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</div><h2>SL Paper 1</h2><div class="question">
<p class="p1">The reaction below represents the Haber process for the industrial production of ammonia.</p>
<p class="p2">\[\begin{array}{*{20}{l}} {{{\text{N}}_2}{\text{(g)}} + 3{{\text{H}}_2}{\text{(g)}} \rightleftharpoons {\text{2N}}{{\text{H}}_3}({\text{g)}}}&amp;{\Delta {H^\Theta } = - 92{\text{ kJ}}} \end{array}\]</p>
<p class="p1">The optimum conditions of temperature and pressure are chosen as a compromise between those that favour a high yield of ammonia and those that favour a fast rate of production. Economic considerations are also important.</p>
<p class="p1">Which statement is correct?</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>A higher temperature would ensure higher yield and a faster rate.</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>A lower pressure would ensure a higher yield at a lower cost.</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>A lower temperature would ensure a higher yield and a faster rate.</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>A higher pressure would ensure a higher yield at a higher cost.</p>
</div>
<br><hr><br><div class="question">
<p>Which experimental methods could be used to observe the progress of the following reaction?</p>
<p style="text-align: center;">Cr<sub>2</sub>O<sub>7</sub><sup>2-</sup>(aq) + 6I<sup>-</sup>(aq) + 14H<sup>+</sup>(aq) &rarr; 2Cr<sup>3+</sup>(aq) + 3I<sub>2</sub>(aq) + 7H<sub>2</sub>O(l)&nbsp;</p>
<p style="padding-left: 30px;">I. Change in colour&nbsp;<br>II. Change in mass&nbsp;<br>III. Change in electrical conductivity&nbsp;</p>
<p>A. &nbsp;I and II only&nbsp;</p>
<p>B. &nbsp;I and III only&nbsp;</p>
<p>C. &nbsp;II and III only&nbsp;</p>
<p>D. &nbsp;I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statements describe the action of a catalyst?</p>
<p class="p1">I. <span class="Apple-converted-space">&nbsp; &nbsp; </span>It does <strong>not </strong>alter the \(\Delta H\) for a reaction.</p>
<p class="p1">II. <span class="Apple-converted-space">&nbsp; &nbsp; </span>It increases the \({E_{\text{a}}}\) for the reaction.</p>
<p class="p1">III. <span class="Apple-converted-space">&nbsp; &nbsp; </span>It alters the mechanism (pathway) of a reaction.</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I and II only</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I and III only</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>II and III only</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Consider the reaction between magnesium and hydrochloric acid. Which factors will affect the reaction rate?</p>
<p class="p1">I. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The collision frequency of the reactant particles</p>
<p class="p1">II. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The number of reactant particles with \(E \geqslant {E_{\text{a}}}\)</p>
<p class="p1">III. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The number of reactant particles that collide with the appropriate geometry</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I and II only</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I and III only</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>II and III only</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>Which statements are correct?</p>
<p>     I.     The activation energy of a reaction is not affected by temperature.</p>
<p>     II.     A catalyst reduces the enthalpy change of a reaction.</p>
<p>     III.     Catalysts provide alternative reaction pathways.</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>Copper catalyses the reaction between zinc and dilute sulfuric acid.</p>
<p style="padding-left: 180px;">Zn(s) + H<sub>2</sub>SO<sub>4</sub>(aq) &rarr; ZnSO<sub>4</sub>(aq) + H<sub>2</sub>(g)</p>
<p>Why does copper affect the reaction?</p>
<p>A. &nbsp; &nbsp; Decreases the activation energy</p>
<p>B. &nbsp; &nbsp; Increases the activation energy</p>
<p>C. &nbsp; &nbsp; Increases the enthalpy change</p>
<p>D. &nbsp; &nbsp; Decreases the enthalpy change</p>
</div>
<br><hr><br><div class="specification">
<p style="text-align: center;">CaCO<sub>3</sub>(s) + 2HCl(aq) &rarr; CaCl<sub>2</sub>(aq) + H<sub>2</sub>O(l) + CO<sub>2</sub>(g)</p>
</div>

<div class="question">
<p>Which methods can be used to monitor the progress of this reaction?</p>
<p style="padding-left: 90px;">\(\begin{array}{*{20}{l}} {{\text{I.}}}&amp;{{\text{Change in colour of this reaction mixture}}} \\ {{\text{II.}}}&amp;{{\text{Change in mass of this reaction mixture}}} \\ {{\text{III.}}}&amp;{{\text{Change in volume of gas evolved}}} \end{array}\)</p>
<p>A. &nbsp; &nbsp; I and II only</p>
<p>B. &nbsp; &nbsp; I and III only</p>
<p>C. &nbsp; &nbsp; II and III only</p>
<p>D. &nbsp; &nbsp; I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statement about the kinetic theory is <strong>not </strong>correct?</p>
<p class="p1">A.&nbsp; &nbsp; &nbsp;The particles in ice vibrate about fixed points.</p>
<p class="p1">B.&nbsp; &nbsp; &nbsp;The particles in steam have more energy than the particles in ice.</p>
<p class="p1">C.&nbsp; &nbsp; &nbsp;All the particles in water have the same amount of energy at 298 K.</p>
<p class="p1">D.&nbsp; &nbsp; &nbsp;Evaporation of water occurs at all temperatures between 273 K and 373 K when the atmospheric pressure is 101 kPa.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Hydrochloric acid is reacted with large pieces of calcium carbonate, the reaction is then repeated using calcium carbonate powder. How does this change affect the activation energy and the collision frequency?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-04_om_08.32.53.png" alt="N09/4/CHEMI/SPM/ENG/TZ0/18"></p>
</div>
<br><hr><br><div class="question">
<p>Why does the rate of a reaction increase when the temperature is increased?</p>
<p>I.&nbsp; &nbsp; &nbsp;The activation energy decreases.</p>
<p>II.&nbsp; &nbsp; &nbsp;There are more particles with energy equal to or greater than the activation energy.</p>
<p>III.&nbsp; &nbsp; &nbsp;The frequency of collisions between particles increases.</p>
<p>A.&nbsp; &nbsp; &nbsp;I and II only</p>
<p>B.&nbsp; &nbsp; &nbsp;I and III only</p>
<p>C.&nbsp; &nbsp; &nbsp;II and III only</p>
<p>D.&nbsp; &nbsp; &nbsp;I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which graph best represents the relationship between the average kinetic energy of molecules of a gas and temperature in K?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-14_om_14.37.25.png" alt="M13/4/CHEMI/SPM/ENG/TZ1/17"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">The diagram below shows the energy changes for a reaction with and without a catalyst. Which symbols represent the activation energy, \({E_{\text{a}}}\), and the enthalpy change, \(\Delta H\), for the reaction with a catalyst?</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-26_om_08.23.03.png" alt="N13/4/CHEMI/SPM/ENG/TZ0/18_01"></p>
