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</div><h2>HL Paper 3</h2><div class="specification">
<p>Insulin was the first protein to be sequenced. It was determined that the end of one chain had the primary structure Phe–Val–Asn–Gln.</p>
</div>
<div class="question">
<p>Describe how DNA determines the primary structure of a protein such as insulin.</p>
</div>
<br><hr><br><div class="question">
<p>DNA is a biopolymer made up of nucleotides. List <strong>two </strong>components of a nucleotide.</p>
</div>
<br><hr><br><div class="specification">
<p>DNA is a complex molecule.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how its structure allows it to be negatively charged in the body.</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>Deduce the nucleotide sequence of a complementary strand of a fragment of DNA with the nucleotide sequence –GACGGATCA–.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>A hemoglobin-oxygen saturation curve does not follow the same model as enzyme-substrate reactions.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-21_om_14.26.13.png" alt="M17/4/CHEMI/HP3/ENG/TZ2/14"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the shape of the curve from 0 to X kPa.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why carbon monoxide is toxic to humans.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The heme groups in cytochromes contain iron ions that are involved in the reduction of molecular oxygen.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the half-equation for the reduction of molecular oxygen to water in acidic conditions.</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>Outline the change in oxidation state of the iron ions in heme groups that occurs when molecular oxygen is converted to water.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Anthocyanins are naturally occurring plant pigments. Depending on the solution pH, they can exist as quinoidal bases or flavylium cations as shown in section 35 of the data booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why anthocyanins are coloured.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why the blue colour of a quinoidal base changes to the red colour of a flavylium cation as pH decreases.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The following graph shows the effect of substrate concentration on the rate of an enzyme-catalysed reaction.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-18_om_17.16.36.png" alt="M09/4/CHEMI/HP3/ENG/TZ2/B4"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the relationship between enzyme activity and concentration of the substrate.</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">Determine the Michaelis constant \({K_{\text{m}}}\) from the graph.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe why competitive inhibition may take place.</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">Explain the effect of competitive inhibition on \({V_{{\text{max}}}}\) and \({K_{\text{m}}}\).</p>
<div class="marks">[4]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">On the graph of effect of concentration on rate of reaction on page 10, sketch the expected curve for <strong>non</strong>-competitive inhibition.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">DNA is the genetic material that individuals inherit from their parents. Genetic information is stored in chromosomes which are very long strands of DNA.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the structure of a nucleotide of DNA.</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 nucleotides are linked together to form polynucleotides.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Outline the process of hydrogenating fats and name <strong>one </strong>catalyst for the process.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Anthocyanins and carotenes are both coloured substances found in many foods.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain, in terms of their molecular structure, why these compounds are coloured.</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 <strong>one </strong>other coloured compound commonly found in uncooked foods.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Stereochemistry is the study of the spatial arrangement of atoms in molecules. A molecule containing a chiral carbon atom exists as two enantiomers. Three different conventions can be used for naming purposes.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Use the CORN rule to determine whether the structure of 2-aminopropanoic acid (alanine) represents the D or L form. Justify your answer.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-11-03_om_11.46.51.png" alt="N11/4/CHEMI/HP3/ENG/TZ0/F5.a"></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the (<em>d</em>) or the (<em>l</em>) convention.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">A food product is often judged simply by its colour. Natural pigments that give rise to food colour include anthocyanins, carotenes, chlorophyll and heme. The structures of these pigments are shown in Table 22 of the Data Booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why these natural pigments are coloured.</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 from their structures whether anthocyanins and carotenes are water-soluble or fat-soluble.</p>
<p class="p1">Anthocyanins:</p>
<p class="p1">Carotenes:</p>
<div class="marks">[2]</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">State and explain how the rate of an enzyme-catalysed reaction is related to the substrate concentration.</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">When an inhibitor is added it decreases the rate of an enzyme-catalysed reaction. State the effect that competitive and non-competitive inhibitors have on the value of \({V_{\max }}\). Explain this in terms of where the inhibitor binds to the enzyme.</p>
<p class="p1">Competitive inhibitor:</p>
<p class="p1">Non-competitive inhibitor:</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) Sketch a graph to show the effect that a change in pH will have on the rate of an enzyme-catalysed reaction.</p>
<p class="p1">(ii) Explain why changing the pH affects the catalytic ability of enzymes.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Hemoglobin contains a heme group with an iron(II) ion.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how the oxygen saturation of hemoglobin is affected by changes in the blood plasma.</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>Explain why foetal hemoglobin has a greater affinity for oxygen.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>An inhibitor reduces the rate, <em>V</em>, of an enzyme-catalysed reaction.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain with reference to the binding site on the enzyme how a non-competitive inhibitor lowers the value of <em>V</em><sub>max</sub>.</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>Outline the significance of the value of the Michaelis constant, <em>K</em><sub>m</sub>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Polymers of glucose include starch and cellulose.</p>
</div>
<div class="question">
<p>Outline why cellulose fibres are strong.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">DNA and RNA both contain a pentose sugar.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the names of the sugars in <strong>each </strong>nucleic acid and outline how their chemical structures differ.</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">State <strong>one </strong>other structural difference between DNA and RNA.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The kinetics of an enzyme-catalysed reaction are studied in the absence and presence of an inhibitor. The graph represents the initial rate as a function of substrate concentration.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-10-23_om_08.00.16.png" alt="M11/4/CHEMI/HP3/ENG/TZ1/B4"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the type of inhibition shown in the graph.</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">Determine \({V_{\max }}\) and \({K_{\text{m}}}\) in the absence of the inhibitor and in the presence of the inhibitor.</p>
<p class="p1">Absence of inhibitor:</p>
<p class="p1">Presence of inhibitor:</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">Outline the relationship between \({K_{\text{m}}}\)<span class="s1"> </span>and enzyme activity.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">A large proportion of the food we eat provides energy through the process of respiration. Carbohydrates and triglycerides are the food groups mainly responsible for providing this energy.</p>
</div>
<div class="question">
<p class="p1">Compare the behaviour of enzymes and inorganic catalysts, including reference to the mechanism of enzyme action and the ways in which this can be inhibited.</p>
</div>
<br><hr><br><div class="specification">
<p>The structure of DNA (deoxyribonucleic acid) has been studied in many different ways.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the name of the component of DNA responsible for the migration of its fragments to the positive electrode in gel electrophoresis.</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>In 2010, scientists claimed that they had discovered a species of bacteria capable of incorporating arsenic in place of phosphorus into the bacterial DNA. This claim has since proved controversial. Suggest <strong>one</strong> technique or evidence that might help support the claim.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The stereochemistry of molecules affects the way they interact with taste and smell receptors in the body.</p>
</div>
<div class="specification">
<p class="p1">The stereochemistry of carbohydrates and amino acids is usually indicated by the D/L convention.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Alanine has the formula \({\text{[}}{{\text{H}}_{\text{2}}}{\text{N}}–{\text{CH(C}}{{\text{H}}_{\text{3}}}{\text{)}}–{\text{COOH]}}\). Deduce the structure of D-alanine and complete its structure below.</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">State which convention is usually employed to indicate the stereochemistry of molecules other than carbohydrates and amino acids.</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">Based on the structure given in part (b) (i) comment on the statement “D-alanine is a +(<em>d</em>) compound”.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><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 structures of the main form of glycine in buffer solutions of pH 1.0 and 6.0.</p>
<p>The p<em>K</em><sub>a</sub> of glycine is 2.34.</p>
<p><img src="data:image/png;base64,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"></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>Calculate the pH of a buffer system with a concentration of 1.25 × 10<sup>−3</sup> mol dm<sup>−3</sup> carbonic acid and 2.50 × 10<sup>−2</sup> mol dm<sup>−3</sup> sodium hydrogen carbonate. Use section 1 of the data booklet.</p>
<p>p<em>K</em><sub>a</sub> (carbonic acid) = 6.36</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>Sketch the wedge and dash (3-D) representations of alanine enantiomers.</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>UV-Vis spectroscopy can be used to determine the unknown concentration of a substance in a solution.</p>
<p>Calculate the concentration of an unknown sample of pepsin with an absorbance of 0.725 using section 1 of the data booklet.</p>
<p>Cell length = 1.00 cm</p>
<p>Molar absorptivity (extinction coefficient) of the sample = 49650 dm<sup>3</sup> cm<sup>−1</sup> mol<sup>−1</sup></p>
<div class="marks">[1]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A different series of pepsin samples is used to develop a calibration curve.</p>
<p> <img 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"></p>
<p>Estimate the concentration of an unknown sample of pepsin with an absorbance of 0.30 from the graph.</p>
<div class="marks">[1]</div>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Lycopene, whose structure is shown below, is a carotenoid and is responsible for the red colour in tomatoes. When bromine is slowly added to some tomato juice, the colour of the juice gradually changes from red to yellow. Explain this colour change in terms of changes in bonding in lycopene.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-10-19_om_06.05.08.png" alt="M09/4/CHEMI/HP3/ENG/TZ2/F3.b"></p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Enzymes are protein molecules that catalyse specific biochemical reactions. The phosphorylation of glucose is the first step of glycolysis (the oxidation of glucose) and is catalysed by the enzyme hexokinase.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain how enzymes, such as hexokinase, are able to catalyse reactions.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State and explain the effect of increasing the temperature from 20 °C to 60 °C on an enzyme-catalysed reaction.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question">
<p>Explain how the structure of vitamin A is important to vision using section 35 of the data booklet.</p>
</div>
<br><hr><br><div class="specification">
<p>Vitamins can be water-soluble or fat-soluble.</p>
</div>
<div class="question">
<p>Retinal is the key molecule involved in vision. Explain the roles of <em>cis</em> and <em>trans</em>-retinal in vision and how the isomers are formed in the visual cycle.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">The nucleic acids, RNA and DNA, are polymers which are formed from nucleotides. Distinguish between the structures of RNA and DNA.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">In aerobic respiration, the metabolism of glucose takes place using the processes of oxidation and reduction.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify the molecule that undergoes oxidation and state the half-equation for the process.</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">Identify the molecule that undergoes reduction and state the half-equation for the process.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Enzymes are biological catalysts. Catalases are highly efficient enzymes found in cells. Each catalase molecule can decompose millions of hydrogen peroxide molecules per second.</p>
<p class="p1">Metal-based inorganic catalysts are also common. In 2009, at Cardiff University in Wales, a new catalyst was developed by Hutchings and co-workers using gold–palladium nanoparticles in the direct synthesis of hydrogen peroxide.</p>
</div>
<div class="specification">
<p class="p1">Enzymes are affected by inhibitors which can be either competitive or non-competitive.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the characteristics of an enzyme (such as catalase).</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">State how inhibitors affect the initial rate of reaction of an enzyme with its substrate.</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">Explain the action of competitive and non-competitive inhibitors on enzymes in terms of where the inhibitor binds to the enzyme.</p>
<p class="p1"> </p>
<p class="p1">Competitive inhibitors:</p>
<p class="p1"> </p>
<p class="p1">Non-competitive inhibitors:</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State how inhibitors affect the values of \({V_{{\text{max}}}}\) and the Michaelis constant, \({K_{\text{m}}}\), by completing the table below.</p>
<p class="p1"><img src="images/Schermafbeelding_2016-09-14_om_10.54.56.png" alt="M13/4/CHEMI/HP3/ENG/TZ1/B4.biii"></p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p>Amino acids are usually identified by their common names. Use section 33 of the data booklet.</p>
</div>
<div class="question">
<p>Amino acids act as buffers in solution. In aspartic acid, the side chain (R group) carboxyl has p<em>K</em><sub>a</sub> = 4.0. Determine the percentage of the side chain carboxyl that will be ionized (–COO<sup>–</sup>) in a solution of aspartic acid with pH = 3.0. Use section 1 of the data booklet.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">The enzyme hexokinase catalyses one of the initial reactions between glucose and adenosine triphosphate (ATP) during the process of glycolysis.</p>
<p class="p1">The graph below shows how the rate of this enzyme-catalysed reaction changes as the glucose concentration is increased.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-09-17_om_06.58.57.png" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">From the graph, determine \({V_{{\text{max}}}}\) and the Michaelis constant, \({K_{\text{m}}}\).</p>
<p class="p2"> </p>
<p class="p1">\({V_{{\text{max}}}}\):</p>
<p class="p2"> </p>
<p class="p1">\({K_{\text{m}}}\):</p>
<div class="marks">[[N/A]]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why a <strong>low </strong>value of \({K_{\text{m}}}\) is significant.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State and explain the effect of a competitive inhibitor on the value of \){K_{\text{m}}}\).</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Calculate the number of carbon-carbon double bonds in linolenic acid, \({{\text{C}}_{{\text{18}}}}{{\text{H}}_{{\text{30}}}}{{\text{O}}_{\text{2}}}\), given that 7.7 g of iodine, \({{\text{I}}_{\text{2}}}\), react with 2.8 g of linolenic acid.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Vitamins are organic micronutrients essential for good health. The structures of vitamins A, C and D are given in Table 21 of the Data Booklet.</p>
</div>
<div class="specification">
<p class="p1">Vitamin D is the only vitamin that can be synthesized in the body, by the action of sunlight on the skin.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Identify by name <strong>two </strong>functional groups that are common to all three of these vitamins.</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">Only one of these three vitamins is soluble in water.</p>
<p class="p1">Identify this vitamin.</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">Explain why this vitamin is soluble in water.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State <strong>one </strong>effect of vitamin D deficiency.</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">Suggest why vitamin D deficiency diseases are becoming increasingly common in young people.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Hemoglobin is often described as a carrier of diatomic oxygen.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the structure of hemoglobin.</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>Outline the role of hemoglobin in transporting diatomic oxygen.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The following products result from the hydrolysis of a triglyceride.</p>
<p class="p1" style="text-align: center;">\({{\text{C}}_{{\text{19}}}}{{\text{H}}_{{\text{31}}}}{\text{COOH}}\) <span class="Apple-converted-space"> </span>\({{\text{C}}_{{\text{13}}}}{{\text{H}}_{{\text{27}}}}{\text{COOH}}\) <span class="Apple-converted-space"> </span>\({{\text{C}}_{{\text{15}}}}{{\text{H}}_{{\text{29}}}}{\text{COOH}}\)</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Draw a possible structure for the triglyceride.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the other reactant and one essential condition that would favour this hydrolysis reaction in the body.</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 which product is polyunsaturated, and outline why foods containing this type of fatty acid are important for health.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Enzymes are catalysts that increase the rate of all biochemical reactions, including those involved in respiration.</p>
</div>
<div class="specification">
<p class="p1">Cytochrome oxidase is a complex enzyme that catalyses the reduction of oxygen in the final stage of aerobic respiration. This enzyme is inhibited both by nitrogen(II) oxide, NO, and separately by cyanide ions, \({\text{C}}{{\text{N}}^ - }\). It has been suggested that NO acts competitively while \({\text{C}}{{\text{N}}^ - }\) acts non-competitively in inhibiting the enzyme. Experiments were carried out to test this hypothesis.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">The graph below shows the effect of substrate concentration on the rate of the reaction in the absence of an inhibitor. Draw and label the results of the <strong>two</strong> experiments showing how the rate of the reaction changes in the presence of NO and in the presence of \({\text{C}}{{\text{N}}^ - }\), if the hypothesis is correct.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_16.22.59.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/09.b.ii"></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">Suggest a reason why it is more likely that NO, rather than \({\text{C}}{{\text{N}}^ - }\), acts competitively.</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">The reducing agent in the cytochrome oxidase reaction is a species that can be denoted as \({\text{X}}{{\text{H}}_{\text{2}}}\) in the reduced form. Using this notation, deduce an equation for the reaction of \({\text{X}}{{\text{H}}_{\text{2}}}\) and \({{\text{O}}_{\text{2}}}\), and outline, using oxidation numbers, why it is a redox reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.iv.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Cholesterol belongs to a class of substances named lipids.</p>
</div>
<div class="question">
<p class="p1">Describe <strong>one </strong>negative effect of a high concentration of LDL cholesterol in blood.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Nucleic acids are natural polymers with exceptionally large relative molecular masses, made up of nucleotides. All cells in the human body, with the exception of red blood cells, contain deoxyribonucleic acid (DNA).</p>
</div>
<div class="specification">
<p class="p1">James Watson, Francis Crick and Maurice Wilkins were awarded the 1962 Nobel Prize in Physiology or Medicine “for their discoveries concerning the molecular structure of nucleic acids and its significance for information transfer in living material”.</p>
</div>
<div class="question">
<p class="p1">(i) <span class="Apple-converted-space"> </span>Explain how the two helices are linked in the structure of DNA.</p>
