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<h2>SL Paper 1</h2><div class="question">
<p><span class="fontstyle0">A student obtained the following data to calculate </span><span class="fontstyle2"><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>q</mi></math>, </span><span class="fontstyle0">using </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>q</mi><mo>=</mo><mi>m</mi><mi>c</mi><mi mathvariant="normal">Δ</mi><mi>T</mi></math>.</p>
<p style="text-align: center;"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>m</mi><mo>=</mo><mn>20</mn><mo>.</mo><mn>2</mn><mo> </mo><mi mathvariant="normal">g</mi><mo>±</mo><mn>0</mn><mo>.</mo><mn>2</mn><mo> </mo><mi mathvariant="normal">g</mi></math></p>
<p style="text-align: center;"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>∆</mo><mi>T</mi><mo>=</mo><mn>10</mn><mo>°</mo><mi mathvariant="normal">C</mi><mo>±</mo><mn>1</mn><mo>°</mo><mi mathvariant="normal">C</mi></math></p>
<p style="text-align: center;"><math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mi>c</mi><mo>=</mo><mn>4</mn><mo>.</mo><mn>18</mn><mo> </mo><mi mathvariant="normal">J</mi><mo> </mo><msup><mi mathvariant="normal">g</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup><mo> </mo><msup><mi mathvariant="normal">K</mi><mrow><mo>-</mo><mn>1</mn></mrow></msup></math></p>
<p><span class="fontstyle0">What is the percentage uncertainty in the calculated value of </span><span class="fontstyle2"><math xmlns="http://www.w3.org/1998/Math/MathML"><mi>q</mi></math></span><span class="fontstyle0">?<br></span></p>
<p><span class="fontstyle0">A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0</mn><mo>.</mo><mn>2</mn></math><br></span></p>
<p><span class="fontstyle0">B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>1</mn><mo>.</mo><mn>2</mn></math><br></span></p>
<p><span class="fontstyle0">C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>11</mn></math><br></span></p>
<p><span class="fontstyle0">D. </span><math xmlns="http://www.w3.org/1998/Math/MathML"><mn>14</mn></math></p>
</div>
<br><hr><br><div class="question">
<p>A student measured the change in mass on heating a sample of calcium carbonate, CaCO<sub>3</sub>(s). What is the mass loss?</p>
<p>Mass before heating: 2.347 g ± 0.001<br>Mass after heating: 2.001 g ± 0.001 </p>
<p>A. 0.346g ± 0.001 </p>
<p>B. 0.346g ± 0.002 </p>
<p>C. 0.35g ± 0.002 </p>
<p>D. 0.35g ± 0.001</p>
</div>
<br><hr><br><div class="question">
<p>What is the Index of Hydrogen Deficiency (IHD) for 1,3,5-hexatriene (C<sub>6</sub>H<sub>8</sub>)?</p>
<p>A. 1</p>
<p>B. 3</p>
<p>C. 5</p>
<p>D. 6</p>
</div>
<br><hr><br><div class="question">
<p>What is the density, in g<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>cm<sup>−3</sup>, of a 34.79 g sample with a volume of 12.5 cm<sup>3</sup>?</p>
<p>A. 0.359</p>
<p>B. 0.36</p>
<p>C. 2.783</p>
<p>D. 2.78</p>
</div>
<br><hr><br><div class="question">
<p>How should the difference between 27.0 ± 0.3 and 9.0 ± 0.2 be shown?</p>
<p>A. 18.0 ± 0.1</p>
<p>B. 18.0 ± 0.3</p>
<p>C. 18.0 ± 0.5</p>
<p>D. 18.0 ± 0.6</p>
</div>
<br><hr><br><div class="question">
<p>What is the graphical relationship between <em>n</em> and <em>T</em> in the ideal gas equation, <em>pV</em> = <em>nRT</em>, all other variables remaining constant?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">Which region of the electromagnetic spectrum is used to identify hydrogen environments in a molecule?</span></p>
<p><img 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" width="686" height="232"></p>
<p><span class="fontstyle0">A. X-ray<br></span></p>
<p><span class="fontstyle0">B. UV<br></span></p>
<p><span class="fontstyle0">C. IR<br></span></p>
<p><span class="fontstyle0">D. radio waves</span></p>
</div>
<br><hr><br><div class="question">
<p>Determine the index of hydrogen deficiency (IHD) of paracetamol.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="150" height="272"></p>
<p>A. 3</p>
<p>B. 4</p>
<p>C. 5</p>
<p>D. 6</p>
</div>
<br><hr><br><div class="question">
<p>What is the ratio of the areas of the signals in the <sup>1</sup>H NMR spectrum of pentan-3-ol?</p>
<p>A. 6:4:1:1</p>
<p>B. 6:2:2:2</p>
<p>C. 5:5:1:1</p>
<p>D. 3:3:2:2:1:1</p>
</div>
<br><hr><br><div class="question">
<p>Which feature of a molecule does infrared spectrometry detect?</p>
<p>A. molecular mass</p>
<p>B. bonds present</p>
<p>C. total number of protons</p>
<p>D. total number of proton environments</p>
</div>
<br><hr><br><div class="question">
<p>What is the index of hydrogen deficiency, IHD, of 3-methylcyclohexene?</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2018-08-09_om_13.09.54.png" alt="M18/4/CHEMI/SPM/ENG/TZ1/29"></p>
<p>A. 0</p>
<p>B. 1</p>
<p>C. 2</p>
<p>D. 3</p>
</div>
<br><hr><br><div class="question">
<p>What is the uncertainty, in cm<sup>3</sup>, of this measurement?<br><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="147" height="157"><br>A. ±0.01</p>
<p>B. ±0.1</p>
<p>C. ±0.15</p>
<p>D. ±1</p>
</div>
<br><hr><br><div class="question">
<p>Which graph shows the relationship between the pressure and volume of a sample of gas at constant temperature?</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAngAAAGlCAYAAABp34tWAAAgAElEQVR4nOzde1zUZd7/8Zd4SIQU8FgoeYg1NcE1tRKzNBU7uSh3LSKpe3vYJZVd2bpJybZdVKQ1cCl39qdWmiyadyqdTEKzezfwmAmlZWNq6OR5QEPHXA6/PxTzAMr5O3zn/Xw8fDxyvs7MJx94zXuu73V9rgYlJSUliIiIiIhpuBldgIiIiIjULAU8EREREZNRwBMRERExGQU8EREREZNRwBMRERExGQU8EREREZNRwBMRERExGQU8EREREZNRwKuA7OxsHnxwIHa73ehSRESkEmbOnElKSorRZYjUOQW8m3A4HERFTePAgf0sXrzY6HJERKSCNmzIICXlLWbOfB6r1Wp0OSJ1SgHvJlavXk1Q0AAA1q37kOzsbIMrEhGRm7Hb7cTFxQGQnPwasbGxBlckUrcU8G7AarUyc+bzTJkyBYBZs2YRFTUNh8NhcGUiInIjixcv5tFHHwMgJCQEgLS0NCNLEqlTCng3EBsbS3Lya/j6+gIwZMhQgoIGsHr1aoMrExGR8mRnZ7Nu3YdMmjTp8mNz5swhKmoqNpvNwMpE6o4CXjlKv+mVfvMrNWXKFK3nEBFxUqXrpmfNmoWPj8/lx/39/Zk7dx4LFy40sDqRuqOAV469e/cyZ86c6x739fXljTfe5MSJEwZUJSIiN2K32wkLG82QIUOvuxYaGmpARSLGaFBSUlJidBH1gZ9fe3JzDxtdhoiIVILGbnFVmsETERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATERERMRkFPBERERGTUcATqUMOh4MNGzKMLkNERExOAU+kjthsNsaNG4fVus/oUkRExOQU8ETqQHZ2NuHho5k8eRKRkZFGlyMiIibXyOgCRMxuw4YM4uLiSE5+lcDAQKPLERERF6CAJ1KLLBYLK1euIDV1Bb6+vkaXIyIiLkIBT6QWOBwO4uLiyMvLY/36dNzd3Y0uSUREXIjW4InUMJvNRnR0NB06dCAxMVHhTkRE6pwCnkgNslqthIePJjg4mMjISIU7ERExhG7RitSQrKwswsKeYuXKVfTv39/ockSkHHa7HR8fH6PLEKlVCngiNaB0M8XmzVu1mULEyfXqFUBu7mGjyxCpVQp4ItXgcDhITk7m4MGDrF2bplkBERFxClqDJ1JFdrud6OhoABITExXuROoRh8NhdAkitUoBT6QKbDYbI0eGEBAQQExMjDZTiNQjERFjOXxYt2jF3HSLVqSStJlCREScnQKeSCWkpaWRlJTIxo2b8Pf3N7ocERGRMingiVSAw+Fg6dKl5OTk6NgxERFxei4S8EooLLBz8vwttGrpDsVuNGrYwOiipJ5wOBxXbabQejuRulRIwclTnG/akpZNobhRIxoaXZJIPWDyTRZFFBzIYGHUCPp0D6TfkEXs2reKCU++xDtfn6bE6PLE6dlsNoYPDyYgIACLxaJwJ1JXSn7kQMZCoh7tQ/fe9zBk8Tb2vf0HnnxhNV8XFFXrpTt06MD33x+soUJFnJOJA14JhYfeZ2bob3k9vxcjh95+8WFPX3o0fJ/oMXP46Mh/jC1RnFp2djbh4aOZNWsWkZGRRpcj4kLOc+jdPxM6YTn5QU8w1APADc87OtPwg+cYE/sRR6rxDf22226joOBsTRUr4pRMHPDOsue9ZaQ5wkhY8CxP3O0NgFvrgTyXOINBeR+w9JNczeJJmTZsyCAqahrJya8yZMhQo8sRcS0X9vLea2tw/DqOBTEjufsWgCa0HjCVxNhh5K1dzScHfzK6ShGnZuKAl8f+L76DoH709Ll6xUaD27rQq8UZvj1+mupN9IsZWSwWFi1aTGrqCgIDA40uR8T12A/wxbeeBAXdxdXtw5twW5df0IIfOJ6nOzAiN2LiTRZN8PBqBt/m82Px1VdK8o5yoMADP28PMydcqaQrN1MsW7ZM6+1EjHKLB15NfuLb/HNcPXwXknf0BwpohfetJv74EqkBJs43rejz+CO02bWCZen7OVcCUMS5k7v50LKI94vuZ1T/Dmb+C5BKsNlsREdHExAQoJ2yIkbzCuTxsPbsejOV9EM/XlxKU3KOk19/hOW1dRTdN4z+HW+p8su3adOGvXv31li5Is7IxF+BGuL94O9YMPUbpv72Ud4CYDfh/f4G+DE8Lo7/8m9mbIniFKxWKxMnTmD69GhCQkKMLkdEGrThwd//ial7/8BvH3z94mMLwui3AGg1griUEPwbV73VVevWrTl9+nTN1CripEwc8EootBfhP20x6x/5nC2ff8WBvAs08e5MYNBA7vP3NvP/vFRQVlYWM2Y8T3z8PB07JuI0fsJ+oRvT3vqQR7Zu5fPdB8i70ATvTr0Ieqgf/l6NjS5QxOmZOOPY2bJwLOE7ItiYNp6Qng8aXZA4GYvFwsqVK3QyhYiz+XE7C381mR1T15I2PoSeDxldkEj9Y+KAV4jjTAE0bUwjHVohV3A4HCQnJ3Pw4EHWrk3Dx8fn5k8SkbpT6OBMPjRt3IjaGr7z8vJq6ZVFnEODkpISk7aCKyJvywLGjP4nTUPHMOLeznhdtWajEa0CBzGgk0eFXs3Prz25uYdrp1SpM3a7ndjYWDp27EhUVJQ2U4g4o5KTbHl5EqNXNCR03GPc28mbq27KurUhcNj9dGp68/hX1tjtcDjo2tVfY7qYmoln8Bwc2PwxXxUdh1VJ7Fh17XUfhiV/WOGAJ/WfzWYjPHw0kyZNJiIiwuhyRKQ8RblsXrGdIjusStrCdcM3ISRv60endlX7CNMXO3EFJp7BK6GwwM7JgvKaYbrR1KsVXk0r1ihFM3j1W1ZWFmFhT7Fy5SptphBxeoUUnDxFQWE5H08NmuLVxosKTOCVO3ZrTBezM/EM3gWO7HiXd77IL+d6E9o/HMGTAV51WpXUvZSUFBYvXsTGjZvw9/c3uhwRuZniI+x45x2+cJQ3/9CRhyeFEOCpTqYi5TFxwCskb/e7JCV9Xs71Nvyq6ygFPBNzOBwsXbqUnJwc7ZQVqU9K7OxevoCkQ+UcJtnwKbpG/IoAz6q/xX339cdqtepLn5iWiQOeBwFT3iV3ytWPlpw/xhcr43g2614iB7Y1pjSpdaXHjnl7e+tkCpH6pmEgUzK/5+rhu5jzJ3ayMjaOrKDfMLBVw3KeXDF33nlntZ4v4uxcbn67QdO29H4yjIcy/0rCR7mYdAGiS7PZbAwfHkxAQABz585VuBMxBTeatr6HJ8f2IfOlhXx0+ILRBYk4NZcLeD+zk304j3JuAEg9lZWVRXj4aGbNmkVkZKTR5YhIbSg6wOETCngiN2LiW7SFnMzZxGf7z179cEkBhzf9kzd/vIvf9L3DzH8BLmfDhgzi4uJITn6VwMBAo8sRkaoqOUHO+iz2/3T1PZaSswfZtHwFP7YJp281zxLv3r07339/UGvwxLRMnG/Ok7txPlFJu8u41oZ7p7zCpPt0goFZWCwWNm3apM0UImZQdIiNM6aQZC/jms8DTFnwG+67tXo3oDw9PSkoOHvzPyhST5k44HkQMCmVbaOv74PXoKkXbbya1toROFJ3SjdTACxbtkzr7UTMoFEAkzZ8zujr+uBVrn+piCszccBrQCPPlrS7cht9yTmOfmPlWOOGtGjRtEJNMsV52Ww2pk+fzqBBg7TeTsRUGuHZqi1XDd/nj/LNnmM0btScFk1r5gt6QUFBDbyKiHMy99egwh/YuuzPjH3ufY6UnGTLy2O4P/gxHh/8IKNmb+RIeV3SxelZrVbCw0cTHh6ucCdiOiUUHt3Csj//jufeO0RJXhYvjxpMcMgjDO4bxuxNNgqr+Q49evRgz549NVKtiDMyccAr5MSmhUTOepcC9yb8Z386C/6xk5ZPzSPllVGcXRzP4i1lLfAQZ5eVlcXEiROIj59HSEiI0eWISE0rOcqmV/6HWWvtuLs72L9uCf/4qi1Pxb/OK+EOFj/3Jlt+LDa6ShGnZuKAd4pd6Rs5GRjJnFkP0WDnv9la1IHgx4czcMQTPNLCSnr2YbVJqWcsFgszZjxPauoKnSkrYlb5X5G+9hiBz/yJWUMas/PjHRR5PMDjTwxhxIjBtDi+newDDqOrFHFqJl6Dd4Gz+eegbWu8G+fz5dZdFDXsRa8uzS9dL+LshSI1Oq4nHA4HcXFx5OXlsX59ujZTiJjZT2fJv3ALbds0p3H+N2zNtNMwqCddLu+cPc+Fai6xadasGZmZn1W/VhEnZeIZPC/8evjBVzl8+fU2Pv30CA3vfYA+vg3I2/5/fHz6dgZ2bUf1DruRumC324mOjqZFixY6dkzEFXh3oIdvAV/l7Obrzf/i0wte3Dvsl/gWnWD7ps843aQnXTs0rdZb+Pr6cuDA/hoqWMT5mDjgedIzZByPXHidCcGRLD/1SyZMHUKHvW/yVHgyBwKfZtwDbdUqxcnZbDZGjgwhKCiImJgYhTsRV3BLd0KiH+fCkokE/+5NTt39NFOHtWHvG1MJ//t3BE55igdamfgGlEgNMPG/kAY07hTK3z7058ntP9DIvy8D7vLg5DY3AsOSSH5xFN08NX/nzLKysggLe4qVK1dpvZ2IS3Gn03/N48Muv2L70cb497uXuzxPsq2wC2GJf+LF0B541tC3c4fDoS+OYkomDnhA4VGyP36Xt77qTcITDdjx8hhGL9xOEc3Zc6sPr88YzG2NNIfnjFJSUli8eBGbN2/VyRQiLqeEwmM5fPz+//LVL2N5ouHnvDxqIgu/OgMNv+bWlguZMci32h9gERFjOXz4sI4rE1My8S1atUmpjxwOBwkJCWRmZurYMRFXpTYpItVm4oCnNin1TemxY6dPnyYxMVHhTsRVqU2KSLWZOOBd3Sblm627KGp4t9qkOCmbzcbw4cEEBAQwd+5crYkRcWVXtUnZd7FNSr+abZMC0L17d3bv3l3t1xFxRiZeg3epTcrbOXz5dcNLbVKmXWyTkqU2Kc4kKyuLGTOeJz5+njZTiMjlNilv5+zm6yaZV7VJyaqhNikAnp6eN/9DIvWUiQPepTYpy59lQnARNOzD5AUX26Q8Ep7MgcAY/qo2KYZLS0sjKSmR5ORXCQwMNLocEXEGl9qkLP/jRIKXQMO7p7FgWBv2vjHxYpuU6bPUJkXkJhqUlJSY+C5lMeeP5PBZaZuUbq1pVLCbdevz6Tb8PjpVok2Kn197cnMP12KtrsdisbBp0yaSkpK03k5ErlZyjiNfbL7cJqVbq8YUfJnB+tO/YHhQpwq3SbnR2J2VlcUHH3zA3Llza7BwEedQ5a9AxdalhDz8Ars8/pu3tr7EQ82dcTmfG01v68WQEYEUFtg5ebKAVi3vYthINxo11NydUUo3UwAsW7ZM6+1EqqyAnUmhhCRdu47sdoZNn8kzox+ld7smhlRWbQ2acVvvhxlBIQUnT3GyoCUtuz3MyEaNamxpTevWrWvolUScTxVT2Xm+y8xg1y960J1PyNjprO1Giig4kMHCqBH06R5IvyGL2LVvFROefIl3vj6tDRYGsNlsjBs3joCAACwWi8KdSE3wiSZt/2Fycy/+OrgtntvTYxjz0jp+qK/dREp+5EDGQqIe7UP33vcwZPE29r39B558YTVfF6j/gcjNVC3gFX9P5pov6RU+kaf8T7Bm5WdOOIiUUHjofWaG/pbX83sxcujtFx/29KVHw/eJHjOHj478x9gSXUx2djbh4aMJDw8nMjLS6HJETMutXRBPh/Xh7LoNbDteaHQ5VXCeQ+/+mdAJy8kPeoKhHgBueN7RmYYfPMeY2I84UgPf0Nu3b09KylvVfyERJ1SFgFfMmX/9k4RdXRjU6wEeGNWHs+v+l4+/O1/z1VXLWfa8t4w0RxgJC57libu9AXBrPZDnEmcwKO8Dln6Sq1m8OpKVlUVU1DTi4+cREhJidDkirsHDB69mzrh85iYu7OW919bg+HUcC2JGcvctAE1oPWAqibHDyFu7mk8O/lTtt9EdBDGzKvzLt7Mz4xPO9voVj/dqR5dhT/Koxw7WZH6Pc03i5bH/i+8gqB89fa5esdHgti70anGGb4+fVqPjOmCxWJgx43lSU1eoDYpIHSg+msnylecYb/kdA51yffRN2A/wxbeeBAXdhc9VF5pwW5df0IIfOJ5XM3dgOnXqjN3urMuMRKqu8pssznxFxpoT9Iq5ny5u4Hb7AMJGtWbsms18N7Yr/k4zljTBw6sZfJvPtSfalOQd5UCBB37eHmbu9Gw4h8NBXFwceXl5rF+frm/LIrXFnkhI58RrHrydYQfzOMft1Ltub7d44NXkJ77NP3fNxEEheUd/oIBWeN9aM21SgoIGcOrUKXx8fG7+h0XqkUrmm2LO7PyENWf7MCrojktP9qH30MF47Mog06lu07aiz+OP0GbXCpal7+dcCUAR507u5kPLIt4vup9R/Tso4NUSm81GdHQ0HTp0IDExUeFOpDZds8kid89Gkp9uy8cv/pb4T08aXV3leQXyeFh7dr2ZSvqhHy8upSk5x8mvP8Ly2jqK7htG/463GF2liFOr3Feg4sN8snI9Z/mBFx++kxevuZywdAuj5jxE8zKfXNca4v3g71gw9Rum/vZRLi6j3U14v78BfgyPi+O//JsZW6JJ2Ww2wsNHM2nSZCIiIowuR8T1eHYlJOaPbF8TwYdf5PLnh1rVr672Ddrw4O//xNS9f+C3D75+8bEFYfRbALQaQVxKCP6Na6bVVelxZf7+/jXyeiLOolL/5ou/+4Q31p2m1182kja+6xWzXyf5NDaEsWs+YWfMQCfpiVdCob0I/2mLWf/I52z5/CsO5F2giXdnAoMGcp+/d/0a8OqJrKwswsKeYuXKVVpvJ2K4+roU5SfsF7ox7a0PeWTrVj7ffYC8C03w7tSLoIf64e/VuMbeSceViVlVIuNc6n3n8WveGuV/zYBx6Tbt8k/I2BnFQw+1quEyq8LOloVjCd8Rwca08YT0fNDogkwvJSWFxYsXsXnzVp1MIWKk4h/4dP4rLGc4ycM61b+A9+N2Fv5qMjumriVtfAg9H6q9t+rUqRNvv/22dveL6VT8333x92Su2YHHqMH0vm6Gzo3mA8cQ0+sEazK+4gyFHE2bip9fMEk7C2q24gorxHGmAJo2ppEOrahVDoeDhIQEMjMzWbs2TeFOpK7ZEwnp3B4/v0u/Og5iXlEob70XR8jtl06yOJrGRL/29EraidN3xit0cCYfmjZuVOvnhTdrpqU6Yk4mPou2iLwtCxgz+p80DR3DiHs743XVmo1GtAocxIBOHhV6NZ1FWza73U5sbCze3t7MmjVLmylEpPpKTrLl5UmMXtGQ0HGPcW8nb666KevWhsBh99Op6c3j383GbofDQdeu/hrfxXRMvAzNwYHNH/NV0XFYlcSOVdde92FY8ocVDnhyvdLNFGFho3UyhYjUnKJcNq/YTpEdViVt4brhmxCSt/WjU7vqf4SVfim12+1qlSKmYuKA50HApFS2jS6vGaYbTb2cYa1g/ZSVlcWMGc8THz9PmylEpGY1CmDShs8ZXVjODaYGTfFqU3MfXxERY9ULT0zHlAGv5PwPfLFpI5u/OQk+d3H/sAf55W3Nan0th6tIS0sjKSmRJUteV2sBEalBxZw/ks2mj7P4xg4+d/Vn2KBAbmtau9tEOnTowPffH9R4JqZivoD3n3288/ux/PGj3J8f+9sI4lLiGdu9hUJeNTgcDpYuXcqmTZtITV2hzRQiUoNK+M+B1fw+9Fk+Oll6iGRD/jZ8NimJ4XT3bHjDZ1fHbbfdhtW6jyFDhtbae4jUtXq3e/7GijmT+RYvfgTDX/gnGzK38n8fLODpW9fzUsLHHDbpdpK64HA4iI6OJicnh2XLlinciUgNO0Xmkr/xEY/yQuoGMrf+mw8Sn+bW9X8l4aNcanP47tGjB4cOHarFdxCpeyYLeA4O7s7m7K2PMHbMQH7RwZdOAY8z/jf3U5T5Od/kF938JeQ6NpuNcePGERAQgMVi0U5ZEal5RTZ2f3qIW0PGMGbAXXS4rRMBo57mN71+InPrPvJr8a3bt29PSspbtfgOInXPZAGvhMIL56GxB81uKb0Z24hbvbzhQgFnf9IUXmVlZ2cTHj6ayZMnaaesiNSekiIunC2i8a3NuHzKrFszvNrcwoX8s/xUi2/t7u7Offf1x2az1eK7iNQtkwU8qUkbNmQQFTWN+Ph5WpsiIqZ2zz338PXXe4wuQ6TGKOBJmSwWC3FxcaSmrlAbFBExvXvu6Y3Vus/oMkRqjPl20QKcXsPs3+7GpwFACY7DOwH4xx8n84F76a3bZvQY/yLTB7Q2qkqn5HA4iIuLIy8vj/Xr07XeTkTq1Ok1cfx2t8+ljgfnOLzjNGDhjxPf5/Jo5NaL8QnPMMC75nbWduvWnUWLFmspipiGyQJeAxo1aQpFu9mRcfC6q3v+/TE/T8C3wX1UeU2QXZPNZmP27NkEBATo2DERqVsNGtLEoyFF328n4/trL+7m3x/v/vm3DVswak7Nvr2vry/Hjh3ViRZiGiY+i7Zmmf0sWqvVysSJE5g+PZqQkBCjyxERqRGVGbsTEhJ44IEHtCxFTEFr8ISsrCwefngQ8fHzFO5ExGXdc09vsrOzjS5DpEYo4Lm4lJQUZsx4ns2bt+pbq4i4tG7durNy5QqjyxCpESZbgycV5XA4SE5O5uDBg6xdm6Y1JyLi8nx9fWnbth02m02n9Ui9pxk8F2S324mOjgYgMTFR4U5E5JIRI0awadMmo8sQqTYFPBdjs9kYOTKEgIAAYmJitFNWROQKgwYN4r333jO6DJFqU8BzIVlZWYSHjyY+fp56PYmIlKH01qyOLZP6TgHPRaSlpTFjxvMsWfK6NlOIiNyAbtOKGSjgmZzD4cBisZCenk5q6gr8/f2NLklExKkNGjSIxYsXGV2GSLVoF62JORyOqzZTaL2diMjNle6mzc7OJjAw0OhyRKpEM3gmZbPZGD48mICAACwWi8KdiEglTJ48ifXr1xtdhkiVKeCZUHZ2NuHho5k1a5Y2U4iIVEFQ0AAWLnwVu91udCkiVaKAZzIbNmQQFTWN5ORXGTJkqNHliIjUS+7u7syYEcu//vUvo0sRqRIFPBOxWCzExcWRmrpC60ZERKppyJAhJCUlGl2GSJUo4JmAw+EgMjKSnJwc1q9P1xE7IiI1wN/fn6CgAWRlZRldikilKeDVczabjejoaAICArRTVkSkhj3++OMsWLDA6DJEKk0Brx6zWq2Eh48mODiYyMhIhTsRkRpW2hhes3hS3yjg1VNZWVlMnDiB+Ph5hISEGF2OiIhpxcbGsmDBAhwOh9GliFSYAl49ZLFYmDHjeVJTV+jYMRGRWhYYGMidd95Jenq60aWIVJgCXj3icDhISEggJyeHtWvTtJlCRKSOTJkyhaSkRPXFk3pDAa+esNvtVx075uPjY3BFIiKuw9fXl0mTJjN//nyjSxGpEAW8esBmszFyZAhBQUHExMRoM4WIiAFCQ0PZt28fGzZkGF2KyE01MroAubGsrCzCwp5i5cpVWm8nImIgd3d3kpKSuP/+e9m8eauWyYhT0wyeE0tLS2PGjOfZuHGTwp2IiBPw9fVl5cpVhIePxmazGV2OSLkU8JyQw+HAYrGQnp5OauoK/P39jS5JREQu6d+/P5MmTWb27NlqnSJOSwHPyTgcDqKjozl06BCJiYm6BSAi4oQiIiIICAggOjpaIU+ckgKeE7HZbAwfHkxAQABz587VZgoREScWGRlJQEAAw4cH63atOB0FPCeRlZVFePhoZs2aRWRkpNHliIhIBURGRjJ9ejTh4aPJzs42uhyRyxTwnMCGDRnMmPE8ycmvMmTIUKPLERGRSggJCSE5+VWioqaRkpJidDkigAKe4SwWC4sWLSY1dQWBgYFGlyMiIlUQGBjI2rVp7Nmzh8jISKxWq9EliYtTwDOIw+EgMjKSnJwcli1bps0UIiL1nI+PD3PnziU0dBQTJ07AYrHoaDMxjAKeAWw2G+PGjSMgIIDExERtphARMZEhQ4ayfn06AL16BSjoiSEU8OqY1WolPHw04eHhREZGKtyJiJiQu7s7kZGR7NqVA8DIkSHMnDlTGzGkzjQoKSkpMbqI+sDPrz25uYer9RpZWVnMmPE88fHzdDKFiEgdqImxuyY4HA4yMz9j0aLFAIwYMYJBgwZpeY7UGgW8CqruIGGxWFi5cgWpqSv0D1pEpI44S8C7ktVqZcOGDaxcuYLu3XsQHBxM37599dkgNUoBr4KqOkg4HA7i4uLIy8tjzpw5+Pj41EJ1IiJSFmcMeFfKzs4mKyuLlStX0LZtO0aMGEHPnj3VVUGqTQGvgqoySNjtdmJjY+nYsSNRUVFabyciUsecPeBdyWazsWnTJjIzM/nww/eJiBjL4MGD6Natu2b3pNIU8CqosoOEzWYjPHw0kyZNJiIiohYrExGR8tSngHclu93ON998Q3Z2Nps2bWLLliwiIsbSr18/evToQfv27TVpIDekgFdBlRkksrKyCAt7ipUrV2kzhYiIgeprwLuW3W7n0KFDfPnll+zZs4eUlLe4777+3HPPPXTt2pVOnTrRoUMHLQOSyxTwKqiig0RKSgqLFy/SZgoRESdgloBXFpvNxvfff8/+/fvZs2cPmZmfceDAfh577Ak6duxI165d8fT04I47OgLg7+9vcMVSlxTwKuhmg4TD4WDp0qXk5OTwwgsvKNyJiDgBMwe8sjgcDg4fPsyJEyc4fvw4R44c4dChQ+Tl5fHhh+9f/nMREWMv/3eLFi3o2rXr5d+3adEcP/4AACAASURBVNOG1q1bX/59y5YtNTNYDyngVdCNBgmHw0F0dDTe3t7MmjVL6yJERJyEqwW8iigNgaVKw2CpvXv3cvr06cu/T0l566rn33dff+68887Lv782IML1IRHQusE6poBXQeUNEqWbKcLCRhMZGWlAZSIiUh4FvJpns9k4d+7c5d9fGxDh+pAI1wdFgMceewJvb++rHuvQoQO33XbbdX+2R48eZdajW89lc7GAV0yBdSOLE2JJ+vgHADyGRRP/TDgjere74bltZQ0SOplCRKSOFFjZuHgeU5PSOQvgEcz0+CmMHtGbdjcYvBXwnJvVar3use+/P0hBwdnrHt+2bdt1j1176/lKZYXHUv369Su3pk6dOtGsWbMyr9WnWUjXCnjFe1kaMoKENtN5a/Z/07fNST596beM/d9f8tbWl3ioefmjxLWDRFpaGklJiSQnv6qGlGI4u93Ozp2fM2TIUKNLEakF57EuncDDCU159q05TO3rw/FPX2b82PXc81Yacx5qVe4zFfBcV1nhEeDcuXMcOHCg3OeVFSRLTZkypcbX2GdlZXHHHXfU+Os2qtFXc3LF321mza6OTE6LoG+7JsDtDHw6lF5Ll5CxM4qHbjBIXMlisbBp0ybtlBWnsmjRYlavXkN0dLRuWYi5FH9P5pod+ExewTN9L95taTfwScJ6LSch4ytiHnqI5kbXKE7nRuPgjSZmQkJCaqOcch0/fpywsKeYO3ceoaGhNTZDeKO7kiZTTIFtP1b86XR708uPunUKYJDPCb48eIrim7yCw+EgMjKSnJwcli1bpnAnTsPHx4dly5YRHBzMww8PIiUlBYfDYXRZIjWj4AhW6y306dT651kJN18CBnXk7JcHOXazwVvEiYWEhLB581YyMzMZN25cuTOPleVSAe9cvp3r7+oDnCU37+xNA964ceMICAjAYrHUm3vw4jrc3d2vGyiys7ONLkuk+s7lc6zswRty7fyogCf1nK+vLxaLhfDwcCZOnEBCQkK1v6S71C3aivLza1/m41u2ZLFlSxbx8XPquCKRqnniicd44403tTZPXEZZ43d5Y7qIs1q48FXWrfuQ//u/f1X5NRTwylDWglwt1JX6pHSHd1DQAHr3vsfockTqzLXjtMZuqU8cDgfJycmsW/chs2bNqtZruVDAa0Qrv874sL+Max74eXu40v1qMSm73c78+fPJzPxM7XvEPFr50cMHdpd1zc+HWzV4iwls2JBBXFwcQUEDWLs2rdqnh7hQwAO3W33wYw3bv8knpN2lHbMnc9ltb03Pji0V8KReK23d8+ijj7F+fbrWiYp5uHng7fcTmdu/40xIh0s7ZvPI3X0Ej54daavBW+qxK7+Y12TrNZf6Z+HW5X5G9TrBmpSP2FtQDMU/8OnfX+djj8EM7a1z9qT+slqtpKamsmTJ68TExCjcibm43UHQqD6cXbOSNXvPABc4+uky/vFxc0YNvVstUqRemz9/Pi1atGD9+vQa7avrWo2OKabA+h7x02JYvufSlqzu45gzdxpjqnCShYiI1JGCvaTFP0vU8i8uPfBLnp7zItPG9NVJFiJlcLGAJyIiImJ+LnWLVkRERMQVKOCVp8DKxqQJdPNrj59fe/y6TSApbSdH1VBTRMSJFVNgzSBpYr+LY7dfe7pNTCRt59GbNrMXMRMFvDKdx/rOS/xmEUSu3sHB3P1ss3QiPSqKV/910ujiRESkPMVW3vnjVBbx36zetp/cg9uw3L6JqDF/519nFPHEdSjgleXywdZTLh1s3eTSwdYnWJPxFWeMrk9ERMpU/N1m1uzqyORnIujbrgm43c7Ap0PpdfYTMnbajS5PpM4o4JVFB1tfVmxdygi/fvwuLbfM2xs3u/6zQ6RNDMBvYhpHa6dUEXF5xRTY9mPFn063N738qFunAAb5nODLg6dc6DbteaxLx+DX7fek/XChCtevcDSNiX4BTEw7VCuVSu1QwCuLDra+7GLvwNOse+MTvrvu//s832VmsMtjOGGD2+uHSUQMVsy5fDtlD99nyc0760IBryldgobS6+x63vj4wPX/35fuVHmMGsng25sYUaDUMn0my425+TMq+td47Mog87vzV1+7PEAMpndz/SiJiDgTN//HiX66NbvWbL7uC/rFW9mt1SjaxPSpLDfhRvPegxnlsYM1md9f8S2wmIJd6azc1YeY8ffRHCg+up3lsU9UYOdaIUfTpuLnN5W0o4VlP3Y0jYl+/ZiY9Bqxw7te3smcvHUnW5NLdzd3ZXhsGtaC0ne4wNGdaVfsnuvK8Nh/svPoTW4/iIiYkg+9hw4u4wt6Prs+eJddvSYyfmArKD7KzuWxDK9Q14iylttc+dilsbzbBJLe+Pk1u038B1t3fkry5fH5CWLT9lJQ+hLFR9mZlsjEbu1/vr58uzpXVIMCXlkuHWxdJlc82Lr5fYyP6cOulensuhym7OxYvYo9vYYS1KUpFGznb+MjmHvssUs713bwVsBuZoRE8red+VV84x/4OP04fV/dTu6edP4S9CXznxzNn06Gs+lgLnvSpsDyGP74jpViiinY+Q/Gh8xl94A32ZN7mNw9awg79jdCxv+DnQUaJUTMrxGt/DpT9vDtgZ+3h4t96LnRfOAYYnp9ycoPvvw5TJ3ZxepFe+g16n66uOWz82+RhMw9yqOlXSPe6svuGaMZ/7ftPz+nss5+Rvp3fXl1z0H2ZMQTlDmbJ0Ne4WREGgdzvyJteiOWR/2Fd6zngUs1zPiWAWl7yM3NZU/GUxybG1G9Glyca/2sV9SVB1tfftCVD7ZuSpdhT/Lo96tYvePSLrQzX5GxBp6Ofhx/t2LO7HifRXv6EBMz/tLOtXb0nfo/xPTaw6LVu6q489iDXmFjGOHfHDy7EDTAHxjK7555kHZubngGDCDYp3RdTWngfIaYsT3wBPDswdiYZ+i154q6RcTU3G71wY9dbP/mii+WJ3PZbW9Nz44tXe9Dz60Tw/57EN8vep8dZ4qBYs7s/IQ1/JroUf64lYa9mP9hamnXiL7jiYnpw57Lz6mKPoSNH46/ZyM8/fsxwN8Dhk3gmYduxw0vAh58AB9Okvdj4c+BM2Y6Y7s2B9zw7PpkDdTg2lzuZ71CdLD1ddxuH0DYKC61iSkdIAYztLcPcI59X2zlrM89BHRqesWTWtKxZ+tq7Dy+hTZezS79kDbiVi9v8OmMX6tG1//R4lMc/PIE7HqBhzu2v3ybuOPDL7CLMxzLd1SlABGpZy5uDDvBmpSP2FtQDMU/8OnfX+djj9LxytU04fbBIxlFaZsYOzszPoFLa6cL9+3kw7MdGRTge0UgaELbjl3wOPsdB49VdYmLN163Xhqr3Zrh1eYWfHr40aqMP1l87CBfnj3LrhcfpmPpbWK/O3n4xf+Ds3byzyngVUUZn5QCTfH/rxdJtj5L1NDuvAhcPNg6iWkDy/rxdAU+9Al9ijvGfMLO59pyMDEN/5j/ZeANN1c4yD9Wt10DPZ5OYeuch1wyhIsI4ObPf72SgHVaDEO7z7j4WPdxzPnnMzcZr0yseS9CJ7dmTMZXPOd7kMTldxCz8eLa6cIyn3Cj3ci1pSNPv5XGnIdc9TO25rnoT3sFeHYlZM775OYevvTrfeY83Zd2Lvs35oZnr2DC/DP56M1VrNnVk1FBd1z6AWrGnb+8Fw/75+QcuGIhb/E58o//VMHb2uf54YC1GuVdmi1c8wk7NZ0v4sLc8PQPYc76vT+P3+vn8HTvdi78gedFr8d/hf+atbyZ9hG7StdOA43u7M1jHgfZlGO7YkNcIT/m54FHFzq2rUALlcITHKjGMhi3th3p6XFQBwnUMNf9eZfKc+vEsP++m/eSFmN9ehKj/Etvx7rRvM8TTO6+g4SEpWw/egGKj7L9tZdJ2NWdyaG9rplRc6OZlw8ebOOD9Xsp4AJHt6fw90W7q1HcxRnG7mffZt78TRd3XhUfZXvyBLr5jWGp9fxNX0FExKzcugzmvx/cTNKrtktrpy9daN6L0Mnd2ZXwMq9tP0oxFzi6fSkJCTvoPvkJ+lw36+mOV9vmkLme9XvPXBxn/76QRdVZ5ty8F6GT+3J2+SvM//QHLg7fWRd33I5YilXf2atEAU8q4dJaDo+O169F9OzL75emMLPth4T264xfxz6MzelBfJqF3/f2uuZ13Gg+8Bn+OWcoh18MprtfZwb9vx/pP+qX1ajNDc/ev2Np2ovcs+0Z+nVsf0UNrzDWv+nNX0JExKzc2jM4bDge161F9KL37y2kzWzHutA+dPTrTL+x2+kRv4Klv+97ccPaVVoxcFoSc0bZeHFod/w6juD/Ff2SUd09qlHcpRrmBLBtbD86+rWnY78/kNNjJmmLwn8Oo1IpDUpKSkqMLkJEREREao5ysYiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOCJiIiImIwCnoiIiIjJKOBVgNVqJTIyEofDYXQpIiJSCQkJCWzYkGF0GSJ1rpHRBTg7h8NBbGwsW7ZkERAQQGRkpNEliYhIBWRnZ7Nw4asAbN68FV9fX4MrEqk7msG7ifT0dFq2bAlAfPwcrFarwRWJiMjNOBwOoqKmATB37jxmz55tcEUidUsB7wZsNhtRUVOJjo4GIDn5NWJjY3WrVkTEyS1dupSgoAEAhIaGcurUKd2qFZeigHcDs2fPZu7cefj7+wMQEhJCy5YtSU9PN7gyEREpj9VqJT5+Ds8++ywA7u7uxMbGEhcXh91uN7g6kbqhgFeODRsyOHXqFKGhoVc9Hh0dTVTUVGw2m0GViYhIeUrXTScnv4aPj8/lxwMDA3n00ceYP3++gdWJ1B0FvHIsWrSY2NhY3N3dr3rc39+fuXPnsX37doMqExGR8hw+fJiWLVsSEhJy3bWoqCgyMz8zoCqRutegpKSkxOgi6gM/v/bk5h42ugwREakEjd3iqjSDJyIiImIyCngiIiIiJqOAJyIiImIyCngiIiIiJqOAJyIiImIyCngiIiIiJqOAJyIiImIyCngiIiIiJqOAJyIiImIyCngiIiIiJqOAJyIiImIyCngiIiIiJqOAJyIiImIyCngiIiIiJqOAJyIiImIyCngiIiIiJqOAJyIiImIyCngiIiIiJqOAJyIiIlIBdrvd6BIqTAFPRERE5AbsdjszZ87k7bffNrqUClPAExERESnHhg0ZjBwZQvfu3Rk/frzR5VRYI6MLEBEREXE2drud+fPns2/fPpYseR1/f3+jS6oUzeCJiIiIXKF01q5fv34sW7as3oU70AyeiIiICAA2m43Zs2cDkJq6Al9fX4MrqjrN4FWCw+EwugQRERGpBWlpadx//70EBwdjsVjqdbgDBbxKiY6OxmazGV2GiIiI1BCbzUZkZCTp6els3ryVkJAQo0uqEQp4lRAcHEx4+GisVqvRpYiIiEg1mW3W7kpag1cJISEhtGnThocfHsTKlavo37+/0SWJiIhIJV251m7z5q2mCnalNINXSf3792fz5q3MmPE8FovF6HJERESkEsw8a3clBbwq8PX1Ze3aNHJyckhISNDmCxERESdntVqJjIxk27Zt7NqVY5q1duVRwKsiHx8fEhMTgYubL+rT+XQiIiKuwuFwkJKSwsSJEwgNHcXcuXPx8fExuqxap4BXDe7u7sTExBAQEMDIkSHaYSsiIuJErFYr48aNY8+ePaxdm8aQIUONLqnOaJNFDYiMjCQwMJDw8NHEx8/T5gsREREDORwOVq9ezeLFi5g1a5ZLBbtSmsGrIf3792fJkteZMeN50tLSjC5HRETEJbnyrN2VFPBqkL+/P6mpK0hPT8disWjzhYiISB25cq3d5MmTXGatXXkU8GqYr68viYmJ5OTkEB0drZAnIiJSyzRrdz0FvFrg7u6OxWIhICCAcePGafOFiIhILXA4HFgsFiZOnEBsbKzLz9pdSQGvFkVGRjJ58iTCw0eTnZ1tdDkiIiKmkZ2dzfDhwZw5c4b169MJDAw0uiSnol20tWzIkKE0a+ZBVNQ0l93JIyIiUlMcDgfJycmsW/chycmvKtiVQzN4daB///6kpq4gLi5Ox5uJiIhUUemsHaBZu5twkYBXQmHBKY6eLKCwpIjCopI6r8DX15f169PJyclh5syZ2nwhIlIhhRScPMbJgkJKCgspMrocMYTD4SAhIYGoqGkkJ79KTEwM7u7uRpfl1Ewe8IooOJDBwqgR9OkeSL8hi9i1bxUTnnyJd74+TV3HPHd3dxITE+nQoQPR0dHafCEiUp6SHzmQsZCoR/vQvfc9DFm8jX1v/4EnX1jN1wWKea5Es3ZVY+KAV0LhofeZGfpbXs/vxciht1982NOXHg3fJ3rMHD468p86r8rd3Z3IyEiCgoIIDx+N1Wqt8xpERJzbeQ69+2dCJywnP+gJhnoAuOF5R2cafvAcY2I/4kjd34iROma320lISGDOnDmatasCEwe8s+x5bxlpjjASFjzLE3d7A+DWeiDPJc5gUN4HLP0kt85n8UpFREQQHz+Phx8eRFZWlkFViIg4oQt7ee+1NTh+HceCmJHcfQtAE1oPmEpi7DDy1q7mk4M/GV2l1KINGzIYOTIEX19fli1bplm7KjBxwMtj/xffQVA/evo0vOpKg9u60KvFGb49ftrQ9Rz9+/dn8+atzJjxPCkpKQZWIiLiROwH+OJbT4KC7uLqjmZNuK3LL2jBDxzPq/s7MFL77HY7M2fOZNGixSxZ8joRERGatasiEwe8Jnh4NYPj+fxYfPWVkryjHCjwwM/bw/C/AF9fX9auTSMzM5OEhARtvhARucUDryY/cTz/HFcP34XkHf2BAlrhfau6fJlN6axd9+7dWbZsGf7+/kaXVK8ZnW9qUSv6PP4IbXatYFn6fs6VABRx7uRuPrQs4v2i+xnVv4NT/AX4+PiQmJjI6dOndbyZiIhXII+HtWfXm6mkH/rx4lKaknOc/PojLK+to+i+YfTveIvRVUoN0axd7WhQUlJi3qWqJcf47K9/YOpr/8Z+1QU/hsf9PxLH9sSzQcVeys+vPbm5h2uhyKtZLBZWrlxBauoKfH19a/39REScUcmJf/HXZ/7Aa1uPX32h1QjiUuIZ270FFRm+62rslqrZsCGDuLg4Jk2aTGhoqIJdDTJxwCuh8NQRTjVrTsm+z9ny+VccyLtAE+/OBAYN5D5/70od41GXg0RWVhYzZjxPfPw8+vfvXyfvKSLiPH7ilO0MzXwK2bd1K5/vPkDehSZ4d+pF0EP98PdqXOFXUsBzTna7nfnz57Nv3z7mzJmj27G1wMQB7xSf/eXXhO+IYGPaePyreS+2rgcJq9XKxIkTmD49mpCQkDp7XxERw/34GX8ZNJkdU9eSNr5rtZbSKOA5n7S0NJKSEpk+PZrg4GDN2tUSE69SLcRxpgCaNqZRBW/DOhN/f39SU1cwffp0jhw5QmRkpNEliYjUjUIHZ/KhaeNGFboNK/WDzWZj9uzZAFqGVAdMPINXRN6WBYwZ/U+aho5hxL2d8Wp85VDRiFaBgxjQyaNCr2bUt0CHw0F0dDQAiYmJ+qYjIuZXcpItL09i9IqGhI57jHs7eXPVTVm3NgQOu59OTW8e/zSD5xzS0tKIippKcvJruitVR0w8g+fgwOaP+aroOKxKYseqa6/7MCz5wwoHPKO4u7tjsViwWCyMGzeOpKQkfesREXMrymXziu0U2WFV0hauG74JIXlbPzq1M/FHmElcOWu3efNWfX7VIRPP4JVQWGDnZEF5zTDdaOrVCq+mFVvd4QzfAkt3GyUnv6qu3iJiYoUUnDxFQWE5H08NmuLVxosKTOA5xdjtqjRrZywTf/25wJEd7/LOF/nlXG9C+4cjeDLAq06rqo4hQ4bSrJkHUVHTtMNWRMyr+Ag73nmHLxzlzT905OFJIQR4OkMnU7mWZu2cg4kDXiF5u98lKenzcq634VddR9WrgAcXjzdLTV1BePhowsJGa/OFiJhPiZ3dyxeQdKicwyQbPkXXiF8R4Fm3ZcnNadbOeZj4Fm3ZSs4f44uVcTybdS+vJYbT3bPhzZ+E803zl26+8Pb2ZtasWdp8ISImV8z5EztZGRtHVtDsCjeqd7ax26ysViuxsbHceeedPPvss/j4+Nz8SVKrXG5+u0HTtvR+MoyHMv9Kwke51Nd06+7uTmJiIi1atCA6OhqbzWZ0SSIitciNpq3v4cmxfch8aSEfHb5gdEHCxcmGlJQUJk6cwOTJk5g7d67CnZNwuYD3MzvZh/Mo5wZAveDu7k5MTAxBQUGEh49WyBMR11B0gMMnFPCMZrVaGTduHHv27GHt2jSGDBlqdElyBVOvwTuZs4nP9p+9+uGSAg5v+idv/ngXv+l7hyn+AiIiIujcuTP3338vK1eu0uYLEanfSk6Qsz6L/T9dfY+l5OxBNi1fwY9twunr38yg4sThcLB69WoWL17ErFmzFOyclBnyTTnOk7txPlFJu8u41oZ7p7zCpPvMM43cv39/Nm/eSnj4aCZNmkxERITRJYmIVE3RITbOmEKSvYxrPg8wZcFvuO9WF74BZaAr19qtXZum27FOzMSbLMrvg9egqRdtvJpW6gic+rJQt3R7eseOHYmKitLmCxGph8rrg1e5/qVQf8ZuZ6dZu/rHxF+BGtDIsyXt2rX7+Vfb5pB3jGMnf+Qnk8ZaX19fEhMTOX36NNHR0TgcDqNLEhGppEZ4tmp71fjd1gvyfjjGyYIL9XZzXH2ltXb1k4kDHlD4A1uX/Zmxz73PkZKTbHl5DPcHP8bjgx9k1OyNHCmvS3o95+7uzty5cwkICGD48GBtvhCReqaEwqNbWPbn3/Hce4coycvi5VGDCQ55hMF9w5i9yUah0SW6AIfDQUJCAhMnTiA2NlY7ZOsZEwe8Qk5sWkjkrHcpcG/Cf/ans+AfO2n51DxSXhnF2cXxLN5S1gIP84iMjCQ+fh7h4aPJysoyuhwRkYopOcqmV/6HWWvtuLs72L9uCf/4qi1Pxb/OK+EOFj/3Jlt+LDa6SlPLzs5m+PBgANavT9fxmPWQiQPeKXalb+RkYCRzZj1Eg53/ZmtRB4IfH87AEU/wSAsr6dmH63WblIro378/ycmvMmPG82zYkGF0OSIiN5f/FelrjxH4zJ+YNaQxOz/eQZHHAzz+xBBGjBhMi+PbyT6g5Se1oXTWLipqGsnJrxITE6O13PWUiQPeBc7mn4O2rfFunM83W3dR1PBuenVpful6EWcvFLnEWo7AwEBSU1ewaNFiLBaL0eWIiNzYT2fJv3ALbds0p3H+PrZm2mnYryddLu+cPc8Fky6xMZJm7czFxAHPC78efvBVDl9+vY1PPz1Cw3sfoI9vA/K2/x8fn76dgV3bUbGDyuo/X19fli1bRk5ODpGRkdp8ISLOy7sDPXwL+CpnN19v/hefXvDi3mG/xLfoBNs3fcbpJj3p2qGp0VWahmbtzMnEAc+TniHjeOTC60wIjmT5qV8yYeoQOux9k6fCkzkQ+DTjHmhbqVYp9Z27uzsWi4WAgADGjRunzRci4pxu6U5I9ONcWDKR4N+9yam7n2bqsDbsfWMq4X//jsApT/FAKxO3ca1DmrUzLxP3wQMo5vyRHD7b/gON/Psy4C4PTm5LZf7qFkx4cRTdPCs+f2e2XkppaWkkJSWyZMnr+Pv7G12OiMjVSs5x5IvNbD/aGP9+93KX50m2vfEaq9tE8GJoDzwr+O3cbGN3TbHb7SxevJjPP/+c2NhYBTsTMvEMHlB4lOyP3+WtfxfR9a4G7Hh5DPc/+RKrVv6JPyZ9ato2KRUREhJCfPw8Jk6coB22IuJkSig8lsPH7/8v/y7sxF0NP+flUUN5ct5yVj4XS9KnapNSHRs2ZDByZMjlpTsKd+Zk4oCnNik3079/f1JTVzBjxvPafCEizkNtUmqF3W5n5syZLFq0mCVLXiciIkJr7UzMxAFPbVIqwtfXl7Vr08jJyWHmzJnafCEixlOblBpXOmvXvXt3li1bpqU5LsDEAU9tUirKx8eHxMREWrRoQXR0NHa7a89siojB1CalxmjWznWZOOCpTUpluLu7ExMTQ1BQECNHhmiHrYgYR21SaoRm7VybifeZX2qTsvxZJgQXQcM+TF5wsU3KI+HJHAiM4a8u1ialIiIiIujcuTP3338vK1euon///kaXJCKu5lKblOV/nEjwEmh49zQWDGvD3jcmXmyTMn2W2qTcgN1uZ/78+ezbt0+dElyYa7VJ6daaRgW7Wbc+n27D76OTC7dJuRmr1crEiROYNGkyERERRpcjIq7mmjYp3Vo1puDLDNaf/gXDgzqpTUo5SltgTZ8eTXBwsG7HurAqBrxiCqyf8fEHy4hNSucsALczbPpMnhn9KL3bNanhMqurhMICOyfP30Krlu5Q7EajhpWbu3O1QQLAZrMxe/ZsAgICGD9+vAYKEadTwM6kUEKSdl/zuAfdn57B8+NH8ZB/8zKfWX8UUnDyFOebtqRlUyhu1KhSS2tcZewuHa8BXnjhBXx9fQ2uSIxWhTV4xRTsfI3/evhZ1hHGe3tyyc3NZc/GOfTYPZeQ8f9gZ4GzbF8vouBABgujRtCneyD9hixi175VTHjyJd75+rQ2WNyEr68viYmJHDp0iOjoaO2wFXFWPtGk7T9Mrn0fygAAGkpJREFUbu6lX3s+4LlW/yby4XEk7cw3urqqKfmRAxkLiXq0D91738OQxdvY9/YfePKF1Xxd4Or9D66WlpbG/fffS3BwMBaLReFOgKoEvILPWTxzCUxfyILpQ/H3dAPc8PQfyu//MpNHv1/IS+9YMT7ilVB46H1mhv6W1/N7MXLo7Rcf9vSlR8P3iR4zh4+O/MfYEusBd3d35s6dS0BAAMOHB2vzhUh94OnPw7//E/GP2kh6KQ2r8QNyJZ3n0Lt/JnTCcvKDnmCoB4Abnnd0puEHzzEm9iOO6Bs6NpuNyMhI0tPT2bx5KyEhIUaXJE6kkgGvmDM73mfRnp6EPd4Tz2tf7PbB/PGf60gd39UJtueeZc97y0hzhJGw4FmeuNsbALfWA3kucQaD8j5g6Se5msWroMjISGbNmkV4+Giys7ONLkdEbsatPYPDhuOxK4PM784bXU3lXNjLe6+twfHrOBbEjOTuWwCa0HrAVBJjh5G3djWfHPzJ6CoNpVk7uZlK5rBz7PtiK2d97iGgU1lb1Jvj37vLdcHPGHns/+I7COpHT5+rV2w0uK0LvVqc4dvjp12+0XFlDBkylOTkV4mKmsaGDRlGlyMiN+SGp29n/Pkeq63A6GIqx36AL771JCjoLnyuutCE27r8ghb8wPE817wDo1k7qSjjJ9pqTRM8vJrB8XyuPdGmJO8oBwo88PP2MPNfQK0IDAwkNXUFixYt1vFmIk7O7VYv2nCGY/n1bP3sLR54NfmJ4/nnrlnuU0je0R8ooBX/v717j4u6zvc4/moyc0QNJ1PXsQm1Oa14GshVS/BYXlC2Lc+IW0fxgpvINq7SiTqLSHp6bAHSabGwmo62u5qEnk7inDUTvGS7e8j1xiImp850IYyWNpvUwDGPjucPQS3xgoDDzLyfj4d/9Bv4zUcf03fev+/v+/l9u3cNvcekaNZOmqOZ+aYDXbv3aJtKWl0Phtz3Y3qWr2ZlycccPQVwkqMH97PBuYz1J4eTEHOzAt4VaNyguqKiAofDoeYLkXbK980h/kY3eoUHWAd8eBT3Te5L+e8KKTnwzemlNKeOcvB/NuJ84S1O3jWOmIjr/V3lVeN2u3nwwQfZuXMn5eUVmrWTy9LMfNORXhEDCPPsoeKTptZ01FGWn8kSVxm1fl/Uey3d736Y5+aaePPn95L43H7wPE/isPHMeeVvxD35GD+1dvZ3kQHLaDSSl5eHzWYjLS1NzRci7Y6PupqPcXMLVnP7WDhz2a7pyd2P/Ctze67n53dP5TkPeJ6bzLDxDl6pvYcnn7RjvS74H1Pv9XopKCggOXkWKSmzyc7OxmQyXfoXRWj2ThYGug25n5TIWax5cx8/fXTod9fbHdnNWudKihLimOX3C4xTnPCcxDpvOcU/3sOf97zHJ18fp2P3/kTFjuQua/dg3sbjqjAajTgcDlwuF4mJU/TEdJH2xPcZb68ppj56DrEDAm1br2/xHB/IvFc38OMdO9iz/xO+Pt6R7v2iib1nGNbw6/xdYJtzu91kZmZy6623sm6dS8FOmq35GafLj5idnUyJ/Rf8M1mkzx6DtQvUubeyPDeTVbc8zKvzYvD/ozU9/PnFGSTunsZW10zst9/t74KClt1up2fPniQnzyInZ7G2NxPxtzo3W5cvJuMPg/mVKwFroK1F+WYXL/5jCrvnrsM1087t9/i7oKvH6/Wydu1ali9fxsKFCxk7Ns7fJUmAuoL/7Q10GTyXN7Y+w4iD+YyJtGCxWIgck8n+QQtwrfgl9zTuZFHrItnSl+glZZxo3bovwwm8R+qg03V0CP6ZfL+LiYmhsHA1GRnz1XwhcrV58rD374vF0vAn8j7+7eA/4Pz9M8y8rfFy+wS1rrlYLONZUtbOu2pPeDlyCDpd1yGk9gt3u90kJSVRWVnJunUuhTtpkSDei/YkX//5OaZOeY1Ok6Yy4c7+hH9nzUYHekSNYkS/sMs6W6hsd9NSHo+HzMxMIiIiSE1N1fZmItJ8pw7y52dmM2X1tUxK+gl39uvOd27KGnoSNW44/TpdOv4FwtitWTtpC0Ec8C60R2MjE+PyN/CK/ebLOlsgDBLthdfrJT8/n6qqKrKysrR2RESa50QZS4ZMYInnQj9gJ3/nc9h7X3qVUXsfu89da/f4449rvJRWE8QB7xQn6jwcrLvQwzANdArvQXiny7tL3d4HifbI6XSyZs1qCgtX63lNItIMJ6g7+BV1Jy7w9XRNJ8J7hnMZE3jtduxuvBB+660N5OcvJSoqyt8lSZAJykbSU8c+5y/btrL9/YNg+iHDx93NHT/oHFJrOdoDh8NBVFQUw4ffyZo1r6v5QkQuwcexv+5l26Z3ed8Dph/GMG5UFD+4zAvxQLF3715SU+dx770/obi4REtZpE0E3wze/33If86dwWMbq88e6zGBpwpymBF5wxWHvPZ6FRgI3G43ycmzePTRND2gU0Qu4BT/98kbzJ30OBsPNm4ieS094p+mIC+RyC7XXvS3L6Q9jd2atZOrKbgui/BxpPRVFm2E+CdeY0vpDv7w5nNM71rMk7mb+Cy4omzAsFqtFBaupqSkBKfTqZ0vRKQJX1H6yvNs5F6eKNxC6Y4/8WbedLoW/xu5G6sJ9OF77969xMePB6C4uEThTtpckAU8L1X791Lf9cfMmDqSv7vZTD/bfcz82XBOlu7h/UMnL30KaRNms5m8vDwqKipIS0tTyBOR7zpZw/53DtDVPpWpI37IzT/ohy1hOj+L/pbSHR9yyN/1XSGv10tubi6pqfPIz19Kenq6bsnKVRFkAe8UJ44fg+vC6Hx9483YDnQN7w7H66j/NtCvAQOb0WjE6XRis9mIjx+v7c1E5KxTJzlef5LrunbmzC6zhs6E97ye44fq+daftV0hzdqJPwVlk4W0bw6HA6v1VhITp2gdiogEHY/Hw/Lly9mzZ4/GOPGbIJvBk0Axdmwc+flLSU2dx5Ytm/1djohIq9iyZTMTJ9oxm82sXLlS4U78Jjhn8A4X8fTP92O6BuAU3s/KAHj5sRTeNDbeuu3MoJmLeHTETf6qMuRFRUVRWLiaxMQpuN0f4nA4/F2SiPjZ4aKn+Pl+U8MTD47y2e7DgJPHktdzZuWaIZqZuXMY0f3KOmvbgsfj4dlnn+XDDz/klVd+g9Vq9XdJEuKCLOBdQ4eOneDkfnZvrjrv1co/baLyzH/1xJhwoYcgy9ViNpspLi4hLS2NBQsWsHDhQi1AFglF11xLx7BrOfnpLjZ/+v0X9/OnTefsSnTtDSRkXc3iLm7Lls089dRTzJ6dojFM2o3gew5eG2lPz1IKRl6vlxUrVlBRUcETTzyhnS9EpFW05dh97qxdVlaWZu2kXdEaPGkXjEYjDoeD8ePHN9yydfu7JBGRC2pcaxcZGcnKlSsV7qTdCbJbtBLo7HY7PXv2ZMyYUdreTETaHa21k0ChGTxpd2JiYti+fQcZGfMpKCjwdzkiIgC4XC4mTrQzbNgwzdpJu6cZPGmXzGYz69a5yMzMpKamhtTUVC1cFhG/qKmp4emnnwagsHC11ghLQNAMnrRbJpOJvLw8Dh8+TFpaGh6Px98liUiIcblcDB9+J+PHj8fpdCrcScBQwJN2zWg0kp2djc1mY+JEu7Y3E5GroqamBofDQUlJCdu378But/u7JJFmUcCTgOBwOMjJWUxi4hTeffddf5cjIkFMs3YSDLQGTwJGTEwMr7zyG5KTZ/Hoo2m6ohaRVnXuWrvt23co2ElA0wyeBBSr1Uph4WoKCwtxOp14vV5/lyQiQUCzdhJsFPAk4DRu4l1RUUFaWppCnohcMbfbzYMPPsjOnTspL6/QnQEJGgp4EpCMRiNOpxObzUZSUpKaL0SkWbxeLwUFBSQnzyIlZTbZ2dmYTCZ/lyXSahTwJKA5HA5SUmaTmDiFvXv3+rscEQkAbrebpKQkKisrWbfOxdixcf4uSaTVqclCAt7YsXF07hxGauo8cnIWa3szEWmS1+tl7dq1LF++jIULFyrYSVDTDJ4EhZiYGAoLV5ORMR+n0+nvckSkndGsnYQaBTwJGmazmeLiEioqKliwYIGaL0QEQGvtJCQp4ElQMRqN5OXlcfPNN5OWlqbmCxEB0KydhBwFPAk6RqMRh8NBbGwsiYlTFPJEQty0adM0aychRwFPgta0adPIyVnM8OF3anszEREJKQp4EtRiYmLYvn0HGRnzKSgo8Hc5IiIiV4UCngQ9s9nMunUuSktLyc3NVfOFiIgEPQU8CQkmk4m8vDwOHz6s7c1ERCToKeBJyDAajWRnZ2Oz2YiPH6/mCxERCVoKeBJyHA4HOTmLSUycouYLEREJSgp4EpJiYmLIz19KRsZ8XC6Xv8sRERFpVQp4ErKioqIoLFxNYWGhtjcTEZGgooAnIc1sNrNy5UoqKipwOBxqvhARkaCggCchz2g04nQ6sdlsJCUlqflCREQCngKeSAOHw0FiYiKJiVPYu3evv8sRERG5Ygp4Iuew2+3k5CwmNXWeOmxFRCRgKeCJfE9MTAyFhavJyJiv5gsREQlICngiTTCbzRQXl1BRUcGCBQvUfCEiIgFFAU/kAoxGI3l5edxwww2kpaXh8Xj8XZKIiMhlUcATuQij0Uh6ejqxsbFMnGhXh62IiAQEBTyRyzBt2jRychYzfPidar4QEZF2TwFP5DLFxMSwffsOMjLmU1BQ4O9yRERELkgBT6QZzGYzhYWrKS0txel0qvlCRETaJQU8kWYym83k5eVx4MAB0tLSFPJERKTdUcATuQJGo5Hs7GxsNhvx8ePVfCEiIu2KAp5ICzgcDhYuXEhi4hQ1X4iISLuhgCfSQmPHxpGfv5SMjPls2bLZ3+WIiIgo4Im0hqioKAoLV7Ns2XJtbyYiIn6ngCfSSsxmMytXrqSiogKHw6HmCxER8ZsQC3g+6tybWZI8DIulLxZLXwYm5+Eqq8Xn79IkKDRub2az2UhKSlLzhUhrqXOzdcksBjaM3ZaBs1jiKqNWg7dIk0Ir4PncvPHYXJbxEGt3fkx11U6cfbaROvUl/nhEo4S0DqPRiMPhIDExkcTEKbjd7jZ/T6/Xe1XeR8Q/juF+40l+tgwca3dTVf0xO539KElNZekfD/q7OJEWqampaZO9zkMq4Pk+2k5ReQQpc6YxtHdHMPRh5PRJRNe/zeYybSQvrctut5OTs5jk5Flt3mHr8XhITp7FggUL2mSgEPEr36eUFu3GlPIL5gztjYGO9B75AJOjv6Ro83sc8Xd9Ii2wbds2Jk60t3qTXggFPB91NR/jxkq/Pp3OHDX0szHK9CX7qr7SbVppdTExMRQWriYjY36bNl+YzWaKi0u44YYb2mSgEPGrur/idl/PkH430aHxmMGMbVQE9fuq+EKDtwSwadOmkZ+/lGXLluNwOFptaU9IBbyjhzzUN/laPdVf1yvgSZswm82sW+eioqKC3NzcNmu+MBqNpKent8lAIeJXRw/xRdODN1R7+EaDtwS4qKgoVq5cSWxsLMOH34nL5Wrxd0WHS/9I6LFY+jbruEhzvPji0qv2Xhs2rGf9+g1ERUVdtfcU8aemxmmN3RJoUlPnctddMbz++utXfA4FvCZUV3923jGLpW+Tx0Way+PxYDKZ2vQ93G43mZmZAPTo0aNN30ukPfn+OK2xWwKJ1+ulpKSE1NS5TJgwoUXnCqGA14Eelv6Y+LiJ18KwdA8LpfvV4kdtGe68Xi9r165lwYL55Oe/gN1ub7P3ErlqelgYZIL9Tb1mMdFVg7cEgcYL8xtvvJGtW7dhtVpbdL6Q+t/C0NWEhXJ2vX/o7MGD1ez33MTtETeG1j+GBJ29e/cSHz+eyspKtm/foXAnwcMQRnfLt5Tu+uicjtmvqd7/V8Juj6CXBm8JYF6vF6fTyZgxo0hMTMTpdLY43EGoBbwBw0mI/pKigo18UOcD3+e889Jv2BQ2mrjBbXvLTKQtud1uUlPnsXDhQrKzszGbzf4uSaT1GG4hNmEI9UVrKPrgCHCc2ndW8vKmbiTE/T3d/F2fSAs89dRTHDhwgPLyila9ML/m1KlTp1rtbO2ejzr378mZl86qyoaWrMgksrLnMXVw74umXa3jEBHxo7oPcOU8TuqqvzQcuIPpWYuYN3UovS8yeGvsllAVYgFPREREJPiF1C1aERERkVCggHch2thaRCQA+ahzb2ZJ8rDTY7elLwOT83CV1eph9hJSFPCapI2tRUQCks/NG4/NZRkPsXbnx1RX7cTZZxupU1/ij0cU8SR0KOA1RRtbi4gEJN9H2ykqjyBlzjSG9u4Ihj6MnD6J6Pq32Vzm8Xd5IleNAl5TtLH1GT73CiZYhvGwq7rJ2xuXev2sA7iSbViSXdS2TakiEvJ81NV8jBsr/fp0OnPU0M/GKNOX7Kv6KoRu0x7DvWIqloGP4Pr8+BW8fo5aF8kWG8muA21SqbQNBbymaGPrM04/O/Awb/32bT467+99jI9KN1MeFs/k0X31YRIRP/Nx9JCHpofveqq/rg+hgNeJAbFxRNcX89tNn5z/9264UxWWMJHRfTr6o0BpY/pOloszWElI+yfCyjdT+tGx7752ZoAYzeBu+iiJiLQnBut9pE2/ifKi7eddoJ++lX2THhQdxPStLJdgoNvg0SSE7aao9NNzrgJ91JWXsKZ8COkz76Ib4KvdxarM+y+jc+0Eta65WCxzcdWeaPpYrYtkyzCSl7xAZvxtZzqZ83eUsSO/sbv5NuIzXbjrGt/hOLVlrnO6524jPvM1ymovcftBRCQomRgcN7qJC/RDlL/5X5RHJzNzZA/w1VK2KpP4y3pqRFPLbc491jCWD5zFkt+ePefA5JfZUfYO+WfG5/vJdH1AXeMpfLWUufJIHtj37OurdunJFS2ggNeUho2tmxSKG1t3u4uZ6UMoX1NC+Zkw5WH32tepjI4jdkAnqNvF8zOnkf3FTxo613bzqm0/GXYHz5cduujpL+xzNpX8jaFLd1FdWcKvYvfx7ANT+NeDiWyrqqbS9QtYlc5jb7jx4aOu7GVm2rPZP+J3VFZ/RnVlEZO/eB77zJcpq9MoIRL8OtDD0p+mh+8wLN3DQuxLz0C3kVNJj97Hmjf3nQ1TR8pZu6yS6IThDDAcoux5B/bsWu5tfGrEq0PZnzGFmc/vOvs7zVX/35R8NJSllVVUbs4htvRpHrD/moPTXFRVv4fr0Q6sSv0Vb7iPAQ01ZPwvI1yVVFdXU7n5Qb7IntayGkJcaH3WL5c2tv6eTgwY9wD3fvo6a3c3dKEdeY/NRTA97T6sBh9Hdq9nWeUQ0tNnNnSu9Wbo3F+SHl3JsrXlV9h5HEb05KlMsHaDLgOIHWEF4nh4zt30NhjoYhvBeFPjuprGwDmH9BmD6ALQZRAz0ucQXXlO3SIS1AxdTVgoZ9f751xYHqxmv+cmbo+4MfS+9Az9GPfQKD5dtp7dR3yAjyNlb1PEP5GWYMXQGPbSf8ncxqdGDJ1JevoQKs/8zpUYwuSZ8Vi7dKCLdRgjrGEwbhZz7umDgXBsd/8DJg7y9TcnzgbO9EeZcVs3wECX2x5ohRpCW8h91i+LNrY+j6HPCCYn0PCYmMYBYjRxg03AUT78yw7qTT/C1q/TOb90IxG339SCzuPr6RneueFD2oGu4d3B1B9Ljw7n/6jvK6r2fQnlTzAmou+Z28QRY56gnCN8cch7JQWISIA53Rj2JUUFG/mgzge+z3nnpd+wKaxxvAo1HekzeiIJND4mxkPZ5rehYe30iQ/L2FAfwSib+ZxA0JFeEQMIq/+Iqi+udIlLd8K7NozVhs6E97we0yALPZr4Sd8XVeyrr6d80RgiGm8TW25lzKI/QL2HQ0cV8K5EE9+UAp2w/nQR+e7HSY2LZBFwemPrJcwb2dTHMxSYGDLpQW6Z+jZl/9KLqjwX1vT/ZORFmyu8HPri6j41MGx6ATuy7gnJEC4igMHKT3+di3teOnGRGaePRSaR9dqcS4xXQaxbNJNSbmLq5vf4F3MVeatuIX3r6bXTJ5r8hYt1I7eVCKa/6iLrnlD9jm19IfppvwxdbsOetZ7q6s8a/qwna/pQeofsv5iBLtHjmWwtZePvXqeo/HYSYm9p+AB15tY77iTMs4eKT85ZyOs7yqG/fXuZt7WP8fkn7haU1zBbWPQ2ZZrOFwlhBrpY7WQVf3B2/C7OYvrg3iH8hRdO9H3/iLVoHb9zbaS8ce000OHWwfwkrIptFTXnNMSd4JtDX0PYACJ6XcYjVE58ySctWAZj6BXB7WFV2kiglYXu512az9CPcQ/9Pb9fshz39NkkWBtvxxroNuR+UiJ3k5u7gl21x8FXy64XniG3PJKUSdHfm1Ez0DncRBg7ebP4A+o4Tu2uAl5atr8FxZ2eYYys/w8WP7vtdOeVr5Zd+bMYaJnKCvexS55BRCRYGQaM5qG7t7NkaU3D2umGF7pFMyklkvLcZ3hhVy0+jlO7awW5ubuJTLmfIefNehoJ79UNSosp/uDI6XH2pRdZ1pJlzt2imZQylPpVv+bZdz7n9PD97umO2wkrcOua/Yoo4EkzNKzlCIs4fy1il6E8sqKABb02MGlYfywRQ5hRMYgcl5NHBod/7zwGuo2cw2tZcXy2aDyRlv6M+vdviEm4owW1Gegy+GFWuBbxo51zGBbR95wafs0Ma6dLn0JEJFgZ+jJ6cjxh561FDGfwI05cC3rz1qQhRFj6M2zGLgblrGbFI0NPN6x9Rw9GzltCVkINi+IisURM4N9P3kFCZFgLimuoIcvGzhnDiLD0JWLYP1MxaAGuZYlnw6g0yzWnTp065e8iRERERKT1KBeLiIiIBBkFPBEREZEgo4AnIiIiEmQU8ERERESCjAKeiIiISJBRwBMREREJMgp4IiIiIkFGAU9EREQkyCjgiYiIiAQZBTwRERGRIKOAJyIiIhJkFPBEREREgowCnoiIiEiQUcATERERCTIKeCIiIiJBRgFPREREJMgo4ImIiIgEmf8HV0uManBw5HYAAAAASUVORK5CYII="></p>
</div>
<br><hr><br><div class="question">
<p>What can be deduced from the mass spectrum of CH<sub>3</sub>COCH<sub>2</sub>CH<sub>2</sub>CH<sub>3</sub>?</p>
<p style="text-align:center;"><img 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"></p>
<p style="text-align:center;"><em>NIST Mass Spectrometry Data Center Collection (C) 2021 copyright by the U.S. Secretary of Commerce on behalf of the United States of America. All rights reserved. 2-Pentanone Mass Spectrum, MS Number 291264. [graph] Available at: https://webbook.nist.gov/cgi/cbook.cgi?ID=C107879&Units=SI&Mask=200#Mass-Spec2-pentanone [Accessed 4 May 2020]. source adapted.</em></p>
<p><br>A. The molar mass is 43 g mol<sup>−1</sup>.</p>
<p>B. The atoms have many isotopes.</p>
<p>C. The most likely bond to break is C–C between carbons 2 and 3.</p>
<p>D. The signal with the largest mass is due to the oxidation of the ketone in the spectrometer.</p>
</div>
<br><hr><br><div class="question">
<p>A student performed an experiment to find the melting point of sulfur, obtaining 118.0 °C. The literature value is 115.2 °C. What was the percentage error?</p>
<p><br>A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>118</mn><mo>.</mo><mn>0</mn><mo>-</mo><mn>115</mn><mo>.</mo><mn>2</mn></mrow><mrow><mn>115</mn><mo>.</mo><mn>2</mn></mrow></mfrac><mo>×</mo><mn>100</mn><mo>%</mo></math></p>
<p>B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>115</mn><mo>.</mo><mn>2</mn></mrow><mrow><mn>118</mn><mo>.</mo><mn>0</mn></mrow></mfrac><mo>×</mo><mn>100</mn><mo>%</mo></math></p>
<p>C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>118</mn><mo>.</mo><mn>0</mn><mo>-</mo><mn>115</mn><mo>.</mo><mn>2</mn></mrow><mrow><mn>118</mn><mo>.</mo><mn>0</mn></mrow></mfrac><mo>×</mo><mn>100</mn><mo>%</mo></math></p>
<p>D. <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mrow><mn>118</mn><mo>.</mo><mn>0</mn></mrow><mrow><mn>115</mn><mo>.</mo><mn>2</mn></mrow></mfrac><mo>×</mo><mn>100</mn><mo>%</mo></math></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">What is the index of hydrogen deficiency (IHD) in cyclohexanol?</span></p>
