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</div><h2>SL Paper 2</h2><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Milk contains lactose which some people can digest but some cannot.</p>
<p>State what type of sugar lactose is.</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>Milk contains lactose which some people can digest but some cannot.</p>
<p>State a function of lactose.</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>Milk contains lactose which some people can digest but some cannot.</p>
<p>Explain the production of lactose-free milk.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>disaccharide.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>provide energy (for young mammals)<br><em>Do not accept energy storage.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <span style="text-decoration: underline;">lactase</span> added to milk / <span style="text-decoration: underline;">lactase</span> immobilised;<br>b. <span style="text-decoration: underline;">lactose</span> hydrolysed/broken down into <span style="text-decoration: underline;">glucose</span> and <span style="text-decoration: underline;">galactose</span>;<br>c. for people who are lactose intolerant/lack lactase;<br>d. increases sweetness/solubility/smooth texture (in processed foods);</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most candidates got this one right. Wrong answers included answers like polysaccharide, sucrose, monosaccharide and ribose.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Too many missed the idea of "function" here. Even after getting the answer to part (a) right, some candidates confused lactose with lactase citing that it as an enzyme, or suggesting that it digests. Others gave a nutrient value of milk rather than recognizing that lactose is a component of milk with a singular function.</p>
<p> </p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question could be interpreted as asking for the steps in a procedure (an acceptable expectation from Topic 3 AS 3.6.5) or it could be seen as asking the purpose of production of lactose-free milk (as found in the teacher's notes). Marking points were given for both possibilities. Most candidates earned one mark for statements about how lactose free milk is made and one mark for a reason for making it.<br>The old lactose/lactase/lactate confusion arose for weaker candidates. There was quite a bit of evidence for strict memorization here.<br>Many creative incorrect answers such as genetic modification of cows so they don’t produced lactose or lactose is an enzyme that makes digestion difficult so lactose must be denatured.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram to show the human ventilation system.</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>Outline anaerobic cell respiration in plant cells.</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the concept of homeostasis, using the control of blood sugar as an example.</p>
<div class="marks">[9]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em> Award <strong>[1]</strong> for each structure clearly drawn and correctly labelled.</em></p>
<p>trachea;</p>
<p>bronchi;</p>
<p>bronchioles;</p>
<p>lungs;</p>
<p>alveoli – shown enlarged as inset;</p>
<p>diaphragm;</p>
<p>intercostal muscles;</p>
<p>abdominal (wall) muscles;</p>
<p><em>Award <strong>[3 max]</strong> for diagrams that do not show correct connections or proportions.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>anaerobic (cell) respiration in the absence of oxygen;</p>
<p>glycolysis / breakdown of glucose molecules;</p>
<p>leads to the production of pyruvate;</p>
<p>also known as fermentation;</p>
<p>production of small yield/two ATP (molecules per molecule of glucose respired);</p>
<p>produces ethanol;</p>
<p>produces carbon dioxide;</p>
<p>occurs in cytoplasm;</p>
<p>example of anaerobic respiration in plants (<em>e.g.</em> waterlogged roots);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>maintaining the internal environment constant/between narrow limits;</p>
<p>example (other than blood sugar) of blood pH / oxygen and carbon dioxide concentrations / body temperature / water balance;</p>
<p>involves negative feedback;</p>
<p>where a variation from the normal (blood sugar level) triggers the correction mechanisms;</p>
<p>controlled by both nervous and endocrine systems;</p>
<p>blood sugar above normal stimulates insulin release;</p>
<p>insulin secreted by <span style="text-decoration: underline;">β cells</span> in the (islets of the) <span style="text-decoration: underline;">pancreas</span>;</p>
<p>insulin lowers blood sugar;</p>
<p>by converting to glycogen/fat / increased respiration;</p>
<p>blood sugar below normal stimulates glucagon release;</p>
<p>glucagon secreted by <span style="text-decoration: underline;">α cells</span> in the (islets of the) pancreas;</p>
<p>glycogen converted to glucose; causes increased level of glucose in the blood;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>In the diagram of the human ventilation system, alveoli needed to be shown as an inset to gain their mark. This was consistent with the Teacher’s notes for A.S. 6.4.4 in the Subject Guide. Many candidates included intercostal muscles but it was difficult to show them clearly. Abdominal (wall) muscles were not shown. The quality of the ventilation diagrams was generally lower than for the membrane diagrams. Correct labels must correspond to recognizable structures.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Uncertainty as to the type of anaerobic respiration found in plants may have put off some candidates since, for A.S. 3.7.3., the Teacher’s notes only mention yeast and humans. Nonetheless, some candidates gained full marks knowing those aspects common to both pathways. Also, candidates may have associated yeast with plants, thereby describing the alcohol fermentation pathway. At least one candidate was able to cite waterlogged roots as a place where anaerobic respiration would occur in plant cells.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates did quite well on this question, showing good knowledge and understanding of homeostasis. The mark scheme provided ample opportunities for many high scoring answers. Negative feedback was frequently included but "controlled by both nervous and endocrine systems" was rarely seen.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the type of bonds that</p>
<p>(i) connect base pairs in a DNA molecule.</p>
<p>(ii) link DNA nucleotides into a single strand.</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>Distinguish between DNA and RNA nucleotides by giving <strong>two</strong> differences in the chemical structure of the molecules.</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>Explain the role of transfer RNA (tRNA) in the process of translation.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) hydrogen</p>
<p>(ii) covalent / phosphodiester linkage</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA has deoxyribose, RNA has ribose;</p>
<p>DNA has <span style="text-decoration: underline;">base T</span>/thymine, RNA has <span style="text-decoration: underline;">base U</span>/uracil;</p>
<p><em>Do not accept double or single strands as chemical structure.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>tRNA attaches to (specific) amino acid;</p>
<p>tRNA (with amino acid) moves to the ribosome;</p>
<p><span style="text-decoration: underline;">anticodon</span> of tRNA binds with <span style="text-decoration: underline;">codon</span> of mRNA;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) Most were correct.</p>
<p>(ii) Less success was seen here. A number of students mistakenly wrote phosphate bonds or peptide bonds. “Covalent bonds” was commonly stated for the mark and, sometimes, even the more sophisticated answer of phosphodiester linkage was given.</p>
<p>Occasionally, candidates reversed hydrogen and covalent for parts (i) and (ii) and lost both marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Easy marks for many candidates. However, some misread the questions and described differences in the physical/molecular structure of DNA and RNA molecules. Rather than restricting answers to nucleotide differences, double and single strands were described resulting in no credit.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was worth only two marks but explaining the role of tRNA during translation could easily have been worth more. A few candidates wrote stellar answers that far exceeded the two mark maximum. The marking points most often awarded were that tRNA attaches to an amino acid and that tRNA has an anticodon complementary to the mRNA codon. Many candidates provided inaccurate information.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish between ventilation, gas exchange and cell respiration.</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>Outline the process of aerobic respiration.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Respiration and other processes in cells involve enzymes. Explain the factors that can affect enzymes.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>ventilation is moving air into and out of lungs/inhalation and exhalation;<br>involves (respiratory) muscle activity;<br>gas exchange involves movement of carbon dioxide and oxygen;<br>between alveoli and blood (in capillaries) / between blood (in capillaries) and cells;<br>cell respiration is the release of energy from organic molecules/glucose;<br>(aerobic) cell respiration occurs in mitochondria; <br><em>To award <strong>[4 max]</strong> responses must address ventilation, gas exchange and cell respiration.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>during glycolysis glucose is partially oxidized in the cytoplasm;<br>(small amount/yield of) ATP produced;<br>(two) pyruvate formed by glycolysis;<br>pyruvate absorbed into/broken down in the mitochondrion;<br>requires oxygen;<br>carbon dioxide is produced;<br>water is produced;<br>large amount/yield of energy/ATP molecules (per glucose molecule);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>collisions between enzyme/active site and substrate;<br>enzyme activity increases as temperature rises;<br>more frequent collisions at higher temperatures;<br>each enzyme has an optimum temperature / enzymes have optimal temperatures;<br>high temperatures (above optimum) denature enzymes;<br>each enzyme has an optimum pH / enzymes have optimal pHs;<br>increase <span style="text-decoration: underline;">or</span> decrease from optimum pH decreases rate of reaction/activity;<br>extreme pH alters/denatures the tertiary/3D protein/enzyme structure;<br>increasing substrate concentration increases the rate of reaction;<br>higher substrate concentration increases chance of collision;<br>until plateau;<br>when all active sites are busy; <br><em>Accept clearly annotated graph.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>As candidates distinguished between ventilation, gas exchange and cell respiration (A.S. 6.4.1), certain ideas keep reappearing and others were infrequently expressed. Among the former were inhalation and exhalation; movement of carbon dioxide and oxygen; and release of energy from organic molecules. Less common were involvement of muscle activity for ventilation; exchange between alveoli and blood or between blood and cells; and that cell respiration occurs in mitochondria. “Ventilation is moving air into the lungs” was not enough for a mark, nor was “cell respiration is release of energy from food” which was too general.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>With this question on aerobic respiration (A.S. 3.7.2, 3.7.3), many candidates easily earned four of the six available marks. These were that aerobic respiration requires oxygen, produces carbon dioxide, produces water and produces a large yield of energy/ATP. Additional marks were earned with commentary on glycolysis, since it produces the pyruvates that are eventually broken down aerobically. </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Factors that affect enzyme activity (A.S. 3.6.1-3.6.4) is another topic that has appeared repeatedly on past IB exams. Furthermore, the topic is often visited during IA investigations. Details on how changes in temperature and pH affect enzyme activity formed the heart of most answers. Denaturation of enzyme structure that alters the active site was usually included in those answers. The effect of substrate concentration on enzyme activity was less common. Higher quality answers mentioned collisions between enzyme and substrate and linked enzyme activity to the frequency of collisions at different temperatures or substrate concentrations. Many written passages were supported with annotated graphs that also earned marks. However, some candidates confused the graph for enzyme activity vs temperature with the graph of enzyme activity vs. substrate concentration. They show a plateau in the temperature curve and declared that the plateau represented denaturation of the enzyme at that temperature.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the genetic code and its relationship to polypeptides and proteins.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the role of proteins in active and passive transport of molecules through membranes.</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Many cell functions, like synthesis of macromolecules and transport, require energy in the form of ATP. Explain how ATP is generated in animal cells.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Remember, up to TWO “quality of construction” marks per essay.</em></p>
<p>a. (the genetic code is based on) sets of three nucleotides/triplets of bases called codons;<br>b. bases include adenine, guanine, cytosine and thymine in DNA / adenine, guanine, cytosine and uracil in RNA; (do not accept ATCG)<br>c. each codon is code for one amino acid;<br>d. some codons are (start or) stop codons;<br>e. DNA is transcribed into mRNA by base-pair matching/complementary base pairing;<br>f. mRNA is translated into a sequence of amino acids/polypeptide;<br>g. each gene codes for a polypeptide;<br>h. polypeptides may be joined/modified to form proteins;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Remember, up to TWO “quality of construction” marks per essay.</em></p>
<p>a. channel proteins allow diffusion/osmosis/passive transport;<br>b. large/polar molecules cannot cross the (hydrophobic) membrane freely;<br>c. facilitated diffusion involves moving molecules through proteins down their concentration gradient/without requiring ATP;<br>d. aquaporins (specific integral membrane proteins) facilitate the movement of water molecules/osmosis;<br>e. some proteins (for facilitated diffusion) are specific to molecule/ions;<br>f. active transport involves moving molecules through proteins against their concentration gradient/requiring ATP;<br>g. (some) proteins in the membrane are pumps / pumps perform active transport / sodium potassium pump;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Remember, up to TWO “quality of construction” marks per essay.</em></p>
<p>a. ATP is a form of energy currency/immediately available for use;<br>b. ATP is generated in cells by cell respiration (from organic compounds);<br>c. aerobic (cell respiration) requires oxygen;<br>d. anaerobic (cell respiration) does not require oxygen;<br>e. glycolysis breaks down glucose into pyruvate;<br>f. glycolysis occurs in cytoplasm;<br>g. (by glycolysis) a small amount of ATP is released;<br>h. ADP changes into ATP with the addition of a phosphate group/phosphoric acid / accept as chemical equation;<br>i. in mitochondria/aerobic respiration produces large amount of ATP / 38 mols (for the cell, per glucose molecule);<br>j. oxygen/aerobic respiration is required for mitochondrial production of ATP;<br>k. in mitochondria/aerobic respiration pyruvate is broken down into carbon dioxide and water;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Many mentioned codons and anticodons, but few explained what they are. Most gained marks from stating that one gene codes for one polypeptide, and that polypeptides can be linked or modified to form proteins.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many were confused by the differences between channel proteins (passive) and protein pumps (active).</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were several comments about how the students could gain 8 marks on a question about ATP. It was obvious that some students had studied option C, but this should not really have given them an advantage. In fact the students found this question much easier than the teachers thought, scoring well in this section.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;">Describe the structure and function of starch in plants.</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 style="text-align: left;">Outline the production of carbohydrates in photosynthesis.</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 style="text-align: left;">Discuss the processes in the carbon cycle that affect concentrations of carbon dioxide and methane in the atmosphere and the consequences for climate change.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Structure</em>:<br><br>a. «starch» is a polysaccharide/is composed of glucose molecules </p>
<p>b. contains amylose which is a linear/helical molecule </p>
<p>c. contains amylopectin which is a branched molecule </p>
<p><em>Function</em>:</p>
<p>d. storage of glucose/energy in plants </p>
<p>e. storage form that does not draw water</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. light is absorbed by <span style="text-decoration: underline;">chlorophyll</span><br><em><strong>OR</strong></em><br><span style="text-decoration: underline;">chlorophyll</span> absorbs more red and blue light <br><br>b. «absorbed» light energy is converted to chemical energy </p>
<p>c. some of the energy is used for production of ATP </p>
<p>d. water molecules are split/photolysis </p>
<p>e. produces oxygen «as waste product»/hydrogen/NADPH </p>
<p>f. plants absorb/fix CO<sub>2</sub> «from air or water» </p>
<p>g. ATP/energy is needed to produce carbohydrates/starch</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. CO<sub>2</sub> is produced from respiration in organisms/combustion of biomass/fossil fuels <br><br>b. CH<sub>4</sub> is produced by anaerobic respiration of biomass/«methanogenic» bacteria </p>
<p>c. CH<sub>4</sub> is oxidized to CO<sub>2</sub> and water </p>
<p>d. CO<sub>2</sub> is converted into carbohydrates/organic compounds by autotrophs/producers/photosynthesis </p>
<p>e. CO<sub>2</sub> can be converted to calcium carbonate/fossilized into limestone </p>
<p>f. «partially» decomposed organic matter/biomass can be converted into peat/coal/oil/gas/fossil fuels </p>
<p>g. CO<sub>2</sub> and CH<sub>4</sub> are both greenhouse gases/increase greenhouse effect </p>
<p>h. both absorb long-wave radiation from the earth and retain the heat in the atmosphere </p>
<p>i. increased CO<sub>2</sub> concentrations in the atmosphere correlate with increased combustion of fossil fuels </p>
<p>j. rising average global temperatures correlate with more greenhouse gases in the atmosphere </p>
<p>k. cattle production/rice paddy/defrosting of tundra increase CH<sub>4</sub> in the atmosphere<br><em><strong>OR</strong></em><br>increasing CO<sub>2</sub> leads to acidification of marine/aquatic environments </p>
<p>l. the global temperature increase influences/disrupts climate patterns</p>
<p><em>OWTTE</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain why DNA must be replicated before mitosis and the role of helicase in DNA replication.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how the base sequence of DNA is conserved during replication.</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the events that occur during mitosis.</p>
<div class="marks">[9]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>two genetically identical nuclei/daughter cells formed during mitosis (so hereditary information in DNA can be passed on);<br>two copies of each chromosome/DNA molecule/chromatid needed;<br>helicase unwinds the DNA/double helix;<br>to allow the strands to be separated;<br>helicase separates the two (complementary) strands of DNA;<br>by breaking hydrogen bonds between bases;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA replication is semi-conservative;<br>DNA is split into two single/template strands;<br>nucleotides are assembled on/attached to each single/template strand;<br>by complementary base pairing;<br>adenine with thymine and cytosine with guanine / A with T and C with G;<br>strand newly formed on each template strand is identical to other template strand;<br>DNA polymerase used;</p>
<p><em>Marks may be awarded for any of the above points if clearly presented in a well-annotated diagram.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>sequence of stages is prophase → metaphase → anaphase → telophase;<br>chromosomes condense/supercoil/become shorter and fatter in prophase;<br>spindle microtubules grow (from poles to equator) in prophase/metaphase;<br>nuclear membrane breaks down in prophase/metaphase;<br>spindle microtubules attach to the centromeres/chromosomes in metaphase;<br>chromosomes line up at equator in metaphase;<br>centromeres divide / (paired) chromatids separate / chromosomes separate into two chromatids in metaphase/anaphase;<br>(sister) chromatids/chromosomes pulled to opposite poles in anaphase;<br>spindle microtubules disappear in telophase;<br>nuclear membrane reforms around chromosomes/chromatids in telophase;<br>chromosomes/chromatids decondense in telophase;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Practically everybody knew the role of helicase in DNA replication. Extremely few could clearly explain the need for mitosis. </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The question was often confused with other details of DNA replication, transcription and even translation. Though DNA replication was correctly described as semiconservative, further expansion of that term became muddled. Most knew A-T and G-C base pairing but the idea of complementarity was not always included. Diagrams were drawn but lacked labels and annotations most of the time. Occasionally, candidates mentioned that DNA polymerase was used</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Of all the parts in Section B, this one (describe the events of mitosis) was answered best. Many candidates earned close to the maximum number of marks. A few candidates thought that interphase is a part of mitosis. </p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Define metabolism.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the following processes as <strong>either</strong> anabolism <strong>or</strong> catabolism by placing a tick (√) in the correct box.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAhgAAAB9CAIAAABvQI2HAAAMbklEQVR4nO3dz27bZhaG8d6FfCP0lcgXQt2HvJ8uJ0nD6cSt26AOJg4w0SarZFtgwEWBYpIWTYACs+iqwJnFmTk4+Ui+1j+LtPT8wEUsUxIlU3z0fZSdLwwAgB18MfYGAAAeNkICANgJIQEA7ISQAAB2QkgAADshJACAnRASAMBOypD88ccff/nySxYWFpYTWZ42zejbMPHl9tWrzULy/sOH58+f7zNVAMb29u3bt2/fjr0VE/WPly9/+umnsbdiuj59+vTs6kqvQ0iA40dIBEKiERIAZoREIiQaIQFgRkgkQqIREgBmhEQiJBohAWBGSCRCohESAGaERCIkGiEBYEZIJEKiERIAZoREIiQaIQFgRkgkQqIREgBmhEQiJBohORVt257NZsVyMZ+PvV2YivVDEvtS0zQ73mnTNFvsh5fL5dlstqjrrW9hU+uEpHiJXS6X+7r3i/l8i2c7X2u7W1gfITkVvSGhJQjrh8SP43vZeY4mJPGcbPriulwu/YEIhARTESGJS1arlV/Stu2IG4aJWD8k51V1XlV+bNpx59k9JIehQ9IdovnjuvPYveYD2T0k942QnIpuSMzsvKr8WBCvZ7/E9+xiEJOvGK+T4mUQcSqG9ou67r2p4n0cSRvRmiHxH/Hlcun7QP7px2HRD2FFIeLCvA/Ejhd7SBGV3t1DjEh69zTf5vOqiv3Nd07f289ms9VqpR+1DklvDy7m83gJFC8lX7O78/euZikJ8a2ch/yiO6+q4gnvHZHEA+8+dZfLZXy3bdu48XzLXYTkVOgRSd5HfYfLe2cs/nrrjuL9BVPcSFzeXd/33e76emfFvVozJH648T3Bjzjxrd7pnU33gaH3MfkAOhSSoXvp3ZnzwfTOHU+HxA/Tokb5vuKBdEPSu5p1GpxfjL1PoBd3KCTdW/OfUdHg4ik6k2d9CMmpGDpHkl+NZ+lNn+9t8Z7IdzJ/Wfru5Ttl7lPxcorL451OsUmHn6CAsGZI8mHXf4LxPjeOjP6l/9y7P98YH1hnx8tvbvIuFzfu1xoKydCeFjfrO6fvqH5TvSP1rh1DkuWNFC+BvJrffjF0yC/GeMj5ZTsUEr9Kd2v9Zoun5c7tdITkVPSGJPaM7lR10ZW4unjh9YYqj46L9zVDA3mMYp2Q9L7/LY71YqfqTsJ058fiMNc93sUeNRSSoT0tp8s6vSl29V7rhOTOsxH5Lb84QHdXK0IVD2domsEf6VBIipFQ3Kx4Wu48lUVIToV+53V/ISn2/li6G7bO6xn3Z52Q9M6xxE9NhMS/5Qep7ohkXyFx3T3tvkPSO/Za1HXcRZyMNDkiGVptvyFxOSe94zlCgh6bhmTNqS1LO9zQkLkwtNohP2SCrjtD4rtQcTohHwpFSLq90VNb9vkuZ+tNbRViT7vvkOhPbRVbmCejxAPJq/VObfm1tpja6t1y/bQQEvzPpiHpPT+ZDwR5KU60xOIv3e5JPN+M3nOzjEjGcmdI8qgi5P1KhKR7GrkISXd36p2MzR/3GDpH0t3T7jskNrAzi1P93c8gPH36dGi1TU+2+ybpcyTd7SQkuNumIbGtPv6bL89vXfn47/TdGZI88ZLFQUqEJO9LbdvG76DEOr2fGLZ9f/w3r7PfkJj8zfb8K5y+WmxwfnRDq/mTk18s9/rx3+7TQkgArIW/tSXwt7Y0QgLAjJBIhEQjJADMCIlESDRCAsCMkEiERCMkAMwIiURINEICwIyQSIREIyQAzAiJREg0QgLAjJBIhEQjJADMCIlESDRCAsCMkEiERNsmJB8/fvzu++//+fo1CwvL0Sw3L17cvHgx+mZMc7m5uXl5ezv6Zkx2eXl7+/r1681C8uuvv/5wc/MvAEfE/0ru2FsxUTcvXrx7927srZiud+/e3b56tVlImNoCjg9TWwJTWxrnSACYERKJkGiEBIAZIZEIiUZIAJgREomQaIQEgBkhkQiJRkgAmBESiZBohASAGSGRCIlGSACYERKJkGiEBIDZGCE5m822Xg65nTZSSB7Q80NIAJiNFJIDX3FrY4XkwFfcGiEBYEZIJEKiERIAZoREIiTaCCG5mM+7M3qr1crM2raNf6+vaZqtN2a7O1rU9cV8vvsNns1mB9t4QCMkAiHRxgnJoq7zJU3TnM1mbdtuEZLL5fK8qrbemO3uaF8hAaaDkAiERJtESMzsvKoul0tCAoyFkAiERJtiSC6Xy2LKyy3qurg8r9m2bXFJnjU6r6q8ZoyBulvlWxLrXy6X3TvykMQcXY7KarWKNfPDzBN68aBiI/2B+3KYLgIFQiIQEm0SIfHDdExtxbPgl/u/F3UdR1jPQLQkLs/r+wHdD9P5HmN9D4ZfmEdCnhBvjN9I9448aXH1+Hde3+/XG5NHML7xcUXfwpy93tAC942QCIREm8rJdj9w+wE9Dqn+Ze+5kzg05+N7MQqJb/UemnN1mqaJGzmvqrzyeVX5bRYhyeOGRV37VS7m86hL3v6hqbDekACjICQCIdEmMSIJRTDiS3+nn2ei4rAe/+jGJt775+mmvELvkCWPVPKX4hxJfJkn0PI95pmrHIz4Mk+dbf6MAntASARCop1ESEIc6P2mPADFFXcMiR5YxGjM767oSvSG0yQ4PEIiEBLtYYRkx6mtQhzuvU/FaruEZM3TGzED1jujFRNid94OsEeERCAk2sMIif3//LZfrk+25/PkfpjOpz2K8+E+RilOimwdknyneXvirLt9fh7I/1GcGconb4CDISQCIdEeTEis7+O/lqaDuh8ILs5G9J4m8fXzJUMhyXc0FBL7/HxM/nHm0yexYfHvoWsBB0NIBEKinfrf2sqf1wJOGSERCIl26iEpPrALnCxCIhAS7XRD4idaGI4AjpAIhEQ73ZAAyAiJQEg0QgLAjP9qV+K/2tUICQCzMULygIwSkgeEkAAwIyQSIdEICQAzQiIREo2QADAjJBIh0QgJADNCIhESjZAAMCMkEiHRCAkAM0IiERKNkAAwIyQSIdG2Ccm/37+/vr7+D4Aj8ubNmzdv3oy9FRP1w83Njz/+OPZWTNfPP//892fPNgvJx0+f/vro0VdPn7KwsBzN8ujx40ePH4++GdNcrr755vGTJ6NvxmSXJ1999fL2drOQMLUFHB+mtgSmtjTOkQAwIyQSIdEICQAzQiIREo2QADAjJBIh0QgJADNCIhESjZAAMCMkEiHRCAkAM0IiERKNkAAwIyQSIdEICQAzQiIREo2QADDj/2yX+D/bNUICwGykkBz4ilsbKyQHvuLWCAkAM0IiERKNkAAwIyQSIdFGC0nbtnlG77yq4luXy2X+ckdN02zxtO53G4DpIyQCIdHGCcnlcnk2m61Wq7hkUddns1nbtjaNkACnhpAIhEQbISQ+FskVcRfz+aKujZAAYyAkAiHRRgjJoq4v5nOxgofEA+BjFBelMbPzqvI5saZpYoXVahVzZbGm345/qxgD+WbkSbYIWI6Zj5a6dwccE0IiEBJthJBczOeXy6VYIQ7i51UVa+ZxTBTF8+CxKVIRLYkRSe6Qr+BVyHnojopyUfLdAUeGkAiERBshJDkPZnYxnxcDgnwQj2ekaRq/sDsz5kf2ohNx0I+Q5CGOf9fX7B1n9IYEOGKERCAk2oRGJL3H7jjK945CsqJP0Zt8jiTWydNrnqvi10GLbfBFD6SAB42QCIREm9A5kt6Q+Mp5FLJLSOKWu6OQOFMyNBCJMyWcJsFRIiQCIdEm9KktcVoiX3Lnh77yFfPUVlw3z5j1blvbtkMzWou6zvcCHA1CIhASbZzfI/GDe35r72dKfEhRHMT9A1r58J2bEbfj5Yjb7J5sz3cUQyIvR1wrGhPbsKjrvDFMcOFYERKBkGhj/omUNX+zvfvbi5Y+/psP6+Ljv7FOt2H5Wt1JMPv84wBUBMeKkAiERHsAf2srPq+1F/nzWgACIREIifYAQnLn751shJMcQC9CIhASbdIh8WmofQ1HYgprL7cGHBlCIhASbdIhAXAwhEQgJBohAWDGf7Ur8V/taoQEgNkYIXlARgnJA0JIAJgREomQaIQEgBkhkQiJRkgAmBESiZBohASAGSGRCIlGSACYERKJkGiEBIAZIZEIiUZIAJgREomQaNuE5Lfffvvb118/B3BEnl1dPbu6GnsrJur6u+++vb4eeyum69vr69vb281C8ueff77/8IGFhYXlRJZffvll9G2Y+PL7779vFhIAADZCSAAAOyEkAICdEBIAwE4ICQBgJ/8Fiz8WPerrrdoAAAAASUVORK5CYII=" alt></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>Describe cell respiration in terms of metabolism.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(the web of all) the enzyme-catalyzed reactions in a cell/organism<br><em><strong>OR</strong></em><br>the totality of an organism’s chemical reactions (consisting of catabolic and anabolic pathways which manage the material and energy resources of the cell)</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" alt></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. «cell respiration is metabolism because» enzymes control the reactions</p>
<p>b. energy is released from complex molecules «to make ATP»</p>
<p>c. respiration is catabolic (metabolism)<br><em><strong>OR</strong></em><br>complex molecules become simpler<br><em><strong>OR</strong></em><br>C<sub>6</sub>H<sub>12</sub>O<sub>6</sub> to CO<sub>2</sub> + H<sub>2</sub>O</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State <strong>one</strong> disaccharide and the <strong>two</strong> monomers from which it can be synthesized.</p>
<p><strong>Disaccharide:</strong></p>
<p> 1:</p>
<p><strong>Monomers:</strong></p>
<p>1:</p>
<p>and 2:</p>
<p style="padding-left: 30px;"> </p>
<p> </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>Discuss the roles of the enzymes secreted by the pancreas during digestion.</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>Compare and contrast cis-fatty acids and trans-fatty acids.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. disaccharide name</p>
<p><em> eg: lactose, </em><em>glucose and galactose</em></p>
<p>b. both monomers that make up mpa</p>
<p><em> eg: maltose, </em><em>glucose and glucose</em></p>
<p><em> eg: sucrose, </em><em>glucose and fructose</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. amylase breaks down/catalyzes/hydrolyses starch to maltose</p>
<p>b. lipase breaks down/catalyzes/hydrolyses fats to fatty acids and glycerol</p>
<p>c. proteases/peptidases break down/catalyze/hydrolyze proteins into smaller<br>polypeptides/dipeptides/amino acids</p>
<p><em>Award [2] if all three enzymes and substrates named correctly and one further mark for all three products named</em><br><em>correctly.</em></p>
<p><em>Allow specific enzymes</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. both are <span style="text-decoration: underline;">unsaturated</span> fatty acids</p>
<p><em><strong> OR</strong></em></p>
<p> both have two carbon atoms joined by a double bond</p>
<p>b. in cis-fatty acids the two H atoms are on the same side while in trans-fatty acids they are on opposite sides</p>
<p><em><strong> OR</strong></em></p>
<p> cis-fatty acids are healthier than trans-fatty acids</p>
<p><em><strong> OR</strong></em></p>
<p> cis-fatty acids have a lower boiling/melting point than trans</p>
<p><em><strong> OR</strong></em></p>
<p> cis-fatty acids have a kink «in the chain» but trans do not</p>
<p><em>Accept answer in an annotated diagram</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram of the structure of DNA, showing the arrangement of subunits.</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 DNA replication.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" alt></p>
<p>correctly shows two antiparallel sugar-phosphate strands/backbones with linkages between phosphates and sugars connected through bases; <em>(phosphate and simple names such as sugar and base are acceptable labels. They must be given at least once.)</em><br>correctly labeled <span style="text-decoration: underline;">phosphate</span> and <span style="text-decoration: underline;">deoxyribose</span> and <span style="text-decoration: underline;">base</span>;<br>sugar linked to phosphates through correct pentagon corners/(5’–3’) linkages;<br>shows complementary base pairs of A-T/Adenine–Thymine <span style="text-decoration: underline;">and</span> G-C/Guanine–Cytosine;<br>correctly indicates both covalent/phosphodiester and hydrogen bonds.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA replication is semi-conservative/daughter DNA molecule contains one parent strand and one new strand;<br>unwinding of double helix/separation of two strands by <span style="text-decoration: underline;">helicase</span>;<br>separated (parent) strands become templates for new strands;<br>free/single nucleotides join (parent/template) strands through complementary base pairing;<br>DNA polymerase joins nucleotides in new strands;<br><em>Award [3] for the above points clearly shown in an annotated diagram</em>.</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>The DNA diagram provided many ways to earn three marks. Complementary base pairing was an easy mark. Roughly 20% of the candidates failed to draw two strands. Most candidates did not show the anti-parallel nature of DNA and very few had the correct linkage at the pentagon corners.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>It seems that every candidate knew about helicase and stated its function correctly. Thus, few zero answers appeared. DNA polymerase was also mentioned by many, but without the correct function. A few candidates confused replication with translation.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>DNA research, involving biotechnology, has led to benefits for society but has given rise to some controversy.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how translation depends on complementary base pairing.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the polymerase chain reaction (PCR), including the role of Taq DNA polymerase.</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>Explain benefits and risks of using genetically modified crops for the environment and also for human health.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. translation converts a sequence of mRNA nucleotides/codons to a sequence of amino acids/polypeptide/protein </p>
<p>b. «triplets of» nucleotides/bases on «activated» tRNAs pair with complementary «triplets of» nucleotides/bases on mRNA /<em> vice versa</em> </p>
<p>c. base pairing occurs when adenine/A pairs with uracil/U and guanine/G pairs with cytosine/C </p>
<p>d. specific amino acids are attached to specific of tRNA </p>
<p>e. mRNA has codons <em><strong>AND</strong></em> tRNA has anticodons</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. PCR is process by which a small sample of DNA can be amplified/copied many times </p>
<p>b. PCR involves repeated cycling through high and lower temperatures «to promote melting and annealing of DNA strands» </p>
<p>c. «mixture» is heated to high temperatures to break «hydrogen» bonds between strands of DNA/to separate the double-stranded DNA </p>
<p>d. Taq DNA polymerase can withstand high temperatures without denaturing </p>
<p>e. primers bind to «targeted» DNA sequences at lower temp </p>
<p>f. Taq DNA polymerase forms new «double-stranded» DNA by adding «complementary» bases/nucleotides</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Environment benefits:</em></p>
<p>a. pest-resistant crops can be made </p>
<p>b. so less spraying of insecticides/pesticides </p>
<p>c. less fuel burned in management of crops</p>
<p>d. longer shelf-life for fruits and vegetables so less spoilage </p>
<p>e. greater quantity/shorter growing time/less land needed </p>
<p>f. increase variety of growing locations / can grow in threatened conditions</p>
<p><em>Environment risks:</em></p>
<p>g. non-target organisms can be affected </p>
<p>h. genes transferred to crop plants to make them herbicide resistant could spread to wild plants making super-weeds </p>
<p>i. GMOs (encourage monoculture which) reduces biodiversity </p>
<p>j. GM crops encourage overuse of herbicides</p>
<p><em>Health benefits:</em></p>
<p>k. nutritional value of food improved by increasing nutrient content </p>
<p>l. crops could be produced that lack toxins or allergens </p>
<p>m. crops could be produced to contain edible vaccines to provide natural disease resistance</p>
<p><em>Health risks:</em></p>
<p>n. proteins from transferred genes could be toxic or cause allergic reactions </p>
<p>o. antibiotic resistance genes used as markers during gene transfer could spread to «pathogenic» bacteria </p>
<p>p. transferred genes could cause unexpected/not anticipated problems <br><em><strong>OR</strong></em> <br>health effects of exposure to GMO unclear</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State <strong>four</strong> elements that are needed by living organisms, other than carbon, hydrogen and oxygen, giving <strong>one</strong> role of each.</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>Outline how light energy is used and how organic molecules are made in photosynthesis.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the significance of complementary base pairing for replication, transcription and translation.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. nitrogen – structure of organic molecules/proteins/nucleotides;</p>
<p>b. sulfur – amino acid / protein structure;</p>
<p>c. phosphorus – nucleic acids / energy carriers;</p>
<p>d. calcium – bone structure / trigger exocytosis (<em>e.g.</em> neurotransmitters);</p>
<p>e. iron – prosthetic groups / hemoglobin;</p>
<p>f. sodium – membrane potential;</p>
<p><em>Accept other valid roles for those elements already listed. </em></p>
<p><em>Accept other valid examples of elements with their roles. </em></p>
<p><em>To award <strong>[4 max]</strong>, responses need an appropriate role for each element stated.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. chlorophyll is the (main) photosynthetic pigment;</p>
<p>b. absorbs (mainly) red and blue light;</p>
<p>c. green light is reflected;</p>
<p>d. light energy absorbed is converted into chemical energy;</p>
<p>e. ATP produced;</p>
<p>f. water split;</p>
<p>g. to form oxygen and hydrogen;</p>
<p>h. ATP and hydrogen used to fix carbon dioxide to make organic molecules;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <span style="text-decoration: underline;">A-T</span> and <span style="text-decoration: underline;">C-G</span> in DNA;</p>
<p>b. <span style="text-decoration: underline;">A-U</span> and <span style="text-decoration: underline;">C-G</span> in RNA;</p>
<p>c. complementary base pairing in replication ensures identical nucleotide sequence of new complementary strands;</p>
<p>d. semi-conservative replication;</p>
<p>e. transcription produces RNA sequence complementary to the DNA sequence (of the gene);</p>
<p>f. triplets of nucleotides on mRNA are codons;</p>
<p>g. translation converts mRNA sequence of information into a specific amino acid chain (polypeptide);</p>
<p>h. (each class of) tRNA carries a specific triplet of (three) bases called an anticodon;</p>
<p>i. anticodons bind to codons by complementary base pairing;</p>
<p>j. (each class of) tRNA with specific complementary anticodons carry specific amino acids;</p>
<p>k. sequence of mRNA codons translates into specific amino acid sequence;</p>
<p>l. enables conservation of information transfer from DNA to RNA to polypeptide;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>In general, well answered by those candidates who attempted the question. The syllabus content appeared to be well understood.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates mentioned the conversion of light energy into chemical energy during photosynthesis. Many candidates also referred to events of photolysis for additional marks. A common omission was reference to the wavelengths absorbed or reflected by chlorophyll. Finally, candidates wrote about fixation of carbon dioxide to make organic molecules but neglected to mention that the process requires ATP and hydrogen.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Reasonable accounts were given, though more emphasis was placed on replication than the other processes. Weaker candidates failed to mention identical nucleotide sequences in replication. For most candidates, the importance of complementary base pairing needed more development in transcription and translation. The complementarity of codons and anti-codons was often missed. Many times valid ideas were left undeveloped but then continued elsewhere in the essay. Some essays were embellished by good quality illustrations. Occasionally, understanding of the three processes was very muddled with some candidates describing mRNA as going into the nucleus to copy DNA.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the role of hydrolysis in the relationships between monosaccharides, disaccharides and polysaccharides.</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>Describe the use of biotechnology in the production of lactose-free milk.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the importance of enzymes to human digestion.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>monosaccharides are single sugars <span style="text-decoration: underline;">and</span> disaccharides are two sugars <span style="text-decoration: underline;">and</span> polysaccharides are multiple sugars;<br>hydrolysis is the addition of water to split a molecule into smaller fragments;<br>–OH and –H are added to the fragments;<br>disaccharides are split/digested into two single sugars;<br>polysaccharides are broken/digested into smaller fragments (<em>e.g.</em> diasaccharides);<br>process depends on enzyme control (in organisms);</p>
<p> </p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a particular yeast (growing in natural milk) contains lactase;<br> biotechnology companies can grow/culture the yeast;<br>lactase (an enzyme) is extracted from the yeast;<br>natural milk contains lactose/milk sugar;<br>when added directly to milk, lactase converts lactose into simpler forms;<br>same effect when milk is passed past immobilized (on surface or beads) lactase;<br>simpler forms of sugar (glucose and galactose) are easily absorbed (in the small intestine);<br>a commercial market exists for lactose-free milk / lactose-free milk is example of biotechnology’s economic impact;<br>some people are lactose intolerant/cannot digest lactose in milk/have lost lactase activity in intestinal cells;<br>consuming lactose-free milk allows lactose intolerant people to be nourished by milk without discomfort (abdominal cramps and diarrhoea);<br>many Asians are lactose intolerant whereas less common among other groups (northern Europeans and some Africans);<br>biotechnology produced in one part of world is more useful in another;</p>
<p> </p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>food must be in a small enough form to leave the gut and enter the bloodstream;<br>physical breakdown is not enough / chemical breakdown is necessary;<br>enzymes are required for the chemical breakdown of food;<br>enzymes increase the rate of digestion;<br>enzymes are biological catalysts;<br>enzymes allow digestion to occur at body temperature;<br>enzymatic digestion is a sequential process <em>e.g.</em> from protein to peptide to amino acid;<br>specific location for each reaction with specific conditions/environments <em>e.g.</em> stomach high acidity;<br>most enzymes work extracellularly / some enzymes work intracellularly;<br>variations in pH throughout digestive tract promote the activity of different digestive enzymes / different enzymes have different optimal pHs;<br>amylases digest carbohydrate to monosaccharides;<br>proteases digest proteins to amino acids;<br>lipases digest fats to fatty acids and glycerol;</p>
<p> </p>
<p> </p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Candidates generally understood the process of hydrolysis but had difficulty applying it to the relationship between monosaccharides, disaccharides and polysaccharides.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The production of lactose free milk was well understood by many candidates, but most left out basic points such as the fact that lactose is found in milk and that lactase is the enzyme that breaks it down. Sometime these fundamental points, which are worth marks, are skipped. Candidates should fully explain their answers and not take any response for granted as "too obvious for a mark‟.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This section was generally well done with candidates demonstrating a good understanding of enzyme function in the context of the human digestive tract. The best responses named specific enzymes, the location of release and the substrate and products of the reaction catalysed. As in 5 (b), many candidates did not indicate that enzymes are biological catalysts and that they increase the rate of digestion. Candidates should fully explain their answers and not take any response for granted as "too obvious for a mark‟.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the process of gas exchange necessary for aerobic respiration in a unicellular eukaryotic organism.</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>Explain how the process of evolution occurs.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>Oxygen must be taken up <em><strong>AND</strong></em> carbon dioxide must be released (<em>Both needed</em>)</p>
<p>Gases pass through a cell membrane by simple diffusion</p>
<p>Require a concentration gradient<br><em><strong>OR</strong></em><br>pass from high concentration to low concentration</p>
<p>Without requiring energy<br><em><strong>OR</strong></em><br>passive process</p>
<p>Large SA: vol ratio</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Evolution is «cumulative» change in population/species over time<br><em><strong>OR</strong></em><br>change in allele frequency</p>
<p>A population has variations amongst the individuals</p>
<p>Due to meiosis<br><em><strong>OR</strong></em><br>sexual reproduction</p>
<p>Due to mutations</p>
<p>Certain variations give an advantage to some organisms over others in certain environments</p>
<p>Populations/species produce more offspring than the environment can support</p>
<p>Individuals of the species compete for the same resources</p>
<p>The better-adapted organisms tend to survive and reproduce<br><em><strong>OR</strong></em><br>less adapted organisms tend to die or reproduce fewer offspring</p>
