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</div><h2>HL Paper 1</h2><div class="question">
<p class="p1">Which graph represents a reaction that is first order with respect to reactant A.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-02_om_13.06.58.png" alt="N11/4/CHEMI/HPM/ENG/TZ0/22"></p>
</div>
<br><hr><br><div class="question">
<p>Which is correct about reaction mechanisms?</p>
<p>A. A species that is zero order does not take part in the reaction.</p>
<p>B. A catalyst does not take part in the reaction.</p>
<p>C. Reactants in a fast step before the slow step are included in the rate expression.</p>
<p>D. Reactants in a fast step after the slow step are included in the rate expression.</p>
</div>
<br><hr><br><div class="question">
<p>What are correct labels for the Maxwell−Boltzmann energy distribution curves?</p>
<p><img src="images/Schermafbeelding_2018-08-07_om_09.44.40.png" alt="M18/4/CHEMI/HPM/ENG/TZ1/19"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">What are the units of the rate constant for a zero-order reaction?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>s</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\({{\text{s}}^{ - 1}}\)</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\({\text{mo}}{{\text{l}}^{ - 1}}\,{\text{d}}{{\text{m}}^{\text{3}}}\,{{\text{s}}^{ - 1}}\)</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>\({\text{mol}}\,{\text{d}}{{\text{m}}^{ - 3}}\,{{\text{s}}^{ - 1}}\)</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which graph represents a reaction that is second order with respect to X for the reaction X \( \to \) products?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-01_om_05.57.03.png" alt="M12/4/CHEMI/HPM/ENG/TZ2/19"></p>
</div>
<br><hr><br><div class="question">
<p>The following experimental rate data were obtained for a reaction carried out at temperature <em>T</em>.</p>
<p>\[{\text{A(g)}} + {\text{B(g)}} \to {\text{C(g)}} + {\text{D(g)}}\]</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-24_om_14.05.06.png" alt="N13/4/CHEMI/HPM/ENG/TZ0/21_01"></p>
<p>What are the orders with respect to A(g) and B(g)?</p>
<p><img src="images/Schermafbeelding_2016-08-24_om_14.06.00.png" alt="N13/4/CHEMI/HPM/ENG/TZ0/21_02"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">Consider the following reaction.</p>
<p class="p1">\[2{\text{NO(g)}} + 2{{\text{H}}_2}({\text{g)}} \to {{\text{N}}_2}({\text{g)}} + 2{{\text{H}}_2}{\text{O(g)}}\]</p>
<p class="p1">A proposed reaction mechanism is:</p>
<p class="p1">\[\begin{array}{*{20}{l}} {{\text{NO(g)}} + {\text{NO(g)}} \rightleftharpoons {{\text{N}}_2}{{\text{O}}_2}{\text{(g)}}}&{fast} \\ {{{\text{N}}_2}{{\text{O}}_2}{\text{(g)}} + {{\text{H}}_2}{\text{(g)}} \to {{\text{N}}_2}{\text{O(g)}} + {{\text{H}}_2}{\text{O(g)}}}&{slow} \\ {{{\text{N}}_2}{\text{O(g)}} + {{\text{H}}_2}{\text{(g)}} \to {{\text{N}}_2}{\text{(g)}} + {{\text{H}}_2}{\text{O(g)}}}&{fast} \end{array}\]</p>
<p class="p1">What is the rate expression?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{\text{[}}{{\text{H}}_2}]{[{\text{NO]}}^2}\)</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{\text{[}}{{\text{N}}_2}{{\text{O}}_2}][{{\text{H}}_2}]\)</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{{\text{[NO]}}^2}{[{{\text{H}}_2}]^2}\)</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{{\text{[NO]}}^2}{[{{\text{N}}_2}{{\text{O}}_2}]^2}[{{\text{H}}_2}]\)</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Bromine and nitrogen(II) oxide react according to the following equation.</p>
<p class="p1">\[{\text{B}}{{\text{r}}_{\text{2}}}{\text{(g)}} + {\text{2NO(g)}} \to {\text{2NOBr(g)}}\]</p>
<p class="p1">Which rate equation is consistent with the experimental data?</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-21_om_09.26.15.png" alt="M11/4/CHEMI/HPM/ENG/TZ1/21"></p>
<p class="p1">A. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{{\text{[B}}{{\text{r}}_{\text{2}}}{\text{]}}^{\text{2}}}{\text{[NO]}}\)</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{\text{[B}}{{\text{r}}_{\text{2}}}{\text{][NO}}{{\text{]}}^{\text{2}}}\)</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{{\text{[B}}{{\text{r}}_{\text{2}}}{\text{]}}^{\text{2}}}\)</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{{\text{[NO]}}^{\text{2}}}\)</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Consider the following reaction.</p>
