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</div><h2>SL Paper 3</h2><div class="specification">
<p>Amino acids are the building blocks of proteins.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the dipeptide represented by the formula Ala-Gly using section 33 of the data booklet.</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>Deduce the number of <sup>1</sup>H NMR signals produced by the zwitterion form of alanine.</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>Outline why amino acids have high melting points.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Students were asked to investigate how a change in concentration of hydrochloric acid, HCl, affects the initial rate of its reaction with marble chips, CaCO<sub>3</sub>.</p>
<p>They decided to measure how long the reaction took to complete when similar chips were added to 50.0 cm<sup>3</sup> of 1.00 mol dm<sup>−3</sup> acid and 50.0 cm<sup>3</sup> of 2.00 mol dm<sup>−3</sup> acid.</p>
<p>Two methods were proposed:</p>
<p>(1) using small chips, keeping the acid in excess, and recording the time taken for the solid to disappear</p>
<p>(2) using large chips, keeping the marble in excess, and recording the time taken for bubbles to stop forming.</p>
</div>
<div class="specification">
<p>A group recorded the following results with 1.00 mol dm<sup>−3</sup> hydrochloric acid:</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2018-08-09_om_15.47.04.png" alt="M18/4/CHEMI/SP3/ENG/TZ1/02.d"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Annotate the balanced equation below with state symbols.</p>
<p>CaCO<sub>3</sub>(__) + 2HCl(__) → CaCl<sub>2</sub>(__) + CO<sub>2</sub>(__) + H<sub>2</sub>O(__)</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>Neither method actually gives the initial rate. Outline a method that would allow the initial rate to be determined.</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>Deduce, giving a reason, which of the two methods would be least affected by the chips not having exactly the same mass when used with the different concentrations of acid.</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>State a factor, that has a significant effect on reaction rate, which could vary between marble chips of exactly the same mass.</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>Justify why it is inappropriate to record the uncertainty of the mean as ±0.01 s.</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>If doubling the concentration doubles the reaction rate, suggest the mean time you would expect for the reaction with 2.00 mol dm<sup>−3</sup> hydrochloric acid.</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>Another student, working alone, always dropped the marble chips into the acid and then picked up the stopwatch to start it. State, giving a reason, whether this introduced a random or systematic error.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Analytical techniques are very useful in determining molecular structures. A compound, <strong>X</strong>, has the empirical formula \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{4}}}{\text{O}}\).</p>
</div>
<div class="specification">
<p class="p1">The molecular formula of <strong>X </strong>is \({{\text{C}}_{\text{4}}}{{\text{H}}_{\text{8}}}{{\text{O}}_{\text{2}}}\). The information in the IR spectrum below can be used to help determine the structure of <strong>X</strong>.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-31_om_09.40.42.png" alt="M12/4/CHEMI/SP3/ENG/TZ1/A1.b"></p>
</div>
<div class="specification">
<p class="p1">The \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X </strong>shows three peaks with relative areas of 2:1:1.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the analytical technique that would most readily provide the additional data required to calculate the molecular formula of <strong>X</strong>.</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">(i) State what information about a molecule can be obtained from its IR spectrum.</p>
<p class="p1">(ii) Deduce the information obtained from absorptions <strong>A </strong>and <strong>B</strong>.</p>
<p class="p1"><strong>A</strong>:</p>
<p class="p1"><strong>B</strong>:</p>
<p class="p1">(iii) Comment on the absence of any major absorption in the region 1700–1750 \({\text{c}}{{\text{m}}^{ - 1}}\).</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Deduce what information can be obtained from these data.</p>
<p class="p1">(ii) Deduce the structure of <strong>X</strong>.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Infrared spectroscopy is commonly used as an analytical technique by inorganic, physical and organic chemists.</p>
</div>
<div class="specification">
<p class="p1">The IR spectrum, mass spectrum and \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of an unknown compound, <strong>X</strong>, of molecular formula \({{\text{C}}_{\text{5}}}{{\text{H}}_{{\text{10}}}}{{\text{O}}_{\text{2}}}\), are as follows.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-30_om_11.30.48.png" alt="M11/4/CHEMI/SP3/ENG/TZ2/A2.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">In the IR spectrum, identify the bond responsible for each of the absorptions labelled <strong>I</strong>, <strong>II </strong>and <strong>III</strong>.</p>
<p class="p1"><strong>I:</strong></p>
<p class="p1"><strong>II:</strong></p>
<p class="p1"><strong>III:</strong></p>
<div class="marks">[3]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">In the mass spectrum, deduce which fragments the <em>m/z </em>values at 102, 57 and 45 correspond to.</p>
<p class="p1"><em>m</em>/<em>z </em>=102:</p>
<p class="p1"><em>m</em>/<em>z </em>= 57:</p>
<p class="p1"><em>m</em>/<em>z </em>= 45:</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">Identify the peak at 11.5 ppm in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum.</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">State what information can be obtained from the integration traces in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum about the hydrogen atoms responsible for the peak at 1.2 ppm.</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">Deduce the structure of <strong>X</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.v.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">\({\text{C}}{{\text{H}}_{\text{3}}}{\text{COOC}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{H}}_{\text{3}}}\) is an isomer of <strong>X</strong>. Deduce <strong>two </strong>differences between the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of this isomer and that of <strong>X</strong>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.vi.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Distinguish between the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectra of 1-bromopropane and 2-bromopropane (splitting patterns are not required).</p>
</div>
<br><hr><br><div class="specification">
<p>The structures of oseltamivir (Tamiflu) and zanamivir (Relenza) are given in section 37 of the data booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Compare and contrast the structures of oseltamivir and zanamivir, stating the names of functional groups.</p>
<p><img src="data:image/png;base64,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"></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>Deduce the wavenumber of one absorbance seen in the IR spectrum of only one of the compounds, using section 26 of the data booklet.</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>Suggest <strong>one</strong> ethical consideration faced by medical researchers when developing medications.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Mass spectrometry is a powerful analytical technique used in the identification of organic compounds. The mass spectrum of a compound with empirical formula \({\text{C}}{{\text{H}}_{\text{2}}}{\text{O}}\) displays peaks at <em>m/z </em>15, 45 and 60.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the molecular formula of the compound.</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">Identify the fragments responsible for the peaks at</p>
<p class="p1"><em>m/z </em>= 15</p>
<p class="p1"><em>m/z </em>= 45</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">Identify a compound that could produce this spectrum.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Medicines have a variety of different effects on the body and act at the molecular level.</p>
</div>
<div class="specification">
<p>Morphine and codeine are strong analgesics. Their structures are given in section 37 of the data booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Dose response curves are determined for each drug.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-25_om_13.15.24.png" alt="M17/4/CHEMI/SP3/ENG/TZ1/XX"></p>
<p>Outline the significance of range “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>Suggest the type of reaction used to convert morphine to codeine.</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>State and explain the action of opiates as painkillers.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Infrared spectroscopy is an analytical technique that uses electromagnetic radiation.</p>
</div>
<div class="specification">
<p class="p1">The infrared spectrum of a substance, X, with empirical formula \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{\text{O}}\) is given below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-19_om_17.53.50.png" alt="M09/4/CHEMI/SP3/ENG/TZ2/A3.c"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why the structural formula of X <strong>cannot </strong>be:</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-19_om_18.29.27.png" alt="M09/4/CHEMI/SP3/ENG/TZ2/A3.c.i"></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">The \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of X consists of three peaks. Deduce the structural formula of X and the relative areas under each peak.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Magnetic resonance imaging (MRI) is a medical application of NMR spectroscopy.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State <strong>one </strong>advantage of MRI over X-ray medical imaging with reference to the electromagnetic spectrum.</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">Outline how MRI is used to scan the human body.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce the number of peaks in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectra of 1-bromobutane and 2-bromobutane. Explain how the integration trace can be used to distinguish between the two compounds.</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 class="p1">Compare the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of 1-bromo-2-methylpropane with the two spectra considered in (a). Include the number of peaks and the integration trace.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Details of the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectra of two of these alcohols are given below.</p>
<p class="p2">\[\begin{array}{*{20}{l}} {Spectrum 1}&{} \\ {{\text{Two peaks:}}}&{{\text{One at 1.3 ppm (relative to the TMS reference) with an integration trace}}} \\ {}&{{\text{of nine units, and the other at 2.0 ppm with an integration trace of one unit.}}} \\ {Spectrum 2}&{} \\ {{\text{Four peaks:}}}&{{\text{The first at 0.9 ppm with an integration trace of six units.}}} \\ {}&{{\text{The second at 1.7 ppm with an integration trace of one unit.}}} \\ {}&{{\text{The third at 2.1 ppm with an integration trace of one unit.}}} \\ {}&{{\text{The fourth at 3.4 ppm with an integration trace of two units.}}} \end{array}\]</p>
<p class="p1">Consider the proton environments present in each of the alcohol molecules when answering the following questions.</p>
</div>
<div class="specification">
<p class="p1">The mass spectrum of one of the alcohols shows peaks at <em>m/z </em>values of 74, 59 and 45.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Identify which alcohol gives spectrum 1 and explain your answer by stating which hydrogen atoms in the molecule are responsible for each of the two peaks.</p>
<p class="p1">(ii) Deduce which alcohol gives spectrum 2. Explain which particular hydrogen atoms in the molecule are responsible for the peaks at 0.9 ppm and 3.4 ppm.</p>
<div class="marks">[6]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">(i) Deduce which <strong>two </strong>of the alcohols could produce this spectrum and identify the species responsible for the three peaks.</p>
<p class="p1">(ii) The spectrum also shows a significant peak at <em>m/z </em>= 31. Suggest which alcohol is responsible for this spectrum and deduce the species responsible for the peak at <em>m/z </em>= 31.</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">Explain why the infrared spectra of all four alcohols are very similar.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Three isomers of \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{{\text{O}}_{\text{2}}}\) are ethyl methanoate, methyl ethanoate and propanoic acid.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-20_om_06.53.07.png" alt="M13/4/CHEMI/SP3/ENG/TZ2/A3"></p>
</div>
<div class="question">
<p class="p1">Explain which of the three compounds has a mass spectrum which contains peaks at \(m{\text{/}}z = 59\) and 44.</p>
</div>
<br><hr><br><div class="question">
<p>NMR spectroscopy is one of the most powerful analytical tools for determining molecular structure.</p>
<p>The <sup>1</sup>H NMR spectrum, including the integration trace, of a ketone with relative molecular mass 86 is shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-10_om_18.45.21.png" alt="m15/4/CHEMI/SP3/eng/TZ2/02"></p>
<p style="text-align: center;">[Source: SDBS web: www.sdbs.riodb.aist.go.jp (National Institute of</p>
<p style="text-align: center;">Advanced Industrial Science and Technology, 2014)]</p>
<p>Deduce the structural formula of the compound, justifying your choice.</p>
</div>
<br><hr><br><div class="specification">
<p>Consider the compound chloroethene, CH<sub>2</sub>=CHCl.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce <strong>two </strong>features you would expect to observe in its mass spectrum.</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>Predict <strong>two </strong>features you would expect to observe in its infrared (IR) spectrum.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The structure of an unknown compound <strong>A </strong>with empirical formula CH<sub>2</sub> can be determined using information from a variety of analytical techniques.</p>
</div>
<div class="specification">
<p>The mass spectrum of <strong>A </strong>is shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-10_om_13.36.49.png" alt="M15/4/CHEMI/SP3/ENG/TZ1/02.a"></p>
</div>
<div class="specification">
<p>The infrared (IR) spectrum of <strong>A </strong>is shown below.</p>
<p><img src="images/Schermafbeelding_2016-08-10_om_13.58.22.png" alt="M15/4/CHEMI/SP3/ENG/TZ1/02.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the relative molecular mass of the compound from the mass spectrum and deduce the formula of the molecular ion.</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>Deduce the formulas of the fragments which give rise to peaks at \(m/z = 27\) and 29.</p>
<p> </p>
<p>\(m/z = 27\):</p>
<p> </p>
<p>\(m/z = 29\):</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>Identify the bond responsible for the IR absorption at <strong>B</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce a structural formula consistent with the data.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The low resolution \(^1{\text{H}}\,{\text{NMR}}\) spectrum of compound <strong>Q </strong>is shown.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-15_om_07.39.57.png" alt="M13/4/CHEMI/SP3/ENG/TZ1/A3"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify what information from the spectrum allows the determination of the relative numbers of hydrogen atoms producing each peak.</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 which of the following compounds is <strong>Q</strong>.</p>
<p class="p2"> </p>
<p class="p1">\[{\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{H}}_{\text{3}}}\quad \quad \quad \quad \quad {\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{COC}}{{\text{H}}_{\text{2}}}{\text{C}}{{\text{H}}_{\text{3}}}\quad \quad \quad \quad \quad {\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{OH}}\]</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">Identify the wavenumbers of <strong>two </strong>peaks in the infrared spectrum of compound <strong>Q</strong>, using Table 17 of the Data Booklet.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>A student wished to determine the concentration of a solution of sodium hydroxide by titrating it against a 0.100moldm<sup>−3</sup> aqueous solution of hydrochloric acid.</p>
<p>4.00g of sodium hydroxide pellets were used to make 1.00dm<sup>3</sup> aqueous solution.</p>
<p>20.0cm<sup>3</sup> samples of the sodium hydroxide solution were titrated using bromothymol blue as the indicator.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline, giving your reasons, how you would carefully prepare the 1.00dm<sup>3</sup> aqueous solution from the 4.00g sodium hydroxide pellets.</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) State the colour change of the indicator that the student would see during his titration using section 22 of the data booklet.</p>
<p>(ii) The student added the acid too quickly. Outline, giving your reason, how this could have affected the calculated concentration.</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>Suggest why, despite preparing the solution and performing the titrations very carefully, widely different results were obtained.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">A healthy diet consists of a range of food groups in the right proportions that provide the energy for the body to function, grow and repair itself.</p>
</div>
<div class="specification">
<p class="p1">Examples of straight-chain fatty acids include \({{\text{C}}_{{\text{19}}}}{{\text{H}}_{{\text{39}}}}{\text{COOH}}\), \({{\text{C}}_{{\text{19}}}}{{\text{H}}_{{\text{31}}}}{\text{COOH}}\) and \({{\text{C}}_{{\text{19}}}}{{\text{H}}_{{\text{29}}}}{\text{COOH}}\).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the empirical formula and structural features of monosaccharides.</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">Deduce the structural formula of a triester formed from <strong>three </strong>long-chain carboxylic acid molecules, RCOOH, and <strong>one </strong>propane-1,2,3-triol molecule, \({\text{HO–C}}{{\text{H}}_{\text{2}}}{\text{CH(OH)–C}}{{\text{H}}_{\text{2}}}{\text{OH}}\). Identify <strong>one </strong>of the ester linkages in the structure by drawing a rectangle around it.</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">Deduce the number of C=C bonds present in one molecule of each fatty acid.</p>
<p class="p1">\({{\text{C}}_{{\text{19}}}}{{\text{H}}_{{\text{39}}}}{\text{COOH}}\):</p>
<p class="p1">\({{\text{C}}_{{\text{19}}}}{{\text{H}}_{{\text{31}}}}{\text{COOH}}\):</p>
<p class="p1">\({{\text{C}}_{{\text{19}}}}{{\text{H}}_{{\text{29}}}}{\text{COOH}}\):</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.i.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain what occurs at a molecular level during the absorption of infrared (IR) radiation by the sulfur dioxide molecule, \({\text{S}}{{\text{O}}_{\text{2}}}\).</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 class="p1">Consider the IR spectra of the following three compounds.</p>
