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<h2>SL Paper 1</h2><div class="question">
<p>Which changes produce the greatest increase in the percentage conversion of methane?</p>
<p style="text-align:center;">CH<sub>4 </sub>(g) + H<sub>2</sub>O (g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> CO (g) + 3H<sub>2 </sub>(g)</p>
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" width="422" height="177"></p>
</div>
<br><hr><br><div class="question">
<p><math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac></math>Cl<sub>2 </sub>(g) + <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mn>2</mn></mfrac><msub><mtext>I</mtext><mn>2</mn></msub></math><sub> </sub>(g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> <math xmlns="http://www.w3.org/1998/Math/MathML"><mtext>I</mtext></math>Cl (g)    <em>K</em><sub>c</sub> = 454</p>
<p>What is the <em>K</em><sub>c</sub> value for the reaction below?</p>
<p style="text-align:center;">2 <math xmlns="http://www.w3.org/1998/Math/MathML"><mtext>I</mtext></math>Cl (g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> Cl<sub>2 </sub>(g) + <math xmlns="http://www.w3.org/1998/Math/MathML"><msub><mtext>I</mtext><mtext>2</mtext></msub></math><sub> </sub>(g)</p>
<p style="text-align:left;">A.  <math xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><mo>×</mo><mn>454</mn></math></p>
<p style="text-align:left;">B.  <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><mrow><mn>2</mn><mo>×</mo><mn>454</mn></mrow></mfrac></math></p>
<p style="text-align:left;">C.  <math xmlns="http://www.w3.org/1998/Math/MathML"><msup><mn>454</mn><mn>2</mn></msup></math></p>
<p style="text-align:left;">D.  <math xmlns="http://www.w3.org/1998/Math/MathML"><mfrac><mn>1</mn><msup><mn>454</mn><mn>2</mn></msup></mfrac></math></p>
</div>
<br><hr><br><div class="question">
<p>What will happen if the pressure is increased in the following reaction mixture at equilibrium?</p>
<p>CO<sub>2</sub> (g) + H<sub>2</sub>O (l) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
  <mo stretchy="false">⇌</mo>
</math></span> H<sup>+</sup> (aq) + HCO<sub>3</sub><sup>−</sup> (aq)</p>
<p>A. The equilibrium will shift to the right and pH will decrease.</p>
<p>B. The equilibrium will shift to the right and pH will increase.</p>
<p>C. The equilibrium will shift to the left and pH will increase.</p>
<p>D. The equilibrium will shift to the left and pH will decrease.</p>
</div>
<br><hr><br><div class="question">
<p>What effect does a catalyst have on the position of equilibrium and the value of the equilibrium constant, <em>K</em><sub>c</sub>, for an exothermic reaction?</p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>Consider the equilibrium between N<sub>2</sub>O<sub>4</sub>(g) and NO<sub>2</sub>(g).</p>
<p>N<sub>2</sub>O<sub>4</sub>(g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
  <mo stretchy="false">⇌</mo>
</math></span> 2NO<sub>2</sub>(g)          Δ<em>H</em> = +58 kJ<span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\,">
  <mspace width="thinmathspace"></mspace>
</math></span>mol<sup>−1</sup></p>
<p>Which changes shift the position of equilibrium to the right?</p>
<p><span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\begin{array}{*{20}{l}} {{\text{I.}}}&amp;{{\text{Increasing the temperature}}} \\ {{\text{II.}}}&amp;{{\text{Decreasing the pressure}}} \\ {{\text{III.}}}&amp;{{\text{Adding a catalyst}}} \end{array}">
  <mtable columnalign="left" rowspacing="4pt" columnspacing="1em">
    <mtr>
      <mtd>
        <mrow>
          <mrow>
            <mtext>I.</mtext>
          </mrow>
        </mrow>
      </mtd>
      <mtd>
        <mrow>
          <mrow>
            <mtext>Increasing the temperature</mtext>
          </mrow>
        </mrow>
      </mtd>
    </mtr>
    <mtr>
      <mtd>
        <mrow>
          <mrow>
            <mtext>II.</mtext>
          </mrow>
        </mrow>
      </mtd>
      <mtd>
        <mrow>
          <mrow>
            <mtext>Decreasing the pressure</mtext>
          </mrow>
        </mrow>
      </mtd>
    </mtr>
    <mtr>
      <mtd>
        <mrow>
          <mrow>
            <mtext>III.</mtext>
          </mrow>
        </mrow>
      </mtd>
      <mtd>
        <mrow>
          <mrow>
            <mtext>Adding a catalyst</mtext>
          </mrow>
        </mrow>
      </mtd>
    </mtr>
  </mtable>
</math></span></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>The equilibrium 2H<sub>2</sub> (g) + N<sub>2 </sub>(g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> N<sub>2</sub>H<sub>4 </sub>(g) has an equilibrium constant, <em>K</em>, at 150 °C. </p>
<p>What is the equilibrium constant at 150 °C, for the reverse reaction?</p>
<p style="text-align:center;">N<sub>2</sub>H<sub>4 </sub>(g) <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> 2H<sub>2</sub> (g) + N<sub>2 </sub>(g)</p>
<p><br>A.  <em>K</em></p>
<p>B.  <em>K</em><sup>−1</sup></p>
<p>C.  −<em>K</em></p>
<p>D.  2<em>K</em></p>
</div>
<br><hr><br><div class="question">
<p>Consider the reaction:</p>
<p style="padding-left:120px;">2N<sub>2</sub>O (g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
  <mo stretchy="false">⇌</mo>
</math></span> 2N<sub>2</sub> (g) + O<sub>2</sub> (g)</p>
<p>The values of <em>K</em><sub>c</sub> at different temperatures are:</p>
<p style="padding-left:120px;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAASQAAAC1CAYAAAD2tIK+AAAgAElEQVR4Ae2dD3BT15X/v5JZQlPhsCzN+gnzqwd7bZLBDYk9kDSZjm2C1JS6ZIA4DYlt4kwWUiC0HmOtvZBfUhwglcfESegkzUixMdD8wS4JybY22DEZ0l28EqV1frXlOoyTGIldGOI/agsG6f7mPb2nv0+2LCxLso5mPHq67957zv3co/PuPffKV8EYY6AXESACRCAGCChjQAdSgQgQASIgECCHRIZABIhAzBCYJWmiUCikS3onAkSACEwLAf+Ikdsh8dL9b06LRiQkIQnwD0Cyt4Tsenej5QZBNGVz46ELIkAEok2AHFK0e4DkEwEi4CZADsmNgi6IABGINgFySNHuAZJPBIiAmwA5JDcKuiACRCDaBMghRbsHSD4RIAJuAuSQ3CjogggQgWgTIIcU7R4g+USACLgJkENyo6ALIkAEok2AHFK0e4DkEwEi4CYwsUO6YUZthgL8Nu/x/jJqzbjhrjYRLkbQ1/EOajcfgDmGGu7sM0KrUENr7IVTphtumGuRwfdlRq2f3mOwdbyAfKGf1civPgGbXAUydVJSMAKX0aHLdX1vSltg88nmhL23EaVq8XuVX42WvhGfHIn4YWKHlIhUQmjzDfOv8IOVP8aOk38PIfd0ZbmB//msC21QY1naAoTeubwz2osNK59HJzjkVTXiSM0qcKFXMF0NjC85zssYOGcVdE7P/ja+5daed0ZN2FKwEQd5L5X3PNqPPI+1mcnuHIl6MbHJzcpBRT8TfgjJ/xjyukmPdJ5Wuh6m6570/ooc+PxSN1GJRrXdQ+g5YwI4DbS580PUhJxRiKAmn835V1z5nPc46bh/8e3i98PXGXElr+HMkSoUcLMnX/8MLDGxQ5pMo+196DDqxGG/Aop8HYwdfbBLdbinf/mo7TDjRG0p1MIUQQtdSy/sGEHfif3iMFaNfF0TzLYxsfRXaCnNgEKRgVJjq1dZ/3x8difsfR0w6rTiNJPPY0SH95DY1oJSYeryAlpapalKEYx9VwEfPVxDanVpLVrMNjhxA7aWzfiH3B34nBf1+Q7k/oMCrimrl44tX0mtBtzt3owWGz+/c9XBT4Ez9h1Fa7Wop9aIPmGaxE8HjdDlq0X9tdAZO9Bnn2AOJT2RszOQqgqla8kZeTopAleXvkC3YCSLkP3tf3TZpdfIiCtpQMeBZ7CcnJEHPv8vbPmX67+PiB/Gebtu0rN0gCFdz0zXvTI6Blhz2VKhHr4uz99SVmLoZqN81usmpk/3vud9rWHllRsY51MWjKtsZ8OCmC9Zc0m6V73eZcGQV8dMow4hp2OwmZVxfvf5erkyZuhx1caszazETxa4KtY+/Hc22LwlQA+hPdwW1jz4V2Zt3hSgR7rexK4zScd0VtL8pQeOu92bWLOVh3Zdtg5XW68Flc+VNLAesY2eyj1XDouBacAxjaGHuUh47klXnv7by9q7G1iJxMm/P6UCEXoP1d4iJH5aqnWzBt/v19hoj8SbY3mVzcwyTl9Oi4JRFiJnA6E8Rj3eK+iVEyOdb2Cr8TPwXr9n1AHGHBjtaUAJ9xkO7jyCrhHfp7s73+gZ6PM4AG2oa5qDmp5hMPY1TPrVgjRb81n8xT9ozM+5rdfA2DVYz7yGEr5452G823UFwGV0vrIHRttSlBi6Mcr4aeUwegxl4GxG7HzLBN/QIYc8/Rkhn6OvGveqBtD6Bh+AXA296WthquoYbEYZL8P2/3D+ohPc2tcDpq7hT1klOdfRt+u7SB45jVe2HoCNK4NBYMHARrthKFkK28FX8ZbQRrmOcMI+2I/uUONHn1dhZbYYw+Cr+7wTH/9xSK5iSguLwA1c+qLfNYrmbgO+OOSJGeEerC4qQGZIo9iwhMdtoSlySH/DX87+p7CKYDu4EXfMTYJCkYS5d4gGb2tDq4l3FtIrB8Wlq7GE7xDVnchfnSXc4Iofx/olfGBvHu7Kz3PFqqQi7vd0lGwrE+fcs8EtfxSlxTkAzGg++wVu3PgCZ5vNAD7DwaeyMVeYEt6GO54yuvRrOgmTj3N8AMU/+g5UAJQqFW5VLkFZqxXM8SbyBzvQ0vImqp7YCqOwRDKKS8P8lG4KX5q1+NHd8wDMgko1Bzf+chbNvCybEU/dcZtryjY3G08d/ExoY1Prn/wcqqTLFZha22CbVPyID2A3wFDO8/sIOyregnmiaaEkjt4nIHADo0Oizdt+gXX3PeUKYAulPkLdLztwwfcZPUF9iXF7ihzS1/ii2ytmEsBuCBeHvFej5uJbt80JyHXrt27DrQGp/gnSfFxKn4PbvjVX+gC45+2eJJ8r2xUM/dXLErgMpKV4BxRH0Gt8CuokNXIfXod16/4Vv+gUvBEAeb196pf7MI5O3LI0pLh7weupKlcP76cuDuGvcvcmHT+SVtNKsbG82jUC7NSj4nWTJ+YnJ4fSQiRgx6DlvFdefsR+DoPtVRAG28Y9eKXzstd9uuQJuL8KN4fjG5iXwj/l+cU3E64L0yTPChxj/Whcu+jmRLhLW3Dij4Nee2yuYvjSqPsuvjkPKXyPIw9606h7dZAPk7n+Xsdazms98Nb5uO1WDwZn31FsF0ZTGlQa3sMxkxWO6ybohaVFj5ipuvJ1wkp8c958wWD9VzHd+jeudd33U8DZ/3u802ZD+qq7sNjTHL9cXh/Ty1H7c9fSvnLhD6CreYR3d+jc8XO8bqapmxep8C6lB4RQmndGv8aBsruwMK8ENRreQM34xUsfiIsY4YmYiaVCMd0Q2j0fuVqN8EX5vO6XONjLR2m8Ntqpq9HhM00KocqgWWxoazqIY8KK2RhsXe+gsYmfouVg3T3fxqzk70ArTOE6UfdKM3r5KYjzAjrElSy1riPIlIcXKMVhAHD/ghXaH2FNzj/hfz75EB8JqyVBlRJvSI75c5z46L9dQ3Je9qtv4OBERYX7SiTnPohi3l4/b8QrBz8TRitO2wlUCytuudB1yD1VJb1FBiHJ8s40B5lFFWIsj6Zu3mTCvrZbYenmR9YcNIb38FbZUiEsAGUm1us2uh4qbb+EgUZJPoinyCEpkbx8A2pKlnrFPm6BWthotxQlNRuwPHmKRPHqd+7Fuiw+vnIL1Cu2CnNzrqwaz+YtADAfy5/cJgS63fGspFSs3NsGcGWoeTIXwbefKaHKysVDwpj6ANal3uKSsfI4kMcPkTwxJOXc+a4Yl8+yfzKyVtwrGJvNuA6pSQooeNmnxiDE7X3QB/mQnIsna8rAecXAktQa7O20gSvZhieXy+0vEuNHyMWKO1wj1SC1B09WLcNj28TRF03dgnMK9c5fh3BRmOlnYdVdqV5TESWSvUdJu5sobufFdOq8hGopyg40o91QiTxJAFcCfVszDkhPByn9pt7TUfLef8LUIMlZihL979BZ/zAWCq1RQrWkGAc622Go1LglcSV1aOvcjzIhaO5ODrhQLvwhao4fRKXkQfIq0WD6DQ5te9AnqKzMeAi760rE6ROHRXDgKmZj4cP/juNu3TjkVRrQ/mY1Vk8cHBN1ScaSsv3obDd4dIDYxgPFroUAf62l6YFmOZb+s9d01D/fuJ953XfgtbKl4tStFu8Ke7LGLUQ3gxC4YT2PT4V7WVis9ouXeo+SOo34ZdtXXiGIIBUmSrK0FUFuT4B0Lzbeg+zxiQ3lSItJEoh9e5tkg3yye+0zC7a/y9HDDBrOtZ9N2EN3nY1amlllnpRWxZot4p45n7pnzgc5G5i6EVKieHBqJxGYkMAsYa+asBDRX4EcuUGrtL2EX2z5+GfIubUf727biqbFr2Hw+gCaFx/Hum1HEy7oLYdqQtyUgQgQgSkmIP7u7dZV38Y/z/o21hq6hZ8aTLGUmK8ujkZIi7C2sR9Tu4Ug5vuHFEwUAspvYn46h89P/BHnneK/LZnS1en4AEkjpPjoJ9JyphNQZqLo1ddg2bQVWUlPAVwJ6o5tQ95Urk7HAUMFHyLj9eR/eS5exoHapGK8EyB7i/cevHn95WwgjqZsNw+AaiACRCC2CZBDiu3+Ie2IQEIRIIeUUN1NjSUCsU2AHFJs9w9pRwQSigA5pITqbmosEYhtAj7L/nzUm15EYLoIkL1NF+n4kePjkGjZP346Lt41lVvyjfc2kf6TIyD3QKIp2+QYUm4iQAQiSIAcUgThUtVEgAhMjgA5pMnxotxEgAhEkAA5pAjCpaqJABGYHAFySJPjRbmJABGIIAFySBGES1UTASIwOQLkkCbHi3ITASIQQQLkkCIIl6omAkRgcgTIIU2OF+UmAjOUwAj6WqqRLxw9r4WupTcqJxiTQ5qh5kXNIgKTIcCf2Lxt6wi2DV6DY3ATLm99GW22G5OpYkrykkNyYxyDzdwEnXBCrAIKhRa6xi7YnO4MrpNt+1pRW5ot/IdNhSIbpbWt6ONPx/V+OW0wN+rEp40CinwdGs02OnvLm9G0XjthN+9H/qT/R/U45fz7mLcX44cw28amp2X2LtTm3y9zkrG/HauRr3sT74v2d8NciwxhFMTbuOcv84O78JH1NaxdOAt/Gx3FjVvnY943p989TL/E6emuSUrhDe8ANhSewYpDA8K/8mWOX2HFJz/Bhrou99DVeeEYtufV4dKa9zDKH18z+h7WXKpDVmG91+mjQzDXPY3CT1bgkIMJdTkOrcAnhU+jzjw0Sb0o+80TcMLe+zZ2Vx9G56QqG6/cGC4cexGFDcBGkxUOxuCwPoeUU1UofPn0OEe1T0qB4Jntn6Fx9178pvNaQB7nhQ+xs/AQsPEYrLz9Ocx4KeU0nil8FZ0jTszKqUA/b7t+f/0VOZgFO8y1KzH3jip8WZSPO1RRcA/SsXNyh7ZJ92b++yXWXpnDuMp25jmaz8GG26sYx1Wx9mEHY0wuD2MOi4FpkMMq2y+5MA23s0rO67OQKl925nMN3sJpsTeHlZkaqliJ/mNmMjzC4O7L4HoJdyYqJxzymM40hh7GW4b0EmwhVBlSoUm9X2NW00FWWVLPzph+5Wt3Qj1/Zxa+nRoDs/goxh9K+V2PjU4k0zHAmsu+y0qav5wo503dl7OBKLjAAKce2wm2fgxc5IfhC1DwkgnWlwqQHKbGtnMDuOg3uwuzKio2IYGr6GuoQIUlH/vK78XcCfNLGUIoZ7fC0j0Py9IWwPsLpExJwzK0odV0RapsSt+dfYewseI8tPs2I3dukkzddgxazoNbloYUH8UWIG3ZNTS1/ino6M3ZZ4RWa3QdTKn8JuYt+EekzPuGjIzIJnmrHVlJMV37fCwvehxZTS04eUGMAThtMJ38E7L0FSjK9DubXWyL0/Yp6l/cj+6yajybt8CVmnwPispT0HT4E1wQnY/T9gec7FoE/Z61yCTi02QJs6F+aD+O71kFblLMJy7nvDiAc7ZgzbDi3MDlIPHCr9Dy1FYYe0f8Co/B1vECtLqOoA6DL6BU/xANx3ehgJvtV1786LyMgXNW+XsAxnsgKjPXo/7RT5GXxMeV8tGYUoWfSjYdtMapvzGprpp68bFSoxKqnGfwRs3/Yl3qLa5gX1IqVprX4o3y5VD5q+nshVGrRpL6AZSfuAc7Nt3nZfTzkFNei5rBrUgVOleBJHUpzMV7UZ4zz78m+hwxAkqouNsD+25CeROVc8I+2I/uCeuRy7AID9esQf/2Si+n5IpfbmxMQ/2uvPFH36rbwY0X1xFGbkE9pZxCXmnJWFJmgFWILXWj8Wf3e9m0V7YIX5JDEgAPwVy7HnmnVqNn1CEG/IbR8+in+MGTjej1X0Vzn8t+DdZDi/HBCg2ebvnC9VTkVz9WPoFTj7a5At9C8LsNj556Bk8aP3MHyCPcr1R9jBJQcqtQ07AO/dufQ8uFq7D3NmFL9Qh0+x7DkvGcTYy2Z6rVIofEEx05i3frLqK4dLWXUSRjyfrHse7Eq3irK1hMYDa4gi3YVXkLjG+0o9/pxEjXMdRZNChdf6fn6ay6E+tL78OJnUfQNUJBpKk24umtTwlVagayb0KokluJ6vq78f4TD6Fw+wBKG6qCT8MmI0elRlY2N5kSMZeXHBKcGDGdRJPcSFfoYOu4wUB3j3b3Y9B+GabWNgRWJRqxLXIBT7cedBFxAkLwOuj3Xh0Q7I64QpIAJR+8VkufAt4Dgt0BOaKfQA4JSiTnPohiOQMT5uRqFGu/g2QxbqQOEnjkih9EbvIC5Go1CKxKjDtwGmhz50e/10mDmyMgPKiGAoLXrmD3YmSlBkQdfeQJ+9n4kdGR3+J4fRoaN+5Fx5RsqFQhNWtxYPBaCHYPITtL7Rm1+2gUOx/IIfF9kZyLJ2tyca71A3T0SSsgI+g9ehhNWY+jaPl8QJmJoj07kNV0GEfdqyT86sgB7G66CzVP5iKZd27LN6BmVT9aj3Z6dnDb/4yjjW3IKn8Yy5MJeeyYf5iaKBdDu+n76N6pR4NoC+4V18rNWB9kVZaX5rSdwM6yNtxf/zMUcHOgWlKMA/VpOLzz14GxykmrNwcZ2h+jrHs/XmwQ45VOG7rq92JndxF06zN9tilMuvrpKCDtbJLbpCTdS4z3YWZpN7DKPI7xLIClrET/O2YZ9d5hxm9Ma2b6kqViHo7lVRpYu8WznVJgNWph7YZKlifUAwauhOnbLGw0MUCG1MrptTdxw2DApkUx3Xtjq4/2wcoxxvz7WLCXZmayXvOpwffDl6y5bAsz9PjZC7vGrO3PM43Pxlzfkv6fAjbkujP42zEYV6JnzSarzyZOd/YoXsjZgILXh3d8dCzNdLh/kiERIHuTSCTuu5wN0Pwhce2BWk4EYo4AOaSY6xJSiAgkLgFySInb99RyIhBzBMghxVyXkEJEIHEJkENK3L6nlhOBmCNADinmuoQUIgKJS4AcUuL2PbWcCMQcAXJIMdclpBARSFwC5JASt++p5UQg5giQQ4q5LiGFiEDiEpjl3XR+Kze9iMB0ESB7my7S8SPHxyGJP2uLH+1J07glIPc7prhtDCkeFgG5BxJN2cJCSYWIABGIBAFySJGgSnUSASIQFgFySGFho0JEgAhEggA5pEhQpTqJABEIiwA5pLCwUSEiQAQiQYAcUiSoUp1EgAiERYAcUljYqBARIAKRIEAOKRJUqU4iEKcE+FNRqvO3osV2IyotIIcUFewklAjEGoEx2MxNqNpQir2d0XFGPBFySLFmF6QPEYgagYUoOvge9OlRUyDRHJITdvN+5Kur0THi9KXutMHcqEO+QiEcCaVQaKEzfgizz4mirqeILl8t5lEjX/cm3jfb4FebWPc48nyl06dIELD34URtKdRin6pL9+OE+yDQcQT620K+Do3+feyfR9ZexpFxs7fsXajNvx+6jst+NY1vozfMtchw27hk6wpk1HbjWzkFyOHm+NU3vR8TaITkhL33beyuPozOAMZjuHDsRRQ2ABtNVjgYg8P6HFJOVaHw5dOQzrJ1XvgQOwsPARuPwepgYA4zXko5jWcKX0Wnv4PDePICFKCEqSbg/AIt2zdgz6U16Bx1gLFhdK65hD1ZG1BrHhpH2hDMdU+j8JMVOMT3MW8Lh1bgk8KnUecuF5q9jCPk5m7ZP0Pj7r34Tee1gHomstFZORXoZ6528W2T/vorcuDzw9aAmqcpQTq4Uu4USele3L87rMzUUMVK9B8zk+ERBv8TTB09zKBJZxpDj8/pnsLpoO684immGgOzeB9mK5T9Lqtsv+TBNJE8T86EvYqsvTnYcHsV49x9J2IW+opj3HgnxA63s0oux7c/2SXWXpnjKReSvUSia/mTkw+yypJ6dsb0K6YJOHF3EjYaTL3rJqZP38SardeD5ZiydDkbSIAR0lX0NVSgwpKPfeX3Yq6co7dbYemeh2VpC3zmsMqUNCxDG1pNVwDYMWg5D25ZGlK8qSkXIG3ZNTS1/kkcSYUgT04HSptCAkokF+yB1boHBcnenXVzImznBnCRn5uHZC83J0uutLPvEDZWnId232bkzk2SyRKqjcoUjZGkqeutGGlQoBqzoX5oP47vWQUuSGudFwdwzhZY0pVixbmBy3A6L2PgnDVYJriNFRPLC1oJ3YgcAacNXfV7sbN7LV579gEkB5OUfA+KylPQdPgTXBADg07bH3CyaxH0e9YiUwmEZC+y9X+Flqe2wtgrBQGkTGOwdbwAra7DHR6Q7ni/K9U/RMPxXSjgZnsne65DtlFPkYCrWTmo6H8da7noTOCCfEUD1IzjBCVU3O1QBW2BE/bBfnQHvS/eEJ6KQb2WV+mJ5HllpctpIHAVfcYiKJLUWFF+Fqt2PIb7gn2hBW3mIae8FjWDW5Ga5Ar6JqlLYS7ei/KceQAfGwzFXmRbtggP16xB//ZKL6fEL3wcwMbGNNTvygvuKPn6VLeDU43zlQ3ZRmWVi4nEcVoXE/qREkTgJgnMQWbZu67gtLUOCz94BDlPt7hHPwGV86tXK5/AqUfbMCoFfUfb8OipZ/Ck8TPYAwpMLkHJrUJNwzr0b38OLReuwt7bhC3VI9DtewxLxnM2kxMTt7nJIUEJVWoGsifqQpUaWdncRLnofgwTUHIr8W+7NgLGt9Haf1VGUydGuo6hzqJB6fo7PaNq1Z1YX3ofTuw8gq4RhGYvMrVLSbwe1fV34/0nHkLh9gGUNlQFn4ZJhUJ5nwE2Sg6J3x3KB6+D+hq1K9gtBK/VQc0iINgdNCfdiD6B87AMyo11rsDU2obAibn40LK5FjhCspdoNHIG2Cg5JN5whCfLkCt47WVIruDlYmSl8hEoFVKzFnsFr8WMQiBxCNlZas8T1asOuowGATFuJLcBlleH00CbO19GsfnI1WoQ+GwS40ZSuZDsRaZ6Mcl54Ri28yOjI7/F8fo0NG7ciw6fDbjBy45/ZwbYqLSpQG5PgHRv5ryL+zT896ewa2yweQvjuDJm6BkWmuuwnmZ1JUs9e08YY47BZlbGLWUlhm42yudyWNmZupLA/S5uYMHkuTMk7EXE7W30DNPn5Xj6SuiuNlbllxbQAaPdzFDyCKs0tDPLqLjhTEjLYXn6M65+D9FeAuqWdNBsctsZYw422tPAysoaWI8kT66gX5qwRy5gH1I4NupX8TR+lLMBPtgnvORuSvdmzvs4DmLUwtoNlSwPYDwLYCkr0Tczk/WaV/OHmaXdwCrzODEPGFeiZ80mq8+GSk+BceR5MiXk1XTYm8NqYs36EsZJfZpXyQztFtGp8NjF/vH/YvvbAlfC9G3e5Rhj/nlk7cW/a79kzWVbvJyRdP8as7Y/zzTjbdiUsorvwRwSY5O1Ub+Kp/GjnA0oePn8MJCOpRl/MEx3p5YA2dvU8ozH2uRsgGJI8diTpDMRmKEEyCHN0I6lZhGBeCRADikee410JgIzlAA5pBnasdQsIhCPBMghxWOvkc5EYIYSIIc0QzuWmkUE4pEAOaR47DXSmQjMUALkkGZox1KziEA8EiCHFI+9RjoTgRlKwOffwvE7J+lFBKaLANnbdJGOHzk+Dkn8FUn8aE+axi0BuZ8NxG1jSPGwCMg9kGjKFhZKKkQEiEAkCJBDigRVqpMIEIGwCJBDCgsbFSICRCASBMghRYIq1UkEiEBYBMghhYWNChEBIhAJAuSQIkGV6iQCRCAsAuSQwsJGhYgAEYgEAXJIkaBKdRIBIhAWAXJIYWGjQkRgZhJw2k6gOn8rWmw3otJAckhRwU5CiUCsERiDzdyEqg2l2NsZHWfEE0kwh+SE3bwf+XIHCDptMDfqkK9QCCewKBRa6IwfwuxzgJ8T9r5W1JZmi3myUVrbij6708e6nLYuNOq0Yh4FFPk6GN83w+abzacMfSAC00HghrkWGW4bl2xdgYzas3BgIYoOvgd9+nRoIi8jgRySE/bet7G7+jA6A1iM4cKxF1HYAGw0WeFgDA7rc0g5VYXCl09jRMwvnDiaV4dLa97DKGNgo+9hzaU6ZBXWwyw5JecXOLbzJ2jAEzBZr4Gxa7C+9H9w6plNeLnzcoBkSoggAf+HTL4OjWYbgj8XLqNDl+t5kAR8cXOh65DpQ3sXavPvl78XqeYFleka6ejy1WI