI7hVKDKX4cu69mkPP4D1b3tYuR/a4aNjJ+HaWuaNRqGzFKmUOZlcHNQ/OL51Aa6brqhloa/omXjWc7B9snuRtaMW3fDTKzH3Dm217OuYa+NzYv4trSRPv+jc0mc+BmFpaiHO7tn0BT9U4UPdmg7Adne8zm3kqPqpYWs34n/UU6OTaXUMZOPuUSSlw9gKVt+OtvvjzmUO69RkbGXU4s6qbO+7QvylHmUNp4stG+9Ychfhbn01+QnmPzWOU9fI9jdzcRSsfXXHooHSTkUQgIgepEQISyOpVWudNaglAql/p3bUNgp1DqMSlD3O4rGDW1GLn7oX1j8MJrJPexL9TxOCYomOiO33Kx2H/8Ey8gN4UFrYye8QWFYNKV3kNpe3aQTxt4rw5X0h1MrYE/ck+9zVw+h8YU38VCyY9+MLsySxJK/zb89TtfOeeY673KW1+PuJpKvgz0Xv9Qra35B8cUS6aSdgNDd2aKUJbxPRahLANQwD/2dccpC5e/bGmf0zv0J+em1oGJuqrjC0yq36ZQbE+3MEC545H7dcDjuZ6uq97Mu4+9yeUgQvkml84rp61koVR6j96pDYEdQqnrwuLdKxmTGKvuMRndoCtTfryCx43O8m5wcMlYejatRaTeQFSd1gz+fAdXMh0rXBQnsu9DqS11yNtegJYHR/l6cCvqmkzUjG3DoM938sNo5TZfJS/KUc4suHOQr0d0oEmUEUOIgei6rRj42RYuue2HmXd5PR+2rIlZZ6Z2i0/Z9yS/eB9KZd6mew+lPS1lbfhbnnwV3N7P/H7NqW00UqNJH+bvP80KdX9NA0lb04sjTCV5RAK19XrCa7Zk0q9PRCjtZEr8X4SyRDSV84HPuciVKJRVHV/lUKvWoRacnKJuWF+iUAbX5zO3ufbVOrNVmHgRyiqELVEJgbeFQMb2JHWRklZTmw933iW/KJ9nl75noLJ3pnK/9JMFb0tWqzwfIpRVjNyn4FViGqo6vkrMSvUM2srNlR3VKUW62pORpipwpShCGTiWEpIQeGcIWO8k0y/c95CRsfFMzsmedRWuCyKU/qOzZaXy4+SetIwxYwzRE16jCV0/XsXvz1yjCdgyuLR5Gv1b1CZSryOsRjw9JqznL2Vhm1PuXHXZfscprx5K2yO29A1Vd4BoMuOca26y7TE/9jOr85gT5v+t3iGr1DT5G58DQYDv2uUI1vlYeI+ji4fTvn4EZn0Y9Vv2Z+a2VLIc+CwXmN9UizYkgbk/7WbuQOXOWAZCazRjwNzfuOt+z/GywnKOEnXi86Uf0ybKSFhMIl+eVe/hxb3DCxmq3HHMEEHjLlPYeflnxkZo0Op6sP7+I37sp/APpt6Eo+pdv9Q8WG+zppOys4SODkuv4bapmjOLLz/JYf+HEepwt7lnMo8ceX35QHmnnAREKMsJTA4XAkJAIWDl6bk1fNozgdhwA3pNCOaIWNoPWcC+62KTr1JHRCj9pGdL59C4WB93tQqmzphD5KjBFPDP8s4+7v4STM0+G7hlecB6daeEMoRSmSK0ayjRQRr0cdM5V9wBb3u0iX5GZduxNnz7b5G64LHUNJVHKAN8166XqNpecHRiE7WnzmPoVxNNv+QbdjlzCGWQHrPe+85dYfTbeN8+99yfsBxC6X63MlM/tjy2kX12FglecxoN9RrTSHlPEcoHRTzdPkgtR329KZwq3lnDen89vdVjEllxzT+dxPI3XzZXduMIofGMc27bw71ESN4oJwERynICk8OFgBAQApVJQITSP7q2x5vpr8hceHeWXXhBQWEW/63qqW6tpezakGpRbn36C6OiFBEKo+Psw9zMyOXZxe/op7wX3IhZvxe49VJ6brR/2XtRTuZ+xtRQzotjxmnFaKw8SO5NWJAGc4eV3FR80o80uXpFS48vsHfteplpUdoyOug06GoOZM1fj8jNz+L20Vkk6jXo60+1S5tTKDUYG33Ezn9ekPPoGDNb2BcMRo06oO5161dYTqHUENb+K1KeZXL/2l2yrE/YMTBM7TEMTZjM3rQXZNw7xZIeNe178KpCacX2YjfDlVGR4AbMPKsYvY0nW/qr/E2JK7jup0/anv3IQC959Rbq8Ycce8G9zE3eKZmACGXJbOQTISAEhECVExChLA9yK1l3/uC3TcuYO3YAbWvbd1TQN5xFSiEUnp5Gg2ANWvNQfnLdIMszAmevYemCB7kcm1AXXVAIDaeeJt96j/XdlfiM9Pzhrr2nTg259DT5J5QFAb5rl2eWFRl7urmvfR60x+rm4p5abWu++afIbQGdns7f3SrOYyF/zGyk9gybk3aQ6W9YTqE00Df5Mc6R5oLjTKmlSL+ZoTvTne8XOvYILhZKZerC3hFR6IK0NJv9J4W2F+waHK7ecazTiut+DndD4ampxCl1wle+lfd0XfnhrrqNhjc0eV0GARHKMgDJx0JACAiBqiQgQuknbet9DkxuQ7QPOdA3nq0KZf7+0eo953Uxn3K8pHVifgsl5J+ZTuNgDfp6Uzl5fS09lZ4ucz+2OCbi+ZEm/4QyN8B37fJmWsT1pYkYS5IqxypnZw+lgWG77ZMIUPa0XZhg31JJvauVn2E5hTKSce49gPl7Gan0NHst5rPe/4GeyhZvDqEEMveNVvcJNjRbwN/P9zJKnWPZkVU3/BVAK7e+62RfkBMzgWPSEeldMV7ptQjlK+GTk4WAEBACgSUgQukfz/wTk4nTaNCGtmLM0m0cPJPK9T0f24Ujfh4XLG49lIYBbH/u7BPzjMDnHae8FuU4zij8y75IJbgBoz7uRmiQhqjBO3GsAfInTb7vcOUdn3KXrdr2u1EN3OYMX5G5C3Ob2mWuXHftcmTA8WjjcXIv++1kExZxxX1xjeMQ5dEplEZG7nXYl/dNCPwMyyGUmjpMOeFm9wXHmBRj76EcssO9h3I2zZQbObgJJdkHGa8cq23F3G9HqzeIMHf8jpv++iS5HBhlX5ATPnA7JVUJdwTy3H8CIpT+s5IjhYAQEAKVTkCE0h/ENp5u6qMKkT5uLHvv5pL7+CJbRjRQh2INTebwl8ccSiPvTfmVaxl5ZKbtYEyssgF/BMP3pGPzeccpb8FzpKmIfxe3tvfsKTKriWb03oziD/1Lk+87XHnHF+i7djnS73q0XF5EG0XYgmMZnnyBpzkZXN04lHoaDbqYcRxWNuf1SyjBr7CcQlmXaafchNL21GMO5a/XMsi8c5zFXYtv2uAulORy9BNFtIMJM5vQBRnoutoxFO/KW4nPLJdY2EJZkKOj43L/h8lLDE8+8CAgQumBQ14IASEgBF4vARFK//hbLi2ktdZzLpw+PJIoVYgcQ9wFXPG5yluDueU8/lDvfOXrjlPegudKU9GNlXQuXtThFK/ij/1Lk5/xBfquXa4s2J9ZH7F3VH21t9NjPqEmgh6r/1O3QPJXKPEnrJKEEsg5N/ulVd7muvWprUxn0PckWbnVbPG/vOOTXHMg9V1Yc7u4e7LwDNPrKz8UIhl70NGb6jjL/mh7vpUkg2ed8ci7soq/7lTOFHqeJ6/8IyBC6R8nOUoICAEhUCUERCj9xZzDlc3j6VQvDJM+ima9ZvLTlYNMrROMNqQViy8Xj+PaMri4cQr9mtciQqcjNLoxXUcv5fgD1zjvy3ecKiz51ovKYpweymKcEOImnXDtiagm2780+R1fgO/a9RLZvOvsX/AB7WMjCdUaiI7rzPg1f7iGgv3soVTDLSusUoQSCri9fx4Dm9UkzBBJsz7zOHB6OV2UOZT6AWxX9gx1/Ms/zWdqD7OGsG4/4Fw/4yaUHnM0HedhnwJR6oKcIA2h/bfx3JZH6ppBtIjQodWE03TYNhze6hacPPUiIELpBUReCgEhIAReJwERytdJX+KuegIZ7BxoUFdd62qNYNfdfIryn3FpTX91PqyuzhTUEfIiCxZrAU9TltNH2fZJU4dPDmY4V4Wr6S48w2exsQG9bWJR1h980foD9jrWJFU9oGoTowhltSkqSagQEALvAgERynehlCWPLm4AsNEAACAASURBVAJW7iT39rH5vDI0raPpjLNqL3D+bx+rG8s7hqjN733juZjIls1/m4YRV3M4v7zyahvlxg1rmTmyL11a1MasG8xeZU6p/CuVgAhlqXjkQyEgBIRA1RIQoaxa3hLbG0DA+oTfV0+gT8u6ROlD0AUbqBHbjg/m/8qN4htvWVKX0q2GCaM+ivhu09l7y2uiY8FfLO7ZmwVHHrntCVrBvFnOMK1RX1af+4fLR1YwKDaJPY61VxUM8l04TYTyXShlyaMQEALVhoAIZbUpKkno20rA9oSDE5sTrosgYegKvhnZgxXX/d6b6G2lUma+RCjLRCQHCAEhIASqjoAIZdWxlpiEgBAIHIG3Wih/+P57BvTrx6fjP5E/YSB1QOpAtagD48aMpUeXrtUirdK2yrVF6oDUAUcd6NW9B4cPHvLLUP/Pr6PeoINWLFvGJ+PGsWXTJvkTBlIHpA5Uizqg/BBOfP/9apFWaVvl2iJ1QOqAow4MGzyYX3/5xS8LrHZC+dXChSxe9JVfmZODhIAQEAJvAgEZ8n4TSkHSIASEQHkJvNVD3iKU5a0OcrwQEAKvm4AI5esuAYlfCAiBihAQoawINTlHCAgBIVBJBEQoKwmsBCsEhEClEhChrFS8ErgQEAJCoHwERCjLx0uOFgJC4M0gIEL5ZpSDpEIICAEhoBIQoZSKIASEQHUkIEJZHUtN0iwEhMBbS0CE8q0tWsmYEHirCYhQvtXFK5kTAkKguhEQoaxuJSbpFQJCQCEgQin1QAgIASHwBhEQoXyDCkOSIgSEgN8ERCj9RiUHCgEhIAQqn4AIZeUzlhiEgBAIPIGACGXRf0tI1GowNJlNSkHgE1nREGUfyoqSk/OEgBB4XQREKF8XeYlXCAiBVyEQAKG0cHlhAqEt2tBKX4/Jx3JfJT0BPVeEMqA4Kzew/F8ZZTLQa92DAMZjI+PyNuZ8c4gMWwCDrQ5B2TK4vHUWSw5lENisv8NMq6jcRSirBnTRvX3M6FSfCK2W0Pg5/FFYNfEGNpZ89o0wY+6+jgfWwIYsoQmB8hJ4daEsTGFuEz2Npqxlfks9tUbufWMu3iKU5a0Or/H4ShHKbHYPMmDuu4VngbWq1wjKz6izdzFUb2DAlmcBFsp3mKmf6F/1MBHKVyXoz/kW/pobjzFmJHse5FOQX0D19DERSn9KW46pGgKvLJT5p6fRMCSaMQfSSZkTjyF0AFsfvxlXbxHKqqlEAYlFhDIgGJ2BiFA6UVS3JyKUVVFiBRz7JAZzu+VcL6qK+CorDhHKyiIr4ZafwCsKZQ5HP6mDofYnHMkGy6UFtAox0G31rTfi154IZfkrhP0MC+c/q03osLX8tjCJhGgjoZEN6T4hmQvpjt/xFs5MjiY86Qu+TWpElD6C+ImHyAQsD0+yYnQHGplD0OprkNBnJruv5rglxkZW6nZm9mlGbZORqPrtGbt8Nv0MriFvy8kJRAR3Z/Mjtx8nlqOM1YfQb+szZ1hFT86ydkJ3mkUa0GkjaNR+NMtOPsJie8aPfQ1ogzT2P217vrtRhC3jAsnjuhIfacCojyCu9UBmbrtCtjNEf58U8ODMeqb17sdiXxOHLWeYFmVm8LxvGNwwHHN4YyYfylADtz4+y+oxnYmPMmI21SKhz3R2/uOZgpyre5g3pB2NI00YtSZqx3dn8ubLZLnhKCnvhc+2MEBfnO8gDcbElfZM5VzlpzlDaR8XRZhWR1iNeHpO3MxlR6CWc8yIMTJq/WGWjHiPWLMec2Q8/Wf/yi1lbnQJTLFlcHH9eHo0isKsNRBdrw2Dpm/HK0v+gn3njxOhrOQqYLnMohZaV9sQZKBP8mO1J7+ststyegoxpiTmf51EfJiB6IbDGdtKT+2xh8krTrbtyWb6G4KpNeaQ673HG+lnjGH8IfuUsLK+3y/F02gihzPAlpXKjul9aFnTTGhYLJ0+XsHc3saSh7wtqSxL6sGk1ce5nV8+riWlAaw8OfMd4zs1JsZgIDymOf2n7+Df4iYs//Rk6gYnsOQ/x7VCidfK/XWdMUZP4KQKqvQwoITrix9tjT/ta/lIyNH+Eng1oczcz5gaOprO+gN1LY71Fms6GzC2Wsw/b8CvPhFKf6uB93F2odQG66nfZwW/P8wi8/YR5idGENHpe25YlOPtX3htUDSDk9PIzLpN6rUMyDjOlLhg6g9ez8Un+RRm3eTw7HaEmbux3n4i1kd7GFnLQJMRyfz5KIMnl3cyuaUZbZDeOYfSL6HMPc/ceB11Bqwh5XE+lvxnpG4ZQZyuDcvTlMbMe3g2nQMjalCr31pS0wuwWrK5e3gaCfpGzL+gZsobhI/X+dw//QPTujelWdcJrDl+G5/ttCqUGrRRSWxMyyTrdirXFZ/MPs/8Vmai205n7z9PyX7xLz9PbEV4TBLb7tgbYFv6QT6pa6L1lP3cyCigMPs+578bQF1dcxZcLE5nWXn37qG0pXNobD3CWk7lwPUMCgqzuf/7dyTF6En44iL2IlWEUoPO2IpJu1N5lpfP05Ql9AjTk7jyRvGPRG+mkL5/JLWi+7PucjoFVgvZdw7zWTMD8XMv2MP1QVHeKpmACGXJbAL3idJDWRNzolsPpR9tlypZQRpiBm4gLTOL25evcnpuU8zx83A0IXmHxlJbo8HQbAGXir+uWXtHUiN8OL8oUujH9/vleK6RaX3ET8NrY24wgg0pj8h4nMquiQmEB2kwlTKHsuDBWTZM603LJl34dMURbvq5zMFnGtQm7AveN0XQfvov/Ps0mxf//sSUBDN1krZyV2nCCs4yvXYIrb9Nc3UsWe+xvqOOupNOq+1l9vkywijh+lJmW+NH+xq4OiQheRN4BaG08Xz3MKJ177PkqsMebTzdNoiokMbMPv/6l3uLUHoXt7+v7UKpCx/K3heuc4purCBRV5tppxWFKhbKqEmcdha1lVur26ELH81BpavS8a/oOstba4j++DBQxH9L2mKu8REH7B126lH5f8ymeUj5hPL5jgGY9QPYWeIESS/5Kfqb+Q0MtF16DUeNdSSx7Md87p9ay5RuTWnZbTI/nLrrWyQdARULZczEU/YfW+r7Vh5u6kuEvj0rrrmlIP8snzfU02TGOaUbkGdbkwgPG8LuF27dkXl7+dBsoNf6h2pIZebdSyhtz7Yx2BTOsF0v3OZU5vHriFDM3dfzUIlK7aG0l5PrmpPHbyOMmPpsK56H6sWUIi7Na4i59VLcs+TAII/lJyBCWX5m5T/DWyj9abvALlnRTDnlbPQoOD2VOH0X1qg/CC1cnNecms1a0sDYiw3qCEsBpybXI6LfFp7a/Pt++4pH3U1FX5Mx+z0aTubGa0sVSgcby+PzbJ7el4TGHRi39CDX3QeNHAe5PfpKA9aHbOkT6iniQP7ZGcTrGjLrnMKlkJSZ9dEnLEH9Xa/0T977gS7aOkw/W4B/Yfi6vpTV1vjTvrplUJ4GnEDFhdL2mK39Q92GDVxDbNqgYOp/coQy6mvAM+MdoAilNxF/X9uF0txnG0/dnIaiv5hbX0+bb/5zCqWx3WpuOUc2Mvk5KQRdv52ke0RVxOUvGqKtPwdsL9g+wIC510Y8ptrm/49Possz5G3h9KcR6NqtcovfI1IfPZQ5nJnaAL0+ll6TlrPndBrPXdcF75OLX+dz5+T3TO7WjISe01h/5oGbIJZwivK2KpQ6OnhM/8jjwKgIjG49F/YQ8jjwYQSmtktdARY84cqRXSQvW8DMsUPo3rQG5iA9XVbdVtmXmXcvobQHXMDT1KPsXr+chdPHMaxLM2rpNZg6ruK2UoaqUOrceiPVjHB2ag1MndZzXy1nb6GEnNPTaBxsoEH3yazYfYa0sqG68inPXiIgQvkSkkp4w1so/Wi7lK+IMuStTWSNq9GDnIOMqxHOB7szwHqXH7qG02/lKgabohn7W54yF4xFLcz0+P6uq8eu1O+3r3hsvNg6ELO+N5s8G06OjK1R8pC3D3KWxyn8+Hl/EhonMubbA6R5zrZxnuEzr3n7+ThcR8L8vz1HH/L281G4nvZL09TzLRfm0ljbmmWqUVq5t7YjpnozSVFW0vsVhl0oPa8vZbU15WhfnbmUJ4EkUGGhtN5bT2+jd4+HkjTlF1ozjJHD+cW9hyWQqfYzLBFKP0G9dJhdKMNGHfaUJ2saSxP0xM38Uy1nZQ6lqUsyDxzSabtPcicNxtGH8dyBw8rN79qiNU8A623WdNJjHvITrl4w5UdtCnMaGcsx5J3H/mE6dL1+9JRej7y8LD8UPub35M/5oF09wpT5leaG9PlsF2mOCVAe51u5v3UwMUERdPv6PG79Ah5H+XyhCqWe7skPXD2Ctmds6eM2r9Mxv7P4Ud9gphqU9cF+prQMwxAWR8f+HzHjq/XsP7eO4aF6unx3S2mRy867t1BaH3BgYgKRIeE0ShzAmM8Wk7zvHOuHhmHq+J1dylWh1NN5rduFDwvnptXE1PGHEoVS6ZF4fG4Ds4YkEmdUfliG0qTnZ+z2DdUnLnnTRUCE0sWi8p55CaU/bZdDKHVd2OBs9JRBhQx+GhpB7MQT5Gf9wsiotiy98g/L2hpoOe8C+XfW0M3UjmVp9lGJsr/fxULpEY+V26s7Y9IP5WfPhpOUWY0JLWXIuySG2RdW0reGhqhe63weogqlRxqUadSb6e82P9s5R11tw0JoMuN3e1iWyyxsrOP9pdewWu+yroOeRnP+UiXUvzDsQulxfVFDLqWt8bN99ZlZeTMgBCoolIogdMJsHsh2jy4se5osF76gRUgo/Tc9dF1MA5Lc8gUiQlk+Xq6ji3sok/Z4SpTlT2bV09N26XXfQkkmPw303UN5aW6D4h7KdHYMNGLukWwfZnVEWnCcKbXceihPTSAquCsb3RvuvAOM1AYXL8qxcHpCeXsoHZHZHwvTr3F6w3jaGEJo+sUlz1/czkMLeHRuIzN7N6dZh3F8978b/vW8+xJKctk7PBRTp9X2HkFnHO5P8jk9JRZDjSFsv+c2rzNzB0P0DqH0I+9eQpl/aioNQmoybOs9t3xmsnOQIQBC6Zb+wnSundrIhAQj+sbznXPI3I6Qp2UQEKEsA1BAPvYSSn/arpKEEhuPN/YhsuVC/joxjcax0zhTUEjK7CaEdl3LpR+TiGrumE/pz/fbl1DaSN+WRKi+JxvU+SkOCAWcmFi7XD2UuTeP8N34LjRr2pvpyed4VMIojS+hJPcXRpr1dF1929Xb6kiKx2MR/yxqiqnNStJurKWTrjELHBNK/QqjJKF0i+Sltsaf9tXtfHkacAIVE8qiqyx9T09Yn024L8J1ps7yF/PjtZg7fsdN53Co89MqeyJCWVHUdqHU15rIKbeeu6K0JbTVNWCuOm7h6wtv5eYqZQ7lKK85lNdY1kpD+Mjf1DmUN1d2xBw5nJ+fO7o2wZL6Fe9pXXMoi/6cTZymJd9edVWgon8WkxDkEEobz7b3x2xIYo/bPE/PHOfy89Ay9qG0PWFrLz2hI/Z79ph6BqQK9OM/NjGrXwuadfRDLH0KpZU733cjNLQ/W9wvCkVpLGtnIGrwTrA9YXNvgyqdxWt01JTknZpKw2AdnVbcsM+zLCvvuT8x3LkPpY2nG3tj1nUunudVnLm8U0yLDcHYfqX9e+pXD6UfTLHx9MfemAwjOODRm/ISVHnDBwERSh9QAv6Wt1D603b5Ej17wqy3VtHF9D6jRjSj5vBf1N0u8v73CXXMHejbKYLG08/aR3v8+n77jqfoxko666MYuee5q6PGksriVjq/5lBmp/3GsjEdaNq0NzM3/F6iSDpQ+xRK6x1+6Gokst9mjw6BorSldNBHMGynawcO63/f0Frfgc+mtscUv5ArjmnjfoXh6/riSJn7o3tb40f76n6qPA84gQoJpeXSl+r2QL3W3S/hV4qFC3ObYghJ4KvLFihKZVFjDcaBuwOegdICFKEsjU5pn9mFUll13WzMDv55kUPmzYPMbRtBrQE7ioc+S/jCZxxjUqyyyjtZXeVtyb5lX+VtSGTFv/aBcFv6EaY0NBA3cCVn7mXwPG0fs9pFoHNb5U32EcZFaWg0Zi+3cgrIuXOcr7pEow9y2zYoN4UvmumJHbqJy88LKCrI4OaRuSTq6zDphDIxyH7RMLVeyKVnT3j69CRT65pInH2U25mFWK15PDz9JZ3MUQzd88TVSJeGBgtPUrYwe0ACzUsTS59CqazwPMa0eAO1uy7gt6vPyM64ybEFXahpbM2XKYp9Wbj0ZUtMpkS+OH6f3IIs7p7fxPjmRrRBOt7/6oo9dWXlveAon9bQ03bh3zx78hT1O6sz02Huce7nFpB15zxbxrQgVNlWyLErg19C6cU0J4fTk+oR9v5sjt3OpNBqJe/hGRa1D6XmoD2lTEcoFfI7/aEIZVUUv7dQAn60XT4lS0lu0RW+bqVDF2Sgx9p76nXRlr6LYaEatJpafHrE8cvcv++3z3hs6Ryd2Ahz3SRWnb5HxvM09s9MJEpT+irvrP/28e2odjSJ78vnm87z2G3gozTSPtOAjfRjU2muj6HH/ANcfZZN5s2jLOwSRVirBahNmCNQ63VWtAlBWVORsPhfN1fwJwxf15fcMtuasttXR+LksTIIVEgoKyMhlRGmCGVFqdqF0tRqAl9P7Ul8uIGwmJYkzf6JNGePk68vvD0+y8MTLPswkThTMDpDLVr3/5ydqVkeicm/uZ8vB7WinlkJuxUfLPqaj+q75lAqq53TU1bzcds6hAbrqdGkN7N27WNhK8NL+1CuGt2eOGXPy+BQ4toO46v9N50rsLNTltEv1oxB14DPzxSSc3Uns/q3Ji7cgF5rpm6LPny25TKZrs5Sj3SW/KKIp39uY97gISz508eYUQlCqYRnuX+MZaM60qR4L8wG7Uay9PhD18rznFS2jO9Iw3A9Bn0kDd8fzJwt+/mmq5GoQTucSVL2oSw579n8ubQ3DU1aTHEzgByubP6EzrERmEIM1Ihty9BZWziwuCuhYYPtK+X9EkrwZkrOVXbNGMD7dSMwB+sIj2lJv6lbuFx+qM68vctPRCirovR9CKXy3Syj7fItWUp6C9W5jPqQFiz8u9jYlK1yuhrQRXzIPvfmz4/vd4nx5N/kwPxBvFcrFLOxFm2GfMU3H8aWPIfSksqKoUnM2vwHT/wUSQf9EtOAhftHl/Bxh4bU1Oswh8fSYcS3nHjo6IJ0hKCsnE9EF9SqeHGO433lsawwSri++NHWlNm+uidDngeUgAhlQHG+LYEVz6Hs+AP3XCPOb0vmJB9C4I0mIEL5RhePJE4ICIESCIhQlgDm3X5bhPLdLn/J/eskIEL5OulL3EJACFSUgAhlRcm91eeJUL7VxSuZe6MJiFC+0cUjiRMCQqAEAiKUJYCRt4WAEBACr4OACOXroC5xCgEh8KoERChflaCcLwSEgBAIIAERygDClKCEgBCoMgIilFWGWiISAkJACJRNQISybEZyhBAQAm8eARHKN69MJEVCQAi8wwREKN/hwpesC4FqTECEshoXniRdCAiBt4+ACOXbV6aSIyHwLhAQoXwXSlnyKASEQLUhIEJZbYpKEioEhIAbgbdaKBcvWsRnU6dy7uxZ+RMGUgekDlSLOvC///2PRnENqkVapW2Va4vUAakDjjowbMhQdu/a5aaYJT/9v5I/ejM/SV63jvdbt6Frp87yJwykDkgdqBZ1oHOHjvTo2q1apFXaVrm2SB2QOuCoA21aJnDs6FG/hLDaCaXcy9uvcpWDhIAQeIMIyJD3G1QYkhQhIAT8JvBWD3mLUPpdD+RAISAE3hACIpRvSEFIMoSAECgXARHKcuGSg4WAEBAClUtAhLJy+UroQkAIVA4BEcrK4SqhCgEhIAQqRECEskLY5CQhIAReMwERytdcABK9EBACQsCdgAilOw15LgSEQHUhIEJZXUpK0ikEhMA7QUCE8p0oZsmkEHjrCIhQvnVFKhkSAkKgOhMQoazOpSdpFwLvLgERyne37CXnQkAIvIEERCjfwEKRJAkBIVAmARHKMhHJAUJACAiBqiMgQll1rCUmISAEAkdAhDJwLCUkISAEhMArExChfGWEEoAQEAKvgcArCWXRlcW8r9WgDXL96UJMxMQlMnz+Pm7mv4YcuUUpG5u7wXjTn+b/yiiTgV7rHgQwpTYyLm9jzjeHyLAFMNjqEJQtg8tbZ7HkUAaBzfo7zLSKyl2EsmpAF93bx4xO9YnQagmNn8MfhVUTb2BjyWffCDPm7ut4YA1syBKaECgvgQAIpYGhu7KL47VhyX3GtUPz6Byup9mMs+SUN0UBPF6EMoAwKzuoShHKbHYPMmDuu4VngbWqyqbx6uFn72Ko3sCALc8CLJTvMNNXLxW/QhCh9AvTKx5k4a+58RhjRrLnQT4F+QVUTx8ToXzFiiCnB5BAgIXSkbJcDn4cjSF2Oude468+EUpHeVSDRxHKwBaSCGVgeVZhaCKUVQG7gGOfxGBut5zrRVURX2XFIUJZWWQl3PITqCShzOPwmJqEdV7Nzdf4s0+EsvwVwn6GhfOf1SZ02Fp+W5hEQrSR0MiGdJ+QzIV0R4FaODM5mvCkL/g2qRFR+gjiJx4iE7A8PMmK0R1oZA5Bq69BQp+Z7L7q3ldtIyt1OzP7NKO2yUhU/faMXT6bfgbXkLfl5AQigruz+ZFb16LlKGP1IfTb+syZsaInZ1k7oTvNIg3otBE0aj+aZScfYbE948e+Btd0DG17vrtRhC3jAsnjuhIfacCojyCu9UBmbruCo4/dGbD6xMKVpUn0+nQ1J26Xc/6G5QzToswMnvcNgxuGYw5vzORDGWqo1sdnWT2mM/FRRsymWiT0mc7OfzxTkHN1D/OGtKNxpAmj1kTt+O5M3nyZLDccJeW98NkWBuhd01CMiSvt2cq5yk9zhtI+LoowrY6wGvH0nLiZy45ALeeYEWNk1PrDLBnxHrFmPebIePrP/pVbBUAJTLFlcHH9eHo0isKsNRBdrw2Dpm/HK0ueaOVViQREKEtEE5gPLJdZ1ELrahuCDPRJfqz25JfVdllOTyHGlMT8r5OIDzMQ3XA4Y1vpqT32MHnFqbM92Ux/QzC1xhxyvfd4I/2MMYw/lKseVdb3+6V4Gk3kcAbYslLZMb0PLWuaCQ2LpdPHK5jb21ixIe+CB5xdP5V+fRf55FpSGsDKkzPfMb5TY2IMBsJjmtN/+g7+LW7C8k9Ppm5wAkv+c1wrlOCt3F/XGWP0BE6qoEoPA0q4vvjR1vjTvvrMsLz5ygQCLpTW/Bdc+20uvVsPZf1l+5fnlVNZwQBEKCsIDrtQaoP11O+zgt8fZpF5+wjzEyOI6PQ9NyxKuPYvvDYomsHJaWRm3Sb1WgZkHGdKXDD1B6/n4pN8CrNucnh2O8LM3VhvPxHroz2MrGWgyYhk/nyUwZPLO5nc0ow2SO+cQ+mXUOaeZ268jjoD1pDyOB9L/jNSt4wgTteG5WlKY+Y9PJvOgRE1qNVvLanpBVgt2dw9PI0EfSPmX1Az9TKwggecS55Gv6bxdBu/kqM3/azTqlBq0EYlsTEtk6zbqVxXfDL7PPNbmYluO529/zwl+8W//DyxFeExSWy7Y2+AbekH+aSuidZT9nMjo4DC7Puc/24AdXXNWXCxOJ1l5d27h9KWzqGx9QhrOZUD1zMoKMzm/u/fkRSjJ+GLi9iLVBFKDTpjKybtTuVZXj5PU5bQI0xP4sobxUOC3kwhff9IakX3Z93ldAqsFrLvHOazZgbi516wh/syVXmnFAIilKXACdhHSg9lTcyJbj2UfrRdqmQFaYgZuIG0zCxuX77K6blNMcfPw9GE5B0aS22NBkOzBVwq/rpm7R1JjfDh/KJIoR/f75fjuUam9RE/Da+NucEINqQ8IuNxKrsmJhAepMFUnjmU+fc488MUesXH02NCyT+WfaZBbcK+4H1TBO2n/8K/T7N58e9PTEkwUydpK3eVJqzgLNNrh9D62zTXNALrPdZ31FF30mmUn+bZ58sIo4TrS5ltjR/ta8CqkAT0EoEACKWrJ8R9cY65dhdm7b/7Wi8oIpQvlbefb9iFUhc+lL0vXKcU3VhBoq42004rTUKxUEZN4rTSe6X+s3JrdTt04aM5qHRVOv4VXWd5aw3RHx8GivhvSVvMNT7igL3DTj0q/4/ZNA8pn1A+3zEAs34AO0ucIOklP0V/M7+BgbZLr1HuUS7LY/7YOIP+zZrQacwyDl1z73F1ZNTtsVgoYyaewokHKw839SVC354V19xSkH+WzxvqaTLjnNINyLOtSYSHDWH3C7fuyLy9fGg20Gv9QzWSMvPuJZS2Z9sYbApn2K4XbnMq8/h1RCjm7ut5qESl9lDay8mlzXn8NsKIqc+24nmoXkwp4tK8hphbL8U9S24k5Gk5CYhQlhNYhQ73Fkp/2i6wS1Y0U065vtUFp6cSp+/CGvUHoYWL85pTs1lLGhh7sUEdYSng1OR6RPTbwlObf99vX/EU/beERH1Nxuz3aDiZG6/1Tyjz73F67SR6xjej56S1nL5b+qiLrzRgfciWPqGeIg7kn51BvK4hs84pXApJmVkffcIS1N/1Sv/kvR/ooq3D9LMF+BeGr+tLWW2NP+1rhSqLnOQngQAIpfuiHLAVZHI/ZSuftjCiM3fnh9c45i1C6WcteOkwu1Ca+2zjqZvTUPQXc+vrafPNf06hNLZbzS3nyEYmPyeFoOu3k3SPMIu4/EVDtPXngO0F2wcYMPfayGP3sPP/xyfR5RnytnD60wh07Va5xe8RqY8eyhzOTG2AXh9Lr0nL2XM6jeeu64L3yb5fWx6TsmUWA5s3ocPob/ktzXOo2nmSKpQ6Oqy+5fqVTh4HRkVgdOu5sB+fx4EPIzC1Xeo8nYInXDmyi+RlC5g5dgjdm9bAHKSny6rbKvsy8+4llPaAC3iaepTd65ezcPo4hnVpRi29BlPHVdxWylAVSp1bb6Ryc/ueFQAAIABJREFUloWzU2tg6rSe+2o5ewsl5JyeRuNgAw26T2bF7jOklRuqK9vyDEQoq6IWeAulH22X8m1Qhry1iaxxNXqQc5BxNcL5YHcGWO/yQ9dw+q1cxWBTNGN/ywPLJRa1MNPj+7uutqDU77eveGy82DoQs743mzwbTo6MrVH6kHf+HU6tmUjPps3pM3UdZx/41+j5zGvefj4O15Ew/2/PzqK8/XwUrqf90jS18CwX5tJY25plqlFaube2I6Z6M0lR1lT4FYZdKD2vL2W1NeVoX6uiir2DcQRcKB0Mc49+SqxGT48f7jveqvJHEcqKIrcLZdiow269a8rPzDSWJuiJm/mnKhrKHEpTl2QeOMTQdp/kThqMow/juRbLys3v2qI1TwDrbdZ00mMe8hOuXjDlR20KcxoZyzHkncf+YTp0vX70lF6PLL8sPxQ+5vfkz/mgXT3ClO2uzA3p89ku0hwToDzOL+VF9gW+61UTbXhv1t9w6210nKIKpZ7uyQ9cPYK2Z2zp4zav0227LaV3X99gpnq29cF+prQMwxAWR8f+HzHjq/XsP7eO4aF6unx3S2mRy867t1BaH3BgYgKRIeE0ShzAmM8Wk7zvHOuHhmHq+J1dylWh1NN5rduFDwvnptXE1PGHEoVS6ZF4fG4Ds4YkEmdURixCadLzM3aXG6oD3rv9KEJZFeXvJZT+tF0OodR1YYOz0VMGFTL4aWgEsRNPkJ/1CyOj2rL0yj8sa2ug5bwL5N9ZQzdTO5al2duJsr/fxULpEY+V26s7Y9IP5WfPhpOUWY0JLWnI23qPbYOi0YZ34dvzbj2bfiBWhdIjDco06s30d5uf7T4qqQ0KocmM3+0hWy6zsLGO95dew2q9y7oOehrN+UuVUP/CsAulx/VFDbmUtsbP9tWPrMshFSRQaUJpvbOarjodHZZeq2DSXv00EcqKMizuoUzag0cTZPmTWfX0tF163bdQkslPA333UF6a26C4hzKdHQONmHsk24dZHUksOM6UWm49lKcmEBXclY3uDXfeAUZqg4sX5Vg4PaG8PZSOyOyPhenXOL1hPG0MITT94pLnL27PQ12vcm9ydMUndGvSjL7TNvD7oxJ+7fsSSnLZOzwUU6fV9h5BV6huz/I5PSUWQ40hbL/nNq8zcwdD9A6h9CPvXkKZf2oqDUJqMmzrPbd8ZrJzkCEAQumW/MJ0rp3ayIQEI/rG851zyNyOkKdlEBChLANQQD72Ekp/2q6ShBIbjzf2IbLlQv46MY3GsdM4U1BIyuwmhHZdy6Ufk4hq7phP6c/325dQ2kjflkSovicb1PkpDggFnJhYu/QeyoJH/L5hOv2axdN57EqO3Chjuk5x0L6EktxfGGnW03X1bVdvqyMpHo9F/LOoKaY2K0m7sZZOusYscEwo9SuMkoTSLZKX2hp/2le38+VpwAlUmlDmnZhMXEgtJvzP4+dUwDNQWoAilKXRKe0zu1Dqa03klFvPXVHaEtrqGjBXHbfw9YW3cnOVModylNccymssa6UhfORv6hzKmys7Yo4czs/PHV2bYEn9ive0rjmURX/OJk7Tkm+vOsfTKfpnMQlBDqG08Wx7f8yGJPa4zfP0zFUuPw8tYx9K2xO29tITOmK/Z4+pZ0CQfY2DS8fQqXEz+k3fyPmSRNJxnk+htHLn+26EhvZni/tFoSiNZe0MRA3eCbYnbO5tUKWzeI2OGmLeqak0DNbRacUN+zzLsvKe+xPDnftQ2ni6sTdmXefieV7Ficw7xbTYEIztV9p3Y/Crh9IPpth4+mNvTIYRHHh9X39HSVS7RxHKqigyb6H0p+3yJXr2tFpvraKL6X1GjWhGzeG/qLtd5P3vE+qYO9C3UwSNp5+1j/b49f32HU/RjZV01kcxcs9z16iHJZXFrXT+zaFUputsmsnA5vF08UMsfQql9Q4/dDUS2W+zR4dAUdpSOugjGLbTtQOH9b9vaK3vwGdT22OKX8gVx0COX2H4ur74qhfubY0f7auvIOS9gBEIvFDaCnj+7y981iaUyMSlXPEc+wxYwv0JSITSH0q+jrELpbLqutmYHfzzIofMmweZ2zaCWgN2FA99lvCFzzjGpFhllXeyusrbkn3LvsrbkMiKf+2VwZZ+hCkNDcQNXMmZexk8T9vHrHYR6NxWeZN9hHFRGhqN2cutnAJy7hznqy7R6IPctg3KTeGLZnpih27i8vMCigoyuHlkLon6Okw6ocxttF80TK0XcunZE54+PcnUuiYSZx/ldmYhVmseD09/SSdzFEP3PHE10u5Isv5j/9ejad+gKf2nb+KPx269hu7HeT/3KZTKCs9jTIs3ULvrAn67+ozsjJscW9CFmsbWfJmi2JeFS1+2xGRK5Ivj98ktyOLu+U2Mb25EG6Tj/a+u2GMqK+8FR/m0hp62C//m2ZOnWC59SSudmQ5zj3M/t4CsO+fZMqYFoUEajK0W84/S2PsllF5Mc3I4PakeYe/P5tjtTAqtVvIenmFR+1BqDtpTynQEb2Dy2kFAhNJBojIfvYUS8KPt8ilZSjKLrvB1Kx26IAM91t5Te+9s6bsYFqpBq6nFp0ccv8z9+377jMeWztGJjTDXTWLV6XtkPE9j/8xEojTlXOVdPA98UMvSxdJnGrCRfmwqzfUx9Jh/gKvPssm8eZSFXaIIa7UAtQlzFJv1OivahKANCiZh8b9uPZr+hOHr+pJbZltTdvvqSJw8VgaBAAil1ypvjZ6oOgn0m7iW3584fpJA0eUvaRqkY7AycbmK/olQVhS0XShNrSbw9dSexIcbCItpSdLsn0hz9jj5+sLb47M8PMGyDxOJMwWjM9Sidf/P2Zma5ZGY/Jv7+XJQK+qZlbBb8cGir/movmsOpbLaOT1lNR+3rUNosJ4aTXoza9c+FrYyvLQP5arR7YlT9rwMDiWu7TC+2n9T3ZpCiTA7ZRn9Ys0YdA34/EwhOVd3Mqt/a+LCDei1Zuq26MNnWy6T6eosdUunhdRlwxg8YzMp/oqk4+wShFL52HL/GMtGdaRJ8V6YDdqNZOnxh66V5zmpbBnfkYbhegz6SBq+P5g5W/bzTVcjUYN2OGJA2Yey5Lxn8+fS3jQ0aTHFzQByuLL5EzrHRmAKMVAjti1DZ23hwOKuhIYNtq+U90soX2ZKzlV2zRjA+3UjMAfrCI9pSb+pW7jsG6oz/fLENwERSt9cAvuuD6FUvptltF2+JUtJWaE6l1Ef0oKFfxf/6FS2yulqQBfxIfvcmz8/vt8lxpN/kwPzB/FerVDMxlq0GfIV33wYW/IcytKgFT3lr61zGDb4G59HlZgGLNw/uoSPOzSkpl6HOTyWDiO+5cRD1/XeHqCycj4RXVCr4sU57tGUFUYJ1xc/2poy21f3ZMjzgBJ4JaEMaEoqITARyopCLZ5D2fEH7rlGnCsamJwnBIRAOQiIUJYDlhwqBITAG0NAhPKNKYo3KSEilG9SaUha3i0CIpTvVnlLboXA20JAhPJtKcmA5kOEMqA4JTAhUA4CIpTlgCWHCgEh8MYQEKF8Y4pCEiIEhIAQkI3NpQ4IASFQPQmIUFbPcpNUCwEh8JYSkB7Kt7RgJVtC4C0nIEL5lhewZE8ICIHqRUCEsnqVl6RWCAgBOwERSqkJQkAICIE3iIAI5RtUGJIUISAE/CYgQuk3KjlQCAgBIVD5BEQoK5+xxCAEhEDgCYhQBp6phCgEhIAQqDABEcoKo5MThYAQeI0ERChfI3yJWggIASHgTUCE0puIvBYCQqA6EHirhTJ53Xoa1KtPkwYN5U8YSB2QOlAt6kDjBg3o1rlLtUirtK1ybZE6IHXAUQfi6tbj+PHjfrnv//l11Bt00Px5XzBz+nRu3rwpf8JA6oDUgWpRBy5evEiNiMhqkVZpW+XaInVA6oCjDgxJGsT2rdv8ssBqJ5RyL2+/ylUOEgJC4A0iIEPeb1BhSFKEgBDwm8BbPeQtQul3PZADhYAQeEMIiFC+IQUhyRACQqBcBEQoy4VLDhYCQkAIVC4BEcrK5SuhCwEhUDkERCgrh6uEKgSEgBCoEAERygphk5OEgBB4zQREKF9zAUj0QkAICAF3AiKU7jTkuRAQAtWFgAhldSkpSacQEALvBAERyneimCWTQuCtIyBC+dYVqWRICAiB6kxAhLI6l56kXQi8uwREKN/dspecCwEh8AYSEKF8AwtFkiQEhECZBEQoy0QkBwgBISAEqo6ACGXVsZaYhIAQCByBgAhl/r1TJM8YTIcGNQnT6giPaUG/iWs49aAgcCmtQEiyD2UFoL2uU/J/ZZTJQK91DwKYAhsZl7cx55tDZNgCGGx1CMqWweWts1hyKIPAZv0dZlpF5S5CWTWgi+7tY0an+kRotYTGz+GPwqqJN7Cx5LNvhBlz93U8sAY2ZAlNCJSXwCsKpY3007Npa4qiy+d7uPggG4u1kMxbp1kzqD76qL5suvb6pFKEsrzV4TUeXylCmc3uQQbMfbfwLLBW9RpB+Rl19i6G6g0M2PIswEL5DjP1E/2rHiZC+aoE/Tnfwl9z4zHGjGTPg3wK8guonj4mQulPacsxVUPglYTS9nwfo6J1JMz9k1zv9OZfZEF8MKE9NnH/NX1TRSi9C+UNfi1CGdjCEaEMLM8qDE2EsipgF3DskxjM7ZZzvagq4qusOEQoK4ushFt+Aq8glFZurU5Ep+/PTp/dPzaentnGtoP/kC5CWf6Sea1nWDj/WW1Ch63lt4VJJEQbCY1sSPcJyVxwFqaFM5OjCU/6gm+TGhGljyB+4iEyAcvDk6wY3YFG5hC0+hok9JnJ7qs5bjmykZW6nZl9mlHbZCSqfnvGLp9NP4NryNtycgIRwd3Z/Mita9FylLH6EPptfeYMq+jJWdZO6E6zSAM6bQSN2o9m2clHWGzP+LGvAW2Qxv6nbc93N4qwZVwgeVxX4iMNGPURxLUeyMxtV8h2huj+xMKVpUn0+nQ1J27nu39Q9nPLGaZFmRk87xsGNwzHHN6YyYcy1POsj8+yekxn4qOMmE21SOgznZ3/eKYg5+oe5g1pR+NIE0atidrx3Zm8+TJZbjhKynvhsy0M0BfnO0iDMXGlPb05V/lpzlDax0WpU1PCasTTc+JmLjsCtZxjRoyRUesPs2TEe8Sa9Zgj4+k/+1duKQMNJTDFlsHF9ePp0SgKs9ZAdL02DJq+Ha8slc1MjlAJiFBWckWwXGZRi/9v70z8Y7reP/77U7LNnSWLJBJbIiKiSfiKIGIpGsRWVFuqal+KWKrVFrW1llAptZZvQ/naKqhGtYQSFTuxZZVlMvP+vWYmk1lMzIREJR6vV15z58695zznfc597uc+57mHn803eKkZlFFgjuS781367GmEadNY9GUaMQFqQqJGMyFBodWEQ5TXmG18sIXBah/Cxx+07SvYTKomjIkHLaEXd9f3M/V0mMyhIjCW5LJ91iDiWurwD4gg+cOVpA/U1D3lrc9lRVp/pqw9Rr1dmHNba2wAAw9OrmZicjRhajWBYZ0ZPGs7f9e4sIrsqbTxiWfZFfsbv4E7G3qjCZnEr2ZQzy8D6ri/eOBrPPGvjTzC3tjiX0JQPmFHqgpV4hry7cfNa4RSIpQv2hkWQenno9Bu0Ep+u1dC8Y3DLEoKIij5O67pTeVaLng/rxCGZ+RRXHKD3KtFUHSMaZE+tBu+kT8fVFBVks+hed0J0PVlo+VEDPd3MzZcTccxGZy9X8SDCzuYGqfDz0upzaH0SFA+PUN6jIrWQ74lp6ACfcUjcjPHEKnqyjd5pkHpPD1byP4xoYSnriO3sBKDvpRbh2YQr3Rg0Tlzo54FVnmX0xkzSO0UQ9+JqziS/0ws/tlzzHhMgtIbv+A0NucVU3Ijl39MerL0DIsSdIQkzmLfpYeUPvmbnyYnEBiWxrablgvJWPgLH7fR0mVaFteKKqkqvcOZ1UNoo+rM4j9r7HTXducIpbGQgxPaEhA3nf3/FFFZVcqd31aTFqYQv/BPLF1qEpTeqDQJTNmVy6PyCh7mLKN/gELSqms1U4LOTKEwayzhIYPZcKGQSoOe0puHmBmrJib9nKVc14Rkbx0ERFDWAaZBd5silC3RJdlFKD3wXWah5+VN2NBN5BWXcOPCZbLTO6GLWYDVhZQfnEArb2/UsYs5X3O5luwbS2jgaPaaRKEH1/ez9Vyl2HCfPaNboWs/hk059ykqyGXn5HgCvbzRPieHsvLuKTbNGEhcxxQ+WXkYj12YSVA6tPWqOWBQemYh3bRB9Ji1l78flvLk7z1Mi9fROm0rt0wurPIUs1r50uXrPFsageE2G3upaDMlG9Ojudsy6ri/uPU1HvjXBh1GUpgDgRcXlIYrLI/zRjN8LyUORb4+X0RQvmhfWASlKnAk+57Yyqi+tpIkVStmZJtcQo2gDJ5Cdm2arClq3R1V4Pv8YgpVWv9V/8M3XbwJ+fAQUM2VZYnoQj9gvyVgZz6q4vd5dPatn6B8vH0IOmVIHRFyU7FO4qf6Lxa1V5O4/Cr1nuXSF/D75tkMju1I8vgVHLxqH3G1NtTu0xyh9CZs8glq8WDg3vfvEKT0YOVVOwsqTvFplELH2adNYUAebU0jMGAEu57YhSPL9/GeTs2AjffMlbhtu5OgND7axnBtIKN2PrHLqSznv2P80fXbyD1TVeYIpaWfbLK5nANjNGgHbavJQ3ViSjXnF0Sh67Ic+ybZkZDNehIQQVlPYC90uLOg9MR3gUXohTDthO2qrsyeTqSSwrfmB0I9fy7oTMvYONprBrDJPMNSyYmpbQlKzeSh0bPr21U91VeWkaS0ZHyWg+MkPcbvuYLSikdfcIYts94hPronHy3/hX/cuTCzoHRsK4Z7ZA7ydxTiQMWp2cSooph72sSlipw57VDil2F+rgcMt9eT4teaWacq8awMV/cXd77GE/9qpSGfjUHgJQTlVVYkeKMZ9pMIysbomX+1TIug1A3axkM7TUP1H6S3U+j61ZVaQanpvpbrtRHqYn5K80WVuoNCB/urubAwCr9288H4hB+HqNEN2EyBfdkV/+PjkPpMeevJ/iQIVfc1dvU7VPqsoKSMk9PboygRDJjyDbuz83hsuy84n+z6u76AnMy5DO3ckZ7vf82BPMep6tqTzIJSRc+1121P6ZSzf1wQGrvIheX4cva/F4Q2cXnt6VQ+4OLhnWSsWMycCSPo1ykUnZdCypobZvZu2+4kKC0FV/Iw9wi7Nn7DklkfMSollnDFG22vNdww9aFZUKrsopGms/Scmh6KNnljTS60s6CEsuwZRPuoad9vKit3nSSv3lBtzZYtEEH5KkaBs6D0wHeZrgaTyPJL4lub04OyX/goNJB3dxWB4Rbr+wSSumoNw7UhTDhQDvrzfP6Wjv7f3bL5gude367qMfJk61B0ykC+d3ScHJ4QWveUtwuU+oIcfvh0MPHRSYz/ej91ujBXbS3P4sNAFfGL/nKcfSjP4oNAhR7L88w16s+lE+3XhRVmRWng9rpeaNvOIcf0Jr1HZVgEpeP9xZ2vqYd/dcFFdr08gRcXlJSwb7gaVbdVdU95V1VQWSs2Xt7Y+pYgEcr6ErMebxGUAeMO2UXXTI+ZeSyPV4icc9YsNEw5lNqUDO5ahaHxDhnJ3mjeP4TjChwG8lcn4qebBIYbfJusoBuxx/FFrqoc5nfQ1GPKu5ysUSpUA35wFL3WJpg/nxU/VBXwW8anvNu9LQGm/EpdFINm7iTPmgDlcP5zvpSeY/WAlvgFDmTjNbtoo/UUs6BU6Jdx1xYRND4ic5BdXqc1v7PmU2k/x3y24W4W0+ICUAdE0mvwB8z+YiNZpzcw2l8hZfV1k0d233ZnQWm4y/7J8bTwDaRD0hDGz1xKxs+n2TgyAG2v1RZRbhaUCr3X2d340HN6Rku0vdbXKShNEYmC05uYOyKJSI0pd9Ofjm/PZFe9oVrhvdmfIihfRf87CUpPfJdVUKpS2FTr9EyTCkXsGRlExOTjVJTsZWxwIssvXmJFopq4BeeouPktfbXdWZFn8RPur+8aQelQj4Eba3ujVUbyk236wBINnBuN/3OmvOuiWXpuFe+EehM8YIPLQ8zi2cEGUxr1Fgbb5WfX5qibfZgvHWf/ZilLf4El0Sq6Lb+KwXCLDT0VOsz/wyxCPSvDIigd7i/mkp/jazz0ry4bKzsbhMBLCEojdzP6olHeYbtDGMtql5F7m/rhHzqK3Q5PVNbfG/9TBOWLMq6JUKbtxm5yBfRnmdtWIXH5P64FJcXsGeo6Qnk+vX1NhLKQ7UM16PpnWKZZrSZWHmNauF2E8sQkgn36sNnecZfvZ6yfT81LOXqyJ9U3QmmtzPJZVXiV7E0T6ar2pdPC845P3I6H2r49zefIyo/p2zGWd2Zs4rf7dYQ4XQlKnrJvtD/a5LWWiKCtVLutCrKnRaAOHcGPt+3yOou3M0KxCkoP2u4kKCtOTKe9b0tGbb1t185idgxTN4CgtDO/qpCrJzYzKV6DEr2oNofM7gjZdENABKUbQA3ys5Og9MR31SUoMVKweRAt4pbwx/EZREfM4GRlFTnzOuLfZx3nf0gjuLM1n9KT69uVoDRSuC0Nf+VtNpnzU6wQKjk+uVW9IpRP8w+zemIKsZ0GMivjNHW6MFOE0klQ8nQvY3UKfdbesEVbraY4fFZz6fNOaLuuIu/aOpJV0Sy2JpR6VEZdgtKukmd8jSf+1e582WxwAi8hKIHC/XwQ7Ev8gj9q32artbD8LItivNH13STLBtVCaSobFkGphE/mhF3krjpvGYmq9qSb5y1cXfAG8teYcijHOeVQWtIjAsceMOdQ5q/qha7FaH56bA1tgj73C/7jZ8uhrD47j0jvOL6+bAtxV19aSryXVVAaefTjYHTqNHbb5Xk6En7KTyPdrENpfMDWAQr+Y7IcI6aOBUHpVX5ZPp7k6FhSZ23mTF1e2HqeS0Fp4OZ3ffH3H0ym/U2hOo8V3dUED98BxgdsGag2i86ad3TMJZafmE6Uj4rkldcseZbu2v50D6Nr16E08nDzQHSq3jV5XjVGlp9gRoQvmh41swweRSg9YIqRhz8MRKsew36HaIoVjnw+j4AIyufRaajfnAWlJ77LldCz2GO4voYUbTfGjYml5ei95pdXyv/3Ma11PXknOYjoWacssz0eXd+u66m+toreSjBjdz+2zXroc1maoPIoh7I07wArxvekU6eBzNn0W51C0krYVYQSw03W99HQInWLQ0CgOm85PZUgRu2wrcBhuPIVXZSezJzeA23MEi5aJ3I8KsPV/cVqmf2nva/xwL/anyrbDU7g5QSl6cZxaBIxSgh9Zm8n53YxlfoKHl/+haVvt0QVOpQfat7sbXDLPShQIpQeQHJ5iEVQmt66jh2/nUtPyijO/4X0xCDCh2yveUCo44IvOsqUCNNb3hnmt7z1pdctb3mrk1j5t2Ui3Fh4mGlRaiKHruLk7SIe5/3M3O5BqOze8qb0MB8Fe9Nh/D6ul1VSdvMYX6SEoHjZLRv0NIeFsQoRI7/nwuNKqiuLyD+cTpLSminHTbmNlpuGtssSzj96wMOHvzK9jZakeUe4UVyFwVDOvezPSNYFM3L3A5uTtmdScoWsL9+nR/tODJ71Pb8X2EUN7Y9z3nYpKE1veB5lRoyaVn0Wc+DyI0qL8jm6OIWWmi58lmNSX3rOfxaHVpvEwmN3eFpZwq0z3zOxswY/LxXdvrhoqcld2yuP8EmoQuKSv3j04CH685+RoNLRM/0Yd55WUnLzDJnj38LftKxQwlIumZy9R4LSiWlZGdlT2hLQbR5HbxRTZTBQfu8kn/fwp+Ww3c9JR3AGJt+tBERQWkk05qezoAQ88F0uRZbJzOqLfJmgQuWlpv+62+bonbFwJ6P8vfHzDueTw9Ync8+ub5f1GAs5MrkDujZprMm+TdHjPLLmJBHs/fy3vEuu/MzX47rTMeYdPv3+DB67MFcRSowUHp1OZyWM/ov2c/lRKcX5R1iSEkxAwmLMLszabYZ/WNnVFz8vH+KX/m0X0fSkDFf3l6dufY17/2o1Tj4bg8BLCkqTSQaKc3ewaHQv87p6Ki9fAsPjGDx1PacK7DPpqsn9rCN+fmnsdphHbYxmWcoUQfmibC2CUpswiS+nv01MoJqAsDjS5u0hrzbi5OqCt9Snv3ecFe8lEan1QaUOp8vgT9mR67gWQEV+Fp8NS6CtzlR2Au9+/iUftLPlUJredi7MWcuHia3x91EI7TiQuTt/ZkmC+pl1KNe834NI05qXPv5EJo7ii6x889IUJmtKc1aQGqFDrWrPpyerKLu8g7mDuxAZqEbx09HmrUHMzLxAsS1YagdNT+6KUQyfvYUcT72w9ew6BKXpZ/2do6wY14uONWthtu8+luXH7tnePC/LJXNiL6ICFdRKC6K6DWd+ZhZf9dEQPGy7tQZM61DW3fZSzi4fSJTWD23kbKCMi1s+pndEEFpfNaERiYycm8n+pX3wDxhueVPeI0H5LFPKLrNz9hC6tQlC52P6r1fjSJ2eyQXXUGvtlw3XBERQuubSsHtdCErTtenGd7kUembDqsiZG43i+xZL/qp56DQtldNHjSroPX62d38eXN911lORz/5Fw/hPuD86TThdR3zBV+9F1J1Dqc9l5cg05m75nQcePgtbOddpA3ruHFnGhz2jaKmo0AVG0HPM1xy/Zw1BWkuoWavaK6Hm5RzrftOnuzLquL944Gvc+ld7M2S7QQk0gKBsUHsatDARlC+KsyaHstd6bttmnF+0MDlPCAiBehAQQVkPWHKoEBACrw0BEZSvTVe8ToaIoHydekNsebMIiKB8s/pbWisEmgsBEZTNpScbtB0iKBsUpxQmBOpBQARlPWDJoUJACLw2BERQvjZdIYYIASEgBGRhcxkDQkAINE0CIiibZr+J1UJACDRTAhKhbKYdK80SAs2cgAjKZt7B0jwhIASaFgERlE2rv8RYh34QAAAWUElEQVRaISAELAREUMpIEAJCQAi8RgREUL5GnSGmCAEh4DEBEZQeo5IDhYAQEAKNT0AEZeMzlhqEgBBoeAIiKBueqZQoBISAEHhhAiIoXxidnCgEhMC/SEAE5b8IX6oWAkJACDgTEEHpTES+CwEh0BQINGtBuWbVasaNHctXS7+UP2EgY0DGQJMYA0sWL6Z3r15NwlbxrXJvkTEgY8A6BtKGDOFAVpZH2vf/PDrqNTpo7Zo1jH13NCYHLX/CQMaAjIGmMAYWzJ9PSq9k8Vnit2UMyBhoUmNgaOrg5iso5f/yfo3UvZgiBISARwRkytsjTHKQEBACrxmBZj3lLYLyNRttYo4QEAJuCYigdItIDhACQuA1JCCC8jXsFDFJCAiBN5eACMo3t++l5UKgKRMQQdmUe09sFwJCoNkREEHZ7LpUGiQE3ggCIijfiG6WRgoBIdBUCIigbCo9JXYKASFgT0AEpT0N2RYCQkAI/MsERFD+yx0g1QsBIfBCBERQvhA2OUkICAEh0DgERFA2DlcpVQgIgcYlIIKycflK6UJACAiBehEQQVkvXHKwEBACrwkBEZSvSUeIGUJACAgBEwERlDIOhIAQaIoERFA2xV4Tm4WAEGi2BERQNtuulYYJgWZN4KUEpeHWd/RTeePnZftT+WkIbZvA4MnfcfK+/l+FJwub/6v461d5xX8Zp1UzYMPd+p333KONFF3YxvyvDlJkfO6Bze9HYxEXts5l2cEiGrbpbzDTVzRKRFC+GtDVt39mdnI7gvz88I+Zz+9Vr6behq2lgp/H6ND128BdQ8OWLKUJgfoSaABBqZhFgGUsG6muKOLOX3tIT26JNmIsu29V19emBjteBGWDoWz8ghpFUJaya5ga3TuZPGpYVdX4PF62htKdjFTUDMl81MCC8g1m+rJ94uH5Iig9BPVSh+n5Iz0GTdhYdt+toLKikqapx0RQvtQwkJMblEADC0qbbcaHB/ionR+txuzl8b90MxdBaeuP135LBGXDdpEIyobl+QpLE0H5KmBXcvTjMHTdv+Gffy/m0QANFUHZABCliAYi0GiCEqq5+HkCGu0Qtj38dxSlCMoXHSV6zsxshf+odRxYkkZ8iAb/FlH0m5TBuULrc7yek1NDCExbyNdpHQhWgoiZfJBiQH/vV1a+35MOOl/8lFDiB81h1+UyO2OMlOT+yJxBsbTSaghu14MJ38wjVW2b8tb/Ookgn35suW83dvRHmKD4krr1UW1Z1Q9OsW5SP2JbqFH5BdGhx/us+PU+euMjfnhHbUvH8OvB6mvVGIvOkfFRH2JaqNEoQUR2GcqcbRcprS3R041K7p7cyIyBqSzNqXz2JP1JZgTrGL7gK4ZHBaILjGbqwSLzcYaCU6wd35uYYA06bTjxg2ax45KjBWWXd7NgRHeiW2jR+GlpFdOPqVsuUGKHo662Vz3KZIhiS0PRJK2y2Fd2mT3zR9IjMpgAPxUBoTG8PXkLF6yF6k8zO0zDuI2HWDbmP0ToFHQtYhg8779cNzWxDqYYi/hz40T6dwhG56cmpG1Xhs36EacmPctI9rgkIILSJZaG26m/wOdv+dl8g5eaQRkF5ki+O9+lz55GmDaNRV+mEROgJiRqNBMSFFpNOER5jYXGB1sYrPYhfPxB276CzaRqwph48Kn5KHfX9zP1dJjMoSIwluSyfdYg4lrq8A+IIPnDlaQP1LzYlHflXU5tnE7qO5+7ZFuXDWDgwcnVTEyOJkytJjCsM4NnbefvGhdWkT2VNj7xLLtivVeYijdwZ0NvNCGT+NUM6vllQB33Fw98jSf+1WWDZedLE2hEQQkVhz4izKc10467uOG+tOnuCxBB6Z6R6yMsgtLPR6HdoJX8dq+E4huHWZQURFDyd1wzp8ZaLng/rxCGZ+RRXHKD3KtFUHSMaZE+tBu+kT8fVFBVks+hed0J0PVlo+VEDPd3MzZcTccxGZy9X8SDCzuYGqfDz8uSPmGyySNB+fQM6TEqWg/5lpyCCvQVj8jNHEOkqivf5JmcmfP0bCH7x4QSnrqO3MJKDPpSbh2aQbzSgUXnPM33reBO9npm9OtEbJ9JfHvsBhWuIJoFpTd+wWlszium5EYu/5j0ZOkZFiXoCEmcxb5LDyl98jc/TU4gMCyNbTctDthY+Asft9HSZVoW14oqqSq9w5nVQ2ij6sziP2vsdNd25wilsZCDE9oSEDed/f8UUVlVyp3fVpMWphC/8E8sXWoSlN6oNAlM2ZXLo/IKHuYso3+AQtKqazVTgs5MoTBrLOEhg9lwoZBKg57Sm4eYGasmJv2cpVxXfGRfnQREUNaJpgF/MEUoW6JLsotQeuC7zCLLy5uwoZvIKy7hxoXLZKd3QhezAKsLKT84gVbe3qhjF3O+5nIt2TeW0MDR7DWJQg+u72fruUqx4T57RrdC134Mm3LuU1SQy87J8QR6eaOtTw5lxW1Orp/GgJgY+k9ay/EbLj0YLm0wu7CFdNMG0WPWXv5+WMqTv/cwLV5H67St3DK5sMpTzGrlS5ev82xpBIbbbOylos2UbLO/LD3jpowaQel8f3Hrazzwrw04iKQoJwKNKiircubRyUfNqF2O0RcnGxrtqwjKF0VrEZSqwJHse2Iro/raSpJUrZiRbXJANYIyeArZtc8LBq6v7Y4q8H1+MYUqrf+q/+GbLt6EfHgIU+T6yrJEdKEfsN8SsDMfVfH7PDr71k9QPt4+BJ0yhB11Jkg6iZ/qv1jUXk3i8qvUf5argjsn1jGtbyfi+k5l/YlbroWktc01gjJs8glq8WDg3vfvEKT0YOVVOwsqTvFplELH2adNYUAebU0jMGAEu57YhSPL9/GeTs2AjffMNbhtu5OgND7axnBtIKN2PrHLqSznv2P80fXbyD1TVeYIpaWfLHEUU1XlHBijQTtoW00eqhNTqjm/IApdl+XYN8mKQT7rT0AEZf2Z1f8MZ0Hpie+iRmSFMO2E7aquzJ5OpJLCt+YHQj1/LuhMy9g42msGsMk8w1LJialtCUrN5KHRs+vbIuYc66m+sowkpSXjsxwcJ+kxfp4JyorbZK+bwtsxsbw9ZR3Zt1wLSStLVzZguEfmIH9HIQ5UnJpNjCqKuadNXKrImdMOJX4Z5ud6U3zy9npS/Foz61QlnpXh6v7iztd44l+trZPPxiDQuILy9ByifTSM/ck6GdAYTai7TBGUdbN5/i8WQakbtA2HbIXqP0hvp9D1qyu1glLTfS3Xa2c2ivkpzRdV6g4KHSqo5sLCKPzazQfjE34cokY3YDMFdnqJiv/xcUh9prz1ZH8ShKr7Grv6HSp1EaEs4+T09ihKBAOmfMPu7Dwe2+4LzifXfK/g5q/fMbVvLPFvz2Djybt2ArGOU0y7zYJSRc+1121P6ZSzf1wQGrvIhaWEcva/F4Q2cbmtwMoHXDy8k4wVi5kzYQT9OoWi81JIWXPDzN5t250EpaXgSh7mHmHXxm9YMusjRqXEEq54o+21hhumPjQLSpVdNNLcEE5ND0WbvJE75n52FpRQlj2DaB817ftNZeWuk+S5h2prp2w9Q0AE5TNIGmGHs6D0wHeZLhHTlLdfEt/anB6U/cJHoYG8u6sIDLdY3yeQ1FVrGK4NYcKBctCf5/O3dPT/7pbNFzz3+nZVj5EnW4eiUwbyvaPj5PCE0OdPeVfc5MS3k3m7U2cGTd/AqbtunZ6Zt8u2lmfxYaCK+EV/Oc4+lGfxQaBCj+V5lnPPpRPt14UVZkVp4Pa6XmjbziHH9Ca9R2VYBKXj/cWdr6mHf22EESVFQqMKyqdZ4wj2jWTOqX9nPQYRlC86xC2CMmDcIUfxZMhjebxC5JyzZlFjyqHUpmRw1yoMjXfISPZG8/4hHHvcQP7qRPx0k8Bwg2+TFXQj9mCLgpkeanOY30FTu2yQ+ynvcrJGqVAN+MFR9Do0+VnxQ1UBv2V8yrvd2xJgWu5KF8WgmTvJc/nMY+DO1uGEeQXR98sz2MUFHGpx+cUsKBX6Zdy1RQSNj8gcZJfXabfclmnpLaX9HHNRhrtZTIsLQB0QSa/BHzD7i41knd7AaH+FlNXXzVFDt213FpSGu+yfHE8L30A6JA1h/MylZPx8mo0jA9D2Wm0R5WZBqdB7nd2NDz2nZ7RE22t9nYLSFJEoOL2JuSOSiNSYcjf96fj2THa5huoSl+y0ERBBaWPReFtOgtIT32UVlKoUNtU6PdOkQhF7RgYRMfk4FSV7GRucyPKLl1iRqCZuwTkqbn5LX213VuRZZiXcX981gtKhHgM31vZGq4zkJ0fHSc7caPzrmvI23GbbsBD8AlP4+ky9PJhFPDvYYEqj3sJgu/xs+yUD/bx86Tj7N0uX6S+wJFpFt+VXMRhusaGnQof5f5hFqGdlWASlw/3FXPJzfI2H/rXxxpSU3IiCsopz6Z3QBFnyRv4N1CIoX5R6TYQybbejiNKfZW5bhcTl/7gWlBSzZ6jrCOX59PY1EcpCtg/VoOufYZlmtZpYeYxp4XYRyhOTCPbpw2Z7x12+n7F+PjUv5ejJnlTfCKW1MstnVeFVsjdNpKval04Lzzs+cdceWsn905uZM7AzsT0/YvX/rmH/elHtYc4brgQlT9k32h9t8lpLRND5HPP3CrKnRaAOHcGPt+3yOou3M0KxCkoP2u4kKCtOTKe9b0tGbb1t185idgxTN4CgtGtIVSFXT2xmUrwGJXpRbQ6Z3RGy6YaACEo3gBrkZydB6YnvqktQYqRg8yBaxC3hj+MziI6YwcnKKnLmdcS/zzrO/5BGcGdrPqUn17crQWmkcFsa/srbbDLnp1ghVHJ8cqvnRygr7/PbplmkxsbQe8IqDl/zyIO5FJQ83ctYnUKftTds0VarKQ6f1Vz6vBParqvIu7aOZFU0i60JpR6VUZegtKvkGV/jiX+1O182G5xAowlK45MDfNxWRftPjlDS4GZ7VqAISs84PXuURVAq4ZM5YRe5q85bRqKqPenmeQtXF7yB/DWmHMpxTjmUV1mR4E3g2APmHMr8Vb3QtRjNT3brSelzv+A/frYcyuqz84j0juPry7Xz6VRfWkq8l1VQGnn042B06jR22