<p class="p1">\[\begin{array}{*{20}{l}} {{\text{A}} = {\text{C}}{{\text{H}}_{\text{3}}}{{{\text{(C}}{{\text{H}}_{\text{2}}}{\text{)}}}_{\text{3}}}{\text{COOH}}} \\ {{\text{B}} = {\text{C}}{{\text{H}}_{\text{3}}}{\text{COOC(C}}{{\text{H}}_{\text{3}}}{{\text{)}}_{\text{3}}}} \\ {{\text{C}} = {{{\text{(C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{)}}}_{\text{3}}}{\text{COH}}} \end{array}\]</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-17_om_08.07.15.png" alt="M09/4/CHEMI/SP3/ENG/TZ1/A1.d_1"></p>
<p class="p1">Determine which IR spectrum corresponds to each compound A, B and C. Explain your reasoning. IR data can be found in Table 17 of the Data Booklet.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-17_om_08.09.33.png" alt="M09/4/CHEMI/SP3/ENG/TZ1/A1.d_2"></p>
<div class="marks">[5]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Compound <strong>X</strong> has the molecular formula \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{{\text{O}}_{\text{3}}}\) and is found in human perspiration.</p>
</div>
<div class="specification">
<p><strong>Y </strong>is an isomer of <strong>X</strong>, which contains the same functional groups.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Its infrared (IR) spectrum is represented below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-18_om_16.36.21.png" alt="M14/4/CHEMI/SP3/ENG/TZ2/03.a"></p>
<p>Deduce the bonds responsible for the absorptions labelled <strong>I</strong> and <strong>II</strong>.</p>
<p> </p>
<p><strong>I</strong>:</p>
<p> </p>
<p><strong>II</strong>:</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 \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum recorded showed four peaks with the following chemical shift values (in ppm):</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-18_om_16.42.26.png" alt="M14/4/CHEMI/SP3/ENG/TZ2/03.b"></p>
<p>The integration trace for A:B:C:D was found to be 1:1:1:3.</p>
<p>Deduce what information can be obtained about the hydrogen atoms responsible for peak D at 1.2 ppm from the integration trace in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X</strong>.</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>Deduce the fragments in the mass spectrum which correspond to the following <em>m</em>/<em>z</em> values.</p>
<p> </p>
<p><em>m</em>/<em>z</em> = 45:</p>
<p> </p>
<p><em>m</em>/<em>z</em> = 17:</p>
<p> </p>
<p><em>m</em>/<em>z</em> = 15:</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>Deduce the structural formula of <strong>X</strong>.</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>(i) Deduce the structural formula of <strong>Y</strong>.</p>
<p> </p>
<p>(ii) Predict <strong>one </strong>difference between the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>Y </strong>and <strong>X</strong>.</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>(i) Like <strong>X</strong>, 3-methylbutanoic acid is also a source of body odour. Deduce the <em>m</em>/<em>z</em> value for the molecular ion peak on the mass spectrum of this compound.</p>
<p> </p>
<p> </p>
<p>(ii) Deduce the number of different chemical environments of the hydrogen atoms in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of 3-methylbutanoic acid.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The mass spectrum of an unknown compound, <strong>X</strong>, of empirical formula C<sub><span class="s1">2</span></sub>H<sub><span class="s1">4</span></sub>O is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-06_om_07.24.46.png" alt="N09/4/CHEMI/SP3/ENG/TZ0/A2.a"></p>
</div>
<div class="specification">
<p class="p1">The IR spectrum of <strong>X </strong>is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-06_om_07.26.31.png" alt="N09/4/CHEMI/SP3/ENG/TZ0/A2.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the relative molecular mass of <strong>X </strong>from the mass spectrum and deduce the formula of the molecular ion.</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">Identify a fragment which gives rise to the peak at <em>m/z </em>= 29.</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 class="p1">Comment on the absence of a peak at <em>m/z </em>= 59.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Use Table 17 of the Data Booklet to identify the bonds which correspond to the absorptions <strong>A </strong>and <strong>B</strong>.</p>
<p class="p1"><strong>A</strong>:</p>
<p class="p1"><strong>B</strong>:</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">Deduce the name of the functional group present in <strong>X</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X </strong>shows three peaks. State the information that can be obtained from the number of peaks.</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 class="p1">The \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X </strong>includes peaks at 2.0 and 4.1 ppm. Use Table 18 of the Data Booklet to suggest the chemical shift of the third peak and state its relative peak area. Show your answers in the table below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-06_om_08.56.29.png" alt="N09/4/CHEMI/SP3/ENG/TZ0/A2.c.ii"></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 class="p1">Deduce a possible structure for <strong>X </strong>that is consistent with the mass, IR and \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectra.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>The mass spectrum and infrared (IR) spectrum of a compound are shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_11.39.58.png" alt="N14/4/CHEMI/SP3/ENG/TZ0/01"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) State the information about this particular compound that can be derived from the mass spectrum and outline how it is found.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>(ii) Suggest how the fragment with <em>m</em>/<em>z </em>= 43 is formed from the original molecule.</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>(i) Use the IR spectrum in the region 1600 – 1800 \({\text{c}}{{\text{m}}^{ - 1}}\) to deduce <strong>one</strong> functional group that is present in the compound and <strong>one</strong> group that is absent.</p>
<p> </p>
<p>Present:</p>
<p> </p>
<p> </p>
<p>Absent:</p>
<p> </p>
<p> </p>
<p>(ii) The molecular formula of the compound is \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{{\text{O}}_{\text{2}}}\). Explain, with reference to another region of the IR spectrum, why the compound could <strong>not </strong>be propanoic acid, \({\text{C}}{{\text{H}}_{\text{3}}}{\text{C}}{{\text{H}}_{\text{2}}}{\text{COOH}}\).</p>
<p> </p>
<p> </p>
<p> </p>
<p>(iii) Deduce the structures of two possible isomers of propanoic acid consistent with the IR spectrum.</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>\(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectroscopy is often very useful in distinguishing between closely related compounds such as those above.</p>
<p>(i) State the region of the electromagnetic spectrum that is used in this technique.</p>
<p> </p>
<p>(ii) The structures of two other closely related compounds are shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-23_om_12.18.07.png" alt="N14/4/CHEMI/SP3/ENG/TZ0/01.c.ii"></p>
<p>Discuss how you would expect the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectra of these two compounds to differ, using Table 18 of the Data Booklet.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The mass spectrum of an unknown acidic compound, <strong>X</strong>, with empirical formula \({\text{C}}{{\text{H}}_{\text{2}}}{\text{O}}\), is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-27_om_05.59.30.png" alt="N13/4/CHEMI/SP3/ENG/TZ0/02.a"></p>
</div>
<div class="specification">
<p class="p1">The low-resolution \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X </strong>shows four peaks. A simplified representation is shown alongside a table with relative peak areas.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-27_om_06.05.48.png" alt="N13/4/CHEMI/SP3/ENG/TZ0/02.b"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Determine the relative molecular mass, to the nearest integer, of the compound from the mass spectrum and deduce the formula of the molecular ion.</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">Deduce the formula of the fragment responsible for the peak at 45.</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 class="p1">Deduce the formula of the fragment responsible for the peak at 29.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the group responsible for the peak at <strong>D</strong>.</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">Suggest a possible structure for <strong>X</strong>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Compound <strong>P </strong>contains a carbonyl group (C=O) and has the molecular formula C<sub><span class="s1">3</span></sub>H<sub><span class="s1">6</span></sub>O.</p>
</div>
<div class="specification">
<p class="p1">Pentan-2-one has the following mass spectrum.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-15_om_07.36.15.png" alt="M13/4/CHEMI/SP3/ENG/TZ1/A1.d"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw the <strong>two </strong>possible structures of compound <strong>P</strong>.</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">Explain why the infrared spectra of the structures in (a) are very similar.</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">Explain how the mass spectra of the structures in (a) can be used to distinguish between them.</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">Deduce the formulas of the species with the <em>m</em>/<em>z </em>values at 86, 71 and 43.</p>
<p class="p1"> </p>
<p class="p1">\(m{\text{/}}z = 86\):</p>
<p class="p1"> </p>
<p class="p1">\(m{\text{/}}z = 71\):</p>
<p class="p1"> </p>
<p class="p1">\(m{\text{/}}z = 43\):</p>
<div class="marks">[3]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Suggest a reason for the peak at <em>m</em>/<em>z </em>= 43 having an exceptionally high relative abundance.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X </strong>with molecular formula \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{\text{O}}\) is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-26_om_09.47.58.png" alt="M11/4/CHEMI/SP3/ENG/TZ1/A2"></p>
</div>
<div class="specification">
<p class="p1">The infrared and mass spectra for <strong>X </strong>were also recorded.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce which of the following compounds is <strong>X </strong>and explain your answer.</p>
<p class="p1" style="text-align: center;">\({\text{C}}{{\text{H}}_{\text{3}}}\)–CO–\({\text{C}}{{\text{H}}_{\text{3}}}\) <span class="Apple-converted-space"> </span>\({\text{C}}{{\text{H}}_{\text{3}}}\)–\({\text{C}}{{\text{H}}_{\text{2}}}\)–CHO <span class="Apple-converted-space"> </span>\({\text{C}}{{\text{H}}_{\text{2}}}\)–CH–\({\text{C}}{{\text{H}}_{\text{2}}}{\text{OH}}\)</p>
<p class="p1">Compound:</p>
<p class="p1">Explanation:</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">Deduce which one of the peaks in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of <strong>X </strong>would also occur in the spectrum of one of the other isomers, giving your reasoning.</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">Apart from absorptions due to C–C and C–H bonds, suggest <strong>one </strong>absorption, in wavenumbers, that would be present in the infrared spectrum.</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 class="p1">Apart from absorptions due to C–C and C–H bonds, suggest <strong>one </strong>absorption, in wavenumbers, absent in this infrared spectrum but present in one of the other compounds shown in part (a).</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">Suggest the formulas and m/z values of <strong>two </strong>species that would be detected in the mass spectrum.</p>
<p class="p1">Species:</p>
<p class="p1">m/z:</p>
<p class="p1">Species:</p>
<p class="p1">m/z:</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The IR spectrum below represents one of the three organic compounds: propan-1-ol (CH<sub><span class="s1">3</span></sub>CH<sub><span class="s1">2</span></sub>CH<sub><span class="s1">2</span></sub>OH), propanal (CH<sub><span class="s1">3</span></sub>CH<sub><span class="s1">2</span></sub>CHO) or propanoic acid (CH<sub><span class="s1">3</span></sub>CH<sub><span class="s1">2</span></sub>COOH).</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-25_om_06.02.08.png" alt="N12/4/CHEMI/SP3/ENG/TZ0/A2"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Analyse the spectrum and identify <strong>two </strong>bonds other than C–H that are present and <strong>one </strong>that is absent in this compound. Refer to Table 17 of the Data booklet to complete the table.</p>
<p class="p1">Bonds present:</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-25_om_06.34.27.png" alt="N12/4/CHEMI/SP3/ENG/TZ0/A2.a_1"></p>
<p class="p1">Bond absent:</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-25_om_06.35.04.png" alt="N12/4/CHEMI/SP3/ENG/TZ0/A2.a_2"></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 class="p1">The mass spectrum of the same compound contains strong peaks of \({({M_{\text{r}}} - 15)^ + }\) and \({({M_{\text{r}}} - 17)^ + }\) ions. The first signal corresponds to the loss of a methyl group, \({\text{C}}{{\text{H}}_{\text{3}}}\), from the molecule. Deduce which fragment is lost to produce the second peak.</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">Using the information above, deduce the identity of the organic compound.</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">Predict the number of peaks in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of this compound.</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>The mass spectrum of iodoethane, \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{5}}}{\text{I}}\), shows three prominent peaks with <em>m</em>/<em>z</em> values of 156, 127 and 29. Identify the ions responsible for each of these three prominent peaks.</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>Bromine contains two isotopes, \(^{{\text{79}}}{\text{Br}}\) and \(^{{\text{81}}}{\text{Br}}\), in approximately equal amounts. Predict the <em>m</em>/<em>z</em> values of the prominent peaks in the mass spectrum of bromoethane, \({{\text{C}}_{\text{2}}}{{\text{H}}_{\text{5}}}{\text{Br}}\).</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Three isomers of \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{{\text{O}}_{\text{2}}}\) are ethyl methanoate, methyl ethanoate and propanoic acid.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-20_om_06.53.07.png" alt="M13/4/CHEMI/SP3/ENG/TZ2/A3"></p>
</div>
<div class="question">
<p class="p1">Explain which of the three compounds has an infrared spectrum with a broad absorption between 2500–3300 cm<sup><span class="s1">–1 </span></sup>and an absorption at 1730 cm<sup><span class="s1">–1</span></sup>.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Nuclear magnetic resonance (NMR) and mass spectrometry are diagnostic techniques often used in the identification of organic compounds.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Deduce <strong>two similarities </strong>and <strong>one difference </strong>in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectra of the two isomers \({\text{C}}{{\text{H}}_{\text{3}}}{\text{COOH}}\), a carboxylic acid, and \({\text{HCOOC}}{{\text{H}}_{\text{3}}}\), an ester. \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) data are given in Table 18 of the Data Booklet.</p>
<p class="p1">Similarities:</p>
<p class="p1">Difference:</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 class="p1">The mass spectrum of one of the two isomers above has significant peaks at mass to charge ratios of 15, 45 and 60, while the other isomer has peaks at 15, 29, 31 and 60. Analyse these fragmentation patterns in the two mass spectra in order to distinguish between the two isomers.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Infrared (IR) spectroscopy is widely used as a technique in analytical chemistry.</p>
</div>
<div class="specification">
<p class="p1">The IR spectrum, mass spectrum and \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum of an unknown compound, <strong>X</strong>, of molecular formula \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{{\text{O}}_{\text{2}}}\) are as follows.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-30_om_08.34.04.png" alt="N10/4/CHEMI/SP3/ENG/TZ0/A2.c"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain what happens at a molecular level during the absorption of IR radiation by carbon dioxide, CO<sub><span class="s1">2</span></sub>.</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 class="p1">(i) <span class="Apple-converted-space"> </span>Identify the bonds responsible for the peaks <strong>A</strong>, <strong>B </strong>and <strong>C </strong>in the IR spectrum of <strong>X</strong>.</p>
<p class="p1"><strong>A</strong>:</p>
<p class="p1"><strong>B</strong>:</p>
<p class="p1"><strong>C</strong>:</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>In the mass spectrum of <strong>X</strong>, deduce which ions the <em>m/z </em>values at 74, 45 and 29 correspond to.</p>
<p class="p1"><em>m/z </em>= 74:</p>
<p class="p1"><em>m/z </em>= 45:</p>
<p class="p1"><em>m/z </em>= 29:</p>
<p class="p1">(iii) <span class="Apple-converted-space"> </span>Identify the peak at 11.73 ppm in the \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum.</p>
<p class="p1">(iv) <span class="Apple-converted-space"> </span>Deduce the structure of <strong>X</strong>.</p>
<div class="marks">[7]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">\(^{\text{1}}{\text{H}}\,{\text{NMR}}\) and IR spectroscopy both involve the absorption of electromagnetic radiation.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the region of the electromagnetic spectrum used in \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectroscopy.</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">Identify which of these two techniques involves higher energy radiation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<br><hr><br><div class="question">
<p>Two students were provided with three different isomers of \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{{\text{O}}_{\text{2}}}\).</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-18_om_09.49.36.png" alt="M14/4/CHEMI/SP3/ENG/TZ1/04"></p>
<p>They were asked to suggest how the isomers could be distinguished and positively identified from each other using spectroscopic techniques. Student A said that they could be positively identified just from their infrared spectra. Student B said that they could be positively identified just from the number of peaks and the areas under each peak in their \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectra.</p>
<p>Evaluate these two claims and suggest how any possible limitations could be overcome using the same spectroscopic technique.</p>
<p> </p>
<p>Student A / Infrared:</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p>Student B / \(^{\text{1}}{\text{H}}\,{\text{NMR}}\):</p>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the essential difference between the <strong>emission</strong> spectrum of sodium and the <strong>absorption</strong> spectrum of sodium.</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>Identify the five missing components in the following table.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-18_om_09.21.27.png" alt="M14/4/CHEMI/SP3/ENG/TZ1/01.b"></p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Three isomers of \({{\text{C}}_{\text{3}}}{{\text{H}}_{\text{6}}}{{\text{O}}_{\text{2}}}\) are ethyl methanoate, methyl ethanoate and propanoic acid.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-20_om_06.53.07.png" alt="M13/4/CHEMI/SP3/ENG/TZ2/A3"></p>
</div>
<div class="question">