<p class="p1"><img src="images/Schermafbeelding_2016-08-26_om_08.24.13.png" alt="N13/4/CHEMI/SPM/ENG/TZ0/18_02"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which changes increase the rate of the reaction below?</p>
<p class="p1">\[{{\text{C}}_{\text{4}}}{{\text{H}}_{{\text{10}}}}{\text{(g)}} + {\text{C}}{{\text{l}}_{\text{2}}}{\text{(g)}} \to {{\text{C}}_{\text{4}}}{{\text{H}}_{\text{9}}}{\text{Cl (l)}} + {\text{HCl(g)}}\]</p>
<p class="p1">I. <span class="Apple-converted-space">&nbsp; &nbsp; </span>Increase of pressure</p>
<p class="p1">II. <span class="Apple-converted-space">&nbsp; &nbsp; </span>Increase of temperature</p>
<p class="p1">III. <span class="Apple-converted-space">&nbsp; &nbsp; </span>Removal of HCl(g)</p>
<p class="p1">&nbsp;</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I and II only</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I and III only</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>II and III only</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which factors can increase the rate of a chemical reaction?</p>
<p class="p1">I.&nbsp; &nbsp; &nbsp;Increasing the pressure in gaseous reactions</p>
<p class="p1">II.&nbsp; &nbsp; &nbsp;Increasing the temperature in gaseous reactions</p>
<p class="p1">III.&nbsp; &nbsp; &nbsp;Increasing the particle size of a solid in a reaction</p>
<p class="p1">A.&nbsp; &nbsp; &nbsp;I and II only</p>
<p class="p1">B.&nbsp; &nbsp; &nbsp;I and III only</p>
<p class="p1">C.&nbsp; &nbsp; &nbsp;II and III only</p>
<p class="p1">D.&nbsp; &nbsp; &nbsp;I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statement best describes and explains the effect of a catalyst on the rate of a chemical reaction?</p>
<p class="p2">A.&nbsp; &nbsp; &nbsp;The rate increases because the frequency of collisions between particles increases.</p>
<p class="p2">B.&nbsp; &nbsp; &nbsp;The rate increases because more colliding particles have the energy needed to react.</p>
<p class="p2">C.&nbsp; &nbsp; &nbsp;The rate increases because the activation energy increases.</p>
<p class="p2">D.&nbsp; &nbsp; &nbsp;The rate increases because more molecules are present.</p>
</div>
<br><hr><br><div class="question">
<p>Which factors can affect the rate of reaction?</p>
<p>     I.     Particle size of solid reactant</p>
<p>     II.     Concentration of reacting solution</p>
<p>     III.     Pressure of reacting gas</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 class="p1">Which factors can affect reaction rate?</p>
<p class="p1" style="padding-left: 30px;">I.&nbsp; &nbsp; &nbsp;The state of the reactants</p>
<p class="p1" style="padding-left: 30px;">II.&nbsp; &nbsp; &nbsp;The frequency of the collisions between particles</p>
<p class="p1" style="padding-left: 30px;">III.&nbsp; &nbsp; &nbsp;The average kinetic energy of the particles</p>
<p class="p1">A.&nbsp; &nbsp; &nbsp;I and II only</p>
<p class="p1">B.&nbsp; &nbsp; &nbsp;I and III only</p>
<p class="p1">C.&nbsp; &nbsp; &nbsp;II and III only</p>
<p class="p1">D.&nbsp; &nbsp; &nbsp;I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which are appropriate units for the rate of a reaction?</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>\({\text{mol}}\,{\text{d}}{{\text{m}}^{ - 3}}{{\text{s}}^{ - 1}}\)</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>\({\text{mol}}\,{\text{d}}{{\text{m}}^{ - 3}}{\text{s}}\)</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>\({\text{mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\)</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>s</p>
</div>
<br><hr><br><div class="specification">
<p style="text-align: center;">CaCO<sub>3</sub>(s) + 2HCl(aq) &rarr; CaCl<sub>2</sub>(aq) + H<sub>2</sub>O(l) + CO<sub>2</sub>(g)</p>
</div>

<div class="question">
<p>Which change does <strong>not</strong> increase the initial rate of reaction when CaCO<sub>3</sub>(s) is added to&nbsp;excess HCl(aq)?</p>
<p>A. &nbsp; &nbsp; Decrease in the size of the CaCO<sub>3</sub>(s) particles</p>
<p>B. &nbsp; &nbsp; Increase in the temperature of the reaction mixture</p>
<p>C. &nbsp; &nbsp; Increase in the concentration of HCl(aq), keeping the same volume</p>
<p>D. &nbsp; &nbsp; Increase in the volume of HCl(aq), keeping the same concentration</p>
</div>
<br><hr><br><div class="question">
<p class="p1">The following enthalpy level diagram shows the effect of the addition of a catalyst on a chemical reaction. What do <strong><em>m</em></strong>, <strong><em>n </em></strong>and <strong><em>o </em></strong>represent?</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-01_om_16.39.18.png" alt="M12/4/CHEMI/SPM/ENG/TZ2/18_1"></p>
<p class="p1" style="text-align: left;"><img src="images/Schermafbeelding_2016-11-01_om_16.40.24.png" alt="M12/4/CHEMI/SPM/ENG/TZ2/18_2"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">In which flask will the reaction between 2.0 g of magnesium carbonate and 25 cm<sup><span class="s1">3 </span></sup>1.0 mol dm<span class="s1"><sup>&ndash;3</sup>&nbsp;</span>hydrochloric acid occur most rapidly?</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-23_om_05.28.53.png" alt="N12/4/CHEMI/SPM/ENG/TZ0/18"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">A piece of zinc was added to aqueous nitric acid and the volume of hydrogen gas produced was measured every minute. The results are plotted on the graph below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-27_om_06.52.01.png" alt="N10/4/CHEMI/SPM/ENG/TZ0/17_1"></p>
<p class="p1">Which graph would you expect if the same mass of powdered zinc was added to nitric acid with the same concentration?</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-27_om_06.53.05.png" alt="N10/4/CHEMI/SPM/ENG/TZ0/17_2"></p>
</div>
<br><hr><br><div class="question">
<p>Nitrogen gas reacts with hydrogen gas according to the following equation.</p>
<p>\[{{\text{N}}_{\text{2}}}{\text{(g)}} + {\text{3}}{{\text{H}}_{\text{2}}}{\text{(g)}} \rightleftharpoons {\text{2N}}{{\text{H}}_{\text{3}}}{\text{(g)}}\;\;\;\;\;\Delta H =&nbsp; - 92{\text{ kJ}}\]</p>
<p>Why is the rate of reaction slow at room temperature?</p>
<p>A. &nbsp; &nbsp; The activation energy of the forward reaction is high.</p>
<p>B. &nbsp; &nbsp; The activation energy of the forward reaction is low.</p>
<p>C. &nbsp; &nbsp; The equilibrium constant is very small.</p>
<p>D. &nbsp; &nbsp; The rate of the reverse reaction is greater than the rate of the forward reaction.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statement is true about using sulfuric acid as a catalyst in the following reaction?</p>
<p class="p1">\[{\text{C}}{{\text{H}}_{\text{3}}}{\text{&ndash;CO&ndash;C}}{{\text{H}}_{\text{3}}}{\text{(aq)}} + {{\text{I}}_{\text{2}}}{\text{(aq)}}\xrightarrow{{{{\text{H}}^ + }{\text{(aq)}}}}{\text{C}}{{\text{H}}_{\text{3}}}{\text{&ndash;CO&ndash;C}}{{\text{H}}_{\text{2}}}{\text{&ndash;I(aq)}} + {\text{HI(aq)}}\]</p>
<p class="p1">I. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The catalyst increases the rate of reaction.</p>