+V5OrblKT+NdLMOpfEBWwco+I/JcoyYOhZkFtAFv3/P3NS3iO3lgbB0KSgN3PyuL/7+g8m0vylU57Giu5rg4TvA+IAtA9Vm0Vnzjo7ZkvIT04nyUZG88polz9Jd25/uYXTtOpRGHm4eiE7VuybPq6Zx5SeYEeGLpscq8munvN1FKD1gipGHPwxEqx7DfodoyjNQZYcLAiIoXUBp8F3OgtIT3+VK6FkMM1xfQ4q2G+PGxNJy9F7zahfl//uY1rqevJMcRPSsU5bZHo+ub9f1VF9bRW8lmLG7H9tmPfS5LE1QeZZDqS8g5/s5DO0cQ4oHwtI85e0UocRwk/V9NLRI3eIQEKjOW05PJYhRO2wrcBiufEUXpSczp/dAG7OEi9a0cY/KcHV/cTUI7H2NB/7VVRGyr8EINLigNFQUcfvsbhb0Ccc/+mMOFNgEQYNZ7WFBIig9BPXMYRZBaXrrOnb8di49KaM4/xfSE4MIH7K9Zuqzjgu+6ChTIkxveWeY3/LWl163vOWtTmLl35aJcGPhYaZFqYkcuoqTt4t4nPczc7sHobJ7y5vSw3wU7E2H8fu4XlZJ2c1jfJESguJlt2zQ0xwWxipEjPyeC48rqa4sIv9wOklKa6YcN70IZrlpaLss4fyjBzx8+CvT22hJmneEG8VVGAzl3Mv+jGRdMCN3P7A56Wd42O/Q8yAnk3lD4un8PGHpUlCa3vA8yowYNa36LObA5UeUFuVzdHEKLTVd+CzHpL70nP8sDq02iYXH7vC0soRbZ75nYmcNfl4qun1x0WKMu7ZXHuGTUIXEJX/x6MFD9Oc/I0Glo2f6Me48raTk5hkyx7+Fv5c3moSlXDI5e4+mvJ2YlpWRPaUtAd3mcfRGMVUGA+X3TvJ5D39aDtv9nHQEe6aybU9ABKU9jcbadhaUgAe+y6XIMplYfZEvE1SovNT0X3fbHL0zFu5klL83ft7hfHLY+mTu2fXtsh5jIUcmd0DXJo012bcpepxH1pwkgr3r+Za3SVhmzmVY3POFpUsbMFJ4dDqdlTD6L9rP5UelFOcfYUlKMAEJizG7MGuXGf5hZVdf/Lx8iF/6t11E05MyXN1fnrr1Ne79q9U4+WwMAg0gKG3r3ZnzwFT+tIpKYvjMDfxWYH0ksZhefeEzOnmpGG5KXn4F/0RQvihki6DUJkziy+lvExOoJiAsjrR5e8irjTi5uuAt9envHWfFe0lEan1QqcPpMvhTduQ6xqkr8rP4bFgCbXWmshN49/Mv+aCdLYfS9LZzYc5aPkxsjb+PQmjHgczd+TNLEtTPrEO55v0eRJrWvPTxJzJxFF9k5de+gV2as4LUCB1qVXs+PVlF2eUdzB3chchANYqfjjZvDWJm5gWKrXmgHiOr5uHZbSwYPoJlZ10kudchKE3F6+8cZcW4XnSsWQuzffexLD92z/bmeVkumRN7ERWooFZaENVtOPMzs/iqj4bgYdtrLTStQ1l320s5u3wgUVo/tJGzgTIubvmY3hFBaH3VhEYkMnJuJvuX9sE/YLjlTXmPBCU4M6XsMjtnD6FbmyB0PioCw+JInZ7JhfpDrW3bm7whgvJV9L4LQWm6Nt34Ltciy2RvlTmXUfF9iyV/1aSqmJbK6aNGFfQeP9u7Pw+u7zrrqchn/6Jh/CfcH50mnK4jvuCr9yLqzqF8Hsrqh/yxdT6jhn/l8qg6bUDPnSPL+LBnFC0VFbrACHqO+Zrj9xzv96a1J6+vTULllVDzco59Ne7KqOP+4oGvcetf7c2Q7QYl8FKCskEtaYTCRFC+KNSaHMpe67n97wWYX9R4OU8INGkCIiibdPeJ8ULgjSUggvKN7frnNVwE5fPoyG9CoDEJiKBsTLpSthAQAo1FQARlY5Ft0uWKoGzS3SfGN2kCIiibdPeJ8ULgjSUggvKN7XppuBAQAq8jARGUr2OviE1CQAi4IyCC0h0h+V0ICAEh8AoJiKB8hbClKiEgBBqMgAjKBkMpBQkBISAEXp6ACMqXZyglCAEh8OoJiKB89cylRiEgBIRAnQREUNaJRn4QAkLgNSYggvI17hwxTQgIgTePgAjKN6/PpcVCoDkQEEHZHHpR2iAEhECzISCCstl0pTRECLxRBJq1oFy0YAGfzprN7Vu35E8YyBiQMdAkxkDuhQuEBAY1CVvFt8q9RcaAjAHrGBiRNoxtW7d6JKL/z6OjXqOD9u3dS2TbdvInDGQMyBhoUmNg+NC0JmWv+Fm5z8gYkDFgGgN//fmnRyqwyQlKj1olBwkBISAEhIAQEAJCQAi8MgIiKF8ZaqlICAgBISAEhIAQEALNk4AIyubZr9IqISAEhIAQEAJCQAi8MgIiKF8ZaqlICAgBISAEhIAQEALNk4AIyubZr9IqISAEhIAQEAJCQAi8MgIiKF8ZaqlICAgBISAEhIAQEALNk4AIyubZr9IqISAEhIAQEAJCQAi8MgIiKF8ZaqlICAgBISAEhIAQEALNk4AIyubZr9IqISAEhIAQEAJCQAi8MgIiKF8ZaqlICAgBISAEhIAQEALNk8D/AxykqvBZ3o/jAAAAAElFTkSuQmCC" width="582" height="172"></p>
</div>
<br><hr><br><div class="question">
<p>The enthalpy change for the dissolution of NH<sub>4</sub>NO<sub>3</sub> is +26 kJ mol<sup>–1</sup> at 25 °C. Which statement about this reaction is correct?</p>
<p>A. The reaction is exothermic and the solubility decreases at higher temperature.</p>
<p>B. The reaction is exothermic and the solubility increases at higher temperature.</p>
<p>C. The reaction is endothermic and the solubility decreases at higher temperature.</p>
<p>D. The reaction is endothermic and the solubility increases at higher temperature.</p>
</div>
<br><hr><br><div class="question">
<p>The combustion of glucose is exothermic and occurs according to the following equation:</p>
<p>C<sub>6</sub>H<sub>12</sub>O<sub>6</sub> (s) + 6O<sub>2</sub> (g) → 6CO<sub>2</sub> (g) + 6H<sub>2</sub>O (g)</p>
<p>Which is correct for this reaction?</p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>Which equation represents the bond enthalpy for H–Br in hydrogen bromide?</p>
<p>A.  HBr (g) → H<sup>+</sup> (g) + Br<sup>−</sup> (g)</p>
<p>B.  HBr (g) → H (g) + Br (g)</p>
<p>C.  HBr (g) → <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>H<sub>2</sub> (g) + <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>Br<sub>2</sub> (l)</p>
<p>D.  HBr (g) → <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>H<sub>2</sub> (g) + <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>Br<sub>2</sub> (g)</p>
</div>
<br><hr><br><div class="question">
<p>The potential energy profile of a reaction is shown.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="470" height="289"></p>
<p>What can be determined about stability and energy change from the potential energy profile shown?</p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the enthalpy change of reaction for the following equation?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">C<sub>2</sub>H<sub>4</sub> (g) + H<sub>2</sub> (g) → C<sub>2</sub>H<sub>6</sub> (g)</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C<sub>2</sub>H<sub>4</sub> (g) + 3O<sub>2</sub> (g) → 2CO<sub>2</sub> (g) + 2H<sub>2</sub>O (l)        <em>ΔH = x</em></span></span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C<sub>2</sub>H<sub>6</sub> (g) + <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{7}{2}">
  <mfrac>
    <mn>7</mn>
    <mn>2</mn>
  </mfrac>
</math></span>O<sub>2</sub> (g) → 2CO<sub>2</sub> (g) + 3H<sub>2</sub>O (l)   </span><em><span style="background-color: #ffffff;"> ΔH = y</span></em></span></span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">H<sub>2</sub> (g) + <span style="display: inline !important;float: none;background-color: #ffffff;color: #000000;font-family: Verdana,Arial,Helvetica,sans-serif;font-size: 14px;font-style: normal;font-variant: normal;font-weight: 400;letter-spacing: normal;text-align: center;text-decoration: none;text-indent: 0px;white-space: normal;"><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{1}{2}">
  <mfrac>
    <mn>1</mn>
    <mn>2</mn>
  </mfrac>
</math></span></span>O<sub>2</sub> (g) → H<sub>2</sub>O (l)</span></span><em><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">                           ΔH = z</span></span></em></span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"> </span></span></span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. <em>x + y + z</em></span></span></span></span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. <em>−x − y + z</em></span></span></span></span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. <em>x − y − z</em></span></span></span></span></span></p>
