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</div><h2>SL Paper 1</h2><div class="question">
<p class="p1">What happens when sodium is added to water?</p>
<p class="p1">I. A gas is evolved</p>
<p class="p1">II. The temperature of the water increases</p>
<p class="p1">III. A clear, colourless solution is formed</p>
<p class="p1"> </p>
<p class="p1">A. I and II only</p>
<p class="p1">B. I and III only</p>
<p class="p1">C. II and III only</p>
<p class="p1">D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which series is arranged in order of <strong>increasing </strong>radius?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>\({\text{F}} < {\text{C}}{{\text{l}}^ - } < {\text{Cl}}\)</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\({\text{Rb}} < {\text{K}} < {\text{Na}}\)</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\({\text{A}}{{\text{l}}^{3 + }} < {\text{M}}{{\text{g}}^{2 + }} < {\text{N}}{{\text{a}}^ + }\)</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>\({{\text{I}}^ - } < {\text{B}}{{\text{r}}^ - } < {\text{C}}{{\text{l}}^ - }\)</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statements are correct?</p>
<p class="p1">I. Fluorine will react with potassium chloride solution to produce chlorine.</p>
<p class="p1">II. Iodine will react with sodium chloride solution to produce chlorine.</p>
<p class="p1">III. Bromine will react with lithium iodide solution to produce iodine.</p>
<p class="p1">A. I and II only</p>
<p class="p1">B. I and III only</p>
<p class="p1">C. II and III only</p>
<p class="p1">D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which is a characteristic property of sodium oxide?</p>
<p class="p1">A. It turns moist blue litmus paper red.</p>
<p class="p1">B. It turns moist red litmus paper blue.</p>
<p class="p1">C. When it dissolves in distilled water it forms a solution with pH less than 7.</p>
<p class="p1">D. It reacts with magnesium metal.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">An element is in group 4 and period 3 of the periodic table. How many electrons are in the highest occupied energy level of an atom of this element?</p>
<p class="p1">A. 3</p>
<p class="p1">B. 4</p>
<p class="p1">C. 12</p>
<p class="p1">D. 14</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statement describes the trends of electronegativity values in the periodic table?</p>
<p class="p1">A. Values increase from left to right across a period and increase down a group.</p>
<p class="p1">B. Values increase from left to right across a period and decrease down a group.</p>
<p class="p1">C. Values decrease from left to right across a period and increase down a group.</p>
<p class="p1">D. Values decrease from left to right across a period and decrease down a group.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which properties of the alkali metals decrease going down group 1?</p>
<p class="p1">A. First ionization energy and reactivity</p>
<p class="p1">B. Melting point and atomic radius</p>
<p class="p1">C. Reactivity and electronegativity</p>
<p class="p1">D. First ionization energy and melting point</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which pair of elements has the greatest difference in electronegativity?</p>
<p class="p1">A. Cs and F</p>
<p class="p1">B. Cs and Cl</p>
<p class="p1">C. Cs and Br</p>
<p class="p1">D. Cs and I</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which property <strong>decreases </strong>down group 7 in the periodic table?</p>
<p class="p1">A. Melting point</p>
<p class="p1">B. Electronegativity</p>
<p class="p1">C. Atomic radius</p>
<p class="p1">D. Ionic radius</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which is the best definition of <em>electronegativity</em>?</p>
<p class="p1">A. Electronegativity is the energy required for a gaseous atom to gain an electron.</p>
<p class="p1">B. Electronegativity is the attraction of an atom for a bonding pair of electrons.</p>
<p class="p1">C. Electronegativity is the attraction between the nucleus and the valence electrons of an atom.</p>
<p class="p1">D. Electronegativity is the ability of an atom to attract electrons from another atom.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statements about atomic structure and the periodic table are correct?</p>
<p class="p1">I. An element in group 2 has 2 electrons in its valence (outer) energy level.</p>
<p class="p1">II. An element in period 3 has electrons in 3 energy levels.</p>
<p class="p1">III. The element in group 2 and period 3 has an atomic number of 12.</p>