<p class="p1">Explain which of the three compounds has a \(^{\text{1}}{\text{H}}\,{\text{NMR}}\) spectrum showing two peaks with equal areas under each peak.</p>
</div>
<br><hr><br><div class="specification">
<p>A class was determining the concentration of aqueous sodium hydroxide by titrating it with hydrochloric acid, whilst monitoring the pH of the solution. The sodium hydroxide solution was added into a glass beaker from a measuring cylinder and the hydrochloric acid added using a burette. One group of students accidentally used a temperature probe rather than a pH probe. Their results are given below.</p>
<p>Volume of aqueous NaOH = 25.0 ± 0.5 cm<sup>3</sup></p>
<p>Concentration of HCl = 1.00 ± 0.01 mol dm<sup>−3</sup></p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question">
<p>State and explain how the graph would differ if 1 mol\(\,\)dm<sup>−3</sup> sulfuric acid had been used instead of 1 mol\(\,\)dm<sup>−3</sup> hydrochloric acid.</p>
</div>
<br><hr><br><div class="specification">
<p>A class was determining the concentration of aqueous sodium hydroxide by titrating it with hydrochloric acid, whilst monitoring the pH of the solution. The sodium hydroxide solution was added into a glass beaker from a measuring cylinder and the hydrochloric acid added using a burette. One group of students accidentally used a temperature probe rather than a pH probe. Their results are given below.</p>
<p>Volume of aqueous NaOH = 25.0 ± 0.5 cm<sup>3</sup></p>
<p>Concentration of HCl = 1.00 ± 0.01 mol dm<sup>−3</sup></p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the percentage uncertainty of the volume of the aqueous sodium hydroxide.</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>Suggest how the precision of this measurement could be improved.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Opiates have been used for thousands of years to alleviate pain. The structures of opiates are found in section 37 of the data booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Diamorphine (heroin) can be synthesized from morphine. Identify the reagent necessary for this reaction and the by-product of this reaction.</p>
<p style="text-align: center;"><img 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" alt></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 reaction can be monitored by infrared spectroscopy. Using section 26 of the data booklet, identify <strong>two</strong> IR absorbance ranges that would help distinguishing the two compounds.</p>
<p>Present in morphine but not in diamorphine:</p>
<p>Present in diamorphine but not in morphine:</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>Discuss how the differences in structure between morphine and diamorphine affect their absorption in the body.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>A class was determining the concentration of aqueous sodium hydroxide by titrating it with hydrochloric acid, whilst monitoring the pH of the solution. The sodium hydroxide solution was added into a glass beaker from a measuring cylinder and the hydrochloric acid added using a burette. One group of students accidentally used a temperature probe rather than a pH probe. Their results are given below.</p>
<p>Volume of aqueous NaOH = 25.0 ± 0.5 cm<sup>3</sup></p>
<p>Concentration of HCl = 1.00 ± 0.01 mol dm<sup>−3</sup></p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="specification">
<p>The graph of temperature against titre can be used to calculate the concentration of alkali without knowing the concentration of the hydrochloric acid, using the enthalpy of neutralization.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how the concentration may be calculated in this way.</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>Heat losses would make this method less accurate than the pH probe method. Outline why the thermometric method would always give a lower, not a higher, concentration.</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>Suggest how heat loss could be reduced.</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 <strong>one</strong> other assumption that is usually made in the calculation of the heat produced.</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>Suggest why scientists often make assumptions that do not correspond to reality.</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>Outline why the thermochemical method would not be appropriate for 0.001 mol\(\,\)dm<sup>−3</sup> hydrochloric acid and aqueous sodium hydroxide of a similar concentration.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.</div>
</div>
<br><hr><br><div class="specification">
<p>Antacids react with hydrochloric acid in the stomach to relieve indigestion. A student investigated different brands of antacid to see which caused the largest increase in pH in a given time. She added the antacids to hydrochloric acid, and recorded the change in pH over five minutes.</p>
<p><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State an equation for the reaction of magnesium hydroxide with hydrochloric acid.</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>Suggest two variables, besides the time of reaction, which the student should have controlled in the experiment to ensure a fair comparison of the antacids.</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>Calculate the uncertainty in the change in pH.</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>The student concluded that antacid <strong>B</strong> was the most effective, followed by <strong>A</strong> then <strong>C</strong> and finally <strong>D</strong>. Discuss two arguments that reduce the validity of the conclusion.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>A class was determining the concentration of aqueous sodium hydroxide by titrating it with hydrochloric acid, whilst monitoring the pH of the solution. The sodium hydroxide solution was added into a glass beaker from a measuring cylinder and the hydrochloric acid added using a burette. One group of students accidentally used a temperature probe rather than a pH probe. Their results are given below.</p>
<p>Volume of aqueous NaOH = 25.0 ± 0.5 cm<sup>3</sup></p>
<p>Concentration of HCl = 1.00 ± 0.01 mol dm<sup>−3</sup></p>
<p style="text-align: center;"><img 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J+ggA5PfAa5+7jxG5bjIZOr1WycxlPj19JvTbQROaZ9Ri+f8bBrDnI7tAwU1mn+TuMFcrY88hQuxRyv8ZCLd3IHo2fYIWSWyfkC1IBuYyW+hz6n15bTeMZaInE1e1i1l0ZsdJfi8LqXsLjyHazpdpr/5aDvxeDHyO+TCJd3r4Rm3oUX4qcvsavbHtvQULXbB1Y5vbacxgsFULMuMdN9Li7vcwXM2q1aSKfXltN4ar7a3wif51ujS78/AVO2YMfWRZjad4hvHK03RaXQmz9CfpH24UMdc2U0R0C1qLWSonX8W18lGOnZMRAZVhtpRSLDa1idheIpz2C60UZb8i3a7V2R/t9KnN40AbICL0kqxvH3duBdo7eSkeTNsDVAwPcmImSytOVKGU7jRadIvh3P9Suc+caBH3j3IqT16uxbOU2fnXwjdPWhEIPYN/kq0lWG9Ilbnfv6hB4hk6XViWVmK0o5jWelx6a/sllR6OaTvvGs7kG9cLPRqkKIbRvxFM7DpGsuQfe8G/HAbp3x4C2a0/ydxrPD8wcU5fVFz9aT8VjSMmwwMB4ct+2Y8VbmD6grB+qKedx9rW9FFafXltN4Oh2hp/Z0O+YdE92BoVa+eV2+F4RV+0eiNy5D+vrjEOuHIT0hwfuWNn76Eru6zerE9yy1WW1LIZUZuz7QTv2f7vjail1fYkd3Utz13XLoaxqGhKx4qNR/Wjeky9U+nV5bTuOFtDfNArqaw6CVfUNOqj4UazKTRGJiYuj692XrxPNysyn/xkVyI7XRYrDbLRJnbBffysT0a9Cq62QPVjfMUDffgYC6Frh3fXXdxm3KOsnBG9zp1gpXNpcJ0qNsxuHXE1JA35rAEW8kp5TdfCO5qSJX2cxJMpDr30vm/jIa6aBbVAjYbtthcvNvbrVgt9KOI9lIrp3oEGG8aGgWwrc/idt/bckCKmuPD33Fv5FYaLGVjWbcw8TIvSe83v4NyMw2V1QSiUi3eu3r0/Rft2qfoG4kZrHHgtN4ButbhzIJuATvo6C6V4iy7QNEmoaZXINc9n+3N7nHeH8YJarTtiWjh+Wt7D9juj9NNfOPjW4fx3RAuDWb3amUA79O27a6kVzk16Qd3o+ltghc6/J2VzBX5AS5Ob22nMazaCOyUGUrhLVup7xjqDvQGLxHhtel0z7BaTyra1KnWZ4a6jaoEyGfMfolBm+mqE8vZrrt1b/TPsFpPFn8sH2grXtgHPbdiu6gDYgLloiZQfXv9NpyGi+Uta2N5ILbqLKZRdoT/p2Vg/xLt4j189KFvAHIipUP1CPX7fc9dMmAegPCe5NVdmv2xukt0udvFBvnXxB4uHZqQMj89HqShojMF7crO5wGKQ+cONmJ2lu2PWLbiyPEhDTFOPAaCENE5tI8ZWfSQBbqAxkNiACTWB2F72Ds5lok9q8bGVS37sEzxZT31V3HfW3baxiqhq83aRvxDCRER7PUtEdsfzFTDElSrkf0Funz1ge1R98NTLfzuv66wcWiwyOrlZ2hDQQrThHpNjMgZJ+wJ1c8J3d2V/uRkOtWeVkQtKGbnXjG2iPRbXjD9yZbLgrfn+Lbed6rO0kkjnte5O7xGWHeIOrLgyi0EZmeuW6Vj1rvob+BzT9ttNGa0q3mo9Z7yK9mYzwbbdv/sibmvH3tqurYarH6kQ4iSdWtv//JYDaurZq+Jm3ptsG7pnX7qCvs94802ODRTp+gXiuatmWrD9LmHjg2vyYDYbRHZv2JdZ3UsG4b9e99QVWD90nJ0ZK3Ld3x1HerraNIHPj3gMC9W94D3zwQeJaWwWq5L3EpFeAdR+irC6PvFHQjgbpLQC7BW9fadl3ULFsIddfsdULe5G1FgG3EilB0/ck7ujytUiNvK0LR89ezjnAORPSEMCUSIAESIAESIAESIAESIIG6R4AGRN2rMyomARIgARIgARIgARIggVojQAOi1tAzYxIgARIgARIgARIgARKoewRoQNS9OqNiEiABEiABEiABEiABEqg1AjQgag09MyYBEiABEiABEiABEiCBukeABkS06qxsE14Zm+zbFTNjMqbuL4lWykyHBEiABEiABEiABEiABOKGAA2IqFRFKQ6tGIEBZc9gV9VJFNy7Ef+YsQl7o5I2EyEBEiABEiABEiABEiCB+CHgjh8pdVmJb4v6ihGyDMU48P9OotFZp+L0ulwkaicBEiABEiABEiABEiABAwKx/wLh2YudCzKQ4XL5hve4+iDj6dewpuAXAzkmTuUr8VjKb5GR951JAJ2zZxOeT74eow78rPOI8WnlGsy+MBkXjTwLademIDHG2TF5EiABEiABEiABEiABEqhpApEbEJVrMPOUuzC1qNKG1h9Q+ModuGrFFei8rRAVQqCqYAD+/MFgDJy3FcU2UkD5W1g0aTL+feg8O6F9YcoO4vNGNyKz3Sn240QjpDsT4w8LVB3rjnP/NA3TbTGKRsZMgwRIgARIgARIgARIgARqhkDkBkQkujzb8c6zu5E4ZBie6JYMOV4qodVQjJ2ShWue3IDXSjxhUvsBRdvux4iue3DR7X3QLEzIYK9KlO54A689fDXSYls6TbalOLiwPZKfPwBpViU0PxO/bXQ6zmxaYwI0WnhIAiRAAiRAAiRAAiRAArEjENsn3LKDOPheO6Sce4bXeFCLkZDUEV2wDmt2/E91Cvn1HMhBnxubIjVvLLqd2ijE39zhK3y48jhuuLpNUJ7B4X3GSc7VjX3DqpKz0H/dQRyXgUrmI6dxYyTPWI23p3VEsnfoVTLOvH8Z1hR8i4NvDkRWsm84VuMhuVhZKIditUDK7XMwbfPlaCzDX7QDBZtH4+6WscUbXCaekQAJkAAJkAAJkAAJkEDsCcT0CddTvBe7Kn9lUor9OPjVd9439kYBEpJHY9WRRzCylVl8o1jSAFiPNzbeE2b40g8oXJ2By6/ai52jPse3ogplG0/FKTfdgF5rvoL8JuJKrETx5EWY2e5V7PIOu/obhu+8E/3P7ol+n49EToGAKFuHBRUTMeThN7FbRmr2J9y5shxCCIiiZVhxVVIYA8ZEO51JgARIgARIgARIgARIIM4JWBsQRVOR5Z8A7YKrcX9MPPkCHmmlvL33+mWg/45yXVErUX7sID7Xudo+bZGCjs2t5QWnV4nSD9fiuQEXIMUsqmc71j/3KY5PmIgVt7VHIhLQrMNoDB3zDXa/sAn7lVFVbr+/HHbVF9d2/Q3QexxyJ6aho0y7WRr+kH4WKt/+CFvLwg3FClbIMxIgARIgARIgARIgARKoywTMHrMDZUqeimXyrbr6r2I1Hm9yJ6YUVgTcxBas7mp/lkIg8Wgf/Yjiw9+je6/OSDJJ2nNoLf65KRGJbZM1qyRdgB6zSyDWD/MZByZx6UwCJEACJEACJEACJEACDZ2AtQHhmJAbzc5OQSfH8R1E9OzEfx7thcyu1duBQRx36wwMB1oYhQRIgARIgARIgARIgATqIYEYGhCAnCyd6jbb7+GikMnV1eUrvy5Mu7k3bubk5eqiZHwSIAESIAESIAESIAESMCQQUwMCzVOQcvWhkMnSvsnV7dHhnGgOeyrFF1u248LrU02HL0kCCe364daex3H8iyLfqkteLKU4tPBCuFz9MWrPaYag6EgCJEACJEACJEACJEACJABEbkC4M5Hz8/OYmix3dbD4S+iG6+7pjOMjZ2HMvhJvYE/hUjz1yDJsnnAPHmwfzY3ejuPYh7A2SqSmnN5Im/U4Bm8o9K4CJTUtWVaAxBnZePzi7y0KRW8SIAESIAESIAESIAESaLgErA0I/SpM2hWZ/MdGqzBJqE3R6o8zsW7Ol9jX8VTvnguNWj+BRRctwYrRaf4vBZ4Do9DH5ULjnM32dqc2qi/L5VvVSE2R3Hs1Xv6gI7pMa+Pdt6FR63XYPjgfW3K6RrBhnZoef0mABEiABEiABEiABEig4RBwCbm8ktz7wOXyrqrUcIrOkjYUAnWxbddFzXW5HyHvmu0NyLvmeJN1zbFmH1izrMm7Znnr+xLrLxA1q4+5kQAJkAAJkAAJkAAJkAAJxDEBGhBxXDmURgIkQAIkQAIkQAIkQALxRoAGRLzVCPWQAAmQAAmQAAmQAAmQQBwToAERx5VDaSRAAiRAAiRAAiRAAiQQbwSCJlHHmzjqIQESIAESIAESIAESIAESiA8CytpLCNrMQXWMD4lUQQLRIaBfOSA6qcY2lbqoWRKh7ti2C33q5K0nEtvzusi7LmqWtUjdsW3L+tTJW08ktud1kbdeM4cwxbaNMHUSIAESIAESIAESIAESqFcEaEDUq+pkYUiABEiABEiABEiABEggtgRoQMSWL1MnARIgARIgARIgARIggXpFgAZEvapOFoYESIAESIAESIAESIAEYkuABkRs+TJ1UwKVKN83BlnJLrhcfZCx6gCOm4alBwmQAAmQAAmQAAmQQLwQoAERLzXR0HR43sXKPt+h2cYTEGVjcOvfR2HqgZ9rgUIlyvfOx/Njk72rfshVBlzJWei/7qC5QVO+Eo+l/BYZed/Z0FuMg28OVAwlG2nbSNEXpBgH3hqFnKsb+3U3HjIH8/aVaFJwUDY1dlk+8p7OQIbk4XIhNG01YKS/dnTr0vTsxNqsZmicsxnFOq/g02qUNzih0DMdD5erEzpOexv5ZR5N2FIcWnihvz68bcnLLxnJzx9ApSak+WEBPnr0bBtlNU8hyCemuvW8jZgEqbF5ok/X/LrxFK7EYv+1m4wz71+GNQW/WOfj2YudCwLt25UxEWO2F9msI7PkrXRXonRDLyQr11SgffiuMe91Fq6N26pLM23h3GOsG4DjegonG1Z9yRFsHt/S4HpUeV8epg+3YhJWmIWnlW41+g8o2na/po/vg4wF27FX2+WoQbW/MWnbAOy2P0f5R6Pv1ELQHMdUt9261OixdWiz/Xk2YXGvwDNAoE/pj1Fhn6d0uq2eecw0C+UPgHoY/HsiV+QkQUj/cP/cEzaJouCY9eusdItYN+oGMXr/T3W0XOWi8INxYkKaW6nHJJE4boH4+9ZCUWG7RMfEzn+0FvbrukQceDZFJD23PzSPwimiQ4fVYo83759F0Yo+InN7mUZJkdj3xt/EY7c1DbS7pCEic2me2FJapQlnfWjatoUQVcemiGHudqLDo++JPd5ky0Xh1qFisLud6Lz6aKjusnXihfvaiKtwmUhff9wi83JR8M8rhDvtb2LKvhNCiApRtm+KmNC9iUicsV18GyZ2OM1CKOm6B4sB7xf5NFbtEdse7SDc7nvFlGMnvSlHXDZVT9WH4tVBLUTiuFf8rKsK5orxiekic/v3aijD32joDk7YV9YkwLLdOS6vb/3q4Gy1Z5LHkKbCPfgZsaJAYVuwRDxxW1PhHvaq2OVvjofFxnGnG7d3bXqmx0Vi//x00fNKt2VZ1STC8o6xbh/vniJ95X6lLZeLwvV/EomJM8XqMj8UVWrQbzjddutRhhvaZKgYuVdeW0KI0o1izZgkgd6LxJZw2Vd9KF65LVF0WLBb0V0kDqzsKdKRKUZa9O/R0B0Ewnvi61eRPsecm+26DE09nGYZ2i7v0JRt6FbSd1JP4XXb6wNDNQshylaIxy36YOdMhPd+ZZiv19Gubl+4JrcvFRu997vAvcPwfurPULlHa/olX1muq17fbbf9Ob62nPedYdtJTHXbrUt/5QQdhNNtu/2dyBUT3P0s+62gjNXnB/9zibxId4mN41pH/FzitxrCFSYoc8WgsP8QGRS7jp5UiJK8niLJxg2mxgpYsVo83uROMaXQ3uO/r0H2FOnzt/kelP0PnH8TuSfC3W3VEkX+cCPEYbFhaBfjxl21UTzXeqDv5l+2Tizo0CMQTn0QSM8Ro7epBk6FKNs7x2dQhLvRqnI1v+Ztu0QcfPYCgaRJOgZG7j4D7O4Oj4v3t40Qve0YEN6Lu5PO0DBKWyNWOTTXLC/2jWJRT4OHzCD3HyMomzZ/s7au6LZ4OKu+7mAtZXtHi9ubdBFplg/VZlzN3Jl0A9MAACAASURBVLX5hL/pV+0faVjfIe6G9R2cj9lZVcEKsXDwFSLzg3zjujWJGI53iD4ljRB3R7oPi03ZLUIf1qs2ihcymlgaUea6zepL7+7LP+Q+ZFkWX/t2u/X9nkl6Ou7V161LUL5U2D5ApKNv2Ae8kDozq0t98lbGsdBzVRMwc1f97emW9wDZTiKvp/DXpL0+UNWq/bVj9JiV3cxdm36UdBu2Y7O2q8nfMJ5JHWiiyUPzti2EvfZnps9G/oa6dQJNTmtNd9D9ViPOzF0TRB6a6zZrZ3p3M966jPSnXtbukD7aV8fhX6LoNQdtJGf2lYLudZ1AKQ6vewmLe0zGlhHd0NE7cK0juk2chwVr++PlHdkY2fsM00LKz88vTHoSG++dhYHNe+Fd05A6j5L1eGPjPchcdIrOA0DCNRiw/g1s7XUqXMW9kb4yF6vby3AF+Ojpochc3Q9TPvw7prb+lRLXjWYdxmHi82ch4Y9DMHBaKtJm9kBSaMoRuLRAuxGHIUaYRCk+jL3FvwAtT4HnQA763Hg67v10LLqVjTOJoHNuORIzK0bqHKNwmtATwzZWYJhJUpW7juKgpwfSbZYtOJkf8c2XR1GcdCU6JqnsZYjf4Kzz2yAp7x2sOTQQ6d66Co5peWZLN5CkDqwsX4PcgUvx+ZLluG/RX7A9bAb26zJsMgaeCe1zsV5294Z/RTj41XeoxBlIKN6LXZXt0eGcZoYhTR09m7DoihlYvext5HU9gKWmASPziKluz1Ec/exHuLu0QYpaX1JeQhuc16UJil/5AFuHt0e61s+WfJv1iPV4Z+65SFvXObgPsLzmvsJH63cC4ybj5pZacRegx+wSVNjSaBTIpu6Wur6wfA0WjF+DrRPW4+uupxol7HWzW5eR39BjqxslTuvJFIXPI9K+xBurEuU7cjDhgd8hff1gZDbT1r82P4dMtEmYHdvS7UHTD9fiSfTF3K6na1Jyo8W1G1HhsJH67gua/lWTstWhnfbnQYnja8vjtO+0EB5T3bbq0glvu+3vF++9urLHQHRobtaWQwH5WKci5dwzgnaSTkjqiFT3GLz03lHMbd8+yC80FZ+L/VzNUvC7G4zXezpPM0ZYGY/Y5zG8+IZmTLh37GkBSvY9iccHNPONV0zOwsAPin3jUUvmI6dxYyQv2IAPZnRUxo8aj3UNHWf5AubvVceEq+NP+yDjqWxlTLo6BvIHFH0wNZC/HKOaMRGj3pITez0o3XAd2vfehGKswfyLfu0dn1xSMh8Tk126scpqHmq6SpkzJiJ3mqI9eTLml8hBjFa8/GCjcHAcBV8chzs19GZ//jWV2Lpxt/nYcvXhZvBrWNXV3ihun+BKlO54A689fDXSDFuZNAjmYlmRgBDrseW29kiUEUvewOop3yDpkfvwoN940CBodgNun/EoHrgqyVYD18SM/LD3dchs57vhJySPxqojj2BkK+1DdaRJ/oCi98dg+n2N0HnuCNwd9AATaVrG4YWnEZL+cpUJc00cTdk0rjYOv8S+r8tthIssSKjuAnw0LwcPXrYE/8pshkaRJRca2nF5Q5MKdknDzVe3gRuVKD92EJvdp+CMlZf5x7k3HjILUz+wGFuf0BlXbXgfG69tBcNLJTjDKJ1FQXc4JZ8fxr6g+SHhAkfgp9Sj/4GjxdeauTo25mB4juK/n5xEYttf43vNHKLozfExKYth+/sBhW89icnb78IDo9OCDSGTZIyd1bo09q2WazV1O66naogO7UuUxDyfIm/+G9g6bDLm9jJ/YWaZtSETy1iWAVTdf0goVx4Mz0fHr58NzM+zM0695Q3o/8j32PrP/2C3MlfCU7gOby/vgsxp/RwY9JayAfjaX4Lja6safacdeaZhqqvbNGGodWn87GMez5aPv/0pz3W/+xof3K48O3vn5q2xNw/MIDNXYiWOf1FkPv9TH0f9uqH/NKG6h/waDmEyGAtWtk48HzRG2PcZC5Bj75Wx1XLcVXaS91NOYHyxHCrTOTCW2z8H4+LAOHX/EJfAmNHQMWO6dITvc493LPVg37jCqq/eE++V+j7FpmnHkwvfWN7AZ2U1rubzjiEHNZw6Pl4t88XKeNufxddb5Hjhn31j47V5hvAKIR/sEMkQJtNPaoq+sMNSvhV79pT68jZNJ1ia7yzM8CWj4F43PT/TgBF52G7bSqpqWzKcAyFHEJkMaQknyhfHN48o0NbNY0SqOTAvIjAHwih1q7LJeRpyuF7oEA/l86nF0K3o6PZdk/6x9BG1u+BSW5fXFz5i3erYWv9YY4VP+lSRq8yTUOe8jLMxd8SvOsKy1p5uk2EJiv7QYYH+EnoPItUdXI+BfiIxMV30zCtQ5ir5+vwmQ1/RzEsJzlcon+9Pb9dOJGXnKfOe5PBIOVTuHv/8IV0s/2n1dPuT8R1EWNe62EKEtMGQEF6HSDXLSMG8dena1l2Nego7xEOnx3+qPocY94FO+m1/0lZMNAEj563XrdyXr0oXiRc/GOhP5DNCv0TjuXma/NXhXVKH719SyHAVbXD1OGLd+vbn+NqqXt9Ze7pVctpffV1q/YKPI9Udck0qw0UTx69X+jGZvm8+l//eGZyl78xkuJj6jBIy3FCThl5zdOZAmIyp8nXW6hhw5aIIGm+udjCaB3P9A5r6oO6/USulCYJg9iCsvclVKfMY1Id7lYo2jOomRWjH8hroVHUFTR5Xw6l5GJVZCPUmFjIZKqhMGi3ysHCKGOLvENSOQf8rJ7lqJyIraRhqlX5m3HR5q6e2bxxKGZvoxxmrCZn9qg+pwe3BLLRdd32jDxvPa8i1EMEXZXCMat2IVKM5aVTYh5WINMtx1HtHi8HunpqHqWDN3jMbZfOGkzcGOYna3zH5JpbfdnGi5eTxaOj2dZSaSX+RtDttse2WN+KHFeXlRNqUwM1dm2/QcQyvsVrW7asnTZur2iO2T+8irkptYTCvKAhKmPG/weG8ZyH1qPazBg9G4fpQmZjSF4ZOtDa5D+jkRNS+Q3QHJ+brR8LPfQiOoT2z3wYj0iyziJruatRTxG3bqg9UH1IDLx21NC2PLZho40fG20i30meEzLn08Qx9uaPJvWyFeCy1hWaBAKU++2kXDdCE1xxGptug/VXz2tJIUQ7t9Z3xo9uoLkNLpbpEpDuC9mf6fKlm7J9EHbh/VRUsEY/f0tpyrqFecxS+mFei9MO1eKkydEwVmqeg/TX7vUNk/qf/9BHBuTjuRmK3DuigVatJu6RkPdavKA0dooNEtG6biMqXNuK1kiqTHJWxrzMvwom10zF16lQsXnwPcq65Dndu0Y4/NIkesbM9XiHLVSZPxTIhh/so/ypW4/Emd2JKYUXATWzB6q4Rjr+OWL+9CPLT9cq7e+nGGduLW2uhyt/CC3f1x72N52Hlw72UuSJRVpPQGT0fehATji/Ec29/Wc1lI6U2uZ9GNkamvoOPn34SK69tZTy0K5KyJVyBfvP/hRebj8O1jeSSh/1w++4RmP3PTDTD+ZGP8TdEaKLbsxOvT3oS//77VOSGGRNumKTWMZLyauNZHhfjwILr0Gn05bh74TgbQ9p8fRBiNaTHUq8aIPq6E1o/iLm7+uLaxSloLId99lyOFT1X44V7E4FOF0Y0LldVGfIbth6TQ8bxyntOytWHlHkpIan5HUKGc6r3Cu/8IX8w5wdhdctkS3H43fXI690PI68wn/tgLCDSujROxdA1Jrqd15OhxhBHk75EG86zE+/9swBJA/+Im03nPmgjaI4tmWjCRnRooTvpQt08NDeanZ2CHpVHfHPzQvKqROm2RXhw70iMGtDRNyRYhmnWG/3v6YxDf12BNd7h0yERI3QI3/6id21Fu++MpW6LuoyQcFDwSNuf99kYYYYiNUWr/v/CnomHsOOKJnC5knHWEy6cN+dFDG3aCIltkwNtJ0hI6In2kTzUNyKXj5HfJzF4zeVGvTB8k27cfLRuLIo2OTGoQBnrVzmrp3/ssW893JZIueeIRSlkxcsNzZLR4Zb38O5v2+Lrrzuizfw3sajncaUSoojJr8YmL3/4ahzIm2qHyKfXOc+xFF9s2Y4Lr0+NcFyvMlEXsRlnH648nsKlmOM1HnLxTu5g9IxgUlK4dM38Ih5raJiQnFNxl2I8vIL8ezoZXviOytY8HX0e3osir8G6HlvuvRzNC+UY/wt0NzVDYRaO5ro9h5Zi4UulOD6pG85U18tX+hHf9W21vrVccz5GdenZi+0zevmMh11zkNuhpUU548Q7ZrqVhQ1WlvteYmx5HHO7AcVG860coDCvRzdaXNkPg9w29nvQ59uyD/oMbKF3jeq5uW5NNp6d2LrmK4OXXpowRocxq0ub101EuqtRT0ZlN3Qz70u0wT2H1mL1lotDDU5tIINjW3VpEM/aKZzuc3F5nyvgPm66coNJ8r4FAioTXTp/1fDYgDU7qvMqV27oEaYPrIFrS1cw+6cx1R2uLu1LNAoZu/aXhJTrVyhzUIvw7ZwsZLbch4PvtYvoGonik3EmRu7/SfM2PPC2vGJmD8TiXb4ELq3d1gmA/EqR9Nx+VKhv6LW/RY9iZEv9RaVUl+ddrB49Hyv++Cp2Va3Hlr/ejqlT/4qR5xzBwX0648eohh27hedVvdWFdKIS2qDNJb/ROQZOQ98YBPwcHXl24j+P9kJm0AoSdlJSbzi7wr9B9OzF+9Pf0EzQt5O2WZgfUJTXFz1bT8ZjScuwIYrGg+fAKPRxqRPqg/MXxzshrZduBZngIOHPPLuxaXxbtEorwrEX/2ViPDgrm9Tdq/EkZbK/KsO3OhPGXVu9r0oWun2rZgT6Du8Xt6qNWNTTDfeETSgSq5FrugKUs/KqJQz36ymch0nXXILueTfigd0GxoOyoU/oZnfKRLdBtfM1Lna6fRs/hZTXcxRfvuuuXtuWC0xYXZPNr0C3gV+GLgBRdhAH38tAWuezjL/E4SykXJkCPLkBrwW9jT2OYwe/R2JGx2p8ebShW2lk8oH2n5tSI+JkWZfhGnBYvxjqdlxPYQX7PC36kkAKyteepN4R3JPsMwnkY/PIUrcbzS5KwxCs0z3wK5ON07oh3WiBEZgZHuok5WsjKH9oWazbn8NrK8Z9Z8x0S0SWdRnK0Z6Ldfszfb4oO4gD715k3rd4NuGFK0I3wpWjRj5B38jaiDosSj+2SXUP+TUaT+8dd2qw8ZayYYsc619lON5eHSMZPOY9aIy5UX5SVNBYV2X8qn6ehFDWfPZOEjaZA+FNx2BNXLnBWJK6eZUaV6PTcFy2Wh47cyDC87Lc3SGSSdTqWt/6ydJB8zxCajrUwbDMBsH2jxSt/7rR4caCSp2ZzRHwjgXUb+AVqkHrYt621bXModsQTBs79DiofYZ6a1yUTX2USfteD2UOhFvrpomhHpprliEURrg4zIQ6Z2XzafTN/wmaA/HBODEm6e6w8zZk3OrrVglofm21u2qU10p32QoxU27AaNYmvVJ9+ae5hwU2NlPmptiZnOsvra2y+kOH5x1j3b7roHdg3k3VHvHh/HSRlLnGfBKzIt28nditRzWcZg6BsrdN2EnUMv+QjcR8c3zs1FP1dUsB6n1Ccz8JVKnxka26NI5qrtmnxbcPhZ0+0IFuo30ubNZTeN12+kCVh72x9Gpo7+IH3r057DAJxFKPoqNbKZ9mzyM5Tn2m1STqsnXi2Z4XiPR56/2bgPrntFRn81K77c/RtVW9vjMs75jqjqQNqq0j8GuuW+3brNqfL//gZwkbC0moz4OaBT/kPkQvjLogzPOET7des/xi4P3Te6juIb+GD/TqzHPNzrghKyUZXcTGHVLQA5o6MQe9AzueGjxEqjPUAzsKq7uLqjcYNS/14V4tmaIrCKZvl1nJRJ2R7tMkO/xyUfJtiahSKyFJfWBQdor07vSs5qGkHTRxXOZrh5eqLzq/fj7q7qsRbyTnm1huuIFZkMQKUbK+j2httPt0ULgwJ0r9wnQjOe1KN2HSUbxM27bysCb9jf+p9RicR1D71Hj53ANtxuslJ5a+mCmG+Hdz7x3cuWviaw9NNfsXGTDTDN8E1v994t2QzLhcMq5aNnXiunruUyE7lEVyV18vG7ly2lKxWtnhWqtTf1xt3UabGho+VOt0O6xLVb+5bjUfc95qHyGv68L3p2h2T5fcnhe5e5SdkmVmqs6QPkFRYlhWVWXob+3q1u9u3zuwUWWo1CAXU90qH1vXpJy0qGwu6Q1/sejwyFuBByeZo5qennfpFvHOIx2EXJVPanEPfkLMVXe0DlIafBIt3VYbkwb3JcqmkKZMdH1OsOTwRqbKxzRtbb+g3kPNDZ9g3aoQG/WkBtX8mrK22wf6+xKjZw9NRuq9XO0TI2KiTcd3HD3dReLAvwcE7h1JQ0TmmweU3dNlXmrfpK0juSP7FrF+XrpIV+s0JF6oZulirlvNx04f6Ms/7LWl8g26Jm30ncaya0232tYlN8N/QeULFW/KW+Vjlq7aTmWSNp4vVJ2B+5QvnnzZ428jQc9aoVpVF73mKBkQMvkisX/dSDHB+wAtgcrOfLXmocPoIjbukHwFVi4K5QtB4rgFYqW/wze4Ucg3HXtyxXP+hx55U5gpprwf2MnY12nrLjbJMuhhyRfvwdffEa9qd9BUV8+Rlaq+yQ+6Cfkesra+PVSza62ZAWGHl1plym91VmHyJqGvHz0fCcK3w7HpEoyKf1BD1MkMu/t0SNgwDtLAeXGEpj3JB+MhInNpXvADQpgkVC99o1fd4/m3LmqWPKm7ZlsVeZO3FQG2EStC0fUn7+jytEqNvK0IRc9fz9olk5ZjsuSkY+XQ3hCtmgolN5I7Ywxemv85vr7L3u54NSWN+dQNAnHbtsPgq4uaZXGoO0ylxsCLvGMANUySdZF3XdQsq4C6wzTEGHiRdwyghkmyLvLWa47iJOowpOhFAiRAAiRAAiRAAiRAAiRQLwjQgKgX1chCkAAJkAAJkAAJkAAJkEDNEIj/IUw1w4G51GMC+s9udaGodVGz5ErdNdu6yJu8rQiwjVgRiq4/eUeXp1Vq5G1FKHr+etb8AhE9tkyJBEiABEiABEiABEiABOo9gaAvEPW+tCwgCZAACZAACZAACZAACZCAIwLqgktuNbbqoJ7zlwRIgARIgARIgARIgARIgAT0BDiESU+E5yRAAiRAAiRAAiRAAiRAAqYEaECYoqEHCZAACZAACZAACZAACZCAngANCD0RnpMACZAACZAACZAACZAACZgSoAFhioYeJEACJEACJEACJEACJEACegI0IPREeE4CJEACJEACJEACJEACJGBKgAaEKRp6kAAJkAAJkAAJkAAJkAAJ6AnQgNAT4TkJkAAJkAAJkAAJkAAJkIApARoQpmjoQQIkQAIkQAIkQAIkQAIkoCdAA0JPhOckQAIkQAIkQAIkQAIkQAKmBGhAmKKhBwmQAAmQAAmQAAmQAAmQgJ4ADQg9EZ6TAAmQAAmQAAmQAAmQAAmYEqABYYqGHiRAAiRAAiRAAiRAAiRAAnoCNCD0RHhOAiRAAiRAAiRAAiRAAiRgSoAGhCkaepAACZAACZAACZAACZAACegJ0IDQE+E5CZAACZAACZAACZAACZCAKQEaEKZo6EECJEACJEACJEACJEACJKAnQANCT4TnJEACJEACJEACJEACJEACpgRoQJiioQcJkAAJkAAJkAAJkAAJkICeAA0IPRGekwAJkAAJkAAJkAAJkAAJmBKgAWGKpqF4FOPgmwORleyCy+WCKzkL/dcdxPGg4v+Aom33I+fqxr4wrmScef+zmP5+ESqDwvGEBEiABEiABEiABEigvhOgAVHfazhs+X5A4eobcfHj5+K8TScgRAXKNp2HNv9IRcfHdviNCE/BLDz0h93YOfA97KkSEFUb8Ebi03gk/Wk8V+IJmwM9SYAESIAESIAESIAE6hcBlxBC1K8isTS2CZTMR84Zz2Lnus3Y0vsMJVopDi3sgpRH+iN3/3SMbFnuO187GVveHoZ01eT0bMILXfvj5X8c1MS1nTMDkgAJkAAJkAAJkAAJ1FEC6uNgHZVP2dUi0HIkZlbstjAAjqPgi+Nwp7ZBira1JLTB+ddUYuvG3SiulghGJgESIAESIAESIAESqEsEtI+EdUk3tcaEwA8oen8Mpt/XCJ3njsDdLRMAz1Ec/exH09wqdx3FwQhGMcl5FlZ/48ePDxvEyl9Gtgpj5c80QqvAipmVP5mSaSiBYBerNmTlX1NtrKbyiZfyUkdk7ZTtI5iXHR6hMegS7wQ4hCnea6iG9HkOjMIfL5qPPADuwc9g+Yy7MKDVr4CS+Zh40SjMGbQJX8/sgSS/niPYPL4Len7+ZPDQJsU/nKGQnZ3tT4UHJEACJEACJEAC9Z/A7Nmz638hG1IJ5RwI/pGAn0DVLrExO0kgaZSYcuykECdyRU4ShHvCJlHkDyQPDotN2S0Eei8SW6qCPMKeAAjrLz2zs7PDhrHyZxqh+KyYWfmTKZmGEgh2sWpDVv51qY3VJa31iTvLEtk1V5faaXDJeFYXCHAIU0OyFu2UNaEzej70ICYcX4jn3v4SnuYpSOngthOTYUiABEiABEiABEiABBoAARoQDaCSnRTRlViJ418U4URCG7S55DemSYRMrjYNSQ8SIAESIAESIAESIIH6QIAGRH2oRYdlkPMe+rguR0bedyEpiOOdkNarM05HIlq3TUTIZGnPUfz3k5NIbJuMxJDYdCABEiABEiABEiABEqivBGhA1NeatVGuhPaT8I9//B+2vrQOm8qUpZQ8u7Hp79Px5IBsPNj9dAAtcGHfQRi2+XGMeu5z3+Zynr3Y/vho3PPeODzYvx04wMkGbAYhARIgARIgARIggXpCgAZEPalIZ8Vojcv/9g629l6H5SmNIFdOcjWagOnnLsWG3MHo2dzXPBJaj8CEf/VC35e74ExvmItx9f6heODdv/qWenWWOWORAAmQAAmQAAmQAAnUQQJ8eVwHKy2qkhM6ouug1eg6CFhmmnAS2v8pFzPlP9Mw9CABEiABEiABEiABEmgIBPgFoiHUMstIAiRAAiRAAiRAAiRAAlEiQAMiSiCZDAmQAAmQAAmQAAmQAAk0BAI0IBpCLbOMJEACJEACJEACJEACJBAlAjQgogSSyZAACZAACZAACZAACZBAQyBAA6Ih1DLLSAIkQAIkQAIkQAIkQAJRIkADIkogmQwJkAAJkAAJkAAJkAAJNAQCNCAaQi2zjCRAAiRAAiRAAiRAAiQQJQIuIYSIUlpMhgQsCcjN6rKzsy3DMQAJkAAJkAAJkED9ITB79uz6UxiWBJAGBP9IoKYIwEaTy87ODivHyl9Gtgpj5c80QqvAipmVP5mSaSiBYBerNmTlX1NtrKbyiZfyUkdk7ZTtI5iXHR6hMegS7wQ4hIlWJAmQAAmQAAmQAAmQAAmQgG0CNCBso2JAEiABEiABEiABEiABEiABGhBsAyRAAiRAAiRAAiRAAiRAArYJ0ICwjYoBSYAESIAESIAESIAESIAEaECwDZAACZAACZAACZAACZAACdgmQAPCNioGJAESIAESIAESIAESIAESoAHBNkACJEACJEACJEACJEACJGCbAA0I26gYkARIgARIgARIgARIgARIgAZEQ28DZfnIezoDGS4X5C7RLlcndJz2NvLLPBoylSjfOx/Pj00OE0YTnIckQAIkQAIkQAIkQAL1lgANiHpbtTYK5tmJtfddj747/4K7C07KXclRVZCN4fszce3Y17FbsSE8BdMx5pK1WNFtM74VAkJsx4Zuz6D/BU9gTbnW0LCRJ4OQAAmQAAmQAAmQAAnUaQI0IOp09VVPvOfQUixc3h5pg27FgFa/8iaW0Gooxk7JQo/Fj2LMxu8AHEH+U09icY+BmNK/PRK9oZoiudf9mHHxQxiz8hAqqyeDsUmABEiABEiABEiABOoQAXcd0kqpUSaQ0D4X64VZokU4+NV38HgKcfSzH+Hu0gYpWnMzoQ3O69IExa98gK3D2yNd62eWJN1JgARIgARIgARIgATqPAE+9tX5KoxVAdJw89VtYNlAPj+MfUHzJWKlh+mSAAmQAAmQAAmQAAnEAwGXkAPf+UcCKgE5L+KODNzqXo6Pn++HzglHsHl8F/RJeA1fz+yBJH+4TVjc+zoM3zcBufunY2TLYFNDTsg2+8vOzjbzojsJkAAJkAAJkEA9JDB79ux6WKoGXCRpQPCPBHwEisT++Z2FO22KyC046YdSdWyKGObuKXrmFYgK6Vq1R2yf3kVcldpCIGmSyD1R5Q9rdQDIudrh/7Kzs8MGsPKXka3CWPkzjdAqsGJm5U+mZBpKINjFqg1Z+ddUG6upfOKlvNQRWTtl+wjmZYdHaAy6xDuB4NfGDdiQYtGLcWDBdeg0+nLcvXAcRiqTqiWXhNYPYu6uvrh2cQoay6Veey7Hip6r8cK9iUCnC9GhOZsR2w8JkAAJkAAJkAAJNBQCfPJrKDUdrpyevdg+o5fPeNg1B7kdWupCu9GswzhMXFnuXepVbHkcc7sBxV8chztVN7laF5OnJEACJEACJEACJEAC9YsADYj6VZ8Rl8ZTOA+TrrkE3fNuxAO7jYyHUhxaeCEa52xGsTZ1z1F8+a4bab06B+ZFaP15TAIkQAIkQAIkQAIkUC8J0ICol9Vqs1DlK/HEbdl47MgITHlxKqZepP/yINNpgQuv6YMesx7H4A2Fvj0fPHuxc+F0PHzeQsztdYbNzBiMBEiABEiABEiABEigPhCgAVEfatFRGUpx6OWHkLO1EijOxSNnN4FcOUn7T/3qkNB+JpZ80BFdprXxzYFodD9yMAMbVv0FndmCHNFnJBIgARIgARIgARKoqwS4kVxdrblq626BdiMOQ4ywk1BTJHefg5nvzcFMO8EZhgRIgARIgARIgARIoN4S4Pvjelu1LBgJkAAJkAAJkAAJkAAJRJ8ADYjoM2WKxxpNOwAAIABJREFUJEACJEACJEACJEACJFBvCdCAqLdVy4KRAAmQAAmQAAmQAAmQQPQJ0ICIPlOmSAIkQAIkQAIkQAIkQAL1lgANiHpbtSwYCZAACZAACZAACZAACUSfAA2I6DNliiRAAiRAAiRAAiRAAiRQbwnQgKi3VcuCkQAJkAAJkAAJkAAJkED0CbiEECL6yTJFEjAmIDeqy87ONvakKwmQAAmQAAmQQL0kMHv27HpZrgZbKGlA8I8EaooAAMussrOzw4ax8peRrcJY+TON0CqwYmblT6ZkGkog2MWqDVn511Qbq6l84qW81BFZO2X7COZlh0doDLrEOwEOYWqwpiMLTgIkQAIkQAIkQAIkQAKRE6ABETkzxiABEiABEiABEiABEiCBBkuABkSDrXoWnARIgARIgARIgARIgAQiJ0ADInJmjEECJEACJEACJEACJEACDZYADYgGW/UsOAmQAAmQAAmQAAmQAAlEToAGROTMGIMESIAESIAESIAESIAEGiwBGhANtupZcBIgARIgARIgARIgARKInAANiMiZ1a8YZfnIezoDGS4X5CZvLlcndJz2NvLLPEHl9BSuxOKxyUqYZJx5/zKsKfglKAxPSIAESIAESIAESIAE6j8BGhD1v47NS+jZibX3XY++O/+CuwtOyh3eUFWQjeH7M3Ht2NexW7UhyldiVt97MPf321AhBIT4Ap92y8XAAc9gTbkayDwb+pAACZAACZAACZAACdQfAjQg6k9dRlwSz6GlWLi8PdIG3YoBrX7ljZ/QaijGTslCj8WPYszG7wBUonTbIjy4dyRG9D4bbm+opmjVZyjGbV+K+R/8L+J8GYEESIAESIAESIAESKDuEvA9D9Zd/VReDQIJ7XOxXpglUISDX32HSpxqFgDAfiXMGYphESYovUiABEiABEiABEiABOoFAX6BqBfVGItCpOHmq9vADTdadB+O6R3nY2HeMVR6s/oBRTvWYelpj2LugHY0HmKBn2mSAAmQAAmQAAmQQJwS4BeIOK2YWpPl2YnXZyzD5mHLMavdKT4ZzQZgwqqt2HxRGzT2C8vEyP1/RWYz2qB+JDwgARIgARIgARIggQZAwCXkzFn+kYCXQDEOLLgOnVbcjLmrJmOkd15EJcp3DMEf036NzrvmILdDS++8iPJ92binSylafvKU4haMUK7oZPaXnZ1t5kV3EiABEiABEiCBekhg9uzZ9bBUDbhI0oDgHwkIUST2z+8s3O5hYuTeExogh8Wm7BbCPWGTKNK4CmHmHhQo5ASQiz2F/8vOzg4bwMpfRrYKY+XPNEKrwIqZlT+ZkmkogWAXqzZk5V9Tbaym8jEtb9lBsWnNLDEkCfIFoPdf0pBZYs2mg6IsGKllX1jrZdHoNS2vEsbKn2XRwLTJLF6YhiqnS7wT4PiTBmw8+ovu2YvtM3qh0+jLcbf/K4PiW7Ie61eU+oMGDhLRum0iKl/aiNdKuJRrgAuPSIAESCB2BDzFGzD5z+nomTkBy4sD+RQvn4DMnun48+QNKGaXHADDIxIggZgQoAERE6x1J1FP4TxMuuYSdM+7EQ/sVocoafS37IM+A1toHNTD4yj44jjcg3rh5pZsRioV/pIACZBAzAh4DmDp0CzMyC9G0pBnsKPIt3+PKDuIvFlDkIRi5M+YhKfy5RLc/CMBEiCB2BHgJOrYsY3/lMtX4onbsvHYkRGY8uFUTG3t2wsiWPi5uHLYUPTt9Qampydj6p/aIxGVKN83D0vnXoWbt3ZBUnAEnpEACZAACUSdgAel+cvxYF4xkD4H/869F5epi1g0a4dr75+E6ftbATfcgj+mnxH13JkgCZAACWgJ8NWxlkaDOi7FoZcfQs7WSqA4F4+c3QRy4rP2X+OczSiGG806PIGXNrTDJXk9cKY3TGOc9ti5uHzXKqzuGm6fiAYFlIUlARIggRgS+BFffLINctTSBX3/gFTVeFBzTGiPYYsexbAbL0MS7+wqFf6SAAnEiAC7mRiBjf9kW6DdiMNyRrPpv4qZPZSvC2406zgSdz1V5A9bsfx+jPauyBT/JaVCEiABErBLYOnSpXj55Zfx2Wef2Y1SQ+G+x1efH5PmA35//pncf6eGqDMbEiABYwI0IIy50JUESIAESKCBEZDGwx133IFvvvkG6enpcWhEyAr5Ed+c+AGcJ93AGieLSwJxRoAGRJxVCOWQAAmQAAnUPAHVeFBzLikpiTMj4jSc2+lsAMU48j8aEGo98ZcESKB2CNCAqB3uzJUESIAESCBOCOiNB1VWfBkRv0HbLt29w0qPrPsPdpXrv0F8h82Tx2L2K/k4FOKnloi/JEACJBAdAjQgosORqZAACZAACdRBAmbGg1qU+DEiEtDiyptwf3oSkH8//jxqAT4s/sUn01OMD5/MxqAZczEhcyD+uvoQhzipFchfEiCBmBCgARETrEyUBEiABEigLhB46qmnLGVKI0IaGrX+1+xK3L9iGSalJ6F4+X3omqysntcoGV3vX+5doSlpyAzM7d8OvLnXem1RAAnUawLsY+p19bJwJEACJEAC4Qjk5+cjNTU1XBBkZWXBjqERNpEoeSYkXYtH/52PTWtmYYh2E570HCx6/SN8vCQL7fVLvEYpbyZDAiRAAioBbiSnkuAvCZAACZBAgyNw6qmnQhoRctWlXbt2hZRfGg9x8fVBq6xZO/T4y3jvv2Vadx6TAAmQQA0RcAm5EQD/SKCGCMiN6rKzs2soN2ZDAiRAAvYIVFZWYvPmzfj888/9EXr06IFLL73Uf84DEiAB5wRmz57tPDJjxh8BaUDwjwRqigAg96IL/5ednR02gJW/jGwVxsqfaYRWgRUzK38yJdNQAsEuVm3Iyr+6bez7778Xqamp8qWayMrKChanO7PSYuVfXa2qHKt8rPypQyUZ+LViZuVPpgGW6pEdZmpY/tYNApwDEX82HRWRAAmQAAnUAgF1ONMtt9wSf8OWaoEHsyQBEiABMwI0IMzI0J0ESIAESKDBEZBGRJs2bRpcuVlgEiABEoiEAA2ISGgxLAmQAAmQAAmQAAmQAAk0cAI0IBp4A2DxSYAESKCmCBw9erSmsmoQ+cjVofLy8nDixIkGUV4WkgRIIH4I0ICIn7qgEhIgARKotwQKCwtx3nnncW5BlGpY3UFbrholl6ClERElsEyGBEjAFgEaELYwMRAJkAAJkIBTAvJhd9WqVd7od9xxB40IpyCVeKrxoCYj96+gEaHS4C8JkEBNEKABUROUmQcJkAAJNFAC+oddiYFGhPPGYMRTpkYjwjlTxiQBEoicAA2IyJkxBgmQAAmQgA0CZg+7MiqNCBsAdUHC8ZRBaUTogPGUBEggZgRoQMQMbR1JuCwfeU9nIMPlgtwl2uXqhI7T3kZ+mcdXgJL5mJis+hn8Jk/G/BIlbB0pMmWSAAnEnoDVw65UQCMisnp46qmnLCNII8JOOMuEGIAESIAEwhCgAREGTr338uzE2vuuR9+df8HdBSflFtGoKsjG8P2ZuHbs69gt7YKWI/F4kfD6SX/fvwqUbR+AdPRF5ms5GNmSzajetxUWkAQiJPDZZ5/ZimE3nK3E6nmg/Px8pKamhi1lVlYWpk6dGjYMPTUEitciy/8CzfeS7IknnvC+UEvOmo1XNh9CuSY4D0mABHwE+OTXgFuC59BSLFzeHmmDbsWAVr/ykkhoNRRjp2Shx+JHMWbjd8Z0ytdg/ri12DvjIeR2PdU4DF1JgAQaNAH5Flw+zIb7k/58Wx6OULCfulO2mREhecovP/yLDoHi5ROQ2fMWjFq8h0ZEdJAylXpEgAZEParMSIuS0D4X68VH2NL7DIOoRTj41XeoDPEpwEfzcjDx6P2Yeu8VSAzxpwMJkAAJ+AjIh1kzI4IPu85aiZkRQZ7OeAZijcCrRRWBr+1VRfhoaQ7SsQfLh0/D6kM/B4LyiARIADQg2AhMCKTh5qvbwK3z9RS8gAVTfoPOc0fgbg5d0tHhKQmQgJ6AkRHBh109pcjO9UYEeUbGz1bohCRcljUJs2f1BbAGDy76AKW2IjIQCTQMAi4hB7XzjwRUAnJexB0ZuNW9HB8/3w+dg0zMUhxa2AUpj/RH7v7pYec+yAnZZn/Z2dlmXnQnARKopwQ+/fRTbN68GT169MCll15aT0tZs8WqrKzEf//7X7Rt27ZmM64nuc2ePRuQcyCSb8FyyC8Qz6BfUvBrs8qPZ6P95RNwpPciHHx7GJ7LGV9PSl/zxfDyrvlsmWOsCEgDgn91gICnXJSUVwUL/fFD8c5Lu8XhH3XuwaEiOCsS++d3Fu60KSK34GRovKqN4oWMJiJxxnbxbaivLRdAfiEO/5ednR02gJW/jGwVxsqfaYRWgRUzK38yJdMlS5aEQtC4WLUhK/+aamM1lU+8lLde6yh6VQwBBDBCvFpUoWmNvsOKj2aJC6T/BbPER4p3veYRQqBm7qcG2dIpzgkEvV+OlZHCdKtDoBzfbpuACT2S0XnNl9AumOo5vBDTB3VG2z+Mwaht/4fqjdAsxoEF16HT6Mtx98JxGKlMqtYq9xxai9VbbkDmTamc+6AFw2MSIAFbBIYOHWorHAPVPwKFhYW45JJLcOLEifpXOJaIBBogARoQcV3pP+PbzYNwW+/ZmJ3fFOXfl+FHv14PfjnlYtx01zk4/6NnML/3CGTt+J98jRL5n2cvts/o5TMeds1BboeWBmmU4vC765GXdCE6JvlWbDIIRCcSIAESIAESCCIg58GsWrWqbm90d8HpaM4npqB65UnDJsDLIZ7rv/QlPHPvG9iSdCfu/M+HODL2UjTz603AKW3HIvu5A/hw2xDcgH9hzYzXkV8RmQnhKZyHSddcgu55N+KB3WbGAwDPTmxd8xXcg3rhZk6e9tcCD0iABEiABMwJSONBbhio/tWt3bJ/xpe7PsQRAEmXtMFZfGJSq5G/JMBVmOK3DXjwwydrsfTQ+Wg3ZRIWXt0aLQ3nJf8ap3ebhuzRp0H8azP+/fUv9otUvhJP3JaNx46MwJQXp2LqRUZfHpTkyg7iwLtAYttkDl+yT5ghSYAESKDBEtAbDyqIumFElOLQhgX4x4NrAGRi+vCr0EItAH9JgARoQMRvG6hA6bf/h2M4G6kXnmlRUWehbep5AApR8F2FzSKV4tDLDyFnayVQnItHzm7i3XlTrp6k/mucsxnFNlNjMBIgARIgARJQCZgZD6p//BkRC3FLcmP//c/laomU3vdjefHFGLLoYfRvd4oqnb8kQAKAxXMpEdUigQQ0adoUp+EkSn+y+qpwEmXflwA4BU1+ZfiZwqAcLdBuxOHApjlChBxXzOyBJDVmy5GYWVGBorvah+wNoQbhLwmQQM0T+Pnn6i2fUPOKmWNDIGBnh3FpROTn58ctjqQhs/DqR3lYMuxizfDhuJVLYSRQowQ4oq9GcUeSWWOcdvHv0ce1Hf9561N8FS5qxXb8581jQNKl6H7+r8OFpB8JkEA9IiDf8ubm5kL+8o8E4omANAxSU1PDSlqyZAluuummsGFi7pnUD8sMXqDJLbKKlo1Hv8uS+KY15pXADOoiARoQcVxrrnOG4s77T8NPsybg+nlbsecn7SKuUnglfv6/f+GVCXdg3Ju/w1njb8EATnCO4xqlNBKIHgHtEBE5SZVGRPTYMqXqE9Dvlq1PURoP8bqs7/jx3CxOX188JwE9geAtF/W+PK9dAq4U9JiyFC98czvuHHM1Oj1wGc75SwaurPwG5yQex48HPsGGt4/jCJrhlEFPY8ldl+C02lXM3EmABGqAgNZ4ULNTV7qJ14cyVSd/Gw4B1YhIT0/3LuGqljyejQdVI39JgATCE+AXiPB8at3X1fzPGL7gbeTNy8CfEj/B10tn45WXXsKcJ9fj2bd/QsHv70b/F/Oxe3EWrmveqNb1UgAJ1D0C5fh4doZm8qQLTzzxROA8YyKWfVwctIljbZbRyHhQ9fBLhEqCv/FCQDUiOnXq5JVUF4yHysrKeMFHHSQQtwT4BSJuq0YjrPnvce1fN6PXnQUo+O9efLq3FCebnIvWqRei4zmno4XdedOaJHlIAiRgk0D+TAy9fC+Of/QSxl92qs1IsQkWznhQc+SXCJUEf+OFgDQievTogWnTptX+nAcLKPIL3ieffOLdMVvq5h8JkIAxAX6BMOYSl66uX7fG2R364IbMTGTecCW6n0vjIS4riqLqKIELMOTVr4NXI6s6ileHXQxgHeas/gSldaRk8byyTR1BSJlRJuB2u+uE8bBs2TJ8/vnnkMOuTpw4EWUKTI4E6g8BGhDxWpeiEHuWD0f//v3Rf8jTWFRwMl6VUhcJ1F8CCa3Qve/vveUr/uYEfqjlksq3o3IISLi/rKwsTqgOB4h+JGBAQF5b0nhQ/+JvnwpVGX9JID4IuIRcq4x/cUbAgx+3ZWNU5YNYfPVv4ap4H4uzvsEVL9+CTnV8uJLcpC47OzvOeFNOQyYwe/ZUfDz7z7h8wjEMeXULlvU7O4CjfA8WjxqA4cuBYa++ief7netd0rG2V2kpLCzEqlWrAjqVIzlM5NJLLw1xpwMJkIA5gU8//RSbN282DCDnbsjrSn5B4V/1CMyePbt6CTB2fBGQBgT/4o3ASfF/q+4Uk4/+oggrFO/dPkf8qzLedEauB5AjRML/ZWdnhw1g5S8jW4Wx8mcaoVVgxczKP36ZlomPZqXLFykm/y4WQ+ZsFUVVwUysymvlX10eS5YsCdKblZUVLFA5i7UONVOrfKz8q8ujJnXUJa31iXssyiKvG/Nr39cnpKamiu+//15tYpb3F7YPPyr/gZ268wfmQZ0gwCFM8WXPKWp+hcRrr0Gjh/6Fd44cxeH8OXimRx9cw0WW4rK2KKq+E9iD5bOew6qP4mclJklcO5yJw5bqextk+WJB4OjRo3j99dctk473HbMtC8AAJBADAjQgYgA1Gkm6Tr8dDz91BsTbL+NN9xgsvKMDWkYjYaZBAiRgQsBgErUowcFXJyG9eDnuv+lp5JfqN3M0SaqGnKURMWzYMM55qCHezKZ+EWjTpg3kggMtW4a/u8p5R7W+Y3b9Qs/S1AMCNCDithJdcJ+ejj/e9wDGpp2NlnV87kPcYqYwEghLoAXa3XAL+l4AoHgbPvnix7Cha8PztNO4fWRtcGee9YPAJZdcEtaIiPd9K7hSVP1oh3WxFDQg6mKtUTMJkEANEfgFxf95E+uOyOxScH7yKTWUL7MhARKoKQJmRkS8Gw9y8jeXm62pVsJ89ARoQOiJ8JwESKCBEjiC5becE9iB2uWCy9UEyT2nIh9JSJ81DL2TuBJLA20cLHY9J6A3IuLdeJDDF+XKUVxutp43zDguHg2IOK4cSiMBEogDAklDMOvVf2PF/VeiWRzIoQQSIIHYEFCNiMGDB3sXKYhNLtVPlXtWVJ8hU6g+Ab5Oqz7DmKVQ+ckdaHN/U1z15z/guvSuuD71HJzp5mSImAFnwg2UQDNcNn4LxPgGWnwWmwRIwE9AGhFnnnmm/zzeDvTGg6pP/RIhJ4WfeuqpqjN/SSBmBPgFImZoq59wwm8vxh3NXsLb42/F8Mvb4Hftr8NlE5/B1H/txI7/97N3gerq58IUSIAE9ARqe6M4vR6ekwAJkICZ8aCSUY0ITqxWifA3lgRoQMSSbjXTTjg3G39/8zsc/+Y/+OD1yZhz/bdouWY0HrnpSnQ7ozN+d8t4DH7mNbz0eSGOV8q9cBz8leUj7+kMZHjHe8sx353QcdrbyC/TLVfp2YudCzThMiZizPYiVDrIklFIgARIgARIgATsE+CeFfZZMWTNEKABUTOcq5GLG6f87mp0v/EfGPfUp9h8qBD/3bYAL8/ugFtKn8frf+2HwZ1b43dd+6Fbzlrk/xSBIeHZibX3XY++O/+CuwtOyi2iUVWQjeH7M3Ht2NexW7UhPDvx6u0ZGOqah9VCQIgiHBjxMXZ3H4sxB36uRtkYlQTil8Bnn30Wv+KojARIoEER4J4VDaq660RhaUDUiWrSiHQnoU23ezAw+3Us2PB/KPp6E/JXjcdjXQ8hYd47yP++ShM4/KHn0FIsXN4eaYNuxYBWv/IGTmg1FGOnZKHH4kcxZuN3ACpRumkSbntlOEYN6IhEb6gkpNy2EA9lr8dziz9Acfhs6EsCdY5AYWEhLr300rieSFnnoFIwCZBAtQiok7zNNr6L95WjqlV4Ro47ApxEHXdVEomgU9D87B645lb5bxYmzCpF+W/sV2lC+1ysN/1gUYSDX30HD0rw0fqdwLjJuLml1t68AD1ml6AiErkMSwJ1gMDSpUuxatUqr9Jly5Z5f6Ub/0iABEigtgmoRoTc/6GkpMQvJ56NB9l/vvzyyxg0aBCkfv7VDwLaJ8L6UaIGXApX0xZoHrVFmtJw89VtkOA5iv9+chKJbX+N798ahZyrG3vXyW88ZA7m7Qt0Xg0YO4tejwjIG90dd9wRVCJpRMjJi/wjARIggXggoBoRZ511lldOvBsPsk/95ptvvJvecWhoPLSg6GhwCTnwnX8koBKQ8yLuyMCt7uX4+Pl+6Fw2HzlnjMGi889Hkz8/gw0zr0XHhEqU78vGPV1+wYWH52Jqa9/wJzUJ+etymVsy2dnZ2qA8JoG4ICCHLalfHowE9ejRwzusyciPbiRAAiRQ0wTKysrw008/xe2ys0Z9qhx+JZea5ZeImm4tMchPGhD8IwEfgSKxf35n4U6bInILTvqcTuSKnCQI9F4ktlRpOR0Wm7JbCPeETaJI62xxDMi52uH/srOzwwaw8peRrcJY+TON0CqwYmblH89MlyxZIl+kWP7Lysryg7Eqr5V/PPPwF1I5YFn0RNjH6IlYtRErf5meVRgrf6ahr5XaYxquT23ZsqX49NNPQ8XSpU4R4BCmGBhldTPJYhxYcB06jb4cdy8ch5HKpGq1LO7UNkgJai2JaN02EZW7juKgulqTGpi/JEACJEACJEACDZKA0VBQLQg5d0PO4eBwJi2Vuncc9EhY9+Q3PMXip93YvnI0pgy9HB27P4ZF/yvHgRVjMXXnN3C8oKpnL7bP6OUzHnbNQW6HlgGwLfugz8AWgXMekUA9JCDnOMhxxOH+srKywMnU4QjRjwRIgASAp556yhKDNCLYn1piiusANCDiunqCxYn/Lcfsft3QfeDTmLbsY+zbfhTHfv4eX32wCI/0GIab845FbER4Cudh0jWXoHvejXhgt8548GZ/FlKuTAGe3IDXSrSfGo7j2MHvkZjRER3ZioIrimd1kkA4I4LGQ52sUoomARKoBQJyjkNqamrYnGWfasfQCJsIPWuVAB/9ahV/BJmLg9j86DjkbP0T+m/+HO8+6tuRATgLPSZNRU7KeryT/RJe+TGCOfHlK/HEbdl47MgITHlxKqZepPny4JfWFK3+NA7/uOJJTF2wE8e97j+g6P3pWDK/P0YOulTZG8IfgQckUGcJGBkRNB7qbHVSOAmQQC0QOPXUU70Tpc2MCPaptVApMciSBkQMoMYkydJNyFvxPyTcPhR/Tz8Hv/EvcuRC41Z3Yfhd5wF7diD/yE82sy/FoZcfQs7WSqA4F4+c3cS7cpJcPUn91zhns2+TuGYDkLP+Hbz4yzCkev2b4dyFnXDlJ48ZrsBkUwCDkUBcEpBGxG233ebVxhtdXFYRRZEACcQ5ATMjgn1qnFdcBPLs7zoWQaIMGgMCP3yLb4qBxuefhfNdJ/FZUBZN0Pw0+fWgBKU/aocZBQXSnbRAuxGHIUbonM1Om6ejz8N7UfSwWQC6k0D9IdCqVSts2bLFO9Gv/pSKJSEBEiCBmiOgGhFywvSuXbtA46Hm2NdETvwCUROUo5FHywvQtqMLv3x6GLvEKboUv8Tu974AmrVHh9ZNdH48JQEScEJA3vT4RwIkQAIk4JyAakTccMMNnDTtHGNcxqQBEZfVYiCqaR/cNOJCNF01E0Of/g+OllQB+P/t3QlYVOX+B/Dv4JCWCN1bmICWuRK43bSrdjXBvfTWtcQtF9IEL5ZLU5jZFbSFNMwt9KrXfSusbLlmGCCWt1T0b6LgXposXvGqLFbGMO//OcOAM8wKzoxzDt95nnmYOe973uXzvsD85pz3nOu4dPYgds4bjhffF2gw6gkMDfS2sDM3UYACFKAABShAAfcLSEFE69at3V8xa3SpAE9hcimvMwtvjHaTkrE9bzCGTB2MCH3Rm7D8sU1YDh80GPomVs59HO2q1kY4s26WRQEKUIACFKAABShAgQoBBhBymQm6PVgX9gK2jtuMb74/jmNp3+GLI79BFRKOjn8Ow9j+wWiqZvQgl+FkOylAAQpQgAIUoIBcBRhAyGXkLu7G7u+OIePx+mjVbRL+1G0Sxsil7WwnBShAAQpQgAIUoIBiBLgGQi5D6R+Ox0c3QtmBA/jsv7+iBnd7kEsP2U4KUIACFKAABShAARkI8AiEDAZJ38R6Prg3sAlabZqKMU3eweSw7mh66YRp633H4KUdr2DCH+uZbuc7ClCAAhSgAAUoQAEKOElAJYTgl9lOwnRpMeWfYXGXIZj2g43h8nkRCWcX4tXGnhtASDep02g0LqVi4RSgAAUoQAEKeJZAYmKiZzWIrbk1ASmA4IMC7hIAYLcqjUZjM4+9dGlne3nspbMM8yGwZ2YvnaY0NRcw3WJvDtlLd9ccc1c9ntJftqNm85Tzw9TLEQ/zPbjF0wW4BuLW4i/uTQEKUIACFKAABShAgTolwDUQchlucQk/ffMNDl6ycQpT/WA8/Hg7tPTm5VzlMqxsJwUoQAEKUIACFJCbAAMIuYxY+R58PGEYXjlrq8HRiMt7H/GBHFZbSkyjAAUoQAEKUIACFKi9AD9p1t7OvXvW64SwmXMQd0FnUm+zey7hYtYOrF7dDH94awgG/MFzF1CbNJxvKEABClCAAhSgAAVkKcAAQi7DpmqNLhNmo4vF9h5HlwZd8cSRy9DxbtQWhbjN8Ge2AAAgAElEQVTx9gv88MMP2Lx5M9q1a4fIyMjb3yC2gAIUoAAFKECBWglwEXWt2Dxtpxbo0LM1dB9uw9oTv3ha49geCkAKHsLCwnDx4kU899xzWLduHVUoQAEKUIACFJCpAAMImQ6cSbO1J3Fk3zmTTXxDAU8RqAweioqKqprEIKKKgi8oQAEKUIACshPgKUxyGbLy3dg8fArePm66BuLOOwXuV/+E7ft/g6pvH/y15Z1y6RHbWQcELAUPld2WggjpwdOZKkX4kwIUoAAFKCAPAR6BkMc4ASjG5bPZyMnJMXkeOnQc27NDcf/zS7ByXRSeuquGl3AtycCupeEIV6kg3SVapWqP0Lk7kVFiHKgU49SKVob0ynzSz0AErjoBrWwM2VB3CtgKHirbwSMRlRL8SQEKUIACFJCPAAMIuYyVVwj+8kI85uw8jWtCSLdzvvksOYATsXeiNH4Dtl0pd7xHukx88sJgDMociqjcG/ryynM1mHA8Av2mfYqsqhiiEBdOXkXAyuMoM65X5CN/YjB4GMtx8rqUU1rnYHzakrW+L1q0yFoSt1OAAhSgAAUo4IECDCA8cFAsNqn8B2QkxCFuaxZyzTLcQOGBJZj+ry3YdvpXs1RrG3Sn1mHFhmD0GD0cI4Pu0GfzCorEtLhx6L3mbUxNvVyxa1EKUpYGoe0D9zJYsIbJ7WYCUmAwbtw4s+3GGzp27IiMjAzjTXxNAQpQgAIUoICHC/DLY08eIJGFL6IfxZOrrt9s5dln0G7Dzbcmr3xGo+k93iabbL3xCk5CitUbW+fj5PnL0OJeeBVk44g2GCH3+9gqjmkUMBOovNrS+vXrzdIqg4e7777bLI0bKEABClCAAhTwXAEGEJ47NoCqPQa+Eou/H/0QufcUI39PLg7dF4aWzeuhfkGBactbhqPz2Ml4tWV90+21ftcDQ3o2hxpaFF84iXR1ILpt7YzAuTmQalaPmY9Zk57F648G8qhErY3rxo6WgggGD3Vj7NlLClCAAhRQpoBKSCfT8+H5AuWfYXGXIZje9XOc/OdgtHZVi6V1Ec+FY7h6Aw6tehodvKQF1A+j7QdjkLRpJmL0pzppUXr8TczutQe5X2xHclfzb5ClBdnWHhqNxloStytY4PDhw0hPT0f79u3Ru3dvqNX8/kLBw82uUYACFDARSExMNHnPNzIXkAIIPuQioBNlRYfF/s+SRXKy6fObL+aLpWOWio3/095CZ/LF8WUdhLpHnEjKvWGnnDMiTeMr0H+12F1uJ6tRMiCt1bb90Gg0NjPYS5d2tpfHXjrLMB8Ce2b20qUSn3nmGXH16lXzwg1bHCnDXh576VJV9vLYS2cZ5kNoz8xeupxM5dRWJbmzL6a/d0ryMO0Z38lBgF8ByiYA/B1X9z6HcWO34oufrBw08nkRCbUO8AtwYvlAtJ/SBVFHphuONNjC8UfT1v7AljPIKdEhzI/r8W1pMa1CoHnz5uCaB84GClCAAhSggLwF+KlPLuOn+xbb45PxRWF3hEydiol/8QZ8wvHwS1F4vnsDAGEI/+BlTGtcr+Y90mVjX0JfQ/DwHpJC/GpeBvegAAUoQAEKUIACFKgTAgwg5DLMlzNxYL8WXs/OxPaF8/DqhJZA6b3oNnExVqZsxKInvsf3nx/BGSsHJ6x1U5e3BDN7dUL3XU9hVpaF4EGXhjV9veEdm65fPH2znELkni6EenRfDOHRh5ssfEUBClCAAhSgAAUULsAAQi4DrP0Nv5YC3i2a4AHVHbjvwQfRDD8i5+dSqBoNxF+HPojfVn6INT/ecLxHpVuxYIQG75yNRtzGeMQ/ZOHIg1cvDHsrAt0WbsabOUWGsrUozVmCNe+PwqwpPRDgeI3M6UQB3ak1GKBSYcGCBVCpumBGuuG+HU6sg0VRgAIUoAAFKECB6gIMIKqLeOp7v2Z4oBlQ9uNFnBcq3NnkQTyES/gp/xoE6kF9h3T/hzzkXi5zsAfFOLX5H4jdqwUKkjCnWX1IV04yflYcdVDDp+sqfLinGe5/I8iQfj9a/Ks9Hj30DuKbVtyAzsFKmc1pAr/hzN6vsKuqvEOYP+9znKq6e3hVAl9QgAIUoAAFKEABpwowgHAqpwsLa9gbfUffA93mBDyTuBeFTbuhZ2guft72IRLStmD7p6cBnxZo2cTRD/S+aBN9RrokktVn2fzehqMLDRH4aDxmbC015M3HpfeeR0yohSMWLiRg0UYCunPY++FeAJ3x0srFGC8dBtr1Ffae+c0oE19SgAIUoAAFKEAB5wswgHC+qYtKfBA9p76Ld/tl4VjqKRy/KwLjFwxG2DevY1bf5zHtI380fvk5/P1+RwMIFzWTxbpFQHfmO3y4qwAI6I9Bw0fg2TGdAezFh3vPgQch3DIErIQCFKAABShQZwV4GVcZDb3qvufwcvJAPJFVDy28GqDBgA/x8cHt2PnhRfz3L3/D6N4t4G/9/m0y6imbalvg5ulLAWP6oovvvcCA/giYn4BdG3fi8LA26OzD7wZsGzKVAhSgAAUoQIHaCvBTRm3l3L2fbg/W/aU9BqwtgO+fGkO6cCtwJ/7QdhRGzX4J0/sweHD3kNy2+oxOXxozoAN84QXfLn0xRjqNKWMzkg9cuW1NY8UUoAAFKEABCihfgAGEXMb44m7s/u4YMv77O/x4lEEuo+aCdupQengnNhpOXxrQ5Y8Vdfh2wAD9aUyHsDElC8UuqJlFUoACFKAABShAAUmAAYRc5oF/OB4f3QhlBw7gs//+ihre7kEuvWQ77QpcwYHkzciQ8hUkoI9fPcOVsfzRZ/4h/d4FG1NxsJgrIexSMgMFKEABClCAArUSYABRK7bbsFM9H9wb2AStvpiKMU1a4u7wZxAaGmr67P4OVl8pvw2NY5VuEyjOQsrGikDBap0FX2Bz6gUuprYKxAQKUIACFKAABW5FgAHErei5c1+Ri+xdZ3BaX2cBijM+QU5OjunzWD4Kte5sFOtyr4AOxQdTsbEAQMBMpBWVV7sEbyHSYqWrMR3DmhVpOMODEO4dHtZGAQpQgAIUqCMCKiHdCIAPCrhJQLpRnUajcVNtyqomMfFVpM8YWHGq0tiPkb/+6Wp3AdehOP11BPdJQAEisPrkBuSsfF1ZCOwNBShAAQrIUiAxMVGW7WajrQhIAQQf8hHQ/XJEfL/lRTF7XGcR0i1B/Ot/JeL45qki7kCB+FUG3QCkL81tPzQajc0M9tKlne3lsZfukWUUpYnYAGn5S4Dov/q4KLekVC1PmSGPvf7aS/dID0v9d2Ds2RdzOHvjby+9rpnWtf5y/E1/Z+jhfA/TEvlODgK8D4SVwMoTN4srG5D47CTEfvWroXldcOG3qzj/3WrMiT6F/R+vwPb+zQyXePXEHrBNtyTg2xvz8gXm2SrEkTy29mcaBShAAQpQgAIUsCPANRB2gDwmWZxE+tvTEbv3CQxLP4o9b/sbmtYEvWfGI7ZtCr7SbMJHv/CMNI8ZMzc15OWXX3ZTTayGAhSgAAUoQAEK8DKu8pkDxWnYteUKvJ6NxBth9+OuqntBqOAdNBETJj4IHNuPjLOVRyfk0zW2lAIUoAAFKEABClBAPgI8AiGXsbp+CRcLAO8WTdBCdaNaq+uj0R/8ABSh+BdeeqcajuLfXr16VfF9ZAcpQAEKUIACFPAcAQYQnjMWtlvi1xKtQ1X4/fAZHBENquX9EVnfngZ8ghHStH61NL5VssC6deuwZs0aREZGKrmb7BsFKEABClCAAh4kwADCgwbDZlMaDsDfoluh4QfzEbn0G5wrkm4Ydx2Xzh7EznnD8eL7Ag1GPYGhgd42i2GicgSk4OG5557Td2j9+vUMIpQztOwJBShAAQpQwKMFeBUmjx4e48Y1RrtJydieNxhDpg5GhD5pE5Y/tgnL4YMGQ9/EyrmPo13V2gjjfflaaQLGwUNl36QgQnpIaXxQgAIUoAAFKEABVwnwCISrZF1Rrncn9E3Iwol9y7HhzTGIiIjAsLhleGvHAZzeOgVj7qtFPFiSgV1LwxGuUkG6yZtK1R6hc3cio8T6WgpdbjwmeHdA+K7Lrugly7QjYCl4qNyFRyIqJfiTAhSgAAUoQAFXCdTiE6ermsJyHRJQ/RFBXSdhjPR0aAcbmXSZ+OSFwRgu5mFDbgp2B90BXd46LHo5Av2mbcChVU+jQ/UQU5eJT2clYo02GGE2imaSawRsBQ+VNfJIRKUEf1KAAhSgAAUo4AqB6h8PXVEHy3SagID2SgbSlj+PVyO7IDQ0FO2ffRkT/pmGjCtlNa5Fd2odVmwIRo/RwzEy6A79/l5BkZgWNw6917yNqanVjzAU4MSK5zHqdAc8WuPauAMFKEABClCAAhSggBIEeARCNqMoUJa3FG+MfBlvfGsULOTk4NiWBVibPBdLN76CyUHVr9BkvYNewUlIsXrfuXycPH8ZWtyLikmiRel+DSZO+QuStv+K5L8exe/Wi2aKiwQqr7ZUuXjaUjXjxo3jOghLMNxGAQpQgAIUoIBTBHgEwimMbihEHMLnM1/FG4f7IHzd9zhY9DuE0KGs+CiOfjkGoy/E4cXJW7C7zGpEUMNG9sCQns0NwQOA0m1Iit6B4i0zMK7VXTUsi9mdKSAFEWvXrrVYJIMHiyzcSAEKUIACFKCAEwUYQDgR06VFFabi6+2/Qj1hGtaM7YbOvtLlWlVQN2qHdo8vxIwpzSE++xybT9zinailNQ4J65E+fgSi21QezcjFwSWvYcGIXUiNeACcNC4daYcKtxREMHhwiI6ZKEABClCAAhS4RQGVEMJZX1nfYlO4u02B/y3EtNYvYdnkb1DwRk/cY5L5V/y8uSseGB2E0f/3ETb+qaFJquNvCnBi+UC03zIEiz94DTH6dRHXkZccjuZLR2DLzmmI8PGC7sRkPP7Qfvye8hV297/XYvHSFZ2sPTQajbUkbq+hQF5eHj744AP07t0bf/rTn2q4N7NTgAIUoAAF3COQmJjonopYi3sEpACCDxkI6M6I7+KaClWriWLykatCV9VknSj732ax6Ik7hOqv/xQ7f7mZUpXFoRf54viyDkKtHi9isq9V7VF+IU6MVw8UEfuu3tx2PEb0R2cRllJYtc3RFwDsZtVoNDbz2EuXdraXx166nMqIioqy6SWnvihpXNgX02mpJA/+TpmOLT3oYS5gusWR33/TPfjO0wW4iNo9cdqt1yKuodTrPvS6uApJHTOwbewzeEyXi5A/HMO3/z6C3T81hf/YC1gzbjjW6GtripYzZiOh893269ZlY9+8Yeg5uxuijryHpBA/wz7FOLNjE9ZozwLd/gCzYwoD/KHqvxq7d45HGM9rsu/sohyNGjVyUckslgIUoAAFKEABCpgLMIAwN/HMLbofcWTDIWSUSs07jUsb3sFHJi29gMINb2Fb1baWCImYbjeA0OUtwawRGryjfgVxWTMQ/1Bl8CAV5Is20WcgoqsK1b9w5BQm0z34jgIUoAAFKEABClBAKQIMIOQykuq/ImpPDh6/Zv0O0aZd8YFfiyDTTdXflW7FAil4OBuNuAPxiG9acS+I6tn4ngIUoAAFKEABClCAApUCPPGkUsLjfzaAb9BDCA1tixb3WYn7GjRBs5BQ/Q3mQkMfQNM7bQ1vMU5t/gdi92qBgiTMaVYf0sJn46d3bDoKPN6FDaQABShAAQpQgAIUcKeAlU+i7mwC63JMoAwlOfOwcGYi3v28CPozmcx2jEZc3vuID3RkWC2fnmRWpIUNtm9AZ2EHbqIABShAAQpQgAIUUIyAI580FdNZWXdE9x0+ffUNxH3xAPwfH4a/BDeCb+4F0y416I6HG9k66mCane8oQAEKUIACFKAABShQUwEGEDUVu135L+5G6he/Qz11KQ4sHIDmZpdEul0NY70UoAAFKEABClCAAnVJgF9Xy2W0GzZGkwBA1eguNGLwIJdRYzspQAEKUIACFKCA4gQYQMhlSP1GImp+F9RL3Iy3sq7ghlzazXZSgAIUoAAFKEABCihKgAGEbIbzD2jx5HS80W0NFna8Bw2qXTFJf/WkRlPwzqVy2fSIDaUABShAAQpQgAIUkJ8A10DIZczE/+Hfmr/jlYwywKczmvYKhO9PZ01b7xsIf46oqQnfUYACFKAABShAAQo4VYAfN53K6cLCCndhxwfF8Bq3Bd8sH46/2LzHgwvbwaIpQAEKUIACFKAABeq0AE9hksvw1/eFXyNA3epBdGDwIJdRYzspQAEKUIACFKCA4gRUQgihuF4pskOFOLl6IDq91x/xO15HbPOGkOPFmKS1GhqNRpEjxE5RgAIUoAAFKGBZIDEx0XICt8pTQAog+JCBgDZdbB57v+jsAwGfzqLpoL+KkJAQ02e3BPGv/2k9ujMA7LZPo9HYzGMvXdrZXh576SzDfAjsmdlLpylNzQVMt9ibQ/bS3TXH3FWPp/SX7ajZPOX8MPVyxMN8D27xdAGugZBN3FeMwqwLOFQqNfgQcnccMm+5Tz4KteabuYUCFKAABShAAQpQgALOEmAA4SxJV5dT7ylMPazDVFfXw/IpQAEKUIACFKAABShgQ4CLqG3geGKS+DUL+7ZOQVxkF4R2fwerr5TixJZpiM+8iN88scFsEwUoQAEKUIACFKCAogR4BEJGwymubEDis5MQ+9WvhlZ3wYXfruL8d6sxJ/oU9n+8Atv7N0MDGfWJTaUABShAAQpQgAIUkJcAj0DIZbzESaS/PR2xe5/AsPSj2PO2v6HlTdB7Zjxi26bgK80mfPQLL6ollyFlOylAAQpQgAIUoIAcBRhAyGXUitOwa8sVeD0biTfC7sddVddwVcE7aCImTHwQOLYfGWcrj07IpWNsJwUoQAEKUIACFKCAnAQYQMhltK5fwsUCwLtFE7RQ3ajW6vpo9Ac/AEUo/kVXLY1vKUABClCAAhSgAAUo4DwBBhDOs3RtSX4t0TpUhd8Pn8ERUX2Vw4/I+vY04BOMkKb1a9aOkgzsWhqOcJUK0k3eVKr2CJ27ExklxoGIFqU5CzFvpI+NPDWrlrkpQAEKUIACFKAABeQpwADCk8dNW4j87PPI/VUHNByAv0W3QsMP5iNy6Tc4V1QO4DounT2InfOG48X3BRqMegJDA70d75EuE5+8MBiDMociKveGdIc3lOdqMOF4BPpN+xRZhhhCl/smpnbcga+eOohLQkAUL8KcKxMQ/uRibCs1DjQcr5o5KUABClCAAhSgAAXkKcAAwoPHTXtoMh5r1wcD/p0HoDHaTUrG9hmXcG7qYES8cwXAJix/rDueePUnXBj6JlbOfRztqtZG2O+Y7tQ6rNgQjB6jh2Nk0B36HbyCIjEtbhx6r3kbU1MvAziLjEULsWH6a9gyIhj6pduN+uDpSUPQP2Mzln0ntYMPClCAAhSgAAUoQIG6IsDLuMpppL07oW9CFk4MSUZ66nf44shvUIWEo+OfwzC2fzCaqmsQPQDwCk5CitWLNuXj5PnL0CIYvROLUCYnJ7aVAhSgAAUoQAEKUMBlAgwgXEbrooJVf0RQ10kYIz1dVEVFsT0wpGdzWJogurx1WDRnPdLHb8Chvve6tBW3q/AffvgBmzdvRrt27RAZGXm7msF6KUABClCAAhSggMcJWPp86HGNrNsNKseNK/9FdnaxfYYGTdCsxT3wrdmBCNNydZn4NKEiOHi3TbXF2ro0rOk/EBPStEDAWIz8qDtCFHgSnBQ8hIWFoaioCM8995zeh0GE6TThOwpQgAIUoAAF6q6ASkgrZ/nwSAHt/mEI7rYNZx1uXTTi8t5HfGBt48ICnFg+EO23DMHiD15DjGFdhHn115G/axieHfAzriT/G4ciHjA7UiFd0cnaQ6PRWEu67dtLSkrw+eef4+LFiyZtGTFiBIKCgky28Q0FKEABClCAAo4JJCYmOpaRueQhIAUQfHimQNm+CNESPqJ+97+JkJAQ+89uCeJf/9PWsjP54viyDkKtHi9isq85UMYZkabxFei/WuwudyC7IQsgXezJ9kOj0djMYC9d2tleHkvphw8fFn5+flJAbfG5du1ak3ZZKsMkQy3bwTKqC5i+t+duL10qzV4ee+ksw3RM6ppHXesvfx9M5zs9nO9hWiLfyUGgtl9VyyM6UkQr70PL6UuQHdHMdb3RZWPfvGHoObsboo68h6QQ6aZ0Dj6OnkFOiQ5hfvI+l8n4tCVrPefpTNZkuJ0CFKAABShAgbokIO9PfXVppFzUV13eEszs1Qnddz2FWVkWggdp3UNfb3jHpqPAQhvUo/tiiMyDB6lbUgAhrXmw91i0aJG9LEynAAUoQAEKUIACihZgAKHo4bXTudKtWDBCg3fORiNuYzziH7Jw5MGrF4a9FYFuCzfjzZzKD9jSGogpiFs8FFGRnRFgpxo5JEuLpNeuXWuzqR07dkRGRobNPEykAAUoQAEKUIACShdgAOHBI6zybYmHQ9oh9N76LmhlMU5t/gdi92qBgiTMaVYf0sJn42fFUQc1fLquwod7muH+N4IM6a3R6ashGPmDhSMWLmipu4q0FURUBg933323u5rDeihAAQpQgAIUoIBHCnANhEcOS0Wj6j2UgORsVzXQF22iz0BEO1J+QwQ+Go8Z0nOrI/nlm6fycq2V6x2knjB4kO94suUUoAAFKEABCjhfgEcgnG/KEmUuYHwkgsGDzAeTzacABShAAQpQwOkCDCCcTsoClSAgBRFjxozRr3ngaUtKGFH2gQIUoAAFKEABZwkwgHCWJMtRnEDjxo3B4EFxw8oOUYACFKAABShwiwIMIG4RkLtTgAIUoAAFKEABClCgLgkwgKhLo82+UoACFKAABShAAQpQ4BYFGEDcIiB3pwAFKEABClCAAhSgQF0SYABRl0abfaUABShAAQpQgAIUoMAtCjCAuEVA7k4BClCAAhSgAAUoQIG6JKASQoi61GH29fYKSHe61mg0t7cRrJ0CFKAABShAAbcKJCYmurU+VuZiASmA4IMC7hIAYLcqjUZjM4+9dGlne3nspbMM8yGwZ2YvnaY0NRcw3WJvDtlLd9ccc1c9ntJftqNm85Tzw9TLEQ/zPbjF0wV4CpOLAzQWTwEKUIACFKAABShAASUJMIBQ0miyLxSgAAUoQAEKUIACFHCxAAMIFwOzeApQgAIUoAAFKEABCihJgAGEkkaTfaEABShAAQpQgAIUoICLBRhAuBiYxVOAAhSgAAUoQAEKUEBJAgwglDSa7AsFKEABClCAAhSgAAVcLMAAwsXALJ4CFKAABShAAQpQgAJKEmAAoaTRrE1fSjKwa2k4wlUqSDd5U6naI3TuTmSU6IxKK8CJLycjtqe3IY8K3mPfw5KcIqM8fEkBClCAAhSgAAUoUBcEGEDUhVG21kddJj55YTAGZQ5FVO4N6Q5vKM/VYMLxCPSb9imy9DHEdeQlP4X2T5Ugd97PKBMCovwYvn1oNTQdZyI+93drpXM7BShAAQpQgAIUoIACBRhAKHBQHe2S7tQ6rNgQjB6jh2Nk0B363byCIjEtbhx6r3kbU1MvA7p9SFl5GJgeiQWPBkAt5fIKRbcZS7Ci1yq8tWQvChytkPkoQAEKUIACFKAABWQvoP88KPtesAO1EvAKTkKKsLZrPk6evwytVx+MTy3DeCvZtEfO4aQOCGAoakWImylAAQpQgAIUoICyBPixT1nj6cTe9MCQns0rjjhYKVXo6iFg6KPowVlkRYibKUABClCAAhSggPIE+NFPeWN6az3SZeLThPVIHz8C0W0aWCnrOvI+molJ345H1OMtbAYZVgrgZgpQgAIUoAAFKEABmQqohLRylg8K6AUKcGL5QLTfMgSLP3gNMYZ1EaY4WpTmaBDTMRv5X67HV/2CLAYQ0hWdrD00Go21JG6nAAUoQAEKUECBAomJiQrsVR3ukhRA8EEBIfLF8WUdhFo9XsRkX7MCUiZKsqeIMeo2ImR5lrhkJZetzYB0sSfbD41GYzODvXRpZ3t57KWzDPMhsGdmL52mNDUXMN1ibw7ZS3fXHHNXPZ7SX7ajZvOU88PUyxEP8z24xdMFeApTHQ4eq7quy8a+hL5oP6ULoo68h6QQv6qkmy+uI/8/ExHT8SscWvoRMia1h//NRL6iAAUoQAEKUIACFKgjAgwg6shAW+umLm8JZvbqhO67nsKsLCvBgy4LaS+3RlCPfFzY+BmDB2uY3E4BClCAAhSgAAXqgAAv41oHBtlqF0u3YsEIDd45G424A/GIb1pxLwjT/Lk4+M4g9F1wDzokr8TXEQ9YXPNgug/fUYACFKAABShAAQooVYBHIJQ6snb7VYxTm/+B2L1aoCAJc5rVh7Tw2fjpHZuOqycSMGtWLoBjyBrWHN7V8qgCX8OyIv0tq+3WyAwUoAAFKEABClCAAvIX4BEI+Y9hLXvgizbRZyCi7e3eGykiyV4mplOAAhSgAAUoQAEK1BEBHoGoIwPNblKAAhSgAAUoQAEKUMAZAgwgnKHIMihAAQpQgAIUoAAFKFBHBBhA1JGBZjcpQAEKUIACFKAABSjgDAEGEM5QZBkUoAAFKEABClCAAhSoIwIMIOrIQLObFKAABShAAQpQgAIUcIYAAwhnKLIMClCAAhSgAAUoQAEK1BEBBhB1ZKDZTQpQgAIUoAAFKEABCjhDgAGEMxRZBgUoQAEKUIACFKAABeqIgEoIIepIX9lNDxCQ7nQdFRWFRo0aeUBr2AQKUIACFKAABdwhkJiY6I5qWIe7BKQAgg8KuENg3LhxUrAq/Pz8xOHDh61WqdForKZJCfbSHcnDMkyJ6UEPUwHTd5wfph7SO3sm9tJZBk3NBUy32JtD9tLlNMdMe853chDgKUzuitTqeD2RkZFYv369XqGoqAhhYWH44Ycf6rgKu08BClCAAhSgAAXkJ8AAQn5jJrsWGwcPlY1nEFEpwZ8UoAAFKEABClBAXgIMIOQ1XrJrraXgobITDCIqJfiTAhSgAAUoQPC6Xy0AABvfSURBVAEKyEeAAYR8xkp2LV20aFHVaUvWGl8ZRFy7ds1aFm6nAAUoQAEKUIACFPAgAQYQHjQYSmuKdPShY8eOdrslBRp333233XzMQAEKUIACFKAABShw+wUYQNz+MVBsC6SgICMjw2YQsXbtWkiBBh8UoAAFKEABClCAAvIQYAAhj3GSbSttBREMHmQ7rGw4BShAAQpQgAJ1WIABRB0efH3XSzKwa2k4wlUqSDd5U6naI3TuTmSU6KzI5OLg283gHZuOAis5qm+2FEQweKiuxPcUoAAFKEABClBAHgIMIOQxTq5ppS4Tn7wwGIMyhyIq9wakm5KX52ow4XgE+k37FFlmMUQBTiwfg1c/u1jj9lQGEdKODB5qzMcdKEABClCAAhSggMcIMIDwmKFwf0N0p9ZhxYZg9Bg9HCOD7tA3wCsoEtPixqH3mrcxNfVyVaN0eVuxcuxTmN0pHqMaVW2u0QspiJAeXPNQIzZmpgAFKEABClCAAh4loPao1rAxbhXwCk5CirBWZT5Onr8MLe6FWpeG1Y8kIHn9TuzqegLrrO3C7RSgAAUoQAEKUIACihfgEQjFD3FtO9gDQ3o2hz7C9OqAR7/+D1L7BYETprae3I8CFKAABShAAQooQ4CfB5Uxjs7rhS4TnyasR/r4EYhu08BQrj9CQ2t53pLzWsaSKEABClCAAhSgAAU8QEAlpJWzfFBALyAtkh6I9luGYPEHryHGsC7CBEeXhjX9ByL64RT8PL83AkwSb76Rruhk7aHRaKwlcTsFKEABClCAAgoUSExMVGCv6nCXpACCDwoIkS+OL+sg1OrxIib7mnWQ8lSxuo9aqF9JE/nWc1lNAaSLPdl+aDQamxnspUs728tjL51lmA+BPTN76TSlqbmA6RZ7c8heurvmmLvq8ZT+sh01m6ecH6ZejniY78Etni7AU5jqcPBY1XVdNvYl9EX7KV0QdeQ9JIX4VSXxBQUoQAEKUIACFKAABYwFGEAYa9TB17q8JZjZqxO673oKs7IYPNTBKcAuU4ACFKAABShAgRoJ8DKuNeJSWObSrVgwQoN3zkYj7kA84ptW3AtCYb1kdyhAAQpQgAIUoAAFnCjAIxBOxJRXUcU4tfkfiN2rBQqSMKdZfUgLn42f3rHpKJBXp9haClCAAhSgAAUoQAEXC/AIhIuBPbd4X7SJPgMRXcMWevXB+NQyjK/hbsxOAQpQgAIUoAAFKKAMAR6BUMY4shcUoAAFKEABClCAAhRwiwADCLcwsxIKUIACFKAABShAAQooQ4ABhDLGkb2gAAUoQAEKUIACFKCAWwQYQLiFmZVQgAIUoAAFKEABClBAGQIMIJQxjuwFBShAAQpQgAIUoAAF3CLAAMItzKyEAhSgAAUoQAEKUIACyhBgAKGMcWQvKEABClCAAhSgAAUo4BYBBhBuYWYlFKAABShAAQpQgAIUUIaASgghlNEV9kIOAtKdrjUajRyayjZSgAIUoAAFKOAkgcTERCeVxGI8QkAKIPiggLsEANitSqPR2MxjL13a2V4ee+ksw3wI7JnZS6cpTc0FTLfYm0P20t01x9xVj6f0l+2o2Tzl/DD1csTDfA9u8XQBnsLkEWEcG0EBClCAAhSgAAUoQAF5CDCAkMc4sZUUoAAFKEABClCAAhTwCAEGEB4xDGwEBShAAQpQgAIUoAAF5CHAAEIe48RWUoACFKAABShAAQpQwCMEGEB4xDCwERSgAAUoQAEKUIACFJCHAAMIeYwTW0kBClCAAhSgAAUoQAGPEGAA4RHDwEZQgAIUoAAFKEABClBAHgIMIOQxTq5rZUkGdi0NR7hKBekmbypVe4TO3YmMEp1RndeR//1LiO3pbcgTiMYv/RNv/icfWqNcfEkBClCAAhSgAAUooHwBBhDKH2PrPdRl4pMXBmNQ5lBE5d6Q7vCG8lwNJhyPQL9pnyLLEEPoct/FPx7LQuaob3GsXECUf43P/ZdiTthSrCwyDjSsV8UUClCAAhSgAAUoQAFlCDCAUMY41qoXulPrsGJDMHqMHo6RQXfoy/AKisS0uHHoveZtTE29DKAYZ3ZswpreoxAX3Q2h0ozxCkW3GUuwvNNKbNt/pVZ1cycKUIACFKAABShAAXkKqOXZbLbaGQJewUlIEdZKysfJ85ehQ0Pkni6EumNztDUON72ao0UvLfamZqGgf28EWCuG2ylAAQpQgAIUoAAFFCVg/JFQUR1jZ25VoAeG9GwOL90pnPvhF6uFaY+cw0mexWTVhwkUoAAFKEABClBAaQIMIJQ2orfaH10mPk1Yj/TxIxDdpgFQchInc7hU+lZZuT8FKEABClCAAhRQioBKSCtn+aCAXqAAJ5YPRPstQ7D4g9cQI62LKFqGGQ9Nxnuj0/DzfONTlc4i/eWH0efoQuzeOR5h1UJR6YpOfFCAAhSgAAUoQAFJgB83lTUPuAZCWeN5C70xBA9TuiDqyPSK4EEqrVFbtA2p+TSx9odCCiyspd1C4+v0rjR1/vDTlKbOF3BNiZyrznelqWtMnV8qS7ydAtW+N76dTWHdt01Al419CX3RXh88vIekEL+bTfFqjuad7rr5vtors8XV1dL5lgIUoAAFKEABClBAWQIMIJQ1njXujS5vCWb26oTuu57CrKxqwYO+NH80be0Ps8XSunP46f9uwL91IPxrXCt3oAAFKEABClCAAhSQqwADCLmOnDPaXboVC0Zo8M7ZaMRtjEf8Q0ZHHqrK90WrQaMxPn0eJq88ikJpu3TEYt4UTPp2Ol4f1gY1P8GpqnC+oAAFKEABClCAAhSQmQADCJkNmPOaW4xTm/+B2L1aoCAJc5rVh3Tep/HTOzYdBdJ945pG45XP+mLQ5ofRWMpTrx16Ho/ErD0vIsqPU8h5Y8KSKEABClCAAhSggOcL8CpMnj9GimohF6c5fzhpSlPnCzi/RM5T55tKJdLV+a40panzBZRXIgMI5Y0pe0QBClCAAhSgAAUoQAGXCfD8E5fRsmAKUIACFKAABShAAQooT4ABhPLGlD2iAAUoQAEKUIACFKCAywQYQLiMlgXfFLiO/O9fQmxPb8Mi7UA0fumfePM/+dDezMRXdgW0KN0/Cj29Z2JZkc40ty4bmcvDEV61EH4Awpdux7bc303z8V2FQEkGdi019mqP0Lk7kVFi7Mp5W+PpUpKBlLmhCDTMQ++x72FJTpFpMZyrph6OvtNl4pNxPqi8uEXVbvSsonDsRTFOrWhlcsEQac2DShWIwFUnqv4n6fK2Ys20wJv5wmdg8sZ9yDb+E+FYhcrPVX0Ohs/A1H2m/9/pqbxpwABCeWPqcT3S5b6LfzyWhcxR3+JYuYAo/xqf+y/FnLClWFn9g7DHtd5TGqRFafZriH9pB/b6q6o16jryPnoOj255BB2+z0OZECjPHYm/fjcGo5bs1V9Jq9oOdfut9EHshcEYlDkUUbk39HdGL8/VYMLxCPSb9imyDB8QOG9rOE0k15inMObaXGwpLocQ+Tj2xJfYHvoshu2/ZiiMc7WGqkZuk/HChuvVdqdnNRAH3hbiwsmrCFh5XP+3Ugih/xsgzdf8icEVlyXXZeLTVyfhVa8EJF+Q/kaUIu/NSygZH4UXUi87UEcdyqLLxMfPhiNStQTJest8nIg+hKzu0zD1xG8VEPRU5oQQfFDApQJF4uQ/Wwr0Xy12lxtVVJ4qVnX5owhLKTTayJcWBcqPiQPL+oiQOenigGQZMFMkXTPCLE8V/wqvLwJWHhdlRgWUH48RfdSvmuY1Sq+rLyWX/uhsNvdMt3Pe1mx+lImiXX2Euvp8K08Vq/uohfqVNJEvFci5WjNWfe4yUZI9RTxb/2HR489GlvSshaUQ4lqSeEXd3uz337iwir8FESLm+K9Gmyv+JlTNZaOUuvvSyu+9OCPSNL5Vv/f0VOYM4REIZcaFHtSrQuSeLoS6Y3O0NZ5tXs3RopcWe1Oz+A25zdEqxslVz2DQj7FIfr07LN3qDyUncfLbNmj7wL0mN/XzCgjFw9iBbfuv2KyhriV6BSchRRzE7v73Wuh6Pk6evwwdOG8t4NjYpIZvv1SUlSUgxta9YThXbRhaSSrdhqRR63B07WyMbVQtDz2rgdh/qyvIxhFtMELu97GSWYvSCyeRrm6J0IA7jPLchSYtmgMLv8Z2Hjk3uJzHwZRMYHo/DDH5vW+J3olFKJvfGwGgp9EkUtRL4490iuoYO+MhArpzOPfDL1Yboz1yDid5TqlVH+AuBPZIQfa7/RHqZXk9Q8U/RON/dMbFHdd/IOZaE2MTW697YEjP5vDivLWF5Fia4Y710XsmYtaUHgiQbmKv//DGueoYoJQrFweXxOL1zmvxWYQP6lXbkZ7VQOy+rfww2wD3bu1stFbnXcR/V3nO/i+4+OM5aM1OFa0o3F97FtkFlv8W261eaRl05/DT/92Af+s7cfXLyVXrHE3XPtFTacNe2R8GEJUS/OkaAekbshx+fK09rhqNQh+Av9UCKv4hHrWazgSHBKRzdBPWI338CES3aQD9UR3OW4fozDMZFqnWa4fur3mhzdxRiAiUggbOVXMrW1ukiybE4olFU7Bl8d/Q3Oy/NT1t6VlOM3yY7dES90UdRr7+nP0yXJ15HcV/exaj9Gt1Ko4+Wt6fW00E9EfAynEjMRJ90/+GcXvKIEQZrr56HgcefhXx+ot40NPETEFvzP4kKahv7AoFKEABBwQKcGLF8xj+48tYPHcwOvCvogNmtrL4ok30GcPi9Il48stwdJr4CbJ0hLWlVj1Nl/smpva4irAvJiLCh3bVfWr33jA3d8chJqjySJgaPg+NweCx/4dtsz9Bhs7aqU21q1Hpe6n8tbjSfAa2zO+HUP00VcMnZArGv7AFby3ZC55Aq9wZwL9Kyh1bz+hZo7ZoG6L2jLYoshVq+DRri/aK7Js7OlWAE8sHov2ULohaMf3mhwrOW6fgewXFYObsXvBf8wFWnPqdc9VRVemI2MyF+OKNeCR1vdvKXvzdtwJTi83+aNraHzh6BjkljSpe16KUurqL2RpHVHhKpyhn6YLoqdCJwQBCoQPrMd3yao7mne6y2hzzPzxWszLBioC0WLqj2to5uQ+ZLa62Ukzd2yydo5/QtyJ4OPIekkKMlqhz3jp5PvyInJ9LwbnqGKvu1Dqs2FSMwpnd0Ljy3i71+mJCmhbad/sgUDUMk0/8Rk/HOGuYy1u/WFpdKCzuV2i2uNpitrqx0W8ABozytdPXO+hpR0iuyQwg5Dpysmn3zW8iTBZLVy2+CrRxfr9sOnl7Gyp9W97zlNliaftXG7m9zb6dtevylmBmr07ovuspzMqqFjzoG8Z5W7PxMax7CHzN/CaHAArV/RDR9Y8A56pDrBVXCqu8P4HhZ3kqVvdRQ/1KGvJFMpKCG9DTIU2jTLo0rOnrbX4zvsqrro3uiyF+3vojZb3NFksb1k/0bo2QRvzoVKHaBG3/3NbClakq7rXhHx6KUC8vehpNQUW9VObVadkrTxIovxAnxqvbiJDlWeKS1LDyY+L7t0PMrxnvSY32yLYY7k1Q/T4QolTkfviIUKvHi5jsa/qWl+euFQtGNKy6DrdHdud2Napki5jfQy0QMFnEXbhhtRWct1ZpLCeUbBHvdPS9+Xsu/arnLhaxJts4Vy3jObC1+j019LvQ0wE5oyxlomTfSNHD6G+lEJX32Zh08+9B+QHx8diGQj1mnUgtlu65Uyry9kaKMXbuH2FUUd15WbJFzOteX/gn7Kv4/26werY+PZU+CaSFbnxQwMUC+eL4jhjxivShDdA/1WPmi7j/5Jnc+MzFjVBA8dYCCCFE8W6RsiRMhBl8gXYiZE6ySLbxAVkBILXogsGwyqliPlbOS+nnzRtFcd7WFLj8QrJInhMiAip9w2JFzI7jhg8WhtI4V2vKWpHfYgDB3/2aY5aKvP/EiXdGNDT8PwoQ/tNXiaRjFV++VJRXJkqOJYmVUwOq/mchYKyI2LhPHDO6h2fN61boHsW7xVdGv/fqMQvEYsOXWfRU6JgLIVRS1xR1SIWdoQAFKEABClCAAhSgAAVcJsAT+VxGy4IpQAEKUIACFKAABSigPAEGEMobU/aIAhSgAAUoQAEKUIACLhNgAOEyWhZMAQpQgAIUoAAFKEAB5QkwgFDemLJHFKAABShAAQpQgAIUcJkAAwiX0bJgClCAAhSggAWBkjR8NC0QKukmceGvIf54kYVM3EQBClDAcwUYQHju2LBlFKAABShQUwHDzcJUA9YgQ1fTnd2RvxintkRjZMn7OFJ+A7l/T8VbCWnIdkfVrIMCFKCAkwQYQDgJksVQgAJ1RUCL0v2j0NM7BvG5v1vttO7EZAxQDcPkE79ZzVOZUJO8lft45k8tSo/HI7and8W36xY/xJ9F+st+UFm5azVgSDfbV4vS7BX4YG4oAqVv7vXP9giduxnLsm/hG3xdGlYFDnZonJxj7os20WdQtvppdPD6H0r+dwP1mtyNPzqncJZCAQpQwC0CDCDcwsxKKEAB5Qio4fPIBET2XIOVO3+E1mLHinFmTwrSx49AdJsGFnMocqNuD5JffAsL23yII+UCImU8wpzyX6YAJz8YiL+2+wQr/Ffja6lsISCKl+I9vI032z2LYfuv1Y605CSO1nsKEe4eJ+02JLYKxEMxTdCjX1v416713IsCFKDAbRFwyp/229JyVkoBClDgdgl4dcPASR1Q+OF32GvpNBldJr7511X0GP4YOtTFv7L33A1/p/VbOuKjwaSR/8WV5JX4+u/dEFpZdqMwDJidgs/fOoJtQ+ZjWZGlwbA1SbQo3v85ts/uiR6VZdrK7sw0dQRePiNQfqE7HnhiLt7MtxyKOrNKlkUBClDAWQLu/pPprHazHApQgAK3UaAhggZEYvqebViWWf2bby2K0xLw9wazEPOodGKKdOrNMqyqXDSrCkTjl/5l47QbK6f4FC3DjEAVvGPTUQAdir/ui0DVEAzbtAnzRvoYTukZgPDl+3DhWgZSqk71aY/QhL3INv5srctG5vJwhFeeChQ+A5O/PIFCm6K2+6E/DateX0xI00L7bh8EqrogfNdlmyU6lngeB7btQEb/6Vj8zANQm+3UFA+PfQ9Loh5FSI3/o53Hga2FeLJncwvlGiqqZuUt1ZVjOGWqaBlivb0RmJCMnVXe0viux7bcSzj571EYF1hxupX32CRszZNOeSvGyRXBCFx1Qn/0yqtRY9xT749o3LDGjTeT4AYKUIAC7hLgXyx3SbMeClBAWQJ+T2LYnGPY/vH/ocCkZ+eRufMw/Mc+gSE+OpTmaBDTaTEW3ZeMY9KpN+Vf43P/hbd22k1VfZ9i2+oc/Do7D0KUIi9FDcR0x/0ha7G+byp+FmUoye6NzrMnYNTH5ytOt9Jl4pPnuuLR74ciKvcGhJQn6TeUPPUU+m4z5Kkqv/KF1m4/vIKTkFKeitV91FC/koZ8cRC7+99bWUDtfxalIGVLMdQdm6Otlf9YXk0j8GL8YIQ1spLBWu1FKfg8dZL105cMVn9O7o5eOdcgRD6Odl8PTceZVetfVP5aFLy2GvPbfIwjQqA891VMyHwew5r1wdNHYxCbKyBKdmB52QyMnf1vZOl80fbZ9zA3vQu8pQDuof3ITZ+CKL8att1an7idAhSggBsE+BfLDcisggIUUKJAUzz89JPotfBrbDc6dUaXuxGblg1D1OMtoMZ5HFizDlvHJmDrjB4Vp954haLbzM+xSfMtts3+5BavFNQZYTNfQvxDfgAaIrDrIDyiViNgzkxseDQAaqjhE/wkwnr9iJzMsyiUjlykzcQLG55A1GsTMDLoDkDKE7IA73/ZDDmj/omVRn25OWou6EdBAibfXc9w5KRyUbT0sxX6LCiuqlpXkI0fCgLg3zrQyesEtCg+8AlWjmxpNTDRnVqHFRuCjYwDEDwqGtOxSr/+pfKgjvqVGdgyIljfPq+gQejX9S6g/3QkVY65Tw88FtYE2p0HsbdEB/g8gee3llas48hfjy36sarqMl9QgAIU8HgBBhAeP0RsIAUo4KkCXm0i8fehq7Fi1wXDYupinNmxCZumRCC66R1AUQq+WvwL/LuFVDu9xh9NW/sDR88gR/pA6aZHffyEgymZKAhohdAAKXiofKjh06wtemu/xrb9Vyo33vzpin4EzETStfKKD9HSguiq5xmkaXxv1u2yV7+g4MxVdO/bAQEW66hYCL8LLRByv8/NHH4xmF9WhvyJweA/0JssfEUBCtQtAf79q1vjzd5SgALOFPD6E/qN74CcFWkVi6l1mdgz5z4MeeZh/YdS6dvzI1ob19cpOIPsAuuXgrXf1Gofbu3vUJHDwrf/9R5ahl1W9nd9P6xUDMArIBSdAgpQeDrfzhoN62VYTJEWur/dFxFdb+0CqqJQ7YKjIxZbzI0UoAAFPEaAAYTHDAUbQgEKyE9ADd/uE/BG1mfYduo6SjNXY9Y9zyHmkbv1XZE+/HZU21iabHYkwE0C/Vdjd+WlUKu++ZeOAlhet3Bb++E3AANG+UJ75BxOWj1Ycx153y60sTDd3FV36hPMHdIfQ7j2wByHWyhAAQrYEWAAYQeIyRSgAAVsCvgMwpA3TmL7twfw/dYMBMzud/OSoH4DMHDqXSjcl4Mckw+/hcg9XQi0b4UQs4W/htObbFZau8QbeBBdBjwCdfpBZOQbH/mouDleuLUb39WqH7Vro/leD+DPEYMQtmshplYuBDfJVIATyx9F896nccnvTsCrOZp3ugs4+h9sO2HtBnPFOL17H1oN7mjl9CWpAl+06jUA/fEjcn4uvVmj0Z2uTa5sdTMHX1GAAhRQvAADCMUPMTtIAQq4VsAXrQeNQK9ZwxH3z3GI7t/M6JKgD+DP4yMxcsNMjJxXeSlV6QPv0xi9oCci5j5t4UZrhg+uBV8gaWt2xWk7JWn4KO5NzDe93FMtuuUF3z4J+HDUBrz12irDZUWlu0e/ibnTP0F2ggbxwZZufFebftSieRZ3UcOn6wIsX+aFwmFR6Ld8381L0pZIl6vti94xTdDry1l4XVp3AkMAVrAGy0L7WLmUbCEuHIDp2gYLdXu1iUasJh8ZCUlYpr8E63Xkp76HjWkD9GNXdT8KC/tyEwUoQAElCzCAUPLosm8UoIBbBLyajsHzo8txJv5viDA5JabiCkfLfpiKaf8dhnb1pKsMdcZjp1/E68c2I7lrxalO1RvpFfw6lnzRHl3mdkBj6VKfT+7Ct0OXY2Uf87sgVN/X7nuvR/D0+//Gjkc+wsqm9aFSeaNRn59wLmYPdsd2tXKlo9r1w25bHM4QgOC/f4eD34Zj1MmnDY4qqHxfxEt4Da8fS0ZqvyBD4OaLNhM/w/dvh1g/umDv8q2V7fLqgD7zv8aBYRnYprfyQVBCO3T4fiW2WBm7yl35kwIUoICSBVRCuvQFHxSgAAUoQAEKUIACFKAABRwQ4BEIB5CYhQIUoAAFKEABClCAAhSoEGAAwZlAAQpQgAIUoAAFKEABCjgswADCYSpmpAAFKEABClCAAhSgAAX+H8gEGt3Jo1D+AAAAAElFTkSuQmCC"></p>
</div>
<div class="question">
<p>Suggest how the end point of the titration might be estimated from the graph.</p>
</div>
<br><hr><br><div class="specification">
<p>Solubility plays an important role in the bioavailability of drugs in the body.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest why aspirin is <strong>slightly</strong> soluble in water. Refer to section 37 of the data booklet.</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>Formulate an equation for the conversion of aspirin to a more water soluble derivative.</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>A student prepares aspirin from salicylic acid in the laboratory, extracts it from the reaction mixture, ensures the sample is dry and determines its melting point.</p>
<p style="text-align: center;"><img 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"></p>
<p>Suggest why the melting point of the student’s sample is lower and not sharp compared to that of pure aspirin.</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>Organic molecules can be characterized using infrared (IR) spectroscopy.</p>
<p>Compare and contrast the infrared peaks above 1500 cm<sup>−1</sup> in pure samples of aspirin and salicylic acid using section 26 of the data booklet.</p>
<p style="text-align: left;"><img 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"></p>
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"></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>The pharmaceutical industry is one of the largest producers of waste solvents.</p>
<p>State a green solution to the problem of organic solvent waste.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p>Disposable plastic lighters contain butane gas. In order to determine the molar mass of butane, the gas can be collected over water as illustrated below:</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>List the data the student would need to collect in this experiment.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why this experiment might give a low result for the molar mass of butane.</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>Suggest <strong>one</strong> improvement to the investigation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>The development of materials with unique properties is critical to advances in industry.</p>
</div>
<div class="specification">
<p>Low density polyethene (LDPE) and high density polyethene (HDPE) are both addition polymers.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline two properties a substance should have to be used as liquid-crystal in a liquid-crystal display.</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>Describe how the structures of LDPE and HDPE affect one mechanical property of the plastics.</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>One of the two infrared (IR) spectra is that of polyethene and the other of polytetrafluoroethene (PTFE).</p>
<p style="text-align: center;"><img 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"></p>
<p style="text-align: left;">Deduce, with a reason, which spectrum is that of PTFE. Infrared data is given in section 26 of the data booklet.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Many plastics used to be incinerated. Deduce an equation for the complete combustion of two repeating units of PVC, (–C<sub>2</sub>H<sub>3</sub>Cl–)<sub>2</sub>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>In order to provide safe drinking water, a water supply is often treated with disinfectants, which aim to inactivate disease-causing bacteria in the water.</p>
<p>To compare the effectiveness of different disinfectants, a <strong>CT value</strong> is used as a measure of the dosage of disinfectant needed to achieve a certain level of inactivation of specific bacteria.</p>
<p style="text-align: center;">CT value (mg min dm<sup>−3</sup>) = C (mg dm<sup>−3</sup>) concentration of disinfectant × T (min) contact time with water</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;">The table below compares the CT values of different disinfectants necessary to achieve 99% inactivation of two types of bacteria, listed as <strong>A</strong> and <strong>B</strong>.</p>
<p style="text-align: center;"><img 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"></p>
<p>(i) Deduce the oxidation state of chlorine in the following disinfectants.</p>
<p><img src="data:image/png;base64,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"></p>
<p>(ii) From the data on CT values, justify the statement that bacterium <strong>B</strong> is generally more resistant to disinfection than bacterium <strong>A</strong>.</p>
<p>(iii) CT values can be used to determine whether a particular treatment process is adequate. Calculate the CT value, in mg min dm<sup>−3</sup>, when 1.50 × 10<sup>−5</sup> g dm<sup>−3</sup> of chlorine dioxide is added to a water supply with a contact time of 9.82 minutes.</p>