71MjXvYn3xXbPyqlAP2+7fn/9FfciNacAOdycSGkcWr3SuXByh7ZJ9+L+3WFlpoYqVqL/mJkMjzD4n1zr6GEGTTrTGHp8DnwUDuNz573E2itzfE6y5bn4H9jn+vwIM1j+7oXNdSAhN4mDAL0Kz8jLyNvb18ykX824smY2KB5A6zp5eDXTm76eHFPhFNx0r5NrvYqPdrOGyofZd/0Pm/TKMuWX48h0tVHDKhvOMCvf7glPV/bT7rqJ6dM3sWbrdb8bU/9RzgYSYIR0FX0NFaiw5GNf+b2YK+en7VZYuudhWdoCnzmsMiUNy9CGVtMVAAtQ8JIJ1pcKkCxXh5AmnQGfgbSU2V65ZiMlLQNoOgnTSPDns1cBurxZAiNn8W7dRRQ//j0sFK1cufB7eLz4IurePese9U4sZgjm13+OHdiC2s25ULkLiCORLR24o+gHXunuDBG4mEjmVfS3vg1j9qN4qng5OL7dSg7Lt1ehJvuUaMcRUGsKq0wAhzQb6of24/ieVa4OkoHnvDiAczaZG0KSFecGLssO8522T1H/4n50l1Xj2bwFAMZwcaAfQauy9WPg4lgwQZQ+TQRs5wZwMaTnAh9zfAsVOy6iclcxclSer4uz7xA2VpyHdt9m5M5NmhbNJ5Zpx6DlPLhlaUjxqAooFyBt2TU0tf5pEo54WpoUIMRb7YCbMyNBCRV3+zhPMHFUM5nGOnth1KqRpH4A5SfuwY5N94nOzmUQk6mK8kaIQPI9KCpPQdPhT3BBdD5O2x9wsmsR9HvWIjMUy3d+hbZfGmFxP3A8uirVP0TD8V0o4LxHwp778ldfoeWprTD2SlFJKdcYbB0vQKvrGNdhTCjTeRkD56xSpQHvITniWTmo6H8dazmff5UWUFekEkLplkjJjt96lUtQ1mp1BawPLcYHKzR4uuUL2VFU/DYy3jWfh5zyWtQMbrYKRLcAAAqQSURBVEVqkms1KUldCnPxXpTnzAupcc7+drxhvMVn2ucuqLodnNeIyZ0+7sUiPFyzBv3bK72cEj8KO4CNjWmo35U3TjgAwEQyhdBD0PH5uJrFyk1ySFBClZqB7LB6ZDa4gi3YVXkLjG+0o9+pQmrW4rBqokJTTIBfhVr5BE492uZaERVWRdvw6Kln8KTxM9gnFHcV/ad/h7a8x1G0fP6EuUPNoORWoaZhHfq3P4eWC1dh723CluoR6PY9hiWTdnChSo2ffOSQ+LgfH7zmgnWaOiDYLZuzux+D9llC8DpoVZx/sFu2Jkq8aQJOjHQdQ51Fg9L1d3qm66o7sb70PpzYeQRdEy0uOAdw+p2z0BQ/hLun2FEouZWorr8b7z/xEAq3D6C0oWqSU78ggFRqZGUHtb4ghWIrmRwS3x9CRw4FBK9dwe7FyEpVAWLcSB1kns8VP4jc5Fmu0VZA8FoMdmdnIHWKjTu2zClWtLkCU2ubzOKCOBq2SSunwfV19v8e77QFrrwGLxEDd4TgtTqoIgHB7qA5o3eDHBLPXrkY2k3fR/dOPRrEgKN7Ba1yM9ZnzgGUmSjaswNZTYdx1B2U5IORB7C76S7UPJkrzP+VGSuxqawHO198B73CZskx2LoMeHHneVTqfhRaMDV69jBDJM9HrlaDwLGCtC1DA23ueNMwcbrGTZQvPFzCBlt+ZHTktzhen4bGjXvR4fOLgPDqBVwhg4DgtRDsHkJ2ltozWgxXRITLkUMSAM/GQs2zOFSzAE133CbscE1Sb8a57Bdw/KcPiIFGJVQ5W3Dk+Gpc2Xu/uAs2DRtaF2FX536ULRF3JykXQaOrR03KEdwxNwkKxS1QP9yF7NfewE+FrQER7lGqXvhFVPLyDahZ1Y/Wo52en/bY/4yjjW3IKn8Yy5PHM31xtTQCI1r+x6s7y9pwf/3PUMDNgWpJMQ7Up+Hwzl+LD7Cb6cA5yND+GGXd+/Figxgnc9rQVb8XO7uLoFuf6bPP7mYkRaystP9SbtekdI/eicBUE5gWexu1sHZDJcsDGC8PXAnTt1nYqLsxrh30CNhl7dqVD42BWcRd3u4iMhf+u/VlsohJX7Lmsi3M0DPsl+Uas7Y/zzST2MkfXOYws7QbWGUe52ozwLgSPWs2WX1+heCnQFQ+ytmAgteE93Z0TlbEfD5VLEOA7E0GSoIlydnAeOPWBMNDzSUCRCDaBMghRbsHSD4RIAJuAuSQ3CjogggQgWgTIIcU7R4g+USACLgJkENyo6ALIkAEok2AHFK0e4DkEwEi4CZADsmNgi6IABGINgFySNHuAZJPBIiAmwA5JDcKuiACRCDaBHz+LRy/c5JeRGC6CJC9TRfp+JHj45DEX5HEj/akadwSkPvZQNw2hhQPi4DcA4mmbGGhpEJEgAhEggA5pEhQpTqJABEIiwA5pLCwUSEiQAQiQYAcUiSoUp1EgAiERYAcUljYqBARIAKRIEAOKRJUqU4iQATCIkAOKSxsVIgIEIFIECCHFAmqVCcRIAJhESCHFBY2KkQEiEAkCJBDigRVqpMIEIGwCCSYQ3LCbt6PfHU1OvyPUnbaYG7UIV+hEM9c00Jn/BBmnwP8rqLPWCTel/Lx72pojb1wSl1g78OJ2lKoxbrUpftxom9EukvvM5LAEMy1P0Swk40Dmuxvb/k6NJptog05MdJR7bYf/icW/n8hywkQHNsJCeSQnLD3vo3d1YfRGdAnY7hw7EUUNgAbTVY4GIPD+hxSTlWh8OXT8LgS/gDBC9AYeoQ8/G//XH9WtJYtcR3C5/wCLds3YM+lNegcdYCxYXSuuYQ9WRtQax4KkEwJM4HACHob96L6N2dDawxvI09vwCuOYhwXbGgYlm1JaMjdjoa+q66DLgv2wOq2L8nOvoZJvxrIq8PxXXniAaahiYybXNIJcXKHtkn34v7dYWWmhipWov+YmQyPMHBVrH3Y6wRARw8zaNKZxtDjc5iecBifd97hdlbJ5bDK9ktBkDjYcHsV47zL8DmF+jnGTeIgwCACZkzyTLE3h/UMa6jcwvRnTjODJpQ+DmIjzHU4ZXAbcbBRUx3Lw2qmN309I+xAzgYSYIR0FX0NFaiw5GNf+b2YK/eosFth6Z6HZWkLfI4aVqakYRna0Gq6IpRyXhzAOdtiZKWq5GrxPNmse1Aw7lHNQYpTcnwRcPaiYePPYdFWoTz3n0LU/QpMrW1A8YPI9bGRBSh4yQTrSwXyIx+7Ca9X6GGpLMe/5swLUVb8ZUsAhzQb6of24/ieVeCCtNblaIJ1nhXnBi7DCSfsg/3o5r6B/23Z5J7fq0tr0eKe+8vU4T5bfS1ee/YBeWOTKUZJcUBAmYqHGt7GnoKFPg+ycTV3XsbAuSFkZ90Ka4cRuny1EB8aP844hgttB1Fnmfk2FOQrOi7SOLuphIq7HcHGNJAczYStGsPFgX7YshZjeemb4vzegb5/X4wzFT9BXUB8SAyAJ6mxovwsVu14DPdxsyeUQhniiYAKHBfcsmRbIozG/wZ7UxW2n1yEn7ZbwZgDfVXzcegH1Wi5MBZYzHkerW+0AMVr8eDCmW1DCeCQAvs3vJQ5yCx7F+zj/4sCt2NRQpX5PWiXf4Ud1S3ocy+z8RLE/EKAvA4LP3gEOU+34IJPnvA0oVLxTsCG388uxqs10qhdCdWS1Shd91/Y+or3Ioqrnc7+3+OdtntQXnTPjB9hk0OCEqrUDGSHbeMqpGYtBrr7MWiX9zZKbiX+bddGwPg2Wvv5VRR6JToBblkaUny+fS47sp0bwEUfM7qK/tO/Q5tmLX5098yNHUn24INESky0dyF4zQVrtTog2B0s58Tp52EZtE+cjXLMXALJ34G2OCf09jkHcPqd0wh0YKFXEU85ySHxvaVSIyt7SAxee7