<p class="p1">II. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The catalyst lowers the activation energy for the reaction.</p>
<p class="p1">III. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The catalyst has been consumed at the end of the chemical reaction.</p>
<p class="p1">&nbsp;</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I and II only</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I and III only</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>II and III only</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Consider the reaction between gaseous iodine and gaseous hydrogen.</p>
<p class="p2">\[\begin{array}{*{20}{l}} {{{\text{I}}_2}{\text{(g)}} + {{\text{H}}_2}{\text{(g)}} \rightleftharpoons {\text{2HI(g)}}}&amp;{\Delta {H^\Theta } = - 9{\text{ kJ}}} \end{array}\]</p>
<p class="p1">Why do some collisions between iodine and hydrogen <strong>not </strong>result in the formation of the product?</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The \({{\text{I}}_{\text{2}}}\) and \({{\text{H}}_{\text{2}}}\) molecules do not have sufficient energy.</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The system is in equilibrium.</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The temperature of the system is too high.</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>The activation energy for this reaction is very low.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which of the following can <strong>increase </strong>the rate of a chemical reaction?</p>
<p class="p1">I.&nbsp; &nbsp; &nbsp;Increasing the temperature</p>
<p class="p1">II.&nbsp; &nbsp; &nbsp;Adding a catalyst</p>
<p class="p1">III.&nbsp; &nbsp; &nbsp;Increasing the concentration of reactants</p>
<p class="p1">A.&nbsp; &nbsp; &nbsp;I and II only</p>
<p class="p1">B.&nbsp; &nbsp; &nbsp;I and III only</p>
<p class="p1">C.&nbsp; &nbsp; &nbsp;II and III only</p>
<p class="p1">D.&nbsp; &nbsp; &nbsp;I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>Which conditions must be met for a reaction to take place?</p>
<p style="padding-left: 30px;">I. &nbsp; Reactants collide with sufficient energy.<br>II. &nbsp; Reactants collide with correct orientation.<br>III. &nbsp;Reactants must be in the same state.</p>
<p>A. &nbsp;I and II only<br>B. &nbsp;I and III only<br>C. &nbsp;II and III only<br>D. &nbsp;I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Equal masses of powdered calcium carbonate were added to separate solutions of hydrochloric acid. The calcium carbonate was in excess. The volume of carbon dioxide produced was measured at regular intervals. Which curves best represent the evolution of carbon dioxide against time for the acid solutions shown in the table below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-15_om_12.04.17.png" alt="M09/4/CHEMI/SPM/ENG/TZ1/20_1"></p>
<p class="p1" style="text-align: left;"><img src="images/Schermafbeelding_2016-10-15_om_12.05.22.png" alt="M09/4/CHEMI/SPM/ENG/TZ1/20_2"></p>
</div>
<br><hr><br><div class="question">
<p>Which change increases the rate of a chemical reaction?</p>
<p>A.&nbsp; &nbsp; &nbsp;Increasing the size of solid reactant particles</p>
<p>B.&nbsp; &nbsp; &nbsp;Decreasing the concentration of aqueous reactants</p>
<p>C.&nbsp; &nbsp; &nbsp;Increasing the surface area of a solid reactant</p>
<p>D.&nbsp; &nbsp; &nbsp;Decreasing the pressure of gaseous reactants</p>
</div>
<br><hr><br><div class="question">
<p>Which is <strong>not</strong> affected by an increase in temperature?</p>
<p>A. &nbsp; &nbsp; Rate of reaction</p>
<p>B. &nbsp; &nbsp; Collision frequency</p>
<p>C. &nbsp; &nbsp; Collision geometry</p>
<p>D. &nbsp; &nbsp; % of molecules with \(E \ge {E_a}\)</p>
<p>&nbsp;</p>
</div>
<br><hr><br><div class="question">
<p>Which change increases the rate of formation of hydrogen when zinc reacts with excess hydrochloric acid, assuming all other conditions remain the same?</p>
<p style="text-align: center;">Zn(s) + 2HCl(aq) → ZnCl<sub>2</sub>(aq) + H<sub>2</sub>(g)</p>
<p>A.     Adding water to the hydrochloric acid</p>
<p>B.     Decreasing the temperature</p>
<p>C.     Increasing the volume of hydrochloric acid</p>
<p>D.     Decreasing the size of the zinc particles while keeping the total mass of zinc the same</p>
</div>
<br><hr><br><div class="question">
<p>The potential energy profile for the reversible reaction, X + Y ƒ\( \rightleftharpoons \) Z is shown.</p>
<p><img style="margin-right:auto;margin-left:auto;display: block;" src="images/Schermafbeelding_2018-08-10_om_07.23.02.png" alt="M18/4/CHEMI/SPM/ENG/TZ2/16"></p>
<p>Which arrow represents the activation energy for the reverse reaction, Z → X + Y, with a catalyst?</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which piece of equipment could <strong>not </strong>be used in an experiment to measure the rate of this reaction?</p>
<p class="p1">\[{\text{C}}{{\text{H}}_3}{\text{COC}}{{\text{H}}_3}{\text{(aq)}} + {{\text{I}}_2}{\text{(aq)}} \to {\text{C}}{{\text{H}}_3}{\text{COC}}{{\text{H}}_2}{\text{I (aq)}} + {{\text{H}}^ + }{\text{(aq)}} + {{\text{I}}^ - }{\text{(aq)}}\]</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>A colorimeter</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>A gas syringe</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>A stopwatch</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>A pH meter</p>
</div>
<br><hr><br><div class="question">
<p>\({\text{100 c}}{{\text{m}}^{\text{3}}}\) of a \({\text{1.00 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) solution of hydrochloric acid is added to 2.00 g of small pieces of calcium carbonate at 20 &deg;C. The volume of carbon dioxide produced against time is plotted to give curve <strong>P</strong>.</p>
<p><img src="images/Schermafbeelding_2016-08-09_om_09.45.20.png" alt="M15/4/CHEMI/SPM/ENG/TZ2/18"></p>
<p>Which change will produce curve <strong>Q</strong>, given that calcium carbonate is always the limiting reagent?</p>
<p>A. &nbsp; &nbsp; Increasing the volume of the hydrochloric acid to \({\text{200 c}}{{\text{m}}^{\text{3}}}\)</p>
<p>B. &nbsp; &nbsp; Increasing the mass of calcium carbonate to 4.00 g</p>
<p>C. &nbsp; &nbsp; Increasing the concentration of the hydrochloric acid to \({\text{2.00 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\)</p>
<p>D. &nbsp; &nbsp; Replacing the 2.00 g of small pieces of calcium carbonate with 2.00 g of larger pieces of calcium carbonate</p>
</div>
<br><hr><br><div class="question">
<p>The diagram represents the Maxwell‒Boltzmann energy distribution curve of the reactants for a chemical reaction with different activation energies, \({E_{{\text{a1}}}}\) and \({E_{{\text{a2}}}}\).</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-16_om_07.47.56.png" alt="M14/4/CHEMI/SPM/ENG/TZ1/18"></p>
<p>What is the reason why the rate of the reaction with activation energy \({E_{{\text{a2}}}}\) is greater?</p>
<p>A. &nbsp; &nbsp; More frequent collisions between the particles occur.</p>
<p>B. &nbsp; &nbsp; More energetic collisions between the particles occur.</p>
<p>C. &nbsp; &nbsp; A catalyst has been added.</p>