<p>(iv) From your answer to (a) (iii) and the data in the table, comment on whether this treatment will be sufficient to inactivate 99% of bacterium <strong>A</strong>.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>CT values are influenced by temperature and by pH. The table below shows the CT values for chlorine needed to achieve 99% inactivation of a specific bacterium at stated values of pH and temperature.</p>
<p style="text-align: center;"><img 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"></p>
<p>(i) With reference to the temperature data in the table, suggest why it may be more difficult to treat water effectively with chlorine in cold climates.</p>
<p>(ii) Sketch a graph on the axes below to show how the CT value (at any temperature) varies with pH.</p>
<p><img src="data:image/png;base64,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"></p>
<p>(iii) Comment on the relative CT values at pH 6.0 and pH 9.0 at each temperature.</p>
<p>(iv) Chlorine reacts with water as follows:</p>
<p style="text-align: center;">Cl<sub>2</sub> (g) + H<sub>2</sub>O (l) \( \rightleftharpoons \) HOCl (aq) + HCl (aq)</p>
<p style="text-align: center;">HOCl (aq) \( \rightleftharpoons \) OCl<sup>−</sup> (aq) + H<sup>+</sup> (aq)</p>
<p style="text-align: left;">Predict how the concentrations of each of the species HOCl (aq) and OCl<sup>−</sup> (aq) will change if the pH of the disinfected water increases.</p>
<p style="text-align: left;"><img src="data:image/png;base64,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"></p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Despite widespread improvements in the provision of safe drinking water, the sale of bottled water has increased dramatically in recent years. State one problem caused by this trend.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question">
<p>Infrared (IR) spectra can be used to distinguish between various types of plastics. Some simplified IR spectra are given here.</p>
<p style="text-align: center;"><img 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"></p>
<p>Explain, with a reference to molecular structure, which two of the plastics can <strong>not</strong> be distinguished by IR spectroscopy.</p>
<p> </p>
</div>
<br><hr><br><div class="specification">
<p>Infrared (IR) spectroscopy is often used for the identification of polymers, such as PETE, for recycling.</p>
</div>
<div class="specification">
<p>LDPE and high density polyethene (HDPE) have very similar IR spectra even though they have rather different structures and physical properties.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Below are the IR spectra of two plastics (<strong>A</strong> and <strong>B</strong>); one is PETE, the other is low density polyethene (LDPE).</p>
<p style="text-align: left;"><img src="data:image/png;base64,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"></p>
<p style="text-align: left;">Deduce, giving your reasons, the identity and resin identification code (RIC) of <strong>A</strong> and <strong>B </strong>using sections 26 and 30 of the data booklet.</p>
<p style="text-align: left;"><img src="data:image/png;base64,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"></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>Describe the difference in their structures.</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>Explain why the difference in their structures affects their melting points.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>A student set up a simple voltaic cell consisting of a copper electrode and a zinc electrode dipped in sodium chloride solution.</p>
<p style="text-align: center;"><img 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"></p>
<p>The student gradually increased the distance, <em>d</em>, between the electrodes to study the effect on the initial current, <em>I</em>, passing through the light bulb.</p>
<p>The student hypothesized that the initial current would be inversely proportional to the distance between the electrodes.</p>
</div>
<div class="specification">
<p>The following data was collected over five trials.</p>
<p><img 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"></p>
<p>The data did not support the student’s hypothesis. He investigated other possible relationships by plotting a graph of the average current against the distance between the electrodes. He obtained the following best-fit line with a correlation coefficient (r) of −0.9999.</p>
<p><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Sketch a graph that would support the student’s hypothesis.</p>
<p><img src="data:image/png;base64,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"></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>Suggest what the correlation coefficient of −0.9999 indicates.</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>State the equation of the straight line obtained using the data.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how current flows in the sodium chloride solution.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>The absorption of infrared (IR) radiation by molecules in the atmosphere affects global temperatures.</p>
<p><img 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" alt></p>
</div>
<div class="question">
<p>Using the graph, state, giving your reasons, whether or not oxygen and ozone are greenhouse gases.</p>
</div>
<br><hr><br><div class="specification">
<p>There is a link between world energy consumption and carbon dioxide production.</p>
</div>
<div class="specification">
<p>Climate induced changes in the ocean can be studied using measurements such as the Atmospheric Potential Oxygen (APO). Trends in APO concentration from two stations, one in each hemisphere, are shown below.</p>
<p style="text-align: center;"><img 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"></p>
<p>Trends in atmospheric potential oxygen (APO) based on monthly averages between 1990 and 2010.</p>
<p style="text-align: center;">[Source: www.ioos.noaa.gov]</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The following graph represents world energy consumption by type for the years 1988–2013.</p>
<p style="text-align: left;"><img 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"></p>
<p>Estimate the percentage of energy consumption which did <strong>not</strong> directly produce CO<sub>2</sub> in 2013.</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>O<sub>2</sub> is consumed in producing CO<sub>2</sub> for electricity generation. The graph shows the relationship between the world’s electricity generation and CO<sub>2</sub> production between 1994 and 2013.</p>
<p style="text-align: center;"><img 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"></p>
<p>Calculate the mass, in million tonnes, of oxygen gas ultimately found in CO<sub>2</sub> which is consumed in generating 18\(\,\)000 terawatts of electricity using the equation given for the best fit line. Give your answer to 2 significant figures.</p>
<p>Assume coal is the only energy source.</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>The equilibrium expression for O<sub>2</sub> exchange between the atmosphere and ocean is O<sub>2</sub>(g) \( \rightleftharpoons \) O<sub>2</sub>(aq). Identify <strong>one</strong> factor which shifts the equilibrium to the right.</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>Factors such as photosynthesis and respiration are excluded so that APO is influenced by oceanic changes only. Suggest why the seasonal cycles from Alert station and Cape Grim observatory are different.</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>The change in APO O<sub>2</sub>/N<sub>2</sub> ratio, per meg, is measured relative to an O<sub>2</sub>/N<sub>2</sub> reference.</p>
<p style="text-align: left;">\[\Delta {\text{(}}{{\text{O}}_{\text{2}}}{\text{/}}{{\text{N}}_{\text{2}}}{\text{)}} = \left( {\frac{{{{({{\text{O}}_2}/{{\text{N}}_2})}_{{\text{sample}}}}}}{{{{({{\text{O}}_2}/{{\text{N}}_2})}_{{\text{reference}}}}}} - 1} \right) \times {10^6}\]</p>
<p>Calculate the APO Δ(O<sub>2</sub>/N<sub>2</sub>) value for an oxygen concentration of 209\(\,\)400 ppm assuming that any change in N<sub>2</sub> concentration is negligible. Reference values for O<sub>2</sub> and N<sub>2</sub> are 209 460 and 790 190 ppm respectively.</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>Suggest a reason for the general negative gradient of the APO curve given in (c).</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.iv.</div>
</div>
<br><hr><br><div class="specification">
<p>Sodium chloride, NaCl, can be spread on icy roads to lower the freezing point of water.</p>
<p>The diagram shows the effects of temperature and percentage by mass of NaCl on the composition of a mixture of NaCl and H<sub>2</sub>O.</p>
<p><img 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/DuX93Qa2VL1BBLkZZrgs5nX8P03W9nTxtVipismgIU0C8g7mkMCQnRv5NbKUABClCAAuplkayJQd4YbcPXoG04sNxg3J5o2HMhPhf/DB7DHRSggDkFxKX7Tp06mbNJtkUBClCAAlYmYEVnSq1MluFSgAJqAV665weBAhSgAAUKI8CktDBKPIYCFJAswEv3kulYkAIUoIBdCTAptavhZmcpYH4Bceney8vL/A2zRQpQgAIUsCoBJqVWNVwMlgLWJSAu3f/3339c6966ho3RUoACFCgTASalZcLORilgHwLi0v3AgQO51r19DDd7SQEKUKBYAkxKi8XHwhSggDGBmJgY9SpOxo7hPgpQgAIUoIAQkKlUKhUpDAuIZUbDwsIMH6BnD9dGz0eRYiGljGhRSjlzlbHH+LKysiDuJ23fvj3k8vy/f825DruUtsxVRnwmzNWWlHakxieWGeWvFaHHLwpQoKgCDkUtYI/HT5s2rUjd5tro+VxSLKSUES1KKWeuMvYYn0j4RTL62muv5X8gJK73LiqQsn67JZex9D5JjU8kpfyiAAUoIEUg//SFlNIsQwEKUMCAQGxsLFq3bm1gLzdTgAIUoAAFtAWYlGp78B0FKFBCAps3b+ZT9yVkyWooQAEK2IMAk1J7GGX2kQJmFrhw4QKqVasGJycnM7fM5ihAAQpQwFoFmJRa68gxbgpYsEBcXBxatWplwREyNApQgAIUsDQBJqWWNiKMhwI2ILBnzx74+vraQE/YBQpQgAIUMJcAk1JzSbMdCtiJQHJyMsS/WrVq2UmP2U0KUIACFCgJASalJaHIOihAgTyBy5cvo0uXLnnv+YICFKAABShQGAEmpYVR4jEUoEChBQ4fPozatWsX+ngeSAEKUIACFBACTEr5OaAABUpM4OHDh1i9ejWngioxUVZEAQpQwH4EuMyoibHmMqP5QOZaklNKOyJKKeXMVcZe4ktPT4e4fG/sISdzLnkppS1zlRGfCXO1JaUdqfFxmVEhxy8KUECKAJNSE2oiKY2IiDBxlPZuKUtXihqklDNXGcaXP8ZSzO3Fb8OGDeq5SQMDA/PBdF5JWfpTVCGlnCWXsfQ+SY0vPDwcKpVKZ9T5lgIUoIBpAV6+N23EIyhAgUIKiPtJ+dR9IbF4GAUoQAEKaAkwKdXi4BsKUECqgJgGSqFQwM3NTWoVLEcBClCAAnYswKTUjgefXadASQqIe0mbNm1aklWyLgpQgAIUsCMBJqV2NNjsKgVKU4BTQZWmLuumAAUoYPsCTEptf4zZQwqUugCngip1YjZAAQpQwOYFmJTa/BCzgxQofYGrV6+iW7ducHR0LP3G2AIFKEABCtikAJNSmxxWdooC5hU4deoUgoKCzNsoW6MABShAAZsSYFJqU8PJzlCgbASioqLg5eVVNo2zVQpQgAIUsAkBJqU2MYzsBAXKTiAtLQ23bt3i/KRlNwRsmQIUoIBNCDAptYlhZCcoUHYCYgnL4ODgsguALVOAAhSggE0IcJlRE8MolhkNCwszcZT2binrqYsapJQzVxnGlz/GUsxt2a9KlSqoUKECXF1d85GMvDLnOuxS2jJXGUFkrraktCM1vn379nGZUSOff+6iAAUMCzApNWyj3iOS0oiICBNHae/m2uj5HlIspJQRLUopZ64ythyfmDR//Pjx6jXv80fe8Csp69GL2qSUs+Qylt4nqfGFh4czKTX88eceClDAiAAv3xvB4S4KUMC4wIMHD9RnSJ2cnIwfyL0UoAAFKEABEwJMSk0AcTcFKGBYQDzk1KRJE8MHcA8FKEABClCgkAJMSgsJxcMoQIGCAqmpqfD29i64g1soQAEKUIACRRRgUlpEMB5OAQrkC8THx8PHxyd/A19RgAIUoAAFJAowKZUIx2IUsHeBhIQEeHp6cmlRe/8gsP8UoAAFSkiASWkJQbIaCtibwKVLl+Ds7Gxv3WZ/KUABClCglASYlJYSLKulgK0LnDlzBpUrV7aRbj7G9d3zEB4+DzcylTbSJ0vrRhrOf1cfMll/jDr3wNKCYzwUoIAFCDAptYBBsIkQlFewaVJfhE7ahAT+TreJITXVidWrV6NSpUqmDivE/nREr5qJ8PAvsPHSfT3HZ+/fd+YGrqv07Da16cF1RB/aiCWjwyHm0BT/Ri/ZiEPR11Hk1OhBHDYu2YJLD6QEYihQFR5c+g+ffR+FuyVZrVZzjwtlHP7Z7mIbi2bF/M7lX52LmX+dRbJWHBLepO/C1vmhCJXJ1PXKZE3R+IP/sCs99weNAmnbusFL1hqhW2/paSB3f2GT4SSc/fN9fD/OK6c90W4PhM7fgLUJj/TUr7kpAVEzO6D/wRTNjQZeK5BxcCC8+q/DydyuGDiSmylgLwJMSm1hpO8dw9K+oQh9Zy1i9J3lUe/vi0mbrqDoP/uUyEw4jt2rP8GebdsQGhqK0NAh+GR1BI4l3CuinhKZMX/gk9VnkVnEksYPz0DM6jmIvvlAQv+M18y9+gXE/aTdu3eHXF6SP0KO4/ffdpdgwqdCVuZtrPryc2y4WBU95vyMFStWYMWK7zGjkxxHF83BlxvjipCYpiP6z3VIbNUKPhVl+mEkbZWhYr1OeM55J9YdvoVSy0vVsZW88YPrUVrGohmVKhGn+x/D5b5BaPzpQemJqTIK60c/i15RfTE04aF6Uv6shAl442w/hI37s+STOeVJ7JjYCoEjL2FbWARuqlTZbV59EyPvzsDYOs+h27ZrUOgdZ5H8vobOCRMwI7gwq5s5wKnth/jVawwG/XHZQJ16G+JGCtisAFd0MjG0VrHMaEMvxP7vCOIfVkC1Bs3Qwqcqymn2S3EHsf87jXS/VmhRuwrOnD5dyLklFbh/Mx7RJ9JQtbEfMu9cRZCYkzLrPm5fvYgzsY/xRNum8HFxAFT3cO3YEUTDDx1b1EblnN/ZWktyijgO3ETVYH/UqGA4mdEqo9kPY68Vd7B/z1n4dWxvtG7dKqS0JaWMaFdKOXOVKWp8N2/eRGZmJu7evQt/f39dVqPvCy55+Rip8dE4nV4OVR9kAl4N0ai2s8ZnOGd/sgwtWwehUmHzwax0HD9yGo/d/NHMzx2OWuVUyMpIwtkTyXBqEgifquWQeSMWRy8Azm5AUKMAnT7kHH+5HPwCaxaIoWCfdIobeKtZTpV5A9GnH8C75ROoWk4rWK3SmmW0dhh5c/78OdR0fGja+F4ttNTon8m2stJx7ew5JFb0zTPOX2ZUnAl8Fc+1Ow9s2YyI7o44/11LBAxviZFnf8HChhWNRJy9S3luFJ5pdBCP1OWr5x2vvd0VadueRsPuKQjQOS67gEgWxX43vGi03QQc/rg9ghf0xqxDX+F9b8e89rJfmNif8Ts+9V2Fq3tWF6pvuZWLvnRv6oI+tz7CyKqGfy7mHs//U8CWBRxsuXMl1bdp06YVqSopS1eKBqSUU5cZ+wyWnoyHUyNPJB2Xw3/CGLwcoLHCjjhTevIjXOg1DFN7PoFPP/4YpvuUfVZz2vB4tP9gISZ0rqlTTpyd/AjD13phxPIhaFEpAZumjEc0emH41J7wzvnZmt8ncfxn+LH1HHza8wkY+9GbX6Yo7I8wY9SrOFe7Fz4a2gJVCllUSltSyhRrfC3w87dkyRIEBQVh06ZNGDFiRCG1sw8ruPSnuDz/OU5f7oIRoYlYMi8Z9d4YjF71cu9XzdkfWQ4DR4xALZGvqVJw6fA+bFn+OyLVV0pd0ejZfnixaxsE1hK3FKiQGb0Wow4kYvC7kxFSq3zBGEUdR+OQWTsQgbUccH33YnVSWtOnXME+qW4h6odvca/NULwT4oXclFGVcgmH921B1L5k7EsWF6qb4tm3nkPXto1QK/dsqk6srp3+D0NbKfDft4fg2KRefls5bez0fwHDNdrQDTzXL+vSRry7pQbeGx4MU+flFi+eh5BqyaaNL4di4IiQPOO5H30B2Zl9Ro3fPVARg2eOyDMWSWn2lwOcgqdjzocbcKK2Hn/djul5L2+4EFsMnjpORMzlW1CY7L2eivVtSv0ba2Zdh+ei0ZhRICEVBbzRetRUTFowCh/N64Nhnz8Jz7x67uHapq8xM2g4tvlrJNvi1oOfZ+OTMbuwS31sd3SdNwGzXuuGrs7ZPwXl/q9h5IBuGL1mMIa+1RD8pZyHyhd2KGAsN7BDDuvucqWnBuLtnjewZMl/+i/ja3RPeTsGe1d/gr7qy/HikvwkLN10DAl5l//TcW73dhwP7otXOtbUk0Q6oUG31zBnbGt4FOJTpLx1DH+vLYeuQbW06tIXR+y1OxpxAFDeRsze1fhE3KIQGoq+n6xF1N7fMCl0GJYeS83plSMqVa+Ftlv/wm6T931pQPClJAFxP6mYDqpkvxxRvVUvDA65beIy/n1c2vQDvjziiLDcS/K/fogX5Qfw8Y+7ci7/Z+DSyVN45FgRHlUN/JqXuaJeq1Y5SazxnqhunMHO3R5oF+CRl5DiQRw2LVyGI/In0axDR/WtAb8u6AV55A/4ccfFnNsCsmOdufUeWs34HitW/Iw5YQ743/LVOKXbpKwq6vh74NSBWNwwmIjpFirq+6IZn70jN2mc4lrLsLG8MTrOmIGRjauaCDQDyUeX4rNfDuB03s8gE0XQCS929imhJE6BtEPrsULRDAF1qxuus2oP9BjoAsWK7diQqnEzlPIANi85CY+XO6BT3s/DBByePwi9ol7DjLSsnFsPeqHd789j4Krz+Zfr5QFo0skDSev+h0iNKk31nvspYIsCed8+ttg5u+uTvDY6vf46el5djSV/xxi+bzMrFWvnfIVI+XP4bkcEIiIisGPdy5Bv+wJf5pa7dxFRW8/Dvb4nqhn4lMjdA9Cxc3N4VzJwQN4APELioR3Y5NsGQV4al8Qyz+qNQ5YUnR8HMhCz9gsMX5+OTt/8i4iIrfjuhfLY/u33iMqrP/uFzLEKGvvGYtfJ67y3VMemJN+K+0nbtm1bOvOTyqujdd8+CEnaiN/yEjud6DPjcfC/VHTq0g5+rjkJp6waGnVph6ZnY3ElRQGo0pF8+S5QuSLccs9Y6lRT+LcqPLhzA1e1ki8VMi8ewX9JTdGla4O8WwNkrgHo0skHZ08nIEUkljmxPvviMwhWn8F1gKtfV7zQr42e5h1Q1aMWXE+dQMyNx3r2l9CmIhh71Khu2rhOzWIbK46OwDMhwzBlcBjafBSJ68a6qozCn58sx84hAzBM86wkjmBXDw+Nh5NyH4wqj6rddyDJWJ24j+sX45EEXwQ+oXGVyVCZpAs4k6Tx0FN6DGL2+msntMoYnNieDI/ObRGSe1a09hh88r8HSNQ6I1oZtXx94Ll1M9aeL/Kjd4Yi5HYKWKWAqWzCsjpl8ilMEe49JO4fj0mdy+f8cPJCjfFLMGdfYv5fppbVqxKNRla9HV4f2xlXl/yCv2My9NSthCI1GWuvBuPpnoFwz/kEyN2b4umwBjh+5BJuKwHl3SRcuO0OX293FP/56kwkJyTpJLhK3Du3T28cXp4ueXHgXix2r72DV17th87e4qJ8ebg36olBQ0IK9k3mCM/6TojadRqJPONQ0KeEtoj5SUtzvXtZtRboOzgYSb9vwA59T+NXCsSABR9igO89REdFIUr8270KH0/8vuDZxxLpswKpydeRopV8yVApsD8WLOgH39RzuH37NqKiDmH3qq8w8ftDOa2qkHnpNCJTPODppnFJF+VRM6AZmhaITYaKbjVRB8lIulO6yUlhjX2cFOYxfvwQKeofVxl4mJ6JhwVscjck4dx3b+LlixPx7QfPIkjrN1grdN2SrD4jqcp5QCn7/4+RuvUpjUvtuXWV3P+VSWdwQtFQO6GVB6BZNw8kzfoJc/b8iff/NDQTgQOc6gSgKS4i+oq+n9klFydrooClC2h9S1t0sIV8ClOZMBczu5xE1MC9OJ2lgiprG/72mI/ZXedjqeblFovubHGCK4/qHQdgrMHL+HI4uNXHunVD0PDuSezduxd79+7GpqUzMGju7uI0bLisMhVJF0lnPfcAACAASURBVDJ0Elw5qrR4U28c+6Jv5NSlxL3zR7D1tie8PTRTY0d4BbVBcIEWy8HD2xO4mIjkQl8CLFAJN5gQuHLlCmrXrm3iqOLsdkC11sYu42cicff3GP3mRHy8NQ7qSaQqN8PrH76BprkJncwZHnWrAfcf4E6xp296gDtJeiY2epCA3Uum4c2JC5GULp7HlqFy0Cv48K02wNUbuPOgJP8yykJK1DL1dFbink0xrdXgmb/jZuS3GJ0zzZV6uqvxG3EpqzD2hTOOOnDUtLG6r8W738ChzWLs2DEXs77fjsg53VBXbxeScG7x02g6pjWGfvcORtbWuOqi9/iibMw5W1nYxNCzPhp75ravQMbVGD1/EHmj9bRDiF5UCbXXj8TsFwNRQyZOkvyARWdybzsqSow8lgK2L2A1Sany/M/47peG6BT+Ml7J+WEkr/0axs0ajCeXfYyx28X8dGm4sHEFlj05ELOGtUNj0Tt5Y7SbPA+Lmy/F2oN3bH9ERQ/lNdHR2GX8rAxs+uRN9Bw0B+vPih+OcjgHD8OSd0PyEjp5NU/Ud7+Niwm3Dd8GUFjNzNtIuKjn3EfmJb1xtA2smRNH8X7RFTY8Hlc0gT179sDLy6tohYp6tEzzMn4sNCcfU10/hF+/v4hmY7/Br9MHICQ4GMHBDVEtMxlX89pxQr2gpnB89ADJqfon8BGHigeVjpicr7Qi3Dw98mrOfvEY1w+ux/enG2Ls/G/QxKcmgkUcgdWQqS+B1Sld9Lfl4Bo8RH3faseO2fevLv/wFdToNBYL1NNciamuVmDFV71QT2vqDSMtFcK4WsPWJo1dU64bNVYmrMWc9WeRBiMPO8ncUffJiXj/zafQ3llPB5RncOCTbtkJ6YmvsDDQ1D2qRvqtd5cDXNr0QbjDiZyHp/QeBKRuwZbf0uAQ3g0v5j0pn3umU18ZTzR64X289U0iVKoMXNs3FBOSxmFU2GdYZBcnSfSZcBsFDAtYTVKa/RTmYUR0z58WJL9b2U9hKpGMhNhkODTzQYBmz+Q+8A1RIHL7SRP3FeXXaO2v5JqX8c9pTuT8CPevX8TcI83wwdrf8fXQZ9G5c2d0blEd9xM07rqq4ovg7v64fSEJdw2e8HmM2zFRpucrreQOb98KOqSPkBCxXG8civslO4upTsN8WwyB5ORkKJVKODkV4r67YrQjiuZfYv4TW+Ny09Kc+zvhCf86VfMfOkIWHtzT/NzIUMm3FbyqpmHtP8f1TEqvwoPEvfhuxlIcveeACsi5nxNJSEt7oDN3ac4+rTOCOWdP6/igTu59rSJo1UPcU581FW/kqFSvCTq5JuH81VSN+Udz+6ALlLtd93K/7nEl996UsXPl8iaNn2l03oCxAhnRY/FavRlYm1UZVeCYfe8kzmLXrthCz12qvDYPU0Oao/3W3ph+sgQSUnWC2xhe6sn4xZnLP7In4q/6PPrProWkWQswR+/Dkgk4vPATfI5RmD6mk9btAHLPxmjmcM7E5fcq8OowAyOGtIOn1j2puWdaC3k/a8kNP2uigMUJaKZuFhdc4QPKfgpTroxH/HF9K8Jk16Q4EY8YgwlW4VuzjiM1LuP//DfO5gWdiQci6fNtgHpuGmculA+Qkar5cIUzGoZ0Q/Oodfh93w09Dw7dw5VN32DY9P8ho6IjIK8Kz/ruwMUzOKk7qb56n5POWdfs+0z1xaF4nDtIMlTxb4Xu7ldw5tJdjRiUyExOxMW8PuW+yFLfuwpfL3iYfPgqtwz/XxSBGzduoE0bfQ/pFKWWwh6be4lZgbNnb+YUkuUkeucRuScm+2EiKJASF4HVy7dB888vVPRFLb+6aHJiORatjsQl8QCU+isT109vxs8fr8btLv+Hfq2rQ4bc+zmv4uaFY5i4KlrjCkHOPq0zgtlnYl1PHcCes3ezE05VCuI2r8Py3fnna1HJHz0GN8SJ5RuwJ1EkzSo8uH4Yf23Yox2rOq6ce1ebNkNATY3vzZyoS+d/xo2Tb6aZNH7q9Zf1GCch5t9XMbLZImweNx+/vVQX5VAu597J04geEQSvSTtNnyTI+B1fDpiAT+OGYdav7+P9RsU/Q6o8vwhvff0avk3Pgir9S4zfOBSz94uraN5oPWUjtg9cj9lt3kL/jTF5ibM427v2gx54fnognlo+teCUUc4BCOh8Xvssq3IHfnyyYn7SKwYwfTe2boxGstZDWjkPWXV/Gv20HtwqnRFnrRSwZAHrTkp1n8IUT0BG5/7isWR2M8WWexk/6TiO385t0xku7u5wj9qFzSduZSd6yts4+8cyfLvpUu5B2Wd5AnrinXcb4eB7X+KHLWfxMPdqemYCjqyeh/Fzk/H09P9Dx+riF2il7Ps5b2/C3MHjNaZqElVm79M+6+oM/+BgvXGcu6Zxs3+VJugzthkOfvsLNl8RZ8vEClP7sPKXzcjrUm7Uqkfqe1eDuzaBl3V/snN7ZHH/j42NRc2aNc0XV+4lZs2JOCv54+kJA+AXuwSjB4llQ2di1TlndHlnDJ7VPA4ylKtUA8PmTMDTngn4bfRrOcuMvoU5kUq0HDkDE/o3gWvOpKOyWh0xbPZg1Mi9VVCjl7JaLfHcsyk4EJOcc8ZThkqNumPCsLqI/fht/E/c5/n2Kpxz74J3xj6rMXOmA6oF98eMkf5I+uldhIcPwps/xsGzUyc00qhf/VKVjJgD8WjargFq5k6EqntMabw3YuyUHmvSuKJXZy1jEaJM5oUma1qg7rqTODO3e/atVOKnSsPP8VPka3i1ULOJpeH8ypmYFKkAkhZidp0KBZ6sL69ObIv2zS6uup26+S76OckBpzYI7pE7H64IMAhPfRGLa2saIWxbKGrkLG1ars4PWFRtDr69+g+2h9UuOGWUPAT9pnZC8mqNaZ3kT+H1X37FQtf3MNClXHbsLuMwy+1b/DZb4yEtZRT2rk6AZ1/N6aRKY6BZJwUsX8DABH6WHzig8RTmKo1vcGsI3YwxZl/GfwEH39ub06ocDtXq4KMptbFkfD88Jba6d8fwt5/Ghx+4Y+a3msFVwRM9x+E7v8M4uPsn/L49CqHbtwGoh+7DB2H6r23QQv1EvCjjCO+n38aiexUwc1G8ZiXZ+0J645Vlf+FkYjd4qyemlqNKsxfx0ZQ/CsTRrNl5xCXkVlEe1Tu/iW+cdmPT14MRKrLr5q/g3bDuaH78SO5B6v+rMlOwK6oBuo7RngtV6yC+KZbAhQsX8OSTTxarjoKFnRE44EOsKLhDvUVWLRhvLVgBxeLF2ZO6wwGu9TphwPROGKBTJnBBwbO4Mtd6aBUi/ukerVNY1OsXhgbBFzBiQKDOTif4tg2G4rcTiG/riXpimikxz2nnAZjeeQCyJ7QfnlMmEAu0nsKrhFqBIRgg/uUcobq+GwdwRqsN1Y1YHLjaDs+N8dS4ZK51iNabcvV64avcJrX26HtTvlDGb+UVzTb2aXIKn+ksjmDKWDxwJZ561/9VBV4df8LyxJ+wXP8BGltd4D/sAlTDNDYZehm2HYmGmoQDXPTuv4fErWMw6PrX2NxN87awKvDqNAVviX/fGGpQd7sDXNq/gQ9PLsWiqD7o2jb7ryO5dz/0e0/80z0+/73y/Hr8vvcdzNjgXzDZzT+MryhgFwJWmpRqPIV5QuMpTHEJJdBKu1Scj1uVFhi6bp2BGkRSNxbrIsbm75dVQECPofi6x9D8bepXLbCus84mMQVTQHv0DGiP47dMrAQld0ejflOxrp9uHQCqNEBIvyws2ReH0JcbZU8zJXfXG0fcvgZY982bGpVUgXeLnhgq/uVsVSZswi5oJqWPkHn3Ni6+8iZm6V2NRaM6vpQsIFZwGjhwoOTy1lswe336F/0WYfupYLwZLC75l+RXOs7uOgC3wW+gUaHXUS3J9u2tLpGQ9kfrRS/h11/76EwtJdHCqR9GrvwRNZbswMnglwpZZxwilmxA8m/7MTTvwSmJ7bMYBWxAQKYy/CetZXZP3KT+WX90fq8dhhZ4CjMOOye2RA/5BlzRWgLO0Pb8Loo17g19hYWFGdqld7uU9cpFRVLKmatMicSnuIPYAzdRNdjf6Pr0hemT6v41HNuXAOdWLdFA3BuruIP9e87Cr2N7o3XrDlhh2iqJMiXipxuIgfdS+lSY+O7fv4+LFy/C19c3r2WTa6PnHZn/QkoZUVpKuZIuo3qUgiuX78Pd1xNOGuvTF7Ud9Tr3R6/jkWsFtGgcgKyMJJy7XgEN/NzzJuLPF9N+VdS2pNpJLSemrLLoXyvpO7B26jC8X/tnrJncKe/WAm1lie+UJ7F96JtY+tZWrMk5W2q4JgUyDr4K/y/7YPOqvoVMYg3Xxj0UsAUBqzqtKJ7CnC5uend4F7NOTtZz07sHvBt4QLE++4Emz9xbjZTxuHT0ITxe8YLuxC65g2joh6hIVk2vE59bS/b/uTZ6voe2xWPcPrYaS8+3wrjcs6X5h+a90i6Tt1nrhThTOmXfX6j/f+MwtEU5xKz+BtF3WuGr2TO0ljHVKqTnTWHa0i0mpYyoQ0o5c5UpTHyHDx/GuXPn1Eu95prkrsOe+74w/5dSRtQrpZwll7H0PkmNTySllvulQNqBTzB2YRyS0BlNpolI/RC4JgJn+tUpftjyIHT74RC6FaomBzi1/Q2Jawp1MA+igF0IWE9SqvkU5qH38b7eS7QuqN8rHENGf4ZRS4Oxa3hTeKjPrI7B8L3v4Fves1PGH+rycG8Rjqktih+G3LsnPo/omVdRwMszEBj3cZES0rzCfFEogatXr8LDw9CfdYWqggdRoIwFDN1fWsZhsXkKUEAtkHsu0eI5CvcUJiD3HoZ3/+qGXitbZj85Wa4JOp99DdN3v817dix+lBmgJQuIh5yqV9d8IMSSo2VsFKAABShgbQJWc6a00E9hwhMNey7E5+KftY0G46WABQuIh5z69u1rwREyNApQgAIUsGYBqzlTas3IjJ0C1i4gVnJq27YtHB31TOJp7Z1j/BSgAAUoYBECTEotYhgYBAUsWyA1NRWenoWa8dyyO8LoKEABClDAYgWYlFrs0DAwCliOQFJSEry9vS0nIEZCAQpQgAI2J8Ck1OaGlB2iQMkL3Lp1C1WqVCn5ilkjBShAAQpQIEeASSk/ChSggEmBmzdvcjook0o8gAIUoAAFiiPApLQ4eixLATsRWLVqFZycnOykt+wmBShAAQqUhYD1LTNqZiWxohOXGc1Gl7J8pbnKiAjN1ZaUdqw5vqysLOzcuRMdO3Ys8N1n6Utemis+Ke