<p><img style="display: block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="65" height="101"></p>
<p>A. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>0</mn></math></p>
<p>B. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>1</mn></math></p>
<p>C. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn></math></p>
<p>D. <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>3</mn></math></p>
</div>
<br><hr><br><div class="question">
<p>A student performs an acid-base titration using a pH meter, but forgets to calibrate it. Which type of error will occur and how will it affect the quality of the measurements?</p>
<p>A. Random error and lower precision</p>
<p>B. Systematic error and lower accuracy</p>
<p>C. Systematic error and lower precision</p>
<p>D. Random error and lower accuracy</p>
</div>
<br><hr><br><div class="question">
<p>What is always correct about the molecular ion, M<sup>+</sup>, in a mass spectrum of a compound?</p>
<p>A. The M<sup>+</sup> ion peak has the smallest <em>m/z </em>ratio in the mass spectrum.</p>
<p>B. The <em>m/z </em>ratio of the M<sup>+</sup> ion peak gives the relative molecular mass of the molecule.</p>
<p>C. The M<sup>+</sup> ion is the most stable fragment formed during electron bombardment.</p>
<p>D. The M<sup>+</sup> ion peak has the greatest intensity in the mass spectrum. </p>
</div>
<br><hr><br><div class="question">
<p>What can be determined about a molecule from the number of signals in its <sup>1</sup>H<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>NMR spectrum?</p>
<p>A. Bonds present</p>
<p>B. Molecular formula</p>
<p>C. Molecular mass</p>
<p>D. Number of hydrogen environments</p>
</div>
<br><hr><br><div class="question">
<p>Which graph represents the relationship between the amount of gas, n, and the absolute temperature, T, with all other variables in the ideal gas equation, <em>PV = nRT</em>, held constant?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="question">
<p>The enthalpy of combustion of a fuel was determined using the calorimeter shown. The final result was lower than the literature value.</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" 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PE9oDV8lnkd42RoEIAABCAAAQjw5LHve8DSFGpr9U2U0UEAAhCAAAQgwJPHju8BreGzzOsYJ0ODAAQgAAEIQIAnj33fA5amUFurb6KMDgIQgAAEIAABnjx2fA9oDZ9lXsc4GRoEIAABCEAAAjx57PsesDSF2lp9E2V0EIAABCAAAQjw5LHje0Br+CzzOsbJ0CAAAQhAAAIQ4Mlj3/eApSnU1uqbKKODAAQgAAEIQIAnjx3fA1rDZ5nXMU6GBgEIQAACEIAATx77vgcsTaG2Vt9EGR0EIAABCEAAAjx57Pge0Bo+y7yOcTI0CEAAAhCAAAQO5cnjn/zpq47/5jOwNIXaWszT/HmCGcyWvgfY7SAAAQhYEmj6yePS/6D2Xl9r+CzzemfK+DB6h3wPWG4e1IIABI6XQJPm8ZD/cW5Ju6Up1NZqafxowehxD8j3wPFueYwcAhCwINCceeQfe/kf+xIuWsNnmVeikz52cw5LWGrvAYsNhBoQgMBxEmjKPGr/0SNPt0FamkJtLeZGNzdwglML98BxbnuMGgIQ2JUA5rHjN+NoDZ9lXgsbIhowZtwDuntg1w2E/hCAwHESaMY88o+97h/7OZwsTaG21hx95NrPOUxhOvceOM6tj1FDAAK7EMA88uTRaY2hJm/uxkU+Zod7oO49sMsGQl8IQOA4CWAeMY+Yx47vAYxZXWN2CPyPc+tj1BCAwC4EMI8dGwfNk0LrnEPYLNGIoeIeWN8Du2wg9IUABI6TAOYR88iTx47vAUzS2iTBQmZxnFsfo4YABHYhgHns2DhYP1XU1GODljdouMCl1Xtglw2EvhCAwHESwDxiHnny2PE90KphQVc7Zvo4tz5GDQEI7EIA89ixcdA8KbTOwRS0YwqYC+ZCcw/ssoHQFwIQOE4CmEfMI08eO74HNOaBnOM2mce59TFqCEBgFwKYx46Ng/VTRU09jMhxGxHm//Dmf5cNhL4QgMBxEsA8Yh558tjxPYCZOzwzt+85O86tj1FDAAK7EMA8dmwcNE8KrXP2vfFxPcwR98Bu98AuGwh9IQCB4ySAecQ88uSx43sAY7WbsToGfse59TFqCEBgFwKYx46Ng/VTRU29Y9hsGSOGrKd7YJcNhL4QgMBxEujWPB7ndG6OWmP2rHM2FfAKAhCwJmBtXK31UQ8CEOifAOax4zm2Noaaeh3jZGgQaIIA5rGJaUAEBI6aAOax4+nXmD3rnI5xMjQINEEA89jENCACAkdNAPPY8fRbG0NNvY5xMjQINEEA89jENCACAkdNAPPY8fRrzJ51Tsc4GRoEmiCAeWxiGhABgaMmgHnsePqtjaGmXsc4GRoEmiCAeWxiGhABgaMmgHnsePo1Zs86p2OcDA0CTRDAPDYxDYiAwFETwDx2PP3WxlBTr2OcDA0CTRDAPDYxDYiAwFETwDx2PP0as2ed0zFOhgaBJghgHpuYBkRA4KgJYB47nn5rY6ip1zFOhgaBJghgHpuYBkRA4KgJYB47nn6N2bPO6RgnQ4NAEwQwj01MAyIgcNQEMI8dT7+1MdTU6xgnQ4NAEwQwj01MAyIgcNQEMI8dT7/G7FnndIyToUGgCQKYxyamAREQOGoCmMeOp9/aGGrqdYyToUGgCQKYxyamAREQOGoCmMeOp19j9qxzOsbJ0CDQBAHMYxPTgAgIHDUBzGPH029tDDX1OsbJ0CDQBAHMYxPTgAgIHDUBzGPH068xe9Y5HeNkaBBoggDmsYlpQAQEjpoA5rHj6bc2hpp6HeNkaBBoggDmsYlpQAQEjpoA5rHj6deYPeucjnEyNAg0QQDz2MQ0IAICR00A89jx9FsbQ029jnEyNAg0QQDz2MQ0IAICR00A89jx9GvMnnVOxzgZGgSaIIB5bGIaEAGBoyaAeex4+q2NoaZexzgZGgSaIIB5bGIaEAGBoyaAeex4+jVmzzqnY5wMDQJNEMA8NjENiIDAURPAPM6c/pzZmllq8fSc1qXaFh8UF4BAQwRy62gpmZjHpchSFwIQ0BLAPGpJOedyG0Vom1Fu8dSgaZ/HxQfFBSDQCAHNulpCKuZxCarUhAAE5hDAPM6gVWuzmCFxI1Wj1zpnQwAvINAxAc3aWWL4mMclqFITAhCYQwDzqKSl2ShCjrLk4mlBzz6Piw+KC0CgAQLaNbWEVMzjElSpCQEIzCGAeVTS0m4WPq+VnzmarXJbGTs6ILAkgTnrxVoH5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUErcSpuj2Sp3SwQBCHRIYM56sR4+5tGaKPUgAIG5BDCPSmI1NwulxK20OZqtcrdEEIBAhwTmrBfr4WMerYlSDwIQmEsA86gkVnOzUEosSut1XEUw6AQBJYGa6wbzqJwk0iAAgcUIYB6VaGtuFkqJRWm9jqsIBp0goCRQc91gHpWTRBoEILAYAcyjEm3NzUIpsSit13EVwaATBJQEaq4bzKNykkiDAAQWI4B5VKKtuVkoJRal9TquIhh0goCSQM11g3lUThJpEIDAYgQwj0q0NTcLpcSitF7HVQSDThBQEqi5bjCPykkiDQIQWIwA5lGJtuZmoZRYlNbruIpg0AkCSgI11w3mUTlJpEEAAosRwDwq0dbcLJQSi9J6HVcRDDpBQEmg5rrBPConiTQIQGAxAphHJdqam4VSYlFar+MqgkEnCCgJ1Fw3mEflJJEGAQgsRgDzqERbc7NQSixK63VcRTDoBAElgZrrBvOonCTSIACBxQhgHpVoa24WSolFab2OqwgGnSCgJFBz3WAelZNEGgQgsBgBzKMSbc3NQimxKK3XcRXBoBMElARqrhvMo3KSSIMABBYjgHlUoq25WSglFqX1Oq4iGHSCgJJAzXWDeVROEmkQgMBiBDCPSrQ1NwulxKK0XsdVBINOEFASqLluMI/KSSINAhBYjADmUYm25mahlFiU1uu4imDQCQJKAjXXDeZROUmkQQACixHAPCrR1twslBKL0nodVxEMOkFASaDmusE8KieJNAhAYDECmEcl2pqbhVJiUVqv4yqCQScIKAnUXDeYR+UkkQYBCCxGAPOoRFtzs1BKLErrdVxFMOgEASWBmusG86icJNIgAIHFCGAelWhrbhZKiUVpvY6rCAadIKAkUHPdYB6Vk0QaBCCwGAHMoxJtzc1CKbEorddxFcGgEwSUBGquG8yjcpJIgwAEFiOAeVSirblZKCUWpfU6riIYdIKAkkDNdYN5VE4SaRCAwGIEMI9KtDU3C6XEorRex1UEg04QUBKouW4wj8pJIg0CEFiMAOZRibbmZqGUWJTW67iKYNAJAkoCNdcN5lE5SaRBAAKLEcA8KtHW3CyUEovSeh1XEQw6QUBJoOa6wTwqJ4k0CEBgMQKYRyXampuFUmJRWq/jKoJBJwgoCdRcN5hH5SSRBgEILEYA86hEW3OzUEosSut1XEUw6AQBJYGa6wbzqJwk0iAAgcUIYB6VaGtuFkqJRWm9jqsIBp0goCRQc91gHpWTRBoEILAYAcyjEm3NzUIpsSit13EVwaATBJQEaq4bzKNykkiDAAQWI4B5VKKtuVkoJRal9TquIhh0goCSQM11g3lUThJpEIDAYgQwj0q0NTcLpcSitF7HVQSDThBQEqi5bjCPykkiDQIQWIwA5lGJtuZmoZRYlNbruIpg0AkCSgI11w3mUTlJpEEAAosRwDwq0dbcLJQSi9J6HVcRDDpBQEmg5rrBPConiTQIQGAxAphHJdqam4VSYlFar+MqgkEnCCgJ1Fw3mEflJJEGAQgsRgDzqERbc7NQSixK63VcRTDoBAElgZrrBvOonCTSIACBxQhgHpVoa24WSolFab2OqwgGnSCgJFBz3WAelZNEGgQgsBgBzKMSbc3NQimxKK3XcRXBoBMElARqrhvMo3KSSIMABBYjgHlUoq25WSglFqX1Oq4iGHSCgJJAzXWDeVROEmkQgMBiBDCPSrQ1NwulxKK0XsdVBINOEFASqLluMI/KSSINAhBYjADmUYm25mahlFiU1uu4imDQCQJKAjXXDeZROUlmaT9z924+7W5ce9q9cPIzs6r7LPT+2W33wWvX3Y0P3HZn7xte+fLCvf3DC3dpWJJSh0EA86icp5qbhVJiUVqv4yqCQScIKAnUXDeYR+UkmaVhHrdRXrqH5yfu5WefdB+8feYs/ej2tYi0SADzqJyVmpuFUmJRWq/jKoJBJwgoCdRcN5hH5SSZpWEet1G+7y5OPuP8OsA8btM5hgjmUTnLNTcLpcSitF7HVQSDThBQEqi5bjCPykkyS8M8bqPEPG4zOa4I5lE53zU3C6XEorRex1UEg04QUBKouW4wj8pJMkvDPG6jxDxuMzmuCOZROd81NwulxKK0XsdVBINOEFASqLluMI/KSTJLS5vH4Y0oN0/chXvgzk+/5l67+czq17mre+TZW+7uN8/chfiOkkfu4uzb7u6t59f5/k0tvs/Jm+784ajT+2futQ9cdzeufdS9dvZQHN2gZ/TGmFT8cRGv4zvu3p1b7jl//eG/J91zt1533zobvSHm4sS9MORE+aNrOve47jduf9o9NeQnal6NJuj0vwp/dPGWe2Ng86R77vZbTh61iILgwgQwj0rA6wUVLZZhQWzGlCWbSOt1XE3ARUS3BGquG8zjvm8rhXn8/b9wd18ZmcBhf3jSPffK90cG8oG7f+fFyFRt7iGr++vZV93pxaP1YJcwj5fvutOk7qDpGffCnR+tjZvGPE7WlZg4N5jHW3/hvvjskxtG9mN37vOu7pJ9BU0AACAASURBVPXdUP0M86icgpqbhVJiUVqv4yqCQScIKAnUXDdT5vE/vvKf3Gc/++9X//3R5z7vpvKVQz7iNIV5XBnFZ9wLt7+7fmL48L67Nzw5+5S7e/6bgeHl+R33sVWf593LJ/fXxsyt38V849qTbsMwmZvHR+7dk88+NrBPfNq99v3zkY7vrp+iPvGKO30QPwnN/dr6l+7s9sevjN/z7uU7pxGTc3c6POHcfpoYzONqfT3xort7/8GK2eXFj9zbsZEeSHJSiwDmUUm+5mahlFiU1uu4imDQCQJKAjXXTc4M/t7v/V/uqSf/afTE5rr7yG9/xHlDmeqnHPIRp2nM48joBVqX993d5/0TtLh9bbxurH7dHZInjtbmcdD2jHvp5KfiU721yR3/qnw9hvG7rS/fPXEvPeGfWqbqRqb12qapXpvHVN8JRjTvjQDmUYm65mahlFiU1uu4imDQCQJKAjXXTcoEeuOY0vXP/89/njSQyiEfcZrGPG6aoDWsn7vTWx9azcvaZK2N143o6dq6T+LM2jwmLrMRTl5zPYb1uHzPdfzG83fcefywMi48GNfYVK9/bX1jZCrjrpy3QQDzqJyH1D/KUlxZsok0SX8q1oRgRECgAQKpNSLFreVK5tE/WZSuHcf+4A9uik8frfX1V09hHrfeLBIoPHRntz86Mo/OrZ/OXf1d4epNMifbb04JZfwxaeTWScOTu5GeVHzdM5xdvXnm5MTdO3l99SHgj+8h7ZNHebyh+vq4znvq1ql7/MvpyDxu/Zp83ZOzNghgHpXzEP8jPHWuLNlE2tRY4vYmBCMCAg0QiNfF1Lm1XMk8+r9xnNLhf30t9bXW1189e/O4eifyW19xL6x+vRvemBKO/m8nv+ZOz4OluiK6iHn0f2N5uv2O7+HNPkGT1jymWW3eF9ETyuhX93qTu1mNV/sngHlUMp/6hzluV5ZsIi3WPXXehGBEQKABAlNrJW63lisZQI15jDUd43n5PKQN0bTZWT9h2/z1blDjP97nm27z42yCYRu9y9ncPF66h2dfGn08z3X31M3b7hurJ49vuvNfvpX4eKC1+dscV5pVGPHj47p//Hef0zw3q/CqHgHMo5L9nH9slSWbSOt1XE3ARUS3BGquG8k8+ndVT2n61x/7OE8ei+7ItCGaNjtT5jEW5J8Cvunuff129EQy+ltKa/P48C332urjcPxnL56s3xEdSxo+lkf75FE73nWe+Gvr0a/dY0mct0EA86ich6l/mON2Zckm0mLdU+dNCEYEBBogMLVW4nZruZJ59DH/ppj4uuNz/3RS6mutr796+zKPEbkHp+7l1a+0n3YvnPzsccOkefyNO7/zqcf3wMh8SSZ3iGX+vnD+u62jJ4q7vGFmpD8iw2kjBDCPyokY/0Oce60s2URabhzjtiYEIwICDRAYr43ca2u5kgH0Mf/0cfwxPUHXv/13L4rG0ffjZ4qAtXkM78De/pzDQclgHj/kXj79+eNw4h3KQ5/hSeJ1d2NkvgajGMWHWMo8Xv7U3XsxfFtO+slj/OTQa1m/GSj1cTuKj+qJdA7j46QpAphH5XSEf4Q1R2XJJtI04wk5TQhGBAQaIBDWhOZoLTdlHn3cv+v6dz/xydVnO/o3yPyr5/7V6sPCc32s9fVXz9o8xn9rOPoQbW++4q/le/ZL7mz4msLoyeK1+MPF/a+7ow/09m92GZmvwSjG8cGgjn9t7d9xfbL+gPDVm2eiJ6CrCY6eMG5o9I0GHxIe6+zvhupiRJhH5TRqNomQoyzZRFrQrDk2IRgREGiAgGa9hBxruTkjWNJmra+/etbm0RNSfD2h8BmQlxffd3+88bV94c01/juxX3XfPXnVfVBrHl38BDCqM7zT2hvU77i7N58efcj54xle/0o79P2Mu3fx/lXj1Nce5r+ecGx++7unDn9EmEflHIaNQHNUlmwiTTOekNOEYERAoAECYU1ojtZySwxiro+1vv7qLWEePaXHn6m49U5r/1WBX39TfgOL7/Yw/oo/b9zWTy/FJ4yrj4i8LZrKxxpGTxlX1/+OO1t9HWBkMLf+hvGBO//+l+Q396xuAj++b48+Bsh/DNFXk59nmdLf3z11+CPCPCrnULNJhBxlySbSgmbNsQnBiIBAAwQ06yXkWMvNGcGSNmt91IMABPongHlUznHYCDRHZckm0jTjCTlNCEYEBBogENaE5mgtt8Qg5vpY66MeBCDQPwHMo3KONZtEyFGWbCItaNYcmxCMCAg0QECzXkKOtdycESxps9ZHPQhAoH8CmEflHIeNQHNUlmwiTTOekNOEYERAoAECYU1ojtZySwxiro+1PupBAAL9E8A8KudYs0mEHGXJJtKCZs2xCcGIgEADBDTrJeRYy80ZwZI2a33UgwAE+ieAeVTOcdgINEdlySbSNOMJOU0IRgQEGiAQ1oTmaC23xCDm+ljrox4EINA/Acyjco41m0TIUZZsIi1o1hybEIwICDRAQLNeQo613JwRLGmz1kc9CECgfwKYR+Uch41Ac1SWbCJNM56Q04RgRECgAQJhTWiO1nJLDGKuj7U+6kEAAv0TwDwq51izSYQcZckm0oJmzbEJwYiAQAMENOsl5FjLzRnBkjZrfdSDAAT6J4B5VM5x2Ag0R2XJJtI04wk5TQhGBAQaIBDWhOZoLbfEIOb6WOujHgQg0D8BzKNyjjWbRMhRlmwiLWjWHJsQjAgINEBAs15CjrXcnBEsabPWRz0IQKB/AphH5RyHjUBzVJZsIk0znpDThGBEQKABAmFNaI7WcksMYq6PtT7qQQAC/RPAPCrnWLNJhBxlySbSgmbNsQnBiIBAAwQ06yXkWMvNGcGSNmt91IMABPongHlUznHYCDRHZckm0jTjCTlNCEYEBBogENaE5mgtt8Qg5vpY66MeBCDQPwHMo3KONZtEyFGWbCItaNYcmxCMCAg0QECzXkKOtdycESxps9ZHPQhAoH8CmEflHIeNQHNUlmwiTTOekNOEYERAoAECYU1ojtZySwxiro+1PupBAAL9E8A8KudYs0mEHGXJJtKCZs2xCcGIgEADBDTrJeRYy80ZwZI2a33UgwAE+ieAeVTOcdgINEdlySbSNOMJOU0IRgQEGiAQ1oTmaC23xCDm+ljrox4EINA/Acyjco41m0TIUZZsIi1o1hybEIwICDRAQLNeQo613JwRLGmz1kc9CECgfwKYR+Uch41Ac1SWbCJNM56Q04RgRECgAQJhTWiO1nJLDGKuj7U+6kEAAv0TwDwq51izSYQcZckm0oJmzbEJwYiAQAMENOsl5FjLzRnBkjZrfdSDAAT6J4B5VM5x2Ag0R2XJJtI04wk5TQhGBAQaIBDWhOZoLbfEIOb6WOujHgQg0D8BzKNyjjWbRMhRlmwiLWjWHJsQjAgINEBAs15CjrXcnBEsabPWRz0IQKB/AphH5RyHjUBzVJZsIk0znpDThGBEQKABAmFNaI7WcksMYq6PtT7qQQAC/RPAPCrnWLNJhBxlySbSgmbNsQnBiIBAAwQ06yXkWMvNGcGSNmt91IMABPongHlUznHYCDRHZckm0jTjCTlNCEYEBBogENaE5mgtt8Qg5vpY66MeBCDQPwHMo3KONZtEyFGWbCItaNYcmxCMCAg0QECzXkKOtdycESxps9ZHPQhAoH8CmEflHIeNQHNUlmwiTTOekNOEYERAoAECYU1ojtZySwxiro+1PupBAAL9E8A8KudYs0mEHGXJJtKCZs2xCcGIgEADBDTrJeRYy80ZwZI2a33UgwAE+ieAeVTOcdgINEdlySbSNOMJOU0IRgQEGiAQ1oTmaC23xCDm+ljrox4EINA/Acyjco41m0TIUZZsIi1o1hybEIwICDRAQLNeQo613JwRLGmz1kc9CECgfwKYR+Uch41Ac1SWbCJNM56Q04TghIhf/OIX7vz8fPI/n8fP/gm88847k3Pj5+9Q5iesCc3RmnaJQcz1sdZHPQhAoH8CmEflHGs2iXHOb334w+7WF76w+u/eyYn7wQ9+sNpAlZfcS9pYc+71XgQlLuLNh+fnOf75F7+4Yur55vROtYX58fXC/Pjr8DOfgDd+YX7CPb/r/HzyE59YzXOYn7ffftu1Mj9T91bcPp9mvkfOCJa05a9GKwQgAIFtApjHbSZiJN4Mps7DEzC/2XlT8tdvvLFldv7wpZdWcZ/z61//WrzmPoJTY4nb96EnXMNzCdyChmD2vvLlrwxmL7DWPrGKn1AGs+PrecMTmx3/2l/f6+Bnk4C/X8P8+Pt4PD+eWzDjc+cnfkI5np9wHX/08+Ov4evX+Im1TJ1b6ysxiLk+1vqoBwEI9E8A86ic46kNQtseNl6/8fkNMPTzm/D3vve9vf/aLlxfc1SiKkrzXLxZ+PznPjcwCZq8URmbw9CWOkoiUrk+Hn78dSRj5HV5fTWNftBY4+i5+PtzPD/+Pva8Yi4azuMxaPvE8xP6/LOnn3b/8eWX9zo/4dqa43isu77OGcGStl310B8CEDg+AphH5ZxrNomQoyy5Sgtm0j/9Ck++vKncl1EJmjXHOePS5nrj4X8t6a/vx+/P9zV2jcZgauP5CRo1/Q85J4w9nh/PYWwWa47Rm0l/vwSN/j4KGpfUpVkvIcdaR4lBzPWx1kc9CECgfwKYR+Uch41Ac1SWFNP8xuw3P38db6b8+ZJ/56UZT8gRBRcE/Ybvf7UZzHIwY/HTq4Kyi3eRzJQfhx9PTz/+fvP3XTw//r5s/SfMT3ii7/9m0j8ZXWJ+wprQHK255YxgSZu1PupBAAL9E8A8KudYs0mEHGXJbJrfCP2vCf0G6Ov6X2sv8UQuaNYcs4IVjV7/PjZ2hZSdU7wh8cYkzE94Wrxz4UoFgvEKf8Pox+XvPx8/xJ/x/Pj/QbE0wJr1EnKs+ZUYxFwfa33UgwAE+ieAeVTOcdgINEdlSXWaf1PA+Gmk1UaoGU/IUQuOEg/1KVY0hMlTPxfh16b7eFo8KWhGQri3wlNGf5/VehPKDNmzUsfz458W7/o0P6wJzXGWWEVyzgiWtCkuSQoEIACBDQKYxw0c6ReaTSLkpKvs1iI9HfIb4S5GMmjWHLXq/cbsdYWncuHNQIf6FEs7bj8+/7QufnpnYVS019fm+ftlPD9LPNXW6tlX3vhppL8/S+dHs15CjvX4Sgxiro+1PupBAAL9E8A8Kuc4bASao7LkTml+I4yNin9y5J9++dicJ0ea8YSclGBvFv11/fXDE6xdNubUdQ4pHgx0MJLx/Oz61GsuB38/jOcnGHp/Hx3jT5if8D84fn78U1fPSTM/YU1ojtZ8c0awpM1aH/UgAIH+CWAelXOs2SRCTqpkaJeOu/TxBsA/OfKb3//2v9wYPurmdz7+8dVHq/i/zfPt3kSMjaWkJRXzfX0dX89/ZIuvH3Lj6/qY9BNypaOU72NSbojV7BM0pI6xtjA/PjfmpJmfuE7uPMzt1Pz4dskwpsbh46mfffTJXSOlbW4fzyP0+d9v/K/D+Qs3b7o/+89/trrfw/oJxjLka44pfqXxEoOY61Oqg34QgMDxEsA8Kudes0mEHGXJxdL8r0+9mfAmzxtK/2aO8IQlaCw9+ic0vp6v6+v7X4FKZmSxwXVQ2PMaz094Yls6L6Gfn+d4fvx1ev9zAetbws+Pv6/9/e2fpnueu8yPtb6cESxps9ZHPQhAoH8CmEflHIfNWXNUlqyWFp5S+aNmPCGnmuAjunAw/vEcac6PCFHVoYb5CWtCc7QWXGIQc32s9VEPAhDonwDmUTnHmk0i5ChLNpEWNGuOTQhGBAQaIKBZLyHHWm7OCJa0WeujHgQg0D8BzKNyjsNGoDkqSzaRphlPyGlCMCIg0ACBsCY0R2u5JQYx18daH/UgAIH+CWAelXOs2SRCjrJkE2lBs+bYhGBEQKABApr1EnKs5eaMYEmbtT7qQQAC/RPAPCrnOGwEux6ly+VqSvk+Zt0nVy/VJmlL5YZ4q30kXUtwtrpO4Jk6StdJ5Yb4PvpI1/CxoEE61uwj6ZkbS+kvjZcYxFyfUh30gwAEjpcA5lE593M2DGXJJtJ6HVcTcBHRLYGa6yZnBEvaup0kBgYBCCxGAPOoRFtzs1BKLErrdVxFMOgEASWBmuumxCDm+iiHTBoEIACBgQDmcUCRP6m5WeSV7dba67h2o0JvCOQJ1Fw3OSNY0pYfKa0QgAAEtglgHreZiJGam4UoyCjY67iM8FAGAiKBmuumxCDm+ogDJAgBCEAgQwDzmIETN9XcLGId1ue9jsuaE/UgEBOouW5yRrCkLR4X5xCAAAQ0BDCPGkoT7wYdbySpkuO8+LVVn7imdD6+jpSTisV9UzkhHueG89AmHUPO+Cjlhtg4N7wO7dIx5IyPUm6IjXP969CWOrbaR9I1NZ6afVJ8Q1zSFtpSR4s+qdpSXLreLrESg5jrs4sW+kIAAsdJAPOonHdpU0jFlCWbSEuNQYo3IRgREGiAgLQ+UjFruTkjWNJmrY96EIBA/wQwj8o5Tm0MUlxZsok0SX8q1oRgRECgAQKpNSLFreWWGMRcH2t91IMABPongHlUzrG0KaRiypJNpKXGIMWbEIwICDRAQFofqZi13JwRLGmz1kc9CECgfwKYR+UcpzYGKa4s2USapD8Va0IwIiDQAIHUGpHi1nJLDGKuj7U+6kEAAv0TwDwq51jaFFIxZckm0lJjkOJNCEYEBBogIK2PVMxabs4IlrRZ66MeBCDQPwHMo3KOUxuDFFeWbCJN0p+KNSEYERBogEBqjUhxa7klBjHXx1of9SAAgf4JYB6VcyxtCiUx6XK5OlK+j1n3ydVLtUnaUrkh3mofSdcSnK2uE3imjtJ1Urkhvo8+0jV8LGiQjjX7SHrmxlL6S+M5I1jSVqqDfhCAwPESwDwq537OhqEs2URar+NqAi4iuiVQc92UGMRcn24niYFBAAKLEcA8KtHW3CyUEovSeh1XEQw6QUBJoOa6yRnBkjblkEmDAAQgMBDAPA4o8ic1N4u8st1aex3XblToDYE8gZrrpsQg5vrkR0orBCAAgW0CmMdtJmKk5mYhCjIK9jouIzyUgYBIoOa6yRnBkjZxgAQhAAEIZAhgHjNw4qaam0Wsw/q813FZc6IeBGICNddNiUHM9YnHxTkEIAABDQHMo4bSxLtBxxtJquQ4L35t1SeuKZ2PryPlpGJx31ROiMe54Ty0SceQMz5KuSE2zg2vQ7t0DDnjo5QbYuNc/zq0pY6t9pF0TY2nZp8U3xCXtIW21NGiT6q2FJeut0ssZwRL2nbRQl8IQOA4CWAelfMubQqpmLJkE2mpMUjxJgQjAgINEJDWRypmLbfEIOb6WOujHgQg0D8BzKNyjlMbgxRXlmwiTdKfijUhGBEQaIBAao1IcWu5OSNY0matj3oQgED/BDCPyjmWNoVUTFmyibTUGKR4E4IRAYEGCEjrIxWzlltiEHN9rPVRDwIQ6J8A5lE5x6mNQYorSzaRJulPxZoQjAgINEAgtUakuLXcnBEsabPWRz0IQKB/AphH5RxLm0IqpizZRFpqDFK8CcGIgEADBKT1kYpZyy0xiLk+1vqoBwEI9E8A86ic49TGIMWVJZtIk/SnYk0IRgQEGiCQWiNS3FpuzgiWtFnrox4EINA/Acyjco6lTaEkJl0uV0fK9zHrPrl6qTZJWyo3xFvtI+lagrPVdQLP1FG6Tio3xPfRR7qGjwUN0rFmH0nP3FhKf2m8xCDm+pTqoB8EIHC8BDCPyrmfs2EoSzaR1uu4moCLiG4J1Fw3OSNY0tbtJDEwCEBgMQKYRyXampuFUmJRWq/jKoJBJwgoCdRcNyUGMddHOWTSIAABCAwEMI8DivxJzc0ir2y31l7HtRsVekMgT6DmuskZwZK2/EhphQAEILBNAPO4zUSM1NwsREFGwV7HZYSHMhAQCdRcNyUGMddHHCBBCEAAAhkCmMcMnLip5mYR67A+73Vc1pyoB4GYQM11kzOCJW3xuDiHAAQgoCGAedRQmng36HgjSZUc58WvrfrENaXz8XWknFQs7pvKCfE4N5yHNukYcsZHKTfExrnhdWiXjiFnfJRyQ2yc61+HttSx1T6Srqnx1OyT4hvikrbQljpa9EnVluLS9XaJlRjEXJ9dtNAXAhA4TgKYR+W8S5tCKqYs2URaagxSvAnBiIBAAwSk9ZGKWcvNGcGSNmt91IMABPongHlUznFqY5DiypJNpEn6U7EmBCMCAg0QSK0RKW4tt8Qg5vpY66MeBCDQPwHMo3KOpU0hFVOWbCItNQYp3oRgRECgAQLS+kjFrOXmjGBJm7U+6kEAAv0TwDwq5zi1MUhxZckm0iT9qVgTghEBgQYIpNaIFLeWW2IQc32s9VEPAhDonwDmUTnH0qaQiilLNpGWGoMUb0IwIiDQAAFpfaRi1nJzRrCkzVof9SAAgf4JYB6Vc5zaGKS4smQTaZL+VKwJwYiAQAMEUmtEilvLLTGIuT7W+qgHAQj0TwDzqJxjaVMoiUmXy9WR8n3Muk+uXqpN0pbKDfFW+0i6luBsdZ3AM3WUrpPKDfF99JGu4WNBg3Ss2UfSMzeW0l8azxnBkrZSHfSDAASOlwDmUTn3czYMZckm0nodVxNwEdEtgZrrpsQg5vp0O0kMDAIQWIwA5lGJtuZmoZRYlNbruIpg0AkCSgI1103OCJa0KYdMGgQgAIGBAOZxQJE/qblZ5JXt1trruHajQm8I5AnUXDclBjHXJz9SWiEAAQhsE8A8bjMRIzU3C1GQUbDXcRnhoQwERAI1103OCJa0iQMkCAEIQCBDAPOYgRM31dwsYh3W572Oy5oT9SAQE6i5bkoMYq5PPC7OIQABCGgIYB41lCbeDTreSFIlx3nxa6s+cU3pfHwdKScVi/umckI8zg3noU06hpzxUcoNsXFueB3apWPIGR+l3BAb5/rXoS11bLWPpGtqPDX7pPiGuKQttKWOFn1StaW4dL1dYjkjWNK2ixb6QgACx0kA86icd2lTSMWUJZtIS41BijchGBEQaICAtD5SMWu5JQYx18daH/UgAIH+CWAelXOc2hikuLJkE2mS/lSsCcGIgEADBFJrRIpby80ZwZI2a33UgwAE+ieAeVTOsbQppGLKkk2kpcYgxZsQjAgINEBAWh+pmLXcEoOY62Otj3oQgED/BDCPyjlObQxSXFmyiTRJfyrWhGBEQKABAqk1IsWt5eaMYEmbtT7qQQAC/RPAPCrnWNoUUjFlySbSUmOQ4k0IRgQEGiAgrY9UzFpuiUHM9bHWRz0IQKB/AphH5RynNoa5celyuRpSvo9Z98nVS7VJ2lK5Id5qH0nXEpytrhN4po7SdVK5Ib6PPtI1fCxokI41+0h65sZS+kvjOSNY0laqg34QgMDxEsA8Kud+zoahLNlEWq/jagIuIrolUHPdlBjEXJ9uJ4mBQQACixHAPCrR1twslBKL0nodVxEMOkFASaDmuskZwZI25ZBJgwAEIDAQwDwOKPInNTeLvLLdWnsd125U6A2BPIGa66bEIOb65EdKKwQgAIFtApjHbSZipOZmIQoyCvY6LiM8lIGASKDmuskZwZI2cYAEIQABCGQIYB4zcOKmmptFrMP6vNdxWXOiHgRiAjXXTYlBzPWJx8U5BCAAAQ0BzKOG0sS7QccbibJkE2lj7bnXTQhGBAQaIJBbJ+M2a7k5I1jSZq2PehCAQP8EMI/KOR5vCLnXqZL76JO7hm8b/0zlx+1x3zgunce54VzKC7GQMz6Gduk4zg2vpdwQCznjY2iXjuNc/1rKi2Ot9pF0TY2nZp+YqXQuaZPy4phFn7je1Ll0vV1iJQYx12cXLfSFAASOkwDmUTnvUxtE3K4s2URarHvqvAnBiIBAAwSm1krcbi03ZwRL2qz1UQ8CEOifAOZROcfxZjB1rizZRNrUWOL2JgQjAgINEIjXxdS5tdwSg5jrY62PehCAQP8EMI/KOZ7aIOJ2Zckm0mLdU+dNCEYEBBogMLVW4nZruTkjWNJmrY96EIBA/wQwj8o5jjeDqXNlySbSpsYStzchGBEQaIBAvC6mzq3llhjEXB9rfdSDAAT6J4B5VM7x1AYRtytLNpEW6546b0IwIiDQAIGptRK3W8vNGcGSNmt91IMABPongHlUznG8GexyLl0uV0/K9zHrPrl6qTZJWyo3xFvtI+lagrPVdQLP1FG6Tio3xPfRR7qGjwUN0rFmH0nP3FhKf2m8xCDm+pTqoB8EIHC8BDCPyrmfs2EoSzaR1uu4moCLiG4J1Fw3OSNY0tbtJDEwCEBgMQKYRyXampuFUmJRWq/jKoJBJwgoCdRcNyUGMddHOWTSIAABCAwEMI8DivxJzc0ir2y31l7HtRsVekMgT6DmuskZwZK2/EhphQAEILBNAPO4zUSM1NwsREFGwV7HZYSHMhAQCdRcNyUGMddHHCBBCEAAAhkCmMcMnLip5mYR67A+73Vc1pyoB4GYQM11kzOCJW3xuDiHAAQgoCGAedRQmng36HgjUZZsIm2sPfe6CcGIgEADBHLrZNxmLbfEIOb6WOujHgQg0D8BzKNyjscbQu51quQ++uSu4dvGP1P5cXvcN45L53FuOJfyQizkjI+hXTqOc8NrKTfEQs74GNql4zjXv5by4lirfSRdU+Op2SdmKp1L2qS8OGbRJ643dS5db5dYzgiWtO2ihb4QgMBxEsA8Kud9aoOI25Ulm0iLdU+dNyEYERBogMDUWonbreWWGMRcH2t91IMABPongHlUznG8GUydK0s2kTY1lri9CcGIgEADBOJ1MXVuLTdnBEvarPVRDwIQ6J8A5lE5x1MbRNyuLNlEWqx76rwJwYiAQAMEptZK3G4tt8Qg5vpY66MeBCDQPwHMo3KO481g6lxZsom0qbHE7U0IRgQEGiAQr4upc2u5OSNY0matj3oQgED/BDCPyjme2iDi3455LgAAIABJREFUdmXJJtJi3VPnTQhGBAQaIDC1VuJ2a7klBjHXx1of9SAAgf4JYB6VcxxvBrucS5fL1ZPyfcy6T65eqk3SlsoN8Vb7SLqW4Gx1ncAzdZSuk8oN8X30ka7hY0GDdKzZR9IzN5bSXxrPGcGStlId9IMABI6XAOZROfdzNgxlySbSeh1XE3AR0S2BmuumxCDm+nQ7SQwMAhBYjADmUYm25mahlFiU1uu4imDQCQJKAjXXTc4IlrQph0waBCAAgYEA5nFAkT+puVnkle3W2uu4dqNCbwjkCdRcNyUGMdcnP1JaIQABCGwTwDxuMxEjNTcLUZBRsNdxGeGhDAREAjXXTc4IlrSJAyQIAQhAIEMA85iBEzfV3CxiHdbnvY7LmhP1IBATqLluSgxirk88Ls4hAAEIaAhgHjWUJt4NOt5IlCWbSBtrz71uQjAiINAAgdw6GbdZy80ZwZI2a33UgwAE+ieAeVTO8XhDyL1OldxHn9w1fNv4Zyo/bo/7xnHpPM4N51JeiIWc8TG0S8dxbngt5YZYyBkfQ7t0HOf611JeHGu1j6Rrajw1+8RMpXNJm5QXxyz6xPWmzqXr7RIrMYi5PrtooS8EIHCcBDCPynmf2iDidmXJJtJi3VPnTQhGBAQaIDC1VuJ2a7k5I1jSZq2PehCAQP8EMI/KOY43g6lzZckm0qbGErc3IRgREGiAQLwups6t5ZYYxFwfa33UgwAE+ieAeVTO8dQGEbcrSzaRFuueOm9CMCIg0ACBqbUSt1vLzRnBkjZrfdSDAAT6J4B5VM5xvBlMnStLNpE2NZa4vQnBiIBAAwTidTF1bi23xCDm+ljrox4EINA/Acyjco6nNoi4XVmyibRY99R5E4IRAYEGCEytlbjdWm7OCJa0WeujHgQg0D8BzKNyjuPNYJdz6XK5elK+j1n3ydVLtUnaUrkh3mofSdcSnK2uE3imjtJ1Urkhvo8+0jV8LGiQjjX7SHrmxlL6S+MlBjHXp1QH/SAAgeMlgHlUzv2cDUNZsom0XsfVBFxEdEug5rrJGcGStm4niYFBAAKLEcA8KtHW3CyUEovSeh1XEQw6QUBJoOa6KTGIuT7KIZMGAQhAYCCAeRxQ5E9qbhZ5Zbu19jqu3ajQGwJ5AjXXTc4IlrTlR0orBCAAgW0CmMdtJmKk5mYhCjIK9jouIzyUgYBIoOa6KTGIuT7iAAlCAAIQyBDAPGbgxE01N4tYh/V5r+Oy5kQ9CMQEaq6bnBEsaYvHxTkEIAABDQHMo4bSxLtBxxtJquQ4L35t1SeuKZ2PryPlpGJx31ROiMe54Ty0SceQMz5KuSE2zg2vQ7t0DDnjo5QbYuNc/zq0pY6t9pF0TY2nZp8U3xCXtIW21NGiT6q2FJeut0usxCDm+uyihb4QgMBxEsA8Kudd2hRSMWXJJtJSY5DiTQhGBAQaICCtj1TMWm7OCJa0WeujHgQg0D8BzKNyjlMbgxRXlmwiTdKfijUhGBEQaIBAao1IcWu5JQYx18daH/UgAIH+CWAelXMsbQqpmLJkE2mpMUjxJgQjAgINEJDWRypmLTdnBEvarPVRDwIQ6J8A5lE5x6mNQYorSzaRJulPxZoQjAgINEAgtUakuLXcEoOY62Otj3oQgED/BDCPyjmWNoVUTFmyibTUGKR4E4IRAYEGCEjrIxWzlpszgiVt1vqoBwEI9E8A86ic49TGIMWVJZtIk/SnYk0IRgQEGiCQWiNS3FpuiUHM9bHWRz0IQKB/AphH5RxLm0JJTLpcro6U72PWfXL1Um2StlRuiLfaR9K1BGer6wSeqaN0nVRuiO+jj3QNHwsapGPNPpKeubGU/tJ4zgiWtJXqoB8EIHC8BDCPyrmfs2EoSzaR1uu4moCLiG4J1Fw3JQYx16fbSWJgEIDAYgQwj0q0NTcLpcSitF7HVQSDThBQEqi5bnJGsKRNOWTSIAABCAwEMI8DivxJzc0ir2y31l7HtRsVekMgT6DmuikxiLk++ZHSCgEIQGCbAOZxm4kYqblZiIKMgr2OywgPZSAgEqi5bnJGsKRNHCBBCEAAAhkCmMcMnLip5mYR67A+73Vc1pyoB4GYQM11U2IQc33icXEOAQhAQEMA86ihNPFu0PFGkio5zotfW/WJa0rn4+tIOalY3DeVE+JxbjgPbdIx5IyPUm6IjXPD69AuHUPO+Cjlhtg4178Obaljq30kXVPjqdknxTfEJW2hLXW06JOqLcWl6+0SyxnBkrZdtNAXAhA4TgKYR+W8S5tCKqYs2URaagxSvAnBiIBAAwSk9ZGKWcstMYi5Ptb6qAcBCPRPAPOonOPUxiDFlSWbSJP0p2JNCEYEBBogkFojUtxabs4IlrRZ66MeBCDQPwHMo3KOpU0hFVOWbCItNQYp3oRgRECgAQLS+kjFrOWWGMRcH2t91IMABPongHlUznFqY5DiypJNpEn6U7EmBCMCAg0QSK0RKW4tN2cES9qs9VEPAhDonwDmUTnH0qaQiilLNpGWGoMUb0IwIiDQAAFpfaRi1nJLDGKuj7U+6kEAAv0TwDwq5zi1MUhxZckm0iT9qVgTghEBgQYIpNaIFLeWmzOCJW3W+qgHAQj0TwDzqJxjaVMoiUmXy9WR8n3Muk+uXqpN0pbKDfFW+0i6luBsdZ3AM3WUrpPKDfF99JGu4WNBg3Ss2UfSMzeW0l8aLzGIuT6lOugHAQgcLwHMo3Lu52wYypJNpPU6ribgIqJbAjXXTc4IlrR1O0kMDAIQWIwA5lGJtuZmoZRYlNbruIpg0AkCSgI1102JQcz1UQ6ZNAhAAAIDAczjgCJ/UnOzyCvbrbXXce1Ghd4QyBOouW5yRrCkLT9SWiEAAQhsE8A8bjMRIzU3C1GQUbDXcRnhoQwERAI1102JQcz1EQdIEAIQgECGAOYxAyduqrlZxDqsz3sdlzUn6kEgJlBz3eSMYElbPC7OIQABCGgIYB41lCbeDTreSFIlx3nxa6s+cU3pfHwdKScVi/umckI8zg3noU06hpzxUcoNsXFueB3apWPIGR+l3BAb5/rXoS11bLWPpGtqPDX7pPiGuKQttKWOFn1StaW4dL1dYiUGMddnFy30hQAEjpMA5lE579KmkIopSzaRlhqDFG9CMCIg0AABaX2kYtZyc0awpM1aH/UgAIH+CWAelXOc2hikuLJkE2mS/lSsCcGIgEADBFJrRIpbyy0xiLk+1vqoBwEI9E8A86icY2lTSMWUJZtIS41BijchGBEQaICAtD5SMWu5OSNY0matj3oQgED/BDCPyjlObQxSXFmyiTRJfyrWhGBEQKABAqk1IsWt5ZYYxFwfa33UgwAE+ieAeVTOsbQppGLKkk2kpcYgxZsQjAgINEBAWh+pmLXcnBEsabPWRz0IQKB/AphH5RynNgYprizZRJqkPxVrQjAiINAAgdQakeLWcksMYq6PtT7qQQAC/RPAPCrnWNoUSmLS5XJ1pHwfs+6Tq5dqk7SlckO81T6SriU4W10n8EwdpeukckN8H32ka/hY0CAda/aR9MyNpfSXxnNGsKStVAf9IACB4yWAeVTO/ZwNQ1myibRex9UEXER0S6DmuikxiLk+3U4SA4MABBYjgHlUoq25WSglFqX1Oq4iGHSCgJJAzXWTM4IlbcohkwYBCEBgIIB5HFDkT2puFnllu7X2Oq7dqNAbAnkCNddNiUHM9cmPlFYIQAAC2wQwj9tMxEjNzUIUZBTsdVxGeCgDAZFAzXWTM4IlbeIACUIAAhDIEMA8ZuDETTU3i1iH9Xmv47LmRD0IxARqrpsSg5jrE4+LcwhAAAIaAphHDaWJd4OON5JUyXFe/NqqT1xTOh9fR8pJxeK+qZwQj3PDeWiTjiFnfJRyQ2ycG16HdukYcsZHKTfExrn+dWhLHVvtI+maGk/NPim+IS5pC22po0WfVG0pLl1vl1jOCJa07aKFvhCAwHESwDwq513aFFIxZckm0lJjkOJNCEYEBBogIK2PVMxabolBzPWx1kc9CECgfwKYR+UcpzYGKa4s2USapD8Va0IwIiDQAIHUGpHi1nJzRrCkzVof9SAAgf4JYB6VcyxtCqmYsmQTaakxSPEmBCMCAg0QkNZHKmYtt8Qg5vpY66MeBCDQPwHMo3KOUxuDFFeWbCJN0p+KNSEYERBogEBqjUhxa7k5I1jSZq2PehCAQP8EMI/KOZY2hVRMWbKJtNQYpHgTghEBgQYISOsjFbOWW2IQc32s9VEPAhDonwDmUTnHqY1hbly6XK6GlO9j1n1y9VJtkrZUboi32kfStQRnq+sEnqmjdJ1Ubojvo490DR8LGqRjzT6SnrmxlP7SeM4IlrSV6qAfBCBwvAQwj8q5n7NhKEs2kdbruJqAi4huCdRcNyUGMden20liYBCAwGIEMI9KtDU3C6XEorRex1UEg04QUBKouW5yRrCkTTlk0iAAAQgMBDCPA4r8Sc3NIq9st9Zex7UbFXpDIE+g5ropMYi5PvmR0goBCEBgmwDmcZuJGKm5WYiCjIK9jssID2UgIBKouW5yRrCkTRwgQQhAAAIZApjHDJy4qeZmEeuwPu91XNacqAeBmEDNdVNiEHN94nFxDgEIQEBDAPOooTTxbtDxRqIs2UTaWHvudROCEQGBBgjk1sm4zVpuzgiWtFnrox4EINA/Acyjco7HG0LudarkPvrkruHbxj9T+XF73DeOS+dxbjiX8kIs5IyPoV06jnPDayk3xELO+BjapeM417+W8uJYq30kXVPjqdknZiqdS9qkvDhm0SeuN3UuXW+XWIlBzPXZRQt9IQCB4ySAeVTO+9QGEbcrSzaRFuueOm9CMCIg0ACBqbUSt1vLzRnBkjZrfdSDAAT6J4B5VM5xvBlMnStLNpE2NZa4vQnBiIBAAwTidTF1bi23xCDm+ljrox4EINA/Acyjco6nNoi4XVmyibRY99R5E4IRAYEGCEytlbjdWm7OCJa0WeujHgQg0D8BzKNyjuPNYOpcWbKJtKmxxO1NCEYEBBogEK+LqXNruSUGMdfHWh/1IACB/glgHpVzPLVBxO3Kkk2kxbqnzpsQjAgINEBgaq3E7dZyc0awpM1aH/UgAIH+CWAelXMcbwa7nEuXy9WT8n3Muk+uXqpN0pbKDfFW+0i6luBsdZ3AM3WUrpPKDfF99JGu4WNBg3Ss2UfSMzeW0l8aLzGIuT6lOugHAQgcLwHMo3Lu52wYypJNpPU6ribgIqJbAjXXTc4IlrR1O0kMDAIQWIwA5lGJtuZmoZRYlNbruIpg0AkCSgI1102JQcz1UQ6ZNAhAAAIDAczjgCJ/UnOzyCvbrbXXce1Ghd4QyBOouW5yRrCkLT9SWiEAAQhsE8A8bjMRIzU3C1GQUbDXcRnhoQwERAI1102JQcz1EQdIEAIQgECGAOYxAyduqrlZxDqsz3sdlzUn6kEgJlBz3eSMYElbPC7OIQABCGgIYB41lCbeDTreSJQlm0gba8+9bkIwIiDQAIHcOhm3WcstMYi5Ptb6qAcBCPRPAPOonOPxhpB7nSq5jz65a/i28c9Uftwe943j0nmcG86lvBALOeNjaJeO49zwWsoNsZAzPoZ26TjO9a+lvDjWah9J19R4avaJmUrnkjYpL45Z9InrTZ1L19slljOCJW27aKEvBCBwnAQwj8p5n9og4nZlySbSYt1T500IRgQEGiAwtVbidmu5JQYx18daH/UgAIH+CWAelXMcbwZT58qSTaRNjSVub0IwIiDQAIF4XUydW8vNGcGSNmt91IMABPongHlUzvHUBhG3K0s2kRbrnjpvQjAiINAAgam1Erdbyy0xiLk+1vqoBwEI9E8A86ic43gzmDpXlmwibWoscXsTghEBgQYIxOti6txabs4IlrRZ66MeBCDQPwHMo3KOpzaIuF1Zsom0WPfUeROCEQGBBghMrZW43VpuiUHM9bHWRz0IQKB/AphH5RzHm8Eu59LlcvWkfB+z7pOrl2qTtKVyQ7zVPpKuJThbXSfwTB2l66RyQ3wffaRr+FjQIB1r9pH0zI2l9JfGc0awpK1UB/0gAIHjJYB5VM79nA1DWbKJtF7H1QRcRHRLoOa6KTGIuT7dThIDgwAEFiOAeVSirblZKCUWpfU6riIYdIKAkkDNdZMzgiVtyiGTBgEIQGAggHkcUORPam4WeWW7tfY6rt2o0BsCeQI1102JQcz1yY+UVghAAALbBDCP20zESM3NQhRkFOx1XEZ4KAMBkUDNdZMzgiVt4gAJQgACEMgQwDxm4MRNNTeLWIf1ea/jsuZEPQjEBGqumxKDmOsTj4tzCEAAAhoCmEcNpYl3g443EmXJJtLG2nOvmxCMCAg0QCC3TsZt1nJzRrCkzVof9SAAgf4JYB6VczzeEHKvUyX30Sd3Dd82/pnKj9vjvnFcOo9zw7mUF2IhZ3wM7dJxnBteS7khFnLGx9AuHce5/rWUF8da7SPpmhpPzT4xU+lc0iblxTGLPnG9qXPpervESgxirs8uWugLAQgcJwHMo3LepzaIuF1Zsom0WPfUeROCEQGBBghMrZW43VpuzgiWtFnrox4EINA/Acyjco7jzWDqXFmyibSpscTtTQhGBAQaIBCvi6lza7klBjHXx1of9SAAgf4JYB6Vczy1QcTtypJNpMW6p86bEIwICDRAYGqtxO3WcnNGsKTNWh/1IACB/glgHpVzHG8GU+fKkk2kTY0lbm9CMCIg0ACBeF1MnVvLLTGIuT7W+qgHAQj0TwDzqJzjqQ0ibleWbCIt1j113oRgRECgAQJTayVut5abM4Ilbdb6qAcBCPRPAPOonON4M9jlXLpcrp6U72PWfXL1Um2StlRuiLfaR9K1BGer6wSeqaN0nVRuiO+jj3QNHwsapGPNPpKeubGU/tJ4iUHM9SnVQT8IQOB4CWAelXM/Z8NQlmwirddxNQEXEd0SqLluckawpK3bSWJgEIDAYgQwj0q0NTcLpcSitF7HVQSDThBQEqi5bkoMYq6PcsikQQACEBgIYB4HFPmTmptFXtlurb2Oazcq9IZAnkDNdZMzgiVt+ZHSCgEIQGCbAOZxm4kYqblZiIKMgr2OywgPZSAgEqi5bkoMYq6POECCEIAABDIEMI8ZOHFTzc0i1mF93uu4rDlRDwIxgZrrJmcES9ricXEOAQhAQEMA86ihNPFu0PFGkio5zotfW/WJa0rn4+tIOalY3DeVE+JxbjgPbdIx5IyPUm6IjXPD69AuHUPO+Cjlhtg4178Obaljq30kXVPjqdknxTfEJW2hLXW06JOqLcWl6+0SKzGIuT67aKEvBCBwnAQwj8p5lzaFVExZsom01BikeBOCEQGBBghI6yMVs5abM4Ilbdb6qAcBCPRPAPOonOPUxiDFlSWbSJP0p2JNCEYEBBogkFojUtxabolBzPWx1kc9CECgfwKYR+UcS5tCKqYs2URaagxSvAnBiIBAAwSk9ZGKWcvNGcGSNmt91IMABPongHlUznFqY5DiypJNpEn6U7EmBCMCAg0QSK0RKW4tt8Qg5vpY66MeBCDQPwHMo3KOpU0hFVOWbCItNQYp3oRgRECgAQLS+kjFrOXmjGBJm7U+6kEAAv0TwDwq5zi1MUhxZckm0iT9qVgTghEBgQYIpNaIFLeWW2IQc32s9VEPAhDonwDmUTnH0qZQEpMul6sj5fuYdZ9cvVSbpC2VG+Kt9pF0LcHZ6jqBZ+ooXSeVG+L76CNdw8eCBulYs4+kZ24spb80njOCJW2lOugHAQgcLwHMo3Lu52wYypJNpPU6ribgIqJbAjXXTYlBzPXpdpIYGAQgsBgBzKMSbc3NQimxKK3XcRXBoBMElARqrpucESxpUw6ZNAhAAAIDAczjgCJ/UnOzyCvbrbXXce1Ghd4QyBOouW5KDGKuT36ktEIAAhDYJoB53GYiRmpuFqIgo2Cv4zLCQxkIiARqrpucESxpEwdIEAIQgECGAOYxAyduqrlZxDqsz3sdlzUn6kEgJlBz3ZQYxFyfeFycQwACENAQwDxqKE28G3S8kaRKjvPi11Z94prS+fg6Uk4qFvdN5YR4nBvOQ5t0DDnjo5QbYuPc8Dq0S8eQMz5KuSE2zvWvQ1vq2GofSdfUeGr2SfENcUlbaEsdLfqkaktx6Xq7xHJGsKRtFy30hQAEjpMA5lE579KmkIopSzaRlhqDFG9CMCIg0AABaX2kYtZySwxiro+1PupBAAL9E8A8Kuc4tTFIcWXJJtIk/alYE4IRAYEGCKTWiBS3lpszgiVt1vqoBwEI9E8A86icY2lTSMWUJZtIS41BijchGBEQaICAtD5SMWu5JQYx18daH/UgAIH+CWAelXOc2hikuLJkE2mS/lSsCcGIgEADBFJrRIpby80ZwZI2a33UgwAE+ieAeVTOsbQppGLKkk2kpcYgxZsQjAgINEBAWh+pmLXcEoOY62Otj3oQgED/BDCPyjlObQxSXFmyiTRJfyrWhGBEQKABAqk1IsWt5eaMYEmbtT7qQQAC/RPAPCrnWNoUSmLS5XJ1pHwfs+6Tq5dqk7SlckO81T6SriU4W10n8EwdpeukckN8H32ka/hY0CAda/aR9MyNpfSXxksMYq5PqQ76QQACx0sA86ic+zkbhrJkE2m9jqsJuIjolkDNdZMzgiVt3U4SA4MABBYjgHlUoq25WSglFqX1Oq4iGHSCgJJAzXVTYhBzfZRDJg0CEIDAQADzOKDIn9TcLPLKdmvtdVy7UaE3BPIEaq6bnBEsacuPlFYIQAAC2wQwj9tMxEjNzUIUZBTsdVxGeCgDAZFAzXVTYhBzfcQBEoQABCCQIYB5zMCJm2puFrEO6/Nex2XNiXoQiAnUXDc5I1jSFo+LcwhAAAIaAphHDaWJd4OON5JUyXFe/NqqT1xTOh9fR8pJxeK+qZwQj3PDeWiTjiFnfJRyQ2ycG16HdukYcsZHKTfExrn+dWhLHVvtI+maGk/NPim+IS5pC22po0WfVG0pLl1vl1iJQcz12UULfSEAgeMkgHlUzru0KaRiypJNpKXGIMWbEIwICDRAQFofqZi13JwRLGmz1kc9CECgfwKYR+UcpzYGKa4s2USapD8Va0IwIiDQAIHUGpHi1nJLDGKuj7U+6kEAAv0TwDwq51jaFFIxZckm0lJjkOJNCEYEBBogIK2PVMxabs4IlrRZ66MeBCDQPwHMo3KOUxuDFFeWbCJN0p+KNSEYERBogEBqjUhxa7klBjHXx1of9SAAgf4JYB6VcyxtCqmYsmQTaakxSPEmBCMCAg0QkNZHKmYtN2cES9qs9VEPAhDonwDmUTnHqY1BiitLNpEm6U/FmhCMCAg0QCC1RqS4tdwSg5jrY62PehCAQP8EMI/KOZY2hZKYdLlcHSnfx6z75Oql2iRtqdwQb7WPpGsJzlbXCTxTR+k6qdwQ30cf6Ro+FjRIx5p9JD1zYyn9pfGcESxpK9VBPwhA4HgJYB6Vcz9nw1CWbCKt13E1ARcR3RKouW5KDGKuT7eTxMAgAIHFCGAelWhrbhZKiUVpvY6rCAadIKAkUHPd5IxgSZtyyKRBAAIQGAhgHgcU+ZOam0Ve2W6tvY5rNyr0hkCeQM11U2IQc33yI6UVAhCAwDYBzOM2EzFSc7MQBRkFex2XER7KQEAkUHPd5IxgSZs4QIIQgAAEMgQwjxk4cVPNzSLWYX3e67isOVEPAjGBmuumxCDm+sTj4hwCEICAhgDmUUNp4t2g440kVXKcF7+26hPXlM6l60h5cWwffaRr+FisY3xes89Yy/i1pG2cM369jz7SNXxsrCV+XbNPrEM6l7RJeXHMok9cb+pcut4usZwRLGnbRQt9IQCB4ySAeVTO+9QGEbcrS5IGAQgcKIF4vU+dWw+xxCDm+ljrox4EINA/Acyjco6nNoi4XVmSNAhA4EAJxOt96tx6iDkjWNJmrY96EIBA/wQwj8o5ntog4nZlSdIgAIEDJRCv96lz6yGWGMRcH2t91IMABPongHlUzvHUBhG3K0uSBgEIHCiBeL1PnVsPMWcES9qs9VEPAhDon0CX5nGJaZvaIOL2Ja5PTQhAoB0C8XqfOl9CdYlJTPVZQh81IQCBvgk0Yx495tQ/bnPjS0zZ1AahbZe05fpK+T7Wap+cLt8m/bTQR9IF5/x9VjKfvXGeundTjFIctPG5/yam8rXXIw8CEIBATKA78xgPzvJcs0mEHMvrUgsCEGiPQFjrmuNS6lOGcE58KW3UhQAE+ibQlHn0qOf8wyflLjVdmk0i5CylgboQgEAbBMJa1xyXUiz9+zcntpQu6kIAAv0TaM48euRz/gGMc5ecLs0mEXKW1EFtCECgPoGw1jXHJdXG//7NOV9SE7UhAIH+CTRpHj32Of8Q+tylfzSbRMhZWgv1IQCBugTCWtccl1ba2r+VS4+X+hCAQH0CzZrHgGbqH8aQt/RRs0mEnKW1UB8CEKhLIKx1zXFfSlv5t3Jf4+U6EIBAPQLNm8d6aDavrNkkQs5mT15BAAK9EQhrXXPsbeyMBwIQgADmUXkPaDaJkJMqGdqlo1UfqXYck64Tt0vn++gjXcPHJD0hVrNP0JA6StpSuSG+jz7SNXwsaJCONftIeuKYpC1ul84t+kh1UzHpesTmEHjkLs6+4+7dueWeu3Y9ulefdy/f+br71tmFu5xTjtyqBN4/u+0+6OfxA7fd2fv7kVLjmruM7PLiR+7ti0e7lFi8L+ZRiTi1MUhxZUnSIACBAyUgrftU7ECH2ITsy4sfuC/dfCYyjLF5DOdPuudunbjzh1jIJiZtQkQNI1fjmhMYEs0P3PnJK+65ax91r509TOS0EcY8KuchtTFIcWVJ0iAAgQMlIK37VOxAh1hZ9qV7eP8N98ITVwbx2Vvu7jfP3EXsDx+eu9PoaeRTL564d+P2yiPg8jKBwzFysv5loz9z924+7W5gHpfFvM/qqY1oYWGnAAAgAElEQVRBiu9TF9eCAAT2T0Ba96nY/tV1cMWHb7nXnn3S3bj2pHvule9vmsaN4cUm8xn30slP+RX2Bp/2XmAec3OCeczROci21MYgxQ9ygIiGAATUBKR1n4qpi5J4ReA37vzOp1a/qtY9TVzn33jiFXf6gMePLd9KmMfc7GAec3QOsi21MUjxgxwgoiEAATUBad2nYuqiJD4mMDx1/JB7+fTnOioP3nSvvfK6u3fyHXcmvNHg8uLMfevrt9e/Bvdv2JB+FX51tcHg3DxxF+6BOz+9415ePQn1v0b3f2N5x52ePxC0PXRntz/qblx72r1w8jPnRr9av3HNv8nndOLvM/31vuZei//W84lPu9e+/maiX7im/zu5X7iLs7+JtH7cvXb2S0GnFLp0D8/fdN+4/Wn31PDGJK/32yLTxxVSb2byjF4X38w0sE28YWbuXLn3z9xrH7h6A86jC3f2V9Ebq579kjt7eOnkawZuV3N1eeHOTuJ7ZDRXfi437qFR+xZSiecz7oXbXxPunffdxclnxL/t/eDtM7f5vqJa98fmAPmbx00eyVepjWFuXLpAroaU72Ot9snp8m3STwt9JF1wzt9nJfPZG+epezfFKMWBuHOX53fcx7x5MXmK+MhdnL46epd2eKNN+HvKV93pyHAOZuPm6+7v77wYmam47/Puj0/fHf2aPDIkd77p7sYGcDBk3rhuX3M19w9/lO6zMryvuHtbpjVc8yPu5dv+zRaxxk+5u+e/UdxWD9z95Dj9XLzo7t4fmeXLd93pK89n96Ib155xL9z5kYvf+jGw3TKPZXO1No9/5F77s49v6nn+jju/dNPmMTNXq6ffD9LzIj8dn+Dp/yfi5H7ERWkeq90f27cQ5nGbiRjRbBIhRyxAEAIQ6IZAWOuaYzeD3stAok109dRvl4teuodnX7oyU+OnhaOniVdPqMLVBoOzMmK+798MT98uL95yb9wKpmn8ZC8YuWDgnncv/9VbV3+z6Z/SRU8FR9d0lz919168eme5f9L4/fPBXGxcc9zPbV7zqZtvuPurd54/chc//FHm70XDaB+5d08+e2WQ/ZOx7w5PODfe7b5x3ajPSKtz/onbd9dPTkf/EzCw3TCP5XM1mMfVXEVm9fLCvf3Dxx/jJF9zk5t/Ev3G8LFP4V3Pfh4/5J579unVk+pU++YT8oiNN88RT+efbg5PRsf3jp+PzK+tq90f4T7ZPGIeN3kkX2k2iZCTLEIDBCDQBYGw1jXHLga8t0Gs/35x+9d1M0VEm638dMi5y3dP3Eurd3Q/6T525/7wFHEwG9euO7FvXPvWqVs/k4sNifwGnvU141/LR+bpic+6e+8Kn/E3POnb1Opi85jqm0N3ed/dff7qzUm33xoMa+gi6h36yGP0fYcnyKN3Dg9sY/MY80y8a36tYzT+8Gvr1Fy5qSeP3iAKT2iHMfonr9KcBKM30jP82UWKTfSE9erJaGCdNo8V74+1uI0zzOMGjvQLzSYRctJVaIEABHogENa65tjDePc3hrX52tk8Xpy4F1ZPowRjMAxobVZvRBv5YHAkU3HVdzBHG0/W1vrjesPlVifraz41GM+fu9NbH1r9PWVsYjf7RYYs0rphHjfi497y62EcybEGk3TdrfXKtTaig6nb/MzCgW1sHneYq/WTx5GJi8SI14xNt8gtmkvxKfi6fX2vXroHp688foor1rwSNRjT8b0ZWG8yc67e/RFh3DjFPG7gSL/QbBIhJ12FFghAoAcCYa1rjj2Md39jWP/aepZREQTKhmE7cciLTOAQyxkA0RwFQ5E2Ml7BUD8YqMFMxE8jt7WujdJn3L2L8DaKcM2Z5m5Vfs179298uXrzzMmJu3fyevSmnU0jtDV2iYcw9A1u0VytmaTZSdeMTffa/MUXXnPVt0v/YxDXDOeh9tWbdUI49WvravfHIGzrBPO4hUQOaDaJkCNXIAoBCPRCIKx1juFv+7aPZXMdPbkRn/Zoq0amaKrO8NRrbcgGs5HrmzWPY1OwqXuoH8zjUGubo3yPxYYsGJHrTjY5m9fefLU2O/PNo//bxlN3d/j7z5T2WKtgnN1uc7U2j5vXice5xXvVOMWtpH3dR563bUabc5Z48ljt/ogpbp5jHjd5JF9pbwSfxw8EINA3Af49WG5+h1+jxk+XJi8XnnqFj7PZzZAMZgPzmCAf/Q1e9O7up27edt9YPXl8053/8q3HH6Ez+TePu80V5nHbkG5+Q83a0G4a1cTUKsOYRyUoi80iVyMlY26fXL5vk35a6CPp8rGctpp9crrgLN9nJfPZKucpXXF76j4lniCg/RVd3H3os/518WAAw9O9OD86H/IiszrEcr+2fnDqXl692Sb+u7WwUa91RJe6Oo2erob6g/7007PtOiESrlny5DEybhOcwtVWx+FNIf6d6InvFR+e6G6OaWAbXU+KbVzv6sWQF81VW+Zx/SS3zKglnjxWuz+kWXgcwzym2Wy0xJvB1PlGR15AAALdEZj6NyBu727wiw9ovQHf2Ph4mNSFIzMWvyt2MC+xuRvXiK4VjFz8N3ixSRl1lZ+Qro1c+m8219dc5+jeEDGScPVyfc0SwzKMI/mGmZjv42/wEU3cSNy67rR5dDvMVVvmMWIV3U8jNJmXCfOofMOMXHi3+0Ou6RzmMUVmFI83g6nzUVdeQgACnRGY+jcgbu9s6PsZTvxkS/3d1k+65+KPmtnh418Gc+S/TSauGUY/1B63rzfqG9ekz/GLPx4obo9MR2yAw/VWx+hXxRumdn3NEvPoYtbZsa7fkDPw2dARiR34+F+pKsxjlC9+NJL/6J/Exyq1ZR6dc8MT6dRH9Ti3Zj5+k08wj+N4xfsjmtb4FPMY08icx5vB1HmmDE0QgEAHBKb+DYjbOxhuhSFcuof331h/naDwVYKrr7G7s/4quvWHYwe5kdna+krBOR8SvvlBzxsf2L1l9NZGbnUPbHyA9uaHhG+ZpMhArb468XT9IeGrD5cevjpv/Cvx9TWLzKPLfKj1w3P398PXFUZPcAeDNP61tR/jyfoDwld/D7n55qHBeEa/tl59sHjhB7o3Zx43eI6/wnDEZ+vpZDCP4/8p8e45+hB5vx72dn+E9bR5xDxu8ki+ijeDqfNkERogAIEuCEz9GxC3dzHgKoPw7+Y9iT7yRXpjgI+NDUwsNvpA5uiNHfH8SF8VOBicJ37fvfz58G0yo+tLX9kXfXbgUzc/7/6f4fuwN/tuG90rzVNfP+fHuvUkdlfz6K89/XV6m1/FGBvOzbE9Zuu/fu877u7Np7c+u3Jgu2EevYayuWrPPGp4pr6icv0nDcM9Gr9pq9r9cXV/RgfMYwQjdzpMZOofoCieq0MbBCBw+AT492CPc+i/0u2bJ+4bwxOwYFb8E8Gvum8NXymX1jR+Sunnb/XO4G+eiV/ft2FwHl24s+Gpn7+2f5r07eHrCjevumnkHl2cuXuxbuEJ6mZ//8o/Ff3a6OmdN8ivJ8a6ec3w6Y/bdacij9+xvsnZM/6aO936Pm1fa/QUze+B/knr179zxSYymNETtg22gti5c9WmefR8/P/8vLl9307dAxtPe6+77Q+br3V/bN4/mMdNHslXczaLXK50gbn5vkarfXK6fJv000IfSRec8/dZyXz2xnnq3k0xSnEg3gaBKYOTVmll5NJXoAUCLRDAPCpnQbNJhBxlSdIgAIEDJRDWuuZ4oEM8atmYx6OefgavIIB5VEDyKZpNIuQoS5IGAQgcKIGw1jXHAx3iUcvGPB719DN4BQHMowKST9FsEiFHWZI0CEDgQAmEta45HugQj1o25vGop5/BKwhgHhWQfIpmkwg5ypKkQQACB0ogrHXN8UCHeNSyMY9HPf0MXkEA86iA5FM0m0TIUZYkDQIQOFACYa1rjgc6RGRDAAIQSBLAPCbRbDZoNglywkdocORe4B4I98DmvyS8ggAEIHD4BDCPyjkMGwFHTAH3APfAnHtA+U8MaRCAAAQOhgDmUTlVczYLcjEX3APcA+EeUP4TQxoEIACBgyGAeVROVdgIOGIKuAe4B+bcA8p/YkiDAAQgcDAEMI/KqZqzWZCLueAe4B4I94DynxjSIAABCBwMAcyjcqrCRsARU8A9wD0w5x5Q/hNDGgQgAIGDIYB5nDFVczYMcjEY3APcAzP+eSEVAhCAwMEQwDzOmCrMAGaAe4B7YM49MOOfF1IhAAEIHAwBzOPMqZqzcZCL0eAeON57YOY/LaRDAAIQOBgCmMeCqcIQHK8hYO6Ze809UPDPCl0gAAEIHAwBzOPBTBVCIQABCEAAAhCAQH0CmMf6c4ACCEAAAhCAAAQgcDAEMI8HM1UIhQAEIAABCEAAAvUJYB7rzwEKIAABCEAAAhCAwMEQwDwezFQhFAIQgAAEIAABCNQngHmsPwcogAAEIAABCEAAAgdDAPN4MFOFUAhAAAIQgAAEIFCfAOax/hygAAIQgAAEIAABCBwMAczjwUwVQiEAAQhAAAIQgEB9ApjH+nOAAghAAAIQgAAEIHAwBDCPBzNVCIUABCAAAQhAAAL1CWAe688BCiAAAQhAAAIQgMDBEMA8HsxUIRQCEIAABCAAAQjUJ4B5rD8HKIAABCAAAQhAAAIHQwDzeDBThVAIQAACEIAABCBQnwDmsf4coAACEIAABCAAAQgcDAHM48FMFUIhAAEIQAACEIBAfQKYx/pzgAIIQAACEIAABCBwMAQwjwczVQiFAAQgAAEIQAAC9QlgHuvPAQogAAEIQAACEIDAwRDAPB7MVCEUAhCAAAQgAAEI1CeAeaw/ByiAAAQgAAEIQAACB0MA83gwU4VQCEAAAhCAAAQgUJ8A5rH+HKAAAhCAAAQgAAEIHAwBzOPBTBVCIQABCEAAAhCAQH0CmMf6c4CCAyDw7rvvuj/501dN/vvbr/7dAYwYiRCAAAQgAAGZAOZR5kIUAhsEMI8bOHgBAQhAAAJHTADzeMSTz9D1BDCPelZkQgACEIBA3wQwj33PL6MzIoB5NAJJGQhAAAIQOHgCmMeDn0IGsA8CmMd9UOYaEIAABCBwCAQwj4cwS2isTgDzWH0KEAABCEAAAo0QwDw2MhHIaJsA5rHt+UEdBCAAAQjsjwDmcX+sudIBE8A8HvDkIR0CEIAABEwJYB5NcVKsVwKW5vEvv/yVXjExLghAAAIQOAICmMcjmGSGuDsBS/PoP2ycHwhAAAIQgMChEsA8HurMoXuvBDCPe8XNxSAAAQhAoGECmMeGJwdp7RDAPLYzFyiBAAQgAIG6BDCPdflz9QMhgHk8kIlCJgQgAAEILE4A87g4Yi7QAwHMYw+zyBggAAEIQMCCAObRgiI1uieAeex+ihkgBCAAAQgoCWAelaBIO24CmMfjnn9GDwEIQAACawKYxzULziCQJIB5TKKhAQIQgAAEjowA5vHIJpzhlhHAPJZxoxcEIAABCPRHAPPY35wyogUIvPfee85/uLfVfwtIpCQEIAABCEBgLwQwj3vBzEV6IGBlHPmGmR7uBsYAAQhA4HgJYB6Pd+4Z+UwClubxV7/61cyrkw4BCEAAAhBogwDmsY15QMUBELA0j/5vKPmBAAQgAAEIHCIBzOMhzhqaqxDAPFbBzkUhAAEIQKAxApjHxiYEOe0SwDy2OzcogwAEIACB/RHAPO6PNVc6cAKYxwOfQORDAAIQgIAJAcyjCUaKHAMBzOMxzDJjhAAEIACBKQKYxylCtEPgisB/vXPX7HMeecMMtxUEIAABCBwqAczjoc4cuvdO4G+/+ndm5vEf/uF/7l0/F4QABCAAAQhYEMA8WlCkxlEQwDwexTQzSAhAAAIQmCCAeZwARDMEAgHMYyDBEQIQgAAEjpkA5vGYZ5+xzyKAeZyFi2QIQAACEOiUAOax04llWPYE/tt//y5/82iPlYoQgAAEIHBgBDCPBzZhyE0TOD8/d3/9xhvu1he+sMh/N//g/3Yf+e2PmPz3O//md8w1/vkXv+i+973vuV//+tdpSLRAAAIQgAAEdiSAedwRIN3rE/BmyRunG9eu89+16+63Pvxh984779SfGBRAAAIQgECXBDCPXU7r8QzKG8c/fOklTOPIOGMgj2cNMFIIQAAC+yaAedw3ca5nRgDjmH/SioE0u9UoBAEIQAACEQHMYwSD08MhgHHMG8fwK3wM5OHc0yiFAAQgcCgEMI+HMlPoHAhgHHXGEQM53DKcQAACEICAIQHMoyFMSi1PAOM4zzhiIJe/J7kCBCAAgWMjgHk8thk/4PFiHMuMIwbygG96pEMAAhBokADmscFJQdI2AYzjbsYRA7l9TxGBAAQgAIEyApjHMm702iMBjKONccRA7vGm5VIQgAAEOiaAeex4cnsYWqlxXOpdxn/yp6+afUXhT37yE5Mp+sqXvzL7cy6X4mMyIIpAAAIQgEDTBDCPTU/PcYtrzTj62fjbr/6dmXn8h3/4n2YTjIE0Q0khCEAAAhCYIIB5nABEcx0CLRpHT6JV8+i1YSDr3KtcFQIQgMCxEcA8HtuMH8B4WzWOHp2lefxv//275rOBgTRHSkEIQAACEBgRwDyOgPCyLoGWjaMn43/VbPV3j96ILvGDgVyCKjUhAAEIQCAQwDwGEhyrE2jdOHpAh2AevU4MZPXbGQEQgAAEuiWAeex2ag9rYIdgHD3RH//4x2ZPHv0TzCV/MJBL0qU2BCAAgeMlgHk83rlvZuSHYhw9sHffffdgzKPXi4Fs5jZHCAQgAIFuCGAeu5nKwxzIIRlHT9jaPL733nuLTxwGcnHEXAACEIDAURHAPB7VdLc12EMzjoGe1RtmfB1vRvfxg4HcB2WuAQEIQOA4CGAej2OemxvloRpHD9LSPPq/odzXDwZyX6S5DgQgAIG+CWAe+57fJkd3yMbRA/2vd+6aGUjLb5nRTDYGUkOJHAhAAAIQyBHAPObo0GZO4NCNowfS+geFT00aBnKKEO0QgAAEIJAjgHnM0aHNlEAPxtED8d8MY/Wr66U+KHxq4jCQU4RohwAEIACBFAHMY4oMcVMCvRhHD8Xyg8L/8stfMeU8pxgGcg4tciEAAQhAIBDAPAYSHBcj0JNx9JAO6YPCpyYVAzlFiHYIQAACEBgTwDyOifDalEBvxtHDOcTPesxNKgYyR4c2CEAAAhAYE8A8jonw2oxAj8bRw/nVr35l9jeP+/ysx9zEYiBzdGiDAAQgAIGYAOYxpsG5GYFejWMAZPWGGV9n3x/XE8YwPmIgx0R4DQEIQAACEgHMo0SF2E4EejeOHo7lZz3+jzff3Im3ZWcMpCVNakEAAhDokwDmsc95rTaqYzCOHq7lZz3W+rie1E2CgUyRIQ4BCEAAAp4A5pH7wIzAsRhHD8zy43r+4r/cNpsDq0IYSCuS1IEABCDQHwHMY39zWmVEx2QcPWDrj+t59OhRlXnLXRQDmaNDGwQgAIHjJYB5PN65Nxv5sRlHD87643p8vRZ/MJAtzgqaIAABCNQlgHmsy//gr36MxtFPmn9SaPmO6x++/Xaz9wIGstmpQRgEIACBKgQwj1Ww93HRYzWOYfb83ypaGUj/fdkt/2AgW54dtEEAAhDYLwHM4355d3O1YzeOfiIt33HtP/qn9R8MZOszhD4IQAAC+yGAedwP5+6ucusLX3A3rl2f9d9vffjD7p133umGheU7rv0TzEP4wUAewiyhEQIQgMCyBDCPy/LtsvoPfvCDWabRm8zejKOfWOt3XL/33nsHcb+UGMhPfuITBzE2REIAAhCAwDQBzOM0IzJGBOY+dezROHok3uxZ/c2jr+PN6KH8lBjI8/PzQxkeOiEAAQhAIEMA85iBQ5NMwJtB7a+sezWOgYyleWz9TTNhzOE410BiHgM5jhCAAAQOmwDm8bDnr4p6jOMau+V3XB/Cm2bWI398NsdAYh7H9HgNAQhA4DAJYB4Pc96qqtaYx96fOIYJ8E8LLZ8+tvhNM2GsqaPWQGIeUwSJQwACEDgsApjHw5qvJtRqzKP/u8hj+PEf7m1pHlv9ppncXHpTqLknMI85irRBAAIQOBwCmMfDmatmlGqMwrGYR+s3zfiP/zm0H8zjoc0YeiEAAQjsRgDzuBu/o+yNedycdssnj/6Dxw/tB/N4aDOGXghAAAK7EcA87sbvKHtjHjen3fKbZrwRPbQfzOOhzRh6IQABCOxGAPO4G7+j7I153Jx262+aObS/e8Q8bt4PvIIABCDQOwHMY+8zvMD4MI+bUH/yk5+Yvmnm0P7uEfO4eT/wCgIQgEDvBDCPvc/wAuPDPG5C9R+vY/l3j4f2eY+Yx837gVcQgAAEeieAeex9hhcYH+ZxG6rlh4V7I3pIn/eIedy+H4hAAAIQ6JkA5rHn2V1obJjHbbD/4803TZ8+HtL3XGMet+8HIhCAAAR6JoB57Hl2Fxob5nEbrPXfPR7S91xjHrfvByIQgAAEeiaAeex5dhcaG+ZxG6z13z3+xX+5vX2RRiOYx0YnBlkQgAAEFiKAeVwIbM9lMY/y7Fr/3eOhfGQP5lG+H4hCAAIQ6JUA5rHXmV1wXJhHGa713z36eofwg3k8hFlCIwQgAAE7AphHO5ZHU0ljHv/lv/gX7vOf+5y7d3LivLn49a9/3RQfr+ftt99e6fM6X7h5033kt/6lS43Nt/mc3Jj8k0LLj+z5yy9/ZRYzaUyf/MQn1GPyPErmCfM4a5pIhgAEIHDwBDCPBz+F+x9AymDF8U9+4nfdV778FfeHL700mBd//r3vfc/94he/2L9o51bX9dcfa/I6vcn1bd4ISf/5Np8zNSb/t4qWBvK9997LsvIslx5TVoBzK17x3KfOPVd+IAABCEDg8AlgHg9/Dvc+gpQ5iOO3vvCFDV3+qZY3Xr/14Q+vzKRv/8EPfrCRs9QLfx1/Pa/PP4n76zfeWD113PV60pj+/It/bmoeU7+6XnJMns+ceeLJ4653Ev0