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</div><h2>SL Paper 2</h2><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Define the term <em>isotopes</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">A sample of silicon contains three isotopes.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-19_om_12.45.06.png" alt="M09/4/CHEMI/SP2/ENG/TZ2/07.a.ii"></p>
<p class="p1">Calculate the relative atomic mass of silicon using this data.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the structure and bonding in silicon dioxide and carbon dioxide.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the Lewis structure of NH<span class="s1">3</span>, state its shape and deduce and explain the H–N–H bond angle in \({\text{N}}{{\text{H}}_{\text{3}}}\).</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The graph below shows the boiling points of the hydrides of group 5. Discuss the variation in the boiling points.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-19_om_12.58.00.png" alt="M09/4/CHEMI/SP2/ENG/TZ2/07.b.ii"></p>
<div class="marks">[4]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain, using diagrams, why CO and \({\text{N}}{{\text{O}}_{\text{2}}}\) are polar molecules but \({\text{C}}{{\text{O}}_{\text{2}}}\) is a non-polar molecule.</p>
<div class="marks">[5]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Boron is most often encountered as a component in borosilicate glass (heat resistant glass).</p>
<p>The naturally occurring element contains two stable isotopes, \(_{\;{\text{5}}}^{{\text{10}}}{\text{B}}\) and \(_{\;{\text{5}}}^{{\text{11}}}{\text{B}}\).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the number of protons, neutrons and electrons in an atom of \(_{\;{\text{5}}}^{{\text{11}}}{\text{B}}\).</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-17_om_08.42.37.png" alt="M14/4/CHEMI/SP2/ENG/TZ2/02.a"></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The relative atomic mass of boron is 10.8, to three significant figures. Calculate the percentage of \(_{\;{\text{5}}}^{{\text{10}}}{\text{B}}\) in the naturally occurring element.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Isotopes of boron containing 7 and 8 neutrons also exist. Suggest why releasing isotopes containing more neutrons than the stable isotope into the environment can be dangerous.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) State the formula of the compound that boron forms with fluorine.</p>
<p> </p>
<p>(ii) Explain why this compound acts as a Lewis acid.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Iron rusts in the presence of oxygen and water. Rusting is a redox process involving several steps that produces hydrated iron(III) oxide, \({\text{F}}{{\text{e}}_{\text{2}}}{{\text{O}}_{\text{3}}} \bullet {\text{n}}{{\text{H}}_{\text{2}}}{\text{O}}\), as the final product.</p>
<p>The half-equations involved for the first step of rusting are given below.</p>
<p> Half-equation 1: \({\text{Fe(s)}} \to {\text{F}}{{\text{e}}^{2 + }}{\text{(aq)}} + {\text{2}}{{\text{e}}^ - }\)</p>
<p> Half-equation 2: \({{\text{O}}_{\text{2}}}{\text{(aq)}} + {\text{4}}{{\text{e}}^ - } + {\text{2}}{{\text{H}}_{\text{2}}}{\text{O(l)}} \to {\text{4O}}{{\text{H}}^ - }{\text{(aq)}}\)</p>
</div>
<div class="specification">
<p>A voltaic cell is made from a half-cell containing a magnesium electrode in a solution of magnesium nitrate and a half-cell containing a silver electrode in a solution of silver(I) nitrate.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_10.08.47.png" alt="N14/4/CHEMI/SP2/ENG/TZ0/08.c"></p>
</div>
<div class="specification">
<p>Hydrogen peroxide decomposes according to the equation below.</p>
<p>\[{\text{2}}{{\text{H}}_{\text{2}}}{{\text{O}}_{\text{2}}}{\text{(aq)}} \to {\text{2}}{{\text{H}}_{\text{2}}}{\text{O(l)}} + {{\text{O}}_{\text{2}}}{\text{(g)}}\]</p>
<p>The rate of the decomposition can be monitored by measuring the volume of oxygen gas released. The graph shows the results obtained when a solution of hydrogen peroxide decomposed in the presence of a CuO catalyst.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_10.25.17.png" alt="N14/4/CHEMI/SP2/ENG/TZ0/08.e"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Identify whether half-equation 1 represents oxidation or reduction, giving a reason for your answer.</p>
<p> </p>
<p> </p>
<p>(ii) Identify the oxidation number of each atom in the three species in half-equation 2.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_09.41.52.png" alt="N14/4/CHEMI/SP2/ENG/TZ0/08.a.ii"></p>
<p> </p>
<p>(iii) Deduce the overall redox equation for the first step of rusting by combining half-equations 1 and 2.</p>
<p> </p>
<p> </p>
<p>(iv) Identify the reducing agent in the redox equation in part (iii).</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The oxygen in half-equation 2 is atmospheric oxygen that is found dissolved in water in very small concentrations. Explain, in terms of intermolecular forces, why oxygen is not very soluble in water.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Given that magnesium is more reactive than silver, deduce the half-equations for the reactions occurring at each electrode, including state symbols.</p>
<p> </p>
<p>Negative electrode (anode):</p>
<p> </p>
<p>Positive electrode (cathode):</p>
<p> </p>
<p>(ii) Outline <strong>one </strong>function of the salt bridge.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) State the property that determines the order in which elements are arranged in the periodic table.</p>
<p> </p>
<p> </p>
<p>(ii) State the relationship between the electron arrangement of an element and its group and period in the periodic table.</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) The experiment is repeated with the same amount of a more effective catalyst, \({\text{Mn}}{{\text{O}}_{\text{2}}}\), under the same conditions and using the same concentration and volume of hydrogen peroxide. On the graph above, sketch the curve you would expect.</p>
<p>(ii) Outline how the initial rate of reaction can be found from the graph.</p>
<p> </p>
<p> </p>
<p> </p>
<p>(iii) Outline a different experimental procedure that can be used to monitor the decomposition rate of hydrogen peroxide.</p>
<p> </p>
<p> </p>
<p>(iv) A Maxwell–Boltzmann energy distribution curve is drawn below. Label both axes and explain, by annotating the graph, how catalysts increase the rate of reaction.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_10.32.00.png" alt="N14/4/CHEMI/SP2/ENG/TZ0/08.e.iv"></p>
<div class="marks">[7]</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>A sample of magnesium contains three isotopes: magnesium-24, magnesium-25 and magnesium-26, with abundances of 77.44%, 10.00% and 12.56% respectively.</p>
</div>
<div class="specification">
<p>Phosphorus(V) oxide, \({{\text{P}}_{\text{4}}}{{\text{O}}_{{\text{10}}}}{\text{ }}({M_{\text{r}}} = 283.88)\), reacts vigorously with water \(({M_{\text{r}}} = 18.02)\), according to the equation below.</p>
<p>\[{{\text{P}}_{\text{4}}}{{\text{O}}_{{\text{10}}}}{\text{(s)}} + {\text{6}}{{\text{H}}_{\text{2}}}{\text{O(l)}} \to {\text{4}}{{\text{H}}_{\text{3}}}{\text{P}}{{\text{O}}_{\text{4}}}{\text{(aq)}}\]</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the relative atomic mass of this sample of magnesium correct to <strong>two</strong> decimal places.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Predict the relative atomic radii of the three magnesium isotopes, giving your reasons.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the bonding in magnesium.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State an equation for the reaction of magnesium oxide with water.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A student added 5.00 g of \({{\text{P}}_{\text{4}}}{{\text{O}}_{{\text{10}}}}\) to 1.50 g of water. Determine the limiting reactant, showing your working.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the mass of phosphoric(V) acid, \({{\text{H}}_{\text{3}}}{\text{P}}{{\text{O}}_{\text{4}}}\), formed in the reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State a balanced equation for the reaction of aqueous \({{\text{H}}_{\text{3}}}{\text{P}}{{\text{O}}_{\text{4}}}\) with excess aqueous sodium hydroxide, including state symbols.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the formula of the conjugate base of \({{\text{H}}_{\text{3}}}{\text{P}}{{\text{O}}_{\text{4}}}\).</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Deduce the Lewis structure of \({\text{PH}}_4^ + \).</p>
<p> </p>
<p>(ii) Predict, giving a reason, the bond angle around the phosphorus atom in \({\text{PH}}_4^ + \).</p>
<p> </p>
<p> </p>
<p> </p>
<p>(iii) Predict whether or not the P–H bond is polar, giving a reason for your choice.</p>
<div class="marks">[4]</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The element boron has two naturally occurring isotopes, \(^{{\text{10}}}{\text{B}}\) and \(^{{\text{11}}}{\text{B}}\).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Define the term <em>isotopes of an element</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the percentage abundance of <strong>each </strong>isotope, given that the relative atomic mass of B is 10.81.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the Lewis structures of \({\text{N}}{{\text{H}}_{\text{3}}}\) and \({\text{B}}{{\text{F}}_{\text{3}}}\).</p>
<p class="p1">\[{\text{N}}{{\text{H}}_{\text{3}}}\quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad {\text{B}}{{\text{F}}_{\text{3}}}\]</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe how covalent bonds are formed.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Compare the shapes of the two molecules and explain the difference using valence shell electron pair repulsion theory (VSEPR).</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1"><span class="s1">Predict and explain whether the molecules </span>\({\text{N}}{{\text{H}}_{\text{3}}}\) <span class="s1">and </span>\({\text{B}}{{\text{F}}_{\text{3}}}\) <span class="s1">are polar molecules.</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">c.iv.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Lithium and boron are elements in period 2 of the periodic table. Lithium occurs in group 1 (the alkali metals) and boron occurs in group 3. Isotopes exist for both elements.</p>
</div>
<div class="specification">
<p class="p1">Every element has its own unique line emission spectrum.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Define the terms <em>atomic number</em>, <em>mass number </em>and <em>isotopes of an element</em>.</p>
<p class="p2"> </p>
<p class="p1">Atomic number:</p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p1">Mass number:</p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p1">Isotopes of an element:</p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Distinguish between the terms <em>group </em>and <em>period</em>.</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>Deduce the electron arrangements of the lithium ion, \({\text{L}}{{\text{i}}^ + }\), and the boron atom, B.</p>
<p class="p2"> </p>
<p class="p1">\({\text{L}}{{\text{i}}^ + }\):</p>
<p class="p2"> </p>
<p class="p1">B:</p>
<p class="p2"> </p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>Naturally occurring boron exists as two isotopes with mass numbers of 10 and 11. Calculate the percentage abundance of the lighter isotope, using this information and the relative atomic mass of boron in Table 5 of the Data Booklet.</p>
<p class="p1">v) <span class="Apple-converted-space"> </span>Lithium exists as two isotopes with mass numbers of 6 and 7. Deduce the number of protons, electrons and neutrons for each isotope.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-23_om_09.16.02.png" alt="N12/4/CHEMI/SP2/ENG/TZ0/04.a"></p>
<div class="marks">[10]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Distinguish between a <em>continuous spectrum </em>and a <em>line spectrum</em>.</p>
<p class="p1">(ii) Draw a diagram to show the electron transitions between energy levels in a hydrogen atom that are responsible for the two series of lines in the ultraviolet and visible regions of the spectrum. Label your diagram to show <strong>three </strong>transitions for each series.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Explain why metals are good conductors of electricity and why they are malleable.</p>
<p class="p1">(ii) Iron is described as a transition metal. Identify the <strong>two </strong>most common ions of iron.</p>
<p class="p1">iii) Deduce the chemical formulas of lithium oxide and iron(II) oxide.</p>
<p class="p1"> </p>
<p class="p1">Lithium oxide:</p>
<p class="p1"> </p>
<p class="p1">Iron(II) oxide:</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Iron has three main naturally occurring isotopes which can be investigated using a mass spectrometer.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">A sample of iron has the following isotopic composition by mass.</p>
<p class="p2" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-30_om_05.32.14.png" alt="N10/4/CHEMI/SP2/ENG/TZ0/03.b"></p>