0ITCnlzFVGanwWv8xogU8xN1CAApYiYDXzlJYlGJcZzdY315KXUtoREUopZ64y1hxfQkICXF1d0adPnwLfhuZaxlM0bK62zNWOpfdJanyWvcxogY8wN1CAAhYkwMv3FjQYDIUClihw/fp1VKhQwRJDY0wUoAAFKGBDAkxKbWgw2RUKlIZAZmYm5ygtDVjWSQEKUIACWgJMSrU4+IYCFNAViI6Ohru7u+5mvqcABShAAQqUqACT0hLlZGUUsD2By5cvw9nZ2fY6xh5RgAIUoIBFCTAptajhYDAUsDyB/fv3w83NzfICY0QUoAAFKGBTAkxKbWo42RkKlKxAcnIy2rZtW7KVsjYKUIACFKCAHgEmpXpQuIkCFMgWSE1N5UNO/DBQgAIUoIBZBJiUmoWZjVDAOgWSkpLg5+dnncEzagpQgAIUsCoBJqVWNVwMlgLmFbh16xYcHLjGhnnV2RoFKEAB+xRgUmqf485eU6BQAjdv3oSHh0ehjuVBFKAABShAgeIIyFQqlao4Fdh6WZlMhrCwsCJ1097WRjeGI8VCShkRg5Ry5ipjrfFt27YN7du3h1yu/+9XS1+H3VzxSWlHfCaklDNXGanxiWVG+WtF6PGLAhQoqgCTUhNiIimNiIgwcZT2binrqYsapJQzVxnGlz/GUsyt0S8tLQ29e/fGihUr8juv84rrxGeDSHEQJaWUM1cZqfGFh4czKdX5PuFbClCgcAL6T38UriyPogAFbFhAJKV9+vSx4R6yaxSgAAUoYEkCTEotaTQYCwUsSOD69euoVq2aBUXEUChAAQpQwJYFmJTa8uiybxQohsDt27fh4uJSjBpYlAIUoAAFKFB4ASalhbfikRSwK4H4+HhUr17drvrMzlKAAhSgQNkJMCktO3u2TAGLFrh8+TKcnZ0tOkYGRwEKUIACtiPApNR2xpI9oUCJCuzfvx9ubm4lWicrowAFKEABChgSYFJqSIbbKWDHAgkJCWjbtq0dC7DrFKAABShgbgEmpeYWZ3sUsAKBBw8ewNPT0woiZYgUoAAFKGArAkxKbWUk2Q8KlKBAUlIS/Pz8SrBGVkUBClCAAhQwLsAVnYz7gMuM5gOZa0lOKe2IKKWUM1cZa4vv6tWrKFeuHFxdXfM/AHpeWfqSl+aKT0o7glNKOXOVkRoflxnV843CTRSgQKEEmJSaYOIyo/lAUpbXNFcZEaW52pLSjrXF991336F169aoVatW/gdAzytLX/LSXPFJaUdwSilnrjJS4+Myo3q+UbiJAhQolAAv3xeKiQdRwL4EVq1axSfv7WvI2VsKUIACZS7ApLTMh4ABUMCyBB4+fKgOyNHR0bICYzQUoAAFKGDTAkxKbXp42TkKFF0gOTkZffr0KXpBlqAABShAAQoUQ4BJaTHwWJQCtihw/fp1VKhQwRa7xj5RgAIUoIAFCzApteDBYWgUKAuBzMxMzlFaFvBskwIUoICdCzAptfMPALtPAV2B6OhouLu7627mewpQgAIUoECpCjApLVVeVk4B6xNIS0vj5XvrGzZGTAEKUMDqBZiUWv0QsgMUKFmBTZs2mZyftGRbZG0UoAAFKEABwEhSqkDmpVO4+Fil5aSMX4bJKw7idKZSazvfUIAC1i8gzpLWr1/f+jvCHlCAAhSggNUJ6E9KH5/Ars9ao4vfTHx8LlOjUxmIj5iLzwe1Q9AzUzD1ZAq0U1aNQ/mSAhSwOgGRlDZp0sTq4mbAFKAABShg/QIFlxlVxWH/7K7oPjsB91qPwNgfP8XXQS45PX2MjPO/YsPKbzH/q5OI8p6Mr3bNwTs1HaxfwkAPxDKjYWFhBvbq3yxlPXVRk5Ry5irD+PLHWoq5tfh5enpCJKY1a9bM77CRV5a+Dru54pPSjmCVUs5cZaTGt2/fPqhUPF1h5NuGuyhAAQMCOkmpCo+ODkZoq39xZuKv2PHBM2hVSd/J1HtI3tofvXrsR9zXO3FlXHNUMdCAtW8WSWlERESRumEPa6MXFkSKhZQyIh4p5cxVxlri69y5M+7evYtWrVoVaogtfR12c8UnpR0BLKWcucpIjS88PJxJaaG+e3gQBSigK6CTcaYjPup/+J/TixgxOsxAQiqqqAKPsBkY3+8+7vx3FFG8vVTXle8pYJUCYjqo6tWrW2XsDJoCFKAABaxbQCcpfYi0u2lAzUZoWdvEutey+qjf0gWIu4NkJqXW/Slg9BTIEbh8+TKng+KngQIUoAAFykRAJymtAJdqLsD9O0i+ZyrTTEParYeApxNcZGUQe8bv+DTAHaFbb+k0fg+J+8djUufyEJfeZTIv1Bi/BHP2JUKhcyTfUoAC2gL79+/ndFDaJHxHAQpQgAJmEtBJSp3g3aQpmiTtxrpDt4w+Wa9K+BUrlqXBob0/gsqZKdrcZjI24cep0/DP+Xq5W/L+r0yYi5ldTiJq4F6czlJBlbUNf3vMx+yu87E01VSinVcNX1DA7gQeP37M6aDsbtTZYQpQgAKWI6CTlMpRuc0IjH32MCJGTcHgHXG4qdB9ijITKdHz8O27X+Gnxy9gwIDW8DRbf7LPgg5rexqN/q8HnAq0m4YLG1dg2ZMDMWtYOzQWvZM3RrvJ87C4+VKsPXinQAluoAAFsgVEUsrpoPhpoAAFKECBshIoOJdT+TAMXjIXV16ZiA+7/YQVLZ9Ds+aN0CD9EvxqJSPp1FH8sSsNGU6d0GrRx1gg7is105fy3CT06O2GEcfGoV36O3paTUZCbDIcmvkgQDPdlvvAN0SByO0nkdT9STMm0XpC5CYKWKhAZmYm17y30LFhWBSgAAXsQaBgUgoZytd+GzPXPoGm383C3Ln/IOroPziep9EANQZPw4RRgzEluBYq5m0v/RdyrzFYFdcAjZ3lUJ7T054yHvHH7wMt9ewDoDgRjxgl4KmZsOo/lFspYHcCWVlZcHEx3x+ZdgfMDlOAAhSggFEBPUmpOF6G8jVfQL/3euPFcbG4EH0Gp64qAI8ANAjyRzO3iiiLZ5vgEoDGxrqTHoOYaIXBpNRYUe6jgL0LpKamcjooe/8QsP8UoAAFylDAQFKaG5EMDi7+aNhO/Mvdxv9TgAK2KPDo0SNOB2WLA8s+UYACFLASAZ0VnUTU6UjcPgmzPt2PM82nY9asPujhbO7H603rKc+NwjONDuLRls2I6J4z2bdyB5Z1fxrDWm7Blc817x2Nw86JLfHUqa8R8d8QdNVz+V5MH2Xoi8uMZstIWV7TXGVEhOZqS0o71hDftm3b0LFjR0PfBnq3W/qSl+aKT0o7AlRKOXOVkRoflxnV+63CjRSgQCEEdM6UKpBxcBhaDfLC4J/nYvrxiXhlXAXs+eF5NDGcsxWiGTMdIveBT/PKBhsr8ACUxpGG1moWyeq0adM0jjT9UsrSlaJWKeXMVYbx5Y+7FHNL93v48CFEUjpixIj8jhbilaUveWmu+KS0I3illDNXGanxiaSUXxSgAAWkCOicM7yLczv2wPmL0fikRxh6jX0X41f8i3VJ1jLtvAe8G3jkPdCUB6KMx6WjD+HRwAseeRv5ggIUyBVITk5GnTp1ct/y/xSgAAUoQAGzC+gkpZVR44nqSDx4HEcyH+DO8W3Y4/gE6rta3uV7/VIuqN8rHEN2foZRS08hWRykPIMDn43B8L3vYEZ/f+icGtZfDbdSwM4EUlJSUK6ctXyf29ngsLsUoAAF7ERAJymtgide/hl/Vh6N0MqV4P5qBfjvG43/q2wN1+6zR0zuPQzv/tUNvVa2RA2xzGi5Juh89jVM3/02hlbV6a6dDDK7SQFTAnfv3kWlSpVMHcb9FKAABShAgVITKHjisHxzdPv0Aq6NuoK06vXhXckyEzl5w4XYorvYlJrJEw17LsTn4l+psbFiCtiWwK1btyCXW+b3um1JszcUoAAFKGBIoGBSqj6yIlzq+IPTaBti43YK2JbAzZs3UbGiOZfCsC0/9oYCFKAABYovwFMjxTdkDRSweoGjR4/CwcHA36hW3zt2gAIUoAAFrEGASak1jBJjpEApC4i5L5mUljIyq6cABShAAaMCTEqN8nAnBWxfQEwH1bZtW9vvKHtIAQpQgAIWLaCTlD7CzQ2h8Hx1Ot5Y8h/+jrmFNL0PE1l0nxgcBShQBAExcb6np2cRSvBQClCAAhSgQMkL6CSlclSq0xTPXfgKy0b0RO+G9VCjYzie/OBHfLk9GnGZypKPgDVSgAJlKnD9+nW4u7uXaQxsnAIUoAAFKCBT6V1f8wHSL25F5K7/cGDPZmz8Ix5HMgA4BcMvvDee7tIez7ZphVC/qqhg44ZimdGwsLAi9dJW10aX0i9zlREDZK62pLRjyfGJJ+8fPXoEMS2Uv79/kT7rlr4Ou7nik9KOgJZSzlxlpMYnlhnV+2ulSJ8sHkwBCtijgIGkVJNCBUV6NM4f+gcROzdh5z/7sf6UWHbUEy7dnkfo0HewvF8AqmoWsaHXIimNiIgoUo9scW10ASClX+Yqw/jyP6JFNV+5ciW8vLywY8cOjBgxIr+iQryy9HXYzRWflHYEr5Ry5iojNb7w8HAmpYX43uEhFKBAQQGdy/cFDwBkcHBujMCnpmDUR3vwx4lbuHFyDTZ99xTecN6AzX+dRoK+YtxGAQpYhUBGRgZcXDgrsVUMFoOkAAUoYMMCRZ+YUFYVNZr2wzPi31AFPkxToLINA7FrFLB1ATFHadeuXW29m+wfBShAAQpYuEDRk1KtDjmgiksxq9Cqj28oQAFzC4h7FJ2cnMzdLNujAAUoQAEKaAkU4vK91vF8QwEK2JBAWloa6tevb0M9YlcoQAEKUMBaBZiUWuvIMW4KlICASEqDgoJKoCZWQQEKUIACFCieAJPS4vmxNAWsWiAlJQUVKtj6xG5WPUQMngIUoIDdCBQiKc3EneOfYe7IxujqK4d8+L+4nvUvFnV4H59Gp4ILPtnNZ4UdtUGBu3fvqqeDssGusUsUoAAFKGBlAiaS0ke4G/kq+naegklbKyAdgCrzEZSpl3E5+QNMfWEyJpwVs+rziwIUsEYBMWG+QiHmHeYXBShAAQpQoGwFjCel9zfgx4nrsbvn99h07HdM6+Cojvau20jMifgY42RLMf+nQ0gq2z6wdQpQQKLAjRs3UKdOHYmlWYwCFKAABShQcgJGV3RSnnoTIUHH4bBlMyK6X8Ef4R3Qt9xvOL28DxrjMvZMb4GQ/97HX1Fj8Hy5kgvKkmriMqP5oyFleU1zlRFRmqstKe1YanzHjh1D3bp1UbFiRZtc8tJcS3JKaUd8JqSUM1cZqfFxmVEhxy8KUECKgNFJRpX305AEZ7SsWlFP3eXh6CgH0h7hoY3fWDpt2jQ9/Te8qajLPObWJKWcucqIGM3VlpR2GF/up6ho4xQaGopvvvlGXdhcy1dKaUcEKKWcJZex9D5JjU8kpfyiAAUoIEXA6OV7B5+W6CY/hb2H4/FYp3ZV2nbs/O8u5N0aopmNniXV6TLfUsCmBDhHqU0NJztDAQpQwOoFjCalqNEPg2dWwo2330HIgv2IvqUEbp/HodVvYVLf4Zh+MATdX26DBjKrd2AHKGB3Apyj1O6GnB2mAAUoYNECRi/fQ+aH9tP/wTblSxj29mi8p+7KVAzZCMApDB1++QrLu9YAc1KLHmMGRwG9ApyjVC8LN1KAAhSgQBkJGE9KRVDlm+OpD87g2OAI7DtwKY45fQAAIABJREFUBAdiK6Fi07Zo36kVutSsxIS0jAaOzVKguAJijlJPT8/iVsPyFKAABShAgRIRMJ6Upv2IGcFRSFk+B/PbPYOn/Z7B0yXSLCuhAAXKWuDKlSucOL+sB4HtU4ACFKBAnoDRpFRxdgtWnU9CY0V5nhHNI+MLCtiGQHp6OlxcXGyjM+wFBShAAQpYvYDRB50cGoTgpVpROH7gNGIzlVbfWXaAAhTIF1i9ejXc3NzyN/AVBShAAQpQoAwFjJ4pRflaqNu+PK682wn+s1vBO8QLLpfitMKVv7wIG98LwRNaW/mGAhSwZIGHDx+qw3N0zF6lzZJjZWwUoAAFKGAfAsaT0sxYnNyWs7Z9xhEkbDxSQEWWmI7sX28FdnEDBShgoQLJycno06ePhUbHsChAAQpQwB4FjCelNaZgSfoULLFHGfaZAjYswOmgbHhw2TUKUIACViogU6lUNr5IaPFGRiaTISwsrEiV2NLa6Jodl9Ivc5URcZqrLSntWFp8N2/exKNHj7TuKTXXmupS2hF+UspZchlL75PU+MQyo/y1IvT4RQEKFFXAeFKauR+bF23BgXTD1crbhWPs0/VR1fAhVr1HJKURERFF6gPXbs/nkmIhpYxoUUo5c5WxtPhWrlypng7K398/b7C4Tnw2hbkcRGvmaktKO1LjCw8PZ1Ka913FFxSgQFEEjF++v7sFv0+cjV+M1fhqEF6y4aTUWNe5jwLWKsDpoKx15Bg3BShAAdsVMJ6UegzChL8a41mdJ5lqVb6Ec7uX4O1lIRg0ogP8bNeHPaOATQqI6aB69Ohhk31jpyhAAQpQwDoFjCel5f0Q9LwfgvT0rXP3NqgQ1xPjdo/E5+1qoaKeY7iJAhSwPIG0tDR1UJwOyvLGhhFRgAIUsGcBo5PnG4Up3xiBwU64u3o/9mYZPZI7KUABCxIQSSmng7KgAWEoFKAABSigFpCclKruH8DhfalAFUdUICYFKGA1AtevX0eFCvyutZoBY6AUoAAF7ETA+OX7Oz/ig15fYXX21b48ktq1H+DRhUvYfaku6n7XBV3K5e3iCwpQwMIFMjMz4enpaeFRMjwKUIACFLA3AeNJqSIZiaejEZ2zqFMuTnQ0IGv5Atq/OQZLX2+ESrk7+H8KUMDiBaKjo9G0aVOLj5MBUoACFKCAfQkYv3zvHIIX3p2PH2LS1fPOiQmRc/8pj/yOv8L24tu5kYjl9Pv29alhb61aQNxTysv3Vj2EDJ4CFKCATQoYT0rFPKWzvsFXJ+7q6fwdxG2ahx+WHcRxPuikx4ebKGCZAps2bUKtWrUsMzhGRQEKUIACditQcEWnR/9i8TN9MHLn40KhyF5Yjsg/XkUH4+ltoeqyxIO4zGj+qEhZXtNcZUSU5mpLSjuWEt/jx49x5MgRBAUVnOiNS3Jmf9bN5SBaM1dbUtqRGh+XGc3+HPG/FKBA0QUK3lPq2B0vzx6ELdcPoJx3Mk5szURC+27wSz2vU7sLKrZ7Cf0n9EZ7G01Iczs8bdq03JeF+r+UpStFxVLKmasM48sfeinmluKXkJCgXu9e35RQUpaiNFcZ4WeutszVjqX3SWp8IinlFwUoQAEpAgWTUjjCrdOP+PMMgJufYnitnxA1eQGO9K4tpX6WoQAFLEhATAdVrVo1C4qIoVCAAhSgAAWyBYyf46wxBUuUMVaRkCqv/Y5l47wgLrer/4VOxqhfD+CMkkNNAQrkCojpoKpWrZr7lv+nAAUoQAEKWIyAnjOlOrGpbiJ+x2/4IzIF6Rq7nJ2zUCnzFFbeHYafv3wGDTT2mf2lMgp/ThmOKR7zsObqK+jn/RiJ+0ZjStehGF1zJyK6Vzd7SGyQApYocOXKFXh5eVliaIyJAhSgAAXsXMBEUnoZUZ+G4Mlpl6EzVWkOmxMqTny7zFd0Up7/Gd+t6IF+Z19GP29HAI7w6vgtZixoicbbTyKp+5PgVOF2/kln99UC6enpcHFxoQYFKEABClDA4gSMX76/vR4r517GvZBxGLPoNYxpJYes50x8sfh1TAyrBARPxoKpXfFEmXZLgYyrMdjp4IfGniIhzf2qjFq+PsDX27Ahldfwc1X4f/sWWL16tfpBJ/tWYO8pQAEKUMASBYwmpYoL+/Hv3RZoP2kyvh3xPl7qURWqNC80eWsZ5q6ai0lX52DOP3FQlGnP7uP6xXgoPGR6o/BQxOFM0iO9+7iRAvYk8PDhQ3V3HR01/3izJwH21doFUlJSrL0LjJ8CFDAiYDQpzS5XFbXdnQC4w7t+TeB4NI7dzgLcnkWvIZUR/1skIsv0RGQyEmKTjXSRuyhAASGQnJyM7t27E4MCVivQtWtXvPbaa1YbPwOnAAWMCxhNSstV90YT3MLF66lQoSKqe9eGZ8YVXLghzriUh6OjHIi7g+QyTUqNd5B7KUCBbIEHDx6gUqVK5KCA1QqMGzcOy5cvZ2JqtSPIwClgXMDog06yer3x0nML8eq7k/Ai3sdvzYMRIluIdT//ifAekVj92x3Igr3hW854I6W71wPeDTxKtwnWTgEbEEhKSkKDBmU6T4YNKLILZSmQe5b09ddfV4fx888/l2U4bJsCFChhAaNJKeRdMGDxXMS+MhGf7HsD954fjemLNuPIiP9D6FcAnHqh949PoaX+2zlLOFRD1WU/0OSQrNJ7QHKBB6D0HsaNFLB5gVu3bvFMqc2Psu13kImp7Y8xe2i/AjKVSqU/m9MwUWXGIepGDQT7OEOmuoNrkSvwY4QHfF/ugX4BbmU/JdS5UXimUTLqn/0FCxtWzIk8Dee/a4mA9dMQ8d8QdDV6owLUE+5rdJkvKUABClDACgSOHTuG5s2bW0GkDJECFDAlYDwpTfsRM4KjkLJ8Dua3q44yPSFqrCfKKKx/PRQvqxZi88JBeMo5M2fy/CO4urF4k+eL1aEuXbqESZMm4dq1axCXjerXr28sGklr2IsKpaypbq4yIr7Q0FBEREQY7bvuTnPGZ662pDhYwviKuJctWwZDT99LWfM9PDwcK1as0B12o++ltCMqlFLOXGWkOFh6n6TGJywKca7D6GfE1E5xtlTcW/rTTz/x/lJTWNxPASsSMHr+UHF2C1adP4OrivKWm5AKbHkLdJ/0ORa5TUU3l3KQyZxQu58SD376Hgu6FX81Jx8fH6xZswazZs3CJ598gpUrVyJ3eh0rGmuGascC4sn7Nm3aGExI7ZiGXbcyASakVjZgDJcCRRAwmpQ6NAjBS7WicPzAacRmWvIj9g5wajwSb32TqP4LXfyVrkpcjjXhbdHYaA+LIAWop9M5cuSIeu3wMWPG4PDhw0WrgEdToIwEbty4AT8/vzJqnc1SoGQEmJCWjCNroYClChh/0Kl8LdRtXx5X3u0E/9mt4B3iBZdLcVp9kb+8CBvfCynjVZ20QirVN66urvjiiy/w7LPPYvLkyRBJ6iuvvMKlG0tVnZUXVyA2NhZ169YtbjUsT4EyFRA/f3nJvkyHgI1ToFQFjCelmbE4uS1n1fuMI0jYeKRAMLLEdGSvE1Ngl01vEJM4b9myBWJKkt69e+ODDz5A586dbbrP7Jz1CkRFRan/eLLeHjByCgDffPMNGShAARsWMH5xu8YULElX5V8SF5fFdf4plzwLe535UPzVLiZzFk9/RkZGqs+ginv3+EUBSxJIS0uDmA7Kzc3NksJiLBSgAAUoQAEtAeNJqfrQTNw5/hnmjmyMrr5yyIf/i+tZ/2JRh/fxabRY6YlfYjoScdZUPN08bdo0JCYm2uSDUGFhYRxsANbmcOXKFQQHB5fK2HXs2LFU6rW2SulgbSPGeClAAUsUMJGUPsLdyFfRt/MUTNpaAekAVJmPoEy9jMvJH2DqC5Mx4WzO5X1L7J2ZY5owYQK2bduGjIwMfPjhh0hISDBzBGyOAgUFxP2kTzzxRMEd3EIBClCAAhSwIAHjSen9Dfhx4nrs7vk9Nh37HdM6OKpDv+s2EnMiPsY42VLM/+kQkiyoQ2Udipg+StxbKp4SFVNIiTOonD6qrEfFvtsX95N6eXnZNwJ7TwEKUIACFi9gNClVxm3DXwdboMsbL+AZ53sanZGhvPcreLGvKxTbTyMqS2MXX6oF3nzzTezYsQNxcXHqh6AuXLhAGQqYXYD3k5qdnA1SgAIWKSBWeawPmaw/Rp17YJERMijA6IpOioP90bBdMloe+Adr2p7HH+Ed0Lfcbzi9vA8aIxEHZgeh/a9TsObcRPQz/hy/1VqLFZ3ECiVF+dq3bx807zFLSkrCoUOHULNmTfVl1HLlyumt7vTp02jSpInefYY2lk4ZFbLSruDY8cfw7eAHN4fstbzUbTVugLSkKzh/Jh531UG5wyewDmpWd4dLhYJ/45ROfPo1Sq4tBe7fuYFrF+MQfzd7bokKnv5o4lsbbpUdkNuO6mEqkq7E4Uz87eyAqvkgsG5NVK/uggp6lj/LLac/ev1bi1vm9u3buHPnDmrXrq2/AY2t58+fh7+/v8YW8TILD1Ju4GrsJdx8BMCxBnwa1EEt14oQn+LsMg3wKOMWEuPjcS1VfRCq1n4CXtWrwc0p++qKZqX629E8Qv9rKeVKrcyj27hwIgEO/oHwqVo+x0HYPULGzUTEx15Dqrobrqhd3xPVq1WDk2PBD0WpxadDKKUdUYX+cpm4ceY0LqSIsdb8ckf9Vv64cGQ/VKoMJO6fiW8mzcfcSAUAT3i88x7GvPQ8pnT0QvF/XcRh58SWeOrLNM0Acl43QeDs9/D+kN7o513w86engIVsSsK5jZMw+so0bB7RqASMzNit9B1YN3MQ+n0rrpv2w0itJb9FHAqkbXsaDbtHQ/HJBpyZ0hYeWuHl7nfDiwXKah2o/036LmxZvwi/TV2LX3Iu3ToM+hxTXnoWY3o3ymkrZ+nx4S31xKdRrXIHfuzWCzNfOY4rbzW0rnHQ6EaJvlTuwPfeX+P4znUaS7nntqBARvQEjOo2D78kNUHgx4uxZnInjTniFcg4+DrabhmFXe+10xn33Dry/2/0Z4ODT0t0k3+Bvw7H43Hb/ELilSptO3b+dxfybg3RTH+OpV3AIt7dk/SD8tdffy1S9IMGDYJumZSUFPVSpXv27MHEiRP1LlVqrmUyjbejROaVCPy64AruOnXA/00YghZVspPNjz+eg6GdnTF8fW0MW/IFwgLcgdun8cfSr7Da/VUsH9oCVXSkjLelc3DOWyllRFEp5QqWeYxbexdh+Lfl8fJHH+ClRu6QK2/j7B9LMXN1ZfReMhJYOhfTpryBvV++h/Xth2HJF12hpji7EUtn/gf3V6diaIuqBTpXsK0ChxTYUNwyYvUxcem+YLJZoCk9y3gqcDdqJWZurYHBH09DcK2KeHD9MP788XfEPTEKE3r54afFizF8QGv8MHMnWgyYjqmd/OCKFMRtXoWvN7rhxbn9EFhJOxmTsvSniFZKuVIpo7qFqB++xL5HHnj2+dcxINA5J7a3crxqYsCHU9GpniuQch6bV/2Eja4vYu6AQFTSYS+V+HTakGpnsFxmNFa964DQL0YgpFb5Aq2Fh++HMmEuZnY5iYvz9uL07nZojDM48Fl/dO56GW63PsLIqgX/gC1QUWE2eE7FwrNztOvL2IQf3uqP/oM+xJp/xqKfUwm1VZh4inNM6gYse2EVohdNL04tZVA2Ded/G4Z+a/pg1tWv8L7RPwSSkDz1Q4wKXYE1bV1LIFYFMs7OwQdvfIqf232HhYdWYLm6/STE/DsBH704DY0/jNSTBJdA0/ZURXoMTpXrjX7+FQv2OnUpPmi2Gcd/i0fWM2ew7K1eCPvxYH5CrzyGTSMd0O+vliYTUlG58e/WGv0weGYl3Hj7HYQs2I/oW0rg9nkcWv0WJvUdjukHQ9D95TZooP07p2DQFrIl9wdl1MC9OJ2lgiprG/72mI/ZXedjaWrprlglpo9aunQp5s2bZ7lLlSpvI2bLMnyz3x0hXT0LjpoqE4f+OQTfsKfVCan48Mjdm+ClQX3hu/UIzt8rXcOCAZXCFmUSDv2zF+j+NHqKhFQ0IXdHo5f+D0N89+Lb9achzvsoE4/gn02eCOsZggB38Yu5PNwb9cSgIZ7YGnURmje7lEKUha5S/BEk+X7SzPPYsvwCOr34DIJriXRKhoq1mqNrJx+c/e8ILmaKuTeUuHFyP3bXaYeuIiEVPwtkrvB7+nn0q3MOJy/Z2oOQmUjcswG/33SC7jllqG7i5M4TqNOpizohzabwx9MvPI06kadxSe1V6KGz0ANVyLx0GpGoBY+qhs9pXNi4AsueHIhZw9plnzGRN0a7yfOwuPlSrD14p3T75tQTQ2YNRvddczH29/Pq79fSbZC1Zwu4oIaz4c9E9jGt0L79dqyd8hPWZpTA74uMtVg89CN83eg3bP9isMaZcU8EPPsLFkX2Q+Opo9B/6y0OkmQBBdIO/o0N73VGpwIZowJph9bja/TBsO51IHfqhC5dPZC07n+IVA+vAqnb5uCzye9jhtE/VvKDK9BE/i7xy8UP7af/g20zLuLm26Px3pbHwMapGDLgB3yxvxM6/DIPy7vWgHXkpGko0x+UObDdu3dXrwKlVCohliq1nHtNHyFh82IsudoCQ/sFFjjjqQ4/6yESLjqhvmdVrb9m5NU8UR9RiDov5mew8i/5E+j5+Tqs03PWV/Ts9oUkPFKpkJmciIvu3vCspvlD2AHVPL0BC0nQxewP1cRlYycnaYNSKRADFnyoPhNouIIs3ElKhmtdD1TV/EEgc4ZH3ceIPHkVmYYLW9keFR5c2oWf1jpiQO82qKAb/YMUJF2tgroezlo/E2VVPVAXp2wkQVcgNfk6UurUhFtFzQHXxkiITYZDMx8EaP6GkfvAN0SByO0nzfRwbBKSYxORPXO0uEo2HpM6l4e4JUsm64HQ+VuxKz03MRK3A1SFLHQyFn7QGF7iGK9pWKQ+WaFT1msw+m+MyalX9Ftnv6G6eyzEv5EaMWjWk7oIkxuNwlyFAklDG6G8Ztv/ex+fveKUE7dMHeOoTec02gcgLl/nxi1risYf/ITvx3lp9EH8/XgGUYtDEaruv4F6tIcx+136Lmydb6CccgeWdXNHwPA4IOkTjHIth/KTdhoZX18ETfkAQyInYdSCKO0+FGj7HhKN9l2BtP0/4uvIFzH03Z4I0vysqetygFPwdMz58AX0q13wjH6B5nQ33DqJbVqm/+V8Xu7h2po2KF9+as7nQ6Ng6iJMKh+EUL1JcM5nrMen+PX/2zsPuKauL47/COAWXCgg1C0oiLgVF4IVq9aNVotiXSjWorgqRUXFba2WatU66h64/y4ciHugVUFRXDgQVFyAG0z+n/uSkBCSQB4hJHDe54O+cc+953zvIznccc6+/vC2Zu+huB/8LsQjOeYPWT9be6P/uUTZH1TCm7i4sY9MxsgaFf1XYdlN8SIhTgPFfsryHibi9sFRcr8DSuqQM0V2+giXtiSha+uqSpYyfMCzBw+RbqHwWRB9DzHsd+tdKJb4t8SvnWyVyMpakD/L0o3yD7lzU2e4z7iJq/cO4tDGmZg2bSHm7DiNiHt7cWaAIyoq6JJFXm9uJEE/PigBNmq6evVqzJs3T49GTU1QvtkozB7aCOVVvBWiLx9xT7J8Mmu3vsK9xGRIP+KzPi8Id4qiiasjihuJ8CYxHqpRxCPxDRtPzd8jLi4OjRo10qIS6Xh7PwJ7QhPR1tsNdbhp+XQkPRKvLlbW0NtHSUguKMGMPz3A8c3nUNG7MxpVyLpWUZSchEdvlVFg997gUVJqAYjr/En8R4j5K0SumMytt/fymozlByIR91b2zj+89kEVCKRff4hYnXxQNEKr9k6wAnMi2qFKm5eIn/cYaSwBTKoffjzXE9+O2YMoeV0iDmJZxa24LvqEx5sHwtM8jZNt7HITkaOi8UL0FanHyqBY965oH/oIQk3qPjILg3e1RKeDn7k1t0//fYmkLuMw6uJbwNwX824txQQTE1itvIW0hNnwNRfi3cVh6Nv2Aa6PvivWW/QOTyffQEzn8WI5RlkYiV0/d0GXexOxIeUrRKIj2GmxGNO49Z2SbmBlfmoGl/O9MTyetZ+G1KWfkNqtG2eHrOcUuo0thRjeBZ0jpXLv8DT4BVK71YPD3ItIErhj8LFXiF1eA2BLKd5+Rdp8NyiZZ8uo2Li2D2ZsagATNo3PbFd6sHWI2dn+CJfDIpFoVRMOVll/H7lqBQ5oGRgIX4esy6mUNiu5aST4isSAmRhvugJH2axqymJMfz0E7bouQei74qjsMQhjsQsrjjyROY5s3Sw3atgZns3UJCo58ifGRfTCT7FfIfp6HccabcCfLWxRYW4RfLPwNUSiBNyacg2hbWciOJ6t247H5bkd0epIW3SMZH3HZnkPY4tgKkb9vEYy4hyPyyED0DlyEAK5d0CEr/Gd0XxLV/TfymYLGM9xGNbtE96veJm5Dv+diJD/HVAEkxyGfcdGKJ+6RwlYVq8KkySFD/l6NVG3dDqe7l+NU4sHa7SERoX7oahVMZSu0Q4urr3g6dkbXp1c0LZS8UyjAYoSenctfAj9+KCUkenevXumUdPU1PwcaRSgePmyWda8ybQV4uunj3ggu1GIztLw8uxurHnQFN83tYIR0pEUr/+B0M6fP5+jDU456UjRs5OY5zUIP09bhxuObnCrVUb8+//1CxKfqPpiyUnNhlLmA+KO/w/XnAdhQJMKmWYKpBZ8ev0cT6QXBfV/USqSHr2HVbnaaO0zBxs3bsTGjVPRvWIcNi89irhP4i+n2BiVbk6ekxE+/ReLp6/DEdcf4etSDkhehyU/XoXFsgCsd7ESj9iU6oShy+dj7Pog+B2Tm9q1+h6j+jnAAkVh62oPC+EZhK28iqQJk7D5B3tYQIBSdX/BIL9niFp1HLfeaFL3IARN6wHX0uxrtySsm3VGE5MwnIl6JufYyON5hEuhB3Bh7CD8LtWbybX3h1e7YxK5dKQcn4y+mwfit9n94M7VbQX7kbuwcZyZpLKvXJmf13fC8IAh6FeZOXAmKFX3d/x10BYx/ZerWL7GRiIXYeQOVvcwiVxJWLf8B38dbAuTyb8jiNcu9qKo3Hsp/hoYoWYaP3vbhdLvdM4ByqErI483m3OTwdOxRbphp7Q7ek8PxIQza7Hs3GvAvCv6TP/AvQPiaWpWmdhJxthv0UPdmmkrufdAUBdNPOrCCp5yfWOF2u1awS39Ek7GpADJ+7B9Wlm08uor6QO2pMwJ7Yb2QIeI84hgjqswFtePJcGidTO05d4BQFD5F8w59wkJ3GatD0i4dgln3FrC017ioAuc4L4wAaKwwXBViU/saK/sVyPzrEcGOxOYNe2Z4aALhbG4cSYJVr1d0CZ1FaYvGI5F7mZIOPuTZJTXA+22KozyZ9QlPlGpSkY50TPc3zsQw13KwtymLhwdq8K2YnPUHLcGG58aUFiF1Fjk5wdlBk+FE/lR05s3b4JtTKG4pgqQ8vWSbfwKxz9LnqLjbz+iZQUe00D5oD97hw4dOgQrK3VjFjlXzMiyLSYxB2RDCHzL/YdpgZsQqQejwTm3IDcl2YavUPx+zQ793atDyVL/3FRuWLJG1mg7aRF+6+MoXj/MaV8clo6OqJF4ANsv6viPNcmUsXhKXjwdamyzBf9z2YDtG0bBs5SQG73amF4fdlUqZJ5CLG0H+7a3uOUEqla5Cu/swrbjFrCoZS23SaMG3BYmQxQ2ELaXd4Fv3eDah9wSA8VXQdxO2vw6eLsrGEFBQVizZgQmtu2IoSfEI3ECiSOU7tYYrtbyo4UWsKkl3d/+SsWIoglK2drBLf2oinW+Yicra91iuXp4gJjHPNeMC5qg+6zxctP4iq5I9rYr0tLmtUhoDIvmdVFXXi259yURNmjYsys6HDmM0DsSPyg5DIeXVJGMzmtRG3NfzE+LwokWN7AnKIh7D7aGtIN7nWU4Im1GYIf67S2QOG0tgk/tQdCeWwpLI0rA2rkpXI8sw/TtEdgTtF9u6Yq0EmX/f0DivTdowc04KHsOwHw4pkb1g8efNWFsPBhT6h7A0SEWuLJwI94u6wDHhNmY4voMH3e/gSh1EDymtVS7xlceuZIWkxC7pjO+674Bqz53RLMRk+Dj0wMTeiWhzMohGDhgAZYakmOqxEJ9ucVGTb/77jvo31pTKSEBjIsVR3XpZaH4nzmkR7HYfxsweCR+bCAdITOBhY12nL28wsiyOLF3qkgR+S8qLbRmVBZ1v/8eXRCJ8KgXgHERWNlqYxetFnTLoypEb65ix7okfNe/LaqpWUdZrFwl2OaRDnpfbbEysLIFniSKR83t6sqvtc5D7SVTxtyUJpvW5H7CcGJ0D7lNL6z9K4jwsJCty2Rr+YzbY8hxbYzo5lXdLNSOH7ytrVG312mcLF8Ljx87oOqy/VjtnsQ5sxrNUShz4OUdG8Vuko5EKt7PuE5A7KOXvJdsCWwmyE3jKy4ByoHtgqqo6lwCkK5fzNBLNyeC2oPgM/AgVq45h0SI//j5o/kg8ei8OhU0HtlNxO2/68ParB16nPyIJFtb3H41DkvP+6BDxh8GNmgccAkxy4qj8i5fTO9RFxUzrTs1Qalm6/G/G8PgkzQdS6Z/j3ZmxsrXJ8vrLozEqdnt1S9HYKPudYIw/3QaRKJo3JzcCnUSQjDi+QwsaVZUspfHE75NygClmqLp9+rXlav/5Hi1EX+PvYonQzfh+B990a6UNPZTGlL9x2N0jyBMWtMe/aa0gJoVFPIm5t95aTvo7IOSp5XMgWBrTffs2QOWstTNzQ29e/dG0aJZtlTwbCF3YkZFiqNmeVVLDMpn2QCVu9byWzoNr7gQT/uAwVMwplM1uaUNRtyGpvKqVMyyAUpVwby7z5xSe3v7vGsAbzkHhEXxs6hSVmU7WTZAqSypvw+46AJvrwFThmOLgprRs0dif71haGQGcBuaVPrnZbNsgFKoqkBdcs7lQGRxAAAgAElEQVSCCouybIBSUU67t5XFzpRv4b78hYbneVS38CS2/7IMm7/biev/9JRt5GGbotjyiIYaqtlhNU4cUjdVq1BfhtOncD/j0pobfc5mZCujdNaTkpJp/Hbo9eta/OQjl4UnB7Z/RjU09mgCq9/v4WbiF8Bc+RyGMD4Usy854peeVbOqkJs7ggZo79Uc6HQUu3+rC7tDV2Ex8C/00HIIMuHtYPj5CmGx/SEee1aRjPazuK6LEQ3ALsMGK9TpHsT9DFvMNoktwIaQMRj17QOAC5tmglIOPviB/YwGGJeda4Lg1/k4YsIO40SHChk1SU/YTMGMHj1xSd1yBGlh6f/CSOzo9gjf7w2AFZ7g1l3xVkPpY/a/dF25lZKXR8ktmWj6vfPYn9ocbX/sKOeQsuemKO3kj8E/mOP97kickXuXZNJ6dib9BVOhVv58UCpXRrrWlE1J+fn56c8OfeOisKn+LsuGJuGbRNx7ZQUbC8UojMrt0/u7wpe4uuo39PY9h/J+QQoOKdPeCMUtrFH9leKGpnTxBqjq1rAorvZXK88RaCO1qHgd6RRsjVH2h0g1tHKyhTGMUc7KAlk2NEnWHtpalTH46W7Ltr9I1k6y9ZPinw0Lh6EeqqFLwN/YOKmt2EZutPB9lg1N4g1QFrAqp/xLM89fBi02oPKd4CIPlOXeCdYcmzqWfvFkNC98iLj/PitMhWc8zaMT8Zo3L5PrOBP9PPPazXdbMN+lGKz/ua1ytE9Quyf6SkYlZV+t0sxA/TG5xBDwrTtbg1NjcfskskwjC1NfQLoKVuqYmYTfFe92zqhUvLFXfFmec95Mwi8jIkE+4QHb/NIf7VRmOKqiWu5JLKJRHXW/4RnZQ6pnxjT+ZHhNi5LeBXJgO4toadZiCMa22o2VCw5m3rDG1SQebR1ULRChX0ugJIpwm3KscAsREXcVprdlTbMzttFJFrlB8ozTqY7c9LwJ136wwzKs2LgJB0Jc0UPpDvXMdWt2JcQ7jnUdtKpXSW75yWekvlGWOEJae0lYuwRi5ODmsEqUOO3SR5L/BTae8PQbxb2/bMQ765xBCu6euICaXeqr3biWudp0vIv8E9O7+WAUFwJKfhmJrKQ6f0vtN6fA3AI18AmpH74o2TWajvTPX4GSRbKGRpG1rUdnYjj68UGZPRbFuKZhYWH5v9bUqDiaft8UD9Zsw+HH4kicQhY8f8MOPOjXDW1zGIcse+vzs8Q7xIb+Dv9NL9FpxjgMbf2N3AipTC+BdSN83+kx1mw4gccf2dZFNrJ6EBvWJKJfv5awUfubJasnL84+ffqEly9foly53M1fGFk2QZ9+5jhz6hoSJBtYIHqDmP/9D2ccO6BNdfaFJEAlpxZo++Qw9pyKB7e6SsSC5+9D6JPmko1heWGlHtZpVBFObvXxJPQATiWIA2GJWPD8PYfxpEt7NFUSaF4PrVCrktJ3Ah+RcOksLtXvCo86pTn5mp29MDh8HkatjBZ/+QtZ8PxfMOL0WAT2qS335aq2Oe08NPeG3yZzxPSfgoHSMDssA1HgOEwqOgdL+tVWunGNa1zQHB0ndkCrBfMw4OhT7oubbaRauy4eFnPGIahlT/51K1rHZvNai2cjBSlJSCntgY5+JZC4eRtWPhU7k9wmrgkLsSZj6a4AZu5zsO2HZQiavluyTjARsVt9MDMj25WxuEz/9ZgV8A+2cHVJgs6P3YWbzA57ZX8wMafLH3/3VpCLGYefO51Euko5RcPUX0un8YveeS0LJWWeE9sBlPLEyBW+6Le+L9qPX4dQbrc6a48Fzx8I3/rLcHhMCDb3qsL9Ac3W0NbDDcSMdIK12tBVQPqCeegv3ZTDohCMmIg/BgZhSXu5EcVSndFjpAWifh6PP9w6q9ihrt5+9U8F3EYiL5PdCF19Cje5XfLvkXD2ZwSMiZTxYlmo3IqhIttJLw1zlnoSRw7EIGnwD/CpDXGK1XYBCLolDSOViNhDu3AewzD8u+pKfieT8OQSNPvDQ3gSW3pbY5RfU8kabDPUbOuBDkd2YVnkW+DdJVz6n4mcY5/VerVfnQK7nxHw6wtcWLAcc2JeQ5xwkaVzeo2E08FY8UdV1BvhhjbSWf2s9evRHTPo1QdlDslI45qydJEzZswAiz2Zf4cAFRr3wm+DzXHUuwvatWsH996LcK/6T5jVy1F5bNP8U5ZXy8L4U1i9/AKAOByc+gPc27Xj7GS2cj+9V+F1uggQWKBxv9EYXP44vDu5o127Dug95Raq+/mjV33Nwo/wUlSN0Pv379GmTRs1JXL6qASqdRqKcY1SsG/8AHH4nwErEVXpewQOagVryfpKo7KO+N63I8qcmYuhXl7wGvAz/nhkC+9xHSRho3LanqGXM0HZeh7w9SyNMxOHcbwG/LwWj2x7YlzH2kr/uDE8i5W8E15/4hRaYuKAxigrCREosPHBhL3t0XlTQ1Tk1m86ovWtQfjt5GgM12QqUCuASqJyn72I3lsaNpO+gSnTx2wMppVbItkMpe5rsCSsO2zHpnMOaDijKidrbHMAFwZE4MREliqzaC7qVjBO0Bzf/eoOu+F1YGw+CpPvVIbr2OVYXX8FRtkU5dbDFp2chDc/7MTOjJ317O/CJui5bC82lJmK/mydoFEH9Lzjg1Gz5KarWZm/9uNAkx1YydVlitLucXjoe1Jih4Iu0ksWpWClgtyoYii9N1qLWZKk0/jy+QBr5Mx2LorAEvwbtxlLq/2LZbZiTkZG1nDc3gBVdkTh5oIOGSkvBfbzsfbMIAzMZksA2+hkNXsIJt7phfrsfSk9CX/UCcXRxd1lyyg4RhK/goXy6u2iJLi8FGQu/jf3xphTozHoQmc4GrPNfM3x7fH26LktEBNMJCPfAnf8tH4Dlma8A7J3fPP0LnASFEPtYXtxYcg9xLmXkayttobjQQ+4nwxUHthebSgoZfaw0GvBWP67b6bfcTFzCxTvURZGpf9F2PSz2K5kqYC0RiMRWxmu6ni9GnO9JmPVoSTcRykUbdEeTYxvoVTyfRyOZoO9tWDRwREW8bHiGswGwP/ABAwpp69eKgseG4w1c1ZK8jEDLD/ubyN+RKCL8nzMbArdy8tLFSGl98+ePYuWLVsqfabuZnZyLNA+26H/zTffoFKlSjA2Ns7Iw66uXsVnfPKpszr4yOlKhvST9fKFCxdQtWpVmJlJQ8LInqk7U57nXJ2Eqtzo2pdhNeqzfnx003eb+OrHPsfUfa2ofzvoqXYIiPO8O9xficfZxA3VTnuFtxbh7VHoUE+EVnGLs0mxWngZaWK5eqf0xVyMqDEZK3Ia9aHUaMy5/wd+raivTqkmaMRlmVOq6