<p>Individuals «that reproduce» pass on their «heritable» characteristics/alleles/genes to their offspring (<em>“Traits” is an acceptable alternative to “characteristic”</em>)</p>
<p>Natural selection increases the frequency of «heritable» characteristics/alleles/genes of the better-adapted organisms (<em>Accept “genes”</em>)</p>
<p>Specific example <span style="text-decoration: underline;">described</span> (<em>Example must be “described” to award marks</em>)<span style="text-decoration: underline;"><br></span></p>
<p><em>Award <strong>[7 max]</strong> if no reference to heritable characteristics or alleles.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Gas exchange and simple diffusion – Most candidates knew what aerobic respiration was, but could not apply it to the question. Perhaps under the pressure of the examination, candidates many did not progress to the second line and therefore missed the expression ‘unicellular eukaryotic organism’. Detailed knowledge of the alveoli and the Krebs cycle did not gain marks.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Evolution – Several G2 comments were made which questioned whether the candidates should be answering a question on evolution. It is a topic that has appeared on the examination many times and well prepared candidates had no trouble answering it. The number of ‘Lamarckian’ answers where individuals instead of populations or species were evolving showed the continued decrease shown over the last few years.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the difference in absorption of red, blue and green light by chlorophyll.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how the process of photosynthesis affects carbon dioxide concentrations in the atmosphere during a typical year <strong>and</strong> the likely consequences on Earth of the yearly rises in carbon dioxide concentrations.</p>
<div class="marks">[8]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. blue and red light absorbed (the most);<br>b. greatest absorption in blue light;<br>c. red light absorbed in high amounts;<br>d. least/no absorption of green light / green light is reflected/transmitted; <br><em>Allow answers shown in an annotated diagram/graph.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Relationship between photosynthesis and carbon dioxide concentration: <strong>[4 max]</strong></em><br>a. photosynthesis uses carbon dioxide;<br>b. CO<sub>2</sub> fixed/made into organic molecules/compounds by photosynthesis;<br>c. lowering carbon dioxide level in atmosphere;<br>d. annual/seasonal fluctuations of carbon dioxide levels could be related to photosynthesis;<br>e. caused by increased photosynthesis during spring/summer;</p>
<p><em>Consequences: <strong>[5 max]</strong></em><br>f. <span style="text-decoration: underline;">enhanced</span> greenhouse effect caused by raised levels of carbon dioxide;<br>g. causing global warming;<br>h. rising of ocean levels / melting of polar ice caps/glaciers;<br>i. changes in weather (patterns);<br>j. ocean acidification;<br>k. alter food webs;<br>l. changes/loss of habitat;<br>m. changes in distribution of plants and animals;<br>n. may lead to extinction;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Question 6 appeared to be the most difficult question for candidates.</p>
<p>Most candidates knew that chlorophyll absorbs blue and red light and virtually no green light which is consequently reflected. Very few candidates knew that blue light is absorbed most and that red light is absorbed in high amounts.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question 6 appeared to be the most difficult question for candidates.</p>
<p>Candidates frequently began with the idea that plants take in CO<sub>2</sub> through photosynthesis and that levels of atmospheric CO<sub>2</sub> can be lowered as a result. After that changes in atmospheric levels as a result of seasonal fluctuation was left undeveloped or confused with human production of CO<sub>2</sub> through deforestation etc. Candidates did know about global warming resulting from rising levels of CO<sub>2</sub>. They knew a variety of consequences related to global warming which reflected awareness of similar IB questions on past exams. Some candidates still think that CO<sub>2</sub> weakens the ozone layer. It seems that no candidate knew about the enhanced greenhouse effect.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>In ecosystems, energy is used to convert inorganic compounds into organic matter. Energy enters ecosystems through producers.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the processes by which energy enters and flows through ecosystems.</p>
<div class="marks">[8]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Producers extract phosphates and nitrates from soil. Outline how these ions are used in the synthesis of organic molecules.</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>Draw a labelled diagram of a pyramid of energy.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. light energy is the initial energy source for (all) organisms</p>
<p>b. producers/autotrophs change light/radiant energy into chemical energy<br><em><strong>OR</strong></em><br>producers/autotrophs convert/trap light/radiant energy by photosynthesis</p>
<p>c. producing C<sub>6</sub>H<sub>12</sub>O<sub>6</sub> /sugars/carbohydrates</p>
<p>d. carbon/organic compounds used for energy/growth/repair/storage</p>
<p>e. compounds/energy pass as food along food chains/trophic levels WTTE</p>
<p>f. cellular respiration releases energy as ATP from food</p>
<p>g. energy is lost as heat (during cellular respiration)</p>
<p>h. loss of energy at each trophic level<br><em><strong>OR</strong></em><br>only approximately 10% of energy is passed to the next trophic level / 90% is lost at each trophic level</p>
<p>i. energy lost in bones/hair when they die/not fully eaten by the next trophic level</p>
<p>j. energy lost in feces/urine</p>
<p>k. decomposers/saprotrophs remove energy from wastes/bodies</p>
<p>l. energy is not recycled</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. by photosynthesis / using energy from light</p>
<p>b. attached to carbon compounds</p>
<p>c. phosphates used to make phospholipids/nucleotides/nucleic acids/DNA/RNA/ATP</p>
<p><em>Other phosphorus-containing metabolites are acceptable if verified.</em></p>
<p>d. nitrates are used to make amino acids/proteins/nucleotides/nucleic acids/DNA/RNA/ATP</p>
<p><em>Other nitrogen-containing metabolites are acceptable if verified.</em></p>
<p>e. transported from roots to leaves (in xylem)</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. drawn in steps rather than triangle</p>
<p>b. drawn to scale (should be at least 1/5 of the box below it)<br><em><strong>OR</strong></em><br>annotated with appropriate numeric values</p>
<p>c. producer</p>
<p>d. primary consumer</p>
<p>e. secondary consumer</p>
<p><em>Award no marks if a drawing has not been made.</em></p>
<p><em>“Appropriate numeric values” should indicate scale so accept percentage or numbers.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State <strong>one</strong> role in living organisms for each of the following: sulfur, calcium, phosphorus and 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>Outline the role of condensation and hydrolysis in the relationship between fatty acids, glycerol and triglycerides.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the relationship between the properties of water and its uses in living organisms as a coolant, a medium for metabolic reactions and a transport medium.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>sulfur</em>: (structural element in some) amino acids/proteins/enzymes;<br><em>calcium</em>: (structural element in) bones/teeth/shells / signal for cellular processes/ neurotransmitter release/muscle contraction/electrical conduction system of the heart/blood clotting;<br><em>phosphorus</em>: (structural element in) ATP/DNA/RNA/phospholipids/bones;<br><em>iron</em>: carries oxygen / formation of hemoglobin/myoglobin/cytochrome / cofactor of enzymes;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>hydrolysis: <strong>[3 max]</strong></em><br>when larger molecules are broken to smaller molecules/subunits;<br>with the addition of water;<br>fatty acids produced by the hydrolysis of fats/triglycerides;<br>breaking of ester bonds;<br>with release of glycerol;</p>
<p><em>condensation: <strong>[3 max]</strong></em><br>when molecules/subunits are joined to form a larger molecule;<br>water formed/removed;<br>fatty acids linked to glycerol;<br>up to three fatty acids can be linked to each glycerol;<br>through formation of ester bonds;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>water is a polar molecule;<br>oxygen has a partial negative charge / hydrogen has a partial positive charge;<br>hydrogen bonds form between adjacent water molecules;<br>water remains liquid over wide range of temperatures/0 to 100 °C ;<br>moderates temperature fluctuation / stable environment;<br>accurate reference to specific heat;<br>sweating/evaporation cools organisms;<br>accurate reference to high heat of vaporization;<br>polarity makes water a good/universal solvent for polar/ionic substances;<br>(all) metabolic reactions of cells take place in (aqueous) solutions;<br>blood/xylem/phloem transport solutes in water;<br>cohesive properties allow capillary action/transpiration stream/water column in xylem;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Stating a role for sulphur, calcium, phosphorus, and iron (A.S. 3.1.1) allowed candidates to easily gain four marks. Sulphur was slightly problematic because its structural role in amino acids or proteins or enzymes is somewhat abstract. <br><br></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The question required an outline of condensation and hydrolysis with reference to fatty acids, glycerol and triglycerides (A.S. 3.2.5). This was often done quite well. Some answers were accompanied by carefully annotated diagrams. <br> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This part had the poorest achievement among candidates. The polarity of water molecules with hydrogen bonding as the basis for many of its properties (A.S. 3.1.4, 3.1.5, 3.1.6) was either overlooked or inadequately explained. The concept of water providing a stable environment over a broad temperature range also challenged candidate understanding. However, as always, some candidates were totally competent in their answers which even integrated accurate reference to specific heat. Ideas about water as a solvent and transport medium, water as a medium for metabolic reactions and how cohesion properties in water relate to transpiration were scattered among candidate answers.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>James Beard, a famous chef, once said “Food is our common ground, a universal experience.”</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how the small intestine moves, digests and absorbs food.</p>
<div class="marks">[8]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish between the structures of the different types of fatty acids in food.</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>Outline how leptin controls appetite.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. contraction of muscle «layers»/peristalsis helps move food<br> <em><strong>OR</strong> </em><br>circular muscle contraction prevents backward movement of food <br><em><strong>OR</strong></em> <br>longitudinal muscle contraction moves food along gut </p>
<p>b. peristalsis/muscle contractions mix food with intestinal enzymes </p>
<p>c. enzymes digest macromolecules into monomers </p>
<p><em>Accept an example for mp c</em></p>
<p>d. pancreatic enzymes/amylase/lipase/endopeptidase «chemically» digest food in«lumen of» small intestine </p>
<p>e. «pancreatic» amylase digests starch <br><em><strong>OR</strong> </em><br>lipases digest lipids/fats/triglycerides<br> <em><strong>OR</strong></em> <br>endopeptidases/dipeptidases digest proteins/polypeptides </p>
<p>f. bile/bicarbonate secreted into the small intestine creates favorable pH for enzymes <br><em><strong>OR</strong></em> <br>bile emulsifies fat </p>
<p>g. some final digestion into monomers is associated with epithelial cells/epithelium «of small intestine» </p>
<p>h. mucosa layer/inside surface/lining of small intestine contains villi/finger-like projections </p>
<p>i. villi/microvilli increase surface area for better absorption </p>
<p>j. villi absorb products of digestion/monomers/mineral «ions»/vitamins</p>
<p>k. glucose/amino acids enter blood «capillaries» <br><em><strong>OR</strong></em> <br>lipids enter lymph vessels/lacteals </p>
<p>l. absorption involves active transport/diffusion/facilitated diffusion </p>
<p>m. different nutrients are absorbed by different transport mechanisms</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. fatty acids can be saturated or unsaturated </p>
<p>b. unsaturated can be monounsaturated or polyunsaturated </p>
<p>c. saturated fats have no double bonds/have maximum number of hydrogen atoms <br><em><strong>OR</strong></em> <br>unsaturated fatty acids have «at least one» double C=C bond <br><em><strong>OR</strong></em> <br>polyunsaturated fatty acids have more than one double bond / OWTTE </p>
<p>d. cis-form has hydrogen atoms on same side of carbon double bond<br><em><strong>OR</strong></em><br>cis-form has bend at carbon double bond </p>
<p>e. trans-form has hydrogens on opposite sides of carbon double bond<br><em><strong>OR</strong></em><br>trans-form makes a straight carbon chain </p>
<p>f. length of hydrocarbon chain can vary<br><em><strong>OR</strong></em><br>position/number of carbon double bonds can vary</p>
<p><em>Accept labeled diagrams that illustrate these marking points</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. leptin suppresses/inhibits appetite </p>
<p>b. is secreted by adipose tissue/fat «storage» tissue </p>
<p>c. level is controlled by amount of adipose tissue/«ongoing» food intake </p>
<p>d. leptin targets cells in hypothalamus/appetite control centre in brain </p>
<p>e. causes hypothalamus/control centre in brain to inhibit appetite </p>
<p>f. if amount of adipose tissue increases, blood leptin concentration rises</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;">Draw a molecular diagram of an amino acid to show its general structure.</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 style="text-align: left;">Outline the role of ribosomes in translation.</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 style="text-align: left;">Some blood proteins are involved in defence against infectious disease. Explain the roles of <strong>named</strong> types of blood proteins in different defence mechanisms.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. COO– <em><strong>or</strong></em> COOH group at one end <br><br></p>
<p>b. NH<sub>2</sub> <em><strong>or</strong></em> NH<sub>3</sub><sup>+</sup> at the other </p>
<p>c. CH in middle with H or R group attached</p>
<p><em>If shown expanded, then carbonyl oxygen must attach to C</em><br><em>If shown non-expanded, N of amine group must attach to C</em></p>
<p><em><img 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"></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. translation is the production of polypeptides/proteins </p>
<p>b. mRNA binds to the ribosome </p>
<p>c. tRNA binds to the ribosome </p>
<p>d. at the site where its anti-codon corresponds to the codon on the mRNA</p>
<p><em>OWTTE</em></p>
<p>e. amino acids of «consecutive tRNAs» bind by a peptide link «in the ribosomes» </p>
<p>f. the ribosome moves along the mRNA<br><em><strong>OR</strong></em><br>continues with elongation of polypeptide chain</p>
<p><em>Accept annotated diagrams of the process</em>.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. clotting factors «are proteins» that initiate the clotting cascade/process </p>
<p>b. fibrin «is a protein that» permits blood clotting<br><em><strong>OR</strong></em><br>allows the formation of a clot </p>
<p>c. «the protease» thrombin converts <span style="text-decoration: underline;">fibrinogen to fibrin</span> </p>
<p><em>OWTTE</em></p>
<p>d. fibrin forms a mesh/clot that prevents the entry of <span style="text-decoration: underline;">pathogen/antigen into the blood</span> </p>
<p>e. antibodies are «specific» proteins that lymphocytes make </p>
<p>f. each antibody corresponds to a specific pathogen/antigen<br><em><strong>OR</strong></em><br>antibodies are specific «to certain pathogens/antigens» </p>
<p>g. antibodies create <span style="text-decoration: underline;">specific immunity</span> </p>
<p>h. plasma cells produce large amounts of «specific» antibodies<br><em><strong>OR</strong></em><br>memory cells retain the ability to produce «specific» antibodies </p>
<p>i. immunoglobulins are antibodies against pathogens </p>
<p>j. <span style="text-decoration: underline;">enzymes</span> in phagocytic white blood cells may digest pathogens</p>
<p><em>Accept annotated diagrams of the process</em>.</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the role of condensation and hydrolysis in metabolic reactions involving carbohydrates.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p><br> </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>Metabolic reactions are catalysed by enzymes. Explain how enzymes catalyse reactions and how a change in pH could affect this.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p><br> </p>
<div class="marks">[8]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the digestion of food in the human digestive system.</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
<p><br> </p>
<div class="marks">[6]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>condensation is joining together molecules with the release of water;<br>(in general) two monosaccharides join to form a disaccharide / many mono-saccharides/disaccharides form polysaccharides;<br>example; (<em>eg. two glucose from maltose</em>)<br>hydrolysis is the breaking down of molecules with the addition of water;<br>(in general) disaccharides break into monosaccharides / polysaccharides break into disaccharides/monosaccharides;<br>example; (<em>eg. maltose forms two glucose</em>)</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>enzymes speed up the rate of chemical reactions;<br>lock and key model;<br>substrate fits into active site;<br>enzyme-substrate specificity;<br>enzymes work best at optimal pH/different enzymes have different optimal pHs;<br>increase/decrease from optimum pH decreases activity;<br>change in pH changes structure/charge of active site;<br>changing three-dimensional structure of enzyme/protein;<br>not allowing substrate to fit in active site;<br>enzymes can be denatured if change is extreme;<br>denaturing is loss of its biological properties;<br>sketch graph showing pH versus enzyme activity;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>chewing food makes smaller particles/increases surface area of food;<br>starch digestion (begins) in the mouth/by saliva/(salivary) amylase/ptyalin;<br>digestion of proteins in stomach;<br>acid condition in stomach provides optimum pH for enzymes;<br>stomach muscle contraction causes mechanical digestion;<br>enzymes in small intestine complete digestion;<br>alkaline condition in small intestine provides optimum pH for enzymes;<br>bile salts help to emulsify fats;<br>example of amylase with source, substrate and products;<br>example of protease with source, substrate and products;<br>example of lipase with source, substrate and products;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>In 5(a), most candidates clearly distinguished condensation and hydrolysis. A few candidates did not read the questions properly, giving examples of lipids or proteins instead of carbohydrates. Some marks were always scored.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part 5(b) was an easy question for those who were well-prepared and most handled it well. Some candidates seemed to try to write everything they knew. They gave long explanations of factors beyond pH which can influence how enzymes catalyze reactions. In contrast, other candidates simply wrote that pH change can cause denaturation, without any further reference to change in active site or loss of biological function.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The weakest answers for question 5 appeared in 5 (c). The passage of food through various parts of the digestive system was frequently given rather than the breakdown of food. Accurate detailed information was scarce. Although digestion in the mouth was accurately discussed, there was a lack of clarity on digestion in the stomach and intestine. Most candidates discussed mechanical digestion without any attention to chemical digestion. Information on the conditions in each part of the digestion was sketchy. Very few candidates correctly included an example of enzyme source, substrate and product. The role of bile was not clear in most. Some made reference to absorption and egestion, instead of sticking to the question. Sadly, there were candidates who thought that as food progresses through the digestive tract, it stops at the pancreas.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The figure represents a water molecule.</p>
<p><img src="data:image/png;base64,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" width="688" height="266"></p>
<p>Draw a second water molecule to show how bonds can form between water molecules, including the name of the bond.</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>Water has important solvent properties. Explain these properties using an example to illustrate your answer.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. similar water molecule drawn with oxygen on one molecule facing hydrogen on the other water molecule</p>
<p>b. one hydrogen bond drawn as a dotted/dashed line between the two water molecules and labelled</p>
<p><em>O and H do not have to be labelled but must be positioned correctly</em></p>
<p><em>eg :</em></p>
<p><em><img src="data:image/png;base64,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" width="223" height="121"></em></p>
<p><em>Can get this mark even if atoms incorrect</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. water molecule is polar</p>
<p><em><strong> OR</strong></em></p>
<p> water has «weak» positive and negative charges</p>
<p>c. water forms hydrogen bonds with <strong>polar</strong> substances</p>
<p>d. positive/hydrogen side/pole of water attracted to negative <strong>ions</strong></p>
<p><em><strong> OR</strong></em></p>
<p> negative/oxygen side/pole attracted to positive <strong>ions</strong></p>
<p>e. glucose/other example dissolves because it is polar</p>
<p><em><strong> OR</strong></em></p>
<p> sodium chloride/other example dissolves because ions are attracted to water</p>
<p><em><strong>[Max 3 Marks]</strong></em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>List <strong>two</strong> functions of membrane proteins.</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 digestion of large food molecules is essential.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline why antibiotics are effective against bacteria but not against viruses.</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>Outline the use of polymerase chain reaction (PCR) to copy and amplify minute quantities of DNA.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. hormone binding sites / receptors;</p>
<p>b. (immobilized) enzymes;</p>
<p>c. cell adhesion;</p>
<p>d. cell (to cell) communication;</p>
<p>e. passive transport/channels;</p>
<p>f. active transport/pumps;</p>
<p>g. facilitate diffusion;</p>
<p>h. carry electrons;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. many molecules are too large to be absorbed (by the villi) / small molecules are soluble and can be absorbed;</p>
<p>b. large food molecules are broken down so they can be reorganized/rearranged;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. antibiotics block/inhibit specific metabolic pathways/cell functions found in bacteria;</p>
<p><em>Accept specific examples of inhibition such as cell protein synthesis, cell wall formation</em></p>
<p>b. viruses must use host/eukaryotic cell metabolism / viruses do not have their own metabolic pathways;</p>
<p>c. host/eukaryotic cell metabolism/pathways not blocked/inhibited by antibiotics;</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. strands of DNA (fragments) split/denatured with heat;</p>
<p>b. complementary nucleotides added to split stands (when cooling);</p>
<p>c. with the use of (DNA) polymerase (and primers);</p>
<p>d. process/heating and cooling cycle is repeated (until enough DNA is obtained);</p>
<p><em>Accept example of PCR application e.g. paternity cases or forensic investigations</em>.</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Functions were asked for, not named structures. “Channels” and “pumps” by themselves were too vague to gain marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The idea of food breakdown to a small enough size for absorption was the easier mark achieved by many. Some candidates wrote that food had to be “digested” but “digestion” was written in the stem of the question and too vague for credit.</p>
<p>The idea of food breakdown for eventual reorganization/rearrangement rarely appeared in any answer, perhaps indicating a conceptual gap in candidate understanding of digestion.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There was a complete misunderstanding of this question. Almost no candidate seemed to realize that the question was asking for how the PCR can copy and amplify minute quantities of DNA. Thus, the process was either unknown or ignored so marking points were immediately lost. In contrast, almost every candidate knew forensic science as a use of PCR, thereby salvaging one mark.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how materials are moved across membranes of cells by active transport.</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 the effects of pH on enzyme catalysed reactions.</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>Distinguish between the process of anaerobic respiration in yeast and humans.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>transport against a concentration gradient / from low to high concentration;<br>through <span style="text-decoration: underline;">protein pumps</span>;<br>uses energy/ATP;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>enzymes have a pH optimum;<br>active site works best at this pH;<br>activity decreases above and below the optimum;<br>by interfering with H-bonding/active site structure;<br>denaturing by extremes of pH so enzyme activity/reaction stops;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>yeast</em>: pyruvate to ethanol and carbon dioxide;<br><em>humans</em>: pyruvate to lactic acid; <br><em>Award <strong>[1 max]</strong> if products are appropriately linked to organisms without the mention of pyruvate.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Knowledge of the characteristics of active transport was generally well expressed. Many candidates understood that protein pumps, requiring energy were required as opposed to protein channels that may be used in facilitated diffusion.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was answered well with candidates aware of the concept of an optimal pH with activity trailing off on either side. The best answers liked this to the structure of the enzyme active site being changed by the changing pH.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates had no difficulty indicating the end products of respiration. A large number of answers indicated that pyruvate was a common source in each case of respiration, though weaker answers did not.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram showing the ultrastructure of a typical prokaryote.</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>Outline how <strong>three</strong> different environmental conditions can affect the rate of photosynthesis in plants.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how the emission of gases, both naturally and through human activity, can alter the surface temperature of the Earth.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Award <strong>[1]</strong> for each structure clearly drawn and correctly labelled, up to <strong>[4 max]</strong>.</em><br>cell wall – a uniformly thick wall;<br>pili – hair-like structures / flagellum – at least length of the cell;<br>plasma membrane – represented by a continuous single line; <em>May be labelled as the innermost wall line.</em><br>ribosomes – drawn as small discrete circles/shaded circles;<br>nucleoid – region with DNA not enclosed in membrane;<br>plasmid – circular ring of DNA;<br>cytoplasm – the non-structural material within the cell;</p>
<p><em>Award <strong>[3 max]</strong> if one eukaryote structure is shown, <strong>[2 max]</strong> for two eukaryote structures, <strong>[1 max]</strong> for three eukaryote structures and <strong>[0]</strong> if four or more eukaryote structures are shown.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>light: <strong>[2 max]</strong></em><br>rate increases with increasing light;<br>it reaches maximum then plateaus;<br>as all chloroplast molecules are working at optimal pace;</p>
<p><em>temperature: <strong>[2 max]</strong></em><br>rate increases with increasing temperature;<br>to a maximum/optimum temperature;<br>but then falls off rapidly;<br>as enzymes are denatured above the optimal temperature;</p>
<p><em>carbon dioxide: <strong>[2 max]</strong></em><br>rate increases with increasing carbon dioxide level;<br>it reaches maximum then plateaus;<br>as photosynthesis operating at optimal level;</p>
<p><em>Award any of the above points if clearly drawn in a diagram.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>increase in temperature is called global warming;<br>this is caused by the greenhouse effect;<br>a natural phenomenon that has occurred over millions of years;<br>main gas responsible is carbon dioxide;<br>other gases like methane/nitrous oxide also cause effect;<br>shortwave radiation from the Sun enters atmosphere;<br>warms the surface of the Earth;<br>longwave radiation emitted by the surface of the Earth;<br>is absorbed by carbon dioxide/greenhouse gases;<br>human use of fossil fuels has increased levels of atmospheric carbon dioxide;<br>rapid rise in temperatures over (approximately) hundred years;<br>cows/animals/peat bogs release methane;<br>greenhouse gases emitted by volcanic activity;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>On the whole the diagrams of a prokaryotic cell were well drawn receiving full marks. A sizable number of candidates drew hybrid cells with features of prokaryote and eukaryotes. Contradictions in answers cannot be rewarded and such answers did poorly. As with other questions, some candidates squandered the opportunity for marks by drawing small or untidy diagrams</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was straight from the subject guide but many candidates were unable to identify the relevant factors. Those who could generally did well. Many good answers used annotated graphs to illustrate the changing effect of the factor on photosynthesis.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The impact of gases on the Earth’s temperature was, in most cases, not well answered with many candidates confusing the greenhouse effect with the hole in the ozone layer.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline, with examples, the types of carbohydrate found in living organisms.</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>Describe the importance of hydrolysis in digestion.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the flow of energy between trophic levels in ecosystems.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(mono-, di- and polysaccharides) consist of one, two and many units;<br>example of <span style="text-decoration: underline;">monosaccharide</span> (<em>e.g.</em> glucose/ribose/galactose/fructose);<br>example of <span style="text-decoration: underline;">disaccharide</span> (<em>e.g.</em> maltose/lactose/sucrose);<br>example of <span style="text-decoration: underline;">polysaccharide</span> (<em>e.g.</em> starch/glycogen/cellulose);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>digestion is the breakdown of large molecules into small molecules;<br>to allow diffusion / to make food soluble;<br>so foods can be absorbed into the bloodstream/body;<br>so foods can move from bloodstream into cells;<br>small molecules can be joined to form the organism’s (unique) macromolecules;<br>hydrolysis is aided by enzymes;<br>hydrolysis requires water;<br>polysaccharides (hydrolysed) to disaccharides/monosaccharides/specific example;<br>proteins/polypeptides (hydrolysed) to amino acids;<br>fats/lipids/triglycerides (hydrolysed) to fatty acids and glycerol;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>sunlight is the initial source of energy for (most) ecosystems;<br>sunlight (energy) is converted (through photosynthesis) into chemical/potential energy by producers/plants/autotrophs;<br>energy escapes from an ecosystem (as heat) / is not recycled;<br>flow of energy through an ecosystem can be represented as a pyramid of energy; (<em>allow a suitable diagram</em>)<br>energy flow in an ecosystem is measured as energy per unit area/volume, per unit time, for example kJ m<sup>–2</sup> yr<sup>–1</sup>/ kJ m<sup>–3</sup> day<sup>–1</sup> / other valid unit;<br>(chemical) energy is passed along the food chain/trophic levels;<br>primary consumer/herbivores obtain energy from plant food;<br>secondary/tertiary consumer/carnivores obtain energy by eating other (animals);<br>energy transfer between trophic levels is not 100 % efficient / is only about 10% efficient;<br>some energy is lost as heat through respiration;<br>decomposers obtain energy from waste products/dead bodies/leaf litter;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Well answered except for the absence of understanding about the prefixes: mono-, di-, and poly- when preceding the word saccharide.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates who did well understood that hydrolysis falls within the context of digestion rather than thinking that hydrolysis is synonymous with digestion. Their answers began with the notion that only small molecules can diffuse and be absorbed into the bloodstream and that hydrolysis is a step in the digestive process. Often those candidates went on to describe that hydrolysis requires water and gave examples of how polysaccharides or proteins are hydrolyzed to named sub-units. Even among stronger responses, lipid hydrolysis was not mentioned very often nor was the idea that hydrolysis is aided by enzymes. This question was an interesting link between Topic 3.2 and Topic 6.1</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The best answers started out with the sun as the ultimate source of energy and how light energy is converted to chemical energy through photosynthesis by autotrophs/plants. This led naturally to how energy passes from one tropic level to the next. By including that energy transfer is only about 10% efficient and that it is not recycled, candidates gained the max of 8 marks. Some candidates included pyramids of energy. Less commonly mentioned was the loss of energy through metabolic heat or that decomposers obtain energy from waste products, dead bodies/leaf litter. Only the rare candidate mentioned how energy flow is measured in energy per unit area/volume per unit time.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the properties of water that make it a useful component of blood.</p>
<p> </p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the relationship between structure and function of arteries, capillaries and veins.</p>
<div class="marks">[8]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how leucocytes defend the body against pathogens.</p>
<div class="marks">[6]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. water is a polar molecule / hydrogen bonding;<br>b. (makes it) (versatile) solvent;<br>c. example of dissolved substance (eg salts/proteins or other example);<br>d. (water is) fluid/liquid at body temperature;<br>e. example of transported material (eg nutrients/metabolic wastes/gases/hormones/blood cells or other example);<br>f. high heat capacity/specific heat allows water to carry heat without warming up;<br>g. (allows) blood to move heat (for warming/cooling/homeostasis);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Arteries:</em> <strong>[3 max]</strong><br>a. thick walls to withstand high pressure/maintain blood flow/pressure;<br>b. collagen fibres/elastic fibres/connective tissue (in outer layer) give wall strength/flexibility/ability to stretch and recoil;<br>c. (smooth) muscle layer (contracts) to maintain pressure;<br>d. narrow lumen maintains high pressure;<br>e. smooth endothelium for efficient transport/reduced friction;</p>
<p><em>Capillaries:</em> <strong>[3 max]</strong><br>f. wall has one layer of cells allowing (fast) diffusion of substances;<br>g. pores to allow lymphocytes/plasma to exit / to increase permeability;<br>h. extensive branching increases surface area for exchange of materials;<br>i. small diameter allows them to fit between cells/perfuse tissue;<br>j. narrow diameter increases oxygen diffusion <span style="text-decoration: underline;">from RBC</span>;</p>
<p><em>Veins:</em> <strong>[3 max]</strong><br>k. thin walls allow (skeletal) muscles to exert pressure on veins;<br>l. thin outer layer of collagen/elastic/muscle fibres provide structural support;<br>m. wide lumen allows great volume of blood to pass;<br>n. valves prevent backflow; <br><em><strong>NB</strong> Every structure requires a function for the mark.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. leucocytes/phagocytes/macrophages can recognize pathogens/foreign matter;<br>b. (phagocytes) engulf pathogens by endocytosis/phagocytosis;<br>c. migration to tissues/squeezing out of capillaries;<br>d. each pathogen has specific antigens;<br>e. leukocytes/lymphocytes produce antibodies by reacting to specific antigen/ pathogens;<br>f. antibody joins to (specific) antigen inactivating/destroying them;<br>g. lymphocyte makes a clone/copies itself;<br>h. thus increasing the total number of (specific) antibodies;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question troubled the rote learner who was unable to apply a general idea to a specific case. Candidates knew key properties of water but could not specifically relate them to blood. Most candidates correctly answered that the polarity of water molecules makes water a good solvent but forgot to give examples of dissolved substances in blood or materials that blood transports. High specific of water was cited but not how blood temperature can remain steady because of it.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates only wrote about the direction of blood flow through arteries, the heart veins. They completely missed out on the link between structure and function. Other candidates who did write about structural features of blood vessels failed to relate the features to function. Many confused the size of lumen with the degree of pressure in the vessels. Understanding of capillary structure and function appeared to be less than that of arteries or veins. Pores to increase permeability and allow lymphocytes to escape, extensive branching to increase surface area for exchange, and small diameters to allow capillaries to penetrate spaces between cells are examples of ideas often missed.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates knew that leucocytes can recognize pathogens and engulf them by phagocytosis/endocytosis. More knowledgeable candidates mentioned production of antibodies with specificity to antigens on pathogens. Further details about antigen inactivation and lymphocyte cloning to amplify antibody production were seen only in the very best answers.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the source, substrate, products and optimal pH condition for lipase in the human digestive system.</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>Outline the use of <strong>named</strong> enzymes in gene transfer using plasmids.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the effect of changes of pH, substrate concentration and temperature on enzyme activity.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>eg</em> <em>source:</em> pancreas;<br><em>substrate:</em> triglycerides / lipids / fats / oils;<br><em>product:</em> glycerol <span style="text-decoration: underline;">and</span> (three) fatty acids; (<em>both needed</em>)<br><em>optimal pH:</em> 8; (accept answers in the range of 7 to 8)<br><em>Accept other correct examples</em>.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. plasmids are removed/obtained from bacteria;<br>b. endonuclease/restriction enzymes cut the plasmids at target sequences;<br>c. DNA fragments of other organism are cut with the same restriction enzymes;<br>d. in both DNA and plasmid, complementary sticky ends/staggered cut are produced;<br>e. DNA segment added to the opened plasmid;<br>f. spliced together by ligase;<br>g. reverse transcriptase makes DNA copies of mRNA / DNA polymerase to increase the amount of DNA;<br>h. recombinant plasmids inserted into new/host cells;<br>i. cultured/cloned to produce the new genes/more genetically modified cells; <br><em>Award [3 max] if no specific enzyme names are given.</em><br><em>Do not accept the word “enzyme” on its own.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>pH:</em><br>a. enzymes have an optimal pH/work best at a given pH;<br>b. activity increases as pH gets closer to optimal pH;<br>c. extreme pH denatures enzymes;<br>d. by breaking bonds / changing enzyme shape/structure / active site shape/structure;</p>
<p><em>substrate:</em><br>e. as substrate concentration increases, activity increases;<br>f. as substrate concentration increases, the collisions between substrate and enzyme increase;<br>g. up to a maximal level of action / reaching a plateau;<br>h. all active sites are saturated/occupied;</p>
<p><em>temperature:</em><br>i. enzymes have an optimal temperature (where they work most effectively);<br>j. activity increases as it gets closer to optimal temperature;<br>k. high temperatures stop enzyme activity due to irreversible changes in structure / denaturation;<br>l. by breaking bonds / changing enzyme shape/structure / active site shape/structure; <br><em>Award any of the above points in an annotated graph.</em><br><em>Award up to <strong>[8]</strong> if all three addressed and <strong>[6 max]</strong> if only two addressed.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Clear answers were given by most of the students that had the knowledge.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some students got confused with other biological techniques, making reference to PCR for example, apart from explaining correctly some steps in gene transfer. There was often no mention of reverse transcriptase.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most of the students scored marks for this answer, some of them confused the graphs of temperature and pH with the one of substrate concentration, consequently their explanations were incorrect. A number of students incorrectly wrote that the enzyme denatures once it reaches its optimal temperature or pH, so marks were not awarded.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram of the molecular structure of DNA including <strong>at least four</strong> nucleotides.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A small DNA sample found at a crime scene can be used in an investigation. Describe the steps taken in the processing of this small sample of DNA.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss the relationship between <strong>one</strong> gene and <strong>one</strong> polypeptide.</p>
<div class="marks">[7]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>The diagram must show four nucleotides shown with two on each side showing phosphate-sugar backbones and nitrogen base pairs bonded between them.</em></p>