rPZ1XN2QujVi2z8Y3fm3QenLBqMubaOCm38ZKvltNAmzvfI4CuEpBAMrJW3As0nYTJZ3Oua49b3qqlUHt9K13TNTWKtd+Z8dM13hi8mp6AtiE1WbkY2k3fR/dOPRp6XdsgnbZPUf/ifnRXbsb6zDmAMhNFe3Ygq+kwjop5hIB470dobL5XXEGbg8yiCuiz2tB49M+QxkJOWzv27W7DqpoNWO6z1CspQO+JQ2A2FmpKUJ71Lnb/yiTayBhsXe+gsflubHtsmdcCjLiyi/G2mswscuSQhP7kjeRZHKpZgKY7bhOWYZPUm3Eu+wUc/6m0VK+EKmcLjhxfjSt77xe38qei8C0HSv9jD9ZKqx+q5Sg/8gbWXNEjU9zyn7ThJDJ2HcGBsqVexjazDIlaE4SAOLJWeI+aVctRcfw/UI0Doo3cgpwDY3jC246CVDfTkxX8lk++kXQszUzv6thqH9lbbPVHNLSRswEaIUWjJ0gmESACsgTIIclioUQiQASiQYAcUjSok0wiQARkCZBDksVCiUSACESDADmkaFAnmUSACMgSIIcki4USiQARiAYBckjRoE4yiQARkCVADkkWCyUSASIQDQLkkKJBnWQSASIgS4AckiwWSiQCRCAaBGZ5C+W3ctOLCEwXAbK36SIdP3LcDkn8SVv8aE6aEgEiMOMI0JRtxnUpNYgIxC8Bckjx23ekORGYcQT+P8MYE4gC4HC+AAAAAElFTkSuQmCC"></p>
<p>Which statement is correct at higher temperature?</p>
<p>A.   The forward reaction is favoured.</p>
<p>B.   The reverse reaction is favoured.</p>
<p>C.   The rate of the reverse reaction is greater than the rate of the forward reaction.</p>
<p>D.   The concentration of both reactants and products increase.</p>
</div>
<br><hr><br><div class="question">
<p>What happens when the temperature of the following equilibrium system is increased? </p>
<p>CO(g) + 2H<sub>2</sub>(g) <img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABIAAAARCAYAAADQWvz5AAABFklEQVQ4EWP8////fwYqACYqmAE2YqAM+sxw98Yz7J4AhRHR4Pf1/zEMDP8rtz/A0MKAIUJI4Ol2UOT8n3HiFYpKFgaGPwwPL19iePHtN3Yno4myckkzrC5gYAi1EGNgOPGUId1cCqyC8f//7/83NacyzLvFwMCLpgkXl4tLhIGLi4HhzTdJhoaJZQzKHAwMjCD34dJAijjYa5c3LWE49o6NgZftF8Pnzz+J1v/zJzuDTWQMg5EoCwMLAwMLg6q+BEO+gifDfgYGhhmrlzKwf/lFpGFsDKwwlfCgf3Xovz8Dw/+mvU/hQqQwUKL/NzRqJ559R4oZYLUoWYRFyoPh3aW9DDpcMPcST1Mt1lBcRLz9mCqpZhAAjQ1JgToZNTsAAAAASUVORK5CYII=" alt> CH<sub>3</sub>OH(g)         Δ<em>H</em><sup>θ</sup> = -91kJ</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<br><hr><br><div class="question">
<p>Which factor does <strong>not </strong>affect the position of equilibrium in this reaction?</p>
<p style="text-align: center;">2NO<sub>2</sub>(g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
  <mo stretchy="false">⇌</mo>
</math></span> N<sub>2</sub>O<sub>4</sub>(g)     Δ<em>H </em>= −58 kJ mol<sup>−1</sup></p>
<p>A.     Change in volume of the container</p>
<p>B.     Change in temperature</p>
<p>C.     Addition of a catalyst</p>
<p>D.     Change in pressure</p>
</div>
<br><hr><br><div class="question">
<p>What is the equilibrium constant expression, <em>K</em><sub>c</sub>, for the following reaction?</p>
<p>2NH<sub>3</sub>(g) + 2O<sub>2</sub>(g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
  <mo stretchy="false">⇌</mo>
</math></span> N<sub>2</sub>O(g) + 3H<sub>2</sub>O(g)</p>
<p>A.     <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{3\left[ {{{\text{H}}_2}{\text{O}}} \right]\left[ {{{\text{N}}_2}{\text{O}}} \right]}}{{2\left[ {{\text{N}}{{\text{H}}_3}} \right]2\left[ {{{\text{O}}_2}} \right]}}">
  <mfrac>
    <mrow>
      <mn>3</mn>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mn>2</mn>
            </msub>
          </mrow>
          <mrow>
            <mtext>O</mtext>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>N</mtext>
              </mrow>
              <mn>2</mn>
            </msub>
          </mrow>
          <mrow>
            <mtext>O</mtext>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
    </mrow>
    <mrow>
      <mn>2</mn>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <mtext>N</mtext>
          </mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mn>3</mn>
            </msub>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
      <mn>2</mn>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>O</mtext>
              </mrow>
              <mn>2</mn>
            </msub>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
    </mrow>
  </mfrac>
</math></span></p>