<p class="p1">(ii) <span class="Apple-converted-space"> </span>Describe the role of DNA in the storage of genetic information. The details of protein synthesis are not required.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">The colour of olive oil is due to pigments such as chlorophyll, pheophytin and carotenoids.</p>
<p class="p1">The absorption spectrum of one form of pheophytin is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-08_om_08.31.40.png" alt="m15/4/CHEMI/HP3/eng/TZ2/28"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the structural feature of a pheophytin molecule which allows it to absorb visible light.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-08_om_08.37.15.png" alt="m15/4/CHEMI/HP3/eng/TZ2/28.a.ii"></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">Carotenoids may lose their colour and develop off odours when they are oxidized.</p>
<p class="p1">Identify, using table 22 of the data booklet, the structural feature that makes carotenoids susceptible to oxidation.</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">List <strong>two </strong>factors which increase the rate of oxidation of carotenoids.</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, giving a reason, whether carotenoids are water-soluble or fat-soluble.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.iii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Deoxyribonucleic acid (DNA) is the genetic material that an individual inherits from both parents. DNA consists of nucleotides bonded together.</p>
</div>
<div class="question">
<p class="p1">Outline the essential features of the structure of a section of one strand of DNA.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Olive oil is a complex mixture of triglycerides, some of which are derived from oleic acid.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain why oleic acid, <em>cis</em>-9-octadecenoic acid, has a lower melting point than its <em>trans </em>isomer, elaidic acid.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Discuss <strong>two </strong>effects on health of consuming <em>trans </em>fatty acids such as elaidic acid.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Enzymes are proteins which play an important role in the biochemical processes occurring in the body.</p>
</div>
<div class="specification">
<p class="p1">The graph below shows how the rate of an enzyme-catalysed reaction changes as the substrate concentration is increased.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the major function of enzymes in the human body.</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">Describe the mechanism of enzyme action in terms of structure.</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">Use the graph to determine \({V_{\max }}\) and the Michaelis constant, \({K_{\text{m}}}\).</p>
<p class="p2"><img src="images/Schermafbeelding_2016-10-03_om_18.17.40.png" alt="N09/4/CHEMI/HP3/ENG/TZ0/B2.c.i"></p>
<p class="p1">\({V_{\max }}\):</p>
<p class="p1">\({K_{\text{m}}}\):</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">Draw a line on the graph to represent the effect of adding a competitive inhibitor.</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">State and explain the effects of heavy-metal ions and temperature increases on enzyme activity.</p>
<div class="marks">[5]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Many lipids are found in the human body. One type of lipid is a triglyceride</p>
</div>
<div class="specification">
<p class="p1">To measure the degree of unsaturation of a lipid the iodine number can be calculated.</p>
</div>
<div class="question">
<p class="p1">Calculate the iodine number of linoleic acid.</p>
<p class="p1">\[\begin{array}{*{20}{l}} {{\text{C}}{{\text{H}}_{\text{3}}}{{{\text{(C}}{{\text{H}}_{\text{2}}}{\text{)}}}_{\text{4}}}{{{\text{(CH=CHC}}{{\text{H}}_{\text{2}}}{\text{)}}}_{\text{2}}}{{{\text{(C}}{{\text{H}}_{\text{2}}}{\text{)}}}_{\text{6}}}{\text{COOH}}}&{{M_{\text{r}}} = 280.4} \end{array}\]</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Proteins are polymers of 2-amino acids. The structures of the common amino acids are given in Table 19 of the Data Booklet. This question refers to the two amino acids alanine and cysteine.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">State the structural formula of cysteine as a zwitterion.</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">With reference to the isoelectric points of alanine and cysteine, describe with a reason what pH value would be suitable to use in an electrophoresis experiment designed to separate these two amino acids in solution.</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">Cysteine is responsible for a specific type of intra-molecular bonding within a protein molecule. State the name of this type of interaction and outline how it is different from other interactions responsible for the tertiary structure.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question">
<p class="p1">Compare the structures of the natural pigments, chlorophyll and heme B using Table 22 of the Data Booklet.</p>
</div>
<br><hr><br><div class="specification">
<p>Retinal, one of the many forms of vitamin A, reacts with opsin to produce rhodopsin. Refer to section 35 of the data booklet for one structure of vitamin A.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the structural feature which enables rhodopsin to absorb visible light.</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>Outline the change that occurs in the retinal residue during the absorption of visible light.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Nucleic acids, which are polynucleotides present in cells, transmit essential genetic information.</p>
</div>
<div class="question">
<p>Explain the double helical structure of DNA, including the importance of hydrogen bonding.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Limonene is a chiral molecule. The enantiomer found in oranges is shown below.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-26_om_06.09.19.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/26"></p>
</div>
<div class="question">
<p class="p1">Identify the chiral carbon atom in the structure above with an asterisk, *.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Stearic acid, oleic acid and linolenic acid are all fatty acids that contain 18 carbon atoms. Their structures are given in Table 22 of the Data Booklet.</p>
</div>
<div class="specification">
<p class="p1">Partial hydrogenation of linolenic acid may lead to a product known as a <em>trans </em>fatty acid.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain which acid has the highest melting point.</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">State the equation for the complete hydrogenation of linolenic acid. Describe the conditions used for this reaction.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Explain the meaning of the term <em>trans</em>.</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">Draw the structure of a possible <em>trans</em> fatty acid product.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>The structures of the amino acids cysteine, glutamine and lysine are given in section 33 of the data booklet.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>An aqueous buffer solution contains both the zwitterion and the anionic forms of alanine. Draw the zwitterion of alanine.</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>Calculate the pH of a buffer solution which contains 0.700 mol dm<sup>–3</sup> of the zwitterion and 0.500 mol dm<sup>–3</sup> of the anionic form of alanine. </p>
<p>Alanine p<em>K<sub>a</sub></em> = 9.87.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.ii.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Strawberries have a bright red colour and a distinctive smell.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Ripe strawberries contain the flavylium cation, an anthocyanin. By referring to table 22 of the data booklet, explain why ripe strawberries are red.</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">Outline the difference in solubility in water between anthocyanins and carotenes, by referring to their structures in table 22 of the data booklet.</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">Outline another convention used for specifying a molecule’s spatial configuration and its relationship with the (\( + \)) and (\( - \)<span class="s1">) notation (previously referred to as \(d\) and \(l\)).</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>The most important components of nucleotides are the nitrogeneous bases, which consist of pyrimidines and purines.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Thymine (T), whose structure is given in Table 21 of the Data Booklet, is a pyrimidine.</p>
<p>Describe how thymine forms part of a nucleotide in deoxyribonucleic acid (DNA).</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>Adenine, A, whose structure is also given in Table 21 of the Data Booklet, is a purine found in DNA.</p>
<p>Draw the structure of the organic product formed from the condensation reaction of adenine with the sugar D-ribose (whose structure is given below) and identify the other product.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2016-08-15_om_07.26.30.png" alt="M14/4/CHEMI/HP3/ENG/TZ1/07.b"></p>
<p> </p>
<p>Structure of organic product:</p>
<p> </p>
<p>Other product:</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Adenine (A), guanine (G), cytosine (C) and thymine (T) result in the double helix structure of DNA. Using the structures of adenine and thymine, draw a diagram to explain how thymine is able to play a role in forming a double helix.</p>
<p> </p>
<p>(ii) Compare the bonding between cytosine and guanine with the bonding between adenine and thymine.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">The graph below shows the effect of substrate concentration on the rate of an enzyme-catalysed reaction.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-07_om_16.15.46.png" alt="M15/4/CHEMI/HP3/ENG/TZ1/08"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Outline the relationship between enzyme activity and concentration of the substrate.</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">Explain how competitive inhibition in an enzyme-catalysed reaction takes place.</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">Sketch, on the graph on page 13, a curve which shows competitive inhibition occurring in this reaction.</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">Silver ions bond with sulfur atoms in an enzyme and change its tertiary structure and activity. Predict the effect of silver ions on the values of \({V_{{\text{max}}}}\) and \({K_{\text{m}}}\) of this enzyme.</p>
<p class="p2"> </p>
<p class="p3">\({V_{{\text{max}}}}\):</p>
<p class="p4"> </p>
<p class="p5"><span class="s1"><em>K</em></span>m <span class="s1">:</span></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how genetic information is encoded within the double helical structure of DNA.</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>State the name of the bond between complementary base pairs of DNA.</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>Explain the bonding between base pairs by drawing the complementary base next to thymine below and by showing the bonds that hold the pairs of bases together. Use the structures given in Table 21 of the Data Booklet.</p>
<p><img src="images/Schermafbeelding_2016-08-22_om_11.51.37.png" alt="N14/4/CHEMI/HP3/ENG/TZ0/07.c"></p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question">
<p>Describe <strong>three</strong> characteristics of enzymes.</p>
</div>
<br><hr><br><div class="question">
<p>Compare the structures and chemical formulas of the two essential fatty acids linoleic acid and linolenic acid.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Pepsin is an enzyme, found in the stomach, that speeds up the breakdown of proteins. Iron is used to speed up the production of ammonia in the Haber process.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p class="p1">Describe the characteristics of an enzyme such as pepsin, and compare its catalytic behaviour to an inorganic catalyst such as iron.</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 class="p1">Enzymes are affected by inhibitors. Lead ions are a non-competitive inhibitor, they have been linked to impaired mental functioning. Ritonavir<sup><span class="s1">® </span></sup>is a drug used to treat HIV and acts as a competitive inhibitor. Compare the action of lead ions and Ritonavir<sup><span class="s1">® </span></sup>on enzymes, and how they affect the initial rate of reaction of the enzyme with its substrate and the values of \({K_{\text{m}}}\) and \({V_{{\text{max}}}}\).</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p class="p1">Linolenic acid (omega-3 fatty acid) is an essential fatty acid.</p>
</div>
<div class="question">
<p class="p1">Calculate the iodine number for linolenic acid, \({{\text{C}}_{{\text{17}}}}{{\text{H}}_{{\text{29}}}}{\text{COOH (}}{{\text{M}}_{\text{r}}} = 278.48{\text{)}}\). The condensed structural formula of linolenic acid is given in table 22 of the data booklet.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">The structures of some natural pigments and three preservatives are given in Table 22 of the Data Booklet.</p>
</div>
<div class="question">
<p class="p1">When the flavylium cation is placed in alkaline solution the structure changes to the quinoidal base. Explain why the colour changes from red to blue.</p>
</div>
<br><hr><br><div class="specification">
<p class="p1">Proteins are made of long chains of amino acids.</p>
</div>
<div class="question">
<p class="p1">(i) Pepsin is a protein which functions as an enzyme in human stomachs. Describe the mechanism of the catalytic activity of an enzyme.</p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1"> </p>
<p class="p1">(ii) Discuss <strong>two </strong>differences in the catalytic action of an enzyme such as pepsin and an inorganic catalyst such as nickel metal.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">A natural pigment found in cranberries can exist in two forms.</p>
<p class="p1" style="text-align: center;"><img src="images/Schermafbeelding_2016-08-25_om_14.52.12.png" alt="N13/4/CHEMI/HP3/ENG/TZ0/05"></p>
<p class="p1">Explain, with reference to hybridization, which form is more likely to be coloured.</p>
</div>
<br><hr><br><div class="question">
<p>Vision is dependent on retinol (vitamin A) present in retina cells. Retinol is oxidized to the photosensitive chemical 11-<em>cis</em>-retinal and isomerizes to 11-<em>trans</em>-retinal on absorption of light.</p>
<p>Outline how the formation of 11-<em>trans</em>-retinal results in the generation of nerve signals to the brain.</p>
</div>
<br><hr><br><div class="question">
<p class="p1">State <strong>two </strong>differences in composition and <strong>one </strong>difference in structure between RNA and DNA.</p>
</div>
<br><hr><br><div class="specification">
<p>Hemoglobin contains an iron ion that can bind to oxygen as part of the process of respiration.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Hemoglobin’s oxygen dissociation curve is shown at a given temperature. Sketch the curve on the graph at a higher temperature.</p>
<p><img src="images/Schermafbeelding_2018-08-08_om_18.58.13.png" alt="M18/4/CHEMI/HP3/ENG/TZ2/11.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>Outline <strong>two </strong>differences between normal hemoglobin and foetal hemoglobin.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Amino acids, shown in section 33 of the data booklet, can be combined to form polypeptides and proteins.</p>
</div>
<div class="question">
<p>(i) Serine is a chiral amino acid. Draw both enantiomers of serine.</p>
<p>(ii) State the enantiomeric form of serine found in proteins.</p>
</div>
<br><hr><br><div class="specification">
<p>Biological pigments include a variety of chemical structures with diverse functions.</p>
<p>The graph shows the conversion of hemoglobin to oxyhemoglobin.</p>
<p style="text-align: center;">Hb(aq) + 4O<sub>2</sub>(g) \( \rightleftharpoons \) Hb(O<sub>2</sub>)<sub>4</sub>(aq)</p>
<p>The partial pressure of oxygen gas, p(O<sub>2</sub>) is proportional to its concentration.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-21_om_11.43.40.png" alt="M17/4/CHEMI/HP3/ENG/TZ1/16"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the shape of the curve at low oxygen partial pressure up to about 5 kPa.</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>Sketch a graph on the axes above to show the effect of decreasing pH on the binding of oxygen to hemoglobin (the Bohr Effect).</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the effect of decreasing pH on the oxygen saturation of hemoglobin.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><div class="specification">
<p>Anthocyanins are pigments that give colour to many flowers and fruits. The red colour of ripe strawberries is mainly due to the anthocyanin pigment whose structure is shown below.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why this molecule absorbs visible light.</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>With reference to its chemical structure, outline whether this pigment is found in aqueous solution in the cells or in the lipid-based membranes.</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 investigated the ability of anthocyanins to act as pH indicators. He extracted juice from blackberries and used a UV-vis spectrophotometer to produce absorption spectra at different pH values. His results are shown below.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" 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"></p>
<p>Deduce the colour of the juice at each pH, giving your reasoning. Use section 17 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Glucokinase and hexokinase are both enzymes that catalyse the conversion of glucose to glucose-6-phosphate. The enzymes differ, however, in their affinity for the substrate, as shown in the graph below.</p>
<p style="text-align: center;"><img 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rkdbyBgzD64JRbp27n+N/jmz0XQ3J31BpPhEOicCNiQAPOFYMGk+N0YO3fu5ELpnzlzBh9//DHtxLAhe2raRAI6hzsu6vbHBejkcft1V3U1uqv739TJ5W/q9l+tMRhpc/cNiph4CkDHfux1ZGZmmt7f1f26OLlePl7Opr/lupCUk7oanhUm6lJUNw2GY4TV9X/qkoLkOnnUF7qT/1ypC0I/XVRmhU5PmC//ui7z7O2m7fDt15zUpYTIdfK4HN3Zk1t0EfJ+uoiU47rrdTVu6lQpE3XgdVc7Fr1e+UK1ffFt6gx1z5fR6XRcXw/VjrO23ZAUncrwlTAoruP64rkYPODuB+ji9l80uEmnRMB2BFQqlS45OZn7m2d/u9OmTdMdPHhQd+PGDdt1Si0TAQsIGP3+Z6Id0sbF9NPgTXYqcD4THRAe+ii6QgqZuzf8eEfLOomrcZ45ZnKzF+JCwLL1sYBV5hzyuP24amym5ep+xMn5lqpQmJ0DdZOdLzzDHGQXVukLywZi5opY+KZORN/Hk4CkFKwJe6B2zay2Hb/H0E9uuIOmth2UQ3VWv2jCNXZ+D1bOehPpfvOxaGo/yHhxTPrduM0eCE4sRGXiQJzPzeK+ye3Y8TGUI4IRnXOjtsX2UPR/EkE5HyJl5/fI3ZHXaOlCi2uF+5ChVsDfs0fDdUCZAr5+lcjI/tn47hiTZKZCRODuBPgdGSyZHwsqxXwhaBbi7tyoRNsRENcnaQNOHeE9ZCT8ljf0mSjK+ATb3f8Pc4J6cKWl3iMwI+ok4hO2o4QLZFUNdUEKEuLLEaccWx+fokHbwr7o3r277QRUv48R97rU+xtIJHDxjUZOgx6lkA0IQ0xUPwCPYfRwn3ojoIEDbINKtReVKK64VOdvoU7/DD899iIijq9C4k4DPwxjVe96j/e7uBe+Iz7EP6+wNYs/IvSjHUgJAY6rKqFhBmbAXOxSrcDjV77GexOGw7eLiz4qap1vCOuoCMtH9GzAQeLSF9E56rtKQQWIgCUEmEMlW8pgkSmZEyXzj2LxZFhUSuYLYZOlTUsEpTpEwAgBERsTgNRnCrYUTkHNe4P0PhMuU/E5JmDLx2H6tXs2YKkHQpRrsNRtG/qyDw1JByjGF8Bv3UbMqzU4jHAR7C1+a6jNBAxJgarGmL9IIRKD9QYaUI1zO5MwO7UDgoJKELvgk/qIo83tsqkTuOE3fnncVmT9LQGLlvY18MOoK2zeibYUn899E3tHZeJsTTYSo15AWNg4BCtuQHXc0AiQQuYThLCoRBzQ6VBTWYjM0ecRP+IlvJfLR0WdiBTVTaO+M5WtDHRm3qCotKMTYNEpWXhrPi4Ey7nDHCqZXwRL5EdZgR39DXCM8YnamADaQx4QjsQDlbX/9LORGBnYyHmPfXAEIyoxu/6DoTINC8ICGpUTh0JZJLsnnnjCBsK6YmBoCOTHf8IJNXOs5A9+B8ckpJbe4m5qz32Nt2bvgG/Sh8jauhxRqiQs2FBY61jZQjssgBi84OveeDGjI3wmLUCS7w7MXnvQ8iUETSVUxwG/wQ830K32+hXwJgI/KsPfUnkAwqZHIlzOZk2qIBv4DMLlJ3HoxIW6GRSuPLdrxbttgnwZCkznDkGAfTGIi4vjMgAbLmWw3BgstDUdREBMBERuTIgJtdBllaJr0AysG5WP2Qs/RgFnULBEajvx3oL1QNICTGLhyFmuk7eWINU3FitmDkTX+5/Hu+vCoIp9t3a3hBRdA1/C0mcbtVOSgZgpW+DLt9MYB++HsXwlNnG7LhoXMOG666MIDVcgJ2M78moNIq36ENYsXILUuomJ2i2nwxdiR91W0Gso3bcPBQjDjFAvSLsOwZx1w7B79ltYU6DWGxSaEux4bzFi8TqWTfJp6EthgmhUhAjwBJg/BNuVwfwhWLhrtpTBolPSUgZPiH6LkQAZEyLSGpsOZUevXr1sI7X0AYStycTWYaehVHSAROKCLkFZ6BmzHdveCISsbnnjASSteAUBMvb6tMf942OxLupU/XKHrB+i1jdqZ9a/MGxrHnYtYO0YO3g/DIN2jBVr8V4PBM37EFsCf8AITn4J3P/6IzwiP0RmXEBtzY7wmboGhTGuyAq6t9Yn4l4EZbkiZtcijL+fOY22x/1hy5C3dRjOKwP0S2hdJiKr5wwUbnu9dtwtCkIPiUADAnyYa2ZEMH8IdrA03/n5+dxSBmUAboCLLkRIQMSJvoRB256Jvti0KPs2o1Kp4OPjIwwAJAURIALNEmBGxO7du/HBBx/gyJEjXJjr2NhYWsZolhg9ECsBmpkQkeaYVzcdRIAICJ8AH2SKZehkybaYU+XRo0c5p0ryhxC+/khC8wmINzeH+WMVfY3ycpZnBDQrIXpN0gAclUDjmQg2C7F161b6m3VUhdO46gjQzEQdCjohAkSACFhGwNhMBFuOZDszaEnSMqZUS1wEyJgQkb5KSkq4NVcRiUyiEgGHJkBGhEOrlwZnBgEyJsyA1dZFr1y5Qt9y2loJ1D8RAEBGBL0GRKAhATImGvIQ9NXly5cFLR8JRwQcnQAZEY6uYRqfpQTImLCUXBvU27x5s42iX7bBYKhLIiAyAizYlOHuDPKJEJkCSVybEiBjwqZ4qXEiQATEToCPWMmCTSkUCm6LJzlWil2rJL+1CZAxYW2iNmqPj34pkxmPH2mjbqlZIuC0BPjcGXzESj75lr+/v9MyoYETgeYIkDHRHBmB3ecDVnl6egpMMhKHCDgWAZYKnCXgMsydwTJ4UrApx9Izjca6BCholXV52qw13piwWQfUMBFwcgLMuTIlJQUsgyc7WAKuUaNGUQpwJ38vaPimESBjwjRObV6Kj37p4eHR5rKQAETA0Qjs2LGjLn9GcnIyXnrpJVDyLUfTMo3HlgRomcOWdG3QdqdOnWzQKjVJBJyTQHFxMZcOnM+fwXZosFTgZEg45/tAo7acABkTlrOza83KykoMGjTIrn1SZ0TAUQkwh2bmFzFgwABuiMy5knZoOKq2aVz2IEDLHPagbIU+Tp8+zWUetEJT1AQRcFoChn4RzDgnvwinfRVo4FYmQMaElYFSc0SACAiTQE5ODuLj43HkyBEkJCRg5syZtJwhTFWRVCIkIPplDq26AGnKUEgkEkgkCgxXZqBIXd1AFQ3LSCAZrkRqVhHU2gbFBH2RlJSEfv36CVpGEo4ICJEAixfx6quvIjQ0FP379wfzi1i4cCEZEkJUFskkWgLiNiY0BVj50mv47vFNqNHpoNNVYOvj/8SYl9ajSFNrKWhPYWf8a9iCKSisvA2d7jYqE3sjf9YMrM67JCrFUcAqUamLhG1jAmxJY926dVy8iGPHjiE7Oxsff/wxJctrY71Q945JQMTGhBbXCnZipSoELz/jAf1A2uP+Z8IQrvoUnxdUcRrTlu3HxlQvhEdPRIC8PYD2kAdGY9FSL2Rk/4xrItArC6LDDjImRKAsElEQBNiSBsujwWJGsK2e+fn5CAkJEYRsJAQRcEQCIjYmWlJHJYorLkELLTRny3Bc7g1PN2ZI8Ed7uHl6Axn7UHhN+Gsdly7pZ1Ao+iWvP/pNBIwT4HdpGC5psK2etKXaOC+6SwSsRUDExoQUXQPH4w3fHHy67wz0JkE11IXfo8A3Fssm+UCKapyvKIO6OVrqMlScb+hf0VxRuk8EiIBwCbAljfT0dLCgbnl5edwuDVrSEK6+SDLHIyDu3RyyQLyx8TWM8vWES51uJiJFlY4AGbOTNDirKgfgXff0bifMkVNox4kTJziRKPql0DRD8giBAAs89fbbbyMrK4t2aQhBISSDUxIQ8cyEFpqiVRgRdAiTT16FjnPArMH1k6OR/9zrSC0RgzeEee8cTdWax4tKOzYBNhuxbNkyLvAUC+p29OhR2qXh2Cqn0QmYgIiNiSoUfP4pVOEv44U+XWsRSyHrMxqRE44h/pNCXIMM7r5eZuHXGyVsZ4hpP2Y1bmFh9o+SDiJABOoJ8A6WixYtQlpaGudgSanB6/nQGRGwNwHxGhPXfkZ2RpERXnoDQs05V7bjHC3lRkpxt5o4ZjZXsG3vs+iXsbGxbSsE9U4EBECATw9u6GAZERFBDpYC0A2J4NwExGtMdH0UoeEBRrSn95OQhz+DgV3bQebuDb8mjpa1jpl+3nDnfCuMNEO3iAAREBQBNhsxcuRIsABuLAw2OVgKSj0kjJMTEK8xAVcEvhKDZ4uz8WVuKTScIrXQlHyDtAw3vDHpMbDFD6n3CMyIOon4hO0o4QJZVUNdkIKE+HLEKcfCRwQEmHd67969nfxVpeE7K4HGsxFnzpxBWFiYs+KgcRMBQRIQwUdpc9yYf0Q41ieHAtkx6MKF03aBz/tVmJK3DQsCuukrSj0QolyDpW7b0LeLCySSDlCML4Dfuo2YF9SjucYFdZ/lElAoFIKSiYQhAvYgsGPHDtx3330NZiPc3d3t