<p><em>Award <strong>[1]</strong> for each of the following clearly drawn and correctly labelled.</em><br><span style="text-decoration: underline;">phosphate</span> – shown connected to deoxyribose;<br><span style="text-decoration: underline;">deoxyribose</span> – shown connected to phosphate;<br>(nitrogenous) <span style="text-decoration: underline;">bases</span> – shown bonded to deoxyribose;<br>base pairs – shown with labels adenine/A bonded to thymine/T and cytosine/C bonded to guanine/G;<br><span style="text-decoration: underline;">hydrogen</span> bonds – shown connecting bases;<br><span style="text-decoration: underline;">covalent</span> bonds – shown connecting deoxyribose to phosphates;<br>nucleotide – clearly identified by the candidate; <br><em>Award <strong>[4 max]</strong> if diagram is not shown double stranded.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA samples are taken from crime scene, <span style="text-decoration: underline;">suspects</span> and <span style="text-decoration: underline;">victims</span>;<br>polymerase chain reaction/PCR used to increase the amount of DNA;<br>restriction enzymes used to cut DNA;<br>electrophoresis involves electric field/placing sample between electrodes;<br>used to separate DNA fragments according to size;<br>creating DNA profiles/unique patterns of bands;<br>comparison is made between the patterns;<br>criminals/victims can be identified in this way;<br>DNA is (quite) stable / DNA can be processed long after the crime;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA codes for a specific sequence of amino acids/polypeptide;<br>the DNA code for one polypeptide is a gene;<br>DNA is transcribed into mRNA;<br>mRNA moves to a ribosome;<br>where mRNA is translated into a polypeptide;<br>originally it was thought that one gene always codes for one polypeptide;<br>some genes do not code for a polypeptide;<br>some genes code for transfer RNA/tRNA/ribosomal RNA/rRNA;<br>some sections of DNA code for regulators that are not polypeptides;<br>antibody production does not follow this pattern (of simple transcription-translation); (<em>allow other examples</em>)<br>change in the gene/mutation will affect the primary structure of the polypeptide;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most candidates correctly answered this question with diagrams that were well done and appropriately labelled.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates did this question well; most candidates did not mention that DNA samples are taken from the crime scene, the victims and the suspects however; they only mentioned suspects. Many of the candidates were not fully familiar with the actual technique involved in DNA profiling; this might be due to lack of exposure of students to the laboratory working with steps involved in DNA profiling.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was one of the tough questions for most of the candidate since candidates thought "one gene one polypeptide" scope was only up until explaining the DNA-Gene-codon-polypeptide, most of the students did not mention the involvement of transcription and translation and exceptions to one gene one polypeptide hypothesis. In other cases, candidates went into great detail to explain transcription and translation (which was not asked for) and completely forgot about the purpose of the question.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>All organisms take in and also release carbon compounds. Draw a labelled diagram of the carbon cycle.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how the rate of photosynthesis can be measured.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the mechanism of ventilation in humans.</p>
<div class="marks">[7]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration: underline;">CO<sub>2</sub></span> in atmosphere/air;<br>plants/producers linked to carbon in air/CO<sub>2</sub> with arrow labeled photosynthesis;<br>plants/consumers linked to animals/consumers with arrow labeled feeding;<br>plants/producers<span style="text-decoration: underline;"> and</span> animals/consumers linked to carbon in air/CO<sub>2</sub> with arrow labeled (cell) respiration;<br>plants/producers <span style="text-decoration: underline;">and</span> animals/consumers linked to decomposers/bacteria/fungi with arrow labeled death;<br>decomposers/bacteria/fungi linked to carbon in air/CO<sub>2</sub> with arrow labeled (cell) respiration;<br>plants/producers connected to carbon in air/CO<sub>2</sub> with arrow labeled combustion/forest fire;<br>decomposers/bacteria/fungi linked to fossil fuels/coal/oil/natural gas with arrow labeled (partial) decomposition;<br>fossil fuels/coal/oil/gas linked to carbon in air/CO<sub>2</sub> with arrow labeled<br>combustion; </p>
<p><em>Award marking points only if arrows point in correct direction.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>correct equation for photosynthesis in words or symbols;<br>measure production of oxygen;<br>example of method to measure oxygen production;<br><em>(eg count bubbles from water plant/collect oxygen data per unit of time using electronic sensors/probes)</em><br>measure uptake of CO<sub>2</sub>;<br>example of method; <em>(eg method of measuring (aquatic) pH changes/shift per unit time)</em><br>measure increase in biomass;<br>example of method; <em>(eg sample (dry) mass of crop before and after timed period)</em></p>
<p>not possible to measure water uptake since water is transpired/used in turgidity/many chemical processes;<br>another valid method if concept of rate (measurements per time) is included;<br><br></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>air enters/exits lungs through <span style="text-decoration: underline;">trachea</span>, <span style="text-decoration: underline;">bronchi</span> and <span style="text-decoration: underline;">bronchioles</span>;<br>during inspiration/inhalation external intercostal muscles contract;<br>causing ribs to move upwards/outwards;<br>during inspiration diaphragm contracts/flattens;<br>causes increase in volume of thorax/lungs;<br>decrease in pressure allows air to enter (passively);<br>during expiration internal intercostal muscles contract/external intercostal muscles relax;<br>causing ribs to move down/in;<br>diaphragm relaxes/returns to original domed position;<br>abdominal muscles contract to push diaphragm up;<br>causes decrease in volume of thorax/lungs;<br>increase in pressure forces air out of lungs; <br><em>Award [5 max] for inhalation or exhalation only.</em></p>
<p><em>(Plus up to [2] for quality) </em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Many candidates spent considerable time drawing beautiful trees, rabbits, and factories but labels on the arrows that connected the various components of the carbon cycle. Some candidates never showed CO<sub>2</sub>/carbon in the air.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates could name production of O<sub>2</sub>, uptake of CO<sub>2</sub>, and an increase in biomass as methods to measure the rate of photosynthesis. This meant an easy three marks. Gaining marks beyond that became very difficult. The primary reason was that when candidates gave details about the method, they failed to mention rate, as in a unit of time for the measurement e.g. bubbles of O<sub>2</sub> released per minute. The equation for photosynthesis was rarely given by any candidate.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The mechanism of ventilation in humans was generally explained well. Some accounts were flawed when specific intercostals muscles contracting or relaxing were not identified. More serious problems occurred when candidates mixed up ventilation with gas exchange at the level of alveoli or dwelled on cell respiration.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the bonding between DNA nucleotides.</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 how chemical bonding between water molecules makes water a valuable coolant in living organisms.</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>Describe the movement of water across membranes.</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>Outline the role of water in photosynthesis.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration: underline;">hydrogen bonds</span> between nucleotides of opposite strands/complementary bases/adenine and thymine <span style="text-decoration: underline;">and</span> cytosine and guanine;<br>covalent bonds between nucleotides within strands/between sugar/deoxyribose and phosphate;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>hydrogen bonding between water molecules;<br>breaking (hydrogen bonds) needs/removes energy/heat;<br>hydrogen bonds must break when water evaporates/vaporizes;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>osmosis / moves passively;<br>from regions of low solute/high water potential/concentration to high solute concentration / low water potential/concentration;<br>passes through protein channels/aquaporins/selectively-permeable membrane;</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>water molecules undergo photolysis/are split by light energy;<br>forms oxygen as a by-product;<br>hydrogen helps power the fixation of carbon (into organic molecules);</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question was well answered with the best responses clearly indicating the location of both hydrogen and covalent bonds. Almost all candidates discussed hydrogen bonding, but many did not discuss the use of covalent bonds.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Again, this was generally well answered with the best responses indicating that the breaking of hydrogen bonds occurs when water evaporates and removes a great deal of energy.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates answered this well, demonstrating a good knowledge of the movement of water across membrane.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates did not appear to be aware that water played a role in the reaction of photosynthesis. Better answers used the term photolysis and explained it appropriately.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram to show how <strong>two</strong> nucleotides are joined together in a single strand 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>Outline a basic technique for gene transfer.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the process of translation.</p>
<div class="marks">[9]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" alt></p>
<p> </p>
<p><em>Award <strong>[1]</strong> for each labelled item shown above.</em><br><em>Award <strong>[2 max]</strong> if the two nucleotides are not shown in a single strand.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>plasmid removed from bacteria;<br>plasmid cleaved/cut open by restriction enzymes;<br>desired gene/DNA extracted from donor;<br>DNA from donor cleaved using same restriction enzyme;<br>results in sticky ends;<br>with complementary base sequences;<br>pieces of DNA from two organisms mixed;<br>ligase used to splice pieces (DNA);<br>recombinant plasmids formed;<br>insertion into host cells;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>translation is the synthesis of proteins/polypeptide chain/specific sequence of amino acids;<br>translation occurs in cytoplasm/ribosomes;<br>uses information on the mRNA;<br>mRNA carries the genetic information of DNA;<br>mRNA binds to ribosome;<br>mRNA contains series of codons/base triplets;<br>tRNA binds with an amino acid and carries it to the ribosome;<br>tRNA has the anticodon that is complementary to the codon on the mRNA;<br>two tRNAs bind to a ribosome/mRNA at the same time;<br>(peptide) bond forms between two amino acids (carried by tRNA molecules to the ribosome);<br>the first tRNA detaches, ribosome moves along mRNA and another tRNA carrying an amino acid binds;<br>process repeats forming chain of amino acids/polypeptides;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Many candidates gained full marks for their diagrams of joined DNA nucleotides. As mentioned earlier, the problem for some candidates was their misinterpretation of “a single strand of DNA.” Though appropriate shapes were given, the bonding was improper.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In their outlines of gene transfer, candidates (as a group) eventually included each of the ten marking points. A number of candidates thoroughly understood the topic, while others wrote about meiosis and crossing over! The nature of the topic allowed candidates to express their ideas in a logical sequence.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The process of translation has been examined frequently on past papers. Though the topic involves many different molecular structures and events, some candidates seemed to correctly grasp much of the detail and overall result. Some excellent answers appeared. However, as in previous years, there were candidates who confused translation with transcription (perhaps a reading error after glancing at the question?) and those who mixed accurate with inaccurate information.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram to show the molecular structure of a membrane.</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>Some proteins in membranes act as enzymes. Outline enzyme-substrate specificity.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Membranes of pre-synaptic and post-synaptic neurons play an important role in transmission of nerve impulses. Explain the principles of synaptic transmission.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Award [1] for each of the following clearly drawn and correctly labelled. </em></p>
<p>phospholipid bilayer;<em> (double row of opposing phospholipids, tails to inside) </em></p>
<p>hydrophilic/phosphate/polar (heads) and hydrophobic/hydrocarbon/fatty acid/nonpolar (tails) <span style="text-decoration: underline;">labeled; </span></p>
<p>integral protein; <em>(embedded in the phospholipid bilayer) </em></p>
<p>protein channel/channel protein; <em>(integral protein showing clear channel/pore)</em></p>
<p>peripheral protein; <em>(shown on surface or slightly embedded on either side) </em></p>
<p>glycoprotein<em>; (with carbohydrate attached on outer side)</em></p>
<p>cholesterol; <em>(shown embedded in bilayer and smaller than the hydrophobic tail)</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>enzyme shape is specific to (particular) substrate;<br>lock and key analogy/model;<br>example of specific enzyme and substrate;<br>has specific 3-D/tertiary configuration/3-D/tertiary shape essential to functioning;<br>active site on enzyme binds to substrate;<br>substrate and active site complementary/fit together;<br>(substrate and active site) are complementary due to structure/chemical attraction;<br>enzyme-substrate complex forms;<br>denaturation changes enzyme’s binding ability (to specific substrate);<br><em>Award [6] for the above points clearly shown in an annotated diagram.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>synapse is gap between adjacent neurons;<br>(arriving) action potential depolarizes pre-synaptic membrane;<br>opens (voltage-gated) calcium channels in membrane;<br>causes influx of calcium ions;<br>causes synaptic vesicles to fuse with pre-synaptic membrane;<br>vesicles release/exocytose neurotransmitter into the synaptic cleft;<br>neurotransmitter diffuses/moves across synaptic cleft;<br>neurotransmitter binds to receptors on post-synaptic membrane;<br>opens channels allowing sodium ions/potassium ions to diffuse;<br>initiation of action potential/depolarization in post-synaptic membrane;<br>removal/breakdown of neurotransmitter stops effect on post-synaptic membrane;<br><em>Award any of the above points for a clearly drawn correctly annotated diagram.</em><br><em>(Plus up to [2] for quality)</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>There were many clear diagrams showing the molecular structure of a membrane. A labelled phospholipid bilayer always seemed to be shown. ‘Intrinsic and extrinsic proteins’ are terms still used by candidates. The marking criteria for glycoprotein and cholesterol discriminated against some who included them. Cholesterol molecules were sometimes incorrectly placed next to the phosphate heads rather than being embedded in the bilayer and appearing smaller than the hydrophobic tails. Overall, however, candidates earned maximum credit for this question.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The topic of enzymes has been visited many times on exams and is usually studied in depth. Though the question was narrowed to an outline of enzyme-substrate specificity, many candidates were able to get three of the six available marks. Specificity of enzyme shape to substrate, the lock and key model and the binding of enzyme active site to substrate were the marking points frequently awarded. Sometimes irrelevant information was given, as when enzyme activity under different environmental conditions was described.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Unfortunately, candidates who showed thorough understanding of the principles of synaptic transmission were few and far between. Insufficient accurate detailed information was a common problem, along with an incorrect sequence of events. Other answers were laden with generalities, vagueness, or confusion. Many candidates scored poorly on this question.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Define <em>active site</em>.</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>Explain enzyme-substrate specificity.</p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>site on surface/portion of the <span style="text-decoration: underline;">enzyme/protein</span> to which the <span style="text-decoration: underline;">substrate</span> binds</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>enzymes fit together with substrates similar to a lock and key;<br>active site has shape that gives specificity;<br>enzymes <span style="text-decoration: underline;">catalyze</span> a reaction with a specific substrate;<br>example of named enzyme and its substrate;<br>substrate held precisely in (optimum) position to make/break bonds/carry out reaction / chemical interaction occurs between enzyme and substrate; <br><em>Accept these points shown in an annotated drawing.</em></p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>A few candidates mixed up the location by stating that the active site was on the substrate.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many answers simply mentioned a compatible fit such as a “lock and key.” More marks could have been gained by also mentioning specificity of shape or any reference to the result of the specificity in terms of catalysis or breaking of bonds to form products. Few candidates gave an example of an enzyme and its substrate.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Plants have widespread influences, from food chains to climate change.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a diagram of a palisade mesophyll cell labelling only the structures that would not be present in a pancreatic cell.</p>
<p> </p>
<p> </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 the process of photosynthesis.</p>
<div class="marks">[8]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the process of peat formation.</p>
<div class="marks">[4]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. cell wall</p>
<p style="padding-left: 30px;"><em>Must be shown as a double line</em></p>
<p>b. large vacuole</p>
<p style="padding-left: 30px;"><em>Labelled either inside or on the membrane</em></p>
<p>c. chloroplast/plastid</p>
<p>d. starch grain</p>
<p>e. tonoplast</p>
<p><em>Allow <strong>[2 max]</strong> if any features common to both plant cells and animal cells are labelled</em></p>
<p><img src="data:image/png;base64,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" width="316" height="216"></p>
<p><em><strong>[Max 3 Marks]</strong></em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <span style="text-decoration: underline;">autotrophs</span> perform photosynthesis</p>
<p>b. carbon dioxide and water are the reactants/raw materials required for «photosynthesis»</p>
<p>c. light splits water molecules/causes photolysis</p>
<p>d. «photolysis» releases oxygen as a «waste» product</p>
<p>e. light energy is converted into chemical energy</p>
<p>f. «photosynthesis» produces organic compounds/glucose/carbohydrates</p>
<p>g. photosynthesis occurs in chloroplasts</p>
<p>h. chlorophyll «photosynthetic pigment» absorbs light</p>
<p>i. different pigments absorb different wavelengths «of light»</p>
<p>j. chlorophyll absorbs red and blue light/ends of the spectrum</p>
<p>k. carbon dioxide concentration/temperature/light intensity are limiting factors</p>
<p> </p>
<p><em>Award only <strong>[1]</strong> for correct display of equation unless further annotated or explained</em></p>
<p><em>Allow up to <strong>[2]</strong> for correct use of understandings specified as AHL topic 8</em></p>
<p><strong><em>[Max 8 Marks]</em></strong></p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. formed from dead plant material/leaves/mosses/Sphagnum</p>
<p>b. formed in waterlogged sites/bogs/mires/swamps</p>
<p>c. where bacteria/fungi/saprotrophs are not active/are inhibited</p>
<p>d. organic matter not fully decomposed</p>
<p>e. «occurs» in acidic conditions</p>
<p>f. «occurs» in anaerobic conditions</p>
<p style="padding-left: 30px;"><em>Reject anaerobic respiration</em></p>
<p>g. «very» slow process/takes a long time</p>
<p><em><strong>[Max 4 Marks]</strong></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The diagram below represents a DNA nucleotide.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>Identify the phosphate group and deoxyribose.</p>
<p>Phosphate group: .................................................<br>Deoxyribose: ........................................................</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>Draw a labelled diagram to show how four nucleotides are joined together to form a double-stranded DNA molecule with two base pairs.</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>State <strong>two</strong> differences between RNA and DNA nucleotides.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Phosphate</em>: I<br><em>Deoxyribose</em>: III<br><em>Both correct for one mark.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em><img src="data:image/png;base64,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" alt></em></p>
<p>two sugar-phosphate strands shown connected through bases; <br>a sugar-phosphate bond labeled as a covalent bond; <br>hydrogen bonds labeled on line between bases;<br> boxes labeled as (nitrogenous) bases;<br> complementary base pairing/A–T/G–C; <br>(5'–3') linkages correctly shown; (<em>no label required</em>)</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>RNA nucleotides contain ribose <span style="text-decoration: underline;">and</span> DNA nucleotides contain deoxyribose;<br>(some) RNA nucleotides contain uracil <span style="text-decoration: underline;">and</span> (some) DNA nucleotides contain thymine;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most candidates had no problem identifying the phosphate group and deoxyribose in a diagram of a DNA nucleotide. <br> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Although many drawings were dreadful in appearance, at least three marking points could be found to earn maximum credit. Surprisingly, the nucleotide diagram that appeared in the previous question was not used by many candidates as the first nucleotide in their DNA drawings which eventually had to show four nucleotides arranged in a double strand connected through two bases.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Astute candidates who spotted the word “nucleotide” in the question earned an easy two marks by stating that RNA nucleotides contain ribose and uracil whereas DNA contains deoxyribose and thymine. Those candidates who thought in terms of a helix talked about single and double strand molecules without earning any mark. In this question, names were expected rather than letters to identify the nitrogenous bases. </p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The equation below shows the production of glucose and galactose from lactose.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Glucose and galactose are examples of monosaccharides. State <strong>one</strong> other example of a monosaccharide.</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>There are several different types of carbohydrate. State which type of carbohydrate lactose is.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the type of chemical reaction that occurs when lactose is digested into glucose and galactose.</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>Simple laboratory experiments show that when the enzyme lactase is mixed with lactose, the initial rate of reaction is highest at 48°C. In food processing, lactase is used at a much lower temperature, often at 5°C. Suggest reasons for using lactase at relatively low temperatures.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>fructose/ribose/deoxyribose/ribulose/other monosaccharides apart from glucose and galactose</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>disaccharide</p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>hydrolysis</p>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>less denaturation / enzymes last longer at lower temperatures;<br>lower energy costs / less energy to achieve 5° C compared to 48° C;<br>reduces bacterial growth / reduces (milk) spoilage;<br>to form products more slowly / to control rate of reaction;</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Candidates were often correct, but some stated a disaccharide instead of a monosaccharide. Common errors were sucrose or maltose.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates correctly identified lactose as a disaccharide.</p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Hydrolysis was often given, yet some erred by stating decomposition.</p>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Generally answered well with most candidates referring to denaturation and/or controlling the rate of reaction.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish between absorption of red, green and blue light by chlorophyll.</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>Draw a graph to show the effect of increasing light intensity on the rate of photosynthesis.</p>
<p><img src="data:image/png;base64,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" alt></p>
<div class="marks">[1]</div>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain one way of directly measuring the rate of photosynthesis.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b (ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. absorbs at blue <span style="text-decoration: underline;">and</span> red (in high amount);<br>b. greatest absorption is of blue light / more blue light than red light absorbed;<br>c. low absorption of green light / green light is reflected;</p>
<p><em>Allow above points in an annotated diagram.</em></p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" alt></p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>either:</em><br>a. production of oxygen (which is a by-product of photosynthesis);<br>b. outline of method to collect gas/monitor gas production per unit of time/over time (<em>eg</em> count bubbles/collect in syringe/oxygen sensors over a time period);<br><em>or:</em><br>c.uptake of carbon dioxide (as carbon dioxide used as raw material for photosynthesis);<br>d. outline of method to detect uptake of carbon dioxide over time (<em>eg</em> change/rise in pH of water surrounding a water plant using pH meter or paper/CO<sub>2</sub> sensor over time);</p>
<div class="question_part_label">b (ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most candidates earned two marks for this two mark question. Most stated that blue and red are absorbed (one mark), but that green is reflected (another mark). Thus, they distinguished green from the other two colors. Very few candidates distinguished red from blue, which was listed as a third marking point.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A whole variety of poor drawings was seen from straight lines starting from 0,0 and going up at a 45° angle to sigmoid curves to bell-shaped curves. Many drawings lacked straight sections for the increase or plateau portions.</p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Few candidates earned both marks here. The most common answers suggested measuring oxygen production or carbon dioxide uptake. Some added a method for doing so; others gave the rationale for doing so. Only a handful suggested taking the measurements for a set amount of time, or taking a reading before and after a time interval. Hence, rate could not be calculated and the second marking point was not earned. As a teaching point, it could be observed that many of the experiments in our practical programmes involving rates, do not insist on rate calculations because a divisor of one (time unit) has been set in the procedure. That kind of shortcut hurt candidates in this examination.</p>
<div class="question_part_label">b (ii).</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram to show the fluid mosaic structure of a plasma membrane, indicating the hydrophilic and hydrophobic regions.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish between active and passive movements of materials across plasma membranes, using <strong>named</strong> examples.</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>Explain how the properties of water are significant to living organisms.</p>
<div class="marks">[9]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em> Award [1] for each structure clearly drawn and correctly labelled.</em></p>
<p><span style="text-decoration: underline;">phospholipid bilayer</span> – with head and tails;</p>
<p>hydrophilic/phosphate/polar heads and hydrophobic/hydrocarbon/fatty acid/ non-polar tails labelled;</p>
<p><span style="text-decoration: underline;">integral protein</span> – embedded in hydrophobic region of the phospholipid bilayer;</p>
<p><span style="text-decoration: underline;">protein channel</span> – integral protein showing clear channel/pore;</p>
<p><span style="text-decoration: underline;">peripheral protein</span> – on the surface;</p>
<p><span style="text-decoration: underline;">glycoprotein</span> with carbohydrate attached on outside;</p>
<p><span style="text-decoration: underline;">cholesterol</span> – shown embedded in bilayer; thickness indicated (10 nm); <em>(allow 7 nm to 13 nm)</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p><em>Both the passive and active movements must be contrasted to receive a mark. </em></p>
<p><em>Award <strong>[3 max]</strong> if no examples are given. </em></p>
<p><em>Responses do not need to be shown in a table format.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>water is transparent / light passes through water;</p>
<p>this allows organisms to live below the surface / plants to photosynthesize;</p>
<p>hydrogen bonds between water molecules make water cohesive;</p>
<p>this gives water a high surface tension allowing animals to live on the surface / maintains lung structure (pleural membranes);</p>
<p>helps in water movement through plants/transpiration;</p>
<p>water has a high latent heat of vaporization / <em>OWTTE</em>;</p>
<p>evaporation/sweating/transpiration leads to cooling;</p>
<p>water has a high specific heat capacity / <em>OWTTE</em>;</p>
<p>this provides a stable environment for water organisms;</p>
<p>water is a universal solvent; can transport materials around organisms/plants/animals;</p>
<p>can be a solvent for chemical reactions in organisms;</p>
<p>ice is less dense than water / water has a maximum density at 4°C surface (pond/lake/ocean) freezes first, allowing organisms to survive in the water below;</p>
<p><em>Accept hydrogen bonds between water and other substance makes water adhesive from AHL.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Many drawings were of reasonably good quality and gained at least three marks. Glycoprotein was a challenging structure for candidates to draw. Often the glycoprotein did not show anything resembling a carbohydrate chain attached to the protein. Also, the phospholipid bilayer was somewhat problematic. Sometimes, peripheral proteins were drawn in the hydrophobic region and, quite often, cholesterol molecules which should have appeared in the hydrophobic region were not totally embedded there. It was good to see that candidates almost always showed two-tailed phospholipid molecules. It was a rare candidate who indicated any reference to membrane thickness.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A few candidates did well on this question, but it was disappointing to see the lack of comparison skills among most candidates. Interpretation of the command terms distinguish and compare needs clarification for students, so that clear answers with opposing criteria are given and expected. Virtually all candidates wrote separate paragraphs about active and passive movement with indirect or incomplete pairings of ideas.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates showed a wide range of understanding of how the properties of water are significant to living organisms. Every marking point was eventually awarded by the examiners. There was limited use of the terms latent heat of vaporization and specific heat, though candidates could receive the mark using other wording. Those who did use the terms only gained credit if the terms were qualified such as “high specific heat”. Just saying that water has specific heat was insufficient. Unfortunately, mistakes such as “water is soluble” were seen too often. Sometimes, a named property of water was linked to a wrong significance.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the functions of the following organelles of a eukaryotic animal cell: lysosome, Golgi apparatus, free ribosomes, plasma membrane, rough endoplasmic reticulum.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish between anaerobic and aerobic cell respiration in eukaryotes.</p>
<p> </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>Explain the mechanism of ventilation in the lungs in order to promote gas exchange for cell respiration.</p>
<div class="marks">[9]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>lysosome:</em><br>a. (from Golgi apparatus) with digestive enzymes / break down food/organelles/ cell;</p>
<p><em>Golgi apparatus:</em><br>b. site that processes/modifies/packages and releases proteins;</p>
<p><em>free ribosomes:</em><br>c. site of synthesis of proteins (released to cytoplasm);</p>
<p><em>plasma membrane:</em><br>d. controls entry and exit of materials/substances in cell;</p>
<p><em>rough endoplasmic reticulum:</em><br>e. synthesis and transport of proteins; (<em>both needed</em>)</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p><em>Award <strong>[1]</strong> for each contrasting characteristic. </em> </p>
<p><em>Table format is not necessary for the marks.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. inspiration/inhalation brings air into lungs;<br>b. external intercostal muscles contract;<br>c. and move rib cage upwards and outwards;<br>d. diaphragm flattens/contracts;<br>e. increasing thoracic volume;<br>f. pressure decreases from atmospheric pressure so air rushes into lungs;<br>g. expiration/exhalation forces air out;<br>h. internal intercostal muscles contract / external intercostal muscles and diaphragm relax;<br>i. abdominal/abdomen wall muscles contract and push diaphragm upwards;<br>j. decreasing thoracic volume;<br>k. increasing pressure in lungs so air is forced out;<br>l. a concentration gradient between air sacs and blood needs to be maintained;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Question 6 was the most popular to answer.</p>
<p>The major confusions were found when explaining the functions of the Golgi Apparatus and the rough endoplasmic reticulum. Some candidates did not make any reference to proteins when explaining the function of the Golgi, for which they did not receive the mark.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Marks were not awarded generally for incomplete answers. E.g. Not mentioning one of the end products of anaerobic respiration, either CO<sub>2</sub> or ethanol or in products of aerobic respiration, water was often omitted. The comparisons were sometimes difficult to spot, given that they did not use a chart or did not follow a proper order. Finally some candidates simply failed to compare, explaining only one type of cell respiration.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were quite a few students who gave very good descriptions of gas exchange and even respiration in some cases, and the properties of the alveoli that made them well adapted for gas exchange. Unfortunately the question was "Explain the mechanism of ventilation in the lungs in order to promote gas exchange for cell respiration". Many candidates did not read the question correctly. Some candidates even gave more detail of aerobic respiration here than they did in part b. Among the most common errors found were to say that "...inspiration brings oxygen into the lungs" and that "...expiration releases CO<sub>2</sub>". In some of the answers there was no differentiation between external and internal intercostal muscles. Some candidates referred to changes in the lung volume, instead of thoracic volume. </p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The graph shows a sigmoid population growth curve.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAdgAAADFCAYAAAD35uNoAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAABaOSURBVHhe7d0LVFVl3sfx3/D2OpNhI9iUoSVOXkZNrdPUBLa6rDEbvKRZaaUmk1hppSClJjBNCVomAtpFwwrTLjppkCajUa+2SiqmM5mlo2DeGWwUHCOa6e1l3vNs9jE0L4AcOGef72ctVmc/+wAHWvg7z//572f/5D8eAgAAjSrE/i8AAGhEBCwAAD5AwAIA4AMELAAAPkDAAgDgAwQsAAA+QMACAOADBCwAAD5AwAIA4AMErMOVl5crLzfXPgIANBUC1uEOHjyooqIi+wgA0FQIWAAAfICABQDABwhYAAB8gIAFAMAHmihg9yovzqVOkR2P/ug+VvOKylRtP6txVcqd0V+d4nJVZo+cWLUqiz9TcWW1vndn6NeRE5RX9r19zlfq8/oAAIGmSWewrScu19927lCJ9bFV780IVfatD2px8b/sZzSHah1e96iir1+ozZ6APcOVoL/snKvBbc+wz/tKqFwJq1WycIja2iMAAOdoxhJxC0UMHKW7wjbrgy8O2GPNoVpVhypUZR8BANAY/GcNtrpM7sXJGmCXj3vFzdO7xYc9J2pKqb3i0jQ7LqqmtBzziPJqnatdZj1hibeyWO9mjFUvb3k6crBScrfqn+55Ghi/0vOElUq8cpJez32i1ud/pzL3K0qJ6XGkpJ35TrHnu3q/j+drvDBbd3c3Xy9Kd88tVNmP6t2HVZz7yJGf64eyeK3X/r1bmZfa52t/mHMn/L0AAPxZMwbsYW1dkq0X/n2NBlzRQu6s+zRs5kENW7NRJV9+oLntCnT3YE+Qln5nPbuqYJW2XbVQn+7cqLeGf6WUwelad7iuq7eH5M6eqrvX9lLO59utr79wtPRq/NNaFzFOqzIHeZ4zSOkfztGQC1vUfIqJQPcCjRk6T/uHL/N83616/5lIvT3mTk3O3e05a5TIvetSPeb5mp+uuEP75kzV0+8dPRuvLl6hyfHr5MopUsnOv2rZ2HJljX5W79V+7We4FP/XH0rn7+fEqatcun/8lfr6pQd//HuZsEjuSt+sXAMAGkeTBuyhrJv1qyMztN4asLSNJi+ZokHn7tV7L/1NPSfHa1TXsz2vKkLXJibodq3XWx/vr/nk3vfooTt7KFRnq+vQ4RqsdXrHXV5z7pRay5WwXCX5D8gV6vmRQ9rKdd0lammfPb4qbVufr61Hvm8Ltb3W83hkC61d5dZX1nMu1bCRfdQ2JEShvfro+rCvtf/QMevJZ7XW+S0PyF3wpla5/6VLzOvY/KiuPft4v3o71GNXqUNmhiZc8k9teOOvaj12rEbU/r3sel1v/KWuPzsAoDk0acAe3eTk+chP1UhXW4Uc2K3NFT/VL1qf9cMLanm22vy0Qu4d+2UVe3/RWq28J61zJsy+tQfqwJRaV+YqL3eFFiXfJFfsS6dYd63Qni/Kjv6++pnObnOW9MkOlf6vOQ5X61Ynb4YKieivPyx5UsOUp/ihUepiSskZb1sdy8eqLn1Tk0e+onZ/XKhZQy5USPU3qthddfQbk16/16tVxwlyAIBfadKAPaFzLlT3sH/rH4e+sUuvHlWHdfDfYXJ1PE9WhP3jkL72nrTOtdJ5rc+0B7yqPacOqaaoXEv1buXdd5Ni83Z4nhGiNkOf1Sc5d55iBhumC3q0Pfr76l86fPAb6bKOivhve+iUPDNfV3+NTs3zvKnYqPzn75Cyp+jJgn32eVtlkeaOeUy7bk3VY9aM2SPkLIVdGKaef/yzttV+Y7LTreeGtLc+DQDgn/wjYM/4pa6+81faNCtTi7ceNlM5rUvP0Ksy67Pn1Txn4xt6+b1SVXvPdbhFN/36XLUKC5c2rNdHZq22coveWLL2xzPT6gPa8eFhT2BepeuH3KhrW32hF63nleuQJz1btg47Tti2VJdrYtR14wI9+dIXqjQNT+s8j5d8p34DXTrXftbJmZLvPA2IHKw/rvO8dk9snt8+zDN+zJsD8wbgoQl6od0kzXnoOrX1/l8J6aDom7pr09JXtNJqbDKvIc3z9UZqUbNe2gQAOBX/CFizRjrxab127/dKv6G3Ov2yjybs66vn8h7V4Ai76ahbuEqfuF5dvOfmjpYrtKU635Ki9KFfKjG6qzpdkal/dL34x2F5xsW67bkH1C57mC6JvEiXTFivsKt+q67ao5J9VQr91dUa2u0dJV4Zqxc/Mz3CRohCXffo+T+NlmYN9HxeV101fqeuf/6lmvKt/ayTM19jtDIzL1FRbB91Md/7hj/pvIdn676rz7GfI33/6XJNzy9TVUGKBlx8kb1G7fm49Fl9fcdsLbvj//Tc9Z7fi/0afven2RrV+Wf2ZwMA/NFP/uNhP/ZT5nKWYRr2xd16n00Z6q24uFiLcnKUmpZmjwAAmoKfzGABAHAWAhYAAB8IgIBlz14AQOBhBgsAgA8QsAAA+AABCwCADxCwAAD4AAELAIAPELAAAPhAAOzkhNPBTk6A/zB/j0ZVVZV27thhPfaqrKzUli1b7KPAc/nll2vwkCH2EQwC1uEIWKBp7du3T7t379ZX+/erqKhIFRUVWrM63zp3Q/8YhYWZG37UBNKxuvfoYT9qPCbMn1uwwHoN6ZkZPvkeRsuWLdWuXTv7CAYB63AELOA75eXl2rp1q77cvl0bNmywQsyEaGRkpLp06aLIjh2t4OncubP9Gc2noKBAM1JTFdO/v8bExSk8PNw+A18hYB2OgAUal/mb+vijj6xA3bJ5sxVYJkzNzNAfgvRkvv32W8+/B4u0bOlrmhgfT0nXxwhYhyNggdO3ceNGFW4otIKpW/fuio6O1hW/+Y3fB+qJmDL2s888o+0lJXrMM6sN1J/D3xGwDkfAAg1jyr/5q1dr1cqV1vGYsWPlcrkcVVotLCxU0sMPUzb2ES7TAYBazJvSJ2fN0i1Dh+rrrys1e84cvbp0qfr27eu4AIqKitJb+fmKiIiwft683Fz7DBoDM1iHYwYL1I2Zzb21apVVNjWz1T59+ujMM8+0zzpf7bLx1GnT1Lt3b/sMGoqAdTgCFjg58zeSmZGh8oMHNSE+3prVBTNv2Tja8wZjUmIiZePTQIkYQFAya6zJSUn6Q3KyRo4aZZWBgz1cDW/ZuFu3brrCdZlVNjbdx6g/AhZAUDFh8fKSJdaao9ns4YWcHIL1GKY0PmLkSK3/4H1rs4y7YmOtTmrUDwELIGiYcrAJC7Ml4esrVljXgQbTOmt9mZ2ZzPKSKZ0nTJxozfjNzB91Q8ACcDzvrPWesWOtBh4TGqwt1p23bGxm/JSN646ABeBopjv2wcTEI7NWumMbxsz0zYz/Y/cnlI3riIAF4FimI3bUiBHq168fs9ZGYn6H5ndpKgGPz5hB2fgkCFgAjmRKwuZykwXZ2ey56wOmEmAaxOpWNj4kd8bN6tQ9QXml39ljHtW7lTcuSr3G5aq02h5zEAIWgKOYf+TNTkxmM35TEmafXd85tmw8ICbGqhr8WGu5xk7V/R3WKmX6ajtMv1PpmxlKWX+lpqf0V4QD04iABeAYJlzNeqsxOz2dknAT8ZaNM7KyNDcz0yobm7Xvo4Repri0e3VB/hNKfXO3vi9drdRpH+qqGQkaFNHCfpKzELAAHMHbzNSzZy89NHkyl980g9pl42v6XGWV6X8oG4co1HW7HhrZQmunTdH4pCf0/jVTlHzjhY4NIgIWQMAz4WqamUy43jvuXnsUzaF22dh0bq9ds8Y+Y5yjq8cnqJ8+1LtlAzX3EWeWhr0IWAABzRuu05KTCVc/4i0bH91gVq2qsj3aVeV5uMWtT0vNA+ciYAEELG+4ps2cad1ODn6u8hMtTHpRui9NKTGleippsdyVDmwfthGwAAKS1dA0aZKGDb+NvYQDwiG5sx/XU/q9po+7TaNSpqjfrvlKyf5ElfYznIaABRBwvN3C11x7HWXhgPCdSnMfVWyWdH/aKLlCQxQS0V/JM/ppT9bjWug+ZD/PWQhYAAHH2y1MuAaGauuSnLW6YOJUxbla26MtFHFjgqY7uFTMDdcdjhuuw2nmPztfmzZ9Zl3nyqU48GfMYAEEDLMd3/p1/0O4IiAQsAACgrlzS1ZmpmbPmUO4IiAQsAD8nrkcx9zw22zFZ24CDgQCAhaAXzMdwzPS0jQxPp57uSKgELAA/NqinEUKCwvjlnMIOAQsAL9lbn22bOlrSkpOtkeAwEHAAvBLZt3Ve8N0mpoQiAhYAH7Ju+7KDdMRqAhYAH7HXO9qsO6KQEbAAvArZvcxc73rtKQkewQITAQsAL9hLsn5Q3KydW9XrndFoCNgAfiNFcuX66JOnbi3KxyBgAXgF0xp+PmFCzUpMdEeAQIbAQug2dUuDYeHh9ujQGAjYAE0u7Vr1lAahuMQsACaldlQIjE+gdIwHIeABdCszIYS6ZkZlIbhOAQsgGZTUFCg8oMH2VACjkTAAmgW5eXlmpGaqsc8H4ATEbAAmoW5JGfY8NvYaxiORcACaHLmmtf81as1Ona0PQI4DwELoMl5r3nlNnRwMgIWQJMyd8oJb9OGa17heAQsgCZjGpu4Uw6CBQELoMmYxqYxcXHcKQdBgYAF0CS8jU1Db77ZHgGcjYAF0CRMY1PazJk0NiFoELAAfM7b2BQVFWWPAM5HwALwKW9jU3xCgj0CBAcCFoBPsWMTghUBC8Bn2LEJwYyABeAz7NiEYEbAAvAJdmxCsCNgATQ6GpsAAhaAD9DYBBCwABoZjU1ADQIWQKOisQmoQcACaDSmsemiTp1obAI8CFgAjcI0NiXGJ2jc+PH2CBDcCFgAjWJOeroeTZ3OregAGwEL4LQVFhZqe0kJt6IDaiFgAZyWb7/9VkkPP6yp06bR2ATUQsACOC1PzZunmP791bt3b3sEgEHAAmgw7zWv9z/wgD0CwIuABdAgpjRsrnnNyMqiNAwcBwELoEFWLF9uXfNKaRg4PgIWQL2Z0rDZb3hSYqI9AuBYBCyAevGWhtNmzlR4eLg9CuBYBCyAelmUs0iuyy5TVFSUPQLgeAhYAHW2ceNGLVv6Gl3DQB0QsADqxJSGEyZOpGsYqCMCFkCdpKWmakxcHF3DQB0RsABOydyGrqKigr2GgXogYAGc1L59+5SVmalpSUmUhoF6IGABnJBZd31w0iTrkhxuQwfUDwEL4ITMuus1117HJTlAAxCwAI7Lu+46Ona0PQKgPghYAD9irnc1667TPTNY1l2BhiFgARzFNDWZ610XZGezFSJwGghYAEd4m5qmJSerc+fO9iiAhiBgAViscE1MtJqa+vbta48CaCgCFoDFbOIfFhame8fda48AOB0ELADNf3a+Nm36TEnJyfYIgNNFwAJBrrCw0LpDzuz0dDqGgUZEwAJBzIRr0sMPa/HLLxOuQCMjYIEgVTtc2QYRaHwELBCECFfA9whYIMgQrkDTIGCBIEK4Ak2HgAWCBOEKNC0CFggCLy9ZQrgCTYyABRzObCKxYcMGwhVoYgQs4FBmb+HkpCRrhyaziQThCjQtAhZwIHPLObNxf/v2F7BDE9BMCFjAYczN0keNGKF+/fpZG/cTrkDzIGABB8nLzbVulp6RlaXBQ4bYowCaAwELOIBZb31y1iytXbvWambq3bu3fQZAcyFggQDnXW81aGYC/AcBCwQws3mEd731ocmTWW8F/AgBCwQo7+YRC7KzWW8F/BABCwSY8vJy3Td+vLV5xOsrVqhz5872GQD+hIAFAoi5BOeWoUMVHR2tp595RuHh4fYZAP6GgAUChCkJey/BGTFypD0KwF8RsICfM13CtUvCXIIDBAYCFvBjBQUFR7qEKQkDgYWABfyQd6P+57Oz6RIGAhQBC/gZ08g0ICbG2qj/hZwcuoSBAEXAAn7Cu92ht5GJjfqBwEbAAn7A7MhkZq3GW/n5NDIBDkDAAs3IbBph1lrnZmZaa61sdwg4BwELNANTDja3lrvCdZkuv/xy1loBByJggSZmysF3xcaqqKhI6z943+oQZtYKOA8BCzSR4uLiI+XgqdOmKTUtjVvLAQ5GwAI+5l1nvWfsWKsc/OrSpTQxAUGAgAV8xATr/GfnW5vzm2A13cFsGAEEDwIWaGSmFOwN1vPPb3skWFlnRbCqLs3V+O49dFPOVlXbYzUOyZ1xszrFzJO78ugzTkDAAo3E7MDkLQUTrMAPQiJ+p4TJl2rTrPlaWfqdPVqtSvdipWQd0O1Tbpcr1HlxRMACp8F7uc3tw4fr8RkzNGDgQIIV+JGfqfMtE3V/h7VKmb5apWayWr1X72S/oj0xCRp39Tk1T3MYAhZoADNbNdsa9uzWXdu2bdNjqalW81JUVBTBChxP6GWKS7tXF+Q/odQ3i7X3zQylrL9S01P6K8KhSfST/3jYj+FAZj1wUU6OdUkITo8J1cINhVq29DXt3rlLF0Z20LDht1nl4KZyVmioOnToYB8FtpYtW3KZUtAxa65jNCzL7XncVv0yl+qpIRc6dqZHwDocAdtwpvxrZqfeUD3vvPM0cNAghXpCrrn8/e9l2rt3j30U2LaXlKjoo4/to8B324g77EeBz3S9N5ZzPX83prJzRGWRMm+N1QuRafrz00McO3s1CFiHI2Drx/y+Nn/xhbXL0msvv2L9o3ntddepW7duzLZwQubN2N69e+2jwFZVVaWdO3bYR6cvsmPHY6773qu8uBs1vcdCfZjg0hn2qBMRsA5HwJ6YuU51z549+nzTJm3ZssUK1Bv6xyg6OloX9+ypLl26sJ4KNDoCFg5R14Ddt2+f9c7ViRvOmyA9ePCgdu3apf1lZVaYbvjgA+tcdJ8+VjnMvMsmUIGmQMDCIeoasKYjdufOnVqzOt8eOXpNqfaajAkj06Di1b59+2YLJm94GiZAv6msVKXnw4RoRUXFkZ/H/Czt219gNSR179FDbdq0UXh4uHUOQFMiYOEQDS0R115TOnZNxqxP1mZKq8c6WcPHz3/+c2u2eDLHfg+v2qFpmE5eMws1an9dE6IGt4AD0FwIWIdrjjXYUzV8HDhwQF/t328fHd+xs+TaCE0AgYCAdTianACgebCTEwAAPsAM1uHMDDYzI0PxCQn2CAA0nuZscvR3BKzDmS7bOenp9hEANC5zg4ujdmrCEQQsAAA+wBosAAA+QMACAOADBCwAAD5AwAIA4AMELAAAPkDAAgDgAwQsAAA+wHWwABDsynJ195UJetc+PFqYovt21+aCcKV8OEeD2zr5BnONi4AFAPzACtvHpMw39dyQ9vYgGoISMQAAPkDAAgBO6nt3hn4dOUF5ZYfkzuivTjEJSomLUqfIjp7HaVpXukPrHhlsHz+ivOLD1udVlxVpSbI9HhmluzPeVnFltXUuGBCwAID62fKl/mvkcm37fJnu13LNHDNLmwYvUol1/LpSFrl1uHqrFt8Tq1llt+qtz7dr24epilg7RfHZn6jS/jJOR8ACAOqn900acXWEQkK76ep+bbW93Q261dVaso47qMoz063cXqjcjR101/gh6hoaopC212nSlEHak71KfzkcHLNYAhYAUD+/aK1Wp0iP6q8rtEdb9NTQnnaJ+CK5Yl9SVVWF/llFwAIA0CAhrcJ0gfoo5e0tKtm5o9bH3KC51IeABQA0upCLojSk92YtW/Tnmsam6tKaRqjBOSoOkj4nAhYA0PhCumrUggW6XS8q5uKL1OmXfTRhX4xeW3CHOgdJ8rDRBAAAPsAMFgAAHyBgAQDwAQIWAAAfIGABAPABAhYAgEYn/T/MwBZgEiSdCQAAAABJRU5ErkJggg==" alt></p>
</div>
<div class="specification">
<p>The table summarizes the genome size of several organisms.</p>
<p><img 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" alt></p>
</div>
<div class="specification">
<p>The figure shows a pedigree chart for the blood groups of three generations.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the phases labelled X and Y.</p>
<p>X:</p>