<p class="p1">Calculate the relative atomic mass of iron based on this data, giving your answer to <strong>two decimal places</strong>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the number of electrons in the ion \(^{{\text{56}}}{\text{F}}{{\text{e}}^{2 + }}\).</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the bonding in iron and explain the electrical conductivity and malleability of the metal.</p>
<div class="marks">[4]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The relative atomic mass of naturally occurring copper is 63.55. Calculate the abundances of \(^{{\text{63}}}{\text{Cu}}\) and \(^{{\text{65}}}{\text{Cu}}\) in naturally occurring copper.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The isotopes of some elements are radioactive. State a radioisotope used in medicine.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State a balanced equation for the reaction of sodium with water. Include state symbols.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">With reference to electronic arrangements, suggest why the reaction between rubidium and water is more vigorous than that between sodium and water.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe and explain what you will see if chlorine gas is bubbled through a solution of</p>
<p class="p1">(i) potassium iodide.</p>
<p class="p1">(ii) potassium fluoride.</p>
<div class="marks">[3]</div>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>Calcium carbide, CaC<sub>2</sub>, is an ionic solid.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the nature of ionic bonding.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the electron configuration of the Ca<sup>2+</sup> ion.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>When calcium compounds are introduced into a gas flame a red colour is seen; sodium compounds give a yellow flame. Outline the source of the colours and why they are different.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>two </strong>reasons why solid calcium has a greater density than solid potassium.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why solid calcium is a good conductor of electricity.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calcium carbide reacts with water to form ethyne and calcium hydroxide.</p>
<p>CaC<sub>2</sub>(s) + H<sub>2</sub>O(l) → C<sub>2</sub>H<sub>2</sub>(g) + Ca(OH)<sub>2</sub>(aq)</p>
<p>Estimate the pH of the resultant solution.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">\(^{{\text{131}}}{\text{I}}\) is a radioactive isotope of iodine.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Define the term <em>isotope</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the number of neutrons in one atom of iodine-131.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">2-methylbutan-2-ol, \({{\text{(C}}{{\text{H}}_{\text{3}}}{\text{)}}_{\text{2}}}{\text{C(OH)C}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{H}}_{\text{3}}}\), is a liquid with a smell of camphor that was formerly used as a sedative. One way of producing it starts with 2-methylbut-2-ene.</p>
</div>
<div class="specification">
<p class="p1">2-chloro-2-methylbutane contains some molecules with a molar mass of approximately \({\text{106 g}}\,{\text{mo}}{{\text{l}}^{ - 1}}\) and some with a molar mass of approximately \({\text{108 g}}\,{\text{mo}}{{\text{l}}^{ - 1}}\).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the structure of 2-methylbut-2-ene.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the other substances required to convert 2-methylbut-2-ene to 2-methylbutan-2-ol.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain whether you would expect 2-methylbutan-2-ol to react with acidified potassium dichromate(VI).</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why 2-methylbut-2-ene is less soluble in water than 2-methylbutan-2-ol.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline why there are molecules with different molar masses.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.i.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Rubidium contains two stable isotopes, \(^{{\text{85}}}{\text{Rb}}\) and \(^{{\text{87}}}{\text{Rb}}\). The relative atomic mass of rubidium is given in Table 5 of the Data Booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the percentage of each isotope in pure rubidium. State your answers to <strong>three</strong> significant figures.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the number of electrons and the number of neutrons present in an atom of \(^{{\text{87}}}{\text{Rb}}\).</p>
<p class="p1">Number of electrons:</p>
<p class="p1">Number of neutrons:</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Isotopes are atoms of the same element with different mass numbers. Two isotopes of cobalt are Co-59 and Co-60.</p>
</div>
<div class="question">
<p class="p1">Deduce the missing information and complete the following table.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-11-03_om_16.54.07.png" alt="N11/4/CHEMI/SP2/ENG/TZ0/02.a"></p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Chlorine occurs in Group 7, the halogens.</p>
</div>
<div class="specification">
<p class="p1">Two stable isotopes of chlorine are \(^{{\text{35}}}{\text{Cl}}\) and \(^{{\text{37}}}{\text{Cl}}\) with mass numbers 35 and 37 respectively.</p>
</div>
<div class="specification">
<p class="p1">Chlorine has an electronegativity value of 3.2 on the Pauling scale.</p>
</div>
<div class="specification">
<p class="p1">Chloroethene, H<sub><span class="s1">2</span></sub>C=CHCl, the monomer used in the polymerization reaction in the manufacture of the polymer poly(chloroethene), PVC, can be synthesized in the following two-stage reaction pathway.</p>
<p class="p1">\[\begin{array}{*{20}{l}} {{\text{Stage 1:}}}&{{{\text{C}}_2}{{\text{H}}_4}{\text{(g)}} + {\text{C}}{{\text{l}}_2}{\text{(g)}} \to {\text{ClC}}{{\text{H}}_2}{\text{C}}{{\text{H}}_2}{\text{Cl(g)}}} \\ {{\text{Stage 2:}}}&{{\text{ClC}}{{\text{H}}_2}{\text{C}}{{\text{H}}_2}{\text{Cl(g)}} + {\text{HC=CHCl(g)}} + {\text{HCl(g)}}} \end{array}\]</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Define the term <em>isotopes of an element</em>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Calculate the number of protons, neutrons and electrons in the isotopes <sup><span class="s1">35</span></sup>Cl and <sup><span class="s1">37</span></sup>Cl.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-19_om_06.41.13.png" alt="M13/4/CHEMI/SP2/ENG/TZ2/06.a.ii"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Using the mass numbers of the two isotopes and the relative atomic mass of chlorine from Table 5 of the Data Booklet, determine the percentage abundance of each isotope.</p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p2"> </p>
<p class="p1">Percentage abundance <sup><span class="s1">35</span></sup>Cl:</p>