<p class="p1">A. I and II only</p>
<p class="p1">B. I and III only</p>
<p class="p1">C. II and III only</p>
<p class="p1">D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>The electronegativities of four elements are given in the table.</p>
<p><img src="images/Schermafbeelding_2016-08-15_om_17.45.26.png" alt="M14/4/CHEMI/SPM/ENG/TZ1/09"></p>
<p>Which statement is correct?</p>
<p>A. W and X form an ionic compound.</p>
<p>B. W and X form a covalent compound.</p>
<p>C. Y and Z form an ionic compound.</p>
<p>D. Y and Z form a covalent compound.</p>
</div>
<br><hr><br><div class="question">
<p>Which pair of elements shows the greatest difference in electronegativity?</p>
<p>A. Mg and O</p>
<p>B. Li and F</p>
<p>C. K and F</p>
<p>D. Li and I</p>
</div>
<br><hr><br><div class="question">
<p class="p1">What is the definition of the term <em>first ionization energy</em>?</p>
<p class="p1">A. The energy released when one mole of electrons is removed from one mole of gaseous atoms.</p>
<p class="p1">B. The energy required to remove one mole of electrons from one mole of gaseous atoms.</p>
<p class="p1">C. The energy released when one mole of gaseous atoms gains one mole of electrons.</p>
<p class="p1">D. The energy required to add one mole of electrons to one mole of gaseous atoms.</p>
</div>
<br><hr><br><div class="question">
<p>The horizontal axis of the bar chart represents the elements of period 3 from sodium to chlorine (excluding silicon). What could the vertical axis represent?</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-15_om_17.42.50.png" alt="M14/4/CHEMI/SPM/ENG/TZ1/08"></p>
<p>A. Melting point of the element</p>
<p>B. Electronegativity of the bonded atom</p>
<p>C. Ionic radius of the most common ion</p>
<p>D. First ionization energy in the gaseous state</p>
</div>
<br><hr><br><div class="question">
<p>Which combination of properties best describes sodium oxide, \({\text{N}}{{\text{a}}_{\text{2}}}{\text{O}}\)?</p>
<p><img src="images/Schermafbeelding_2016-08-09_om_07.51.14.png" alt="M15/4/CHEMI/SPM/ENG/TZ2/08"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">The electronegativities of four different elements are given below (the letters are not their chemical symbols).</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-27_om_06.36.16.png" alt="N10/4/CHEMI/SPM/ENG/TZ0/10"></p>
<p class="p1">Based on this information which statement is correct?</p>
<p class="p1">A. W is a non-metal.</p>
<p class="p1">B. W and X form an ionic compound.</p>
<p class="p1">C. Y is a metal.</p>
<p class="p1">D. Y and Z form a covalent compound.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which oxides produce an acidic solution when added to water?</p>
<p class="p1">I. <span class="Apple-converted-space"> </span>\({{\text{P}}_{\text{4}}}{{\text{O}}_{{\text{10}}}}\)</p>
<p class="p1">II. <span class="Apple-converted-space"> </span>MgO</p>
<p class="p1">III. <span class="Apple-converted-space"> </span>\({\text{S}}{{\text{O}}_{\text{3}}}\)</p>
<p class="p1"> </p>
<p class="p1">A. <span class="Apple-converted-space"> </span>I and II only</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>I and III only</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>II and III only</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which oxides are acidic?</p>
<p class="p1">I. <span class="Apple-converted-space"> </span>\({{\text{P}}_{\text{4}}}{{\text{O}}_{{\text{10}}}}\)</p>
<p class="p1">II. <span class="Apple-converted-space"> </span>\({\text{S}}{{\text{O}}_{\text{3}}}\)</p>
<p class="p1">III. <span class="Apple-converted-space"> </span>\({\text{N}}{{\text{a}}_{\text{2}}}{\text{O}}\)</p>
<p class="p1"> </p>
<p class="p1">A. <span class="Apple-converted-space"> </span>I and II only</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>I and III only</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>II and III only</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">What happens when magnesium metal reacts with chlorine gas?</p>
<p class="p1">A. Each magnesium atom loses two electrons and each chlorine atom gains two electrons.</p>
<p class="p1">B. Each magnesium atom gains one electron and each chlorine atom loses one electron.</p>
<p class="p1">C. Each magnesium atom loses two electrons and each chlorine atom gains one electron.</p>
<p class="p1">D. Each magnesium atom gains one electron and each chlorine atom loses two electrons.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statement concerning electronegativity is correct?</p>