<p>Y:</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 how fossil records can provide evidence for evolution.</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>Distinguish between the terms genotype and phenotype.</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 align="LEFT">Outline a structural difference between the chromosomes of <em>Helicobacter pylori </em>and <em>Homo sapiens</em><span style="font-family: ArialMT; font-size: medium;"><span style="font-family: ArialMT; font-size: medium;">.</span></span></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 align="LEFT">Deduce the percentage of adenine in <em>Oryza sativa </em>if the proportion of guanine in that organism is 30 %.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the possible phenotypes of individual X.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe ABO blood groups as an example of codominance.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>X: plateau phase</p>
<p>Y: exponential growth / log phase</p>
<p><em>(both needed)</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. the sequence in which fossils appear matches the expected sequence of evolution;</p>
<p>b. comparisons with fossils and living organisms (morphology) shows change in characteristics from an ancestral form / <em>OWTTE</em>;</p>
<p><em>Vestigial organs and homologous structures are acceptable answers.</em></p>
<p>c. fossils of extinct species show that (evolutionary) change has occurred;</p>
<p>d. fossils can be dated with radioisotopes / geological depth/strata indicates (relative) age/date of organism;</p>
<p>e. can yield DNA for molecular clock analysis;</p>
<p>f. example of any of the above can earn one mark (<em>eg</em>: reptiles follow amphibians);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>genotype is the genetic make-up/set of alleles (of an organism) while phenotype is the characteristics (expressed/shown in an organism)</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>chromosome from bacteria has no protein associated/naked DNA / bacteria is circular, H. sapiens is linear / (chromosomes of) H. sapiens are much bigger/have <span style="text-decoration: underline;">many</span> more base pairs than bacteria</p>
<p><em>N.B.: </em><em>Answer must refer to "chromosomes" not genomes of the two organisms.</em></p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>20 %</p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A, B, AB and O</p>
<p><em>All four phenotypes must be shown to award the mark.</em></p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>allele I<sup>A </sup>and the allele I<sup>B </sup>are (co)dominant as they are both expressed in the heterozygote/AB type blood / <em>OWTTE </em></p>
<div class="question_part_label">d(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Well prepared candidates could state ‘plateau phase and exponential growth or log phase’. A surprising number reversed the answers, probably due to carelessness.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were many convoluted answers without substance. Most gained the marks by stating that fossils can be compared with living organisms with an example.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most managed to give a reasonable explanation of genotype and phenotype.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many missed the word 'chromosomes' in the stem. The knowledge of naked v proteins or circular v linear was expected from the core. Using the data it was expected that the candidates could state that the human chromosomes were <span style="text-decoration: underline;">much</span> bigger (divide by 46) or that there were many more base pairs as there was about 3 X 10<sup>3 </sup>difference.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Considering that everyone on the IB diploma course studies maths at some level, a surprising number left (iii) blank or gave answers that did not make sense.</p>
<div class="question_part_label">c(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A pleasing number were able to state that all 4 blood groups were possible in (i), and most had a reasonable attempt at explaining codominance in part (ii).</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A pleasing number were able to state that all 4 blood groups were possible in (i), and most had a reasonable attempt at explaining codominance in part (ii).</p>
<div class="question_part_label">d(ii).</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p align="LEFT">Draw a labelled diagram showing the <strong>interconnections </strong>between the liver, gall bladder, pancreas and small intestine.</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 glucagon in homeostasis of glucose.</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>List <strong>two </strong>examples of polysaccharides.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. pancreas linked to small intestine by (pancreatic) duct (pancreas and small intestine both must be labelled);</p>
<p>b. gall bladder shown associated with liver and linked to small intestine by (bile) duct, (gall bladder and small intestine must be labelled);</p>
<p>c. showing (bile and pancreatic) ducts joined together before discharging in small intestine;</p>
<p><em>Ducts are to be drawn as double line structures.</em></p>
<p> </p>
<p> </p>
<p><img 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" alt></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. (glucagon) released in response to low blood glucose levels;</p>
<p>b. (glucagon) increases blood glucose levels;</p>
<p>c. glucagon leads to conversion of polysaccharides/glycogen (in the liver) to glucose;</p>
<p><em>Do not accept implication that glucagon directly converts glycogen to glucose.</em></p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>starch / glycogen / cellulose</p>
<p><em>Award <strong>[1] </strong>for any two polysaccharides.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>"Well I will just draw a diagram of the gastro intestinal tract and hope for the best", seemed to be the idea of many, resulting in no marks. The connection from the pancreas and the gall bladder to the small intestine had to be shown clearly as ducts, not random lines. The indecision manifested itself in the fact that many candidates drew very feint diagrams, resulting in scanning problems. Point 6.1.4 from the guide states that the interconnections should be clearly shown.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most well prepared candidates could outline the role of glucagon.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A disturbing number could not name two polysaccharides.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>(i) Distinguish between the thermal properties of water and methane.</p>
<p>(ii) Explain the reasons for the unique thermal properties of water.</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>Using the diagram, explain the interaction of short and long wave radiation with greenhouse gases in the atmosphere.</p>
<p><img src="data:image/png;base64,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" alt></p>
<div class="marks">[3]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(i)</p>
<p>Boiling point of water is greater than methane</p>
<p>Melting point of water is greater than methane</p>
<p>Latent heat of vaporization of water is greater than methane<br><em><strong>OR</strong></em><br>specific heat capacity of water is greater than methane</p>
<p>(ii)</p>
<p>Water is polar<br><em><strong>OR</strong></em><br>O atom more negative<br><em><strong>OR</strong></em><br>H atoms more positive</p>
<p>This causes «strong» hydrogen bonds to form <span style="text-decoration: underline;">between the molecules</span></p>
<p>Which require more/high amount of energy to break</p>
<p>Which increases the melting/boiling/latent heat properties</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Short wave radiation/UV «shown as» having its origin in the Sun gives off light as short radiation</p>
<p>Short wave radiation/UV «shown as» passing through the greenhouse gases «some reflected»</p>
<p>Some short wave radiation/UV is absorbed by the Earth and some is reflected</p>
<p>The reflected radiation is long wave radiation «reflected as heat»</p>
<p>Long wave radiation/IR «shown as» being unable to pass through/being absorbed/reflected by the greenhouse gases</p>
<p><em>Award marks for diagrammatic explanations of these marking points</em>.<br><em>Accept UV and IR as long as they are drawn with the correct wavelength</em>.</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) The expression ‘thermal properties’ seemed to confuse weaker candidates, who looked ahead to part b and tried to compare them as greenhouse gases. Perhaps the use of ‘physical properties’ might have been better. Many were able to state, for example, that water has a high boiling point, but did not get the mark as they did not continue to say that it was much higher than methane. </p>
<p>(ii) Most remembered about hydrogen bonds, but lost the mark for forgetting to state that they are between molecules. </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The writer of this question presumed that the more visual learners would use the diagram to produce an annotated response. In fact, very few used the diagram at all. The difference between long and short wavelengths was very confused, and weaker candidates were obsessed with explaining the composition of the greenhouse gases, and the role of the ozone layer (usually incorrectly). As a major problem affecting the planet, there seemed to be a lot of confusion.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the stages of the cell cycle.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the process of translation in cells.</p>
<div class="marks">[8]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p align="LEFT">Outline the production of a dipeptide by a condensation reaction, showing the structure of a generalized dipeptide.</p>
<div class="marks">[5]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. interphase is the longest phase;</p>
<p>b. interphase includes G<sub>1</sub>, S and G<sub>2</sub>;</p>
<p>c. in G<sub>1 </sub>and G<sub>2 </sub>/G phases, cell performs normal functions/protein synthesis/cell grows/organelles are replicated;</p>
<p>d. S/synthesis phase when the DNA replicates;</p>
<p>e. mitosis is when nucleus/genetic material divides;</p>
<p>f. named/described stages of mitosis;</p>
<p>g. cytokinesis: the division of the cytoplasm / formation of two daughter cells;</p>
<p><em>Award <strong>[3 max] </strong>if all three stages (interphase, mitosis and cytokinesis) are not mentioned. </em></p>
<p><img 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" alt></p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. translation is the conversion of base sequence on mRNA into an amino acid sequence / <em>OWTTE</em>;</p>
<p>b. messenger/mRNA attaches to ribosome (small unit);</p>
<p>c. many ribosome/polyribosomes bind to same mRNA;</p>
<p>d. (mRNA) carries codons/triplet of bases each coding for one amino acid;</p>
<p>e. transfer/tRNA each have specific anticodon;</p>
<p>f. tRNA carries specific amino acid;</p>
<p>g. tRNA anticodon binds to codon in the mRNA;</p>
<p>h. to corresponding triplet base/codon by complementary base pairing / <em>OWTTE</em>;</p>
<p>i. a second tRNA (anticodon) binds to next codon;</p>
<p>j. two amino acids bind together / peptide linkage is formed;</p>
<p>k. first tRNA detaches;</p>
<p>l. ribosome moves along mRNA;</p>
<p>m. another tRNA binds to next codon;</p>
<p>n. continues until stop codon is reached;</p>
<p>o. stop codon has no corresponding tRNA (anticodon)/amino acid/causes release of polypeptide;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. condensation is joining together two amino acids to form a dipeptide;</p>
<p>b. carboxyl/COOH group of one amino acid reacts with amine/NH<sub>2 </sub>group of another / diagrams of two (generalized) amino acids correctly shown;</p>
<p>c. water/H<sub>2</sub>O is eliminated;</p>
<p>d. diagram of dipeptide correctly shown;</p>
<p>e. peptide/covalent bond is produced / peptide bond correctly labelled;</p>
<p>f. occurs at the ribosomes;</p>
<p><img 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su1rdf8cK1qz2Gbz1om3a2LOGpUt2HNaryaat/RT6No2Trs7ypngodtcazUrvyhQzk+DWvJ88jMesvt3WdK2cEojAyX88FpOjflv4fetsdB8KUYZbDPswUHt+TgsdN3ynkXJFfarbbK3mm5IhvFxfsEJOWW225y6G1fbhNlKcLhNxMHO+o8xcfgy3HN9Reh8MGnUJ7R2zYInubfS1n1VI495ePY1u4yrk7pPh8vR5NcF8pfRLj4oqc86vPvHeqyr8tleeXjyCq9XN6O8O66VlmgzG39c7VTmRfr8fwza1Gk1FttPeomG/flpPNc60MvcSqffaJUpLbTWl0Tdx7BgeLTDke3ovVVheR7foro4IsRc/cKFM04hDn6ixAUEo/spp9j5yuLEN915GETHHMnns8fgy23jUFI0DgsLLsUExPVVpOolOqnIuPmT/Fv4SEI0WegcWYBXsmYiLDgGNy9/gXMaMyAPiQE4bEbgXmv2MaJaeUdb+TokyituRWPP5ig/iB9XS/bac8TXUde6pFY15Glw+dQeT2efxxXb0m2rcfCfYiYGCe+JOeRQ2tJSXCd7+VIXLAA2P4BDh4WhcHhlIXDUV/7Z/thUm91F/m13hSPD0V+hczD9ia5YLk7ZaTcvVWNxF+NxHtTRsjbeiOe7piDCmVbhznnQ/gUrIc67uJvuprz8oo4tZRtTf+htkpOrlzG3noJClOT5BbVSST++x+wZeIHuE2ZXzK2jl6Ojen2fLcT+f8UTMr3LkH4da9gdF4u0uNHy+lPIP/q19TpH0ZZxHj52FToeRTsmB/ORCXUjLSMCaj5t3HyNo/BnMaZKHO3zb3+9mIde1sXQQ5WI0Wr6C6sWPBTuaK1BS/xXNqSX10vb6+n6V3LkUyU467ycw3ufasFV+sMbh/VCB49FrfqNiJVvxjmr8Z6Lv9dzrY9DpR9ajUmfigH8ZARuG7rlcjbuADxnYe6K3un/S5I3iefQtOUPyjLHe5hX7addXEopz0CSBjGxI51yMeePNUVrmd1HMuq53LsoR5xKuNHPeTjUIwe+yPoClOhFw/resgjpd7q6+/tuL0h8/FWx+XQQbReYGsoiCDtqf5x2t8uQsi9/w35GNLhtJ5j3eSpnJxDfQjRGtc734l9AdjdUsAQp9HSEPvev8Di+iCxODU3bhVG/aUQ83s9SiXSiuOozP1XZGIZdma6BlzyCnFa9/a78N7Cv/jNg8SOh5HkV8RzH9HQLzCjUTm98D62bD2E+bPiHU7PqsQ55RPuWlxEWtOJtsqXkLnmOoezIHTBlGcC47DA3CDn8GlYS7dja9WtmDWpR22hWQxWfisSyY+uxtxDizFGOb2Qi455f8CK2VEuP6p6Ttnpgi+RFokDsBiEJ7yNm7YtQqLrTSV0/nQ/x6OmO3Ao9RqEBF0E/dMnMG/no5jddV1V+3gakIiINI+HLkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVl7XbnsRmr2HZYdBb1yLYrcvuSMiIk8YrHxmIUyWM929LLdWYQU2I3nJa91vQKXBRelFoOdBjMe3+hKRgsGqv4SNR9pDRhiK3sZe8RoQGqQMSDN92X0QIzWjekUo1iQ/hldrWS6IesNgRTSghmNc2q+RYdhrez2MmkpEzhis+kvbxyhcV4D65Om4OZo9nxMRnYtzC1adVlQWZKuvkhY3DLyAcvHyOnWc8gI7Zdw0ZL+2HbnT7sPm6g+QGx3ktXea+A/xrqEh3dcllPc6LUXFljmI4SECdWnBwcI/YE39zbjn5mt49EjUi3PYN46jcs0DSNgSgiU1zZA6vkBe6AbMfuxNNHbaxk16Yyy2WU5Bav1PxO5cgayqKFwT+f+QWefmVfEBz36DxSlYdj+JRMRh4qQbEavjazoGt3oUpl7dfRATJF5seDmerXge8/iuMaJe9TlYddaasTyrCUsfz0BKzHB5yijM/LURw3ZV4NOKV+Vxw5C/MRtTRGUcNg63z5oM8LUUsqHQTVmGbaZrsTU1Exsqj6vpNDh132DRYSnCskQDEidOwk2xV7JVReRBH/ePdtt7/lGJ1bdFdB0VDknIQv2wS9H6+X4UKa9htx8ZtqP1+DHbq5bPZQ9Ubu2NhtF8WE1QiTfdRrtJ9xtDETk7C3nzG5CV+RIq23gZneSdTzcVK7atxtiti7FwQwVvXSfy4NwO5gw5qDhjv+VWHeqycdMQdbxd5xfYu70ak8deMchO/Xkgt0RnP/U7zK/JQebK3bAyXpEsOPIXeCovBTVZT7HVTeRBH4NVKK4cPxHJ9cUw/bXR9lrk8hdg1P8CuZVtzuPEjRbPP4vHiq7DreMj1OkHk1DoUjbIgXwDUnTOoTo4MgX5Fgv2rJwKHc/59F3AtrgFx1b38yix37BERE76XGUGx9yJ9UXT0ThnjO21yNlfYsrOTciIH2kbZ4rHh7fJ40LmYXtTO6CLxjWjh6oVymC8G9CfyQcjlWbkGuO6TvnqjbkwV1r5HNCF0KWgQKpDQcpVaoJKbnWn5FdB2vNb2zVfIurhHI7vhyNm6iMosKin//asgjFep85AHpeyEnuUU4OvY2HsGVinJuC64fLY0PhzvBvQ9W4peRiSgKx6dTT5mByoSp7FvQkbcXRKPiwd4jdtRumcELx+RzIeMDcwYA1aPIihgeOFk1GHYTZGQ7/AjEa5xHZa38eWrYcwf1Y8rlS/cW5cu6ORhzMVyDGoo8m32j7Cy0/vxFjTi3jWOFE9XSkOVBZhZd6t2LU4Bzsaeapq8OFBDA0sLwSrSCQ/uhpzDy3GmJAghOhz0THvD1gxO8obMw8I4gjUX7TX/BUbShMw46ZIl99vKCJ/noK5eBuvl32lpvUntrgHFA9iaIB5IZ4EIywmBav2WNSW0DtY1VWYyb+042hDHeoN0YiKcHPSdvi1mDQV2HfoHwNw/THwWtw8iCHqO4YUIjoLLR/E0GDBYEUOQhERFQ1DfR0ajrqpdlo+Q1kx+PwcEfU7bQWr3m7tVe4odJNOXhcaewvSE9/Fxl11LhfMT6PxXTO2YjpmTTq/W2fIX/EghgYeW1bkLCwB6bmLcHrBw1hWUK72tNGC2uIXsHzxe7g9LwuzI/ks0GDDgxgaaEGSuFLtZ44cOYIxY8aon7RPXEj3r2zuRFttMTY8k4mswo+VFF1aDvIeug+zu56towvlX+VCLhOVz+OOhLcxccvT+Pe54iYqcRCTj2eMmxGa9yY2pfAOYPIdvwxWEydOxNq1azF58mQ1Rdu0XimdPHkSu3btQkpKippC/YEHMUR955fly2w245FHHsG+ffvUFDpfIlA99NBDsFgsaor/Wrp0qdLqJu9xzk/xmMo0ZBZUKUFWDJaCTKQwUFE/8MsyJk4BMmBdOHugmjBhAhYvXqyk1dbWKun+aNasWUrrkAHLO8S+xdY2aYXfHhAxYF0Yd4EqLy8Pc+bM8dtgJU4Li9PDDFgXTuxTYt8S+xiRJshNeb92+PBh6cYbb5T27t2rpmiP1rL5xIkT0v333y+tX79eTZGU/0U+ivz0d6Is+MO2aHX3c80/+z4WCGWD/JffByvBvjNpNWBpqVIK9EBl5w8BS4vBqrdApdV9iwaPgAhWgpZ3Kq1USoMlUNlpPWBpLVgxUJGWBUywErS6c2mhUhpsgcpOywFLS8GKgYq0LqCCleC8k52RLKaFcqUwQ8qp+Nb2BdWZihzJgIWSyXJGTfGyDotUYcqR0nRQKiVgvJSW87ZU09qhfsEXTkmWCpOUkzZeXSYkXdoaaeeBpkEZqOy0GrC0EqwYqMgfBFywEuw72+HDX6jBSq64E9dIFQ6BwqfBquOItHtZsrzMZZKpptmWZNkrrZGDiG6+STrik3glB6rdT0qJSJaWmqqlVpEkB8yyNWnSZZelSEt+n698SxhMgcrOuUIewIMYB1oIVgxU5C8CMlgJ33zzjXTiREt3sIJOSswps1XiMt9VSh1S8+5lkg53Sfk1J9U0m46afCkZ8dLS3UfVFC9q3i0t1emk5PxqeQ0cdFRL+ck6Sbd0tyTC5mAMVHb2ivmbb74amIMYhfvWb5F6UOMb7pf5XzsYqMh/BOyD56NGjcIll1xi+2B4En/+UwpqsnLxau33tjSfOYHP9n8Ia/J03Bx9sZpmExwzH+9IFVg15XI1xXvaP9sPk/Vm3HPzNc4PzwWPw/x3LLCsmoKm2loUFhYqz874U9+K3iKew3rxxRfVT6rSHGRuqECb+tG3HF4NP+vPkA+cILd+seP6j2BMXA6zT9602/syn1z4Eha/9IZSFsRzaeL5NH/qxowGl0HSS8ql+KdfZiFvfjUeW/UXNDp3G+1l36Kh6jAMUydgbL/lrv3leBMxYaxzgHQUExOD8vLyQRmo7K6//nrlQEbRrwcxspa9+P2cjRia/zyeTRmHMJEWrMPEh5dhRZwZi9ftRYvyRS/ysMyVE/6C3xR+ioZjxxioSPMGSbCSBUdhdvYjiNv8Wzyxo8HlNQc0OPXnQUzfWr/D1SRv6csyr7jkEqW1zUBFWjZ4gpUsOCYFK3OisHlxDv7n8+/UVG/7AaLirkJ98QEc6lH5taC25E2U1Hr7+Nn+crxyHDjk2kIQPWWXwlxS20+nuvxMvx3E9K316119W6Y4XT6YW9vkHwZVsAJGIj79CeTEmvEvdz2JejVVvKrBWwMwDLFJM5FY9Db21jkHjs7Gd7FqzoNYtdeiVIrupj+fQbC9HG8/tu/9wrnC7TyMolVLkLpqLyw+bjn4q/45iCGiCzHIgpVMeRNuFhLVj4JkuyvSK4PI0rCfpGDJ/GosWPgUzGorqtO6D88v/y02x2Zh5d0xSsa7m/58BkXY9fjVkumoEm/4NR+0taI6rSh//gks3hyFnJUpiBl8v3Yf9cdBTN9bv+6mP5+BLW4KJIOw+rIHk/HqZx8IjkLKpiJUzOvA+tgRSsURok/HR3G/Q8UrixAf5otsH4rIlDWorJgDrJ+CcFFhhegx+6M45FVsQkb8SPV75JbPD2L63vp1N/35DAJb3BQw5EJNNMioDwUbcqQKx8epOr6QTPPFs0i+es7qlHTEtEjSuXlwW+fmAWXvGIhlEnmfX77Wnsh/nYa1cjt+n5mN1aVWJcX3r4YfiGUSeVdABivxgGNDQwNvxXWxcuVKDB8+vOtli0RE/iLgDqrsT+LX19svk5OdePPrgQMH8MADD/jt24DPlygXIljzDcI9ibcC823bpHUBFazsgSotLU0ZtMJ2Z9bAE8/TrFu3TvlfvNJ+sASsjz76SCkX4lkiPk/UU1RUlHIgw4BFWhYwpwEdA5XWTnOJYKWlbBZBSgQrQQSvrj4UA5DomeG5557TZFdCWioX9v2HXS6RVgVEsNJyoBK0FqyEQA9YYvtExSv6QszLy9Nki0pr5YIBi7TM708Daj1QaVUgnxIUZcIeiP/7v/+bp/76SOSTaInylCBpkV8HKwaqC9N7wBK3OpuRa4xTjv7FoDfmwlxpVR8sbYfVnC6np8NsbVdS7NorcxHtJr2/2K9P3X777Vi+fHlAn+L0BQYs0iq/DVYMVN7RM2A1d7//aEo+LB2iN4RmlM4Jwet3JOMBc3/2WH8YZmM0goxm2J4OsmtDZW5Sj3RRyT744IPKO6tE2aDzw4BFWqStYGU1wxgUDaP5sJqgaq9EbnR3OgOVdzkGrLWrluHlp3dirOlFPGucCJ1SQoYjZuoirMy7FbsW52CHT14SeP5Ei1Dclr5r1y6lkhXvrKIL4z5g+W+Lm/yf37WsGKh8wx6w7pt0GTaUJmDGTZEuhWMoIn+egrl4G6+XfaWmaYO4IUAQ68/rU97jHLDe01CLmwYjvwtWomcKEaQYqLzvkkuGYOjJo6g3RCMqIlRNdTD8WkyaCuw79JV8DC1sRKp+SNdRthiGJGR19VreX9LT03l9ykfsAav+kz1+1+KmwOJ3wUrcUitaVaQFC2GynFFuv7YPZypyYFDHek1hKvQOATEoKBwJWaXqSHS/pp58QgSse+PD/K7FTYFFg8GqXq6brnaomORhSAKy2HtSP7C//6gODUfdXFto+QxlxfIBw9gr5W/2ozQTLA4BUZJaUZHj+DIP8i37G4f9q8VNgUWDwcog101fOlRM8nCmAjleP1wnd2zvP3oXG3fVuVyDOI3Gd83YiumYNelKNY3InX5qcdOg4nenAcnHlJcQLsJp8cbhgnJYlYjVgtriF7B88Xu4PS8LsyOHKl+lwUKjLW4aVBisyEUwwuIfxs6aDESULIA+RJzGGYHEbR2YtbMIm1KiWGgGIba4aaCx3iE35IAVMw2ZBVVdp3EsBZlI6XpRXyh0KRvk9A1I0TkfS4fGZ6LOTTr5Oba4aYAxWHkdH4z0nquQUlAHqSAFOjXFJgzxmXvcpJPvsMVNA4uvtfc6EawWQ58KmCx5SgtD3A0lslkEq3EJdVitptMgI3po0S+VC8YeFKRc1VUulB5axt2DqtW2dCLqiQdD/YDHA0REF4bBimiA8CCGqO8YrHyGD0YSEXkLg5XP8MFIcoc9tBCdDwYron7FHlqIzgeDFRERaR6DFRERaR6DFRERaR6DldexK6K+EjcXEBH1BXuwoAEjghWLHxH1BVtWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWNGi1V+YiOigdZmu7mtKP2upRWdsiVgK50dEwmg+rI4jIHQYrov7WUoLsmGlY93EzEBqPzLo6FKRcpY4kIncYrIj623fH0WRV/yeiPmGwIu1qOwhz9jQEBQXJQxyMa/fB2imnd1pRWZCNJCU9CHrjWhSLU2poQ2VuEoKSsrEp1wi9GK83Ym25FWIytNWi2J4eNA3Zr/4NJ0S6cF7z7JRnaUZ2kl6Zxmkd0YLa4rUw6m3zCwrSIynbjNrj5cj9WSoKUY/C1CQYt293OA14GtbKrd3zk5eTW1wrr4H9lKW8zpueU+fpuCyiwMdgRRr1NUqenoPU8p9it+UkWivm48uMh/H70s9QueYBJCz7GnOrmyF1HMG2yLeRnLgc5sbTtklLP8LnN6zEEelbVGR8g4zZ61HacgyVGzKQ/NZYbLOcgtT6n/hR099ha+B8j9otD/ec58J8VLap0cDdPL89iFeXLMbWidvQLHU4rOM/0FaZj4XJuxG381tI0ilYdi8EVi/FMyU6ZL5vQhoMSDPtQUFqtG3+6JCneQH3JqxG09witIppto3FW8mpeNjcYAu2qEL55/F47ojjsr5WxhAFOgYr0qb2Buw3VcIw4xe4RXcxwuIfwR6pAqtuacGeDfuRvCIL88YNl0twJKb8JhtL8TZeL2uyTZt8D+YlRsqFeyQmJCXCYD2G460WHCg+iOS59yBRNxQI+yHuNN4Bnfh+5xfYu30vDBm/RprjPGtexqvl3yizdDvPExdh5JjLYC1/B6+9/je0/kRdxylXqOv7JjLjR8oTD4Uu4WeYqCysNydQs+cNlCY/gkfnjUeYmGbKIjy+9CJsfr0SXynfuRlz5/0MuuBghE24BTMMx9F0/KQyhijQMViRNh1tQFW9AZPHXoFQNUmhpA/D6JGXdhfeYSMQMawe+w414Yz4PHokwl1LdmcbjtWLUfbpguXJRmFY1zgr6rMSMEQ5ZScPI27DaqtDMHA3z+AozF6xBTvmAltnJ0Af4nj6UJzS+wvMZjPMm7ORpMzPNpl7X6Oh6rDLci7GiIhwyBuGRmXDRmFkuFNuEA0arrsfkTZERCHOIALQP+B0Y7mSfkIOIt+pp8ZkJ5px9IQIbKMxRE3qITgMowxwmK5TnuyY7ZqVMs6A5PxqdEgSpK5B3KV3tfLt3gTr4jFr/iq5FdWB1pq3kYHNSH7mTZSbMxB/x3YcEgu77G688u1uLPXYsrocUXFXiRVEa9eGfY/mo62QNwyRvW4Y0eDAYEXaFGpAUvoM1L/1Jv5qPY3ORjMW6PWYVngKt6TfgKLHcrDloNyC6WxEyXOrsBrTMWvSaHViN4Kvwc33yNNtLcQO0fJp+xSvFey0XbNyHSdaRSW/Q1LQ3dhc+734hnutZchNikbS8mJYO4MRpo+U2z6AbvQlaD70Cayx1yNp+myk3BaOj/9YgK1WNcheOhKjewSuYYhNmonEorV4ZsvHaFPW4QU8vfoU5s+Kx5Xqt4gGKwYr0qiRiE/PhWniB7hNfxFCxvwW7RkvYf3d/w8TMzahLKsdj103AkEhYzCncTqKSlciJXKoOq07FyNm3vMom9mIxbHydOH/gU9G/9h2zUodVzGvA+vFuKCLoJ9zCDPLnse8mIuVb7gVfiPSN67GxA+NyinAoPBkbB29FDv/fQZuu28F1ly9GQnhIXL6Erw76ibMTQSqaixoC4vFtHkGFKZOwrQ/7ldbjiEIi1+EV8rSgcfiEK6uw4wiE55PieKOSoNekCTOdxANAHFtiMWPiPqCB2xERKR5DFZERKR5DFZERKR5DFZERKR5DFZERKR5DFZERKR5DFZERKR5DFZERKR5DFZERKR5DFbUr7Zv346VK1fi2LFjagrw+uuvIy0tTf1ERNQTgxX1q6lTp+LRRx/FLbfconyeOXMmZs+ejZtuukn5TETkDoMV9atRo0bhl7/8JT755BPl886dO5W/CQkJyl8iIncYrKjf3XDDDep/Nj/60Y9w4403qp+IiHpisKJ+d+2116r/2SQlJan/ERG5x2BF/e6ee+5R/7P54Q9/qP5HROQegxUNCKPRqP7H61VEdHYMVjQg4uLilL+JiYm8XkVEZ8VgRQPCfuv6pEmTlL9ERJ4wWNGAEK0pcRfguHHj1BQiot4xWNGAmTBhAn72s5+pn4iIesdgRQNG9F5hMBjUT0REvQuSZOr/REREmsSWFXlRO6zmdAQFpcNsbVfTbNorcxHtJt3ZaVgrzcg1xsnzCFIGvTEX5korOtVvENHgxGBFGiEHqpJncW/CRhydkg9LhwRJakbpnBC8fkcyHjA3MGARDWIMVqQNbR/h5ad3YqzpRTxrnAidUjKHI2bqIqzMuxW7FudgR+Np5atENPgwWJEmtNf8FRtKEzDjpkiXQjkUkT9PwVy8jdfLvlLTiGiwYbAiH9iIVP2QrutOYhiSkIV6dWxP7TjaUId6QzSiIkLVNAfDr8WkqcC+Q/+Qv0lEgxGDFfnAQpgsZyBuNLUPZypywJvUieh8MVhRPxM3UvwOSUqLKw7Gtftg7QxFRFQ0DPV1aDjqpu3U8hnKioHJY6+Am3YXEQ0CDFbUv1r34fcPHsWSI6cgteYj7o0/YFfd9wiNvQXpie9i4646l7v+TqPxXTO2YjpmTbpSTSOiwYbBivpXeBJW1eUhJXIoMGw4Rsl/FGEJSM9dhNMLHsaygnK5tSUSW1Bb/AKWL34Pt+dlYbaYhogGJQYrGiCnYS014b34ebg9+mL5czDC4h/GzpoMRJQsgD5EnCYcgcRtHZi1swibUqJYWIkGMXa3RAOgE20Ht+LhHCDr+bkYF8YwRESesZagftaCg5sfwPXPMlARUd+xZUX9qrN2M26PXYAi9TOQiJyKnciMD1M/ExH1xGBFRESax3MwRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxWRESkeQxW1D86D2LzND302SVoUZOIiPqKwYqIiDSPwYqIiDQvSJKp/xN5V0sJssfdhtVW9bMr3TLsPrgCU4bzmImIPGOwov4hrlndPgWPXb8NB1dNwXA1mYioL3hIS0REmsdgRUREmsfTgEREpHlsWRERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWBERkeYxWHnFYZiN0QgKCnIZ4mDMfQe1bZ3q97ztNKyVZuQa47qWqTfmwlxpha+W2P/aYTWnO+Rp96A3rkVxbYv6PSIKZAxW3pRmgkWSIClDB1qrM4E1/4olr9b6IHjIgarkWdybsBFHp+TD0iGW2YzSOSF4/Y5kPGBuCKCAJSyEyXJGzVt5aK3CCmxG8pLXUBtYG0pEbjBY+Uwwwsal4qGMWBRt/wB13q5Q2z7Cy0/vxFjTi3jWOBE65Zccjpipi7Ay71bsWpyDHY2nla8GpLDxSHvICEPR29hb972aSESBisHKT7XX/BUbShMw46ZIlx9xKCJ/noK5eBuvl32lphER+TcGK5/pRNtBE9atqUHyPT9FtFdzuh1HG+pQb4hGVESomuZg+LWYNBXYd+gf8jcDVNvHKFxXgPrk6bg5+mI1kYgCFYOVNxWmQt91A0AIwq97BaOf3YEt88Yxoy/YRqTqh6h5Kw/hydg6eikqtsxBDDOXKOBxN/cm+w0WHUewe1kykBiPSTeNU68neVMoIqKiYaivQ8NRN22nls9QVgxMHnuF/M1AYb/B4hQsu59EIuIwcdKNiNUNVccTUSBjsPKF4EhMWfEiTGN3InVhPip9cOt6aOwtSE98Fxt31bnc9Xcaje+asRXTMWvSlWpaIBkK3ZRl2Ga6FltTM7Gh8riaTkSBbICDlf0ZmnSYrc4thPbKXES7SfcbwVGY/dTvML8mB5kbKtCmJntNWALScxfh9IKHsaygHFYlYrWgtvgFLF/8Hm7Py8LsyEBtdQxF5Ows5M1vQFbmSz45GPCNwfBcHJFvsGXlQ8GRv8BTeSmoyXocK0savVwhBSMs/mHsrMlARMkC6ENE5TcCids6MGtnETalRAX2j+t4MLBytxqstWywPRdH5F1BknjCcsCIltVi6FMBkyUPKbruKyyiZTUuoQ6rXdKJ/FJbOXLv+DWql5hcDiROo9GcgRsXA3n/twYpAdsaJrowbFkR9QM+F0d0YTQSrFxuS5aHIQlZqFfHEvk3PhdHdKE0Eqxc+n2ThzMVOTCoY/2NCLbkO8xfosGHpwEDgGPlzYpciwbjc3FE3sVgRdQPBu9zcUTewWBF1B8G9XNxRBeOwYqoXwzy5+KILtAAP2cVmMR1o/7MVsfl9feyB4I/bWNtbS1iYmLUT0R0vngwR+QjeXl5mDNnjvqJiC6EXwSrY8eOKQORvxCBqrCwEGazWU0hogvhF8Hqyy+/xPTp03HkyBE1hUi7HAPVmDFjlDTxmeWX6Pz5RbC6/vrrsXbtWqSkpHCHJ01zF6hE2vvvv4/LLrtM+UxE585vrllNnjyZAYs0rbdAdeDAAaxbtw6XXHKJkkZE586vbrBgwCKtYqAi8i2/ClYCAxZpDQMVke/5XbASGLBIKxioiPqHXwYrgQGLBhoDFVH/8dtgJTBg0UBhoCLqX34drISeAeswzMZoBCWtRWWbY//WbajMTUKQ0QyrmuJtndZKmHONyv+iS6AgvRG5xbXykn1HLFPQi+XJg+C7ZbbDak6Xl/ML5FYeV9Ns2itzER2UDrPVR68P7LSi0pwLo962jUFBcTDmvoNap9/YyxyWqfye6jJXv7iFgYqon/l9sBLsAUtUFF1Kc5C5ocKngcJRp7UYj917D9YfnYWa1g5I0ilYdkxElTEVD5sbXF4L4R32ZSYuNaHUvsyyPJ8u0+YtZGW+5HIw4EOdjSh5bB4S1h/DrNJmpV/ADssGXF+VicSHd6DRJ5nb+zJXv2HBH15joCLqV/JOGGC+lExpBtHLqTzMkHIqvlXTW6WKnEQJaSbJoqZ4z1Fp99J4Ccn5Uk2HmqQ4KdXk3yVBt0za3ew0wgsGYplnJItpoZq3Oikxp0zOVXVMRY5kwELJZDmjpnhLh9S8e5mkw11Sfs1JNc2moyZfSka8tHT3UTXFW/q+zPXr10v333+/dOLECeUzEflGQLSs3DE8+zL+NL8BWcvNqPV1A6C9AftNFiTf81NEO+XoxYiZ/yoky0pMGe7lrB6IZdoZnsSf/5SCmqxcvFr7vZroKyfw2f4PYU2ejpujL1bTbIJj5uMdqQKrplyupnhL35YpelRni4qofwRssEJoLH751O8wv2otVu3w5Skx2dEGVNXHYuqEMf2XoQOxzC6X4p9+mYW8+dV4bNVffHMarsu3aKg6DMPUCRjbbxvat2WKV39s2rSJgYqoHwRusJIFR/4zsldch82Lc7Cj8bSaSl4RHIXZ2Y8gbvNv8YSvDwaIaNAL6GClnBK7OxM5sWYsfmIHPne4Uc12d9eFD4qIKMQZalB84EjPSrutFiXm0q671tzN41wHRT8vUwyugmNSsDInSjkY+J/Pv1NTvbc8MQA/QFTcVagvPoBDPTa0BbUlb6KktkX55G768xnOZZlE1D8CPFjJwhKQnpuF2M0LcNeyUjVRubHEK4Mi1ICk9BtQtP0D1DlVbqfRWLQOc1L/gL0WW8vO3TzOdVD08zLF0NNIxKc/oRwM/MtdT6JeTXU37fkOwDDEJs1EYtHb2FvnfH2ss/FdrJrzIFbttSgB29305zOcyzKJqJ/IO2eAsd0NaMipkLrvS/tWqsiZIWohH90NKEkdR0zSfJ1OSlxqkmpaxV14pyRLWZ6UJtIc7przpv5fpno3oCFHqujK3A6ptWKNlCjy1id3A8o6vpBM88dLSFwmmWqabUmWvdKaNJG2RqpQtt3LBmKZRNSrwG9ZKUbiJ7+aj/k69aMPBEemYFPlDszDRsSGhyAo6CLoZ5cjLm8nXsmYiDD1e940EMvsKRhhP0nBkvnj1c8+EByFlE1FqJjXgfWxI5RTdSH6dHwU9ztUvLII8WE+KMYDsUwi6lWQiFjq/0RERJrEw0Oi8yS69zp58qT6iYh8KWCCleirjZ3ZUn8SZe6hhx5iwCLqBwERrETfbO+//z4uu+wyNYXI9x555BHlLwMWke/5fbDSYieitmd1BoeB2Fat5K8ob/bOkxmwiHzLr4MVe7umgcaARdQ//DZYMVCRVjBgEfmeXwYrBirSGgYsIt/yu2DFQEVa1WvAcvvGYTMqrfbOle1vYO75pmWfv4GZyE/4VbBioCKt6xGwvqtX3zh8FFN2WtAh+h9sNWEOXscd8Rkw820ARH0ywMGq70eUDFTkL7oDloT/+cMKPL3lWpi2PQ1jvM62w4XFYGrGU8i7/T0sfuJNH78PjCgw+EXLioGK/I0op5s2/R6xQV+gdOoU3BQ5VB2jCr4KP7/vDmBzEcq+4ik+orPxi2Cl1+sZqMgPqW8cjotChJrSLRjDr0vAVNTgkMX+GpKNSNUPUa9r2YYhCVldr14hGsz8IlilpKQwUNEgsBAmyxmnd2udqciBQR1LNJhpJFjxiJICkfrG4aoGHFVTunWipboCxYjFWP3FahoR9UYjwYpHlBSI1DcOF/4Ju2qd3ziMzsN49+WdwPxkTLoyVE0kot74xWlAIv8UjLD4f0VuzgksWPhbFFRaba/Cb6tF8ZonsHjXrch76heI5F5IdFbcTYh8aiTiM19BzfLRKLlDjxBxmjs8FdswCzsr1yDF9S5BInJrgN8ULJ6zWgx9KmCy5CFF1306RDxnNS6hDqtd0v2BuOY2oNnajwZiWwdT/hKRDVtWXnEYZmM0goxmWNUUmzZU5ia5SfdXA9EtELsiIqIBD1ah0KVskI+SN/RoPYXGZ6LOTbo/GExH/QOxrWxVEQ0+bFkREZHmMVgREZHmMVh5U2Eq9OJur64hHAlZperIQDIQD3HzwXGiwYzBypvSTLBI3Q82S1IrKnIS1ZGBZCAe4uaD40SDGYMVERFpHoMVERFpHoMVERFpHoMVERFp3gB3t0RERHR2bFkREZHmMVgREZHmMVgREZHmMVgREZHmMVgREZHmMVgFELPZjAceeAAnT55UU3wrLy8Ps2fPVj8REfkOb10PIMeOHcP06dOh1+sRExOjpp7drFmzEBERgddeew3Hjx9XUz379ttv8cc//hF79+7F5MmT1VQiIt9gsAowolV1+PBh9dPZFRUVYcmSJcr/999/P7KyspT/+2LYsGEYM2aM+omIyHcYrAiFhYU4cuQIHnnkEVxyySVqKhGRdjBYERGR5vEGCyIi0jwGKyIi0jwGK+qjNlTmJiHIaIZVTfGF9spcRAelw2xtV1OIiBisiIjIDzBYBZq2elTWtogmCnKjo2E0u7uNvX9aSURE3sJgFUhaSpAdMw3rPm4GQuORWVeHgpSr1JHe8j0s5S/AqA9CUFI2Ciqt6BTJnVZUFmQjKUhOlwe9cS2KRdC0B0b5u5tyjdCL8Xoj1par07XVotieHjQN2a/+DSdEOhGRAwarQPLdcTT5uqlUWABT22y8dMSCsplNWHbHepS2HEPlmgeQsOxrzK1uhtRxBNsi30Zy4nKYG0/bpiv9CJ/fsBJHpG9RkfENMmar023IQPJbY7HNcgpS63/iR01/Z2uPiHpgsBogyo0EcgvjueccWhXmg3I7RDgNa+VWZCfplVaKaInkFtcq43qdTpz2+1kqClGPwtQkGLdvdzgN2Ck3YN5BrjHONr+k3+DVqq+VJQmd1nIUZE+zjQuKgzH3HdS2Ke2entIWYsmUSAQH6zBxgRFzUYR3PvwAezbsR/KKLMwbN1wuVZGY8ptsLMXbeL2syTZd8j2YlyhPh5GYkJQIg/UYjrdacKD4IJLn3oNE3VAg7Ie403gHdLYpiIi6MFgNJGsh1lVPQUnrGbRW34umxXPwdMnX6KzdhnkJq9E0twit0ilYto3FW8kZ2FCp9tvnbrq/RiHzfRPSYECaaQ8KUqNt3xXaKrBh4SK8FbkGlo4OtP7XjWgq/tg2rvMgtsybjWVN96K6tQMdljWIfGsRFm6oUAOnM0NcFCLU/zFsBCKGya25v3+EqvphGD3y0u4CpYyrx75DTTgjPo8eiXDX0tbZhmP1YpR9umB5slEYpvxPRNSNwWpA3YUVj96DcWGhCBs3A8a5wNZ3/hcVe99GkcGIh9LGIwxDoZuyCI8vbcKaV/dDXAVyP93f1XE9dVo+RnHpDZg772fQBQer08TbxtV9gO1Fsch4KFWeXzCCdbfhN4/fjZo1O1De0rN1VV/VgKPq/zjRjKMnRmL0j69HnOEEmo5/Z7sOJSjjDJg8djSGqEk9BIdhlAEO03XKkx3jNSsi6oHBakCNwsjwUPX/izEiIhzWpn/gyDE5HNRnIWGIOC0nhgjctrpSHncc3ynfdTedfVxPna3HUO9mGsE2rhRZCeHqskIw4rZnYRWn6b5zcyqwcCPWlzSis7MRJc+twmokY9pNP0VS+g0oeiwHWw7KIbNr3HTMmjRandCN4Gtw8z3ydFsLsUPcjNH2KV4r2MlrVkTUA4PVgBLXbewPv36P5qOt0I2+AmNGRQDJ+ajpkCC6buwaClLU6znuphuJS9UUV8Hho2BwM41gG3cX8mtOOi9L2oAUnT24OUi8Fh0F0xESMga3fRgPU+lvMGX4KMRnbEJZVjseu24EguRxcxqno6h0JVIih6oTunMxYuY9j7KZjVgcK08X/h/4ZPSPec2KiHqSKyYaAGcqciQDdFLisiLJ0nFKsux+UkrEDCmn4lupoyZfSkaytNRULbXK3+2wFEnLEg1Scn61dMrDdFLzbmmpziClmb4UC5ByDOr/HdVSfrJBSlxqkmpaz0it1VukNB0kpJnkeTiO65C/e0TavSxZkoOlJAdLIiJNYMtqQMXi6saV0IdcBP2cQ5hRtAbp8SMRHDMHWyrmAOunIDwoCCH6DDTOLMCWeePUprD76RAWi2nzDChMnYRpf9yPrg6Lgsdh3pYCzGz6LWLDhyD83/4Po6eOdxj3CuZhozwuRG0VzUTZljmIYekgIo3gK0IGiLgFfVxCHVZb8tyfbuvF+U5HROTPeOxMRESax2BFPtMvPah77AORiAIFg9UACY3PRF1vd9x5cL7TERH5MwYrbzlLR676+4y4T3T+GnQ3Ntd+b5vGLYce0fuj1WDvpd1xubYxDthLOxENLAYrrzh+1o5cra98g5/s/BaS9Crmx1yspJ2Vz3pOVzn20o4wxGfucXiWy3s6LXuxVumXcBqyC8phVZ41Pkv/h+K7m56z9e4u+itcu0+drgW1xWvVdD2Ssl9BFbu8IAp4DFbe0F7fh45cUzDzJyNt/2tFf/TSjjfwgukM/uWlSljKZqJp2a/x+9J/oK3yBdzbo//DVDxsblC7XqpC+efxeO5IB1or5uPLjIfV6fKxMPltRG47gg7pIP7rR8dRzOYeUcBjsPKGow3n15GrwkOP6I6nAZX/5RbGc79zaFWYu3pH77Xn9N6mO17u3Eu7+VOHU31e7KUdM7FkSRJ0wUOhm3iP2o/hPny45w2UJj+CR+c59n94ETa/XomvlOlu7u7LcMItmGGQA+vx47Ac+FCezt6D+3CMu/M+zGWXF0QBj8HKGyKizq8jV8FTj+g9fIzCdV/i1pJmSK1FmNv0WyQ+XYqWs/ac7ma6Z9vwoGMv7SlXK99UeLGXdhiiERVhvxnE3o/hJ/ioSg7ATgFc7a9w3yE0KtHdsS9Du3a0in4THadTDgrU/4koYDFYeUOo4fw6cpV56hG9J133qUb13U/Y+i7KKv7qoef0jl6nq2gW43ryZi/tqK9Dw1HXfgx/hOvjrhLdraO1axK1v8LJYxHZa3QPRbjoN9FxOuWgQP2fiAIWg5VXjDzPjlzlyt9Dj+g9OZ5qVN/9ZD2GY0eOnqXndPfTHe/l1J1Xe2nHG1i/fg+snadhLXkBT68G5k6bjJuSZiKxaC2e2fKx3CKzjzuF+bPicaU6ZU+XIPrm6Ugu2o78HeJFlS04+NrL2MprVkQBj8HKW8Sbcx8pgEXttdxS8AimxsgtmbPcZeepR/SeHE81qu9+0o3CqDERHnpOF80U99ONlFtG7ni1l3bE4YaOLYgX/Rje9gEmmrbh8SlXICx+EV4pSwcei0N4kL2PQxOeT4nyWCiVfhPFjRqLr5OnG4d/+2QkpvKaFVHgkysaGkieekR37Dld+V9OT3xS2m051dUTe2JOmdTqqef0Ux6mc+ylXWqVKnIS3fTEzl7aiWjgsWU10Dz1iN6DDolX1+Jp/UW2nthnvICN6QkIO2vP6b1M59hL++ZqdF3BYi/tRKQx7HXdX4hb0Mfdg6rV4s69c3hI+HynIyLSEB4LExGR5jFYERGR5vE0IBERaR5bVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHkMVkREpHHA/weDYUMuzF4R6gAAAABJRU5ErkJggg==" alt></p>
<p> </p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Few managed to state that mitosis is the division of the nucleus/ genetic material and also lumped in cytokinesis as a part of mitosis.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Better candidates were able to explain the process of translation in very clear detail. It was good to see that very few candidates confused transcription and translation.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most gained the mark for stating that water is eliminated in a condensation reaction. Unfortunately they could not explain the process in sufficient detail to gain any more marks. Even although the stem was about dipeptides, weaker candidates wrote about carbohydrates. There were some G2 comments that asking SL candidates to draw a dipeptide was beyond expectations. It is indeed on the limit of what could be expected from 3.2.2 and 3.2.5. However the candidates did have a choice of Section B questions.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram of a section of DNA showing four nucleotides.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline a technique used for gene transfer.</p>
<div class="marks">[5]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how evolution may happen in response to an environmental change.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>Award [1] for each labelled item shown correctly connected.</p>
<p><img 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" alt></p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. plasmid used for gene transfer/removed from bacteria;</p>
<p>b. plasmid is a small/extra circle of DNA;</p>
<p>c. restriction enzymes/endonucleases cut/cleave DNA (of plasmid);</p>
<p>d. each restriction enzyme cuts at specific base sequence/creates sticky ends;</p>
<p>e. same (restriction) enzyme used to cut DNA with (desired) gene;</p>
<p>f. DNA/gene can be added to the open plasmid/sticky ends join gene and plasmid;</p>
<p>g. (DNA) ligase used to splice/join together/seal nicks;</p>
<p>h. recombinant DNA/plasmids inserted into host cell/bacterium/yeast;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. (genetic) variation in population;</p>
<p>b. (variation is) due to mutation / sexual reproduction;</p>
<p>c. valid example of variation in a specific population;</p>
<p>d. more offspring are produced than can survive / populations over-populate;</p>
<p>e. competition / struggle for resources/survival;</p>
<p>f. example of competition/struggle for resources;</p>
<p>g. survival of fittest/best adapted (to the changed environment)/those with beneficial adaptations / converse;</p>
<p>h. example of changed environment and adaptation to it;</p>
<p>i. favourable genes/alleles passed on / best adapted reproduce (more) / converse;</p>
<p>j. example of reproduction of individuals better adapted to changed environment;</p>
<p>k. alleles for adaptations to the changed environment increase in the population;</p>
<p>l. example of genes/alleles for adaptations increasing in a population;</p>
<p>m. evolution by natural selection;</p>
<p>n. evolution is (cumulative) change in population/species over time / change in allele frequency;</p>
<p><em>Suitable examples are antibiotic resistance and the peppered moth but any genuine evidence-based example of adaptation to environmental change can be credited.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most gained some marks for the diagram. As it was DNA the nucleotides should be in two strands joined by H bonds. Many drew only one strand.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Marks were lost through lack of precision. The names of the enzymes were expected. Few stated that the same restriction enzyme was required for the plasmid and gene.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was answered well by the better candidates. There were also disappointing numbers of Lamarkian answers from weaker candidates trying to explain the adaptation of individuals. Many answers were very general and would have benefitted from concrete examples.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The electron micrographs show mitosis in a cell at an early stage and an intermediate stage.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the name of each phase shown, recording whether each phase has taken place at an early or intermediate stage of mitosis.</p>
<p>Phase A: . . . . . . . . . . . . . . . . . . . . .occurs at an. . . . . . . . . . . . . . . . . . . . . stage<br>Phase B: . . . . . . . . . . . . . . . . . . . . .occurs at an. . . . . . . . . . . . . . . . . . . . . stage<br> </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>Outline the events occurring in phase A.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State what results when there is an uncontrolled division of cells in living organisms.</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>DNA in chromosomes undergoes replication before mitosis. Outline how complementary base pairing is important in this process.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>phase A</em>: <span style="text-decoration: underline;">anaphase</span> (<em>occurs at an</em>)<span style="text-decoration: underline;"> intermediate</span> (<em>stage</em>); (<em>both needed</em>)<br><em>phase B</em>: <span style="text-decoration: underline;">prophase</span> (<em>occurs at an</em>) <span style="text-decoration: underline;">early</span> (<em>stage</em>); (<em>both needed</em>)</p>
<div class="question_part_label">a (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>centromeres split/break;<br>(sister) chromatids/chromosomes separate;<br>dragged/pulled/movement to separate poles;<br>by shortening of spindle microtubules; <br><em>Do not allow events other than those in anaphase</em></p>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>tumours / cancer</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>conservation of the base sequence of DNA;<br>adenine pairs with thymine <span style="text-decoration: underline;">and</span> cytosine pairs with guanine; (<em>do not accept initials only</em>)<br>both (daughter) cells/DNA strands produced have identical genetic information;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Many correctly identified Phase A in 3(a)(i) but often missed Phase B.</p>
<div class="question_part_label">a (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part 3(a)(ii) was usually well answered. Unfortunately, some candidates referred to homologous chromosomes when they meant sister chromatids; homologous chromosomes separate in Anaphase I of meiosis. Few mentioned centromeres splitting.</p>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part 3(b) was very successfully answered. No credit was given for “mutation.”</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some candidates just wrote that “an exact copy of DNA is made” in 3(c) which is ambiguous and gained no credit; it was not clear that they knew that replication is a semi-conservative process where each of the new DNA molecules has a parent strand (conserved) and a new strand made by complementary base pairing. Also, full names, rather than just letters were required for the nitrogenous bases and both pairs were required.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Rice (<em>Oryza sativa</em>) is usually intolerant to sustained submergence under water, although it grows rapidly in height for a few days before dying. This is true for one variety, <em>Oryza sativa japonica</em>. The variety <em>Oryza sativa indica</em> is much more tolerant to submergence.</p>
<p>Three genetically modified forms of <em>O. sativa japonica</em>, GMFA, GMFB and GMFC, were made using different fragments of DNA taken from <em>O. sativa indica</em>.</p>
<p>The plants were then submerged for a period of 11 days. The heights of all the plants were measured at the beginning and at the end of the submergence period.</p>
<p><img 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" alt></p>
</div>
<div class="specification">
<p>In the same experiment, the researchers hypothesized that the capacity to survive when submerged is related to the presence of three genes very close to each other on rice chromosome number 9; these genes were named <em>Sub1A</em>, <em>Sub1B</em> and <em>Sub1C</em>. The photograph below of part of a gel shows relative amounts of messenger RNA produced from these three genes by the submergence-intolerant variety, <em>O. sativa japonica</em>, and by the submergence-tolerant variety, <em>O. sativa indica</em>, at different times of a submergence period, followed by a recovery period out of water.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State which group of rice plants were the shortest at the beginning of the experiment.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the percentage change in height for the <em>O. sativa japonica</em> unmodified variety during the submergence period. Show your working.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce the general relationship between the growth of all the<em> japonica</em> varieties and their stated tolerance level.</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>Outline the use of the binomial system of nomenclature in <em>Oryza sativa</em>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Determine which gene produced the most mRNA on the first day of the submergence period for variety <em>O. sativa japonica</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the difference in mRNA production for the three genes during the submergence period for variety <em>O. sativa indica</em>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Compare the mRNA production for the three genes during the submergence period between the two varieties.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce, using all the data, which gene was used to modify GMFC.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Evaluate, using all the data, how modified varieties of rice could be used to overcome food shortages in some countries.</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>(GMF) C</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAZwAAABACAYAAAAuysHZAAAAAXNSR0IArs4c6QAAAARnQU1BAACxjwv8YQUAAAAJcEhZcwAADsMAAA7DAcdvqGQAAB2FSURBVHhe7Z0LVFTXucf/Em+aJpBSq5FBEi0Q0FyoUbnmtnorEoF4talLE201gh1ui/eaxOjSIfhobWpiDBRrHo0mayhKY+NjuDHWViCgpiYWCiQEGhiCLAgwg8GrwOAbZ9+9z9lnmBlmeBiDj3y/tUaZc+acvc93vr2/x97n7CGMA4IgCIL4ivGR/xMEQRDEVwoZHIIgCGJQIINDEARBDApkcAiCIIhBgQwOQRAEMSiQwSEIgiAGBTI4BEEQxKBABocgCIIYFAZocC7BWvwaEpNyYFW+t6E0fTaGDBmifqZvQWmnnW+3o7MmBynTA/n2SCRmVqJT+f1VYLeieEsiApUy4pGSU+04l936AbYkRsqy1yCnpoNv7YI159dI2VEMq6gKQRAEcUMwAIPDjU3hJixMOYXEjbOhE5s6ymA6vRLtjEG8sIAdXoFJvj6wN7+D5dHbcdv6f+CKzYjI7CVYntPAzdBAuYCarHSYRqeihrWjyhiE7HmrsK20jVubamSty8XotR+A2SpgvO8A5iUbucHzgS5uAR769DksXJdPRocgCOIGod8Gx978Z6z7RSue+mMqYnS38y3cGOzLxbB5E3G3+hPJBdTmvo3MyAVYEj0KPr7fw6OLg5G5vQC1A+387fU43v4jrJ07Fr68lLFLVmNjXBm2HT6BS7XlaF/0NOaG8dJ9I7Bk7QrEHXkXh83n+PexmLv+RSxuTsfvjpySJyMIgiCuJ/00OKoR+eu8uZgxShgbTucneDc7G6ujHsD0lEwUKuksQSsqj5YhJHY8gpWz34Hg8ZMRkleMypNdyi/6jc9YJK6I7jZoPnfBP+BO9c+wBVgRM1z5W+Dj548A+beC7wN4LHESsje/ixqKcgiCIK47/TM4PNI4trsKsQ/d3935+07GqsNNsJn/iMXYjYfDFyJdpLq6vkDdB+cQMuwut5OfRpttgAbHHftZtLVEYun0EAyVmzTstja0RD+K6eGqQRKXdve4KMTmHcKx2gtyG0EQBHG96J/BOfkpjuYNR+Tob8sNGj7wDYuBfvNulKQBq9fkyGjiTgT4uxucL4sdHUd2YXdsKpZO8pfbNE7hiPEoYtN/powhORgxGpEhZTha2So3EARBENeLa2QT/DFpkR4JJ07D5nMPgqcAH9R9Add4Zhj8/dS4xF6TiXhtZpv7J3ANCjs85MA6S2DMvR9bl0bBV25SsaOzdB9yw1d7MEQEQRDEjcI1C0KUlFbIMPj5jEDEtIk4kV+OOsVuXEBdeTFOxE1GxEjV4PiE6ZGrzWxz/1heQMzdbtXqrETmb8rww/WLMNY5ghHGpvot/Ob9iVivj3AzRARBEMSNRP8MzsgHMC3uFCoazsgNbnCDkPV8AWJfmIswnzsQGv8T6Cty8O5HbbBb/4as7Drokx9G6NWYN8XYHMKYZ/QyXdaB6h3bsL/5gmpsdgXgmeWTVWPDf7tjy1/QrAVIrQ2oODER0yJGyA0EQRDEdYNHFf3gPDMbH2c6QwFrV75fYbaqLJagg1gtlCHawLJKLHyrxkVmKXpV7o9jBlMVs8k9A8JWwYwJEWoZTh+dIY81OZfv+ExihoJWefAV1l6QynRxRmburlg/4fUvOcCMhjgWklbCLsutKu3MbEpl0aI8nZ4Zq1SJKNiqmIkfo9QxIYtV2QZcMEEQxC1LPw0O776bTEwfsoyZmi7KLTc4V+qZSR/N9KZ6J0PYTywmliCNmKvBuciaTMuYLnoDK7CcZ7aSDBatkzJRypvEolPzmOXKGVaSNovp9CbWRDaHIAhCod9JLp9Rs7HxjRF45YkN8hUyNzCd1chJXYZXRq7BxjmjBz5QpZuLHexzmBJC5AaJvQ652w8hcvECROvugO+EmVgceQjbc+vQVVuA7ZnBWLzkP6Dz8ceER+ciMvNt5DpPye4qRXroEISml7pNqCAIgrj1GUBffDt0ManYlT4ORcbD8l1qNyJdsOa9if0BvK4bY3nnLzc7OIXC9C0otF6S3zn2ZhT+8mXPs+OcUaaH34vY8UGq4HyCMD72XuQdLcfHlcXIC5mM8cF3KD/1CR6PWPcp2UMnYVUtQ+2qST2eIyIIgrjVGaDzz43OpMXYvPnH6rvUbkiG8gDlt9ixYooHYyMYjpilM9H2VqZqdISx2bAd9QuX9Jwd50aXpQ4fYASGyendDloa8UmNGVBm6cltCufQ0nb2Kt4hRxAEcesxQINziyDetbbyR8DbaUj5eRo3NqugH+v6RjjvdD9P1IMAfzeDQxAEQWj02T16fDjzJv304EwHD3j6a2h47BQYjCkwo87i9qqcgHvxvbBw8bQrLC6DM1/FGxcIgiBuTvrsC5n7g5k38ceBmFSQYULbE2uxeVMyxuxKR2Z1PyZCKM8jNSK/vElNk9mbUJ7fiLhp4/FgxGTEnShGeZ1qjOx15cinZ4AIgiAcfA2d71Mo3PZX+C9aqi5t4DMKMRuE0clynTSgvCj0nPwi8QlGfPIjqMj+Kz7qvADrkd3IrngEyfHBGBr6MJL1dch+9xN02ptxJGs3KvQ/QXyoOolAwZqDRB5pBSbldD+cShAE8XWBe/6EO5dLWFqI0wOlCSZmkbvYFQsrykhgOrE9OpWZzN0Pfl6xHGMZyoOqOhZtMDGzxwc/W1lB6iZW0E4P6BAE8fViiPhHsTyDglii+k08O+dJ7LTqEG14FdvXz0GYeGWNWEp667OYs3InrIiDwbQV65WF124hOmtQuOcgysfMx/KYUTS2QxDE14pB7fPsNX/COpMOa2suw1a1CfdlP4nkbSXo7G0p6VsJ3zDE6FdgBRkbgiC+hgxiv3cBtccvYdFaEdEMhe/YBVi7cSqObHsf5kvel5KmJ/IJgiBuDQbR4NyBsMSfOz1cORR+/sPUP3tZSpogCIK4NbiOmZ0u2NpsiF76Q4S7P0fZy1LSBEEQxM3J9TM4HR/CuDsK6R5W8PS+lDRBEARxs3KdDE4bSo1/Q/jWJLmomhNel5ImCIIgbmaug8HpQHXmVrz/w+U931/mdSlpgiAI4mZnkHt1YWzSsWvMf2G5ki6zo7N6N7bsb4Dd61LSTssIEARBEDctg/jgpzA2KxCTlOm6lo4uFQX/WID6NU8gaWel3KiiMxSgenNM9+w1giAI4qZlkN80QBAEQXxdoYESgiAIYlAgg0MQBEEMCmRwCIIgiEGBDA5BEAQxKJDBIQiCIAaFa2pw7NZS7M9MwfTQdJQ6v+ZZrHWzJRGBQ4ZgyJB4pORUo1PZcQE1mfP5NrHd6ZOY0z11WjyfkxipbA9M3IHqTuelMttQmv4M0r+KZQzEMtTp21BopeeA+qaT34fp/B4FIj6zGnZ7A/a//Jf+rWrap5y1c89HZs0FoKsU6aFcR+IzUUOrpn51yNVpvz5y7kBN/hYkBvJrDnwSOS7P/zUiJzGU6yDvg1IK+S817OisyUHK9EBF96en5KDG0T+dQmFKlHJM92f2Ne6ruvhtWqqeO3CN64rFol2lxKv7pq9BTo1W64HUi8skZw2mK+dPclqG/xKa92de3TOSYlr0teFzZkoIUVfIDEljJZflZnaemY0rmcFUxWysnVUZ9UyHWSyt5Axj7YdZ2vo8ZnEsfil++zjTGQr4L7u/IzqDlTTlMYNuEjMUtCp7GLvCbCVbWUJaET/vtUVZudPwOivxuGJnf5CycFkptIplZRyW13WDYDGxBISwBNPncsOXQFkl9XFmNJ8XX/ip0+Tf3um3nNsLmCEkVa6SeoV/TWUhDh0hXPGge/2Gt7esN6Sc1bYXklbC7+atzkXWZFrGdDo9M/7zODPGLfSgu0Kuk1zbiq2EGTMKlP7riiWPpUaHsDhjFddQ/t38Fltvqlf+FlwxG9ksbzr7pfoG0daS3e73GVZi5PfRcpGfu4kVpMYxxBmZWdRzAPW6Yn6HZYh++0o9M+kjnPpljuUdliqvdSBc4yWm5cU7Gxx3YfLvxjidZ0VW9v3AyajYWElatBSm2pAcx9mKWFrC1i9hFLxgq2BGvYGZmvjNumYIQ5vMZl3FDbpZEIobJ5VacLkkjUX0ZhT6LWd3A9PKCgyznHSEuDZwB64qiyXMkvewR1u8dVGNxSyWWtDkvX0Kp0enOVSeUPsqzwZa6Gyyl2O/bN8gzv0Dh6HzhGiLIS5BgEZv9XKGG7C0Oa5lCAczQnMC+89XP4bT77VuxFuid2IdkpAUPVxuGwq/YSOAzxtgaa5GUT4wJfgevrUNpdt2AU8n9Hz5J6erNB2hQ6bzMFFN3PUbezMKX3gW2ePmIe5bHyNdCZW7w017TSbiAw3Yt8+gpgdFuqFDC11lysc9/O4s5ucZi3FJ23Ew6b+RUVyNwjUy1NV+o5xd0lGIFBHWK+mpv6NaCWmXIscqcpSXYC3NQbqWYkzKkWkrsXT3a2o6gIfP6SlTeN2eR+aLs5XzTE8vVlOY9mpkxk9BSuGp7pTJkCik7Pvj1ZVZmq2mEwIXIXX7blQ8OAYB8nYMDQzGxI/r0eIpHeMs51G3q5usH2CLUsZsPJ/+DEIdKYJz+KzsE0x56H5Vh7oaUGYKwkPjtDeJ87C/MNM1rdHGZS7Sbsr1VHPNEohUwnxVJ5Rr95JGcKR/+bmefxEpoc7yEff4C5lm6D633ZqPNUr5qjyfSVnK9U/7vdAJjrivkSLVLNMg07egVEm/uMt3Lz7NXyPTz/z40o9U/UrkcncrR7mPLjjrXj4aC+V5POqpMyI1/Sj8xi3BzoNJ+M+MUnSd/BRHK6YhPvwLD8d50wlJbzrsSb6Fn8o0j/j9p+jQ0lSOdJ5Tuku5dvmRqXuRys9Jlyn7HukwDQ960vmFUu5tgXHYdOQgNv3iT/jIeSjAAe+bSt5DduQjmBp6h9zmzgW0t96FeRNHuy2pYkdn6S7sGKHH/DC3Y937BqW/8lRPZ+G60fEJcrNHYcHUMV7GR+w4134avGK436VivdTLgUgZHsG+9HX4/W2rkLVkbHcZQ+9B8MRm1LcMMK0mDc81wkOE447iOc1RU2oueLHUwhNOiGCAjkUbTMxsu/wVpdJEii6DRUN4MWe5Q/Mqyyg6xusaIcNo53Sfep0hm95ibycvZ8aqCtdwW/GGutN/ioehk96AksbqzVPiKDLi5zNsYm8YN7I4kVJUrpvXT5fA62XhXpk4TzIzWc4yS8EGvl3P69HOI2gT0+t0LG5TGtvEI8sSkZKU4bYShWj14NcrIged9v1qyoxOZSYzL1OcF87pzt68Kmc5qzJQPUxetrGCh++iHrruFIHyvTvF4RpJyRStrIcS9UZrXrnQp0nyfmllRnO9E1oj7uVy+bcTMv2gS8hiVbazajpXuV5+EeLaQzawvW8bmN5YxsyONIbUeafoTsFFB4SHOKu7XYhrmsPle1nWq4d8L8t7tZAZNr3OjGmPs+i0Y2qZ7uW441JuH3rqjJIS1Y7Tosq3WV7GBrfjvNfZBU/61P65d/kqGYxZbNNeI0vW8/3mvfK8F1U91e6xlmbX9EO557ycjGPMcsVD2kuhNz1RZeSSLupB3+lF0e6Sk02syf3eiHRUsvdI3qVv6LWenlH0pNf+1kv5fdSLF65ml8QQCeJ6Rn+Kvmjtqf/0EeF4GdSXnx7eeZ/0staNN0vtGwH9jgpuGC04vHkuwlCGbS/z4GbpRHBXU3oCzhMRrpbTKN7zFsyGpXgs7E7cHbMMy/3N2J03DtMieJTFz95kbkWs4mm3oaqoAiNzC2D5+QboA79Qoq8A/2/y30lvCHGIjxIrml5AXXkxzi2egSix2qlfECKjz6G26f/4Lz1jr/2Ql2vB5yNi8FP9WuQeXoFJ4rpX7cPkP/4WKyZ/B9bjhciPm4yIO/6O3z3xD8w68Fvl7ds+vIguayAenLwEzy4PQPnuMsRNewAjhbfSVIuK2CiMU1ZdPY2S3DxA1uuqykw3YG6YjF112vUKutDaUIsT8psrznIWntUpHPndBhyf9Xu8po+ArxIBf0fWWcoCD0vP8gJqjxUAC36AUH4J9ub3kLbuJFZq9fDlUdVk4OP6U/xqfREUHgxrSxvO2huRt+d9XkcbWtu5l24/icr6yXh0gvMCGEI3X8MTxx/BgdcWY6zv7eqKtOJ6R/qgo6oE+SM/xAHLPGzV34umohLoAvxxF9dWv9HhiL7UiKaTTt6ebyDCIy+ipe08r+dR7Mk/A92502g/Z+ceuRn1c2ZiwoUSz/Id2cWv8xDyrO0YEfsT6FftweFV30egp3JccNe93vTUFXtdOfLPacepunHipWyUi7e6Ox/X6a3Obn59D31ajvtLXvciX35sx2e8jBbkHjiPn29dhMCmMuTrhsH/rgs8wj0OTJ6BGfwei2jm4NE6REcGwU/JdDyHjMkv4ZUVUzDS+g8czA+W7bWb3vVEyMgs27UX7PU4trvZQ/QisTfgnd8UIW79bIxy6bx4m/toP/aHdkfyrrj2Db3X0xOiPRxCRY/oReMSmt/5PfLi/gdzXMrvq14CX0xaVQCb+RDSEizY9MRrOOI8KaG1ARWeG3jvSMNzjegjwuEWO8Owk3s3PdwA1Yvpy3tTPEXhmYroSPNg81iTm8d8VSieIY8MHBGW9KRkndTIQZYhfxutRFmeIgVdt8ekfNeiJBXlXCFqRNITWa4SYWjC6JZPVVMJe8dokBHNSeW3Or3mWcljZV3UyEPWWRn4m+Q0qCn2aR7tVZTp8AjlsZrHqaDeG4/euJucVU9e8/C0/dq9VM/tKkvN45PlOpfhsl/TRRGVbGIZxw9xj0xMkKjnRfDo1T3CdjlW4Bxxy+vR5OMSRQjUQecQxXPXKiPHHEV0kfo6O16wiYUoHruFFaS9oUSPnuXLr1SpS4jUL2c8leOEcpyT7vWmpy643UOvx/VSZxc86FOv8pVlaJOJHG1bvQ41AuZRr/S2DcYCZnbcB64rVXWs5J03mEGLkpXza/ShJy765gURxXmUG0dExevXe5ABR5Qza73n4wRKPVwzKN712RNCx6K97L/ILAVpXFbu8uD0VS831L7COYrV7lcfcvOAiz3uyTWMcHpd60Z4VEcRKT1Xz4ic4068jIVqdKTk8tu4ZzIWowJH4z604rTNYwK2f5xtQ4t1aneEpXg1PDoQdQL3YH75K2QqOdzbpRe5BOt/IRaJ8xQpTMXGpB+oHlOnBeYKLUpS8Rk1G8+99E2sW76v55RT6U0Z1i92Gp8S4xjHYc1Lwrh/exmf3T0T26ufw4TzVjSYmxE55QHoxE87P8G72cegU+pySfWS40Sdfbink4YnM4Pl9amekfB8lPGyAZV5AuVHW7E4/nvK9dmb/4LN6445IhIFJVq1qLJzv58ucu7Cycpi5Dmirg5U73uLyzYUYwKE5yWiynOOshRZnpgmvfAu2E63IiR2PIKVMoQ39yrWiXEHZf9QjBgdipBzeXizbBzmR43GsBDuobd9AON7QZg/wS3CFmMWeZFybIjrWvVB7Mi+iAfHDIePcj2Q8uG1dIkiBLdj1JzVeGnoK1i+p0Z6o9/G6Mh7cS53L8qiZiIq6B6E4DLaju/Fe8FxmOCreu495XsWXUKHKuZL/XLGUznduOqeFu141lNXhJybHZGw9+O819mlLp70qTf5amUYVuIXom1LeWv33cfvXkR9/7/AO3XuIOdisz4GYfy8XZ+VwWTdi6Rxj+Llz+5G/PZDeHECYHOpTO96Ym+px8cOffMEl4eIbh066gzX12wTGheu6rm2lzjuyC7kzF2I6B7HSVz6hr702QNKVBjuNJ6pIeT7v3ir8RGsF1kDuVWlH/XyhEsUq94vq9K3eBv/8UwfJd6BMP0eEQV5/Fh6LB3AhdZ2Wv7tRF9r3fQ58MXhofybptF4YeVkVYBDR2PiPH/kF1Wj2dKAzzECw/w8xpUDgIfw2jmUBjKR12kYarL3osQ/ELoH70bbR39HgTCOGxPUG6YYPuCn4VdwwtohO/JpGGOrhdUuG29kLMbbzfi0MB2ztQF8wYnTbo2Dq4PS2bgrmTp5gkcyaGragVWPBKDy+WQ8+5E66H3pdAfOCRn/ahMOmgNlQ21F5dEq3un/OwJq/hd/KgHCdd+Ff1sVajrqVGP62L2wlVtlB9ffMs/wfZdwqo13jNZ8bHi5CP7hUxHr34ZaZXBT67DmIjk+2Mv9dJKzoKWNy0HM+TfiD0fruDBDuWxOwq7oxZ28O2jBic4u9bwhowBLI5ehWr9zVQ04aReTJt7EmiePYuaryW4NaQKSn56JUUNFqu48dq77EKOX8e8eK3YabbZL6Kw5gG1/KOQ6NRXhaER1kbiH0jhLQ6zWsRbF6UudJh9c5LfUrfMNXoyn54zGUD9/BCAT6w4GYRn/7uNVvi1qmsTFMIhnkfoox+FEaLonOgVveuqWktPa3/gufFRzCi31DV6Os3upc7s8kYpnHRZ4km8zrGdE+cEOJ00xJNo+fpFd5j/DkNWA040t3W2H4+M3DCG6ZTA1lWLHqpkIqszAwmeLYZP7VXrTE9Upc5W1G/ZGvPdWHiKdHSoF0YdloeihJUgc68s7+Gys2aFNUOHw/uqNHcPx6/lhXtqAa99Q0+nTT33W4AbpvRx+vHs6UxibvdhW9K9YmsiNjegX1uzqdmz7rJcb9mYcySpD7AtzEaYdoOjLReiTH+4lQPDMAH/eG6JRzER40l7eEFcj6l/krBRxwct+iqSXVuPhwG9AjY6+hZhPwzBdyR9qgu/NWrah9M1Ct45iGCYnrcHi4kQERWXiPuMv5WwL7WGoSCTlNLg1yl64i3cIEaEYPUK9eXYb98TRjn9m7eRK9QiiTlkQ3lKGyivAmY99ETs+SBWezGVW1l7EPSPbeSdfBt3wKpQ1+WGkj5079KdhvXQMez7swPn6Yhxc/RD8hnwDQU/asHrXIkxwsZEyJ9ujAXDDP/+X2Nj1KwTdxuX3oz+gLT4DJv1/4PvzHwP4OcOWHcUDs2ZwH1h63vazaGs5j0v/fBtvFIXh0aguHAlvQVGlHYFnq7kx/SaG/70cTffchboBlTkDUxPjUDdvDO571oKFT8/AUPMxHKzzQaBwJpQGepw3lNVueWOJi5yHYuRDcdBXJCE86CkcDJqFeZG347uV9bDd8x34iGiIRwXHdmSjvP2SIksML8aO35Wi3e5cv2/waPtzxBzg0cxc0Zlr3IaxKxOc8tQTkXZgI+Z6qtfISfixvgpJ4Q9h2cHhWDAvEo3fbUCtjUdFjbW40+F5nkFDxSm1jsPPozL/XayO+jaG3DYGT3Ytxa5FkfyqNMKx8n9iunU2OgMHts6R373Id8k38SGPDhxRncDehPJeyxEIB8NJ93AK9V711O36laizFUf3lAIBp7gzUi8jD47LcXd70Qmn2UvedNirfP0xopVHGXdOxvhgtf0q439y30hYUV55G5Zu/E8Me+8p3nYikZieg1JuNH3CHsPWjefxZJDoVx6HsW0GtpuWdHeMCr3oiYzEXGTthDIrlct7XmYp8pJm42c5jXKHmGn3FGKWLMeScd/iZd8Gv5giRM3QHCzepxXno/bHP+aRrEtlnHDuG7p427mzH/osUWabjkHQvNeUaDP8Z9qD8sJQvY5lMT/B6iWRXFb8Hvn9FB9ETZGGwVu95MPV2qw/cd1aJuvhl9E4by1WOsbcVUNnmvlrPKc4TgOERyq3Ju0FLDVVG2foBwPMa954dI+59Bg3GTTEDKatLCHV+WFeN256ORODhxizTXAdo1BmEs5yGmv9EoixmevaXm5CxMy5hI3qQ6VXwYAN1I0PDylrCpH5Rg1mPDXVo+fiEZ9gxOu/jcaBziu/UdAii6sIc68V9uYDeGH/OLy4MVYdU/LEzS5nYhCx8WiyDMW57zueRbGfrEd58+XuCGzAiGeVZiNdPA/3igkBKY+6RUSEV+wNyHnhfUx8cTVidB6yBP1BGh5CYCthWSbzl/ecBhllLr8yg0d8nGeTDBY8sjG/w9Lkaz765CaVMzHYCL06xD1q8Rye1O9oAzMWmHvOvOo3csahmO2mvG6L6Be2KmZKe/2qIxsNWmKaIAiCGBQomCQIgiAGBTI4BEEQxKBABocgCIIYFMjgEARBEIMCGRyCIAhiUCCDQxAEQQwCwP8DtAUM9NJYkLAAAAAASUVORK5CYII=" alt></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>inversely proportional / the higher the tolerance, the less the growth / <em>vice-versa</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. first name/<em>Oryza</em> for genus / second name/<em>sativa</em> for species;</p>