<p>B.     <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{{{\left[ {{\text{N}}{{\text{H}}_3}} \right]}^2}{{\left[ {{{\text{O}}_2}} \right]}^2}}}{{\left[ {{{\text{N}}_2}{\text{O}}} \right]{{\left[ {{{\text{H}}_2}{\text{O}}} \right]}^3}}}">
  <mfrac>
    <mrow>
      <mrow>
        <msup>
          <mrow>
            <mrow>
              <mo>[</mo>
              <mrow>
                <mrow>
                  <mtext>N</mtext>
                </mrow>
                <mrow>
                  <msub>
                    <mrow>
                      <mtext>H</mtext>
                    </mrow>
                    <mn>3</mn>
                  </msub>
                </mrow>
              </mrow>
              <mo>]</mo>
            </mrow>
          </mrow>
          <mn>2</mn>
        </msup>
      </mrow>
      <mrow>
        <msup>
          <mrow>
            <mrow>
              <mo>[</mo>
              <mrow>
                <mrow>
                  <msub>
                    <mrow>
                      <mtext>O</mtext>
                    </mrow>
                    <mn>2</mn>
                  </msub>
                </mrow>
              </mrow>
              <mo>]</mo>
            </mrow>
          </mrow>
          <mn>2</mn>
        </msup>
      </mrow>
    </mrow>
    <mrow>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>N</mtext>
              </mrow>
              <mn>2</mn>
            </msub>
          </mrow>
          <mrow>
            <mtext>O</mtext>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
      <mrow>
        <msup>
          <mrow>
            <mrow>
              <mo>[</mo>
              <mrow>
                <mrow>
                  <msub>
                    <mrow>
                      <mtext>H</mtext>
                    </mrow>
                    <mn>2</mn>
                  </msub>
                </mrow>
                <mrow>
                  <mtext>O</mtext>
                </mrow>
              </mrow>
              <mo>]</mo>
            </mrow>
          </mrow>
          <mn>3</mn>
        </msup>
      </mrow>
    </mrow>
  </mfrac>
</math></span></p>
<p>C.     <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{2\left[ {{\text{N}}{{\text{H}}_3}} \right]2\left[ {{{\text{O}}_2}} \right]}}{{3\left[ {{{\text{H}}_2}{\text{O}}} \right]\left[ {{{\text{N}}_2}{\text{O}}} \right]}}">
  <mfrac>
    <mrow>
      <mn>2</mn>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <mtext>N</mtext>
          </mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mn>3</mn>
            </msub>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
      <mn>2</mn>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>O</mtext>
              </mrow>
              <mn>2</mn>
            </msub>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
    </mrow>
    <mrow>
      <mn>3</mn>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>H</mtext>
              </mrow>
              <mn>2</mn>
            </msub>
          </mrow>
          <mrow>
            <mtext>O</mtext>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>N</mtext>
              </mrow>
              <mn>2</mn>
            </msub>
          </mrow>
          <mrow>
            <mtext>O</mtext>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
    </mrow>
  </mfrac>
</math></span></p>
<p>D.     <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext="\frac{{\left[ {{{\text{N}}_2}{\text{O}}} \right]{{\left[ {{{\text{H}}_2}{\text{O}}} \right]}^3}}}{{{{\left[ {{\text{N}}{{\text{H}}_3}} \right]}^2}{{\left[ {{{\text{O}}_2}} \right]}^2}}}">
  <mfrac>
    <mrow>
      <mrow>
        <mo>[</mo>
        <mrow>
          <mrow>
            <msub>
              <mrow>
                <mtext>N</mtext>
              </mrow>
              <mn>2</mn>
            </msub>
          </mrow>
          <mrow>