<p class="p1">\[{\text{5B}}{{\text{r}}^ - }{\text{(aq)}} + {\text{BrO}}_3^ - {\text{(aq)}} + {\text{6}}{{\text{H}}^ + }{\text{(aq)}} \to {\text{3B}}{{\text{r}}_2}{\text{(aq)}} + {\text{3}}{{\text{H}}_2}{\text{O(l)}}\]</p>
<p class="p1">The rate expression for the reaction is found to be:</p>
<p class="p1">\[{\text{rate}} = k{\text{[B}}{{\text{r}}^ - }{\text{][BrO}}_3^ - {\text{][}}{{\text{H}}^ + }{{\text{]}}^2}\]</p>
<p class="p1">Which statement is correct?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>The overall order is 12.</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>Doubling the concentration of all of the reactants at the same time would increase the rate of the reaction by a factor of 16.</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>The units of the rate constant, \(k\), are \({\text{mol}}\,{\text{d}}{{\text{m}}^{ - 3}}{{\text{s}}^{ - 1}}\).</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>A change in concentration of \({\text{B}}{{\text{r}}^ - }\) or \({\text{BrO}}_3^ - \) does not affect the rate of the reaction.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">The activation energy of a reaction may be determined by studying the effect of a particular variable on the reaction rate. Which variable must be changed?</p>
<p class="p1">A. pH</p>
<p class="p1">B. Concentration</p>
<p class="p1">C. Surface area</p>
<p class="p1">D. Temperature</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statement about a reaction best describes the relationship between the temperature, \(T\), and the rate constant, \(k\)?</p>
<p class="p1">A. As \(T\)<em> </em>increases, \(k\)<em> </em>decreases linearly.</p>
<p class="p1">B. As \(T\)<em> </em>increases, \(k\)<em> </em>decreases non-linearly.</p>
<p class="p1">C. As \(T\)<em> </em>increases, \(k\)<em> </em>increases linearly.</p>
<p class="p1">D. As \(T\)<em> </em>increases, \(k\)<em> </em>increases non-linearly.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which step is the rate-determining step of a reaction?</p>
<p class="p1">A. The step with the lowest activation energy</p>
<p class="p1">B. The final step</p>
<p class="p1">C. The step with the highest activation energy</p>
<p class="p1">D. The first step</p>
</div>
<br><hr><br><div class="question">
<p>Consider the following proposed two-step reaction mechanism at temperature T.</p>
<p> Step 1: \({\text{2N}}{{\text{O}}_2}{\text{(g)}}\xrightarrow{{{k_1}}}{\text{NO(g)}} + {\text{N}}{{\text{O}}_3}{\text{(g)}}\) <em>Slow</em></p>
<p> Step 2: \({\text{N}}{{\text{O}}_3}{\text{(g)}} + {\text{CO(g)}}\xrightarrow{{{k_2}}}{\text{N}}{{\text{O}}_2}{\text{(g)}} + {\text{C}}{{\text{O}}_2}{\text{(g)}}\) <em>Fast</em></p>
<p>Which statements are correct?</p>
<p>I. The overall reaction is \({\text{N}}{{\text{O}}_2}{\text{(g)}} + {\text{CO(g)}} \to {\text{NO(g)}} + {\text{C}}{{\text{O}}_2}{\text{(g)}}\).</p>
<p>II. Step 1 is the rate-determining step of the reaction.</p>
<p>III. The rate expression for Step 1 is rate \( = {k_1}{{\text{[N}}{{\text{O}}_2}{\text{]}}^2}\).</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>When X reacts with Y to give Z, the following graph is plotted. What can be deduced from the graph?</p>
<p><img style="margin-right:auto;margin-left:auto;display: block;" src="images/Schermafbeelding_2018-08-08_om_11.19.32.png" alt="M18/4/CHEMI/HPM/ENG/TZ2/20"></p>
<p>A. The concentration of X is directly proportional to time.</p>
<p>B. The reaction is first order overall.</p>
<p>C. The reaction is zero order with respect to X.</p>
<p>D. The reaction is first order with respect to X.</p>
</div>
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<p>Which of the terms in the Arrhenius equation takes into account the orientation of the molecules?</p>
<div class="page" title="Page 11">
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<p>\[k = A{e^{\frac{{ - {E_a}}}{{RT}}}}\]</p>
<div class="page" title="Page 11">
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<div class="column">A. <em>A</em><br>B. <em>E</em><sub>a</sub><br>C. <em>R</em><br>D. <em>T</em></div>