<p>b. (all) members of <em>Oryza satica</em> share special/unique features;</p>
<p>c. two names make a unique combination to designate species / worldwide recognizable nomenclature;</p>
<p>d. varieties (<em>japonica</em> and <em>indica</em>) have some (consistent) differences (in tolerance);</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Sub1C</em></p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <em>Sub1A</em> is expressed strongly/the most / <em>Sub1A</em> produces the most RNA;</p>
<p>b. <em>Sub1B</em> (always) has the lowest expression/produces least mRNA;</p>
<p>c. <em>Sub1A</em> expressed/produces mRNA for the longest time/days 1 to 10;</p>
<p>d. <em>Sub1C</em> expressed/produces mRNA for the shortest time/days 3 to 7;</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <em>Sub1A</em> only expressed/produces mRNA in <em>indica</em> / not/never expressed/ never produces mRNA in <em>japonica</em>;</p>
<p>b. <em>Sub1C</em> expressed/produces mRNA from day 1 in <em>japonica</em>, but not <em>indica</em>;</p>
<p>c. <em>Sub1B</em> has lower expression/production of mRNA than <em>Sub1C</em> in both varieties;</p>
<p><em>Award <strong>[1 max]</strong> for other accurate comparisons between japonica and indica</em>.</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <em>Sub1A</em>;</p>
<p>b. is only expressed in <em>indica</em>;</p>
<p>c. <em>indica</em> is the variety showing submersion tolerance;</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. genetically modified rice/rice with <em>Sub1A</em> is more tolerant to submersion;</p>
<p>b. can withstand seasonal flooding/torrential rain;</p>
<p>c. GMF/tolerant rice ensures greater harvest/provides more food during flooding;</p>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Generally well done. A few wrote only GMF.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Little understanding shown. Many divided the difference in height by 50 instead of 22.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates worded generalized relationships such as the higher the tolerance, the less the growth or growth and tolerance were inversely proportional. Sometimes “height” was given rather than “growth”.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The designation of <em>Oryza</em> as genus and <em>sativa</em> as species was the only marking point that many candidate got correct in this question, although some candidates mixed up the terms calling <em>Oryza</em> the species and <em>sativa</em> the genus. Very few candidates went beyond to mention that <em>O. sativa</em> shared special features. Even fewer candidates mentioned that the varieties <em>japonica</em> and <em>indica</em> had differences in tolerance. Occasionally, a candidate mentioned that binomial nomenclature helps scientists communicate about the same plant or the worldwide acceptance for the terminology.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some candidates did not appreciate that the actual production of each gene was indicated by the intensity of the bands shown on the photograph of electrophoresis.</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Since the question asked for differences in mRNA production for the three genes, it was important that candidates used quantitative wording such as <em>Sub1A</em> produces the “most” mRNA or that <em>Sub1B</em> produces the “lowest” or “least” mRNA to convey a sense of comparison. A few candidates noted that <em>Sub1A</em> produced mRNA for the “longest” time/days 1 to 0 and/or that <em>Sub1C</em> produced mRNA for the “shortest” time/days 3 to 7.</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many valid comparisons could be made comparing the mRNA production for the three genes. Most often given was that <em>Sub1A</em> only produced mRNA in<em> japonica</em> and/or never in<em> indica</em>. The two mark maximum was achieved frequently.</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The question was poorly answered. Though <em>Sub1A</em> was sometimes correctly identified as the gene to modify GMFC, reasoning to support that answer was usually incorrect or missing.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates missed the question by trying to relate GMFs to drought conditions rather than flooding. GMFs offered tolerance to submersion enabling them to withstand flooding so that greater harvests/food production were ensured during flooding.</p>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p align="LEFT">Sockeye salmon (<em>Oncorhynchus nerka</em>) spend the first years of their lives in the freshwater lakes of Alaska before migrating to marine waters. Their first months in marine waters are spent foraging and growing near the shore line. They then move to offshore regions of the North Pacific Ocean for 2 to 3 years.</p>
<p> </p>
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" alt></p>
<p align="LEFT">The graph shows fork length frequency of juvenile <em>O. nerka </em>caught during their first months in marine waters in autumn 2008 and ocean age one <em>O. nerka </em>caught 15 months later during winter 2009 in the North Pacific Ocean.</p>
<p> </p>
<p><span style="font-family: ArialMT; font-size: medium;"><span style="font-family: ArialMT; font-size: medium;"><img 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eFEZN8B6tPUCCEiLlNs4/KhhPS9tix4VR93HqOJD7dXtHlmjG1tM+yvmmV85/OTljPQGgAAAGElPIMJQ0S9mzXuLyF0dzqTYlupuRUkeNVU/SZXqGjpWmUVHFXW6kwVRcaoQV3fZYyAon4jIzDJ1Jqs7+15ISjYqTVLjyrmumaeQKKY5zuVs1cHGZQOAKhGPF1+A08Azr2wDSakGqp3uro7xTZS/TM1WrlovlJaxpTK3K7qNkk77LdD5TqyTzuL7D/8KcrT/iM+XbAAAKgG/A0uNicA4SGMgwlDqe5On+hHe3ZYaTVBK8zxDfvKTpUbzxBRt6GujrT/8KdcCwgAAABwboV3MGEo6e70jGZvPW7PNdS8XE1ig5W+T4NyXYsKdTD3gCL73qD4qDqK75qgyJxt+iLft8XApcKs59SzYZLm5Zyw54Ug6mrd2LeO8j75UvmlGmE833lGW1cAAAAAB6pA6dTb3emksr/8wZ5niGig6/tco6Kli7Us2xw0bT5W9R1NnfKWgvUWqpSitzT16XeUYwUUBcpOT9WwpfFKe/B6RRmHLqrTvUrr/LFSx7+uLVZA4dmGKWPnSsOHq1/sRdbHhOYStblriNqtm6KJz39kBxT2dy6so4cn9D6DP05XoByfR+Caj8mducbn8baWk8rPWlTyy9vWY2tf13tZZR+nCwAAgOqialR1e7s7lWqIuEixt03Q7CE/a9ofWhmF2zgNmFekxDGPKM5e4pS1GqyhnQ9o6u/NMRGtdPuG5pqZMUmJ9ezuRsZ2JU6dr1kd/6kJ7Zoay8SodeL7uvS+OXpteFvV9CwVIs+ToKZn/FUdvnlKHRubBfb2+lPudZq1aq5GxNeylzvdTurQ8gnq98xR9czYJuvxthk99d0zAzRgxubigMJ16O96ImmxNDDd57G1H+nxpJdKPbUKAAAA1ccFboP9GtWR+aN67SZIL77tM8bjhHLSU9Tj6RjN+XiCEqJOev5e1lUrliWXtJC4sjWvz8PKHflGSONDzBYNczwJAAChMO8bgQZbDx08KOA9xel6prP9ncHWM52p/QROFzrhV3dRCUr7oqLB4vZYkbiGquubYiIuVYO4k8pYvTPAL3oDAADgfEYwgTJOKn9zuqY+nafuf7lXnaKMJOL6Tvt3HLXfL69oxz4doacTAABAtUMwgWKunHT1adhUHW+foo+vH6R72kV7EkjhYeXmnLZh7QAAADhPXMCYCZTjOqTMSQ8o5c3GmrZ6ihJrblJqu8HK6DtXGyYnKMpeTDqqzHH9lLJjcKmxFGYfzkCC9QsFAMCX2e8/2JiA0/2e6Wx/57nYHqCyutzQyX5VHsEE/LMGZj+knY8t1dt3Swv69NW0uBdCCiYCMYMMBoMBAEJ1JgY1B1vPdLa/M9h6pjO1n8DpQjcnBFGkvNzDKrQGWgceoF1uYDYAAACqBYqA1ZxnnERnpWb6G2B9pRK7Xq0o1VT9JleUH2htDcw+rpgml1fyNzUAAABwPqiawYQrX1nvvu7za8yN1DJlhpZllv3V5jBidhtq3kJ90rPD6hejI2J7K3V4HWUs/EDZ1i99G8wxE9NmKOP6IUpqc4kx4yLFdL9N3XNe0dT5uzzH2DgHW55/RtNybtXwvrFEpQAAANVQlSsDuvLXaGLPG5Wc8b+6YdZHVn/A3H3ZWvlgXWVNGaABE9YoPwwfU+o6sk87i65R7w4Nwuyg11L88BeUfsu3mmb90rcRnDV+QGsajdTbMweqaU3P1kbU66KRL96nuov7q7W1THvds7250hY+4Hl8LAAAAKqdqlUKLNysWYNHa/PvZ2nl7EfUJdY7FLiGouMHatJr49XgzXF64p2vw6r23/xF6byNq7UjMkYN6taw54WRiGjF9x6p2V+YgZk5ZSgtOUGxdiDhEaXYhGSlrdhlL7NX2+eMVGK8/fhYAAAAVDtVqBx4TFmvPqXnNVhpo29QtJ8tj6h3k0Y+FqOVcz9UXiWiCc+4gSTNy9quzPRx6ml1nUpU6vLs0t2mCnN83je7Vj2nD3N8f/vZfLpRN/VJ/0TZa57T0ObGMg8s1yGX/QvSfW9QvFWLf1L5mU8an2N8x4LNdktKgXLsdTxdt4z30jOV4+16BAAAAISZqhNMFHyuZa8eUvf7EtW6VI25Hzl7dTDkQrhLhQf3Ki/yF32y5hO5Ojym9/fl6fOlXZU1Ik1v55zwLFa4WTNvH6CpuW00c2eecvdt05sdv9CIxAnKOHTSs4w1IPk7FS2eozeOd9f0L/Zq+0u9Va9wp9YsPWoPVC5QdvpwdU/+VG3TX9Kku9oagZERKM0YrB7PFGjgh9lWrf/uj/+syzb8l/o9td5YAwAAAAg/VSSYcKkga60yimJ0XYvLTvNGf6+s1Zkq0lXqf9+9dtepCEVefLFq6IByD5ptE0eV+dSjnlaRP/eyu/9EqendIzQqdp3SV+71dKuyfin6J13Yfage7d20+AlHJeMlaisnfYxuf1oa9Y8FmphQz9oXV85ypT37G6XOGqWEaE83qIjoWMUZr8s9QQkAAAAIE1UkmDiD7Mebxj020Gcgsbe1IkE3xl8iFXhaFuIGdPfTKvKT57cYigOea9T/ljifR6V6x0v8Rt8uH6vbJ36hxBfTNKhpyU+/RcQma9m+hRoUe5Hxl/HdOeuVsXyNPs+3WzwAAACAMHR+BROu/dq07DOfsQkVc+V9pOXbmpd5ypLdWhHbSPWNqMATJBRpx8SbdJU9XsLz1KOblLatyF7npI7sy1NRq666PsYMCrw84yVUtFrzsy9Vz2bHlfXZXp+xGGbwsNx+zG17DZ3xptbs+t6YfUhfbCpQXJ/2ijm/zhIAAADOE1WkmBqhmvUbKcb+yz+jUP75Si3Zdo1GDWqnknr/YLwtEGWesuRtrbAK8naQEHm35mw3x0p4n3hUMm2fnGB8nz3IuuyvQdutGk2TZujtmeN1z4Dmyn71PW0psPsuFazXlMQpOjJgiT7f95FmjxygxN69dWtcbX1bVEdXN7yU5iMAAACEpSpTTo2IvUXDkw5o2vQPdMjPGAJX/lo9M3auNHy4+lndhULh2wJRcihKt1ZcpJgOXRVXlKf9R3y7HZ3UoeUj1TIxXTnm9gT4NWhrvIRu0+jHzLEWkYrtm6I7ZAQ9H/7TCGW8XaNqqG7DuuW7RukKNTGbRgAAAIAwVIUqveuo08Pj1XffExoyPl2ZxY9k9TxS9f4u43Soxwt6bXjbUoX5oEq1QNjz/LRWRMR0UXKPA1qycGPJY1yXP6khj5/QqKf7KtZc1xp8Xba7lB0U+AYrUVfrxr417MfXRigq/gYlRh716fpkfvZfNWLiRilcf5cCAAAAMFShYMLY2OgbNfHNxRod/4MWJbayxy6014i1/65eC5fp5WHtS35/wvW1Mh5orybelgM/PC0QF5fpSuRprZDvuIuIK5U4dY5G1fqbuje2v3NLI43OmGIPpLZbGFS2u5Q9hqNU16dLFN81QZHbVmtT3gkjuOikMRlPKn5lsueXpRvepfnHOmnSzDsVWa41BAAAAAgfF7gN9mvgjDKDP3OMCQAAoTDvG7PnzrP/Km3o4EEB7ylO1zOd7e8Mtp7pTO0ncLpUqZYJAAAAAOGDYAIAAACAIwQTAAAAABwhmAAAAADgCMEEAAAAAEcu4GlOOFPMp0yUFeyJFQAA+DKfSBTsaUWn+z3T2f7Oc7E9QGV1uaGT/ao8ggmcNWZwwWPqAAChOhOPWw22nulsf2ew9Uxnaj+B04VuTgAAAAAcIZgAAAAA4AjBBAAAAABHCCYAAAAAOEIwAQAAAMARggkAAAAAjhBMAAAAoELmo2grmlD9EEwAAAAgJObvWgSaUD0RTAAAAABwhGACAAAAgCMEEwAAAAAcIZgAAAAA4AjBBAAAAABHCCYAAAAAOEIwAQAAAMARgglIhTnKTB+nnsU/OtNeQ2esUk6hy17AdFL5WYuU2qOFvUwL9Rz3ut7LypfvUgAAAKg+CCaqO9fXyhh9t4Zt+K0mfZyt3H17tfvj6YrbNV79Rr+jQ3ak4Dr0dz2RtFgamK4Ne/Yqd88aTbrsIz2e9JLWFxBOAAAAVEcEE9WcK+9Dpa+oocSk29QmuoY1LyK6vR4ac59iVszQS+uPGnNOKG/lW1oZ20d339lW0WaqiYhWm4cf1ajYTVqT9b21HgAAAKoXgolqLiI2Wcv2rVNaQh17jq+j2rnvO7lUqIO5BxQZ11B1fVNMxKVqEHdSGat3qsCeBQAAgOqDYAJBXKPeHRoowvWd9u8wWyj8K9qxT0fo6QQAAFDtXOA22K8BD3McxUMDlKox+uCF3qpXmKnUdoOV0XeuNkxOUJS9mNlykTmun1J2DNaKZcmKtUNTc4B2ILPnzrNfAQAQ3NDBgwLeN87Ee6az/Z3nYnucOpVtRdXW5YZO9qvyCCZQRoGy08fo9sW/1ay5o5VgjqMoqFwwEYgZZJgDvAEACIV53whWWA50T3G6nulsf2ew9Uxnaj+dOJVtxfmLbk7wYQcST0ujZj7iCSRMNS9Xk9hIz2sAAADARjABD1e+tswa5Qkklk3RoKYl7Q+egdb+Bmh7lBuYDQAAgGqBIiCMOGKNJva8UX9cUU9pGWUCCUtN1W9yRfmB1tbA7OOKaXK5sQQAAACqG4KJ6q5ws2YNHqaF+7tr2mtjlRhbNpAwXaSY7repe84rmjp/lwrNWWZLxvPPaFrOrRreN5aEBAAAUA1RBqzWTijnrWf1/JdFUtFyjbq+qTW4yndqOS7T+g2JiHpdNPLF+1R3cX+1Nt9r3F73bG+utIUPqFMUyQgAAKA6ohRYrV2k2OSF1pMXAk3bi5/eFKXYhGSlrdhV8t6ckUqMjyYRAQAAVFOUAwEAAAA4QjABAADOmLLdZ8tOAKo2ggkAAHBGmT905m8CUPURTAAAAABwhGACAAAAgCMEEwAAAAAcIZgAAAAA4AjBBAAAAABHCCYAAAAAOEIwAQAAAMARggkAqOb8/ZCY7wQAQCAEEwAA/Uet2n4nAACCIZgAAAAA4AjBBAAAAABHCCYAAAAAOHKB22C/Bk4rfwM3Z8+dZ78CEC6GDh4UcHzEj8d+4LrFKTHTV6A0FOw9k9N1q9J3novtcepUthVVW5cbOtmvyiOYwFljBhe5+/bafwEIF+a1GSyY4LrFqTDTV7ACb7D05XTdqvSdwdYznan9dOJUthXnL7o5AQAAAHCEYAIAAACAIwQTAAAA1YjZXSnYBFQGwQQAAEA1Y4598DcBlUUwAQAAAMARggkAAAAAjhBMAAAAAHCEYAIAgDDkb2Cs7xSIv2V9p3Djbxu9E4DwRzABAECYMn9M0N9UEX/rmFM48red3glA+COYAAAAAOAIwQQAAAAARwgmAJz3/PXF9p0AAIAzBBMAqgV//bHNCQAAOEcwAQAAAMARggmUVrhZM3t0U2rmUXuG10nlZy1Sao8WdteQFuo57nW9l5Uvl70EAAAAqheCCZQo3KWFT03Xii9P2jNKuA79XU8kLZYGpmvDnr3K3bNGky77SI8nvaT1BYQTAAAA1RHBBAx2q8OITP2ubzdF2nNLnFDeyre0MraP7r6zraLNVBMRrTYPP6pRsZu0Jut7z2IAAACoVggmIFfOIj0wdq9unDxE8Rf7SxKFOph7QJFxDVXX9+2IS9Ug7qQyVu9UgT0LAAAA1QfBBBRx+c166c3/UkJ0DXtOGa7vtH9H2TEUJYp27NMRejoBAABUOwQTkGpepuiaQZJC4WHl5hTZfwAAAAAeF7gN9mtArpx09es2V1env620hDqemQWZSm03WBl952rD5ARFeeYajipzXD+l7BisFcuSFWvHI8F+BGz23Hn2K+DsGTp4UMDflPjx2A9hlS7Nba1IoO2taN1g61WV41OdOD0v4XY+ze1xsq2mivbzdL9nOhOfe75sT7D3TBW9j6qryw2d7FflEUygFL/BhCtb8/r01bS4F0IKJgIxg4zcfXvtv4Czx0x7wQpX4ZQug22rKdj2Ot3PqnR8qpPz5Xya2xOscFpReg+2brBj4GQ9k9N1z8R6prP9nWdqW3H+opsTKmYNtLYDCz/KDcwGAABAtUARECGoqfpNrig/0NoamH1cMU0uN5YAAABAdUMwgRBcpJjut6l7ziuaOn+XCs1Zrnxtef4ZTcu5VcP7xpKQAABAQGYXqWATqi7KgAhJRL0uGvnifaq7uL9amxd+4/a6Z3tzpS18QJ2iSEYAUNX5K+CVnQLxt6x3Ckf+ttM74cwxx1v4m1C1UQpEKRGxyVq2b13J4OtiUYpNSFbail3W4Cpz2j5npBLjo0lEAHCeMAdDB5oq4m8dcwpH/rbTOwGoHMqBAAAAABwhmAAAAADgCMEEgCrBX9/mslM48bd9vhOqB3/n3ncCEJy/68Z3wrlHMAGgyvDXv9k7hSN/22lOqF78pQFzAhAaf4O2zQnhgWACAAAAgCMEEwAAAAAcIZgAAAAA4AjBBACgWvA3eNN3AgBUHsEEAKDa8DcQ2pwAAM4QTAAAAABwhGACAAAAgCMEEwAAICT+xpqYE4Dqi2ACAIAK+CtA+07Vhb8fDjMnANUXwQQAACHwN3DbnACgOiOYAAAAAOAIwQQAAAAARy5wG+zXwGnlrx8xfWvh1NDBg4J2Kfnx2A8B01ewdStaryJn4jvPxX46Wc9U0TEK9p3BnKnvPJX9PBfH9mx+Z7D1TOH4ncGcqe88m++ZzvZ3On3PFG7bg9Onyw2d7FflEUzgrDGDi9x9e+2/gMox009FBYBA6SvYuk7XM1WH7wy2nonvPH++M9h6JnPdYIW6YN/pZD1TOH5nsON3utczne3vPF+2FWcP3ZwAAAAAOEIwAQAAAMARggkAAIAQmd1u/E0IP/7Ok++E04NgAgAAIETmeAt/E8KTOd7C34TTh2ACAAAAgCMEEwAAAAAcIZgAAAAAfPgbY+E7oQTBBICzyl+m7DsBwPnIX35nTqHwt5454czyN9bCnMKNv7ThO51pBBMAzjp/gxfNCQDOV/7yPHMKhb/1zAnw8hf0mNPZQDABAAAAwBGCCQAAAACOEEwAp5m//oq+EwAAwPmCYAI4A/z1bTUnAAAAf/xVQPpO4YpgAgAAAAgD/gZRm1M4I5hAiE4qP2uRUnu0sCPkFuo57nW9l5Uvl70EAAAAqheCCYTEdejveiJpsTQwXRv27FXunjWadNlHejzpJa0vIJwAAACojggmEIITylv5llbG9tHdd7ZVtJlqIqLV5uFHNSp2k9Zkfe9ZDKekbN/IslMw/pb3nc4Ef9/jOwEAgPDm7/7tO4WCYAIhKNTB3AOKjGuour4pJuJSNYg7qYzVO1Vgz8Kp8Tdo25xC4W89czqT/H2fOQEAgKrB3xgNcwoVwQQq5vpO+3cctf8or2jHPh2hpxMAAEC1QzCBihUeVm5Okf0HAAAA4HGB22C/BvwryFRqu8HK6DtXGyYnKMqeLR1V5rh+StkxWCuWJSvWDk1D7WMHAACA8Je7b6/9yg8zmACC+uUrd3qv5u64sWvdP9qzPL51rx3byR3Ta6579y/2LIdiGjS0X1We03XP9nomvjM4vrNiZ/s7OT4V4zuD4zuD4/hUjO8M7lx8py+6OaFi1kDrOvYf5ZUbmA0AAIBqgSIgQlBT9ZtcUX6gtTUw+7himlxuLAEAAIDqhmACIbhIMd1vU/ecVzR1/i4VmrNc+dry/DOalnOrhveNJSEBAABUQ5QBEZKIel008sX7VHdxf7U2f8ikcXvds7250hY+oE5RJCMAAIDqiKc5ISyYT4AK+qSA8wT7eX6pDvvJuTy/sJ/nF/bz/FJV95MqZQAAAACOXEDLBAAAAAAnaJkAAAAA4AjBBAAAAABHCCYAAAAAOEIwgTOrcLNm9uim1Myj9gyvk8rPWqTUHi2spxc0adhCPce9rvey8lXqd/HyN2vhuER7GWPqMU7z3s1Svu9C4SDgfhYoJzPdZz8bqWXKc/owp8B+3yP899Olwqzn1LP5BGUWBNuokzq0fKRallsutPMdPo4pa0Y/tRyXaZzBssruS6JSF2wufa5c+cpaME49vefTXCb978rKP2kvEC6C7GfZfTDS5MKy5ytc97MwR5npvtvVXkNnrFJOYeXTZPhfm6HkMcb1m5Opeb770XyIZq7J8fxukFdYp9vQ8tJSXF8r44H2ftJ3mOZHIaVbQwjXZlin2xD3s/Q+mOdoUbm0GN7Xp5Fm1zynoc3tbfN3zZ0v+ZA5ABs4I47vdC8Y+0d39wad3OPWfmvP9Pjl4DL3A816ucfN/9R9+BdzxmH35mdT3HHNxrvX/mjOMOftdy+/v5P75rH/7d56+Cdjxk/uw5++5B7SrPznnVMB9/Mn98FlI4x9SnHP+vSw29qr4v0c4V5+0Nwnc1647+cv7uNf/c09rlcnd4zv+fHDc14bllsupPMdNn50fzV/rLt31+buuLFrjb98ec7ptfcucH913NoR9/Hdy9zjbrrG3XvuV55z7D3vN411L9jqOe+/HN7knnVvOz+fdy4F288f3Fun93XH3b/MfdA+PZ5z2Nc9Y+sPnhnhup/W9WRsw70vuTdb15PPdpXbn6qeB4WWx3j2tZ17yLObPPtavB/t3A8s218F0m1o+1mavU6DhuW2PyzzoxDTrWe5Hu4hc3e6j1szfnTvXjbefXODO93pu/9lzQnrdBvqfh7/1D3jpk5+0ucs91Yr7zWE9fXp3d7x7uW7zdRXcq+4efqn9rkz5p4X+ZDbTTCBM8BI6Fv/2z3u3ufdm7e+5u5drpD9L/fuuXe6Y3rNde/2ZhymX75yp/fqWrzsL7vnGuv6ZJAWz7rhUSirYD+t/fFTUCszP6z308jYts4f7x4yfZ17q3nOgt1sjaAq/d6u7puNG0Dp5UI73+Hgl8OfGoHhCPeMTzf5P3c/rnWPK5eB/2LMHl+S+Vv75RtceFjn+VwWVnw4289v3WvHdipZNkz303M9lb/Jlp5/nuRBZfKSYqXm2/ta7pyUmR/O6Tak/fRlVoAscA9pbeRH5YLl8MyPQku3ZfKaYqWvzXBOt6e0n2XypXDeT/95aNlrMbS0GNb7aaObE047V84iPTB2r26cPETxF/tLYoU6mHtAkXENVdf37YhL1SDupDJW71SB2Sx/cK/yImPUoG4NewFTDdVtGCMtXausoN1tzrwK9zOiqQZl7NL2yQmKsmf5KtqxT0dc4byfJ5Qz/7+UmttJTwz/vS625/p3TFmvjte0fxusUbdfYc/zCuV8hwFXthbc95Ryu47WsGsvsWf6cqkga60ylKAb433fj1BUwiRt/2KSEsxfgy88rNyci3V1w0tL9SONqNtQVytTa7K+t+ecIxXuZ3CedGu8CNP9jIhN1rJ965SWUMee4+uodu77zsxdzos8KLQ85iLFJi9Urjd9llWUp/1HToZ3ug1pP+0/TIVbNWfEq7owdaRui7TnFQvP/Ci0dPu9slZnSn1vUHypc1lHCZPX2ccnvNNtaPsZjHeZML8+oxKU9kWg/fQ6T/Ihg5+cBTg1EZffrJfe/C8lRPsmfB+u77R/R9mxBSU8N4aTOrIvT0X2vHK8N8BzqML9DOrXiuvTXjER4byfNXT5TVO0eNKNig6aUxiZXdYCpb56pdJSb9EVZZcN6Xzbf5xLEfX1h1fmaWJCvQAZo32uYhso6vD6kv7nZfrBuo7s086AJzSUm+UZVuF+GqJaq8+QOspYvEGH7I115W9T5tZ6enhCb8UaK4b9fvp1jXp3aKCI8yQPCs6bx9h/BtKqq66PuaiKnk9T2f00Kzae0usNR2pcr5jyabyq5Eel+Kbb44pp8hsd9hk/UnrsSFVOt/Z+Gv9FtblF9zTI1JIP/2mnO3NswUZlNbhfqbfFGktUtf00tn9zuqY+nafuf7lXncxg8DzKhyrKZoDKq3mZomsGSVpWDVjAS8PmidjDWkX76ddJHXrnZU3L6azk7o2MCzCc9zNCNaMvU037r4DMWsCxm9Rt4QQl1vMTWIV0vsNBTUVHB9tb+1wVvaXUxzaqwcNvKnffXuV+OkK13xiux5Z/bdz07Foke43wVNF+mmopfvhfNOrQWHVq7Bnwd1W7Ydo2YKKGxdcy3q8K++nD9bXenf6K8nrcpm5Gwfm8yYP8KpvH+Oc69IFmmAWbwV2MgngVO58Wf/tpV2ysTFD61F6q52/nq0x+ZPCbbn9S0eJJ+vPaK/TQ+7uMPChPm0bX1t/6T1DGIbNQWQXTbdn9NNVsq2GzBuvwiM66yhp03FQdk79U/1lDFG/dd6vOfrpy0tXH3P7bp+jj6wfpnnbRnvR6HuVDgfIZAKedcaPLXqKJj+9R3xdH61Z/Be+qxnxayuhHtar7n5RiFTKrgZxL1P+ZUSUtUjWbqU9SW214/DWtD4Pm5tPCfDpZz6Ha2GeJPjcDJnPauUS9N4zU/em7jNtbVVKg7Pl/Veq+WzRrws3+C5jnjRDzmMJdWjB+hvbfPlnje11ZBQsC/vfTdegdPZaUqW5P3mUXOKuyQOm2SHk1+uvpCd4W4wjVbHqTBvbMUuqLm85JF61T428/zaDwOd2a+Il6/2ObJ/8xgqbP/3GTNvYfqXnZVWsvPV27jH3Ys1Gz6q/QH7uMsQO/80dVv9pQFdW8XE1iy3VkLaOm6jcp2/e+KjNvfov0pz4vSI/9RY8WdzGpyvtp1gzOMG4CtyltyLWBWzBCOt9VSLm+q8bNvH4jxVjNzT97XtvvVE0uFWx5T6/vT9DAvs1KzqsdNH389BJtMe7lVWM/jYJK+hjd/rQ0auYjPgHg+ZgHBcpjyjACiXkjUjRNQzR99A0lBdIqk24D7KdZu51mBEhD/hy8YqNK5EcB0q2tXB97O616usVUpXQbaD+/15alb+lA3wHq09Q7SsYbNH2haQuyjDWr4L0zop4SRo3UHVqp9JV75TqP8iG/eQ1wRlmDiwIPSvJklJ7BRQEvs3IFunBm9pWcbd/85mh6couSApo9iKpK7qdrr1bNXamiL6er/9UxnvEDDZupx8SNUtF8pbSMU5/0bLlCOt/2H2HtEsV3TQh8rmzWgNWAC9UpN8A1/HgGeZZvfPcGTZ7BuGG/n658bZk1ylNQWTZFg4oLJYbzLg8KlseUcOV/pOesQOIhvTlzoJr61N5XjXQbeD9deR8qfcXXyn62v1pbeZExNb5JaduKVLRwsOIbJmlezokQz739x7kQLN1GXa0b+15p/xFIFUm3wfazYKfWLP3a/sOXHTRZg44vrMJlhCLl5R5W4XmUD4X3PQ3nKd9aFHuWqXhw2eXGEr61vb7Ngd5BsI1Uvyo0Y7sOKXPC7ep4+wrV/Uu6n5t8Fd5P+wkrniZo7/SlVkzsYGRwd2vO9h1altzU3MMQzndVYOzJVdeoY7kn27g8/c2bXae4y41M3aptOl5uwKpngOsValI/3Pc2UNBk72ek/TSrMN5PV/4aTex5o/64op7SMsoUVCznUR5UYR5jMgrhmU/q1nYp+iB6jN4uE0hYwj3dVrCfxV1JfKc9Hyi1VaQik+Yqa99CDYo1++OHb35UcbqN0lVt4v08wcfsV39ETRNa6PKI8E+3Fe5nwKDJM34g0nqa1YVhvZ+ecRKd/fyQrelKJXa92jib51E+ZD8iFjgjAj5T2vsjSt4f3gn4Qy3mj9t4fyAs/H6oxcv/fnp++Cumge8PQ/lRJfaz7POxA/G/XEjnO5wEfH69fU59fjjJ84NLPcr/uFKz+93pX3nWDp8f/yoj0H5avxlyp3vc3LXu3d4fiLLmdfL5waUw3U/rx66aG2kw0I+ZeZwfeVAoecwv7uNbZ7lvNn+8zfdHwcoJ53QbYl5aVoD0HZb5UYjp1rOc7w+f2WmyddkfQg3TdBvSftq/E9JrrDt97W57P+15vj+cGdbXp/3Dn8XbZvjloHvt+F6l5p0vZSGCCZxRgYIJ61c71851jzMzFeMmZ05x9053L7d/edXD/MXIte70sb2Kl4lpluKesWyr/Suu4cPffnrm2dvtbyrOLKrCfp5aMBHa+Q4jAYMJk7Evq2cZGbnPuVrtveHZju92r5071irAefbXuFlMX+b2/HppGAm2n2X3oUrsp53+iren/FSyr1U/Dwopj/nhC+sc+33fmnzyrTBNt6HnpWUETN/hlh9VJt0ajPO0ZrpR4PS+d+8s9xrrV5a9wjXdVmY/y+9D1dlPmxEYbF02veRe0aBX6Qoay/lRFrrA/J/dSAEAAAAAIQuDjlYAAAAAqiKCCQAAAACOEEwAAAAAcIRgAgAAAIAjBBMAAAAAHCGYAAAAAOAIwQQAAAAARwgmAAAAADhCMAEAAADAEYIJAAAAAI4QTAAAAABwhGACAHAaHVXmuM5q0rBRwKnluEwV2Es7c0I56Ulq0nyCMgtc9ryK2Oskpisn1FVOK5cKc1Zp5oTFxd/vyklXn4adlZp51DOjslzZmpc4WPNyTtgzAODsI5gAAJx+kXdrzvY85e7bW27aPjlBUfZi1cf32jJvsp7//F/236dB4WHlXthZ18dcZM8AgLOPYAIAgCrHpYKs/9FXt7ZXDHdyAOcQWRAA4Bwxu/5kat64RLsLVAv1HJeuzBxvJyijwJw5QS0bJir19Wc0tLm5TIBuQYW7NC+lvVqmvKwt+SftmRU5qfysRUrt0cL+fuN70jOVU+jtB2V32Up8WZmbfZZrPkQz1+So0F7KUpijD2cMMbbV/Jz2GjpjkWe/rK5Y3xif008pC7+Wtk1Sj8a++3BSRz57TzONbfdsg7nuKp9tCOR7Za3+Vrd0aOD/Rl6QqdTmLdRnxlKtKt4u8/guUlb+UeWsec4+no1KHzOn6wGotggmAADngBFIZC/SnxL/Sxsv+7M27Nmr3D1rNOmyjRrWbbBmZh2zlzNtV8amaI36NE+7P56rwW0usefbzEBiRIqm6SG9OXOo2kTXsN8I5qQOLR+j7klrddkTa7Tb7IK18y9qsuG/1G/0OzrkW5bf9pymZkTq7jd3KHdftja82FCr7v2z5ni30fW1MkbfrRG7OuvNnWbXrn9oVO3/0bSF2z3vq44SJr+tOUlXSq0maMWedUpLqGO/l68PV+5VozH/sLqA7f54suqtHKMRr24tHayUVbBTa76Mr6CLU5F2PDtP6xs9qk3WZ89S261Pqn+7WzV1Vxs9sdPc5/c0SvN0z6S/++yz0/UAVEcEEwCA069ovlJaxlg12L5TyeDr77Vlwav6uPMYTXy4vaLNu1FEtNoM+6tmJR3V85OW+wyUvlKJSTepac0IY5HGamz8W6xwp08gMdBaJiQFm/TS4ysV89ijeqhttOdmWLOFBk3/qxLXzdBL631aPyJv0+jHeinW+uwaio7voPjIr7Ru+xEjJHKpYP1rSl3XTmlP9Le/P0pNk9OM/TCChwpdqTvGPKLEWM8okojoDrpzQHNlZ+7S4YCFdLOL01qtaNZQdSvY3cikkRrdu6lqGq8jolsp4VojiGl1n0Z7j3nNGF3fMUZF6z7Tbp/WEKfrAah+KsiGAABwIMAA7OLB12bN+tKjirmumadwWqym6je5QsrZq4MVFlK/1ppZqUpbHaNRY24LPZCwC+MZRXV0dcNLS98Ia16uJrFHlbF6Z+AnTlnLSHm5h1VodTfKVFFsKzUv1SJi74dTQff/pI7s+0E9ul5dDQeyAwg3BBMAgLPOdWSfdhbZf/hTlKf9Ryroj1+UqTe2NdYdXfM0bfoHDrrbfK03ktuWbj1pfJPStgXbsDDg2q9N7/6nbowv092rnEjFNLncal2oHKfrAaiOCCYAAGddRN2GujrS/sOfyBg1qFvB2Aez9WPxNE0ac59iVkzR5He+VuXiiQ5KXfVludaTUi0oYciV95Hea/b/FB/FLRzAuUdOBAA4+6Ku1o196yjvky+VXyoCKNTB3ANSbCPVD7HbUkRsb6UOr6eVj7+m9SH9iF2EouJvUGJknj7Z9U3pAKRws2b2iFef9OwQA5NLFN81QZHluiXZ+3HanVDexiz9ji5OAMIEwQQA4By4RG3uGqJ266Zo4vMf2QFFgbLTUzVsYR09PKG3YkO+Q9VS/JA/6+EG72rqaxU8Bckr6no98Jd22vB4ml7YnO8JHAqzlfHUZD2vwUq9LTbEG6QRmHS6V2mdMzX16XfsR7oWKGf5c5pqPgq2mO8YihMqLPzZfl1ZZpAiNalPJyQA4YFgAgBwDkSoZtOBmp7xV3X45il1bGyOWWivP+Vep1mr5mpEfC17uRDVbKX+93XWgWefKnlka1A1VK/3JL39Ygd9M/5GXWWOl7g6We9fOlhL5t6n+JAHcxsirlTi1Dkaden76ne1+QSrP2jq3ms0dHg7ewHTRYq5abCSTk5Vj8bX6q638irZJcsW0iNhAeDsucBtsF8DAIDT4oRy0lPULzdFG8J4/AUAnCpaJgAAcMz+le7mD2hetvdhsieVvzldU5/+l+7p25pAAsB5jZYJAABOhStfWe+8oZcfn6UP7afKRnYdprQH79Ct8fYP4gHAeYpgAgAAAIAjVJgAAAAAcIRgAgAAAIAjBBMAAAAAHCGYAAAAAOAIwQQAAAAARwgmAAAAADhCMAEAAADAEYIJAAAAAI4QTAAAAABwhGACAAAAgCMEEwAAAAAcIZgAAAAA4AjBBAAAAABHCCYAAAAAOEIwAQAAAMARggkAAAAAjhBMAAAAAHCEYAIAAACAIwQTAAAAABwhmAAAAADgCMEEAAAAAEcIJgAAAAA4QjABAAAAwBGCCQAAAACOEEwAAAAAcIRgAgAAAIAjBBMAAAAAHCGYAAAAAOAIwQQAAAAARy5wG+zX570mDRvZrwAAAIDzT+6+vfars6PaBRNn+wADAAAAZ9q5KufSzQkAAACAIwQTAAAAABwhmAAAAADgCMEEAAAAAEcIJgAAAAA4QjABAAAAwBGCCQAAAACOEEwAAAAAcIRgAgAAAIAjBBMAAAAAHCGYAAAAAOAIwQQAAAAARwgmAAAAADhCMAEAAADAEYIJAAAAAI4QTAAAAABwhGDCkUJlzbhZTRo2UpsZWfrZnmtxHVLmhETrvSYNEzUx85Bc9lvhwrNtoU/nXoFy1rygiQuyw+5YluZSYU6m5o3znn9jaj5EM9fkGCnGhytfWQvGqWfxMU5UavrflZV/0l7AdFL5WYuU2qOFvUwL9Rz3ut7Lyi99DMp+Vo9xWlh2mYCOGel4tGZmHTNeH1XmuM7G9k5QZkE4HuUTyklP8tk+++/EdOWczs01j+e7r/sc90ZqmTJDyzLLnMNwUpCp1OYt1CfdyfVhpNms59TngeU6FIan3XsOQp3OvLLpMESFOfpwxhQtzDlhzzjdzkHeY+xTZnrJZ7VMeU4f5hTYb1bEN+/B+c1MT38vnzaXrldOYRhmOhb7fuj0/lK4WTMTRyvjkO91dZ5zVyMxDRrar07VcffW6T2sz7t2+lb3/9lz3b8cdK8d38uaH9Ogl3vC2oPuX+y3wom5ffGtrglpOn3H7BT8uNY9rllzd++5X4Xl8fT65eAy9wPN2rmHPLvJfdja0J/chz99yT3EmPfAsv32tv/kPrhshDvuprHuBVsPW/N+ObzJPevedu64sWvdP1rLeD+rl3vc/E89n/XLYffmZ1Pccc3Gu9f+6D0KPxjpsK877v5l7oP2LM96fd0ztv7gmRHQL8ZhHe++1mfdquVf7t1z73TH9Jrr3n2atv+Xw6vdE25q7o67d5Z7zW7vmTDO4db/do+76Rr3zeNX2+c1vPyye667d4M73em7/2XPqaxv3WvH9vJJo+HDzH/WfLgupCks8iq/PNda3Cmdo+DOet7zy3738vs7uW8eu8y9+7hnnuf6+WM1yHsQMm+ZqFmKe8bq3UbJyZ59+FP3AiPPiblpsnvt4Z/suWHkl6/c6b2uOYUyx7lL4+cqH6Rl4nQxWyQmPaCUeduNP1oqKf0ljU+oR9NPtXFCeSvf0kp118Dk6xRtnfgaim6brNGPxWjl469pvVmT6dqrVXPXKWbAXRoYH22lj4jo9npozH2KWbpWWXatu/VZsX10951tPZ8VEa02Dz+qUbGbtCbre/PDpYLPtezVo0oc0FH17IQWUa+j+vc9qteXfq6gdYSFW/X6lK/1yJ9uKl63WivcrFmDR2vz72dp5exH1CU2yn7DOIfxAzXptfFq8OY4PfHO1w5q/88kI61sXK0dkTFqULeGPa+y6qjToD467E2jqGLOdt7jUsH615S64gr1H3STYmt6MpCI6A66c8Cv9Pyk5cFrc8l7qoljynr2EaV8+nvN+fAFjbgxVjXtdyKi2yrpiec0reF7Gjbp72HXKurK+0jLt12sqxte6rAMF6GoTgP1yKEX9NL6o/a88xuX8ukQUiBRoJzMdJ+mY7N5OdNu5rObzs35ZZvVXNmal2iu01mpmUai9P59urt3nAlmk/ryGRra3G7atJrL05VZ3BQeoGuN1W2jkVqOy1SB+brdYL1RVKQdE2/SVday31S8nnnDy5yglg3v0MzlyzUzpb29DcZxX7BZ+QVmt4MhxvvmvPYaOusj5Vsf5V0vSXMz12thcdOsscyMVUGaZS9SbPJC5X4xSQlRfi6rojztP3LSuJEeVm5O+Uwqom5DXa1M+2ZdqIO5BxQZ11B1Sy10qRrEnVTG6p3BAwVD0Y59OhIwfZzUodWL9HqNzro+5iJ7XplzUepYenmPjSctunLS1cc4TvPKdt2w1rXTq8lPV6x5vt2GrOVbqM/ra7TFZ7nS3SZC6V5StnuG7zUWjHHTe/UpPa/BSht9g10YKy2i3k0aaRbM5n6ovIo+zkfxMcra7tMlxNiu5dmlu59U2GXEPD/d1Cf9E2Wvec66plpaXZPstNL3BsVb6c44BplPGp9jp3NrW81ugp51Ah2XiJguSu6cqWeX5oRZsHQm+UtTpdN4seI0/c/S61SYds3Pm6SOyfNVpI1K69bM55qqKL3a16Rxvcz15lV+0//ZzntO6si+PBWVC2BrqG7DGEVuW61NeYG6c/nLe0xlu2mVvVfYyuQl5a+TUPIAcxnfe4IxOcqTAqjwvmcy93dVyTZY3X483StL5bkV5Z2BlMlPTmX/XPmbfe6DAc5LOWb3yQVKfVZ6+MmHlBDtp6Ij4krd+icjkF3xllYFTC9+WGWgeE9eWFymMrfLCGJLnecyZa5y3f7saz3xdWVl2+ei+UhlHDqhwoN7lReZoBvjL/Esmb9GE3vEG9+xyO4SWOb8+TsuEY3UbfDVypjxXviX1U4DPzkPKucHZc9P0zArkJBqDZ+gceUCCSMDXT5B/ZIn6Y0vi+x52/XGxMHqN2KRsgtrKLZviu6INGaXyYg9EbKxjjdhRzTVoIxdys1IVmxYnz2zVuIhJb/3Gw39MFu5+/Yqd88qjf7VMqUMm6esCgt4tqgEpX081zg2kYqb+IF2B7phBvSxnn/lMzUa8w9jG7K1If33ykrtr47tntaujmn63Lgpfv6Ph6SX/1Sm1nmjnpyyRhcPWmBt++6PJ6veyjEa8erWijNyf1p1tW6eriP7tNObBMo5qp37vpPL9Z327whcm1EcKES1Vp8hdZSxeENxzY4rf5syt9bTwxN6B04f3hrKPu0VcwppKCKmvXq3+kLLN+73OW5GBp21Vhmy06vra2U81EfJ636rSR+b6cA43jN/p40P3q3HlvsebyNYfGKWMi6+S4uttLJRs+qv1tCQ04p5jY1R96S1uuyJNdptfsbOv6jJhv9Sv9HvBK/5slp4Dqn7fYlqbdeyBpSzVwdDTbvmDce6Kf2iT9Z8IleHx/S+uf9LuyprRJre9gZhZv/a2wdoam4bzdyZZxyjbXqz4xcakTihpM+tlSa+U9HiOXrjeHdN/2Kvtr/UW/UKd2rN0qOKaXK5aho3z+z04eqe/Knapr+kSXeZNctm3/TB6vFMgQba1+Huj/+sy8zj8tT6kkJLxGVqft0V2rHso0oFS1XbRYrp0FVxRd6CtOl7Za3ONFKjfS1a88qk6XKCpV0zC5tg5Dt3K1IdlLrqS22fnKCoyqTXL9foo9ojtMnMvzLuVZtK5X+GM5H3BHVAuQcD5JJ+8x7jOslepD8l/pc2XvZnbdhjHsM1mnTZRg3rNrhkXIWdl/Rf9CsNXbXNz3USyjE1C7mv6N6k9/Wr+5Z5ljGP65jfaEnynzWn1BgOJ3lSaPc916F39FjieH3RcY5xDzKW+XSEav/9VZ/ygSHkvLOMwl2aN+JuDdvgXc/Yvyd+a6zXWwNmbPa5f1W8f65Dy/Vwl2Fa7z0v+z7S9CafaJhv3uTX99qy9C0d6HGX+reuZc8LJEh68ccKin+t2p+s1spfOmjMCqM8tDNd3bY+ocfe8laG2PnelL1qM+sjz7Fb1llfPOJ77OyguChDLy/6X/WcudEIyGcosV6hJw+IbaT6NY2vy16o+41jsPn3U/XaEwMVH32hkYZe0IBuz+tY0tueNORNr4nTfIL9Gopu0UoxQYPr88cpFCVgOvZsihKNQq43Czi2cqO2l81oCjbppceXqyjyJqX+w8wEjcS38z2ldo1W0epXtXCLcSOLulo39r3SWPgzn8KZ3YXBuA3FPTZQnSp7EzmXvF1wkm5TG2+tREQ9dUrqo7gvP9GOw8EyotPpSt0x5hElWt1WzC4rHRRvBiaPPaqH2ppN/RGqGdtWHWILtGHLHp+M1nc9Y9OjWynh2ouVnblLh8uc3mBchz7QjKfz1H1wF+PmaRcu7fcCsjLLgHd9H7UUP/wvGnVorDo19tQsXdVumLYNmKhh8UEy8AA1lJUW0UDX92muHYtX6vPiNO8pjMmqKTeSgdUdIkajxiTb6cA43k0H6pkXu2tDmW41kUkjNbp3U09TeES04m9orchQ04p1ja1UTPF5NdRsoUHT/6rEdTOCNDXbBcWiGF3X4rJTOx7leAumV6n/fffaXaciFHnxxUZK9N5AjyrzqUc9rSJ/7mV3GYlS07tHaFTsOqWv3OvJC6xz9pMu7D5Uj3qPkcFTQLxGvTvUVk76GN3+tDTqHws00a7QcOUsV9qzv1HqrFHFtYMR0bGKM16XLhiGUqt8/vEExMdLAgerMC116tpSecWBlW+a9p9CKp12K5NeI7trYN9mxmcb+VfslcXnviJnLu+x04r9Vwm7cGb/5ZffvMcoeC54VR93HqOJD7cv6Vo17K+alXS0uNuUK+9Dpa+o4ZMvG9dJ3wFK1ErPdRLSMbULuX3v1CDvMuZx7XSb+rfaq3Xbj9j3Xo/Kn9dQ7ntHtf7FGdpg7u/dLTyfbW+nVaFoMfKlSuSdJYz1tizRtE3tlPbEPfZ6Zpe3ocZ6t+nAs8+WVGIYgu+fZztXxt6n0d7zYh7z5DTN6pul1Bc3lVRGlFVgV3Jc18xvS69z3vy6huoPuE+PeLtORUapdo2flJd72LiHG8tkzlCy1Soy0k4r5rG7TVa3v+LWZU8rnC7sqvtHe/Neg5UHHFdcn+tUN8cIcvu8ID22RIsn3ejZF1eO3p40VzUmPl3SAyXiMl3Vsp4Rn9mtgDar1S/St0x3/jqtp7n6aqmk6am63cwIvnxZqWVqr3/O/UwrzBy26AOl/aGVp1ns6luUtjrfmPm13XR8ieK7JhgZdFFJ7WDhDr2/+DPjhVlYaFC1TpbZovDFOqW1+UGZy5crw5zSx+nWbpOM4Kgqqqn6Ta6oXM104S4tGD9D+2+frPG9rjz958+s0e45VBv7LPHUbllB6hL13jBS96fvKpUGfXkKoFeoiVntckouUkz329R9/1taZgbEBtehDVqytI7u6dvauO3Yhely3SGMjL1+I8WUqhEuy14mpFor7w2mTvkAqeblahJ7NKSuYaed96ZUqiLA21ph13LbN924Ad39tIr43Byt/btG/W+J89w8Ld7xEr/Rt8vH6vaJXyjxxTQNauoJgE0Rsclatm+hBsWaXUqM785Zb1yLa/R5qaf3mCpzvM8j3oDYznOtluCcBCXd100x3mvdOkdSYterjTQdioqO5VlIr2c07zH7g9+rtM6Zmjptrd2V7qTyN6drxrLvjf0OzG/eE7Dg6ZvnFtkVa2XWte4zu7QsOVaFIR3TOkqYvE7bJ8frSOa7nvvS8teV2rOv0rb9ZK8QSAjXSCj3vUD7a22nN5pwmnfa68W2UnNvMGMJ5fous4y1nV+X7/Jmn5ei4nE2Z5MdsLYarLs71bHnGawgtY59jdrHoNWt6umvVaTUdV0+7/X0Bvm1/vPbpXq0T6o+7vtXPZNsB30mq3dIlpHmmnrSmdmlbPk7WvPZIevtUqxzKjsfP7+VSiJwwh4j0TdJj/yltxUMZD/7lE9z6c86+vVeBXsAXlH+MWMtI4Nuc4vuaWZkJlbtYJEKtryn178sUmSP29StVP/SqsDscvGAWl7dXSmvbPHsf63umr40VXFntcByOgrNDlhNzSmapiGaXtwP35tZV6DUTSUQo0Bipo/9CXatpa1mM/VJaquPn16iLQFqrkKqoQyRZ8C37Bu1d/BmmUy8aL5SWsbYfUvtFpQzElR+rTeS25b6niaNbzIKCaG08lTAtV+bln3mMzahYp6bUvMyFQHem72nCd1TqCzyjAcKuN3eG6inu0oJu2ataLXmZ1+qns2OK+uzvT43LTN4WG73GTbH/LypNbuMAojrkL7YVKC4U+zmdn6wuzrZea55bRwwznGbazuotz3g2CoAB+zidCrOUHo943mPIeJKJU6do1G1/qbuVqvo7Xrhq2s17un+xj0wUJ7rP+8J3v3KUKa2N7iKjqmxDdkLNbR5K/VInqMtx8w88j9140wjoGh1Ogp9p/m+V9m8s4JuasXd2ey/QlG0cLDifb6/ScNm6jFxo/3uqfBWhlTi2rLy4S/K5F3e4NxOd3YQpG2T1MNusfe33SWtur75szeN5uvDubmq26ulirbuUK5vBWJhtjLsMSTWY8NX79KP+kn7d+30k0dXH9X+VnKqSsZI1FC9XvdrVCszI87S82MX2P0OIxRZq7anSbj2MC3JtWuQfac5vRVtvl8zTj0HXGO8MJvFtmiLWeiQkWn7PK2nqnDlLNWfJ36ujjPXafeKyRrUu7cSe3fU5QX7T1tBNly58j/Sc9bN/CG9OXOgmvrUeniaPe0/yrFr1azBjj61LmV4aorsQqk9r0RFNVchFipC5mlRk1lLdWyvn4ze0GqCVlj9bctO65SWEHg/K8/TJ7389+y1+6n7E8rxMG4wn6/Ukm3XaNSgdiHWTts3pbI1i8VN6OYx8g5kvVtztptjJQJtd4BBsXbNWtOkGXp75njdM6C5sl99rySILFivKYlTdGSA2XL1kWaPHGBcg711a1xtfeuvBrea8nR1OmIU9PYb19QmXWGOP7GuQRkFr38qxyjw5FUiiAydk/Qa3NnJe+w/asaqy8hXtd3a5gyl3XWtah72k+aL+b/Wgm+XIeDn+VPBMTW7qDz2V33ceYbW7zG2ObmvcU3cqoTL/xVC966Knfb7XmXzzgrOX/F5tv+qmD1Wsdz3G1Ow8YtWUPpr+48ArJ4Xxv2iMl24/XaTK13Z4gkSrtQd6ZvLb3Pxdhsf5S9/9lb2NLtb0zKe1aR7ze5pJS3vnm6pQ5Waf7ve35mn7XNGqo95jnu1Vu1vC/y04lQf1XS3z5CIWPWbcL+amq+LuztFKCr+BiWameUPS/TyQk/3E8/TAcwaQ9+nhti1ZGZXp/9+StPM6LoyUXvY8Eb3Zfuh/6zCY76N93YzdqU5Xe9M8zxJ59Z2KfogeoxRwCt9M7dYmaxPH21b6eZ/uxm57GBHuyDqGWzr7RZXlrcQGzjdeG7eFdSShVpD6U3fytQ/5r5Vpibe3sacbfqiVLcaYxuznlNPf0+CcsR7jeXpk13flDquVlewHuaTPwL/oFtE7C0annRA06Z/4Hegtit/rZ4ZO1caPlz9rO5CofBtgShJA6VbK7wDgMvWvJoDSUeqpfeJbaXOewlPjbnZD9js7xvpeYiDjKDnw38a++qtrTP7t9f1Wc87Dqts7bH3mj1HLXnnkvdJRfOma/7Suva5MdPu9cpb/KymLT5SiS5OoTi19Orf2cx7jD/Np5SVe7KUp1AXbGyJ37zHGi9YR3mffGl3mfKyW96sayjSvjeWWbf46YbzdaR1CMfUKoyqXBcjV+ExfWe/di7E+553f8u2gpQar+I07wyyXmWv74DnxRzc3C/4EyWNslCfkbcq7+mX9a6/gdrmEzCnTrbGiqXeFutzrIIp0wLhVaa1otw4KJs5mPzB5t7jZgcgZfJnTzovGZfjuTeo5CEn3laP6N/q8nL5upGuyuTRnnPqZ/55KLRziBBFqGbrRA3tYbYz+HR3iopX0mM3GQW/fH048Ra1bmgOlE3RQrMLU9chSmpTUuizHtForp/zpbKLquDAa4v3ZvmZlizc6NOn9nVNNAeiW8uYvIWplVq09EtPxmo2IT49Q2/4VhL51nIUFarQFeJ6Z5WZyb+ie5Pn6ECPJ/XqE71LBnT5sh4X19nIZGdqQbbnBmPWJr4w5RXlJaWoj1VYNfbPHIuQ84qmzrfHPrjyteX5ZzQt51YN72tmvsYxbtNfo67PMzI3n18SLfxSyxZm6oohtwR+6kuAQkUpVl/ya1S0dLGWWdtp7F/OO5o65a3yrSH2U6XefPZ17SjVzGtso9W3+mOljn9dW6ybm+dzplS6cF6BqOv1wF/aacPjaXphs/1LvWaaeCqUG1YddXp4vPrue0JDxvs+3s/zSNX7u4zToR4v6LXhbUO/IZRqgbDnmftuBXoltWGe6/2Az3VifOfyJzXk8RMa9XRfzxO5rBtS2e5SdlDgezO0bv417AGG3mvwqE/XJ/Oz/6oRZlN/uRq5QF2pqgNPAUxrV2u9URD0HBe7Fv3LTH24//pTrNDxrZF3GVlYkVynlF7LOtt5j5lujQJb7Lulx0xkLdX8ZZcr7cHrAwdefvOeS9TmriFqt26KJj7vfUS32V0oVcMW1il+Ml1ETHcNH1RLbxjbm2nlJcZ3rn9LS7b9zrNMrRCOqV1A3rH4La23C9vWMRg/RStP+d4R6n3PyG8eHKmOS2doqvcR0eXuX07zTu99ocx62Yv06INv6YpK5bn2dpY5LznLZ3ge+RrsiYHW9t+nWbfv0ah7n/B5LK25D6s0c2g/DTvYQ3+be5/i/aVVvwLkUWVbK7zpvPgcm9+5XBPunaGfH/sve//NQPVIuVZ0T1BQ1ydYsfMG7+NrrfRzpU/XJ/uzh03VDj+tPv67Up2fzvf9O/vMZyenjlF3q1I3y34ShfkEhCl6O32C7jDHRFii1WX47PI1SBG/1Q0Duts1zn4S4Wn6nYkfj/0Q0uSYcbN8aOFYxX86TB2tfoudNX7DpRo4b5rPEyuM3Y3tq6dfGyg97Qmymty+QMcTh2ms1V3MZmQOfxjZTyet35m4X28bF3VI651N1hMeXla28bJoxcjipyuVTN4WqBqq1/VBzXrsUi2xB+Nf1e5P2tFijNIfLrkJR9TropEv3qe6i/t79q9xe92zvbnSFj5QElyaTwCZOUE3arVGXG33q/39TP1wxxwtHhmk4OutNQr6GNCLFHvbBM0e8rOmWdsZpwHzipQ45hHF2UuUqKXWt9xqzI+2nxxjzzZZfavna1bHf2pCu6bG58SodeL7uvS+OZUrnFfIOK69J+ntFzvom/E3esYfXJ2s9y8drCUh3LAiom/UxDcXa3T8D1qUaD8koWF7jVj77+q1cJleHuZ9monBfGTjA+2DXoOem1L5p9aYrRWlam7L9T03vnNLI43OmCLPQGq7Nq64kGvzjuEo1axu10p6n8gU1UljMp5U/MpkTxpqeJfmH+ukSTPvVGTZ1hC/fZHDw9DBg0KanPMWAo0Yy+fceGo4jZllay8d8BSEjyutWwu1vHOJcd2dWnot5VzkPRFNddcrr+iOX2bZ+fs1unep1OeVJ5VYzzdILcNv3mMEW00HanrGX9Xhm6fsz2uvP+Vep1mr5mqE98l0EfWUMOEVLRn4L0218pKm6jjlX7pj6Qv20+tCOaZmxcEzmnjtp0qxPqORWo/7WL9NMoKlJPNpiqco1PtevV56OuNhXfqefW3+/hnt7TxID5e67znMO637Qpn1RnylDi8uD35f8MOznb7npZX6vVdLQ4uPeRDm+Zq0QCvGtNIPC++28yBjW4atU+3EF7Ry9v0lT7wyAgWrNTZYa7XfPM+bP/q2xNvp4NEoLepi7/+wLWoyZo6mewdSWy0MJ8vkz94xHL55bUmA6HkiUx0l/Hm2pl27Wv2te655XzymG59IM85v2fEo9udVkwqaC8yfwbZfn/fMjMPsMxfezBqZMbrdfNys2V9yWbj/ngSqJOu3DaZLT75k36zNH8jqp5Qdg0lz1ZDZbaVf4l4N/3hCJX/HBaikcnkPLGZFYZ+HlTvyjdM8lgznxDk6n+eqnMtdI2z8Uxkp8UZCaKWe1u9WXKk7Rt5CoQ5nRs1rdc+Yq7Tw1cxS4wSq8wCy6uuo1s9bpsv/cm8V7FKJKidA3lN9eH7ZvGXKQmV7u6d6u5Kd7KU+Pt2eUVW5VLB+kZ6r95Ae8H2E7XmMO0fYqKUrWljPdDK01B0zZ2sMtRM4Yzx9Wp+5LFMLXhujlg3bKmVpc426K/40DjRF+HOpMOsNPfvdYI07E7+FApTjzXvWacnnwR6afr4yu1rNUFqLdbrd2z21cR/N/qWn0ivbxQ3hqXCrXp9RpNTUm6vckzidopsTAAAAUMXRzQkAAABAlUIwAQAAAMARggkAAAAAjhBMAAAAAHCEYAIAAACAIwQTAAAAABwhmAAAAADgCMEEAAAAAEcIJgAAAAA4QjABAAAAwBGCCQAAAACOEEwAAAAAcIRgAgAAAIAjF7gN9uvzXpOGjexXAAAAwPknd99e+9XZUa2CCQAAAACnD92cAAAAADhCMAEAAADAEYIJAAAAAI4QTAAAAABwhGACAAAAgCMEEwAAAAAcIZgAAAAA4AjBBAAAAABHCCYAAAAAOEIwAQAAAMARggkAAAAAjhBMAAAAAHCEYAIAAACAIwQTAAAAABwhmAAAAADgCMEEAAAAAEcIJgAAAAA4QjABAAAAwBGCCQAAAACOEEwAAAAAcIRgAgAAAIAjBBMAAAAAHCGYAAAAAOAIwQQAAAAARwgmUIUUKCdrjwrtvwAAAHBuEUycdj8rf/kwNWnYyJjiNXT5P415RiE4M12pPVrY8xupZcoMZWTly+VZ6bz1c9YMtWl4s2ZmnWoIUKisGX9Ujxe3Owsmfs7SzGsaqc2MLOMMlVWg7PQH1NI6N52VmnnUnn82mPt1c3G6KDelLFe+tdwJ5aQnqUnzCcos8JNqCjKV2tzftgf7fG/6rJzTd05PgStfWQsm6MH0bAfXkOeYtByXaZz5yjqpQ8tHq8+MzVY6dOVv1sJxiSXHtMcEZeR4P/Wk8je/rKHNvce7hXqOW6Ss/JP2+zbXIWVOSPSbNl35azSxR6LPsXapMOs59XlguQ5VasddRhKZYKTxJM3LOWHPM7Yva7lmprT32f5xmpeZU3KNubI1L7Ek3yo7FW9zYY4y08epp897LVOe04fFx6ICVvptoT6OzueZdApppXCzZnrz/HLXrc91WXyN+yg+7g6vMyu/O0PX6Cmda89++8+Hw4Sxfx/OGGLfDxKVujzbvh6May9nlc/10l5DZ6xSTqG/FFs6nyj9mb7Hy+n1XIVUKn8zlck3jTxpYXFZqTLnIIhKb5MP+7ouva5RxlvzXMk2Nx+imWvMfPSfykiJt7d1mDLywzbVnzo3TrP/cx9e9og7pvV099b/M//+yX1w2Qh3XLMU96xPD7t/sZb50b172Xj3zQ36umds/cGac776v63T3dc26GHs53F7jlPH3Vun93DH3LvMfdieUyn/t9U9o3VD97XTtxpnqIxg751xldivH9e6xzXr5B639lt7htcvxlvjjTQ23r32R08KK2F/fnF6PHWn75w698vuue7eDe50p+/+lz2nEn75yp3eq517yLID9ozQ/XJwmfuB1iPcyw/+ZPyx3738/nbuuHsXuL86bhz3Xw66147v5Y5pZr9vnS/je57d5D5svn14tXvCTc3dcWPXGjmAzbtOg/Lpz7t8TNljbX1vD/cDy/bb+Uko/uXePfdOY9u8aeRH91dz73fHNejlHjf/U2v7SvKldiWfbe1Dc3fvuV8F+a4fjDTW1x1z03j38t32nh3/yr18rM+xqEA4pCm/HKeVYNek6YB7+b3XWOc9ptdc9+5Si9j3jK493De3DrT+uXLq5zqs2de0dV6KJzvPPf6pe4Z1Pfq+19x98/RPjVy2tFL5hPtb99qxncrnE97z7uh6riIqnb/94j6+dZaRB/VyT1h70LyKPPmUN21Z1+M1Jce87N+hcJLnFrPTf6l1vdf6/e70r8xr4if34bWTjX3w3p/sMmGDR9zLD5+mm3AYomXijPtGm99bp6Lre+r2ttF2U1CUYnsNVP9WX+n1pZ/bNV6BIluDn1p139ph7+uhKXZNV2K6cn42a25Lao9aprysLd4aUVe+tszyV0tisiNpf7VlpnK1UmVqWwuzlVFcU5uo1KXbVVIPW76FpqTWwa6p6/FnzfRd36oVMt/rr/7PfimtHqmO18xQlnEgXPkf6bmANRTGdy2fYG+nuY1L9MVP9lu+zGPbtp+e/0E69mw//c747E8/8XM8XRWdH/M7XiipMWn+gOZt/qT0sSiu4XIo6mrd2FfKWLyhdC2WK0fLZryrmMcGqlOUg0s62Dn17lvKYPv9JM3dXnov/J+Hn/3UhBusGtduIbT+mLXmi0rSSvHx9tSwt+42STu0UWndUkp/vqVsjXvZNHpYuTkx6tCijufvkB3V+hdf0P67B+rGejWMSztL76+oocSkm9S0pnHcI+op4YHB6lK0Tu9/+o1+zv1MK4raqmf/too2347uoDsHXKOiHft0xDh/Vg1Yz1H6PDFN07rWtr/DZGx/5pO6dfAX6jUrTV3sucUifqsbBrTVhsdf03p/rVR+Fepg7gEptpHq1zT+ypqnP038XB1nPqdJd3m2z8qXej+i0Uk1tHLuh8ozPtqzDw3UuWX9wM3YP+/R+vlZqtU9UT1jozzzajZV4mMjdYeytGV3RTXWJ7R3+1YdUxM1qneRlR791+KajipzXLdSLRiunHT18dbg5y83rlEjrbzuSc8tH3hbX64x0mHK68oszg+MNJq+y74WTyGtBNpOK43HKT55voqK5iul5Q3l03tBrrZs+kkxzZooMmevDvrWrBZs0kuTftHIO1rowJXm+Yow0kqWMny+q3RtrZlndzOuuxc814uR98yYOtjOt+wWqYD7b6ZD39a1Cmp6QzrX5a/d5zbb22qen+I8IdA1bnKw3bM+Ur692ZXaJx+uvA+VviJfkT1maP2ePH2+9E9qqq+VsXqnjh3epXVfFtnv7dXuTTPUPbJI2Zm7dLjUR5fOJ1w57+nZhSqdT0zKUG5GsmLNi6qS17Pnfm/cT2b82T4uZppdXrJ/lb1HW59T0ooV7L5atiU2WIuUs/zte21Z+payW/XRnZ3qGXlOlJre9Ae1K7LT1jdfauO2aHXr3ExGNmYcu/qKS4hW9q6DxekiGMd5rsVsRVqg1L//S00j7Vkm6/77ltR3gPo0Na+JGopOGKv39y3UoFgjP6smAt4fcLrUUfOOzaVN7+tvxRmlIaKpBmXs0vbJCcblYjaJTlC/e1er3osbtXtftja82FCr7r1bjy3/uvimGdyX+vjfhhqZ3DatfKarfvPeFCWnfqluSz9T7s4luufgc/rjfYuMm8sxZT37kP64oqFmfZyt3H3b9GbHLzQicYIyDpmZzW+VOCdLuXN6K9rzwT5OKOetSUpZ/BuNttY1tjN9oLTwSaV9sNfYTuNG/9RQjdr6e80x3t/98TD9euunKrLXduUs1WPJy/SrMauMfTQy44/nKEnLNHHSB1bBxfLlu1r1q2HasMf87N8ra0SycQy+V+uRS7RkeDOp6wxt+Gyk4k9s1qzBD+mD+pONZfca+zhHHXaNV7/R7xgFbfNGNE39RnyutunG8dyzSqN//aU+9G6IrwvjNWLz23rYyFdqDX9bX5mf/W/mG2WO5zsVnR/jprJ0p2qP/od1vB9usF5pt4/Q+03+os/3fWZs+4V64/FF2hJy4c+fOuo0aLBiVrylVXklBWhX3kdavq25endo4OCCruicmox921RLQzd9qc8/fEI9WljZuEdhoPPwngpb36DEyM+0fOP+4jRsbWvO9box/hJ7jj9mxj5V9/ZdbKcV7/H+s+ZkFSgq4RHNSrrSkxb8ZNiuQ3/XE0lz9d0t6caxN7cpXd22Pqnk5zdZgbtVQFaMGtQ1AoLKKNipNUv/reRGFt1bs/etU1pCSUHTdfyYvtXFqlvrQh39eq+O1W6kK+pcaL9bQ3UbxihyW5a++MasFqit656coWH+jkVUB6XNvU/xF/s7o8YtNt44tsrUmqzv7XkV+Plrff7+16qV0FKNIrw37Ps0steVZdJMHSVMXmcXdH727IO3kB/IhVeqdc8rdWzlRm33LbBFJSjti9LHxz870GkVr+Z1Dilj9N0aurKe0lZtU+6ejZpVf7WGDpunLPOzXd9p/w7p6oaX2ttt3OAP7lVeZFu1bhKpnw/tVVbRJq3a00Yzd+Zp+0s9deGBPBWtflWLvr5Jrxn5yvqZ7fTx00usa9FxWnEZBcxA21kUq0HLliq1VRPdkb7ZuKbKHwPXkX3aWVRH8d07KaboB/1Y5D1uRv782nPK6NlOtfZ8qhrm+TIKs+9OGqnZ3/XU28Y+5Zr5SfcvNTHpJU/h8+dvtHdrrj5c+Y3aGAXq3C/SdM2Pe+xzfVJH9gXZf6Nw9cTg+/SGleeaefJk1Vs5RiNe3eq/cFbhub7EKHC94nPtGts65Hs9O8jc1p9V8NVn+rj2tYprFBHkGj9mfGDw7fbkO97tNgv9A3Vw+p/1wvqjld+nYieUt3G1duhKJQ7oqHoREaoZ/4hRKNxr3adr1W2oq30LkbbIuIaq63sRlcon7PSpVmrzu1r2AmU5uJ61XW+svNjKs3d/PEttt461732Vv0f/auW7yrY/NXB+bn62ESQ9/6gmbu2qJWY63PmeRmmRhj661ChX2OuX4iR/881/jD/Nis8l7+vjyHi1ucooqF/WTB1a5WvVui8959J1UDsy89W0RX1Pnlwhp3muoXCr5ozdpG6TR6rbr+15JqvC4ddq16aJUZarvgIcNZw+Fyn2tlRN6/uNnr+3u1qbEb3ZL3n5u8r0RvSuvVo1d6WUNFJ/SjCjcTOyva9UDWHFvBlglBrH/K/WGJ9X1PUu/THeyMBqttWIFbs8F2jh51r26lHdMeY+JUSbN0gj8k8aont+vVLpK72Fx0CMfUleqNwVY+11je3s2EPdahfpwA//a1z3G7RooYo/OyL6Bv1pzG3y5r8Rsclati9DE619NP6Ovk69ujeQvv5Bx71fHHmbRo+6QdERwY6BESxseU+v77/VXtaYVbOF7nywv2pYBe08rV34bsnxNGuCRo3UHX5uBIGVP54VnZ9Ib81EzWbqZO5XZHcN7GveUGqpZeeOqlW0WZ/n+otoDGaLi13bUzKVH9MQEdNFyT0O+BTQj+nz995VXlKK+gSrBflhlvo3Kf35npauCs6pZ21j3xJ1g1GgrNm4saJ/Zc+s6Dx8+zv1GfI77Xh6kV3j5rlZ5/W9QfHBWlAKt+lvU95WjYlPa7z3eFvb9JXWbT8il1WgPK64js10mb2Kr4h6vfXiFxlK693Uc4Opebka1f+1ivKPGWGRXQt+/TX6XaVacYx9zVqrDHkKrf55zsWOZrepTxt/wVKEIqNqGXtj/xUdrx7x3tZKX8b+xico3jofAXhbqVbvtAq9FXHt3a51P1ypHtdcqQutws5RxfVpr5igh+CYvtqyzfj3XY1qF1sq7Zi1nSWtA0YB4M+zNe3a1ep/dR+lLthcXEMcEut8HjUKZVfoNxteU+qKenr4yZFKNGu+jWu3U1IfxX25Qut3G9eOdeNu5lMwK1LuZ5tVZLW4nPScWzMPeayXYs1aYKPw9MWGLxSZ9Fc9M6y9kUYvVM1axufaBXhnacVIC+sr2E6rBrWumpjNQOX8rG92ZRmF1iv0u2ti9J/K1d5DnsoB16FMzXn1NxrVVVph5KXW+Yow8qKX1un9yb3tfaqpeo3qF++D99zeMeYRz7ZYx7OGZ92g+/+9Pn/jRS2sMUwzJ9xoXb+ePDnaT227VwXn2pWjtye9rAPFeWUttb7lVsVZed8xK0BQz2vU5EQF13jQ7S4yCszP6vnifMco9Lfurv6tjmrFZ59pS6X3ycsOao1t1p50uxXap8Uj6no99GKKrlgxUp0aN9JV14/UygYpmvXw9T6FyLL5hEtFx35QUe1IHfuftOLWglI9BUyVvJ7N+1PZ+6yse59O4R5d0X3VOPb5xxXZ8ApFRxpvGu8NmmMEr96CfxmnlL+Z22K2TDVurz9O36l29/fXdebyEU111zPDVOPZ/p6yVOOblCbjXA9vG1Iw4XybjCD/1ela1f1PSrn2UnuerchI10WXqu6x1f5b46oJP0kAp53ZDDw5Q7l7PtKS52Zo2gBpyYhhSul2lyZmHjIKR/+rH76WYppc7nNB1NLv2rQqXdAO6t91aZRdmLQ+r0i1WlxpZP2lebotfK03ktvahQJjamJ28yldeAzMHAC1XhnLlxvT60q99S6ri5DJqhU0bpAlN9AIRf3uGrWz/7KYTbDWuks1b9ydnq5LvkrduGuqfpMr/BwDuwBhdSGIKd6P3/WdZVzy3+uH7w9q79afSh/PqCZqc71vs2ZFyh7Pis9PjUujigMny69rKcrMdENh1bLvVW6pKUuze//WXsBmNYknKM9bQC8wg0Ppnr6tg9eK1B6mJbmlP3/LyHijsGEKfE69yu2bpYLzcLymXZCwa9xc+7Vp2REldr066Lb+vHuDFn75g3ZMvElX2Z/pSaP2AlZB7WKf2ukyitOYMS2dYRQK/p9Grf7Bvh7MAsORgIFIYHZNacBzarYuTlLyq5cpdeYgxVuFvjPpIkVd+u/FXaaC89aO2temdfOroOuSyVvIT5qrLJ9045l2aVly05L17Txu98cTdN3Fe/S3oe3VpMeTyvQtMAVinU+zZq+evjHTU6tb1bN1SS1uxMW1jAK3h5V//dq3teeYDuzKt2uHPYXBSN9g1aq1jzaujzZ2mrPPY2Rt/Yd5Hh2lFTvdB9tOMy+MDNT6dUKH9uYa1+S1imv3OzWv/b/6rsAMJuzuMUMeUTdl6+PivNTsHvqufX0u1syU/6eOI9411jePQ4TdMpNQ0trnG8gE2/8ae60uS9o2ST2MwrHn+o0rnyeXFeRce1pJ65S6xj2VSH/XiPgTRoCQZ+WjF1V0jQfb7osOGPnIZ6XPs93Sv+WRS7XJyT6Vsl1vPPGC3ZKdrw+np+jeZzer0PW9/rl9n8xwo9j+fdpx4Huf+2aAfOKHddp42GxhMa+dz5TeYpXdU8B+v1LXs8m3pcMIpuo3UoyV55otnk7v0RXl55fquqR+djBldp16XRnvZlWu4iBkxnYlTNJ2I6+xWpZWPGSdg4JDy/Vw4iu6fOY6q3eD2SI4p/Uy9XvoTA5gN46n2b1p5fVKG3JtgKAlVxkbTihx7mfG+c3T5wtb6oPbH9WCcl1wz18+qR1nXES04m/trcTkyXp/zzpN6/GNFo5crM/P+gD/Znp46Q6fgoFnKilcBmIWmEbp+m5j9P5ecwDCf+rG6bOsLkKhcBkZwYO/765h75ktIBGq1XWC5phdl5zyU0DONW9a1wYrqlZ1Ribb5hbd02CTUUA/6qkFiy1dqKmcUzunlkDnIb6mImLaq3ero1aN248hdXHydq25VdM+zinzmZ4CrKvcDdGH3f0k5ZUtxmdcpCuuf0izP5yhLqqt+EaX6UKru8/JwIFIQD/r+A9GQHRtI9Urd5F4umUNGfG17ln4Vw2y+s2eaRepXqMmIVY22AUcq3uJt/XKW4Atw/epYMWF/NCb782av1t6D9CImUYa0iINs7sLBebydH1Rc3VocaEVGOg/a6mkp4H3/UtU++KfrZaCk2bNtvccWGMP5NlGu0a+VLB69Gt98ZNva5Jd+2xWWtT8p8O04glgKtrOgK1fVteM/Yo096PGv6v2lcb5OXbC07d+6dUaOiBW+WahzgpG5OkCmzxHW4659KsrO2vYnDc9/b2ttOg5tyouWNvb4T3Xwfb/5EF98UNtdZn5P2WuM2MKUNvsy9+5Pnb8B6OwHaBLj3WuahtBbF19X8E1HhH0vP1LP3wdIF2a6zneJ7vyStHqbhdWi8dFvPqePt36vp6cvklXDF9id4kzu7NusrtweS/CAPlE7f66/0GzhcX8w26p3rZam4q7q1bmeg7mTObnl3jGAliVok8q5dKPlPpIP3Xs+ZynC+IZUtyyNP9Drd34oVaqu/p3+a3nmoyop46JCaqxYoFeTL27OADyN/l7clNIvN2bnrwrSCVRM93zYJLaWC0bRnDXsoO61S7dxfd8V0F2gVMW6JGHxkVw3R/a2q/NG4qUl3vYyDK97C4GV9b2uWF5uVRUcMzINgKwPi9Sx3Z9rbLDXC9sco16RO7Xuu0HK5/I7e5YNYa/oBdHDlBi71uVUP9X+s4e2HxhvUaKN24luQe9e+G9wZpOKG/lW1r562FKf3mk+vQ2gqoEY6e/+1/r3WKbPtNXxRmzfQMpV4CLVJNr2iryh63asddPgejCy9To2l+XPp7WjaxMdXuoKn1+zrCaceo5oK4yPpiv2TMy1XFwlwq6qwRRwTkNroLzYIpopG6Du0sLn9boKUsq7uJkZEmRtWobn/y9UTDxl/XbwUapgnEJzwDKGrpjzAgN6n2T4qMvtNNgtJpfWcvuEhKs/3IgF+ri2kYQtHWvDvluljUI9yF1f3CfbnrzBQ0zuxVaLlSdKxup1g97deCodwXvtvvWrDtl126HlP48XUaKryOr3/FxZX221yc9mzz99d9oYHbTqmUfN7OQH2TMgzWg1s8jhms2Uutr69jdhXzZD1qwBgebf3trnM2C83/oP6IvtpYq8b2yVmeqqFVXXR/zs9VSUNJCaBScPsxQRpG9jVYXKN+uRXb+Y3WBsg+S3dpitjxc4jitXBTCdh7w2zJssbbTbuk08pZa/yl9e+yocjZ+osv/MlK3Rn9rBRuegvP+4i6wo5P76hazi4adl/m2nvgeEyu4sAKu4PtfJ7KW6kb+ZHx3KC3ShpDPtc+1aw1Gj1fPGZtVYI4Tsbr/1KzgGq9gu60ZvtttPza7h1GodV1cuX0qxR7TZLz6+djx0uk29kpFFXwt48gal0mBApedy+YTF+qyFvGK++mYCorKrnSJal3szQcqcz2btmnLV+bYEpO35bGJGtU9HDQ/j7i4tq4IeI8OIT832ZWifUa+qqylw1TL27XvtPA8AMbvo5ivvET/YR4bv63Dv1Fs8uwyAVDpqeLKUv88LeUf6/m+xjVlBiZ2C5r1wBbzQTVWfvp/fipnfq3/rPXv1aaQXV3289yJam33G39Gs3yeVFGY855eeGWDmt7dUVfV8Ba4Zmi62e3JuCHkZ76iqQtPqrtZUKzhHfS2QhvMpuT8TzRv4coyN2kfdgEucvUC/c0czGY/U9l61rla2tszUwuyzcvV+C7rmc6h/77CyV1fKM/MTc2nQjw9Q294NyS6owYmSW9MecXT5O1vO3/arR155veaT1t6ztjHrz3zvYpWalH6J8p3eY+BdEdSx5LB4N8e03GXXTvf7DNNm/KWsq2BmfYTqqznuUfrhqRbS46n+V76fxuFDvszKqu4QBzg/Jz1q+gixfZNUeI7L+jlnISSWppTEPCcBlXReTBvnjVUr0uiEiO/1Ier/7fCLk7WZ5qDESM/05KFG60mdO8TRFpaz2IPftONsAZJHrULyuZ19o6mGttWZA0iruG56ZoDfS+r7G3FLmj4Fgq8g3BfvVCjlk3TI8VPa/PwBO6b9f4ST79yV/46vfzKGk+N9KnGEkbho8AIxMsN/vTHfnJQcXcdKz131oFnJ2uKt8+7dd5G+3TT+tmnkB+kb/NlRkGxx6/14Suv+vy+hvfaNq6PW+LLdBGyC1s52/SFlUds1H8v9nZZqaWr2sQb+dZcvWxdZ+bvv6Rq2MI6enhCb8VGnNCP+d5CkPl0tVc08fHlxdvo6QLlG2TaBWvfY2S1ttSxxhPUcJxWooJvpzwtJJ4xC+V5upp6u5nV0hUtauvAV2/ptWXNldLVuJbtYMM6XxGXqkGcUVDfukO5pa5P39aTf/PpsmYGjp6uRDUr2P8LrX76dbRj8Vtab5wLMw1YTwBsPtJ+GEcZIZzrelaaN67d93YYx9Q4LvNnalpOZw0d0EJF5jgRK0C4sIJrvILttgaBm9u9Up8X/mwckrc09ek8db8vUa3rtarcPpVi5D2d7lVaD+nDibdYffKtcRFFkYrr01Hxbc1tLlL2vBR1NLtQXd1fz5tPdypVQVI+n7DGuXXO1NTX7AHgxv14Q0amTvboorbFaasS17PFyHsWvmWNu3Dlr9V0I90qqa9uuNzzeYHy84jYWzQ84D26gvz82JdGYNhCLVMWet4zzm/e9t06aT/84PS4TG1v6SwtzdBa+3yZ2/jOyv817rV/UMf2XdT9p0wte89+MmLxsbxN3WLKVy6dDhfGj9QW38Ak1+eBLeaDaqz89GplTHnDbqExygcbVmjVT53V8/eV60xblYWUbHEqail++Ata8pfm+uIRewC2kdm0Tnxfl943R69ZA4eMAlfvSXr7ta469GAHXdWwqTo+uE/dXpuvp3ubT1upo04PP6Xh9d9TSrumuqrL69LN/dXJ/obyjM/rNUbpac20yoymG3dQyqetNS1jlBKiLlH8kKc0e8jPmvaHVsa2GN81aKuaPzdHY6wnjgR5NGxErPo986QSD/5VPa+OMTLTx7SlyQA93DVaxzK3a6/LHJw3R7O779MwczvbPaVD0b+zanqsArA1EP2Q0qzvba8RWxooZXjX0jUhkb9T3UNPGZm19xh4tytSV908UF1yzL6ww5RR2Eops2bqHr3g2ZbG7XXP9paaae2jcbNKGFVyPBvfqAmHLlU7x/ldRefnNPA7ANucAvzQjVUQaKI4p4+D9arwnNrLBVLz2iDnwd4ua1uvNE5hSb9uz+MNA/xoXlQnjcl4UvGfDrNu2le1m6zsJiP19tReqhdhnItrOqip2Sf6Ws8jgkuxBkkOlKwBesZ1NmyLGne/3q4FLbD6BJcUUsqkdfsRzP4fi2wHOcVPXDGKkNYgXGPJog/sNF1y3qwmdXNb5g2SXh5o70eKltZ/RK+XGrDpkDWIWnZwZtf2B0gr3icHlXTXsdNzeh9pUbKnYGReI9900KyMKfJ007JbM8r0ny6Z7Md7moODp87XnAG/aHY37zFopX7v1dLQpcv0fLnr4yLF3PSQhl//sUZdb+YRw7T52if19p87Gfthb9fM1tqcbF5nrdRz8aV6bKm3xecyXZd0i05a/ez/oKnbo9XBuAY8j7t1eVp9SrVimrX235fqDlOqz3il0oqvCrbTd8xCOWWfkOUJro797X/065F3WN0oSp8vM+8fryS9rP7e67Px/1MXb+271a3H52lbxV2JzOCigv03PtszmPpT675ipoHU7CYanTFJieajj8sK5Vybx3ThWMWvTDaOqXlcLlOa9XlFVkuu5wlTxmcFvcYr3u5ODz+jidYg8Fi1/sObqvuX9OJ7ZdB9CnqNG4x9vHXCLE1MamnPaKk70tL10t1NjX0zt3m2lTd6RKvL8Nl22vUqm0+Ys8zjNltDv5vsuf837qapvwxQ+oSbjX31LFKZ69kjWu2iszXBus+O06HuMz3bEdI9uuT4mPfob1p0VlP7U4Pm57WaGp/t85433S984NTuQaXY19ZzjfV+V+P8Gcfrqi5/U61H51jn98J6vfR0xsO69D0zfXmP5WA73dgfcdbZ23zfUaVax8UoH0z5l+5YOEa3+ruOzlf2703gtCn7o3UIzen/cTWEC88PppX6sTbrh5z6usv/AN+55PnxoWtLbacv+8enAr5/tvj5QTTzx+XC7gfOgHBT0TV+OlQ2n6jc9Xy6f+DR83kOfwAUIeBH6wDg1BXu0PuL/02jBrUrqcEza+J2JAR4hOq5YvZ7P6SkgE/GqqNOD45Ux/dLmuDPCdc/tXbxZnX8y712jaBLBVn/o51336I2p62GEDgfVXSNnw6VzCfO5vVsj+E0x7BY3YQKd+m/X1yiY9ZYnzPTTQjVA3eeM8V6rn+AbhxAtWAPjLw6Wat+n6Q/+N6szB+5ynjkLDxCtTLqKGHyqxpRPIi6vIh6XTR8+C9KX7zNczM+61wq/DxD6RqqccU/OBdhHM5ULRsZ2rPWgeqr4mv8dAg9nzjL13OpbmiNjLy5v5ZEP6Ilrwys8OldcMLsSvt7z6Ocz3MXmM0T9msAAAAACBmxKAAAAABHCCYAAAAAOEIwAQAAAMARggkAAAAAjhBMAAAAAHCEYAIAAACAIwQTAAAAAByQ/j8ng1Zb+P6lywAAAABJRU5ErkJggg==" alt></span></span></p>