QfsgAEDsGHDBo0by4ncw4cPMXHiRHz48AHe3t74559/EBAQoFFbfPKpswb4yOlKhvSTvQJsRHf58uUaZ3IyyDzsMrOVnpFNYix8ODBJPnLsj3hNPzOVdh7dzAEBtuGlI8p3qoLh1xdhaV02SyOe3v3V9Rk+ndmipRzzOVClMBYRRuH4+M7oV3GHFkeOCyNImc3q5i2Air9ieao0zEYO/k/9s0A5pDJM+nPGRsC2b9/Ohfvp06cPXrx4oT/KkSb5ToAt72CxSXmnFs13C0gBIkAEck7ABGbuS3BmbSretZdOy5ZClRV1Uf3kamxupjIcRM6boJJKCEg2uxl3RD8sxvZRTeTi2CopTrdyTEB9SChWjeg1nv63D6ciHiJWySZcQXMv+HWsifxdRZdjewtMwaFDh6Jx48bo1KkTFi5ciOHDh2s8XVtgYJAhGQRYatHSpcWbTTJu0gkRIAIFl4DAAc28tqOZF7Cu4FqpZ5aZobbPPYh89EytAqCOeqdUdB/np7uiw/R4qJzBH+iEXuSU5sur4OzsDHd3d9SsWZOLa+rj48M5qvmiDDWqFwRYatESJUrohS6kBBEgAkSACBABTQiodUpFj1fhzxlPkd5/HqZ6NoZj2qssdRvZtUKNLHfphi4JTJs2DW3btsWvv/6K2NhYvQq4r0sOhb0taWrRFi1aFHYUZD8RIAJEgAgYIAG1TunXZ/cRKWqJDiN9ML0VTdDrc/+6urri8OHD3IgpC7gfGBgIGxsbfVaZdNMygSdPnqB9+/b4+FEcI1PL1VN1RIAIEAEiQATylIDajU4mVRuivSAFL1M+Kgmen6d6UeU8CLCA+yxN6cyZMxEUFAQWcJ+OwkPg/v37cHJyKjwGk6VEgAgQASJQoAioHSlFpSEYuzIUDWYuxXSLgehtLoJRWlomAALL6rAvXxySmMmZntFF/hDw9PREkyZNuM1P0dHRXOgoCwuL/FGGWtUZgaioKLi5uemsPWqICBABIkAEiIA2CagdKQXKoHKTpugaG4zpTWujnp0dHB0dM/3U9T+EGG1qRHVphQALHXXkyBFuOpfFMb18+bJW6qVK9JMAW0968OBBWFpa6qeCpBURIAJEgAgQgWwIqB8pTVmH+Z4rsK1cO9T1bA6HN/eyVGfUuhrF58pCRX9ujBkzBmyXvvwmKP3RjjTRFgG2nrR79+7aqo7qIQJEgAgQASKgcwJqMzqlX+wD++b3UOnAQZzpZFkop+j1Kc2osrcju9SkUpkvX77gv//+Q3JyMneLOaqaHrpKGcqnHWYLHzldyeS1fgkJCRAKhShXrhyvdJxMPz6pMnUlo+/68eGg7zbx1Y/SjDJydBABIsCHgNqRUoG5BWogEcXMCveaUU1ThuYkXaiyzuIjp6nMqlWr4O/vj9atW3M/yvRQdU9XKUP5tMN05iOnK5m81m/BggXcelI2fc8nNSTTj4+crmT0XT8+HPTdJr76MaeUDiJABIgAHwJq15QK7EZg7KgYHN1+Apc/CvnUTzJ6RoBlgmrTpg3YF8eKFSuQkpKiZxqSOpoSoPWkmhKj8kSACBABIqCPBNQ6pXhzCddi02Ec0gNN6rmjZvv2cHBwyPRTb8ZJPNZHy0gnlQTKli2LrVu3ok6dOpgwYQLu3cu6VlilMD3QOwK0nlTvuoQUIgJEgAgQAR4E1E7fIz0JDy+kiFOM3o/A/ftZWzBKSMXnrLfpjp4TYDFNp06diubNm8PX1xcsjJSHh4eea03qKSPA4pNWr15d2SO6RwSIABEgAkTAYAioHymt+CuWp4ogEqn+ES7vgloGYy4pqkigQ4cOOHbsGK5cuYKFCxfSdL4iIAO4ZvFJra2tDUBTUpEIEAEiQASIgGoC6p1STu4jXl+bhwW+DnCtLoBgxH48+7ofy1yCMDcmmTI9qWZrME+kMU1ZwH2azjeYbstQlMUnZbvu6SACRIAIEAEiYMgEsnFKv+DNmYHo3fpXTDxSFKkARB+/QJj8CI+SZmBy90kYd+udIdtPussRmDZtGubNm4c5c+ZQilI5Lvp8Gh8fDzbaXaRIEX1Wk3QjAkSACBABIpAtAfVO6YfdWD1+F052+gcHr25BgIv4i+9NOV8En5iNMUYrEbL2EhKzbYYKGAoBFoD9+PHjNJ1vIB0WFxcHW1tbA9GW1CQCRIAIEAEioJqAWqdUeP8o9l5sgDZDuuO70u/lajGCqU0/9OhdBunHbiDyq9wjOjV4AjSdbzhd+PjxY1SoUMFwFCZNiQARIAJEgAioIKB2973wQwoSURoNzYspETdFkSICIOULPouUPKZbBk+ATee3aNEiY3e+wRtUAA1gmZzs7e0LoGVkEhEgAkSACBQ2AmpHSk2qNkR7QTROX36INAUyopRjCD/0BoL29qhvrPCQLgsMAenufJailKVSZIHa6dAfAmyTE8viRAcRIAJEgAgQAUMnYCRi8Z5UHaL7OD/dFS1n2KP5n93x3f6xmGoyA2sG3EfM6k1YeLQ5OoZvxcF2FWGkqg4Dv29kZAQvLy+NrMhpPnrFSvnI6Urmy5cv3OYnll/dyckJJUqUUFRf6XVByS0vbxwfm5g8Hzl1Mh8+fMCDBw+yxCilPOyy3uLDQlcyTEtdtcWnHb76sc8kdV8rst6hMyJABIhAZgIKTqkI6c9PYc/pcmjQzRE1TI2AtGs4PrMXfGY+QKbY+aW+hcuyRdjt5YiKBdUjBcCcUk0/YDXNRy/tEj5yupJhOrK2unbtioCAAPj4+KBx48ZS1VX+X1Byy8sbyMcmJs9HTp0Mc1jPnTuHzp07y6vHK4c9q4BP/nZdyei7fnw46LtNfPVjf8Rr+pnJ2qKDCBABIqCwpvQLkk76w7NvE0x7+heCrE0AU2e4z7iJq94ncPbCFVy4WxzF6jVDi1aN0KZS8QI7QkqvhnICLPNTrVq1MGLECLD0lp06dULRokWVF6a7eUrgzZs3sLKyytM2qHIiQASIABEgAroioOCUqmq2GErX+A4d2Y+qInS/0BBwdnbG4cOHMXz4cISEhMDb2xsWFhaFxn59MTQmJgb16tXTF3VIDyJABIgAESACuSKgdqNTrmrWpfC7LZhrVx7tjrxUaPU9Es77Y2JrU24a3sjIGhX9lyP4bALSFUrSpWYEypQpg+3bt4NlgQoMDMS9e/c0q4BK55pAcnIyjVLnmiJVQASIABEgAvpCQMVIaRJirlxC6Nmn2eppZNcWXZwqQlnQqGyFtVHg3UGsnhyA/92pBsWcNsL4BZjSJgoP/jyNGyebwwE3cWFeH7R2fYRyL2fB17xg+OTawMi3DvmwUWzEtHXr1nyrIjkNCRw6dAg//vijhlJUnAgQASJABIiAfhJQ4ZTuQmjXXQjNic4Dd+LGup5wyElZrZZho6BTMH2oJbxXe6DUX5fxJVP9Kbh3YCPWuAXghE9zOHD+pwOaT/oTf+/qg00Xx8G3AwUdz4SM5wULG7Vjxw5u89PLly9pnSlPjpqIJSUloVmzZpqIUFkiQASIABEgAnpNQIVT2gJ1x3aAQ3xMtsobta6G/FhNKLw9ER7dymHk1TFonjpWiZ5JiL+bBJP6VWEnPyAqqIrqbdNx5lgUEju4gbaJKEHH4xZbZxoWFpaxzpStNzUzM+NRE4nkhACLF0ubnHJCisoQASJABIiAoRBQ4ZQ6wXN8oHj3vZ5aIrD+BVvv14JDaQGEt5UoKXyIh9c+AA2VPAOQfv0hYoWAlbzDqrwo3c0hAek60xkzZmDChAmYMmVKDiWpmKYEWM57GxsbTcWoPBEgAkSACBABvSWgwinVW31lipnZqV8ykBqL2Jh0lU6prCI60zaBqVOnok6dOujTpw+3EUrb9VN9AAucb2xMqdToXSACRIAIEIGCQ4DGCQtOX+qVJSye6dWrV3H79m3s3r1br3QrCMqwkVJbW9uCYArZQASIABEgAkSAI6CQ0SkdqZenY+iCmvhx1QB0LZ0/PivLoqT68ITvrfVYai/b7y+8PQrf1bmIL2GHcUK6eUl4HGs6dIRPwzA8ni+/dvQ+wsc3hHv0HzhxaDBcJSaqa5PSjIp7g09K05MnTyItLQ3FihXj0mHmZHRPXWpN1e+F9tN4qmpLH/S7ePEi7OzsUKSIYswJfqkrma18UlHqSkbf9ePDQd9t4qsfpRll5OggAkSADwGF6XsTlG48E9u28alKezJaSVEnqIqqzqrzsytugFLVJnNWN2zYoJFxfFJ/sgb4yOlKJjf6sQD748aNw/Pnz3MUaF9dak11HcFHTlcyTG9tttWuXTv4+fkpxUEpL2VY+LDQlQzTUldt8WmHr37MKaWDCBABIsCHQP4MhfLRVGMZC9jUssjY0JQhLnyIuP8+w6KWdb5EDcjQoxCdsA1Qq1evzgi0z8IZ0cGfQHx8PFgYLjqIABEgAkSACBQkAgXYKTVDzc5eGBw+D6NWRoNzg4QseP4vGHF6LAL71IbCMHFB6le9tIUF2g8ODuY2QLEpcDr4EXj79i3Kly/PT5ikiAARIAJEgAjoKYEC7JQCAhsfTNjbHp03NURFIyMYGTui9a1B+O3kaAynbE758kpKN0AtXryYi2uaL0oYeKNPnz6lGKUG3oekPhEgAkSACGQlUCAGCwX2SxEmymocYAX7Tksxn/0oe0z38oUAC7TPMkBNmjSJC23UqVMnyuGuQU+wnfdOTk4aSFBRIkAEiAARIAL6T6BAj5TqP/7CqyFzTLdt24Zbt26BbYRiGYroyBkBFmqLpu9zxopKEQEiQASIgOEQIKfUcPqqwGnKNkAdOXIE9vb2nGNKG6Cy7+KUlBQIhUKUKlUq+8JUgggQASJABIiAAREgp9SAOqugqrpw4ULamZ/Dzn3x4gUcHR1zWJqKEQEiQASIABEwHAIFYk2p4eAmTVURYDvz69ati8DAQJibm6sqVujvJyYmckkICj0IAkAEiAARIAIFjgCNlBa4LjVcg9jO/Hnz5nGpSSlklPJ+vHnzJq0nVY6G7hIBIkAEiICBEyCn1MA7sKCp3717d7Rp0wYUMkp5z9ImJ+Vc6C4RIAJEgAgYPgEjkar8moZvm1YsYGlGvby8NKqLpdnzHlADt7cexzabUejZsBiKP3uWbR18csvrSoYpr6u2WDtsKv/KlStgm6FsbW2zZccK8MlJrysZbeiXlpbGMckuHBTlYZe9LnxY6EqGaamrtvi0w1c/9vtLXyuyd5DOiAARyDkBckqzYcWcUk0/YPnko2dq8JHTlUx+6McyF/Xt2xfffPMNevfunW0sU23mllf3WvBph9XHR05e5t69ezhw4ADHQp1+usxzzqctPjLMXj5y+iyj7zbx1Y/9Ea/pZ6a695meEQEiUHgI0PR94elrg7OUjZKyWKbJyckUyxQA2+RkbW1tcP1IChMBIkAEiAARyAkBckpzQolPGeFxrGlvCtOJ4UiUygtvIvLvdmjHUp4aGcF04CL8GZMsfYqyZdORcN4fE1ubcs+NjDzQLuQIIlKFGWXUnyTh8mxbOIQ+UV/MgJ4yx3T79u0ZsUxZnM7Cejx+/BgVKlQorOaT3USACBABIlDACZBTqqsOFkZi10/N0HR7C7SNeQuRKAHRLdZhXP3JCIr/AuA9yrw8iiptXiJ+3mOkiUQQpfrhx3M98e2YPYjKqV+qK3t03A6LZcqC7E+cOBGFNch+QkICzMzMdEyemiMCRIAIEAEioBsC5JTqhjOEd/7FivX2cJ3sj6A6LA6nFez7+2As/sHKQw8gTF6Hs1tfw2JZANa7WIELIFuqE4Yun4+x64Pgd+yljjTV32aYYzp+/HgulmlhdEwPHjwIS0tL/e0g0owIEAEiQASIQC4IkFOaC3g5F/2IeyfDcATVUfcbufSQ5r6Yn5aGhGE18e7SLlwS2cCuSgWxQyqtvLQd7NvewpljUbJlANJnhfD/oUOHIjg4mHNM4+PjCw0BZmvTpk0Ljb1kKBEgAkSACBQ+ApTRSa/6/AkiPCxgpEQnk4ZKbuI/FLm5BUZGGxUefpOpjqLzIpE8sTGKKpQy1EsWZJ8dffr04TZAFYa0mywSQY0aNQy1y0hvIkAEiAARIALZEqCR0mwR6bJAA/je+siFU2EhVeR/0ua7wSqLKg3xxaGfXLkXiJxlg7rbH8vdE+FTAXJIpQiYY3rixAkuyH5hyP709OlTWFllfQOkPOh/IkAEiAARIAKGToCcUp30YHHUbOuBDniAmMfvZC1KdugbeazHk8Y90dQoAWeinyNdVgJ4twXzXYrB+p/bme/Llymk566urtixY0ehcEzj4uIovWghfc/JbCJABIhAYSFATqmOelpQ2wcTxyUgYs5SLHsq3m2fcGwRNhz3gOeMnnAo642WP6Qjpv8UDDyXKHZAU49jR+A4TCo6B0v61c681lRHeut7M87OzhmOKdudXlAPSi9aUHuW7CICRIAIEAEpAcroJCWh4n9tphmtYvsWKTcjcXjfc9xl7dVyh32bJmhk/BpGHz7g5s1TaGNfDNGRdxF+T8Tt0Df/1h1OdtVR5e0DpRrKp/60tPyErzcOYk2FcfgecUrLs5vyMioLKXnAR05XMm/evEFYWBhq1qyZ47SkzERDSDNap04dhIeHo2XLlkp6JestXaaU5NMWHxlmJR85fZbRd5v46sd+5ymjU9bfS7pDBIhA9gTIKc2GEaUZlQHSVUpTPu0wLVlKUrYhiMUz7dGjh0xxNWfyaTzVFMv0iI8Mq4CPHJMZOHAgdu/ejZ49e2bSQ9UFn9SarC4+crqS0Xf9+HDQd5v46kdpRhk5OogAEeBDgKbv+VAjGb0kUKRIES4t6e3btzknTi+V5KHUs2fPULZsWR6SJEIEiAARIAJEwHAIkFNqOH1FmuaAAEtLum3bNhQkx/TVq1eUySkHfU9FiAARIAJEwLAJkFNq2P1H2ishIO+YsixQnz9/VlLKcG6xnfeVK1c2HIVJUyJABIgAESACPAiQU8oDGonoPwGpY8oc0pCQEIN2TNnIb6lScpnA9B8/aUgEiAARIAJEQGMC5JRqjIwEDIUAc0xDQ0O5jU+G6ph+/fqVw01OqaG8daQnESACRIAI8CVATilfciRnEASYY8qm8NmOfEN0TNlIb0533RtEh5CSRIAIEAEiQARUECCnVAWYgnE7BXdW1ISRUR+Muv2pYJjE0wpDdUw/fvxIO+959jmJEQEiQASIgGERIKc0z/rrPsLHm8PIqAv6XHyrpBXJc481iBAqeZzdrdQIhK3rg9g9G8FiqbIf04ELMGXvLSRlJ6v4/N0WzHCYj9B3fBRRrEx6nY53F/tj53VjRGmzWmn1PP43RMeUjZSamZnxsJZEiAARIAJEgAgYFgFySvO8vw4g9Ne1WnT40vHuVhAmenTEgOudUWzQVC57ikiUgBt9ruJRbyc4zL2ogWN6H8cDx2FnUF/0KKXN18EEpZrNxCDz7Riw85E4bWqes86+AUNzTN+/f08777PvVipBBIgAESACBYCANr2QAoAjD0xwcUWrMxMx6q9IDRxFNXq8C8Xfw2fhjzqbcWyht1z6USvYdVmPZWc84TB5FPoceammEukjNpo5Bf2Oz8CSXlVgIr2ttf9roGojW1j0X46VyXoyXApkWmMq3bhEJKUAACAASURBVEikNZO1XNHr169p572WmVJ1RIAIEAEioJ8EKM1oNv3CpsVZ2jxNDpb7uW9fJ6ScO4hlL7pjiHM4tm2thPIj+qL1Oy7rPWxsUiXPe+PbPrVR6cF9PLh3Ak5WJrhy9BEi37EWS6FYy+/gVLc2an98hBIlRPgm/TjmrrGCtV9vNH11K0se+yq2b/H44BPENu2CFiXuofjjg5i7uyZqS8qzWqX56KtVeYX4w8ewtdo49Cz3GkYfPnBm1irzCHdjo7DnaDI4NWCPSt+1hODVLbjXrs6VYe28uh2doatR4+7o/80VXNkFvBkyFN9+FtsZdz8ctb8kZWmDq0TFP1L9VDxWeVtTuStXruDhw4do0aIFjI2NVdar+ODGjRtwdHRUvJ3ttaZyzGHWJOe9VAE++d6ZLB85Xcnou358OOi7TXz1Y7+HIpGIidNBBIgAEdCIADml2eBiTqmmH7Di3O1BCB/fEO7Rf+DEARe8HtIYvR7PxPb/+cGTmyZna0olzw8NhqsgHv7f2SHEYj7WzxmGfpWLAMIoHJ/YEe2vTJDIxYllNo/C0lvB8DUXQH2eeLbRqSHsRjSE7631WGpfjLNWKiO8PQrf1UlCTblneLcF81qNwPq+B7B9Uis4CADh0z/xm+dELC7ni8f7F8EC8bg8uwWaHB2AacsmIaiOCRLO/ozJnv9ifWIjuIYdxokOFbi2xoz5Ab51LsNuVwBOcHZmAxzIxibV8lK7VJfI+qRu3bqoXr06Ro8ejaJFi2YtoOQOnxz2rBpN5eLj4xEQEIA5c+Yo0UL1LcrDLmPDh4WuZJiWumqLTzt89WN/xGv6mSnrMTojAkSgMBOg6Xtd9L7AHt1njcdgddP4yftwPawMWnn1FTukTC+BE9oN7YEOEecREf8FED7Ew2sfgHo1Ubd0brsuHe+exCLcpAYcrIpIKKQj5fxqBN70xShfF84h5dSoPAg/edvg0/1nuMlm4ZP3Yfu0snCd7I+gOuYASsK65RL8Nq1GFpofP5rAsnpVWB05jNA7+hcBoFGjRnobLorlvM+po5wFPN0gAkSACBABImBgBHLr2RiYufmnrsBmAmZsagCTyTMxStlufHNfWP/ohhMtbmBPUBCCgoKwNaQd3Ossw5E8UfsDnj14iHS3WnIOrgnMvj2GtLSZGBj/D6fD779PwT9j7GE34r5ECyFSLu3CxnR71P1GPsuQGWq29UAHBV0/fDBCKVs71MMDxDwWLwZQKJLvl/Kbn5KSNI5dkGf6P3nyBKampnlWP1VMBIgAESACRECfCJBTqrPeKInKvZfir4ERkt34JRRaTkTllAOwNmuHHic/IsnWFrdfjcPS8z7oIHXoBFVR1bkEEH0PMam53TiUhPi7Shywdwexql8ZlHacjmUplkhNNcZT1324tLwGEP8SManiDEMKyhv8JXNM27Vrh8DAQOiLY/rixQuUKKH4nhg8ajKACBABIkAEiIBSAtrfcK20GbrJERA0EU/jV2O78athuRwW4e1g7N1XDBbbH+Kxp3QnfDpSji5GNAA7rmwVNPZoAqvf7+Fm4hfAXLxGVK4a7lQYH4rZlxzxS8+qio/kri1gU8sCXOUZd1NwZ9MvGHZyEKY9WYQgG+m0Plv/yhxY8SanjOIF7GTcuHH45ptv0KdPHy77E5/NTNpEsnXrVm4TljbrpLqIABEgAkSACOgrARop1XHPyKbxg7Hw3GdJ60JufWc8LNGqXiW50EyfkfomRU5DE5i1GIKxrXZj5YKDSoLSp+NdjB8GVQtE6NcSKIki4vWcuIWIiLsKIalKcM9Mwu/KjbpKRk/rNYSrtdQhBSB8jbdJ0hFSY5g17Qkvk+s4E/1cLv6oeI0qc6DlDxYxgK1djUZ1hel++VL6c+7p6YmrV69i8eLFOH36dL4pxkZra9asCYGAfkXzrROoYSJABIgAEdApAfrG0ylu1ph0Gv82zp+XOqUCztFranQNoatPiTcT4T23oz1gTCQS5XUs5YmRK3zRb31ftB+/Do/KSEcvExG7fyB86y/D4TEh2NyrCoxhLFnPeQMxI51gPTFcri4T7plb+n3xqCvXhmQk9sg2BB9/KnY4hTdxYd4g/Lz+vUwLc2/4bTJHTP8Z8ItJBsAC+gcjeMZJufrFxYsXT+fWriZ26AjP2spHdmUV68eZs7MzduzYgf3792P37t35olRycjKvsFP5oiw1SgSIABEgAkRACwTIKdUCRI2rkE7jW8lJmnuj6WB7DLrQGY7GLG1oc3x7vD16bgvEBJMvcgVNUKruEvwbtxlLq/2LZ3/NkKQZtYbj9gaosiMKNxd0kO2ct5+PtWcGYaB8W5LaBPb+mDj2OHaffigZ8TSBmfsS7F32BV872MCUpS+1mY9F1ouwa4srjN5LYw+WROU+exG9txhK+lSAkZEpSvt+hG2fVnCV05SdljV/hdPb4mHV2wWtDOhtY45pWFgYbt++jU2bNoGl+9TlkZiYiBo1skYz0KUO1BYRIAJEgAgQAV0SoDWleUa7BtwWJkPqxik2I7AJwuqEIKzOeFAS8Z8bYcPpGMzPuCc+6ZY2U+EOILDxhOdoT+y7NAB3NmzI8lx2g4VrWot1CWuxTnZTclYFzfp6IP37/2F3v9ri+KkCBzQZeQInRioW9sCPBwZwsVHFT6xg32kp5rMfSVEW93Q/LkLehS6e/BhbTo9F4O7acssSFOvWz+syZcpg27ZtYGtNQ0JCNIplmluLYmJiUK9evdxWQ/JEgAgQASJABAyGgAGNXRkMUwNSVJyffkv/PxB86Inc+lBtmXAfD688QdLmERhubpivGnNMV69ezcUynTlzps525v/3338oXbq0tjqC6iECRIAIEAEioPcEKKNTNl3EN81oy5Yts6k562NN02SyGrQhU6fibexbXR5FRrqgSrw4PWhW7bJvq175S1i75COXZrSb8R3YCs4iaG95dPzpO5R9/FBZlUrv8bFJWyyUKiS5yUYv7969i+LFi6N+/frqiip9ltM0o/LpRfmkr+QjwxTmI6crGX3Xjw8HfbeJr36UZpSRo4MIEAE+BMgpzYYa/zSj6qbUlTfKJ02mrmSYxrpqi087utIvNDQUQ4YMwaJFi7jd8cp7UvndnKYZZelF2Qarnj176iwNJdOYTypKXcnou358OOi7TXz1ozSjjBwdRIAI8CFgmHOqfCwlGSKgBQIsZFSDBg0wd+5csJHPvDji4uJgbW2dF1VTnUSACBABIkAE9JYAOaV62zWkmL4SYAH2WcgoFsv08uXLWlfz5cuXKFmypNbrpQqJABEgAkSACOgzAXJK9bl3SDe9JSCNZcqmbbUdy/TevXuwsLDQW9tJMSJABIgAESACeUHAcJ3S1AgcCWmHdiyWJvdTDw4zDiEiU07490g474+JrU0zYnlW9F+O4LMJebDTPC+6h+rUZwLMMb1y5QoXy1SbjunBgwdhaWmpz6aTbkSACBABIkAEtE7AMJ1SYSR2/dwFnSN7Y3j8Z4hEInyNH4chtzzx7Zg9Gek3hfELMKVNFCL7n8aNryKIvh7FPosQTHcNwcpkodZhUoWFj4A0likLsr9ixYpcB9ln6UWbNm1a+ECSxUSACBABIlDoCRikUyq88y9WrLdHK6++6FdZnKNdUHkQxkzzhtua2fA79hJACu4d2Ig1bv0xzae5OMORwAHNJ/2Jv51XIvTi60Lf+QRAOwSkjmmJEiW4IPu5yf70/PlzyuSknW6hWogAESACRMDACBikUyqwX4ow0WWc6FBBCe4ExD56CSGSEH83CSb1q8JO3kpBVVRvm44zx6Ky5GlXUhndIgI5IiAfZJ9lf2IjnnyON2/ewMpKSU5YPpWRDBEgAkSACBABAyIg764ZkNrqVG2FHq2rQiB8iIfXPqgsmH79IWJpBl8lH3rAj8DChQtRu3ZtBAYG8nJMb968ifLly/NrnKSIABEgAkSACBgwgYLjlAojsWfOOoQP/gE+tYsBqbGIjUk34K4h1Q2VAAusHxwczDmmbCe9JsfVq1fJKdUEGJUlAkSACBCBAkPApGBYkojbK4ai74PxWLK1C5wKjqtdMLqnEFrBguyzY/LkyRgzZgwcHR2zpZCSksKl+ixVqlS2ZakAESACRIAIEIGCRkAv04yyEE+qD0/43lqPpfbFJEUScfvvjqj3S2MMv74IS+uai+8Lj2NNh47waRiGx/PdIFuldx/h4xvCPfoPnDg0GK4SB1ZdmyxtniaHvuZul9pA+klJAHxYaCLD1oieOnUKlStXRnJyslrnNDU1FU+fPgULzi89+ORU5yPD2uMjpysZfdePDwd9t4mvfuz3g0VEoYMIEAEioCkBvRwpzfEHmvAmLszrg9ZTm2d2SBkFQVVUdS6hkofiBihVbTJndcMGzfLY63PudgaE9JO9FnxYaCrz9u1b9O3bF2y96M8//wwzMzOZAnJnYWFhYKOlLi4uGXf55FTnI8Ma5COnKxl9148PB323ia9+zCmlgwgQASLAh4DBTnQLn/6JyW2d0eJIN/wWJTdCmkHBAja1LJBlQ5PwIeL++wyLWtagnDkZsOgkDwmwnfnM4WQbmCZMmABV60yvX7/OjajmoSpUNREgAkSACBABvSVgmE7puy34/YdxmHvfB9M2BCGojmTKPhNmM9Ts7IXB4fMwamU0uAA93MjqLxhxeiwC+9SGXg4TZ7KBLgoSAScnJ8ybNw+rVq3iAu3Hx8dnmMdCSDFnlcJBZSChEyJABIgAEShkBAzQKU3BnU1TMPFMOpC4FNNti0pSiErTjRrBdGI4F4NUYOODCXvbo/OmhqjIUpEaO6L1rUH47eRoDDc3QNML2ctZEM3t3r07Dh8+jGbNmnGB9ocNG4b58+ejT58++PHHH1GkiDgZREG0nWwiAkSACBABIqCOgF5udFKnsK6fqdsApWtdqD0iQASIgCEQULVG3xB0Jx2JABHIPwI0g50D9p07d85BKVmRa9euwdnZWXYjh2d85HQlw0zQVVt82iH9ZC8Z8csdCz78+MgU1Hf2wIEDsg6gMyJABIiABgRoDlsDWFSUCBABIkAEiAARIAJEIG8IkFOaN1ypViJABIgAESACRIAIEAENCJBTqgEsKkoEiAARIAJEgAgQASKQNwTIKc0brlQrESACRIAIEAEiQASIgAYEyCnVABYVJQJEgAgQASJABIgAEcgbAhQSKhuuLCQUy1uuycHynZctW1YTEa4sHzldyTAFddUWn3ZIP9nrRvxyx4IPPz4yBfWdffr0KSgklOwdpDMiQARyToBCQuWAlabhnSg8jAwqHxZ8ZFiLfOR0JUP65e6d0Hd+fN4jfbeJr37MKaWDCBABIsCHAE3f86FGMkSACBABIkAEiAARIAJaJUBOqVZxUmVEgAgQASJABIgAESACfAiQU8qHGskQASJABIgAESACRIAIaJUAOaVaxUmVEQEiQASIABEgAkSACPAhQE4pH2okQwSIABEgAkSACBABIqBVAuSUahUnVUYEiAARIAJEgAgQASLAhwA5pXyokQwRIAJEgAgQASJABIiAVgmQU6pVnFQZESACRIAIEAEiQASIAB8C5JTyoUYyBZeAqRsCtuzD/i0BcDUtuGaSZUSACBABIkAE9I0ApRnNpkcKTprRqvDeuAez2rzCmk7tMfWGKBvLsz7mk0pRM5m2CD6xGoNqfcJ/i35C10WRCkpInle6gN+aeGHd+8yP1bdVEg7eE/Fzr87o3NAS4r/GvuDZlSM4vGsFAtddFVdWcjA2RgbBFaeUtsEKZW2H1T0Zkwf1hGstM3E9wmf4b1MIJk9eh5vcnbaYEb4ag2s+wr/duiLwqoLyUG5b1rbE1cPBG8G+Hmjp3gq1Skn+tnx3FxFH/od1flNwVKQmza3DROxb1wwR3gOx6KZMD+VtlYSD/0aE/pCAie1GYb+sOKeIchmJjir+4yPDquIjp88y+m4TX/0ozaiKF59uEwEikC0BSjOaLSKgoKQZvb5wELosBK7dEGlsE8PEJ5WiZjKVUNLECEAZNPSZhqCY6djzLE2uhyTPjYqgbF1nOMs/UqufLVxHj8dIj4p4cWYHAnvsRBSTtXRFX18vDJzVBo2qBWDynoeAaRkUYSpAeRvKOJg6j8bfM9xgHLUNAT22IirNDE69/DHWOwjrKhbDyJCLSEMlCLh6TVDSpi6cRQrKQ7ltyviZOv2Ehb/1QLUPUdi9fBTGRjwBYAan7t7o12001t7yQOjsWVgXlSLHTnpaG94hP8H6+mKcNq0FZ2fpfTX9G74FYT2mI+hPHzznbMmBjKxIljNlNmUppOQGHzl9lmEmFkT9KM2okpeXbhEBIpAjAjR9nyNMVEinBD68w/viTujn1xWWuW7YFJbdfTDS4xukhi2G/1yJQ8rqfRaByV1HYk00UG/wWHjb8pmvL4uWnZrAEo8RsUJadwqidi7BugupsPy2P/rzqleF4Za9MIM5pKlHMXV4INZyDikrm4KoPWxkdiP+Qx30+sUbzlnMYSwGolOFaGxczhzlnB53sHlnNEpq25acNk/liAARIAJEoFAQIKe0UHQzM7IsXAPWY/++JQhuUFJiNRtdm4iQbfuwf/9+7N+3FnN+cs3kCJo69cKvIVu45/Hxj7EtJADerrY5plbOfx/2rh0NpxxLAEiPwuHjiSherxf8uldVL2nqhO6j52Dtvv2Ij4/H/v37FHSsBg/3OiiZGqnCEYvEgS3bcejoZTzKuZcmp9MbRMweiC5d/bDuiZIKBGVRuUYpufK5OTWFrUcbOJR8iwsbN+KakubwbB+m7bjLjQIP6V87c2OmDeHZpQ6E0RdwNkPWFJau3ggI2SLhtx/7t4UgwDvze5B29jjOvbBBxwGtkcXXzdwKXREBIkAEiAAR4EWAnFJe2AqCkBmcRy9A8NAGwJnFGNqlB4YujoVlDz8Ej27GOR7ctHSwF+yS9yKgRxfY2HTDisTq6OUfiNHOkrWTeYLiC+JWrsHRZ8VRr99QdLdU5QZVRfcZv2Jww8/YH9gfNjY26NJjKg4K68FzpI9YzrYFGlcpCuHLp7if4YhlVjotag+WhmxARKalApnLcFcl7PHtwGGYO7YLynFT8UrKKN5KvY1zZ98o3uV5XQ1ujW0gEL7B0/vvVNSRhqs7z+ORsCiqNG4B+T8fTFu6w8XyPaLPXZWNklp2hd/IrqiV+C88GL8u/RFw8Avqew7GYFe5dalpdxD94D1K12uOlqq6Q4VGdJsIEAEiQASIQE4I0JrSnFAqiGVMG6OTixUQtxPzQ8LxjNkYvgsRPZrA08UdLZe/QZUhrrB8H4mF09k6SVbgKsJnz4dtyBz0GtIDe0avA1vNmCdH+kUs/ysc9Wd8y03jX5i8U6yjfGO2beHuUBSPdm7GTun6ybRr2Lw7Gh3H26OufSkcQGVUEAjxPvFJVnn5urI9r4TOk6diZAPmjLdHM6tAjN18V6WUqbMXvJqXxrOjx+VGJQEIasDz793wVCWZquoBAFMbVK5gCrx/jkfZOdCsqQqVUcMUEA/gmsKySiWUVHBoTe3tULUkc1QvcRuynNkygHXj0Hedoh7vcP/pGwhd7OHSsiwiIrTlaCu2Q9dEgAgQASJQWAmQU1pIe960ZXPUKw28j5Z31u5g3ehe4PwRW2+EsBHGR4ojjEl4lPgeguYN4Wa7WfmUtZaYpl1bh7+OOmKGB5vGv4LJexQqfrIOo7uu46aqvUd7YNinTyhm4YRWLtVQEq8VCuf20gimJsaSSkxQtHgR1RVaemCCnytKx+3DLMW1m8L7CB01Xgk3tgFpDjwrqK42d09KoUblshC8v53JoU27HYuH75ujea+BmFihK6xehmNdxjpV+RbT8OzRc7yHDayqWLC98PIP6ZwIEAEiQASIQK4JkFOaa4QFuwJBNU/8vV/JuJ5QmVNSHE6jl2C2h3UWKLP3e8jufY3Gqh8mY89H2S3lZym4tnwNjtb/FR5sGv/CZoVitnALmIYxLpYQvI9DxLEofE69hBWrnmPY0Aac85QW/hQvhQJUsbLl1sryH9l9hr0LFsLEsylKJoQjbP8tBV0kl5YeCJgzAs1xEYvnbJSMMCsvqvHdtHg8fZkGVKmEKmxJg7I1rHKVZl6yYIEqVtK1xHKFnu3EZL9X8PZshe96u6NWKU94jk9F3LnD2Llmc/ZLGuSqolMiQASIABEgArkhQE5pbugVeFkhUs8txsDZ4dwaxOzD13xEVMhwdAmRgXnsNgNXByRhyk8hiJLdzvlZmvw0fiLOyEmaug7AMJfyeBE2kwu7FHntGpydm8DWeyGY+/WSlX1yHpcfdUW1TFPZcpVwp2zDlycavD2CdWcVn8muRa8jsWNFpMowPqZOP2Da2L5wYg7p5N8RnoMpdlntOTmLQ/jlePSqJtk89UTZHwamaNCrBaoIPuPR5fNyyyvEI9xQNhL7LALrQiIwdsg1ODcZiO4j+qHbt57wtwLu5+USjZyYTGWIABEgAkSg0BCgjU6FpqszG5p29gKiU4GSkhFE8VPJDv396xFQ4wYuP0pDyeoOcMi0saUqus/ZrNOMR+JpfLYb3w2tKkr/jpKskUQqHkTfkW3cQXGUNysmZ2wcwo7fwvvSTeA1QryBS+4hgAZwC1iE4MFNYfY2GZCORpasDpfW8tuEMktlvjKDk/fv2Di7P2q9C8eiPHFIWYtpeBJ2Cjffl0FzLy8lIZ9Y7NWumN67FhfuavXmO3JqStaElpSMsso9yXSaFoU9IWsR8ehzxppU8XMp7/dIfJSUSYQuiAARIAJEgAhogwA5pdqgaIh1pF3G/sN38bFaR4z3dhbvtnfqjh71zfE+ei/WRFzB5tUReFHRDX7TfoAT55g2gOvosehXD4jethkRKnazax+HZBr/mQAlS0rXdabhSfh/eCQsg/o9ukv0s+aC1vt9W1mSsYlpkoZne1ZgxblXqOgxBot+7SUpKw6eP2ffPxjjUhJxO//G8mss2LxkRFFgCRf/xQjxVgirlMU4FvtzIn7ztEPxZ0cxxz9EK1PebNQ1eO1uSZimLQgZ7SYO1fVsJ6bO2o240t9ixspg/JQRnouN9o7GnDleaIhb2PnnOoWQUZI1oQohqkxdA7Blv7h+B842FiLKA40rAs/OyW/SkqxJ1Wo0gSww6QYRIAJEgAgUYgLSYadCjKCwms52WU/HrOQRGNZvBnZ7sr9PUhF3Zj1m/S7Z6X5tOQIXpWBwr26YvdsLswEIk6JxdNVcLGfZj3R5ZEzje8jiqD7ZjX/WVMKwfj0we3cvzMYXJEWfQcS6o2js3UZOuycIn+2Pl937o4t7b8ze/ZPkWRqe/XcUOxf+T25zzxtELFiI8tPGwjsnYa9MW2NwXyduuQAsPRC8W27tLNfKZ8SFTsboLLvZ5dTLcloWLbt0RK1nG+HRYC5sg7ZhyeBu8NhzmtsglRa1Fn5eV9B9eFe4j1yKXuMlf1u+j8O5U+swdEwQntWSS9UktTZiBw73moWOLg1gGiFekpEW8RfmlBFnggqL9xeXFCYh+ugG/CO/Scu0AVzqmSM1U4zTLIrTDSJABIgAESACvAkYiUQizZOg827O8ASNjIxQuXJljRTnk2+bNcBHTlcypJ/sFeDDPFf83JbixO4WONujKwKvKiSfl6mVcaZaP3Ee+53DgZW9vDLlvc9Ov5LeGxE50wq7umXWQXVbGepkOeEjk51+WRqR3ODTlq5k9N0mvvqxNKP0taLqjaT7RIAIqCNAI6Xq6EieOcsnCM9B+ew3BCmvhI+crmSYxrpqi087BVa/uzb4Y3FXlD6+FHtFmXPVK3+Lsumn8C041GM6+vt74XSO89jXhvfQRvhwdHEWHfj0FR8Zfe/fgmgTX+bMKaWDCBABIsCHAK0p5UONZIiALgiYOiN4XzBcn29CoIIDyb/5O9j8zxG8b9gFnVVmypKvna2ZHYiOxc/hL/npfPkidE4EiAARIAJEQAsEaKRUCxCpCiKgXQJss9EI/OZTHy/X/orhR57JRRfIfUvcmlTpstpsq2MbxQLRTzFxQbZyVIAIEAEiQASIgGYEyCnVjBeVJgI6IFANHr1cUa10UVT7ZRV2/8KaTEBYgB9CorLNOKAD/agJIkAEiAARIALaJ0BOqfaZUo1EIJcEZOle+a5VzKUCJE4EiAARIAJEQOcEaE2pzpFTg0SACBABIkAEiAARIAKKBMgpVSRC10SACBABIkAEiAARIAI6J0BOqc6RU4NEgAgQASJABIgAESACigTIKVUkQtdEgAgQASJABIgAESACOidATqnOkVODRIAIEAEiQASIABEgAooEKM2oIhGFa0ozKgOiq/SLfNphWvKR05UM6Ze790jf+fF5j/TdJr76UZpR2btOZ0SACGhGgEJC5YAXpRkVQ+ITnkhXMkxDXbXFpx3ST/aLVhD5FUSb+L6zlGZU9q7TGREgApoRoOl7zXhRaSJABIgAESACRIAIEIE8IEBOaR5ApSqJABEgAkSACBABIkAENCNgwE5pImL394e3tRHYuk8ja2/0ORCLpEz2v0fCeX9MbG0qLmNkjYr+yxF8NgHpmcrRBREgAkSACBABIkAEiEB+EjBQp/Q9nm7vBsd5VVDt+FuIRGlIPV4NVWfVh8PcixmOqTB+Aaa0iUJk/9O48VUE0dej2GcRgumuIViZLMxP7tQ2ESACRIAIEAEiQASIgBwBw3RKk9dhyY+f0GrKOATVMQdgglJ1/DHU2wZJf+5FKOdwpuDegY1Y49Yf03yaw4FZKnBA80l/4m/nlQi9+FoOA50SASJABIgAESACRIAI5CcBw3RKzX0xPy0KJzpUUMMuCfF3k2BSvyrs5K0UVEX1tuk4cywKiWqk6RERIAJEgAgQASJABIiA7gjIu2u6a1XrLb1Hwlk/BP9sDKclPhhuLgCED/Hw2geVLaVff4hYmsFXyYceEAEiQASIABEgrJxZLQAAAgJJREFUAkRAlwQMPk6p8PYofFdnGY6wSfwBf2G9ixU4o1JjERuTDjTUJU5qiwgQASJABIgAESACRIAPAYMfKRXYL0WYiG1iuo7DFWehfxN/BMV/4cOCZIgAESACRIAIEAEiQATyiYBeOqVciCcW5knpTx+Muv0pKy6BE9ynBGJC0gqsPPQAwtJ2sKtr8APBWe2kO0SACBABIkAEiAARKIAEjEQikajA2JW8DJPqjMIir+N4Pr8Kro1vCA/Bbjye7warDCPvI1zJfeYA00EEiAARIAK5J1CQvlZyT4NqIAJEIKcEDHIoUbyO9CK+hB3OsgNflFQPrdo7oRyKwKaWBdJ3iTc0WUnHhIUPEfffZ1j0s4aFHCX6EJWDQadEgAgQASJABIgAEdAxAamrpuNmc9ecwH4yZs16jjMbD+B4qmQLvTAKx2cG449+4xDYohwAM9Ts7IXB4fMwamW0OKC+8CYuzPsFI06PRWCf2uINUblThaSJABEgAkSACBABIkAEtEDAIJ1SwAaNfz2MMx0OYL2dsXjtqfEEBFf5F0eXDoB7abFZAhsfTNjbHp03NURFtj7V2BGtbw3CbydHi8NGaQEgVUEEiAARIAJEgAgQASKQewIFa01p7nlQDUSACBABIkAEiAARIAL5QMBAR0rzgRQ1SQSIABEgAkSACBABIpBnBP4Phplsyf7BE+cAAAAASUVORK5CYII="></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Estimate the lowest freezing point of water that can be reached by adding sodium chloride.</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>Estimate the percentage by mass of NaCl dissolved in a saturated sodium chloride solution at +10 ºC.</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>Calculate the percentage of water by mass in the NaCl•2H<sub>2</sub>O crystals. Use the data from section 6 of the data booklet and give your answer to two decimal places.</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 a concern about spreading sodium chloride on roads.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br>