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<br><hr><br><div class="question">
<p>Which combination shows a second-order rate expression with the correct rate constant units?</p>
<p><img src="images/Schermafbeelding_2016-08-11_om_08.44.57.png" alt="M14/4/CHEMI/HPM/ENG/TZ2/21"></p>
</div>
<br><hr><br><div class="question">
<p>The rate constant for a reaction is determined at different temperatures. Which diagram represents the relationship between the rate constant, \(k\) , and temperature, \(T\) , in K ?</p>
<p><img src="images/Schermafbeelding_2016-08-11_om_07.01.37.png" alt="M14/4/CHEMI/HPM/ENG/TZ1/21"></p>
</div>
<br><hr><br><div class="question">
<p>Consider the following reaction between nitrogen monoxide and oxygen.</p>
<p>\[{\text{2NO(g)}} + {{\text{O}}_{\text{2}}}{\text{(g)}} \to {\text{2N}}{{\text{O}}_{\text{2}}}{\text{(g)}}\]</p>
<p>The reaction occurs in two steps:</p>
<p> Step 1: \({\text{NO(g)}} + {\text{NO(g)}} \rightleftharpoons {{\text{N}}_{\text{2}}}{{\text{O}}_{\text{2}}}{\text{(g)}}\) <em>fast</em></p>
<p> Step 2: \({{\text{N}}_{\text{2}}}{{\text{O}}_{\text{2}}}{\text{(g)}} + {{\text{O}}_{\text{2}}}{\text{(g)}} \to {\text{2N}}{{\text{O}}_{\text{2}}}{\text{(g)}}\) <em>slow</em></p>
<p>What is the rate expression for this reaction?</p>
<p>A. Rate \( = k{{\text{[NO]}}^{\text{2}}}\)</p>
<p>B. Rate \( = k{\text{[NO][}}{{\text{O}}_{\text{2}}}{\text{]}}\)</p>
<p>C. Rate \( = k{{\text{[NO]}}^{\text{2}}}{\text{[}}{{\text{O}}_{\text{2}}}{\text{]}}\)</p>
<p>D. Rate \( = k{\text{[NO][}}{{\text{O}}_{\text{2}}}{{\text{]}}^{\text{2}}}\)</p>
</div>
<br><hr><br><div class="question">
<p>Which statement is correct?</p>
<p>A. The value of the rate constant, <em>k</em>, is independent of temperature and is deduced from the equilibrium constant, <em>K</em><sub>c</sub>.</p>
<p>B. The value of the rate constant, <em>k</em>, is independent of temperature and the overall reaction order determines its units.</p>
<p>C. The value of the rate constant, <em>k</em>, is temperature dependent and is deduced from the equilibrium constant, <em>K</em><sub>c</sub>.</p>
<p>D. The value of the rate constant, <em>k</em>, is temperature dependent and the overall reaction order determines its units.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Consider the following reaction mechanism.</p>
<p class="p2">\[\begin{array}{*{20}{l}} {{\text{Step 1}}}&{{{\text{H}}_2}{{\text{O}}_2} + {{\text{I}}^ - } \to {{\text{H}}_2}{\text{O}} + {\text{I}}{{\text{O}}^ - }}&{{\text{slow}}} \\ {{\text{Step 2}}}&{{{\text{H}}_2}{{\text{O}}_2} + {\text{I}}{{\text{O}}^ - } \to {{\text{H}}_2}{\text{O}} + {{\text{O}}_2} + {{\text{I}}^ - }}&{{\text{fast}}} \end{array}\]</p>
<p class="p1">Which statement correctly identifies the rate-determining step and the explanation?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>Step 2 because it is the faster step</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>Step 1 because it is the slower step</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>Step 1 because it is the first step</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>Step 2 because it is the last step</p>
</div>
<br><hr><br><div class="question">
<p>What are the units for the rate constant, <em>k</em>, in the expression?</p>
<p style="text-align: center;">Rate = <em>k</em> [X]<sup>2</sup>[Y]</p>
<p>A. mol<sup>2</sup> dm<sup>−6</sup> s<sup>−1</sup></p>
<p>B. mol<sup>−1</sup> dm<sup>3</sup> s<sup>−1</sup></p>
<p>C. mol dm<sup>−3</sup> s<sup>−1</sup></p>
<p>D. mol<sup>−2</sup> dm<sup>6</sup> s<sup>−1</sup></p>
</div>
<br><hr><br><div class="question">
<p>Consider the following reaction.</p>
<p>\[{\text{2P}} + {\text{Q}} \to {\text{R}} + {\text{S}}\]</p>
<p>This reaction occurs according to the following mechanism.</p>
<p>\[\begin{array}{*{20}{l}} {{\text{P}} + {\text{Q}} \to {\text{X}}}&{slow} \\ {{\text{P}} + {\text{X}} \to {\text{R}} + {\text{S}}}&{fast} \end{array}\]</p>
<p>What is the rate expression?</p>
<p>A. rate \( = k{\text{[P]}}\)</p>
<p>B. rate \( = k{\text{[P][X]}}\)</p>
<p>C. rate \( = k{\text{[P][Q]}}\)</p>
<p>D. rate \( = k{{\text{[P]}}^{\text{2}}}{\text{[Q]}}\)</p>
</div>
<br><hr><br><div class="question">