</div>
<div class="specification">
<p align="LEFT">Protein content in <em>O. nerka </em>was measured to evaluate possible differences during their first 15 months at sea. The graph shows the relationship between fork length and total protein content per <em>O. nerka </em>caught during autumn 2008 and winter 2009.</p>
<p align="LEFT"><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>Scientists measured mercury levels in different fish. The table shows the results.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p align="LEFT">Identify the most frequent fork length for <em>O. nerka </em>caught during autumn 2008 and winter 2009.</p>
<p align="LEFT">Autumn 2008:</p>
<p align="LEFT">Winter 2009:</p>
<p> </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>Distinguish between the fork lengths of <em>O. nerka </em>in autumn 2008 and winter 2009.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest a reason for the variation in fork length of ocean age one <em>O. nerka</em>.</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 align="LEFT">Compare the protein content for <em>O. nerka </em>caught during autumn 2008 and winter 2009.</p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the difficulty in predicting the age of <em>O. nerka </em>from fork length.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p align="LEFT">Using the data, suggest <strong>one </strong>reason for the relationship between protein content and fork length.</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>Compare the results shown in the table for monkfish and shark.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest additional information that would be helpful in evaluating these data.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State which type of fish shows the most variation.</p>
<div class="marks">[1]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>autumn 2008</em>: 175mm or 180mm; <em>(accept either 175mm or 180mm – do not accept in between values) </em></p>
<p><em>winter 2009</em>: 250mm or 255mm; <em>(accept either 250mm or 255mm – do not accept in between values) </em> <em>(both needed)</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. shorter salmon in autumn 2008 / longer salmon in winter 2009;</p>
<p>b. wider range of length in fish collected during autumn;</p>
<p>c. higher peaks in winter compared to autumn;</p>
<p><em>Accept numerical values if clearly stated that one is bigger than the other.</em></p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>genetics/gender/ food availability/diet/water temperature/predators/age</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. both show direct/positive correlation/linear relationship;</p>
<p>b. values for fish collected in winter 2009 are higher than for autumn 2008;</p>
<p>c. many common values in both sets of data;</p>
<p>d. differences between winter and autumn may not be significant because of the overlapping data;</p>
<p><em>Award <strong>[1 max] </strong></em><em>if only similarity or difference provided.</em></p>
<p> </p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Difficult because of overlap in fork length between juvenile and ocean age one <em>O. nerka </em>/ total protein depends on fork length/size, not (only) age, so difficult to predict</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Growth is a result of incorporating protein / larger fish have more protein/more muscle/more cells.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. average/mean mercury concentration is higher for shark/lower for monkfish;</p>
<p>b. small number of samples for monkfish (so data less reliable) / large number of samples for shark (so data more reliable);</p>
<p>c. minimum for shark is well below minimum for monkfish / maximum for shark is well above maximum for monkfish;</p>
<p>d. range/standard deviation/variation is greater for sharks;</p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. age of fish / details of the method used / chemical form of mercury / part of fish analysed / gender / trophic level of fish;</p>
<p>b. statistical calculations <em>eg</em>: t-test/mode;</p>
<p>c. exact location of sampling as some areas of environment may have more mercury pollution than others;</p>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>shark (shows the most deviation/variation)</p>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most candidates were able to identify the most frequent fork lengths as 175 or 180 and 250 or 255. Weaker candidates lost the mark for stating values in between.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most were able to spot that the salmon were longer in Winter 2009. Weaker candidates just stated figures without qualification.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates compared the two ages of salmon, rather than answering the question.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>As a compare question, at least one difference and one similarity were needed. Most commented that the values for 2009 were greater than 2008. Surprisingly few noted that they <span style="text-decoration: underline;">both</span> showed positive correlation. Similarly in the second part the large amount of overlap between the two ages was not well spotted.</p>
<div class="question_part_label">d(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>As a compare question, at least one difference and one similarity were needed. Most commented that the values for 2009 were greater than 2008. Surprisingly few noted that they <span style="text-decoration: underline;">both</span> showed positive correlation. Similarly in the second part the large amount of overlap between the two ages was not well spotted.</p>
<div class="question_part_label">d(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>An answer that implied knowledge that protein was a structural component of the fish was sought, so more protein as part of the fish meant a bigger fish.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many lost a mark for not stating that shark had a larger mean mercury content. Large numbers commented that there were many more sharks than monkfish in the survey, but did not extend it to say that this meant that the data was more reliable for the shark.</p>
<div class="question_part_label">f(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many lost a mark for not stating that shark had a larger mean mercury content. Large numbers commented that there were many more sharks than monkfish in the survey, but did not extend it to say that this meant that the data was more reliable for the shark.</p>
<div class="question_part_label">f(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most, but certainly not all, were able to state that the shark showed the most variation.</p>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>Consumption of dark chocolate has been shown to have health benefits. A study was undertaken to see the effects of epicatechin (Epi), a substance in dark chocolate, on the aerobic capacity of leg muscles of mice.</p>
<p>A group of adult mice was used to measure the effects of a low dose of Epi given over 15 days. The mice were divided into four groups and given either water or Epi and were either kept idle (no exercise) or made to exercise on a treadmill.</p>
<p>After 15 days, the results were analysed. The blood capillary density in leg muscle was measured under the light microscope.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="specification">
<p>Leg muscle tension was measured over time during a treadmill exercise in all four groups. The muscle is considered to reach a point of fatigue when there is a decrease in tension to 50 % of the initial tension.</p>
<p style="text-align: center;"><img 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"></p>
</div>
<div class="specification">
<p>The scientists tested the expression of four different mitochondrial proteins. The protein samples were taken from leg muscles. The technique that was used to quantify the amount of protein expressed was Western blotting. In this procedure the thickness of the band is an indicator of the amount of protein.</p>
<p style="text-align: center;"><img 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"></p>
<p style="text-align: center;"> </p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the significance of the statement: p<0.05.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the trends in capillary density in the results of this experiment.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how increased capillary density could affect the aerobic capacity of muscle.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the time when the point of fatigue occurred in the Epi–exercise group.</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>Compare and contrast the results for the water–no exercise group and the Epi–no exercise group.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss the effect of exercise on the results of the experiment.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Analyse the effect of exercise on the presence of the mitochondrial proteins in the leg muscle.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Mitochondria are essential for aerobic respiration. Suggest <strong>one</strong> possible role of the proteins that were studied.</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>The scientists concluded that Epi significantly increased aerobic capacity in leg muscle.</p>
<p>Evaluate the strength of the evidence provided by all of the data for dark chocolate improving the aerobic capacity of athletes.</p>
<div class="marks">[3]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>there is a significant «statistical» difference between two experimental values<br><em><strong>OR</strong></em><br>there is a less than 5 % chance that the difference is random<br><em><strong>OR</strong></em><br>95 % or more probability that results are due to the experiment «IV» and not random/can reject the null hypothesis<br><em><strong>OR</strong></em><br>there is a relationship/correlation between doing exercise and capillary density</p>
<p><em>OWTTE</em></p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. exercise «significantly» increased the density with both water and Epi </p>
<p><em>“both” or OWTTE must be mentioned</em><br><br>b. Epi «significantly» increased the density with and without exercise <br><br></p>
<p>c. Epi–exercise had the greatest increase in the density<br><em><strong>OR</strong></em><br>Epi increases the density more than exercise alone</p>
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. increases amount of blood taken to the muscle <br><br>b. increases the delivery of oxygen/glucose/nutrients for aerobic respiration </p>
<p>c. increases the removal of carbon dioxide/wastes<br><em><strong>OR</strong></em><br>increased gas exchange</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>175 «seconds»</p>
<p><em>Accept 170 to 180 «seconds»</em>.</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. in both cases the tension decreased over time <br><br>b. Epi–no exercise lasts longer/more time until «onset of» fatigue «than water–no exercise» </p>
<p>c. the rate of decrease in tension is the same/similar in both </p>
<p>d. Epi–no exercise has more contractions per second before fatigue point «than water–no exercise»</p>
<p><em>Do not accept numerical comparisons without justification</em>.</p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. «exercise with» water has no impact </p>
<p>b. «exercise with» Epi promotes higher levels of tension for more time </p>
<p>c. «exercise with» Epi increases the time to fatigue</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. exercise has no/very little effect with water <br><br>b. exercise with Epi increased III/IV </p>
<p>c. «it appears that» exercise with Epi has no/very little effect on II<br><em><strong>OR</strong></em><br>Epi relative to water increases all 4<br><em><strong>OR</strong></em><br>exercise has little/no effect on protein I/II </p>
<p>d. exercise with Epi «appears to» decrease I</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. protein channels<br><em><strong>OR</strong></em><br>pumps in membranes of mitochondria<br><em><strong>OR</strong></em><br>hormone binding sites </p>
<p>b. structural/integral/peripheral/glyco/surface proteins </p>
<p>c. enzymes/catalysts </p>
<p><em>Accept verifiable names of specific membrane enzymes</em>.</p>
<p>d. electron transport chain proteins</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Limitations</em>:<br><br>a. study done on mice and may not apply to humans </p>
<p>b. levels of Epi administered in experiment may exceed levels in a sample of dark chocolate<br>OR<br>levels of Epi administered in experiment may have different levels in a sample of dark chocolate<br>OR<br>chocolate may have other components with unknown effects on aerobic capacity </p>
<p>c. mitochondrial proteins may not improve aerobic capacity </p>
<p><em>Strengths</em>:</p>
<p>d. data supports as dark chocolate contains EPI </p>
<p>e Epi improves capillary density and would therefore increase aerobic capacity </p>
<p>f. Epi improves fatigue resistance </p>
<p>g. Epi in combination with exercise improves it further </p>
<p>h. Epi increases mitochondrial proteins therefore/presumably increasing aerobic capacity</p>
<p><em>OWTTE</em></p>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>Native oyster populations are decreasing where rivers meet the ocean along the northwest coast of North America. These oyster populations are being attacked by a gastropod.</p>
<p style="text-align: center;"><img 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viWufqJAZYAEtLYAJANuXNzZe26daPBn3pkEUMPYAzdQdyBWQDFbN2mKwb4fkovZK7rvryE5THrWacaR224LqgHsKbZWx5Hk3e9JTF7dQK4sSeAageIffP8UrceOWyMmcowIXQJqqrp+g9QVdduil0rb62nr8wDiggVRJZ4+5+8M3K1vgfv8PUhp/v+yyT0l0Cp8vY86FAeMV1eAZb2OAPcg0t8xHlTzysfhbtetFo21EOp5+PcXD8Diwxtq+m+3bW8+os0dsU5Ttyda4BMZmUByNpUzylmTmln92MlnTu2F5tIeyi/5jk/K6C1f6BHNuXMwvp0oZS6tKS2XJkhPfRbnmPs5aW8vu3uvMHTgmo39NZn3pZuHmgeaB5oHmgeGOeBZQ1iz3WPrQNodSArBlVARTe7CSADoNWN26dizSEADboYfRmIu4GbAZKBP4KDeeeVGMg7EMuQSl7+mW45gQMsddoB0EYms0mxdVACsdC43tCXbCrvwtmu0JXWiTLgA7Z6cNUBYG0f05NVBiCggqKwFSDUbX7vTKys0MdG/R2IxT7bRJ1tJWa2k6AOXhYDLAF2qpt7kCgwlTYedSdwVN1a6WudIBgN/Yy1dtb2YIP6nQFGd68XenEbPxK0XztqO9iGqsqpYLA+nleXs6PQ5gMZ+CaXuVEvb9fnAK06/UFDX2Jb7c8qG4CrPF5yquloxagc/wrs0Y/NzL5WvwEK+SFXd2lwNjMk6Iiuz6qfunN25EdfmOOlRfuj9yfncm1HbQ8yzM/M1B972pbbv1jatlb7pKrnlWC/nlPWtbh5oHmgeaB5oHlgaQ8saxB78cKFt1rPAN2BCpABwymglTDZvd3tfpYMyTHwJhAroEUGdaNhW5kO6aCmLsx32w0JBOET8AF8ALHEPmK2ng3yXUdaywAgdbYJ8FFD1aO6mEVk94FuFg6asHluLi1rwPaOu0tgAyDJLbIADeRXrV49mhGM9gpaeaTNbDBiqlEBngQUzNIigzbHDG5VF/+ZiSXgA0B67ws+z1pnmBP5iBb9GTDVfFUPUcJewUMeMFXBMj1dfdaZW3gaHjYOlXX5rM8ZSsqG4BffUa49WZxl/qDI+qizXDp5c540fDlmCQVl9Nf8fF1fq42Uc8zMVJuwr3/MX2dEK3jlBxlgs86Worvq7U6OkR/q0gnooq+6cwZafFH1VV9WwI2t9YcTNJBnXuhrWzKw73bB6LaO0w/GzOI6k9vrqz8olSdti5sHlosHmCAZF7ivM+5wb/THr3nuiQQmVkhDY9lQFnJaaB5oHvjxPbCsQWy+gQj5oqkduMrN5mbAhwnmOtDl4/PgS49wefzPqBw3lTo6jwZ2gEIFSg7cdYAHqDDQjguUA/wEf9BQBg82YUdwxv6YFfyFHGyCtpMNfWyn1S2JGKcLMBPyB/ZUMNLdDBNAoRye0NPZDyAOUJrWQ2In5fhkwXKG7mWxSd6YH7w0hlwObuAV6NR1nuaHYLW6Gr9WMMPMIfzwKpv1pfE1pwDwdX1v7wdaUX880EfQrl7NW+318X5dV1tlrV7d7yZRZ1zrEo6ato/pJ4BX7S/b0OsTEAruohejekhb+7uC7QoCqxTKOeo5BSDvZVTwa71a+/OOtvY+q+fh7Gyd9VVObbNlnKMAYsFnbz+y9DW2axeAltlvg+Xk8/lse4kJyCJIX2P6pvYnddIaQ2O5afNZVxC1f80Dy8ADefzJ5nD+5p+J0HEP5b7KfZSJCCYIuD7j2uGly24syHJaunmgeeAn98CyBrFc+Ab2tDRwE3E2kHTAhA6UkQdIERP47w2HNOtD48bibGoXV9mVh7SDLzE3pkAUIzjSy6x8i//PbZAKAMPALcAlpoyjt0DqPvalMUqiffqE7a3cU7fzR4CkDtDTfuWGHmi6l74ox7cx3zBu1kHwkWTgjzichY0ZvjqrB8Bi+YE+jv6Jl5Dcogtr7JG+baYqH7kKWHkkD9jC7hrXHwJ1ScNCIJX7THk5FhQiu9LWWL5MS3p0DunnIUGiGVMVoLKX0duKPgCnOqr4HtBWINqfg+NkD8tye/q62vMMpoJY67CLczDOk64d1dZ6plSAXG1ANr6voFcJNYYny4C22tLzQimddVVXpYkflgvFtlzzwLL1QIDVbozgHQKuo/qzrsREBNvurV6zpqxdtbpcv3Z19KTQa2rZNqwZ1jxwC3pgWYPYBc+Xu1kgfBwDocDCmPruMWcAx66cYTxAaNc5PvpBRh2Ue/BVZ7J6gOWAK4AN3YNOVv2gOLLwh7TOtgCMLHugNjN2Az/2+Mb4OHkM/Moknkg+qSI7INSB1wwU/DmAbtITzFwzo9bpDj/xo6GTiS2hj0dhHeyMHxL8SOhAEfwc0GIPM3E+qidfQ415lBy2d4+05alllaaCN9qIbXXmEhtqO/pH99V1wvK3ekrbF9aoo85wWpd9ZBmx5bksp5eqX6ouyximq8/q+Zj916eHHH2+0uDjWtbzdAUdKeXZPtM11tfdNdZda/ZVr62m5FUmsXpzGmrz1isL2S00D9wKHnBCgqd9nMcr2MJw8FSCcl7o5R7py7fXp6dHQPZWaGezsXngVvLAsgaxzjxy83A21EEwABgAh0EZ0JFmEV0jS0dAn8FeHtIZhBn0F4KiCiLq4FqpQ9civao946rZ/kgbiB302VAo+DogG/aTZuP37sWwcfLiRayuwhuq+vn8KSHKWRpAGp3dmmHKpSXmqIC+thE/UNaDispNHruZbSPm4GUmwGoFsezMUOVlENvbX+X7qFndxmFzh7yqfuiZeeWxdb/eTHmVD4BrycLYdjjbax4+Qhd1vqA9C/nfac4+HcdHm62vcfWf7axdLnDUkNwHVao2j9Nhme0kb1utc8aVvqQOWzz6/sanOLXawXINZ6xtw1Cu8omlUZ75zGPd0EZps7yWbh5YTh7wfotNntOct567lK1dt758/Zf+s/LQww+XP/2TPyn/1z//P8vmLVujGZcvXVx0XexyamezpXngVvPAsgaxvt3NDcIBOG4grmntvM2NJNZ5Dm4qVHPzmWNw7pBA0FGRZjWpQ249vEmRr2nB6LjO9VHquDpAnusXlRWqayZsiHwCAdPdL/ux8tKsFb/yK8ioNgJU4hH/aGa0zsqFb9itoZs1pY2AV/zpDVhd+kD4G7x+zrfbLQHgBWiFn/Yhq86g9mVDueQFML0OtfZxreOxdV3bie94BCfQVG6lY80ss7P9y0pVh1tgCQrrC2gVaAvkK6DtNdfUuL5EF8F4yLNUHt9oc417ECsf5QvBrDU57tuSS3OaPhCA9v3ndmK1DdoiX/XjeF9UECvlwnhcXyqbOtMLuWo/DMvIj/P7OLpW1jzwfnggA1j012u2vqzl5AnrYD/7yCPl537uZ8sdd9xeHn7ogXgR9zvf/lZsw8hLXi00DzQPvPseWNYgdjQY+ggUoNn5ANBmiCE+rc2Lt+4Bvh34jZnUDozEANyhIvg4eEwe8ehztlUygzyzaa6/pZSykV3MGSZgqT3GFdzVKcMMgnh5aYTMJO5kM9u6WBjNTEdbsE3gPR9fDoMPe7IuAE0GcDzWr7Oi9XE9PLQntyunBUb1xt3TViBbQaw6w8+dPOUSA1L0mbHlxlV+P7NBOXbUI3LRWwDbKqP2zdxcBa3orkAOH1TwBh38gMkKtisP0gjaAk3Nv3V6l1NFkB5Eg389b5yFC2rxizqq/B7Ewkedh35WQC2vuZ7G2nFx1e+a5Oon2sNWavVHCzqzvfRLBpBZD+cIQR772DJiy5RJGf2gHGJDPgcoy3VtraBeavFy8sAQvMZ52z0CincKuh+pLC/Yun1H+cIjXwwAyzZ4TMAcPHSoPPPUk+W1I6/EFx6XU9uaLc0DHxQP9EhwGbYI4EGIgXSwnRPbaDFEOmACCvshszYGvvrGPbOFtSwDCwfSOtaGtNGXn6CGFrAmXZWwcADOA7j1fQyIcka0L412xQxmLVMG+jI47zlq6urV6WgHdBm0UTs9fTVmfQUmFTTUT5Oy7RVtpAxeAsAcGRX09OCGOuypLx7htOo4/MeBnAo6AIS+9b9wXaP+sm/Mh+IBgKFMOuwDzNV8pSYtcMUmZVUfVJAI4GK3A/qK3zak9SlS6k4IfZn6Mo1ytfHtYnmrrxaeedYp07i2r7Y309R2VY3+4GDldPU3st96Dg7te6sOAGoF8cwSuSbZ/sygGV76VRnIrv1PqvazdmG3256R9nyyPRnEVjnVN5RbF1LTj0GfuFDeQvPAcvFAnOvdDCqAlvz86KMn82WKp1+zs7EG9otf/nL50L33lNdffyOuI+6vhw4dKrffeWd59ZWXY8eC6StXQgbnO+MS1xsTLfm6Wy5tb3Y0D9wqHljWIJa3PAkMlHED6WZGBZYOinWvzToIZ6DGAAwQkL+CAR+xVrBmR3EjqYN+LWEQX7WqPgJyoK40AClk1gEcfdU2gCV2ug524QwkdhDUocxaWv8jf7h5fg/q+kfyUNcbXz9zyHZTgjx0yAcoXrlyVdiFvwDQ2EnMzVTbkan9lLkBP7KqrqqTtq9ZU0FRnaWun12Fn7ztgqc/8NFCoFtbvPA/9q9cyXZevDVf24D92FOBKD6uYFW7Zmfp4zogrFhRQXAFXBWAw0vwx0F/LtT+0QLpsDmna1/T5z3Q1x/wLgTetc3yr1hR1ymrI8fdhE4U1fO4+ggfOPPfnzPOmFZAmOWYvsZb0HEu1p07eh/W2dH64KLvS/jQ4/lLHrtrP/VfA7PcNkNT21zp6w+Iet7b7izTc7L231u34EK+PscPnj+Ut9A8sBw9sGbt2vhQDACWfbj3335H+fznv1Cef+GFuIfu2rmznDt/rmzatLF87OOfKM88+WQ5eeJ4NCX2kmV5V/dUhPy4Gd/l2O5mU/PAcvTAsgaxDMwEQQkDbD+jVAdRBsDZ2QokGTwBHdAY6sBcAQhpB2PrjQE5AiYHY+uq3AoAHMD5YtPERL/OiW2lqANUVbBcwQMyqrweBFFWgXjVIFjpaWs5/wVrQ7sz4ISugjR0A8IABlVG335l0g5s6j/3KnDIAI9PixJoU9/+CpqxqYL4xUHJSFtnyFK+B+hUXRlkCdjqj4XqI3wIJUsEKuBZaHMFRNhru4N6TL8P7SHvF8NqusrC7+gA9FuuTPKWQTfsI4BkLpMW/lye05zj16/35y+0LI8QcOYZVOoI8AtamSWtB/ZUvwLAofGc6NhSv9aSujVaBfF1C7O+D+SBRnvreYRt2Cj4r+dg1kW74cGu7AP6kYB/qfeHhrpa3DywnDwQ19DkZKxx5emGS78+/ZnPln379sYTKrY6PHz4UDl+/ERZtWplOXzoYNm2bVv5h//g75dzZ8/EuxvO6iJv4fWwnFrbbGkeuDU8sKxBLECJwCDHgCeY7csYwK3v4/7GUPnJ92XjO4YbCiFuVF0aHvK8+c8LYayDgiqG6dm64TXrb8cFMBFgqtpdQSNikWk7KiCDu9oJQAEgUt6Z0MnIwEGQgaxqc7WzB5s96KyWqY9cfdyOPB7vLu6X7A/49At2ka4ziQvBYuap9PVHBfYAcqyvVvX/BVsApwrGiPFdbZ+gFLoKmKofaTcHofqg+qbSV/nWZx8vTGsHfV3tRaTy7Id+drTqVC66DLXNthNQ5o8cz5oqF3polWH7h+3t5WIXMqo/sh+1jwGT8gpgPRfQI699OJIawDjLqueq7eOaq3bn87Ha3rd5aqo+JfEaZTa1hr7NNd99Crqr7botcixP4bwXfHckLWoeeF89sPDa6E1hLGC/cYDswbvvKV/68pfK2bNny92HD5Wnn3ku0jx5OHv2clm9+kr52Ed/phy4444AsTEDyzK12bputo5sveyWah5oHnhnHljWIFbgUIECg+tC8FIH7Tqg1sG8DvIVpOQ0fNUxi96YBmBEN0LPY3cArDsbMGDP8RjIr3B1YCrK46tFPQjqgUq1hzx0lhujD1222TxlHiNkC2jr1rbKD3jAT9CGv4g7hFPtqjqhg4ebLJGIC6oAACAASURBVAG/VHvq+t/6OFkAblxl6mNsREY9kBuiYjkBM8TQVZsFU/ZFpRv+z3YDXgVi8fIEoCgtI8FW+vetdvtDoJSFL8DZvmpvrEceGtCBYL8A1oNcCCvY5LG5vqbUH1j2l32kj4Kz839W18sQfNdzxfLaf+is5fAK8KTJ8qCXhrgCfUFmf+5U+2p98HCudeeL8rDIWaIejNZa+4hc9P+IqTufu7wfE0EH9tpf+LGmZezbh7wqn7qlz5Weu6WaB26OB7zXxiRGt4519vr18pGf+Uj55b/0l8vp06fLxo0by7PPPR9LrY4efS3GDJ4snD9/oRw/cTLWzXJtcF3kJw6A2RaaB5oHfnwPLGsQu9Sgzc2Awb0GZ78qeIoXRbrBHTqpoBV09JBHCQs/ASufNy6oKHNgrsBvPm5W1I3KWdfXoToeLQVfx5tBaFT4TxTYAQtkoQv6+PhB15YADxXdxNxt+CfNRmJrAIKON9rQ8XKzxK6wuwPRse8sZciIsgpkw+aODxms28KHAY5rpZbXuLMfe7QdW/Lste0ZMcLT6ZAO+YIlY99cD/sSyEKOoCvs72xATx4YMk3wpB8QYVNnUPiyzrF3kqmoZ450tq2nrTThl/SjIUr58bOKz+KOD4K9kMV51f0oifMtnU9wo58j9j/u2hlSO/+BeOGrdnX6pNMfcb3UPol1eZ08zq+R/zoefHadzzN73rqspHvJxR8JnaYFUfQX50HXV/F55y6NnkDnXftghI4Q52d3DnZFLWoeeN894HWpIdyruH72HThQHv3q18rPfu3R8gd/+B/L6lWrytVr1+I6PXf+Qtm+bWu5cPFimZ2ZLW8eP1727NlbWEvL1+niOuac9xpVeIubB5oH3rEHljWIDXDQNakCiDqgR1EHThkEAwR1ABMQx+N/4EcM/Mw2dbOs5EcgNt1AquwOKKTZTIEU+uA1AAQZrInXrVvXA9jYzaCfZV27dm3QQCd45MYlaFNmBh+UmfeGqd7FbNd+7A0Q27VB+fJDF3Z0bT937lxUUc7NOsAMQEKfdqBSII08vMCnFg29V+qPAGwGnIbvkAMA7vLyjIulyTF0zlqEjYM+i1nlbtcKgRz6Bb7ww0cYDRhJRlSkf74xbFFuG2UCrpDZyRF0RtydI/DRDgatcQF+baQ/sJkYv8EXbe36Q9BHXfw4SwKhJUAffdS1c9TH3Y8K9kmmPwK8ducIvJ4roa+jVV60wfOo60dkELId2mBMHfKwQTvI0w79pw5jAGzYENLbv+aB5eEBrhfOTa5tri+e4rCdFp8TvPdD95UNGzaUf/973ymXLl2K48D+/eWZZ5+r11q8H1FfouU6+8Ijj0Sjfvd3/t/4gci9xr1j84/u5dHyZkXzwK3jgWUNYnnzk8CA6gAYIImybkBl8KOMQZQ0254IoKCJwTstFRAUDbtIUDosR66DN2kOwJOP5alDL+UG8oTNmzfHQM6MJzfAuAnyadmpqTjG8Qwf40JrECCQR0c+4LOtxNqabTMdgKmUAshWBiCDG2vU4dMEPnP70T3VgVh1aJ/AJfpIIJti6OBBZw5ZvrZbT1675SOmH/EH7R7p9QdI5zPogqcDUKTp5yjrbFEPZfgj94k9irX6TDDmDE3Y3p0X4Q8Edm22XeowRteorptFDdCIb7vzFxp0EmebyFcV6QkDgLTbN5nPCROCrptlB3oKYNHrwbmlbOiVjd64dmhX51PP2RC+xD9kK0vZQY5P0jWSRVydrXsxqzPXtXTzwHvpAc/5cToAl6vXrInz+drVq2X9xo3l4vnz8WLB3r37yrZtW8v16zNl757dcR3t2bO7HDx4Z+zZzb1+06ZNMfPKcoLLly+Xv/k3/0bZd9tt5Z/+k38c1yBPYzgWCwuun8WIWnnzwE+5B5Y1iGWd0bjAjYdHmgILB04uesqWetxpnTcvbxQAmBwo54BOGusBT2vWrInssE4aYnmltQ4btV07rAOUjZMJnXKozzLgVR518hMDPvAPQV3G+sI6ZFDHQRsN0pNXd9Yj3dvFyJGPmKBt5rMN1PPyhHVZPnQZ8I+jsS35/Lhw4cLIhtwuZA/PAfX5A4S8bTCd/SS9sT9AMli0LrdTO4f2SGs89BXl8tj+LMu0fMoZF8OvDOhtl/Lhsd4fgtRZpi20lXL55dOWcbo9r8fVtbLmgffLA/yoAmTywxcwC4Dlx+I9991fPv2ZT5eHHry/vPrqa2Ge5/srrxyJp3OHDt1V3nzzeKydv+fuw924tLLcfffd5Xz3BIz7L3KvdsvO3q92Nr3NA7eyB5Y1iM0gKzuZgXOpgdkbSuYxzQCcB2bLKQNYEPLAPNQ15F3KDmWN41GX+o0FPuZznHUN7dLmYQwPBzZQl21hKQTBMmLTGSBKo+xs01JpZQ35yHsM+eGRnnRuc6a1XblsXFp5xv4wQgdlhmxP1k89fQKYJiiHNH0ooIvKwT/lY6syJbH/jaGVXpphLO1QFnSUaZv1yhRYSqfct9Mn3bh4yDvMZx7qsEG7ch3ppXiHtC3fPHCzPOASAsYTfsgCYNeuW1f+ym/81fJzX3s0ZlcBsYxT7A5COHv2XIBertVjx47Hexs7dmyP+9hjjz0RSwjue/jD5dknn6jnfTfm3Kw2NT3NAx80DyxrEDtuZsyBkJuEA3fuFMqWArGLgSIBArLUYTyUn/NLpbm5jbMRXVmfMqAdgkfriKkfZxN1AoFcT1pQbDl00vJhgcobUZRbJ1+tWSh/MduzDvmMkUu9NMbUD+VpA/FSdmQZyJGPtP08LFMevLmOvHYo13rztmVcLE3mGcqThtg66D3Gyc1lS50b6oV+KXnaAI1p46wry8vlpKH3sE56yk1bR4zf9X0uJ60vhuUt3zzwfnrAlxJZinN9erps2LSp/Pw3frE88oXPxUtcZ8+dix+xgFTWt16Zni77999WXn/jWDl27M1YbgC4ZTkZs7nnL5wvq1etLp/93OfL0z96rEyuWBHLDd7PNjbdzQO3ugeWNYh19muckxkoGRSJHTRzGTyWk84DdU5n2Q7A1htLk+VZttjATD3043ioE2QpxziXw5ttoM486Sw7p6HxGMqDTlrWcxHID4GE8tUnD7Fl2kxsGfXS5vpMYzk80GYfqlc5uU6+t4sBe/ITI9P2kScYK4u8bbDMPHXyW3cjsfzQ5vQwT532GENjWt6lZn2lwU74Mq9l0ixluzTyZ1stM85y5Mv0uR6eH8eHWUZLNw+82x4AoC4WOKeZfWVt7Mc+/ZnyxS99uTz80IPl+PHjMVHCrOvpM2diJpb1sGV6uqxfv67s2L4tntwwe3v06Ovl6rWrZeOGDWXP7t2x5RYvhG3ctKnwRcql9GOXa+8Xs7GVNw/8tHtgWYPYPKM6HDjr9lq+emM3AlD4dOtbF8vnQVbqHGewl8sXS2tPv6H9WynzRwbeWtuXKIsS0sM85difbYTGNpG2zjLyvkcDbhvKRSYzsbku0wh8eitrCvmLgRF1I2dcAFxKo73ZdvmkGSfDOmnH0VBG/ZAGuzmncjnyzHve2D7qOLDVpS3SyiftODv8oo9tVR60pA3I9LAsx+pUTq4zrTxA/9AmbYVWOtLjdFpvrPzM64xwlpvpxqWxaWiXdLbLdlre4uaB99oD487zrJNdTT7/pS+Xv/W3/tuyZ8+e8qMfPRFfhOResWXL5jI9fTVmU8+fP1/OnTtfrly5Ul586eXyxJNPlQfuvy+22eJDCFu3bIndDH742I/K66+9Vg7ec2/50fe/FyB1MSDbrofcEy3dPDDeA8saxC4180Rzhhe5g6qD4rgmu7dsxlngCcHcOJ5xg29/8+vByFt5K9DETulzWnrrzBPnsmE7c560MuHJfMihXdovnzGA30+S1k+O9rNlQznapg7jbCty0TWON5fl/jHd21Q1kR+W1fZUgJzlZdtIC5ahQQaxB/VD3mFem5RLnsPzxHJlZTuRZV6dOZbXtdnQelCXecfl5V8qtj3KpU8WkzuUsxSdcvUPeemHct5JXnnvhKfRNg+8Ew/k89Tz2Be3FpPDLCzX6a//+m+UU6dOlxdefKnwIQM+K/vccy8EYD156lSZnp4uDz5wfzl06GDcW9iVgDKuO8Aue8P+8Xf/JO4hrx09ylVeHnjgwXL0yCvxstj0lStl3foNZXr6SszgwsfLXrz0xa4ILTQPNA8s7oFbCsSmyavYRJrXsChLmw0VypYaFH08Pbyp+Qh6nKu86Y2rW0rXOPpa5kzlWwFw1mU62zpMkx+W9XydtoTYM70zj1ApQ8Cz2A8IZC/WZuuUtVj74ddG+o+vfGUbMn9OZ3nw10/T5tKapo+Vby15DmcRKZcGHRzalcvlxy+USysNPsw2SgNflie98vQhcgnKtV76LFvbrZOPGHmZVnmWZR7oh/ksi/SNBGUTD+VZZ7m+GCdXX4yra2XNA++XB9gSjsf5l69cKfPz7A0+U9avXx+zqqx95anOmTNno46XZNl3+9VXj5Zr164X1stevHgxyt54/fX4muFdBw+Vbdu3l/3795cPP/xQfJ723/6rfxlyALCsq41tt+bmAsDm+/P75YOmt3lguXtgWYNYN3DHiQyK8efnOAFTGdV2no7NpJZY5yQQGHYMA6lLA8R8iuczqDlwY8OW/pv3Xa2MmXhMOtqyCO1i4BEx3tTkByAIFqgXMNR0VYyaDNwFY9Rm3kq99A8A5HMoI+tHVgYj2misfHkENdiX5eV6eOwDgG62Fx6OxUKmlWZYRh59HARj6c0PaSyHLs+oZnuQ7SF/5oPWemKCsfqHsf2oHOmVL72ylUl91iWf9fIplzwyyNtP0sLrD76sV53+gLBOvV536rAeufBQrwztaXHzwM32gOenejdu3lI2bdwYn5M9d/587Ejw0suvlKtXrwUwferpZ8rpU6fKzl274lphP1juCSwr2Lp1a/noRz9SNn/pkXLx4qUoZ1kS9ayd/eY3f7Xc/8AD5V//P/93eem5Z0fbeflCcPsIgr3Q4uaBxT2wrEHsxOizsqVMzHcDMfBxgkG2b9RoUO7AgMCnp+hTGWj1pYA35nMFM6lmKWHoW6o+iXm3kt5kR21O4Iuyvv7dN01AYlu0YbFYuhwPaa2zXPv78pqynlxOS3ejMUDJgC5lEQ91S8c5k/ksv9EYuVl2Tt+oDOi0MdssvzKtk96YcusyrWnlGOdy+YyhyfXyLFYOrfqJ5TXmzW3SHItdn1lHSzcPvBceiHMwfRiH5QTMkH77298um7dsCVDK0gBAJpMYu3btit0ITp8+E+c32/fxgheTDcjiS17UAXgpf/31Y7FulrW0DBsH77qz7N69q2zbtq1894//uPzet36nzJw/X7+IyMdrui+GvRdtbTKbBz4oHljWIHaqmwHlhkFwIKxZ3kDvu2HBANuB0b62Ty32CLrOOKGjpyXFzcYXtLgxLecgQMDO6o9qr74xpg05Pa5NvYyFtfDhq3H8uSynx+kDFOrPTCtYtMxYGeQ54F0M8GSehdb34Evdw/pxeXUuVjeuXPvUQ+wxjv5Gyobt0g+Wa6fxYjKtl086bSWf0+PqLRvGyrZcOZaTNw0NeWZh6ct6DS7va8x2tfiD6QHPV1rHutQ7Dh4qW7ZuLXfeeUc5fOggZ2ype03XXVUAp7cf2F9ePfp6gFc+psILnWwPyY+zS5cuxwQJSw82bdoQL9Nyj4P+zJlzsQ3X3YcPlQP7bysXL14ov/+734oZWQB0C80DzQNv74FlfaWMbigsIYjH990AR1Q/NT8CnQ6O0eQlwOZiwAeWmIsdO4b2IFqbAuxOzI9mb9/e1T85BYO/+pFGflywXHriXJbT4/gpG/pJvcaZzzL1ZPmmBafwQS/PUA7l8linXGWQH8ef6U0PYx+FD8vH6ZWGusX0DfkynXw5VuaPG4/zDbKyb6Qxtk6dlHtYNozl1XbrKR/Ks46YOnnJy5/1UZYDM1vyuewg17d088D74QFmQj/ysY+XR77w+cJesHt27yoXL10uJ0/Wz8iynAygyufF2emFNEtj2BoSIMvkx86d22PmlnLoduzYEUsL3jx+vJy4cqXccceBcuHCxbJ3755y3/0PlD/49u+WuYmJWHKAvBaaB5oHlvbAMgexGs/2ARXIWkK8CIbLJG9J5wE2Vw4H1ly3WBr9g/F4MdJ3tVxAgM2ks+05b31us7walOssy/IsI7Z8KRCjvKwnp5FDPs+6WU8ZaULWYX0ut21BPPinjEFxZHOd6aVkwZT1D2XKq2+oJ+1B3h8E0hDn9g1lLpXXZvUQZ/usz2Xoy/lheqhPGcpeqn5Yl/PZB7kc+foi68InP65fsvyWbh4YesDzjXJ2JTBQzhpVPmzgnqyck3xa9guPfLF8/et/odx5x+1ldm42XvBiqQA/utjrddvWLSHmwsVL8TSBpQbnzs12QHZVgFmufXYqYJstwC3AFMBb95s9UR5//MlYUsBLYbw0xgwsOrxnjOxMNlOmrdbf6nHukw9i+271/lnO9i9rECtI5aYSfwtmFBe6NQ+G+Ya1kKoO+MMy8iyVHNwnxpGNQBaVWedY4veokPbZRmNUDdMAbH04tHcp28PfHSMyc94mWa7crDvTmxacQJd54bcOWussM68eaExH4if4h+wbDdozpHew0fZcj3x1mDaf6W40rS+H9EOfZLqhXeSHbZGGmGCeNPZaPtQ7Lg+t9MbSKcsYO0j7wiJ0+lOeFjcPvBseGIIkZa5dtz7Wvcb+0d16+Xvuf6D893/n78S2WXyo4PiJE+X2AwdiNxR2HXjzzQuFl335qMGaNWvK0ddej50IVq1aHUCU83nd2rUxa8u6WM7zjRs3lOPHT5STp06X7du2lk2bNgbfs88+Wz7x8Y+XgwfvLOcvXCw7du0urx15JT6EwLUxzu64fmzAT0E8vI/YZPzQQvPAMgex3aBauoG3ZkeDJN232An+43RtBnxvx/9u6n07XW9X78UcN7cORLgf7pAXu2/UduUqI/NZZ9kwlsfYevPyk7eOOJcP6zKdct5pzONqdACWkOeBnKHuLFvduYy0gBB5Q37zxP0xlHDjeW0gRl7Om87SLCPOh7w5ho/8MChjsfohvTIynzS5LNPlNbENxOqtFt8MD1y+dDG2uGL969p168rhez9Ufv2v/rVYA/va66/HEoDdu3alfV9nA7hynk7H52RnYpstzuetW9eVEydOxFe5AK1+Nh1Q++rR18pTTz0dM7HUsbSAtbTMvt5++4HC3rIbN6wPWwK4zs3Fi135msEfXjc3wzfvl44P2izz++XHnxa9yxrETk7Vxz7zc/OFnQqYjY3ZmzJR+CY1gYs8jrn5MjfPejy2PapbYsFnoI5w/TogBr5aAy83htgTsBvEydejrpNlbZR6eOxU9VS9c3OzqnhLPDXVuxd+Q74R5XLq87Zi0htP8FZsN5PGGqtYYOGWYzGLBQjpH5XBhy+03VjgpR1DG+RTL14QpOEi9kEk1DKpqs/q+sbZ2PsVPcM1juiCD/uVySwIgTroieGVljpshd50JLry2lcVgJFm0ICXMIyr37S958m06tZP1Kkjx6Gg+0c5wTaZJkYnfuEc4/ypPqlLCoY6oMdm9ZA2b7vURWz7LIOfIB9pQSLpIV0Qj/kHXbbNfqSMx685ZDtyOWntUC/+QQblxsjLuoYyWr554L3yANclywB4jM8erT//9W+Ur//818orR16N+xzn5rZtW+MjB1x/LAeoX+aaLm+8cSy+2uW5zUtdjz/xZHnz2LGyY+fO8slPfCx4WU5w/MTJWE6wc+fOmIlFLrO4zMryhS9mac9fuBDANa69NF7ktnu957IPUroB2A9Sb96ctiwcjW6OzhvW4sDpQNhtUjAaAEeCEpALLJEAKjQV/ObZqwo4kOsNaCRrkIDXYJr7S72ZADCsrTH6LdP+hRQV6AjIhjclQM6Nhao781e9FfQgI26G/KJP6ySwb2KignxBxDh9foCggrJuJryTmXUGzA93jvPF+MfpVeZb+0C5b9sngzW12C+v8bg2ZTranv1CnUAKGcohfjt7FtMFeIWfHTH4cYIczqH5+ckRuFfXUIflys550gRj01lGrhu2M9cpf1w8jg4d0Y5kQ84z0GsP/EMZ2DL08xAUj7OllTUPvBce4PwEyDL7uXHz5vKpT36irFi5MgAnOw88+dQzcb4DRFkHC4D9wQ8fi5lZtthiJnXz5k2xCwF7wbKDAR8+APjyEtdmvt519Wq5+/B8uf++e6MJnP/sJ4tMvgL2g+9/r+zZu68cPHgwtvLiRz2A+qcpLAVe833tp8knra035oFlDWJnrvcXsgCSZjF+TnUzjsNBknoW4bPTAN+9rvTzsRCeXD9zWkFUEFC+YKavzsBGXczSTo5mebnYuAmhNw/GyskDOiCmTtBlXf1sIzzDC1SZyssxgz306rDt5rUr85CWblg+zGsLMQBcubl8vLzaPj5h63Zk6Mx6BVLIUm7WP6SnDjrapH7LlJvlyG9dlk3acmPKhr6mTpnSZd3KlE5ay4ex/cF4NDlZ/ckG5jPdxv7U5x86yFPmUK/lQx3aSbk8xkPanM98udy0tpN/O3lZlv089O04GZSNK9eGFjcP3AwPMHFw+O57yle++rXYJeCxxx6PWdL/+EffjV0JHn7wgXipa+2aNQE8+cQs9zmA6tq1lF2Nl7N4cYuvdAFC+djBk089XZ/CrFxZTp85E5+upZxxgd0IWKbA0oJf/MVfjOugfhlsvrSPHCzs9XHrgqVYCvxK0+IPtgeWN4idXfxRfQWHtXNGHyno9ocN8DpRQVQMsADOACi5MxdOoUJXZx/7gdVB1mUKDMzI4ROEeZBfILUDzpQJBHM96aqrb1sGAT5aH/JUvrpcgvTwC1bYipxsl3mBkoDB2Bkw24lc0/BymCcmn4P1xhnAQjekR0Yul49Y2pzOtMG4yD95jId6sk8QYT3lBHXnuqhItJnGuhyP8w/b7MAHsCOGBp32B7FpdQsCh/oo196sN6fVoSxtYtCUlxg6DtNZRk7rp3Fy1UEdgRgbtV99lFsnLXX6Qh3KCGHtX/PATfIAAHbvbfvLb//tv10eeuD++EABe7Y+/+JL5Stf/mJ57bXXy/MvvBhf2MIkPjNbJyfmCssH2CqLvWBPnDxZrlyZjmvq+9//fjl96mR54MGHyr333B0zs9di+60VsbyL2dvZmdnYaouZ2yNHjpZr16+VN988Xs6fOxctd59Yrw+vnZvklqameeCW8cCyBrEO8F7IAteYZWWd7Kig7tdqnl9njK3+SquPcBlMGWwXghZ7ypsEMupRaZmT5aZFfQ9eqwx5lDGMkTOOJoOXYb0gYCiL/GIfaqAOOYADgQl5Dh7vctguaE3TrhwsJxZoaB92UW4wTT1p9UlvLH1ul3WZTzrrhnlph+XQ5wO7x+lSbrYbWsKwjjLoPKg3rf4cK3NYRj9rTx34FoJY6rRdGZSZNkautFlHTmujZfLm2HZCo17LpLMcmuxH6yk3TWw60yMDXmLqzUNDyDxdUdCYbnHzwHvhgTouzMf6V9894Nz85l/59bJ7187yxrE349w8ceJkuW3fvphN5XE/gckFfpSyFdbRV18t586dLWvWrC0Hbr+93H/ffWXF1FTZsH59OXnqVLnzzjvLli1byp49e4KPGdY1q1fH0gK212J/Wa8NZF+fmSmP/+jx0Hf29Om6br7byivW0Hv/7u7BH8SZWiZUaCtti/sKP9pnZ8vqNWv6cXx+vuzau6+8/uqRsmr16rqrSUfHkhB8SkCO9x37PCoWufdY1+Jb0wO3CIjFuT2oAEtNduClDojU9R3gyewSBGYIAQGEtwMD0HiDiYupm9EF/XbXyOhiUR5xtWMhILKM+nFBO3PduLK+3kb2oAr6fECb87Zbudkmysgb93r6R+2AEWiUA43gRl7KlKseYtO5fpge0lE/LkCX9WUa9di35qEZys9ypLNtyLdtyrdd5ofxuHrLlKdM8rmOtDYY57KhLmksJ69M2kBaXdAsJYu6pYLyoMl6luKhDj79KS/8lqFX2cP2vJ3sVt888JN6YHje33HocOwMwFpX9ntdv25deenll8uzzz1fnn7qqVg+8DMf+UjZtnXraFcCABeAlh+p7DKwavWqeMGL8gMHbiuXL1+JWdU1a1YHzZXp6XghDHAMCJ6+ciWuKYAXM64sQwAMv/baa2Xn7t2FHROmeUqT3o+Ia4VrvJtQGbbjJ/XL+81vW4ftyoD9t/7Wfxfrhtmf95/9s39W/t2//TdhNjy8nGcgj59a+OnwwC0CYscNznOx7tUH3PPdF7ei2zq0uRB0Stl3bL5gHFCJF5bHKB4v5MApXS+lggV4rIuLKIEEy+HJsod0i8nPutyRQFplK4s8aWLT1hlnO6QhthzTh0ADXoJ0xrncMuNgSG3O5fCR9+h1LwRXWb40ys2xsrFbIGeZsfTmhzH1lKnTvHzvNMYO5ZFW7rDt0hiP0yPPuDr4bPc4GeimnjqC9MbaZV2mG+rTDmjkkx5a9DC457JMCw80WZfLWoa6Wr554N30AGsrPWdZl85s7IaNG2NZAEsGOC9Zp8rWWHxa9o477wxwdMftByLPzgS7du4o7BXL0gF2yFm9anVhrSwvdfEC1/nzF4Ln1KlTAVyvXL4cS9B2794d+QBbExOxxIDZWs59dingKd8999xd9u7dW771736nPPa975WrV6fjOmIWmB1yeKIGqAP8ftC+5sWMKb4AfNI35GPHCOLJybL3wO3lK1/+Ujl3/nysI/7MZz9X/uN3fj/202Vh3vzsbMx64xfk+D7Mu3n+NFnL0wPLGsS6VZauYzDk4GazqtuWqc6QzpfZuVJmS11nmk/gfjAFHPWzgwIMZaMrb4llObHykCUYGbcPq6AZHmmzHNPIGD7Kt863u80vjLG/yu7bVSm4eCnDNxymh3bIZww3AhjFSgAAIABJREFUaQ7ARw6WS+sAgHzSlAuQiH18rsyhLPLymc40pJEJjbq4gZPGX3ETn5uLG7jtzfzyDW/w+iPrVKZ6qKMNBNttGn6C8iPT/dNey8hLjz+UiU3wk6ct09N1gFIufITsW8ukybZSl88h3pzO9CGssxk7PJBPGlpi9dk2Y+pth7Jsi3pyvfJsHzzKQKb1ysr1zERR75FpWrp54N3wgOcgsuK8nJ2NJQCf/OSnYk9YntZBs3cPL1ttKtzfAYwXL13qZmAnArgee/PN8sorr5SLFy7ENTwzc71s2LCxbN+xI2ZUuaa4tk+fOhWPwrl/sQYWndwDAMeAUIAWB9fLoYN3YVW8IHbm7Nnyl3/lV8vHP/HJ8n/8b/+4nDt7JuyYSoPL8P72bvjn/ZYRALbbglBAi03cebnvf+KTn4pdIbZs3lxefvmV+BDFnYcOl2eferLMXb8eIN9x+v1uS9N/cz2wrEEsa4dyYDKQmwHhnZywlafyKY8yZXHzIpiXxpgbGmrzjdA6bn6E8bwLdcqzVLyULcMXp9SbdZM2r73cWMcF6XKd+o2pI+0hrbw5liaXQU9+aIPyqRNIcUOnXLBEWlncuJHBDY2YcmUQ52MIrqBVjjqkt33Ei9mY9WR6yvOPDvLZLuzIeXmzbm0zzrZDb5CHOAd1LsYHrXbIJw9x9jX1Q/nyEGNj1iMt5QZl2x7rhnG2iUez2OGhrBY3D7wXHgAkEZjp++znPls2bdxQXnr5SCwRYCnAsTePxx6wL734Yqx9feyHP4j1r6zDZCB45ZWXy4njx2Pmj/1gOR64//6yc+eO2F+WewLbbHE+EwNi9+7ZHQCWJQb8aFu5YkXUMevLrC2zuFNTl8rLrxyJL4H9wjf+Qnn6qSfLf/j93yt8iAFAzTXEjCxpr733wj/vh0yXE9A3tJH2MWtNvO/A7eW+++8vDz34QOwu9MAD95VdO3eWj37s4+XxH/6g9iWTKHNz8cMB/7Tw0+OBZQ1iHfjGdcdgLF9A4pg65LccYutu5GYQux9MOFALrOrMroqVo9yqw9p3HivPeJyErMt66AUmlA35M491lpnPfMqyjhgAYh5a+Ml7aIt1OZ/T6hUYKQcwqXzKqGdgEMByk/KRE4uh+YgAjwrHgSD4uTHae85eEqOHWF3Yhozcjlxn2vocwzvMq4s62zakIW99JFKfWUe5aWNpkUswtjzHAsbwxQDQ6/uh3MxPWrpcPk6nPzCgUx+y4fdHguXK9Byj3LKsp6WbB35SD4w7V5klfe655wOMvvzSSzGDeuzYsQCzrx45UphlZQcCAOvmLVvKPfd+qNxzzz3l0OHDBYDLPYgnIITHn3iiLkG4/fZYH7t1y5YAXABYgOq+fXvjxS62fxREw4eOLVu3lNOnT5fp6aly34fuLW8cOxYyH/nilwLgPvPEE+XK5UtR9kEFaLQL8ErwozD8yNi5a3f56s/+XCzzYD/eZ555rmzduq1cuny53LZ/f8ymA3Z5sQ4ZfBCICQ94W/jp8MAt29POgI7rJgfJWsfA2M/EUZYHbG9uYIFcvkAuIIntu4KonwEky76zyljA8zaZxXRl4DMUUQf7ClqGbWLwRyY02kMsQBjKIr+YDYuVj5ORy7J+7NEOaLJd6oY+0whgchk3KMAPcYBY1oXxaO7a1cgzW8+uDXzLXEDKoykDsvCYMuOxVfcVLTY1xy59RB0yLNMPw1j7iX0MZhm00iuXOvtHOtpiGbbBQwyPMoYxPpA/2pVmowWIQTD4Z1/og1ydbczltoGyzEc611k/rkwbibEv9y9l5uElrZ3ZjpZuHhh6QLAT51d6+WlIl/Osq+SaY80l12xcf/Pz5fvf+17Zu29fXPfMtDJzyvpVwOe5s2dj31f2dmX2lPOUF7O2bt1a7rn33thNIF7OmpqKWdh9e/cEEOYjB9yTWDcbywnWrYv9ZAG9fMSAezey3G0G+eiFHsDL+lg+hnDP3YfLL/ziL8U62T/6wz+IF8KCn2vnFp1tXHTPV5YIdgCU+ztAdvO2beWv/LX/onzi4x+LGe6nnn6mrFu7rrz44kvRf7t37yqf+vwXynf/8A9iEgPgil+IOTda+OnwQD/a32LtdYuUcWazZUkNgNd+RogyT25uIhx9fpykWpbpKCFvkN98jhery/yZnjSgYjG+hYCDR2K1ffAJfrVVGcSmh7rMaw90pok9oDNNLPiQP8fUZ3p1G0tr3phygUwGM2wePnP9egwOs7N1NpY+ZQYDOnwigGXAIA9gwg5lx+2su6nFr/WJiRjIgt/P33a+13bttD3DvOU5Jp37iD7BBo5cnmXBw6Gt6pdemeYznXKIaQu0hpymzpD5oeGgLJeTlt+6YT3y5CUtz5Av69UOZXJx0jeUj45bdHC2nS1+7z0AwCHMJqDi+beYdmbnAEkAyamVK8vKVavjvsJnYAGlgMaTR4/GLOntd9wRX9s6sH9/gFA+SMC1jAwAKMsGtmzZFHt1c75zbNq4MV44un59JmQhjw8hrFq5Ks5tfoByf5plCdLs9TIzw4tIK0Zbb2E3H01gX1r0ALTh/+qjXy6f/cynyq5du8sf/sF3ykvPP7dYE6P87fywJPP7WEl7uTcD0gOMzs+Xg4cOl898+lPxWV5MO3v2XMxm85EJZsj377+tbP+t3wr//6fvfrc+cbuFAf776P5bWvWyBrH5xa50vwqHL/qLbtAdaVxfUMPFThgOxAuIuoy0Qc+MbGy7VXkdmMfxCSzH1TnYD+uyLussW/gymWC3tkOQo1x5sI9Zh3FBWuqgz3nlEVtuPI5e+Zkmp5UnnfZBw0GeA1udtSN/+dKluKkzKABiqaMcnupfgGP1AbLVCQ2B/7GcIPU3NKyfwibognawTAIaj5CT/KOOXD6SE1oX/qOOfgg9na+xPZ878ltGHj36Td4sWRrLpIFvmM5l0JP3/IR2aB/1BnmzTOrI5zLzxpmGsmhb7hf4u/NzxJP0qr/FzQNDD7yTdyLg5RwGwBIDEmdnrsT6ScDl9u3bY9Zz3759AXSZAd2+bWtZs3ZNAZQyU8q6bc5fdhJgtpRdCK5fB5iuCvBKXQWuawOcsu0WOxesWLmCCwUD4t7GRw+QyflO4H528tTpsm7t2tj5YMuWzQHW2I6L65MZ4GPH3iyPPvqVWHv7T//3f1JOHH9ztDzqLeNg+sE69NlyyOelFNmemW53gnXrN8SuDHv23Va+9JVH4w6+c8eOwlpixgZ8AojduWN7PJF74P77ym/8xl8tP/hPf1ZmZyfr546Ycefe3vki38uyzpb+YHhgWYPY7jpf4GkvfmZiPTmJY5CcByhk8joQ89gmlzNOmu/T/aCdJUS6I64fTVg4eAsE3sLT3Ti1jXrttQ2L8QzL5WPG0TAR722a62dwe9kAjHqTDPDQkWoPMb9+CfKox5g609JQJrClzvoh2LIc/8DrQTlp65HHDAk3cwI3Km4+5DmwnVlXBgzL4GVWA/vZUaLG9TEhdnDjJ6CHwQ4ZyCSPDGh42xc5HOQ5qM/BOuJhnfKRR73B/Dh50NgXYVPSpy5tJM8hHWltyDFpDs9D6AzKwKYclIVs7BwG6ylXV6axTPm5DpnaDJ1py6WVl8e78Wg02S1Ni5sHxnkgA1jBCufTUsEXopjlA8QSWE700MMPl49+5MPx4tWp02di2RL3WV602r5jewBIQCSBJQarY2eBqQC1AFuWMwFA2W4LcHr12rXR9cj5z30H2zjHqRPAxm443f2cLbqgjeVCExOxV+2KvXti7/Pz5y8WHqPffmB/+dxnP1NefOGF8q//5b+IGUvkhnx3VVnmADacuMg/+sfJlrXr1pVf+uW/FLOw+Hh6erpMX50urDPmq2a0G7CPL6n78IcfKg98+GfK9/70T6JvkYU/PTdQmcE+Pmvhg+OBZQ1ix7nZmxXxxCRolBOUjU3jR1sMmplmKCNO7gQIpB1HRxmDvDdNeAnErFuyPhJj/im7jyvR/HwPSMaw3VBRvihhmIo2Af4qWMNU7AQ8ELBBOwQuxiq0nnyd9a08yhGQwCetaceQ2dn+0Tk08BB7g1KXMbJzHfTMkgK8WEZA7OeA0QVo5UfJqlX1LV/AmyDW9jA4OaTZd6EPENv5Ix5JYnRar+m6N2ixy9g2UpbLw9b0chh5juGPA2zEB7RFG6FTFnooVz51BsoEocbyEkvLDwGC/ULsIT31+UdFLtcW+dUFD3XKIq9Oyqyj3KBc4/gBYWU6F/WFchjoF/RX4mnJ5oHsAc/XXLZUGnrX0q6JdafzZfOWreX++z4UP6LZFeDN4ycCQPIDGaDL+ckaWM5PXuBiWQHn57Wr18rq1fzwnonPyAJgAzhdu15mAFZX63p9wC28LB2Ia3+C+9bKMjkxGXzIp5xZWwLXCbJnZvnCYv3ELV8BY1kDuyZs27atfOSjHy3/6l/880rfXZeCMn2CzuUatHFoX/icr5ddv14+/LGPl6999SuF7cw2b9oUpJcuXSoH77prtA8vvsOXfGWND1Q8+tWvle//2Z+Gv+PFsO7+PRwnh3pb/tb3wC0HYhdz+WIXx5B+sQsc/nEyGIi5YKyTTpA4lD/MQ6/O7roaktxw3pvVjTKoG/0e8mrT4vk6QzfkE5jIp1/qF9VqadYrXQZFlhFDi8wsN3R2v54pJ89NDmDtzCufI2RWBFDG7Aoz8w5SgGJuZNzA4KX/ONRHjD3IBsQCV7EDGugN2pbLlDFsI/l8KCPHyIHm7cLQVn2gD5Ghv4z9ISAvujzG6bRuMVuQIx+0OZCnTjuoy/TSyhezrfRjX7HAz9LRf2+dF5apxc0D1QOel/pDoLLU/dFzlp+Hs9euxW4Dv/Jr/3mAyVOnTpfTZ87Etld79+6JewPXE2/DX7hwMc7VDRvWxyNsdF67dj1mcbkncTnzWdmpyanCl7kAnRvWr4t7Dz/CAbBcPoBeElwnvCTMXYf1n/BDFzHgtUzEfY21t+vWrS2vv3GsbN26uRw6dFeskWUm8vC9HyrPP/O0zR9dpyX9+B1V3iIJwCv9uv+OO2MZwdPPPFe++8d/VNihAbDKxMC1a/UraWfPnY9P9bIjAUsxZmdmC2ub12/YWM6zr+6CMfft77e3iIuamYt4YFmDWBfwL2L7guIYCLvz1UFxAcENZd56wnNz8aZpXF+oqoP42+mCRxr5zd+QSe+AqLe1B+ToEtggiryHosfZY1m/Dhd4gdwRFAl22mQbiQFa8Aq8cjzUl3m1sQ4M1WeTfDt79eq4iXFThyZmXbtPNULrTGwMDh3Y4rEceWUG0HX7lg6cMUhx4xTMYgt0thtbKSPYhlwWFcmf1kGrD5CFDcqRZ5i3fBjrR+kziIVW2xkBZ7p+1VZ4PZRL3qBvlG25eeNhOfksRzr0ks518srj1aVd0pqHX3mZt6WbB7IHAKsC11z+dmnOs9Wr15SPfvKT5SuPfrXcffhQOXPmbIBPrqUd27fFmtezZ8/GdQtg5MXSek3XH9qesywB4N7IjgLxktaalbFuk/sVj8CvXb9SVkzx5ai5cuXylXgCBCiljBBbbXHPmZwKAM0kwPr16+KROUsNuA6gP336bDw6Z0aYbbi2bt1S7n/ggfLKiy+EHOhGTzD8oX4LglkmIbgfb9m6tTz44APlD//wP8T9+OjRo+XSxYuxHvj1198oJ0+ejB8bvLwNz9Zt28Iv3Ls//NGPxle8GKn8UU9/tXvK210Zt3b98gaxN/L9435c/rF6ghPcG1MvYKFQL4IaM9BWgDOet5eykK8HRT3FO0u93aPWcfahwfYRj0tnK7Q5ly2Vlp6YgUCgRYwuBoClAnyAUYKy4OMmFLybNtVynN69jOTyAcEpMaAMPuWRNj9MQ4MMAaZ6h3ZSbh0ychjmrZNHPvPUm7ZOnhwrd0gj71CO5RPdjLVtVY55QSv8likr67c+0w/r7WPLtYEYvxKrHxrzuUw91psf0lDeQvPA0AOLzbqyTRYfB/A8itn97l6wdt368vVf+qXylUcfjZeomFHl3nP16rWyacvG2ECfL0FyPwHA3nnH7eWll14J4MjSAdZgrl23NkAr4BYgBdDk1sQs7Pp1a+MlMG29cPFiBbTdzgTsYAA91xa8V6evxtKDNXyxrrCs6nq5dPlSvDgGQONFtP3794W4V189Wv70z/5TOXjwYPn5n/8LAeb+w+/9+3j6xIwugTbTnutvc8/VvvcqjqUV3DsHS6bQ59My6rhXAFwpW7dhQ7l88WLMkH/nO39QXnn5pbJ9+47y2tGjZWf6FDA7SRy8687C7DlrjPffti/afPvt+2ObMj5Fa//nHzr8uJi+cuXH+vHzXvmpyX13PLCsQewANyzaYi7e+lB4UZIFFQ6qFJLuD8kYhE1DY7oHsJYsFSOXMIwp8ya7FP87qcttUF/Wg76scymQAp8yvB8CKJkNpTz8vcBvtZ2AG38BZ6ADDwODMrXLfLZLOnUIitSL3RzUc0DPYXugg0d+8h6UqRv6IcDW9tx+0tCpTxnKIc4BXdVXc6M2qx8601lO5s/l0MqTaZRhfdDQUeklLeqGsshbblq50maZ1oX8zpYhHfT6kbTyjaFXl+eEZVkWafs2623p5oEb9QCg5Rpff+OewFOblSvLlcuXyyRbW83NlU997vPlG9/4RmyRxYwmIPaNN47FkoLNmzdHOXRrL6+JN+DPnT8fT4HYCgsQxPnJ2kz42Nf1/IUL5ZVXjpTjx0/GLCqflGU5AqCUl8CgAWAyUwtoZVYW+dyv/Gw6s67sdkA962FXrloZdexiEE9YZmYDsPLYHJmANmZ62fB/y7Zt5eL589E+Jji45ngK5XV1o367mXTMGgfQ7l423bR5c/TR2dOny979+6ONfLL38OG7y10HD8aSjjtuPxA7Ntxzz+Hy8stH4kcFvuBlX3aUoA+fffb5eEHvoZ/5SHn6ySfKtenpaBY+ASjH07nBGHQz2910vXceWNYglgXwNxI4UXPgIs5lpL2wh7F80GQeHu+Yr4/Uqe9BSJapjGEs/7D8x83/OPJor21Gr3naBCjNIcsXuFHPS2zQUjZsN/nMpzxu+OgCuBhXWVVntkka5Wgj9Nzwc560YEfwapnysxzKqDcIuMhro3W2JcfUqV895rMMefSbNij7RmNlC/jkG9qd9cCTA7pz2dAWdWQe6aU1D02WJy++wwbpsyzS8ksPLf1loBwZBOrsU/mka3HzwDvxAECWtZKARYHL+o0by6F77i2/+Zv/Vfnwww+V5194MUARL0Oy3vLM2evlzJkz5Y21a+JHONeeL0oys/vc8y+WixcvlcOHD9bH/VP1aUP9gV1iNpWXvlg3yw/h2ZUrYhYSOdw3KwheVS5cBACfjxlbADZbcnH9vPzKq2X79m2xlvbkyVMBUrkmfBrF/rGsqeUFL8A3defPnwvwRzvzrPRyv354fwEbiQkXzp8PMP6Zzz9SvvTlL5ft27aVV44ciRfuzp8/X3bt2hUv9r5y5NX46hk/IuDHt8x+Q8PX0Mjjr7/79/5uee65F8o//J/+x9hTl3MBXfgZP+XZ2XdyXjXa5euBZQ1ivSA3bdoYJyFvaLJnnwvk3WXKMRyQ6eAqLyevg6XdYB1503zLOqZfMyDuBHMhMNNLFTcQQJ27AAxlq4OYC6vq6Eu1ET7Eqw47tUXq3C7KeKRVQwUA0CsDuwh9WQ/ClW1dfQkL3gpC5I0LvQOl3MQp5+DmQJ10nRERyWMZ7aLMYB4Z6K/t7mPohjIAOwIe42r7QkAOr+Wmka9M46H8TAv/MNDOOgD16+CyXHUSO1MMDzTMMtjvmUcd8moDttlGaSiDjthAHjriHJTnDIx5aKS1/dpoHts5DNQ7cNpf1KGXg/YgkxgZthM+gzTmjfUT/Lld1FunXfK0uHngnXgglgYwAzc1FdchuxB8+atfKx/7+Cdi/Sv7wfKiFOtY2eeVc/Xoa6/Hxvm33Vb3iN26ZXPhxSFmO1lmwFe42HGggswNce4ye3rp8pU4b++/79544Qo5ANDDhw/FuleuDWZX6znNS1+XyssvvxK6N23aUNauXRfbQzGZwMuqbN7PjCFjDS+UMXtLAGSfO3c+5FCPXGYmA6BP1vsBdwmuIWZjmfn1un8nvrtZtNi3stsdAjs3bd5Sfu03/lr56qNfiTaxH+zOnR+J2WnazhcxueUBVH/wg8difTA/Fo4efb1s27al/Omf/XnMTu/fv7+wfpZ9fPfu3V1+5Zu/Vv7Xf/Q/lwsXmE2vn6LlSVUG/DerzU3Pe+uBfgR7b/X8WNJj66z05jMXPI+KBG4KTWN9FC0c5yvQW4x2VF7m+YbBwtAJdi1qDNZJ2Y9zs6i2V0WKclAnzjKtX2hUzckDICX0vAtnjOXt64M6AXJtqbH6ofdQBnWU5SA9ZfjHenkFOIuBG/iyjCzbNPXSINd0Ls/pbIMyjK1TRpYnOFMWeULO53ZYLk2WbVq9w1i/DMuXymuzMbTaoF25TlmWSWtsfY6ltSznaRNH7mdlWZfpswzriXMgD4/l+jzTtHTzwI14YM2atbGcgNlJjke+8mj563/9v4ntsZixYzcTtr8CHAFKAYUsCSDEj8/ua1HsMMB9eveunQFEn3r62bLiTH3sz2NstnTy5S8mWPj8KaCY85jlBfzg4yUtjhUrVpaZidl4QYxdDCoQnYvZ2XXrtsbSAWYH4eWHI4p5aYyPKGAD7eB6Y4kCBUeOvBrrdZnFJbidFPzcrRbuCB0ky+ofu8qED2ZmyrYdO8unP/f58uUvfTHWCr/2+hvhF35ksLXWrl074kcGH36gfT967LHC19SYgeXTs3cfPhw/BNgabc+e3YXlHIBgln58/nOfLb/7rX9Xvvcn3w1gzzIGZtVZbtLCB8sDyxrEupyAgY0LuV7sXLiTZWZu8cv1rY/J+05z0OxLaoqxdSH4TRR8Jar7RopjMBcVspYCI+qSR4kZyFLmAG79YjHtQu9E98WwhXSCzoVgMtOgR1vAZ+o1htZ0pa0yswzbPSwjb9043mp3BaOmlbEUcFmqTn7kGbTBvLaYN6bfkD2kVxZ18OY86eGhPGJph3GmMe0sprSWj8vnMtIemYeBk5Bpydt+eXIsv3GuG8qJ66/zMzIN8pgfF2uD18pQds5n2eNktbLmgcU8cP7c2dH9a8fOXeXzX3gkwOnx48djfSp7vXKTByxu2by5sOaVmVY/NgAYAuTyyJ59qJldZW9WlgNwP2Cmlcfa27Zu6a6ziXL8+IkAXJs2bSqnTp0qj/3o8ZgtZT0sL4bt2rUzZhUBVvtvuy0AHECL2dawp5Ry5vSZsnpN3YVl+sp0vLDEcoPS7ScOaF6zbU2U/3+/862YtT15/Hi5cvnS6EUpwG5sK5juhYv56f0s937OEo+Pf+rT5etf/3oAT2abAbfMgLO0gxfgAPJ7du+KWWbulw8+9FD0DbtKAHL5chfbjzGrvWXLlvhsL/zMxrJe9q67DpYffe/PF9wD38+2N93vjQeWNYhlGxICg18cs8TzZZ7H4OkR5tA1PIKooQc39QOktZRtohw486DpgGyZsdLU44VIXjnWDWNl5HLuMw7ouTynM5864CFd9QMkAJm1LQJ3+DIvMsnDJz9lQ/fJo13oGMoa2oEcy0jDk/kyvzZAl0Pfnlzap5VHiTYqyzx12Q7LiXMauty+7A/qAILQK8uYOgK2WGacdUijXHVV7oX/82P8XKM87UZP9gG06ibOh3LkJaZeO5BjG4yVJ48yjCmHX3r1US8PdQbS6pNGGdLIhyxCzEBZ2eLmgbfxAJMZ4+7/XFOsfwQM/eZv/Y3yqU9+fLTuH1B0fYbdCPhYylQ5cfJkLAlj9o/zj62ueGGLc5fzElmUP/fc8+Xxx58Ii1ifWdelbg0aHumzvA064mNvHo+PI6AfHXUWdT5mgJnB5VO2gGSWKcQ4FuvEV8TnbdHPS12AX15K4+kfMvkQQnwJ7Or5cvbcuZh5vO2228q69evDJmgdn3xi+DbuuynVcZ/ovsbH9U6eGJC5Zeu28gt/8ZfLJz/xiZhtxRd33XVn+Iw1r/ju7Nlz5djqY8F36RKfHJ+NfmVLNGahmXU9cuRoefXo0ShnNpwX5Ji15etm6Nt/4MBoPSx9Qb8sFYbrZcedY0vxt7r3xwPLGsS6LijWFnXr9TgR86A5zm1OFDFjabCsXlCU1jrLGU9J1wEW8FPTeUCOC7MbeE07o6aeHFdZuaSmK/CsOsbUjoqwodqlrTXWpmoD5AtnhNGbdZPWXoVbb0y5cikjTewhX46VSUwQ6MifaYc3EGhuJCg72wOfukkji3w+L4byzdtGZWQboPFAnjzQ2DbpkaNtlElLGTdhQtYln3G21TJ5smzkIlNdi6XRqQ3qNc4y0AstcoY2SIcd1CuPmEN51ilDOvlsT+bL/NbD30LzwDv1gOCCc4pzyMfx3GM2bdlafv4bv1B+7Vf/Ujny6tHy/AvPxib5PNYH4AAImfU7fuJEAE5AFbOkzN4BjJghBXCyewDnO2D2/vvui69Hsb0TWzkBmMKGenOOx9s87metJjYxk/vQgw/UDxx0n6t1lhRd7Dxw/Vrd3B9Qzd6xjCO0hSUPpE+dOFlOnDwVgI0lD3v37ImZR2ZvWfsJWA+gPTtb+Ewr7SC4xRjp9+v64tE9we20sMM0a2J/8S/+cvnN//q/DJDP3re/++1/X1jTyrpgAOrxN98M2zdt/Gz86Ljn7kPRvqefuVbYpox+YqkGW5Lxo4A1ynySFh+w9RmfD2aG/eirr8aHJOoSxIn4cYD+xQJ9RP+1cGt5YFmDWC8Gbhj8WuOmUt+UX9rJDrb5hMwXtDc/pZCvIAUd/WCNHA/4OQQAWZ5yhnHWn+u0L5fldJbtNYUs+aqt9YKTVl3EHlkmZdBKT4w885kfvnHgPNOS9tAeYg71KxN5pnOdZeN0abs6sVVe7VavtOblUb5TV4bsAAAgAElEQVS82Q5lSGsdefVQNqxXpjozeJTWeKl2yT+Ms3zkeGiLsi03T9sJ8NM222dboINGHxlTr4yhTMuRizzl02bCkD4KO8Cf6S0fxrmtw7qWbx5YygOetwBYZiM5F6dWrSp7b7utfO1nv1ZeOXK0nDhxIg5AJ4+XCXHOxstU9WVFZjV5LM06WEAhW2Sx1IBZUMAR4LY+2l4ZHxVg9pXZQl7s5R0NwCjLEhg3ANE86gYgv/DCi+XQwbvK1m113SvXAzwzM9cCdK9duyYmSlzbij5mh2kXuxG8/sYbAcp27dwZ62HRhR28vf+9P//z8vqRIzFbS5vYRizW9HLddwCScq+vfB2HE27Sv5F+7juOn6tWlT1795YfPvZ4rDem/adPnYwZ6HvvuSeA/wsvvhT3qZ07d8Qnxlkj+9zzL8SesSdWr46PQ/BDA5898/TT8aODjyTgY0DxqZMnAxCzfnbVmjX18+UzM2VFrDVeOXryo303yR1NzXvkgWUNYv31VgdcgSYzSZOjtzcX88vwBCXPxWy5sfzkAYxcCKQBILWs/wqVNwMBALwO1sq50XioP/MtVmc5OrEFO7Qx142zS9uhy2n1yj+MoZV+SEveemJ4M3Aj76EMYn2mLvPKzzF10BHntPq0gVh5DEYGy8yrC98RqNc2bCdtnnrS0Monj3L9URPCOnr5LBsXM2uQ9UiTy0wba7Pyc942j/M/tiuDGD7z6lXmsNx2Um8605g2znQ8ZoUn99tIHxebM7H0gf0xXOcyYmiJ5oHeA/l84zE6V7PjBTOuf/RHfxzrWQE6AMvJSQDp6njRipextm3dGrN+bJrPmliuH0AoO+AAXpmtBXQyO8jWWAQe7bNWFnpmQt3rlcfYbLwPwGUG8Nnnnh/tJSsNdefOX4jlAFyjXBssX+ASUA8zrwDyLVs2l40bNsS9lLW2bN81PT0d23wxy3vp0sWwFcA6uu676wa5+MZrtffYzUvZD2hkXjNmrbuxCtuef+658qd/8t3y0MMfjiUA+27bH7OrrG/FN9wvWF9MW9hRAt899dRT5fy5c9Euyll2AZB98cUXyq5du4Nmw8aN5c477wzfsCPBl774SPnO7/9erIulv/AXywoM77eftKPFP5kH+tH+J5PznnA7xo0G5gnWLQIo6pQ/F6onvSCDE5MLmxsRb+5Tz8HADS83DOIMWOHlwiCoC9nIgk+w4EkPrXT8AiY4WDtgk/cGEwTpnzZJawwPFx+xQMO0OsgbkINNwwANh74g1nZotZ0YPejn4CZOftzsovbAj40EZcJLGr9k+6ShDj9RBy0BWn1uHfZQn2XAi24OgvzYSto66PA3MXXKIM56uSESbI9yo3CJf9IZS6r8cXlo1Y1e2qePbBdtx5/kqecgPZSLfNtOGtke0OtD9enHLMc6/AMP/kIGtNKbtm9sF3TwaAeyCJaZ59yhDerNMRedj37l1Q71zo05n0NR+9c80HmAcwhgFOdWd71wV1mzcmU5fPc95eBdd8QnZHkJi0fPgEyWCXAOc26ytKA+jp6JF6+4dqiLZQWrVwU4YnkA5+abx1lDOxnrWZk95fE/uwxw+gNQ4WN5gNfBq0dfi5eO+NrWt779ewHGAGLM9LLcgFlhZlqffe65cvr0mfLA/ffFC14sVeB6ZNYRgIbN2MhnVvnByxZg6OA+cuddB2O28bHvfy+Ae6y9nZ0t69YDdq+Eb7QHl93sH4iAxQXXebp30GeH7767nDy5tdx55x3RzqNHXyu8fBefmOVjElevju5H9YtcK8qBAwdK4Sgl7u8sq+Clr/vuvz9m0pHLPYsXvmg7M+rsSPHbv/3b5R/8/b9fnn78R/HDY46+SkuvfDkE/hZuTQ8saxDreUUcJ1nMlPazcqOBrxuE6QJOYGjhqW/x9ycnZQ7W0ELngJsv+nfSlZ78xvIuJa/atxAEaI9yjJU3zFtuTH3f9n4GlPZyoyVIY5o6AjE3AA5ooePGTkCmh/moSP+USywIy7SU50PWbK/0lBG0TWBNGTIoRwexMkljN+XEypVHuiyXMttKOYE8snJ7M51yrCfGZ5Rb1omKPGnqsMtDGQxY8BLgJW/ABgP0BtPQZxrqlTX0jfqUkWPbKo0xNOqSXn3oxk+GTEca/coxlpaYMmTkgOxxtJmmpZsH9EDM7HUZziVBGo/V9+7bFzOczHry4/C2fXvjfAPcsDUT9xN+aK1cubZcuHCx7N9/W4BJzluWFbALDV+AYjaUl624rti1gOUBbMzP+lPehAdoIpPA8gF/2HMdM4sIKHvpxRcCGN//wIPl9o99NIA04JTtvQDV7HYAUJ3oPuqDbQBWZoqh27JlU1xPgF8+aXv8xMkArR/60IfiS1Xbd+wov/+73wrd8F6+dHF0bekTfXYz47iWuRenj5tQRqC/3njjjfLiC8/HQfnevXvLbfsPxGP/Bx98sHz44QfjHuM9kT54+MEHYI59Y9lXl23S4GWGeqJMxA8L7iOvvfZGLLtghwOALsc/+l/+Ufl7f+9/KN/6t/+muMUXdmjTzfRN0/Xue6AfOd992T+xRNf38Lk+Tjh2K3DAc7Am74FCTk5uUgQH23yywkd5Polz/TijoSUQm5YO3QbkjJMlD3XKwAbpsTfLQZ5yoDetHmNlZXrrLOMGgC59kevVmX1JPXL1ofmsSxnZLmTZHnnIw0dAB0G6yAz+yZ/lCs6UQ532wk5eXyJ7aKeyjLVDnmwCvNCNk2EfaYe0yiOPTHmlo542aLPtp54y+bFDm7RhWJZtJQ2dbSbNcaNhyKesHGdZWTZp87ZTexh4bCMx7ZMWmolkszzIyDKz3pZuHhjnAc4XzhvAmmtiN+3YES8IcR3xgs9dd94RYJF1l7wARBn7ufIDndnVU6dPx56rx958M35E8oY8gTWvt+3bF3vBsnvBSy+9VI688nIApu3bdwQN4MiP8Bx97bVYn0kFdgGguF88+NDDZc+ePbHVFqAVe7kXsGQBAA0AY6kAABjQumH9unjcTR6bf/jDx8vGTRtjD9THn3gqtu+6/cCB0HXfh+4tH/mZD5ennniinDt7plwFzPFi2Jo1MVsbRnb38nz9Wf5exoJXd05gHHfmnK21Xn7pxegDfLh585byyCNfiB8Fbxx7sxzYf1vZs3t3fKIXG/n6Fh862LFje8xgX7t+re6ZW0os+WDmmt0LmKHmRwhYgWUjfGGN5QY8tT2wf0/51W9+szz15BPl2NGjsT53Oe3k8F72xU+D7GUNYl2/MjfbgdjZflB0cBQIeKFyITN4Gii3jjJuLnHz68CVwAE58kEPDcE4p4cyg3DwTz7jQfVo0FZWtjGn5beMmDJiy8jTDoLlxgIJ2m1boZOetPzG1JHOdOaJs5+0AVrKOdQDLX4llk67zCsX/mGdMqUZxurSnmE9/ATLSUNLXp5K0f/PdkFHHmAmj7I8X5yx7iXUFHTyo4tDHh4TMOOiLZQzuClbvhwjVduIpf3/2bvzYM+O6z7s/d6bfd/e7DsGg50EQQIEuJiUxH1fJMpWibZjybGsyIydxIldYeUPpeyUS5U/YiclufJPUillteNdii0pilaSAEkQJAjMvu/7zJt95r2X+py+5/16fngDgAIIDpNfv7qv76+X093ndp/+3tOn+2aY/O7bK9uYfqZNX3j2A