hAAEIHBYBzONhzVcTamOTmDofm8dYuDddf/7FL67MnDcp3qy88847ccrO575ebIL89fx1l/qJx/TUk//U/e4nPun+6HOf39lIxr+6rjmm3DxhHpe6q6gLAQhAoE0CmMc256VpVSnDGMdz5jEMzv/K1f8qOPxdnj/6p5P+qdpcM+nzfT/fP67nf6Vb8nd8QePc4z/+4z+6P/iDm+7/+OA/W5ljf/zXH/u4+7f/7sXZZtKbT9/v/3311a0x7fNX/+FX4zHXeJ4wj3PvEvIhAAEIHDYBzONhz18V9bFJTJ1rzGMs3ps/b/R8v/ArU1/bn/tY6j8p19eZaz5jLbue37v3/62eOHrz543kR377I84/jQys/LmPpf4b5/7epz61YlNzTIFJap7C2HJH/uYxUOQIAQhA4LAJYB4Pe/6qqM8ZhHGbJHCcM37t+/inXd5s+KeJ/unkOGf8WnoSN84Zv56rTcr3sXHd+HX85pn/8B9uuc9+9t+vnibGOeNz/7TR5/n80N9/CPk4L34taYvbpXOLPp67VFuKYR4l4sQgAAEIHB4BzOPhzVl1xZIxGMfmPnmsPihDAb/61a8G0xfM367HHy7495q7Dp1fW+9KkP4QgAAEDosA5vGw5qsJtWOjKL0+ZvPoJ+lvv/p3pgYyfuNMEzdBJALzGMHgFAIQgMAREMA8HsEkWw9RMovj2LGbxx//+Mem5tE/uWz16woxj9YrjHoQgAAE2iaAeWx7fppUNzaK0utjN4/+bxR3/VX1uL9/I06LP5jHFmcFTRCAAASWI4B5XI5tt5UlsziOHbt5/P/bO5sWOY4zAP+UXdiTBAIHX/ZkE8hB1kEYX30JrAVSwOBDbivkiw9JZGaJINbJ2SVKiBNQZm0T4g+ZiS/BURisg8FiDoIQL3OwhZEGbBYxvKF2p3pqaqprunu7urtqngbRX9X18by9u4+qu6pV8PWoa1sCz7Kv3qfs2oI8di0i1AcCEIBAWALIY1i+SeZui6JrH3kUefToUe29jx99/Enn7inksXMhoUIQgAAEghJAHoPiTTNzlyzax5Q82sfM/TwyZhp7u65r7HztfVc5dhp7v8o1rh5IO19zX6dXj8TNxUxjb5vpzG07nblvpjO3zTRVtpVkskAAAhCAQPwEkMf4Y9h4C4qIAz2Pp2H54ot/1977qPLs0kLPY5eiQV0gAAEIhCeAPIZnnFwJyGPxkIaY8/Hm2z2xex+L16j+lMhj/UzJEQIQgECXCSCPXY5OR+uGPJYLTIiBM//8/PNylQiYGnkMCJesIQABCHSQAPLYwaB0vUrIY7kIqfkZ9fuKda67MvIaeSx3P5AaAhCAQOwEkMfYI9hC/ZHH8tDVF2LqFEeVV1dGXiOP5e8HroAABCAQMwHkMebotVT3IvKo07iqqM/lrbt6jate6lheO9RxvdhfnPFdkyeZvmt0Oebal96sW+hrdD2UZLJAAAIQgED8BJDH+GPYeAu0DPjWjLZeDosa6JInhlWP/37/YLmgho/Q89gwcIqDAAQg0DIB5LHlAMRYvE8a9TnkcTmyIabtUdL55YMHy4U1eAR5bBA2RUEAAhDoAAHksQNBiK0KWhB9a+RxOapqep0QvY9tT92DPC7HmiMQgAAEUiaAPKYc3UBt80mjPoc8uuGH6n1U0wG1tSCPbZGnXAhAAALtEEAe2+EedalaEH1r5NEd4lC9j+rxtRqU08aCPLZBnTIhAAEItEcAeWyPfbQl+6RRn1PyqLdd67zGu9LqY3Vdo/PLW7vKyUurj1e5xjVIRufnWrvSq2OutPqYq17qmD7vWle5xpWPfUxJJgsEIAABCMRPAHmMP4aNt8CWAtc+PY/5YQnZ+9jG6Gt6HvNjzRkIQAACKRJAHlOMauA2uWTRPoY8+oNgz/uY16tY5XjTny5EHv2x5iwEIACB1Aggj6lFtIH22KLo2kceVwdC9RJWkcMi1zT5/iPyuDrWpIAABCCQEgHkMaVoNtQWl9oxiiwAAA7cSURBVCzax5DH1cEI9c1rJZdq+p7vvvtudSVqSIE81gCRLCAAAQhERAB5jChYXamqLYqufeSxWLTUFDtFehKrpGlq/kfksVisSQUBCEAgFQLIYyqRbLAdLlm0jyGPxQLy9OnTIBOHa9lUj8bVAJ2QC/IYki55QwACEOgeAeSxezHpfI1sUfTtuxrjS6/OuZYuXOOqlzrmq1uVa7T42WtfOXZate9Lr865lhDX6DyVZLJAAAIQgED8BJDH+GPYeAu0DPjW9DyWC0vIwTNKJEN+gYaex3KxJjUEIACB2Akgj7FHsIX6+6RRn0MeywVGDW5x9R7WeezP7/0lyCNs5LFcrEkNAQhAIHYCyGPsEWyh/loQfWvksXxgQn332hTQEO9AIo/lY80VEIAABGImgDzGHL2W6u6TRn0OeawWHNU7aMpeiO26BRJ5rBZrroIABCAQKwHkMdbItVhvLYi+NfJYLUChR19rGa1zHkjksVqsuQoCEIBArASQx1gj12K9fdKozyl51NuudV71XWn1sbqu0fnlrV3l5KXVx5u4RoufvdZ1cK3ttHrflVYfc7VFHdPnq66VZLJAAAIQgED8BJDH+GPYeAuKyAM9j2cLi/o+tRa90OuPPv7kTANp6Hk8W6y5GgIQgEBsBJDH2CLWgfoij80EoYn3H7WYqvcgq37OEHls5n6gFAhAAAJdIYA8diUSEdUDeWwmWOrLML9753ZjPZBKJNWI77IL8liWGOkhAAEIxE0AeYw7fq3UHnlsDrvqDVSDW3QPYRPrsr2QyGNz9wMlQQACEOgCAeSxC1GIrA7IY7MBOzo6alQelaA+evSocCORx8KoSAgBCEAgCQLIYxJhbLYRyGOzvFVpX3/9dWMCqd61LLMgj2VokRYCEIBA/ASQx/hj2HgLisijTuOqnD6Xt+7qNa56qWN57VDH85a6r3E9zvaVoc5VucbVnlXl6PNKMlkgAAEIQCB+Ashj/DFsvAVaBnxrpuoJE5bQU/gwYCZM3MgVAhCAQEoEkMeUotlQW3zSqM8hj+GCoeZldPUanvWYGtmtRniXXXhsXZZYGumn46F82H9Xrl88v9D7fmGnJ3/rfy6jybTmhk5k2HvppKzne0N5ViL3Z8OePL+xKVvP9WTouHA6/koejEvc+8+GsvfcpmxtvCR7w0mJmpAUAmkQQB7TiGOjrdCC6Fsjj2FDEqIHsswgGbN1yKNJYx22j2U8eEsuKRnz/Tv3mty6P5b6FDKEPD6RUf+GXCorgcjjOtzotNFDAHn0wOGUm4D3D8bsjwny6GZX59E6B9GUHSRjtgN5NGmkvj2VyfDWTBy35UqvL8OFHrupTEYDOdi9PBPLV2Rv+H2HofxPDnd+Ur4HEXnscEypWhMEkMcmKCdWBvLYnYDWJZBPnz6t3CjksTK6CC/8Vga7L8jWxrZc2f9K8h/Yfi/D3iunAnl5X0b1dT/WzAx5rBko2a0JAeRxTQJdZzOLyqMvXV59mrjGV4Y651q6cI2rXuqYr25570H6rqlSji8/fU5JJkvkBJ4M5Po59bj6dTkcO14eNJo3PerLtZO0r8rB6EfjTJc2kccuRYO6xEMAeYwnVp2pqZYB35rH1s2GS32JpsqnDKsOkjFbR8+jSSPx7UweCwjh9KEcXFaDaV6Q64Nv52CyR75KQI+tx9ybsnVxVw4GI0evZs47jzo/NRjmeCzDP+zO38e8eEuGk6ksD5h5JuP+687/eBUajKPLPHlX8slSG04GDTnbII66zNGcbtXQzp2+jOWJjAZ/lb2d7Xk7FdsPhjL29QRPRjK425MrJ+J/+l5rkfYobsfj+3Ine2XhvFzq3XfE0W4v+zESQB5jjFrLdfZJoz6HPDYfJDVSWr27mNfb6DpedZCM2Trk0aSR+HYmhJtyYee2/GfhfceCbc/E66oc3Ht3QVL074+tjfNy6cY9S3JWSdUvZe9Xs0fleiDP7JF5OHn8mVzvqQE3rsFDrjbUIY8F2vnzm3JwQ793atfNXS+RqUwe3smJh8rjvFza7S+Notdsn9+9Kb9eGHl/Xl7ef1jjgKmC9xfJGiGAPDaCOa1C5r/g7V9K833ksb2Yq7kaXaJoHzvLIBmzdcijSSP1bXPAjBaKd+Ww/w9r4IyHQyaPs98XF3flznA2Kntq9hzaPVcr5PFE4Ix3MadjefDlab5acJan6jnrY2vdhhtyOHpy2mirDbZA5ddFM6uhnZpF75O57E0eymHWK7jcczx/zUD9x+CWfKbbI8cyHv5pNiWTHRNDhlWZ567KwcNTDqWnP9LNZx0FAeQxijB1q5LIY7fi4aqN+h72zbd7Xok8yyAZs0zk0aSxDtvHMr5/O6eHSvVOKZn0zPNoyuO5N+TwyJ5f8ViO+m/IhRMZuSGDJ/oZ62qpunC1L0c6uRGKfGGrQR5nj8aN4kQkrw2GbOXMOSlSQzs3cnr9sp5j+/x8gFMew+n4nrx50rO4KJ4Z241tudb/Lz2NizdCsnvIY7KhDdcw5DEc2zpzVo+xDw/fdwpklS/J5NUNecwjk/hx9W6cY5Lw+e+Hbbny239Zj55F2dNsgm1bYAxemeSY70uukqr8/DLBWRK2s8pjfpnibEMd8phfZtbOjUXBm5PVo+U3ZeHdzkLvsv4oo/1XTx5fm72pq8ucl85WOgSQx3Ri2VhL5n8c5o+p7WM8tm4sHCsLUu81mr2QdQySMQtFHk0a67qtBmd8IIcOmVzqycrkMU9wFEOXKLqOmTJqiuZiHDLBqV0efW1wi1p+XXSdQ7TTn/d0tC8vL/X06mvm66zuJwNyTo9nx86ZvcTza9hKkwDymGZcg7bKFkXfvqsivvTqnGvpwjWueqljvrq1eY2vXk1y1vVQksmyHgTUpwsPe6+dPnr2jrbOm+7HJVCuY6Y85n8qMBOc2uXRN2WRu775ddH3hvu6eY9tlXb6887qdPKuZH6ngP5ZNt8dza5dYqvLZJ0iAeQxxagGblP2C8Tzi4aex8BBqJi9mtKn7qVoz2OR+4Y0Bf5we37uivKrdg/onrT8x6aL+Rrv0e0OZDacxHhsXVa8QkjVWR9bl21DHY+tkcfF+4y9Ngggj21Qj7zMIn+gkMfIg1yi+kXlkZ7HElA7mVS/87YpF0wZ9NQ165UyHnPOe9CKPPI1RbWL8li2Dd2Ux+yxdYXewyzGFa713Dqc6jgB5LHjAepi9ZDHLkalvTohj+2xb7ZkY5oe5yhpuzY5spm985j/jqJ7sEkX5dHThsl92TsZnbyYZqVsZQNtrEEtGbf6ex6l0IAZO76n+yvb476Mo5ETQB4jD2Ab1Uce26De3TKRx+7GpvaaGWJzYeeOPJw45sWZFTqfN3BRnuY9j+prMqdfgFmspzHNzcL5kPJo1XGxQst7mcgVaIM1kCTr5XOOiDYEfaNBeRT9SsKmLA1wylrvfg0BecwArdUG8rhW4a6nschjPRxTyQV5TCWSRdphfYXk3Guyd9ea09H6vN2SjJjitWFNSL0wwbY9b2BIeVye/NpLo3IbROa9qko8jcnF1ecE791amD9zYTqdrMwAPY+qWtm3yNVcnfsyyCYJF1kcALX4qB559N4pyZ5EHpMNbbiGFZVHX7q82jVxja8Mdc61dOEaV73UMV/dmrrGVwd9jnce86IR2/GpTEb92RdHfAN83J+zm/c8bsuV3TdyPu1nfCkmwxNCHueP1vV9umW+n5mVbW1kIndVDvo3S7RB5XMs48FbOdeoTwfelcPfvHTyc92kPK7+PKGK9WV5c3C0MBE48mjdG2uyizyuSaDrbGb2S9Yz6pMBM3US73Ze9Dx2Oz7Baqd6CT+4KwfZJ++0SG7Lld578qH+5KBdgUy8VA/aYxkP+7K3sz37T9DpF2rc14aQRzWl5Eg+y6YV2pSt2few7Wov7GdtUKOtj2UyGhgcfG3QuSgBN69RvZC7cjAYycQ5x+VZpyTS5eYw1KfV2uo5Pv19f1mu7//d+QlK5NGEtz7byOP6xLq2liKPtaFMIiPkMYkwNteITLzyH782VxlKggAEqhBAHqtQW/NrkMc1vwGs5iOPFhB2/QSQRz8fzkIgAgLIYwRB6loVkceuRaTd+iCP7fKPrnTkMbqQUWEI2ASQR5sI+ysJII8rEa1VAuRxrcJ99sYij2dnSA4QaJkA8thyAGIsvog8kkYPHmCt7wUlmSwQmI+25p1H7gYIxEoAeYw1ci3WW8sAa8SwzD2APLb4Q0vREIAABGokgDzWCHNdsiojDKRFMPU9gDyuy28I2gkBCKROAHlMPcIB2qdlgDViWOYeQB4D/DCSJQQgAIEWCCCPLUCPvcgywkBaBFPfA8hj7D/51B8CEIDAKQHkkTuhNIFfXLvm/SSelgXWiKN5DyCPpX/UuAACEIBAJwkgj50MS7crdfud28ij59OMpjCxPRfoH374ods3NrWDAAQgAIFCBJDHQphIZBJ4/Pix/PTFFxFIBLLwPfDHO3fMW4htCEAAAhCImADyGHHw2qz6N998g0Aij4XkUfVUs0AAAhCAQDoEkMd0Ytl4S9RjyE8//VQO+33+wcB5D6j/ZLBAAAIQgEBaBJDHtOJJayAAAQhAAAIQgEBQAshjULxkDgEIQAACEIAABNIigDymFU9aAwEIQAACEIAABIISQB6D4iVzCEAAAhCAAAQgkBYB5DGteNIaCEAAAhCAAAQgEJQA8hgUL5lDAAIQgAAEIACBtAggj2nFk9ZAAAIQgAAEIACBoASQx6B4yRwCEIAABCAAAQikRQB5TCuetAYCEIAABCAAAQgEJYA8BsVL5hCAAAQgAAEIQCAtAshjWvGkNRCAAAQgAAEIQCAoAeQxKF4yhwAEIAABCEAAAmkRQB7TiietgQAEIAABCEAAAkEJII9B8ZI5BCAAAQhAAAIQSIsA8phWPGkNBCAAAQhAAAIQCEoAeQyKl8whAAEIQAACEIBAWgSQx7TiSWsgAAEIQAACEIBAUALIY1C8ZA4BCEAAAhCAAATSIoA8phVPWgMBCEAAAhCAAASCEkAeg+IlcwhAAAIQgAAEIJAWAeQxrXjSGghAAAIQgAAEIBCUwP8Bf4dBcC94WucAAAAASUVORK5CYII=" width="408" height="457"></p>
<p>Which factors could have contributed to this error?</p>
<p style="padding-left:60px;">I. Not all heat from the combustion was transferred to the calorimeter.<br>II. Incomplete combustion occurred.<br>III. The temperature probe touched the bottom of the calorimeter.</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>How many signals are observed in the <sup>1</sup>H NMR spectrum of this compound?<br><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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" width="141" height="72"><br>A. 1</p>
<p>B. 2</p>
<p>C. 3</p>
<p>D. 4</p>
</div>
<br><hr><br><div class="question">
<p>A reaction has an activation energy of 40 kJ mol<sup>−1</sup> and an enthalpy change of −60 kJ mol<sup>−1</sup>.</p>
<p>Which potential energy diagram illustrates this reaction?</p>
<p><img src="data:image/png;base64,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" width="639" height="431"></p>
</div>
<br><hr><br><div class="question">
<p>How are the uncertainties of two quantities combined when the quantities are multiplied together?</p>
<p>A. Uncertainties are added.</p>
<p>B. % uncertainties are multiplied.</p>
<p>C. Uncertainties are multiplied.</p>
<p>D. % uncertainties are added.</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the degree of unsaturation (index of hydrogen deficiency) for the molecule?</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQsAAACiCAYAAABWMejAAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABIbSURBVHhe7Z0/bxRHGIeXfAHS2BUkPRRJadI46dKRhrROgVIYpMi4obMpIiJFximMq6A0qZyC0ESRUpgUIalCA7RIdhqggG/g3LOegfF6Zm9uZ/du9vb3SANz69u52/nzm/d9Z3fuzNGIQgghxvCe+V8IIWqRWAghopBYCCGikFgIIaKQWAghopBYCCGikFgIIaKQWAghopBYCCGikFgIIaKQWAghopBYtMDTp0+Lzc3N4pdffjFHRB95+fJlce3atWJxcfFtol3fvHlj3jFsJBZCiDh46lQ0Z3V1lad236alpaWjR48emb+KvrCxsXGiHd20sLBwtLe3Z945XCQWDaHznDt3ztu5SIiIyB+EHYH3tWE1DX0i0H4WE/L3338XN27cKP755x9zJMxITIqRqBSXLl0yR0RO3Llzp1hfXzevjqHN1tbWzKui2N7eLv777z/z6hj+fvPmzTKmMShKyRBR+ExVTNStra3y78w6PmuDGeng4KB8j5g9L1688FoTIxEw73gH7XblypVT76Xdh2ZlSCzGQMfa2dk5unDhwqnOgqvx/Plz88534KJ8+OGHJ95PWllZKcsTs4G6p83Onj17ol0Qg8ePH5t3+aFNfaKxvLw8mHiGxKIGLAafpcAMFGMpcH71XHu+mC7UebUdmlh8oRgH/eTJkyfmXfOJxMIDHYgZo9ohsC4mNT0py9dR6VzWfRHdEQpExwp+CKzNapm23HlFYlHBN7Db6ASITNWVIWHapnRa4adOpNtyG/iMkJUxjxOBxMIQmoHaHMz4zCExkpXRHm25f7R7jCXJe3x9ByGZJ9dk8GKxv7/vdTk41lVD20AbQVL3M3mNefv69WvzTjEJ29vbp+qUYCZ13SSwbC3By5cvR/WFn3766dTnk/j8eRCNwYpFXaBq0rhEClqWS6duZm8iElggPgsw1sqss2zaslJnweDEIuQKzNLPrOvsfe5cXUPddCn4Ke4M383Xz0h9XWodlFjQgXIOMtZ1ziYz5DwTepajbcGnX/isv9iVsVAsrI8TwSDEItTgNGJuKp/aOecd6sBnTXCsy7gAIuQb9LGuRcjKiD0/B+ZeLOoaKWdSO+c8EmrLtq2JOnzfgXaK+Q60W+h8LKXcmVuxYJaZ9ipHF7Ba47M0uA46mO9283mClSFWiNpc5UiFz/zmm29OfB/SRx99FGWp0mYh65FrzdXlnDuxQL27DHrNipDvyyCa5sw6TWgv31Ik7ZvDgErta3Xn59imcyMWIROPNE+DKXSNdLp5iWnQln2JMQH17hPyWFELiSJl5mQFz4VYhGZdOhwdb94IDSZ7zbmasTH0WfBDWxjECBxtFrp2judArze/OTw8LDcvqW6UOxKOcoMSNqlpEzZ0/fPPP8s8m+BUN0WpwvewG9+MZpni/PnzZb5N2GB2d3fXvDpm1EGLu3fvFiPhMEfyh/q8evVq8ezZM3PkGK5hJBSd1F0XhDZHov3ZbGfcRkih87vq0xNRSkbPwDQjuMXXd5MNELUBgUVmCmZqX6C0aaIsyqRsPqONW7upD8qsfhb1kaPZ7lIXwM39u9cRui6O8bdxcO2hNr1//75513TpnVj4RCLW1KsD0x5T1xdw6jrRKdoYGHW+fkwHnSYInK+uOTYvsRegXX0uMq5FjIscOn8W9dQbsairtBQfnQr3CZAvWasAUeH7kHyD0P6NxHs5xzeIfYn3pQa1+NyUDto11IkvoNeHew2aQt1Xr5c2oi5i8J1PmmabZi8WVIRvBqKiU5SVc33luomBy8BrU8EpywqI7zNtSp05qLfUDto2XE9I8HMQsa7hGn3tTp3ETBChsUCin3ZN1mIRii6ndPaQ+WuTFYhpEfJtbWpDNHzXy7FUCyYWLL/QIGlTiPsC/ataFyTEPYbQ+bRpl6KbpVjQgdru4FRiyJQjaDSr2dbC9+M7+K6bxGBLIbQNXNfXTcf2uRy4fkMm1B9jLb+6/hwrOpOSlVjQsXwrDwyUpgE6ZrVQUJTj07QiYglZG3xnrK2mMRrO4/zq4E0t1wfihAi7n0Oizqdl0fQB6oI6qe44HruyZ893zyXZNm2TLMQClfQNDiosxUwNmWuztiJiqZs9Uq+B833lpoonQueLS3AdXI/ww6D3WZWxYyB0fqylEsPMxSLUaVNNKd8gS3FjZgmDzDdL0xGaWlxAXfgGNvU06cAOCRvl52i95Qp1lSK2jKdQm6bGh2YmFly476KwMCbtqC6c61PYttR1lvgGI+Zm6mAMdbDUDhp7vjiNr61Jsf04dD4uS1NmIhY+9aTTpyof51fLbTJL5ozvGkmpgkEd+ToYnxUqu03LRJyGOvTF8LAyY+o35BLWtWkdUxULvmD14hEJAjmptz37llnbDvDkBNdWdU2wylKDlPyMny9+xDHbwRAJX1CN75PiFgk/vnFDok1i3GrO97mxHJtENKYiFsyGXboGVaFoqpx9pNqJuPY2VjWYuXxtFpqpUq1CMZ7QOOJYTJszJpicq+fTfjF0LhahZZ22BjPluGVz4UMzgauWAALSFqEOZtM8xIL6hs+Kpo1i2gJRqfaX2DbsXCzcL0Xii7a1ni+heEe1A/C6LXwdjNmsjytL80KdlRFj5dnzY60KmJpYtG2qSihO03TGiMUtW+QB44C+77YNKXZSnmTMTE0s2pzpuEC3YjDBhi4Ulqpg0Jnawi1X5EXI3W9zgu6dWBCtd31o8hwT76gGPdtaoXDLFPlRt0rVxqTRO7GoDgRZFKfB/Kyapm3EidzyRL4wJqoWJok+kTJxvDcqpDewh6HdAxNGatmbvRmnyeLiYlk3LtevXzc5Me8wJmh/0kggzNGi3DP2s88+K8dRI4xodAYfQUq1LKpxCu42FPUQ4HTrLNV/dcsS/YBxU70zt2k/6I1YuMtE5EUcrjmKGZqCLYck+gWiwbghftGUXrghm5ubb7dGP3v2bPHgwYMyL8azs7NTjDpImccM5acDxPDANeFnBv766y9zZHKyFwsu8NatW+ZVUXz77belTy7ioK5+/PFH86oof2OEOhXD5P333ze5ycleLNwfVSFYMzKrzSsRCz9s49bbTH+oRvSWrMXi6dOnJ36ZaW1tTVZFQ1ZXV02uKOu0cURcDJasxcL9WT6sCs2Izfn000/Ln9CzbG9vm5wQcWQtFu5vmGJViDRca4JgJ5abELFkKxasgLx69arME82XVZEOsYvl5WXzqii+//57kxNiPNmKxb1790yuOBHNF2ncvn3b5Irit99+MzkhxpOlWOB+YCYDfva4n6kX8VCXNnaB5ea6ekLUka1YWLRU2j5unUosRCxnuI3T5DvhzJkz5f900OrDTSHsOXBwcKCHxVrm8PCw+OCDD8yr8t5tk6vHbZeOu43IkOwsi7t375pcUVy+fFlC0QHUqXvfhVvnQoTITix+/vlnkyuKjz/+2ORE23DfhcV97F+IENmJhXvHptuhRbsobiEmJSuxqHZaiUW32KdRQQ+XiXFkJRYE3izurcmiGy5evGhyEgsxnqzEwnVBFNjsHteycOteCB9ZicXDhw9NTvdXTAPXzdNzImIcWYmFfRYE5IZ0z8LCgskVxbNnz0xOCD/ZiIVrVYDckO5xYxbgxoyEqJKVZWFxty8X00NxC1FHlmKhB8emh4RZxJKtGyKmg4RZxJKlZSFmg2IWog6JhXiLYhaiDomFECIKiYUQIgqJhXiLboQTdUgsxFt0I5yoIxuxcG89FtNDT5uKWLIRi+qtx2I62F3UhRhHlm6Idm6aDYpZiDrkhgyY6mPpilmIOrJ1Q3T7d/e4WwK4G+EI4SMrN8Q1g//991+TE13hCrJiRmIcWYmFawbr1uPucTe8UbxCjCNby0JLet3z8uVLk9PTp2I8WYmF22FZ0nM7s2gf98eFJBZiHNmKBWhfyO7Qj0+LSclKLMD9Dc5ff/3V5ETbuMHN5eVlkxMiTHZi4W5P/8cff5icaJvd3V2TK4pr166ZnBBhshMLTGK7LyRuiHZvap87d+6YnFwQEU92YgFuB97e3jY50RaKV4gmZC8Wek6kXViSdu9hkViIWLIUC1ZFbNCNJdTNzc0yL9JxLbWVlRWTE2I8WYoF3L592+SK4t69eyYnUsCqcC21r776yuSEGE+2YoF1YR9uwrpwg3KiGTdu3DC54x8XcleehBhHtmIB7j0X6+vrWhlJgMfR3VjF2tqayQkRR9ZiUQ2+aWWkObdu3TK5Y6vCtTKEiCFrsVhcXDwxAyIWel5kcrDI3FjF3t6eyQkRT9ZiATdv3jyxi9bXX39tciIGxPXzzz83r46tNT00JpqQvVhgXTx48MC8Ksq87r2I5/r1628fyMP9kFUhmpK9WAAzoeuO4G8r2DkeRFXuh2iLzsXCuhCpg5ulUxvwZCn1k08+kWCMwV1uph1S3Q/dWTtsOhcLe69EG9vkMTNa8bGCIfx8+eWXJ+p8Y2PD5IRoRi/cEBfXlEYwuLHozZs35oiAH3744cTMj0Wgx9BFKr0TC8TBFQy2hvviiy/MK4FIuPEdhEKxCtEGvRMLYAC4/jOCodvBj4UC98Oi1Q/RJlMVizYDkgwCVzC4HXzIguETikePHplX6VC32nF94Bx1zPLy8hEfY9PW1pb5SzuMBONE+bweGiPhPFEHCwsLRwcHB+avaVBOtQ1JfKYYFp2LRXUwky5cuNBaZ4ZqZx6SYOzs7Jy4dtL+/r75axoIe7XskcXSuuCLftC5WACzkG92Ygbc2Ng4evHihXlnM16/fn2qfATp8ePH5h3zSVUoqM9UoaAuaRPKcsumPvm81LYS/WUqYmEZ+dDlzOR2QpvoiKlUrRg6/Dyay1hlPvcr1VqjrqoiQUI8hJiqWFjofNUOSVpaWkru8D7TuY2BlAs+wV1bWzN/bQZlUvdumSSO8TchYCZiAXRCBrbP0qDzpwxuZshqubzus5WB+U+9uNdESpn1Q2X2va5EN8xMLCyIQhcdlnLxs6vl9jH4ibD6riUl0Bgqc3V11bxDiJPMXCwsBCOrfjiJwGVT0QgF63jNoHjy5Il5Z55w3b7AMMeaBjJDZVL3udeHmC3ZiIWlK//ZZ73YcttaamyLUEwHa6tpHSAEVdeMNE/xHNEt2YmFhRnQF5lPMZNDrgkJ0Zjl/QOIQEjQSCmxCV/QV3EJMSnZigUQgPO5JqkdPRRYtYnPbGMpdxyIFyJQ910QkKYzP3XkKzulTDFcshYLC7Our9OnuiYMJp/L4yb+zuDivak3JOEKUA5iVCcQpJQBzef4riu1vsSwOcM/o47UC3iY6bvvvitevXpljhwzmp2TfuLw4cOHxe7ubvTuT6PBbnJF+TOL7BNahTLt9+QBLPbeGMdIQMqy2aTYV2YMoToaWUra00KkUUpGj3j+/HkZt6jGM9q6HZlgJ66Bb8Wg7cQ1rKyslN87ZSWCa6aM0KpPap0IAb0TCwsmui8giHnfZqASs926DqkCQhnWpWkrZkBZobiEEG3SKzfEByb+1atX3253b8Gk//3334uLFy+aI+0S67IsLS0V58+fN6/ahV3Oq7/S1vV1iwFTSsYc4LMySLNcDu0KrB1fAHMer1Xkw9yIBWDaY+pXBxFmOuZ63wm5Xhxry60RIsRciYWFYKFPNAiC3r9/37yrPxCgJOhaDWCm3PYtxKTMpVhYQrc49+l+g9ANZApgimkz12JhqRtwuZrviFlI6ORyiFkwCLGAkL+fYzzD50LhgujuSzFLBiMWFnx834zNAJ31jF13z4RurBKzZnBiYeGOR98TqIhGyt2UTQh9lz7suSGGw2DFwsJsXl1lsAO1a3ArQoKluITIjcGLBWDi++IEXcUz6uInurFK5IrEwqFuBaKt4GIfV2aEAImFBwa0zzVJ2a0KIfA9iIYbIpEQfUBiEYDAou/5C6yCSa0Mn8tBkssh+oTEYgwstfriGVgJdfEMdhb37bvBaywULYWKviGxiCS0coFoVN2IWa6wCNEVEosJCbkUHEdQfK5Ln55FESJE7ze/mQWHh4fF+vr62A1wzp07V4xEpNykRoi+I7FIILRLF1y5cqXY2trqbJcsIabNe+Z/0YBLly4V+/v7pfVgwZrY29srk4RCzBMSCyFEFHJDhBBRyLIQQkQhsRBCRCGxEEJEIbEQQkQhsRBCRCGxEEJEIbEQQkQhsRBCRCGxEEJEIbEQQkRQFP8DDyurxjmrsM0AAAAASUVORK5CYII=" width="166" height="101"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. 1</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. 2</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. 4</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. 5</span></span></p>
<p> </p>
</div>
<br><hr><br><div class="question">
<p>What information is provided by <sup>1</sup>H NMR, MS and IR for an organic compound?</p>
<p>I. <sup>1</sup>H NMR: chemical environment(s) of protons<br>II. MS: fragmentation pattern<br>III. IR: types of functional group</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>A liquid was added to a graduated cylinder. What can be deduced from the graph?</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" src="data:image/png;base64,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"></p>
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"></p>
</div>
<br><hr><br><div class="question">
<p>The enthalpy of combustion of ethanol is determined by heating a known mass of tap water in a glass beaker with a flame of burning ethanol.</p>
<p>Which will lead to the greatest error in the final result?</p>
<p>A. Assuming the density of tap water is 1.0 g cm<sup>−3</sup></p>
<p>B. Assuming all the energy from the combustion will heat the water</p>
<p>C. Assuming the specific heat capacity of the tap water is 4.18 J g<sup>−1</sup> K<sup>−1</sup></p>
<p>D. Assuming the specific heat capacity of the beaker is negligible</p>
</div>
<br><hr><br><div class="question">
<p>Which value of <em>q</em>, in J, has the correct number of significant figures?</p>
<p style="text-align: center;"><em>q </em>= <em>mc</em>Δ<em>T</em></p>
<p>where <em>m </em>= 2.500 g, <em>c </em>= 4.18 J g<sup>−1</sup> K<sup>−1</sup> and Δ<em>T </em>= 0.60 K.</p>
<p>A. 6</p>
<p>B. 6.3</p>
<p>C. 6.27</p>
<p>D. 6.270</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the name of this compound using IUPAC rules?</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="300" height="103"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. 2,3-diethylbutane</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. 2-ethyl-3-methylpentane</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. 3-methyl-4-ethylpentane</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. 3,4-dimethylhexane</span></span></p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">Data collected from a larger number of silicon samples could also be plotted to determine the density using the following axes.</span></p>
<p><span style="background-color: #ffffff;"><img src="data:image/png;base64,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" width="325" height="191"></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">Which statements are correct?</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;"> I. The density is the slope of the graph.<br> II. The data will show that mass is proportional to volume.<br> III. The best-fit line should pass through the origin.</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">A. I and II only</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">B. I and III only</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">C. II and III only</span></span></p>
<p><span style="background-color: #ffffff;"><span style="background-color: #ffffff;">D. I, II and III</span></span></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="438" height="324"></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>
</div>
<br><hr><br><div class="question">
<p>The rate of a reaction is studied at different temperatures.</p>
<p>Which is the best way to plot the data?</p>
<p><img src="images/Schermafbeelding_2018-08-10_om_07.47.54.png" alt="M18/4/CHEMI/SPM/ENG/TZ2/30"></p>
</div>
<br><hr><br><div class="question">
<p>What is the slope of the graph?</p>
<p style="text-align:center;"><img 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"></p>
<p><br>A. −0.0025 mol dm<sup>−3 </sup>s<sup>−1</sup></p>
<p>B. −0.0025 mol dm<sup>−3 </sup>s</p>
<p>C. −0.0033 mol dm<sup>−3 </sup>s<sup>−1</sup></p>
<p>D. −0.0033 mol dm<sup>−3 </sup>s</p>
</div>
<br><hr><br><div class="question">
<p>What are the absolute and percentage uncertainties for the change in mass?</p>
<p style="padding-left:120px;">Initial mass: 22.35 ±0.05 g</p>
<p style="padding-left:120px;">Final mass: 42.35 ±0.05 g</p>
<p> </p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>Consider the mass spectrum of an element:</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" 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" width="363" height="242"></p>
<p>What is the relative atomic mass of this element?</p>
<p><br>A. 10.2</p>
<p>B. 10.5</p>
<p>C. 10.8</p>
<p>D. 10.9</p>
</div>
<br><hr><br><div class="question">
<p>Burette readings for a titration are shown.</p>
<p style="text-align:center;"> </p>
<p style="text-align:center;"><img 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" width="628" height="103"></p>
<p>What is the mean titre?</p>
<p>A. 11.1 cm<sup>3</sup> ± 0.1 cm<sup>3</sup></p>
<p>B. 11.15 cm<sup>3</sup> ± 0.05 cm<sup>3</sup></p>
<p>C. 11.2 cm<sup>3</sup> ± 0.05 cm<sup>3</sup></p>
<p>D. 11.2 cm<sup>3</sup> ± 0.1 cm<sup>3</sup></p>
</div>
<br><hr><br><div class="question">
<p>What is the index of hydrogen deficiency (IHD) of this molecule?</p>
<p style="text-align:center;"><strong>Paracetamol (acetaminophen)</strong></p>
<p style="text-align:center;"><img src="data:image/png;base64,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"></p>
<p>A. 3</p>
<p>B. 4</p>
<p>C. 5</p>
<p>D. 6</p>
</div>
<br><hr><br><div class="question">
<p><span style="background-color: #ffffff;">What is the value of the temperature change?</span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">Initial temperature: 2.0 ± 0.1 °C<br></span></p>
<p style="text-align: center;"><span style="background-color: #ffffff;">Final temperature: 15.0 ± 1.0 °C</span></p>
<p><span style="background-color: #ffffff;">A. 13.0 ± 0.1 °C<br></span></p>
<p><span style="background-color: #ffffff;">B. 13.0 ± 0.9 °C<br></span></p>
<p><span style="background-color: #ffffff;">C. 13.0 ± 1.0 °C<br></span></p>
<p><span style="background-color: #ffffff;">D. 13.0 ± 1.1 °C</span></p>
</div>
<br><hr><br><div class="specification">
<p><span style="background-color: #ffffff;">Questions 13 and 14 are about an experiment to measure the enthalpy of combustion, Δ<em>H</em><sub>c</sub>, of ethanol, using the apparatus and setup shown.</span></p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question">
<p><span style="background-color: #ffffff;">Which quantity is likely to be the most inaccurate due to the sources of error in this experiment?</span></p>
<p><span style="background-color: #ffffff;">A. Mass of ethanol burnt<br></span></p>
<p><span style="background-color: #ffffff;">B. Molecular mass of ethanol<br></span></p>
<p><span style="background-color: #ffffff;">C. Mass of water<br></span></p>
<p><span style="background-color: #ffffff;">D. Temperature change</span></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>
<br><hr><br><div class="question">
<p>What is the ratio of areas under each signal in the <sup>1</sup>H NMR spectrum of 2-methylbutane?</p>
<p> </p>
<p>A. 6 : 1 : 2 : 3</p>
<p>B. 3 : 3 : 1 : 5</p>
<p>C. 6 : 1 : 5</p>
<p>D. 3 : 3 : 1 : 2 : 3</p>
</div>
<br><hr><br><div class="question">
<p>20 cm<sup>3</sup> of 1 mol dm<sup>−3</sup> sulfuric acid was added dropwise to 20 cm<sup>3</sup> of 1 mol dm<sup>−3</sup> barium hydroxide producing a precipitate of barium sulfate.</p>
<p style="text-align:center;">H<sub>2</sub>SO<sub>4 </sub>(aq) + Ba(OH)<sub>2 </sub>(aq) → 2H<sub>2</sub>O (l) + BaSO<sub>4 </sub>(s)</p>
<p>Which graph represents a plot of conductivity against volume of acid added?</p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>Which compound produces this mass spectrum?</p>
<p><img style="display:block;margin-left:auto;margin-right:auto;" 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"></p>
<p style="text-align:center;"><sup>[Spectral Database for Organic Compounds, SDBS. SDBS Compounds and Spectral Search. [graph] Available at:</sup><br><sup>https://sdbs.db.aist.go.jp [Accessed 3 January 2019].]</sup></p>
<p> </p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>Which spectra would show the difference between propan-2-ol, CH<sub>3</sub>CH(OH)CH<sub>3</sub>, and propanal, CH<sub>3</sub>CH<sub>2</sub>CHO?</p>
<p style="padding-left:120px;">I. mass<br>II. infrared<br>III. <sup>1</sup>H NMR</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>Which information can be gained from an infrared (IR) spectrum?</p>
<p>A. Ionization energy of the most abundant element</p>
<p>B. Number of different elements in the compound</p>
<p>C. Bonds present in a molecule</p>
<p>D. Molecular formula of the compound</p>
</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>
<br><hr><br><div class="question">
<p>What can be deduced from the following <sup>1</sup>H<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
<mspace width="thinmathspace"></mspace>
</math></span>NMR spectrum?</p>
<p><img src="data:image/png;base64,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"></p>
<p>A. There is only one hydrogen atom in the molecule.</p>
<p>B. There is only one hydrogen environment in the molecule.</p>
<p>C. The molecule is a hydrocarbon.</p>
<p>D. There is only one isotope in the element.</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 src="data:image/png;base64,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" width="308" height="162"></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>
<br><hr><br><div class="question">
<p>Which is correct for the spectra of organic compounds?</p>
<p> </p>
<p>A. Mass spectroscopy provides information about bond vibrations.</p>
<p>B. <sup>1</sup>H NMR spectroscopy provides the values of carbon–hydrogen bond lengths.</p>
<p>C. Infrared spectroscopy provides the number of hydrogen atoms.</p>
<p>D. Mass spectroscopy provides information about the structure.</p>
</div>
<br><hr><br><div class="question">
<p>What is the index of hydrogen deficiency (IHD) for this molecule? </p>
<p><img src="data:image/png;base64,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" alt></p>
<p>A. 3</p>
<p>B. 4</p>
<p>C. 5</p>
<p>D. 6 </p>
</div>
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