            <mtext>O</mtext>
          </mrow>
        </mrow>
        <mo>]</mo>
      </mrow>
      <mrow>
        <msup>
          <mrow>
            <mrow>
              <mo>[</mo>
              <mrow>
                <mrow>
                  <msub>
                    <mrow>
                      <mtext>H</mtext>
                    </mrow>
                    <mn>2</mn>
                  </msub>
                </mrow>
                <mrow>
                  <mtext>O</mtext>
                </mrow>
              </mrow>
              <mo>]</mo>
            </mrow>
          </mrow>
          <mn>3</mn>
        </msup>
      </mrow>
    </mrow>
    <mrow>
      <mrow>
        <msup>
          <mrow>
            <mrow>
              <mo>[</mo>
              <mrow>
                <mrow>
                  <mtext>N</mtext>
                </mrow>
                <mrow>
                  <msub>
                    <mrow>
                      <mtext>H</mtext>
                    </mrow>
                    <mn>3</mn>
                  </msub>
                </mrow>
              </mrow>
              <mo>]</mo>
            </mrow>
          </mrow>
          <mn>2</mn>
        </msup>
      </mrow>
      <mrow>
        <msup>
          <mrow>
            <mrow>
              <mo>[</mo>
              <mrow>
                <mrow>
                  <msub>
                    <mrow>
                      <mtext>O</mtext>
                    </mrow>
                    <mn>2</mn>
                  </msub>
                </mrow>
              </mrow>
              <mo>]</mo>
            </mrow>
          </mrow>
          <mn>2</mn>
        </msup>
      </mrow>
    </mrow>
  </mfrac>
</math></span></p>
</div>
<br><hr><br><div class="question">
<p><span class="fontstyle0">What is correct when temperature increases in this reaction at equilibrium?</span></p>
<p style="text-align: center;"><math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mn>2</mn><mi>NOCl</mi><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>⇌</mo><mn>2</mn><mi>NO</mi><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced><mo>+</mo><msub><mi>Cl</mi><mn>2</mn></msub><mo> </mo><mfenced><mi mathvariant="normal">g</mi></mfenced></math>    <math class="wrs_chemistry" xmlns="http://www.w3.org/1998/Math/MathML"><mo>∆</mo><msup><mi>H</mi><mo>⦵</mo></msup><mo>=</mo><mo>+</mo><mn>75</mn><mo>.</mo><mn>5</mn><mo> </mo><mi>kJ</mi></math></p>
<p style="text-align: left;"><img 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" width="463" height="165"></p>
</div>
<br><hr><br><div class="question">
<p>Which species are acids in the equilibrium below?</p>
<p style="text-align:center;">CH<sub>3</sub>NH<sub>2</sub> + H<sub>2</sub>O <math xmlns="http://www.w3.org/1998/Math/MathML" class="wrs_chemistry"><mo>⇌</mo></math> CH<sub>3</sub>NH<sub>3</sub><sup>+</sup> + OH<sup>–</sup></p>
<p>A.  CH<sub>3</sub>NH<sub>2</sub> and H<sub>2</sub>O</p>
<p>B.  H<sub>2</sub>O and CH<sub>3</sub>NH<sub>3</sub><sup>+</sup></p>
<p>C.  H<sub>2</sub>O and OH<sup>–</sup></p>
<p>D.  CH<sub>3</sub>NH<sub>2</sub> and CH<sub>3</sub>NH<sub>3</sub><sup>+</sup></p>
</div>
<br><hr><br><div class="question">
<p>The equilibrium constant for N<sub>2</sub>(g) + 3H<sub>2</sub>(g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
  <mo stretchy="false">⇌</mo>
</math></span> 2NH<sub>3</sub>(g) is <em>K</em>.</p>
<p>What is the equilibrium constant for this equation?</p>
<p style="text-align: center;">2N<sub>2</sub>(g) + 6H<sub>2</sub>(g) <span class="mjpage"><math xmlns="http://www.w3.org/1998/Math/MathML" alttext=" \rightleftharpoons ">
  <mo stretchy="false">⇌</mo>
</math></span> 4NH<sub>3</sub>(g)</p>
<p>A.     <em>K</em></p>
<p>B.     2<em>K</em></p>
<p>C.     <em>K</em><sup>2</sup></p>
<p>D.     2<em>K</em><sup>2</sup></p>
</div>
<br><hr><br>