/eZN++zTZk+/aSX8a2vLemSzlR6ILvji/rnleky38AfcODVOKAfAnqAS5wiYPyMj5fPffFnyqqVK2PZ/sEHtscmH+e40nz6SMD5CxdC+2nM6nu7du4MIAkw6oO0p1u3bg2QyCYWmI3l+82by2OPPVa++dxz5eLFCwGU16xeFcBLPd/5xDuiuvo+OcvZhAVcMWn49vPfifp+7KMfCrDKFtZZs/v2HwhzAmk52lRgWz7a4L379sUJCl/72qwAfYsXLw4N8UMPPVDY8tq1//gTT4SG0dfJ7Ly/fu3alAY0lUDam3NpFPQm/Ut50JLDV+WyQVWm35y06uG5PfXup4NPTCR8sMAndYF5fGBqwVxjdMXy4J382gqY4u3NGzfjhAnmgnl2u5eBK1evRv6tWzaHlpYZifK8LHjuTzz+9vI3/6P/pPynf+s/DD7hF3577ZfOc05+te0Z3N/7HLi3QWw3Id72udXJqs1rJ2uCJyfAnDx1eml0eAMnB1reJyARb3yZV8UBFWhkeo/OBJ+ALB9lxqev/HQ5YPP33fykiYYLDfXhq0NLJ9OgJbyNE5bxLRhBJ+uFnnvxyuBq2yvwxQ802nSpTUv6bbnupefQzfLdo5H1b/MoWzjXX/+kE5HNv6Td1jXzZpmt39ZLeKbt95NPU+U22kutkjddmzfbkPXSx7SJH86z7HiiU7m3sznrKK28LvEEKDezsy8WnzzKNivflXXOuiXN/F0rUP/3h2XaLDvrLzW62Ua/M21LI8Min+fdPkO86iapKL1rt3tTl7SpgYmwTNv5sWN52CbNysNsZ9Aa/Btw4FU4oF/qu/oXsESrF5uAbt2MM0adGHD06LHQaNK0GotMC9hK0tKxlzQG7Wp35qr+6hxYX+nSH6WnPbWH4uixY2HT+sQTTwTIfGD7trJixYoyD3A0Z5TJOCZLnZgWoGs+Aa5ofH0wgf0m8wOawVnzqy2tz8cyJ5De5jH1pS02/p0le9/WrQHAmS4AWdq7atVoWbhgYYB3mkuA8Ot/8ifl8qWLwQfgMV2ObVrH1gQj498MP8toZUY8l5wjxsdDO6wsdfjEZz4XX9Ny5i1ej44uj03anol2M+NYvGhhnFxA5ngOACxw67mgTWs9cwZt+kiYElxs2iyMzbPiberD/wMHDhUb5B56cHt8xe33/92/DX6Gppgtbd+c+2bwZUDjreNAr8e/dWW+7pJyUg9BMVnt/tzr3Ca8nGDbAeReZ+cDY+natDp2zVPfEjNNTvAGSg7O9DNN0pE2XX/69nem6fez/tkWvnwtXXlqPSv4a+/FZd0yvPXR8ZuAxDPleQvm3Gc50rjPK+sgj3tp02V5LfAVl3nRyjpknoxPIYxeSzdp9tcj86sHwcS1tLMNWSYfrUyTfpbV/nYfvxvQFWGeab7ZKK8DW+K0MfpeBzadXSyMtkYvCj51ZhjJM23OsrzlxxJWguTuWWeYJTj01DfrzE/X3ifNrFf+zrT8pOM+n0/ry6OegGS/mwKqHX8in3Z3ADzbF+mazH7jERd0+2knf7Pviu/6qPTotu1sSA9uBxyY4oA+EoCmmwOMrUcff0ds4tq1a3f0dzvZ9dsNGzcWGkwgEvjRP2lBZ87cEiYD6JCRgMzSJYuLY52MW2mdTADE0uYeu328Ap+RkXLixMkAowBojKFORqJtedtxWL42tXSpy9e/6sZNWln36rVz5+4Axzt37Q4bUdpA4comX4GuDRvWx8YzQA4odoYsoI4+zaXTDN7/vveEBvIf//qvl/17dofNLttgAG2YaU/KmynuvXk3IWNyfmgUGkwamDdEm2xGu3GjbH/4kfL+D3ywfOTDHwrgDmCGtnTGjHipIEd9yIBcwqM0IQDmyX8vBDTYOafTxA6PzIqvd3pW6MXLwNhY3OM/nnm5wVdxa9asKp/5zGfLc1//WrkyNhYbvNL0AV19YeB+/DjQQ3n3YN11Ps44zIk6/ba6wlqXafgGWhvvnmCiK8oJU1iW1dJ5vfdJPwZ1B0Ja2nn/WvTQcb1W+oxPP+m2v91nu7Qtf7dpss18AtglPtOim3nbfClIxGed02/DMg9BLz7j0s/4rIffeQlLmpluCjz1Pe8g3P2TNuvchue9+KSbYekT+AnqAqAppwNiWX9pxdEqmDyvdl+YIWhdAcY6kxX8DKd/oZXgmTacdtoLl92ypRSfmUwQN139hLU8QTd/10KyqFf2+Vek6+oRbWieTfIZpbyPdme9M1/33KPEafgjfCpfjLRat6Ab/7pnUBMGHydNhoBsL+ngbsCBaTmgbwEfM0ZGAnwCS7SdAfRmzy4bN24I7d7JkydDu+pEAZuzHI3l8640ojNmTMQXsC5cuBBloAno1KX9Kodo/1avXlWeevJdYR9rPLO7BHR9+hytKRf5b4f9qzCbsL7/0sthFkDrCyABxXbZ+/wsTSSwuXvXrrJu/fqgf3lsLOSAcaku7Hd37NgVy+PsOzdsWBen7qiHr4MB5ufOD4dmE7D+zf/xfyinT52cWhY3hskjsoftMLpvpsOzyZRxDWEA1kkJt2/dLCNDQ+WDH/pw+fznv1AeeeSh0Khqm2e0cMH8OJoMf+Kc3W5zcdgLX7se2u2Rub58Nh6nTfhQxdjlsdBWA63ArmfKXMRzMy/RZJvfh4ZuRbwTJ8hlednXSuOTxOS2l3Jy2LO5/SbzpmHH4PaHzIEfExBbwZ23MR1ORzSQTc6cTuo+f+u4nEHsEs836PL+TkBUAQLa0sTg75bf3SsvgYDfSZtPgLYuBnY32YvzO+uV9+3vNr06aZcwLuOEu8+yM02bTh05vjZqi3SZR5wwccI59y0N5UjjUkd5pRHu8tvFhoyfPAliDb/zd/rSyc8nwDjlAoFaarmME9/SlCbLzzzKzfr0119ebUteyCO9dJk/49qylJN8kL7fSYsn6aRxyUNL0v4O3naTB1MB1BzpMpwAUBu7SXh2Vy/5+zWRaCtXW91Lox1tvbMO6nXL0WFZL+Oi45M4edQLv1ObGuAc8O4AtXSehTS0zIR7hGVfjF+Vn26zbOkDoHfxxl7yMoIyv/YkkO+e863ut68MRd1oxbr0HbmBN+DAKziQS+YxRoz3kZGQSbSY+p++DsyQUxcvXgwbWWmAT/1WT+ezKTWnUGgYI4AQgOnztMaaI7Asee8/cChAKe1fBUXn6xx0bjyW/a3s0fz5EI+D+smK/QcOlp07d5Yrl8cCQKF3/vy5AJLMCJ581xNh+/rSyzuCJkBrfOQ5pydOnCgH9u+Pus6bN79s2rw5AHStf4l7S/BMC06fOV0+8+lPBp/+8X/3jwIcA6zkzlvpsm7mPScleE7bH3q4fPnLXy5bt26OkwM8MzawK1eORnyJj0dcDbtVe1+cxBDHmF29GufyMtk4d+p8udnZsDoD2KkOeEwb7cgyzrMGfk+eOhUgls0ybbYwzwLgBXx98Wv9xo3l4L69wW8fyPhhAPy3ku//fy/rngax7cMxQHKQCE9QRfjkJJ9hma7Nk2E1bZ3YK31goYLGFjC4zyuBQ9YHDReXdDOu9ds0tdweAM64TN/SybgMa/NOl166zMMPwNKA+haWtW3RPi7zJm2/E7Shhb4r0wOCfifv5fO79ZNW+mjmJSzuOz/zou9eXKYh/LNccZk26bbpM13mFycsw5PmdHkzLPPmb36Wq71AYACuDhDiU5ZTWVC1sQRjcKSrszTBL7+B0pieulLwpo8XYoJHzUtQ1qOtW96bAINm9s0mHzo2fcSzz/guI5ppNkFTHHXUxgbMJ0/Sj6WRLn99UlmL3lFfvZB6F1rf7qUz6tO9wAj3fNQfX6fK6Ccw+D3gQMeB0J51L1uCmALQwlqeBlaAHJu0LDN7ybTb3bKyI6tsmvI588WLF5ZFCxfFl7H0uQSzznwFfC1d8w8cPFT27dtfdu54OV7AFy9ZGuYJyoqyb98ORYZyyUrygO/TqYAowIy+Xfhr1qwtoytXhj0tDe/Bg4cCLO/YsaNcOH+uLFu+IsyT5D148EDQ0C7HegHlPoBAE+yLYrOcKdt9mIFmmab2i1/4XNnx8svl9/7tb08pC0I2eTlt5U3Hxzfq0YYbv9oXsqk7KcLzcArBggULy6c/+7moM1MBYN8LgyOynMNLm8221XPysYixS2PxQYio8/BwuXXuVjwHPHV5JrS2tNjKHJlRlVMUIzbisRH2xS5zhheFVFjgz5y5c0JrazPZO554Z3n+m89VkwJymlz6IWiq3yh/B/lfHwd+LECsDutNWufUmROUCHfP50zAXAyoBlT5nU7ayUlgKIFSBQs5cNr8aAsnlO7msuzXikdH2iwnwWGWV+tVBZ40/U582+7Ml2m1Pe/bvMICUHVgKmm0aaa7z3blG73f6ix/1j0AT6M5U9bd6Gf7lBX3DcjO8qOu04DYjE8/6zZFqwFm/eWj2Z8+6bxeP/Nn/TLfK59S7XuEO81qy3d5om7q+ioakv4yglcdj+VveZ5x4ZtMun6T9VVm3ntmd+Tt7FYzPnxAsrvaZf1+Ht4BYtWt6QPZN5IuPgRA77TBWadaFxNgtaNVbp0Q39wlz3xWA///OxygcY0xNjISoNWO/CuXL5c1q1cXX326NHY5wCvQR1tnY5Bjr9hdpskBgLpj565y5vTpYqe6eQUQtdxv2V//BUIByqrdrf1SWWw8pfeBAto+K0m0j8KUOTwyXLbfv61cvnIltLnOjb3YmS14Cuxgv/b1b5RzZ8/G2JDXWbHGykvff7Hs27s3QKu0NLTqbbzQJAJ7H/hz74v75cuWxocWfEVM2Tai/Z2/87fLkcOHyosvfCfadfP69RjTOR5/kF7wWhpKcgH4m2l1b2IiQKMxvHx0tHzy058tn/jEx8raNWvifF6aUkDbJivaVqcwTE5eL9evXQ9QevjwkXL06NHQqG7atKncd9/WoOdjD44yo1FlEpDaV8AXoAdQb9xEq36Ex+kEnhdeeYEAnB3PpQ845UCVn3jH4+VfrVwVJzngG77H00373mmYpF0Dd29y4J4GsQlIDBYDnZDR6dxP53KgArt3cwkSkjbhUDd6Ve1i0pBfGumVO51r094tPgZ6o6mUJ/P136ORdc98Wc+kLzzDMo24Kgirtk+bgAm88jaqnP48mTfjsi78pMeXrv9CN9NLk3my7kFgmn/oZFql5O80MZgmy1SaCno6TWEDmjIPuui1Ln+3bc/y23R5j2d3c2i48BkNmxfUKereAT+CTprgQ2PGku2MOnrZyvp3ftKWL7XcWY9st7zStU6YiwTPMqfCmucij0mfC77jfVfPKK8jKg4PQqhnHTs62pb1Ti5HWX3CXVzwXb/pykHvtueT9Z964dKenhmQauTB712VBt6AA6/ggGVqWnt92goDd/bsmQA4tKy0cjt37Cg3b94I20xjFmAkxwFUYIoJy43r12r8+Hho+HzMQP+3EQxABR6dWOAerdmz54RtJhBm3ABVaVoFXBmf7DHRYKP63Re+Ww4dOjiVhv3tt775XFm9Zk155NHHioP9fbnr8KFD5dKli3F81/lz56KO7EqBYQA7ZM7ERDlx/Fh57tlno70A62OPPlJWjq4IOZRj0+d1P//Fny7f/fa3QtMov69U0V7f6uRbysVkbMiQ/JHjt/k93W3mQddLBedZjK5eXf6rf/BrYbsbfLt1qwL5c+fCpyHfsmVLaJGtP7E7Bjjf8fjbwnTjzNlzAcbx10a7eXPnBAgmTYBZpk60uuQu7bkzd7mJiSq7mVhcuHAxno9jt9BmW+yF5ML582XxkiWR3sY/9W1NUyJi8O/HjgP3NIjNwWbAWDrQsQkKPpfxed/+FpYDDRCoyzoVJNrdWadYQBXwc5JBz+Yw8yW44KMNI0W+DthJ92oALEFR5s160gTLm/V1nxcwUtP3wKN8XEsv69RFTQFtbc0rgE0DjBMQZZ6kV/lTQ5WtLgQEf8q579qNbsZlvQGp2JwzleHOG/WVFn3lxu9Oe0g7wkW7+R2/hSV9eQgdS1VTb8Vdfe4ATg3Iz/xBvPunjHRZXrYr25Tx8XrfAUBtzkvdk//qjn+AvTq2vJS+LS/4r/wOxCU/pEna+rZ7cdKLQ9fv9uXB70yjvrQPnDzSq3urO4j6dgAaTb9nGk/TvPAxJRjvbJfRDADbgVjcy17Bn3oWzXg0oSpj6kqtb9Qw3g6jfkFr0vgzAfXSZ7KBP+DAdBwwRm52Y8LmyOzDL3z3ewE8T586VY4dOxrjaPjs2RgPwGjdPEm+1ZExf8HCeGGjSTV+gNf169cX9pTMD5w1CwQBnwcPnY+zZvfupdlbEdpEO+fFG5fmAYCW3DT2+PLNnTsv6ALAmzeXAFS0iIDps88+W57/9rdCkwts2oh2zUbRTvFA6+vi2NwaT/VrYCfLk0+9O8wKyAqnFrDXlYbG8bOf/mT5V//yX5Tnn/1GPe2gkyfy9zsy5M/qIm9HM8HgM+99X9TBGbjiLd/bdOfypa7RFSviZcOzIKtmzZoMO9Uwm5g7NzareR7MJ5gOAKXalhvzfHWNGQYNLZqjo6Ox8Y0sA4APHz4cz4T5h2f40Y99POyPv/fiS+XswoXBQ3S9lKRLefVGeJG0Bv5bz4EfCxCLLd74EhTwDYAAE90gSi1PdMQcmJYJugm1YjDaLBN4D1xIbzHBAK+gARCoA7um7YEv9fD2mAB4OqHQPsKgHZN5htaJmvZJ3acbNNrGoR3AoxE8AU46Ulm2NNO5pC1dm1YbOfHKynT8vBff1i/Ck89NfaRDO/PJc7f6RKFdue7Vw/J3+N3zImITwGa981m3bY9nikh9qLGkFXm1VbA2NvVMWuIsx3G0gwlep+KbPJGo+SdNukzvd7Y9w9r2u8/wTKe9/XySpn1ByzYLzzLkTzCb9dDOlq5w9KdAbI4DeaVNrWm3xB+bvGTq+gha+TyUnbSzvOTA1LSXL19IdLwQNwx869/oAhndOMxnKM3EOG1+1w+6MVpXRLKULHXgDzhwJwf0Y/0rtbH6KvtLGs2xsUsB9IAgwJT21XgKm9KFi8ratevq2bDd2aubN20MDR8Nri94TU5MxmH7DtxnP7tn9+5y7Nixcu3a1UJLSjsLZDlfds6cCkZpdo3feBnX18dvh9b23U8/HWkBTyYC6zdsLBtHRsqRI0fK3j27A3AZYy4ywUklNoPygVe7+2k5xbMjpZn1da7Lly5Fu1JuOIrL2LEhKswZhofLV7/61fKVX/mVcvrkieAT0JjjPeVA//i+k8uv/Qsdr59eIszPCxcvKT6x+41nnysPPvBAuQ3RNdgAACAASURBVH/bfRHnS2Rskx1J5ngzJysoW/3l03ab5wBTl7b7fDBNM42z9I5OIz+8MDDN0Bafq3WmLM24Z2HeZibiJeGJd76rOO0B/4TJ5yWF5lp5/+R/XRgnFOhD+pJ6eCEauB8/DvxYgFidvU78FZCZFOPtuw9YBDChsWwm92qR13swAGyriZ2kGCvDsXtcqvFxg6uX3mAzsXPqwQ0P+13BY4ZFRPevDauCQr6epokmFhzWJvE1TaUvrJbRo5/0+HkvTf5Wraxj1tdvF3rSZTnpiyN4WzpZtjQmAH4691k2gdC6oN8GTHOfeUVlOYRS3Ctn6hnX+iYJdaTlkI4taezyb8CYdMHdRjtan1JS6PyOd1NASnqMw5up59rjeV/u+Nm2Af/QSk2838mvqGuz/C9f8KjhYfsCIb14fnvf8jxpqEiWk+BTWC6rAvjuPblMF5MNzVXHqxg7gEDTr7N+2hFt6eLQQNPFTfG2AbDQaPLQBD5R6vhMEMtPfmX963Mwtlw2DxoL+D9VQpQ3+DfgQD8HjDlyIQCIcTM0FCYCp0/bmT4eGjhglQyj4QSgaOzsiAdSnUJgjtizZ28ALid7WKYOzef1a2X5itHYg7Fy1apYfgYA0QBgASOgdeGiRQGW9GvlOO6KD0haIqeJpRncs2dPfGb12NGjAVxjifvKlbJ0+fLYiEYOWOa+eupUnDDCTMnxTzdudEdMde2kPbZgAciKe/6b3wywzhb4qaeeDO2wc1CNV5rZxx59uPzdr361/Ne/9mvl6KGD0TbjXny8YKYM7WfuD/AbHY58mTFnbvnYpz4dpztQFPiqGLBvQ5VTHs6dvxAfm/AZ3+9//+V4sZg7d07wikkFkK9dQGds/Jo7N2xlPeelS5aULdTYQzaOjoe5BTlZv862oDvRYGZ8KOGB7ffHs6K5ZTqybOnS0FA/8vBDAWSd1Rv1nTkztOH6kL7gGrgfTw7c0yDWURycgXfx0liASx3aQBZmVubHVXoTLZCqx1e93EiZOaNqUNEiNCrRbpKfDEVepM+32Zqg9z81r72QvrtugqelNSlH3eK4K4C5p/WVq+KlukEHcEgwU0GMpeMKhtAIMNGAXEKyputp+BKIqbuyCfjkSS2vByCSpnD3BAZ6HKHQglqTQdJp6yEseZjhfJdwV38dhVXQUssFgtvfaXOc5WX9+GilNkUey3DKap18wrLOCQTl1ToCirCSDg+jHDS0vQOb0gpPl3mlkRevlK0u4vDKvcmKE8ZlXdxrt9/i1CnrLsxvdVFvz0xakyMtgjDlpZkFH8/aMgjiAKyd6UBrzStd1CbrhIdNWcEngLkT3lodwrwDuuLVI/iRPOm0uV0jI87EGsMw+3/3aUn1p03iJz+iTn0vU0HL145Ci+WQ9znl1q2qKa9xg/8DDrySA9GnmhdC48DGrc1btsZGK+BTH/7ed18oZ8+ciXECoK4YHY3+SGsLlF6/bql+KLS3TATWrF0XGtsY46XEGNiyeVOAMNq+s+fOl4MHD8YHB9auWR3jHyg9cuRo2b17d2wuowk2do1loFf56mK5nTbYErfNY8wMuP379oZCJuXI2TOni81Y3LWrVwJwxo8Ai7fL0PhwvKQCu4f27y9HDh0sf/LHf1Q2bNxUPvThD5Un3/lEnE3r9IT3v/eZcuvW3yr/xd/9z0LeqNeb6VIezZ47t7zvgz9RfvZLPx2gVDmHDh+JuWz1qtGye/eeMANjQ0yj7dxX/K9yuoTJwZIlS6qW9eLF0Hir56yZs+LlAxhllsAmllzykj52uW70Yj6hP5CR6JkDgWZ1o4ENW9g/PF+WLV8eYTbq0ch69mRoyiU04+X+zWTQgNZbwoF7GsQmeKwdrYOljVar5VCkHQIgSxzdkXHy6uQtLXER1k3yU0Z+manPR6N18nJxMBKQ2RHICT3j49WxyYhMrUeCpR7gjTaWodAABMVmqTXQeiwVZ74eUWm7gxaiTRmTdc665O860HsnGWS4fO19/hbWTwM4SZdxbfoqnO7ULCZt6d27si78dC09YZmmpZ9pox7B//o8Mzw0g8K7cvK3yY72MQFgpO9eEqJONKLxXDtKHlj0ncobadQv6+h3usjf8Ep4P5/afEBrttu9K+m16dBJ2iYH9wEOOxALLHK0RXdz8aJTO2e0r1frmsPvKEP7O77hUbQ1Js96H4Nrql11rEWaHA9TvEkeVV+aAM6RLuN6tRUMpAOwqdnuxQ7uBhy4kwP6qj4VGsWu7505eTJeEtmlHjywP7SU+/ftC6C5fEXd/AS8zpo1szgmy6kCLmOJGQJQyMbSi6XlecdvrVy5IrR4x46fiKVw4+/A/n1l186dAabYw169eiVAKxAEiM5fsCDA7KLFi8uqVaujTtIBlfIvWrQ4tLg2kZ07dzb6+80rV8JMQCvHLl4MkwI2tF4s04UWtTNzGxoeilMLmB54AQSWjx8/Fp+t3Xbf1rAjZUtqLH3y4x8pv/1bv1V+57f/zZR8SZpv1Fc/z4C2+21vf3vwyoa23/md3wnTifu2bA7w/uCDD8T4tyHLKQPjt8fjRIErV68Ez5YvWx7HZ/logaPHnAXrpQTYtUrjIw9OFmBqQMkDwB46dDjy2jwGwKYiQL5zZ89U2+GTJ8vW+7ZFu8lJdWUGsnr16viQgvZ7JpQLpbNDfqM8GeR/6znQQw9vfdmDEgccGHBgwIEBBwYcGHBgwIEBBwYc+DNx4J7WxDqRgHMosrdvaqTQGNFnehvvNlnlm3k1+rNbtWLzyNOxxZt70pKPSWu8zSetLr5LPq0nvb/WZEBC2tWg2eWaqk+n8Y00fVo7mjcu6xVauzyeKbR/k2UozCZqmpquvplnHn5t42QZnhwJrWFbVtv+/vvMKzyvzOt3W0bWNSrc/RMfGsHGp1lMjSIafqefeTMsw9Hppy/Ola69z7CsX/5WF+n4SS/pRByb2k57GeEd772dB/2mvlFyV37SQDMvYcqPZcJGg5p1ST/roc0uLul5+3ehwxee5hw9rWWllPktc0qvPdGmTqucdcly0xfO2bkrfZhVZF6nHTQ8Dt50Gnb52Aimyzjh/Zc0WU6sTUT9Ml3G1XpoY12dSBOLfMZpMkIcZViWPvAHHLiTA9HfupUCMbSUN+Os0Mn4SIBxxx7TV65o6Iwr2jfL0UuXLY/+SnPqnNH169aWjRs2lDNnz8ZueOl37twVaeSjbRRG4+q0AZo+G7yMWeXQ5EmnPJfVCtpY5gTj4/U4SFrYRYuXxDFflsYvXrwQO+jROXfmTNBnmhNL2jYY3b5drnXjT1uNm9B6mgfDVK7ERqbb7M/Hx8vJ48fC5tUXvh5+6KGyevXKTht7OUwg3vPe95bf/b9+K+jSmjKtCM1ufsimk413crnaupKPHBkQft88Kfxd73467I19FMLpAY7RetvbHw+N8qyZM8voiuXl9JnKX8dfxde6RpymMKOsHB2NOPa87GXzyCzt/s7z3ynHjh0v73rnE+X3/58/iPN5wzzgQjUXICeZIdBaO8Fg4cJFoVH3YQnPmXkJzTp7aDLUqQRMDGjMtz/0UHnua+epYnv2/p1cr7zunfPdk2/BgsG/e4wD9zSIJSha15oE5H2Cx/wd+NQmkW6JP/MHeOjApk4ZHbOzqc00r9VZLUcDAyFwOtvVBCdJM2nw2ebW8AroKgqvZauPuDqx18neb8I4HXkhTJlcBTkAgbAKDDKt3ZXaLD2Hrrr5Pd2VabL86X5nWLbRby7zqFflR62jdOKybGmF5VVz1/8mgMzb1jnzZxkEVdLhy5fp+33xwtp6ZFjWFb28D1OBpn5Zpjz99fC7pascdOozkaPmUb/2PvMlD/I3PGcDA5ftqG2rtr1op0uaaEirDWFX3ADNtJ/NJf+kGfTVrRYUeeVXD2VU/tY+o08Jl/cOwdD0IWTUvaarNLKeNa73UoROvZKfkSKSy8+Ou7peX2352UUOvAEHXsGBAFdp8tLJoX179wRw2rRpc8gJAEb/BkJ99QqYXN7ZRgozZxw/cSpOCWBSAFwKB1Rt4HKeq/xMFPRjG6aUy7ZW/zUe2bbW+WA8ABM67DbNXRVczYhwL5LGKJvXOD7q4sUpcwFL5jactZuLeucleznvXoAdDdm8eLoX58M9gK+zcl96+eXyyCMPRR0swRvj73nm3WXr/dvL3l07X8FH7Xqt18YEsDIrU550QDFbYns/vPhq91Pvfrrs27ev/Ob/fKp8/GMfCTMNJhVr164pW7ZsDpMOpgVOf6inQFwpjkerAP9imHewmQVQT58+XX7nd3+vnD93NuxtNd+pBHWPwHDZdv/98VzVR73ISs8MkGZCwAaWXTLzDuYizqj18gLM7tuzJza9eU5OgnB8Ixd8bUzcsq0D/97kwB1z1b1WRcCsdTl2YhzHhvbe8AvQ2oX1A9ikITzAQbMhTFymT/qZPv0AiE1k1cQCszVFO6iDXheRoICQ6aXJSd6guxMEEGZ2X6aTp70ICKSFtSAnygwAmzl7fr/Q6dWjDlYppel3ma6Ny/sKtmrdCHJ1SaB1N3rS9bsEZSaOzCdMOXllOzO8rVfWR1iGS59AKMsURrBJk3XP30k3/axj0uYn7aTXlpftzvTKdu9Kmnzpqs/uth79lvSy7fLcutUD2cppaSUv+NmmdsNX1j3ptb/Ripewru/URz7UTQb1+Wd5bb68z3pAsL1Jrf+EjU57MU29a517L1hT9MLG1uRXP9vZ8iTLHvgDDvRzIPqPF+EOeBgHL77wQnngkUfieCb9jcbtxthYOXPmdNzXc1TnBOj0CVPylgMuASinAnBWPGhVgR/HYm3ZsjXsPoFizkH5e/fuiaOehpYPlaVLl8V4NPYdMaUPX748Fh86UC/zB5tb4BXYJAvYsF+5fj20tSn/AFkuQWt7nxrYSBCbVXPjbbVXtwnMsV3acP+2beWxxx4pDz5wf4BEx0p99vNfKP/Nr/2DWn6nYbbZTH164zmp3+n3a2PxnjMfLV2+Is7WBTa1n11rnO86NlYuj10q//fv/0GAxyVLHG81GqdB4C2+0GzLQ+7s3bOnbL3vvrJx48YAnzTfnos0wp986qmwg/UMAFz2sZ4DnqoPee55o+eygQ5o3Xb/tpgzpZF37pzZZd7cueXTn/pEnOjwT/+P/73s2fFy1EebtDU3eKlXXI1C4U7ODH7dCxy4p0FsDp4pRlUEZ5RPLeHrnFOTb+zD6b0lCk+XA4+giI7Zgb5Mk36mb30bYwDdyOeokwBFVXgQSFkHeRIc1LQplHpASJo44ivernvatja9NK9Wn6xbm6ZfMzvV3oYHmS/9TOO3+7z81sb+eOVlWJvWfVuXNl2Gt+mzfHF5tTTatHmf6fiZtq1jpksQxM+wbI+8wvkZlumlTZf36be0Mn3WJ9Pw9YUEq2hlOeJcQUfPJSi7OmRcFq9NmY+f+dBz3zqTj/RcbN5y05dGkHQ2ucVk1fFcf6EJ7bUtyCCQNz2/o6kMdcjzFN3XZ1BfyGSQu/IIjzsNUuSnQe6BcnnrJW/3lbOp1YZe0YO7AQdeiwPGCTBrx/mul18qo6OOu5oVWjwaN5+J5ZzQ4TitXE63Y92y/8qVq2LpGSiycSu/wgUYObbLBYjaFGTJGojavv2BqWolQKUtPHrkcIQDYK7QAC9aFAAKfZdPyaoD8HrjxvXQ2MpEo6stk5N3KjLEDU3UcVnHTB1XkZ4Gd/x2Gbcb/9y5oPsbv/Hr5YM/8ZPl5/7ClwKw0Xb+5E98oPzGf/sPp86YVQ6wFyC2ketTjZrmhtxKwCs/N2/+/OKsXacH4bmXA2mAVF8re+E734kvnuHFuXPnQk5t3batvP3xdwSIxH+mAE4MAFgPxdfLLgWv8d+LxskTJwKQ+mAFLTfgSqtOI4suR+4Crq45s2eXjRvXx8uAY7w8L/W1cfTixbGyZPGieIn4/Gc/HaYKf//v/b3y3Nf+NOj0/0vTgv7wwe97hwP3Nojtn1CB1JinuwHdmQcY2DmokrXT/ZZuovtaS4K+SPcqQA+9CmArKKlJe+Ary6m+8ExXB3nW5xV+CKsaKm/FCXVif0Xars1ZRn+88BpXY5KWX5V2jz/JqzZ90hOXjgDxuwdy6n0/PemTZublZ7oMa2mjmfH8vCr4uTNvmy/LSvrpJy2/gSoCjZ/03Luk47c027pnm4W14e4J/ORFlpNliM84fpZLkCuz/u71B0I+JoRu8sB2r2V1RaCmk4/LuqBB88GpJ9rCko7fd3OZJuK7ttW06l3bipYSez2gRy3D1WUKJHd9RZiqZteJ31FvLxE9XlcNCZq1vADQIzOiPO0BBCz/8QduwIFX40D0w07GtOlo2oBDx1axSwVAQvs2d26AJ4BLPOAjvJ4DuzTMBIwfgJJ2kvyw4x9QchmLcTTWxk1hWwtIsa8Fpl76/kvluWe/UXwm1koHwKR+zpFd0i1tkxOAsUsZwKud99zUy2c3ZvoBbILG0r2UV7kwEfVEApBVnkv5QPrBfXvLH3Uy8Itf+FyUQUu5cvWaALGtbFGH5GfLy+nusy6Z3/K79no5GBq6HCcIHD92rLzwnefDtMB4ZhLgFAWmBvhGy7lkydKyefPm0IoCv3v37gtZduI4m1hfPbsWwNYyP1tiz8Dz8iU1R2qxm1Xn0dEV8YlhZgk3b90sE+MTISOdQFFXNMdDbi9cQDs7Um7OGCm+sibvgQMHI47pxfs/8MHy/HPPTtnGars2Znun48Ug7N7hwL0NYruZEfCsnaoDPGWy3L5190nbER7pcjNLO1BjEOqkoV3tOmwfEAzoWnFEKb6kMtOEOxSG/ASCJScDmLADAFwGSq1y+9ZMSFStYACGMhSf0J3arNYtDamzgU7g5aWeLXgCYgJsdJ81TBAljTrxCWBOXvEJfGxAECYegHBUSQALv2cAffVTiUlzin8NYAqBRSB1myXkz7L4wIhLOXxOeVmXCJjmX6bNdkvieb3imTUCF81Ml/zny+PZpEsaSRsfOL/REC9fhsVN37+kL21ehGrS7ks+9TP5o1/U84K7KKA4+RLPSb+e8NC08A666oiHylJm60y8uRR5qdu8JSyedf8SWIc0lRt9pOEfkJttCW1r9/Wg6MzduMh49QEQ1NXYoskxeda61z4g7Ujas3fl4LfnbBIzOvjqkeXFhDFzZgDZto2D+wEH+jmg7+iHaUqQ8dHHbt+OJXVyj+2qY65oY5kUiNc35eeq7B4pl4eGQn46wxTocmwTgErTJ3+MSsB04cIAwDSKBw/eLo7JOnHieGzSYvO6cP78CnwCYFWtIS2u5XXL/I7PApJnz5ldx834RHHGKvCVTv20LZ2x2boch8Lqeem9ucZYCpOE4VLOnj5dXvr+i+WpJ98V2uZTp86Eje/+3bvqC3CztwCvUo60ZbX3Cejauok3Jzgn9+CBA8FjYxyoZSsLrK5avbr4DLDjxLwIkGF48od/8Adhp2rD3eOPv73YFPbwI4/Ep3QvjY2FrGCCsHzZsjj31dwIvDqXl1xV55Pdl7/UY+6cORHm2LQlSxaVM2fOhnwx1yXP+LTFPsagL7B9dpzXo488XJYsX14unD0bTSbPtLe/rS0/Bvf3DgfuaRCbbEotFYDYjO+MfoU/XecTlp35FRkacCSuze8e+HRQs3sTb54vCDAkUJGv2ln1BJIBnsAq3rjzjdkS0OTtaIwBY+Cj5ZK+ras4A46jQVC+S3gvna/QzOuAmcEXyaO9wC26aGT95Qf0GNvjSdZRfNLNdgnj5PeWnEs5Gc5P2q3vPl2mzd/9fj4Xfl7SuM+8mSbz9qfL362fNNq6ZP4fxFeH/nr4razk0/T0YvoL/oZ9d9O++mJW+1oIzGYjouehzui757JdWY7yxSnfM8tn6F5ZE6kaNdmhoeyubwWN7CSVeC1Lnq6OMWl1Ay7bKmmU67kAqgJoqL14odfVSXkJVnNC4Ot3CZiNh6xz1EuepBMVHPwbcODuHEhQ1Z/COCHbLOP7FCm5CECdP3s2lvHJ7txk5WUPEA2taQe4aA9PnjwRIHP3rl3lyOHDISdbWZ9jXr8FzOx+R4um0ZfClBdax+HhCAeiAVhA0WX5n0bWWCqFTWhPVmqPNqTfjr0alqYEk3WcR8pSXwa70wvY2y4OML4sNlEB0QAhE4hvP/uN+pLbvARox+txka6T6+7Vk5Z1544d3RwzGR9dWLJ0WTl18kR82ACvHnzooQCMbIy90M+aNbusXbcuXgpoVn06toLteQFybUhDe/nypZGWdhnwxDtyccWK5WX2rNnl+IkTIf8AU6w0N6Ft3mX2cfMmE4bz5dKlsfiqF+05O9lbN2+VhQsXRLg4G73+2i//Svn1f/QPy4Xz1eTBE/HCEeYE5GYzn70eXg3SvHUcuKdBbC79G8hpy5pa2VdjUUyoIQyaVKlRusuATcFRBUvNF+XGEtHcALEAISAnrYHibdAuSD5hSUD6PjQhmWmyBg2mCFreLA0MGtAAsONA7HgMGvUHRgzYBGABRDrNJm3ardsGdAVSNL0EY10MJgArsAxAMzISAlV9lAMIC9eWbCtBQxAQAISxS5i2ump8/Q659mS8cPXS/gwXp85Jm+931j/50foZl766urj02/Tu89mIl68/T/1dc2Udsk79tF7rd1tWtiXbiAd3c7Tdtf4VBLd1lD/dnfWqLw3JizauzS+8bbd6oAko8n20IF3SqvqnytPK3d4gaWnLNwVik0j6wDt+S9PxPoGqEpWV/SLodOMu+ZV1ifIk6IBykh/4Aw68FgfaMZFphemz+ubFCxfK2vXry6lTJ8uJ48dCI7v9wYcCLLKX1fcAu5STlA+XLl2Mi3aW5pDZASBI/pGXCdpizHXyJlc1yH0aRsvfFy6cD9tP84KXSYoC9aKZTHvc1HqqR24uy3YIa13/7zbOSoh50aYvduo2EA9PDpWbnVIEmLfUTg4Ba+s3bAhwrt5eMrVRGqYQr1aOdlhX0w75QiHTVYTsR8MHJcIeeHIyNNhVi70yPg2bsu76jRuhaV28eFHkznnDfEnDiofkF1CpTJ+s5WbOmxc2rDaPmSMd02X+5TxHdGzai3k0zKrqF7woniigAGVpbt64GRpa8oktrjDaXfk++IH3h+3t//ab/1MFw7NnB1/iuQHPjTyNgrt/r8a3Nt3g/ofHgbvPwD+8Mn9wyl0HqjaDr509hdxUv2vy3yki7qSVHTLzi3Xv6yDeuL1dcwYOYWfAGQwGlIE5umJFvOGFximEUUz1MfC8bRMm6M2aBZwCqT2wSVAaTD7Xl05adUpgQvi5v2W5t9OuiidY/TYo+0GVXbeEiLonncwLeGd+y93qROi6eu1aHEIKOPWmq92M8NEKgd4J3ZZn6p+/A1A1GtVsW+vfAWwabWWbpv8e/eSPNuT1ynQ1JNP3x7/e35lfOVkuPyek6eik8G75JH/r2t+1DbkxqsfDNn3yk3DmJibq808Qq041vJon+OVZpcu6pJ/pM54f7WryZB0zbTwv/O/aEl/56l4OlZV9o6Wp3vInLXF53/pZRpt3cD/gwOvhQPavix2QBLoAo40bN8U4tfTvy1ZkLe0oLZs8ZJvNXzSYZKI8wslJfRmABapyHOmvNLZ86ZctXxFgee/evSE7Fy5YUIFvN5Yc11XtRoemvkKVdX097bpbmjAdmCaSBpE5we5dOwNcvu2xx8KGl/lBBb4ThdpB/dXj1Zw0mUdaF8CMd8rBS8dXsXEV5wizJ9/1ztCCmjOXLF7cme1NBm+sqgo/dfp0zB945UXB/MPVebG+4Hu54GhTAVFzmGdiDvJlsKw5UG5OQoP5QMxdQOjNm1PzonpS3Fy/zh66ym3gm3bWV8QA409/+pPl5Zdfik1egD3APm/+gnLuzOmox+DfvcmBHw8Q+wZ4FwOv6+6vNl4TW2Qafg5aA5kG00XgEWbeNBfHpwsXBnCsALIu8xsoBmO1g7wTtGiKsupEXwct+i5u9aqVU9pZAMnh0XwggEAgUDlh6uctlk2rN27gQpi0BruBa6Aa/PMtr82t2mMlSUtYc1k2mgvmzw/j9/MXLkT+0CRM2dI6ULp+d1w+5SgjL2HapQ5oiueSj/Fjmn/Zfn4ApKZO0yS/Iyjzypf3EtQyq5/1E/Zq7m7x6IrTniwHHeFo380lvfTbdEkHDS7LiA1Pcb5w5UXyUHzeVzq9foUWvmca6ZJelp3xbVr3nDSZzm/5pW/sUmqR3X/5pO/VoEYIMw7EJ+3MiGbS5XPqyPnt3hXlRujg34ADPxgHyK/sUyeOHimbtmwtK1etjjFKbtv97nQAY/bq5csVhHWbL5XEPpW9N1MEdEJxMW9e9Gl9VD5+mHUNDwcwBYwOHTwQHzIQLp8NYxQdyhyKeaPuV7CZK2zIO82uMmMcdeNguta28e3RWy2ATW2s/DSGTj4ZG7tUjh09Wo4fO1re995nYo7ykYGn3/f+8o0/+eOYP4zVlv7dygdYpUU7gb92yuuyRO84r82bNoRCh+kCDSfljnR45sQAHz6gjeWMcy8GVla9PIyEmUXlr7mLy5cI/vDw3LCPVd658+djNVO43+oG5Jp3a57hMnfOgjLjxo14WfHCkgok8xd2ez5eQNjczps3t+zevTdMLn7qQx8u3/nWN6fkF/OCAOuvsnE2Kjv49yPjwD0NYnXQdHkffi84o6f1a9qauCE1bVpviFy/PEGDob+3P0LKwNyyeXPZtGljmA6I98bvbTXf9BJ0Dg3VHf7VuLxO7D0NWq0XwVTxQrUZZOhuIBKAAOTQpeEomwAFSAlCAoJWlHAgDGjhlAk4GNBMAwxQANebpjdTcTVtBTuECxf178wX7OpkDiEOjStXr8V5fMqSHxhWB3Xrz6su0sjrcp+0I/Gr/Mv0fE7e1+vavFm+crnWV7+s491oZ/l3i8/2pN+WMV2e/nZkfaRVF06Z7VXp3BmW9ZIn0/b35+R3xmeeRtMl6AAAIABJREFUSq/+lyYmj06LnvwSi3bWj99f96SDrvjpysl8ysj4zMdPmuKThvDMN12eNv/gfsCBV+OApd9YGndOq81UV6+W27dvle9994Xo3+xfyWnycuHixXWDIoXAzZsBUPU/L27ily5bFtpZfZUygux3NJa+igYwx1feAsc9rV0b+Wz6YpZFXtPAksvMDGj1bgJZ5HQ3PtB6LRd1eq1EffGWzTllMSOw1K4sZg9f/ep/Xn71V//L8q2vf60qRDp+mHOmczkmtZVTd7QAUODzPe99X2yMwidaWG7Pnn2xIhla2MnJ0HIuXbqkLFq4MECs+SRXBmlZzVlLlyyJuY25wM2bFEZVWWS+nTePidut0N5K6/k4j9Z8S3mjbHMScwO/L1++UjZu3FCfc5wuQb7VkxR8sMKRY0zvPNOxy44Gmx3z5Y4du+LF5Sc//JHy2//yX0zJMO39szyHYMbg3w+dA/c0iE1NkLFeTxKImxhEr8YZHS4FRJ5AIH2GvVre/jh5Tp48GeCNAf+WzRvL1q1bAiAacOgDAN70DGwHKUeHT5DYAVxpEigQbD2hoa5AC4BRbagIQPHMDQDL4eEFwYojR4+GUDx79mw5c/rU1HEh8vnUHsEwunJlWbBgdWh0vREboN5QnZGnXBduEgoGMTGaAtmJCQsXVvOIhx58IIz20WZof+LkqXL8+Il4gzU5EBwECj8v7Vb35H/woQNq2n43RyhlWmna+3xmGZa/k1aG8/PKNPz2UocEUpn/B/Vbev117aeFL+kyn9/uk0/5u1d3k2YF85mXL16epKktwtr8CUqTFl9ZXBvXPq+kIV7afE75W1jScy+8TZP5s5xMm+H8Nl/+buPdu7KOUeHBvwEHfkAO0HJylAo2Nh7avy+AqKO1nA5Ay2pZn+lAyl+yjw0tILt0+fKQaeQRWXro4MH44lNu8EkATEGAjpMM1q/fULZs3Vp88tUHENBmsiDNyPLlIS+NW/anHBCon3PKzpW1CHiNf/U4rd4Lfm4IM3eEZjb2bw6F/S1e0MYyKTh2/Hh5x+NvL8ePHw/lCw0zrerQxESAP3L8bs7YjfFrlWR4OOYPdV62YrR87JOfKp/8xMemZAJFD+fLXPhL68rMztFYZMbFS5dinM+aPSvypKKFssYndDkbvyYnZ8USv3mLMw8umF/tYmlzpbl85WoodwBZ/AVi0TPfia8ybjg0wBQy0nBoer7Dw86MvdTZ184O8MsW1+dxf+EX/kr5zvPPlyMHD0R99ae7PSdxA/ej5cA9DWLzRRXwikluZLgMjQwVx1HFxDc8VGZ0n+6s4KweOzKjW8IwsC1X5AaoZHUMzL5Pt8YyTHwxqWo0Lb+PXb4cQO/dTz0Z33tetnRpDD5vco7wQMfg5KfLN0lG5d5827hMA6QYSBzwe/u2zVAVsM6bNz+0rOLY6pw+cyY0snt2745NA7QJBqzlEAPVm6oBSgvB0b5aDluzZm3ZuGlTAUZXr14Vn0d0TJj6VoBcj98iUOVx7AuNrXt1TmCBprfk+7ZuCfr+hVbi+vUAwoSIehJg165dL2fPnZuqfxUoM6K+6CW/1EGd+VwKUWm0iS9ePRPYtPWRR16XcA7t5LW8WVaGJe2cQNKPzN2/rE8blvdZjt9Ztvvsm1lvz9U9+tJlvbIe6aujNK5sG198Ww9h2Z6k6Xe6TCtMWpry5Kc0WZ64LI/PZR/MdFk2vy67Vd5mGXwXWpkn/QxL2hnOF5eX3/1OeRmfdPrTDH4POPBaHAAygctcGSMnjx89Utau31CcP0xGAmK0p8btvKGhsnnLlpChtINOKeBs7NKPya8rzA4mxkN+zosNRPXoLl/xspkJ2FWO8WfMLF++IuS0/MaKuhiT7oFh4UAnzaB+326Seq32tfEJYIX1g1ufUJ05a3aUx2zi1Kn6qdtz5y+UsctXyv59+4KUeuMJ/24Ov7SBj79A+IOPPFqeeOe7yi/8wl+O9tP2miO0DRidP29+tyG4bjLNs1m1l5bUah/g6lgsIBfYDf44NYc5Unck5cRE3exsNVEdKG88E/PwwgXzp6qMJplH22sqprBZumRxzFNWEwF6G6nNWxQwVjLN38plvrdxw/pyfRHAbF5mEjhR/sov/tXy3//Gr5dTx4+VyR9gZXCqUoObt4wD9zSIzQOhY5IbHuo6d5xKEp3eoOHyxAK/DQDaUZNh+MXkXfnZO6oLWKhhaLsIIcsdJnb2oAYZEPrYow9HJwdOdXrCT1oXbab0lUYFy+INWj7BKM4AzctvTl2BnZq3mhIQJjNn3ixHjh4rL7/0UrnJJvbq1bKr++b1yePHi00LS5ctj+Uuy1XXJidDI+Cg6Bs3rpfVa9aGQTswvH7duvKOx98WQlp5CRDUJV3yUD2UxxheGGN5YdOBC8DZ1To0CQpglpE8IXHm7Nm4164sH01p/Xb5jVeccHxtHa1BuqxP/u73xSf9bKPfb9QlD14PnSx/unKFTReOboYnb/J3+tJEn+6eSYZnWH/dss5tugxLWllW5m3T6pucsCwjn2HGiU8+p98C46Sb6VL7hR6XtHMMZbqIHPwbcOAuHABouOxHmUx4mBN4Yes+STs0a1ZoWh985JFy4fz5ADI0dhs2bozNQGQTTS2Axl4W0Em6tLOWzAFN/Vs+CgJ5bJglt1zOGwVmH3vb22OHO4BaX+qvhTzTz4Evecloy/wBDPtONslya9vqpNWC1WwnP5b1u8/UZprUxrKJc2KBv8VLl5bt92+LM1W/970Xy7e++Vw5dvhQaIHRwS+0AGzjk8aR7NdGYZz6a6d0H/ipD5WvfOUrZd26NWVkeCRkPF6Y68wJwOS1q1XrbD8HmQEoBo3bt4KHeMzRpppXAVnnvlv1AyCdvMPOFmilJCEugOSZs5xnezvmKXM+7ezcOetjXmbvTJmyZs3qKItZAYUKwGpFEm+B7dw4DUjTGFPwUN6oq2d239at5fCRozFvfuAnfrL8k//lN+NZ4ctUv0vc0SkOojGDfz8yDtzTIFbHT6cTGpgGTmFr2h0KH/NhfDEoPnsUndU5cGGEHpow2jACz3vWUACtlqZ7tA02zkA2qQK0a9eujk5ez6jzVlgBLIGWQM4gI1OVQZiIq9dkAEIR2lGvWjKBEMDbebETdYmY5lc9/vCP/jjelB28vXr1mjhzEJBVL9/HthPUBWQTvLdvXC+HDx4MYbth0+by5S//xfL+978nhIW3Wi7LBxCTpbTBtL/JY/e5vEVoEybBs06Lho76pXOfoAS/8E95s5cuDYGzds3q+BQhAc8cYeeu3VPgX5m0E3gonw1y6AnH63xJSF62ZUrnkk98umyj38Lb35mGL+/dXPaBu8W/WrjyuCyX39LL8EyT9ch8bXimTV9cpnff7/rj/M6y2zhhfrdhWX76Gdf67rMu/IzLPC2/22einpnWfX+dkpY08nnu/fn72zr4PeDA3TgAZKVJQabxm2YSQA1g1q1e6XM2PgGw586eLWe7HehLli0Pk4BzZ8/EqQPsXSkzpPfyRt6fP3cuxgN6gPGjj72tvP3xx6N/Myug3CDjmRDwOfkreO0UA42pUda19fu1q21c/z3NLmd+5PDhFpvSblXuxe+/FLKWhpnpBJ6Q2eYPMt89X74c5/LSvmoj8C3P+s1byqc//ZnYL6GNZ8+ejK9rjY1difkMgKUhfeihB8M8I+dgdZL+0qXLZfHihTG3GOdsdQFXq39kQ31ZqBuozdXqQqu6Zs2q4L25Ujp1sVnLvCINMwBA1IvE4cNHysFDh4v5hzyxaUv7rEICxuYdz9Aqqw1i8s/ZsilMHs6eOx+KL/V97pvfngLuzq+Wjgv/VcwLItHg31vKgXsaxOaXTFKzCsDq9ADYrXK7N0F2nawuQ5QAQjqbgeJyT4hw3gINBAKp+rm8U212vI1547aTc+XoaDe51i8T1aX/22FXgxaaBoTBAtD5DJ9BT3B5Y5w31zebe5pib8rqAqipjrgqWIejXgYlOyzf73YYtDqeOnky6kkArtuwMcrTJhpZ/KApUPZHP/mp8ld/4d+LN9G2B7Xt116/Ca/xWzaFMS/A3corb5toSkcrG4K7D/gkH5Uhnfa4OHxw6/kkyF+xfFlostevXxd2RzY+sDuSNoRPt/sXXXXDT8+oar3rEpBwbWzLUnaW37Y369GGoZ11bOvfpnGP3g/q0Ev66WdZ6aOZ93xX1iPDs1xtbdO7z7SZ5rV87ZAn86Xf0sqwLC/jhKtTPy+EZVq+3676zGuc363LerS08z7TZT3y98AfcODPyoEAQZ2cz75IblAC7N21s4yuXhMmAFaMyFU2o+SqjyIsXrI0xgttG7MCJwyIk9Yh/fmJVVrKAH2dWY0NYMARuRYfNRi7VC5fHgsgbGxwgFOdE5woc6c5jnq+2hhIgJo8SaDqd3sfv728xgvsSJkojsAaibnsxIkTAfCYOxi75H/yR77UMGYZEd+lSXMD9sK//Ct/ozz99FMBLM1bACKASXmR+0OcQlDlQ5V5ZLkzYG02u3r1SmhX5VMXdaABddlwZc4wH1254rOzM2IesBfDM6SCoj21MucR5yoovh4/fjKqLh5YdWyXuQX9WDUKWVUifyqiqmlgnadoa20wU6cDBw6FrazP5269776yZt36cvTQwaB1u1GaJL+TZwP/R8eBexvE9k2KOq9OadDr7H7zOUAsnU5vIOWV4fKJi47dgQP5h4frpG1gcgaKr4Lw2b9amuhkY7xFAloGD3oGCkHnN9qWRfjCCAcCAV1hhJpLfm+taStlshe/a+fOODA60/o8Hy0BQYI+bQEgPH/hwvgCjDPsPv25z5f/4Jd/KQaougPhvqJCsCgr65g8wFJv3YQO/nDSpG+Qkxna5c1cXF6RqNNWtwBFOfmoPIfxDqwnXUtp69etrYLg9qbg6cWLYyHUgH1luaT3Ru0lQnuTxwCt5ao8QkV56eTj0u+/z3RZl/w9nX+3NC3t/nxtHun6edrmdd/+TlptOHpJI+Nfy2/zJ/hMX1730rR1TZpZH3F5iTNGMs7v9t7vHFvC3fNd2eeUKZyf5fb76AiTjy+ta+AGHPizcKAFZyRa9q2UzWMXL4R8EQ5c2U/h06hWtchoIManav2mueVfvXI57EvNBTb2+iIXu9uTJ05MfZlLn3c5K5VDm8aTUgCgItPIrzOnTkV8jhX1cHHp1/tXjoHpAGtk7P4Brwl4aYBpTymBaF8/FdrT2XHEmLqR/9qAL6l9RSbHIQDZOnPVz/7cz5ePfeSnYoPvytEVkZZcNs9kO/CAiQAzDHTtkdi7d9/U3hI8IFdoavFTXW7dGg77VelzblevuXPnhJkcGjTh5II87GjV04kR4+OLYt4kZ6SjtTV3jI7Wj1mYW0L+rFheFs+eVebOcdTk3FAisaOtp1fcjlMNKFYAWXMz9773vTfMTf75//lPo7yWH8GnNmBw/yPlwJ299UdalVcWrnNyOcBzkvObRpabsgfqznUFSnWyuznAMTp2JzykVU6lWd9clyxeFADz5i3gs34msAJfgqJuiMkyDIYArUBsLId2Wtnb42E3hXYKUemyTegZMCFUAN0bN+Kb0oTf5q1bQyj65KHlLqYFlrXQYVLAjumv/cpXys/89Be6c2V7IILATKcMWl8ahWoekEClfvPaV76q9rUHHqTj1GtoqPfGrr3ZZgKf0LEMxCW7AVhLUPgLxF+/ei2WmQgWy0McAcl8wCkOFy+NBQ8Ab3bE+BPLS92pB4zsUzB7k1e3rEP6QbT5h7/5PLPfNNGvenu39MLvVt50BPMZ4wMnb17Tpc80fHkz32ulbfO1aTM/X7npt2mmq48wbU0+9Lc749Lvp5d1z/iclLI+6HPiuSxPvxZWx1hEDf4NOPADcwA4S5faxexr5M6VsbE41cWeAvMAuaPPeuknt4QBrkwEUks7f0E9PgvAXbp0WSgUgMSLFy9EOuVZNXOkE6dPXx67FNpbtFNzWzfPzgmbWMvh6bJ+vd93AtgWvLZpgdZ0ZKR0GT97ZHYoOpQDUFIgqJ99Cv8KIPSC2pkSyHOr4VvQsM+jm7eA3a/8x3+7/MxPf74cP3GqjK5YXmwQM2ZtGHM+a5XRdWwbw3Xz1vyYK51EsHTGkuJDC2S432xkazrHRE4GYDVHkP/sa21aJvsXLJgf9qzEBtmvTM84lUbCzBdhSjBnTmxawxbPwGdnYQMmC0uXLg5Nr/CTp06X8139aYhpYZXH/tbzX7tmTWiG6xFeN4IWswh50+GRqxeSMQP/R8GBexrEJjpqO4vOE5NdM4inOlicwNXTOGVnw9i811Glz0uce8DMIBHPeUu7cqWms3QxPm43fgVa4oE8b/4GhMGXAJXgcu+tlECcqltXjryWnxiqX7joU4eX4vgXgNZOWF8HeerpZ+KYltMnT5b1GzeWk8cc2TK/XDh3rqxau7b86q/+ahieo5XAwX3bJuCVIIrBNkmz1ttIRgurbgQFkWmZRF7hnDzoYrEB7CgW8TmYvYHPnFHtbZOvIVQnq80x0AK0+rgCQXrjet0sgZ70AWqGhmI3qXQ20hFe8RWd7jO83qKV4znIT+B4PnirLvoADUHWl6/OLvHplPfDdMp6PWW0dco8/WHq2Ya9kXpnnfh5n/SyfLzi+tNk+v66ZDrPL55xx1vh+nsb794z4kvbPpeWrnt5pZGeP3ADDrwRDuhz2cfR8aLOUTI4P5Zzditgq+/RWlrKJqvOnD4dfXbZsnrmKRkTceMTAVzJqZs3bwSgXbSofrnQ0rV5w1ek9GG07VsAkgnRAF8AbXfGqbq1gDsqFOOw1/fvBl7vlraOvbrqASiqd4C4WbMCdL7nmXeXdWvXxFmuALs6cTkW5efwKoCiD98sWlQ+/qnPlI98+EMh7ylTrlydGxuo9h84ENPz+nVrQoNN2YOm8WtzFVAa9MLkrh5pdrmUsGMF7PFU2UAwIGsfS5lZz+BVl5RN1cSg2surt1N0Rm47AcbnreuHVdybo2lvab69cJirhZsKgHfxaJpnHa114uTJcvDAgdBOb9q8ufiqGZtbp/A4ShK4VY+3vf3xsmfnjphLp3g1kFHxbO+Vf/c0iGWozXmL0/Gzc/N9WcryhI5n2QTYWbVyNJZ8tt13XwA0edh26pAVZI7HDkWD7eq1qgV1L46zw9HHBnzCToetcXWnqd8EngtAFGfwGRQGIoGV4BUwtYTuOCxhBFvkBwztyrzsM3cXokzLVr7xzabq6WfeU774M18q33zuuRiIa9ati7fmD3/8E+WRRx8tH/voh+PjBeyHDEh8IDRycKkbQR1v2QHmKnidMbM+ZmlTeLqvb7e17UkHTYOfXSvjfiATTeHKQVtatkd5HFc8I8BV3slaH2nxh3PPLAPwd++5Whaq9R8qy5YuCVB/fXQ00uXLgvYEyL96Ley7CCJ8d9X6jwdN9/iNz+IIUOVU+sPRN9BSrvBXc/Lkha77bIO8+J6X30kv08mT+TJOfmGZXlq/W7r995km84nPMtq0wtDV/jZN1kG85/lKNxTPMLUZoc1pgKf0UX/9nllM1/dbOkBAvkhkW7NfSpf1bX3ppOFnHs9t4AYceKMcmOpnxla+oHXjjPaRLLYqdeHs2eibK9esDdtXJltxlFY3x/hwgXO3jaELF87XI7cCnM4OELjt/u1l/fr1AZicwbp3z95yeXX9GA7ZpR40gXwyTxgFAJBM/gqv2ktjrL5Ianvei2M2ltpVCgL5a5putaTRvBpH8pgn0TYfkoPaOmPBwvLcs8+Wp558Z5Rto63xDKzO7ORlrsbFXOVlstv09YUv/fnyF/78l8qBgwdjfrKTX3vMdzY+s2U1Vzpd4PTpM2HupfwVK1ZEXSlJjG1A1HzB2XNBZpg3yWkvAso13zhNAM99SCjqf7tueqbc0D5hZDi7WycRkF11ta7KwNCwOmGhlDiFAF/QVhbHHAHA3rRpQ1m9emVZtXJluTR2KUwRbPTasH5taGy9lDjJgCb4HU88Uf7db/3rmLPRNf+5po48CsqDfz9KDtzTINbEyfFvDdUlR78NFPaR/Js3b0RndqDyo48+HGfU6Zg6OOFh0DnyxERu0i1lLBW8oWlEw8DJstxzJlqgSX5lOU3A+bQGkiNADA5yxQCRBogATmk40fQxgvyaCJqrVq+O8m3cOnfubBkd9XnZiRACP/uzfz4GFk3ot5//Tjl4YH/QWLZ8efnFX/zF8vS7n5wCPVk3ZbjQ4IB1rgWwBjGNJgFCMPntIjACwDryZO7cAMqx1NMdYWKXJmAp7UTpTC2SL0O+3FUBGXDrRSFBSNZFe9UNt4UpW/3YT6HJCZfGhx48J2m8SXtON2/NCns1GwDkI/gtA1m+OnO2bqA4c+ZM0LGU5KrPFpibFS8tngknjk2Vl5wsMyJexz99Qh255F22kZ9tSb+2pwfO+osQn/QyrTQZdrf7LDv7Zv5uy+1vW6bJuiftzJO/a7w61HrUZ6e99Te6+svERA9495fV0tIXMj7bpczp2pvxOfbQGbgBB94oBwJkdETyngzJvg/E+X329Kk4qjBlNnC1eMmS0KSS69evX6tga/78AK8rV64q69avj+X54ydOxtcM6waxsTBJkGft2rUB+MihUuzEr+Zl5NPNmzSSPnBQZYoqAmfMulo3NFRtPmMjsN0eDWCljZQn8/aAbz25x5giS2/dvFHsmbDxTNgL3/1eefF7L5Z9u3cFmJZ/2KpjJ1/jt9WtWbMjr8/1fv5znw0zL+YIgKiytdE8h1cXLtaPF9hQbczTRtdPzl7tTM0oW6yaDXea2aGyenXVWO8/cDAAKf4ApDt37QreLV+2tBw9djz4tmL58vKdF14IuvinHT4wsWH9+pBJ5lz1AKrnzp0X88fElaux4Yw5AMC8YsWyAMp4XOXScKwAUmxxALOPCF0eu1wVT5frxm7xO3buLjtefrnMmDmrJ6MpI7r+I3/KsCA2+Pcj4cA9DWJT6PC9ieqEBq0Jtk58FaR5w7IMQGvItsWXQSKPI6w6DZLfeQGkQCiAB0BVQNp70yVsdHrgNa4b1+0cC60vICt9Lk94arSFBjmfePJlGPEGGGPzlavWBZhia0Vgrlu3rnz84x+PExDU3SHNBsOOHTvLkSNHyuo1a8oXv/jF4iML3jS1AbhQLpAgbQ4ePNEGmoYAOYQcYNu1l9CUxm4t7dV2g1t+GxvwxD0AicdXL43Fm+ntheMBQtFtyyNg8ZngIpxaYIUXWa/szeJndcdo4an6aE9Lk9BFTzsAaDZVQJU3dWEE0ob160LTfur0mThGBb/xAzilXeDwEmglTLVZvJcOgleZhJ72vprLPpJpsj2Zr/bBXl9K/mW8fO195r+bn+nvFo9WXtqQ6eOm+Zf5s+z0Jel/Rv002rTiPF/8Z+McdOOLcr0+l2U1xU/doqU8fvIqy+svZyrT4GbAgR8yB1KTCcCm86J76sSJsB/VZ/VXZgROF3DuNuAEtG7Zel+Asjhqanw8tHwB6rqTClatWhUmYrSEIauH7HqfG8CK/E/bWzKOtpRmdbz06jE00XtRVrd2fAVInagf+SG3mSRwFDNoTU5ULaS6kqPS08CioT7mIMvlVr7++I/+sPj4QZZBMywfGSk9uRlgb3KyfPQTnwxASv5SdJCr0lAqONVmeLiedWs+o4nFD/zjmFzYBKceeKz9J06ciq9PMh1zCg+zDZvorNDRgqoHhYj61o8hXJ86tsuLAkUM7TiZjsdz5swLnnvBNnctmL+gzJ5dlSREvDpTIjndwLwnDX5oQ90ElkqxydAqS68NLlplR3VpD57ahzKQXfFo78l/9zSITY6ZTHUol0GWS6CWD9iXbt60IQbS+QsXYwDJV7FKBQAGootBuKUIzsA1GPg6aMR3gOf8+Ys17NbN0L6yx5TGJY+BJL36AEYGqjCDljBk+G8gA6Br162PwWPJip3Ul770pfLA9m1h4E776Y3dm63lC8D3/e97b3nH47/cLfVWsEfwTnaHQRuE6pGAlCByP2+mDWsVaPjCiDQcoUBjCuwpQ1oCIZfc2eUCxpZO5KGhAKo5ZRGc6CYwETbU2dgK45IvEddpLvEm6yBdXVoCfOszrM+zPtfr15zWMCOEqGUqQo8d09VrR2ITAOEDcKuHt3P2xMqiEXf2IP5pH03tyVOnpiYUaZRtOcoz8ju1xlHxvn/is87pt0naMPdtGzOv8Lznc/y8WnoZLyzztWGZVlxeGcbPtJk34/xunT7bujY+aeBtffeZLJPdmcryiG+p9ZfV0nWftPnJn7zvr0fmzX6Uvwf+gANvNgey39KieTEnFzlHFc5iZzkyN2QDcEjZQJ5bKrdiZo5JjStZbLPUw488EsvmNK+WoXNjqjNKLc8nqKQhJHvMCa2jZeXCVK5boUptMU3rlLZ2ospYwBegQpcbnwA6Z4e89pUsccbq+G0n4oyXFaMrQ6usHQAlgHpw/75ou7ToiVPXdOYvYP9jn/pM+ct/+S+G7AwlQGdiYGc/WQy4Xr06GXWxo9+4pk1lXkABob3maIDah3t8tp18Xr58eXHcFxnshYBWdXTFitjoa8OYeRatTRs3hN3q5StXyvbt28uaNWuiio7FMk8B1OSVudNztXmLraz5wHNQFzxh90rBwbzBkZnmDl//Im+iDmGuOBQ0FRCybmIiTivQltHRFTFPhhzrTDAiHZ4181vyb+D/aDhwT4NY4IsL9X0HIC1P6LiMsw0wgMaXqdipGijAmUFmgE6B1zABYI80Ua7cvtodsVGBjwHn0qkNdELCAAAwDQpOfDsRo+3SuRMEKMvgkPbSJQdrs4UqZenSehDzhg0bysMPPRDLF4DnpbHL8VbrwOV8M3zwwe1lyeLFUaa2xADtdsyyAfZbueoI2DOGF5YAsQUDwl2ch+xNnAOU8VMcsGjQe/sEEm8C7RMTZb6v1LDtDO3uK7UEKfcY5aZIAAAgAElEQVRakIJ28oLvIpA8r9vjt0LTSvBU7e3MCKelAJzUv2qMeyYAqr5kfDy+DKMcm7ykI0S9qau/MpYvWxbtUpYlvkOHDpcdO3fFs/FMo23dYdrSCLubUw6XvEv+ZVibT9mZTnj+zrTtb/ftJU2WlXnbfJk2w5STvBbGZZqsg9/p+uvdxmUaflsHv82P0TeGfFBE/+l4obd1dZDOfdLMstrf+Cw8L+Xot8K5TJt+228jweDfgANvMgf0NdIw+2QsNYQ8vFkunb9QZqxw3NaS+JABGWMPAiBG8+kDBseOHY35wWdl44MzixbGsrblc4qRl3fsLHv37Z8CSKpPzgNaADNgnKtg4oaG69whDqisyog638RKWWNCANQG2PUi38mvGUMzi0/pGlfDt25NrTLdvMm0rX45CwgHZi3R/7N/9s9jjwbwygGrAKzxnuOQKcEv/NJfL1/++b9QHIF49OihkJ+UHxQExinlwqHDh6c+zfvAgw+GYmTvvn1xrBjtqv0eTMGYceENvsbxZcuXxYqpZ+CrjhwFg3nXhRdA8NVrp0M7OstmrBkTZe2a++PDBDF/2+h7g41xVSChq/7454NBTmEwB8MHNnlxwChlk/nDfJAmDuYcm/FohgFm+1LEVwXUjGjz0SNHgsd4lXxS/4G7dzhwT4NYy8DppoRPI4hs4Nq8eWO8hZ2MZYNbseHrUmcmIH9qLGN5vUzGaQI6Oe0dHxD2BuyYFeBQRzVYLJsAwyZg6ZTv3kScl9/eyjllocOkQPz69Rti08DKlSsDdG3ZvCl2hwa92Dk5EuEByuZVu1QbttAxkAg2jtABYNWhLodX8IFOgMIZM6eOtYoMHX/cq7P2qQ96CxcsjLd0u/21j9AAbi3DEzq3LnVaaUKxO8UBqCUgDOJqhlBLiZcJy83xWd8K0rJ8vvoFz7qNC2Qn3hKEwpkljE+MlBEgPDQRjiirJhxeCAh/ddu370BZtaoa4dPWyqs9ScvzpZ3nCCsfVwDUCSLLVAn68RQv5L+byzh+1j/TZtzdBFnG86XJ35keHfd5ib9b2kzDTzryq1O65GPSzfD0Mx8fv7gsr02T6ZQ1Pu4lw0HCaa8cKDaEvnSZNv2kmX6lUc1XMn3yMf0sW9oEry29jB/4Aw68mRzIPgYEAm6OlXKvHzoLlnykHXRt3rwlzAr2798XdrE0fdu23R/Ha5kjmA9QNtAKWrLevWdvaBQfe3Re2bV7T8hVMs24S6WLcshP5UTfj01Ydbc9uZROGnmVA7g6D5WTJ/zOntYcZfxEuqGhALTG2I0b12Oc2lSszU888URolP/db/2b+D0MMHefvUXPHJDlP/nMM+Urv/LXwxzvxRe/Hyt4FC/aAfABnD4ljjYZbe5Sr9HR5UGbJtXeFDaqzPDCVnVtPTrLhw6Ygtm8RWZToJjPZs2aGb577VGXNOMDLCmpmCtQPmiPeYpm3NwHwIZM7GS6ejILcC1cuCDOfaWVrVry8SgLOAfCtRsPnbJgrjDX0/iap4F2cwdb4IMHD8YcnC89eDbelZfPJB7M4N+PjAP3NIgF3DgdW4dJX9jDDz1YNmyoO0QTbHpjtfFHh9dJ5RkZqZu7bo1XcwRvfDq+AUgAKEN+oJadjl2q7KBOnTpVLodJwIx4a1VmdPzu+9xAEcCKhks+GwHWrF1Xtm3bVh56cHt58MEHYrASAL7eVcHaZGxwclYqp44pYNny0oga6NEGGtdOQ5yDXH2vX6+artDAdrvh0ULHhaYBDYDWcN/IvhHmFBHQlas9gCHwiG8EMuEA+M2dMzs+3EB20khwaQMbPPTlmTIUb7fKJNTYSknvLR+P1YMdmLAELOqV7XW6wdRZszPq86nPbCSetYOzfT7QkTEJVDtZHvHKjDfkNGuIsw1vl2eeeSqWlNg2sZFmduLlIPuTunl+2h986jS06iWOr77tb/euyof61R738svD5aQSP7p/bb7ML0o7OWHtPRouYa68z3p1ZKfytr/zvqWX9xnX1gfNpCs87/W9Wr2edjfz87MdaCe9zJ/PF63kbeaVPq9sJz/zSiffwA048GZzgIJB32N3Od5p7pSRy+qArLNh61L1cGhezTdkPNm7fsOGAK9W+jZuWFe+8ew3y59+7esBpN733mfKo488XL734kuxEmguIdeybysnwGuc+NKB0k7Tak6w6gdQGQfMCIBX6WOMWA3rZAUzAXNcbLC61TNPAMbrmB2KOYaZgTlJe+tO/rFy6eKFbmWtnlBD9mkfp1y//9wHPlgB7PdfjuMRw6Tr6rUAf2xKjecElDYq55mq6NjRT/Hg8+Lveuc7yqFDR6J8y/jCgcndu/eEaYN5xMeEfBFz5coVYQ5APtv3YC4+fORotN0JAnivDdpHNpDblBuW+8n1eK6d/LeiCZCaFxyTBYimzK/z5vWg45z1JT6PvnRp8GnbtvtCkWNONrfR4oZSh03v9evBU4qc5FXcDP7dMxy4p0GsDslZljh9+nQMNANbx3772+pyDwAGJBqE3OTkrHjzyqVrA1keg9pAiB2fHSARrnPrqJZ7fO711MkTAcIIjkOHDgag8+ZtqUF+gwgt9j5Aqy++oON+w4aN5W/+zb8RAgxdu/GHuyUNadSFG+rOonVvYKbZhN8M37XHQAe02fAQMvATkGnwOpPPGXkLZsyLspMO+mgpN+roa1gjQ8W3ny+N+ULJtVhyYYrAoReCs9ukRRjRHIRw63jE1ogDZNFXLwKWkGZjzIyjaqDt0J1ZFi1cNAVE1CPbnOBGOywFCWeNhS8JXDxLzkSR+cS5V88EsrXONcw3wtEAdB17Ii2Bs2D+vDJr5prg37x59Us5+gjhVN/Mq0kIWnhFeNEO4DlHmBKseJHlef7SKg/QF0+L7V77OPXNSz9Nl+3IdqWf8ekri+Pnvd/KdLWujXefNDPcb1e2Iemmr07S8tU/2yWPtqYvvXtp82rDMj8aeJE0heeFNt5lPr50nEmHU8bADTjww+RAyloyjDM2LMuzWT11/HhsHrKxCxBcsWK07N2zO8aCfg3kAHE+c2pu0qc3bthQtm7ZEmex0ioKYwoG/Mbc0ili2Jtark+XNrE2CpNLcZzWLeOubnKdSmcj7syqpZzovrZFAwm4GlvK85lcMs84WrCgLq8L93EGspameN6CBdFG9eAoGrTbR3aMO/nRtepHnjMf2LhhfYzZnPOWLp0Zq12UA2x/v/388+WBB7bHZlz8IVcpf178/ssBSGOzcNj+DoVMf/Jd74yTB7bff1+srgGLwC0bWAoZGlDz3ebNm8qBAwfDhpaMNR/Q8qqn5+U0Adpamlp19Uyco/69F18se/bsjY3T6uEZUUyxc065bb5Gw1s6EGvT8OxZFSh7KaF4ko9JxqHDR8qOHS+HnKIsUZZ2cnVlsnfebgT2/RvIsz6G/JB+3tMgNjpb9ylVgMBbMjDprVcHAaAAD+lMujmJmgu9sZbueCgdts6Pztt7paaHMLAX23Ekvpn84ndfKOvWb4jOe/XKlXL40KEow1szp2zlbty0uezZvSsAkPCf+qmfjGV49UghmWDgbs8vJvkOAEkTAq3TGHgDBQTRYz+aAJZQsdyvDPlpXNXJG7qLYKBhNXCBTxcBgw4HqNY228zj7b6CCXEJQMYuX4k3cOAQ1hAOwPrIgTIAbYPaMSsAn2cAAKqz9F4ilJHPRX7h+F/tLmkcqlaiwzIhkCNdt/mCYONop7Wh0qhgTb0mbo/H7lZlSBuCavbsMJkgxGfPAZyqrTM7Ws/s6LETUQ+CymSjX6k3/qmvcL/1NXxOsxP1kAZdV+VH1fgrt/Kz97lWv6VJl3WXt99lOvRdr9e16dF4vXmzLm05WX9hSYcvrTq7b9sk3O8MS7+l2bbVM0o6aGUZ8sV46UBzm6elNbgfcOCNcCD7Wz+N6NdpbhMrOfX4RPKMbHAyASUKIEXBQAYDVvozGUFW2BwLVKWM9UIsffZt8sHcQbYDiy4v7ICsGWXm7Fll6Fan4GjGhrrGpqVuqd1v5mvqnHOjsigUqkyup9c4HUfdgGjaVGNKmRQzZG6dxRxYU1840XNZSjeXAIVElzGOBrmvPHasbFatFNqs5ZQdZ63StmqjOYEdKpkLHKqDOQKdS2P1eK4tmzcW580eO3aiOGOXVlVe7ZDOPhRhytu//0CE830WljkDoO4iM1xMC2h1Fy9aHMdreh7qJs4zuG/btqChDPz3LPlMDpiDOB3hyJGj0aatW7fWs+ZXrAgbZ+e1H+nmfrzrrWxWk6s6m/b3qMHvt5oD9zSIzQnt/LlzYV+q83pb9PbH7tGAzk6tk8Yg6HbxJ1AjSAwkHVC8JfB0Bq58yvEGbNC5vEUPHzsa9lEGk9+jK1ca1WEPxHhd2OFDB+Mols1btpSPfuzjcU4tQIcuABTl9YESYZw0U37Y4dZBqQx19r5H0NW3+ZsB2OUB5gBYAlbbb3Ub3dI+60Z3FuH8oXlTbSNUKrisZRMY6gnocoAsEI8PlRd1OX9iAk8rIKX5BagJVQL80tiF+I0PdqjSSKoDvgOw6qqtIci7JWL3AWCnluuroAzAO1ltbtWJzZR2X7kyHnbD6pha2qhvpxUmgIBM9ZFvQQiqGWWk29GrfOYMSxbPKgsXzA8hywyFgKNJeHnHrjjr0YuLzXheXAh2PCAMXZ6jNioHvaDZrQaIV887nmWYXVTA5vlIn046POAyT/99mz7zpZ9x8t4tfz89v/GHk7+9IrDvX9LOsjJfhvuNfxmuPfFcu2ed4Vk/ZWef4rd0Mq3wvE/+RMDg34ADPyQO6N/6IkBDxlMICDt39kwc/eQjNMb8E+98V3wAx0rg6VOnAoz60AGtoiV04/+5b36rLFu6rGzZsqnMOOi867lBU5wVOytnyiEjyV4v05Ne/MfrPgAAljlB69QN4DQ21M+Yc9RTprvRzTPy2N8gPdpsep1G8MCDD4XcIru8mKNhHiTxaWGz/cqQ974HH4qzyoFLc6A2WKnzcQCgUpqUhb7EqC3b7wcQZxanBoi7ebPuNaFwUW/58c3GKScFqAeN94aNG8uxY8diE52z0H1gyLnfypTPHI/3u3ftLAsWLoqy8E8aK6ZAtY9JyAvEysf+9r77tsS8yOaVLa08TDOYGZDrZJF2OGXh2vUb5dLYWMwv5tKtWzZHfJX/I+W7L3yn/O6//e04kgxGCPzQKCbwb7JRPrXPbnD/1nLgngax3ng53282AHTsD3/op8JoW5y3Wx1Y54xO1YEjccCeDmnwxuafifpGaCk9B7B8LoPf5Eno0MY6TsW1ddu2GNApAGju0GYPZBlm146Xy5Pvfqb8pb/0F8s7n3g86KJjIOag6X+cBlE69cjBAfxxlrtS6+joKZc6A2MEB2FmGT9dfo3Lm+qffu0b3Wf36qf3Fi9eGGYHdtDauMbuFW0HQI/fnhl0VCd5h6b6uSqPaim0r4Bwak4JTTzlUvsARAK4NKTsztDAhwQlNAHuE9OlQlI50mkfGgTUjJG6PH/rlq98jYTG1DPwZm25i2Y2Ab6XmRkzmHbcCKBO4GT9a3tqG2KZbmQk7J0A+s2bNk4dmo0n2nT06NHgsUnmwMFD5fDhwwH29Q90Xfobk4QQbN0HNZTHxbPpzA+0VT5xyYNak8pjbc58bTh+6Duvx8mfVwLL/nzi1SOfMZ9Lv02fYeln/VL4Zz71k0aZWW7mSXpZr/yd/MvfmZ4vjo9P/bzK9AN/wIE3wgHLv+m8SHNGAg2mvscni6+M2dtwPcYVYGavw8kTJ2I523zDtOzBB7aHplHfp50EkiaW1NUwJwE41om8quOmfhnRmAGqjAvzzM0AqVVDyiSKC5MCioqh8TI8frssmFlNAyhr6nxCo1u1sOQ5cwD0AENjyKkJq1evCRm6ffv9MWdaXn/2G1+PNkb52tmZFPid4/DdTz8TyhH1cJpArlIR2LTPHH6o+61z5wOI79u3PxQpZCK7V6B1z969EWap3lh2UgHZjx6eeLHXFjapQ8uXR/3JdTKKaYY8TqLZsmVzzL14/MjDDwZYPXr0WCzxyw+krlo1GvOJ5wWI2txtoxYFjeO80BHHiQfG0Ve30RkzAvjSHP/O7/1++ea3vh34Iuepr3/tT8vN69djzgvQ3/WZnAODqBeCAZBNVvzI/B8LEGvXIBsXb2je/mxSAp4MwGr7Wj8paH42qHVyoNAAsMThd3yediqsgqSafzgAHtrSCWNHcy2O8rgRb7R//Id/EGYG8Za7cmUcuULgfeFnfrZ8+ed/LpYggLqsi3tgjEshoV6tUzeDWloDq4LralOZ6QweQsMAn79gbticLhyaP2WqQDOKviWef/1vfrvcv+2+8szTT0UeoPbGjbrTEz2C9fiJE7F7f9myJdFm9AkyAjABJx4Ck+oH7NmQpnzxwB4+EkhALQEuHQ2sNNrR/wWvAOXdxyHSFhdgLaVqB9WtPgeArNZj5szkx2SYRli+Ou8rYsuWlnXr1obdFPAKuHLqzwkDVrmW3bVPVF5rD62LenJ4MDIxEW1++KGH4hkStAS5pTKHZfvNHCH40QlcfYWA9IIQdMYnQtiHtuF63SGcz158e68+tc09INv2jzZtEO/+CW/Tufdc0rVxbZjJVN6km/fSu/I3P/pivmk0GuO2HGlcnr2rddIl6HWfZXhGbT3aMqVJOugO3IADbxUHyKccA5aMaU71RStvTpYhN41pAJFMcGwVQMSekxwE4N7zzLun5GcsoXdmVHNCI1vnKSCZMsb+C8CHTOGMgzRTy998GldzkDkixtBwPRfWPRM3Msz4Ml7QHO9MFeS1agZQko/Hjh4th/bvFxy0gDAgntxHG2hz/9hjj8WcuXJ0eaz6AYz2UDh5oCpVqlkaeXjgwIHYOzJn7rygS/YDosY3XtkkB/BSupi7yUgyn1bU5i7paF9zvn1g+/1hQ+ukIWUdO3Y85jAnHbB73b1nX1m8+EzMNzS75kTg2OdwPQM8B3ql9wWuNEcwRzONoPhQF8oHPHMl/52YsH/fvtDy2teS89jYxXoEmD6hnlz7IuQ5RFg70UTI4N9bzYF7GsTq6BxBYgnHLlDLF8AT20pA1kDk2MDGW2L81sE6jdPUGZd1EqfN1fEJKhMrIWBQsSO6cuVyXUJZuzZy79uzpzz9zHvK29/xRCxt6MwEC//f/6VfKh//6EemwCpQRyBx/y97d/bk2XHdiT27urt635fqfV8B9IJ9B0GQAElxKMqyxBkpwrJDf4BtRTjmzeN5GfnN4QfFjCXO2JZmNNookZJIcREJASBIEEsD6H2r6q26u3rfl6rqrirH5+Q93T+1AMZ4RBBF6pcVt+793Zs3l3PznPzmyZMnczo9G3p22Pmb1o8Ru3IIGB7opQEEjKSvTIzLXXuP5pFW1jsAt+kTAtjKVvdoFmmDBULWFA8ftPLp7jkUYBDotWCBcJMu2gF9PBHQoNIoyB8JUzA5y2ckprSqgDcwkCdbJQLEIb00WVC/BCOEJNtlwklAm45xHXdQZh143AV53gN2ldXGB9IlhKw2pR21oUXkw08u7eykyWXRogVBI/miFVo6B70b++IEt1a0Em6+vbbk2xBqtLtG7n53ju8s8+dVB9kP8Ol75WpMPWkz6q6jGzOmWpbpxLzjGZowzfBboBHIa+e8rmWs7SXKGLHrv4zTcutDL5U76+la8DvzyrTzW+T9zCOf+y2OOjjytzRb38n48Y2aOmf7zPy1W/H8zsNvHaVn0ss88uw7ipvvfmiF2w/aFPgJUkBb5E4OsCMTtFPyyiybRVH2rrt48ULp6loQGlgAFo8f7O4OmT1l8pQyb96UAE+KZRDNtEq6ZLT2HIBzbEeZOYuN6OQAeQBYLDZqNLOpUZV/8luWxW+847fgPLax/3dNjnWwmW3eNZVPC3ns2LHoN03JX7929Y4ZFwAd9TZzxHRq7Ngyb8HCsnnTA2Hzq++wW9XuPXtD9l6/cT36CCDcDKDZKrOU6tnV1VkmT5kS9VTXtB1Wv+XLlxcbGGS59QHUpikvgF0ByKTFZfbAZ6v6sD3euXNX/R5DQwHSDQjICOCT/HEsX1btazNN/ZrBhXSYe8AAZLB+7ebN2tfqp3lOoF3WF4UXg6tXAmxbbyN/YFaa0U+QZy2KAmUOTX7K23ueRaWaf6nxb73Xvv7JU2BUg1gASli5cmV5+qknosFfungpRqG3mw0KPAcsMG+uXgdmMzB6Hx4/HKDXbiYYAWjEDI4AbblRwpSpYRROiPE0gOEP7N9f/uW//F/Kv/k3v1127dwRHfD/9D//VnnpxReCeTFTMmoKIHm4xvTyz+e1rLdDkww40gpibuW3GOuu7U5HrA610wg3IwQGIWHUaMXniZMny5rVq8qVy9UnrZHu00/fnQ6i3cWsply8d/rM2SjPocOHy9tvv102bd4cGlvlMo2y6YH7y+zOWTGlhom5paJ14JkAM9uYQT3VixAnVAkdgJLKk90U0Mw7QfQLoWW+q2FWP98EuGRyEAGYiUVlY8rYMXebIboRyDFtc7sONJYtWxLfyWpRgxCgB5Dc/v72qIvOgTaYwBriI5D/xhs3Iz/2w8ONxgKQtRsZcE/bfP583ZnHvWu3rod2lmYW4Pae+qq3UfzJvlPxrrxpvuW5aNHCGMHr7KrmvXqLQEMDLB2C9uUQ3EdzaWp70ncv73vmnrMD7VNo5/1KvNqZAYHiCckrrvNexs1zptv6Ozs0ZZKe+jlrN/L33bKMyTNJF+9IU1z3HOI6u+fIPIOezYrqzMsz+RsI5D3ndmhT4KOkAFACYKRWUpsl8w09tceLF87H1rPJB+wu2Zlqw6ar9+/bV9asXVumr5pW3TwND8dqe++S1Xgop+TlMX06n7JTA/DpT8iFRUuWBp9x40hDGaZYzI8SHNHGNjIXn+C95BW/9WH6F9PhtpUFoM+cOR2AE7Ds6e6ORcc9B/YHWPUuGeEMnDmUbfbcueWlz/1CKFDOnjsX2le2p+fPnQu/uBZMkZXK7EyxACRbZOVM7gKPlA40nfoochg4pWix++X5C2YFBwPk6tPUS31S1vitD9NvyccCM5pks2XuA5y0q3y/6ifVwawc+USB4j39As8G5DKzAppkC+66u7vL6VN9oeQiZ1KuuZ46rZprbLzv/vCIYPMg2l0Lw3hx0EbGWMydawBaZFMC1PxeH2V7baf94ylwFz38+Hgfy9PcvWrt2tWhfbt9qzZaGksNX2N2GHHV6yqEdKJ+0yBidFrM2A++AQgaMsEljTx7J4UWrSxAbJqGuxXM+9TTzwRwW7FyVfnkJ58LZvC+9zK0XhM0nc0z6QqZL0ZTtnR3AgARSjR+AOIrr75Wnnj8sTJz5vTy5S//3+XZZ58JIcXlCW0hugBG1W0LcwAj9WqTqd5GmISiMmBWW/slo+/etTOEB9MDjrkFwo0msnRWm1yg0z3vDwxWTXfQp7Ft2vbu+6H5tdKUcJZHpf9IGRqpdfUukCpfDC9NdEjbX3XOxRRoEd8n7HOrtjacfo8bG1P6Z86ejU6CEKOFB6wI7UWLF4cwQzff0YieUANgDWqA1jqNVafQbg/XKX/vKkdMfcXOaMPx3vnGP6Dviram+Qhn7Ucds80RtOihw6LZRvtsf+otHsGu3ASt34Kz98QVz3FvyGfO9wbvt77jOuPl+d53/G59p/V5vpPn1mfK7X5rHsqOzjlIvPc9z9HJO9q6QxXNktCu4ynVynSllTMm3hW/HdoU+CgocC/oAD600zH3tDn3zp85Uw4eOBC+YZevWBn2sG+9+Wa0W+1785YtIVMBLYNbQO7w4aPhYzXbvfYM6AmAG1kC9LGvPXv2TABL5gV4wGKl/ts3Q07qe2hmaT7JRdpSvBi81AwU06VWeAfoWhBgk8Z3/vyuALRmC7mL7D1SbVaVAWAFHMlcfQwFzbjOzjJ9xszY2nXX7j3hZWD6tKmxwxcQDmTaAStkdeP9R1r412xY7/HjUX59lzKSp2yI9R3yMrhnjkARo578wlIg8AZAltFW07ryLsCLgnJJi1KBBwMaVf3czDIj4u8/0B2mDGjBk4ByALf6O9+Cn/VTfX3l/PlzpWvBwui/AVJ9uPyl5azPoqxQBnkyH5Tm8ePH4xvs37sn6K6N+I7ZduJj3vPvxz27J2r750dEgVENYm1mIPAbB7jSWhptDV/7+yuiNUagpHaqtfN3jw++HO3pPLNDFi+eN47qgSvHYGzZNyGeiWOUancSmjerF3/lV79UHnloawXUzSr2e7+L9+TTGoIRWuwN2RpZGSlgKoyAuTGZcjz+2CMBFL7zty+Xb33zG+X1779W/rv//n8IH32m8I1CuTBhAgDsAQgWXxEkBJ97AR4aTSKaYVI0JEQJGHtaE8jLly0JUAyo8ZfH9QgBSugSdEAzEB8C+2RfmCa89uorZeYXf6lYPAA4AorqrJ4CQEpoojEQGzao4yqYS1pHRAKx0Qpkp+L38MjdaWyjetpndQNQTVmhEz+Ga9euCV+G7LQAK+YBtNuEWYIlQNoP38UBTBNc6IP2fl/gNHuYpoI2YXJ8g9CQN4MPdZs1c0ahqajft668JXCVBW1phrUfQbpjOuq0V9bT2btoIkgz20mWze/W63w372UarfczLXE+LKD5B4X8Xq3pZ1tFzyyfszp65pzB/XsPcRz1vnrW3+hbvWDcfadqr9nqVY8QsSCwZVCY+bTPbQp8lBQg54QALY3W89zp08WWqoAWrSRNn2lmvmNpI810TZs2J2z09TFW4Lsv4CftH9/pCUyFG/iSXzbSwVunTvXFgiyeboBZmmCyAYDNQfKYxixLWnGvMcdh1jBxoun1ukhswcKFYW7n/b179sRg8cTx3kjfuxlcm+VSXyDOQP3CubOlp6enfOalF0PTqewG4F5jxsfzAo2qvoE3GDapgKo+BEgHdteuWxdZSH/ZsmXhBnPunDkxU5Umcmo5+AsAACAASURBVOjnIF8pHfRZ7FilLb8MgLBpfX3uzl27w1710qWqLNiwcWMAUJ4D3t32TuyqBpACzYJZQmYD6H6opycGDevWr4/vobwOsp+ts+/KS4FZSlprAwt9HK370cOHqweHZrG3dtEGq/mFRt95VINY09SCBkTVbwpEQxUwbB5peA5I6CwBnnjGJ2kzPeyZft59zwmSPDRu8TBQaO86MDLwNClAype//B/Kr//6r5UtWzYFQPQ+oBJla8ARBnZIX9CRY6bs1F3HNA672gasMjXw/OSpU+X1H7wRgNto/cVPfbL8u9/9cvmLP/mjsnDJ0kiPQ+gf/PBHpfvgwQCFv/5r/zymzQMc0OqmsGqm6RNIJFAgLKRx/aGHQqMMfAkY177XwIZtWwlGoBRwBS6AyNu3x8Wo2G4spsNoHwlso3Z0c6SAlKZrUBYoBI59H4KGsK/fhl1WA2Bj+8Qx4a5EXaSlDN7xLsfaRuq0p74XLTZB6NsQqswafL8bje1wvAeotkzTh+a12WFM2Ux7uSct9Qsb66GhGP1ra57VelctNK02Tw+APy14NSM4X44d6y1Tpk4J4I/ezEHQTL0NJAjMALRNh6Zu2kd+G2WptLoLcP0WT3DOI38nfVvvu5ftzvV/ach3Mj/vyT/L5yyI57t55lqHmvGA2rxuje896XZ01DpEQi3/vONPoO3WURg8ud8ObQr8tChA03lniEd2N22Q/Me7lBjWSvBIA/yR47SHtIu0lAbB3EUtXbo45Of+/QfDDItmkSyRBr4AmvQvZBjgR75cvnQpnns2NLluz5qDxeRNdMhrigFyrYKxzrJy1do7msS9e3aHT1tydt++nnLl4sVQaHgfXwGt+FEfpB74zPaply5cCK2t/oB8FshVihZ1tY23wTqZqy5mA9XBszfffCvcXJnyx8Mzpk+LPMlkMyzujTQLvshUAPjAwZ4AmOxmAVXAVlnkoe7eZc4QZb1te9pr5eFHHi2HerqDDnzSzphRtcQ00swxpKFs+vjYBGjqtALY80IAQ5AzA43rSXVkFiIAsGx8DS7QlE/ZE8eZrF0NmgH84kff1fTr8WL736iiwKgGsZhCsP0orSOAYO/jCRPqBgDR0JvtZIEXB4bHZK1B4/YuxovOswU85G+CBojCDI6BgepmxajTyO+3fut/vNP4vZNAVhlaQ/5WDumIx6SBQPPMu2w27SgVnX6Osq1ebZjr0OEjMcU0Zdq0wgftI48+FnFPnToVo3orTgGlWn9AudpMeZ+gi3waO00jaGUA1AgnI03lIkQxP6FBeKxYvrws6JofcWhjCZ2RkcE6ah6pmmLvmcJftXp1Wbiwq2pbW2iKDjTB6qochvPMFG7dqovVKoitXcbgrcEybtiWvsNlygRCZCC0vkB3x3BHuLxiEiCYtq+0bFxkTZwQnQLN6IkTfZGPeISiuvv+6GzpVW0P1UG4enqmeRgMoRcBLLimEdCGaA/6Tp0OAXfh/PmwZXvuWeYkV0O7b8Wt+O9s21Y2bNgQ3imYOtAYDwxcLv0Dddof0BZ8Z0IyOwllc8+5NSi7cO8578V3veed1mfx8gf8y07wAx5FGaSbaWe5AHDX7uMbZc/fOl3X4qBpa3101N7JIJ44vp+zIL44af1qUOF3vHf31UyifW5T4COjgLZoACUAd2Ql2eUM2JGTkyZNDg1jV9f8sO0EzgxsyZ6eQ4eDP5hnmR0iNwFNMiQ1sGQFELh///5YIBxyqJnB4XvWTJU4BofRXzS85rf33AtAOXdemAvwm66MNLLVtWOJLXCBYlvndu/bG3JY3dIswZnkbR0o4je/BWYRUyZPDm2sGUw8TssJ4MkbLdLmVHmu37hRVq5aFTzN/pQChIssJgZW+5MXBv1oQrPKDZizMtPg0kTzn2sAQDYqCw2pBXVoQXZOnTkzdiMT33bufX195eiRwwGwV69ZG4vHrN/wPjol/dSbfLe4bds770TZ9Ze+I9dkzC3UTx7A/X333x80pr19/7134zl5xQ8szbj6tsPopcCoBrExp3GnU087u/S7R5tXNa9s7TCaAzMAUoJr4JVgwVQ6cwLEkZ1rwogEndF4m21R2cQ++NBD5Td/8zdjy0HMkYBAGq5DCDbAQn75O+NikhAUDWiRr2AED8DRehKOjzz8UDDbN7/5rfKjN94IAfHiSy/F6FVeX/3q12LaBvNZZKBeAGK1NQSYK1BQBuVyNupmDqBOGBzIMs1jcUJPz6Eox5HDh0tf38kAt2vXrQ9b3BBS12+ELdS5cxfC5ouHgIULFoQWEy2ZM+SIPoEz7ML9GQ2qFf60uUkPaVb6VBBjwMDLllEyAUkoEvzo4zuqn+lnQg/9mF8gM7DoOeAOdO/YuTvcyFjMsHr1qjA5IZxMTef3IMCkxzPBGz96M9yzGPlzx7Jk8aLQwEoTjQBmQJfWYM/u3UEbmhPlcOw/cKDs2r27PPHE4+Xxxx4Lt2W8Jgies49T12wn6s/kQvru+ZaCOEkb5fygkPedW6/FzfaVaWR+H5SOvD8o5Lv5LH9n2r5F5i0N18qPTs61M2+2zGwGhjqcrL90pKH93U1bbtXEwDP3pWX3Ivzw4+qR5Wyf2xT4SVJAGxSijWabHx4OuTJvfldZsWJFtGH2l2ZiyJA33ngjQB7H/Y8+8lAAqSNHjoVZ2KKFfLWODZBkoIdvyDiAlWlCgmYKBe0dAJO3eHgieUwfkcoUMs3MUS4yY7+5MbZIvVb+6I/+uOzc/n452XssAHHI5aafSc0rGRqKhYZw8hJPoL3sCg3njJCvZr9SEaAseF+fmppTA3zgUblpqm3PbiZP38QeFRjctWtnuNHKmVMzjOQAGY8mixYtDjlBE05uoo88mbFtvO++WNwFnKKBfoSrrSVLFpee7p4Aw7wfWNxsYRvNuMHz0SNHCkVPatH1U8wuLDIzwxp14UVn4sTCNEEfZhEY953A64733g3NtPKFDLOFu37+Q+RnQ8r26WOmwKgGsRq8wM6R3SPgU6eC67ZzwYjDwGvt/AgE9wAYTAe4YA7MIBAQGrsGirmAVM/yAIwwAKY1TWFHEAB22dLFkbf7GEE+8sRc2enKV55AWSM/4hkGGNtotaIQjVN84FM5lclon/YVACAYXv7ud2KKhxYQYz/62GMBYPnI/ZM/+dPyxS9+MQzhN25YFyswbWIAPBnR58hauvJOmkhHqHZN50IwGz0LGJlQZBu0ZvXqcvjI0aDBnNmzAyQToHWqxlTWrbDJNWoHkKXPyF/e7E/dQ8+BsdxVlaB/CMHGdy860XgyY4hOY0x1ri2yNGMhXphr2IRiUnyrydOnlXmx0vVSuFAhDAnM3PuapnzyjRvlwQe3xvfN6aHBRmASWvbi3rFzV/mLr/xZrD5es2592NeuW7+hrFmzJoCtb0szQBPAjczZM6fjGrh/80dvxLQW4UmDDRADwE8+8WjZvWdfeX/7jviO6eT73k4JnaVf63x3MBQfoBlwoY04gmsh21frvbz2jTNeRP6Qfx8Wx/0sT+tZMpmv+/JRrhwM+Z4Rp9nJpmPkrlmE+MK9eXrHIQ2WODo9GivugvCjwVzmEQm0/7Up8FOggHYKSAnabg5+LQI9dvhQzDqRyfoLcpZssw15utLTnrVf8oD8J2er1q/u5ueZdk8LefLkiZgep210X98E3NHqmnXyG4AivxziXLmCtwzep5XJU6YGX65etTLcTZpd+53f+Z3y8re/FRpD5efPlomAa/I/eRyYNUOmczJNzpRAUF/1439bfuSyvsiUvroCqSELzGyNGxd04HasmgxEEiEjxTl9+lRck5/keZqHRbmmz4iNhABW+SgXkwIDYlP/zkC+gF4p28T7q7/663B15j3aZnFpnL/33b8NOsnbM2ffQx5kNu0vICsYONAsKwsaq/Pu3XvC45DnO99/r9iljebVO2jlGg3aYXRTYFSDWA1ZYE5QF/dUIaFhpRABJjV6DQ9oBQ6rFq9OVuaoioAQR1zvM6S3eAeQdV8HypB98eIlMZpkbP/8J1+IhU8a/u2hW2VcR/UN6n3pSgujArMWE8UKf6C7capMoMX0UuPnD0M6gkGH7poXAInsVS9dmh4jdWn3He9tmHtisXvIM88+V957f3thqM4p9OJFC2N6m+0Sux5CiJZAWYUA9ne0ZxX08YlHGHNhcuNmf4BGK+iViWDgqsUCs31798ZomHbUgia0I5hoezG/KXgCEmCncQVgI88GfA4MjITZB+BbvSRUgHL7tm0Jr8f3oVFlOoA+0pS/cqCpvFwTTB0dY2MFqjZAkFdheSbetYIVkFyydFnUm3Z527Z3y2c/82IILNpjbsAItoPdPeUP/p//EFNFG+5/IACwaS+j95e/Oza2a+QP0qpe34eGpffo0TJj1qzYHtFOOL7TfRvXR5nffOvtsIU1nbh0yeLQprMZPnr0WFnQ1RXTVMqqM8gOSbuRhroqEyHuWwPZtf1WgWvwJq444vumBjro5PruN2428mi+c3yEln9oKKSAVy9l0tY9k3fyWKabaSuzuL6He8riPde+g85PZ61zIPBD49PYjXlHED/zcO0wUARghfjet2vckTF3Xa7Fw/a/NgU+AgoEkGvSxR2t2km3AVFBuzZYBT450efeD3AzPc291pNPPB5T8LwY0P7hXzNk+NVh6p3cxC/aPQWFnbdM1eNHeWv/+Nxz/I3H5syZGzwDKLL9tFBp9uw5Zemy5VEus03MmcJTTX9/2fH+e2G2AIhLj5eCyld3gbkX1Vv6ygmcmSFUNnxLrgCv+/YfiDzsVNjTfTC0poCfMuJpcoq7MFP7a9auiwVeJ04cD4WPPoBcAyBD29qY5NG42p3LbNbKFSsif/68zXRJ94VPvVDefuvtSF/mNLk0u+iqrEePHokFaEwzyJI54WnnVvRjyi3wpz48fDPoTXOunOjELtn3q9+DNrYj7tG88tJD9iuDWTwziBRA0a/RipcSIFj66NQOo5cCoxrE6kQFDNg6qru3UWHaEAogbEyjG4E2C8IC3OaCouFgOMxx40bdWID/OrY5mBSTY0pChQDaumVTpKccGvftZsFTdsxAsLKw/dm5c3f4sgVgBbtMXbnCd10d/UlD3AQNzspKoFkExOMAIHzlyuXYL1oZ9+/ZE+AK437n29+KuJu3bA1XJdIDSL1vNB9AhXnCyF2Gk74wGEbtt2JaxWDgamMLS0irN+N3IProsd6oO1snZgfqiSZAZS6o8jsYnousADUlhAxa+Eb4Xdlq3upby9PffysEJWBM68bwH8Al+NBFfOkRQD4e4eo+4QqQ08abWnJPAN4dQDBBpC607IQ5WjALUGaDHUL13W3bQih94oVPh+2VdAg4GneaADZWXN24r47SIpgBNqP+y5eHQ5PAvMLmCg9u3VJ+8MM3QrN9rPdEmDYYWKgHR90C2ys2WAAhTfn4cTND0wy8Zqegzjo47Y2wRfOkn7RcVzpX7W3WX/qeSUc8x4cF9Mg4rfG8m+1Ruq3PpNX6jufyEz86NTMSjTmMs29k0CKO4973892RaJ/KW+Ibax/elX4A3Gax14fVpX2/TYGfFgW0ye79+8Mji2tygf3k/fdtDECkHAAaniXHKAfIbTJ2xvTpAZjcx9fsOclr/QhekB7+ouggJ2yGoA+YMnVarL3IOFu