<p>What is the effect of increasing temperature on the rate constant, <em>k</em>?<span class="Apple-converted-space"> </span></p>
<p>A. The rate constant does not change.</p>
<p>B. The rate constant decreases linearly.</p>
<p>C. The rate constant increases exponentially.</p>
<p>D. The rate constant increases proportionally with temperature.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">What happens when the temperature of a reaction increases?</p>
<p class="p1">A. The activation energy increases.</p>
<p class="p1">B. The rate constant increases.</p>
<p class="p1">C. The enthalpy change increases.</p>
<p class="p1">D. The order of the reaction increases.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">For the gas phase reaction:</p>
<p class="p1">\[{\text{A(g)}} + {\text{B(g)}} \to {\text{C(g)}}\]</p>
<p class="p1">the experimentally determined rate expression is: rate \( = k[{\text{A}}]{[{\text{B}}]^2}\)</p>
<p class="p1">By what factor will the rate change if the concentration of A is tripled and the concentration of B is halved?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>0.75</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>1.5</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>6</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>12</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Carbon monoxide and nitrogen dioxide react to form carbon dioxide and nitrogen monoxide according to the following equation.</p>
<p class="p1">\[{\text{CO(g)}} + {\text{N}}{{\text{O}}_2}{\text{(g)}} \to {\text{C}}{{\text{O}}_2}{\text{(g)}} + {\text{NO(g)}}\]</p>
<p class="p1">The reaction occurs in a series of steps. The equation for the rate-determining step is given below.</p>
<p class="p1">\({\text{2N}}{{\text{O}}_2}{\text{(g)}} \to {\text{N}}{{\text{O}}_3}{\text{(g)}} + {\text{NO(g)}}\)</p>
<p class="p1">What is the rate expression for this reaction?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>rate \( = k{\text{[CO(g)][N}}{{\text{O}}_2}{\text{(g)]}}\)</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>rate \( = k{{\text{[N}}{{\text{O}}_2}{\text{(g)]}}^2}\)</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>rate \( = k{\text{[N}}{{\text{O}}_3}{\text{(g)][NO(g)]}}\)</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>rate \( = k{\text{[C}}{{\text{O}}_2}{\text{(g)][NO(g)]}}\)</p>
</div>
<br><hr><br><div class="question">
<p>Which is true of an Arrhenius plot of \(\ln k\) (<em>y</em>-axis) against \(\frac{1}{T}\)?</p>
<p>A. The graph goes through the origin.</p>
<p>B. The activation energy can be determined from the gradient.</p>
<p>C. The intercept on the <em>x</em>-axis is the activation energy.</p>
<p>D. The intercept on the <em>y</em>-axis is the frequency factor, A.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">The rate expression for a reaction is:</p>
<p class="p1">\[{\text{rate}} = k{\text{[X][Y]}}\]</p>
<p class="p1">Which statement is correct?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>As the temperature increases the rate constant decreases.</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>The rate constant increases with increased temperature but eventually reaches a constant value.</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>As the temperature increases the rate constant increases.</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>The rate constant is not affected by a change in temperature.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statement describes the characteristics of a transition state relative to the potential energy of the reactants and products?</p>
<p class="p1">A. It is an unstable species with lower potential energy.</p>
<p class="p1">B. It is an unstable species with higher potential energy.</p>
<p class="p1">C. It is a stable species with lower potential energy.</p>
<p class="p1">D. It is a stable species with higher potential energy.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">The following data were obtained for the reaction between gases A and B.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-10_om_17.13.06.png" alt="M10/4/CHEMI/HPM/ENG/TZ2/21"></p>