<p class="p1">A. Electronegativity increases from left to right across a period.</p>
<p class="p1">B. Metals generally have higher electronegativity values than non-metals.</p>
<p class="p1">C. Electronegativity increases on descending a group.</p>
<p class="p1">D. Noble gases have the highest electronegativity values.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which series is correctly arranged in order of <strong>decreasing </strong>radius?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>\({\text{A}}{{\text{l}}^{3 + }} > {\text{M}}{{\text{g}}^{2 + }} > {\text{N}}{{\text{a}}^ + } > {{\text{F}}^ - }\)</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\({{\text{F}}^ - } > {\text{N}}{{\text{a}}^ + } > {\text{M}}{{\text{g}}^{2 + }} > {\text{A}}{{\text{l}}^{3 + }}\)</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\({{\text{F}}^ - } > {\text{A}}{{\text{l}}^{3 + }} > {\text{M}}{{\text{g}}^{2 + }} > {\text{N}}{{\text{a}}^ + }\)</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>\({\text{N}}{{\text{a}}^ + } > {\text{M}}{{\text{g}}^{2 + }} > {\text{A}}{{\text{l}}^{3 + }} > {{\text{F}}^ - }\)</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statements about the periodic table are correct?</p>
<p class="p1">I. The elements Mg, Ca and Sr have similar chemical properties.</p>
<p class="p1">II. Elements in the same period have the same number of main energy levels.</p>
<p class="p1">III. The oxides of Na, Mg and P are basic.</p>
<p class="p1">A. I and II only</p>
<p class="p1">B. I and III only</p>
<p class="p1">C. II and III only</p>
<p class="p1">D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>Which element is a metalloid?</p>
<p>A. Co</p>
<p>B. As</p>
<p>C. Cs</p>
<p>D. Es</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which property <strong>increases </strong>down group 1?</p>
<p class="p1">A. First ionization energy</p>
<p class="p1">B. Melting point</p>
<p class="p1">C. Reactivity</p>
<p class="p1">D. Electronegativity</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statements are correct for the halogens F to I?</p>
<p class="p1">I. Melting point increases</p>
<p class="p1">II. First ionization energy increases</p>
<p class="p1">III. Ionic radius increases</p>
<p class="p1">A. I and II only</p>
<p class="p1">B. I and III only</p>
<p class="p1">C. II and III only</p>
<p class="p1">D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which combination of the characteristics of element X, a metal, and element Y, a non metal, is most likely to lead to ionic bonding?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-24_om_11.53.29.png" alt="M11/4/CHEMI/SPM/ENG/TZ1/12"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">Element X is in group 5 and period 4 of the periodic table. Which statement is correct?</p>
<p class="p1">A. X has 5 occupied energy levels.</p>
<p class="p1">B. X can form ions with 3– charge.</p>
<p class="p1">C. X is a transition element.</p>
<p class="p1">D. X has 4 valence electrons.</p>
</div>
<br><hr><br><div class="question">
<p>Which element is in the p-block?</p>
<p>A. Pb</p>
<p>B. Pm</p>
<p>C. Pt</p>
<p>D. Pu</p>
</div>
<br><hr><br><div class="question">
<p>Which element is a lanthanide?</p>
<p>A. Hf</p>
<p>B. Tb</p>
<p>C. U</p>
<p>D. Y</p>
</div>
<br><hr><br><div class="question">
<p>Which property increases down Group 1, the alkali metals?</p>
<p>A. Atomic radius</p>
<p>B. Electronegativity</p>
<p>C. First ionization energy</p>
<p>D. Melting point</p>
</div>
<br><hr><br><div class="question">
<p>Which period 3 oxide, when added to water, forms an acidic solution?</p>
<p>A. \({\text{S}}{{\text{O}}_{\text{3}}}\)</p>
<p>B. MgO</p>
<p>C. \({\text{N}}{{\text{a}}_{\text{2}}}{\text{O}}\)</p>
<p>D. \({\text{A}}{{\text{l}}_{\text{2}}}{{\text{O}}_{\text{3}}}\)</p>
</div>
<br><hr><br><div class="question">
<p>Which statement is correct for the halogens \({\text{(F}} \to {\text{I)}}\)?</p>
<p>A. Electronegativity decreases from fluorine to iodine.</p>
<p>B. Atomic radius decreases from fluorine to iodine.</p>
<p>C. First ionization energy increases from fluorine to iodine.</p>
<p>D. Reactivity of the element with sodium increases from fluorine to iodine.</p>
</div>
<br><hr><br><div class="question">
<p>Which metal has the strongest metallic bond?</p>
<p>A. Li</p>
<p>B. Na</p>
<p>C. K</p>
<p>D. Rb</p>
</div>
<br><hr><br><div class="question">
<p>Which properties decrease down both group 1 <strong>and</strong> group 7?</p>
<p>I. Melting point</p>
<p>II. First ionization energy</p>
<p>III. Electronegativity</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>Which properties <strong>decrease</strong> down group 1?</p>