<p>D. &nbsp; &nbsp; The temperature is higher.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which unit could be used for the rate of a chemical reaction?</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>mol</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>\({\text{mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\)</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>\({\text{mol}}\,{\text{d}}{{\text{m}}^{ - 3}}{{\text{s}}^{ - 1}}\)</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>\({\text{d}}{{\text{m}}^{\text{3}}}\)</p>
</div>
<br><hr><br><div class="question">
<p>Excess magnesium powder was added to a beaker containing hydrochloric acid, HCl (aq).</p>
<p>The mass of the beaker and its contents was recorded and plotted against time (line I).</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p>Which change could give line II?</p>
<p>A. Doubling the mass of powdered Mg</p>
<p>B. Using the same mass of Mg ribbon</p>
<p>C. Increasing the temperature</p>
<p>D. Using the same volume of more concentrated HCl</p>
</div>
<br><hr><br><div class="question">
<p>For the reaction <strong>R </strong>&rarr; <strong>P</strong>, which letter represents the activation energy for the catalysed <strong>reverse </strong>reaction?</p>
<p><img 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" alt></p>
</div>
<br><hr><br><div class="question">
<p>Which quantity can be changed by the use of a catalyst?</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_05.07.57.png" alt="N14/4/CHEMI/SPM/ENG/TZ0/18"></p>
<p>A. &nbsp; &nbsp; I and II only</p>
<p>B. &nbsp; &nbsp; I and III only</p>
<p>C. &nbsp; &nbsp; II and III only</p>
<p>D. &nbsp; &nbsp; I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">What is the best definition of <em>rate of reaction</em>?</p>
<p class="p1">A.&nbsp; &nbsp; &nbsp;The time it takes to use up all the reactants</p>
<p class="p1">B.&nbsp; &nbsp; &nbsp;The rate at which all the reactants are used up</p>
<p class="p1">C.&nbsp; &nbsp; &nbsp;The time it takes for one of the reactants to be used up</p>
<p class="p1">D.&nbsp; &nbsp; &nbsp;The increase in concentration of a product per unit time</p>
</div>
<br><hr><br><div class="question">
<p class="p1">A student added 0.20 g of calcium carbonate powder to \({\text{100 c}}{{\text{m}}^{\text{3}}}\) of \({\text{1.0 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) hydrochloric acid (an excess) and measured the volume of the gas that was evolved. The graph of the results is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-03_om_13.42.48.png" alt="N11/4/CHEMI/SPM/ENG/TZ0/17_1"></p>
<p class="p1">Which graph would be obtained if 0.20 g of calcium carbonate powder is added to \({\text{100 c}}{{\text{m}}^{\text{3}}}\) of \({\text{0.5 mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\) hydrochloric acid (an excess)?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-03_om_13.44.24.png" alt="N11/4/CHEMI/SPM/ENG/TZ0/17_2"></p>
</div>
<br><hr><br><div class="question">
<p>Which is a correct unit for expressing the rate of a reaction?</p>
<p>A. &nbsp; &nbsp; \({\text{mol}}\,{\text{d}}{{\text{m}}^{ - 3}}{{\text{s}}^{ - 1}}\)</p>
<p>B. &nbsp; &nbsp; \({\text{mol}}\,{\text{d}}{{\text{m}}^{ - 3}}{\text{s}}\)</p>
<p>C. &nbsp; &nbsp; \({\text{mol}}\,{\text{s}}\)</p>
<p>D. &nbsp; &nbsp; \({\text{mo}}{{\text{l}}^{ - 1}}\,{\text{d}}{{\text{m}}^{\text{3}}}{{\text{s}}^{ - 1}}\)</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which variable is best to use when determining the rate of decomposition of hydrogen peroxide?</p>
<p class="p1">\[{\text{2}}{{\text{H}}_{\text{2}}}{{\text{O}}_{\text{2}}}{\text{(l)}} \to {\text{2}}{{\text{H}}_{\text{2}}}{\text{O(l)}} + {{\text{O}}_{\text{2}}}{\text{(g)}}\]</p>
<p class="p1">A. <span class="Apple-converted-space">&nbsp; &nbsp; </span>Volume of solution</p>
<p class="p1">B. <span class="Apple-converted-space">&nbsp; &nbsp; </span>Volume of gas</p>
<p class="p1">C. <span class="Apple-converted-space">&nbsp; &nbsp; </span>pH of solution</p>
<p class="p1">D. <span class="Apple-converted-space">&nbsp; &nbsp; </span>Conductivity of solution</p>
</div>
<br><hr><br><div class="question">
<p>Consider the following reaction between hydrogen peroxide, hydrogen ions and iodide ions.</p>
<p>\[{{\text{H}}_{\text{2}}}{{\text{O}}_{\text{2}}}{\text{(aq)}} + {\text{2}}{{\text{H}}^ + }{\text{(aq)}} + {\text{2}}{{\text{I}}^ - }{\text{(aq)}} \to {{\text{I}}_{\text{2}}}{\text{(aq)}} + {\text{2}}{{\text{H}}_{\text{2}}}{\text{O(l)}}\]</p>
<p>Which changes could be used to investigate the rate of this reaction?</p>
<p>I. &nbsp; &nbsp; Electrical conductivity</p>
<p>II. &nbsp; &nbsp; Mass of solution</p>
<p>III. &nbsp; &nbsp; Colour intensity</p>
<p>A. &nbsp; &nbsp; I and II only</p>
<p>B. &nbsp; &nbsp; I and III only</p>
<p>C. &nbsp; &nbsp; II and III only</p>
<p>D. &nbsp; &nbsp; I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statements explain the increase in the rate of a reaction when the temperature is increased?</p>
<p class="p1">I.&nbsp; &nbsp; &nbsp;More particles have energy greater than the activation energy.</p>
<p class="p1">II.&nbsp; &nbsp; &nbsp;The frequency of collisions increases.</p>
<p class="p1">III.&nbsp; &nbsp; &nbsp;The activation energy decreases.</p>
<p class="p1">A.&nbsp; &nbsp; &nbsp;I and II only</p>
<p class="p1">B.&nbsp; &nbsp; &nbsp;I and III only</p>
<p class="p1">C.&nbsp; &nbsp; &nbsp;II and III only</p>
<p class="p1">D.&nbsp; &nbsp; &nbsp;I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>100 cm<sup>3</sup> of 10% hydrogen peroxide solution decomposes at 298 K to form water and oxygen.</p>
<p style="padding-left: 150px;">H<sub>2</sub>O<sub>2</sub>(aq) &rarr; H<sub>2</sub>O(l) + \(\frac{1}{2}\)O<sub>2</sub>(g)</p>
<p>The dotted line graph represents the volume of oxygen produced.</p>
<p style="text-align: center;"><img 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hGIIYH169fbwY+Li4uRl5cHzs3T6hYxBKysREAERCBGBFwKPQD7ijH/sStww71fYnWlSjVF/ZsfxeRH++Lcuu6DJUvoVYKrHRFIGgGuZjFs2DB7CbPCwkL7e9Iqo4JFQAREQASqJeBe6NnZl2H3N/Pw0SeLseCL3chs2Rlt27RD9xOPQE6VuXvV1ifkSQm9kGh0QgQSQoDDsxR4nIvH4McUfPKoTQh6FSICIiACUROIkdCLuvywb5TQCxuVLhSBmBOggwXXqd2wYYMdNoVz8zRUG3PMylAEREAEYk7AnTNGzKujDEVABLxGgGFS2rdvX+FwobApXush1UcEREAEQhNwudZt6Ix1RgREILUJmNh4Zp1aEww5tVul2ouACIhAehGQRS+9+lutFYGwCHColvPvKPK4Ti33ueKFkgiIgAiIQGoRiFjolf1nIJp0uwV9n3gNLy/egK1lWt4stbpctRWB6gk4h2rnzp2rdWqrx6WzIiACIuBpAhEP3WbWa4OB2Q/gqTvG4nU2rUUPdLjsYlzc5VScf/qJOKVebcTI0dbT4FQ5EfAbAedQrWLj+a131R4REIF0JRCl120Z9nz3EZZ8PAsfz/0HZrxdjLnraNk7DvUvvQTndu+Kc/NOwbnHN0b9mrGRffK6TddHVO1OBIFAr1pa9ZREQAREQARSn0CUQi+g4WWbsf7T6Vj4r1n456y5eOX9UuwEkNGhF04561o8Mro3utVxJ/gk9AKYa1cEYkSA8fAGDhyI3NxcOzYew6goiYAIiIAI+INAbIReJRZ7sOObhfjPwnfwyfx/YNrLXdHjq2cxqnHEo8SVcpXQq4RDOyLgmkBgAGR51bpGqgxEQAREwHME4iD0KrfR2lWKnQfnoK47gx4k9Cpz1Z4IuCHgXKs2Pz/ftuS5yU/3ioAIiIAIeJNAxF63kTYj4xD3Ii/SMnW9CIhAaAK03DF0SnFxMcaPHy+RFxqVzoiACIhAyhOIu9BLeUJqgAj4iACXLuvdu7e9fNmSJUswYMAAH7VOTREBERABEQgk4G7iXGBu2hcBEfAkAYVO8WS3qFIiIAIiEHcCsujFHbEKEIHkEmDolG7dutmrXAwdOhTz5s2zLXrJrZVKFwEREAERSASBGAi9Muze+A9MWLwN5bBQtvFFPHVlPWRmnoyW9xZh7o79iWiHyhABEQhCgPPxKPLofMH5eIqPFwSSDomACIiAjwm4FHp7sf3DK3Hh8Rfiukn/wQ/WYky/ZxiGT62Ho05bj/I/9seFD8zDBh8DVNNEwKsEnPPxaMXTfDyv9pTqJQIiIALxI+BO6JX/E0WjpmFuo+sx6Mq2yFk5Hi9O3g30/ANe/ddKTC6og93PvYHxm/bFrwXKWQREoBIBzsdj0OPRo0eDS5lx6JZetkoiIAIiIALpR8Cd0Pt+Ef79SRkO6n8dnjwtB5s++gCzcRjqndMBJ2ccgqNPaArs/BLLN/4v/ciqxSKQBAIcotV8vCSAV5EiIAIi4FEC7rxuy/ZgN9c6A1ALX2P14o0AOqFr2yNRE//Dju0lABog6yCX0ZI9Ck/VEgEvETBOFyUlJfZ8PA3Veql3VBcREAERSA4Bdxa9I05F566Z2Pv2NEyY8SdMmbITaNMDfTrUwfblT2LcX9YBrU5DtxZ1ktM6lSoCaUKA69W2b9/ebq3i46VJp6uZIiACIhAGAZdLoO3B1g+uwBU9p2OubdlrjxNfmYrFV6zAs516Y9ia83Demy+gqEdT1A6jMtVdoiXQqqOjc+lMYNiwYRgzZgzatm0LrVebzk+C2i4CIiACVQm4FHrMcDe2ryzCO3/bhZJzz8dVpzRBbsZGLH5+PJacMQTXtj4cWVXLjfiIhF7EyHSDzwk4gyBzvVqGTjn00EN93mo1TwREQAREIBICMRB6kRQX/bUSetGz053+I0CnC3rWcr3agoICMJSKkgiIgAiIgAgEEnDnjGHnZqGstBj/mbcaGwKcaxvWWY/i1+rg0KduxjWH1wgsW/siIAJREJDTRRTQdIsIiIAIpCkBl0KPAZMHIr//q5ixzgqOMPv3ePjx4Kd0VAREIDICdLoYOHAgcnNzQacLxceLjJ+uFgEREIF0I+DO69YOmPwaZmzrjBOGDsUNXWsB2d3R4bYbcX1nul90Q/epd2BYA1nz0u3BUntjT4DDsxR5dLpQEOTY81WOIiACIuBHAu6E3i8BkzOvvhtFhY/irutaADt/g9NuGIMX352Mpy74CB+9XYw1IYx9fgSqNolAPAgwJp5Z6YLLmR199NHxKEZ5ioAIiIAI+IyAO6H3S8DkWs0bolnGQTjimGPQFF9h+dc7kVH3PFx8+THY8+Lf8PJXAZP3fAZRzRGBeBGgZy2HZydOnAh61lLkybM2XrSVrwiIgAj4j4A7oZfbFM2aAvu+2oINVgbqNDwGx2Mr1n37EyzUQM2DagHYhI3fa61b/z06alG8CRinC3rWFhYWgvPzlERABERABEQgEgLunDEOORNnX1MPDzz9MC5rcSjev/k0nNH6Obz3+t/wcNOGOGTaaiD7ZLRoeFAkddK1IpD2BIzII4jx48dDy5ml/SMhACIgAiIQFQHXcfSs78bjiZtvxYhdYzD3navQ8r2+uObyGb+slNEUDUZNwaL7TsdRLpe7VRy9qPpXN6UgAVruuNoFE4dq5Vmbgp2oKouACIiARwi4Fnp2O8o2Y/lnNdC8QwPUrlgpYwu+69oL15zZHPVdijyWIaHnkSdG1YgrARM+hZ61/C6RF1fcylwEREAEfE/AndCztmLdggX4dGt1brWHIqd1G3Ro2RD1a0av+CT0fP8spn0DOTxLpwuKPDldpP3jIAAiIAIiEBMC7ubo7Z+PN6/rixFrD1yXjE6/x7CX7scTJx2K6OXegcvRFSKQagToWcuhWuNZqzVrU60HVV8REAER8C4Bd0KvRlvkDT4Rx438HGs6DcBFV56BLns3oH7N5Vg6eyaeee8INBl5Dx5o9CZmjn0Ghf0ORtN5D2L4Ee6K9S5O1UwEIiNAkdetWzd7zVqGT5FnbWT8dLUIiIAIiED1BFwqrlJ8/fkarO78KCbPuh3X5Py6AoZ14yQ06jEQ967KQsuHZ+Li487Cvy56Cy8vuBnD+jSTVa/6ftHZNCDgFHkMn2IcMNKg6WqiCIiACIhAggi4i6O37X28V7QbWb3ORB+HyGPdM3LOR49e9WBNW4jZWyzUa98N52A1Vq/bhr0JapyKEQGvEmD4FK5uwRh5DJ8ikefVnlK9REAERCC1CbgTejWyULsWsG/F11gV6I9hbcCG5TuBw7KRm5UBa3cpSpCNgw6qJWteaj8zqr1LAs4YeXPnzlWMPJc8dbsIiIAIiEBoAu6E3uEX4OJBh6N8wv247L6/YfLn67Bq1RdY//krmPbgQNw9uQbqXH8+rjnoI8yaVIQ5aIcu7ZpA4ZNDd4jO+JsA5+C1b9/ebiQ9azk/T0kEREAEREAE4kXAXXgVANaOv2PysAEY8vIP2Fmplo2Qe91jmFrYD10+Ph+tenyC7f3HYc64fujCldEiTAqvEiEwXe45AoqR57kuUYVEQAREwPcEXAs9m5D1Izb9+zV88P5CzCgGstqfgy5ndsdVpzRBbkY5dq+ahD9/fiIuuqA9WteJzogooef7Z9HXDRw1ahRGjx6tGHm+7mU1TgREQAS8RyA2Qi8B7ZLQSwBkFREXAiYQcl5eHqZNm4ZDDz00LuUoUxEQAREQAREIJBCdeS0wF+2LgAgEJWBEHmPkabWLoIh0UAREQAREII4EXMbRi2PNlLUIpDABxsjr1asX5s+fDwVCTuGOVNVFQAREIMUJyKKX4h2o6nuPgAmETJFXUFCg1S6810WqkQiIgAikDQFZ9NKmq9XQRBAwIs8EQubQrZIIiIAIiIAIJItADISehbIdy7H80xVY+X1g1GQAWa3Q4fw2aFErI1ltVLkikBACDITM4doNGzbYq11I5CUEuwoRAREQARGohoBLobcPOz67A7de9jQmrAki8uyCB6Ng0zMY1dhlUdU0QqdEINkEnKtdcEkzibxk94jKFwEREAERIAF36mvvTIy/6RlM2NIZJ9x9FS5pVI6sH36oTLZuF5x7WI3Kx7QnAj4i4BR59Kxt166dj1qnpoiACIiACKQyAXdC7/ulWPxROWoOvQ8z/3gujtbobCo/C6p7FAQo7DhcyySRFwVA3SICIiACIhBXAu68bg9pgIaNgIy6B6OuRF5cO0qZe48AlzTr3r27XTGJPO/1j2okAiIgAiIAuBN6uZfj2ruPQ9lr0zF2/S6EmqUn0CLgNwLOdWs5dKvhWr/1sNojAiIgAv4g4G4JtP1zMeXaK3Dfq1uxFo2Q060zmmz9sjKZnGtx28wRuO5wd/P0tARaZazaSx4Bp8ijJU9LmiWvL1SyCIiACIhA9QTczdFDKbat2Ia1dhmbUTrvLSwPLC/7W2wrCzyofRFITQISeanZb6q1CIiACKQrAXcWvQRSk0UvgbBVVFACo0aNwujRo9G2bVutWxuUkA6KgAiIgAh4jYBLi57XmqP6iEB8CDAu3sSJEyXy4oNXuYqACIiACMSJgDtnjF8qZe3+DB+/eisKBnRC686P4KUfd+LLKcMwatEW7IlTxZWtCCSKgBF5+fn5suQlCrrKEQEREAERiAkB1xY968dJePzqmzBy1u5fKtQJ3+zZjg0LX8LowavwyZsvoKhHU9SOSXWViQgkloBT5HF+npIIiIAIiIAIpBIBdxY9ayU+eGg4Rn54Afp+8DnmP1T/l7Y3xJl3j8LI376LWbe/gjf+q8ArqfRQqK4/E5DI05MgAiIgAiKQ6gTcCb3SOZg95UdkXj0AD3Q7CgdXBE3OQK0jb8B1NxwDfPEJ5q011r5Ux6X6pwsBibx06Wm1UwREQAT8TcCd0Nu1FVs2A7WaN0TzjP8FkMpC3cNyAZSg9L/lAee0KwLeJSCR592+Uc1EQAREQAQiI+BO6OW2wHGtM7B3yRoUW4Gz8L7CZ/9cDWS3wglNsiKrla4WgSQRkMhLEngVKwIiIAIiEBcC7oTeIeei1+BjccjUxzDg6QVYX7IfwC5sXfsp3nm0H37/jIXaV12AyxvXikvllakIxIrATz/9ZC9jxhAq9K6V40WsyCofERABERCBZBJwHzB531K8/4eL0PvRTdhZqSXZqH35g3jxmSG49gjXzr1QwORKcLUTQwIUed26dUNxcbFEXgy5KisREAEREIHkE3Av9NgG60ds+vdr+OD9hZhRvAcZJ3RH21O6oX+PVmhSs8JDw1VrJfRc4dPNIQg4RV5hYSGGDRsW4kodFgEREAEREIHUI+BO6FlbsW7BAny6tbrwKYcip3UbdGjZEPVdiD4JvdR7uLxeY6fIGz9+PDg/T0kEREAEREAE/ETA3Zjq/vl487q+GLH2wEgyOv0ew166H0+cdChiY+M7cJm6QgRCEZDIC0VGx0VABERABPxEwJ3Qq9EWeYNPxHEjP8eaTgNw0ZVnoMveDahfczmWzp6JZ947Ak1G3oMHGr2JmWOfQWG/g9F03oMYHoM5e37qBLUlsQQk8hLLW6WJgAiIgAgkj4A7oYdSfP35Gqzu/Cgmz7od1+TUqGiJdeMkNOoxEPeuykLLh2fi4uPOwr8uegsvL7gZw/o0k1WvgpS+JJKARF4iaassERABERCBZBNwF15l2/t4r2g3snqdiT4OkcdGZeScjx696sGathCzt1io174bzsFqrF63DXuT3WqVn5YEJPLSstvVaBEQARFIawLuhF6NLNSuBexb8TVWBfpjWBuwYflO4LBs5GZlwNpdihJk46CDasmal9aPXHIaL5GXHO4qVQREQAREILkE3A3dHn4BLh70IMY8cT8ua7IPf+h7Ck7N2oWD/rcUS6c9irsn10CdEefjmoM+wqxJRZiDdujargkOSm6bVXqaEZDIS7MOV3NFQAREQAQqCLgLr8IQejv+jsnDBmDIyz8EBExuhNzrHsPUwn7o8vH5aNXjE0E7LBYAACAASURBVGzvPw5zxvVDlygWylB4lYo+05cICEjkRQBLl4qACIiACPiOgEuhtwfbt1k49De78W1FwGQgq/056HJmd1x1ShPkZpRj96pJ+PPnJ+KiC9qjdZ3oRosl9Hz37MW9QRJ5cUesAkRABERABDxOwJ3QK3sdj2Xfiqfzb8c1F3VHn7yT0CEnCnNdGJAk9MKApEsqCEjkVaDQFxEQAREQgTQmEJ15zQDLbIbjr8tE1osj8MglndCxw0XoeOdzeGTOKmwsC/TOMDdpKwLxJSCRF1++yl0EREAERCB1CLiz6NntLMOe7z7EolnjMe316XhxZok9Vy+jQz/k9e6FQb26o2frI5DjcjkMWfRS56FKdk3btWuH4uJiaO3aZPeEyhcBERABEUg2gRgIPWcT9mDHVzPw/rRX8I83ZmPcR3sAZCOr61XoObg/RvY6DR3r/hpU2Xnngb5L6B2IkM6TANernThxIvLz8zFhwgRBEQEREAEREIG0JuBu6LYSOgtlpcuxatl/sGbNCiz5nCIPyOjQHqd8+xe81v90nNzzIYzd9PPxSrdqRwRiQCDdRV75l0NwbkYG+E9R5U9jNLhtHJ5dVhIDyspCBERABEQglQi4FnrW7tVY8cFDePr2VjjtyI7odMkjGDm5Pnb//jk8/P5KfP3JfMxf/iU+f/VMdJpbiIJpa7EvlQiprilBIN1F3q+d1AiNXlyBfZYFy3z2v4e36xdiaLu7MWqj1qX5lZW+iYAIiID/CbgLmLx/Ov7cpTeGLaXjxXFokP8Q7rysB/oGet/WbInWXU5Bc3yFbdlaGcP/j1ViWyiRdwDema1x2u+GYPh9Q/HiO7fi3htawd0v/gHK02kREAEREAHPEHBp0auBWrgO17wwG+9uKcaWCXfjkYs7Bg2xktH4Njy0dTm+ym+pl4xnuj/1KyKRF0kfHo/fNvuNfv8iQaZrRcBDBObNm1dRG35funSpvc9IA9xfv369vc8t93mcKXCf9z311FP2Of4YNWpUxZxmXst9Uxa3wfZNWZwLzfMmVZeXydvMn+a2W7duFe0YNmyYvW/y4jkeY2KduW/KMvuR5sX7xo0bBzrtXX755XY7zf5dd91l73PL8yNGjLDLO+2003D00Ufb31k+v/MYv5933nmoW7cuDj30UPu4mTbzt7/9zTQj6Vt3zhjWNqz4Mgutjs8JuX6tVboJ39ZpjCNruXO7lTNG0p8Vz1VAIq9yl3CO3vnHF+HzFz/A106rXfkyfPLHgbgx8wlMufsMtHb5713lUrWXjgT4sjQiIhXbv2bNGjRs2BDZ2dng9507d+LYY4+ttM8XPROFBK/lC33Lli2YNWuWLQJ4nhzeeOMN2wmM9z/zzDN2frfccoudn9k3ooqihWU++OCD9r3Dhw+3Hcf4t4zl0JGM0QKYd+A+72U0gblz59r16t69O9q2bWsLNtYjWF55eXm2OKJYmz9/vl0WRQrz3rBhAwoKCuy8Ro8ejWbNmtntoBhjPcy9zHv69OkV+27yMnm3aNECTZo0sXl+99134L7pi127dtntYsXY3kMOOcRmyT5au3Ztpf3Fixfb9ffij6lTp6Jfv36eqJo7oceAyXWfx6yXn8KEPm1wVE2nmNuJrR/dh1E9d6DB0ucwqrG7wSIJPU88L56phERe1a74Weg9i9lVTwFohPrDn8Zro3ujW10pvaCIknyQL9BQKRxhVd39gfnypa8kAskiQIFKC5jbREFcXT7G6shy9uzZYwtLXs+PEfg8Z0TkgepD8cvE+80/AqYOFND8eDG5U1+ZR6FF30WYe9WF6PTPBzC24Ar0OSIL1u5PseD5mzHivk+xqNE9GFvbKQC9iEF1SiUCEnnV9RadMQIsetiMlVOvxU1X/h59GzTBsrtORf3qstC5agkEE13BRFawY3zx0JISj0SLTLgvmp49e1a8qKKtC19wbA8tMbRmBbN20frF4TGntYvDYrSQRWOhMtauRx55BB9++KFtzXLmbSxn9957L04//fSQVji+5GmhY91Zb36Yj7Eq8cVvXuTR8vHCfUaEeKEukdaBz5ZTqNGCzN89Zwr8HYvkHxjn7wuF2zXXXFORtZOb83vFBSn2xZ1FD/hZ1D09CDfc+TnWdLoZA25uiiNffwAPzjoUuQP/gCfu649BRx8Scmg3XF6