<p class="p2"> </p>
<p class="p1">Percentage abundance <sup><span class="s1">37</span></sup>Cl:</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Define the term <em>electronegativity</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Using Table 7 of the Data Booklet, explain the trends in electronegativity values of the Group 7 elements from F to I.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the balanced chemical equation for the reaction of potassium bromide, KBr(aq), with chlorine, Cl<sub><span class="s1">2</span></sub>(aq).</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the colour change likely to be observed in this reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the enthalpy change, \(\Delta H\), in \({\text{kJ}}\,{\text{mo}}{{\text{l}}^{ - 1}}\), for stage 1 using average bond enthalpy data from Table 10 of the Data Booklet.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State whether the reaction given in stage 1 is exothermic or endothermic.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the structure of poly(chloroethene) showing <strong>two </strong>repeating units.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest why monomers are often gases or volatile liquids whereas polymers are solids.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.v.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Carbon and silicon belong to the same group of the periodic table.</p>
</div>
<div class="specification">
<p class="p1">Both silicon and carbon form oxides.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the period numbers of both carbon and silicon.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe and compare <strong>three </strong>features of the structure and bonding in the three allotropes of carbon: diamond, graphite and \({{\text{C}}_{{\text{60}}}}\) fullerene.</p>
<div class="marks">[6]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the Lewis structure of \({\text{C}}{{\text{O}}_{\text{2}}}\) and predict its shape and bond angle.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the structure and bonding in \({\text{Si}}{{\text{O}}_{\text{2}}}\).</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why silicon dioxide is a solid and carbon dioxide is a gas at room temperature.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the bonding within the carbon monoxide molecule.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Silicon has three stable isotopes, \(^{{\text{28}}}{\text{Si}}\), \(^{{\text{29}}}{\text{Si}}\) and \(^{{\text{30}}}{\text{Si}}\). The heaviest isotope, \(^{{\text{30}}}{\text{Si}}\), has a percentage abundance of 3.1%. Calculate the percentage abundance of the lightest isotope to one decimal place.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Draw and label an energy level diagram for the hydrogen atom. In your diagram show how the series of lines in the ultraviolet and visible regions of its emission spectrum are produced, clearly labelling each series.</p>
</div>
<br><hr><br><div class="specification">
<p>A sample of vaporized elemental magnesium is introduced into a mass spectrometer.</p>
<p>One of the ions that reaches the detector is \(^{{\text{26}}}{\text{M}}{{\text{g}}^ + }\).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the number of protons, neutrons and electrons in the \(^{{\text{26}}}{\text{M}}{{\text{g}}^ + }\) ion.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The sample contained the three isotopes \(^{{\text{24}}}{\text{Mg}}\), \(^{{\text{25}}}{\text{Mg}}\) and \(^{{\text{26}}}{\text{Mg}}\). The relative percentage abundances of \(^{{\text{25}}}{\text{Mg}}\) and \(^{{\text{26}}}{\text{Mg}}\) are 10.00% and 11.01% respectively. Calculate the relative atomic mass \({\text{(}}{{\text{A}}_r}{\text{)}}\) of magnesium, accurate to <strong>two </strong>decimal places.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the relative mass and charge of the subatomic particles of an atom.</p>
<p><img src="images/Schermafbeelding_2016-08-09_om_13.42.17.png" alt="M15/4/CHEMI/SP2/ENG/TZ1/04.a"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Calculate the number of neutrons and electrons in one atom of \(^{{\text{65}}}{\text{Cu}}\).</p>
<p> </p>
<p>Neutrons:</p>
<p> </p>
<p> </p>
<p>Electrons:</p>
<p> </p>
<p>(ii) State one difference in the physical properties of the isotopes \(^{{\text{63}}}{\text{Cu}}\) and \(^{{\text{65}}}{\text{Cu}}\) and explain why their chemical properties are the same.</p>
<p> </p>
<p>Physical:</p>
<p> </p>
<p>Chemical:</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the bonding in solid copper.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>two </strong>properties of copper that make it useful and economically important.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why the relative atomic mass of argon is greater than the relative atomic mass of potassium, even though the atomic number of potassium is greater than the atomic number of argon.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the numbers of protons and electrons in the \({{\text{K}}^ + }\) ion.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The graph of the first ionization energy plotted against atomic number for the first twenty elements shows periodicity.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-16_om_07.30.16.png" alt="M09/4/CHEMI/SP2/ENG/TZ1/05.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Strontium exists as four naturally-occurring isotopes. Calculate the relative atomic mass of strontium to two decimal places from the following data.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-16_om_09.20.10.png" alt="M09/4/CHEMI/SP2/ENG/TZ1/05.a.iii"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Define the term <em>first ionization energ</em>y and state what is meant by the term <em>periodicity</em>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the electron arrangement of argon and explain why the noble gases, helium, neon and argon show the highest first ionization energies for their respective periods.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">A graph of atomic radius plotted against atomic number shows that the atomic radius decreases across a period. Explain why chlorine has a smaller atomic radius than sodium.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why a sulfide ion, \({{\text{S}}^{2 - }}\), is larger than a chloride ion, \({\text{C}}{{\text{l}}^ - }\).</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iv.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why the melting points of the Group 1 metals \({\text{(Li}} \to {\text{Cs)}}\) decrease down the group whereas the melting points of the Group 7 elements \({\text{(F}} \to {\text{I)}}\) increase down the group.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.v.</div>