<p class="p1">Which relationship represents the rate expression for the reaction?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{{\text{[B]}}^{\text{2}}}\)</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{{\text{[A]}}^{\text{2}}}\)</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{\text{[A]}}\)</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>\({\text{rate}} = k{\text{[B]}}\)</p>
</div>
<br><hr><br><div class="question">
<p>Which is the first step in the CFC-catalysed destruction of ozone in UV light?</p>
<p>A. CCl<sub>2</sub>F<sub>2</sub> → CClF<sub>2</sub><sup>+</sup> + Cl<sup>–</sup></p>
<p>B. CCl<sub>2</sub>F<sub>2</sub> → •CClF<sub>2</sub> + Cl•</p>
<p>C. CCl<sub>2</sub>F<sub>2</sub> → CCl<sub>2</sub>F<sup>+</sup> + F<sup>–</sup></p>
<p>D. CCl<sub>2</sub>F<sub>2</sub> → •CCl<sub>2</sub>F + F•</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which graph best represents a second-order reaction?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-12_om_13.11.42.png" alt="M13/4/CHEMI/HPM/ENG/TZ1/21"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">Consider the rate expression:</p>
<p class="p1">\[{\text{Rate}} = k{\text{[X][Y]}}\]</p>
<p class="p2">Which change decreases the value of the rate constant, \(k\)?</p>
<p class="p2">A. <span class="Apple-converted-space"> </span>Increase in the reaction temperature</p>
<p class="p2">B. <span class="Apple-converted-space"> </span>Decrease in the reaction temperature</p>
<p class="p2">C. <span class="Apple-converted-space"> </span>Increase in the concentration of X and Y</p>
<p class="p2">D. <span class="Apple-converted-space"> </span>Decrease in the concentration of X and Y</p>
</div>
<br><hr><br><div class="question">
<p>The rate expression for the reaction X (g) + 2Y (g) → 3Z (g) is </p>
<p style="text-align: center;">rate = <em>k</em>[X]<sup>0</sup> [Y]<sup>2</sup></p>
<p>By which factor will the rate of reaction increase when the concentrations of X and Y are both increased by a factor of 3?</p>
<p>A. 6</p>
<p>B. 9</p>
<p>C. 18</p>
<p>D. 27</p>
</div>
<br><hr><br><div class="question">
<p>The table gives rate data for the reaction in a suitable solvent.</p>
<p style="text-align: center;">C<sub>4</sub>H<sub>9</sub>Br + OH<sup>−</sup> → C<sub>4</sub>H<sub>9</sub>OH + Br<sup>−</sup></p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p>Which statement is correct?</p>
<p>A. The rate expression is rate = <em>k</em> [C<sub>4</sub>H<sub>9</sub>Br] [OH<sup>− </sup>].</p>
<p>B. The rate increases by a factor of 4 when the [OH<sup>− </sup>] is doubled.</p>
<p>C. C<sub>4</sub>H<sub>9</sub>Br is a primary halogenoalkane.</p>
<p>D. The reaction occurs via S<sub>N</sub>1 mechanism.</p>
</div>
<br><hr><br><div class="question">
<p>Which pair of statements explains the increase in rate of reaction when the temperature is increased or a catalyst is added?</p>
<p><img 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"></p>
</div>
<br><hr><br><div class="question">
<p>X and Y react according to the equation \({\text{2X}} + {\text{Y}} \to {\text{Z}}\). The reaction can be described by the following mechanism:</p>
<p>\({\text{X}} + {\text{X}} \to {{\text{X}}_2}\) slow</p>
<p>\({{\text{X}}_2} + {\text{Y}} \to {\text{Z}}\) fast</p>
<p>What is the order of the reaction with respect to X and Y?</p>
<p><img src="images/Schermafbeelding_2016-08-11_om_06.54.26.png" alt="M14/4/CHEMI/HPM/ENG/TZ1/20"></p>
</div>
<br><hr><br><div class="question">
<p>What happens to the rate constant, <em>k</em>, and the activation energy, \({E_{\text{a}}}\), as the temperature of a chemical reaction is increased?</p>
<p><img src="images/Schermafbeelding_2016-08-21_om_08.03.18.png" alt="N14/4/CHEMI/HPM/ENG/TZ0/21"></p>
</div>
<br><hr><br><div class="question">
<p>The hydrolysis of tertiary bromoalkanes with a warm dilute aqueous sodium hydroxide solution proceeds by a two-step \({{\text{S}}_{\text{N}}}{\text{1}}\) mechanism.</p>
<p> Step I: \({\text{R}} - {\text{Br}} \to {{\text{R}}^ + }{\text{B}}{{\text{r}}^ - }\)</p>
<p> Step II: \({{\text{R}}^ + } + {\text{O}}{{\text{H}}^ - } \to {\text{R}} - {\text{OH}}\)</p>