y6IVLyt/Xcchh4MCB9jBC4C+5v1t+4NaFHLrlreVz8HKP83Dd8hEYu+JB/C43va16zmcn8IUSKOQieXk4e8n5InEe5zyjYKk6i4DTghDs3miPmZenKZtc+OE/UzxGMUYe/L3jPutOHvToZuLfZVo5zH0cTuRwIOcu8UPhxXN8WfL7tGnT7C33mSfZ8zomnmMZPBdYL/sC/UgJAoG/T6x04O9UsGui+T0LtAwGirLA/VC/eykB1kUlXQu9n8veiW3/HIzrL5iCt3fyyMnoOO5FvJXfNmA4N/qaSuhFz84vdxqRx19uvjz48lP6lUC1Qg9r8cEdHXDWlCG+E3pGFJCE8wXi/M5rON8nnBQo0IwIMvcGE12B15hrE7Vl+5hYNyO6AsUajzMdSJxxvpZZVYa/c/xQpAUTZ+b3kOeUUpuA8/fFtMQ8M2Y/2DXRCDTmZ4ZBTd6BoizY71m6CjXDKNqtu6Fbu9R92Ln6Lxhf+Dbe3pmNgw7fi4N+XIEv3vo7Xv2/5hh5XGhHjWgrrfvSj4BEnss+L1+P9Uv/i5rXnI3eKWLNc75UzAvHeSycF4x5mfClYSaek6TzpRLsheKSdsxv5/PPRPFG6wgtbfzOD0UYJ+IbcUZWFGt8KVKABiZyMMfJgZP7zb6xxJl7TBnOffOdW714nTSS8935j46pgfl9MfvO3xtzLJzfH3Ot2ebm5tq/O2af26FDh1b5pzvwuUj2P0LO+qbjd3cWPWsTlk2+GrcMmY95OAddCv+ICfnNsf/N/hh5zzuYse1cdP/Lk5ja73g0cDlNTxa9dHw8f26zRF54fR/aomfm6NVG/Y9fwWunJt8Sal5OZssWmpcThUxJSfBVPJwvGufLwyncAl8y4dFL7FWm3aYNbLsZ6mRb2Aa+iJ1DpLRkkw1f2hRgvI4ij/v8HeEx5sd9bpW8T8A8B86amt8Dcyxw2LO63w9zT+DW+Xtjzjl/Z3gs2D88gdeYe7VNLQLuhF7Z6/hTy374w/H3Y/RTtzqsd7TyPYNn77wPdxZdjYJNz8jrNrWeC8/UViIv/K4I7XVLj9v7cOtll+Curo0TEkfPvMACtxQhoZwRzHwbI37YciPaUvGFwzlnbC+tb9xSiPFlyuN8mQfOZ+NxPu9sK7e8x8xf48udx5W8RyBQiDmFmnn+Ta25H+4UAnNP4FSCYILM/J6Ye1Lx98XUXdvYE3An9PZ/iDfv2I1jHjoLHepUndxN79u5N72Fz/50P4Y1cDdKLIte7Dvf6znyD2j79u3tmEr848k/cEreIWBeYhQk/JgXXqghITOMal5KZpuqLyW22WlJo5Bj/LF169bZFjW2iy91Y5Vje/mheDPsnKLWOz2bfjUxz7BpuXmWuW/6ypzjtaH+WTHXOLfmHxhzLPB5P9C+uU9bEYiWgDuhZ0rdsRBz/joOf5+7GLO/KENmu3PR9qTT0Tf/QlzSMMtc5WoroecKX8rdzD+0RghQ5PGPoVJyCLAvjJAzL8RgYs5YHsyLy2xNPyan9u5K5bPHNlPEkUOvXr3sD4dMA+fGUfTxGlrwKOD4nVv9g+KuDyK922lRYx9QqDEFCrZgz3Cossw/KTwfaFELFOvmuQ+Vl46LQKIJuBZ61tbnMeryW3H/P/dVrftxgzF8+uN48vjsquciPCKhFyGwFL6cf5yNOJDIS1xHkrsRdOZ74DCTmetjXm7sp8AXX+JqHJuSzDPGdphwIkYs8O8OBSy5UChQ8FHscct9fshCKT4EnELN/JPBkpzf2QeBz2mo2jgFm3mGeW3gM+w8FyovHReBVCHgTuhZKzFnRBec/UQrdHz2ETzd92ScVi8L+3csw4o5f8C9g6Zhxv+9hDmvD0R3LYGWKs9EUuspkRd//HwxkrP58KUZaN0w1jkKOfPS84Olgm2l5Y1toljjMCo9VIuKimwBx32KPHMNGfFaCgEl9wScAo1s+SwyBX4P5YxjamD+4TD75h9D7jufU/Psmuu0FYF0JOBO6JU8izuPH4LHL5mBFc9dhJaVPGu3ofiJDmh3R2f8bsUkjG1V2xVfWfRc4UuJm53WEWNlSYmKe7iSRtSRpxF2zvlF5oXJlyNfitw6X5oeblq1VWN7TTu4NRzIgPM+8/PzbTFnmPAatl8pcgJOkUbuTIY3v1PcOZ+5YCWYfyx4zinOnN8DrW7B8tExERCBqgTceUjs2ootm4FazRuiWSWRx4Jy0KBpAwDbsK2krGrJOiICDgJ8MfBly//kaV2h4FCKjIB5uYYSdXyZkistWdzy4wdxY6x0bBfbw+eIFkrjFMFjxiLHNhvnCNI1HCIjnR5XG9HmtMKZY3zWDjRcaoZJyZ99w+QUa87v6UFUrRSB5BBwJ/TqnYA2J2Zg0qyP8O7vO+KSOg61Z32JxXNWAdnX4IQmsXHISA4ilRpvAkbk8cUxfvx4ewgt3mX6IX9aUpyizvnidYo6Ch8KGiN2Ur3tFB4cYmWbOKeODDj8ysTj/PCZMu3lMKzSrwSMWAsm4HisOuubsbyRrQlA7RRsFHX8KImACHiHgLuhW2zH2vF5OHnQOuy+fARu7tMZp2VtR31rGZa98yLufnEn9o+YhhWPnYVmLtusoVuXAD16e6DIM//5e7S6Sa0WX9DmQ5Fn5jGZ4Vcj6Lg1IiepFXZZuFOssU1GmPD4YYcdZkfkp+cr9/lJd4FBBnwumALFHM85/xEI7BoTAsQp2sw/B85jgfdpXwREwPsEXAo9APuKMf+xK3DDvV9idaX2NkX9mx/F5Ef74ty6NSqdiWZHQi8aat6/hx6M06dPty15Enm/9hdfzE5R53SWoFXFKer4QvZDopBjomCjVY5WOi7PxbbSckcm6WydM+LNzIkz2+qscOafAHIlR8OXjCXgbBz6IQK+J+Be6NmI9mDH2vlYtGQpFnyxG5ktO6Ntm3bofuIRyHGM5rqhKaHnhp4376WwY4BZMzHem7VMXK34IjerJjitL7S28CVtPn6w1pEqBQrFG4Uq286VIrhuJq10FHQ8z2ckXSx1RriRBbkY65xT5DufxmAizljhyCxduDmZ6LsIiEBVAjESelUzjvURCb1YE01ufhJ5P4eUMMLO+TL3q7Az4sVYlvg7TeukEXwUeLTw+sVCGeo3zHCgoKOYY/udwt7cZ4ZTjXgzW4k4Q0hbERCBcAhI6IVDSdfElACH4caMGZN2ljy+4I2w49bMsaPYocDxm8WODw2FDC2QFCdmmN4Mx5pYdUb4xfQh81BmFHRG1JGH09nBWOXIwAg4I+g81ARVRQREIIUJSOilcOelYtX5ch84cCAYeoEvP78nvtgp6vgxVhu+3PliN+LOT0NsFLO0UFGssM29e/euGI5lf/M82+6X4efA55ftcwo7p6WWgp5c+CEDCbpAetoXARGIB4GIhZ61dR5e/fRgtDqjIzrEwMki3EZp6DZcUt69zog8DknxZejXl70Rdtwaq50ZjjXizru9FHnNKOyMWA0cjmWfs83mfOS5e/8O9rMRd0bMs9amz42o8zMD7/eSaigC6UsgQqG3F9um/R+a966D8z+egdc6LcJf+92KR056BjPvy8NRceQooRdHuAnI2lh3/CjyzJAs20gPYpN69uzpS6udaR+3Zhh+yZIltoWKwo4CnuLOr4lWWgo79rfTYucUdn62Wvq1X9UuEfArgQgDJlso27sPO7EHX636CpsaLcXKxV/gi8y1WLqxBXaUlFTlVLshmjavFzPv26oF6IjXCfDFSOcLDln6xZIXTNyxffQgpsjxq9BhX5r20XnCCBpjnWU/+y2Z4VhjuTNz7DgUSy9hMjAc/NZ2tUcERCD1CURo0QPKNxTghrMfwMtrrDBbPxgFm57BqMYRasqA3GXRCwCSIrsUBnwJMlHkcV5SqqZg4s7pSOFXcUernbFikQHbSUHnR1Fnnk0OR1PYBVrtaKXl80wGGoo1tLQVARHwMoGI1Vdms3vx1LS6OOrRf6OsyUYsef4jzGzeH+fm/QY533xTta21O6ND3cyqx3XE9wQoClJd5IUSd7TkUOiksnAN9QBS5NBaZ9rHfXLgh5Y7CnY/JopZDj2zfWaundNq51ch78e+VJtEQAR+JRCxRe/XWwHsn44xnXpj+KlvY+XzF+G4SidjuyOLXmx5xjs3I/L4wiwqKkq5oUxjzeGWDhUcljWWLCNe480wkflTzPHDthmnmcLCQnsOXiLrkeiyKOpMX5shWc61o8glCz8K+UQzVnkiIALJJeBO6CWw7hJ6CYTtsiinyBs/fnzKDPEZSxZf/Oal7/c5d6ar+ftF65XTeufXoUkj7IyIJwOG+6GQ15CseSK0FQER8A0BKxap9F/W+88NtIb1Pck64YQTrDZXDbeufuRNa/rmPbHI3c4DQMzyUkbxJdCzZ09O4LTGjx8f34JikPv27dvterZt29auM+udl5dnH+M5v6bCwkIrNzfXWrJkid1E9pX57sc2FxUVWfn5+Xab2cf88Dllu8Pu59K51qwJfaz+jX6+n3nUvPYx695py62tfoSmNomACPiCgGv1VP7dc9Z9Z9SqeEmaP6L29rjB1vDlO2ICivkpeZ8AX6bsK269nObOnVvpxd+sWTOroKDAWrdunZerHXXdKGYo7vhhosCh0PGzuGPbhg4darFvzd+liMWdTWuftWN5gTWic5ZVf/gE67Vv/vdLP3xrfTnjSuvamjWt+g9/LLH3CxVtREAEvEXAnXoq/9J6//bDLaCL1fHZBdbC73db5Va5ta/0c+uzol7WJYfByuj5kvXB3nLXrZbQc40w7hnwpeplkWesd84XPwUprT1+TUbIse3sG1or/ZxiJ+4clHZMsR47vaZVc9CbVvF+x3H76z5rx8dXWt3Q0er27rbAk9oXAREQgaQTcCf0fhprjWwEK3PwDGtlFS231Vr6eBML6GP9bsVu1w2V0HONMK4Z0ELkVSFBK51z2I5Cj5atsIfs4koufpkb66oRe361VrJd7E/n8Du/x6aP91kls8+yGlX3d2z/F9aHDzxgjf3ip/h1pnIWAREQgSgJRBxepdLkxF1bsWUzUKt5QzTLqHQGQA4aNG0AYBu2lZQFntS+jwgYL016K3KCu1cS68WPWb2AMdAYE86PXrNkTicYto+eotzSsYDfjVOF2Xqlf9zUg23ls+bsXzqT0FM4tg4VG/Dpu4uwudEQtG50UPAqZ7ZG13tbo2vwszoqAiIgAkkl4E7o1TsBbU7MwKRZH+Hd33fEJXUcas/6EovnrAKyr8EJTbKS2kgVHj8CjD1GUeGVpc0oAPjyZxw4es4yLEpBQYHt+esnoePsUbbXBC+eOHFixRrCFDx+S8Zjlu1kMnHuTMy/mLe3fD3WL/0vcOKxOEHxQGOOVxmKgAjEn4A7oZd1Di4d3gYPD7oH/fpvx819OuO0rO2oby3DsndexN0vAnVGXI6BR9aKf0tUQsIJOFe9oNgwy2AlvCKAHRaE4o71YNw7CoBUCu0SLTMKHIoeWu742b59e1L7Idp2VHefCWRs+pbXpkvYm+q46JwIiIAIhEUgyiHfX2/bu9Sa92Ar67hfQhZwntbPn6ZW/ZunWLNKy3691sU3zdFzAS8Ot3J+G8NzOEN0xKGYA2bJ+WdmLpqZI0iPWr8mcmd7jfcs28/5kX5LbGfgvLvkhL1ZY825PcdCo7utsT9V8cTwG3a1RwREwIcEYhQweQ92rJ2PRUuWYsEXu5HZsjPatmmH7icegRzHaG5YyjPERQqYHAJMEg47AyIna9ULrmgwatSoivl3tPBw36/Ds7Rq0WJH9mwj5xl6aT5krB7DYEOztFryk5y+LUPpe+ehVY/D0XvFJIxtVTtoU8s3vo6H/t0Ggy89HvWDXqGDIiACIpAkAqkiXmXR805PGe/GZFiSaK2jZYfPA62JDOniV29S0+MmbI2xVPrNW5j954x3x36l1dK013BI2vZA4VWW3WpdW7OlddJr6619SaukChYBERCB4ATchVcJnmdcjkroxQVrxJmaYVIGF05kChR4LN9vgsfJkyLaDM+y7X5sL9toRDt/v/kPBI95r1/3WTtsMVczdMDkO961vtDIrvMR1ncREAGPEJDQ80hHpEI1jGWJYi9RKd0EHrlS6NCqReHjt2TmVLJ9qWaV3f/Na9Zrf+5mdauYh6wl0Pz2fKo9IuBHAjGaoxf/cWfN0Ys/4+pKoMfjwIEDwVh0iZgb5pyDxxApDOHCTzI9e6vj4/YcmbJ95Mz5d2ZOntt8vXC/iXlHr+ji4mK7SnyOGP6Fc++UREAEREAE4kfAXXiV+NVLOXuIAEUIRR5j5VGIxDMFCjzGwPOrwKMAMiFqAgUsHS9SPbFtFHd8fkzIG7/HNEz1PlP9RUAE/EcgJhY9a/dn+GTaOLzz7kK8sfJy3DbzFnSddS+mHncX7jq5IYL7qUUGUxa9yHjF6mqnEOH3QEESq3LWr19vC7rp06fbQY79bsEjN3qRUuyx7fHiGqv+CTefUNY7Wu78GMA5XC66TgREQASSRcC1Rc/6cRIev/omjJy1+5c2dMI3e7Zjw8KXMHrwKnzy5gso6tE0JmIvWZDStVwKELNcGK0y8RAjFAYUdWalA4ZJoRUoHmUlux/ZVraNTPkx4WD80FZZ75L9dKl8ERABEQhBwNXEw/IvrfdvP9xC9mVW3w8+t+Y/VN8CBlsFm/Zaezc+bo3smGmhzUPW5F3lrorhzfK6dY0wogzoEGDCqHACfawT86cnqZmUTwcPv4dJoWMJn2M6tfgl0UvWPCdsW8+ePa2ioiK/NE/tEAEREIGUJ5AZQv+Fd7h0DmZP+RGZVw/AA92OwsEVwZEzUOvIG3DdDccAX3yCeWuNtS+8bHVV8gnQ4sSJ81xGLNbzxTjPj3mOHj3a3s6dO9ee+5ecgLjxZc22miFaMl2yZIlt1YtvqfHN3Qyz0xLJuZu0VHLu3bp16+z5eBqijS9/5S4CIiACkRBwN3S7ayu2bAZqNW+I5hn/w9JKJWeh7mG5AEpQ+t/ySme0420CnE9FkVdYWBhTr0gO73GYdv78+fZatMlaVSMR9CmGKPC4ZaIYojCKtWhORFtMGRSt/LD/mPLy8uznQ56zhpC2IiACIuA9Au4serktcFzrDOxdsgbFVqDLxVf47J+rgexWOKFJlvdarhoFJWDmy3GuHL/HIlHkUAy0b9/e9jKl9YcCyI+WH7aVAs+IH87DM6IvFiwTnQfrbuYS0npHsT506FDbekcPadPORNdL5YmACIiACIRHwJ1F75Bz0WvwsXj01scwoHNdFJTsB7ALW9d+incm34ihz1iofeMFuLxxrfBqo6uSSoDWmjFjxtiWGn6PRaLzAYUCw2v4eT1aih5a62i1M84WseCXrDzYHj4DxkmGoXXYjxTnfnAeSRZXlSsCIiACCSfgepbh3iXWe3ceaWU7osVzUjaQbdW+/Clr0pbYrP4oZwzXPVVtBsZRgBPrY7EEFR04zCR9bpm/XxMdEvh8JnpZuFjzZL+zLc2aNbPbwzbRSSYezjixrrvyEwEREAERCE4gJnH0YP2ITf9+DR+8vxAzivcg44TuaHtKN/Tv0QpNalZ4aLgSsYqj5wpftTdzOI5WKCYO1bmx2HDokpYfWga5ogW/x2oIuNpGJPgkOdHixfaxzbRcsp1u2CW4CRXFmeFZZ2BjtoXDsqnYnoqG6YsIiIAIiABiI/RQht3fr8VX35VVRVq7IZo2r4ccl3pPQq8q2lgcoUjhkCO3Zvgx2nwpFCgQNmzYYC+VRvHjR09a8iEzOqzQ0zRV28j+Yh85nSvYf36cOxntM637REAERCDVCbibo4d92LH8URTe/Tj+9HYJdgalMRgFm57BqMYuiwqatw66IUBxR0sehRk9YKP1CGU+tP5wVYtmzZrZeflNLLCNFEW0cFEM0ZrH76km8tgO1p1tYb/T6krnCrYp1dri5tnXvSIgAiKQLgTcqa/yhZh21wMomNEM9c/vi66t6iJn4zeV2dXujA513Tn3Vs5Qe7EiwJe7iZUXrTCjVYgij84WFAwcyvTrcB/FEYUxuUUrimPVd5HmY1auMM4VFOSMkSjnikhJ6noREAERSDECwafuhXl0U4HVH7BqDp1lrXO/+EW1hcoZo1o8EZ/k6gxmsn3EN1uW7bCRl5dn58HJ+350tqATgrNtqbhyB50rTD+xv7lyhR/7KppnWPeIQHACa6w5t+dUOCTx96bi06i/1WfCbGtu6f7gt+qoCHiQgDtT2yEN0LARkFH3YNR1OQcvxfRxSleXQ3d0lujZs6c9jBdpY2jF4zAf53aZmHjGmSPSvLx4PYc3mbg1H+6nytAm60zLKutrYt85V67wU1958flRnXxCoNHdGPvTfnAFzp8/+7Dj/XboOKs3zhkyGXN2aCEAn/S0/5vhTnz+aK2Z3MmqXXuwNbz4B2uPu8yqvZv/USm5J+AmjArDb9AixL6gpcuPYTcYToTr78YixIz73oosB/YH62+sDwxrQ4uekgiIQCQEfrHoNbrbGvtTVcvd/m8KrEE1a1r1H/7Y2hpJtrpWBJJEwJ1FD4eh+SXD8cBpL6OwbT3UzsgAvWMrfereike2MpCyUrIJcJ4W52RxAj49bCOZS2eseHS44Fw85pVq89Sq488QI0y0gqWaxYsWWtaZK49wDh4DU3P9YPaRVq6ortd1TgQiJ5DZ5Dbc+UwzbPvzdLxeIqte5AR1R6IJuHPGsP6Dv99+M0bM2wdkd0STvMbIWbe2chtyGqO+u1Iq56e9qAhwOM84XEQi8swwIId6KboVggAAIABJREFUOYGfgi/VhFB1wNg+ClaKXgojDnmmQmK95T2bCj2lOvqPwMFo2PxoNNq8Bss27wVyA5f/9F+L1aLUJuBOgm2bjZlTS5GZPwULnuuHrnVcGghTm6Wna09xxnAa9LQM1xJnLEL0zDXz+SKxAnoZiAkMzfaQTaqI12DBjeU96+UnTXXzL4GvsPzrnUArCT3/9rE/WuZOmWXlILcuUPPYY3CSRJ5nnwgO31GsFRYWhj2Ux1AiHAqksKCQoCXPLyKPbTnmmGMqrHe0jHl9iJNWWIpR1pvDs/zO4Vn2D+vul77x7C+RKiYCIiACKUrAndDL7YNBD3RA5qvT8ez6XbYPeopy8G21KdjMvC3GfztQMkO8w4cPBxeyN1a9A92XCucp6JgokjiPLRweyWyXGZ7lvMHu3bvbfcF6czUOvw2hJ5OzyhaB6Ag0xwlHZUd3q+4SgQQScDd0u/8LLF7wPVp//QjuOvE9PBN0jt61uG3mCFx3eI0ENktFkQCFjRFsRuRUR4aijvP4OMRLhwuKRL8kWr1MsGB+D4dHstpOKx3rR/4MRM25kcYaK8tdsnpF5YqAIbABn767CJsbDUHrRgeZg9qKgGcJuBN6KMW2z77BYnvts8XYOHNx1YZmf4ttQZbArXqhjsSSAEUbLVYUCRz2O1CiqKAopEcul0MzjhsHus/L5ymYjHiluKMlj1uvJvYTBZ4RpHl5eXYf+qEvvMpc9RKBSAmUb5yMv475Lxo92x835robFIu0bF0vAtEQcCf0avTE0CXlGBpNybonbgQ45EdRw3SguXW8luKHYVM4VMvrUyUw8IEA0umEFjEGOzU8DnRPMs5T3PHDANRMZlg5XKeZZNRZZYpA+hEow87lT2PsA49j0pXjMOuKlnD3Ak0/gmpxcgi4e06trVi3YAE+3coYrSFSVit0OL8NWtTS0hkhCMX0sBF5FDicrF+dWDDz7+io4ZehWgomEwuP36trf0zBR5iZmX9HSyqHymlJ5eoVFN1+EdoRItHlIuAtApsfxpBDH8YQZ626jcTvBr2PpVefhtYy5jnJ6LuXCbgK1LzvNetPLRzrADrXBKz4Ptgq2LTPVTG8WStjhIfQrIxwoBUReJ4rQPBTVFQUXuYev4orQ/A54eodXk1cL9esvmFWGDlQX3m1LaqXCIiACIiA9wm4s+jVaIdud49GwTeVo4M3rbcVWz6biZdeaorD/tgb5x4mR4xEiH0G+zUettXNRePcPQZA5lCtl61e4TCjZYztZptovWMomOraHk6e8biG8+9oveMQORPn37HeXh5SjgcH5SkCIiACIpBgAvHTosutWbfUtTL7vWJ9uNd9KbLoVc+QVjkyysvLC3kh12/leWP1SsX1XAMbV1hYaLeHWy8mWuu45iyZ03pKax6tekoiIAIiIAIikAgCGSwkPtryf9j8Whc07tcU1302BeNOPNhVMVw/N25VdVWz5N/MuXa0DDH0Br8HC8HhnI/HuWCpstRXMLrGO5XWSFr0TPuDXZuMY6wTrXesH+ff0fOZVkZaHYP1TTLqqDJThwCfbz5T8UjheOTHolxa2xP97LM8r87RjQVT5SEC4RJwN3RbXSllK1H8MReKb1rdVTrnkgBfACb8RigPW/4xN9d4dWgzEgwUqXz58cM/5F4Z/mQ4F9aN/UBnGA6Nc9+LQ8mR8E7Ha80/EMHaXp04CkeU8TnhPwBKqUWA0y3cpliJz1gLZ6/8DXXLV/cHJ+DOord/Lv7a71Y8tKLyHL06dSwcVXMdij7Zg4yz/4yi6beg58HuvG5l0QvegfyFp9dsqNh3tCoNHDjQ9urkCypV/8OlhYwvXwonvij5BzPRFoLgPQA7TqFz/h3XBab1Tn88QxGL/fFgwixQkAW7hjUxYW1iUSt6Tx/odyzSl32k10fSjnjmbeoRirs5H68t/07wE4sUqzbwHwH+E6j0MwH+M5ysv+Px/oeLUS+88g5wKfSmY0yn3hi2NMjob3ZHHHVFPv4w6kZcf2SW6+daQq8qQlqK6HzBVRMoLAKTOc9fJr70kvULFVivSPf5R5YhR/jhH0qvJIpoCjwKbb7gaTWlEFV4lOh6KPBl6rSOBZ6L9o90sBdLKOtIqD/Soa6PrtW6SwQiIxD4uxDZ3VWvjnV+VUsIfiSWQjx4CdUfNe+U6q+K/izfv155F7gTetEziPhOCb3KyIyljsF1+d2Z+IvLh4wenjxPMZJqIo9toHileOKHfxS88EvDepEnmWv+nfOpq/rd+YfcKdqc3yMRbIFDZ4FCLHA/3n/Iq7ZYR0RABETAewQk9LzXJwesEa1zXOQ+mKWOQoQvvFQPgmza6BXHEQqSwPl3FKIU1OmU+HwZq6pTsJlhUp7ns1ddcg5vBg4dOsWahFp1FHVOBERABMIjELHQ27/iblx5+dtYFl7+QM61uG3mCFx3uLtYerLo/QycgsPMAeJ3p6WOL15av2hpSkWnC4oFiiezDBvbl2wrHuvknH/n5/h35M2PU8wZAcfj1TkQOIdEjVhzijiJtnD/YOo6ERABEYgtgci9bvdsxJrly7E83Hpkf4ttZeFerOuqI8AXMIUcJ/MuWbKkisgzL9hQjhnV5e2FcxQVFBQUrMkWBhya5cdM1OcQeKrPvzOizWyNRY7bUBPEjYDjPxfGemnmqDmFnBeeH9VBBERABESgKoGILXpVs0jMEVn0YIs8zrsLtNbRAmZewnyJG4tfYnrGXSlmvhvFBhPFrNNK6S73yO5m2RR3rBOtVxxipIWRn2TVKZIWOIUb22IEnRGrgXkxvp8R1Nw6hZv5pyHwHu2LgAiIgAikFoHILXrB2rdjIeb8dRz+PncxZn9Rhsx256LtSaejb/6FuKShe4/bYEWm2zFakyjyhg4dWiHqyIDChOFT+NKm4Eslkcf6GzFCS54RG4nuW5ZtBCctW2QZKKYTXadQ5RkxR24Uc9wPNaxqhBytkWRrLHFG3IUqQ8dFQAREQAT8Q8C1Rc/a+jxGXX4r7v/nvqpUjhuM4dMfx5PHZ1c9F+GRdLboUcD17t3bXh/VCCPiMyIvmFNGhHgTdjnFCS1kpv7cT5a1jCKJAo8hapi8Mv+Owo0fI+LMNtgcOdbZWOLMVkLO7k79EAEREAERAOBO6FkrMWdEF5z9RCt0fPYRPN33ZJxWLwv7dyzDijl/wL2DpmHG/72EOa8PRPdaCpgczRPHlzyH0fgS53cjimjhGz16dFDP22jKSdQ9FHa0LLFNFKrJSBTOFHhmSJMWL4rPRFtD2Z/kQfFuxJ2pk5MLhbyxyBkRZ6xzzuv0XQREQAREQAQCCbgTeiXP4s7jh+DxS2ZgxXMXoWUlLbcNxU90QLs7OuN3KyZhbKvagWVHtJ+OFj2KAAoiigCKASNEOB+PVqhUseRR0LDO/BhrXkSdH4OLyZICjwLZOf+OdaJ4imcyIq46QWdCjhgBx343oi6edVPeIiACIiAC/ibgbo7erq3Yshmo1bwhmlUSeYSWgwZNGwDYhm0lcruN5jGiCGFMMs4XCxR5tEIlyyIWTVsodow1Mpr7o72HAo/WO36c8+/ovRyP+lDMUdiyvdwGWuiMoONcS2OlM+Iu2jbqPhEQAREQAREIRcCd0Kt3AtqcmIFJsz7Cu7/viEvqONSe9SUWz1kFZF+DE5rIISNUB4Q6Hsz5gsKPlrxUEHm0nrG+xhJJwZXIRKFFhs75d6wPP7FIbA+FnFPYBQYK5vw54whBC50EXSzIKw8REAEREIFICLgTelnn4NLhbfDwoHvQr/923NynM07L2o761jIse+dF3P0iUGfE5Rh4ZK1I6pT211Ikcf4dhQItUUypJPJYXwqheFjMDvRwUHhR4BlLGoUW2VFoRZsCRR0FntMxwljpuIoHxZyx1EVbnu4TAREQAREQgVgRiHiOnrV1Pt768URc1Opw2Ha6fcWY/9gVuOHeL7G6Uq2aov7Nj2Lyo31xbl13q2Iw23SZo0cRQVFCkcTv3KaKyOP8O4pUU+9Kj0OcdziM7Zx/R2asTzTz7ygWjaUuUNQxZAnFHD+aRxfnTlX2IiACIiACrglELPTKPumLVqd9iO/73Yire52HQRd0RMec/dixdj4WLVmKBV/sRmbLzmjbph26n3gEchyjuW5qmw5Cj5YjigcOO1JoUEykishj37KubANFVyKseSyLFk+WRwsbRZgReOGWTyHHjxF2zuFXWurYH0bUcRtuvm6edd0rAiIgAiIgArEiELHQK1//EO646gEUfrTn5zq06IEOl/XBtZefj4GdjkRujIRdYAPTQejRQcC58oXXRR4FKevIRKGUqGTm39F6SAcLeh/TemfqEqoeziFYI+ycS39xqNwIO4q6aKyBocrWcREQAREQARFICgErmlT+g7Xxk7HWpD90srofk2EBsIBsK6vrjVafF2dZb3+z0yqPJt9q7mEZfk4FBQU2x6FDh9rNzM/Pt/e59Vravn17RZWaNWtmse6JSHPnzrUMFz4PeXl5Fo+FSuvWrbOKioosMm3btu0vzymfVVisN/MqLCy0lixZEioLHRcBERABERCBlCbgWj2V715pffbOPdafbjjKamELPr5IW1lNbvyTddesL6w1/90fE0B+FnoUI0a4EJYRM14UeRRWiRR35DF+/Hhb1JERP+RCEReYeIzX8jzraK43bCn4yNopVAPz0L4IiIAIiIAI+IlAxEO3oc2OZdizdR4WTpuAaW+8haff221fmtFpNF589//h+sPdOWT4deiWw5Bm7hfninEI0oshVDjsyflprC+HmOn4wG28kpnrxzl4zgDH5GPmybEuHII1H6cnrBmG5VAsP0oiIAIiIAIikJYE4qJad31ovXP/iVbHbFpgBlsFm/a5LoZWGb8lWpbMkCKHD71qyePwJvlXN0waq76hVY5Dwbm5uXaZtMzRSscUymLHa3v27GkPwyaijrFqq/IRAREQAREQgXgTcBdHzymNyzZjw39ew3tvTsKU15dg7joLaNEDHe+4GD0Oc2fNcxbjp++0TpmVL+hY4DVLHi1mdEjghxayeDon0JpJ650zwPENN9yAQw45xLbY0erp9Ihlfeh8QasizymJgAiIgAiIgAhUJeBy6HYPdnz1LhbMGo9pr7yLcbYnbiPkXNgfffv3xk3ndUDHnNgES/bb0C1DggwcONBeOYFDi/xO71EKHi8k1ol1odgzQ6XxqBcFLgWeCXB88cUX47e//S0WLVpUcYzlkg1FnYZi49ELylMEREAERMCvBKIQehbKShfj03+Mx6x/FOGVyZuxlnRovbv6GtzU6xz0bdcwZvHzDHg/CT0KqPbt29vi5cYbb8SQIUPs75xrFk9RZVhWtzVWPFobmTgXL9Z14vw7CjwT4LhOnTpo2bIlvvrqK+zYscMulzHxKOqMuIt1HapjoHMiIAIiIAIi4BcCEQu9/V8OwUUnP4tZO4kgPta7YHD9IvQocjjUyO1jjz2GwYMHe0LkUeBRWHF4loIzHoltpvXuiSeewM6dO3HQQQdh7969FUX17NmzQtzFc5i4okB9EQEREAEREAGfE4h4jp5Vsg1z912ALn/sj5su6YaerWO3+oXPWdvNo4WK3qFPPvkkRo4caa/mkExLnhmapbCiAGX9Yp1YxqBBgzB37txKWTdq1KjCYhePcisVph0REAEREAERSEMCEVv0rB3rsa7mUWheJzOhuPxg0eNQ5ejRo20r3tSpU21+FHnJcibg8CkdGjhMy7rFMtF698gjj+Cll17C999/X5E159oZJwpZ7Sqw6IsIiIAIiIAIxIVAxEIvLrUII9NUF3oUdN27d0fXrl2xceNGe+g2WSKPcwTN8DFFF0VeLMQmLXcUj88//zxWrlxp9yr7rVWrVrZF7/rrr4/5fL8wHh1dIgIiIAIiIAJpS0BCLwFdTwFEIWVZFo466ih88cUXKCoqissw6YGaQ+vdmDFjYla+EXe03LFdJtWtWxf9+/fHgw8+KHFnoGgrAiIgAiIgAgkmEPEcvQTXzxfFcf5ZSUmJ7WhAK9748eMTLvKMFc/MhaPjRbSJeTE8DNvijG3H/Dp27IhbbrnFHp6NNn/dJwIiIAIiIAIiEBsCsujFhmPIXIwF7eSTT7Zjww0dOtT2PA15QxxOcC4c58xRoEU7L46WO4o7fsxSY9nZ2bb3LKucn59vizs3AjIOTVeWIiACIiACIpDWBGTRi2P3c74ah0nbtGljizyKIYYXSUSiMKO445AxxSbj0EUq8sywLMWdsdw1bdoUhx12GLZv344aNWqAwpX5R5p3IhioDBEQAREQARFIdwKy6MXpCaBIosiqWbMmfvjhBztWHi1qiUimbIqvSMukODSWOyPujjzySFusLly40A5ozGDGFHd05FAg40T0qMoQAREQAREQgegISOhFx+2Ad1HkUShxeLNFixb2fLZ4iyLjxctyjBBjPQ6UKO5ofeRn+vTp9uUUc/QQ5koVM2bMsI+Z9WUp8JREQAREQAREQAS8T0BCLw59RJHFIdvatWsjKyvLFnnhCC43VaEVjuvlRjIH0Ig7bukskpubazuJMNYdBZ9Zf1bz79z0jO4VAREQAREQgeQRkNCLMXuKpt69e9uiieKJq0HE00GBAo8WNlrlGA+Pn+oshxzW5TxB1tM4VXDpsT59+mDfvn32/TxO0Wesgpp/F+OHRNmJgAiIgAiIQIIISOjFELSZG7d//37bG5VhVOI5zMm8J06ceMCYeGZolgLPzLuj1Y5CrkOHDnj55ZfteXkUphyypVhkGJbqBGMMsSkrERABERABERCBOBGQ0IshWDMvj1lyuJPWtlgnikk6WFCIcU4e90OJSZ5nHczQLEUc76PA4308R6HIxPl3PG7i7MW63spPBERABERABEQg8QQk9GLEnCKJ8/KYaC2L1Ns13GpwGJVDqwxvEsziZrxmab1zDs1SDFLEUdw5LXsUpLTgaXg23B7QdSIgAiIgAiKQOgQk9GLQV2ZeXq1atXDwwQfb1rJgIizaomiZY360GLIsirJA5w5jvTMWOmcIFJZLccePGZ6l8KM4jWU9o22f7hMBERABERABEYgPAQk9l1xpQaOo2rNnj+1lS0/VQBHmpghaBtu3bx/UShjMeuf0kOW9FHdG/Ck8ipue0L0iIAIiIAIikHoEtDKGyz7jcGhpaamdywsvvBATkUcBR4FGqxtFY+DauEbAOefeFRYW2tfTQsfhWXr6KjyKy87V7SIgAiIgAiKQ4gQk9Fx0IOe2BYopF9lV3EqhNnr0aHtYlcOrxtmCx/kxZTIsCs9T1BlxyPMmPEpBQYF9r+bfVaDVFxEQAREQARFIKwIauo2yu82QKm+PhfMFvWApHCnUKNporaPAM96xZn5dYHw7c5+x7pmwKUYcRtk83SYCIiACIiACIuADAhJ6UXQihdhJJ52EjRs32kucffbZZ669VjkEzNUolixZYg/XmuHZUPPrKOwo/ox1zzk3L4om6RYREAEREAEREAEfEpDQi6JTaS0zAszNyhe03hmLHIUd59cZ71mngOPwLOfqUWDyHgo8MzzLuvC8hmej6EjdIgIiIAIiIAI+JyChF2EH05LGJc6YOAeOw63RJIo2ijOKO4o85su8jIAzc/N4TaB1T8Oz0RDXPSIgAiIgAiKQfgQk9CLoc1rf2rRpg127dqFr16748MMPI7gbFevR0nmCQ7Uc8n3rrbdsC52Jb0exx3PGe5YWPKd1jxa8eK6dG1GDdLEIiIAIiIAIiICnCUjoRdA9p59+Ov71r3/Z8/K++eYbW4xFcLs9LNu9e3cMHDgQ5eXlFcO/zuXHjPMFBV4w614k5elaERABERABERCB9CaQmd7ND7/1nBdHkcc0Y8aMsEUe59xxfh0FHNNll11mx8XjHD86UHCOn1n5gta6Y445piK0CuPncYiXVj7NwbPx6YcIiIAIiIAIiEAEBBRHLwxYnCM3fPhw+0rOy4tk6JQibs2aNbjooouwbNkyOw+zviyHZzk3j0KwuLi44pxxvgijarpEBERABERABERABEISkNALiebXE/369bN3Tj311LCcL2iBM+FPKPQ4p4+hWEwAY2ZGCyGHZ83cPOfKFr+WrG8iIAIiIAIiIAIiED0BzdE7ALu77roLjz76qL2O7YoVK8IaQu3QoQNWr16NnTt3wgQ4ppWO4s/pXMGVLThcS+cLJREQAREQAREQARGINQEJvWqIcsi2ffv29hVFRUUhBRnn0VGslZWV2ZY7pxPFpZdeanvWOp0rFPuuGug6JQIiIAIiIAIiEDMCGrqtBuUll1xin73pppuCijwKPM6zmzJliu2oQaHXrFkzcBj22GOPxbhx42zHCmbC2Hcc0qXIUxIBERABERABERCBRBCQ0AtBedCgQWAIFXq7Pvzww1Wu4ty7Cy64AAcffDB++OEHW+CNHDkSe/furbRyBR0v5FxRBZ8OiIAIiIAIiIAIJICAhm6DQHYO2Zq1Z81lDJPCz1VXXYXNmzfjkEMOwS233IItW7ZUxMUzK1eYwMfmXm1FQAREQAREQAREIJEEJPSC0G7YsCG+++47DB061LbOmUs47GrWuM3JyUHnzp2xfPly2/LHa2i94zWRhF8xeWsrAiIgAiIgAiKQ3gRoSIp13FwFTA54pjgfjyKvRYsWtsjjPLypU6fa4o0ir2bNmvYyaKWlpXj33XeRmZlpz8nbvn277VErkRcAVLsiIAIiIAIiIAJhEaDjJoUeo3TEKsmi5yBJJc2VKSjmGB6FqXXr1vjvf/9rh1fJysqy497xuKx3DnD6KgIiIAIiIAIi4JoAnTZHjx5t58PlURlzl4squEmy6DnoGWvc5ZdfjjvuuMMWfRR5THv27LE9bOlRK+udA5q+ioAIiIAIiIAIxJzA/Pnz7RBvnBLG0cVok4TeL+Qo4Bj/rk6dOvZQ7ZtvvmmfqVu3rm29o1MGLX70oGVIFSUREAEREAEREAERiDcBThvjcC6te9EkCT3AFni33367zW/37t32lkO448ePx9dff23PvXNrOo2mc3SPCIiACIiACIiACHC51OHDh9uCj+HdIkkpNUcvkobpWhEQAREQAREQARHwI4GCggJ7EYZw2pYyAZMtywqnPVFf88Ybb4Bz85REQAREQAREQAREIBkEnM4Ywcrn6lscwmWc3nBTygi9cBsU7XUSedGS030iIAIiIAIiIALxJJCbm2v7CETjJyChF8+eUd4iIAIiIAIiIAIi4IIAw7nR0hdtIGUJPRfwdasIiIAIiIAIiIAIxIMAl1PlMK0J/RZtGRJ60ZLTfSIgAiIgAiIgAiIQYwIcpqXAY/y8WKSU8bqNRWOVhwiIgAiIgAiIgAh4lQDj9TJWbyzj9UroebW3VS8REAEREAEREAERcElAAZNdAtTtIiACIiACIiACIuBVAhJ6Xu0Z1UsEREAEREAEREAEXBKQ0HMJULeLgAiIgAiIgAiIgFcJSOh5tWdULxEQAREQAREQARFwSUBCzyVA3S4CIiACIiACIiACXiUgoefVnlG9REAEREAEREAERMAlAQk9lwB1uwiIQJIJlDyLOxtnICOj+k+tkX/HJy8ci4zG9+DZkvIkVroUK19ohcZ/+RJlSayFihYBEUgPAoqjlx79rFaKQPoQoPA7fgievGYOvn7sTDTyXMvX4v2BfVF0578wtlVtz9VOFRIBEfAXAVn0/NWfao0IiIDXCZS8i7ffvwl9Wkrkeb2rVD8R8AMBCT0/9KLaIAIiEAaBUqxyDt2WPIuRtWqh8cOv4Z37W6OxPfTbGA1um4jXN27Fyr9fhfxfhoRr9R+LVzftdZSxC99+dBtGnlHrlyHjc9H96dmYt+NAQ8JlKP3kbRTddwZOD/XXd8c8zH66O7pXDEWHm7ejevoqAiIgAr8QCPWnRoBEQAREwPcEMuqXYfM9L+Gxlm+i2LKwf+NduG7R9ejb9Cxc+vnvMHKjBWvHTDy37070v+/v+MzWcbuw6bXuaPZ/32Pjo19jn8VrhuLqhZfinGHTfrkmFLoN+Per23DJGUejZtBLNuLTp6/FhYsG4N7S/bDsOl2I0169BFdNXaU5fUGZ6aAIiEB1BCT0qqOjcyIgAr4nUHPEnZhyRSvUB5B55IU459SDgR7DMfbO09GafyGzT8f/dWuIsnc+xYe02JVMxJirl6D+s/dgUpdGPwu27Atw/fOPYfikURj6/vehmZW8i9mv9kDrRgcFv6Z8JYrf34b6Z5yKvLo//3nOPPJWPLxwD769oVUIcRg8Kx0VAREQARKQ0NNzIAIiIAJhE9iP0n+/hVfK2uK3zX5TWXjV/S1a5a3Ah+9/hs0h8ivfvAyv3ng2eueG+NOb+Vu0Pbs+NheMx4MLpmHUtBXYFiIvHRYBERCBcAiE+GsTzq26RgREQARSm4C1rSbqH9fYtuZF1pLFmHdu/cohXWqcjevmVBcwpRSr536MYy9qW40ncBN0uuffWP5sHRz51u8wuvcJaJDBeYPj8OyyksiqqKtFQAREQBY9PQMiIAIiEA2BPvjdit32HDrOo3N+9oUK6VK+CAseOht9Tj38AAU2wvG9RuGGp76FZe3Epn/diNs3D8OQcx5Ncvy/A1Rbp0VABDxJQBY9T3aLKiUCIuBNAjWQc8qluKZmMT78/LvKzhE7X8VjXWqHDIRcvuot3N+7R+hh26ANPgSNu9yLmwedhkab12DZZqfnb9AbdFAEREAEKhGQ0KuEQzsiIAIicAACufkY+tdcLL/qD+i/cPPPYm/HHLxx7+24M+thjLmyZeW5e3Z2Zdj59VrgxCOrHyYun4OXzqyNBre9+Wuolh3zMXvmcmwbdAUGK/beATpHp0VABAIJSOgFEtG+CIiACFRL4BAc2Xc6Pp9eF03uPAq1GO8uZxgKDh+D1yYPQZ/sYH9WDxRW5ZcCM8/CwEmTMfbQ+3BVTo2f5wD+kvdfgymfAAAAh0lEQVSU0RfhpGBZV1tXnRQBEUh3AloCLd2fALVfBERABERABETAtwT0/6Fvu1YNEwEREAEREAERSHcCEnrp/gSo/SIgAiIgAiIgAr4lIKHn265Vw0RABERABERABNKdgIReuj8Bar8IiIAIiIAIiIBvCUjo+bZr1TAREAEREAEREIF0J/D/AcpS7yw0n7HuAAAAAElFTkSuQmCC"></p>
<p>Which graph represents the decomposition of an equal volume of a 20% solution under the same&nbsp;conditions?</p>
</div>
<br><hr><br><div class="question">
<p>The diagram shows the energy profile for a catalysed and uncatalysed reaction.<br>Which represents the enthalpy change, <em>&Delta;H</em>, and the activation energy, <em>E<sub>a</sub></em>, for the <strong>catalysed&nbsp;</strong>reaction?</p>
<p><img src="data:image/png;base64,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"></p>
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<p>Graph 1 shows a plot of volume of CO<sub>2</sub>(g) against time for the reaction of CaCO<sub>3</sub>(s) with 1.00 moldm<sup>&minus;3</sup>HCl (aq). The acid is the limiting reagent and entirely covers the lumps of CaCO<sub>3</sub>(s).</p>
<p>Which set of conditions is most likely to give the data plotted in graph 2 when the same mass of CaCO<sub>3</sub>(s) is reacted with the same volume of HCl(aq) at the same temperature?</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" 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" alt></p>
<p>&nbsp;</p>
<p><img 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" 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