</div>
<br><hr><br><div class="specification">
<p>Magnesium is a group 2 metal which exists as a number of isotopes and forms many compounds.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the nuclear symbol notation, \({}_Z^AX\), for magnesium-26.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Mass spectroscopic analysis of a sample of magnesium gave the following results:</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>Calculate the relative atomic mass, <em>A</em><sub>r</sub>, of this sample of magnesium to two decimal places.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Magnesium burns in air to form a white compound, magnesium oxide. Formulate an equation for the reaction of magnesium oxide with water.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the trend in acid-base properties of the oxides of period 3, sodium to chlorine.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>In addition to magnesium oxide, magnesium forms another compound when burned in air. Suggest the formula of this compound</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the structure and bonding in solid magnesium oxide.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Magnesium chloride can be electrolysed.</p>
<p>Deduce the half-equations for the reactions at each electrode when <strong>molten</strong> magnesium chloride is electrolysed, showing the state symbols of the products. The melting points of magnesium and magnesium chloride are 922 K and 987 K respectively.</p>
<p style="padding-left: 30px;">Anode (positive electrode):</p>
<p style="padding-left: 30px;">Cathode (negative electrode):</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>There are many oxides of silver with the formula Ag<sub>x</sub>O<sub>y</sub>. All of them decompose into their elements when heated strongly.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>After heating 3.760 g of a silver oxide 3.275 g of silver remained. Determine the empirical formula of Ag<sub>x</sub>O<sub>y</sub>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest why the final mass of solid obtained by heating 3.760 g of Ag<sub>x</sub>O<sub>y</sub> may be greater than 3.275 g giving one design improvement for your proposed suggestion. Ignore any possible errors in the weighing procedure.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Naturally occurring silver is composed of two stable isotopes, <sup>107</sup>Ag and <sup>109</sup>Ag.</p>
<p>The relative atomic mass of silver is 107.87. Show that isotope <sup>107</sup>Ag is more abundant.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Some oxides of period 3, such as Na<sub>2</sub>O and P<sub>4</sub>O<sub>10</sub>, react with water. A spatula measure of each oxide was added to a separate 100 cm<sup>3</sup> flask containing distilled water and a few drops of bromothymol blue indicator.</p>
<p>The indicator is listed in section 22 of the data booklet.</p>
<p>Deduce the colour of the resulting solution and the chemical formula of the product formed after reaction with water for each oxide.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[3]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the electrical conductivity of molten Na<sub>2</sub>O and P<sub>4</sub>O<sub>10</sub>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the model of electron configuration deduced from the hydrogen line emission spectrum (Bohr’s model).</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Titanium is a transition metal.</p>
</div>
<div class="specification">
<p>TiCl<sub>4</sub> reacts with water and the resulting titanium(IV) oxide can be used as a smoke screen.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the bonding in metals.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Titanium exists as several isotopes. The mass spectrum of a sample of titanium gave the following data:</p>
<p style="text-align: center;"><img 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ScCQ0lA7umJoayDdBGBSATkbJCW4ZGo0TkiQASIgIcAOUsyBSJABIiAAgLkLBVAIhEiQASIADlLsgEiQASIgAIC5CwVQCIRIkAEiAA5S7IBIkAEiIACAuQsFUAiESJABIgAOUuyASJABIiAAgLkLBVAIhEiQASIADlLsgEiQASIgAIC5CwVQJIV4c+gdlU21CWN6A0S4h3NqC7JhfDoVFKSGnNKatDi6A+SokMioJQAj97GMqhFexJsKvQTzg792nthazSiZI7aXVZdiMqjNjj9AmKK7DYIiOSQnKUERnTJfnTX6bHG+EFIMb67Fvf/2x64Vr4M4Vl71teItTiA6SsOwMaHiFMGEVBAQIWUueWwC/YU8PkYFv0CQFuFw09oEf7t7/3ori2DdnM7Zu457S7fVY5bjxdjYWWz32E6m1G1/CG8NfM5uMQ6OnFg5jtYuHw3WpxkuAI43x8QcOjLp0QwARfra9vPCibPYtpZHON0ZtbjEznLzDpNUB5jrMfMdJyG6cxnfZKUCCVANhjKRD7HxfosVUyLBUxv+VheTLQ9juUY2phLIuWyGlgOljKD9RJjzMV6zKWM40qZuUcilYB2K2eDNLNUcE0PEXFa8OyDO3HdU6VYnhx0tvd91NcA+bk3B17lU+aiwm5BxdwJQQXokAhcJQHBDtfrYdUV44eacbJK+I86ccqhxrT0CZD+4FWp6ZjGncDBE52IPG+041TnuQFkZKuPmxNSdnHTqWvbkQtoeXYTqiaVYdPiDIwIqsxtmJOQNbYbjcYSzBFjS9korKyHjZYyQbTo8OoJ9KO74QVUWfOw65HZgRfmqJQ60Gq1wwkVUmYsRnFWA1489qHHMfbDYfktmrM2oHxZZoCjjaqKOBEmZxnVQPJwtuzD+iPzcHjHYqSF0OPh7GpHKzpQs/6nOJb+CMxi7OckSscfwl3r6tAd+RIeVWtIOIEJ8B2o31ML5OfhjrSREUG4Z5ChIu4LuyQ/eQaK9zyEriXpGCFe5EdBPe9PyN/zIDTJIcYuKZgYSSIQxTjz3XVYt9CMBZUrBzAeO0bmb8WWuWmeq3EKptx9L5a8Xo5nms5FUSOJEoHwBPj2t3Gw4VYUL7t14Fllymw8sus21GzejUbPHRm84yR2VNSifxbnqUCYCGzHPO1J3NPW49lEcqGvbQHevOthGE8H3+8Rvl3xnEvOUuno8mdQt7EcHcUb8UCE+JBbXWh8CMlqZGVfoNiPUt4kF4HAZbSfeAMNOXn43i3ysUq/gpFIyytHU1kKqjWjxFvZ5j3dgW9vehL5yTcgO0uNZJxH86EXYc2/F3dP8e6pq5A8ZQEKl/wRj++zhNwe59efGClylgrHmW83Y4+xBU0bZmKM9x63EV/DqgYHHNvmYWzSMhht/UiZfgfyvRdrhbpJjAhERYDvxImDJ8BNS0eq4l9wCjLnP4pqu3DrkR3HK/KhGfNPWFvHuTd+xI3JljDNSMbErElw1ByDpTexY0iKUYehmFBZqswi1Afc38bAXG0w5HDgdGb0sEMoyhwNJE/GzDuvoKb+/cArsdMOa+sUzP9GasIHyhPKcK5BZ91LcHXoHRdydfGnYcy9HSWNgSEgMWaJHOROHw+k3IzcfE0YDU50WTvA5d+B6SmJ7S4Su/dhTGPQWaovI+ehImRtq8JzLRfc6ngHmg3VMN1ZhO8rWjYNuhWkIG4JeDcRJyFrYvB9azKdVqVj9j1p2BYQs2xGjeENTNy1GlrRCY7HjJVrMf9UPV5p9D7Zw8N5+giqa1KVxUZlqo+XbHKWQz6SKiRr1uGwdS3wzL+5Hy0bkYPdruX4Tdgd9CFvAClMcAK8zYjcpCTJY7ijkbliBywrLmKzWohZJmHEchOwbAf25t3kWekI8cl87N6ZC9Sv9YSaRiBz63nc1/QS1g8Yp49/6CHvDadX4cb/oH+eeyj3GtLPc5upbfFFQM4GaWYZX+NMvSECROAaESBneY3AkloiQATiiwA5y/gaT+oNESAC14gAOctrBJbUEgEiEF8EyFnG13hSb4gAEbhGBMhZXiOwpJYIEIH4IkDOMr7Gk3pDBIjANSJAzvIagSW1RIAIxBcBcpbxNZ7UGyJABK4RgZAneK5RPaSWCBABIhBTBIKfZrwuuPXBAsHn6ZgIXEsCco+aXcs6STcRkBKQs0FahkspUZoIEAEiIEOAnKUMGMomAkSACEgJkLOU0qA0ESACRECGADlLGTCUTQSIABGQEiBnKaVBaSJABIiADAFyljJgKJsIEAEiICVAzlJKg9JEgAgQARkC5CxlwFA2ESACREBKgJyllAaliQARIAIyBMhZyoChbCJABIiAlAA5SymNaNP8GdSuypa8cpRHb2MZ1ElJ7lfghvlWlzSiN9p6SJ4IYLC21Qvb0e0oVHtsU12IyqPe94N78fbC1mhEyRy1z37Vhdtx1EYWKxAiZ+m1k6i/+9Fdp8ca4weSkiqkzC2HnTEIz9j7Px/Dol8AaKtw+AktUiQlKEkElBEYjG31o7u2DNrys1jU1APGXOhrWoSz5XdhYWUznGIDPDL3vYnUiha4BPt12VE37RQKtWWo7e5X1sx4lmKSP0D4fdPfwARcrK9tPyuYPItpZ3GM05lZj2whF+uzVDEtFjC95WNZKTrhJkA2GI0lKLStHjPTcRqmM5+VKL/ErIalDFwpM/e4GHO1MUNOGFuWy5doireknA2G/K9D8XxhGLK+OS149sGduO6pn2L53h/iJ5EUC7Lr9bDqDuBVzbhIknSOCERHQKltpcxFhd0SWbdqCorq7SiSkXKc6sRHPJCSwGvRBO66jFUMmH0BLc9uQtWkMmxanIEREeX70d3wAqqsedj1yGxafkdkRSejIzAY2+qHo9mAJx9vQ9Gu1dAO6AFvQM49s5CR4N4iwbsfnXkCPJwt+7D+yDwc3rEYaQPR4ztQv6cWyM/DHWkjo62M5ImAPIGrtC3eZkRu0iioZ67B0fkPYPW3uAgbF0Jcfhceb/0uVudOiiAn38x4OjPQzz2e+jrovvDddVi30IwFlSuhSR4YHd/+Ng423IriZbfSrHLQ9EmBlMDV2pYqswj14uZNFw6kvYaZmmKZzRseztO/QNmav2DFgVIspot9wl8spPYXOc2fQd3GcnQUb8QDimKPl9F+4g005OThe7dQrDIyXDobHYEhsC1VGub+uAQ61GJPfQf4gAYIjrIGD8+tBLb8J8rmppGjoFuHAiwk4gHfbsYeYwuaNszEGO/9kyO+hlUNDji2zcPYpGUw2i77dfCdOHHwBLhp6UgdeBLqL0cpIjAQgSG1LQdarXbP7UNCxUI88788jvIX2F00FckDtSdBztPPWOFA+5Yv0vsnXW0w5HDgdGb0sEMoyhzt0+ZeJqmRn3szLcF9VCgxFASitS13nHI6ShrPhale47dRvhuNZQuhnvkaUne9TI4yiBY5yyAgQ3PIw9nVjlZMQtZEui4PDVPS4iYQvW2pMvNQrk9FTfURnHZ6FtyCY3yqAjXz12LljPEALqClajXmbbWjyPQctuZNoRllkMmRswwCQodEINYJuGeSSZLHcMdBU7wXhxedxdbMEe5HGUcUoT6jBE278zElWQXeVouyDUcAfADjknSM8IaavN/qMjT2BkY2Y51TtO0PeW84vQo3WoQkP5QE5F5DOpR1kC4iEImAnA3SzDISNTpHBIgAEfAQIGdJpkAEiAARUECAnKUCSCRCBIgAESBnSTZABIgAEVBAgJylAkgkQgSIABEgZ0k2QASIABFQQICcpQJIJEIEiAARIGdJNkAEiAARUECAnKUCSCRCBIgAEQh5goeQEAEiQASIgPhCsgAMIe/goccdA/jQwTATkHvUbJibQdUlMAE5G6RleAIbBXWdCBAB5QTIWSpnRZJEgAgkMAFylgk8+NR1IkAElBMgZ6mcFUkSASKQwATIWSbw4FPXiQARUE6AnKVyViRJBIhAAhMgZ5nAg09dJwJEQDkBcpbKWZEkESACCUyAnGUCDz51nQgQAeUEyFkqZ0WSRIAIJDABcpaDGXz+DGpXZUteOepV1g9HSw1K5qjdrx1NykVJdTMcif0mUS8c+g4hcA6NJdM9tpIU5ns6ShrPeUr1wnZ0OwrVHjl1ISqP2uAM0Rmc0Qtbo9Fvk2HL8XDaGmEsyfW0IRuFlfWwed81HqwywY7JWV71gPeju06PNcYPgjTwcLbsxvKF72DmgU4Iz9oz13OY+dZDWF7VrMCog9TRYQIQmIC5FRa3rQj24v30vQO9djK0+p/jibkTAPSju7YM2vKzWNTUA8Zc6GtahLPld2FhZSTb8pTb3I6Ze0679XeV49bjxQHl+O46rNNWwDpzB/rENrTgqVt/j9ULd6CFHKb4P2sw7x8CD73Z9B1CwMX62vazgsmzmHYWxzidmfX4ZM4ys04TlOdiPeZSxnGlzNzj8klSIpQA2aCXycfMol/AoK1ilj6PzfSYmY7TMJ35rFeIMXaJWQ1LGSLZlliOYzmGNia1PpfVwHKwlBmslxhjbrtFjoFZA4TamCFnckhZSQPiLilngzSzvJp5i9OCZx/cieueKsXy5CgUONrR+VF/FAVINDEJCKuTfVi/4SPonsiHJtnzM02Ziwq7BRXiLFM5Gf6jTpxyqDEtfQKkP3hVajqmcSdw8EQneP4cOk/ZwU1LR2qA0ASkTxuHhoNvoz3Bw0hSLMrpJ7TkBbQ8uwlVk8qwaXEGRoSwGI8Zy+5FVk0tjnV7HCPvgOXY+8jSr8eyzNEhJSiDCAQQ4D9Ew8+NsBaV4RGtsPyW++uHo9mAJx9vQ9Gu1dCmXM3P2YFWq33g8FBrO7oSfCke8v9Zyg0L5QsEPFf8I/Nw+PBipKlsYbCokKx5EHu2FCBr4ij/+RwDrK/PQDQTUX9hSiUSAb7djD3GUcg3fxtpMv6PtxlxZ9YqNADgCnah7ltcwKxRyss9g5TmuNPuGacnXyXMINVhhNwzztATiZcjMxSJB0JJj8UA+EIzFlSu9C+NQgpeQEvl3dC+uQBtfS5PsL4HbfecxF0rq3E6wa/OIbgoI4jAZbSfeAMN2nuxbMb4oHP+Q1VmEerFzcMuHEh7DTM1xaj1rmT8Yu5Uymw8sus21GzejUaHe7XDO05iR0Ut+mdxHukJ0D5ShjtrKvBUYzfEFTfvQPOOp3GwP4wTDa4jAY7JWSodZP4M6jaWo6N4Ix7QjJMv1fseDlV9hPzCBZjijTUhBVPuvhdLju7Evubz8mXpDBHgO3Hi4HvIyb8Tt/jsJwIWVRrm/rgEOtRiT32H28mFiI9EWl45mspSUK0ZhaQkNeY93YFvb3oS+ck3IDtLLa54VGmLsaOpGOOrv4sRSUlImvc02r5dgh35k4DsDExU0p6QuuMng5ylwrF0L41a0LRhJsYIhiR8RnwNqxoccGybh7FJy2C0XUSv5RhqHGGUJquRlW1HTf376A1zmrKIgECAb38bBxvGhWzGDExnoNhjCjLnP4pqu3Brkh3HK/KhGfNPWFuldamQnJmL9dWt7hXR8QoUasbAbu0I3fgZuEFxJ0HOUuGQ+pY93nvgxCVQGww5HDidGT3sEIoyb0DK9DuQ713ZSHU77bC2qpGfezNSpPmUJgI+Ap4lOJeD3OmhS3AhTpmbJL1B3VcQgEbetvjTMObeLrmx3V1OjFnCW9dl2IzLQh+wEHfJR8nrljYhztPkLId6gFOmY+WW6ThV/xoabd45ZC9Ov/IiarIix6GGuimkL9YIONFl7ZBd8qoy81CuT0VN9RF/7JvvRuNTFaiZvxYr5WKcqnTMvicN2wJils2oMbyBib5d9NHImP1dZG8LjFm21OzDwYk/GmBXPtY4X117yVleHbcIpVIwpWgbduYC9auneB4bux1bzy9D0+F1ETaGIqikU0RAJDAOmuK9OLzoLLZmjvCEgopQn1GCpt35vhi5ewaaJJkljkbmih2wrLiIzWohZpmEEctNwLId2Jt3k28XXZV5H/Zb7oNr8zfdMcsRK3AISyrDXysAAA0FSURBVLB/b57srnwiDUzIe8PpVbiJNPyfv77KvYb089dSalG8EpCzQZpZxuuIU7+IABEYUgLkLIcUJykjAkQgXgmQs4zXkaV+EQEiMKQEyFkOKU5SRgSIQLwSIGcZryNL/SICRGBICZCzHFKcpIwIEIF4JUDOMl5HlvpFBIjAkBIgZzmkOEkZESAC8UqAnGW8jiz1iwgQgSElEPIEz5BqJ2VEgAgQgRglEPw0Y8j/lB4sEKP9pGbHKAG5R81itDvU7BgkIGeDtAyPwcGkJhMBIjD8BMhZDj9zqpEIEIEYJEDOMgYHjZpMBIjA8BMgZzn8zKlGIkAEYpAAOcsYHDRqMhEgAsNPgJzl8DOnGokAEYhBAuQsY3DQqMlEgAgMPwFylsPPnGokAkQgBgmQs4zBQaMmEwEiMPwEyFkOhjl/BrWrsiVv0fMq64Wt0YiSOWr3G/jUhag8aoPTe5q+icDVEhDfAe6xq6Qkz9tDhe9lMNouK9Taj+7aNVCry9DYyweW4R1oqS7BHK/uOSWobnEgSCqwTIIckbO86oHuR3edHmuMHwRpEAyxDNrN7Zi55zSEx0dZVzluPV6MhZXN5DCDaNFhlAScdlhbZ8NgveS2LcG+xM8hFGWOVqSM7/41Nq7ZDUewtHDxv385nnHl47CoswfWtSOwf/o67FfsiIOVxs8xOcurGkseztO/QJnuD8iaxQVq6D2BZ9bUIju/AIszU9znVGnQrsjDyA2VOERGF8iLjqIgwKPXcgw1yEB66sgoyklEnR9gf9l/oiNLI8kUkjx6m/ZgzevfQuHdX0eyeDYFmXnFeELXgccNb6M3qESiHZKzvJoRd1rw7IM7cd1TpVjutiqfFv6jTpxyqDEtfYLv5fXCSVVqOqZxJ3DwRCctaXy0KBEdgX581NkOR3YGJiZfzU/3Alqe/TEev+4BlC2fFFT1eVjqG4D8OzA9Rap7AuZWWGCvmAvPpT+oXOIcSqkkTq8H1VPB4DahalIZNi3OwIiodDnQarXTUjwqZiTsJ+BEl7UDXOqHqF2Z7YlXZqOwshYtjn6/WNgUD2fLPqyvSseuTYtwU7Dh8ufQeeoCsrNugF0Sb1cXbsdRW6LPKd1AyVmGNSy5TI/BHZmHwzsWIy0MPfcMMrS8e8YZmk85REAxAY9Dy0qbhcJ9rZ5Y5Uk8NsmC9ct3o8UZYRtGWA2tfwsLDm9BXlqYJbwYC70IZ00p1h37Mv7DbAdjLthKx+PAXWWo7R7IGSvuRcwKhvm5x2xfrnnD+e46rFtoxoLKldDILYNSZuORXbehZvNuNHqu9rzjJHZU1KI/OL55zVtMFcQVAdUUFNW343j5fHC+X24KMu+4AzOsepQdsoUP8QgbN+sewpEFpXhAMy4CEgfeHpmPnVu8+lVInrIAhUt+jzXPnKCYZQRydEpKgD+Duo3l6CjeOIDBjURaXjmaylJQrRmFpCQ15j3dgW9vehL5yTcgO0vtCZ5LlVOaCAyCQLIaWdmQCfF47trouBeVD0wf0Pa4aelI9TlioU3JmJg1CY5TnfgowsR1EK2PmaIBWGKm1Z9BQ/l2M/YYW9C0YSbGeO9BG/E1rGpwwLFtHsYG3OeWgsz5j6LaLtzWYcfxinxoxvwT1tZxIRs/n0FXqMpEIsB3oH5PLRxNxZg+ZoQnznk9sla9DDi2Yt7Yicg1ngafcjNy84N3yBMJ1MB9JWc5MCNRQpVZhHrfPW2ee9tcbTDkcOB0ZvQwz31u4k3Dt6Ok8VyAZjFmiRzkTh8fkE8HREApAd5mRG7S9BDbghhvVCM/9+bQHWtx6S7EH733Ywrfl2A1LAW4Uph7ulBfNAUqpCBr5m1AzTFYAm5UFzaVuqGdPxXqBPcWCd59pWYahZwqHbPvScO2gJhlM2oMb2DirtXQBtyWEYVeEk14AqrMPJTrU1FTfQSnfZs5vTj9yosw3VmGR7QTBsFoJNJyClCcdQibn7N47tjoh6P5IKpNt2Dt96cNuIQfROUxUZSc5ZAP02hkrtgBy4qL2KwWYpZJGLHcBCzbgb15NwXceznkVZPCOCcwDprivTi86Cy2ZnqX1EuxD/fiN5K7M9wz0KQwj+EOgCd5BtYf/g3KsBuZYqhpFDS7+3Hfb8rD76APoC7eToe8Cpfe7hhvQxxb/ZF7s15s9YJaG8sE5GyQZpaxPKrUdiJABIaNADnLYUNNFREBIhDLBMhZxvLoUduJABEYNgLkLIcNNVVEBIhALBMgZxnLo0dtJwJEYNgIkLMcNtRUEREgArFMgJxlLI8etZ0IEIFhI0DOcthQU0VEgAjEMgFylrE8etR2IkAEho0AOcthQ00VEQEiEMsEQh53jOXOUNuJABEgAkNFIPjR7+uCFQcLBJ+nYyJwLQnIPZd7Lesk3URASkDOBmkZLqVEaSJABIiADAFyljJgKJsIEAEiICVAzlJKg9JEgAgQARkC5CxlwFA2ESACREBKgJyllAaliQARIAIyBMhZyoChbCJABIiAlAA5SykNShMBIkAEZAiQs5QBQ9lEgAgQASkBcpZSGpQmAkSACMgQIGcpA0Yu2/uaUeEu/4BPrhE23lOKd6ClugRzfDK5KDH+Gi2Ofjm1lE8ElBHgT8OYqw60PdHOlsFouyyvw2lDo1Fqk9korKyHzff+caHoZdiMy8LoViPXeBpe85avJL7PkLOManx5OLva0ZpjgNXFIDwa6vvUFyFTpNmP7ronsXA/sMJih4sxuOwbkfpmKRY+fQK9UdVHwkQgiIDTDmvrbBisl/y2J9rhIRRljg4S9hzyZ1C7bgnue/MrqLBfEcu57M9iWut6aNfVodvnBZ3osnYjx9Am2q3Ptpkd9UVTEv6d9+Qsw5uXTO55WOobgGnpSJUjx3egfs8byM5fiXwNJxqYirsd6x57FNk1x2Dp9VmmTB2UTQTkCPDotRxDDTKQnjpSTigkn283Y49xFPIL78EMzl3OZ5PGcjzTdM5dpvd91NdcwbT0CQnvGEMgAsQkHBTZPP4cOk9dQHaWGslyQuKVf1yIwalS0zENDai3nJcrSflEYAAC/fiosx2O7AxMTJa7WoeqUGUWoZ5ZUDF3QuhJ2HGq85y4xOY/6sQpxyRkTZS17jDlEydLOfHEYSLfU9ERXo/UfxzESrUnZqkuRGVtCxyeCaPb4ORU+A1TToLyiYA8AWGZ3AEu9UPUrsz2xBaF2GPtIOLhs3HP7HSo4AkxcdfjH7WrofbE29