0TX1QQSIgBkEJDrmaUiHxQT4raS2wsg81jt37sxN69K3MYvVRBVFRoDNRiiVSmzevJnzF5ozZw7IiBCZEklcpyIg7jgTTqAqNqXLDkry5QTKpiFyBAyze7J8GhQGm14MIiB8AiJe5hA+XJKQCBAB0wkY840gQ8J0flSSCLQlAZqZaEv6JvRdUVHBlerRQxz+HSYMiYoQgSYEDGcj2E4NWtJrgohuEAFBE6CZCUGrB9Bo9PtUXF1dBS4piUcEzCfAR7Hk40bQTg3zGVINIiAEAjQzIQQttCADb0y0UIQeEQFREmA5NaZPnw62W4lFsWTBp+ggAkRAnARoZkLgemNJvij6pcCVROKZRYDP8DlgwABuy7NKpSJDwiyCVJgICI8AzUwITyckERFwWAJnz57F7Nmz6zJ8zp8/n0JhO6y2aWDORIBmJgSubRb9slu32gBcApeVxCMCLRFgAag8PDxgmOGTMuG2RIyeEQHxECBjQuC6YuvJffr0EbiUJB4RaJ4AW9aIi4vDhAkTuCW7PXv2gDJ8Ns+LnhABMRKgZQ4Ba439E6aDCIiZgKGTJW35FLMmSXYi0DIBmplomU+bPuWjX3p5ebWpHNQ5EbCEQHp6OgydLCl2hCUUqQ4REAcBMiZEoCeWm4MOIiAWAszJ8tVXX0VkZCQSEhLw2WefwcfHRyzik5xEgAhYQICWOSyAZq8qFy9e5LoiY8JexKmf1hI4dOgQ2A4N5utDeTVaS5PqEwHxEDBhZuIOfi89gfIr/xPPqBxE0gsXLnAjoWyJDqJQBx4G8+9Zt24dhgwZgv79+4Mt0VFeDQdWOA2NCDQiYIIxcQsVX8XgIY8gRC5NxTdFp6G5Q1nLG3GkSyLgtATYsgZLER4TE4Pk5GSsXbuW0oU77dtAA3dWAiYYE39Azz5PYnivn5G+OBrPD3wE/iGzkJC+Fz+rb4DMCtu9OocPH8a0adNs1wG1TARaSYAtazDHymPHjuHgwYNcQCqKHdFKqFSdCIiQgAnGRAf0fn4Z9p8oxbH925A08yngwEbER4agv8IfI2atwN9zf4b6llaEwxe+yN27dxe+kCShUxJguzX4ZQ0WkGrw4MFOyYEGTQSIACDR6XRmTi5ocetSKQr2Z+MfGRuw+psSPceHxmLenJfx52eCENj3j+gocQ68Eol+oGZjNAHP+PHjERgYiIULF5pQmooQAfsQqKqqglKpxObNm7ndGhQS2z7cqRciIGQCJsxMNBZfio49+uDpyXOxatdRXPwlD39fMx+jkYvVcydj2CP+eHpJHi43rmbt62u5UCokYB/mRn8UC5F7TT9bolUXIE0ZWl9uuBKpWUVQC3wyJSsri6JfWvu9ofZaRaC0tBQjR47kDAm2W4MZurSs0SqkVJkIOAQBC4wJg3FLOqLHw8Mwec4KfL43E0kRT0IGNY6cqsItg2I2Oe0ajMRKHdiMQP1PDa4XrkQQRiNpVxyCu0oB7SnsjH8NWzAFhZW3odPdRmVib+TPmoHVeZdsIho1SgQckQBbyvD19eWGRrs1HFHDNCYiYDmBVhgTOtzRnMGxnCXdJuYAACAASURBVHQkzByFR71CEZt+HL2Gz0LSi/3RJiv9mkJsWLAeSHoLMwP0ybG0ZfuxMdUL4dETESBvD6A95IHRWLTUCxnZP+Oa5exsWpN9A2QHRb+0KWZq3AQCbNvnsmXL6nJr5Ofn024NE7hRESLgTATMD1p15xrO/PJPHPg6E1s++RQHftUAskGYGL8Ra8aPxLD+HpC1awuHiSso2vAuYlWTsD9rIGScFrXQnC3Dcbk3lG7MkOCP9nDz9Abi96FwUZB+BoN/JLDfFLBKYApxMnEMU4anpaUhIiLCyQjQcIkAETCFgInGxB1oTh9D/r492LU1DRsP/BuADA8ND0fS0sl47pnH0bdHR7SFCcEPUnsuFx+uPIWodesRxJY3uKMa5yvKoIY3X6zhb3UZKs5XA107NrwvgCs++qUARCERnJQAH82SDf/o0aOU6dNJ3wMaNhEwhYAJxsQtlKZORUD0dmhYi7WzEJFtOgvReGi3UJb9d6RiDPY/4wHelAA0OKsqB5ozJho3I6BrPvol5TQQkFKcSBS27ZPl1mBxTpYsWULLGk6kexoqEbCEgAnGxB1cr/oNvUbPx7KoiQh9egD+1MazEE0Gqq3Awe0/IeiNBQism5VoUsqkG/xWT5MKUyEi4GAEmH8EMx6SkpJo26eD6ZaGQwRsScAEY6IT+rzyJU78n6tgY0doy37A9pzHEJ78aK2vBI9MBndfcabvLikpwbhx4/iB0G8iYHMChv4RmZmZXGRLm3dKHRABIuAQBEwwJlxwz32uAh7sLZQd3IOcJk6WTGS9o6W8Oenl3vBs4JgJbptpc8WN3bfVTMaVK1cobbMx4HTPJgSKi4sxffp0rm3yj7AJYmqUCDg0gXr3ArEOk1viOAh5+DMY2GSJQwqZuzf8eEfLujHWOmb6ecNdJkwEly/bPOxXHQ06cW4CLH7EgAEDoFAowM79/f2dGwiNnggQAbMJCPOT1JxhaCqhOg74+SoaLXHoG5F6j8CMqJOIT9iOEg0LeVkNdUEKEuLLEaccCx+BEmChip944glzSFBZImAWAT5t+IQJExAbG4vPPvuMHC3NIkiFiQAR4AkI9KOUF88Kv6UeCFGuwVK3bejbxQUSSQcoxhfAb91GzAvqYYUOqAkiID4CzJAwTBu+fPlyCostPjWSxERAMARMSPT1XxxLnomEM/0x8ukn8Hj/R+Hr0RUmOFsIZpC2FIT3mbBmoi/mCOfh4cGldKZMjLbUnnO2zd4vljb8yJEj9I455ytAoyYCVidgwsxEO7j69AVyVyJ6zFD0630/+gTPRELKDhw4VoHLlHrc6kq5ceMG12bPnj2t3jY16NwEWCAqZkiwQ6VSUdpw534daPREwGoETDAmOsAjdCE+P1KOi6WF2Pf3RLzs8x98Mm0Cgv0fhGu/ZxD51zX4dM8/UarW4I7VRHPehnhjwnkJ0MhtQYA5Vw4ZMgT9+/fnHC0pIJotKFObRMA5CZiwzGEMDEvydRa/HDmCwh8O4Kt/ZOKrIjUAOQLGTkDYtBi8McYHwgtSbWwsrbtni2UO9k+fOcVZc+mkdaOk2mImwPwjUlJSEBMTwzlavvPOO+QfIWaFkuxEQIAELDQmGo3kjgbq8l9w7Mhh5OVk4UvMxvdpYWg2vkOj6mK+JGNCzNpzfNl5R0u2Oyg5ORmzZ892/EHTCIkAEbA7AesYEw3E1uL2rTto37F9myb+aiCSDS9sYUywdM8FBQXYuXOnDSWnph2dgGFEy+zsbISEhDj6kGl8RIAItBEBG2zKkKJDR8N03200MhF3S9EvRaw8gYjO79hg4hw8eJAcLQWiFxKDCDgqARMcMB116MIdF0W/FK5uxCAZ27HBthazg/nf0PZiMWiNZCQC4iZAxoQA9cfWt/v16ydAyUgkoRPgd2yw1OF79uyhiJZCVxjJRwQchID5xsSdG9BQbAmbq18mk9m8D+rAsQisW7eO2wXEDIm1a9fC1VXICfociz2Nhgg4OwGzjYk7xz6Ef78/Y/7a7cg9dgaaOzpnZ2jV8VdVVXHtkTFhVawO3RjbsREXF8dt/WQ7Nj7++GPa+unQGqfBEQHhETDbmJD29MW43iexeu5fMML/YfiHzEJC6tc4XH6ZAlZZQb+XLl3iWvH09LRCa9SEoxPgt34mJSUhLS2Ntn46usJpfERAoAQs2xqqu4VL/z6K77J34u9pGfiCD1g1MRyRfxmP0KcH4E89OtLWUAuUXlpaCl9fXy7UMUUotACgE1Ux3PpJOzacSPE0VCIgQAKWGROGA7lzDaePHcS+PV9h6yef4sCvGgB/wvCZM/B65AsIffwByCSGFRzr3NpxJvjolyykdqdOnRwLFo3GagQMt36uWrWKdmxYjSw1RASIgCUEzF7maNjJHWjU/0FZWRlUx37CEc6QkCMgqCdOb1iAF54cirFv74Wa/CoaYjPhigwJEyA5aZHi4uK6ZF209dNJXwIaNhEQGAELjAktbl0qxeGvN2HxpKcg7+2PEX+Ziw8rHoEyZRd+/PUXHD7wPU5cPI7MuIdw4N31yCq9KbBhC1ecyspKDBo0SLgCkmRtSoDFkBgwYAAUCgUXQ8Ld3b1N5aHOiQARIAKMgNkRMGuOrcNT/nNxlNV+KAQzk7Zh4rNDEPiIO2Tt6tcz2vXwxaDHHgRk/8M9HV2ItokETp8+jaCgIBNLUzFnIpCTk4PQ0FDwWz9p9sqZtE9jJQLCJmC2MaG7sJczJII+LMAXrwSgR0fDyY3/4j/f7ULO2T9h0ouPQT56BS5f7IZuDcoIGwhJRwSESIDFkGBZP8mQEKJ2SCYiQAQMLQHTaNw3DA/hIfTu5dbIkACgu4iCD9/EzLcOoLxGgnYyVzIkTKNaV4pt8aPol3U46AQAb0iwGBIsGBXNSNBrQQSIgNAImDQzofvta7zWZww2XK4X/9cJvZFef9ngTDa+F7qbb6Y0aMOZLyhglTNrv37sLIYE26mxaNEiSh9ej4XOiAARECABk4wJyR+DEbt5CW5l/Qd3fv8FO79RoVdQKAb3vqfRkKToJB+IMVFj8aC9jAmtGkUZq7Fg6nLkMWmC4rBlxTyEB8jBi6BVFyBj9WJMXZ6jlzcoDinzJmHUmADI+UKNRtIWl3z0y7bom/oUFgE+GBXL08JmJGbPni0sAUkaIkAEiIAhAZ2Zx53iNboB6KObseucmTVtULymQpcZFaSLSDmuu841f1WnynxTF4SJuhTVTX2HXJkAXVBcuq6w8rZOp7utq/znOl2EPEAXt/9iq4ViizvsxxqHSqXi2mK/6XBeAjdu3NBNmzaNexcOHjzovCBo5ESACIiGQOuDVhlaJnY91+Jabjz6TAG2lixFcFd+iuEScpUjMQXLUZIYDFlpKkb57sFkVTqifDrWSngLpakRCFLN5Mp0bYXc1gxaRdEvW6EIB6lqOCNBUS0dRKk0DCLgBARMWOa4hdLtbyNhjxumrYzBUxe/xLyEb3GtBThSv2lYuWAourdQpvWPqlCYnQOEL8fAOkOCtdoDwYmFqOQ60OLa2TIcl3tD6dbeoMv2cPP0BuL3oXBRkIEhYlCkDU4rKiq4Xnv06NEGvVOXbU2Aj2p55MgRkCHR1tqg/okAETCHgAnGRA1uXjiG9C9vYOJyADcv4FB6uj7ORDM9yWZMBCtq00N7CRXFV+A3uTMqc1OR8F48luepIY9YibRF0XjWh803VON8RRnU8DYuiroMFeerga78jIXxYva6q9GwUOSg1NH2Ai6gfnhDgol09OhR+Pv7C0g6EoUIEAEi0DIBE4yJe9B/zm7o5tQ21HMOfqq7aLlxmz7VVEJ1/AY01W9i7pMLsWV/JRKlWmhKMvD6cwtxPX8lwu7X4KyqHGjOmDAiIL9sYeSRzW/xxoTNO6IOBEXA0JBg4bEpqqWg1EPCEAEiYAIB3tHAhKINi+huXUKFWsN5HzIfxFsVP+Hgv9S4xdzG7Hao8UP7cCQvfbZ2V4YUsj6jETnhMGavPdjiUozdRDSjoxMnTiA2NtaMGlRU7ATIkBC7Bkl+IkAEGAELjIkaaH75FK89/SieWl2A6xzHmyjf8y6GPvI4nrNzYi+5vyfcGoxCBndfL6iLK3Beqz83R9U6nY5tzTD5x5y2qSwRMCTQOGEXzUgY0qFzIkAExESgwcewKYLrqvKw9IWZ2HBlOGYPfwB6t8YO6B36f0iLewRH3p2OWekn8T9TGmtNma6PIjQ84C4t6B0t5c2VknvDs4FjZnMF7XM/Ly8PvXv3tk9n1EubEuATdjEhaGmjTVVBnRMBImAFAmYaE1pcL96P9BJ3vPLB+3hz5EPQuy66QPbgUES89z4SnrqKrO2H8R+tFaRrsYmu8H38CSBjHwqvGXbG/CTOIejZflBIpZC5e8OPd7Ssa6/WMdPPG+4yMxHUtWH9E+bFz7JB0uHYBJghMWTIEC7PBhkSjq1rGh0RcBYCZn6SavHfK1VQww0PP+CK+hyhtbja3wd3b1fg1ypcN/x8twnN9rg/JAJv+H6O9zYVQr8Pohrqgu1IyxyAmBf9IWPrON4jMCPqJOITtqNEw4RiZVKQEF+OOOVY+JhJwCZDYZtkblKadluxFVK7hoYEy7NBSxtC0g7JQgSIgKUEzPwodYHrA97oDxVyjlQ0WcrQVf0L3+/9FbKhXlDYI+u4LBALdn2LhVgPH4kEEkkHBKyvxpRvlyHs/tq4ElIPhCjXYKnbNvTt4sKVUYwvgN+6jZgXJJx4DmfOnOF0SEm+LH2VhV+vsSFBCbuErzOSkAgQAdMImB8B83//QurE0Yjer8DUt2ZjytA/odsftLihPoqvN6zG8m9codz/D7wf/MemMxemySSqUvxWUua02ZqDol+2hp7w65IhIXwdkYREgAhYTsCEOBONGv9DX0R89Amq5s9DbNxL2GL4WPYs5v19JeKHO4chYTj01p5T9MvWEhRufTIkhKsbkowIEAHrEDB/ZoLvV3cD6pPHcbJcjSvVEtzT8wF49e0D7x4dnWJGgsdgrZkJ5og3YcIEbksq3zb9Fj8BMiTEr0MaAREgAncnYP7MBNdmDTQVP+G7/P34saAcl7Xt0P0BPzx6TYJuoY+iZ7smrpl3l8TJS1D0S8d7AciQcDyd0oiIABEwTsACY+IOLn63HJNHL8IB/RYKg5Zl+NPUDfj6o5fg05EMCgMwdz1l0S+nTZt213JUQBwEyJAQh55ISiJABKxDwMzdHICuKh9/m/E+DvjORsqPv6LqZg10uv/heuVxfLs0BJe2xCNumx2CVlln/IJqpXt32+ZZFdRgHVgYMiQcWLk0NCJABIwSMNOY4INWeWLm23/FK094oXtH1kQ7yOT9MCp2Md62W9Aqo+MR7U22m6Nbt26ilZ8E1xMgQ4LeBCJABJyRgNnGhD5oVQ88JL+3qaOlXYNWOZa6srKy0KdPH8calJONhgwJJ1M4DZcIEIE6AmYaE/VBq7499G/cqmtGf6L77Rj22TNoVaP+6ZIItBUBMiTaijz1SwSIgBAImOmAKUGHR8fi/17chIi5r2Dq9Tcw9ek+6Nm5BldP/YSvkhPxkfopKMOHwI38L03WL1viYIeXl5fJdaigcAiQISEcXZAkRIAItA0BM40JAH/4E1782yZc0M5DbHwkthvKTUGrDGmYfd65c2ez61CFtiVAhkTb8qfeiQAREAYBy4NW3bmGM6Un8W8KWsVpsjXhtPkPJJafgxI/CeMPwxQpeL2xLb0saRfl2jCFGpUhAkTAEQmY6TNhgKBdV3g8/DiCnx+PsLBxCB3qjz85WfRLAxqtOr1w4QJXnwyJVmG0a2VRGRJaNYqytmFFpB9YxFb9jx8iV2xHbum1Bty0pakIlUxCamljj6gGxWxwcQulqZMgUSxE7jXjKYf1sg2EMveSDfqnJokAEWgNAROWOW6hdPvbSPhWbXI/Ur9pWLlgKChqgsnIqKCICIjJkNCqD2HNX2ciCZFYNycHNWlycN8gNKXYuyEBU3wz8EbhViwIEP62ZKlPFLJ1USJ6U0hUIuA8BEwwJmpw88IxpKfvMZmKbMZELDe5NBU8fPgwRb8UyWtQXFyMIUOGcPoS/NKG9hR2xs/EG6ejULhrLgJkBhORMh88u2ANdmEKBi74BMMbPxeJPkhMIkAEhEHA4L9LcwLdg/5zdnMJqJhfgCk/1zc8j57NNUf3jRKg6JdGsQjq5tmzZzF9+nQMGjQIiYmJgveR0Jbtx8bUDohbHN7QkKij2g0DXn4HO2N8get36u7Wn1xCrnJg06WHa7lQKiRQKHNRt0jCllLSlBheu4yiiFyFvQ2WUK6hNDcVyuGK2mWWUChTc1GqMb6kwcmgOYHUSD8oItejQF2NhssctbKFrkduQUZ9u4pIrNhbCsNI/1p1EXasiISibomncd9aaEpzkaoMrV8GGq5Eam7DdtBojBJjZerh0RkRcCoCJhgTxnhocUv9E75JXQHlzFfwyorvcbmmDN98tBPHLt42VoHutUCA3xraQhF61MYEmCERFhbGScEyvLq6uraxRHfr/hbKDu5BjjwEoQObl1UqD8C4sOcQIG9/twabf649hR2vhmDgFhfEqK5Cp7uK3GEnEBm0EDvOVQO4hpLU+Qiakg+3xCLU6HSoqXwLbvlz4TtmDYqMGRTMkHj9RcRjAXLXz0Jgc/LlJOC9zHsQvessdLrbqNzqhW9C3sCGoit6eTUFWPnSDGS5TEdRjf7LUE3lArhkTMeMDYV6o0NTiA0z4pDv+zdc574w3Ubl4s7IGBGPz3nfkdoxjsntjcTK29DpanD9o4eRP2UC5u44hRZMoua50RMi4EAELDAmanD58FpMHjoMz0fHYvnGLdhy/CJuXf0Vexf9GUMmJ2G/mgwKc94RFv3yiSeeMKcKlbUjgcaGhDgcZTU4qyq3C6X6GZA3EObTFUBX9HnhZYRjBzZml0N7rRCfxBdg1Lp3MTdQ77MhlQ/G/OQ1iFMlYeHnpQ0/jK8fNzAkwtHHcHmm8YjkU7F40Xj4cGXaQz5wKALlP2HvsfPQQotrBTuxUhWCyOgnIa/9byeVD8XU8MeQt/cEKrWAtvIE9uZ5YdgQb8i49ttDHrwEB3SfI8qnI8DayduI2al9sXRRdK1hI4WsTziSt47B7tkbkdeM02hjcemaCDgqAbONCV1VHhJfWYzcR97Fd6cOYPlDtWhcg6D8LB59DyRiXupPuOGoxGhcTkVAnIYE+/y7hIriSiO6ql0eqJvyZ7s7FAhNLWn4gW6kpvFbtTMg8IKvu/6jmCvXNRiJlZXIjvKBpnAfMtR9MbhfL73zJ9+QTAFfP+C4qtJgWeIUslfGITqdfXBPbtmQ4Nsx/N2gTSm6Bi9DZeVSBJ7/DmxGaceOL5GqHAff6C/qakkV/fBs0EHEp3yNgtyvm+xwAapQmJ0Dtdwbnm6GMzhSyNy94afOQXZhVV17dEIEnJGAmcZEfaKvKa9OwhBFF4P8HB0gf/ZlzAzpghN7jqGixh44a7eTNfjH2PSfo1ZdgLTG66FZRVALYG6SX+Lo1auXPYBRH2YQqKqqarC0IY4ZidoBSnvA019hZLQ9EJxYWOf7VKNKQYiRUta7VY3zFWVoaS+YurgC5/m/RfU2LP/pT4iLOIn4xG9xjr9vqUCc30V/dPF9Ccn//B2AFN1Cl6MwZSJwvAxn2RKLLBALduVh6+OXkfnedIzwvRcSSWO/CgDq9zHiXpd6vwqJBC6+0cixVDaqRwQciIDZxkSLib6k96CbW2dArcFNnT0osanccwhJOcmtw9Y7h7JvRH3034I4j/bXsAVTUMitdd5GZWJv5M+agdV5wtmv3rMnuaza440xtY+bN29CqVTiyJEj2Lp1qwiDibkicNLLCGrzb83t4ebpDXkL4OX+nnDj/xPJ38T+rLV4f9F8+KUuwVs7W+OPcAuln7+L6L3DkHm2AgcSX+WMw7Dg+3G18RKQzAfBYa8i8UAldDWVKMx8FufjRyDovbx6J9OQFKhq/S7q/9cwP4xCJAb3aGGE9IgIOD4B/k/YxJG64F7FA+iHM/ip7CIa2wu6qn/he3sm+rr2M7IzbsPfs0fD6VOD0ejXc70QHj2x1smsPeSB0Vi01AsZ2T/X/6MwqGPP0xs3aEHInrxN6YsZEnPmzMHmzZtx8OBB+Pj4mFJNYGWkkA0IQ0zUbSx/L8O4k+NdJZbB3fdu+WI6wnvISISgHKqzBnsotCVIDVVAEroF5wc8g3D5SRw6caHhUoqmEqrjgJ+votZXoV4gqU8YliU9gNRW+SPU+o34PYZ+hg6c2v/iyqUW/LqkcgSETUVkeAD0syauGBgaAvnxn3BCzRxK+UMLTdEqDG+TIF+8DPSbCAiDgJnGhASd/Ufj9bE1+GzxMmz6sRxX2XLGzd9x6thuJM9/E6vVAQifMMguib605ytQrG60VtuAqxaas2U43mStU/9tCRn7UNjGjlPl5XonOXF+YDWA7RAXjQ2JwYMHi3dc0gcQtuYzpPROxcAxbzbc6qgpRe6XK/BKUDSOR8RiwRCFEYO81lBQ70Lal/+q3flQgh0JiVhusG4h9Q6F8s37sPy99cjlPmyroc7bjoycx5C0LAw+3QfilaWB2D37LawpUOsNCrb8EDMXy31jsWySj5G+uyFg5ltI8v0c722q3XVhtiZqjYCc7diSd07fr1aNgjVvYXbqibrW9FtOQ6HcUVLru8G2in6H7AIgasYIeEul6Bo0A+tG5WP2wo+5barMKVNTuhPvLVgPJC3AJM5Rs65JOiECTkfATGMCQEc/TNuwCW+5Z2Pm05OwtALAF9PxpP9zmJuuxeQVq/HOaA8DXwpbMeUNhU74bceMuj3kisgV2FFU+w8Ld1mvVZeh4rzhNw1byUrtioWA4YyEqA0JHrisH6LSDkG1+HEgOwZdeP+iLhOQVqHAuK0qlKbNx7PcLgy+Uv1vqc8LSM6JAuL99HXHfILrExZgU4jBwoX0fgQv3YLCqTfwnqIDJJIOULx3A1MLP8YbXGTNrugTtQp5W4fhvDIALkyGLv8H1bA1ULUULEvmjxdjRkIV+279Vs960Uw4Y0ZADHZt8cePI9z1/br/Fd95RGJnZlzd0ovUZwq2FM5Az6yJtXxc0CUoCz1jNmLp+Af0hg5nmGVi67DTUHJj5Mtsx7Y3ApvMrJggHBUhAg5FwOxEX7rf/42jv3fDwx53UHr4RxQeL0dVtQtkvbzxyOOD8aSPK0wIq2kFiMz5MgK+GY9g/7Y3EcxNY9Z+W5iRgZ4rPsGCgDvIVY7EiIwQ7C9ZiuCuvO2kxbXcePQZUYalqvTa7V+WicTyHLCDraFacixbtgwFBQXYuXOnJdWpjhUJrFu3DjExMcjMzKxzvLRi89QUESACRMBhCZj9uV9TkYVJA98Bhodj5vQX8Oyfp+MRj652MiAM9dARPlGfo2GofilkPk8jNHAZRizcgbG7xxpWMOmcNw5MKmyFQleuXBHpmrwVBi+gJnhDIjk5mQwJAemFRCECREAcBPiv6iZL6/LACCxLCkfv0xmIfXEE/Hv3wROTFmHj14dReulWE6dMkxu2WsFapzFu21dnExzIrNaxRQ1dvnzZonpUyXoE0tPTuRkJZkjMnj3beg1TS0SACBABJyFgtjEh6TEAkxZ8iP0nyqH6IRNr454Gdi/DzDFPwrfnAIyZvwafF6phLNK//ZneZVtaE8dM/XJFw21fLecjae2Y2I4Bin7ZWoqW12cZQCMjI5GQkECGhOUYqSYRIAJOTsBsY4LnJenYEz5PhiEm8TMcVp9C4T+SEBFwFd+snofJyT/iIl/QVr9rt541SDbE9aXfDiYPfwYDu7arjVDX2NGy1jHTzxvuLYXqtZXs1K4gCBimEp8/f74gZCIhiAARIAJiJGCxMcENVncLl0oP46tP1iNx6UqkF6kB2VOY+vSD6GJrGlIfTFoWC9+MT/FlCZ+7UAtNyTdIy3wC6+YMAcsSIPUegRlRJxGfsB0lXEKhaqgLUpAQX4445Vj4tI5Aq0bJQjWzg6JftgqjRZVFlUrcohFSJSJABIiA/QhY8FHKMob+jNztazB/zAD09H0KE+ZkoOKRWUj5uhCn1Pn4JHqAHbZKSSELeB3bdo1G1fuDa0PcumPMJzWI/HYZwu6vjaEv9UCIcg2Wum1D3y4sFG4HKMYXwG/dRswLatuodXzAKop+ab8XnvXEjDg+lfjatWsFn0rcvnSoNyJABIiA+QTM3hpac2wtBvnPxVEAsoAXMe/VFzH62SEY6NW9DXZ0mD9ga9fgd39YsjWUfTseMGAAVCoV7eiwtmKaaU+0ibuaGQ/dJgJEgAgIgYDZW0MhkWFg3FrEj38OwYO80K2dPs6CEAYjNhn46JceHh5iE12U8rLolvxuDZZBUlSJu0RJnIQmAkTAWQiYbUy4PBqFTY86Cx77jLNTp0726ciJe+HDZGdlZXH5NsiQcOKXgYZOBIiA1QlY4DNhdRmctsHKykoMGjTIacdvz4EvWbKkLnGXQ4TJtic86osIEAEicBcCZEzcBZAtH58+fRpBQUG27ILaBsCiWyYlJXFhssmQoFeCCBABImB9AmRMWJ8ptSggAobRLcPCwgQkGYlCBIgAEXAcAmRMtKEu2bflfv36taEEjt01Rbd0bP3S6IgAERAOAbMdMPWis1gTxdi/OxffFfyC37yjsHK+HD9sOgH3F0ahf88OwhmhwCWRyWQCl1Cc4lF0S3HqjaQmAkRAnAQsmJmoweXDazF56DA8Hx2L5Ru3YMvxi7h19VfsXfRnDJmchP3q2+KkYUepq6qquN7ImLA+dBZLgoXHHjduHCgolfX5UotEgAgQgcYEzDYmdFV5SHxlMXIfeRffnTqA5Q/VNukaBOVn8eh7IBHzUn/CjcY90XUDApcuXeKuPT09G9yni9YRMAxKxRwvadtt63hSbSJABIiAKQTMNCa0uF68H+klMeCRrQAAIABJREFUnpjy6iQMUXRBfciqDpA/+zJmhnTBiT3HUFFjSvdUhghYjwCLJfHOO+/gyJEjoKBU1uNKLREBIkAE7kbAbGPiv1eqoEYPPCS/18CQqO1Geg+6uXUG1Brc1N2ta+d+fuLECQ4ARb+03nswZ86culgSFJTKelypJSJABIjA3QiYaUy44F7FA+iHM/ip7CIa2wu6qn/h+72/QjbUCwqXu3VNzxkBmoa3znvAljQ2b96M7OxsUCwJ6zClVogAESACphIw05iQoLP/aLw+tgafLV6GTT+W4ypbzrj5O04d243k+W9itToA4RMGwa1+/cNUWZyqHIt+SYd1CLAljZiYGCQnJyMkJMQ6jVIrRIAIEAEiYDIBs7OGAjrcUe/Dey9H490DZxp11B+TV6xD8htD0NNJjAlLs4bGxcVx7JYvX96IIV2aQ4DfAhobGwtiaQ45KksEiAARsB4BC+JMSNBO/ize/vafmPDjjyg8Xo6qahfIennjkccH40kfV6dMRW49lVBLphJgOzeGDBmCadOmcY6XptajckSACBABImBdAmbPTOh+/zeO/t4ND/+pJzo6yexDS8gtnZlg9di0PJ8Su6U+6FlTAoZbQPfs2QNXV9emhegOESACRIAI2IWAmT4TQE1FFib5eqHfiNew4u+5OHbmGu7YRVTH60ShUDjeoOwwIn4LKOuK+UuQIWEH6NQFESACRKAFAmYbEy4PjMCypHD0Pp2B2BdHwL93HzwxaRE2fn0YpZduNdnh0ULfTvuIfRjSYTkBfgvoqlWrQFtALedINYkAESAC1iJg9jIH37Hu1kX8++j3yN75OdI+3I4iDXvSB6PnzUTEy5MQNlDuFL4TlixzlJaWwtfXFyqVCj4+PjxS+m0CAbYFlO3cyMzMBGUBNQEYFSECRIAI2IGA2TMTvEySjj3h82QYYhI/w2H1KRT+IwkRAVfxzep5mJz8Iy7yBe34W3tuB6IVA6HM1Yeq5rvWqguQpgwF++DnfoYrkZpVBLWWL0G/xUAgJyenbgsoGRJi0BjJSASIgLMQsNiY4ADpbuFS6WF89cl6JC5difQiNSB7ClOffhBd7E1Qewo731qCVHWjjtn9+NewBVNQWHkbOt1tVCb2Rv6sGVid19DoaFTTZpcVFRVc2z169LBZH47WcHFxMUJDQ7mdG+S06mjapfEQASIgdgIWbA1l6cdP4IfvDmBXxgas/qYEgByDImYh5Z3n8Myw/ugts6DZVpG8hpIt7yKuvAeewvUGLWnL9mNjqhfCVRMRIG/PPZMHRmPR0nwEZf+MRcHB6Nqghu0vNBpuTYgcB01EzXZuTJ8+vS4LqInVqBgRIAJEgAjYiYDZMxM1x9bhKUV/jPjLPGw+PwDxG77Cj7/+gh/SFiNqdEAbGBJaaIpSMCu+Ez5Y+AJkDcBpoTlbhuNyb3i66Q0J/eP2cPP0BjL2ofCa/dc6eGOigah0YZQAc1blZyIoC6hRRHSTCBABItDmBMyfQpDIMDBuLeLHP4fgQV7o1q6Ng01oCrFhwafwWpeJ8Q/sx8cNkFbjfEUZ1PBucLfuQl2GivPVQNeOdbfsccKSfLGIjXTcnQDbuZGVlYWjR4/Szo2746ISRIAIEIE2IWC2MeHyaBQ2Pdomshrp9AqKNryPb0Z/iF1hD0Ba2riIBmdV5UBzxkTj4gDnoGnkNt1qAwKGybv8/f3bQALqkggQASJABEwhYIIxcQul299Gwh43TFsZg6cufol5Cd/iWgutS/2mYeWCoejeQpnWP6rGuR3xGPPN09i1ayC3vGH/BQvLRpGXl4eIiAjLKjtJLcOdG5S8y0mUTsMkAkRAtARMMCZqcPPCMaR/eQMTWU6qmxdwKD0dR1sYsmzGRNg6fZX23Nd4a3YF3ti1FAGy5lw/ZHD39WpB0qaPdLrGidWbljG8w8eZMLx3t/MjR47gr3/9692KOe1zFoeDdm44rfpp4ESACIiQgAnGxD3oP2c3dHP0o9NJhmFp5lfoMiAYQx+8p9GQ/4v/fLcLOWflaMc+k23mTnELZdl/R6r6G2BgdzT2PsgZ0RPLQ1Kg2j2Vc7SUN5Ky7rKJY2bdE5udUPTLltGynRtTpkzBoEGDsHbt2pYL01MiQASIABEQBIHmvtI3K1zNqb2YM2E+Nh+talpGdxEFH76JmW8dQHlN08fWu9MRPlGfg80iGP7UqFIQggDE7b8IXXYUfKRSyNy94cc7WtYJUOuY6ecN92ZnNeoKW/XkzBl92nYvL/NmTKwqhEAba5xzo1OnTgKVlMQiAkSACBABQwImzEwAut++xmt9xmDD5fqqv07ojfT6ywZnsvG90N1sM6VBE1a7kHqPwIyoVZidsB1PrQ9HH9kdqAtSkBBfjritY+HTRnJ27tzZamN0lIZYro3Nmzfj4MGDtHPDUZRK4yACRMApCJhkTEj+GIzYzUtwK+s/uPP7L9j5jQq9gkIxuHfjZQ4pOskHYkzUWDzYRh/STbQm9UCIcg2WpiSib5ep+sfyCCSt24iXg+wfgfLiRX2gcTImGmoqPT0dixYtQlpaGgYPHtzwIV0RASJABIiAoAmYneir5thaDPL/CIG79mPD85RCm3fANNVxk6XMnjBhArc8I+g3w47CHTp0CEOGDOFibyxfbmvXXTsOjLoiAkSACDgJAbONCSfhYvIwyZgwGZXRgszhkiXt6t+/P+dwSX4SRjHRTSJABIiAoAmYtMzRdAR3oDlTCtVvNxs9qsGNi2UornwIU6Iet3GciUZdi+Ty8OHDXLIqkYhrUzENQ2UvWbIEZEjYFDc1TgSIABGwGQHzjQndJRz+22uYEvsFfm1GLNmMXfhLVDMP6Ta6d7dtOC+xIGYGBIXKFou2SE4iQASIQPMEzHaT1P77KyyJ/QIXBkUg/t0ZCJIBsqAZeHfxqxj+kAwYFI8vlzyLns336dRPWECmbt26OTUDNnjmcJmUlITMzExQqGynfx0IABEgAiInYKYxUYPfS4vxA/phylvL8G78AkSN8ICmfSAmv/0RvspMxNiTu5FV9BvMiyMpcopmiM++iffp08eMGo5XlDlcRkZGIiEhgfOXcLwR0oiIABEgAs5FwExjQoc71dXQoAcekt8LicQVno+6A8fLcFYjgezRELww4jd8tDkPFWRNONebZOJomcPl/PnzOb8R9psOIkAEiAARED8BM40JF3Tt6QYPXMKv6qvQoTN6eboD6tM49/v/ALRD+44uwIkLqLJpBExxgmdLHOxw1uiX5HApzveWpCYCRIAI3I2AmcaEBPf0D8bUPhXY+u7bWPfjZdz/8AD0wyFs37YbP+7/Cv/IqYAs0AM9Xe7WtfM+d9aAVSzCJVvmYb/d3d2d9wWgkRMBIkAEHIyAmcYEgK5PISY1AaOvZOPrk1fRaWA4Vr/VF/nxf8ZTz87F9v+NxpsxI+BhsyRf4tWAM0e/ZMG6KMKleN9dkpwIEAEi0BIBC4NW6XBHcx7q267wuK8DcOcyyguP4OfzgPyxpxDYW2a7hKEtjaYNnpkTtMpZo18WFxdjwIABFOGyDd5P6pIIEAEiYA8CJhgTt1C6/W0kfKs2WR6p3zSsXDDUKYJWkTHR8mtRVVWFkSNHcoXy8/MpMFXLuOgpESACRECUBEwIWlWDmxeOIT19j8kDlM2YCMqw0BQXi345bty4pg8c9A5zuFQqlThy5AhY6nWKcOmgiqZhEQEi4PQETDAm7kH/Obuhm+P0rKwCwMfHxyrtiKGRlJQUSikuBkWRjESACBCBVhIw3wGzlR06c/XLly87zfBZYKqYmBgkJydTSnGn0ToNlAgQAWclYILPhDE0WtxSF2P/7lx8V/ALfvOOwsr5cvyw6QTcXxiF/j07GKvkkPfM8ZlgZVn4aJYl05EPygTqyNqlsREBIkAEmhKwYGaiBpcPr8XkocPwfHQslm/cgi3HL+LW1V+xd9GfMWRyEvarbzftie44BQEKTOUUaqZBEgEiQAQaEDDbmNBV5SHxlcXIfeRdfHfqAJY/VNueaxCUn8Wj74FEzEv9CTcadEMX7Ns6O3r16uXQMPjAVJs2baLAVA6taRocESACRKCegJnGhBbXi/cjvcQTU16dhCGKLgbxJDpA/uzLmBnSBSf2HEMFhdOupwzgxg29edWzp+PmU83JyakLTEWZQBuony6IABEgAg5NwGxj4r9XqqDmE301RiO9B93cOgNqDW7aJdGXFprSbKyI9APzR5BI/BC5IhulGm0DybTqAqQpQ2vLSCAZrkRqVhHUDYs1qGPtC96YsHa7QmmP5R0JDQ3lEnhFREQIRSySgwgQASJABOxAwExjwgX3Kh5AP5zBT2UXm6QZ11X9C9/v/RWyoV5Q2CE3h/bcTswNWomL477AdZ0OuutfYNzFlfAdswZFvEGhPYWd8a9hC6agsPI2dLrbqEzsjfxZM7A675IdEOu7KC8v504ccWso85OYMmUKBg0ahMTERLsxpY6IABEgAkRAGATMNCYk6Ow/Gq+PrcFni5dh04/luMqWM27+jlPHdiN5/ptYrQ5A+IRBcLN5bo5LyFu7DLvDlVgU1gcyxlPWB+OjJyMk71N8XlDFEdaW7cfGVC+ER09EgLw9gPaQB0Zj0VIvZGT/jGvC0IOopViyZAkXmGrr1q1wdXUV9VhIeCJABIgAETCfgAlBqxo12tEP0zZsgvrlaMx8erP+YcV0PPkFO+2PySvW4p3RHga+FI3qW+2yB4ITC1HZYntaaM6W4bjcG0o3ZkjwR3u4eXoD8ftQuCgIwV3NtKn4Zsz4XVJS4pDRL1m+kaSkJG7LqyPOupihYipKBIgAEXBaAuYbE5CgnfxZvP3tPzHhxx9ReLwcVdUukPXyxiOPD8aTPq6woFGrKECrPoQ1CatwPOodpAb1AHAL5yvKoIa38fbVZag4Xw107Wj8uRXvXrlyBY72Ycv8JCZMmMAl8HL02BlWfBWoKSJABIiAwxGw+HNf0lGOR4eH4dHhhkxqoPlPLj490AmTop60X6IvbQlSRwUjOkcNyCOwcueTkHOTDRqcVTFfhWaMCUPRbXzOol92797dxr3Yr3lDP4l33nnHfh1TT0SACBABIiA4AibO7+twR/0jUhe/hIFdJOgy8CUsTv0R6jv1WzZ0t07j+w0xCH50BGbmq3HLnkOV9kFUdqXeuXKrF756PASv7jgFSzZr6HeFsJ0hpv2YOszNmzejX79+phYXfDlDPwlK4CV4dZGARIAIEAGbEjDJmNBdPoTlL09G9NLPUKQBNEWfYWn0ZER+eBQ3UAPNv7bjjVFD8PSsj3Cy7yx8NPMJtE00hfaQB7+OxXEdkLpxP8q0Mrj7etkUoDmNy2Scm6g5VQRZlvwkBKkWEooIEAEi0GYETDAmanDp0Od4/4ALxiblofLmHfzvcjFSIu7B3re34MusRIx9/C9YneeKyUnfoihnDWY+qWgzv4k6ksfLcFbTjnO0lNfdbHQi94ZnA8dMQMe2mJrx06hFo5dVVfqdJY5gTJCfhFEV000iQASIgFMTMMGYuInTJcehwWC8MOEJyDu6oF03P7wQ+WfILycjcvwiHBm0EF+e2I+tC0bBp9sf7AOU+UmEKqBQ5hrd3ikPfwYDu7aDzN0bfryjZZ1k1XrHTD9vuMtMQFBXz7KTS5f08Sw8PT0ta0AgtchPQiCKIDGIABEgAgIjYMYnqQz3dOQjUUnR+V5XdGahHcaux8Gv3sWER+6z72yE1AeTlsXCN+NTfFnCR4uohjp3Pd7L6I+lrwxEVwBS7xGYEXUS8QnbUcIFsqqGuiAFCfHliFOOhY8ZBASmO7uLw/JuHDlyBCyeBPlJ2B0/dUgEiAARECyBVn6UemL0S8/hURlvZNhznFLIAl7Htl2jUfX+4FqHSU+8lO2BxXmrENWHmRLMmvBAiHINlrptQ98uLpBIOkAxvgB+6zZiHrd91PYynzhxguvEw8PD9p3ZqAfDvBuOtsXVRsioWSJABIiA0xCweGuonpALOvzBxQ4BqprTR3vIA8KwII39NFdGCplPMKIS2U9zZexzX6zf5lnGU8q7YZ93hHohAkSACIiRgBnGxH9x5bfzUEM/C1Fz6RpqUIObV36DWt2wGUmn7ujVrWMbGhnCUkVlZSWXt0JYUpkmDfOTmD17NuXdMA0XlSICRIAIOCWBhlZAiwi2Itp/a5MSFdEDwUXSNnwSkYnKtDA0u4vCsKwTnJ8+fRpBQUGiHGlKSgqysrJw9OhRyrshSg2S0ESACBAB2xMwwZhohy4ejyMiorfJ0kj9esL2AapNFocKWkjg0KFDiImJQXJyMvz9/S1shaoRASJABIiAoxOQ6FhQBTosJsAiZbKjJYysTFpaGiIiIizux94VWWyMkSNHon///li7di3t3rC3Aqg/IkAEiICICJgwMyGi0QhYVLEFrFIqldw2UBbtUqyOowJ+HUg0IkAEiIBDEWjl1lCHYmGTwYgx+mV6ejpYLpHs7Gy4u7vbhAs1SgSIABEgAo5DgIwJG+tSbNEvWbjsyMhIJCQkICQkxMZ0qHkiQASIABFwBAJkTDiCFq00BsNw2fPnz7dSq9QMESACRIAIODoB8pmwsYb56Jc9evSwcU+tb54Pl61SqchPovU4qQUiQASIgNMQoJkJO6na1dXVTj1Z1g2Fy7aMG9UiAkSACBABgIwJG78FGo3Gxj20vnkWLjs+Ph7Tpk0T1fbV1o+cWiACRIAIEAFrECBjwhoUW2iDLXPExsa2UKLtH73zzjucEEuWLGl7YUgCIkAEiAAREB0B8pkQncqsKzBtA7UuT2qNCBABIuCMBGhmwsZaz8vLQ+/epocit7E4DZqnbaANcNAFESACRIAIWEiAwmlbCI6vdrdw2ux5ZmYmwsLC+CqC+M22gb744otgGU3z8/Np94YgtEJCEAEiQATESYCWOWyoN/aBLdSDbQPls4FSuGyhaonkIgJEgAiIgwAtc9hQT2fOnOFa79evnw17Mb/p4uJiLFq0iEs+RtlAzedHNYgAESACRKAhATImGvJw+CuWK2T69OkYN24cJk6c6PDjpQESASJABIiA7QnQMocNGVdUVHCtCyn65QcffMBlA2WzJrS8YUPlU9NEgAgQASciIPKZiWsozU2FcrgCzNGR/SgiV2Fv6bUGKtSqC5CmDK0rIxmuRGpWEdTaBsWsfsEHrBJK9EsW5TIpKYlzCKVsoFZXNzVIBIgAEXBaAiI2JqpxbsdCBE3Jh1tiEWp0OuhqKrHTvxiRQQux41y1XqnaU9gZ/xq2YAoKK29Dp7uNysTeyJ81A6vzLtlU8bwxYdNOTGzcMMql0HaWmDgEKkYEiAARIAICJSBeY0JbjuyNO4DwSEQHyvVxwaVyBM59E0v9dmD22oNg8xPasv3YmOqF8OiJCJC3B9Ae8sBoLFrqhYzsn7kyttINi37JQlQL4aAol0LQAslABIgAEXBMAuI1JqR9EJVdicrEYHQ1oht1cQXOa7XQnC3Dcbk3PN2YIcEf7eHm6Q1k7MP/t3c+cFGV+f7/zNCmGZKZljNgeZEAd6VcId3SXQdMsGumF9L25yrjYru6m2a5yiTZ7t7SSuFqpraVQSBue7WYq7neAoRwr64rDa6FG8ws8sKCGVpdQ5i1NGfO7/WcOWfmzHDmDzAgDN95vXhxznOe5/t8n/f3Oed8z/PX0N67fR233nqrmOl1+6/X6/HWW29h48aNoO6N62YGypgIEAEiELIEBq4z4dMkw5D62AOIUV5Fa1MDLN7iWhrQ1Cp0h3iL04NwtvrliBEjeiCh50lZ90ZGRga/P0hqamrPBZIEIkAEiAARIAIeBELMmbiKlgM7saF2NpanRUMJK5qNjR5F7rvTjz/+GPHx8X2XoUxOrHvjvvvuwzPPPCNzlYKIABEgAkSACPScQAhNDbXDWv8H5Kz8O5buLcD8SGm3RuCgxOWxA0/Rf2NKN/HqLzNK+i8t0owIEAEiQAS6SyBEnAnmSBTjiZQ8YOMfkJMS6RiQiXBExUV3l02P0rFNtNgvOvr65a/VarFp0yZQ90aPTEmJiQARIAJEwA+BEHAmrsJSvRvPzH+ddyR2ZU1EuLPQjoGWKue5x0GngZkAx3EekXyf+mvJGDZsmG8BvXCV7QmSnZ3Nd288/fTTvZADiSQCRIAIEAEi4CIwsMdM2FtQmTMX6qnvY8zOd+HuSLBCKhEeFYOETgMthYGZCTGICu8dBOfPn+cpXw9n4t133+U38XrzzTdplUtXXacjIkAEiAAR6CUCvfMm7SVl3cW2oWbrcsx8yYyskjfxUnq8pEXCFVMZMxPLs+qwYdM+1FvZNFDWkpGPTRsaka17BLG9RODLL7/klejrqZise0Xs3qBNvFz1gI6IABEgAkSg9wj00qu09xQWJdtNeuSsOwzgDAoyxiFMWE5bXFZboc5BJVtDQjkWqbrt2DjmHUwYHgaFYgjU86uRsPMNPKUZJYoLif/UvRESZqRCEAEiQAQGHAEF19VBAgOuiL2rsDhmwhMjG7Pw1VdfYffu3b2rgEQ6m73BWiX++te/glolJGDokAgQASJABHqVwIBtmehVKkES3perX1L3RpCMRmKIABEgAkSgywTImegyssASsJd7X61+Sd0bgdmEYhEBIkAEiEDvECBnone48rMp+mr1S5q90UtGJLFEgAgQASIQEAFyJgLC1H8jUfdG/7UNaUYEiAARGCwEyJnoBUuzFzz73XHHHb0g3SWSujdcLOiICBABIkAErh+BEFgB8/rB85fz6NGj/UXp0XWxe4PN3rjpppt6JIsSEwEiQASIABHoLgFqmeguOR/pLl++7ONqcC6xrcVpcargsCQpRIAIEAEi0DMC5Ez0jJ9s6sZGx7bnsbGxsteDEShuLb5ixYpgiCMZRIAIEAEiQAS6TYC6ObqN7vol1Ov1eOutt1BaWgraWvz62YFyJgJEgAgQAQcBapnohZpQX1+PefPm9YJkgHVvZGRkYN26dbS1eK8QJqFEgAgQASLQVQLkTHSVWADx29ra0FtdHGL3xjPPPBOAJhSFCBABIkAEiEDvE6Bujl5gzPbk6I2ltMvKyqh7oxfsRSKJABEgAkSgZwRoo6+e8YPcRl8srKSkBOnp6T2U7kp+8eJFzJ49G/fee2+fbh7m0oCOiAARIAJEgAjIE6CWCXku/S705Zdfxscffww2+JJ+RIAIEAEiQAT6EwEaMxFka7ABkuwXzNUvjx8/jtzcXL61IyoqKsgakzgiQASIABEgAj0jQM5Ez/h1Si0uWBWs1S/ZktlPP/00PzskmN0mnRSnACJABIgAESAC3SRA3RzdBOctmehMeLve1fBt27bx3RtGo7GrSSk+ESACRIAIEIE+IUAtE0HGLK5+OXbs2B5LZhuGPfvssygqKuq1qaY9VtKngGuw6FdAodXD4jPe9btotxzHthW7UHMtQB3sFlRv02FbjRWw6KFVrIDeEmjiAPOgaESACBCBAUYghJyJNtTkPQy1rhLtHkawW6pRpEvjZ16wmRaKZB0KDtbAYveIGMTTnm68Jd0RdMGCBUHUjERJCdjNJ7DryNfSIN/HdjP+tKsaNhZLlY4i7nWkq6iBzzc0ukoEiECoEwgRZ6Id9UUvIed/TnW2l/0cDmz4JQqxGAbzFXDcFZg334mjv1iOV6oudI7fwxC2+uV9993XQynABx98gIMHD+LNN98Mwo6gX0CvTUDyr34FrVoBhSIB2oIzsALgv8y1CQ5HS61FXrkJVrD40/AT7X9ArVAjLftXWKRIhlab7IiXvA3VplLkJKuhUKQhp7IFdqsJ5XlaqJmzplBArS1CvdWbt2aH1aSHjk+vRnJOOe/YeddFXndY66EXncTk/0Sl5SorEKq3iXqokazTw2S96mghSV4JnVBWXr+2arzy2DqcPbsOSfELoV0oKXPBX1Bfvk3gpYBCvQwF9S2oeWUt1p2twrqkucjTFzhbJrqse49rCAkgAkSACPQfAgPemXC0OuTgjxMewWPhncHaGyrwRkE0lixbgETVjQBuhGrKMjy7MRrFpZ92asXoLKFrIWz1S41G07VEHrGlS2ZPmjTJ42p3T7+G8cI9WG/6Fh2GLHy+bCfKWs6gcKkW70duhdlmQ8ehSTicugH7TexL/Ut8dMMSfGwzo/TpafgOLgAzdqDDVof8G3Mxf1MrMg81ornkbhRuPgzDiUJoD0/CoQ4bOFsdNrbm4aWyFnll7