<p style="text-align: left;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. <em>x − y + z</em></span></span></span></span></span></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which statement is correct?</span></p>
<p><span class="fontstyle0">A.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">O</mi><mn>3</mn></msub></math></span><span class="fontstyle0"> </span><span class="fontstyle0">bond dissociation occurs at a longer wavelength of light than </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub></math> <span class="fontstyle0">bond dissociation.<br></span></p>
<p><span class="fontstyle0">B.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">O</mi><mn>3</mn></msub></math></span><span class="fontstyle0"> </span><span class="fontstyle0">bond dissociation occurs at a higher energy than </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub></math> <span class="fontstyle0">bond dissociation.<br></span></p>
<p><span class="fontstyle0">C.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">O</mi><mn>3</mn></msub></math></span><span class="fontstyle0"> </span><span class="fontstyle0">bond lengths are shorter than </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub></math> <span class="fontstyle0">bond lengths.<br></span></p>
<p><span class="fontstyle0">D.  <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">O</mi><mn>3</mn></msub></math></span><span class="fontstyle0"> </span><span class="fontstyle0">bond dissociation occurs at a higher frequency of light than </span><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><msub><mi mathvariant="normal">O</mi><mn>2</mn></msub></math> <span class="fontstyle0">bond dissociation.</span></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Methane undergoes incomplete combustion.</span></p>
<p><span style="background-color: #ffffff;">2CH<sub>4</sub> (g) + 3O<sub>2</sub> (g) → 2CO (g) + 4H<sub>2</sub>O (g)</span></p>
<p><span style="background-color: #ffffff;">What is the enthalpy change, in kJ, using the bond enthalpy data given below?</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUUAAADJCAYAAAC0cSBKAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABx8SURBVHhe7d39cxRVugfws/fnG0KVhVWb8HZ3LV59oYqEIGVdS0QEZBcCCAQ0osgC8YIsKwQwrKUgIbDLcqNAWOTFILIoCOwqAgYs7rq8GKhClxCgqF11CVZJUUuSP8Cb7zPnmZzpzFuSSejOfD9VXaenp6ene/r00+ecPj39kx+bGCIiEv9hUyIiasKgSETkiFp9vq/vf9kxIqKu7fo3/7RjITGDondG8gfuG6LUiHUssfpMRORgUCQicjAoEhE5GBSJiBwMikREDgZFIiIHgyIRkYNBkYjIwaBIRORgUCQicjAopqFvvv1ObnHSYcPGt+w76Ul/hz99cMBOubu+OH02vE7YV53lyNHjZu68oojvxGusx7btu+yUtnO3y88YFNPQZ1Un7VjIvj3v2TFKVwiEC+fNNSeOfmqnpC8GxTR0suozSQtnz5H09q0fpJRARAyKaefrv9eY6jOnZXzk4yPN42PGyvjnJ5tLj6gqoYqTl5tn7tTX26mR1W4Nopi2ZOmy8PRx48a3CLCYhvewXHccsD5aRdPhjVVrIr4X45jmvh+riokqMNbbndddVjyNjY0R34PtcpcNeI3mBp0HA16734F10PewngUFM8OvvdVQ77bhO2/cqLPvJuZdF+/yddn4jd3fBqnuJ6zjqEcflXHAOOb3wvz6eWwT9p0L7+v+1cG7Pl7u+mFe/RyWj/UC/T29+RE072A5qcKgmGaqToSCX79Bg80jI4abx0Y+Lq8PfrAvnOGenpIvKUqQp8+ck3HQavc9Pe4148aMlgAxbcrT8ll17XKNVMOiHQxlq16X9xW+b84LL7SoslVu32befLPUvjKmuHi5TFMYX7N6tX3VDAGiZOkrst4K885oOsC8B1M0WD/3e7BdRfOLwp/F9uL15o0b5LXC61jfMWtGQfgkBPgOt+1yftNB7f1ObEMyEDi864LlI7B64Td2fxuk2E/eoB8LaheYXz+PbVpWXCzjgACG9939C1ifRIERsH6YV2H5+O0QeMc8OUryHL776LEqO0dof2jewQk+VRgU00zV8WOSjhr9pKSa4eDD/Qcl7Z6ZafKnTpNxtwSp1e5pM5+RtLLyPcmoKG3if+kwrF73O3nvnYotLYIEAvH5ry7KfE+MGinfh8/nPjwi/Hmt0tdcuiQpDjbN+MUrX5N5qk6dMplN6+jCAaIBYtf7e2U+fBeWjQNVty0erN9Hf/lYPqvb4X4W24vX+L30O5DiNaaXl2+S+Vz4HXWdsXy4dvWqpNg2DZhFixaH58M6J4LAis9imfgMPot1x7ogsGopy6W/H9ZZnT1XLSdHLENhfGvFZvsq5B/Xr4e3GcsBbLMG1cOHDkmq24FBt/f7mzclTQS/uW6Hfnb37t2SH5/65QR5/fnJE5KCnqTxe2EbUoVBMY3gQEFGhlH2zOpmOA16MGHiREm1BOlWuyflh+Y/a18jaGm1R0s5CHaXamplXCEQ4/ugb5/eZs7sWXIQvLRggZQmUAVyS01QW3tFUhzsmB/w2Wefe07GFQ5uhRIG1iXnoSHhdT5f/aWk8eRPnmIefCB0ME6fOjkcnPSg/uTPhyV9cd788EGIVE8S+r7r1VeXS4p1Hm6XV1d3Q1J32xYvWiDj0bYtGg2s2J+o7mJ7J/1ifLgkp8tW2Bb9/bDOGnTQZJAMbKNus9Yk4EZd6LdZv26t7MusrCzZl6jWal5LBtYPvzlgH2BfwP99/rmkEyeG8hzymp5sNb9OyJ8kaaowKKaRk7bqDDiANJBpIEIA0XYi98BBSUmr3SgV4sCFRJne2zaGA8aF70IbFIKYt+rqdU+PHnYspFu3bnYsJNHB/a/vElcTMzIy7FjIQLv9CGIoEWnA8c6n26Xvu/QkEE+ibYtGA2ss3tJZtyTWIx53m6NtE9oT9aSIfaml+2Tpb630+/Q3RaDUkxTyo56kcUJBbSeVGBTTSLSSjJcGP9Cz9bWrV8LVbm2DBA2aWi3zDnrmj2XTpk0SWJHZsQxUd7Vq5nX71i07FtLQ0GDHQtyDNtq6HDnysX03Nm9grbVBPzu7p5wIcACCd76bNgDp+62VaNuiwTqB23ThDr9duULe7wwoub2+cqWMo7lA84NexEuG/tZKf2PNYzBy1BOSooSo+RS1nGROPK3BoJgmcCbXs662m7mDtiG6fRbR7geoQiN4ec/KWh08eGB/uISpV0NxpTARLb317NVLqnZ37tRHVOFh4MABkmLdtcEepba3y8tlXA3Py7VjoXUAzKdXS5Np7Ec7qLbFaZsd9OvfX9L/fuwxSd35kOpvps0QyXK3zV3n3e++K+Px6DqhRKZXkbW0hkH3R1s0NCRXpVbYb5q3+vUfIPsSv8vFCxdkWjLwW+s+wrojT4HmMdBqO+bV9mOtVqeSL4OiXmaPNqC65V6960zYaboOQaMXTBDYtN3M9djIUABE5taDDKUjDZaAdiX3rFxY+IwsDwFTq+OaWdHulkg4qDYFXXwWbWNo0ActPaEaryUOVMt0Pu+FFqwrGvkB66DzYXtQ2nDbweLR9khtG8VntcT70ktFsr1Yps6HFK9R2l248CWZL1nYNv193XXWYByP2+aJq774LFLAMqPt43i6d2/+PbEvW5PH8dtriU73EX4X1diYuOQL+ll8vzbNII8p5D29EAfY/tZuZzICV1LEj4UMe7cCYxCheqMN1npRwAtdbLT6515x1mAJenFG4WDYtmNHRODEwYGriNqoHw+CiPtZjO/b/6GMI9BoaaysrDTiYED1DBdnlB7QuFiB93Q7AJ/bvGVzUlUsBHL3e7A++KzC9mL9NPgqvN5Skdx3eOEChfc79cp3IvhO77pg+7HM1sK6u00XvXqH2o2TtbasLBykAct6bdUqGUfe8/ZE8MKJz91uLAs1GvzmLrfrTaovsIThEadeP+/T147dHb+aO1/W4fU33rRTQv59586P06fPkPeQdrY/vrNTvnvs2KfslM53t/dNZ/vr387INnvzA8YxbVjOMDuFgkj3I475ZOgxiP2OeNAeWE40gSop4mymja1eKFW4d1agLcnbjpRM736Fdg23Gq9tPtS53KvguDqt+0OvVMcq+VLXoscuqtjgbcpJpUAFRRTBtSHeDY4IiGjDQNuUQvULP2Bbevcj9d5pgTYf3SHUuVCFdauYgCoyqmjav4+6tp863bmQFzp0v9sSY4RYxcrOotXnWMMrS4rtnCGozmI6qtT//OZbmabFbAx79+2XaVpUx4D3wa2e6XzuZz/59JhMw3wosmMaq89EwRfrWApklxyUCLW6i2quXqlavmJFuGEWDf3a8HvhfPPdDoDp8Xr3690PaPTGBQjAfKyqEXV9vg6KKCZ7+9Pp1TZUd1GdvuzcztStW/Q7ErydYZPt3Z+REXlngfdOBiLqegJXUnTbEnBv7SDbARa8nU61l3wyt025dH5v/6pEt5IR+QXa2XFhwnsBkRILXFB0ryh3ayq5ofOm9ksrXbMmfLEE82kn2KE5zXc7JAO98sGtpiOT8R+qKQiQZ6P9tRolx9dB0e2CoYNeAUZ7n/Zm106iCIL6jyE6H6rgie7B9cLdD9rOqHcL6J0L5H9651GsUpLbNas19A9UvV29OotuV7z1RpMSboEcfP/9dgq1ViAvtKBd0e21j4sh+K83BEqlXTbacmM8+j+hG4h7Qzu+0+3xT/6FP7CAEQ8nvv+6q0HexZ9fuHciUSvZq9AR2O3Dv7hvEkPXqXh3PLX2LgqlXb+0O1dn065iWG90FcO4d9AuZPq+vqaW8PtEE8iSIlEs6KKFZo7cvOT/iRlVTn2OCtK2wGe1aq3Vc30NWvXFgOqvtn2rZO7IcqF25O2ZgUG7kFHbMShSl3Luy1Cf1AEDQn+tlQw8Awbt0ei/ij9ZaA+0Zbt/lovXCLTu3VC4U6q0tLn5p7V3ZFHHYlCkLqW17YkIOghSuLBWura03ffTYjl4xgn+MFcv1iHg6vNN9HZF9xZSvVKMoKzPW9H2awTKtvwjlJYkWXJsPQZF6lLwN1UILskENwQmLZ0Vznq+xd9UtQX+rRzLwffr329hfXBHFOifw6q23JFFHYtBkbqMtrQnqj+sX5fwP/+SEe2up3h3ULXljizqWAyK1GW0pT0R1VpUcxFM9VGmejcIBgTajtQRd2RR+zAoUpfR2vZE9ENFtXZFSYm8xrNXcFX4/sED5TXoA5Lcam52duRTCdujI+7IovZhUKQuozXtiS4ERnT8R2kRD7zH5/WCiD47Bc8NAZQqU33xItV3ZFH7MChSl9Ce9kTAQ6kA3WlQWsOdUN7nnyBAvb93j32VOgiyqbwji9rnJ+jBbcfDcKbC5XzyH+4botSIdSyxpEhE5GBQJCJyMCgSETkYFImIHAyKREQOBkUiIgeDIhGRg0GRiMjBoEhE5Ih5RwsRUTrw3tUSMyjyVjJ/4r4hSg3e5kdElAQGRSIiB4MiEZGDQZGIyMGgSETkYFAkInIwKBIRORgUiYgcDIpERA4GRSIiR+CC4oaNb5lx48bLLToY8nLzZFpbLFm6TJZxp77eTolUUDBTlk/p7cjR45JPkMbyxemzMg8etRoP8mq8PEd3X2CCIp7Fi2BYfe6s+Z+FC+WeRQy/XrLUVB0/JgGMGY1SDXnq7fJy+yo6BMLfvPyyfRUbAicerk/+FpiguHzZckm3VGyWh4er6VMnS5CsPnPa7NhZaacSpUZx8XJz+9Yt+6ollPw2bdpkXpw3306JDsF1zerV8pB78rdABMU/fXBAgl7+5Cmme2amndoMQbJ45WsmIyPDTiFqv23bd5mLFy7EDHh4HzWXsrJSOyU2BNfMprw7beYzdgr5VSCC4rWrVyUdOHCApNHMmT1LBqJUQHPNOxVbpHkmOzvLTo2UNyzX7N27J+qJ2oWTOoJr6drEwZPuvkAExcbGBkl7xsic7ZXz0BBp/PYOKJ1SekJzzZChQ6V5JpYHHxhsx2JDcP3D+nVS2uzbp7edSn4WmDbFjnT+q4vhCzfukPvwCDsHpZM3Vq0x9fX1SVWLE9HgylpMcAQiKGZkdJP0Rt1NSePR7hOJhkRdJyg94Qpx5fZtZkVJScJqcSJoc0xVcKXOE4igmJObI2lt7RVJo0E1RfowjhkdtdTnHZKp+lD6OXzokKSzZhSET6AL582VaUjR9StZaJO8drkmonlGu+RgWlv711LHCkRQRKBDVfbggf1R+yIiIBbNLzLf36yzU4jaZv26tS1OoOUVW+U9pLiwkqxz1edaLKto0WJ5D002ixctkHHyl8C0KeqVu/nziuRqnsL4tClPy/irr4b6MhIRtVVggiKu3L3fdJbOzRtuSpa+Eq6O4Moe+n4dOfJxu9uAiIj4iNOA4b4hSo1Yx1JgSopERJ2BQZGIyMGgSETkYFAkInIwKBIRORgUiYgcDIpERA4GRSIiB4MiEZGDQZGIyBHzNj8ionTgvdUvZlDk/bX+xH1DlBq895mIKAkMikREDgZFIiIHgyIRkYNBkYjIwaBIRORgUCQicjAoEhE5GBSJiBwMikREjkAFxa//XmOWLF0mt+foMNfzcPzWwPKwjA0b37JTIh05elze37Z9l51C6UjzAVIv5L1x48aH8yPypxfyj76PgfnJ3wITFJGRJv1ivIxXnTol9yxiyMkdJg/HR3AkSrU79fXm7fJy+yoS8mTlrp1mbVmZ5MWP/vKxqbl0KSIvvrFqjXmnYospr9gangevMZ38KRBBEWfoslWvm6JFi836dWtN3z697TvGzJk9y6xe9ztz4uinzGiUcsXFy83tW7fsq2YIlghu+ZOnmAcfGCzTkOI18uI3334n83zy58PmxXnzzbgxo8PzPPXLCaZy+zZ5n/wnEEFx97vvmnt63GsWL1pgp0SaPnWyyX14hGQ0ZEaiVEBJ8OKFCxLUvI4eq2oKlj+YJ0aNtFNCcJJGiRAn7u6ZmeZc9TmZRsHh+6CIIFd95rQZMnSonRLdyFFPSHr2XLWkRO2BfIeS4K+XLDXZ2Vl2arPGxkY5Ud+ouynVZW0vTFRbQRskTt6Fs+dI0CT/8X1QRKaD7OyeksaiGffmzdD8rbF544aIhnAdFs6ba+egdLN82XI5EaMWEs33Np/95uWXzYSJE6V0eP6ri6b2ck3U9m29WIP2b9RqJk6cYN8hv/F9UGxoaJD0PzMyJO0IaKtEpvYOaByn9IPSXn19vSkrK7VTWmpsbJDqs9teiJLfhPxJ0qb4xemzMk1hHs1XPXv1kouG3nnIH3wfFAcNHCDp1Su1ksZSZ0uUWVlZpqBgZotSn3eI1nWCCIEK1dsVJSVxq7c/zcqWNG9YrqRK82tt7RVJo3nppVBJ8uSJk5KSv/g+KKLBGtUNNHjHc776S0mH5+WavXv3RJT4og24ik3kdfjQIUlnzSgIn0C1GQUpTriQYWsuDY2Nknrp+9F07x4Ktihtkv/4PijCs889J1WVWI3YaLxGlQWN1253HaLWwsnSewLVZhSkOOGClhC//DLywt5lW0LEyRmlTgRVb2ftO3dCXXG0tEn+EoigiPaY4pWvSbUG1V632w0yHBqvHx8z1vx25Qo7lahjob8hTsL79rwXzo/od3j44Efhk/MjI4ZLvjxZ9VlEn8TS0rWm36DB5oXnC+0U8pNABEVAXy/cDQCjHn00XLVBtRmdt7dWbJb3iDoLTsK40DJtytOSF3MeGiJdw9yTM/Jlbt5weU/zLHpSvN9U4mSXHH/iI04DhvuGKDViHUuBKSkSEXUGBkUiIgeDIhGRg0GRiMjBoEhE5GBQJCJyMCgSETkYFImIHAyKREQOBkUiIkfM2/yIiNKB91a/mEGR99f6E/cNUWrw3mcioiQwKBIRORgUiYgcDIpERA4GRSIiB4MiEZGDQZGIyMGgSETkYFAkInIEJijiubkbNr4lvdB1GDdufIsHjbdFRy6bgu/I0eOSJ5B6vbFqTUSe+dMHB+w7zZCP8nLzwvPhM+RfgQiKyIxPjhptrl6pNeUVW+XWHAyFs543Bw/sNwUFMyMekN8aHblsCj6cMN8uL7evIs2dV2RqL9eY819dlDyzectmU7lrZ8TJFONlq143v//f/w3nLXwGnyWfwr3PXj/v09eO3X3/vnPnx2E5w3781dz5dkqkf37zrbw/ffoMOyV5HbnsjuKnfZMOkDeQB/C7f/LpMTv1RxnHtL379tspIX98Z6fMj7wFY8c+1SL/YB58FvmL7p5Yx5LvS4o7dlaa27d+MM8WFtopkfr26W2mzXzGVJ85HbXqEk9HLpuCD6W8ixcumBfnzbdTml25clXS4Xm5kqrs7CzJU6fPnLNTYmtoaLRj5Ce+D4pVx4+Ze3rcax4ZMdxOaWnYsFDGvHY1lFG97YPeAe9DW5ZN6QFNJu9UbDG/XrJUAl1r1dXdlBTNMDipfnH6rLyGk1WfmcfHjDUPPjDYTiE/8X1QvH3rVlPg6mFfRXf/4IGSoq0GFi9aEG6/iTbgfWjLsik9LF+23AwZOtRMnzrZTomUlRUKlDds8FNaglT4fP7UaWbWjILwSfkf16+brRWb7RzkN74OimjkRlUkMzPTTkmdjlw2BRuuDtc35Y+yslI7pSUEu9yHR5jdlZWSlwAX7fbteU/G1ZKly0zNpUum6tSp8En5qV9OkCvV+jnyF18Hxe5NAavfoMFyZo3nUk2tpAOb5k1WRy6bggvV3Mrt28yKkhLJI/FsaSrtdevWzeQ8NERKgIcPHZKrzJCRkSHLOvjBPpM/eYq0T6vCwmfMtaaax4f7D9op5Ce+rz6PGv2klOjcNhmv2torkvbr31/SZNsU27Js6toQ2MCt7i6cN1emIUUXLYWguX7d2nAJEFXiGzfq5L2ePbNNQ0ODjHvbJBEg0ZZ97Woob5HP2KvQEfzU7UO7zcTqFpOKLjkdseyO4qd9ky60+43bJeevfzsj05C6fv+HcumGA8g/mAddcLyQr6JNp84T61jyfUkRZ+NtO3ZINRcdXt27CtBNpmh+kfnZffeZ0rWx239i6chlU9eGHgveNkXkGfRoQNUbUCIsnD1Hrja7eQttlrjA9/SUfDuFfMUGxwh+LI2gVIezMNZNB5yRU3G27chlpxrWjTpXtJIioCSIzt2aZ1Cj8M4DyEcoGep8rywpZsdtH8C+iIZP8wsY7hui1Ih1LPm++kxE1JkYFImIHAyKREQOBkUiIgeDIhGRg0GRiMjBoEhE5GBQJCJyMCgSETkYFImIHDFv8yMiSgfeW/1iBkXeX+tP3DdEqcF7n4mIksCgSETkYFAkInIwKBIRORgUiYgcDIpERA4GRSIiB4MiEZGDQZGIyMGgSETkCFRQ3LZ9lzy0Hrfn6IAHi3/z7Xd2jrbBQ8y9y12ydJn5+u81dg7qivAQ+3Hjxku+8sK0vNy8cH5A/nAfaI/84eYX74DPY4j2ng5YBvkQ7n32ivWQ6LsJDx3HA8XdB9R/9fWl8HSMt4U+zBwPw1d4OD4eWI7pfnsgvh/3TRBhH+Ph9dH2sT783s0Tmk/iPcQeyxw79ilZbjyaZ/lA/Lsr1rEUiKD4+htvyjr99W9n7JRmyIjIYJoR8RrzxhswDyDT4zUOgmj0e/fu22+n3H1YH2of7E8ELw1+3qCI/Y73XQhgifICTqSJgh2+y295Kl3FOpZ8HxQ1M+LsGgsymHtWT4YG03jL1Xm8B8jd5Kd9E0SoUWCfIsWA39MbFLG/EeC8Yk2HaKVLL+8JnO6uWMeS79sUz56rljQnd5ik0UyfOtksXrTAvkrO0WNV5vatH+Iut3tmphkydKi5drmm3e2W5A+9e/c0+/Z/aB58YLCdEgntjNjfP83KtlOaZTblhxv/+pd9FWn3u++ae3rca154vtBOaWnHzkrJc88+95ydQn7k+6DY2NgoaUZGhqSpkuxy+w8YKOnl2iuSUrDhRNe3T2/7qvX+cf26HWv2xemzpvrMaTNt5jOy/Fj27XnP5D48wowbM9pOIT/qcl1ycKaPdqXPHTCPBsVu3VIbbCn9nDxxUtJJ+RMkjQY9HFBKnJA/yU4hv/J9UNSSnAaxRHCmxr/pxhswT1ZWlsxfV3dT0liuXqmVdNDAAZJSevvZfffZsWaf/PmwlADjlUA/P3lCqtdjnhxlp5Bf+T4oIhMhM52v/tJOiW7Dxrda1e6X7HIvXrhg+g0a3K4qFwUHTpjY39/frLNTmtU31TB69uplX4Wg6owS4MhRT9gp0SEfoX06XvWa/MH3QRGZCG01J45+KhkwGnSsrTp+rFWBy10uqjbRoGM4MnzhrOftFEoHw5tKfTWXLtlXITjh4gJMv/6RNYZa29Y8ME5NAjcBJLqoR/4RiDZFXFl+fMxY85uXX464+wCZraBgpgS2FSUlMi3ZNkXAcvOnTjMlS1+RkqbC+7jboHL7NlO88jW5uk3pIyc3RwIgToqqtHSt1CyenpJvp4R8fzPU/NIzO9QcE41epEv1xULqGIG50LK1YrN5cd58c/DA/nBwm/SL8WZgU1Wn6tQp88iI4TIfSoDR2hHdwa3CrF+31qxe9ztpO9Tl5jw0RN776C8fmzmzZ8k4pQ9cHcbJEG2Fmicamk6Ur61a1aL629jYIMEyXi1F28N79mzZzYf8h484DRjuG6LUiHUsBaakSETUGRgUiYgcDIpERA4GRSIiB4MiEZGDQZGIyMGgSETkYFAkInIwKBIRORgUiYgcMW/zIyJKB95b/aIGRSKidMXqMxGRg0GRiMjBoEhEFGbM/wMvT500xbLl+QAAAABJRU5ErkJggg=="></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. [2(1077) + 4(463)] − [2(414) + 3(498)]</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. [2(414) + 3(498)] − [2(1077) + 4(463)]</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. [8(414) + 3(498)] − [2(1077) + 8(463)]</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. [2(1077) + 8(463)] − [8(414) + 3(498)]</span></span></p>
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