WFlahtcSR8vFIYE3KW8pYZcsbtCNVIm/ED7LN74pW2Ukx65ydYXtUMp9fgQkpSBhEYAgKelU1W2iwU7mv1xCxP4rFJFqxfvhstAZs1A9THn0FdxXa0Fv07cjOEWKdn1po1CTMK98IuxkFdsD02Ce+sfwhVLRcGUJgAp5nkDxD40190BFysx1zKOCxlBut/e9IapjOfDVTTY2Y6jmM5hjbmCjxDRxICZIMSGEqTUdtWD2szFDFO+1Nmtl8ZoJazzKzTMOQYmDVBDFfOBmlmOegLogrJEzOQjQ5Yuy560oNWSgqIgHICyWpkZQOtVjucA5bqxWnjo5j7OLDlvx7FXM+Gj3yxZEzMmgS0tqMrmpmrvMKYPUPOcoiHTtzI4eSUqkM2fuQkKZ8IDDkB3oHm7WvdjrJxO4qmpAx5FfGskJyl4tH13LCrLkNjwO0/3sB4DnKnjwfEq/wF3w6jVz3tNHpJ0PfVEnA/EDEdJY2eW328isSNRzXyc2+GnPvjHUdRNk+Dma+lYVdTGEfpudldXdIYdC+wZ1Mp/w5MT0lwdyENWMit1aUyCZ3ue4fptRpWYGhlfV4Qfa3MUKBlRaZOTyzyCusyPcw4rogZ2npEKZf9BKsqmMo4nZm5c7yF6TuYANlgMBHp8cfMol/AuIL9rK3PG0B0xx8nF5lYlzdLWkRIi3bLMXAPM1OXXIzSxfosVUwrsVvGXKyvbT8rmBypXHBlsX8sZ4MBOzpyQrHf/aHrgctuYSZ9AeMAJvCCVscMZqvfeQpV9VmZ2aBjWq8MprICvYlZBgymD107Y1UT2eAAI+eyM4tJzwo4j/0hh+kMZmb1OU/GXFYDywE8F+dLzGpY6rZVnz16y7q//RfxK8xuMTF9wVSPPMe0OgMzWxPrEi9ngyGvwqW3O3rXNvT9WRCQe7PeZ9EWqjMxCcjZYIIHIRLTGKjXRIAIRE+AnGX0zKgEESACCUiAnGUCDjp1mQgQgegJkLOMnhmVIAJEIAEJkLNMwEGnLhMBIhA9AXKW0TOjEkSACCQgAXKWCTjo1GUiQASiJ0DOMnpmVIIIEIEEJEDOMgEHnbpMBIhA9ATIWUbPjEoQASKQgARCHndMQAbUZSJABIhACIHgR7+vk0oEn5SeozQRIAJEIJEJ0DI8kUef+k4EiIBiAuQsFaMiQSJABBKZADnLRB596jsRIAKKCZCzVIyKBIkAEUhkAv8DWufu5OBMq28AAAAASUVORK5CYII="></p>
<p>Calculate the relative atomic mass of titanium to two decimal places.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the number of protons, neutrons and electrons in the \({}_{22}^{48}{\text{Ti}}\) atom.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the full electron configuration of the \({}_{22}^{48}{\text{Ti}}\)<sup>2+</sup> ion.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why an aluminium-titanium alloy is harder than pure aluminium.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the type of bonding in potassium chloride which melts at 1043 K.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A chloride of titanium, TiCl<sub>4</sub>, melts at 248 K. Suggest why the melting point is so much lower than that of KCl.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Formulate an equation for this reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>one</strong> disadvantage of using this smoke in an enclosed space.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>The emission spectrum of an element can be used to identify it.</p>
</div>
<div class="specification">
<p>Elements show trends in their physical properties across the periodic table.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the first four energy levels of a hydrogen atom on the axis, labelling n = 1, 2, 3 and 4.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the lines, on your diagram, that represent the electron transitions to n = 2 in the emission spectrum.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why atomic radius decreases across period 3, sodium to chlorine.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why the ionic radius of K<sup>+</sup> is smaller than that of Cl<sup>−</sup>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Copper is widely used as an electrical conductor.</p>
<p>Draw arrows in the boxes to represent the electronic configuration of copper in the 4s and 3d orbitals.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[1]</div>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Impure copper can be purified by electrolysis. In the electrolytic cell, impure copper is the anode (positive electrode), pure copper is the cathode (negative electrode) and the electrolyte is copper(II) sulfate solution.</p>
<p>Formulate the half-equation at each electrode.</p>
<p><img src="data:image/png;base64,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"></p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline where and in which direction the electrons flow during electrolysis.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>Trends in physical and chemical properties are useful to chemists.</p>
</div>
<div class="specification">
<p>The Activity series lists the metal in order of reactivity.</p>
<p style="text-align: center;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJ4AAABBCAYAAAAg7R2BAAAQxElEQVR4Ae1dC1RU17n+ZhiuaRXwekuaIVhtYvCRqK0N9bHwZhAEjLkqJpjoUmKxGANGIRZi0lgw9W0TNQY0vvAmViMkPtJoBSEDhigRe298AT7SgvJoQxOBIU29zMy+a5/XnHNmzswZO6NEzqzFOo/9739/+9v/2a+Zw6cjhBBoH42B28yA/jaXpxWnMcAwoAWeFgh3hAEt8O4I7VqhbgPPXpeOeJ0OOp0Ogdkfo8UVX/Yy7IoNdG/jKp+He21tbR4sRMkiDLqwV5Dfbhcl8qcduPz2IAansg1v6+2xBXVH5iB2Sy2s3ma9rfZynBwnipz5D5zbwGOLNaJfRD9gw3EcdNGg9ssHsOV/H4DJ6FuQ06ZN897hOBOiWj9C0WdfO+e1V+PEjhsYO7aXc9q/eqf9IHZNew81Bt2/6sm/+Z1wBiPiuasgzauQFqIiFHyITlVpvWZn4AUccdGgHbhirkKfN5fg5z4EVV9fj4qKChw6dMg7r33G44m0BlSWnnPqnekDsnzs68gc54fA8w6lZg1AVeDhvihMWuyiQWkvsioWKVH/FJFpR8fxWITpZmDB0WLsyghjhzfdcDz82h9RbnE1DIqyA9i9ezdzgz9KU91d9cd/Top00TuzD8igJyLxH07ZW1B3NB3Z49npgk4Xj+jNJVKclnKUbI5GNDftkNi05+OloelYb7WiZf5QBCoNW+35yA4MxL0vvoG1M/tIpyb2i6jeIvIf/RLSj9ahVYzVfhGf7ZmBZ8PYqY9OF4Z7X9yB/IvtYivYm/a55twlzn+w0w8GM3cevwvlkiayMu0ZGPiyYwqjBq8ElfOFusDDDxEZHwn8Tz0uiUDRXuS1xDhM6Wtw9owivL2+AteeqwXdKrQ1pmLKsUTMyKuWEuoiJx9whw8fhldzPQQgePR0ZOIyLrb8n8Mz94AkjZaHXQvqtiRg+FQLGtdeQxeDcyb+6+R0RE/ZhKJOWtlGnNk8B5Or5+LVDhtXl8kYs28KZr13GdaQNKytzUOWwQDjtlp0uRm2dKFWtL53EdeWNYHY6nD8mVEw2qtx4BejMe7UU5jfeBOEdMGS909Ypk5FbFEDN2dsxJk1CYgqeQwJ1dSGgNiOYZ/+N0hfuIvDCdgbc5E6MBlL9Zthplgta5FZm4SJGYdwLsgVTvGM9B4MeiwecSXHUHRZ3JE04ExxNZA5EYl0OFaF10G94hndQFb62GrTSByMxLitltja8kiWYTpJq/2WM28ndfmjiKm4lZC2PJJtBDFklZFmYiPtJTHEiJ+xaYLzq6RsSTBB3E5itgk3nU7MZjPd0Bb+CgoKnGycbthKyc4YA+f7r6Q0sx+DuYszpPUIf6GUfEU4DMaXSV6bjcGdZYggIwrrCW/LZGHqamDrbSslO6J7Sfw5lS+yl/gRG0o44hO6OK6SRLzSNPa+wbBUhHO4jE9C2Pbh87aTS1sfJODrxhQh8++EU5aHq2vo6iryJQ+RycOXLfPH28jxCveVT1T2eABC4hH/QjkOflLPPoVCL9JPMailCaEIfygUOH8VNW6GW7634/Nu3LiRP1V5DEXkpJ+idf9JVDK9Mz/MjoQUqQ0dpw9gj3Ukoob/EJI+O2gwhjwGtF5pxtf6wRgZG4qWnAKsOHEIuYdqPfbYKoECYHuTFuMgPGz8N1E2A/r0H4wJ1uPsvDokDeu6zsE89gIO5eYiNzcX722ORszQfJTwuezVqCxqAIYPwrAgvlkNCJ5YimZSiLwh9/CWykf9GCQsGIEbyw6hiFlIfoOm4t3YMGYu0sZR9lTiVS5BSOERCjeUTuwYIGlQ++UP8VZqIpJ8vBqSLyjOnj0LuthQ/9Ej+OfTkVlxhB0y7NX4eOsMjjixly789c/1TosQsYX1bD0u2MPx6CunUZP/Pdx/IA3LE4fhXoX5lTivV+ctq5HeN4CbC7NzuABxUIFOCUYiLDgaiRXforV/f9R9tQR5p55DHP6MmmudXhWnbNwb98fPRSa/kLRX4djWcwhNfhyJfUSh4hGvcgl8isgbf0vpaBA1aBuulFxC1IyfIFTJ/Bbu096uvV06WaZu5L2gR9fi3vnyh9ixYKqUOMZBIO57YCDc7QIZRg7EYIYhI4ZOy0XqxmYQ0ommT+djSUsG0ieudUy4PYJyYxC3E2YbYedudP4m/J2BOe4HsNetwOI0O0IL69FlXou8efOQm5uAcMtVnHfj9paSQuKRwC0k2y4fQKF5ChLHD5SOCB7wqinXi8ATDbfmP6Lkv59EUoSK7lsNCs5G3tvxWb0OPKF3LkbRkUsYEy0jjnEcwDxIsw1nUXn+b9KNX8sl1FUAoQ+FuXiweiNs3Kt4PmUMjC1XpYsYHrDq4wA8Gh8Jw8dnUN4sWgzBis7PZiFaNwPpdd+g8/olnMdQ2ZTgJiw3Ohwl6SMRlTTAaSrDfgkQhrDtdRCtCx35nM5YTNjwPvL3H0VJXIKondXgFS9MnJwLN7wLPK5Bv353O7amjkeUl7mFUl2c0NUrXcXSz4ABAyQWDQ0N+PzzzyX33F9wvXPlO1h88mkRcbJcIYlIefMe1MxahuSTLWzwdR7FjgXZWB+1DptmRsBgL8POCffg3hc/cGyxWCpQcqQGrSnP4Dn68AUNxuDxAYxzfUcrWtW1MAADgmNWY/+sd7Dyle3Y10SDz4rO2hV4LfMALq5egtwhvbkH5CCKdp7ARcb3N2j+dCFeyagWTRWCMeiJRVg68A3krihl7eznYN5xECWmLKYueieckpktR44BwWPnYdWY7fh17k0Ynxonamc1eNV1Rl6GDtugi6r/HSaTq15E1rBeXJaXlyMnJwc3btyQzOnosFNQUOBl4HG9c1o9DAljRcTJARkx5PljOH84COEv/QiBdJ8uaBN+P+4AzB8uRhKd1+hj8It33kVe399gVjA3DwvOQE6/Tdi7/AmMoAzqx2DS0hgMnj8UASHpyJVsR8jLlF3rIzH9rY9wJPJ9bAvvBZ0uEEExf0F9WgXM2aPZHjfkWWSceAFzqybjkQA6BxyDiWWxmL7/VWQZHD2l/v5FWFlUgDVdc1m7gATMtK9G4bvpXF3kOB15Jaj6TMbU2QMA43TMn/SAdJhVg1fizPWFji54XSfd2bv0+2H66abw7iw5d0HpXvZ4d0GNtSp0Cwa0wOsWzdDzQGiB1/PavFvUWAu8btEMPQ+EFng9r827RY21wOsWzdDzQGiB1/PavFvUWAu8btEMPQ+EFng9r827RY3dBx79uTT9qXX0BuFXrhLU3M+56RfQ9Les7BfSjyK65O8SM+1CY0DOgPvA463L1yP9Lc8/WdcPyUMxYX/Kw2fVjhoDrhjwGHik1YB+ETdhePm3SP/Mi3ddXZWm3dMY4BjwGHjUrldGATYll6NoaYHrIZdzpg21WlypZUBV4MEQgcSVv0JKZbaqIVdt4Zpdz2VAXeDRn5yFZ+G13/9UG3J7bqz4tOaqA8+O3rj/qTy8pWLI9SlCzdldyYDqwGNqr4/ENNGQ66t3m+5KZrVKuWXAu8CTDbkpleJ3Qd2WoyVqDEgYcPW2h8TA+YIfcqPx5KpvEOVsoN3RGPDIgNc9HuORH3L/Uo5Kqy/frPWIVzO4Sxi4tcDjh9yNkW5fiL5LONKq4QcGtLfM/ECq5tIzA7fc43l2rVloDCgzoAWeMjdaih8Z0ALPj+RqrpUZ0AJPmRstxY8MaIHnR3I118oMaIGnzI2W4kcGtMDzI7maa2UGtMBT5kZL8SMD6gNPkG3qhi/z8NicNBr8yJwn15ZyHF04FYvr1P2HTE/u/JYux8lxqSgh5iMgqgOPalrsrUjFytyvXCrn+AjPXeLGio6qFfhlXi/pv7jtdrVzgVMfg5TSLnStm+DXr0NVBt4XKN+xBxWZTyHt6ccxYf1WrOjuT3K3a2QNkIQBZQkMUYpYZMOd4EiHmRxbPowYGYGUR8iw5bvItsVGmeiHyK+bU15kxY2JI0kisOK47erM1riX7KSYGIxGEpq5neRdaJOY2q4XkkKhHlTsJY6Y3iwm5g5eGaaLWC7ksXXjxWBM2STtSC35UhCYcYjEsMIzkiIEERUj9b3hRZJspPYOURrf4KRldpKmk5kkK8rA1tmYTJI+qlPE2cZxyWL+Byva4iSKIxOAIYSowStmgP6rVw8feSGcGowcjO00+SC5NzHM2U1KmQZqJrX5I9gglKjNeCiOS/ZH4Nmu55AUQwQZtuoTcoGJIRajwfA8ybl+ky3ZspesGRkssqGkbiJLx/YiguINb7PlHKeA00maih8nJvAqO0oKOOK68zYQOLM1fEI+6bARn+EknaRxfyRhgnsf+1BYLi4icwQ1Ix4Dj5tGEKuSxD8sUvUgHj+rkCTYqOGVz8odPQeeDAjNx4JxPJ0OCSRRAzIFyCScZIW7u/R94ClJWolJZOWwBCknAaD0YXPdGIKxqDcTNag4mTnnG13MI03wHU55ELEQxP55+S8RTnl7e5SZEvsTV1LMq/g+e+5xjkcXFfvLRiIqdoQw2dRHTMfTMWdFiwxWasg64VGYwsQ/h+dkpCSD+x26aC9G8d4OOERTeBwsRuueUhxsByPB1NX1WyQ3bmekm15/fRm2ZwzB4AVf8BmgD49CbNRBbNv1B5R/sMZJQVEwvJUTH+Jk2y5UptfxICb8rh2kOAUmvQpdBE8yU6rwOpfjIfA6cLWiGCX4E8rjQx2SRwGxmFdmBdtYzk5vhe/blce6PgZhgvwn/df9IZKgAtW5mNkXQY8sR37HfbBYAtBk+hCntz7oEC/pMxNZR4/j8JAyHN24DOmP9IVEStQHlfEJTh/gAH27UIXMlEe8Mizu37lo34MdCxsYOcxrqUOkegf0H/b8YDFWFCZjQWqgzG33vKT/jsO47Tyc6iLApVLpi5BaMRc5199Abjjfe3+Bj38lUY8Fgkx4PIX+bcU6qiW7dznys+Mx8XoZrq0zobfg0/sTn+L0vnjnHIzM1MvYUHoObT/iZKbyHTonnvE6u3TT41kZdcMNSHUW2aB+GDDfR8v7J3HC/mNOGumKTJmxFY1XZA3mjOH23OHwtlbVoEbSSTfizKr+0DGbz9+yeIePkk4Z7F+jrdWmjFP/MEbPXo1nZwWDCu+JNX2VMymk+BAnOyVqZVQoHa1AH65B0DFyVTcVQMhvu5GZUoVX7o/O4BU/7ieHdEFhqZrpWMnRVe3sYBKa+T637dBM6vbFEBPdbujGq1oW42SSVHVDtCiIIzEljayGre0CObWK2yLi6sEuLuKIiVkpUgK7iKUmhywZGSxo3zoWIJ2k/ct2qR4uw7nS4oK4XNXeCk5mK4VZbTvqI1+hy3Ha5IsLPj4se8k6ZkuG1S8W6/K6WoVL8fJOHEfFwGMB8Q3iyCA5k4N02scrJEUrB96+wOP31ORHYevHef/NMGcdyfm0yREYtgvkdL6JfWCYhyaZJO0+Rk7tMxHHareTNH2aQ9Y801sQdAbdH3u3itumoUv/s6R0CbdfKJQvZk858JhAlu0T3hpOWp5sH4/uG+afUsRZ1SXdTnEg5kWV0x1bT0KiCl4FW/bEzy/70G59FB7+YhuuefkVjCYp5WJ4uotuuZnjeVNLKzqOxyIwcB7Sa3i9WaowuBgrFj6ExCdHCVsxar3ymq1q7TW77xYDPgo8Kie5CZUFFnTG0q0Fuk3RBwPeHoYHKnZi7+i+3y1WNLR+Z8DPQ63f8WsFfEcZ8FGP9x2tvQb7jjGgBd4do75nF/z/U6NFz1Ygn7EAAAAASUVORK5CYII="></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the general increasing trend in the first ionization energies of the period 3 elements, Na to Ar.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why the melting points of the group 1 metals (Li → Cs) decrease down the group.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State an equation for the reaction of phosphorus (V) oxide, P<sub>4</sub>O<sub>10</sub> (s), with water.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the emission spectrum of hydrogen.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the strongest reducing agent in the given list.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A voltaic cell is made up of a Mn<sup>2+</sup>/Mn half-cell and a Ni<sup>2+</sup>/Ni half-cell.</p>
<p>Deduce the equation for the cell reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The voltaic cell stated in part (ii) is partially shown below.</p>
<p>Draw and label the connections needed to show the direction of electron movement and ion flow between the two half-cells.</p>
<p><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">e.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>Alkenes are widely used in the production of polymers. The compound <strong>A</strong>, shown below, is used in the manufacture of synthetic rubber.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) State the name, applying IUPAC rules, of compound <strong>A</strong>.</p>
<p>(ii) Draw a section, showing three repeating units, of the polymer that can be formed from compound <strong>A</strong>.</p>
<p>(iii) Compound <strong>A</strong> is flammable. Formulate the equation for its complete combustion.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Compound <strong>B</strong> is related to compound <strong>A</strong>.</p>
<p><img 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" alt></p>
<p>(i) State the term that is used to describe molecules that are related to each other in the same way as compound <strong>A</strong> and compound <strong>B</strong>.</p>
<p>(ii) Suggest a chemical test to distinguish between compound <strong>A</strong> and compound <strong>B</strong>, giving the observation you would expect for each.</p>
<p>Test:</p>
<p>Observation with <strong>A</strong>:</p>
<p>Observation with <strong>B</strong>:</p>
<p>(iii) Spectroscopic methods could also be used to distinguish between compounds <strong>A</strong> and <strong>B</strong>.</p>
<p>Predict one difference in the IR spectra <strong>and</strong> one difference in the <sup>1</sup>H NMR spectra of these compounds, using sections 26 and 27 of the data booklet.</p>
<p>IR spectra:</p>
<p><sup>1</sup>H NMR spectra:</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A sample of compound <strong>A</strong> was prepared in which the <sup>12</sup>C in the CH<sub>2</sub> group was replaced by <sup>13</sup>C.</p>
<p>(i) State the main difference between the mass spectrum of this sample and that of normal compound <strong>A</strong>.</p>
<p>(ii) State the structure of the nucleus and the orbital diagram of <sup>13</sup>C in its ground state.</p>
<p><img 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" alt></p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a 1s atomic orbital and a 2p atomic orbital.</p>
<p><img src="data:image/png;base64,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" alt></p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
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