SbsX5WN6jkH0HFpL6YUrscrFUd96CKju8UK0/5fI6N6NgwdX6JiyiEsfuUIPjuwCYtOp6CS1+MEVl14Eav2m8C7NcavEbf+OLiOk1jzeR5eqlThqX25GD8+F4b6/8K8myRlfvQy3tZWIOHQV+C4r2Hc2IFlL52E+qk85I7XINdwCGvvH+Eon72+i7pTt4h8xaBQIkAEBiqBge1M8A/x52FMW481SbfJ2MAOa3MDalUxGDeGORLi70aMGRcDFB+Bod3b17MYt+//v/rqq3zrRnCXzB6BWfNSEB9+A8LVd+FOVizL33C0bDKWLP0hVEolwhMfxarMRhw90wpgBGbNuQ+RzhoyDfMeike48maMGHMbEmZMRWz4UNxx1zgMO9uOsORnUPVcNM6V5UM3MwXLynx0HVjNMNaOxZzk7yI8IgWbzQZsnvhP37p46g4rmo2NGD/nR7g3/HakbDbAvHkKWk/+BWf3LMWE4WFQhI1DRkENyo7+zTFmY9YcPBQfAYSrEH3nEBnDSsococFzVWsRfe4ICnTzELfsXZn4QpA/jp109y6KrhABIkAEBiIB56tiICoPZRQeKvxvvJgSCfmCXEVrU4P3wX+WBjS1Xg1q0dl6EBMnTuy2TLZkNpPBHIn+uyPoEIwZcbOEeTs+eetxaIr+DjtuR9obZSjJFL7au02iuwmHIDW/DjaOAyf+FWUgsovi7KZCZGjeRqNdiRFp22ChOAD3AAAgAElEQVQsWd5FCRSdCBABIjB4CMi/gwdM+cOhUsn0bTj1d3y9Ok/76CA83JdO3pVggy43bNiAxx9/PKhLcXvNUfU9zEg9heLC/4PFboe15j3s2BONGRPHeE0if+EKLv7zPDBmMlLT52KKvQYHy81obfuXo3vBM1G4GnEJX+DwR5/Baq1GXnIM0g5dw7Qu6RKOqLhonD38J3xivcgPvlWk/TdsSd9HbfE+VLHxE9YzKNAmIa2gXl4PUa/LF3HpMj+kUgyBveMiziISk1PnI32KHccOHgda29DBN2R14Pylb5xxETSOLpF0RASIABEYSAQGuDMRfNT8bA9hEGEgx1IN2P4Z7NddZ0JcU4JtL94nP2U8lhYW4ZGWNVCHhWH43NOYU7YRC2Nv6mL2t2LyvKWYVTwTtyjCEPtSEybMug21xhZ0yElSxmLhji2Ycng+hg+fiq13Poftix7F413SZShiFz6PkikfImn4bUjaegfyt2diVsazOPBIIxarh0AxPBXFY3KwY2GspBXFXaEb4n6EFXGFmBm/CDv+7uqauSFuNnJmHcLMW8KgiM3FPyZMhqq2Ac3f/BuSV4zBlpmzofvAsdopgsbRXTc6IwJEgAgMFAKhs9GXvR4FD6Vgw6S9qN+cggjeAt/AVJCJuA0xqKjfiJQI0Xeyo71yA+JnNmCjcQ+yYoc67cUciO78WJM6WxciLi4ObIGprm5BLqZla0pkZmZ2RwVKQwSIABEgAkTguhAI8QnyjoGWKm9oOw3MBN/P7i26XHh3nQ9PWdnZ2fygS1pTwpMMnRMBIkAEiEB/JxDizoQS4VExSLB86BhoGSG2QAgDMxNmIypcbK3ouanOnDnDC+nq6pdsJ1C2psSxY8eCsKZEz8tBEogAESACRIAIdIVA8N6kXcm1D+MqY2ZieVYdNmzaJyyidBWW6nxs2tCIbN0jiO0FAl1Z/ZKNs2Dbi7NxEtOmTetDMpQVESACRIAIEIHgEOiFV2lwFAuaFOVYpOq2Y+OYdxxrDyiGQD2/Ggk738BTmlFBy4YJMpvNXV79kjkSH3/8MZ588smg6kLCiAARIAJEgAj0FYHQcSaU8cgqNcPsHHwpIlQiPDYFWZtLXesOmIuwNj0RqiCX/vPPP+/S6penT5/m15QoKSlBVFSUqHA//W+Htb5IWF5aurkVW3o7CVr9Fx56ewv3iObvtEubaQUpT3860XUiQASIABFwIxDiYybcytqvTtiaEr/97W8xb948PPTQQ/1KN3ll7Oj47AT2zCqBuSgdXge1yiemUCJABIgAEQhhAkH+Ng9hUgEUja1ceeed/ELVfmOLG3kxh6IrYyz8Cg5CBLlNq9pqXsEPM94A9mRALbeleFutsOlWGnT6en4TMacqbptvJUCbVwoT2wTMS7jdUi5sIqZG8jMl+NwpyHXgFoffwEzaWuK59bm0xaIdJn0Okvm1RIRNysDG0exybuql1m5DuakdsLegMkfcbdbL5mgKmfK61KQjIkAEiMCgIEDORJDNrFar/Upkgy4zMjL4QZfB28jLb7aBRfCyaZV++Ar8H1tSOlOuZaINe4qNuOu5w+gwzEZ1xq+FzcJYll/DVLgaU9+Pxl62a2tHPhIOP4FV+z9BvVz4O/+Lkg3rcYJtAsbV43czhsLoqTm/E6wkzvfaUG7xjCR/bje9h1UZn2KO4Z+4VJGIwsW7UFFdiKVT30fk3mbYuK9wKKECqavew2eGP+DnhYmouGSDzfg0Wpc9j/319TiwYQNOz/gDOjgOtubluLCSlVeyIqZ81hRKBIgAEQhZAuRMBMm0rNsi0B8bdMl+wd3IK9Dc/cT78jMvG26d95FwBDJXPYpEtomY22ZhLEkrzhytQ+qSx6Bhu7aGT8ZPVj2IsqOHcUguvPC/8NoH0VjyyD0IRwTiH5qDWZ45W8/ipDTOoz/BkoD6XWyOjd/Ga5B870hEpLwIs/l5TGw+hbLUx7BUw/Z4GYHEn2Qhs6waf8NYzMBLmBn/U2z9dAR+adiOpWozTn5QhT3LEjBcoUBYVAYKLKdw9IwvPp4FoHMiQASIQGgRIGciSPb84gvHAER/m3xJB1323428egDF/i+0tV7pgQCPpDePwJiAHAWPdEE4DRubgfxmMwy/m4fo9pN4JSkVP/vvOlzDAuQbv3YN6OUaUJQ+Ngg5kggiQASIwMAkQM5EH9ptQAy6vOO7Xjb/Gu2DVBv2ZDwOnf4zWP76AYprZ2DeVLG7ZwwmzpiAMufmW6fw+x1HkDpjDubKhS/9FX75UKOw+Vg76t/7PYo9uzDCx2Mqi/P+p7BCLo4CN48YCVV5JU60fANrfSUOlrcBCHMsYna2Ch99chHWmm1IVizCIXwXqWX7UFjVAjvaUPP7AuxJnYyoM7+GOmoTziU9jPSlv8SqrCFoxl34gVM/cYbLQhRQN4eP+kGXiAARCHUC5EwEycJNTU28pFGjvK9d0Z8HXToxeN20Slw91BlTcjACmfmrMfXk01DPPY1HDjyL+ZFDhOs3IXbpdpx0br61DLVzdmHHwnsRLxe+6N+RsXG7sPlYPH5x9BvESXLiD5V3Yf7Gl3A/2yhMIRcnDBFTFmHjrKPIiLpJ2HjsDkfS2Eexo+QeHE66DcOTCnBn/q+xKH0FCk8+gpbFUQhT3Iq5tTNRtuPHmDJzFQ6s68DKqCFQhN2PHaNysMNNvzAMn/AOxux8Hgsl+7t4qkvnRIAIEIFQJxA6G31dJ0uJe3OwtSLYoEq24Zfcjw26nD17Nr8OxZYtW+SiUFi3CFyFpfIlLFp8Bc+5bebWLWGUiAgQASJABLpBgFomugFNLonVapULdoa9/vrrtNKlk0YPD9ymlA6BenEjHjmwChrnrrA9lE/JiQARIAJEoEsEqGWiS7g6RxZbJtjeGuwn1+pA24u7uLFxI+JgVTG0q9u1i+noPxEgAkSACPQPArQCZh/YgbYXd0E2Go34/ve/7woAcPny5X63cJebgnRCBIgAESACPglQN4dPPIFfrKqqkl39sqysjN9efOPGjfTCBPht1j2pnjp1yjOIzokAESACRGAAEaBujh4aS+zmYGLYIMz09HSnRNakP2PGDNx7773YvXu3M3ywHhw/fhzTp0/vVPz77rsPer1+AGx21kl1CiACRIAIEAEA1DLRi9Xg3Xff5QddiuMpejGrfi26ubkZe/bskXUkmOJsC3bmhLFWnK6sJNqvC03KEQEiQAQGEQFqmeihsaUtE3/9618h7rXBpoLedttt2LRpE3JycnqYS/9IzpyCc+fO4csvv3QqVF9fj7Y2tiCU/I9tfib3Y604bN2Nt956q9Nl1lKh0Wg6hYsBI0aMQHx8vHiK6OhovospJFcUdZaSDogAESAC/ZcADcAMom2GDRvmlCbuv7FixQpn2EA9YC0Gr732Gj/2IxhlYC01rCViypQp+OSTT/iWCalc1lLB/rr6Y3LZfifkVHSVHMUnAkSACPSMALVM9IwfpC0TbMpjVFQUxKmgnmMoepjVdUnOHIm0tLSg5V1UVITMzEynPNaCwxwvby0YzohdODh27BimTZvWhRQUlQgQASJABHpCgJyJntAD3JwJcfXL+fPnw2w24+jRowN6BofoFPUQER5//HH88Ic/REpKitdBliwv5rgcOXKkxy0grJtkoLPvKXNKTwSIABHoSwLkTPSQtrRlgjkT4pd8KHwdM6fo4MGDboRYV8IPfvAD+NsdlSUaO3Zst50pNj6DrT/h68euNzY28oM7PfXcsWMHVq5c6Ss5XSMCRIAIEIEgESBnoocgRWeCfX2/+uqr/FRQtVqNAwcO9FDy9U8ulk3UpD9327CFwaRdJczpkVuNVCwL/ScCRIAIEIHgERgcU0PtFtQU6ZCsUPDdEgpFGnQFf0SN5WrQSN5666387AQ2cDAUXmJsLIPnz9cMC8+4fX0+b948tyzZImL0IwJEgAgQgb4hMAiciatoObAJcwuBpQYzbBwHm/nXGHN0Pea+cgztQeI8ZMgQfiAh+yIOhb0mLly40IlMf54lMXr0aDd9uzMbxE0AnRABIkAEiEDABEJ/aqi9EaVvfIiEJX/EkkSVY5Uu1TSsfvZpfKg5AsOzGqQEYbfJ1tZWfjojW8kxFH5smitzjAbKb6DpO1C4kp5EgAgQgUAIhP6YifZK6OKzgb0fYnPKKBcTb+GuGAEdSccV0KC/gJBRJCJABIgAEQgxAiHfzWFvbcJpizermXG66QLs3i53MXzRokVdTEHRiQARIAJEgAgMfAIh3s1hh7W5AbUAJgVoK2lLQ4BJnNHY8tn0IwJEgAgQASIQygTENZWkZQz5lglpYemYCBABIkAEiAARCD6BEG+ZUCI8KgYJKAuYnJzH5Sux2JLR1XS+ZA60a8TAtRIq1QOAGBAD9gyjejC4GIR8y4RyzDhMUnl7Pasxadwo2ofdGx4KJwJEgAgQASIQAIGQdyYQrkZcQlungZaOgZnRiIsKDwATRSECRIAIEAEiQAS8EQh9Z0IZjbTls1G7IReF9Y4lquyW49i+aRtqs1fg0dih3thQOBEgAkSACBABIhAAgdB3JnAjIlOfxN6No1A84RZ+Oe0w9QqcTvhPHHpqOiICgERRiAARIAJEgAgQAe8EQn/RKu9lD8oVGnxIgw9ZRaJ6QAyoHjgeqXQvDM57YRC0TATFZyAhRIAIEAEiQASIgBcC5Ex4AUPBRIAIEAEiQASIQGAEyJkIjBPFIgJEgAgQASJABLwQIGfCCxgKJgJEgAgQASJABAIjQM5EYJwoFhEgAkSACBABIuCFADkTXsBQMBEgAkSACBABIhAYAZoaGhgnikUEiAARIAJEgAh4IUAtE17AUDARIAJEgAgQASIQGAFyJgLjRLGIABEgAkSACBABLwTImfACxl+w3VKNIl0av/IhW/FNkaxDwcEaWOz+UobOdbupAGms7J5/aQUwhToHazXykqdBV3nBw6BXYakphi5ZLXBRI1m3GwdrLAg5JF4ZfANTwcLO9UKhRlpB/cDnYDWhskCHZGe9T4A2rxQmq9TCIV4PAmIQ4vUA7TCVb4NWLTwD1VrklZtgdXsihHg9kJSVnAkJjIAP7edwYMMvUYjFMJivgOOuwLz5Thz9xXK8UuX5cglY6gCLaIe1uQG1qfkw2jhwnOSvNAuxoVyzrGdQ9MJL+J+qK51sZm/5IzbM3QssPQAz42KrweYxx/CLuTtQ1S592XRKOrACfDAArGg2tiA1vw42ab3gzCjNiseArhr2c9CvzsDio3diM3/vc7CZX8ek2rXQrD6AFsHEIV0PAmQQ0vUAV9Giz4HmxfOYV3UJHGdDR9U8nH/x3zE3r9rpUIR0PfB8YnH06zIBmzGfS8UCLt/4tSTt15wxfwGnyq7gLklCQ/fwPFeRnTiIyssseYUzG/Zw2ZnbuZOGN7lUJHLZFeclJnbUAaTmc0abJNhWx+WnPuARV3J9QB36Y8Bx3KUKLlvlyWZAFdKrso57v3PZ3MNDux64l9WFqlN4CNcD+Tou2F21nqu4xB4AoV0PXJZ3HA3ojwRPx6hvzoUvclUMxo25UZLljRgzLgYoPgJDKH2BSkrodmi/gKbTbUiIUyPc7ULonthNe7F0bSPSXl6BpOFhMgVlX+SNUE0ahzHSO0s5CuMmXUFx6adol0k1kIL8MwDsrU04bYlGXFTo1QxlbBZKOQM2p4ySMZsZp5suwM63zIRuPQiMQWjXA0SkYLPZWz0Qq0boPw/EkrL/0keeNJyOvRK4itamBli8Xbc0oKn1qreroRNuNcNYexPG/GMffirtM9SH7rgRpfphFB56DikqqRMpMSnvYJklAe6HltNNaB3gPR1+GbBXKev+Ut2Ef+iXQy2MK1Br86APxXEjbiaejsemj4NyENQDt2K7nQgMBl09uApLdT42bahD1s7l0EQogUFWD8iZcLsRAjlxeJuBxAzlOI6vTzUipzyOt83CeAnTekSf/A0WbXX1GYYUg/DboQr3ccvwDpZXNzM0UPhjAMHZjovGFO1umPkxEzaYno3GybW/xNaattDgIC0FG0O1eRtqs36MtJihwGCoB9Lys2NPBoOoHjgGog+BeupKlM9ageX3qxxf6YOsHvh4MnrWFjonAi4CjqbOUryYEulq3gqPxYNp98C4Lg/7Td+4ItPRICIwFLFZ+8F99BtJC44S4bE/QtqUL7AuRx9iM33aUV/4PFY2Poq9Gx9G5KB8osoxGDz1wPEsZIOtm7E38n1MTVwDfcsgaJ32eKoNyqrvwaCLp+GIiovuYprBEl2J8KgYJKARxmb3CVKDgkC4GnEJqkFR1K4XUrhvahvQ7DaFsuuS+k+KdtQXPI2UDcDG3z3tcp4GVT3wwsCrkUKxHgiFVUYi5RkdsqHHG6WNsA+qekBjJrxWee8XHAMtvb4yOg3M9C6JroQYAX6gpdproToNzPQaky70ewJ2C6q3rXI4EpXbkBUf4VJ5sNQDXwxcNAbhkQW1RjOsg6UeCBamlokuV3Xh67vTQEuhrzghBlG++tW7nF9/TCAsRqPOQaXbzBVx8F0q0pJG9kfFe1knx1dXp4GWg2nmi70eBWlqqHWVHjNXhJHtSx5EEhucNoB/dks5cmYmYur7kdhZ5eFI8OUK/Xrgl0GI1wPHOIkkmUXrWAVIxJK0exCB0K8Hbrex51xROg+AgK2JK8mayKkyC7m6Djaf+ApnPrmTywzRufWyRDpOcrmaRC4zv5brECN01HL5mRouq6SJky6zIF4Opf+d5tQLhbM1l3BZqokuLjYzd3JrJqdyzj0PHQryDGxch2Erp1Flcfl14oorNq6jrpDLHP8EV9J8ZWAD4Ou9ioPKd1lCuh4ExCDE6wH3FWfInSN5B3AcZ2vmKtanuoWFdD3wuJPZyoX06zIBG9dhrODys1M5AI4/VSaXW2LgzKH+FpWwspkNXEluJqcSGWiyufwKo8u5kMQNtUP5Fykr5SXOWJHPZWtUzrqhyszlSgzmkHOwvDNgC1uVcLmZEwUGKk6Tnc9VGEXnYqDWBmERIrG+y/x3LVoXqvWgKwxCtR4I9ddm5gwluVymSngHIJXLzq/gjPwHpljHQ7UeiOVz/actyN3aaeiECBABIkAEiAAR6CqBgd152dXSUnwiQASIABEgAkQg6ATImQg6UhJIBIgAESACRGBwESBnYnDZm0pLBIgAESACRCDoBMiZCDpSEkgEiAARIAJEYHARIGdicNmbSksEiAARIAJEIOgEyJkIOlISSASIABEgAkRgcBEgZ2Jw2ZtKSwSIABEgAkQg6ATImQg6UhJIBIgAESACRGBwESBnYnDZm0pLBIgAESACRCDoBMiZCDpSEkgEiAARIAJEYHARIGdicNmbSksEiAARIAJEIOgEyJkIOlISSASIABEgAg4C7TDpc5CsUEChSINOXw8roQlJAuRMhKRZqVBEgAgQgetPwG56D6tWtmNV8xXYmpfjwspXUGa5dv0VIw2CTuCGoEskgUSACBABIkAEAChjs1BqzgJgh7W+A9eGjcSIm+kbNhQrB1k1FK3a78t0FZaa/8V7eVqo+eZP1gSqgFqbh/cqTW7NoHZTAdIUC1Fg+qbfl4oUtMNqKkVezjsw2YNBox2m8leRU1QPh7hvYCpYCIU6B5XtQckgICX5OphWEKQyBZRlDyMJnALS2Y72yhyoe3SPWVGTl8zfw+w+dv0lI6+GdWqw6zMxfMJ6fL4wGRPC6bXTQwP3y+Rk1X5plhBWym5B9bafIXHuPjRFP4kaGweOY3+XULU4DIcWazA3r9rNoQhhGiFWtIuozn8W62qC5Pi1G5CvfRk1NhHTUMRm7QdnfhEpEX316LLD2tyE7zz2AGL6KkuxuAPmfzgS134k3Mfi/cz+f4S1ieEAhOu2E1j15W/xzIEvBkzJSNHACdDtETgritljAlfRcmAT5q/5J9Yc2o616YlQOWtgBGJnrcauQ+uAdc/j9Zq2HudGAohAzwlchKH0H0ifPg7OqtpzoYNGglurjvJmjBh1K8aMuGnQlH8wFZTuj8Fk7etdVnsjSt/QA9lr8PPEETLaKBH+/R8j70AW7sbXQtO2NNoFVOqSOjdzt1dCp1ZAratEuxjdbkFNkU4YRc66ULah3OS86ujDNVWiQJcmNMuqkawrQKVbnHaYKgugS1b7iMO6bIolcdKgK6iEyeqvGd4jnVqLvHJpFw/rMvCln6t5endlFYqc5UiANq/UI39/eQF2S7VEhieLQPJitpmNmVtqgLJliAtLgq7yH0ITehp0u1+GVs2awFn4BQBMJz3ytAmuZvFkHQrEbi5m0/iZ2GKxoGzZBITxXRuXZbo5PG3kyV+oM2m7UFktsVMn3mLF8fjf/ilK/zYF02OGelxgpyKX/0CeXlqWNOiKqmFpN6Hc2ZWXAO2247Dw1aK76QQVrCZUFrjqtkLKTUZLtyB2X+jzBFuw+2IrPjjVIoki8noZ+tJtzngsj6KaFrSzbizRZmottlVbZO5Tlzhl7KPY/thxaMKY7ZNRNGY9ntKMckWgo9AhwNGPCPQRAZsxn0tFIpddcT7gHB1pFnD5xq85jjvPVWQnclCt5you2VwyLlVw2SpwquwK7hILtTVxJVkTOWjWcyVGFnKJq8vP4lSqJ7iS5issAtdRV8hlqiZymVuPcWYmymbmTm7N5FSYw+UavnLEMWzlNKosLr+Ol8pxtmauYn0qh9R8zshnf4VrLnmCU6kyua0nzRwf1FHL5WdO5FRZJVyzREWXsuxISIdULrukjuuQ6JNV0sTZJOe+9LtUsZ5TAZJysmKUces14zlN7kmug8/UX16sWCVclpSFDK/A8hLs4+Rj48R0qsxCrq7DxtnMDVxDx7dcB89Wwo27wpkrfstpnPyZ2ZhdVVxqfp2DLfc1Z8xfILG/aFeXHJv5GLc1k9l+K2foYAYQdIKK02SXcEY+TCYvdwMJZ0z/57g5zvw9I7nK56promxwcNYLV30T7Sty6Vo6juPE+pW5kztpZnX5Cmc+uZPLVKkkNhc4Oe0g6v0VZ8idI6kvNq7DWMJla1Qc4HGPSXmJ9R7gVM58RfbiPSXmQf8HKwHWz0U/ItAHBMQHb+87E7JOi9uLyfGC6fzCl74MvT2QJajcZHqG+yinrY7LT1W5nB8+qTTvQPTzxlMqh/lEgeXlcpDEcgg68A5agHmJL27nS8x3OqfzJ2bJ6zre5Tx04uvhTPDXJ3KOF7QoxNMJEXjIOqBSR0WS3nnI0s7x4fx6KV8nvT3t0MN0TqdYVFSUJzoEXuour5dnvfRMK8fLM44jX9n7TFSJ/g86AtTNETqNTP28JFfR2tQASyctxSZf6ShwBRQBjUTvJAzAN2g49iHKEI24KDb4S/hFpGCz2YzSrHgoWdN1sRkJ074rGbPB4oUjKi4aqG1As/UGqO+9H5qy15B/4P9Qqa/y6Dqwo91wBMUWNSaNG+Xenx6uRlyCGcWln7q6XUQ9WON4w5+xrwxIiFPDpeEopGw2gCvNQqw1EP28daNIy2APMK8aqCaNwxi3p4FDjqX4CAxeZ0645yUpop9DR1nNm5PQWnkQer0eev1u6GamYFnZZT9pxcsi/wmYNvEOGf5ArdHsfSAvbyM/cewX0PS3yUhLGilmep3/s/EbZbAkTMZE1Y0SXZQIj4pBAhphbPa2JJTIy+O+gJhWIo4OiUA3CLg9PrqRnpIQgQAJ3Igx42Kg6hRbiYiUF2HmZ3Rw4Gx1yE/tHKtTsh4E2FubcLqzV+OSaGlAU+s1hCeuxiFjHqa2/REvZCQjbngYOvdP12DLzNGufn82NS5sApaV+crAlZXcUWD6XZVL2u0wy5aZuMVtWt9NiFv2brfl+U7I1hwoglZ9C+JmvoaTbcwxuh1pv9MjP9XPC94p2Jtz6owAy+kmtHrzuVzRvB4xp0//PQ2S/M4c8XxBexXpcaGL6Zhzc9rsIUN6asbppgtexjD45yWVhIQYRNEUTjckdOKbADkTvvnQ1aARUCJiynys0Xj/Yg9aVn4EKceMwyRf/ooqBuPGsC8/JcJjNUjP2oyPOA42swElc1qxYeYivMAPImQZLUC+8WuZaXEczJtTEOFHF7nLgesnl7o7YSqk5tfBJjp00v+9MQ3TbsL+1etR/lAJmm2l2Jz1KNLT5yFFfRnG2kCdMG/Oqav8nVtbXNf8H7EWrmp8L+2ebtnQv/xuxFCOwrhJah8JZVrJnLH983JGpQMi0A0C5Ex0Axol6SaB8En4f6vSgS1b8Wa3pn4Kzeo+sx+KmOmzkerZ5GuvR0Ga2tF9En4P0paoUXv8M2F0vSjQimZjI7x9lSlViUj/uRZLVOwL8CLCkx7EElUdjp/50v1r0FqNvOQYpBWIiy2J8h3/lTEP4LFOX+DCQkNs8aDWu7uln3suPc2rDTV5D/egu0lOGyHMaoaxFp26mewdbWDzPAL7KRHhlb8g360bKTCpzlj2JhzT396PujiYZiORlJYKVe0pnLFIW6bYWhgNqPXs2nMWhh2IvDy7QsS0bpHphAh0mQA5E11GRgm6T+BGRKa/iMr8O7A16TGPKZRsit8+5P10AZbVzkLu2ulQd6qdgqNgOYSi9z5z9Idb66HftBlbJB+0ypg06Nbfhi0v7EIl/9C9CkvVPhSXTUbui+mIVY7ElJ+uwqwPfoOc7eJ0vXbUF+iweMsYIY7wck/Ogd45XbQdpiNHUI10LE+LhjJiOp7cOQMfrPw1totT5Jg+LzyHdXgCLy6Mde/LF8Epo/GQbjnitmzGy5UtvCNit/wfCotPQZO7FgtjIwPQTxTm57/fvMZC82QOHvJgYdJvwdp1EFj4ycN5WersfQOr1cseDBEOZ66seB+qhJei3XIc23N+gwKJHcGPaxjmkH7Zik6zbSOS8NONUzz4n0HBqtXYErfOO3+nvj4OmMODcf2sqZ+17i3CxllHsTJnN6p5drRW1AQAABZOSURBVKzLqBirFhcijq87clNYhXLy9fUHKF6sQ0E9mybNph8fwKYXCmXGMvlgQ5eIgAyBTo9rmTgURASCSCAC8Vm7YTKux1SUYjkbh8D31d8CTdEXGDdvB4ymt7F2VqxkcKIrezZvfUdZFrAhAcNZurlvoyNjLd6UjrNQRiJlYyEMSy/jBfUQKBRDoH7hMpYadmMNv76FEuHxS7CrajtmtD4PNT8HPh6/ME7DXuM7WMvHGYrYpdthWDUSBzW3uHQ8OBKrDj2L+ZGsG8ThHFXtnYFWXSLCmD7DF+Dg6OUwvPMEEr32Od8IVcp6vGNYDNsL9/HpwtR5sC19B++smYJw1r3iVz8XE99H/vIClJHzsd2NxS3QsHI6efnOwXV1KGIe+hnWX92AuLBoZOxvgHPxSlckAKOgeeo1FE75M2by9lEg6pkTGKt9DSXZia6YvCO0BFfZOhM3Z2F/g+fKmqwubYM7/1/BOGM7jIdW++DvykL+iA1WrMLf0vvhqpfhE5G1qwR7Z3wOHc8uDMN/8Rlm7K3CobWs7vj6CfW1aCKOprA6HYbhyw24b9WTSPWVjK4RgQAIKNj8lQDiURQiQASIABEgAkSACMgSoJYJWSwUSASIABEgAkSACARKgJyJQElRPCJABIgAESACRECWADkTslgokAgQASJABIgAEQiUADkTgZKieESACBABIkAEiIAsAXImZLFQIBEgAkSACBABIhAoAXImAiVF8YgAESACRIAIEAFZAuRMyGKhQCJABIgAESACRCBQAuRMBEqK4hEBIkAEiAARIAKyBMiZkMVCgUSACBABIkAEiECgBMiZCJQUxSMCRIAIEAEiQARkCZAzIYuFAokAESACRIAIEIFACZAzESgpikcEiAARIAJEgAjIEiBnQhYLBRIBIkAEiAARIAKBEiBnIlBSFI8IEAEiQASIABGQJUDOhCwWCiQCRIAIEAEiQAQCJUDORKCkKB4RIAJEgAgQASIgS4CcCVksFEgEiAARIAJEgAgESoCciUBJUTwiQASIABEgAkRAlgA5E7JYKJAIEAEiQASIABEIlAA5E4GSonhEgAgQASJABIiALAFyJmSxUCARIAJEgAgQASIQKAFyJgIlRfGIABEgAkSACBABWQLkTMhioUAiQASIABEgAkQgUALkTARKiuIRASJABIgAESACsgTImZDFQoFEgAgQASJABIhAoATImQiUFMXr3wSsZ1Fjanfp6HnuutLzo96U3XPtSEKvE2iHqeYsrL2eD2VABAYOAXImBo6t/Gj6BfTaGCgUCigUK6C3XAPQDlNlAXTJaiFcAbU2D/oaC+x+pPWry9dqkBejQExeDVipOv3Y9UlpePXMJcclz/NOCQIIaK+ETr0QBaZvANjRXpkDdVoBTFeleVlRk5cMRUweamQVCyCfXosi1e0aLPoVPddTagfpsVwZLHpoFcnIq+nJK1daBrlMghnmuH+81jFnVkyneYh79RN0OMPowEHgAip105BWUO/7+eKv7vQYZzDqTaD1oWvKXqvJQ0y37gu553vX8u7t2Df0dgYkv28JjM81oH5tIm7AVbToc6BZ2YF1B2pgm6KCkjkX+pexPOlnaDTsxdrEEX2r3IDJzY52wxEUJ8xGVcxQABdgKD2KhMcyEaP814AphUvRG6BKfx1cuiuk149U6Sjq0wx7WqKxSC9qQF8i6qnG/S59+6coLY7EY1XjMPC/UvtbfWD61MM8byXUGf3O8rxCA9/m/ZNrP9DqS5w8+CEss+bhx7wjwVSKQOz8TCxJPYWt+0+B7xSwmlCep4Wab9FgLRfbUC50F3T2oqUev3Cc/BNo+ZYPteOLxG5BTZEOyU55u1BtucrzsFuOY5s2QWglSYA2rxQmq9BGwn/JxkCr/8Iru8u1f0SemF6tRV65CVb2lROfhHVnz2JPxp2I2ZSHTdLzvEr8hbUeJP8Kebo0Ie806PT1QjO18NXubM1h2V9Fa9M5JDz2AGLYHWK/gKbT4/DYD85jq5vsanzLol+ulTD0KJfdguptvvimQbf7ZWjVrEWJ8S9Adc17rtak5Bzoxe4bH7JY64nVpJekewb7ay8ILD1bJq7CUlPsiqvWYlu10FplNaGywGU/hUKNZF0xagQbdjbORZjKtzn0T9ahSGz1cmuZYLqVumyn8GAEH/r0GV/pl6iHPk5921GTNxdJ66qAPRlQx+ThL39xfGlqtcnO1j+FQmzREmjZ61GQNg260j8iL4bx3ORiL7WvTEuiQsqU/xjIEe4tlxxna4rP+uFpOV82kbu3P0O7W/0S7idJq5y9tQmnE2ZjOu+Asw8XH7ry6lhQoUuCgrX4SZpK7aYCpKlzUNluh91SjSLnfZsA7bbjsPBxfekvlvUaLlbkQO3NHpUXPORLn3/S+gAf8cS8hP98q4vLNnxLsZuNWbwLqC3/L8k9Lz5zRe7enlUeefWzU3Im+plBgqfOaEycMRkoP4jfs5euKFgZj6xSM8ybUxBhPwf96gykHo7GXvMVcLZm7I38EKmaHOhbHA6AmMzr/6pPccOqE7B1nMCOh6JgObAJc5f+DXMMX4HrOIk1n2/C1KV7YWqvxtZFWrwfuRVmGweu4w+YUbsWmtUH0MIeDvyXbAOK0sd6zcpS3oghT5TBxn0Fw5p/Yp22ENWXv4+19Qbkjh+PzJLP0fDsWjwrPV87Bd9hEqv+gMNha2G2XYG54gFUZyzAav052CF8tXOvI10lNNTZm3BsXxMmjRvFf2HZG/6MfbV3YVzUNPe8RNmWU6gb8nPU2GzoMGTh83XPIr/6IoA21Gz9Gaa+L/DlLqFyxhlo3fiWofiYCutN36LDsBVxe5Zh6twPEPe7ep5fLgqxMt+Adn+y2qvwgmYlqu8vcpTxudGo3nNGlqW95Y/YMFeH6jkH0CGwXDN1NQpNbTDt34CZxcPwHKsPHGO1HNiiQ84HjbJN12fX5WFv2EK83dyMivtPY+ncTTjgUXfsLQewWvNTHBZsbzNvReThnzpt710f1sUEoE/4SlC1H8MrTj42dNStBbb+FKv2m/H9tYdgyNUAmSUwN6xFkqNyofyGVWi2XULDyUKsUR3DvmNNTl6O+jMDaffdzgqDqi1/QthzH8NmY8xqkCHUB7vpPayauc9xjeNgM5dhPYqxNOcDNNhZV9vL0GTU4P6KZthsH+O5sD9hS5VFUDyQuuYqoz+b8DGl9/YDTdjkVr8icHhLmUsgvkHDsQ9RO2kcxij96Somux33paVCVfYhjjUIthblLHkQSeFf4MCGZVhaPRuGDnZ/ZOHzNQuwtLAe1/zUKUcON2DkfQ9iiTd7JNlR9covBfk2cB212IgCpK56z825YS//wOKJ5fJuY0eMMyivG4Unaq4Iz8hcaPl7XEjv9Vklyu+n/zn6hQiBz7mSzPHc+FwD961Yoo46riQ7lQPg+NNkc/klB7gK4yU+hs2Yz6UikcuuOC+m4LhLFVy2SsWl5tdxVwy53HhouFxDh3C9gzPkajiMz+UM3wrHqvVcxSWb47qtjstPVXHILOHMLokcx9m4SxXrOZU0Lsdx3/LyF3D5xq/dYnc6+dbA5Y4Hp8qu4Byai2kF3fjr47nMks8dSd3OZfTkznMV2YkcUvM5o6C6NE+ei1PXrzlj/gJX3v5kC7ryduBZevDlr0v5Sq4LaV3llPD+J7OLJC5T2CmrlmsuWc7BqTO7KJSRt9W3nJld548d5QGWcyVmZ02RFt/9WFoemWOXrpxb3bGZS7hMvu6c5/m56ybUBzDbf+W4LquPjO2kOgST77eS+4fXfSKXVdLEda4egk5CHXfUYaldvuIMuXMktpDUH0F3r8zcyXMcJ7G/oF/ntHDc835YuJdDqANu9UVqk/OO+9x5Xag/znPP+sVucXbvPyA8SxwsveoqtWHHSS5Xo3LdXxI5jueT5L528glQf76++7AHJ+iZVcI1uwPiOOGa43nqK55TKceBHxs7nqnS+iK1sUx9F+9j/lkl2EH2XvHQ4zqcUstEP3XygqJWeDzSN5eCs5lhOFCCkiVAccZ8zIxbgJzKFlzruIiziEZcVLgru4i7MXXWMJy9+C/nl5XroszRsJG4ZZhQjez/wsWzFoxPuAuj3aJext9PnYDF8hJm3hLmbA7+TtI6nMV5XOwIbPTisNG3YJib3C6czErChAixuocjKi4aOHsRHXyTqVSO8IXFvoxYfL6VogVL0u5BhDSa9FjKQBJ+7e+nUGKpwZaZo51lVnyHdclYJHyHY/QtbFyG6ydXzm9NvmT9A180GoGEGESFi2UcgQlTk1xCnUfX0HHxPDA+BneNlhsyxZqPq6DX66HX74Zu1lysO+tM7HEwHrOm3u3iEq5GXALDKq07Qn5uuikRMSEJs3jbf+NHHwB9wNetYHdMhXa9GgUZ4xCmSIOu4D0cFLtv3CKKJ1IbjsD3H0lHqqUMpYaLMvXHDzPWzcSzfw8FugxHlwrL5to/0Hj8MhLi1HDerfy9Op5XIrC6JurrzybC/ejk/g3MfuqXs/UlaaRfXUUt+P/h9+CRJdNhKT4CA+vW4FsBZyAtaSTs/PNpLBLuutUtCRCg/nwqX/a4A/drlyCuIANRYaxrYjf0B2uEbhRploHGE9P4sTGk9UVMI/kf8LNKkqYfHIpPnn6gCqnQawSUKiTOS0d61mZ8ZGtCSZYZL/38DzjFd/j3Wq6dBY/PheFbDhwn/fsIaxOdj8fOafo8xIpm42WX82A1w3jW8XDrnioa5Bo6PMrMoYEfJNtVid5kCV05XRXXKT4btPskYuNW4WAja3a+HWm7ipDreF91it0/ArwxYYOQu/lTRiLlxVLYzAYcKNFi9NH/xPykRMzMq3Z1F/oQrYx5AI+lmlFc+inaJC9HH0n4S/YWPZbFxmHxQdalpMSItBdRwbpUAv71AouA8rbD2tyAs6IDHlAaMdJQxEyfLThfLY6ukm7JEeV1/u/dHjdClfIbfMR/bO3EE6OPYeX8JKhnbkON1SYR5Ctep68RSbrBdUjORKjam5/aKAyKlJZRGYn750zjQ5QRIzEejTA2O0dUAO1/x8nyyxg/8maZEdnf4NJ5HxPilDdj5HgVztaew3lpnhiGuyffD9XZanzCv6TcLvbNSbkBde3ijc8chkZgWjTUnm8cfkT6MKG1RpjVMV76xR+4ujfcPRkZKiPKP2kOrJXHh+jvxPqSNRTq6DigtgHN4oBWtKHupEFG4g0YPnI0cLYB5857tAjZG1H6hh7DcguRv3YR0tPnISUqDOcvy4jhg86i/OTfHQN52TlzvGqHYVr07ZIXuZCfm252tNcZUI7RGDl8qHd9vGUrhAeTr1xWSlUi5qUvwtqiEzDkxqHq9T/B6IFMLh2U0Uhbng5seQGrNxWj1u3l6I3ZcDSV/jcKhuXiUP5aPJqejvSUuwDxfuPvLaDWaHY5NPy96mg26hoLfzbxvCnk4kvr10V+ttN4sdXEj66ezJQxM7E86wq2vPAMNhW7WgGVw9nz6QvUnvvKI4mcPtI65aG/T3sAED62Hl1bhM8NuRhf9T4+MspU+kDjwZuNpfeFR5Gkp4E+q6Rp+sExORP9wAi9okLEZCxcMxllG17CVucATNaE/T5e2XEEmhU/wnfjxZt4FyrZaH17Cypf3owtSMfytGjcKLwMD5ecgMV+FZbqfSgqrvGurnDTqvYU4Pc1bQ55OWlQqDfAEDcXazTHsGHTPtSzF5448lwYte1daKBXLqO1Tdq87nFuOYSifKEclbvwwhYgW/sjqNzEu6aEOkakOx6Szlkdzrgesp3hHgdOG+SisJ7NnWEMd0GrToKuUpxp4ZHG26lPWW1QPbgQ2SjECy9X+LHVUMSk/RhZqvex4/enYGU6Vf4nkhVJ0FV8yed+ufYMGpiNrPXQb9qMLeIYPxndLMW/x3usbM66sxDaByMlMYX8nLox01fg5RcKgawfIy1mhHd9Kt1dUolQx6FPJl3kKxHOzyZQJEBbcMbx4rY24ZPaC1BlTMbd4nuqtU2mi0wUciMiH0zHElUV9uzpcLVyCZctxUXIZ7Nn3JhFOa5ersMnDayusNkQW/HCFuF+U8biUd1SYMtmvFzZAju7f/KLUCzapkss/NnEvdsNGIrYR1d4r1/ilNDpwpRQf7qKmMT/yrF48Cdzoap6B3uMrlZAh5NxE/bseA81Vjazoxw5yWqodX/GaFaHvdYpT/292IOfZaOGWlvkeCahHQ2f1OGy6n5MvlvSoRpoPLE8bJitrI2l94UksudhQM8qz0TX/5ycietvg17SYAQS1+yGYWcCarVxGM5P1QzDcM1BjF61D++smYJw5V1I316CsjmNWKweAkVYFBa3zEZZ1YtIj7wRiJiOpw48izsLU6EOG4LEXVcxd80iH/reiMj5z+JQ4fdwOOlWXt7ME4koqXoGKZFTseKNt7EGeZgwPAyKMDXmn56EInaNjU0IYGqo14xvuBsP5zyE2mUTEKbVw+J2vh/nWELVPRjT/DxfDvXiRswpewfPpYxindGOBZ34qaH/ENaTEKaEej4kmRw52V4VG4HEFVtRtuYaNky4BQrFEKjnVyOhSMzba0KZC35kRWjwXNXbmNOyxlFGXR3GzJooIwdQRj6MjYc2Y8rh+RjOdJr5Z0wp2YvnZv0QC3fsxJLP1ztsNHw1TsYtRm7mRJwt/wSNYsOOU6oKmiXRMP4iXlJ3BHs647D85mO7UzcFwtRr0DLnbVRtn49IpQ99UtxH3khECod+mHROEFCIMvZR7CjLAjYkOO6b4akoHpONQ09NRwSGIe7hpcisXYa4sBUoOXdFXmbEPUhbkgioUvn+f2kk1axRaNYlIsx5vzFmwxC78HmULGnGMr6uxGP5yX/DE7mZQoveVUSkPIOqkkScmBmFsLBE6FpjsUQjusP+WAiLHrH7g32M+7GJVF/+mK9fOzHlhFaoX41IWJLK3z8XP3asyeJwwFlspR9dPaUrEZHEZl0AKmkrjvIuzN+Yj8IpHyJpeBjC1FqcmLITVc9pcGuX9ZexhzIWC3dInkmKWzCheBReOrQKmogwl5I+49klzw9Xs5W8jQN83Xp9VrlU6pdH12HQJ2XZKwQko9F7Rf5AFSodLT1Qy0B6DzwCklkcovLSWQxiWE/+8/IcM4M6TUboidyA0gr3lZcZUZ1E+NNVMoujU9qgBMjYIyhyPYT0yMb+nlU0m6NfOlGkFBEgAkSg1whYP8X7xd/BxmUPuGa79CgztlR1EhTJbHAgayJqR/2e17D17HQ8JnYv9Ei+r8TCcvKKh5HHui/ZAmn1JXh1qxGp4sJubsm7qqsd1r9+gGIswzINay3shV/Q7dELOg5wkQG2uwzwUg4i9c+uS8J33FZzHESFp6ISgetO4BuYChZCMXw+Dt+/FA/xq0EGQ6lR0Dz1mrPJXyE2yRu2Y2ms5xiBYOQnlaFEhGaVq/tSEYbhE97BmJcOoHBpvMxA7S7oyo9HiMLwpA9xvy7NseKsNOseH/eWPXqsWBcFsG6qeKgz3uhiur6LrmCNNH2XHeVEBIgAESACRIAIhBoBapkINYtSeYgAESACRIAI9DEBcib6GDhlRwSIABEgAkQg1AiQMxFqFqXyEAEiQASIABHoYwL/H/rSdJGloTF4AAAAAElFTkSuQmCC"></p>
<p> </p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Estimate the <em>K</em><sub>m</sub> values of the two enzymes.</p>
<p><img src="data:image/png;base64,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"></p>
<p>(ii) Suggest, with a reason, which enzyme will be more responsive to changes in the concentration of glucose in the blood.</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) Outline what is meant by product inhibition as it applies to hexokinase.</p>
<p>(ii) Product inhibition of hexokinase does not affect its <em>K</em><sub>m</sub> value. Using this information, deduce the type of binding site that the inhibitor attaches to.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Analysis of amino acid and protein concentration is a key area of biological research.</p>
<p>The titration curve of aqueous glycine zwitterions with aqueous sodium hydroxide is shown from pH 6.0 to 13.0. Refer to section 33 of the data booklet.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the pH range in which glycine is an effective buffer in basic solution.</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>Enzymes are biological catalysts.</p>
<p>The data shows the effect of substrate concentration, [S], on the rate, <em>v</em>, of an enzyme-catalysed reaction.</p>
<p style="text-align: center;"><img 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"></p>
<p>Determine the value of the Michaelis constant (<em>K</em><sub>m</sub>) from the data. A graph is not required.</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 the action of a non-competitive inhibitor on the enzyme-catalysed reaction.</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>The sequence of nitrogenous bases in DNA determines hereditary characteristics.</p>