<p>I. Melting point</p>
<p>II. Atomic radius</p>
<p>III. First ionization energy</p>
<p> </p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p>Which increase across a period from left to right?</p>
<p><img src="images/Schermafbeelding_2018-08-10_om_06.17.52.png" alt="M18/4/CHEMI/SPM/ENG/TZ2/07"></p>
</div>
<br><hr><br><div class="question">
<p>Which equation represents the first electron affinity of chlorine? </p>
<p>A. Cl(g)+e<sup>-</sup>→ Cl<sup>-</sup>(g)<br>B. \(\frac{1}{2}\)Cl<sub>2</sub>(g) + e<sup>-</sup> → Cl<sup>-</sup>(g) <br>C. Cl<sup>+</sup>(g) + e<sup>-</sup> → Cl(g) <br>D. Cl(g) → Cl<sup>+</sup>(g) + e<sup>-</sup></p>
</div>
<br><hr><br><div class="question">
<p>Which describes the oxide of sodium, Na<sub>2</sub>O?</p>
<p><img src="images/Schermafbeelding_2018-08-09_om_11.47.12.png" alt="M18/4/CHEMI/SPM/ENG/TZ1/07"></p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which combination is correct for the properties of the alkali metals from Li to Cs?</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-22_om_18.52.18.png" alt="N12/4/CHEMI/SPM/ENG/TZ0/08"></p>
</div>
<br><hr><br><div class="question">
<p>Which statement is correct?</p>
<p>A. Atomic radius decreases down group 17.</p>
<p>B. First ionization energy decreases down group 1.</p>
<p>C. Atomic radius increases across period 3 from Na to Cl.</p>
<p>D. First ionization energy decreases across period 3 from Na to Cl.</p>
</div>
<br><hr><br><div class="question">
<p>Which trends are correct across period 3 (from Na to Cl)?</p>
<p style="padding-left: 120px;">I. Atomic radius decreases<br>II. Melting point increases<br>III. First ionization energy increases</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which statement is correct for all elements in the same period?</p>
<p class="p1">A. They have the same number of electrons in the highest occupied energy level.</p>
<p class="p1">B. They have the same chemical reactivity.</p>
<p class="p1">C. They have the same number of occupied energy levels.</p>
<p class="p1">D. They have the same number of neutrons.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">The number of electrons in the valence shell of elements A and B, are 6 and 7 respectively. What is the formula and type of bonding in a compound formed by these elements?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>\({{\text{A}}_{\text{2}}}{\text{B}}\), covalent</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>\({\text{A}}{{\text{B}}_{\text{2}}}\), covalent</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>\({{\text{A}}_{\text{2}}}{\text{B}}\), ionic</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>\({\text{A}}{{\text{B}}_{\text{2}}}\), ionic</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which property generally <strong>decreases </strong>across period 3?</p>
<p class="p1">A. <span class="Apple-converted-space"> </span>Atomic number</p>
<p class="p1">B. <span class="Apple-converted-space"> </span>Electronegativity</p>
<p class="p1">C. <span class="Apple-converted-space"> </span>Atomic radius</p>
<p class="p1">D. <span class="Apple-converted-space"> </span>First ionization energy</p>
</div>
<br><hr><br><div class="question">
<p class="p1">Which physical property of elements is represented by <em>y </em>on the graph below?</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-03_om_12.55.54.png" alt="N11/4/CHEMI/SPM/ENG/TZ0/07"></p>
<p class="p1">A. First ionization energy</p>
<p class="p1">B. Ionic radius</p>
<p class="p1">C. Atomic radius</p>
<p class="p1">D. Electronegativity</p>
</div>
<br><hr><br><div class="question">
<p>Which oxide dissolves in water to give a solution with a pH below 7?</p>
<p>A. MgO</p>
<p>B. Li<sub>2</sub>O</p>
<p>C. CaO</p>
<p>D. P<sub>4</sub>O<sub>10</sub></p>
</div>
<br><hr><br><div class="question">
<p>Which oxide, when added to water, produces the solution with the highest pH?</p>
<p>A. Na<sub>2</sub>O</p>
<p>B. SO<sub>3</sub></p>
<p>C. MgO</p>
<p>D. CO<sub>2</sub></p>
</div>
<br><hr><br><div class="question">
<p>Which solution forms when phosphorus(V) oxide, P<sub>4</sub>O<sub>10</sub>, reacts with water?</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
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<div class="column">Which periodic trend is described correctly?</div>
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<div class="column"><img 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" alt></div>
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