<p>Which description of this reaction is consistent with the above information?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-08-02_om_08.15.36.png" alt="M15/4/CHEMI/HPM/ENG/TZ2/21"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statement about a first-order reaction is correct?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>The reactant concentration decreases linearly with time.</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>The reactant concentration decreases exponentially with time.</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>The rate of reaction remains constant as the reaction proceeds.</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>The rate of reaction increases exponentially as the reaction proceeds.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">The rate information below was obtained for the following reaction at a constant temperature.</p>
<p class="p1">\[2{\text{N}}{{\text{O}}_2}({\text{g)}} + {{\text{F}}_2}({\text{g)}} \to {\text{2N}}{{\text{O}}_2}{\text{F(g)}}\]</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-26_om_15.36.01.png" alt="M11/4/CHEMI/HPM/ENG/TZ2/21"></p>
<p class="p1">What are the orders of the reaction with respect to \({\text{N}}{{\text{O}}_{\text{2}}}\) and \({{\text{F}}_{\text{2}}}\)?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>\({\text{N}}{{\text{O}}_{\text{2}}}\) is first order and \({{\text{F}}_{\text{2}}}\) is second order</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\({\text{N}}{{\text{O}}_{\text{2}}}\) is second order and \({{\text{F}}_{\text{2}}}\) is first order</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\({\text{N}}{{\text{O}}_{\text{2}}}\) is first order and \({{\text{F}}_{\text{2}}}\) is first order</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>\({\text{N}}{{\text{O}}_{\text{2}}}\) is second order and \({{\text{F}}_{\text{2}}}\) is second order</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Experimental data shows that a reaction in which Y is a reactant is first order with respect to Y. Which graph shows this first-order relationship?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-15_om_13.40.24.png" alt="M13/4/CHEMI/HPM/ENG/TZ2/20"></p>
</div>
<br><hr><br><div class="question">
<p>The reaction between NO<sub>2</sub> and F<sub>2</sub> gives the following rate data at a certain temperature.</p>
<p><img style="margin-right:auto;margin-left:auto;display: block;" src="images/Schermafbeelding_2018-08-07_om_09.47.13.png" alt="M18/4/CHEMI/HPM/ENG/TZ1/20"></p>
<p>What is the overall order of reaction?</p>
<p>A. 3</p>
<p>B. 2</p>
<p>C. 1</p>
<p>D. 0</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Decomposition of hydrogen peroxide in an aqueous solution proceeds as follows.</p>
<p class="p2" style="text-align: center;">2H<sub><span class="s1">2</span></sub>O<sub><span class="s1">2</span></sub>(aq) <span class="s2">→ </span>2H<sub><span class="s1">2</span></sub>O(<span class="s3">l</span>) <span class="s2">+ </span>O<span class="s1"><sub>2</sub></span>(g)</p>
<p class="p3">The rate expression for the reaction was found to be: rate <span class="s2">= </span><em>k </em>[H<sub><span class="s1">2</span></sub>O<sub><span class="s1">2</span></sub>].</p>
<p class="p3">Which graph is consistent with the given rate expression?</p>
<p class="p3"><img src="data:image/png;base64,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" alt></p>
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<p>The data shows the effect of changing reactant concentrations on the rate of the following reaction at 25°C.</p>
<p style="text-align: center;">F<sub>2</sub> (g) + 2ClO<sub>2</sub> (g) → 2FClO<sub>2</sub> (g)</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" 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" alt></p>
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<p>Which is correct for the order of reaction with respect to the fluorine concentration and the overall order of reaction?</p>
<p><img style="float: left;" 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" 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<p>Which pair of graphs represents the same order of reaction?</p>
<p><img src="data:image/png;base64,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" alt></p>
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" 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