<p>Calculate the mole percentages of cytosine, guanine and thymine in a double helical DNA structure if it contains 17% adenine by mole.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAxIAAAGCCAYAAAB0PfWhAAAgAElEQVR4Ae3dD2xd5Zkn4Pc4FdOdMQEhuopv6BYhJklHTReabEYzoCEJNC7TpUXpNsyWetImWrIzQLONCl5CaTVDJ53QlCr0HzMonrKhVSkQwTAs44TedXdgupsmVVtQm1ioYrRgZ7RRxRpvS7PNvatrX/zZybXzubaT2PdBCn597nv+Pef45vxyvnNdVKvVaviPAAECBAgQIECAAAECkxB4U623KIpJzKKVAAECBAgQIECAAIFmFBh9D2IoSNQm1MLE6BeaEcY+EyBAgAABAgQIECBwskCjrNBycpspBAgQIECAAAECBAgQmFhAkJjYx6sECBAgQIAAAQIECDQQECQaoJhEgAABAgQIECBAgMDEAoLExD5eJUCAAAECBAgQIECggYAg0QDFJAIECBAgQIAAAQIEJhYQJCb28SoBAgQIECBAgAABAg0EBIkGKCYRIECAAAECBAgQIDCxgCAxsY9XCRAgQIAAAQIECBBoICBINEAxiQABAgQIECBAgACBiQUEiYl9vEqAAAECBAgQIECAQAMBQaIBikkECBAgQIAAAQIECEwsIEhM7ONVAgQIECBAgAABAgQaCAgSDVBMIkCAAAECBAgQIEBgYgFBYmIfrxIgQIAAAQIECBAg0EBAkGiAYhIBAgQIECBAgAABAhMLCBIT+3iVAAECBAgQIECAAIEGAoJEAxSTCBAgQIAAAQIECBCYWECQmNjHqwQIECBAgAABAgQINBAQJBqgmESAAAECBAgQIECAwMQCcyBIVGKwtyce3bE+SkURxdCfpbF+x8NR7h2YeO9PenUgevfdF1sfPBSVk16bwoTKoehqL0WpsxyT3aIprNWsBAgQIECAAAECBGZMYJYHiYHo3fPJuG7xZ+N7b7k5Dh6vRrVajeprj8WH47/Ghxd/KHYcfDUfb+BA7Fr/l3HweP4sWZ0tS2JDd1/0bV8d87Nm0ESAAAECBAgQIEDg7BaYxUGiEoMHd8WmDzwZlzz21/HZ9Sui7Y29aV0U7/7EznjycxG3XXdPlAem9f7C2X1EbR0BAgQIECBAgACB0yDwxqX3aVjVdK/iZ7H/W1+PnjUfj87r3xYn78j5cfmNfxaPf2lNXBT/FHs2Lm0wtKgSA+WtUSptjfL/2hedS66Oe/r7Y+/Gt8e82rShAFIbOlWOrs72+rCpUqzq7Dph2NRA9Ja7onNVqXHPmKFN9XUW6+KBck88OLLc2nCs7ugdHB16jkX/wd2jltsenV3lMT2V3q5oL0rR3jXNw7Gm+3BZHgECBAgQIECAwJwSOPn6e7bs3sCPonv3wWi77OJYMM5etLQti/evXRmL5r8trrnxuojde+KZV46N2sOfxYHuvREd18Tyt747th/6dtze1hZrdv0kjvdti9XzIwYP7Y6bV26O7yz4VPTVhk4dPxjbF3xn1LCp+p2RDz8Xi796aHho1fHvxV3zHo6rb300ekfnglFrjngkbrp7b5y78ZGheY733RsLn7o5Nt1/IAaH+o7FK3u2xLLrnokF2w/G8aEhW5+Pxd/ZHCs3Px6v1JfbsmhDdFf7onvDkgZhaswKfUOAAAECBAgQIEBg2gTGuQSftuXP2IIqR16KH/S3xdLFpWg95VpaYv6K62PL4r+Pv+r+aXqQeiiMRHS0v3OcZxd+Fvv/5oux79o/i22brxgeOtXSFis+/vl46PYjcdvWPdFbORZ9P/xu9Cy9Iq5cVH8ComVhrN7WHdXuDbFoXOFlcftdW2JtfZ6WtsvjmhXnR8++F6KvFhIGno37btkTSz9zR2xe0TYcElrfERu+uDM6nt4W9/UcPeVeayBAgAABAgQIECAwUwLjXubO1ArP2HJb3xnv63hX7H34H+PFoX/Nr8TAgWdid6yJ9uUXNN6soaDRF0uv+J30/MVQZ2tctPiSiOdfjJcH3xSlf/17sXLvV2LX4/8Q5T09Y4YeNV5wo6mjl/mr4W3rL8VlF1849k5DaykWL+2L3d0/8glQjRhNI0CAAAECBAgQOC0CszZItCy4OC5r64/nD/fVhwKdyuvNcWn7H8WG578Su4b+Nb82rOk7sXjL9bFifmOG4bseEyy3/8V46civonXZ5njy8I743Vf/Lu7+wKpYfO68KFZ1Rle5N3PbxlvHwbjn6rfUn7uof7TtvLfHxr39481gOgECBAgQIECAAIHTItD4Cvq0rHqKK5n/zmjvWBb9P3gpjoz7HELtYeXukQejWxb+QdzYEcP/mj90t2FhdLzvneMOjRoOKxNsZ9ulcfGCcyKiJVoXrYy1G7bHf6tW43jfgXjsvUfik1d/KO4uT2UI0gdj1+FfDD93UXtGYtQfHyU7wXHxEgECBAgQIECAwIwLzN4gERfEinU3xsq9X4jtj/9Teu5hhGwgDnX9SSy77sl49bfeXJ86PM/i3d+Khx/+29i99D1x5aVvvDYyYyqGwkopnn/ux9E/JqwMxsuHfxqx9NK4qPVkwtpD3mtvWh8dbX3xg5eONti2tIrGVUvMX35NdLT9JJ574Z/Hzj+4P3asutSnNDWGM5UAAQIECBAgQOA0CZx8FXyaVjz11bRE67KN8dVdK+LpD9wUdzy4P13sD/bGvh23xuqNL8dHHrojrl9Yu2tQ+68lWi+/NjqW/m3cdNO3YukNvx+XjhYYev7gN4dbfz4Yg5ULYsVHb413P/3p2LrzufryawGlMz58z4L43La1sajl9ejtWhfFqq2xZ+Q3aQ9E7zPPxP5YG5vaLxn7jMPw0k/9//lXxse+dFU8fcunYuf+/uEwMXgo9tx9V9wWN8e2dYt+veWees06CBAgQIAAAQIECJxSYPRl9Cmbz76G+bFkw1fj4IFbY/GP74rSvPpzBOd+IB6KP4yHDj8S21YvHHvB3XJJtG9aG21xZdxw5cUnvXZtZ0ccq/0eid/aEN968Vi0LumIL/fsjKuO/Hl9+UviTw5fEQ8d/kZ8Ytn5EfHmWPSRnXHg1gviiZXn1Z9nOC9WPnFB3PrknaNCzGT1zomFa7dFz0NXxZHOZTGvKKI494PxxFs2xYFv3BzL6ndC/B6JybrqJ0CAAAECBAgQmA6BolobeB8xdAFcL6djuWfxMmp3EP44Vj73R/G9B9bGwlkepc5iaJtGgAABAgQIECAwRwSKohh6Xnf07jTdZXSl/x/ia7v/X2z509VCxOgzQU2AAAECBAgQIEBgEgLNEyQqh6KrvRTzSjvi+K2fjf84NCxpElJaCRAgQIAAAQIECBAYEWjCoU0j+64gQIAAAQIECBAgQCBDwNCmDCQtBAgQIECAAAECBAicWqB5hjad2kIHAQIECBAgQIAAAQKZAoJEJpQ2AgQIECBAgAABAgSSgCCRLFQECBAgQIAAAQIECGQKCBKZUNoIECBAgAABAgQIEEgCgkSyUBEgQIAAAQIECBAgkCkgSGRCaSNAgAABAgQIECBAIAkIEslCRYAAAQIECBAgQIBApoAgkQmljQABAgQIECBAgACBJCBIJAsVAQIECBAgQIAAAQKZAoJEJpQ2AgQIECBAgAABAgSSgCCRLFQECBAgQIAAAQIECGQKCBKZUNoIECBAgAABAgQIEEgCgkSyUBEgQIAAAQIECBAgkCkgSGRCaSNAgAABAgQIECBAIAkIEslCRYAAAQIECBAgQIBApoAgkQmljQABAgQIECBAgACBJCBIJAsVAQIECBAgQIAAAQKZAoJEJpQ2AgQIECBAgAABAgSSgCCRLFQECBAgQIAAAQIECGQKCBKZUNoIECBAgAABAgQIEEgCgkSyUBEgQIAAAQIECBAgkCkgSGRCaSNAgAABAgQIECBAIAkIEslCRYAAAQIECBAgQIBApoAgkQmljQABAgQIECBAgACBJCBIJAsVAQIECBAgQIAAAQKZAoJEJpQ2AgQIECBAgAABAgSSgCCRLFQECBAgQIAAAQIECGQKCBKZUNoIECBAgAABAgQIEEgCgkSyUBEgQIAAAQIECBAgkCkgSGRCaSNAgAABAgQIECBAIAkIEslCRYAAAQIECBAgQIBApoAgkQmljQABAgQIECBAgACBJCBIJAsVAQIECBAgQIAAAQKZAoJEJpQ2AgQIECBAgAABAgSSgCCRLFQECBAgQIAAAQIECGQKzJkgUentivaiiFJnOQbG2/nKoehqL0VR2hrlgco4Xa9Hb9e6KIrl0Vk+Ok5PxFxfX7CKCOdC7Qdgrp/r9q92kM/G90bn3tBfQGflsfHe6L2xfnnk/Bz+MZ22a9C66yz6UlSr1Wpte4uiiHo5izbfphIgQIAAAQIECBAgMNMCjbLCnLkjMdN4lk+AAAECBAgQIECAQBIQJJKFigABAgQIECBAgACBTAFBIhNKGwECBAgQIECAAAECSUCQSBYqAgQIECBAgAABAgQyBQSJTChtBAgQIECAAAECBAgkAUEiWagIECBAgAABAgQIEMgUECQyobQRIECAAAECBAgQIJAEBIlkoSJAgAABAgQIECBAIFNAkMiE0kaAAAECBAgQIECAQBIQJJKFigABAgQIECBAgACBTAFBIhNKGwECBAgQIECAAAECSUCQSBYqAgQIECBAgAABAgQyBQSJTChtBAgQIECAAAECBAgkAUEiWagIECBAgAABAgQIEMgUECQyobQRIECAAAECBAgQIJAEBIlkoSJAgAABAgQIECBAIFNAkMiE0kaAAAECBAgQIECAQBIQJJKFigABAgQIECBAgACBTAFBIhNKGwECBAgQIECAAAECSUCQSBYqAgQIECBAgAABAgQyBQSJTChtBAgQIECAAAECBAgkAUEiWagIECBAgAABAgQIEMgUECQyobQRIECAAAECBAgQIJAEBIlkoSJAgAABAgQIECBAIFNAkMiE0kaAAAECBAgQIECAQBIQJJKFigABAgQIECBAgACBTAFBIhNKGwECBAgQIECAAAECSUCQSBYqAgQIECBAgAABAgQyBQSJTChtBAgQIECAAAECBAgkgTkTJCq9XdFeFFHqLMdA2r+xVeVQdLWXoihtjfJAZexrI9+9Hr1d66Iolkdn+ejI1BOLub6+YBURzoXaeT/Xz3X7VzvIZ+N7o3Nv6O+ds/LYeG/03li/KnJ+Dv+YTts1aN11Fn0pqtVqtba9RVFEvZxFm29TCRAgQIAAAQIECBCYaYFGWWHO3JGYaTzLJ0CAAAECBAgQIEAgCQgSyUJFgAABAgQIECBAgECmgCCRCaWNAAECBAgQIECAAIEkIEgkCxUBAgQIECBAgAABApkCgkQmlDYCBAgQIECAAAECBJKAIJEsVAQIECBAgAABAgQIZAoIEplQ2ggQIECAAAECBAgQSAKCRLJQESBAgAABAgQIECCQKSBIZEJpI0CAAAECBAgQIEAgCQgSyUJFgAABAgQIECBAgECmgCCRCaWNAAECBAgQIECAAIEkIEgkCxUBAgQIECBAgAABApkCgkQmlDYCBAgQIECAAAECBJKAIJEsVAQIECBAgAABAgQIZAoIEplQ2ggQIECAAAECBAgQSAKCRLJQESBAgAABAgQIECCQKSBIZEJpI0CAAAECBAgQIEAgCQgSyUJFgAABAgQIECBAgECmgCCRCaWNAAECBAgQIECAAIEkIEgkCxUBAgQIECBAgAABApkCgkQmlDYCBAgQIECAAAECBJKAIJEsVAQIECBAgAABAgQIZAoIEplQ2ggQIECAAAECBAgQSAKCRLJQESBAgAABAgQIECCQKSBIZEJpI0CAAAECBAgQIEAgCQgSyUJFgAABAgQIECBAgECmgCCRCaWNAAECBAgQIECAAIEkIEgkCxUBAgQIECBAgAABApkCgkQmlDYCBAgQIECAAAECBJKAIJEsVAQIECBAgAABAgQIZAoIEplQ2ggQIECAAAECBAgQSAKCRLJQESBAgAABAgQIECCQKSBIZEJpI0CAAAECBAgQIEAgCQgSyUJFgAABAgQIECBAgECmgCCRCaWNAAECBAgQIECAAIEkIEgkCxUBAgQIECBAgAABApkCgkQmlDYCBAgQIECAAAECBJKAIJEsVAQIECBAgAABAgQIZArMiSBR6T8YTzy6I9aXiiiK+p/S+tjxaE/0DlYyKWagrXIoutpLUeosx8AMLN4iCRAgQIAAAQIECJwpgVkeJI5F//4vx0eXfST2vHRJfOzgL6NarUa1ejxe6/lQxJO3xuLrdsbBMxUmWpbEhu6+6Nu+OuafqSNsvQQIECBAgAABAgRmQKCo1q68I4b+Jb9ezsBqZmaRlVf2xH/4N7fET7c8Hk9+YkW0nriawf2x47oPxVPv/Ubj10/s9z0BAgQIECBAgAABAicJ1Eb9nJgVZvEdidfjxe5vRld8JO66afnJIaK2+62XxY077otbf3tevFYb4TRQjs5SccJQo0oMlLdGqVgeneWjdbRj0X9wT+xYvzQNlVrVGV3l3hgc6nhjnnXxQLknHuxsr/ctjfU7utNwqhOHNg2tvxTtD+yL/Q92xqr6MKzS+i/Evt6xg58q/ftHLbcUqzq7ojy6p77sor0res/g6K2TzjITCBAgQIAAAQIEmkJg9gaJykvx7MPPRlvHNbF8/ni7cU60LfvDWPv+ZdE2XstJh7kSgwe/HB+67omYd/PeOD40VOqX0XfXb8buq7fE/QdfHTXHI3HT3Xvj3I2PDCW04333xsKnbo5N9x+oB45RrSNlf+y9aUc8du5H48naso+/HA8t/PtYs2nXyBCsoTstyzZGecGnou94bajWofjq4ufiwyu3xp5Xjg0vqT5sqtq9IRZl79vIRigIECBAgAABAgQITElg9l6CDvbF4ef7p7TzjWf+Wez/1tfjcMf62LiiLYaBzom2lTdEx5pDse+HRyLdAFgWt9+1JdYuGn4CoqXt8rhmxfnRs++F6EtNJ62m7fbOuHPtkuG7KC1tsfyaZdHW8934YV8tJByNnvu2RdfSj8edm6+oB6D5sWTD9nio43/ELfc968Htk0RNIECAAAECBAgQON0CszZIVI68FD9olCPqw5dGPr1paPjQuujqfT3T9sJYvf1A9G1fHkfKT8SePXtiz54HovPq1bFx789PsYzWuGjxJRHPvxgvZz/g3RKtF10aS+OncfjlwYiBH0X37oPRdtnFsWDM0Rledv/uZ+LAwAQp5RRb6GUCBAgQIECAAAEC0yEw5lJ1OhZ4upbRsuDiuKytwdrmr47tfbXhQLU/v4jDuz7YoGmiSZUYPPRgrC+dF4uv/kr8z1drF+3/Mtq/uid2rYl4/nDfBMOWJlru5F7rv+fqOO+Nj7Id+vovYvHGRya3EN0ECBAgQIAAAQIEZkhg1gaJmP+uWLflvTHt/0Jf6Y1vbb4j9l37WLx8vDu2b/h3sXbt+2N16eczNJSq0ZFtizW7flJ/PuONUFT/2rctVo/7TEijZZlGgAABAgQIECBAYPoFZm+QiPPj8n+/ITbE1+Luv57o4eZRaK2lWLy00W2MUT1Dz15ELL3id8Y8oF157dV44zOdRnVPfzn/ndHeUYrnn/tx9I8ZwfRqHNzxb8OnNE0/uSUSIECAAAECBAhMXmAWB4mIloXXx87yZ+Nf3Xt9XDfm41ErMdjbE4/u2BQrN/4k/vhzG+PK0jkRLRfHlTdcGf27vx6PHqp93Gqt7/H4i7u/FiOPW9Qv5Pfufjh6+oc/IanS/1zs3Prp6Bppmjx0/hwXxsqPbY1rn/50bN35XD1MDETvnnviE7dFfG7bWp/SlI+pkwABAgQIECBAYIYEZnWQiGiJ1iXr48Henrjrd49H96Yl9d/nMC/OXfk38dLFa+Ohw8/Fg59oj0WttV19cyxa95nYu+VX8cm3nxdFcVFct+v/xgfuujPWjABfGCv/01fiayv+Ma4u/cbQ8i76z9+Nt67/Sjx2+7KRrpkshgJSz8646sifR2leEUVxXqx84oK49cADsWXZ+cOr9nskZvIQWDYBAgQIECBAgMApBGb1b7Y+xb55mQABAgQIECBAgACBaRCYY7/ZehpELIIAAQIECBAgQIAAgV9LYJYPbfq19tlMBAgQIECAAAECBAhMUUCQmCKg2QkQIECAAAECBAg0o4Ag0YxH3T4TIECAAAECBAgQmKKAIDFFQLMTIECAAAECBAgQaEYBQaIZj7p9JkCAAAECBAgQIDBFAUFiioBmJ0CAAAECBAgQINCMAoJEMx51+0yAAAECBAgQIEBgigKCxBQBzU6AAAECBAgQIECgGQUEiWY86vaZAAECBAgQIECAwBQFBIkpApqdAAECBAgQIECAQDMKCBLNeNTtMwECBAgQIECAAIEpCggSUwQ0OwECBAgQIECAAIFmFBAkmvGo22cCBAgQIECAAAECUxQQJKYIaHYCBAgQIECAAAECzSggSDTjUbfPBAgQIECAAAECBKYoIEhMEdDsBAgQIECAAAECBJpRQJBoxqNunwkQIECAAAECBAhMUUCQmCKg2QkQIECAAAECBAg0o4Ag0YxH3T4TIECAAAECBAgQmKKAIDFFQLMTIECAAAECBAgQaEYBQaIZj7p9JkCAAAECBAgQIDBFAUFiioBmJ0CAAAECBAgQINCMAoJEMx51+0yAAAECBAgQIEBgigKCxBQBzU6AAAECBAgQIECgGQUEiWY86vaZAAECBAgQIECAwBQFBIkpApqdAAECBAgQIECAQDMKCBLNeNTtMwECBAgQIECAAIEpCggSUwQ0OwECBAgQIECAAIFmFBAkmvGo22cCBAgQIECAAAECUxQQJKYIaHYCBAgQIECAAAECzSggSDTjUbfPBAgQIECAAAECBKYoIEhMEdDsBAgQIECAAAECBJpRQJBoxqNunwkQIECAAAECBAhMUUCQmCKg2QkQIECAAAECBAg0o4Ag0YxH3T4TIECAAAECBAgQmKKAIDFFQLMTIECAAAECBAgQaEYBQaIZj7p9JkCAAAECBAgQIDBFgTkTJCq9XdFeFFHqLMfAeCiVQ9HVXoqitDXKA5Vxul6P3q51URTLo7N8dJyeiLm+vmAVEc6F2g/AXD/X7V/tIJ+N743OvaG/gM7KY+O90Xtj/fLI+Tn8Yzpt16B111n0pahWq9Xa9hZFEfVyFm2+TSVAgAABAgQIECBAYKYFGmWFOXNHYqbxLJ8AAQIECBAgQIAAgSQgSCQLFQECBAgQIECAAAECmQKCRCaUNgIECBAgQIAAAQIEkoAgkSxUBAgQIECAAAECBAhkCggSmVDaCBAgQIAAAQIECBBIAoJEslARIECAAAECBAgQIJApIEhkQmkjQIAAAQIECBAgQCAJCBLJQkWAAAECBAgQIECAQKaAIJEJpY0AAQIECBAgQIAAgSQgSCQLFQECBAgQIECAAAECmQKCRCaUNgIECBAgQIAAAQIEkoAgkSxUBAgQIECAAAECBAhkCggSmVDaCBAgQIAAAQIECBBIAoJEslARIECAAAECBAgQIJApIEhkQmkjQIAAAQIECBAgQCAJCBLJQkWAAAECBAgQIECAQKaAIJEJpY0AAQIECBAgQIAAgSQgSCQLFQECBAgQIECAAAECmQKCRCaUNgIECBAgQIAAAQIEkoAgkSxUBAgQIECAAAECBAhkCggSmVDaCBAgQIAAAQIECBBIAoJEslARIECAAAECBAgQIJApIEhkQmkjQIAAAQIECBAgQCAJCBLJQkWAAAECBAgQIECAQKaAIJEJpY0AAQIECBAgQIAAgSQgSCQLFQECBAgQIECAAAECmQKCRCaUNgIECBAgQIAAAQIEkoAgkSxUBAgQIECAAAECBAhkCggSmVDaCBAgQIAAAQIECBBIAnMmSFR6u6K9KKLUWY6BtH9jq8qh6GovRVHaGuWBytjXRr57PXq71kVRLI/O8tGRqScWc319wSoinAu1836un+v2r3aQz8b3Rufe0N87Z+Wx8d7ovbF+VeT8HP4xnbZr0LrrLPpSVKvVam17i6KIejmLNt+mEiBAgAABAgQIECAw0wKNssKcuSMx03iWT4AAAQIECBAgQIBAEhAkkoWKAAECBAgQIECAAIFMAUEiE0obAQIECBAgQIAAAQJJQJBIFioCBAgQIECAAAECBDIFBIlMKG0ECBAgQIAAAQIECCQBQSJZqAgQIECAAAECBAgQyBQQJDKhtBEgQIAAAQIECBAgkAQEiWShIkCAAAECBAgQIEAgU0CQyITSRoAAAQIECBAgQIBAEhAkkoWKAAECBAgQIECAAIFMAUEiE0obAQIECBAgQIAAAQJJQJBIFioCBAgQIECAAAECBDIFBIlMKG0ECBAgQIAAAQIECCQBQSJZqAgQIECAAAECBAgQyBQQJDKhtBEgQIAAAQIECBAgkAQEiWShIkCAAAECBAgQIEAgU0CQyITSRoAAAQIECBAgQIBAEhAkkoWKAAECBAgQIECAAIFMAUEiE0obAQIECBAgQIAAAQJJQJBIFioCBAgQIECAAAECBDIFBIlMKG0ECBAgQIAAAQIECCQBQSJZqAgQIECAAAECBAgQyBQQJDKhtBEgQIAAAQIECBAgkAQEiWShIkCAAAECBAgQIEAgU0CQyITSRoAAAQIECBAgQIBAEhAkkoWKAAECBAgQIECAAIFMAUEiE0obAQIECBAgQIAAAQJJQJBIFioCBAgQIECAAAECBDIFBIlMKG0ECBAgQIAAAQIECCQBQSJZqAgQIECAAAECBAgQyBQQJDKhtBEgQIAAAQIECBAgkAQEiWShIkCAAAECBAgQIEAgU0CQyITSRoAAAQIECBAgQIBAEhAkkoWKAAECBAgQIECAAIFMAUEiE0obAQIECBAgQIAAAQJJQJBIFioCBAgQIECAAAECBDIFBIlMKG0ECBAgQIAAAQIECCQBQSJZqAgQIECAAAECBAgQyBSYpUHiaJQ7l0dRFBP/KW2N8sDPo7drXRRDdSWTZRrbKoeiq70Upc5yDEzjYi2KAFSLv2oAAAzuSURBVAECBAgQIECAwJkUmKVB4sJYvf1AVKvV+p//Hd++fVlE2x3x7f9zPE3v2xar55/hXWxZEhu6+6Jv++qYfyaPtHUTIECAAAECBAgQmEaBM3yVPY17YlEECBAgQIAAAQIECJw2gSYKEq/E95++N9aX6sOhSutjx77eGIyIyit7YmNpeXSWj54APzyEamhY0kA5OkulaN/xaHTvWB+loWFVpVjVuTsO9h+N3n1fGFl2af2XY3//seFljRnaVImB8tYoFevigXJPPNjZXh+atTTW7+iO3sHRQ6+ORf/B3dG5qlTvaY/OrvKYnkpvV7QXpWjvOhSj5zxhJ3xLgAABAgQIECBAYNoFmidI9O+Lp75/SdzZWxv69Mvoe+iSeGrNlrj/4KvRsvAP4saOiN1f/+/xyugr8oEfRffuiI72d9aHJfXH3tseiPIld0RvtRrH+x6M39vfGctLq+IvXlgRf/lyNaqvPR+fifvj+k/+3dhljTl0j8RNd++Nczc+MjQM63jfvbHwqZtj0/0HhoJNxLF4Zc+WWHbdM7Fg+8E4XhvC9drnY/F3NsfKzY+PLLdl0YborvZF94Yl0TwHcgykbwgQIECAAAECBM6QQPNcf7Z9JO668/pY1Frb5XOibeUN0bHmUOz74ZGoxAWxYt2Nsbjrm9H94uv1Q1GJgQPPxO5YE+3LLxg5PG23d8ada5dEa0S0tF0e16woRaz5eNy5+Ypoqy269dK48qq3R//TB+LwmDsMI4uIiGVx+11bYu2i4acmhpdzfvTseyH6akFm4Nm475Y9sfQzd8TmFW3DIaH1HbHhizuj4+ltcV/PiXdORi9bTYAAAQIECBAgQGDmBZonSDS0/Hk8f7gvBqMlWi+/NjrWfD8efval+jChn8WB7r0RHdfE8hl/YLs1Llp8ScTzL8bLg78aDjD9pbjs4gvH3mloLcXipX2xu/tHPgGq4fE0kQABAgQIECBA4HQJNHmQGMXcckm0b3pPPP/J/xI9A5WIoWFNC2LLuneN+rSltli6uDR0N2LUnDNUHox7rn7L2I+3nff22Li3f4bWZ7EECBAgQIAAAQIE8gUEiRGrc2LhNWujI/ZG94Gjw3cFlq6N911+/kjH6S0+GLsO/yJ9lO3IR91WfZTs6T0Q1kaAAAECBAgQINBAQJAYjTL/XbFuy4LY/fVvxsNPfSeW3vD7celpF2qJ+cuviY62n8RzL/zz2E9jGtwfO1Zd6lOaRh8zNQECBAgQIECAwBkROO2XyWdkL7NXen5c/r61sbRrc9x078K44cqLxz6jkL2cKTbOvzI+9qWr4ulbPhU79/cPh4nBQ7Hn7rvitrg5tq1bdGa2a4q7ZXYCBAgQIECAAIG5IyBInHAsWy69OjZteEfEmvfElZe++YRXT9e358TCtdui56Gr4kjnsphX+50V534wnnjLpjjwjZtj2dAnT0X4PRKn63hYDwECBAgQIECAwIkCRbVardYmFkUxNB7/xIam+772C+Su/XA8t+mxeGDt2/zLf9OdAHaYAAECBAgQIEDgRIFGWcEdiTFKx6K/5+HYfezG+NM1bxUixtj4hgABAgQIECBAgEASECTqFsPDhH4jSnf/Mm79q40jw4cSlYoAAQIECBAgQIAAgTcEDG16Q8JXAgQIECBAgAABAgQaChja1JDFRAIECBAgQIAAAQIEJitgaNNkxfQTIECAAAECBAgQIOB5YucAAQIECBAgQIAAAQKTF3BHYvJm5iBAgAABAgQIECDQ9AKCRNOfAgAIECBAgAABAgQITF5AkJi8mTkIECBAgAABAgQINL2AINH0pwAAAgQIECBAgAABApMXECQmb2YOAgQIECBAgAABAk0vIEg0/SkAgAABAgQIECBAgMDkBQSJyZuZgwABAgQIECBAgEDTCwgSTX8KACBAgAABAgQIECAweQFBYvJm5iBAgAABAgQIECDQ9AKCRNOfAgAIECBAgAABAgQITF5AkJi8mTkIECBAgAABAgQINL2AINH0pwAAAgQIECBAgAABApMXECQmb2YOAgQIECBAgAABAk0vIEg0/SkAgAABAgQIECBAgMDkBQSJyZuZgwABAgQIECBAgEDTCwgSTX8KACBAgAABAgQIECAweQFBYvJm5iBAgAABAgQIECDQ9AKCRNOfAgAIECBAgAABAgQITF5AkJi8mTkIECBAgAABAgQINL2AINH0pwAAAgQIECBAgAABApMXECQmb2YOAgQIECBAgAABAk0vIEg0/SkAgAABAgQIECBAgMDkBQSJyZuZgwABAgQIECBAgEDTCwgSTX8KACBAgAABAgQIECAweQFBYvJm5iBAgAABAgQIECDQ9AKCRNOfAgAIECBAgAABAgQITF5AkJi8mTkIECBAgAABAgQINL2AINH0pwAAAgQIECBAgAABApMXECQmb2YOAgQIECBAgAABAk0vIEg0/SkAgAABAgQIECBAgMDkBQSJyZuZgwABAgQIECBAgEDTCwgSTX8KACBAgAABAgQIECAweQFBYvJm5iBAgAABAgQIECDQ9AJzJkhUeruivSii1FmOgfEOa+VQdLWXoihtjfJAZZyu16O3a10UxfLoLB8dpydirq8vWEWEc6H2AzDXz3X7VzvIZ+N7o3Nv6C+gs/LYeG/03li/PHJ+Dv+YTts1aN11Fn0pqtVqtba9RVFEvZxFm29TCRAgQIAAAQIECBCYaYFGWWHO3JGYaTzLJ0CAAAECBAgQIEAgCQgSyUJFgAABAgQIECBAgECmgCCRCaWNAAECBAgQIECAAIEkIEgkCxUBAgQIECBAgAABApkCgkQmlDYCBAgQIECAAAECBJKAIJEsVAQIECBAgAABAgQIZAoIEplQ2ggQIECAAAECBAgQSAKCRLJQESBAgAABAgQIECCQKSBIZEJpI0CAAAECBAgQIEAgCQgSyUJFgAABAgQIECBAgECmgCCRCaWNAAECBAgQIECAAIEkIEgkCxUBAgQIECBAgAABApkCgkQmlDYCBAgQIECAAAECBJKAIJEsVAQIECBAgAABAgQIZAoIEplQ2ggQIECAAAECBAgQSAKCRLJQESBAgAABAgQIECCQKSBIZEJpI0CAAAECBAgQIEAgCQgSyUJFgAABAgQIECBAgECmgCCRCaWNAAECBAgQIECAAIEkIEgkCxUBAgQIECBAgAABApkCgkQmlDYCBAgQIECAAAECBJKAIJEsVAQIECBAgAABAgQIZAoIEplQ2ggQIECAAAECBAgQSAKCRLJQESBAgAABAgQIECCQKSBIZEJpI0CAAAECBAgQIEAgCQgSyUJFgAABAgQIECBAgECmgCCRCaWNAAECBAgQIECAAIEkIEgkCxUBAgQIECBAgAABApkCgkQmlDYCBAgQIECAAAECBJLAnAkSld6uaC+KKHWWYyDt39iqcii62ktRlLZGeaAy9rWR716P3q51URTLo7N8dGTqicVcX1+wigjnQu28n+vnuv2rHeSz8b3RuTf0985ZeWy8N3pvrF8VOT+Hf0yn7Rq07jqLvhTVarVa296iKKJezqLNt6kECBAgQIAAAQIECMy0QKOsMGfuSMw0nuUTIECAAAECBAgQIJAEBIlkoSJAgAABAgQIECBAIFNAkMiE0kaAAAECBAgQIECAQBIQJJKFigABAgQIECBAgACBTAFBIhNKGwECBAgQIECAAAECSUCQSBYqAgQIECBAgAABAgQyBQSJTChtBAgQIECAAAECBAgkAUEiWagIECBAgAABAgQIEMgUECQyobQRIECAAAECBAgQIJAEBIlkoSJAgAABAgQIECBAIFNAkMiE0kaAAAECBAgQIECAQBIQJJKFigABAgQIECBAgACBTAFBIhNKGwECBAgQIECAAAECSUCQSBYqAgQIECBAgAABAgQyBQSJTChtBAgQIECAAAECBAgkAUEiWagIECBAgAABAgQIEMgUECQyobQRIECAAAECBAgQIJAEBIlkoSJAgAABAgQIECBAIFNAkMiE0kaAAAECBAgQIECAQBIQJJKFigABAgQIECBAgACBTAFBIhNKGwECBAgQIECAAAECSUCQSBYqAgQIECBAgAABAgQyBQSJTChtBAgQIECAAAECBAgkAUEiWagIECBAgAABAgQIEMgUECQyobQRIECAAAECBAgQIJAEBIlkoSJAgAABAgQIECBAIFNAkMiE0kaAAAECBAgQIECAQBIQJJKFigABAgQIECBAgACBTAFBIhNKGwECBAgQIECAAAECSaCoVqvVoijSFBUBAgQIECBAgAABAgQaCFSr1ZGpb6pVoyeMvKIgQIAAAQIECBAgQIDAOAKGNo0DYzIBAgQIECBAgAABAuMLCBLj23iFAAECBAgQIECAAIFxBASJcWBMJkCAAAECBAgQIEBgfIH/DxAKchb8xtikAAAAAElFTkSuQmCC"></p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>The graph of the rate of an enzyme-catalyzed reaction is shown below.</p>
<p style="text-align: center;"><img src="images/Schermafbeelding_2017-09-21_om_13.52.27.png" alt="M17/4/CHEMI/HP3/ENG/TZ2/13"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the value of the Michaelis constant, <em>K</em><sub>m</sub>, including units, from the graph.</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>Sketch a second graph on the same axes to show how the reaction rate varies when a competitive inhibitor is present.</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 the significance of the value of <em>K</em><sub>m</sub>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Spinach is an excellent source of vitamins A and C.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify one structural characteristic in vitamins A and D which makes them more similar to each other than they are to vitamin C using section 35 of the data booklet.</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 pigments from spinach were separated using chromatography. Identify <strong>Z</strong> by calculating its <em>R</em><sub>f</sub> value and using the data table.</p>
<p><img 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8vf/Y/xJb4QQAABBBBAAAEEEEAAAQQQQAABBBBAIK4FPhHXtaNyCCCAAAIIIIAAAggggAACCCCAAAIIIOATIJDHLwICCCCAAAIIIIAAAggggAACCCCAAAIJIEAgLwE6iSoigAACCCCAAAIIIIAAAggggAACCCBAII/fAQQQQAABBBBAAAEEEEAAAQQQQAABBBJAgEBeAnQSVUQAAQQQQAABBBBAAAEEEEAAAQQQQIBAHr8DCCCAAAIIIIAAAggggAACCCCAAAIIJIAAgbwE6CSqiAACCCCAAAIIIIAAAggggAACCCCAAIE8fgcQQAABBBBAAAEEEEAAAQQQQAABBBBIAAECeQnQSVQRAQQQQAABBBBAAAEEEEAAAQQQQAABAnn8DiCAAAIIIIAAAggggAACCCCAAAIIIJAAAgTyEqCTqCICCCCAAAIIIIAAAggggAACCCCAAAIE8vgdQAABBBBAAAEEEEAAAQQQQAABBBBAIAEECOQlQCdRRQQQQAABBBBAAAEEEEAAAQQQQAABBAjk8TuAAAIIIIAAAggggAACCCCAAAIIIIBAAggQyEuATqKKCCCAAAIIIIAAAggggAACCCCAAAIIEMjjdwABBBBAAAEEEEAAAQQQQAABBBBAAIEEECCQlwCdRBURQAABBBBAAAEEEEAAAQQQQAABBBAgkMfvAAIIIIAAAggggAACCCCAAAIIIIAAAgkgQCAvATqJKiKAAAIIIIAAAggggAACCCCAAAIIIEAgj98BBBBAAAEEEEAAAQQQQAABBBBAAAEEEkCAQF4CdBJVRAABBBBAAAEEEEAAAQQQQAABBBBA4JMdRZA2KLWjsiIfBBBAIOYCNSdqY14HKoAAAggggAACCCCAAAIIIICAU4AReU4NXiOAAAIIIIAAAggggAACCCCAAAIIIBCnAgTy4rRjqBYCCCCAAAIIIIAAAggggAACCCCAAAJOAQJ5Tg1eI4AAAggggAACCCCAAAIIIIAAAgggEKcCHbZGXnD7WF8qWIT3CCAQzwKs8xnPvUPdEEAAAQQQQAABBBBAAAEETAFG5PF7gAACCCCAAAIIIIAAAggggAACCCCAQAIIEMhLgE6iiggggAACCCCAAAIIIIAAAggggAACCBDI43cAAQQQQAABBBBAAAEEEEAAAQQQQACBBBAgkJcAnUQVEUAAAQQQQAABBBBAAAEEEEAAAQQQIJDH7wACCCCAAAIIIIAAAggggAACCCCAAAIJIEAgLwE6iSoigAACCCCAAAIIIIAAAggggAACCCBAII/fAQQQQAABBBBAAAEEEEAAAQQQQAABBBJAgEBeAnQSVUQAAQQQQAABBBBAAAEEEEAAAQQQQIBAHr8DCCCAAAIIIIAAAggggAACCCCAAAIIJIAAgbwE6CSqiAACCCCAAAIIIIAAAggggAACCCCAAIE8fgcQQAABBBBAAAEEEEAAAQQQQAABBBBIAAECeQnQSVQRAQQQQAABBBBAAAEEEEAAAQQQQAABAnn8DiCAAAIIIIAAAggggAACCCCAAAIIIJAAAgTyEqCTqCICCCCAAAIIIIAAAggggAACCCCAAAIE8vgdQAABBBBAAAEEEEAAAQQQQAABBBBAIAEECOQlQCdRRQQQQAABBBBAAAEEEEAAAQQQQAABBAjk8TuAAAIIIIAAAggggAACCCCAAAIIIIBAAggQyEuATqKKCCCAAAIIIIAAAggggAACCCCAAAIIEMjjdwABBBBAAAEEEEAAAQQQQAABBBBAAIEEECCQlwCdRBURQAABBBBAAAEEEEAAAQQQQAABBBAgkMfvAAIIIIAAAggggAACCCCAAAIIIIAAAgkgQCAvATqJKiKAAAIIIIAAAggggAACCCCAAAIIIEAgj98BBBBAAAEEEEAAAQQQQAABBBBAAAEEEkCAQF4CdBJVRAABBBBAAAEEEEAAAQQQQAABBBBAgEAevwMIIIAAAggggAACCCCAAAIIIIAAAggkgACBvAToJKqIAAIIIIAAAggggAACCCCAAAIIIIAAgTx+BxBAAAEEEEAAAQQQQAABBBBAAAEEEEgAAQJ5CdBJVBEBBBBAAAEEEEAAAQQQQAABBBBAAAECefwOIIAAAggggAACCCCAAAIIIIAAAgggkAACBPISoJOoIgIIIIAAAggggAACCCCAAAIIIIAAAgTy+B1AAAEEEEAAAQQQQAABBBBAAAEEEEAgAQQI5CVAJ1FFBBBAAAEEEEAAAQQQQAABBBBAAAEECOTxO4AAAggggAACCCCAAAIIIIAAAggggEACCBDIS4BOoooIIIAAAggggAACCCCAAAIIIIAAAgh8EgIEEEAAAQQQQAABBDpDIG1QamdkS54IIIAAAggggEDCC9ScqG1TGxiR1yY2LkIAAQQQQAABBBBAAAEEEEAAAQQQQKBrBRiR17XelIYAAggggAACCPQYAfNJsz0qr61PnXsMFg1FAIFOFeBe1Km8ZI4AAq0QsO9HrbgkICkj8gI4eIMAAggggAACCCCAAAIIIIAAAggggEB8ChDIi89+oVYIIIAAAggggAACCCCAAAIIIIAAAggECBDIC+DgDQIIIIAAAggggAACCCCAAAIIIIAAAvEpQCAvPvuFWiGAAAIIIIAAAggggAACCCCAAAIIIBAgQCAvgIM3CCCAAAIIIIAAAggggAACCCCAAAIIxKcAgbz47BdqhQACCCCAAAIIIIAAAggggAACCCCAQIAAgbwADt4ggAACCCCAAAIIIIAAAggggAACCCAQnwIE8uKzX6gVAggggAACCCCAAAIIIIAAAggggAACAQIE8gI4eIMAAggggAACCCCAAAIIIIAAAggggEB8ChDIi89+oVYIIIAAAggggAACCCCAAAIIIIAAAggECBDIC+DgDQIIIIAAAggggAACCCCAAAIIIIAAAvEpQCAvPvuFWiGAAAIIIIAAAggggAACCCCAAAIIIBAgQCAvgIM3CCCAQIwEGmtVWVqsovzJGjYoVWkB32OUu7pIJaWVOtHY1fU7qpJJw636XKPFFQ1dXYH4K+9sgxo6oh8aqrTj6UWaMsTZ30M1Or9c3Vq5o/zi7zeDGiGAAAIIIIAAAggg0OkCBPI6nZgCEEAAgQgCZgBvbY5Gp2Up59EVKiyrlrdF8pOq2LBKKx+do3FpRlBvbXkMAnotKtUDD9SrqqxAU0avVNXf2tn8hnItnvh1LVxVpkMBHe5Vff05dUScsJ017ITLO9CvE2pHlggggAACCCCAAAIIJIIAgbxE6CXqiAAC3VOgsUY75t2hnPV7Vee6hUZQb/1dmjh1nQ52yLAw1wX37IQNv1ThpEzNyN8SFHhrC8t5VRWt1da6gAielZFHlwy9TMltyTaer+lQv3huKHVDAAEEEEAAAQQQQKBzBT7ZudmTOwIIIIBAaIELqildpoI9J63THg0YN1uzb5yoGdMzAgM55qi9H+7Rgbd+pKK9Tem91UW6f0W6XikcH5g2dGEcba/Amd/qF9Xn2ptL0/WNh1X+cq2Vl9nvC7V+3RxlJCd1TP7xmEtH+sVj+6gTAggggAACCCCAAAJdJMCIvC6CphgEEEAgQKD+Va0q3G9No+2jK+f9UK88s0Q5wUE886KkVGXOyVP+M+Xau+5rGuDLyKu6srXaWHU+IFveJIDA387q9Mf2aLxUTZ4/q3sH8RKgS6giAggggAACCCCAAAKJIkAgL1F6inoigEC3EvD+5m39wo7lDJylhx+6xsXIul4aNH2JFoyzJ17W6pU9h7vpemrdqrsjNObT6pfsiXCeUwgggAACCCCAAAIIIIBAswCBvGYLXiGAAAJdJODVH2tqdcEqrdc/f1lXuJ5VeYmuvXGkmkI/Xp186x39oYtqTTEIIIAAAggggAACCCCAAAKxFSCQF1t/SkcAgR4p8An16ZdsBeOkxvozOuvaIUkp0zfqyIla1ZjfP8nVoEjXNlRpR/FTWjwpXWmDUpu/h0zW4qc3aUdVfaSrI5xrVP32uzTMynPY3B1yk1Nj1Wpda9fjX1arKtT2rOaagKVFKpw7prm+5jW+Ov9IlbV2CDRc9Y6qZNJw69prtLiiwUjYqIaqXSpZbewQbJfvIk9vxSJdbqbLXKFDdnEXypQzxLIctkiV9shK+3zInw2qzL+mqU5D5mirvwkHtDJzqL+dl+dXWtOtHW2wymisrVRJ/mS/uc+juDL0Dsbt7ndH+YPabthxfiFROYgAAggggAACCCCAQI8TIJDX47qcBiOAQOwFkpR81UhdYc2o9O59Qku313TwFNl6VRXfpdFXTdPC5Y9ra/BGDd5qbV31qBZOzdSU/BdV1eodcI2A4pQ8zRlojQ18c7feqA8VlXNqn1f1ngo1bdfRRxnfnKz0gJGIF3Si/BFNGZalnEdX+Tf28Ofgq/O3lZP5ZU0peDV0AMuf2PHCCAy+XjBNo6Y+qJUbgnYI9uc5Xnd3eB846tDelw3lWnprnlaWVVuBPiNDo+679p9RnwDDTur37mDY3j7gegQQQAABBBBAAAEE4kCAQF4cdAJVQACBnieQlDZF9069zGr4SZUvuF6XT1qkouJdbQiqBfudMkZ/TdeM5eWqCz7V4v05HSpbolvveFIHWxvMSxqu8TenNuXo3a8XdhyLHIxseEs/3mnt1uoZpdumDVFzDMoI4m1fqFm5z+pQ1BFuRp1feECz5pW5COY1aN+35yjvBUcArIWBecDsg3u0Li43D/mTfrZ8ubbWBcMka8yNo5Tib09n9Xt3MPQj8QIBBBBAAAEEEEAAgYQWIJCX0N1H5RFAIHEF+iuzYKXy0vv4m+CtLlPh8gc146rBxlTLMcpdXaSSYjdTSf1ZGC8uqKb4fs0re7/54IBxylu3Qwft6bgnDmtv6SPKGzfQn8ZbXaT7V1TInITq/qu30idkqSmXc6r64UuqDjsoz5iKu3erdlnBKM/Yibo2pTmM11jzvB5a/FN/4NGTnq38gDrX6mhlqZbNG9e8a++ex/RQ6ZHIwUPDo67ObJWxM3D2Q1qz89dNU5INCzO/Jdnp/inO0lGVrt8dMEXYk7Va75lulQW60obpla2SY9bU5iOrlelqr4pkZRb+sqnsY6Wa2cvObKSWVB711+m9wkxHfaw0F/5dW3cZ/Wn0472lFTrq68fjOrjzKd0z7hI7USf2e9sNO87P9uInAu4F/FO7ndPpo732TeEv1qaK2gj3Fq9OFGf7p8Q3LVtgT0F3Xz9SdqWAOeJ7pRaXHu3KQikLgR4j0Kb7rX+Jk2j33O7IyL8j3bFXu7JNBPK6UpuyEEAAAadA8jXKf+6HWhUQTLITnFTFhlVaudycSmqu95ZuTIF9SiXbqyIH2xr2qfiZg/7pl570+SrbXaT86RmOXXGN3W+z7lD+M7tUNi/Dv3FGXdlyrao4ZVfA1c+kjNv1r/YuuicrVF59Psx1H+mNVw9Y9bpMU2aNcYwk+5NeWvFvqvINODMCbvNe0P6frFZeQJ2lpNRMzV5UpFe2z9eVvuCZETwsfFwvRZ3SO1Dj1+3U9sJ7NS2jefyamV9OYYk2ZNsjI43Zqr87pg/CBiPDNK1LDg9V3obv61tZqdYoRmN6dsa/KCPZCoZ2er93B8Mu6SgKSXQB33T7FXpszlc1dm5xB4yQTnSQxK9/Y225Hp87XuNyn9ORuLy/J74xLejpAuf12wPv+jdxa5WG8557l5uZFq3KncQIdFsBAnndtmtpGAIIJIRAcoZmFr6k98zRZkvvUtaAcMO7zCmwj2vlgmkaYY4YKQsV0Asc9SbPeK3Y9IBG2MGeFiApGrFovVbYgTi9r12b9wWMSGtxSYsDzl10a/XKnsOhR7HU79drb1rj/QbeoK9f2785p4Bzs/TwQ9c4go7NyZpeGQGsEfP0cM7QprfeA3rt5x8FJwp477n6Di2ckuaYxus83V9jb73BGlVoHP/4tBr+5jwfJ68HZml8eu8wlen8fu8WhmH0OIxAaAGv6vauaNuyA6Ez5GiXCxhrhpYVaPqEu/SDvU2rs3Z5FSgQgR4h0KDao39uZ0uNe+6eZZq1pDzyA+t2lsLlCHQXgU92VkPMaQbml7mrYvCXfS74uP0+1DXmuUjXteUaM89Q10UqJ9w15vFI14UqpzOuCVe/SHULd01n1K8tDuHqFy9t6sj6dcc2JfrvkVn/rvjyjTbLNUac5S4xijM+fGz/iQ6e/k8df7k49EYV+d/UkdoiPbvIGfT6L31w/H1r1JtHA3PyNNkxfTV0Oz6nyfNv0ff2Pu3bhMIekRb1Mn9mxqYX103UGE+5KrxenXz5dVU/NEIZzbNmjZRGoOnnu7XPN+LOqNfN1zs2uYh0zl9I0AtrSu+Go0adG/SLt38n7/TPtZyS6rvKo0u+crUGBdQnMLuk5H7qaxyK3495wWaB9Zc6u9+7g2GwGe8RcCfQtOxAul4pHB/hAYO7vEjVtQLeikJ9I7+sbaOEuraqlIZAYgs0fqjjv/trB7TBCOaVrdXGW0crPyPcw8sOKIYsEOgGAp0WyOsGNjQBAQQQiJFAijKmz1aGWXrufVplfAw5UbFNrx/4uTb5d101RuhtyFNOvzL9OHeYNdrM+UT0Uxo6+LNhRqEFNivp0iEaagwEPGkG2j6qUa2x6UWG+0ielDJR9+QUGVOBjbWHTr6of9t1u4qNwJr/q/GYdm7ebwUYU3XThOGOejmDUEYgcMMMDd3gv9LViwtHjuuPytSgkKndO4S8PC4OJqlvvz4Os+BKdXa/dwfDYDPe90yBXrpy6UvalWuN6HUiGDszV5Y+re8VlgVtuGN8sNy5VRWLsjTNf1/0aFBumWpynRnwGgEEEOihAg3v69hHgRtyecat01vPTHMsoxJsY/5tu0HLCzaoImAzr6bZHQsyRkT4uyc4L94j0PMEmFrb8/qcFiOAQMIJmGvafUM5i0r01rvbtMS/SUXwBhP/qdOnLlit66WUvi6fZl7UV/7Pp94GnT7b2rmlzk0vjB1OX90fMD23sfolPf/OOV+9POPyNDfgKet/q6H+bPt65Ohx1Qb+/ejIrxUOjqsS62Vn93tPMEysHqe2nSCQlKrM3NXavrtAGcErHLiYwt8JNSJLBBBAICEEvL95W78I+Dusl4aNuiJCEM9slvm37f1atfC6oBkVXn109H2m1yZEz1PJWAp02oi8cFMozcZGOhcJoy3XddU1bW1XV9WvLeXQpubfxrb4ddU18d5P8V4/u5+iTWtu/m1o/ytzZ6+r5jRN94n+xDKovOQRyln3HR2feK+2mk8wfRtM3KeMgOBY0DVd8DYpfbJuv3qzVhoBO++bu/VG/WRr9Mp5Ve+psKatJmvMjaOi/GHXBZWlCAQQQCCMQFLaLC3N2aYZ5ghj/1fwFH5zt8FZGrf8gD+Fsa20Zpa+plVZyY5jQS8bqrRj62699sym5hEo5q7id81S9jeNUcXGEgDOfx+arjZ3tt6snFRndPGoSiZN1srq5gc3/pGGocrwpGvmgtn6+i03N2+QY2ZujkL84Yt6YaOjPuHSBjXF/9aXx0/1s11By0CY7Zp7nUZeP0OZqf5tuv2XNb8IYWnuDH7I3BG8UQ1VL2vbnp86RqMbV/ry/prGzwxqjy/TEPn5C7ugQ8u/qrTl1oH0Au39SW6Y0dz+i3iBAAIRBbz6Y01t0BT2ZA1L+0zEq5pOGsuzXD1Sw1SuQ47U3lP1Mh//Nm9P5jjp6uV5Va2eGnQfNzYN27kz8pTd+h3KHbXAWCqmuZDwf6dby+Acfyvw/mRf6voeaF8Q7meDKvNvUE5ZnSNBhH9vvJVafOUcbbX/eTCv8t9THVkEv2z3vTw4Q953tgAj8jpbmPwRQACBIIFP9O2ni61j3rfeVrXjD4agpKHfJl+uL1/+KevcWZ0+89/W639Qv/72B6YLqj8TbgfZoGzPnpF/41dPsvpd1IZ/GpKGaOqsUU1PVZ2jVxoPq/xla61Uz0jdcN0lQYX/LyWnXGQdM6e9/cz3sMcMsLr+PmJ+4AvKtke9jWG/9yhnGtszBP5elw6+LGiESHtbbkwhK39EU0ZO08LlG5uDeGa2dXtV9OgcjRt9l0qq6ttRUIQyfLtCPqgZE+f5y2isLdPdo7+qnEeD6hMibehKWeUNyzLyeLzlWq5mu3y7ro9X7tpynWjtbrENB1ViBAJHTH1QK/1LSlg18eVttGfkTBUebI9Z6JZxFAEEWiNwSu/sPxZ0wec1ONX+OzXoVNDbxobTOhN0rP1vnTNF7NwibMjmS+Jcs9m+JvQD6MbaV7V0UqZmLHi05f3JvtR5Dyw+GMcjDDv5Xm578LPDBdrwaa3D60CGCCCAQI8SsNek8zX6wtv62b5TrWy/cyql89JkpQ61n4D+VUePfxh6B1nnJQEbURgnLklTathdbgMuDHpjb3phHjam125+RTXGB7fG6tf1im/xPY8GTJ2pLP8cXvty54fmCzqy/7cB03LtVPyMJBDLfo9UL84hgIDMNU63L9Ss3GeD1t4Lsqkr18p5/1fba1w+gAm4vFGnXi5wWcY6vV71ou69dZnKA9alCsjQCDCa9VmnSmPN1JZfLtvku/CkKtbfq1nzytwH8xoP6nt3ztbKaDvNeqtUdMt8ldQ4h560rC1HEECgEwVCbXQxcIRGXOrmCeuf9NL6F4M2GzM2+Bp9tT7fzionpV+vmwY662Csw1xSpJf8T66DC/hIb7x6wFrP2ToX6gF0Q7mW3vqAXqxuWjImOJeW74174PLZyik+4uJv8pZXd+6RTr6Xd27le3zuBPJ6/K8AAAgg0OUCKWN029TLrGLf19aCJ8J8WApds8aqnXrenlLluVJf/j99rITOoFi0P1jsvAP/cPF8cYgujbDDq31VyJ+Odnnf2abt1acc02pTNdnYhazlpLMkJX8hTfY4Pe+bW7Uz6ocy46np9rs0zNgd3ZwSPWzujh4e/Itxv4f8ZeAgAokqcFrVbx8N/DBnjM+72Bg53JY/mhtrntdDi38q56SosDJ1P9XS5T8NmqIWNrXjhLEhR/V7LsvYorypSyIH8eyc617TC3s/st/5f7aqTb6rjPrteUwPlbr8IOut0aH3XH5I9h7U89vei8MPyH4uXiDQvQVCbXTh6m/Jeh1cPV8FexuCfDpog62kqzT3waD195wzRoJKbax6Xt8LqIsRUMzJ0+SAB9DGlN2itU1L2wRdH/lt8JrWkVN31dlOv5d3VUN6aDlt+Zukh1LRbAQQQKCjBPprbN6s5gXV67Zo3h2P6fXa6KMKzOlQ9857xv/00jN2oq71/5FhjIobN1NTBlhPIL3lKpj9pA6GHFFhtiX4j6jLNGXWmHasSWK069YbNNDH9GcdO/ZW87TagVkanx56842m9fWsYKR3v9Y++IMIdTZG+dWUKm9xufVBu7117qg+jWU+se73WLadshHoSAFjTbaDz+l7O98PyrStHyxP6c2izaoKXj7BXIeucIcOWksIHK3cqHv9mxgFFd2qt8bI53H3q6TycNPSBO++oLx0+0FPcEZm2gJte/e4L+3Ryh/olhZprbUBnZc2HtGmhU8FtSmo3JoKlcwfZ6wa6PwyPsgWPh5hNIwzrfU6wOm4Du4sUJb975s/ufHQ6q139Af/e2tHYcP2SGm2sZy+8yto+QbWx3Pi8BqBNgk0fnBMRwPucR5dMvSyEA9urezNdTyLn9JiY2pq9oaqoIcmRpqBt+ieKZ9rU10CL3LOFLHPtNyQremMcz1nO22qbpowPHDnXOdyMXYy4z51S3GFjvqXhPm1ti0dH3T/MxKfPKiDHwRA2TnE5mdX3stj08JuXyqBvG7fxd2jgR9/XK/DR37n//7wwzp5vXF0M+wezLSiCwWS0m7X6nxrTTmjXG/1s8rL/LKm5D+lku1VQWtpGEPfK36kktU5Gpu5qHkkhWeUHiq4MTDwljxGuXNH+Nd38lavV/bEPBUG5Gnm95wK504J+CPKc/Us5V7bv10KzVMZjD+WHjd2gPRNq+2jjG9OVnq4kX7G+noz5n/N/0ePr87GWlKLn96lKmcQ0vzj7+lFmj5xhf9DZEfU2VWDL0pRf3uGRpumQ7sqpe2JYtzvUSse735RG0CC7i7QWFupTU8X6M5b1recAhtqepUbkPp9eqFFUPAyzSwq0arsDP8H3aTU8frWMztUkm2P1HaTecs0nqsX6rmNDzZvLpF8jRY8Mst6uBKYviltrn/zi6TUG/VoiLQXjhzXHx2XOnchtw+3KNfcAfih9XpuafO/cb60EUbD2Hn5fxr/vi3Z/WOHkzF6O2OO1qyY4f+3wp824s7l/lS8QACBDhfw6g+/Puh/uNyUvRFc3zBDQ61ZE+bMiYDvq8y1QkOsq2le7MlQ3vdylBHu78XW1j9llG4YGzgXpGlDtqAlA0IF6EI9gE4aofw3fqaS7xRoydK7jAcL/ZW1aoOWj091BPxSlJH7f7VgXGC5ra16Z6fvsnt5ZzekB+ffabvW9mBTmt6BAmbA7je/OaS/nm+5ZozH49GQIWkaPuyLHVgiWSHQVQK9lJa7XptP52qW/4nkOR0qe9z3vXJBlHqYf+y8uF45aYHjDYytqYx8v68Nx2YaO1xZo0rMBXcXmN/h8/Skz9fm0jlKa+8fT0mXa/o3R6h0+X556+r0sVmk8YHstmlDHH/kBNfD+ICW9R3jQ1+tbjKvM09bC65vXfVgcOLm9wO+phXrbm9/nZtzDP/qor7yDXz0Vc6YDj3ny9pqpvaM15r9G6wdesNf3vlnYtzv0RoY937RGsD57iEQtGupq0YZDyLyvxU0vcrVhWo5UsW4ZRgj5hZmhXpgYo3U3tn8oMJdKXYqY1H2WTe1uB8mXfFlXdPr6cAdDDVUc749q2Xa5H7qa2R30s6yxc9Qo1ZC5+X7t2jOQ5rzw1tV5HugY2ZmjYaZPi3wAVSLcgynsTM1tcW/b8a/FWPGa0yvLUHtCZEBhxBAoAsE/qraY83jYdtVoO/v2mLlj0hpVzaBF1+irFk3aMDeLc1LD1gPFKZNbx7117yes311hAfQ5oOKObnKNJLm5C6xLwj62Vt9U4L/Pv+Djtf+VcZC1EFpY/G26+7lsWhdTymTEXk9pacTsJ0HD1bpF798O2QQz2yOOSLvP/7jiPZW/JzReQnYv1TZFEjRiEUvaHfp/SGmC4UX8qTfqlVlkf7Y6a/Mwu2hh/a3yLaPrsxeqS3PPaARbdrkIjhDI6A0babG2KPXjNOB03+D09vvzUDUJu0uvlNXOq61zwb/9KTfqaItazQtNfgPpeCUHfTec4W+OinEaBnv+zr+wX91UCHtzSaW/R6l7gnhF6UNnO6BAsaU0QnLtHbOsAgPIsKxGNN0f1+jwBXmemnYqCvCBrGS0q7VxOFtvacN0VeuDhUgDFE/z2UafOnftzwxcLCGRSy+QbVH/xx03afVLznMTTvpsxr8xcCdK72/O6YPggbDBGVovI3g9ImL1O/iMOW1zIgjCCDQmQKNNTrwi/r2lWBOoV/8hLYd2NrBQTyzWkbw/9rpmhyw6UWDKp54XlX++1CIoFbUB9BhmuybNlysovxval5ZXZhE8XC4q+7l8dDW7lsHRuR1375N6JaZQbwT73/gqg0NDX/Rm/ve0tgxo2WO0uMLgcQS6KVBWQ+qeP88Y7rrNr1e8we9/cwmVQTvJjhgnPLmjtbgf5qkaRlunlaaQ/s36q2ZxnTUrf+uX71crK3OHbZ8+V2nkdfPaJ6G1VFw1lSGCt+iwcYokRtHhf3gGlikYTH+Ye06cocqf7hHB976kYoCdi0cqKx539A/j5ygO7Kc0xgCc+mcd1aQ7Csl+rc1zzj656xOn/lvo8jQ6/91Tl0i5RrDfo9ULSWKX8RGcLJHCRj3m/nf0dIHx2tQm0Yq/03nTjcErf+UrGFp9s7ioTA/o7RhxmiN6jZ8AOxlTF8L+LAaKn/rWFJf9b2oLY0KtWP6Aa3MHKqVEYoLOPVRjWqNJRMy/Gu7Bpy13vRS/37/EOqE8bm8j/r1M+ruH+UXOhlHEUCgCwRCbHThutQBt6pk93eV2SEPkSOUmjRc429OVdGGo82JTlaovPo+ZWQYf7uFmFbr7gG0uUyN+Xf7GR0P/hu7uaQ4fdVV9/I4bX43qRaBvG7Skd2pGcdrfu86iGe32wzmmcG/UaO+bB/iJwIJJmAG9L6hnKxIQ/Xb0KTkDE3LNb/v06o2XC5jClbOTw4rp1XXfk7TnqnStFZd40jsm7aQZ0xdyFO+47D7l62sc2qudp3IdZG9ESSbvkjFxne7vjyZWnWkNkp/tLINwRXq6n53ZdhBfsFt5T0CHSZgjlDO1deG9FVaZzzk6LB6JnBG3gadPvs3Y0B6pEBiL6X0jZeHIwlsTdUR6GSBlssHGDu9ztuiikUjmkcxN9aq8onlWrZ+b/P0VrNedfv0470nNHZ6WnPaTqlvb6VPyNJAI5DXvGxArV7Zc1gLMkYYD05e1ysBDwaiPYCuV1XZOj2ydEvL9VQ7pf5xmqmre3mc1r2bVItAXjfpyO7SjPPGWnjmdNm2fP3xTx/K3BTj4ovdjFZqSwlcgwACCCCAAAKJK2DuWvqSduUOTdwmUHMEEEAgLgRCbXQRYodva/ObzakLNWvBTx3BvJMqX7xMm67aFGK9545tYFLG7frXcS9qoW+miJm3vdv1cJ3ZU+EI8BmnBtyg28ZdEqYC9Tq42rm2tSOZOUV4wdc0OOl/Gw+Crpc2TDXWqnaOrv68BqcGLjXguJqXCLRagEBeq8m4oDMFDh/+XbvWu/v1r9/RxInjO7OK5I0AAggggAACCEQR+IT69Ev27SDu2yPHl7pBR2qMNeaywi12/mfVHGmIkm8sT/+D+vXvZVTgQnMl4mbDn+Yq8QoBBLpCINRGF+HW6jRmnUxfogWv/rsjmGbU0XtQm4r2aUbheP8u3p1T80t07Y0j5dlb3rzcweEDeqd+jE6/5VzKyRhROHW6xoaZ7ttYVaJv+TeoM2tqrKM6bqHWr5vj3wG8qf4NquychkTP9ewZ1fvX/wuXnHt5OJlEOs5mF4nUW928rubmFW7XxQtHYe5ua47K4wsBBBBAAAEEEIidgLHI+hfSFDiu44KO7P+twv2V0ljzhnYfdgTJYlf5MCUnK3Vo0Bp/cbXhT2C1PamDNSTwEO8QQKDDBEI8eIi4VufnNHn+LRoYUL5XdTtLta2ms+97SUq5bmLARmzyHtKv9u7T2wH33FTdNGF4mKm+oTbFuE4LCoODeGYDz+tMfWe26YLqz5wPkLTftJzubJ9x/kyse7mz5rxuFiCQ12zBqxgLfPihc/hx2yvzvstNMtpeAlcigAACCCCAAAKRBZKu+LKuMQewOb68e7+vNRWnHEesl8bujy+tfk5VzcP3WqaJ+RFrramAehxV6Xc3qybqCJCAi3iDAAKJLlD/26AgmDE+bfRXlB5h38GmKa5BI5KtUXkhxyKb6+utzdHoQcZmPtb3sLk7wj4MiUiaMlH35DiXVajXvh+9pP9w3nMHZml8erj1OUPs9BrmQUZjzSt64c2QLYpYxdAnP6XUIZ8POtWgfa/ub+nQeESbjPtx81qAQZf533Iv91Mk8AsCeQnced2t6n8y1rjriC9zrTy+EEAAAQQQQACBmAp4vqKvz3Z+cDRr87625uVocVmVmj7mNaqhaocK77pTC/dE//gV0/YYhSelX6+bgnbH9b6zRnfctVo7qhxjDRuqtDV/soYNGqPc1UUqKd4UeD4mDTFGRL72hhV0NBasr6i2+iAmlaFQBBJaoOXIL48uGXpZlCmyrRmVd15Va+9WTtAmGUkpfXVRm+SCg1fGaMDq9xxr9iUr68HblRF2H57e6psS9GRGxoOMh9fo9Vp79J25EUaBpk9cEeKhzF90usEZNXTbiOZlGpxXePc+ocVry3XCeojSWFuux+/K1cp3zjmThX2d2PfysM3qUSdYI69HdXd8N/bPpz7ukAqaU3T/8pez+vSn23ab75BKkAkCCCCAAAII9HCB3srIyVNWyQJVOD+/eauNINc04zsBeZKu0l2PztBLc7Y4PgAbH4j3Pm2sfWV8h2hSxYZVqvAdf0IvLC3Tj3OHhZm6FuLi9hy6KEX9zdFBDnvvOys0IW1FU669slVyKF2ZEUYQtad4rkWg+woYDyB+X6OPAhoYYqOLgPNNb5LSJ+v2qzcHBpyMUXnPb3tPs5273Rrjyg76168bqrydO5WfEW60XIiCQhxqCl49o6KAXWqthJ6RuuG6wMUQArPoo/SvXCmPsYGF45Yib/Wzyst8NjBpyHdndfrMfxtnWtsGe1pweeC/I4ZPxfq7jO+QhUU/mEj38uit6ZEpGJHXI7s9/hpt7lZrBuA66svMjy8EEEAAAQQQQCCmAik3aumqr2mAi0p40m9V7rj+LlLGMomx9l/WAn1/XoZvIw/3NTEWhZ+wTGvndFEQz6xY8mUackmEKF3jGZ05y5xg931ISgRsgXOqfvtQQEBL+oyGfCFo2qyd3PkzaYimzhoVdP8wdpHduV1vNoT5/7HXVRp5RWsDYM5CrddJl2v6N0cEld10zjN2oq5NCTscz0hkBNTGzdSUARHuKf4ijfvdtdfqyoCk1mZH/jSteJEyRrdNvczdBZ7LlXVt4EqEoS9MoHt56Ab0+KME8nr8r0B8AJw///91aEUa/vKXDs2PzBBAAAEEEEAAgdYLmLs1rtHmdZGDeZ70O7X+e/frKxE/SLa+9M65IkUjFhVry9LxrgKUUh9deduT2rwhW4MifU7u6MpaI07CBlG9DTp99m8dXSr5IdADBEJtdOE22BYmIFb3ml7Y2zTGz1uxSJcP+qpWVltTVi+UKWeIuU6eMYq2tj0DP3opbdrMwE0vfL2VrDE3jlJKtJ5LHq/lWx7T+IjBPOt+V7pCd4x1BjYjb3YUuej+yixYpyXjogToPOm65d8e1+J/+Wzk7PxnE+Re7q8vL5wCBPKcGrxGAAEEEEAAAQQQQKBDBcxg3lN6s7JUyxZnB4zS8KRnK3/dDu3/ycO6PjV4/aUOrUQHZ5aijNyNeuvdHVqz9Fuamd6nRf6+ti39rkoqf6VdK27s2iCerzbmiJPv6pWdTyg/Oz1wFM6AccpbeptG9OWjUIuO4wAC0QS8f9Txo/a6cFbioYOVGjACLUImyaP19ampQQnCbOAQlKrdb1NG6YaAAJuR48BbdM+Uz7nKOik1W0/v/rFx37tLWQEBvYHKmlegNTsrrftdf109akhAnt69RXqmqo2zxpJHKOeZXdq2rkB5QQG9pnvtE9p2YIeWj09t5dIFiXAvD2DkjSXwd/9jfHWEhrmTjPOr5kSt8y2vEYgo8PHH9XrjzX+PmKY1J7/0pWEaPuyLrbmEtD1cgHtYD/8FoPkIINBpAvb9lb8NoxH/STvm3mSsNefY7dC3jttq1nGLRsd5BFwIcC9ygRQ3SY6qZNLkplF53AfjpleoSMcJtPd+xGYXHdcX5IQAAggggAACCCCAQJOAt1KLr8zTvtGzNXvUxcax/hox82ZlJIeZX9rwnn713l8D9S7up2QGjQWa8A4BBBBAAIEeLkAgr4f/AtB8BBBAAAEEEEAAgU4Q8PyjBg9N0ta9G7Vyr5X/8gfVtB7eIsdUWmMHyKqXtHH9E9pa51z/yaOBN1+v9DBxv06oMVkigAACCCCAQAIIEMhLgE7qCVX89Kcv6tBm9r/YfPLNFwIIIIAAAgggECuBgRox+lKp+mhABbzVzyov89mAY6HfpOqmCcNbud5R6Jw4igACCCCAAALdR4DB+t2nLxO6JR6PR+Z3R3317v2/Oyor8kEAAQQQQAABBNog0FsZeQ9pZsCC6G6z8WhA9kO6K6O32wtIhwACCCCAAAI9RIBAXg/p6ERo5mf6d8wouk/17q3exjdfCCCAAAIIIIBATAWSx2v5lid1S4hdXcPXy9j9cP4PtHnleCWHT8QZBBBAAAEEEOihAkyt7aEdH4/N/tznPqs//unDdletfwcFBNtdETJAAAEEEEAAgR4vkJR6o5b/JEu5Fdv0es0ZHX+5WFurzwW5GCPwxpmbYgyPvCFG0FW8RQABBBBAAIGeJ0Agr+f1edy2+LOfHeCbXuv1Ohd6bn11Bw9Oa/1FXIEAAggggAACCHSaQC8NyvqGcrKMAnLv06pOK4eMEUAAAQQQQKC7CzC1trv3cAK1z1wjb8iQ9gXhzNF4Hb1xRgIRUlUEEEAAAQQQQAABBBBAAAEEEOjGAozI68adm4hNG5z2BR07VqO2jsr70vBhidhs6owAAggggAACCCCAAAIIIOATGKqcnxxWDhoIIBBSgBF5IVk4GCsBc1TeyH+6uk3Fm6P5Lr44pU3XchECCCCAAAIIIIAAAggggAACCCAQ7wIE8uK9h3pg/cy18gZddmmrWp6c/GmlX3lFq64hMQIIIIAAAggggAACCCCAAAIIIJBIAkytTaTe6kF1HTEiQ57/5fFNs43W7H80drs10/OFAAIIIIAAAggggAACCCCAAAIIdGcBAnnduXcTvG3mCLvPffaz+o/DR3Tq1MctWvOp3r31pS8N06WXfr7FOQ4ggAACCCCAAAIIIIAAAggggAAC3U2AQF5369Fu1h5zzbuxY0brL385a3z/RX89f17mOnr9L2Z32m7W1TQHAQQQQAABBBBAAAEEEEAAAQSiCBDIiwLE6fgQ+PSnL5L5zRcCCCCAAAIIIIAAAggggAACCCDQUwXY7KKn9jztRgABBBBAAAEEEEAAAQQQQAABBBBIKAECeQnVXVQWAQQQQAABBBBAAAEEEEAAAQQQQKCnChDI66k9T7sRQAABBBBAAAEEEEAAAQQQQAABBBJKgEBeQnUXlUUAAQQQQAABBBBAAAEEEEAAAQQQ6KkCBPJ6as/TbgQQQAABBBBAAAEEEEAAAQQQQACBhBIgkJdQ3UVlEUAAAQQQQAABBBBAAAEEEEAAAQR6qgCBvJ7a87QbAQQQQAABBBBAAAEEEEAAAQQQQCChBD6ZULWlsggggAACCCCAAAIJI5A2KNVfV+dr/0FeIIAAAl0swL2oi8EpDgEEOlyAEXkdTkqGCCCAAAIIIIAAAggggAACCCCAAAIIdLwAI/I63pQcEUAAAQQQQAABBAyBmhO1ske/mK/5QgABBGIlwL0oVvKUiwACwQL2/Sj4uNv3jMhzK0U6BBBAAAEEEEAAAQQQQAABBBBAAAEEYihAIC+G+BSNAAIIIIAAAggggAACCCCAAAIIIICAWwECeW6lSIcAAggggAACCCCAAAIIIIAAAggggEAMBQjkxRCfohFAAAEEEEAAAQQQQAABBBBAAAEEEHArQCDPrRTpEEAAAQQQQAABBBBAAAEEEEAAAQQQiKEAgbwY4lM0AggggAACCCCAAAIIIIAAAggggAACbgUI5LmVIh0CCCCAAAIIIIAAAggggAACCCCAAAIxFCCQF0N8ikYAAQQQQAABBBBAAAEEEEAAAQQQQMCtAIE8t1KkQwABBBBAAAEEEEAAAQQQQAABBBBAIIYCBPJiiE/RCCCAAAIIIIAAAggggAACCCCAAAIIuBUgkOdWinQIIIAAAggggAACCCCAAAIIIIAAAgjEUIBAXgzxKRoBBBBAAAEEEEAAAQQQQAABBBBAAAG3AgTy3EqRDgEEEEAAAQQQQAABBBBAAAEEEEAAgRgKEMiLIT5FI4AAAggggAACCCCAAAIIIIAAAggg4FaAQJ5bKdIhgAACCCCAAAIIIIAAAggggAACCCAQQwECeTHEp2gEEEAAAQQQQAABBBBAAAEEEEAAAQTcChDIcytFOgQQQAABBBBAAAEEEEAAAQQQQAABBGIoQCAvhvgUjQACCCCAAAIIIIAAAggggAACCCCAgFsBAnlupUiHAAIIIIAAAggggAACCCCAAAIIIIBADAUI5MUQn6IRQAABBBBAAAEEEEAAAQQQQAABBBBwK0Agz60U6RBAAAEEEEAAAQQQQAABBBBAAAEEEIihAIG8GOJTNAIIIIAAAggggAACCCCAAAIIIIAAAm4FCOS5lSIdAggggAACCCCAAAIIIIAAAggggAACMRQgkBdDfIpGAAEEEEAAAQQQ6GiBRjVUFGj0oFSl+b6HanR+uRpaVUy9Dq6epmF2HqPu047aC63KIW4Sn21QQ2Oo2hxVyaThltFwTSk+GipRNzkWj2111ukaLa4I/g2Ndr6bdA3NQKC9Ag1V2lH8lBZPSrfuZ9a9f1SOCot/pMrOuHf7ylyp3FFDHWWma0r+UyrZXtWKf2/Oq2r1Vx152P9uhf95eX6lvO014/qEFyCQl/BdSAMQQAABBBBAAAEEmgWSlJz1oB7Lvsw65FVd2XKtqjjVnCTiKzMQuE73b6iyPixdppkrvqNpqb0iXhV/J+tVVVagKaNXqupv8Vc7aoQAAgi0T+CCTpQ/oikjp2nh8se1tfpcYHZ1e1W0/NvKyRyv3OKDrQiuBWYT+M5Z5kZV1DlDaud0qOxxrVwwTaMmPaLXXQUQT+rgWx8EFsE7BFwIEMhzgUQSBBBAAAEEEEAAgUQS6K/MgpXKS+9jVfp9bS14QpWhh6YFNKyxdrsWF2xTne9oH105b6UWZ/UPSBP3bxp+qcJJmZqRv0WHnJ8z477iVBABBBBwI2A+cHlUs3KfdXGPO6mK5bOVU3xEIQcnuynOl8Z9md7qZ5U3YbZKaqKM5K7/rd4+HCWN6/qRsCcJEMjrSb1NWxFAAAEEEEAAgZ4ikHyNFjxxnzI8VoPrtmjenFLVRPok13hEmxY8pnJrlIXn6vu07qFrlJxoZmd+q18Ej05JtDZQXwQQQCCcQOO72vgd+4GLkciTrplLS7W3plY1J8zvX2vburuVNcD+B+Ccqgof10v1kf4BCFeYdbz+JS3M22I95DGLzNaS0god9ZVnlFlToZKl2brSLtK7X2sXPh/x35zGD47pqP2wZeDd2uavv92Olj/fK8yUXUSUGnO6GwsQyOvGnUvTEEAAAQQQQACBniyQlHa7VueP8n/o8b7zlBaVhhuVYayLt7ZAa9+xpmd5RumhNbcrLaknC9J2BBBAIN4EGlW/q0ilJ60I2ICvac2eH2tVbqYG+e/XKcqYvkhPb3lM4+1gnveAXvv5R21sjLGWXUmRKqwiPenztfm5FcrJSpW/yKRUZeau0LMvzvcH87zvbNP26vNhyjRG+P2+RnaNPF8cokv9mYW5hMMIWAIE8vhVQAABBBBAAAEEEOimAr2UNudhPXS1PcXWHJXxiDa1mO4UYl28ou8rJy3R1sXrpt1IsxBAAAG/wEd649UD1hqmHg2ceqcmh1nDNCl1upYvvM56mNOgfa/uV70/n1a8aDys8pdrrQuGas4j8zQiOVTUzVijdcStumOsPY77A/3i1yfDFHRO1W8fstrRS8NGXaGUMCk5jECwAIG8YBHeI4AAAggggAACCHQfgaRhmr3GMcU2xHSnwHXxPBqQvTTx1sXrPj1GSxBAAIHwAo0f6vjv/mqdT9VNE4Y3j4prcVWSUq6bqDHWXFTvm7v1Rhum1zZWv65X7BGAA7M0Pr13i5KaD/RW3xQ3D4H+rJoj9m7Vl+qf/2lgcxa8QiCKAIG8KECcRgABBBBAAAEEEEhsgaS0OSopulUDrGaYU2wXrP1l0y6Gwevipefp+wVZrtfFa6yt1Kbip7R4UrrSBqUGfA+btEhFxbtUFXGTjaMqmTTcuu4aLa4wP9gZIwSrdqlkdY5GO/McMlmLn/6RKsPshuitWKTLzfSZK3TI7rILZcoZYtVr2CJV2usx2eeDfzZUacfTizTFvsbML0q5wVkYldeOUCa+fDZpR1W0MTFOk2yV1JqVbjIpyp+sYX6ToRo9d6VKtle1bUfK1ra1fody/S5fVWFVuClzzSKNVat1rV3ff1mtqnYs0dWcK68Q6MECH7yjX9hBtV5XaeQVkYJqhlPKKN1gj5DzHtKvfhO0u60LyqSMRXrDXgvv3xcpI9RgPH8+53Wm3t7Aopf69/sH/5mAF86NLjyXafClfx9wmjcIRBIgkBdJh3MIIIAAAggggAAC3UDAmO6U9aAey77Mass5HdqwRKsqjrRcF++Je8NMmQpiaKzV6wWTdXnmHD22/HFtDbG5hLe6TIXLH9SMkTNVeDBa8MrK35fvNI2a+qBWbtjrX1jdd9Zbra2rvq2czPG6e3tNO3dgDGqPLuhE+SOaMnKaFq4qC9wJ0nW59aoqvkujrzLyCGXiy+dRLZyaqSn5L0YJcDrrZ9Rt+wO6yTApLKu2pqKZ572q27tRKxcYXpMe0ethApzOnJpet7GtKRN1T85QK7tavbLncJQ+OK/qPRVqmlhnTAG8+XqlRwwAtKwpRxBAIFDAW3tcx+xDQwcrNerOD84Rcg06UvNn++pO+Gneq1Zq3V5rpN2AG3TbuEtClhOw0cUlaUpNblDV9mIVzh3jeCCUbtwrn9Kmitoo95qQRXCwGwsQyOvGnUvTEEAAAQQQQAABBGyB/sosWKqZ9sLnel+7Cmbrng1VVmCojzLyH9ZsN+viNdZox7w7lPeCM6hklxPip7dKRbfMV0mLtfmC0xprOH17jot8T6p8wT1a52JEWHAJod836tTLBZqV+2xgAK9F4kjlnlJl/nTNWF4eGHxskYd5wAikli3RrXc8qYMRRyuaaf+fTh9YrwcW/zRivt7qZ5V366OqjJpfe9raW+kTstQ0Ac6rky+/rupII+wC1tWKNgXQbCtfCCAQWaBRZ8+c8Qe1eg0brH+MfIFx9lNKHfJ5K1Wjzpw+578+6qWuE9gjhr+uiQvse9VlmrniQWWGXEvPSO/c6KLfSW02HnDMWLBCRXuda+qZ98rH9dicr2rs3OJWPPxwXXESJqgAgbwE7TiqjQACCCCAAAIIINBKgeQsLV4xo3mKbV2dPvZlYa6Lt04lucMirLVkl2XumLhaBXvsD1t9dGV2gUoqD6vGnnpl/DxaWapl88b5y5L3oJ7f9l6UD5AXVFdnjuQw83xIa3b+2p+nmd+S7HT/DrzSUZWu3x2wcLsna7XeM+tQWaAr7er2MqamHjOOmcePrFZmyNErxsi26veMQJnhMO7ugHJr3t2hVVHKlTGar6b4fs0re98uVUZGylu3Qwf9Joe1t/QR5Y1rXgfKW12k+1dURJkWW6uXHn/OF2D0pGdrSWmFjlp5tjCp26ZlUfNrX1uT0q/XTQMtxJMVKg+7I6UxGbhV62o10/EKAQTCCfxN5043OEblhksX7rhXH9ef1d/CnW7tcf90+8Ea4RwxPGC8luzcrlVZ/cPk6NzowhhbXP1T7Qwxqrv5YnP08QqXDz+ar+JV9xUgkNd9+5aWIYAAAggggAACCAQIBE+xtU4OmKHH3K6L1/iunnni582j+JaWaXthrjKDdk1MSs3U7EXr9dzSUVbwzRjB9dY7+kNAfUK9Gajx63Yaed6raRnNexia+eUUlmiDf3qw8eHvd8f0QaQRYaGyD3vMCB7O+6FeeWZRQLlKztDMaOU27FPxMwf9H6496fNVtrtI+dMzHGsN9tKgrDuU/8wulc3L8JvUlS03pjifClsrGWG+urpGDZiwWrt3rlZOVqo/2NpkUqrNAfmt1caoIxXb0dak4Rp/c6pV30jTa0/pzS2vWdNqjdGe35zMtNoIvcwpBDpP4BPq0y/Z8RCkA0s6W69TIdYd9Xymrxp//0GEhxTOjS7M+oR+IGQ+SFmzOKnl0A8AAEAASURBVFtX2pt1uHr40YHtI6u4FSCQF7ddQ8UQQAABBBBAAAEEOl7gE7oopV/gh7p6Y7RafYhPY6EKb3hfxz6y0npG6bZpQ/yBpZbJeynt+iwNs08cPS7fvg32+xA/PVffoYVT0sLk2V9jb73BmtppXPzxaTV01NCSgbP08EPXOAJvzspFKtcYobh3q3bV2SbjtWLTAxHWGUzRCCPAuWJcslWAMcV5876AkYXOkn2vzUBr4XQNCrm+nJHfQyv00NV9rMsiBdesJG1uq3l9b2Xk5CnL98E6wvTa+n16Yac1QjHq74lVL34ggEAnCCTpor59w9xT21ecb70+c/Tx0gItcYzA9q2P6lu7c13o5QOcG10Yd/SmhzctHwiZD1Km3b1Cz7443wrmGSPzytw8rGhfu7g6/gUI5MV/H1FDBBBAAAEEEEAAgQ4RMNYlqlin+/3r4lmZevdr7cLnVeNmdFvKNBXbU1WPbdS0lJDRpebaXpSi/iGnszYnaX7l0SVfuTpMwKopVVJyP/VtvqCDXkXfiCHp0iEaarfjghH4tHeN1H/pg+PvW6PxjHyMINfkaCb6nCbPv8UfkIw8stDIc+p0jQ25zpTV/KQhmjrL7cjH9rTVKs+5C2bI6bVGcPPnu7XPjm2Onahro5p0UFeSDQIIBAkErqsXdLJdb33LGewvUX5urnIWleitE+YSAvcry1qL1Vu9XrPmlLb8t8X578iJfXp6eriHN2b1jJHkI+7Qv061N2ty8bCiXa3i4kQQIJCXCL1EHRFAAAEEEEAAAQTaLdBYu12LC7ZZmyZ4dPGA/v6Red53ntKi0iNR1rBzUwVj18KKH6mkuFglTy/SlFELVOFysJ+5KPvQwZ/tlJEjkWuepL79+kQu96K+Ch2LalDtUXsXSPf1DwgMflSj2rCbVLjZJCJJKVePdDnysT1ttRUv0bU3jrR+d0J9qP5Ib7x6wApuJmvMjaPUPEnazoOfCCDQNQLtXVevNbU0lxB4UE9vXqgMezrsO5tV/Eak5QPc5N9P6V8Zat1z3C7T4CZf0iSqAIG8RO056o0AAggggAACCCDgXqDxiDYteEzl9hRQY7rmqlc2OaZknlNVYYHWHax3nWdjbaU2FRepcO4YpQ1Ktb6Ha9ycb2vl8hVauaosyi6wwUX1Ukrf3sEH4/z9f+r0qQtWHVtRf2dg0Nug02fDzRH+tPol20MB44XCCBxeN1FjfNUKMb22fr9ee9PctMT48ozUDddd0vSa/yKAQDsF2rvenfEAJ+UidXYQJCltlpbmDLXa+r5e3v1b/xqibQMwRuV9IU3+O4mLZRraVg5XJYpAZ/8OJ4oD9UQAAQQQQAABBBDotgKnVLnkbq1851xTCz0ZyvvBAmWmXK6c0nWaaU2DkrdKRfeuU2XY0WEWUGOtXi+YrMsz5+ix5atUtNfewbbbAtKwYIGUibrH/qB+8jX92D/ixjmt1tgFeOpMZYUeyhicI+8RQCCqQOB6dxeOHNcfo17j1ZnTf7FSuRiRGzU/Nwl664qRV6mXldRdPSPn2znLKkQuk7PxK0AgL377hpohgAACCCCAAAIItFvAXBfvCS0rszYeMHYHzMhfoQUjrMmOyVlavGKGBtjl1G3TshUV4XcbbKzRjnl3KO+F6hAjLIzAzbi7tMRc+Nz8XrdDBysLdKWdd7f8+Q/q19//cVX1Z867a+XZM6q31yT0JKvfReE+lvxFpxuiz01ubDitM3bJF/dTcrjs7DTt/tlb6ROyrHX+nBt2OKfVpmryraPDbCDS7gqQAQI9UsCTOlhD7JafNv6/t+8j9rEWP53T/5M1LO0zLVIkwoGuv8clgkrPrWOn/xPXc2lpOQIIIIAAAggggECsBRprSpWTt8VaF8+Y6Xj1fVo9Z5hjPThjypKxptFj2fZC4uaugMu1qiLUmkZGUPCNZ7Rujz0Cb6Cy5q3TtnePq+aEsQHEiaN665klyjEXPje/p2f0gCBOslKH2h+M/6qjxz90sc6gc9Sa8RtySZpSw25m8Wcd+701TTXsL5PRL7+v0UfWec8Xh+jSKHuQhM2qFSeS0q/XTQObpv1639ytN4zIZGPV8/reXqu+A7M0Pj3Rpkq3AoCkCMRC4NKr9c/W/3c6eVAHP4gS6G/8UMd/91erpp/X4NRPtbLWXp0ozvYvnzBs7o7Iu2z7cg/cYMPTP8V4hGR/tS2/WNzj7BrzM/4ECOTFX59QIwQQQAABBBBAAIGOEDDXxVv4lKrsz3kDbtWG0jlKaxHk6a/MgqXNU2z1vrbm3a+SGnvtN7syxjp6uyv9m2UMnPeknl40TRlhg1BGwOqdAzpiX94tf/69Lh18WfMi7CVFesk/1C5cg52j1ozgasTAW4P2bX6l5a6Pzqwbj2nn5v1dv7lE0nCNvzm1qSbeA3rt5x/oD78+qKYwb/TdcZ1N4DUCCLgUSErTyH+2t485ot2v10R4eGA+fNmul+xdtgeO0IhLm4LvLkszknn0+X8a0bzLthW0j3y98x5n7EY+9DLHQx2P/jEt1T/t1n4IEDG/WN3jIlaKk7EUIJAXS33KRgABBBBAAAEEEOgkgaB18XSZZq54UJnhgm7BU2y9+7V24fORA0gRa27sXlv+mOYuLg8xBTfihQl20tj4YdxMTfGvM1iugtlP6mDYdQbrdXD1fBXYo9aMfpkya0zEXV3NHYUXrP1lmOnORn5rC7TWv/5hV24u0VsZOXnK8sUFzNGIv9GB/ces/nOz226CdTXVRSAuBIzlESZmWsshmJsUPaJNLR66WBVtqNAqx07lA2++XuktHuREb5Rz9K28P9e61RGWX5Bx79++Uuvse5xnhG6fcbljFLg5Mvx63ey/Z+7XcyW/CnN/M+tm5LfrB9pk3+MG3KDbxvm3vYheeVJ0SwECed2yW2kUAggggAACCCDQkwVarot35byVWpzVPwKKOcX2O3pu6ShrdJlkBpAWlR5xjPb4lFKHfN7Kw9itdMMDunv1DlUFBK3qVbW92NjJdrzG5T4buGtt4xmdORt1QacIdXR56qIU9bcHnVx4Wz/bF2qasMu83CRLHqPcuSOa3arXK3tingq3Vzk+nBofRiueM1ymKHtDlT+46bl6lnKvjdQvZgXO6dCGPN2ZX6zKWnuUpNHHVTuC8jPXP/yWJnfl5hIpo3TD2GSjjsbvw7bVetLardYzLk9zM5hW6+bXhzQItE7AuFdfO12T7em1xkOXlRO/rsXFlTrhv72a9+HVyp14r7baO5V7rtO/5lwVEFBzXW7SVbrrUXstVXP5hQXG/egH2lHl3OXcvCftUlH+1zVxwU+tkdvmPelhzU6z1xG1Sgy4Z4a6v5npQuUX5YGU6waRMNEFPpnoDaD+CCCAAAIIIIAAAgg4BUKti7fuoWscU5ucqZ2veyltzsN66LVsa4dba7RH1ibl+D6IeTRo2i3KKjygCt903ZOq2LDA9+3MJexrb4NOn/2b1NmBpov6NhXhq6MxTXjOl7XVrJRnvNbs36BpHV6+4Zb7fW04NlM59qYidXtVtMD8DqshT/p8bQ451dl5TR99Kf0zOlZdo0NlK4z8VzhPOl4bG41MWKa1AesfOk532stLdO2NI+XZa4y8PFVnfXhP1pgbR0UcZdhp1SFjBHqCgBVYe2mOtf6pt1pbl88xvsM1PlKQ/6hKJk3WyuqmhwS9skv1bmGm/8FEU47mg54F+v68I5rlexBhBN/K1mqh+R2uSCOH8Pck89+ax7TiwJ1a6Ftz1cwv0v3NLKSPoj+QClsZTnQzAUbkdbMOpTkIIIAAAggggECPFgheF88zSg+tuT3EunhhlJKGafaa+5Rhj2gzR3vMelSV9qi7lMla8+J8XWmfD5ON7/CAcbq39HmtGmeO2DK/juntdzp5dJxZjOcKfXWSvXmHecD68r6v4x/8l/2ug38a6wwWbte2peObdwAOW4LxgTR7pbY894BGhJvq7L/2U7r8vjVaf1t60AdrfwLjhZHfbU9q84ZsDWrDtDlnTq1/HTS12MzA05XTe1tfY65AIPEFmgJr613db4xNiZZuUkmuc5OjtgikaMSiYm1xXeYWvbIxwj3JWOtv2obnVBTx3mbV05OumYU/1LOL3DyQakvbuCbRBAjkJVqPUV8EEEAAAQQQQACBMAIh1sUr+r41mi7MJSEOJ6XdrtX5zVNsVbdNy1bYayIZHyBHLNCuAzu0ZuldyrLXObLzMT9wLS7QstIKHd1fom9lXaMsc8SW77yxccOr+13seGhn1tafVlBt3d1B9Tur02f+u62ZurguRRm5G/XWu6bNtzQzvXmfRt/FRmAzb+l3VVL5K+0qvCXCJiFBRSWl6voVP9bu0keUN25g80mftZXfihtjEMSzqpI8Wl+fam16YRzyjJ2oazt81GNzs3mFAAKmgNv7TbmKc0e4GJHtRtVZZsv7vyc9W/lLnzB2Mv+5uzJ997aX9F5lqZaF+PfEn5/x782q7J6wC7qbPiCNKfB3/2N8dQRF2qDmf7zM/GpO1HZEtuSBAAIIdIkA97AuYaYQBBDogQL2/ZW/DXtg57e5yc6pbgM0s/Q1rcqyRzW2OdPOu9AYBVoy056ObaxhVbrVqG+0df86rzrkHFqAe1FoF44igEDXC7T3fsSIvK7vM0pEAAEEEEAAAQQQQACBbiLQWP2Snrd3lBx4g74edfOObtJwmoEAAgggEBMBAnkxYadQBBBAAAEEEEAAAQQQSHyBU3pzy2s66WuIsaD+NycrvcvX6Ut8RVqAAAIIIOBegECeeytSIoAAAggggAACCCCAQA8WaGxo0Dm7/Y21qly7RMvsnXoHfE33zhwi4ng2ED8RQAABBDpD4JOdkSl5IoAAAggggAACCCCAAALdTSDpzFbdftUKHWrRMGM03tw7NDbqLrwtLuQAAggggAACrRJgRF6ruEiMAAIIIIAAAggggAACPVbgohT1b9qC2EHg0YAJy7R2zjBG4zlUeIkAAggg0DkCBPI6x5VcEUAAAQQQQAABBBBAoLsJJP8f3ZA5sLlVA8Ypb92P9crGbA1iTm2zC68QQAABBDpNgKm1nUZLxggggAACCCCAAAIIINB6gaHK+clh5bT+ws6/IilN0zbu07TOL4kSEEAAAQQQCCnAiLyQLBxEAAEEEEAAAQQQQAABBBBAAAEEEEAgvgQI5MVXf1AbBBBAAAEEEEAAAQQQQAABBBBAAAEEQgoQyAvJwkEEEEAAAQQQQAABBBBAAAEEEEAAAQTiS4BAXnz1B7VBAAEEEEAAAQQQQAABBBBAAAEEEEAgpACBvJAsHEQAAQQQQAABBBBAAAEEEEAAAQQQQCC+BAjkxVd/UBsEEEAAAQQQQAABBBBAAAEEEEAAAQRCChDIC8nCQQQQQAABBBBAAAEEEEAAAQQQQAABBOJLgEBefPUHtUEAAQQQQAABBBBAAAEEEEAAAQQQQCCkAIG8kCwcRAABBBBAAAEEEEAAAQQQQAABBBBAIL4ECOTFV39QGwQQQAABBBBAAAEEEEAAAQQQQAABBEIKEMgLycJBBBBAAAEEEEAAAQQQQAABBBBAAAEE4kuAQF589Qe1QQABBBBAAAEEEEAAAQQQQAABBBBAIKQAgbyQLBxEAAEEEEAAAQQQQAABBBBAAAEEEEAgvgQI5MVXf1AbBBBAAAEEEEAAAQQQQAABBBBAAAEEQgoQyAvJwkEEEEAAAQQQQAABBBBAAAEEEEAAAQTiS4BAXnz1B7VBAAEEEEAAAQQQQAABBBBAAAEEEEAgpMAnQx7lIAIIIIAAAggggAAC7RRIG5Tqz8H52n+QFwgggEAXC3Av6mJwikMAgQ4XYEReh5OSIQIIIIAAAggggAACCCCAAAIIIIAAAh0vwIi8jjclRwQQQAABBBBAAAFDoOZErezRL+ZrvhBAAIFYCXAvipU85SKAQLCAfT8KPu72PSPy3EqRDgEEEEAAAQQQQAABBBBAAAEEEEAAgRgKEMiLIT5FI4AAAggggAACCCCAAAIIIIAAAggg4FaAQJ5bKdIhgAACCCCAAAIIIIAAAggggAACCCAQQwECeTHEp2gEEEAAAQQQQAABBBBAAAEEEEAAAQTcChDIcytFOgQQQAABBBBAAAEEEEAAAQQQQAABBGIoQCAvhvgUjQACCCCAAAIIIIAAAggggAACCCCAgFsBAnlupUiHAAIIIIAAAggggAACCCCAAAIIIIBADAUI5MUQn6IRQAABBBBAAAEEEEAAAQQQQAABBBBwK0Agz60U6RBAAAEEEEAAAQQQQAABBBBAAAEEEIihAIG8GOJTNAIIIIAAAggggAACCCCAAAIIIIAAAm4FCOS5lSIdAggggAACCCCAAAIIIIAAAggggAACMRQgkBdDfIpGAAEEEEAAAQQQQAABBBBAAAEEEEDArQCBPLdSpEMAAQQQQAABBBBAAAEEEEAAAQQQQCCGAgTyYohP0QgggAACCCCAAAIIIIAAAggggAACCLgVIJDnVop0CCCAAAIIIIAAAggggAACCCCAAAIIxFCAQF4M8SkaAQQQQAABBBBAAAEEEEAAAQQQQAABtwIE8txKkQ4BBBBAAAEEEEAAAQQQQAABBBBAAIEYChDIiyE+RSOAAAIIIIAAAggggAACCCCAAAIIIOBWgECeWynSIYAAAggggAACCCCAAAIIIIAAAgggEEMBAnkxxKdoBBBAAAEEEEAAAQQQQAABBBBAAAEE3AoQyHMrRToEEEAAAQQQQAABBBBAAAEEEEAAAQRiKEAgL4b4FI0AAggggAACCCCAAAIIIIAAAggggIBbAQJ5bqVIhwACCCCAAAIIIIAAAggggAACCCCAQAwFCOTFEJ+iEUAAAQQQQAABBLpYoLFWlaXFKlmdo9GDUpXm/B4yWYufLtamilo1Rq3WUZVMGm5dP1xTio9GvSJyAmd+12hxRUPk5Jx1CDjtOqIvHFm3+aWzTqH6M9r5NhfMhQj0LIGGKu0ofkqLJ6UH3s9H5aiw+EeqrL3QKR6NtZXa9PQiTRni/HckXVPyn3L5b4ijWjFqg6MGvEwwgU8mWH2pLgIIIIAAAggggAACrRcwA3hPLNey9XtVF+5qb7W2rqo2zq7QYwPGa8mGlcrJSAmXmuMIIIAAAjETuKAT5av1wD3P6pA3RCXq9qpoufldpKylT2pN7gglh0jW6kPGvyWvf/sBzX+hWi2LPadDZY8b30+pZMJj2rwhW4OSIpUQozZEqhLnEkKAEXkJ0U1UEgEEEEAAAQQQQKBtAo1qqCpW7uivKidSEC8487pyrZw6RbnFB8XYuGAc3iOAAAKxFDDu6xWPalZumCBeQNVOqmL5bOUUH3Ex0jrgwpZvGmu0Y94dygsZxHMm96puzzLNWlIe4d+PGLXBWU1eJ6wAgbyE7ToqjgACCCCAAAIIIBBZwPigdPBJ3Zm9QhV1zWMnPOnZyl/6hLa9e1w1J2r930crS7Vscbau9Ni5mh8AH9Di7TXt/wBoZ8lPBBBAAIH2CTS+q43f2dY8utqTrplLS7W3xr6f/1rb1t2trAH2zfycqgof10v10RdNCF+xC6opXaaCPSebkphlLv6uSioPW/+GHNfBneuUN26glYURzCtbrlUVp0JnGZM2hK4KRxNPgEBe4vUZNUYAAQQQQAABBBBwI9BQoVX3FjVPuzI+eN1SXKH3frJaeblTlJEcOOcpKTVTs+9erV0HXlBeeh+rhJMqX7xMm2o6Z50lN80gDQIIIICALdCo+l1FKj1pPZwZ8DWt2fNjrcrNdExjTVHG9EV6estjGm8H87wH9NrPP7Izaf3P+le1qnC/NZ22jzLyV2v53d9QZmovK68kJWdMU/7GZ7Vmgh3Me1+7Nu9TfYvSYtSGFvXgQKIKEMhL1J6j3ggggAACCCCAAAIRBE6pcsVybbVH4nkylPdiqZaPT1Vg+C5EFsnXKP+5dZrp/wB4UJuK9kWYIhUiDw4hgAACCHSCwEd649UDVkDNo4FT79RkfzAtsLik1OlavvA6NY3La9C+V/eHCKoFXhP63XlVlRSpwoodeq6+T6vnDAv9b0lSmibP+5rsUJ73zd16o8VIwFi0IXTLOJqYAgTyErPfqDUCCCCAAAIIIIBABIHGml36wc73rRTm6IkVWjCiFRtXJGdpof8DoDFFaudWVbT4MBahApxCAAEEEOh4gcYPdfx3f7XyTdVNE4aHDqj5UiQp5bqJGmPNsA0dVHNRxcbDKn+51kqYrDGzblJahCdCSenX66aBdqGH9KvfnAssJBZtCKwB7xJcgEBegncg1UcAAQQQQAABBBAIFjiv6m3bVGUvi+cZpdumDYnwYS/4evO98QFwSp7mXD1eeUsLtGTJrbo6aCpuqKuMnTW04+lFmjIkVWmDrO8hk7X46R+psrYDp+ea5RQ/pcWT0pvLMcvzlbVJO6paTuYKrO9RlUwa3nTtsEWqNKwaaytVkj9Zw5z1Lq7UieBlpTqy7EHZKqk1O8rclGSXipzlDxqq0XNXqmR7VdtGQ7a2L+p3KNffb19VYdX5QLIQ7xqrVuta2+tfVqsq2CrENZ15yOzDTaF+L4w6Dpu0SEXFu1TVEONKdiYAeXd/gQ/e0S/sabW9rtLIK3pHbnPKKN0w1tqv1hsiqBb56qazDe/r2EfWPyi9Jui2SZ+LfFXSCOX/+1Fr7bxfalVW0H65sWhD5BpzNsEEPplg9aW6CCCAAAIIIIAAAghEETipg2994E/jGTtR16ZEGD7hTxn0wvwwtmNj0MFwby/oRPkjeuCeELsoequ1dZX5XaTx657VD6antTKo6CyzXlXFSzR/eXnzQu/O03ZZekLPZRfo4YKZLdYCdCb3v24o19Jb722eimyeMPLatf+MFubaqTqpbBl22ws0a8FPg9pkjITcu1Erje+1P7xT67+3SNeHmUJn17DpZxv7ImWi7skxps9tOGpkU6tX9hzWgowREfrKCBjvqVDT0vfGFL+br1d6G37NAuvexneNtXr92w9ofoTdNL3VZSo0vlX4nDHNvFj5rRmh2sZqcRkCHS3grT2uY3amQwcr1Rr4Zh9q+bO3+qbY69g16EjNn6XgwFrLiwKOeH/ztn5hxfE8o7+i9KhlBlze4k0s2tCiEhxIaAFG5CV091F5BBBAAAEEEEAAgRYC9b/V24ft0W/GNKgbR6kVk2pbZBf9QKNOvWwEonJDBPECLjY2zlhwj9a5GOkVcJn/jbHuX/50zQgXxPOnM1+c06GyJbr1jid1MOoIrD/pZ8sd6wn683HadVbZ/0+nD6zXA4uDg3j+SvheeKufVd6tj6oyalva0xe9lT4hy1rbyquTL7+u6kiD1wKm20Wb4hfYng5911ijHfPuUF6EIF5Aed4qFd0yXyVs4BLAwptEEGjU2TNn/LuI9xo2WP8YtdqfUuqQz1upGnXm9Dn/9VEv9SXw6o/GbrhN/6J4dMnQy9Q0vs54YFDxozaMIo5FG9y1lFSJI0AgL3H6ipoigAACCCCAAAIIuBE4W69T1ugJ6TMa8oWgaU1u8mhVGmPkWPV7xmgyj/5/9u4FPqryzv/418ZpWVwwENHYUiANIFbJGlgqakUTQLFVwSCpl/9ShaQRYasW5Wq3tZUAQaqtdDGEi8XiJVyEbVUqElRqi8UYGtoVgRigtGIxEGF1abOp/3OScyYzw1zOZG6ZyWf6SjNz5jnP5f2MJ5zfPJfMkXdp0fNvWVOq6lW3a4MWFOZYi62bme7VyiWb27Hg+inVVXxbUyrtdf+MrDJHqmTxBlUfMMpp+XlHW1c+pJKR9jLr5qC6cn27tCr41NRTv9bajUa+Rn5TV1Zpb0te+1X9/OO6e+R5RkExLFv12vSj1S07C7tyCjXbXX699m5bqdmedkfW6cFQbTGWwI+kL7zWtjpcpS21gafXNte+ohfsKX698zU6J8QUP7P7o/4wd79cqDkvt44LlLppsDESc/m2d9o+g0Z/mpYPThmpTLv8pmo9te6PYQY07JP5jUCiBP6hk8carY0u2lOHJn3YcEL/COvUJiP495F1Rpp69OymtMbfquzGr2jkpO+qrLLWoz7WKOLpBRp+4+IAX6Ikog1hNZjESSBAIC8JOokqIoAAAggggAACCDgX8Jq2pLPVMz3CeVCOijYCKFN+phdWzFRBrsf4v/RcTShbrqWFfd25NL27T4eCjfRyp/R40rhdFSuq3TeMrpxpqtxcrhnjc63RIWbaLuqXP1EzVmxU5ZRcK3ho3FhWztOCqqMemfl7OlAlS3+i7+Tbu/qmKT33q63TcmNadqOOHGlW5jULtfn5hSpyl2+sUpiVp6KylVrj1ZZHtCzkiMYI+iLtQo2+IcsCap1e67+rjur1Z16yptUam6l8c2xiptU279KKR1+1PhdGPeZWan1ZsfJ8piCblnfOXKLVc4e7PxeH33hbf/L3UeAYAikl8Bl165nu8WVKuI37uxqN4J/7cewNlU0sUXmtzwYW7gStT5pql6hwzHcdjCL2OdHvy0jb4DdTDiaxAIG8JO48qo4AAggggAACCCDQQQR6367v3X+ZR1DNs169NOLW66wpm8bxD4+pMawhIcaoq61rtfGIvUjTaJWuuldDA26+kaGhRtCmdKQ9EvGgNq7ZHnwUYMARZXEoO/NmPVw2Xv38ri9ntOX+Ut0/pJsFGiy4ZiWJqC+6KreoRPktsd8g02sbtutpe1fkdm2m4vn5iOC55yL8IevRRdmj8jXILm7vfrXsM2K/5jcCKSmQpu49egRZ6zKcRp/S7qU/aA3iuXI0YdajWrdrf9voV2ME9qJZhRpsf3fkaBSxk/Kj2QYn5ZGmowsQyOvoPUT9EEAAAQQQQAABBMIS+EyPnjonrDMiTRx6o4O0PgM00L65O2VMhbWnZDoq+m86tP+gNerKKMsINI0NuXnH5zV22i3u4GHwUYDB6h+Hsm8arxEBg5IGUNoA3XS705FkwdrSih2yLzx3ufQ7vdYIbr66WdvtuGp7N1Nx1PchEmUUqGKfNbV63zIVhPpcdM9QL/tzGCJr3kYgNQS816SLSpsyr9eil5/TgrvGeW8mZIzALrirVE+W32pNYzdHRDsZRRyqVjFoQ6gieb9DCxDI69DdQ+UQQAABBBBAAAEEwhVIS++pHu6T/qT99R+7X8XmibVuUrDMu/dQqBhL4NMbVb/X2Gmx5XGWBvY/39HoEq+A1Qd1qg+4UUSw+se6bCebRKQpY8gwhyPJgrXFIgzZF+fpqq8Ns6bi+RsB+IFee3GnFVj13BDEyr9D/WpdkH95RYWWPzFT44ZPV5V7/cgOVVEqg0CMBCJdk863WunKf2C2Cnymr7elMpYlyJ+m6e4R0f6uIW2pnT2LdhuclUqqjitwZsetGjVDAAEEEEAAAQQQQKAdAr37a1AXaXfLNoOn1HDc3LDAnmbajvwSfsr/6NjR1j0TzXXwMno43FTBDliZgZumRh07YcznDTuaGOuy47WGYTidaAQOrx6jK11bjKCXNb32/qHKtaf+NuzQS683tmboGqbrrjY3BEn8o7l+m1a/sldHdxg7aW61N79IfL2oAQLRE2hbK6598WiXzsnorvBGM31W6cY5MrYzanl0uUa33fj5EE2yvgzYusUI+Dfpg70HjQ2Hhlq7pyeiDSGqy9tJJxDeZzjpmkeFEUAAAQQQQAABBDqdgOsCfeUKO3DXqO0v7gi+PlxAIGMK5fpv6aIbZ6rcGNG0qqqeXT4DWqXYGxljdHfRwNZGHX5Jz71mbxbiOa3W2KX4pgnKDzs4GmWr5nq9MmesLsqbpIfnLSCIF2VesutIAt5rxZ3as19/Dlk9P7vOhjzHM4HL2Kn27LYDA/srK+T0dO96Nh1tUNvWGN7vxacNbdXnWWoIEMhLjX6kFQgggAACCCCAAAJuAc+pkcZgtNc367UG/3uPuk/x+6R1CuWp2kqVzSvVI5sPKKw9Kvzm2Z6D/6yevYwhhi0Pe4Shg3xOHJe72a509ezenn/6x7rsj3SsMfTYmubGYzpuN/mcnkpvT1Ps8x397qqca/KtNQY9NwvxnFabpbG3XpHYsZ7NddowZaJKnq61pvp6Ns4INI78lmbPndP6s3iDqrfN0WDPJDxHIMkEXFn9NcCu8zHjuhDy0u65PEC6BmWfa5/t8LdLX8jOMsZCWw9HZdqJ/f+Ofxv814OjySsQ8z+ByUtDzRFAAAEEEEAAAQSSU8CeGmnVvulV/Xj5rrBH0zXXvaCn7SmU6qsbxlxsrZsWb5V0ZQ20bz4/1t797ztoi+fIMaO+52UrK9iGEgGbFOuy/6p971nTVAPWoVmN79XpA+t91wUD1Mee5hrwnMjfSMsZpa/3bh16YweDm2ue0o+3WvUNuNNv5GU7y8FweW2FFr9sT6Ptrfwpiz120dyrN1bMVlFxcevP+NzEBh2dNYpUCAQX6DNEl1v/XepwtaoPhfgioPl97X/XXif1i+qfdVbw/P286/qXS3W5PQov6Hqj9snem1N0GdRfX7DfMn8noA2exfM8+QUI5CV/H9ICBBBAAAEEEEAAAV8Bz6mRxlilw0una26VPT3SN7Gf142/1eL7HleNdY/oGnK7iq/q5SdhPA59Tn3697WCiEZblpdrk3uoXaDyPUeOSe0PfsW6bGPq85oXVBdsVE3zPj2/Zoc14iyOm0ukXajRN2S1Ajft1EuvHtKf3qpWa9gs9O64gXomesdPqmbzNmvlLqM+Ux7TEzMLvHfR9CrMCO6+vVN7vI7xAoEkE0jL1rDLM6xK79HmV+qCfLFhBrvXa5O9S3jvoRrax47IhdFuz52sHX0x5Hn9Tdfll17g/SVQItoQRnNJ2vEFCOR1/D6ihggggAACCCCAAAJhC3RVbsn9mpBp37Qd1NqSIs2qrDEWHQ/+aK5/UXMnlqi81l7VqK/GTRun7DiMAvNfM2OE4cgJGme3pWmL5tz5mKoD7kLboOqF0zTHHjlmjCYcd/uV1kLr/ksIfDT2ZTe9/bimP/LbAP1itOWROXrkbasv4rq5hPEZKipRfstHyBwJ+Xvt3LHPonKy225g1fi/Y+xeu+VhTZ5lLr7PA4FkFuim3DF5ymxpghHMLntIq+rszYB82tVYpQVz1rUFu28YpZx2Xcc9l2swv0yZp8XVDT6F2S+N4GHVEi22r79+r1mJaINdP36nggCBvFToRdqAAAIIIIAAAgggcLpAer5m/bREg+1YXlOt1s4o0PCWzSs2qsYrEGbcfNVs1PKFRRqRN1XPuoN43TR4ynzNyk/UaDyrWelXqnjyUPeojqbaJSocU6Ky9Z6BSSNYU7VaZZPHqXBpjTtgE/FowpiXfVK7l5bojhkV2lZv35Cb/bHBpy3Gze+M72hsPDeXcI/EMW7e1y3UY9ZUa9fIEk3Odbh78OmfzCgdOUtZA75o5WWOOr1Xdy3c4PO5blDN+grDcbRGFj+p3Z5RvObjOn4i2FDIKFWTbBCIqkCa0q8ar7H29NqmHZo/5huaVbFNB9wfZ/Nzv1DFY6Zq7RF7WPXVuqfoErUrjmeclTHuO7p/SLfWljTVqPyWST5lGm811mjDwhJ9fdIzVvAw0DUrEW2IaieQWYIFzkxw+RSPAAIIIIAAAggggECMBIybpaH36slnpTtuWeIOYjSZm1cYP5p3X4hyzSBeuZ6ceVkHWFusi7KLf6Kl+yaoqPJga72PbFX5dPMncDNcOdO0ZuWkCEcTxrLsbvpyzrnaV1un3ZWlRttKAzTG2Ljhmgf1yKRB7bwRD5BtyMPWSJytxki2o0esm/M4Tu8NWj+X+hXcovyynapqiVUcVpUxhdz8cfRoatSxE8b2LfEMjDqqGIkQCCGQdom+9YObtckOmJlf0sybZPwEOi9QQM1Mv1fLbxyr+bWtXyJ0KVypXWV57i9N3DmmDdKdix/UW7c+qC1mcDBkmSGuWVFtg7uWPOkkAozI6yQdTTMRQAABBBBAAIHOKWAG86Zr/cvLNHVkb+cEmSM1deUmre8QQTy72r2UV7Ze6+aOtqaV2cf9/TaCkIXz9czqezW0XZtc+OYZq7LP0kX/vkhLbss5/cbZXQWjLbc9pjVLC9WvfcNp3DmF/8RnarGZgd+pcuHnHJUzMsZq0bPT2kadBsu05TP9lBaMTLdS7dObb4exbmSwvHkPgbgKGNf1/Ola4uhaaGwCM3eVlhdH/iVAWlahntj8jGaH/Fvi5JqVmDbEtZsoLGYCjMiLGS0ZI4AAAggggAACCHQUgbSs0frOitG6p36bVr+yV0d3/FzlW+3dPq1aunI0Yfr1umDgKE3Mz4rzyC+nUhnKLV6mNyYYU7jW/lq/+0WF1rqnARt5GMGakslXa9iom5WX1cVppg7TxajstCyNKn1Om0dVqnJNRVu/tPTHBF17bSza4rDJZrL0K/SNm7K0dunelpNcI8boqg4ziq01UL1xZ77xedisl1asUpU9ldCs7WmfaWPDi+PD5DJHGBqrEm5/cYcaxhe0c/3EFg7+D4EECcToehSqNelDVbRii0ZVrdMrO1/VqqVbrZG65onmztETdd01BSrIzQiVk/F+gtrgoGYk6dgCZ3xqPKJRxex+1o5OVmZ1B+qjkS15IIAAAnER4BoWF2YKQQCBTihgX1/5t2En7PyATfacypapCStf0oJ8e5RYwJMS90bzHi2fUKj5LRtu9DXqu9aob4LXTEycRtKWzLUoabuOiiOQcgKRXo+YWptyHwkahAACCCCAAAIIIIAAAtESaK7dpKfsXXN7X6dvXEUQL1q25IMAAgggEL4AgbzwzTgDAQQQQAABBBBAAAEEOoXAUb3+zEtqnYRtLJj/zbHKifs6fZ0CmkYigAACCDgUIJDnEIpkCCCAAAIIIIAAAgggkNoCzY2NOmk3sble2x6ZrQftXYIzr9fUCQM66NqJdqX5jQACCCCQ6gJsdpHqPUz7EEAAAQQQQAABBBBAwJFA2vG1+rdLSrX7tNTGaLzJEzUiKjsAn5Y5BxBAAAEEEHAswIg8x1QkRAABBBBAAAEEEEAAgZQW6J6hXi7fFrqUec2DemTSIEbj+dLwGgEEEEAg7gIE8uJOToEIIIAAAggggAACCCDQIQXS/0XX5fVuq1rmSJUsfk4vLCtUP9bGa3PhGQIIIIBAwgSYWpswegpGAAEEEEAAAQQQQKAzCgxU0X+9o6KO2PS0bBUs266Cjlg36oQAAggggIAhwIg8PgYIIIAAAggggAACCCCAAAIIIIAAAggkgQCBvCToJKqIAAIIIIAAAggggAACCCCAAAIIIIAAgTw+AwgggAACCCCAAAIIIIAAAggggAACCCSBAIG8JOgkqogAAggggAACCCCAAAIIIIAAAggggACBPD4DCCCAAAIIIIAAAggggAACCCCAAAIIJIEAgbwk6CSqiAACCCCAAAIIIIAAAggggAACCCCAAIE8PgMIIIAAAggggAACCCCAAAIIIIAAAggkgQCBvCToJKqIAAIIIIAAAggggAACCCCAAAIIIIAAgTw+AwgggAACCCCAAAIIIIAAAggggAACCCSBAIG8JOgkqogAAggggAACCCCAAAIIIIAAAggggACBPD4DCCCAAAIIIIAAAggggAACCCCAAAIIJIEAgbwk6CSqiAACCCCAAAIIIIAAAggggAACCCCAAIE8PgMIIIAAAggggAACCCCAAAIIIIAAAggkgQCBvCToJKqIAAIIIIAAAggggAACCCCAAAIIIIDAmRAggAACCCCAAAIIIBALgex+We5sPZ+7D/IEAQQQiLMA16I4g1McAghEXYAReVEnJUMEEEAAAQQQQAABBBBAAAEEEEAAAQSiL8CIvOibkiMCCCCAAAIIIICAIVB3oF726BfzOQ8EEEAgUQJcixIlT7kIIOArYF+PfI87fc2IPKdSpEMAAQQQQAABBBBAAAEEEEAAAQQQQCCBAgTyEohP0QgggAACCCCAAAIIIIAAAggggAACCDgVIJDnVIp0CCCAAAIIIIAAAggggAACCCCAAAIIJFCAQF4C8SkaAQQQQAABBBBAAAEEEEAAAQQQQAABpwIE8pxKkQ4BBBBAAAEEEEAAAQQQQAABBBBAAIEEChDISyA+RSOAAAIIIIAAAggggAACCCCAAAIIIOBUgECeUynSIYAAAggggAACCCCAAAIIIIAAAgggkEABAnkJxKdoBBBAAAEEEEAAAQQQQAABBBBAAAEEnAoQyHMqRToEEEAAAQQQQAABBBBAAAEEEEAAAQQSKEAgL4H4FI0AAggggAACCCCAAAIIIIAAAggggIBTAQJ5TqVIhwACCCCAAAIIIIAAAggggAACCCCAQAIFCOQlEJ+iEUAAAQQQQAABBBBAAAEEEEAAAQQQcCpAIM+pFOkQQAABBBBAAAEEEEAAAQQQQAABBBBIoACBvATiUzQCCCCAAAIIIIAAAggggAACCCCAAAJOBQjkOZUiHQIIIIAAAggggAACCCCAAAIIIIAAAgkUIJCXQHyKRgABBBBAAAEEEEAAAQQQQAABBBBAwKkAgTynUqRDAAEEEEAAAQQQQAABBBBAAAEEEEAggQIE8hKIT9EIIIAAAggggAACCCCAAAIIIIAAAgg4FSCQ51SKdAgggAACCCCAAAIIIIAAAggggAACCCRQgEBeAvEpGgEEEEAAAQQQQAABBBBAAAEEEEAAAacCBPKcSpEOAQQQQAABBBBAAAEEEEAAAQQQQACBBAoQyEsgPkUjgAACCCCAAAIIIIAAAggggAACCCDgVIBAnlMp0iGAAAIIIIAAAggkv0BzvbatrNDyhUW6ol+Wsj1/BozVrCcqtKqqXs0hW7pXy2+80Dr/Qo2r2BvyjOAJPPO7TLOqGoMn510PAU+7aPSFR9btfupZJ3/9Gep9pwVHKx+n5ZEOgQ4m0FijDRWPa9aNOd7X8+FFKqv4ubbVn4pihT9RzcJrvcvx/Bvi5/lFM7apKVQN4tqGUJXh/WQQODMZKkkdEUAAAQQQQAABBBCISMAM4D06Tw8u2aojgTJqqtXaBbXGu6V6OHO0Zi+dr6LcjECpOY4AAgggkDCBUzqwZaHuvftJ7fYXKTuyVeXzzJ9y5c99TIuKhyo94roeVvUbhyLOpS2DRLShrXSeJa8AI/KSt++oOQIIIIAAAggggEBIgWY11lSo+IprVRQsiOebz5Etmn/TOBVXVIuxcb44vEYAAQQSKWBc16t+oNuLAwTxvKp2WFXz7lRRxR4HI629Tjz9RcMf9OY70Rrhl6A2nN4qjiShAIG8JOw0qowAAggggAACCCDgRMC4Uap+THcUlqrqSNuQDVdOoWbMfVTrdu1X3YF698/ebSv14KxCDXbZeZs3gPdq1vq6yG8A7Sz5jQACCCAQmUDzLi37j3Vto6tdOZowd6W21tnX87e0bvFdys+0L+YnVVP2I21qCL1oQrCKNR/ap732n5Led2mduzy73NN//7EsT3YtvPJOUBu86sCLpBUgkJe0XUfFEUAAAQQQQAABBIIKNFZpwdTytmlXxs3eLRVV+uN/LVRJ8Tjlpqd5nZ6Wlac771qojTufVklON+u9w9oy60GtqovWKAyvInmBAAIIIBCWQLMaNpZr5WEropZ5vRa9/JwWFOepn/uSnqHc8TP1xDMPa7QdzGvaqZde/SCskrwTG18MvVcnOwfXBQPUx12ed8rQrxLVhtA1I0VyCBDIS45+opYIIIAAAggggAACYQkc1bbSeVprj8Rz5ark2ZWaNzpLIe+90i/TjNWLNcF9A1itVeXbmWIblj+JEUAAgVgIfKDXXtxpbSDhUu+b7tDYrC5+C0rLGq95D1xtjYhr1PYXd6jBb0onB0+q9s3dVrldNGj4xWr/CqqJaoOTdpImGQQI5CVDL1FHBBBAAAEEEEAAgbAEmus26qfPH7TO6abcGaWaPjSM2670fD3gvgFs0pHn16oqwmlZYTWAxAgggAACpws0v6/9735sHc/S16+5MMiXM2nKuHqMrrTmtja9vlmvtfs6/lfV7bFXTO2jy/+19+l1c3okYW1wWkHSdXQBAnkdvYeoHwIIIIAAAggggECYAp+odt061dhrGbmG67aCAUFu9vxlb9wAjivRpCGjVTJ3jmbPvlVDfKbi+jvL2FlDG56YqXEDspTdz/oZMFaznvi5ttVHcXquWU7F45p1Y05bOWZ5LWWt0oaaUONO9mr5jRe2njtoprYZVs3127R8xlgN8qx3xTYd8F1WKppl9yvU8nqzo4xpazUbVe5Zfr+BumLyfC1fX9O+0ZDh9kXDBhW7++1aldV84reLPQ821yzUVbbXVxeqxtfKM3HcnvuzzNG4GY9rVVU96z3GrR8oKCYCh97Wb+xptV0u0bCLuwYvJmO4rhth7VfbtFu/+/3J4OkDveu50YWrr/r3+VyglKGPJ6oNoWtGiiQRIJCXJB1FNRFAAAEEEEAAAQScChxW9RuH3IldI8boqoyQE2rd6d1P0oZqxoZlmlFcrKJJeR7rL7lTeDw5pQNbHtK4YQV6YEFl27p8ZoqmWq1d8F0V5Y3WXRFvnNGgmopv6YpLjHLm/Uhra31uSlvK+oEeuCnPCNw8q5pGh5Glxi2ae2uJ5lfWWlPHWuu9ccdxdXPTxahsGXbr79XXb7pPZZ7lGzU5snWZ5k8v0PAbH9IrjgOh7eyLjDG6u2ig1af1euHld0IEvYyA8ctVOtxyhjHF74ZRynFbWdnE/ZfZR1P8WJ7U7sof6eFJ+booLMu4N4ACEQgq0FS/X/vsFAP7K8vvThJ2AvN3V/XIsKfeNmpP3V8933T83Guji/OylZXeqJr1FSqbfKXHlynOAuaJaoPjxpKwwwsQyOvwXUQFEUAAAQQQQAABBMIS8Bw5oXRd+bXhEaxl5KTkZh39xRzdXvykdwDvtFONjTOm363FDkZ6nXZqywFj3b8Z43XzvC1tuzX6T2gcNQM3s3XrxMdUHTKY9xf9ap7HeoLuPD3tYlX2/+nYziW6d9Yvg7apqfZJldz6A20L2ZZI+qKrcq7JV+uEuSYd/sUrqg0WB21+R1t+UW9phZri50aN4ZOPtWfNg5oW4vPh3DKGVSVrBNol0KwTx4+7A+xdBvXXF0Lmc5ayBnzRStWs48dOus8Peao7gc9GFz0Pa43xZcnN00tVvrU1lN+a1A6YX6sRkysCfJGSqDa4G8OTFBAgkJcCnUgTEEAAAQQQQAABBDwETjToqDlbs+VxrgZ8yZpWZR+K+m9j5FjtH41AlEuZI+/SouffUt2B+tafXRu0oDDHWmzdLHivVi7Z3I4F10+pruLbmlJpr/tnZJU5UiWLN6jaLuvAO9q68iGVjGxbu6mptlzfLq0KPjX11K+1dqORr5Hf1JVV2tuS335VP/+47h55nlFQDMtWvTb9aHVLANSVU6jZ7vLrtXfbSs32tDuyTg+Gaos5ii+CvkjLGaWv97aG+Byu0pbawNNrm2tf0Qv2FL/e+RqdE2KKn9n9MX0YQYStO/x+DttnGdPKkjkC7RD4h04ea2wbNRx2Dk36sOGE/hH2eZ4bXZiDrH+p531HQ3vlaY4mLg3wRUqi2uBVQV4kuQCBvCTvQKqPAAIIIIAAAggg4C3gNW1JZ6tnesi5V94ZtOtVNw2e8jO9sGKmCnI9NtVIz9WEsuVaWtjXnWvTu/t0KNhIL3dKjyeN21Wxotp9A+vKmabKzeWaMT7XGHNoP7qoX/5EzVixUZVTcq3goXFDWTlPC6qO2okC/B6okqU/0Xfy7V1905Se+1XlmusCxrTsRh050qzMaxZq8/MLVeQuX0rLylNR2Uqt8WrLI1oWckRjBH2RdqFG35BlGQWbXntUrz/zkjWt1thM5ZtjO8C0WrPa/tvu1/L5lVpXF8V1GwN8sjiMQGIFPqNuPdM9vkxpT208N7owzzf+Oyuco+Xb3mn70sb8AsT44mbRrEINtjfXcPJFiqPqRKMNjgoiUZIIEMhLko6imggggAACCCCAAAIdWKD37fre/Zd5BNU869pLI269zpqyaRz/8JgawxoS0qyGrWu18Yg1zNA1WqWr7tXQgJtvZGjozCUqHWmH+A5q45rtwUcBBhxRFoeyM2/Ww2XjA6xBaLTl/lLdP6SbBRosuGYliagvuiq3qET5LTfiQabXNmzX0/auyO3aTMXz8xHF50Hb7mPZVK2n1v2xHdMMo1hfskIg5gJp6t6jR5ibHflUymu5ht4avfh5rS8rVl6Wvfaeld744qbgrlI9+ew0K5hnfpHi5MsHn/JOexmFNpyWJweSWYBAXjL3HnVHAAEEEEAAAQQQOE3gMz166pzTjsbyQOiNDtL6DNBAe2DgKWPkhj0l01G1/qZD+w9ao/GMsoxA09iQm3d8XmOn3eIOHgYfBRis/nEo+6bxGhEwKGkApQ3QTbcPd48wPPzG2/pTQLdgbWk9KWRfeO5y6Xd6rRHcfHWztttx1fZuphKwDe19I1359/2bcoNtuOFj+cHeg8GnXbe3KpyHQIcR8F6Trl3VyihQxT5ruYQD2/XE+OwggUFjNPPQibrnJnsUtoMvH0JWKgptCFkGCZJJgEBeMvUWdUUAAQQQQAABBBAIKZCW3lM93Kn+pP31H7tfxeZJmnr07Bbkxs4otXsPhYy9Baxco+r32jstnqWB/c8PXpaVj1fA6oM61QfcKCJY/WNdtpNNItKUMWSYBtk+e/er3r0Gon3Q/h2sLVaakH1xnq762jArcOjvJvwDvfbiTiuw6rkhiF2HRP12sh6kEWT4UrbMlQ/NR9Mbb6o2oGVrGv4fgeQWiHRNuva0vqdyLh3o8MsHJ/knog1O6kWaRAkQyEuUPOUigAACCCCAAAIIxEagd38Ncs94OqWG44E3LIhNBaKd6//o2FF7LbMuyujhcFMFz4BVU6OOnQhrPq/ViFiXHa81DMPpEyNwePUYXRloem3DDr30emNrhq5huu5qOywWThmxSOvM0jvQHYt6kCcCsRKIdK04l87J6K7YB0G8A+by+vIhWdoQqz4k32gIxP4zHI1akgcCCCCAAAIIIIAAAk4FXBfoK1fY68M1avuLO4KvDxcwX2MK5fpv6aIbZ6q8okKrqupZTyygVYq9kTFGdxcNbG3U4Zf03Gv2ZiGe02qNXYpvmqD89g+1TDE0moNArAW814o7tWe//hyyyCYdP/aRlcrBiN2Q+TlLEDhgnjxtcNZSUiVCgEBeItQpEwEEEEAAAQQQQCCGAp5TI43pg69v1msN4W4Ta1avdQrlqdpKlc0r1SObD6g9Y9oib+g/q2cve4hhGCMMTxyXu9mudPXs3p5/+se67I90rDH03M7mxmM6bkOe01Pp7WmKfb6j312Vc02+tcag52YhntNqszT21isCbHDiqJAoJ+qollFuJtl1agFXVn8NsAWOGdeFkJd2z+UB0jUo+1z77Jj+DnbNSpY2xBSIzCMSiPmfwIhqx8kIIIAAAggggAACCIQt4Dk10ji56VX9ePmusEfTNde9oKftKZTqqxvGXGyteRR2hSI8IV1ZA+2bz4+NWVrvO2iL58gxo/jzspUVbEOJgDWMddl/1b73rGmqAevQrMb36oywauvDdcEA9Qm2oUPAfMJ7Iy1nlL7eu3WHEjsY3FzzlH681apvwJ1+wysneqk7rmX02khOnV6gzxBdbv13qcPVqj4U4ouA5ve1/117ndQvqn/WWWESNulARaGy+2W1/AyavMHBCO8Q16y4tyHMJpO8wwsQyOvwXUQFEUAAAQQQQAABBMIW8JwaaWxLcHjpdM2tsqdHOsit8bdafN/jqrHuEV1DblfxVb0cnBiLJJ9Tn/592xZOX16uTe6hdoHK8xw5JrU/+BXrso2pz2teUF2wUTXN+/T8mh3x31wi7UKNviGrFbhpp1569ZD+9Fa1Drem9cnGAABAAElEQVQcCb07bqCeid1xB9PIE2UZu0aTc2cTSMvWsMszrFbv0eZX6oJ8sWEE1F5br032LuG9h2pon9bgvHM2l76QnSV7TLQd1A96fqj/zuLehqC15c0kFCCQl4SdRpURQAABBBBAAAEEQgl0VW7J/ZqQad+0HdTakiLNqqxRyPFf9S9q7sQSldeetArpq3HTxik7DqPA/LfKGGE4coLG2W1p2qI5dz6m6oC70DaoeuE0zbFHjhmjCcfdfqXsW1//ZQQ6Gvuym95+XNMf+W2AfjHa8sgcPfK21Rdx3VzC+AwVlSi/5SNkjoT8vXbu2GdBOdltN5Bp7I43bf2+Sir2BAhsJNIydm0m584m0E25Y/KU2dLsk6ope0ir6uzNgHwsGqu0YM46HWk53P7gu2vIKN3gvv7u0OrlvwtwvTILOqUDG3+qVfY1K/M63TbSd0Oc+LfBR4aXSS5AIC/JO5DqI4AAAggggAACCAQQSM/XrJ+WaLAdy2uq1doZBRresnnFRtV4BcKMkRs1G7V8YZFG5E3Vs+4gXjcNnjJfs/ITNRrPalv6lSqePNQ9tbepdokKx5SobL1nYNK4gaxarbLJ41S4tMYawWaMxot0NGHMyz6p3UtLdMeMCm2rt2/Izf7Y4NMW4+Z3xnc0Np6bS2QM13UjzI1TjFGd6xbqMWuqtWtkiSbnOtw9OMDHMzaHjcDGvEKN74iWsWkwuXY6AWNH2KvGa6w9vbZph+aP+YZmVWzTAffI3gbVrF+o4jFTtfaIPaz6at1TdIna9X2M1zXQ3/XK7ITWvyHlM76hMdN/aQUP+2pC6X3KO21ZgwS0odN9TlK7wWemdvNoHQIIIIAAAggggEDnFTBulobeqyefle64ZYl2W/dzTebmFcaP5t0XgsYM4pXryZmXdYANDboou/gnWrpvgooqD7bW+8hWlU83fwI3w5UzTWtWTopwNGEsy+6mL+ecq321ddpdWWq0rTRAY4wdYq95UI9MGtS+G/EAuYY+bG2csnWLmo4esW7O03Xl14a3c4Rj6BLbnyJXJXOztGnehg5q2f6WcSYCXgJpl+hbP7hZmyY90/rfpPklzbxJxo9XKo8Xwb4E2KvlN47V/NrWLxG6FK7UrrI895cmrZkY18BJD6t05x164GVzcr0RzAt6vTLPCvElUFTb0FpL/r/zCDAir/P0NS1FAAEEEEAAAQQ6oYAZzJuu9S8v09SRvZ23P3Okpq7cpPUdIohnV7uX8srWa93c0da0Mvu4v9/GTWThfD2z+l4NPW00iL/0oY7FquyzdNG/L9KS23J8bpw962O05bbHtGZpofq1aziNZ17hPveZWmyeHtfpveHU90z1HPV9rVl8fZDPRyItw2kLaREIJmBc1/Ona4mja2Fv5c9dpeXFEX4JYKxrV7B0tcqDXqusOrtyNKHsZyG+BEpAG4KR8l5SCTAiL6m6i8oigAACCCCAAAIItEcgLWu0vrNitO6p36bVr+zV0R0/V/nW1m0L3PmZN1/Tr9cFA0dpYn5WnEd+uWsR4kmGcouX6Y0JNdqw9tf63S8qtNY9Ddg41QhAlky+WsNG3ay8LHt59hBZOn47RmWnZWlU6XPaPKpSlWsq2vqlpT8m6NprY9EWx42W0q/QN27K0tqle1tOco0Yo6viOb03jKrKWJK/3/jH9MKX8rRsyaNtljKCGVMm6rprClSQ277VEsOqBokRiLlAjK5Hwerdcq3apD8Wm39Hdug3K1apyp66a5znyinUfTdcpq9MuEG5jr5ASUAbgrWP95JG4IxPjUc0amtux+z5qDtQ7/mS5wgggECHFuAa1qG7h8ohgEASC9jXV/5tmMSdGPWqe05ly9SElS9pQb65Dl0HfTTv0fIJhZrfsni9sebVyrVGfRO8ZmIHperI1eJa1JF7h7oh0LkEIr0eMbW2c31eaC0CCCCAAAIIIIAAAgiEIdBcu0lP2TtQ9r5O37iKIF4YfCRFAAEEEIiyAIG8KIOSHQIIIIAAAggggAACCKSKwFG9/sxLap2EbSyY/82xyon7On2pYkk7EEAAAQSiIUAgLxqK5IEAAggggAACCCCAAAJJL9Dc2GjsR2k9muu17ZHZetDeJTjzek2dMKCDrp1oV5rfCCCAAAKpLsBmF6new7QPAQQQQAABBBBAAAEEHAmkHV+rf7ukVLtPS22Mxps8USMcLWB/2skcQAABBBBAIGoCjMiLGiUZIYAAAggggAACCCCAQFILdM9QL5dvC1zKvOZBPTJpEKPxfGl4jQACCCAQdwECeXEnp0AEEEAAAQQQQAABBBDokALp/6Lr8nq3VS1zpEoWP6cXlhWqH2vjtbnwDAEEEEAgYQJMrU0YPQUjgAACCCCAAAIIINAZBQaq6L/eUVFHbHpatgqWbVdBR6wbdUIAAQQQQMAQYEQeHwMEEEAAAQQQQAABBBBAAAEEEEAAAQSSQIBAXhJ0ElVEAAEEEEAAAQQQQAABBBBAAAEEEECAQB6fAQQQQAABBBBAAAEEEEAAAQQQQAABBJJAgEBeEnQSVUQAAQQQQAABBBBAAAEEEEAAAQQQQIBAHp8BBBBAAAEEEEAAAQQQQAABBBBAAAEEkkCAQF4SdBJVRAABBBBAAAEEEEAAAQQQQAABBBBAgEAenwEEEEAAAQQQQAABBBBAAAEEEEAAAQSSQIBAXhJ0ElVEAAEEEEAAAQQQQAABBBBAAAEEEECAQB6fAQQQQAABBBBAAAEEEEAAAQQQQAABBJJAgEBeEnQSVUQAAQQQQAABBBBAAAEEEEAAAQQQQIBAHp8BBBBAAAEEEEAAAQQQQAABBBBAAAEEkkCAQF4SdBJVRAABBBBAAAEEEEAAAQQQQAABBBBAgEAenwEEEEAAAQQQQAABBBBAAAEEEEAAAQSSQIBAXhJ0ElVEAAEEEEAAAQQQQAABBBBAAAEEEECAQB6fAQQQQAABBBBAAAEEEEAAAQQQQAABBJJA4MwkqCNVRAABBBBAAAEEEEhCgex+We5aez53H+QJAgggEGcBrkVxBqc4BBCIugAj8qJOSoYIIIAAAggggAACCCCAAAIIIIAAAghEX4ARedE3JUcEEEAAAQQQQAABQ6DuQL3s0S/mcx4IIIBAogS4FiVKnnIRQMBXwL4e+R53+poReU6lSIcAAggggAACCCCAAAIIIIAAAggggEACBQjkJRCfohFAAAEEEEAAAQQQQAABBBBAAAEEEHAqQCDPqRTpEEAAAQQQQAABBBBAAAEEEEAAAQQQSKAAgbwE4lM0AggggAACCCCAAAIIIIAAAggggAACTgUI5DmVIh0CCCCAAAIIIIAAAggggAACCCCAAAIJFCCQl0B8ikYAAQQQQAABBBBAAAEEEEAAAQQQQMCpAIE8p1KkQwABBBBAAAEEEEAAAQQQQAABBBBAIIECBPISiE/RCCCAAAIIIIAAAggggAACCCCAAAIIOBU402lC0iGQSIEPP2zQ0Q8/dFch/eyzdc45GXK5XO5jMX/ycb1+9+YBfRxxQS6dO/hSXdQrjnWPuM5kgAACCCCAAAIIIIAAAggggAACiRYgkJfoHqD8oALvv39Ev//9bn38ySenpTODeAMGZOvCQRec9l5MDvz1FZVOKtXuiDPP1ISVL2lBfnrEOZEBAggggAACCCCAAAIIIIAAAgh0HgECeZ2nr5OupdXVNTpw8FDAejc1Nem//3uP/vKX9zXiyiviOzovYK14AwEEEEAAAQQQQAABBBBAAAEEEIiNAGvkxcaVXCMUCBXE88y+sfEjvb79DZmBPR4IIIAAAggggAACCCCAAAIIIIBAqgoQyEvVnk3idu2vey/oSDx/TTODebW1f/D3Vgc85tJnP8t/eh2wY6gSAggggAACCCCAAAIIIIAAAh1agKm1Hbp7Ol/lPjHWwjOny7bnYU7D7du3T8smGO05P+Q5WcXaeKA4ZLKWBH/fr/X3TdbMFw7pU68zPqvzb5qpaVd09zrKCwQQQAABBBBAAAEEEEAAAQQQQCCUAMOCQgnxflwF3nnn3YimyL711ttxra//whpV89M5+t5pQbwz9E+X3K3HH/6azj3D/5kcRQABBBBAAAEEEEAAAQQQQAABBAIJEMgLJMPxuAuYa9wF29zCSYXM3W0//LDBSdIYpfk//XVzqf79Jzv1vz4lnHH+jXro0WLlnkUUz4eGlwgggAACCCCAAAIIIIAAAggg4ECAQJ4DJJLER+D9949EpaCDQXa6jUoBATP5VH/7Q7mmfGed3veeTyt9ZrDufPRBFWR1DXg2byCAAAIIIIAAAggggAACCCCAAALBBAjkBdPhvbgK/OUv70elvD9HKZ9wK/PpsVf0/ZKfaNcnvlG8c/TV75fpgeHniLF44aqSHgEEEEAAAQQQQAABBBBAAAEEbAECebYEvxMu8NejH0alDuYU3Y8+OhGVvBxn8vc9+vk9c1T557/7nPI5ZU0s04//bZA+6/MOLxFAAAEEEEAAAQQQQAABBBBAAIFwBAjkhaNF2pgJmLvVmgG4aD3M/OL2+PRD7SiboR9s9w1EGptbXDpd//ng1UpnKF7cuoOCEEAAAQQQQAABBBBAAAEEEEhVAQJ5qdqzSdauTz7x3RoisgY0fvRRZBk4PvsT1T/7XU1bvlv/8DnnjPNv1uKf3KmBnyWK50PDSwQQQAABBBBAAAEEEEAAAQQQaIcAgbx2oHEKAq0Cn+rjtys0/Ye/0nFfkq7DNO2nc3TteWf6vsNrBBBAAAEEEEAAAQQQQAABBBBAoF0CRBnaxcZJCEifHt6oWVP/U7/33dzijD762oJFumdIOkwIIIAAAggg0NEEmuu17WevqO7om1q1dKuOeNbPlaMJ06/XBQNHaWJ+ltI83+tsz080qvGsdKV3aoTO1um0F4EkFGis0Ya1v9bvflGhtbUn2xqQOVIlk6/WsFE3Ky+rS9vxaDxrKXOzXlqxSlVH7OWhumlwYbGuv/Srunl8rpzdCX6imoU36ealex3XqkvhSu0qy5PL8RkkTEUBAnmp2Ku0KfYCf9ulpf/+kF5833dzi3/SoMkP64c39GWH2tj3AiUggAACCCDgXMAM4D06Tw8u8QneeebQVKu1C2qNI6V6OHO0Zi+dr6LcDM8UneB5g2oqF+uhHzbrnrcXKo9AXifoc5qIQDIKnNKBLQt1791ParcdS/NsxpGtKp9n/pQrf+5jWlQ81GFwzTMT3+fG9bFitqbN2+L9JVBLspPaXfmjlp9HfnarfvjQdE0I+ffjsKrfOORbCK8RCCnA1NqQRCRAwEfg0w9U9R/T9aMa33X4PqMeox7UkhlfZXMLHzJeIoAAAgggkDiBZjXWVKj4imtVFCyI51vBI1s0/6ZxKq6oVqPve6n6uvG3KrsxTzfPeMb/jXGqtpt2IYBAkgkY1/WqH+j24gBBPK/WHFbVvDtVVLFHzV7Hw33RoOqFxbrVbxDPO6+m2mc0yxidV1bd4P2G76uGP+jNd075HuU1AiEFGJEXkogE8RA4++zuUS2m1znnRDW/tsw+0XtPzdE9z72nT9sOtjw740vf1GOLCpXF5hY+MrxEAAEEEEAgUQLGzV71Y7rjliVegSlXTqHuu+EyfWXCDcr1mDvaXL9Nq3+1WZsWV1rpzRvAezWr55P66fjs1J9qe/wP+o3n1LREdRvlIoAAAsEEmndp2X+saxsVZy6LMONe3TUpT/1aRhEbI+fWL9d/LlphTX09qZqyH2lTwVIVZLRnmLEZOFysby+tkT34r+XvyDdv0Tfc02jNL41+oeeeWaVHK2vV1FSj8qmLNWzzD5Xn8XfGs1nNh/Zpr51h77u07rWZym1P9Twz5XmnEGBEXqfo5o7fSJfLJfMnWo+uXf8pWll55PN/atz+iL71vSp94nG05WnXr2rW0vv11R7Exn1peI0AAggggEDCBBqrtGBqeVsQz7jZu6WiSn/8r4UqKR7nFcQz65iWlac771qojTufVklON6vah7Vl1oNaVceoiYT1IwUjgAACboFmNWws18rDVgQs83otevk5LSi2g3hmwgzljp+pJ555WKMzrXvMpp166dUP3LmE9aR5n9Yt+aU7cOgaMkcvPG/8HXEH8czc0pSeO04lZSu1Zkpu6xp2R9bpwdKqAKO6jcDfe3Wya+S6YID6EMQLq1s6c2ICeZ259ztY28/tFZ1RdGZAsGvXrlFu3af6e32lZtzzM9WfPhRPhY8/oskXRLvMKDeB7BBAAAEEEOhUAke1rXSe1toLkbtyVfLsSs0b7WATi/TLNGP1Yk1w3wBWa1X59gA3Y50KlcYigAACCRb4QK+9uNMaGedS75vu0NgAm1mkZY3XvAeutjaGaNT2F3coxGRXv21rrt2kp962N9IYqEnfvV3ZAYNuGRpaMkXjWv5+NOnI82tV1eBvUu9J1b6522pHFw0afrERfuSBgDMBAnnOnEgVB4HPf/78qJTyhSjl41mZT4//Rj++r0xbj/3D87Dx/Gxdcv9ifX/keWxu4SPDSwQQQAABBBIp0Fy3UT99/qBVhW7KnVGq6UPDuE1Kz9cD7hvAYDdjiWwlZSOAAAKdTKD5fe1/92Or0Vn6+jUXBln2IE0ZV4/RlfagvNc36zW/QbVght4j55RzswpzQwzgSL9IX7norNZMA44E/Kvq9tgrsPbR5f/aO1gleA8BLwHmAXpx8CKRAuefn9kyvbapyV4ooH216du3T/tODHjWx9q1bJ7Kd/lubiGd8YU83TjouH5TtS3g2X7f+My5uviqi9TrDL/vchABBBBAAAEEIhL4RLXr1qnG/ieFa7huKxgQ5GbPX2HGDeC4Ek1aY7x33TD1TOuvIQHWOTLPbllf75U/6N1fVGitzzpzgdbk8y51r5bfOFbza40pvF0KtXz3Qo04vE2rlj6mR8z1lszEp60D5ZFDY402rP21fudbvnnO9HH6yqU3qiDADopNVTN1yaRKeU0ePlWpogGVrQVY9cnzXQXF3An4Zy9r5xs/V/nWw22VaSlzgq699mblBRgp05rYo83K1ISVL2lBfreWdabWvfxLo+0eOww7zrOtGkanRFg/j7x4igACHUPg0Nv6jT2ttsslGnZxiKBaxnBdNyJdVVuNoFnTbv3u9ydVkJ8eRlv+oZPHGt1r43UZ1F9fCHl2urIGniuZZepj7d3/vrHRxue9/wZ5bnTh6qv+fT4XMlcSIGALEMizJfidcAFzSqw5mu7AwUPtrksvY3ruOeeE8W27o5Ka1Nhw/LTNLcxTP/3zRv1g8kZHuXglCvQPYq9EvEAAAQQQQACB9gkcVvUbbf+ecI0Yo6vas8B52lDN2LAseBWMYNEr371X0562gm1+UjfVVqrM+FHZamN6b4VmOBkZ2LhFc2+d2jY12My3qVYbdxzXA8WehRiLulfM1rRAOyka56xdYPzoUa0unKPvzZlw2tqAnrk5e35KB7Ys1L13B9gx0i5zQZkG37ZAj/3wa9YC9CFyNy3nfN+/pTvPco1eHGrzkRjVL0T1eRsBBGIv0FS/X/vsYgb2V5bvFwz2e+7fXdUjo4v1qlF76v4qhRXIc2cUxhOXevQ820rfpA/2HjSWZhjqNXXWa6OL87KVld5obNCxQVteXO3xxUg3DTZ2vx075npNzHewLEQYNSRpcgswtTa5+y/lap+Tc3FEm158+cJBKWdCgxBAAAEEEEAgTAHPkQ5K15VfG+51AxVmboGTN9dpw5SJKgkSxPM62dzF8JZpWh5y44y/6FfzPNb3c2fi2xZjHcAZ43VzoCCe+zzzyUntrpytWyc+pupGf+s1eSUO8sIIkq1/QLcXBwjieZ1plPn0vbp9SqUOhCzSWL/qu5McWBqbj0y/W4trTtt6zCo5VvXzahgvEEAgIQLNOnH8uDG6rfXhbHTcWcoa8EXrjGYdP3bSfX57mtBsDPA4EfLEo3p7hzvcqKajDcYV2PPhPV3X1fOw1tyUp5unl3oE8cz05nX7R3p40rUaMblCNRFduz3L53myCxDIS/YeTLH6m6Pyvvzl9gXj+hlTaqM/Gi/FgGkOAggggAACnUHgRIOOtsxFNRt7rgZ8KZxpVE6BzJ0TF2rOy/aUUnPkxBwt3/aO6g7Uu3/2blupB6eMNCaOWo+maj217o/BbyRP/VprNxrr+2WO1NSVVdrbkt9+VT//uO421uVtfZxSXcW3NaXSXgfQOGqkL1m8QdXu8t/R1pUPqWRk29pLTbXl+rbPLoqu/IX6o3nOtjkabOXeMr13n9WOPQtlT6ttrntK98/y2L0xp1AzvMqsl3ebjfUFX35Y96/cE7zNxsTeI0fMaWim4/1a9PxbXoazC3OsBevNCu7VyiWb/S5aH7v62TD8RgCBxAl4T3MNvx5N+rDhhHxXPQ+ej0tf/Nehsq+iTU7W2WvYoZdeN69n1uPYMR23o48thzw3ujAHW/9Sz/ssyWCf2vrbuI5uLY3CFzHeufIqeQUI5CVv36Vszftnf0lmUC6cR3r62TJH8/FAAAEEEEAAAQS8pl4ZG1P1TA859yp8tOZdWvHoq9a6ScZmGnMrtb6s+LQ14dKy8nTnzCVaPXe4FYhq0uE33tafQpY4UCVLf6LvuKdTpSk996tt02Ibt6tiRbV73SZXzjRVbi7XjPG5xhhE+9FF/fInasaKjaqckusu/0jlPC2oOmonCuP3X7Sp9D+ttQeNgNuUp7XjvxaqxKtMqbXN5Xph/TQNbqE/qZqyH2lTyEXmexvTZp83HKd6redn5ldUtlxLC/u669r07j4d8roxNt+Kdf3cxfMEAQSSRuAz6tYz3eOLgPArnpYzSl/vbf0daXpVixdWBd7F3BypPftRVbm/TDLK+/CYGr2ih54bXZj18f9FUN2uDVo0q9C6jpoBv9O/iAm/NZyRCgIE8lKhF1OwDUOH5joO5pnr4o248oqIpuQGJ0xXXtlv3d8Ke37L3u7nHt9sBy+bdxFAAAEEEECgQwo0HtS+D6w7tZCbaXRR9qh8uecc7N2ves+bPH8N7J2v0TmBFnE3RgNuXauNR+zyR6t01b0aGnAzjgwNNYKJpSPtEN9BbVyz3e+INn9VcR/zHGXS+3Z97/7LPIKG7lTWEyPwOHSKvlc0sPV1wJ0b285zDZmoB8Zley8I7367l0bcep17VMzpN8ZGwhjXz10VniCAQBIJpKl7jx4BrisOm5F2kcZ/c6jHlyFT9fXJ87Wqqt5jpLExrb+qQrNuukkPGCO1XZmZOidQ9l7LP9hfYJz+RZDx7Y0K7irVk8/aX4oYI/MqH9GygEsLBCqQ46kmQCAv1Xo0hdpjBvMuv+xSndXV/z9i7Wm4sQ3ipRAoTUEAAQQQQKCTCHymR8/AN1DRMsgoUIU99XTfMhWE2kyje4Z6OR4Y6FLvG0YpJy1QZf+mQ/sPWqPxjLRFJRobqnxjx8Sx025xB8L8j2gLVJ553AgevrpZ21tih6HqZ+fTVTnX5FtlNuo3b77rHkFop2j77dJ5lw4JuilGWnpP9Wg7wedZrOvnUxwvEUAgSQS819VrX6WNL2MmPazSa9wTbI2prsuMtevyNbBflrJbfi7UyEmlrbuWG1/u3P/D23S+XZjvphyefz8ObNcT4wN9gWFmYH4pMlH33GSPSK7XCy+/4xFAtAvhd2cSYNfaztTbSdjW88/PlPnz0Ucn9Jf333e3IP3ss1uOuw/wBAEEEEAAAQQQsATsgE/r6nV/0v76j2VsCRhnH3N0xjq9Uve/Rgxsv365uFK7Q43Cc9cwzdjxsFuQESSNqt9r7LzY8jhLA/ufHyStO1Ol9RmggUYw8bBZjw/qVG8snJ4bMgBon+8ZPDSmBy+9WQOX2u85+31qz379WXnq5ze583b4PV2xrp//UjmKAAIdXSDSdfWs9qVlq2DpanUPsUu5Mkdr9tL5ulPL9VTUaHoq59KBchlrojYZ/2tdnmFogGtp1Aolow4sQCCvA3cOVWsTOPvs7jJ/eCCAAAIIIIAAAiEFevfXoC7S7lNmylNqOG7ucBq7QF5z/TatfmWvju74uc+OgyFr2s4E/6NjR1saZ5zfRRk9/M9eOC3z7j3UErczA3lNjTp2wli0yXEg7+9qNBaJj+hhTSnu53dkYhjt8FuJWNfPb6EcRACBuAq0rXfn+HsRr/q5dE5Gd7V7WmJalkaVbtCOCb/Qupd/qVVLt+qIlb/L2PjnvnFjdO03jS8rjNHUTVXH9KH9Xq8MYxW8SB7GqLwvZes8bVHLF1RBr6WRlMO5ySJAIC9Zeop6IoAAAggggAACCDgTcF2gr1yRrrVbG430jdr+4g41jC9QhrOzPVIZ0zXXT9GIn/XQt2/or89mj9JE9+YTRrLmer0SanSGR248RQABBBCIRKBtvTszkBd8lK9dTpOOH/vIehFqtLN9TrDf5sZD41Rk/swMlO4T/WHnLuNrJPNhLBswsG/EXyV5jzQPVC7HO4sAgbzO0tO0EwEEEEAAAQQQ6DQC5+mqrw2Ta+uWljXZml7frNcaxoZex+40nw/02os7daq2UWW1xti3wv76f3Ygz9yZcModLYuan3aaceOWOfJO3TncWuq857/q5iFv6Y68Uu0+PXE7jvyzevYyhhy23CaGMeLwxHG5N451patn93DGpXxW6cZIFrWMP+miwXM3aWOxtZFFO1oQ/VM6ev2i32JyRKAzCriy+muA0fCWa+mxYzpu7F5tjoAL/PBciiBdg7LPDZw0au94lhnpsgGtlWpuNNpq1++cnkoP5/Jtn8fvlBGg+1OmK2kIAggggAACCCCAQKtAmjKuHqMr7SmcTa/qx8t3hb04eHPdC3r6dXNUn/noqxvGXGztWtisxtdWaLGxM2Hro7fypyzWul37rV3u9+qNFbNVVFzc+jM+N+LRGFZB1q90ZQ20b0Y/1t797ztom+dmEEY252UbywYGvfv1LlKfU5/+fa32n9KeHX8If9dbnxyj+7Kj1y+6rSU3BDqtQJ8hury3dXE/XK3qQyEm2Ta/r/3vGuuktjy+qP5ZZ4VP17RNswbZm1oUanmobcc9d9A2wo6XDunlUWaTDlQUWhtkZGnQ5A0OrqXG35z36vSBlYvrggHqE87l26N0nqaGAIG81OhHWoEAAggggAACCCDgKZAxRncX2SPGzM0Zpmtu1VHPFMGfN/5Wi+97XDXWPaJryO0qvsq+GTupms3brLWRjB1cpzymJ2YWKDdgYMwIor29U3uClxjGu55BK6Nty8u1yT3ULlA2raML7Vve8G8E7TWaWvNven2tnq+z1+kLVKY5NflbGmTt6ujshjVQXqGOd/T6hao/7yOAgCMBY9OJYZfbCyXs0eZX6oJ8kWF+6bJem1p2+DFy7z1UQ/vY3/A4Kq01kesL6j/QHAVtPvbpzbeD/S3x/tLENfIW3ZTlWaZLX8jOMlY3bX20jhg3hhUGezTv0/Nrdli7fqfryq8Nb8dSEcEK4L1kEyCQl2w9Rn0RQAABBBBAAAEEHAh0VW7J/ZqQad9AHdTakiLNqqwxVs0L/miuf1FzJ5aovPaklbCvxk0bp+x2jYAwdq/d8rAmz2qd5hu8ZKfvGiMOR07QOLttTVs0587HVG3sQuv/0aDqhdM0p2XNQDOF0Z7brwz7RjAtZ6z+bYi1ZHvTDj1y30+DlGksIVi3UiXudrevTP/t8X+0o9fPf605igAC4Ql0U+6YPGW2nGR8qVL2kFYF+lKhsUoL5qxr+9LlhlHKadd1vLeGXtHHqmajqhYt0bZA11ujzEWLXrWCbv6ve64ho3SD+/q9Q6uX/y7I3yXjb8jGn2rV29bfo8zrdNvI88IjI3XKCRDIS7kupUEIIIAAAggggAACLQLp+Zr10xINtmN5TbVaO6NAw2+cqfKKjarxuhEzRm7UbNTyhUUakTdVz7qDeN00eMp8zcq3R+OZOZ+lrAFftJDN0X736q6FG3zya1DN+gqVTR6tkcVParc9FM48q/m4jp8IFHQzEzh4pF+p4slDramuxg6JtUtUOKZEZes9A5XGDWDVaqMO41S4tMa6sTSWXvcaXehRVvcM9bKtTr2pX233GXWSNkA3T7veuoG2yhxWoFlP+Fg21mjDEzM1fkxpgBGNHmVG82lHr18020peCHRaAWP07VXjNdaeXmt8qTB/zDc0q2KbDrgvq+b1d6GKx0zV2iP2sOqrdU/RJWpXHE/GF0NFJcq3r49HntGUiXO0vKq+bTSgdd0bN+xb7jIDXmu9rt8ntXtpie6YUaFt9Z6jnFv/JpXP+IbGTP+lFYzsqwml9ykv4OjvTvuh6HQNP+NT4xGNVmcbQ+Y9H3UH6j1f8hwBBBDo0AJcwzp091A5BBBIYgH7+pq4fxsaN0PVj+mOW5Z4B9McmZpBvHI9OfOy09e4a9ig4uHTVeUZoHOUp5lomGZvW6Mir+lWe7X8xrGaX2veyDndTOKots2YoKLKg45LduVM05rV92qovxtBcx2owZO01vNe0szZNVqLdiy1Ngs5pbqKO/X1efY0LwdFZ16vRc8sUkGWPZnMPsezzZmasPIlLchPt988/Xd9hcbZG4Z0Mdap2r1QefaNtTt1NOvnzpQnKSCQ+GtRCiB2mCYY1/Wq7+rrk56xAlyhKmaM4ptbqeeKB/kJ5Hleh8xNjVZqV1me+0uStpyNL0bWP6Db3UG1tnf8PQt6rTVPCLphkr8cg/w98pecYx1aINLrESPyOnT3UjkEEEAAAQQQQACByASM0RtDp2v9y8s0dWRv51lljtTUlZu03l8Qz8wlY6wWPTutbbRfsJxb8npKC0baQapQaywFy8zzvV7KK1uvdXNHu0fJeb7r/dy4CSycr2cCBfHMxK6Lde2Nfb1PM181HdT+Q3+zjndRdvEqba64w1HbXTl3qNxvEO/0YqJzpKPXLzqtJBcEOreAcV3Pn64ljq59xmZEc1dpud8gXjiKXdRv/PcdlGnuWj4n+LXWLNZY669g6WqV35bjJ2joUy9XjiaU/cz/l0o+SXnZOQTO7BzNpJUIIIAAAggggAACnVkgLWu0vrNitO6p36bVr+zV0R0/V/lWe9dZS8a8WZp+vS4YOEoT87P8jNzwFGwNEG7cma8NazfrpRWrVGVP4TKTnZaXsQD68WFybTXXymvU9hd3qGF8Qdjr1HnWoPV5hnKLl+mNCcZ01rW/1u9+UaG17mnBRgojiFgy+WoNG3Wz8k4bEeebmxUYvHS5/nPRCo/2nNCx4383Ene1TjBuaEd/Txv3TNS2n72snW/4Wpq7+P4/XT7sGgeOvnWIxuuOXr9otJE8EOjsAtG89jm1bC3z9VHG35FfbdamxZUeI73N695EXXdNgQpy7c04QuSblqVRpZv0x2Lz79IO/cbn74grp1D33XCZvjLhhiCbKYUog7dTUoCptSnZrTQKAQTCFbCHN9vnJW4KmF0DfiOAAAKpIWBfX7mupkZ/0goEklWAa1Gy9hz1RiD1BCK9HjG1NvU+E7QIAQQQQAABBBBAAAEEEEAAAQQQQCAFBQjkpWCn0iQEEEAAAQQQQAABBBBAAAEEEEAAgdQTIJCXen1KixBAAAEEEEAAAQQQQAABBBBAAAEEUlCAQF4KdipNQgABBBBAAAEEEEAAAQQQQAABBBBIPQECeanXp7QIAQQQQAABBBBAAAEEEEAAAQQQQCAFBQjkpWCn0iQEEEAAAQQQQAABBBBAAAEEEEAAgdQTIJCXen1KixBAAAEEEEAAAQQQQAABBBBAAAEEUlDgzBRsE01KUYFPPvlEn3zyv3K5XDr77O4p2kqahQACCCCAAAIIIIAAAggggAACCPgXIJDn34WjHUSgqalJ++ve08EDh/SxEcizH2Yw7wufP18XXniBunbtah/mNwIIIIAAAggggAACCCCAAAIIIJCyAgTyUrZrk79hH37YoN/89k2ZwTzfh3nswMFDLT//8i+D1T/7S75JeI0AAggggAACCCCAAAIIIIAAAgiklABr5KVUd6ZOYw4d+pNee/3XfoN4vq38/e93q7q6xvcwrxFAAAEEEEAAAQQQQAABBBBAAIGUEiCQl1LdmRqN+eijE9r51tthNcYcnWcG/3gggAACCCCAAAIIIIAAAggggAACqSpAIC9VezaJ2/VWdXhBPLupu4yReeaGGDwQQAABBBBAAAEEEEAAAQQQQACBVBQgkJeKvZrEbTJH1TU2ftSuFpjr5r3zzrvtOpeTEEAAAQQQQAABBBBAAAEEEEAAgY4uQCCvo/dQJ6vff//3nohabE6xZVReRIScjAACCCCAAAIIIIAAAggggAACHVSAQF4H7ZjOWK333z+ij6MwNfYga+V1xo8PbUYAAQQQQAABBBBAAAEEEEAg5QUI5KV8FydPA//yl/ejUtlo5ROVypAJAggggAACCCCAAAIIIIAAAgggECUBAnlRgiSbyAWOHv0w8kyMHMw19sz18ngggAACCCCAAAIIIIAAAggggAACqSRAIC+VejPJ2xKNabU2wUcfnbCf8hsBBBBAAAEEEEAAAQQQQAABBBBICQECeSnRjcnfiA8/bIhqIxo/at/Ot1GtBJkhgAACCCCAAAIIIIAAAggggAACURQgkBdFTLLqOAJMre04fUFNEEAAAQQQQAABBBBAAAEEEEAgOgIE8qLjSC4IIIAAAggggAACCCCAAAIIIIAAAgjEVODMmOZO5ggggAACCCCAAAKdViC7X5a77Z7P3Qd5ggACCMRZgGtRnMEpDgEEoi7AiLyok5IhAggggAACCCCAAAIIIIAAAggggAAC0RdgRF70TcmxHQIul6sdZwU+5ayuXQO/yTsIIIAAAgggEBeBugP1cSmHQhBAAAEEEEAAgc4iwIi8ztLTHbydZ5/dPao17EogL6qeZIYAAggggAACCCCAAAIIIIAAAokXIJCX+D6gBpZAr17nRM3inHMyopYXGSGAAAIIIIAAAggggAACCCCAAAIdQYBAXkfoBerQIhCtQN4XPn8+oggggAACCCCAAAIIIIAAAggggEDKCRDIS7kuTd4G9e3zxahU/vME8qLiSCYIIIAAAggggAACCCCAAAIIINCxBAjkdaz+6NS1Mde1i3RUnrlpRp8oBQQ7dWfQeAQQQAABBBBAAAEEEEAAAQQQ6HACBPI6XJd07gp9+cJBEQEMGJAd0fmcjAACCCCAAAIIIIAAAggggAACCHRUAQJ5HbVnOmm9zE0q2huMS08/WxcOuqCTytFsBBBAAAEEEEAAAQQQQAABBBBIdQECeanew0nYPjMYZwblwnmYU2r/deiQcE4hLQIIIIAAAggggAACCCCAAAIIIJBUAgTykqq7OkdlzaDciCuvcBzMM9NfNeKrOvvs7p0DiFYigAACCCCAAAIIIIAAAggggECnFCCQ1ym7veM32g7mhZpma26OMWrk1QTxOn6XUkMEEEAAAQQQQAABBBBAAAEEEIhQ4MwIz+d0BGImYAbzcgZfrP7ZX9L+uvfU2PiRuyxz6u3nzz9f5pp6PBBAAAEEEEAAAQQQQAABBBBAAIHOIEAgrzP0cpK3sWvXri0BvSRvBtVHAAEEEEAAAQQQQAABBBBAAAEEIhJgam1EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAIIIIAAAggggAACCCCAAAIIIIBAfAQI5MXHmVIQQAABBBBAAAEEEEAAAQQQQAABBBCISIBAXkR8nIwAAggggAACCCCAAAIIIIAAAggggEB8BAjkxceZUhBAAAEEEEAAAQQQQAABBBBAAAEEEIhIgEBeRHycjAACCCCAAAIIIIAAAggggAACCCCAQHwECOTFx5lSEEAAAQQQQAABBBBAAAEEEEAAAQQQiEiAQF5EfJyMAAII/P/27gZKq7reF/ivw5l1XaY2giYaFYgYXZMVkKWnfOHNSjuCIKR5M19ANDUx5EX01KnkVVHPUQMExWNxrEEQT0kcFfCtJE3nXuysDCTErIvHA0zqddGdS929Z+Z5mBnmjdnMlsf5PGtNz/PsZ/9f9ue/cy2//v/7T4AAAQIECBAgQIAAAQIECOQjIMjLx1krBAgQIECAAAECBAgQIECAAAECBDIJCPIy8SlMgAABAgQIECBAgAABAgQIECBAIB8BQV4+zlohQIAAAQIECBAgQIAAAQIECBAgkElAkJeJT2ECBAgQIECAAAECBAgQIECAAAEC+QgI8vJx1goBAgQIECBAgAABAgQIECBAgACBTAKCvEx8ChMgQIAAAQIECBAgQIAAAQIECBDIR0CQl4+zVggQIECAAAECBAgQIECAAAECBAhkEhDkZeJTmAABAgQIECBAgAABAgQIECBAgEA+AoK8fJy1QoAAAQIECBAgQIAAAQIECBAgQCCTgCAvE5/CBAgQIECAAAECBAgQIECAAAECBPIREOTl46wVAgQIECBAgAABAgQIECBAgAABApkEBHmZ+BQmQIAAAQIECBAgQIAAAQIECBAgkI+AIC8fZ60QIECAAAECBAgQIECAAAECBAgQyCQgyMvEpzABAgQIECBAgAABAgQIECBAgACBfAQEefk4a4UAAQIECBAgQIAAAQIECBAgQIBAJgFBXiY+hQkQIECAAAECBAgQIECAAAECBAjkIyDIy8dZKwQIECBAgAABAgQIECBAgAABAgQyCQjyMvEpTIAAAQIECBAgQIAAAQIECBAgQCAfAUFePs5aIUCAAAECBAgQIECAAAECBAgQIJBJQJCXiU9hAgQIECBAgAABAgQIECBAgAABAvkICPLycdYKAQIECBAgQIAAAQIECBAgQIAAgUwCgrxMfAoTIECAAAECBAgQIECAAAECBAgQyEdAkJePs1YIECBAgAABAgQIECBAgAABAgQIZBIQ5GXiU5gAAQIECBAgQIAAAQIECBAgQIBAPgKCvHyctUKAAAECBAgQIECAAAECBAgQIEAgk4AgLxOfwgQIECBAgAABAgQIECBAgAABAgTyERDk5eOsFQIECBAgQIAAAQIECBAgQIAAAQKZBAR5mfgUJkCAAAECBAgQIECAAAECBAgQIJCPgCAvH2etECBAgAABAgQIECBAgAABAgQIEMgkIMjLxKcwAQIECBAgQIAAAQIECBAgQIAAgXwEBHn5OGuFAAECBAgQIECAAAECBAgQIECAQCYBQV4mPoUJECBAgAABAgQIECBAgAABAgQI5CMgyMvHWSsECBAgQIAAAQIECBAgQIAAAQIEMgkI8jLxKUyAAAECBAgQIECAAAECBAgQIEAgHwFBXj7OWiFAgAABAgQIECBAgAABAgQIECCQSUCQl4lPYQIECBAgQIAAAQIECBAgQIAAAQL5CAjy8nHWCgECBAgQIECAAAECBAgQIECAAIFMAoK8THwKEyBAgAABAgQIECBAgAABAgQIEMhHQJCXj7NWCBAgQIAAAQIECBAgQIAAAQIECGQSEORl4lOYAAECBAgQIECAAAECBAgQIECAQD4Cgrx8nLVCgAABAgQIECBAgAABAgQIECBAIJOAIC8Tn8IECBAgQIAAAQIECBAgQIAAAQIE8hEQ5OXjrBUCBAgQIECAAAECBAgQIECAAAECmQQEeZn4FCZAgAABAgQIECBAgAABAgQIECCQj4AgLx9nrRAgQIAAAQIECBAgQIAAAQIECBDIJCDIy8SnMAECBAgQIECAAAECBAgQIECAAIF8BAR5+ThrhQABAgQIECBAgAABAgQIECBAgEAmAUFeJj6FCRAgQIAAAQIECBAgQIAAAQIECOQjIMjLx1krBAgQIECAAAECBAgQIECAAAECBDIJCPIy8SlMgAABAgQIECBAgAABAgQIECBAIB8BQV4+zlohQIAAAQIECBAgQIAAAQIECBAgkElAkJeJT2ECBAgQIECAAAECBAgQIECAAAEC+QgI8vJx1goBAgQIECBAgAABAgQIECBAgACBTAKCvEx8ChMgQIAAAQIECBAgQIAAAQIECBDIR0CQl4+zVggQIECAAAECBAgQIECAAAECBAhkEhDkZeJTmAABAgQIECBAgAABAgQIECBAgEA+AoK8fJy1QoAAAQIECBAgQIAAAQIECBAgQCCTgCAvE5/CBAgQIECAAAECBAgQIECAAAECBPIREOTl46wVAgQIECBAgAABAgQIECBAgAABApkEBHmZ+BQmQIAAAQIECBAgQIAAAQIECBAgkI+AIC8fZ60QIECAAAECBAgQIECAAAECBAgQyCQgyMvEpzABAgQIECBAgAABAgQIECBAgACBfAQEefk4a4UAAQIECBAgQIAAAQIECBAgQIBAJgFBXiY+hQkQIECAAAECBAgQIECAAAECBAjkIyDIy8dZKwQIECBAgAABAgQIECBAgAABAgQyCQjyMvEpTIAAAQIECBAgQIAAAQIECBAgQCAfAUFePs5aIUCAAAECBAgQIECAAAECBAgQIJBJQJCXiU9hAgQIECBAgAABAgQIECBAgAABAvkICPLycdYKAQIECBAgQIAAAQIECBAgQIAAgUwCgrxMfAoTIECAAAECBAgQIECAAAECBAgQyEdAkJePs1YIECBAgAABAgQIECBAgAABAgQIZBIQ5GXiU5gAAQIECBAgQIAAAQIECBAgQIBAPgKCvHyctUKAAAEClEoSbAAAIMJJREFUBAgQIECAAAECBAgQIEAgk4AgLxOfwgQIECBAgAABAgQIECBAgAABAgTyERDk5eOsFQIECBAgQIAAAQIECBAgQIAAAQKZBAR5mfgUJkCAAAECBAgQIECAAAECBAgQIJCPgCAvH2etECBAgAABAgQIECBAgAABAgQIEMgkIMjLxKcwAQIECBAgQIAAAQIECBAgQIAAgXwEBHn5OGuFAAECBAgQIECAAAECBAgQIECAQCYBQV4mPoUJECBAgAABAgQIECBAgAABAgQI5CMgyMvHWSsECBAgQIAAAQIECBAgQIAAAQIEMgkI8jLxKUyAAAECBAgQIECAAAECBAgQIEAgHwFBXj7OWiFAgAABAgQIECBAgAABAgQIECCQSUCQl4lPYQIECBAgQIAAAQIECBAgQIAAAQL5CAjy8nHWCgECBAgQIECAAAECBAgQIECAAIFMAoK8THwKEyBAgAABAgQIECBAgAABAgQIEMhHQJCXj7NWCBAgQIAAAQIECBAgQIAAAQIECGQSEORl4lOYAAECBAgQIECAAAECBAgQIECAQD4Cgrx8nLVCgAABAgQIECBAgAABAgQIECBAIJOAIC8Tn8IECBAgQIAAAQIECBAgQIAAAQIE8hEQ5OXjrBUCBAgQIECAAAECBAgQIECAAAECmQQEeZn4FCZAgAABAgQIECBAgAABAgQIECCQj4AgLx9nrRAgQIAAAQIECBAgQIAAAQIECBDIJCDIy8SnMAECBAgQIECAAAECBAgQIECAAIF8BAR5+ThrhQABAm0U2BaVyxbHovlTYkSfXtG7Z/2/fjFi8u2xaOGKqKza1cb69va0qlg7+aS6dk+KqWuq9raCvTg/z7b2olttPnVDLDrr4zlZtblT+/+Jb1ZFh92++//V6yEBAgQIECBAgACBTAJ/m6m0wgQIECCwbwR2bY6198yPf5pTES9WN1flW/FixS3xYvrz9G/F8WOmxbenjY7+5V2aK+A4gf1IIAmpK+bGd763K65+YXYMctvuR2OjKwQIECBAgAABAqUiYEZeqYyUfnaowNtvv92h9aucQEsCuzavjOvPHh5jp7cU4jWuIQ31rotzThgZ1z+6OTpqfl7jVn0n0C6BqmdizlmD4pzJ97cQVLerZoUIECBAgAABAgQIdCoBM/I61XCX5sW+8847seXV38cbb/xX8QLKyz8QRx15ZBx2WLfisfZ8SAO8Cd+4Ov70p6pYumxZe6pQhkAmgV2bK+KK826IR7fWm4ZX1i9GTxwRn/7MWTGyf717vKoyli99Op79ycJYuv6t2nar18ePxl0Q2+beG3eO6h3ZJzmVx6A5z8SmOZkuq42F82yrjV1yWscI7Ph1/KJwz3ZMC2olQIAAAQIECBAg0CkEBHmdYphL8yKrq6vjNy/9NjZu3LTHBaShXnr88MMPi08N7B8HHnjgHue0duCpJ5+KayZcHTu276g5ddHChTF23LjWivmdwL4TSGYpzb36xnoh3sFx/FdmxW3fOyN6NpXIlfePkePSv3Fx2aOzY8LX762b3fRaPDr1hlj8ycUxtvcB+65/aiJAgAABAgQIECBAgACB/UrA0tr9ajh0piCQhnhPPvXzJkO8wjnpexroPbb68WRG3Zv1D7f6+Za5t8SFF1xQDPGO7n10nHbaoFbLOYHAvhN4JyoX/GMsKM5S6hHD5j4Yy2Y0E+I1aPiA6Dnshrj3R1fG8WV1P1Svi5sn/SA2WWPbQMoXAgQIECBAgAABAgQIvJcEBHnvpdF8D11LOhOvqupPbbqiNPT71fMvtOnclze+HKNHjYo7b7+9eP6Is0fEgw89FMf0OaZ4zAcCHS6wbVV8f9GGumbKovuYb8WsvVoa2yXKB06IexecF93raql+4fsxa8UfO7zrGiBAgAABAgQIECBAgACBd0dAkPfuuGu1BYF0dl1Ty2lbKFIT+r2aPEevpdfKh1fGuV8eEy/UhX6Hdj00br/zzph7661x0EEHtVTUbwT2scDO2LR8aTxVeCxe2WkxccrgKN/rVpIw79QL4qIBB9eVrIqnVq6LbQ3q2RCLzvp49O7ZK3r3nRJrkzZ3bV4biyYPj77psfSvz/CYunBtvFIzm68q1k4+qfZ4z5Ni6pqqBrU1/LIrqipXxKLZY+OzhbqS975nTYkFyyqjtmS99nuOiUWbCxed1tRaW/XLFvrSdJs11zD/h7F2886GXWzhW+qweOHtMfWsfnXXW+dRuIaFK6KyKq8pjnXXNX9KjOizux8143Pi2JizsLVrq29VcK6tc0H9se55bHz2kpmxqDg+LQDV/yl9PmNTVum9M39xLK9seNcVilavmRLHpffGoBm1uy2nP+ysiLGFa6y7JwvneydAgAABAgQIECBAoGUBQV7LPn59FwS2vPpqu1p9ZUvT5dINLb7z7X+Mq664oriUdsDAAfGjH1fEGWee0a62FCKQTWB7/K91L0Uh0io75QtxaremHorXhla69Imzzz8xiitsn1wVT2xrIXyqejSuP298zKxYX2w/kg0zVqzbEQfvTRd2bY7Hpo2ME8++JmbOWx1b63W1en1FzJn45TjzkoVJEPaXer9k/NhCm+k1LJ31DzF20LC4bNmmlnfxralneBw36OK4cfotuzcOqde9mmuYfk2yK/DomPN80yFVvdOzfdy1KZZfeloMTC1nNbFz8dbVsWB6em2fjhHTVtYFrq01uTNeWTYhzkzqnFN/rJNR37r6rpg5MRm7s74Tj7UafG6LyoWXxmc/OTImNWVV4/7dmHT2oBgx+Uc5Bp+tXb/fCRAgQIAAAQIECLw3BTpss4t0FkHhtemVzYWPzb7XP7/Zk5IfOkNd6fW3dp1t9SrFutq6pDa9tvqv+rvaFo6nS2kvv2x8/G7T7wqHiu+zZs4sfvaBQGOBsRdf0vhQm78vuufuls+t/m08+/PCTLfyOPmME6Pe3rQtl93j1y7R7bQvxMllj8aaNBmsfi5+9vjrMXLUUXucGfHH+Pfp02Np/R1ya87ayz6kwdPlF8akR15roo3CoTQwuimunPzHOLmFXLFwduvvyWzDf7g46XvBrbkSycYfE78ec49+MCb3b2ITnDb1vV7d1ZWx4Nwro+uqjtpI5I1Ye90lrVgW+vNWvPivU+PaXkfHj8f1bWGH4v8X25+7IyZc/9MGAWuhlsJ79fp7Y/x5f45Fq74Xg8qbSnGTvk0eHWMrthSKtPCe9K3iujjvpT/EkvsmxMAm62uhuJ8IECBAgAABAgQIEGiTQIcFeW1q3UkEOlCgsrIyzjl7ZJMtFJbXNvmjgwQSgbVr1nScw2svx0vFFaAfjD5Hl2drq/yj0eeIsljzWprk7Yw3tr/ddH07n46lK5Kfug+JK2ZcH1cP7pWEQenyy2dic68jmi6zx9FdsW3F7JhWL8Qr6zcmrp1wWVxUU1/t0t37KpbEonSm3iP3xtI96mjPgZ2xdWuKluzsO2Z8XHDeuTGyf238WbNEdt5tcXNx5tmGuOeOVXHJ3SMbBaSN+57WdVVcfflXY1Cv3bv9pvUV+592tfr5+MED/xEXTRnYQnjWnmtKrCrviX8sBmU9YvDl18TXxw+P/sUgLB2fh+KuO26NBavT4PStqJxzSzw0cl6MbHYW5+Z46JbfRJrXNjU2i+tbbX0gbpgxKB6eM6zR0u5k+ffCb8Tlxb4lTSf3zfhJV8Slo/rXnZvM+ltTERVLFtb1LaFavyC+MaNfsb6ywbPjP16ZHbF5YYwoLK89IFn6++LsGFSYRto+OqUIECBAgAABAgQIdEoBS2s75bB3jovu379/XHf9tM5xsa6ypASqN78cG4s9/kB0Lc+YaHQ5OLp2Lcyo2pk8Y/IPu5fNFtspfDg2xs/75/hmXegWSTRV3v9z9YKjwnnNvO/6n3H3rY/X1Z9s0nH67Fj14OwYW6wvqbHXoCT0uiOWzP1ScSOOZmrby8N1O/vOuaIY4qUVpO2NnbMo5o35aLG+6t9ujFcbzwRs0PeDo//1FbFszrgGIV6hvrT/911fWLJcHa/9/IX4fbH2ffUhCel+tyler6uubMg1MWvKyEZjkY7PyJh818K4rvAsxLpZl833oioJPXc1OzZj59wTSy7vX7ccO5k5WXFz3FX5TsPqqp6KhXc/X7yPyvpdGRWrFsTkYoiXnp7snjz4gph894qoaFDf9Ji15o2G9flGgAABAgQIECBAgMA+EeiwGXmtLQ1t3Pu9Pb9x+frf1VVfo/XP+5vX+w88MNrzr4Dl5R/Y42LHjhsXp502aI/ltVdcdVV8c+I39zjfgc4r0Hi5+r78/8V+pdpjcAzr18SS0zZ2ctf6x+Lhmpl/SYHu58SNc0ZFz0KG2KCOJOQZ9a248ZcvtnFpZoPCTX4pG3BBTBrRu5lZcYfHKed9MXpUzI+aBb//tT1qHs9Xv29VW2Lj6+msxeRVdmJ8ZWSfZupKTzggeg8dHH2nr6vdpGHDy5Hu09EzY+aa1rz79Zd4a3tVMSyLNzbHK8nmGt2Ks/F2nxld+sbY5etjbL1DLX5scWy6xcBrZ8S1vxwTM194K6lmczz8yG9iYv/CjMNk5uLqpbGisAS7bFjMWNzSctmkviT4nLHhzJi0Ol36vCVWLHkqJg1uPCOyxR77kQABAgQIECBAgACBNgiYkdcGJKfkK3DUUUe2q8Hmyh3T55h48KGHYsTZI4r13nn77TF61KhIn6HnRaDzCJRFj78fGv3qh1t7dfHvxPpH1tQGZcl8rh5nj4pTmgqdinXWhWvF71k+lMURnxnQTGhYW2+X8q5xaEtNdBsZCzdurnkG6aaNd7WwNLWukkO6xeH7NLhr3Lmy+PCnBkaPusPV6++IMSeMTHaBXRiLMu2Y24axabBJSuMZh3+OV1/eUpx12WPs+Bje7DLewjUdFcOvPHf3tTQ1I7JwqncCBAgQIECAAAECBNotIMhrN52CHSVw5JHdo6nZdS21V1ZWFsf0PrrZUw466KCYe+utcfudd8ahXWv/VT99Tt65Xx4TKx9e2Ww5PxDoCIG/ObRrHFas+E+xvapulljx2F5+2PVWbN9eWEd6QPTp86HiLrYNa+qS3P8HtzALreHZe36ris0b/rPu8Pvj2GOObLWuLp/4dJy0+/Fze1bZ5iNta6/N1TV5YvrMtx8mIVoSpM2fEiNOnFi7gUiT5+6bg136DY+vFpbMplXW7AI7I2amO+Z+8pjo3fPkGDd7QSxaVhnpXLe2vXrFmad/vJWxSTZJGXBC9C1UWDfjsPbr3o9zWq7LR/rEsYXg8/VNsTmZXehFgAABAgQIECBAgMC+FeiwpbX7tptq62wCnxo4IJ548umorm5bwHHCpwZEGua19jrjzDPi2GOPjeumTok0yNuxfUdcdcUV8dyzX4uJk66NNPDzItDRAoXAo3aF6n/Gxt8lEU1TO6y2tSP1l4wmS0IP79pR9/Hbsf2Nwi4dB0S3Q9uwRLfsQ3HMsUmSt75Qrq0X1fi8NrbXuFgz32s2tHhsQ7yx7ofFjRqaObVjD6dLZu9ZHDFxQsys2cyicXOvxZp5syLdemXmxHRzjmnx7WmjGz1Hr3GZrM9dbMc4p1045NCombiX/mO7uiq2v/mXqD3QuH++EyBAgAABAgQIECDQXgEz8torp1yHCnzgA4fEqad8LtLn5bX0SsO7vzvpM5HO4mvrK11qu/hf/iXS5+QVXvcl3+fedHPhq3cCHSvQ7cT44inldW1UxVMr18W2dreYPM/s8VXxVDHz7hOfGXB4u2t7zxfctTkemzY8jht0cdw4fda7G+IVsMsHxti7H4/nH7w1rrt8SAsbhLwVL1ZcF+d8YUIs35w1GC007p0AAQIECBAgQIAAgVISMCOvlEark/U1DfOGDDkttrz6+9iy5dWoqvpTUSAN+I760JHx8b4fa9NMvGLBug/pzLt0s4sTTjghrplwdc3RdEaeF4F8BI6IU884IcpWP1rzHLLqJ1fFE9uGt/7MtqY6t2tjPLhkXXHDhLIBw2LQR1qfndpUVa0fOyi6Hp6uk01DpJ2xbUe602khkGymdPUf4uUN+0notGtTLL/8wpj0SM12GI06nOzAO+SiuOjEukXPXT8V5wz4VVw4aEbtZheNzt73X9PdaUfE2PRvSrKbbeVP4oFfvR7bm5oxuPWnMe3GQXHq3c1tJlFYrt3yfbCranvsKFzIYV2jvPif9toxzmk9b+6IbYXVtGXl0fWQYoWFVrwTIECAAAECBAgQIJBRQJCXEVDxjhUoPPuupeffZenByaecHD9duTLefutty2qzQCq7lwLJ88lO+0KcXPZo7TPYqh+PubPXxOA5w1qLxRq1kwQ+T9wXi2t2Hk1/Ko+Tzz8zerd7M4tG1e/xtTx6HfvBiJqdSaviF7/8bVSPOqqZ5/HVFt7162fjmf0ix0ut7o65xRCvRwy+/Jr4+vjhzS9T3fyrPQTyOVAI9ZLWxo2PyZEGew/FXXfcWpxB2HL425bl2kmdv9sUr9ddUNnH+sRHivdN/XH+P7Hh5f+d9OCoVp6512hm6BG9o1eLG6HkI6kVAgQIECBAgAABAu81Af+5/L02oq5nrwW6d+8e6XJbLwK5CnQ7I6ZOPrEuBKuOrRUT48LZz+zFhgZJEPP8bXHh+Ptja6HjPc6Nr484qvCtA94PjH6nDy7uTLrzyUfj6RY3NKi/y20HdGevqnwrKletrbNKdnW9/LaYP2Vk8yFeEl1te+G5eGmv2tjbkzfEorM+nmxo0Sv5+3zMqUxnODb1SoO9kTF5/ndjdDohMn0VnkFX+63R/ybLtZc8HJsKs+Ma/VrztcFMziQAPuPE6FY877/FR475aPHefG3RgnioONWueFKjD6/HEyuf2z0ztEEw2OhUXwkQIECAAAECBAgQaLeAIK/ddAoSIEAgi8AB0fvib8e1xR1Lk+efzRsfF05bGa+0FMDUNJnsrvrojXHhuXfEi4Vn45X1j/H/NDb6F2dVZelb82W79BsaZ/aoW7K59YG4YfKyZvqbBo3z4juLNjRf2X77S63vJVNrlz53XDd7xMDPfqSu+g1xz/eWtBi+7Xr15Xi5cG8ckIR/hXFoooPVL9weE29uLhjeFs/fPC1uLszkLDshvnjaEfVqSWaMDhkdI7rXjXP1ozHtotvi+WZD26S+2VfGtJqZmmk1H40R559cLxisV7WPBAgQIECAAAECBAhkEhDkZeJTmAABAhkEkh1LL5p7QwwrBCaRhHn/ekUM6Ts8ps5fHMsrG22BUVUZyxfeHlPP+nQMGXfv7hAvmSM3bNZNMXHg7jlVGXrVctEun4xLv3tO3YYMyUzCR26I8y+dGYvXbE7msNW90n7OHh9njqoXNBZ+e9fe3x+9+ny4rvXqeG3ehLhs9vKobBBObYvKZQtjziXDGvkmxXbtiB1vFq9wH11FMsPxnHOifyEve2FGnHn2lFiwrLLhzMxkg46198yMy86/KSprgtvkeX5nDS2Wa7ozdcHw5IWxtrgxRrpEd3lyfSNizLzKutlzB0f/yd+M4TXbzdarqfzkGHfJwOKy6er1d8SYL4yPOQ36lgSea+5rVF9E2YDzY9ypjTZcOaRbHF54ZN/OX8a/P/VGvcZ8JECAAAECBAgQIECgrQKekddWKecRIECgAwS69BoT81d9OOZcMD4WrH+rtoXq9bF0VvIX341JrbVZ1i/O/f5t8d1hvVp5hllrFbX192SZ5+Br4sYxv4ixFVuSQkmYt/quuDH9a2sV78p5ZdFz5LnJcwifq30uYbwWa+ZNrPlrU3cKS1kbB15tKtz8SV16fzVmT14TZ06v3bCken1FzJmY/jVfJrqfEzdOG9zC8xQPjv/e74Oxcf2mZJfbGck4zWimsiQQPP2GuPnivk3cO8mM0XH/HPM2jq4b56SKratjwcT0r5nqksNl/a6MJfdcvOdzGg85NGroaoLILbH04k8n93daYFjctG5e+zZ6ab4bfiFAgAABAgQIECDwnhUwI+89O7QujACBkhEoPykm/9vaeGDOeXF8YdZSq50/OI4fMzMeeG55TM8txCt06vAYNHNxLPhKv+KMrcIvDd+TDSUmXRqDC891a/hj/t+6DY+bfnRl24y7D4kr7vlBzBpS2JV3Y/zyhY6YRZYGZnfE/dcPq5vl2DJLWb8LY8H934pBLW4k8f447qqb4o4Wxye5f75yWyyZNyZ6NrscOxnnOcvigTb1rfZ+vP++CTGwqb6VfSI+f9ZH97y46i3x8qt/3vO4IwQIECBAgAABAgQINClgRl6TLA4SIEAgb4Fu0X/MjFgxZmKyvPPf4vk3Xoqfzq2ot3w27U8aloyLL/X9RAz92qAWApgc+t6lVwydsTzWjf5JPPDIT2PxvNW7N91IZgmOnjg6Pv/5c2JQj2di6u135dChtjSRzCYcODFWPDc4li9dFT+7e3Gs2Vp4yGBSvqbfX4qPHTs0LhicznBMNrzYcUKUrU6flZdsILFyXWwbNbIDnv2WjP24u+LJoWvjvsfWxS8a9ytZOj348v8Rf3fC6XX9asO11ozPj2PV0IqoWLKwuNtt7TXWjU2vtiSstX37+ehkufTSp+PZnyyMpYWZo2k3ksBz/CWnxQlDk7Fusb66UPAzi+L7N91dz/3N2L7j/yYVHdiGi3IKAQIECBAgQIAAAQLv+2vy2hcM6a579V+bXtlc/6vPBAgQ2K8F/DOsg4anem1MPf7iWLozqd8yyg5CTqtNd8AdHjPXp9DdY/Q9P4tZgwuzCTuwWVUTIECAAAECBAgQIJCrgKW1uXJrjAABAqUtUL1mShyX/IebNPjs/bnZUdnK/g+7fv1sPJNmS+nriN7Rq6lll7W/+l8CBAgQIECAAAECBAgQaEVAkNcKkJ8JECBAYLfA3xzaNQ4rfH3tZ/HjJ1p4btyul2Lx95Yk20qkr7Lo8fdDo1+zz2MrVOqdAAECBAgQIECAAAECBJoTEOQ1J+M4AQIECOwh0KXXgDipe2FHjmT30fFjY+r8FVFZVX9q3rbkOX93xtSzx8TMF+p24i0bGF8957gmdkfdowkHCBAgQIAAAQIECBAgQKAZAZtdNAPjMAECBAg0IVB+coy7ZGCsmL4u2QAieVWvj6Wzrqn5a+LsukMHR//J346Lerdlc4Xma/ELAQIECBAgQIAAAQIEOruAGXmd/Q5w/QQIENgrgQOi97g74v4558XxhYl5LZVPdoI9d+FD8eNxfc3Ga8nJbwQIECBAgAABAgQIEGiDgBl5bUByCgECBAjUF+gW/cfMiBWnj47lS5+OZ3+yMJaur1tCW3NaWXQfclFc9NkTY+jXBkVPz8Wrj+czAQIECBAgQIAAAQIE2i3wvr8mr3aXrlcw3cGw/mvTK5vrf/WZAAEC+7WAf4bt18OjcwQIECBAgAABAgQIECCQCFha6zYgQIAAAQIECBAgQIAAAQIECBAgUAICgrwSGCRdJECAAAECBAgQIECAAAECBAgQICDIcw8QIECAAAECBAgQIECAAAECBAgQKAEBQV4JDJIuEiBAgAABAgQIECBAgAABAgQIEBDkuQcIECBAgAABAgQIECBAgAABAgQIlICAIK8EBkkXCRAgQIAAAQIECBAgQIAAAQIECAjy3AMECBAgQIAAAQIECBAgQIAAAQIESkBAkFcCg6SLBAgQIECAAAECBAgQIECAAAECBAR57gECBAgQIECAAAECBAgQIECAAAECJSAgyCuBQdJFAgQIECBAgAABAgQIECBAgAABAoI89wABAgQIECBAgAABAgQIECBAgACBEhAQ5JXAIOkiAQIECBAgQIAAAQIECBAgQIAAAUGee4AAAQIECBAgQIAAAQIECBAgQIBACQgI8kpgkHSRAAECBAgQIECAAAECBAgQIECAgCDPPUCAAAECBAgQIECAAAECBAgQIECgBAQEeSUwSLpIgAABAgQIECBAgAABAgQIECBAQJDnHiBAgAABAgQIECBAgAABAgQIECBQAgKCvBIYJF0kQIAAAQIECBAgQIAAAQIECBAgIMhzDxAgQIAAAQIECBAgQIAAAQIECBAoAQFBXgkMki4SIECAAAECBAgQIECAAAECBAgQEOS5BwgQIECAAAECBAgQIECAAAECBAiUgIAgrwQGSRcJECBAgAABAgQIECBAgAABAgQICPLcAwQIECBAgAABAgQIECBAgAABAgRKQECQVwKDpIsECBAgQIAAAQIECBAgQIAAAQIEBHnuAQIECBAgQIAAAQIECBAgQIAAAQIlICDIK4FB0kUCBAgQIECAAAECBAgQIECAAAECgjz3AAECBAgQIECAAAECBAgQIECAAIESEBDklcAg6SIBAgQIECBAgAABAgQIECBAgAABQZ57gAABAgQIECBAgAABAgQIECBAgEAJCAjySmCQdJEAAQIECBAgQIAAAQIECBAgQICAIM89QIAAAQIECBAgQIAAAQIECBAgQKAEBAR5JTBIukiAAAECBAgQIECAAAECBAgQIEBAkOceIECAAAECBAgQIECAAAECBAgQIFACAn/bUX3s3bNXR1WtXgIECBAgQIAAAQIECBAgQIAAAQKdTsCMvE435C6YAAECBAgQIECAAAECBAgQIECgFAUEeaU4avpMgAABAgQIECBAgAABAgQIECDQ6QQEeZ1uyF0wAQIECBAgQIAAAQIECBAgQIBAKQq876/JqxQ7rs8ECBAgQIAAAQIECBAgQIAAAQIEOpOAGXmdabRdKwECBAgQIECAAAECBAgQIECAQMkKCPJKduh0nAABAgQIECBAgAABAgQIECBAoDMJCPI602i7VgIECBAgQIAAAQIECBAgQIAAgZIVEOSV7NDpOAECBAgQIECAAAECBAgQIECAQGcSEOR1ptF2rQQIECBAgAABAgQIECBAgAABAiUrIMgr2aHTcQIECBAgQIAAAQIECBAgQIAAgc4kIMjrTKPtWgkQIECAAAECBAgQIECAAAECBEpWQJBXskOn4wQIECBAgAABAgQIECBAgAABAp1JQJDXmUbbtRIgQIAAAQIECBAgQIAAAQIECJSsgCCvZIdOxwkQIECAAAECBAgQIECAAAECBDqTgCCvM422ayVAgAABAgQIECBAgAABAgQIEChZAUFeyQ6djhMgQIAAAQIECBAgQIAAAQIECHQmAUFeZxpt10qAAAECBAgQIECAAAECBAgQIFCyAv8fPYX/D5KRDk0AAAAASUVORK5CYII=" alt></p>
<p><em>R</em><sub>f</sub>:</p>
<p>Z:</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question">
<p>The stability of DNA is due to interactions of its hydrophilic and hydrophobic components.</p>
<p><img style="display: block; margin-left: auto; margin-right: auto;" 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"></p>
<p>Outline the interactions of the phosphate groups in DNA with water and with surrounding proteins (histones).</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<br><hr><br><div class="specification">
<p>Enzymes play an important role in the functioning of our bodies.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The graph below shows a Michaelis–Menten plot for an enzyme. Sketch and label two curves on the graph below to show the effect of adding a competitive and non-competitive inhibitor.</p>
<p><img src="data:image/png;base64,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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>Enzyme solutions are prepared in buffers. Determine the pH of a buffer solution containing 2.60×10<sup>−3</sup>moldm<sup>−3</sup> ethanoic acid and 3.70×10<sup>−3</sup>moldm<sup>−3</sup> sodium ethanoate. Refer to sections 1 and 21 of the data booklet.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>An enzyme catalyses the conversion of succinate to fumarate ions in a cell, as part of the process of respiration.</p>
<p style="text-align: center;"><img 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"></p>
<p>The rate of the reaction was monitored and the following graph was plotted.</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine the value of the Michaelis constant, <em>K</em><sub>m</sub>, by annotating the graph.</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 malonate ion acts as an inhibitor for the enzyme.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p>Suggest, on the molecular level, how the malonate ion is able to inhibit the enzyme.</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>Draw a curve on the graph above showing the effect of the presence of the malonate ion inhibitor on the rate of reaction.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br>