2PljOnT0T8g1wtgmLTQQoavbuO1CuX70aU/B4UkgQ9kE0AlwF/Wnyul0oufUyS/XGD39QJk+eEuUFpskH5eS6Sz3UjSyTCrdU7jnU33tkpZ3OAG7KAEoh9NKPGuAzw2JqYLEW4Hn50sXQvooLFJO5ly5eiLKRM9n/cFE2dSpN9JToa/jDVZbZc+ZG30SzrF+RP+8Izjt27IxdNg0GAGkaagDfu0krniHk03fyZOwylsqYlHsfRMP2vdFHgVENYnVuQquWJ0lYG1pLR9tMlwBSgI0AwAAHDh25424Ahu4CPkyBaQAZjM0HH9de8pYXoWK6fOxwteMjfDAOgAHkrVq1Ilaluo+xaSjffe/98uwzTwWjEAjSEIz2Aajr129Gx004KjP3WfzaSc/U0dXLl8pkO4k1fv9WrlodIM+mAsAabYF3+dUD1IBDTKm8lNi0DBZpESY2LEhTAwKQYGVC4H1mBX57z2jV3uDqAFQolzieuycEkLl1K8CsPKz2DC302FJu3a60l84dUFpKCGv0N2io01I34zpo1dkZ+dJojzTutUyqjxlv6nls2EPVlf+m3Oo2vIRr1LmDkJ0fNNNJjPD3d+JkCVOIkUrv48dPlv379pYtDz1cli1fHoL4vo0byuc+99lYmLF7N1cuPXe+P4EHFNvpRtvRNoRt77wddnJPPvVU2bB+bfn0pz5Z/vwvvlYeeuihEPjyodle37icYT+rfkBqT/fZcK5twOGe8lmYJh/eF4B3tmjahXaoreSBjr6B7yOou+B3Hr7JvSHjZbvTBlvf845n4uU505Cue5m+s3jO6OxdZco0xHVkO8803cvgWWs6ee15neK8O8jLd9rnNgU+Sgq0ambvzQfoO3/2TPnB69+PGbr5XV3l6aeeDDt47p/w7JLFi8vUaVNjkM3+Ml1Gma3CH7HJx5gxseqdyQCbT3IQ35gNNOVNHpB9ZG3HzZsxi2RDGoCRdwBmA6ctALNxwrRp5f/9g/9UvvInf1yuXb0SoE651YPc+Pt93N+vER4bjllFbhjrQi/vAHfcbBEvly/XxWHy4k6M3BeHJtQ9PKx/AizVgVb3wvlqQ0trrK8R9IMA9cvf+275u5e/F8oCdVcnZZw+vTNowRMAWXFg/74CVNp4ABCWl0ChQmtLVpCdGdgKA6vKQFs8dWAgzDzee3dbyCemAfpHdvs8GwCo6mFxl7RpvmnGybIjh3qifmZl2+FnjwKjGsRiAkGjB04zuHbQ/GAqB2BYvQBUI/p8T2PFUICIA/jLa0KFFramPxyAQlrsgD716RejYxUXAziyw64Alusp7jcmxNSRETJtpHiAL8Brmr8Cs6pZDKZpto598613YqoZWLZpAK0iQIPBMJtpGcwMrthZxA5in3j++XBIDehMnWI6fmyMKjEi4/wMGN4hOCu3AFAQQLw+EIymeDxnz+W3dLmNkbcBACEsALN5iB9mALfqQpwxIxWs8h4hfYu6sg7yopXwzuDg5NLZeS3ooX40rDTPrh3eQcsAos1Ut/vSTABbBye5w1PucnYzQLwOBb3ZVRkMMK24dm0w3rVTGWHsm1oMAfzqoGg01q5ZFQsEaFUJwKq1vh0aAd/+/Lmz8a5yCQSpBV/K+8Lzz8ae40wGTDXS/Ma04a1bZfWqVdHhaU/C9h07w+ZK29HxWcUrLQLcCl5BZ0YwJw2Cno2jc99QnuI70FRwFs89Ic/xo/nnO4oj5Huu3XNIO+9n+q3xPcvn3qPJEC9BrGeZVuaR5fAseTTzyjzUR7BghgpfOZpqxP32vzYFPmoKtLbre/MiywWKDSZL2j3Zxwk/nof6yJuN920sy7duCblikG7gazERGWTq/PiJE4XfVtpEvIAPtH1nMgYQxPOLFi+JxaIDgwOx2yKTBDKP2dSaNatCtvzV1/+m/Nv/8/+IcgXfpTeWZuGWEkszQ/Jh/o764vvGZpYW2E6U3FiRPxY8rVu7NhbS0oxawKV/VF7y2Da2gCrZDihm38n8DkAlZ2lpKTcAZb8d5DN5Aeg7y0s5mXAxUeDC7NjRo+XAgf0xG/nY40+EPNUvkpPMC3jlsYg77XUnT+6N/JVFWsA4BRRAf9/9D4S5lnrz8MP0QLl9LwCYh4dTJ0/EOwYTyv9BbSFkVWMylTRsn0cXBUY1iE1SJeNrUFXTWhcPEQKYCKNbUAQgiEsgpIAAWDTSTMPIT4MnaAgl7yQjcqclDyMyO2bBCX5jRtpDwZR2LmgipAg6PmxPXbxUZs2eFSM/gFqZTP9gHnlU37A2YKg+Zk3fm34GGG0jy+eeTpxNLmYCvjE6W8yXXnop/BCGKcDVa+Xd93bUKSWa5Qbw8XAAOI8r1d4xtNfKcavanNL8oQthRKgwHcDUVnyyUfTM5gW2j0UbK+oJGwKm7ohWvwaXXQHWO8YWe4cD6bExAsHIJGNsHfGiWy6SoD0FTmgppg9PC2GYNPGd5K1u8uXGSkcBzNHCEozAoTM60/R6R5psfGmYXaOXEbmBgLxpLtxn9wruGeWzXUN3i6/shoZGhw4fjYpxoSV/O77EIOS2LRD5LuQjty+my7gXmzV7TtCP5gJw/dxnX4ypPYKV/S1Aqq1JS0dmGm3F8mXlF7/w+XLo0JEoF08LbLbsUW6aUbnrwGE4ptSUX5COtpodiLNnDm2k9Vy/zt8HqXlP5yN+HuiXIfki88z03W8N3vWes2+X8bTZDJ75jZ/yvntC5pnv5dmzWi+8Vmc5Mr32uU2Bj5MCNJfRvzSzdBba8uetva5fvz7kVgCx+fND1qVihewUgNDzFy7G6ndyiTyNwVrja1na0tJH4AfBinm2nIL1AMuXLQheIgs9+93f/b3otxIkBl8ODQV40xddCx+t8fqH/gs79oYv9UfHjhwpn3rxpbA3JRv1I9xTAd5Mn/BuHqHx7eR5Zny4v1J/cp9JAhtefRbbYP2uAT3FxIyZs+JMMWLHS3UmHwcHBwrt9oyZMyMffbP80En+8hCPJvV4b2/IHoCV/FFvSiF0C8VUM8sKLLsHbFNqka1kusC0QJr6/TOnTsUisejbm4198hukzPpQArYfjCoK/EyA2GQglAsQGaClP7SFpsY1SiARkNH55tl9AAmIzYZJcIjjiGu/m5WNGMQ7pk5qnLubGgSzNB07IEdg6agBK+UzWoytagcGYhQ6i4+7qVNiVEhwKTe7zvEE27nzoVGVV1/f6bDfMZ1iNyp2osrlwIBbH3wwhJeFBbwAEBIM04EfgsI7D9x/XwUJLRozpgXDpbqiUheMDzwND1UtAAErncmTJgfYIjgIACAMaKTlBgIJNfkSCDSi6kGgVoFdAQrhCbDeDmBF21sXDKEZWYn26iMoi+9j5GsaPXdVY8OKno5Jk6ZGHvJCR+9LizY43DqxM508OTTlwN/Jk31l565dITwXLVpUdu/aVY73HiuM/OVHMM6bN7+8/eaPyuZNm8rEidy5TAwQbMGXPK343bhxQ5gVWH0MwPLT6xmbZG1EJ2bHM4B4zZq1Zc+ZM+WVv3s5Rv2/+iu/HLZypvu+9a1vR123b99edu/eFQD8wYcejsVfbGPRUUf1ieeeifRt47tnz54AshZtMCkRdA6DjdZGOVLIxsOGlujaSt981npOEIsWgvaa/JC0db81D51T/pavdzIv7+R7mU6WLTq1Jn3vZ355P240GuN8Bx+4ziPjtM9tCnycFDBbQy5ebmzltU+LXi36XLBgQcgW8pc5F9MgoJNs1I/QIGr/5C5PJ8wGZs6eXcY2JjfkuCB9A3SynhKFYoGNud8UBOQ03sMjBw/2xLT71OnTw45W+fA2vSuNqvIBtzmD6XdryPgG6cBoxme2RjYwEeCdhZbS4ir3HOqjPPoCyhkzmIBoXXhW+1zPyEVxPTOrd/pUX4DX1atXB1C3XkRfwiVhBblXysWL26NuXD2SLwC9Z++89WYoiOQrzVmzZ0e/oT4dvAc0i5HZyXqHfCHnrXGIdGiFJ0+OtPft3RP9jT56ypSpYXbAVEz946BpZf+bA/IW+dhKv/b16KTA6AaxLUyYnSVwpZE6jBjTjEAjxuiYLp8bqWFWgSCgUUyAW0eCgzGaA9AwPu1f34kTsSIduDGFwz+dVe7yx/xW5I+zm9XVwXL5SvXPGoAqtgCsvkblR5s4NNwR4IcwI9wIrtDuNlPDVupbZMWkAHgBTI0gMVauUrWDiAUDc2bPigUw0gA22QmZ6sbwwCBhRpgSYsqqPtxpXbjALdXluMcXoLKwvZQ3m19CUny06z1+IoCtRUum+9GU9tTmEmhqqqyjoz8EGmEErOaUW0z5374Vmlh5jB9Pg21Fumnwqp2j1QSMeUCQLgDte43pGHNnowJ18X7VuN+MPGh3gVe0N1BQXoMXeSs/Z9tG68CnzuX48d4AnGyIdTLd3QfLfffdH6tqNSnfQr5Xr16r010TJ8ZvDsvXb9gYGlbtRDmM2JlzmDojLGua08Ke2HcAjs+cPlW+/o1vlueefbps2LAuFmjs3r23vPP2WyHQaRh37therq5cVdasWR0eH6S1d+/+sm7dmvLpF54vTz35eNm1a0957/33Ix9tIIYIzXR8gshWMZJtPb+fZ967N+hUvC++4FsK6pfxI79GOxPtp+EbcTLk/dZ7nnk3j0zb74wnb+0x88/0stO4o9mtieXj9rlNgY+cAtrph4WwIR0ZiQVIwBH/pWZfyFNeCvRFTAS0b3KIp5TkKfLUcfjw4RhQA5AC+Sxo+7SXtxuPOdxu6ZPwGN+ntK6m8802mfn60Ztvl//8n/5jOdPXF32asumPcircjo14LPkwMvkx/+RPC6l/xLNW6pu1ItPJ/lWr14SiABgFtPGu7WXJLbNOzmSk/oktrH5IDaN/vX073IkZ8C9fsTLqSn7SRlvUJU3lB9rRo862TQmFU9qlVoVONScDPK1fmTCBZ5vq/soMo7qiccpGAwWyes7ceZGmvjIXg8mbJpZXgp4D+4PO6g8/jDSgOPuyWFDSyL+UUT+GlO1HHzMFRjWIBTIEDRej5eEeB8f5G+NjMvEc0bgtvLp+PaaxNXLM47drcQkMDONafIxqlSLtGzDLrUoIhfD7Wm0GaRuFCoTqtAShBSxODNtCPugqSU2LTwgAyM7zZjAVMAE8mm7CVH4TfMplep9AoVm0cMiIl0YubSxztxja0/379sVCJULs8//sCzGtT3vaf7M/hMuBA92RPr+G3D/xlEBDCOgCovIw1X2wu7qTIjBoAIAJ2/rRilqoZqESMBlg+ypPC9MDwIYmtlk0RRgFMG+AE57SMAAAIABJREFUDJtYZVe3cRMaW+LYAYYgKmX+/LnlylWuaraFVwAjbcJu4aJFZfGiRfGe7+p7AMrsdefNnRvfmobCt75NG3C7fmf2lMuWLYmdXvhhNPXvuxqVW227atXqqLdnBN71GzfLwIm+6GzY5HqfdwYrg5XlC//sF8LzADMAIFSg5aA5rmDQIGmo0PhqO/ZCZ8slv97eE1FubdAAS95syvgb9q743jUw4ld2y+bN0Tk9uHVz7HazefMDMaNgIQnhv9QOOL29UQbtVlD/bO/qQ0Os85C2EF1y0zFr10I+01a9674j08nfzuJmXq4d4vnOOUDybQRnzzIdZ/U0ePRe8qL0fFPt+05n3qSX6WpE6kEj0g5tCowGCoTSwtajAwOFNs+iUFPlbC+Hxo0LO86QKdevh8cY4I8MST46cbKvdB880NiIVq2shV7kMIBl4ZQpdjKWe0Ma28tXrobmkXw2K/anf/bnIesPdXeXc6erKy98Jo8MgGwGfdaHheDTBkyLo34CoNZ77Gi574FNpaurK+xPKWZs68qeFFi3zkBfpN/U/1y6dDEAPRAecijlBHA+ZUr0abSde3btjNktsoJsANwphSiOmBEAjuJzI0aBc/J4b2y1bgtY9ORN4Py5fSFLQs41M6m0s5HvzZs1zWZAYLBRBxJ2cLwW9r7KnN4Jeo8crnVuBgGp5HITfTK0wWtSYvSfRzWIBaoEZ4fGyB6VNi872zzrJHWaGrZGjEE1Shq7uoCrap/E0/HnCNhvAkFcDHXzxvXYFcUCIKNN6UtPiI65RYuFMU1xT5sKIHLLdC3ANfDF7lSZh8faTnZ8gAAAhmeBMbfGxHPpAbCYVUdPSL7wwidDU3ro0OHQ/oVAiN2sboQGVll7eroDNBkZm8YhzwBlIPPv/u618s1vfjM2bUCPZcuWB2g1IrWK32pXaTKzYCer/qdOny7Xr12P9GlNmWbQ1nqmfBcuDJSz5843u7rwtzc2NK7KIg+aAgAa46ctLaDrQDvxpSk9NGBLa1EZI3sjeQCWYEdDYDwAd2dn0FaaaIOWbG8tYOsYOxza8GwPRv9MQKQpHg3G1cuXY1BitK+uVvsSlMAmumsnBKFVxL6zTkWd+cVdv35tefDBLeWlT79Q/vKvv1H++i+/Vm7QIjQCf8yY00F3iwf27N4V02raAi3q9773vXCQvn79urJ23dpyc3udbgPsdALahe/gG1y6fDlAroUi7isHP7Q0HbQihLBOUZ20TzQS0EMd8rgXxEYH19LJhXCmnW9AbBXyFchm2444LWn7Zj8uRB4xoKvpKFOUDQhuOgPdrHR1rNoJGpgNqaGCYiBW3QVx82kTqX1qU+BjowCAM8ag7NatcvL48QCjZBhZs2Tp0vDqwpSpzo5Vme853iDTaTfxskHwlGlTNfBo4+K4R7FioZNpeLNf+qnunsOhFKEwIXv5gbWTlDBufOcd4PnjwOp/DcHIxdz0xYJlcpe8OXLkSGhMDx3iGut6DFzNTim/gfr8rgURD5BWL1P45JKpe32TRV7kLMBKRlKgkGdkt/jiUjqYSbORARkvrUOHDsVzMkM8gBqdxaWFNTNH6+rbeE5W0pLTCpNFNL/cG8qLjJOOBdt+p+y6l06tgPbeZ+3fo5cCoxrEZj+cQAgTjA8j87s2edl56gAxhAbtXjI543EgJu8HUzTxomO9xR6voww27jXs5PSlL/3z0FR6R2cuXWcHBpC+hV5AmpE14QMIAmD8A5qiwODKT3tFIKkDBhIARfZB8mcbaWEXrSsNsMVefbF1Xn8wpvh2mwLU9uzZG4wImAFQykIzu6DrgQB8BNG///dfLufOnCmr166NqW7OomkEmS3Qtk7eujVsn+RNoNAEGBTcLeNglEvh1Uc8wkP5CeakMyHiOgBs/0CMrNGkboAAbI69Y2qAXqaQBPWm9bQiV9l9m+WNHZXn7MoMJtDIe4Qd8MdWGAC3AGxsswBouPFe4B2g0LR+ltcmBcpNsPHlaHoMSARepUkIT12wIL4X4O0bM2VQR7QSt2v+/PLr/+JLEZftqzjqXbfAHROLDZTflCI7Mu0FnWhUmDUAoH4rh7YjX2kAba7RgYcEZT96tDfu2bRi65bNEY/JiGBwApgHyGsxL4h2rmNsseECAkNH06JVCFW5hPIeTU5jfxwZJIBsnuMd5a2vVF4bSWbMFxoAq0zCvR1D/PZOA0ylqbz/ID7+So3QB+TRkl37sk2Bj4UCeIU7KyAOj5tZ0ReZ1dKm3TMgZe/e31/tu/G3WSFaW0Efo+2TT87kuXel9dT6p0tX17yYvqe9ZUJgO+2vf/3rpefgwXgfjw/c7o9+DbjM/u0nRRBaU4teBW6o2P8zV+MVQH8GAAo5kM4ZS+sFyDPaZHTgU1vdTemntjRlAwB6pvEUFOVv5AOZDITqE6bPnBkKH0BZPwC8kt9kpHQcKUfQEn29y5RAnzt12vSgo1lV3n2UDziWHh+03k8Z1Aat8Ul/5v+NahBLUAg6VPaHGp+pDUAA2DBtPTBIS1uZwHOgAfMBNq4xF/CowetQnTGbM/BpYVEpdcr0gS1byr/6V/9rWbRwQUzBDw4Mhp0pIRa2M6ayb92OPKXLDgqIkS8tLAaXrvLQKhoJes7GKQPNsOAdGloAxyFYDcqNCK2p6WpMf+HC+RB4sdho4sTYLeahhx8OgPzutnfDjvbxxx4JLeT27TtDw/wLX/jF8snnPxH7YP/+7//H0AwSFIz2BbQE7u02xTUY8EYw0AIAfRZTAaTKiM48GPgGnhHkykujCqgSCurhWxHMY2/dKlOnTA6NKb0ajTfQxyQBfaRD89h38kSM2gF331NeygCwKpsyinv+/IU4DwxcCtBrmo1fW4vrmC4YROgAuIUxzWX07z3T/NOmTQ/QKi3fHG2ZBeRgAoivfh0rUBZf/QBtW/H6VvPnzSmf/exnQkPIT6x3Y/puZCS+DQBLUBKi6k8QW0m7Y/v20LCEIG40Bqbm0Eke2gVtu/aCnjoC7x85erR88QufL5//3GfK/gPdYT/svpDCW/1co716oZ227qyN04TGtZfca+xTgdu0yRPfIa3WIL1i28gmyEOo/yVVr6Sf+WZcZ/TNPDLuWNopz+zE1rR9zwyc8JZrh/JkPq1ptq/bFPi4KBB2o81AjebUCnraRgNMcsVgFy9u374jFs0amJIR586fj8EsWUGeS4ecE2IAyb/2xInhiJ/iwjum8MnJ1159pfynP/j9cvzokRhAk5v4Qxppx/mTpoetat9+Z1vUCWDct2/vHQBOO8qLQPZv8s5r6xxSMeBMOXD+3LkoJ1lA1pn5dFZHNCMDyYLgd/1HKTELCSijkfxTpqp3Xf9xLp6FfGoGzeN4fGgUS/ra6XzaNtrXeV1doXA4dfJk0NF7KZdawesdOdnIpQ+iqzK0w+ilwKgGsQnuqgy5q2n1m5YLCB3fTyMKcNUpZ6Q26sUMAIKFQISM6zQh8Cyubw8Fg3kHcPqN3/iN0IRylo/ZCBvT4Bp6dLLSHbZRAYfQVwPEMsAH+kyBY+JLl68EMJg4aWJsQWqx1HPPPNWU4XbYctrEwWjVIV3vAl8x2m52XgFyMDmBsHnrg+WFTz4fxv4EAcBz+fKVAHh+z549O5jZoqLf/t9/O2w8gbszZ8/Ftn7KxwwDPU3FAIrAC3tQtrsYHJicPm1q1JVg5qIqXWixzWI/auMEIDI8MtCsBRBizF9X2yszP7NAbAJYmlp0YXcKGHISvnPHjhixA43e4frKFDuQ7LuiR+xwNX58lMM2rla0qqvFV+x2o20M2FzhdtTjgQfuK++++245e/ZMmA0YBLC/EghQAFcnxA7Nu4RoCNih4TJlStWUosOx3t7q33HwVgxMTK0B64899miUkf0rv4oBWCdMjNE+zbjVvDSwNAfajvbm21lVi7ZsY3mRQHft6Z1t5yOeb6wsCxcsCA3wgQMHyukzZ2MHMNsLA9Tb3n0v2gnh7l3t2eHdBLQ6Fc/yeV7nWTzx89DusiyVZ+5qOPzODjcI+CH/pNF6iJadm3w9E4bU2YWFlnGngmL5R7mas+t8p4nWPrUp8LFRQBsWsk2aycLLTGDMjnCxSBaTcWzXyTx9kbUIfqcpAW8CNI/Sw7fjmql6g2jO/MlXioRvv/Ny+b1/92/LsSOHIz6zBcFMhTIAgwbFrSAsIvwE/ukPv/LHf1QWLllSlixZEkBSn0TmKjeZSaaZpjcoJv/Onj4d8k/9KVzIMYdpfu8ps77JNZnoPvnAhEJaBgRkp3C4pyf6YDNu7Fr1sxb0kuEGAmQD+exMDhpICDmz6gxok+8DA3VNBP++ZueUQ74Rv9GEx4/2v58LCoxqEJsND+Nnp5rTFpgII2CgOA/UxSTiec+2sqYZ2MhgfkIE4CEAxMEk7jkL4phWB/KYBNCk1l2ucp95/k+rnSYNHcZMhqKVtOiIgOEhQFq2ZlVGYJNmbIjpwPnzwVAEHfAG/DnTVAI5RrHqYrRt+t1UP2a1mIA29Nix3tgekP9ZjOndjE9wwgzr160NQYpmAOH9922IxVF+W0QGlCs7Ybxgwfxy4WJdICc995wJZiYNNN0cbcdK0FKfEyy3O4aqxi9oaWqsPwChPJTd2YpP3wZtaDsBdwBK3VMgEWKAK2FuUMAcgoCycYI4vhebM1pupge8OCgPMG3QweSgo6NqKQByxvtG7WyFpUnwoonpOTvRyN+ChJkzZ4VgtjmCsi0pi0LIHjt2PDT32oN8gFfv0sIv6JofGvqHHtwaix2OHj0adfUNdET2Uwdw9+7dE0KalkU7AODVmRB3uJ4zZ1acLeYDpLMtb9n8QLjpUje2076fNowWrrMT9I0E5zzUTdC23RM347nOkPHznPd9M0fwRtPh5vvi3E0h36hnceTt3dbQ+q774uCPNC9QA7/VTcjyZD1a02pftynwcVEg+Uj7NNvCrRQwJdDsWWAskJm8rWjPQBQgduP6tZDP3gVEtXTtG9AjH3gkMIXvXYtxv/y7/1cAWPE9b82bXLUboXvArbL8JEP0UU1fyDf49Bkzy8UL5wNkkkHklkDeBS36+2OmicxVHx4E2L3qX3t7j0U51UuomxRUV13eRwNyEYCVNtnRWl99cppfoDWNLqWMd9Qf3fXxlC3KMompXCODzFzGZgu88Jw+HWsZlF0/KS7FVHvxaHyWn5t/oxrEAluChquhA48asvuAH4CkcTrcc9boTX8ATQAsZveu4w6ABV5vc88F3NbOF2OYyv3k88+W4c7qZBmDWfgjfwFzDQ1ZYDMu7DNnzppZwfGtasxvxfz4cUBVCeDHLtJOWPIGiE2jY6hp0+piHfcJPcylXt5L5gS6gOZNmzbHitGenkPxrviEgC1t7UMN9NH27tm7L4QhJ/ohMBu3XuPHTSmnTp0JIMj2E82AdZrOixcvx4Iw9UE/2lfmA7QChA1gSRDNnjUz7GOVDRAPjSBbsMbGEZgMDQUNgynjkerGCQhGc+DtxIm+qBvH/wA7bwECoOk3uyX0RmvfEE0APM+VRTDtRqNLE8wvo29Da5sCGNDj61CZ1UcaaKUeFpCllkA9BgbGB+CVBw8IFoURlMwrfJdYjNfsOAPYsROj1beQz7a8tp0VaFAnTZ4UWmvtY8eOXeWVV1+rq5mXLQ9bMt9WmminfmjPFKV2YBPL7j37Ygcv32fN6lVhwoBmBmzKTCOiHuiQvODceh2Faf61Psv7GVc6roWMl8/UUzkTCOe7957FR9t8v/W59/N+5pXxfct85n28oD2bkcj73m+HNgVGAwW0UbIUD9I0Hty/L2bF9C94kZbRIt6D3d0xEDXoFVauWFG+8+1vV83huAo8gVDtnWxzTGh4iPnBsqVLy+/93u+Vw90HQ14Gd9qKvOn/KFscAJjwjwWwZPK9wYDyMi82M2YGT+oPyS1KFH0tOYkO7EzxqD7A4Fudqnuwm+HDVhz1Y6sKpAKnZ8+cDqWOGUDvsfMlS5ki4Ht5k3fe1YcL4qWMMeClEGFuIX8LdMlwgJXsYIagHL1Hj5Yly5ZFmt37992hmW+oPtITXKOBvNvhZ58CoxrEGo3VUJlO54pBND6NWNDoMZXDc0Gj1oECNZiPRgyTADcAk5XmfJNyaO+Z9K5fr4AZY+pYb964GavxLVQC0sSR9/XYPGEwmAxaA05pAYEqU+1CBZo66fFl6dIlUYYAhc3UiXJZvYmprYhnknD//feXA/v3x2IAwsNzdkHsWJWJxpB28Nlnnor0kiG5IDHVbn/qf/2v/7e60Cx86A6HgGWfK30CFoA1DeZdAwKAjDDxjC0WTQJhUAVTdTkFDNIuVzdbV8uqVSvjPd4Q0NxCJ1Pec232MDwUmmd1dZ82cdLEKQHo0cTUvO+wYsWKsBs9d+5saGJpLYziYxroYvUhCAwTZN4z4mbzipaEFhdggCe63xzHztaOauPLls2bom6m8tQBDaUBIBOQAuF68ODB6JQ8l6epNNrUbD9co2lX3gXoBfGkqc5cqvHsoANiOqFOaKp+3GQxqejuOVT+4Pd/v6xbt/5OWZYtXRLXu3bvDcCuPQH1Dz+0Ndrrvn0Hyl9/45tl86YHAuAC6dI2bXng4MG4jsI0mks8kPVyrWzS9M0EbdaBhg5ldOCNVoApbj5TR2kaUOT9dIMljvSchaSXexmkKw3BfWXK/NxznXkpk9/t0KbAaKRAtPWmHQOQ5MTRI4fLZz77uZD1Zml6uruDX4A1YG/58mUh001l23CGHNPHGGhLg+zHH8yOXLP5/8qff7Xs2r49ZA6ABbDi459mUL7hAJ91lT954pg8eUrwKLmLb1eutP3tpehH1YsJFbMp8pKcFTr4Bu+4O8NisdWECYPlyqVL4TVH/dEreZ8pAFkSNArb3yoXxCM/BLNh+kELzpzFp5wAlH0XQHjp8uWhhT3a0x3v+JeAPTSwLbLrToT2xc88BUY1iDWdLmRnmJ0lZqpbkDabHtCsps3R0FBo1ag1GdTr0E0vmKqmmTUdjuEwSBqlY0YjTpsK0H5dv3GtsGkVTO1evWYUOj6AkvdHOktMy1+7fq3R+N4MTScQq38niAgo9qZCamP5O1UHoAuANQ0PCAGthJlVmISFshByyshXKDD19ltvh3BMoBJAsXN86eu7Uv7ya18NJ/1AXQIM+Tj8ru/cFYyEByFZ3V5ZoMU8AJIpodmkYRBoqwkk5ZCO9JRPub1PcxhAJEwFpF9dhvkWNJe0jQFabBDRaClkksb4IbiGhmJ0zT4WYDPFz2aWLenmzVvCFyPzjnnz5kRnQbtLuFrcJX3557e30n/rlk1l0aKFsQECmzR0lq70DGiC/nwTTp4ce5UD9QYLttslKE/29YWGBShXR+mjq+t6DMVAgecGZg3qlwMpaXeOGx9aeu/96pe+FNsJox0N6/Yd3HHZYW1jaF/5S9TemJyoz8aN68OM4w//8A/LmrXryouffiGA+OCtwSg7TaaQ3zh+NP/kLTjn8zxnR+B5dhzuee7Id/O3ePkuABuN+p60I7Pmn/czXbf8ln7rOdN2L68zD+2rHdoUGG0U0D6BIHzv2nn/nj3lpc98NnydGsiemT49tjW1wQptrdkicYFXgZJAm2cPKhggumYixoaTAuLrX/tqsWtWLnQcbNG8Jgjzbl4nD0WCP6F/gDOPA7wKYHl5LFmyNOSOtQT6UWCzr+9kgFYgPWaYhoYKm188rM8io7J/9Vw/NalZmCYdoDjtYOd0dQUtmGGhizTIcoH8kGfKEd4hpHtzhlnBujZAX0TBsWDV6kIhwhzv0MEDUY7rYVdbZVB+x0i4PWj+CbWY0ZPMqO49dPA16BRrx6iREyaCxgksYIBoqLwPNBqpBDeeMfbm+oP9JVdI/f03y8iwhWLMEwbCpODzX/yl8vBDD0Y6mAVwkSegh7kwzIUbF4PJTD3HlrKNlksccTF++LEdGCid4zvLpIkVdABTOnlT4Tl1z/5SmYGXk32nwv2VPBYtXhwaY0CMwb/FBACVMr391psByAA+YM8iJoLv4UceLZ/9zIsBeKof3f7QAkifrW6lV9Veh4uqmMIdCA8Eps+VDV0tKKKhZe4Qo/BJk6JOp06fKVcbJ9y0oBDvgYM9Ua7Vq1dGnZhvAIlhQhBApe6MZQSsHCGAbvbHWX6myGmR3Qf4DVjEY68a2nPfudkulyZYHAKRKQSN+vTpjceHpg1oD+J4tmTx4tBwoh/AffzEifjmBjLhwovbs0ZT6z2LFQ4dPlxsj8j2Fi3YwMY2t52d5Wbjl1ibmjq1s2pgp1bbXdoWYWSkus7RngQDlSceezTsqw8dPlIOHOwO4TtxQt3aNz1W6DB8d/kSznb9Uod3t20r3/7Od8sLn/xE1HnZsmWheYjEm3/olR2ac16jr/plB+DsnuCd1uCdDJ6J556z3/fGF7c1vXw/887fH/RelkEa4mWHle9mOdrnNgVGEwVa2yc3TeS5xaiUI9q5KW7eVshjcpOcEDonTrizjTh+9Iw9q+n3hYsWx8DWpid8k0sneKcZ/Pkd936KhMgtyUMBMWNG2PybkSF3AUT9CM8rQGjsNhaKjLpIVjE9VwcynUyz8FqaqaFlHofn0QHIZ5aBLupphsz7tKrSoDzxmyKF3S25PXXqxDsyXt8gnjhpu0tuCuS5NO8N4v/Du3djfdA7d5+2r0YrBUY1iAUiBDMKQE5ljmr7arERhnBonASHUaBzNNbGzpQWTudZGcbKyGowb9Vi/7Wb4R92xuzZ5XOf+2wAvgnjJ8T0OL+vwKp3cy975g1pK6nBS1NeCUhMccfCrqHhmI5lKylgVIuTTIOwHfUO5qvA7GbYyiYw4N9OAL6NRAN4X7pUnnr6qfL66z8I+yIa3mNHj0ScX/pvfrn80i9+PqZTgHLmA0GPcRW09A9U7wxMG2hOOzstsrKIrT8WTilPXXw2HFNERrYz7RZz9lzYwao/P7WCbWoJoPfe3x5bvCrz4sULg+5G8r4FmjEvqFrKu1o+z9TfN7Rwa9PmTaH8JRzVmTkBmuRUkbrb7QYdmEP4ru4xqzA4AJot/MrvrZymlJSJxsKAwa5r8uXNgEZWPbUpbenGjYFy8WLuonU7gKO0lF8atOe+8ciIxQfXA9jT2orjfl/f6TJjBk1z1dS67z3tEghXVrTk91Wdv/rVr4Xv2IcfeTju88agTAYVgvzskEbjzL2WWQGDB9ptdGEGg/YfFLK9exbtMunQAFu0yZDXztJ1ZPCu+9LTZp0drUEdxXEWX8jfrt3zLPky33fftbj5Xp7Rrh3aFBhtFIj22vC7svlNu0he4W/KkFhNf+1qyB79AyBFZgFjtI76GyAQTzgE7V5fhce6Dx6s/PJjbDRbeeijopGyWIhmAxqDfcDR4mILYdP1FZ4my9RDHYeamSj1IUcAUf1K1cba2KTEbKj4AeCb7b2lrU7SYx7gPTKZYsl96elbx3eyoR+OhV20vIAz+orDBE1e5IlvEf3lINeW48NmWF+QmuugORn4AbbAHxU92+n+9CgwqkFsdnKlEACpib27MxfGwQhCdo7ONFr8nAI5AgN5QmXwjpaMYXftqLEaX58WRAErNJG0aM5GknbjApjkA8BiUFpaTMJellArsSMXbWY1eDftgnEBkPpe3WoQswGZ0ldGguPM2bMBCGni1BeDsr8EnDEmV1F2TVGvhQsXxogf+DEV9exznyiPPFy1xzSCQ2U4gCrtp4UEsSjh9lAzeq2rQ6Vj8ZbyZX7KgPnVRf2UEQhFIyNi5VYP94FqYevWrWX58qVRRqANECGwpUNLrQx86gK3Qh0lV2Hnu9EuE0Kn+k6W1199pZiemjZjRnnggU2xBSPAKC1CHvgU0Eb52aQqjzjqHQv0hkfKlMmT4rvY+5qJiMUA3uGFYU2jZT3eeyze9Y1qhzMhwPq06TNi4MG9DEHtXW7FWr+XMvgtTVv5pqYWHWnY3dfGfFdHlhlgJbj5XqSJ2fTAA5EHEwvpKQfNOwBvsHP9xo0A4dJAWwEtMsjn3tB6T3kSGLrvt0O495zv5f2Mk+9oJxkybp7zvnPrvbx2br327TK9vC8fba4d2hQYbRS4wwPNoiqgiFzjTo89/dJlzM+Gwy/5okWLg/fZwt+3cUNMadteWhqhQGkGuepI/uH1Y73HyztvvRm/me3gNHzRuvAo+cR7rrNMP2la5eKni+fPxaJUpnfkOW0zWeuaXMyzsjjURVAuZnB43AYO+tvof5W5GbiKw4aWbHLPAjV9DlltPYVA5gGv+kf9n3fQuMrqqslltkFDfPnSxdgxjGyVpi1uBe/R1ApBryb/fyg1I8qdf8r0YaEVEH9YnPb9j4cCoxrEZofnbETmHGC2ATMYRiN1dgiV4SbEdH7n0FBMx7uH4WjNBgfrtIi43tXYMRJAcfkyp/dXQpPot6lxIILBPvAGSMjf6vJx4xt3QUBnf51CpumUjyl9ZbXQR/zK/FXD674pbmkBo7wOEIq2KNSZm5rCyFZ0ApsbNm4M5hQfI5vqIUDZlqZWV35Tx1WtsDoFHdCqcbfkXQcQLn8gWh69vcej7H19fQGW2cLSDAKu0ydNC/dbFhdZqERY2ZLV++vWrgl71OoZAMCvaaYLMr+HY1OIuukDoBk2pM2WhEwSAEBA1tTaoiVLA9CyEV23fn34Y0VH5aWh5XmBTan6MidAT/UhUNUR4PSNBaYQhKL3HcpiBfGqVSviu1w4fy7yIgilwy56eLhOaUlf54I26qktAPBdYVrQcQfAs2MG0OWJ3iGUaf4H+MStgj5BpOfKYTHbyRPHy5HDh+O3vDZvuj8GGNoNWlrANWEC2nQEfQFcJhHanm/OfZj0Ms2o8D3/8rnbrgV1yaAsee/e+/e+K66yOOd74njPfdf5LPPKeJlf5pXv+Z1x4qwjbIPYVnK1r0cJBVpBTYIY7fj0qVMBsnhCMXMzYZMFpaW8+srTMprDAAAgAElEQVSr5fXvvx5T6AsWLAzXUv39/SGnyHbpkd/kLHOqfXv3lr7jvXdXzje8GXyFT1pmO34aJJGfvvDooZ5y+eLFsmnr1gCmygPkUtyQuaEUun07aJDlArzJvJQH7odsbrzE6D9oXPXjtL0COW1Q7x2KJPRBJ7LRfbJXGuQfmUOjrb/2HrpamJ2yxCIvC8cEcl15KDPyu2W8oGmDFdSrHX72KTCqQWwCE0CwlTmMWgGT27Rdzcg1Fw55JwEEcGdqhF2pqZ9gisZQH1C5davaiUpbHsAJbayV9RZ2AV9G04AspvGOqXJgEiPduNkf5TCFzD0ToIbpAC2aUFo1aWM+jOnAkMqjjPyEAjWE4one3tK1cGFZOG5c2EsRJrSxwBqt69YtW8prr70apgAPPvRw2Ez+4PXvB9MDOEAhISB/0ybKJG9ACGgGXD0jjNSFUAFO2cRy/WTKnguwPbv3hBDoWrAgps023ndfPAMwCRiAnvCWxrWO67HAoXNS9cdKKNA+DwzS3NYNJrAIejJjIDPIaYvYKm1KrFJVTvQwogYit7//fqTPPphXgne2bQvBj/ZoKz5aqxPBOr4BW36HZjZ/d+QU/2BobbnF0nEQeNoJGjsAMvR4+JFHwkm5jkldlIVABFjZwDGxQAPfX3xlAdwJWHlXOy1uw+pgRltCf/a1Oi15WtyQWng0cV/bUSeHTkK+tP1z586OHdloHZTHc+G/RPiKk/HyPe/mtXNeR6Itz/K9PHveCnh9RO/m87z2WzyHusY74jYZiJfpxIIxHVnTOWUZ2uc2BUYLBQCebLtZJjL0ZO+xmC0iuy9evBADcf0MDSDeZV9PplioS645yHHaWgtMzcy4d+hQTySLF5IX5WmVvpD8lXn/Y88J6D4oHXnJNctx4dzZcOH42ONPRP/FpzfbVvwLYIqvX1QvfSE5GjN2DcCMvmaozprKj7eCtHMd2zFS5s6fHzICHVoBMLkagPTKlbrpwdDtYpZM2rndL/MGM2kTmp299Msne3tDVitXlKll4B59YlPpqGfLs1Za/Dj6tMZrX48uCoxqEKuTFzALcKQBAgjOFlMJGACAtQ1pLg4CZHKBE9ChUQMCGAEjYlTgR7BX8yAPBFevFt4Dpi6Y2ng+oKWru4Tw4yfQDJpmJ6ikoaPmGxagdlbGa9erL0+dM/dM3d2HArDROAbI6hgbbrl6enpiRGq1J1Br+sUWeRhSvTnrnzNnbgDJDRvvK2+99VbYKK3fsDGAFI0lm6UZ06cFCIryMQkIw/rbITSUERiqwPl6CFbCRiBkaULVgVuYo0ePhTuv06dPxSIjAha4Fn7t1/5FCDIr97nW2vTA/aUUxvZ1JJtauf6b/QFKhoeq9o5WUn5W/gOyvhs60e6yAfVtXnrx00FPmmd1J8TYPukQALrZs2fGCP6dt235ujlW/rtPzgOJ8vAODTJNpoVs8iFsnXmTEMZPGh8eCbY+uLW8/L2XYyqQNtbisgSVvqsyAK6+Cc0nwaac4thwglcDpgSm/OfPn9tsXVxNUJRDG2GzDOhKb/eevWXatCfiPlc0q9esiYGV76s9atvOaRuLXtKxeQVzFu28LnyrPoWjMs2/7HD8dK2++S2cM6CX75wH2rS+m/HcE0fwvngO5XGkmQzn48kb6CVfwb0MWRbvx8fywZTPt9FGm62fdYBsh6MD/ZByZZrtc5sCHzcFKArIanybm7W41oYpEx559JHoI/7q8OGwJSUH2HN2dS0IJYOFUbt37Qwb94P79kb/laD1g3jyp1VfeetLkz+V6dTx3nJ88eIwY+tasDa2RSeryAh1xrveQw9KDc/IypAJjflT9dM+VCZPmRrPxCNTKUnIFLOR5DCAy6ZYmszpmCbwLkTmCBQLZLA8UnaIM2/e/HI+ZtduVrk/xNvOuLb960+r4YyCfEY1iLUAScAo+kmdZHaYNHGC39l5Aq62tqRRxCyAKaB35crl0MTmNAhGqVrJoVh1iVl+8MMflV/+pS8E8DCND0TRogG/1adq1db5XTVoM0NYAaZ+Y2wAxGEaGnCwQ19uQmCBj7g2VLC1qNE4xqSl5aSZTdDYMq6cOXUq7i1dtqysWrU6yvPVr/xZuXDuXPnif/sr4c6FwHz6qScDGEmDhhLoUAYMDLTTLAPnaAJMEwAAKFrRGqAbsEZYqS/AxY64a8HC2H3F88WLl4QARkeaWkBL3ZghoA870KolryYFQC0hJgAvNJXSUV52ssLIyLgoi/u0sej56KOPlj/+o/8ctPOtl69YGXtpW8z0ta/9VWgs2AOjrfSlR5hduHgxpu64raJFT218AjBeFBLMKQ+dII8Btq79kz/9SmjLdTzskWlUBa5v0JCQTkFN2EqH2Ui0m9tDAWbVXRvpH7BRRdUAvPnW2+VHb/yovP/eu6Flvnn9etDruWefKStWrgrNqkV2OjdeKXJ7XZprefgOb771TqwC9m2CdtOmBagGfAV5CWhVeeMuaPfbN3ZuDa2/XTuCJi3xpJvxkm5+Z35xFgctW8qQZXHONCKPRquUaeTkXeTRlME1Okf85l5rudvXbQqMNgpQUJg5o2SwZoG3gmeefS7asBk4vI1/9EFs/W2pylxM/3Pl0sVo7+QIQJxrF0ZDHQFYQJa/2OTjPTu2Rz+1Zu3c8OyDV4FWpgHqONRsVKLvUSd8zA/75KkVtKqX/lZ/aDC+ZOnSmH2M7WspqJoNbqy/mDKt2tSiW8i96dMjH32EcsUCMztRspcdPz5kJcBrcRhTLgFN2xrV0dCafnplGNUgFngU2NEYpY0ff3fldALX+ryuGr1u+nawareAAYw2OFDdX2HKmHpuVi8ythcG+/vL8pWrylf//CuxItxiHprVlStXxojQ1DdmlR/gRkBZvQ/AWVA0dmxnuXoNWL4Yq+EvXb5Seg4dDtdKNHdPPfl4MKS8GP3v2bM3wNj2998L8AjYLluxIvzlAWnnz50tF8+fL1cvXw7hB9yyr3ry6WcC3CoHUEkrSkNM8+ee+gaIb6Zu5OddGAXgpyUeN24w7DvRwraytLRGtUCawAG1KZuRrq4YIcco2Ij8NJA3Lqbk2YcCybbA3ZWmB11dQTteAGzecLC7J8AawWbXsoce3FI16I2DE3VWLs/Rdvq0qbELy5HDh8qO998v+/ftK4uXLAl6E5robltD4FJ84MtAxfT9ooULwvsAm1IClIA1qOgYS9veTJnHAoSqiWQ/O3/evPKrv/LLZe/e/eWNN96IuhsMKE/vsWOhBbDAy0EbTSurzmFrdUfDORIbXNh1yyCBmcU3/uZb5dvf/JsA2vy8WhzRuWhRef37r8WWucxJ2D8buHCX5nsL6gCInzt3vvzt33637Ny5I4C+QYS6+z4GGMonZAfjWp1bf2sLSVf3M4576JbA1Xv5LC5a0mr9nfGkhfZhsiJPGlYmC+xjm3ykLV7m4yOHlkn8ezZYyPt5lg8+b8HUWYz2uU2BUUeB0ydPlHdv3SrzurrK088+F7IJ2MITf/PNb5XXX3slFA+AnQC8Jp/il04mSTzsGBC2TG8nv/20Kxx8W4VyyBT54011oj3m+pAyCOikSIjZoZGRUAKJ6x5FifKTpUwOyEx9sP5K+voaMkQa3GLNnd8V/al4DuYX7FzJTTJSnyZ/eQGwni+e3xX9nRlDcSgEbL7As4I0WP+jaTv806HAqAaxzAMEjBE2n2PqYpJwx9EomjzTQVuxfv1GtUEMO8Y7ngtoaisIBYIwk0DL610rIYG3vuPHgznYL2IMwE8cK+BDu3rlSuk/dz7sWmnPMCyGvHjpckwNmdbGbLSUgtXmwK53ATvg2JkNpJ2n3nrzahj+J7PTBquH6e9xE+siLdNVfnOODZzs3r0rwBD7Xvlz7UVDauQKOMpfHYEeGkIAUKBtJEiABFP5c2bPCg11AhrvEELohiaAE7+kNJRG0DS9tLjo4n1lAWZTI+o9BxDGJypTCS5QqlCq5hytwIqstOhNoN21eInm2epSI2tloL3YcN99UU91FdilElzoTptMC6Jsyu++QYodtNADgAfc5es7DgxUswPXl8eOCzMFA5IbN66HVtwCMgBWndULPbwryM93TJDmN7pkHAD67XfeLd/6m2+E/TItsZ191IP2lSBni8sejv2r6S952DYYLW3r65t9//UfxMpgbc5z9ZKvdObOq27CokD3/PNc2QRn5XNkW8/nreeMm+/dk2S875l3BGnRhuhwhxqNqXue08q6vvPbO+57MeM2aYgTWqiWDJOfI60mv5bH7cs2BT4WCrS2fQUwEMtA1jCBOt13MnjetLmBt01pvv6XNi+oLvrEc3jubXJScMZPZAg3g6Mh4Eu8LeBTWmLlPHTwYMinBQsXxhQ/cCkYlBtck7dow2e5t4FffQ8NrGdAaQa2q7S0+juzXhMnTgpZSWaKiyZ6aPKLL1lyj6wli2m+9U3kp8VhzDT0p9IIAAsnNDOMaN4O/zQoMKq/tOlaAUNZjQ+M0shmZ+lZBSkWU/XH9HUAOCvPG9vCFETiuvYco5h+8Hvm7NnBbEAPILxhw7rQkAJ9bBuBJYu7TI2brlaGyHd4KBZPAY8Y3ep5gdsU/kkBG1rZ06er6yz2mnaeAgwwLNtIwsCKde+npmoWTWh4POiPcs2ZNy/eOXz4UIBW4Gb69BmxPzdfqGjRd+pMUz5grrqf4k8V2EZDAsWIVro0xu6FH9jJk+P9BGVsZ8UjNGzCcPXqpADGgBbbTGc2yTTkbFVN66CNNPtOnS7Hjx8PO1LCsKurqxB6XfNpbi146I9vpQzkpO9GgMuLr9lZs2eVV//u5RBc4hCAABzhJF8twRSUzoAtlBW+tmwF3NGRSQRAa5qJRloZCFP0rmCMlrCE0DOY8P2VgS/H3F1H3WkR5ClNmhJ5AdG0sQJaAZfMQWhQgflLly+X7du3l2tXrpQVK1cWbrx0TH5Li+Zh//59MeW4bPnyWLDnuxHuOgJge9/+AwFglVW5tD8rdnNxyNGjRyNu5YUoSvxDK8HZM+8rI5plXPdcV9rX+O4JGSd+fMhvceKQT2PXeude80yeQpYn0wuiK1tL2gGG/aaJ59WBec89izfvvN++aFNglFFA2yezyRhAattbb5bVq9eEPGNagO8F8ksYZ7Fxwx9AWGhfG77NOBHxY/yHb9m6q1MGQLDTboW3bpUjPd0hU9Q3+wt08I6+V3870gLY9XFkIMUJ7WqCSjuCAb6HurtDjgKp5KnA3AJtKBfI3CVLl5WFXEwePhxaYJtJuE8+huLi+vVipzRa8ZjRsfahsypjsg7t888/BUY1iG3tEDEOAFsXE1X7VAwClAKYFvkAHgECwv6xLvrSmdd3a0fsN2DhIIi4tJIGwHD8+InyxGOPlP6Ynq8awdhR5ebNAE3sWgUgiA0jp/vSiS1MFy4o3T2Hg6EBGwuMmCLYGhXgwnTKV49xoUEF4EyJEwKeK5vy08ASAKbF/QYujXJNWxEcRrAPPrglpuEtAMrpbtpXdQV0Z86cXqZMnhLlYHsKwDnziADo9vb2hpZZGdKGC71pNAkkC68IXPcAxApeb8X9cGM1VB1epwAipJVfXQHBWMw1oTPy952Un/BBcwMS+TKFAGSlR1A+/OhjZcf770We4gGs8vd9vA/oA5zqb9DAfEF5aXLje0xaFO620Ii5CNrpJGq7YCvaETud6T9o0GnbpWVxl7yUBe3kgSZDnZ3xW3qmswhsz9WDkPbtaafZsJoeW7dxY/hBvDUwWOZ1LYjFdabg1OHE8eNR1pWrVodpxJ7du8ILhbofi8UeuwK4SpNvRuAWbQlt7/OJCLC7Vh7BdQZ1DaDYoi0Sz6FNZFzn1sN7HxTyu+azyFN6bgQvNq7tmvRb40Vc5cjyKW9LvChr87uWrb5dy3i3Tplm+9ymwMdBAe04eSXadEsh3DcYI6c9e+3VV2K3xd07dsTv0Lw2Mxe2kRX3g4J07k37g+J91PfMsACRrYHcJY/IULOVx48eLSvXrCkrV62K2Ud8TEHCE47BKKAafcfFizF7yNuMgMcpA8wwkW3kGE88dtE0SDcbqc9gukW+MmnjDtOZX9kTx3urbJ5iBnRqvG+Qj8Zm7ypYHgkAfnOomp/VfqbWZjTQt5Wu7eufLAVGNYi9t6oaYz3qdAwmYuN44+aNYCaAhlAApqIDtX91s8uK6f6ODqvH6wIeUxq2+zONbCvanK5NjSPwOXXqgvLNb307AARQA9idOFF3a3nm6afCX+r6dWvvLDJ6jY/A4eEAckBVgKS5c8OelJaXMHDfFMjB7kOh5QX+ADqgyCjUSJh2cOq06TFiZUckDrBNE6mOykKzaWUnza9yMSugGV1qBb3Rqh3OgL9xtuurjqNpUE33A8XoQkAYWQvoJm+CDKC0Mp+2kQBSJ1pkdrEGDDSvQI77qUkYO25s2JDSThJEg4MD5dy5C6HxFI9mF1jnvUFgj5vBN508aWJ55pmny7vvvB23gTg0ARwJ0+q+aqTc7uyM76tcdkhj20vbTUCuWLEs8hBfngTsyZOnyu7du0Poeqe391h54VOfDvdi6GVaC8hFc+AUTQlV+aOzsiVgJWiZZkg/g/ivvvJK7GzDdplAZeNMI8PzBS2sPKTjPXRz9m2AeIMvtGZeIe2kKaGfeWsftBKhJWk61sw/gaLvB/51NIuupOP9PDwXIl6Cy6aDyWd30mwByPl+njMOMKvjyilWz6UT8URqgLbypblBvus7iJvv52DJQryWomX09rlNgY+FAh/EFwqS96P9Nj5UD+zdUw4d2B/8gL9T8xg8yYMOTzctWs6PpUL/FZnqk2LmhCu8ZkcvLh95WyBLmUrpb/E02Qf06qvIUnQgl3mb8dshLlMzcpBWFi2ZhZkFu/+BTeXUqb5YBGcjCQN9spl8IE/njIyESUGaAqqOPFI2oXnO4LnXDv80KDCqQWy6HfIpsqGadrx1ayDAHGAKdAJMAAcG0agxCOZwDbBlhw40eGbVO7ceph48W7Z8Rdg3yYdLLNPDixfV7UIDENL2xpR19YsHzBjp7d23P8AI11LHT5wIrd7zn3g2gCNgyaxAuU0XY3KrywFEU/DyXb5iRVm7bl0AJs8BIqPRCxfOB/MClATAkiVLA0iZrmcmoEzcL9n6lFYYSOUejAbYojQAFlhGl1uDpnw6A2zKQ73QYNeJEzFFQ1MoPbQD3oArgcABmC1O4+OPWylpA3fAubTQ4MDBuohr5coVZeOGVSHECCRaX/RmG+wd342mUz4B6G1Y0OyqlnnZRGHzlq1lx47tFZCNHRtAlCAkQOd3LQh3L2HGYBFFKaEF9x7vBAYePAiwzTU9/+62bbGQyjfQHghZe5//QW9vCNonnnwqhN6MGTOj8wnNQYOitB31J3CzTQHFBKrvqL2dPXe+7GBGcI33hrmhIfA97Yv+zttvhdaBRph9HM38d7/z7bL1wYfKo489Ft4XfM/du3YFADZAYfuMRpcuXIiBkIEVzQaaAcOALVppOzpQGmPXDgMEgej2Hb2jzp4pPxoAwTpSZ+XSDuSX/CJtcX1b7wnSyCBP4FQ84NWT7CrETzqn1slvaQmt135LQxltSMIEJMoqr5b8Mt/2uU2Bj5sCwQf3zFrcbn7jnw6DekoA9qEtvkq9NwLA/YyCqhg4kwNkgp0Kz56J6X1rGNRT0H+4triVZlV/BXQyq9KnkU0pV8SfE4qdOhsa5nrXroWHgf1794ZSRRo93QfDk4GFwWZgpUH7akEXbSywyiUlee5aAKCLGc2mb4qb7X8/9xQY1SA2O0AdpINAqOCM9vXmnYU7ph4mT667iUQH24CWZBxCZvKNGwHkjOzcBwqyo9aZLm52jWLjunXL5lAk/fCNN2MkaYpcXODFNLltTIEYQM1Uvinhxx59JLShNJ9AK8Z2pr00jT00XDVxQPe+/QdjO1XTJWvXrCkTJk4IDejFS9MDVHC6r0wYfO+euvkAW0qr5QG1pUuWBHAF3IAjIMDUuhXuMW1PQ91fvTSw65WWOqv74K3qBow9Jg0ggIk+NLnAZ4CIBvAE3e2+NcSOlw1x3RZQfKCUFtYB1C/o6grtakwtNVv/AkhW7ltsZfQsSIcWmfwLzWxjg6tsAXTDyf/cGGQA/AI6Tp/O/KCC8YuN0227puXiNrRgJvGjN98u33/t1dLT3R2glaaZf1bbKc6YOassXb48gHrfiRNhg/viZz5bNm3aVPbs3RvfWJtTLvWiZTAI8g1tvJCa2Qr8xpYf/vCN0nvsaNDP90Yv32z6jJnluU88X370xg9DmB/Ysydsr3UAL//tt6MeAOjBA/tjFkC7sujLbj4WOc1fwNZ2QWwqYaAATDtPbEwBfAjazWi/rvFGgs7m20UHA8Q2oBAADRvhBgTjE/fi3GhGI72g+D/8hy7yFIDU7MCSR/ON1jTymXMe3sPH+Xu4MROJzj7rl4m1z20KfIwUyDaubQp5do0HgCUBXw1Z12DQ1pgNtMaNOM3AL174GfpnsArIphwhh06dOB79VdrrMzWIvraRDydOHA/wyie7UP3Ajg35SVHA60qYIdgU5/bt8H5gAJ9Bf4V+ZJM+obOzo9kAaCCUBWS6mavD3QdDho008ihkizUF9ww2Mt32+eeTAqMaxGrMgoasQTswC5BBi0cVpLHrwIPZhqvHAe+Ih+EqI1QAjBHdk64pb9PENF3O4f2gVGBFsymsWrkipvqToWhBTe0CbQkMBwenlFmzZgYYlNbQ0NiwlU0BWMtSd/ECiEzFG1ECgsDQmI4xhWswms7cXMBq9ZgeX74syvHGD39Qzp2dWDZu3BAO/Wk4bZfKUwDQXG2F6xQtTRsAG4ubGroBZECDkeos7k8mTAi6AXVcegFJ7JSUmUCidRZSEHvPZLUNJdQfKE8QAlQzDQCgTefYPctOauqHptIAbGJ6LUBVXbhkGj01thZkAYHsbtHVNwKGvSe/6l2gat8JVJpG8Q0eanlM0Q+F2y3AETiXP6B49vTp0EyrD43p4UM9ATJNifnuBO3Va9cC8EpXe2H/2m8nmsbvobQFYBMtlOHw4SNhq6UtKIvvce7c2QDP6vX4E0/GAjxppWnAtBkzyo1r18u3vvHXZdXadaFJYBtGKKsrzblNMQzK8p52rJyCs3jZ3uP7EPbDw1WD3kzn32q0JsCuZ2hq1bFrnUa81/hXzu8j/bjfaE1bf0fmzf3oKFq0pcqTwTPtojX47T5a+q6uhczX+1Gnpp3ESKk1gfZ1mwIfEwXSVMYOiMkbipJtOMFS8mMMFJu2nc+A2hxgfkzV+EdlGzxtrUZjCoEmFYAOxmwO+UcG62MAUfzO7hW/k6dV4TEcZzLNomSzQPpwrrG8p9+Uz6YtW8vpU30Bapmy8fBy8sSJ6AuZ/ZG9lC76bsG7QtCXz9pGNurn8xtFhPa/n2sK/EyAWI01QamOMAHaHcHS0jG6h4G8g1Fo+IwEXQMB6doJQ4gDLAFJnZ2TQqvqXZpCQNb0PHBSbXBiJjV2iAJSvC9NwKuCmI5yxQr+FjdeBBjQYJcqedMUAm/yUE7vuweQB7OPjMQ2qzf7B8r5C0dj5Bqr4JvtCpknYGB5Y9xaf0CxAgGCBuCiqVRGWk/MrC4EDfdOtL7cdq1atTJMJ1555ZVG21h31GKve7Zx/wJcoI80aMCr26rbZWhI3LqntTwsbPNdaEpt1wvwqhsbXAAZ6L1tJ7PGhtl0/+s/+GHZtXNHaDuBadvbPv+J56J+bJSZUhi1A+Xq4juo9xWLxMZVn7W2zAXQjGbkY2OJkydPRj4BbrncmjatrFy5KjSmPQcPhu9GIF3a6sVvaw5InNGUlnpkhAutiWG/TChqf76bM08Bdt2hqWUHW+2ETW1dDBpwvs23IsfeBPXqtWsDPBPqCxcvDu3r+bNnowy8OFjAx9WXwQhBD/SqI60uOph10HloxxXwmbqvGhI6InQVDx3cd2980+lEfOY1BoPK734j5IeaxXbo4FD31iMln2dCnqWZIePnb9pqzzNOnsVznXllfOfMO8+tz9rXbQqMNgrgRVrY1E4CZUKAqJYBXoCr0Vb4/5/lwbcxPU+T3MgBcsQcGX/mTAPcB14N8hkYUR5MGT8+FCJkttlKsktfyHxNH6w/NBtK5tq9KxQg48fFO4BxLLhm0sZV19DQHdmqf9K3kI3SVD6ByYaQZYwf7X//JCgwqkFsasAAJDagQJFr09umxQErAC7WTLd0who9Jonp82abOuDD0RqkhYk0/Fmz55S+kydCm2YL1vXr1wY4sQHVlCk65qrFHRi4FunorIEX0/i0kYDBdavZm8VAATzCFUvVHFvhH666mnKxFdKpY3wg2DXgYhODuXPnhtmCrfhobp986snYZYrGEzBWD4JUfHbDzmHv2whT5gUApXo5x2g5bB+5CKufHP26uuZFWrSFykDg2IoWXdCOgAAOgX009Q3srEIDrO7nL1S3U0CyegObV68CfOxpb4ZgUy/fgukFAM9cgx0pEEiIXb9+Lab5aUjFXbduXdm/b2/Zu3t31FX5fSP0dkhL+upGk007bhcx+5Vve+ftEHpB15kzw92VBQL3bdxYXn/99dAQWGR13T7gzQpatqg0t2yv5EMYA5UALKArf/k600AQyDZloG2gzWW/zLfsqRMnCvdoa9etDxCMZtJyPPr4EyF0z54+FT4N2TkDsd4P0DkyEt4xfAP5OHQUNPfRlvt5TphYbg1pw41NbKPlBlxzpiJ4YQwvER1FS0cjtIgpzpyqDzBpVqPu8CYf9nrKKS/Bexny2jmvM5440Yk0HYlOXX4OIc+upa99tabjubSk4Yj4LSAgEmn/a1NgFFAg234WJTWtrUA1eKGFfyq8yjd+Ns/qN9zwfmiVEzSOjIQ9at/Jk1Exslg/A2AyaQNk/RbEIbfxOh4/Ozwcg3UmVDZRoJjhPsuuZtYBPPDApuiX1q3fEGeFWX4AACAASURBVO+Tpe+9uy3SkL0+yaEPTEnl+5BlWcbW7xKJ/H/t3VvUJkd5H/qe0YwkdBpxkJCQZpBAAgkkJJPEsS0MsffF3og4ySXYOL6zsbGz99o7CcuHS4dlO3dxiHHuHBNgrb1zWEkQcXacxDZiZWNjgyQOQucROiEkNDqOZkaavX5P9/97a1rvd5jzNzNV33q/7q6ueuqpf1U/9e+nq6v7v9MWgU1NYl9+eXxZxQXA45c7XeTurFctiryl5prqsIiXC0iHt0XCvMjjwvFz94f8OSet4IJyjJwgVFXO3r3DV77ylZoj6o16j6yRBHJTBi+fR+XkunhcUNIgk+ZpHthv/uneSuPlM3Lpg5Qgr14W4nlDOp544oka4EN6HLuofQnKFvm1nBQv7AsvjvN5cQyE1hfDlFmP4beOUy9cxEWGpvVc1bNIzSsHivg7ZmzNlfV2f5HIHRevLFuCiCAbwQhmC5IxdhdEyscbTN6Hhbp7JG+pqfETrtsr/vIihuMqAl50u+sb3xjuvOPr9VEB3lBkDqn83hOP18tjSCjDd80111bbwMlLVzzhsMiLTwiRucnwt4zZnXd9owgsT6vpEKZGXHXV1cO7b7ih1qmFv/pYE5iBRUR9xpcHRdvpVwirUDqdd17pDwdBP9F+pns8+ugjtdA2ryo9xOk/2885u0g1PXkneB08ClO2T+byLNx797drqgbPs/KUO/ZxXt+RrMOlpjVMfZq+wkjyDIuT5yFTaRoP58GDeZw/rUqwdeuwxZOJ6cUu5Zlz6+aPJ72uDSQ3BLJKGv8pLwO3rbrmGNmfB+mtjFBEdMJMXIKyIjOypG3T22/zJG/fdgROBgKrEaF5PPLUhkWvb2Onx96HRp0SR6lftpSGgXo+Pi1/df273l1Toe69956VsTLXN5tsnPKEynsgvKjys5VsirGPreeR9YKsFybI5hRhu6wFy2Z44fXs688erJl+37e/VTICYDBvdcy5vj29EdjUJJbndQzjd+lRCp0+Ax1i4ucRKbKHkOj4yOL+fSPx1fmlRxZcLLxuHo/o9GQhurxqLrK3vvWqIivf+c7dtcjyT33og0VCeB1dkLbewFSm9C+8+OLw1b/8Wr2k5E7UZ2B5BpFrHtLt27YP+8/ZX6QQmTX4k4No0mt8TP79WkbKo35LjSBnD+3eXR5Li/m/49q3FxEzhWJ8aexAyad7fd3rrG21+kAZlfpIwsu17FjhZnmxyauKuO159rmaUjDOpd1Wa8bWYv/bt1c96QY7IQYGkeOJRJzPe915NTXhscceH7735JOFG2yffvrpmlvKgCErsEFuze/8q6+dX2uoWrAa/sigF7bU32N7++Pj/XGdwP/yR/+5Xmq69NI315JTPJVF8CePucftSLpy77jzruH+++4dvvmNbwy7H3xguHDHxfUCljt4y1UhkG5IbJE384zV65prrx0efPDBIqAew/NEW4vQW7WIMm8ALDyuQs4ZWPNpLUkmrflZ5CCwSD7SbFFudedRftvb3z685YorS28ffFBXOklLF3kZZ2T1DW94Y3lendu3b+xnPAw8+/IJ5siSnRuKMQ5RHc9J5weT8tDrXxPRNE8PfvqLOuXphRsofUYcw5/0ZCuLPHkEckv25JHRts750YmMpJM36bNVl9LfTd903VUdJ9mVZxoU5emhI9AR2PwIuFbdGHvCxL65jt3QxwaxreyDVWWMCWx32T6kf8uWcniwp4jtD9c7BBeVU8eTLsHYxE4Z17PWujHTS7kZE9iwHs5sBDY1iUUIBV4qFwyP3zjIFQWtx9svvzw+XncBuVBqsJ7mtVpMWXoL0nsUzus6eg7HZYeQSiTq+98bv6pVxwcOFIlCUP7b//jT4Ud/5IdHonzgQC2q/81vfLPIp+WxEDx3lVe99a3DWy6/vAisAZ2X9HXbXle6n7XPY9rxBSVv0rvIeWPNHbJPbxcrEoxoInlkeNvej748qS/vGwmI+p2NKE9knjd2/wteghoX8/fZ26d/ML4ViqwzMnff/Z1aDeGZ6fvdHuH80HvfW8tt8ZY+/sQTwz333FNklZERgidvK9J+xVsurzLuu/+BuhGgI2+ymwd3xj4D6E5bqEfi55xTC/zTs3Q+++z6tKw5pOOb+Na6Hb+N7S19eX3G0VJaZfguvbQe6yOHSCsiLTBecLL6gPms2smHBi646KLhndddVx5Y+emsDvQn/21vv6bWWr3++uuHXTuvLAL/b/6f/3v47u6H6kbGnCz6+LTtW9/61rqxsBTbd+7+dpH10uOCC1amGGh3/cmLBqYFmBbCu23Ol7bVbvoHLNT/2muvra+Yka+u5soyzDy/zqfvIo/0Fpf62urx5E3RVYa0IqTUdxHWIp8TCdb3DSjjNRMyytupfSfjj6BWSeNNnXJbUipv8ld5U1n0dexH3ypr5anE6FEtkjzlt3Rb5rBFfsmrm7HXenYnlfqmI9AR2KQIuPF13b/4/PPD/fffV7aPLfL0iD3ypOvACy/UU1BzWTkW2OX68qL5/dMNazkGduyoaXnsI6cS28qmvumSS4ddu95ajoN37dgx/Pc//q+1zBfvLlk9dAQ2NYlF7IR4jwyWfggbAqgT+9gBYoNM6fjedHRskEV8EJEXnn+y5Bg0DaDSucgM2ObukOMtdhclYuFlKvF33Xln3QVed90768I0jcGyIvIjUgjfTe+5scgmgoEEIS3jwM9LtqVWCuApRsRNTxjT7a2tfWlNdZBPfX2m1XzayHEX+u27nx6+/9RTY53OPbfKsyQWsizw0qqLhf3/5E+/VC8VqTtyxftoTpJH8rybP/jB08O3vvmNmsv5Ez/5v6zoVKT0hRfKUwjjmgqw7azyspLtowOmCljXFElELK2ywAvLCMGEd5E30dZLYPlsqiVVeC/l8YN91fXNb672uNqnWr/73eH2P/vTejuV55Pe3mTl5UQUBZjzhvrCVhH+F18sErXrqquLvFqazLSLYInwkaNM3tHLLntzzdXVZ+D3lrdcMex+4IGaI3v+hReWR+HNl11epJgH2xSTvXtfqjanf30+0XxTUyymzyNqH3W/8MKLql7IKw/rSDjHz1NKr+/xwuqf0o/tO9QxPJDRInXTo7qGrdY5NySvu/DC6i+wUD7yGU+EfiR/yfI4f5qHKq24uu07KNYwMxLTyu/mcCLN8mtrQX8gU0hcyshxtpVo+idf8mYrX/YznSGyZds23Ti1cvp+R6AjsLkRYJMQ0W3bzx6+881vDE9c/PrhR9/348MVV1457H7owRof2AjjD3s9PtHbUtOt2H9P2Zz3RO7//aP/XDf0xh7TsYwdNUZcdlnZf+O4p3m2xmv5Yvs2N0pdu+ONwKYmsbWMVg2iyGs8SeOAWERimr+JMPgJCA8CimAavJEjj5yRDQOpiyR5a5/HruZ9vjq89MILw/Pbt5en1GNg8xa9QU+OuZpvfMPrh7ddfXXdIcpr0X/TBHxwwPqvdFC+l5rMN5UGoRasNYpYS2NJLi8S8cJJI7h7RSKkkcdXqCyFZemq/+8rf14vQyEA7mgvu/wtw65duwZfx2IYkGAL7+/e/fBw7z3fqSkB9CBPnZEqdUHQTaeABTLo0T2vLGOBrCFwiJYfPeHkbpgH2aOhxx/3cYXvle5ICDKGcLqhkNZb9ea4wh+ZQ/ivuOKK4V3vvqEIJKPj5TZ4IcSjIdtSdbr55ptK1//8hf9UNxTKY/i8OMXY8aQjlR4n0U/dgrePC1x19dXDZW8e1+8lVzpprrziLYU3nJSvDs7Ja8HuB+6/fHjo/pfq+9sMoykaVhnw/XM3LZbC4gng1bccGe+CvqWdYKsMdYeFAHfn4ZMXG9TjgQceqFUJTGsJdtpem3qRjD7D9u0lrwgtYSGRE5FU1kqYBhCLkAuly+QBGQnrgoBG14OvSjt6TeXR7/dPy19tm+oSEuz8KGF8KYvO+cHJL0HZlX4iq45hbWuQk28xV21B1iOnlRWZfdsR6AhsbgRybcemWYvb+w1ILFvFlhjntm8/u+z4415avuSScqa4iR+ndD1WT+bUdPdDD1WFjVMcBuzCd+6+e7jmmmtWnDpkimdT6ilTn06wuTvJCdBuU5PY1L8d7Mb9cTkPj9kN0H7ikRsEMEsWeRv+2mvePtx0003D/fffXx7Kxx97dHyJa+/eIim8r4jJ/n0vD48/+sjw2CPfrfmR17/7hvoMHsJouSSPOZTjkSgSxEPogvSmPW8f4lSfhn32uWH37t31AhOdXMz0QW6QGsQOyTEPyPzLkMbcVfK4qkORmmGoF5d8veTRR75bd6DIEiLqi1BkMhC8nw/cf389rkFYlYlYIqteRApph2cIFyPw0AMPDPcfuKfIp5eevEQln7KtW2u/vs511tbhu488WsRXeUilx+ZeXDIFQLDAP49niA4CY3kUj/PpBgv67rhoR611i+irq8fysPVZW4/cb9+xowglw8ggehmKPjD0yF9baQc3AB5P8YDCFCGkoykoZPMQM5QMonnGbhJe3GdFhkvrxsPcXx5gc6K1gU9GwkC5O173+uG6G24ogm9Olkf/poDQh3HlKaAHrN/0pktG/aanBjDQH+jDUw1vGCDAyGy8COYB7z333MLrvPOmx++Ws/HFGZ7ZiZzCTdBPyXQsJn0rx3WOJ9XgwcgXBx5paIjpKGtaBWDwsqKpA+a/jlNy9BtYl4ysbzkR1rRrKTP9E1dEtfHaIt5FYJ2byKutpxG5oav6TIOcMpXXQ0egI3BqIVBPcEwnmub3GxsffuiheurGNhgjfV2L3WcHLZ3IHpt6wIZ7gsdGsku+mnnV1W+rcZFj5BvfuKvAsI43x433GKyT7mmdcj05M7700BHY1CR2MVtv4Q3K4I00epwxDvrj3DyEy9QDA6vH9wiF4DE+L92ed79r+OpX/7II0CPf/e4KmUVgDbAIhouLN44Mg/+NN9wwPPb440V0XHDe5vfNaF5Bj9itlfeW+pLWRcNjjz1aS0eRk1UIlG/erYEaQaA3EuSLTPTjtRRv36dbTYu45E1vrHQvvPhifRXqq3/xF8PLL700XHvddfUIXHrfmGYY/Ohu0jx9itQ0njLnxsc4ozfTV6EuueTS+tSpupok/8wj3y2DwPAgf8i4uiJ3XjazGgEipizE0af/PNZ54rHH6mMNJu57sxQh8XUsRFu5jBF5D+/eXR7tSy59c8lTf8uIIfXxmpoSgXTefPPNg8/Kmhdl7hTvbuFTBvH8Io70Fs49d3xs//JeKwe8VOl5nBFEpE46RJwuV2x7S8m/qDzlL1b7mFJw8w/dPNx3373DE489Olx62eWVx5xdj7NMB9m3z7rBLxVx9BKW/uYmRHs5rpugaX4o7Mcbi/FFOTc76mALc8bYkmnl0Z0+jUzPEET42je3NV5Q9aw+n8dnSB9iO90guQZCAm21gZ8QuQi39CMJdk4547xn/XzrVtMdxnls0h3i7WjklNDmmHwyo3f0IiMLxBeZ9ulbH7CYXjBzWnmVfpruENl92xHoCJxaCLCJxjy2kFOD08L0LU/IEE1PQ13rpreZEoDcclyw/+LYEdPc7v72E8P7fvz9wwc+8IHhoYceLIcRe251AuPLv/93/3N4zEoFZ51V42EcP6cWWl3bY43AloN60CYNjzz6WGlWY3bRiHFAr0EyOk9vSDo0oDvHu2TerME1JMFFZHAX5wWch3Y/XAvjuxs0+CN6CJrH4DuvvKK8aTy9iFW8TfLy7lqXlKeSN8/A7Hx9rWv6whRdEEBkzp2kR/WCCx2hEQf0mlM0LQBvzuW1176jSJRH8t/3jeoHHyySiYR4+/O666+vO1k6kiOESCAefggXD6yyHJsOwFhYLUGhpj3QWV084nZXy7PL2/u9xx8rD+Przhu9iYgaQqt+5Kovglgexv37i2AiowwNnL3chby7M/co3s1A6k0Gz7O6kWuerMf5SKxP09LHRxBgJi3y+fxzz9bawPDTfryxAl083ldOiJB4k/2RdGvm8hgjlM4jwryupqecPS09xit68Y4dtfoAwwpP5UoPv337Xi5slYkMi+elVc8Rz/PqpTnkjCd4nNZxoKZdSAN/dSi9aj3bc6ufhSDKByvlKMN0k3Hu98G6GZGuwrTUFZwEfbV8s1N/ppcfgz4nsdLrH9obVm4UeJ7ppq7RJcRXf+dprj7fTGUwaLiR8IOFbYiytiC/dKPHRGxhkJ8+pn39nI/OyvfTJ+bhH/6f//s8qh+fQASuvfptJ7C0XtSpiMDKtTx7ksJ+XPPO64b3/62fmBwZT9X7Da57tvjrf/WX9QSOHTEO7ty5q97ZYHs4iaQzhctTuqeeGp0ill38+tf+arjv7m/XEx43+l5a7kT28HrOPdPKD4eXa3On3tSe2Ba60eM1zhs1AFt+C1k18Ov0BlcDqwtr65atw7B1MUg7Pw7U44CPNPHObvnr710ZUOUTam7qRCAMvt6qlt9PEuvGFrm7BPF6pR5fy2uAfuyxJ4Z77r23vJEIjCWxBASE5+mii7aXBxbBtWQTAsBbiTTxYPLujnXbPxLRfS/X8iTvvO768t56Mcl6q9aSLd28nenltO3bhyuvvLIe/SOt5CojpKyI8549RRjcBXt0b26qRztII2wRYxje9527hz1PPz08NXm6H0Rop0WryUvIvCe6W3aMPuqCSPJUIjbeWhV8bjW6FNma8JS3HqvTYevWqrO5ukgrvOhDr5rz++STJd+jaXG+dMWzqU2QanNnbYX9+7cNF154VpE69YU/0gonuiFOSOeTk9cYiaK3tOPKAXuqvR0LjKn1C73wV33JFJRt24q0w1ufEZyDtW+H80Dwso9lnTdOOTl3JIjSZzqJ+bejt3h/6UkXWCKAemSRxS1bioCaI+1ciKx9bSdt9dFpXqt9oa6FaZ413NV/MJ93+niFfOYamx5Cz+1nn1flwZiOylFPwXltqF31GbKVkz6R9pVevPS2dU1OeBl0IssNnHPKkFaIzDro/zoCHYFNj4BrNl/LirJs+oP331fT7Thm2Fq21PQrY455sn/+la/US7zXXPuOuu6tnPM3fviHy0bd/e1vT06NJ8uOspVuvK0kw4aUs4q9aMajlN23Zx4Cm5rEuttqA8JisORlLfYyDfLj48nFm9UjHR1JhYF05TdsqXVSHVeYto69vU/uq97gnl4iM5gb6AUXqzDK8iY4L9L4dSpxvoRlvqWvd2VgRxoM+ry3L+3lIX2pCADiglghvi/tuLhIJ6JmMHexIqA1z/bcc8uTimiY/uBLVoii+YXOm8PKU8pAIK50VLb89t0RK4fMkbCMj3StauALW0hkLVH1g6fLc+lrUzzCCN/TTz5ZdTX3iAyErOaXTuua0oVMj94ZLV5F3kVzVekDO/Wnr69TnX/hBaUHDOml7ghPcKCjgJjuP3DhqPP0mULEkMccMZTuJeva7t1bUw48yiKLDogoeaY3wFI5fiGj0sEFCbOPRNHRPt21y2OPPVZx553nhblxHqebFvKQWTcfSB9Cy6sAAzjyICDR9MynerdNfYYLXDpGF/H0BRz9gkzt96bJW+omRjrx8NNLGWxETz6664U+YNA+jRj75DhXFobSZVt5VvSo6JV/+sqY1nb84o1yvUW5hbd1unZWMkyyq3/TxfUz6UIHIWUnDxmvqoO6iERspSV78uAkb7bJ27cdgY7AqYcAm8xWf+POOwYk9cb33FR22M16bI5xkrPCeOPlX+Obc2ytJ3SILEcFe296gvGNzLKf0027G3jHPZzZCGxqEptBzkBpcNTJDXQG+nEwXHjAPAotcju1pyF9HCsnL+w0ILvAEtoBV/qDBxHkYXjl4Eh2xvm148LvY9rR+4RkTGN3EZoMvuZQmouLGCFo9Iy+vjhWZKc+yHBJeZKdRzjFI2pIjIvVkiPiySDLY3xTEMwvfeG55+oR9MWvf8Nw6WWXFWlzpwsb8iLTMULnuEjeNI0AeRLkefvb3z4SimktXmvymaPE2Ji3qY7S0cOjdHXxg4X5t8gg4oe4CZdfeeXKI3wGR6D/1guthTrO06SXunkxjGzEUzAdwzmkk2Hy2BsOVjFAMAV38sp3Dmndd9FFo/zJY+gxv9UWyJXHCgcvTkSVMUR8U3/e3CoLbtOj9icef6wMpvlX9FZn2NHL1nq+fvLRm54+8KDNkHVbfSM3IPKl30ZGeVan9W6VwZOrneiVdkL4cgPnGpBnhfil4xUi402dhmLQq8NPRFK5Y58dieXKjd1040cfWL4muM6mNFVuQzRbeW3++WtZJZeedKl/IyFvdVQfP+eX6vEaxXpER6AjcCogwJ4Kzzz1VNncv/HX31tT+B58aHfZuHvvvbdWrLn2Hfvr3YrLL7+snCAcKuwnpwPbu20bJ9D+kbyyZ5PNYkda+3YqYNJ1PH4ILBjd8SvjyCVnIJy8UhFk0NPZEzIW69gG1wTxyO1IaBeen1wANShPg31eIpPfL7JGYjx6f8Upeyyf53d63DstcXTgwEh2kBH62SKA9m3dZSJAlqxShvO2CNazzz1fc1M9zia/COIzzxS5QW55+lbI2969dWE/9eT3ag0+ROi6699V8pEzxICuiBzCSF7KQbwi/13XX1dzZZE2RFnZ8vKG0pVe0gcPJM1c1Jr3Wh+UQN7yha/zi2whjtZhpbOyEbQd0zqgCNnZ27fXy1GIu8fusEHmlIVwCwgdIo2oIp4Iozt2dZMOcUaS5R3bYuF1NYUjcsiCMYIZr7q6aAMEjcfZNA4vrcGXTGW7odBe0iDfZ59tWsPrqi485ryxdPfyWWE0EWG6qK85zPKTpR38ePpfecWNzXiD1NaXPqmHL7fRP21YXlcVCelLZ28IYoE2/Ut5tdWPZZ3OKSOkGHZjWtfLeD2J86uyqu7JeaiHVZ8gN3dyPLJkke9cnUqZpJvmEz0m/aUV/IdzDx2BjsCphUCuYdd+gjjH5SU9OK7n7hPsllVk87yvwNlw5ZVX1DsJ3/jmt2oFHnnM2Te2mPLFBhqT2ORr33ldzY1lU4WUS14PHYFNTWLr0f40VmaY04ENtJlvqgldAOU1RbgOvlpzYquj11PX6dFl40WU3l1dbWvh97Ej5AKMTFtj7UhkRzIizfjjIRs9YYnjiUWa8+Y1AkQvPz4pcpQpfRHDaa4hcoY0IrfqxsspHRLk7vTp7z9ZZMwdbrySvFjOI7LPPvODkucOdsfFCOh5w4UX7RjOq/X2zinSpgzpkUfEjlf3W9++u8hWEc0dO8rbi3gq23IolpaSB6l1V0wue5XH+zD06F5+xubxRx8dztpmfu3rSkbIIkJuRQLHPJnaDklFiuHgPCJTHtG9e8vYIcPqShfzoMq7ec45ZeDIyfQFbUQGg+ZxPuPnow4MHjKJJJHPA+/FLmnV39SA+++7r+ZlMZambPhMLk80XchTL+1GV+lhweuMoJuPffDVg8N5F1xQ6RFthlu5ypMW5tpaHbS9PAcOmAM6kmuEHt6l30TmeZthKU9NP8jjd5og7aXR2F/b/0USc0OmkZQ5HbckkT45Tr8lp/rdtFKGTu+cQI9FHcYbxJI7vUhW+kzlVPppkJGvQq6XRlY8sCG2K2nHHP1/R6AjcAog4Oa0QuM4cswOckyw4aYMfP2OO8vWmnrmReCdO6+sNc0f2/74cOmll9R4wgZwTuQT8N5B2LnrrbW8peW1/sd/++OyZ2yH6XRC3RzPyq4T/d8ZhcCmJrEZB2uQmwZVRNGgetbWxcsgrxwcvYVarl7qmppQJ5fWoJ1B2Sny4j0q2TXgT3Ntk7cZxEcCuvDO5qtHIwEbF95XBpIyEl7biajWAC/vVK61QKdVD+KJJYce55x7zrBr506vaw773/nO4QfPPDN865vfrGW7kKj6JKulTLaeVfMxrQAAB2TNdAOkUDqEBKF9/Ru8wHbJcOXOnfXYGvkTpFP2Qw8+WGQN2ULern3HO4qwIVbqg7wiVfIxLpbWIp9H2EoDMEXqLLWlDvVt7MnbjJAicl6Ms++FLXfYyCEDh6jlpTlkVXl+5pmefeDAihHUhggmrynjxetMX2mRP+UWuZ88wwwnkq0MP+mkGW98RoIJa+Ujr+o6eqdHeeb+kofsF5H2QQBTHaabI/jZhztiTH7FTcbU/M8q00tX03763khkxxsaccqCLf2SBgmGOSIJl+rDUxnkSSd99Vu6TAY95+rmbOrjlY5e+uCUB+k0yAi5PpBJgwOM/BxHvi3Zbg5S7sqN1JRvoqvjHV+TN3WqwqZ/5I1UeCwj9VmWts3X9zsCHYHNhQCbsiywSVs9kdq2raZn3fxD7x3+5t/8m8M117xtePDB3cPTP/jBcNmb3zw8+thjteSlscrYsHPnzuHrX/9ajRXXv+vd9b7Fu2+4Ybj9S382PHjfvWWX0Vd2lx1hM1ZszzJFetwZgcCmJrEGVmHZpZJBFqEwuAoGZwMu0pFBMYN7JahP2E6POydv1SKeh248F9Ia71ldLJM3jUpbtoxlOo+EINaCqUD4xkiYzqoXuhDW8ZWWeOPGvLkIXeh0FDxqIcnjF8Hatrt2Xjnc+J73lOf0v/6XPypyhYAJrxzwktCh6CAbSOoPnn6qPmbgxSxr9lmXtjyDW7fWy22WxbIkVoivt/vf+KZLypBcecUVhZ+39++5557h7m99sx67H3jlQC2bdfkVV9S8UxPun3t2T62p6txD999XJPTCHRdPXsxpLdJXXhled/443QABGu/Q966QOMQUuYUlgxZPqTVWs3yXaQXIpakB6gjjEMC93rLft68IKVx5tcmwLw2PqpetpEF8xTOa9ZGEAwdWvMIw3f3gA3UjRJ/nn90zbOf9Jc8awu1HF/JRgsnzqI/4VV+cCGH6YM6Rr2zdVVvAQXr66QcItS3dhH1Tv6i3cSO7zoz/yGLEx96n146hdJiIa72oNd0Nlj6IsOPppYiSQaeJ7MO2ZDbeWPIMWLnpvb+VBgAAIABJREFUsk2d5Ks7tKmXiydTqPJmpJacrFLg+lZervN67DHVoW86Ah2BUxMBN+FsBtuDfH7tr/5yOHjwh2p8e/yJJ0bbfc5o641B3/zGXfX0jJfWUlqeulkHna3mhLnra39VjhNo5Aa8iHIzpfDURKprfSwQ2NTrxD7xvSerjhkwkUWEL95W8Ugs8olkxFuWl7faQTSDtfz2Vwb6IgIjwTQ4C+MYPA7ESTuNyxPmoQuWczp0Xk4GcAlHr+xIXEIxcp48+14ms19EgYfwxXFN2SLnpiLw7tYW+X1l+Is//4vhj//LHw0+8eeCVlck57zzLxhe/8Y31txRj7uffOKJ8tzS44KLdtRb8JlX6pG+ebDesGdEvJFvPT7Y+AKV9VV9XhauvKAhhFPl64ML99zznZqzKo/ynvnB0+UVPMfLWueMy3UlfVY2oKs20VbIC4KKcJq8L5hvqqwQVOunmnuK5GSeqXPKhJct0kcWMl4e5MzJQtYmTyjZjF4MKy8rosjTLF8tq/XMMzX/lrebB5kXt25QaukpL+uNXuyVvkiPyZsqji50M61AXvteMHOOjmSZkhH9K53VGab00pDhJ6iTX+k83aSl7ySu6jSRVfjE2yr/ooeO/YweFT95MGp/Iqb26aWdbMkX6CIXPWBiUHJen1d37UnvkjzJTz4y9Et6kLNCXtsLqckTIlwFD8PwD/+v/yO7fXsSEOjrxJ4E0E+TItk/9kIou7f97HoJmTPgPTfdPLz1qqvqKZgx45FHHqk0bIrpXMYltsoHch757sM1Lj31vSeHA/v3rSyv5SaYQyM27TSB7YRUo68Te0JgXhSSTmqbX87yQY0kcEE2c26tbYjAPM2y+MQtxt0FNci5hR9slNiOy6jEmO5QHRcEdhEvnV99lKAI8OixKg8Y75gPDux9eXjHO99Zd6j/88u3D888/XRdzHv3I39WOthbXkVGxN0weR73I6KMSs1DfXH8WhXy5keuO19LSvmalC+l8FiaGoBQkuU8QomYIDQPPfhA3RmT+dKLL9SKCWefe+7whssuXyFhOYeAI9umE5jrax+JRTjpg8QhsmnfbJEjZVuvVD2qTtNnWt2h00McHcnyo7eQuhfRmuZnhRzy7vKCkgsba9yK27fv5ZXpGshX3RwUsTyrpg5EL/Lr5mEiyWOrj//ThgiZfXjJl2kEjulhmzRyJp9tQhG/SU7ism3TJa62S64TBLPKmxIuSlgQ3Taukk16lF4TIc48WMuDJRQmDhLX5BNN7krdKmJWUlPfyOzbjkBH4NRGAMlkG3LtGyMe2f1Q2ep7vvXN4a/9yI+WE8ETqMsuu7y8rZZmZPPuu/feGquMOV9+4P6yzex8bJ4pZWSzz27ie+gIbO7pBJNXyhhZA2bziDMXiG0G6cVKmYtHmcuauC6IiSCMZHgcbKUdx9UFQR7LWTyyr7zT4Cw9vRLGc47HwXo8DpGN7Azsh86TjYyQrchGGpShji+88PTwpje+cfiRH/2RIqbmyz7+6CMrFzMyZgkuhHL8CtT2YcfrL64XkMyZdefrZSQkj0eN51N5CCNdTcJH4LZNy2qt6DAtcr9v3/gSkrmk5Z2tdU9fLYPiM63IIXIZjKSpKQ8+AWt+qhefppeT1McPofUSGX3Gx/Xjm/rkyI8gqddzzz+/Mh9WvpoHO5Fhd/HKrPjJeymfliCXh5EhVFfzcAWkFyamXZiqQDdxsD7HV7rO4hm14L83+rfUF8i8qIcYSxOvMvmFE1KbvjBt6bQSV6nGtk+crTTRXRLy2vNTtpV0OVfxdNFhp+tEnPNJk324FNHMPLKJPK7MiZ2RyZDPLQajxovthmcl8D6PF2aVpw5HHMg5mvxHXHDP2BHoCBxrBNjavZOdrac2k40U72uQX/ny7VUkz+zbp48h+GokZ4tP1Xo6+B/+3b+psYqd90uoMWR6ouf5XSeyQebM3W5qEjvOJx0bJwNzmsrAbNwLCVg53wziSZs07UBbcdPKBG28PG16+0UCJmEZa+d5Qlx53XLOVIFR3igzsqUdVyyYx4/LS1U6ehTR83Z+fX2h3upH5i668MLhlvf9eH1F6o47vj7cd/fd5UVERhE1F/2L0xzTiy5+/bDtnLGZGZR9B3hAny9D4XG3ugU7nlJeUWRUHchC7BgY8zft23qpyzJT9Xb++efXPFieOo/lBXoUAS2v5dZ6DC0OgUX+yEV54inlWS29EdD8aimsfTW9QV6k1nxZ5JzsPc/8oB5JqVPKVI8YvWq3IojjS1iMn/MebznHU4zUe0lNoBf9tm0fCW+R1GmuM/LqRS75M0UB2aSzn+CcuKrj9IJUCKl+7GMYjpNP+ngwS9eJIMbDTGbkj319cWNUeSf8rFggv5+QbfbrFmsi1Smv6oFAa3t1mPpApZ1kKFP7kLrihUWCo9ekf1v/0mOqR5VBiZQ933fcBulycbXxfb8j0BE4pRCwNKIQW1sOgr17y5EwfizGUoTnDs8/++zwrTvvKGfCO667nuUZvv2tb9ZLxPLz4CK+bDxZAhvD6SCw0T10BDZ1L8gKBJqpBsjJw2m+aAhsBngXSkI7biYu2xrkVwb8SW68ssUD4hmzVQ4S68ShJCHlG6xLt4ns1tJLY9IiIVXeSt5FefRuw5huMTc25xKPDJjDac6sRyqXXvKm4cIL/sZw2eWXD4/fdPNw/333Dvfc/e3h6e+Pc1vlR9Qsv2Weqjtgd77e/h/jnynPq7meHukjJwidl8bUCVEMQZEe4eEpra9UFelBRBePc5DHffteLs9ryDtPZhHQAwfq0T2DRAb5yJpgP8QOJpnbat6qeI+c6AEHKxQwkHSkkyDe+f3Ti0qmVKTfOKevCO08akax5uW++so4DzQrDUwe1pHQbhs9sFvH5WKK1E5zX5WXX+qjHkifY3WmO8OLAKu3/cTLK71f6lC6Nn1CGoEcWDnvJ0dt5aVH0/8qQ66VlT5+cFVjb4WOs2CkHZSXC0dZbqDoOSpYokdtx6+Ipf6pR+qSKR3RZUPbSdexkJSyoZw9UUegI7DJEAi5NK2ArYqjwTbjNIIqGMs8TXzDm95UzhMODSvh7JuejrmBZlsiQ56yOdOYsMmq3tU5CQhsahKbgTyELwN5tiGwOvVIDF6LYMZHeeLpse/iSP7Ikzv7iJjzmc+Yc4vtyFS3bAl5HkmGYiI32ixkLoiwNMtCXaAhE5Xg1WHLQV7AcW3Rc6evO33/qadqHqy5Q34f/N/+1+Hf/tt/N/yPP/6v5WFEQt3tIlEvPPf88NyePXXxI1RIrXVkV17aevHFMhL0RFJ5Yp995pnCwjJeRczO2lbED0lhiJAnHzVAKGE1Tl/g5URkfV51+r36SnmSTTeQL/XTXogvREyB8MieZ9cqB0K16fSVr337Xi6CzUuLbNULSFvPKrn0KE/h1NCmQyC48o9yvOC1IEb7p3Vwt599TpFLuvN0H9z/6iBOWlMJGGJ1h190Xm1bBc3+te0bXWZJxr6mH0xE1HltkAAjx5U/3tYp7SG6yDeR4twQyOsnxNtsfyF9LAV+ViqobVN+eWidI3dqjxXdVrDNdbfAl3xH0mYZuxzn+htLXvyPTivpFqf6XkegI3CKIhB7EfuX41Qn8ez6N+/4et3oI74cFdJ6qiXMpwzUDXeE9O0Zj8CmJrHLWqcGx3zEoEmQ9WPbCyX72TbJD2u3zT/uj4SVEOWO/Hi84Jz3+HiMG4dncfnJYz8kJxdySIkXtMzTzfzemrM7Pfb1uP/lvS/XBwUuveSSqsPzz78wPP/CC8O37/7OcNPNN5e39S//4s+He79zd5FOJA1xnb5cX4QP8Xz5pZfq0TkPIeLKG8tY8FC+NBEpd78H9706nLf1rOHAcGDY/7Ilql4qcszQIJzRH1FSr5X5pz4DPBHZs7YNZZgQxJDCceH/kbDG+4tIVf3jPfWo/FVffxnXj1Xh0eO7b3hx3ws1fxcx5jVk/BDYYfpQBF1G3V4dDk4OY3EjObWO7oVFztUX4S/dpxcIQnqV/erBA8PWwq/gXvmX9lJ2PJhIm3blOS2S7qW2rdqaJ3Wcd6wcaeKtILB6ydRH0i/EK4OcYFxlTvGhjXVOuVOZ8QDz+vo5z7udkHw5Xm2bcotYzhPpH40nOfoV5lPa6FrYIL1TnwpWKyIn73IdT4R55Vzf6Qh0BE45BNiBZYFNKHvZnHRsFEBEQl6dlpaXdp6+E9gGvL5bCGxqEpuLwYCKMCE4CIKBWhi9TuNjWY+La+CcPFW1NFUzPxWRMA+1LqRDvLCLnoDwhYRIa38kICGjY1p6jbrZrnCYOknXhJGQmP86pqd7PR6ZLtKks41MX7PKftkCRcej9tJLK5/QfWGayynvBeefX4/dkZWrrrqqph3s3LVr+PrX/mrY8/TTVQxCikAKSFoe6/BaFlktgucjCucPe597rggeorVv38s1dwn+iBLdvNWfEA+eYzKRzHFFgnEeKQLqGAk2+6CIobaQbjJ2udNeTE4Y8ZCmjNn+V+rxUsq0HYn5GFPe2alPJA/vsYCk1pJf5lbte7mp98tVb/IFenohDvFjOMdHYeaFjt5jcoNZZUCoJ286DPRF81MR6bHf+BLZS0VCx34w1klxW88al6WSB8bqEtKoj/jymOAGg1ecjtqpytBXfKHMNIqQXGv/1tfFFi+GkdOSc/K0Xeprn15k5pw4HXrLtESYYz/1LtJdX8Z7ZfwYQ3XLqT81nlny0s9faS4Oui4dgCYyrA+0faKU6v86Ah2BUw6Blni65tvrfn7Osd++adUBlS07NI0n8iZPK+eUA6UrfNwQ2NQkdq1aG4ynsfM1yXIROJGBOInmx2N8SOpISpN22XaRf8xjwB71GMl09LLFcUZeMKaNvDqaCFzism11T9xGth69IDIXXHB+vcUfsnLXHXcMDz/0YJErqxIgsggp4rrtrINFaL10JCCbiATC8vxzz6483hdHr5DN1fRBmoQiV1Y/KJI1vuGPTLahlRVdc34ZBiGM0kiPesWozfM7poNgXm5NC5i8wMlfJ6d/o4eYR300qPPy23JWypq8hshn/fLS1rSVDgl1zlbbmHIRD2nlCYGbyDB1lJ0y2q390oPRtz/rP9GjiPGMmLb1aeW3GCzbTz5IKl+/pUP0mstK/IqshtyuerE2jwv1u22rXdQrQvtOR6AjsJkRmNuF6Fr2oSGl4tkTJNWNsvPsdsaRerLGETE9iYycvu0ItAicEiQ2gynFdfTxt9hvKyTtuGxWQxzLozSmiqxKN7LJlTu/8dzoffKQd5F2kXeRZoxzwdXFV2TGcM87ZUv4KGMsa9Rn5cyMhKQObZnZz7m1tuanItTIzDnnnD346hYvHoLKK/2Dp56q1QXinfPhg/LuHRy9aTyk0iGbSJ95qkI73zTlq68Qoph4W+T0IG/k5Cl8ZZi8qc2LXIVHQ9wQu8q7CiaRv6zcxEmT/dEgxuvM+z556adPFku7snxWGc7xfJH4LeNb+aM83uSFhx+2ymgJKI+vY+mUy6uKSEqHtJpawhPsh8z6Oa83VL4prfLgEvnZFy+kzPqsbV660g5pi0ZP6YNFtuLm/cm5eVzSVXzawzXXXHvL8qzImnQaewhp49XQ6jHGLv7zCAcL2x46Ah2BUxsBNqK95rNf24bI5rieYE32hh1N/tp2m3Bqd4bjrP2mJrHtYGk/x4jBykVRw2vRxeKN4vP4Fnby8OKJi4zIaUnmuDRWphAcSj4X8kYi2i6jFT2kMW2gDQbklLuQsVg6q00734+OryHk84TTcZGnqbx89WvHjouGW973vuHqt71t+M7ddw+7H3pweOr7T9Z0APNQEdoiaY1RacXncX/qmHNz8przvMEIrBDvZfJsn3nwcrdNFqMlLKMv7tLj/VNOpkRIz3MqtHHj8YJCRTcEVWjJq1UMRsI73hgFc3nOUtbkZQ0pHcsfSWzieFgr/eSBXZBY6+9ahmtcVqs8sAjuNFc10wTopFz945A+Mg0CzpFvrrHt1skjzhObc+LH6SIjKSVHXGRnP8e2y+LE56YlWCDJbVr1Li/6ROblEaSPPvp9jp2Tv35j0tf8P2vC8DUnekRHoCNwyiHQ2osov2JPEjFtE8/usCtZKYXd3z85OuZjyUxEPzzDEThlSGwG+AyIWTJJ+9XgOXjcOQ6kh8x9nT7fmUE1zqV6dDwNvOIcyzemQygQ0pGU5kJbyBjLaftOSMi4Hc+fffY4L7PIYEPCyeb1XBbUSz0SqszSJTHLt+ecfXbJ3L9/nCpAD3lfeunFml7wY7fcMvzQe99ba75+9+GHaz2+x777cE0faAllzQWdHu+k3q8pcSJI4luDlblL4u3L3543tzfH8b46XrWcad5pTR2YiG6rS8hrXsTKOcQ4BDf7aXdeZhjXdppqkDVg6cGzGp1sEbIiupM39JC4aS7sStwhpHf6Mtcw3lSVkZ4wafsy+SlP+bzpwUN80iLH2a96TrJSZ2v4ljdj8momfr4lM6HdF1dthkxPn5eNl9c5egqVpyHIla9pZ+f9UofkSXwJmf1D6NXb75A6ztL1w45AR+DUQqAdE+aat+cWI95oh9q0bbo2vu93BCCwuUlsQ+ba5vJwswbTJrIdNLNv68/AiMQsxu+RZNb5unpyHBI7EmPiR4K7ILNjnsUlV4/np4Q5ZysYlMdT5NduDe61zu0qxPTgWQvZJachv6OE5f/3TktHjSRo4XnmKazH19OnWy+99NLh4osvrm9UW8XAmnwW/a9pAMgIMrEA6pDC5pjPjyWmc5H2KWe8q63HsxXayghu7fnV9lvi2sqQXlmmRwjjfNdoMX74oOInIms5rXh64eQnjH1mJOFoX8hmbSeyKn5edo6zLWHTvwV9HAbr4CLymV4gvR/5y4hcq1fS6lTpLa1e9tugTyzTRxrxLe4lb+z0hYtzfpFZcpyf9ZFWRuS2Oqy1n+tEGSlnrfT9XEegI9AR6Ah0BCCwqUnsvIkMlCsD+PzkRKBEzwfUkUAajFsaMRLUube1zR852c6LFG/FhOSx3JaQZbd4dttQlHoiCKvJbNO3+wu60sYu9s973bnDvn0+v/rqsG3b+IgbMfWZVZiZ/8pbp1zEaceOHcO7b7hxeOCB+2sFBisOWAO2PLE8cYjQRFSQ0vkUgkXJy/fa9G2bKb9+jScxKwlIN8eFHkhppgGkNGnnIWXWuYnHycfrOpLaMTIvcpUHNoSUV9XasJMOc/mOD/ktIbD0afVPesSMtjm29eUzae3bVprJ8ypuLst55LaVEQIrrfN+yG7ylxAvRjSfbUxcu40OkUcf+y3CZAvO6Q+pT+SIF6SLvKSf65M82aqXfEh9ysm5vu0IdAQ6Ah2BjsBqCGxqEhuPlEHQ4HbOOaOXbBxIR4KYwbPi4n1DBngUJ6JkDi1vj8Hc/rJA/jgOkzt6b+UJcSA/P3KiW+Sl/JomUGnNLzyUxKZceeMpTNxq2zl5bY/JKJ2Gg8PLL49fsEIERp5s5YGtw7nnnjN+RWv79iKuyqY/D+2bLrmk1oh94xvfODz04IPD/ffes5jvOJEh8s0PtZXPNotQ208I0dVW0rehTSe+iErjLTQtoJ3e0ebNfKiaHvDq4sMFkVl9owjm4pz8LXGyv/0cL2CNL14hxSNOI37O+3lsla9UhQyKp688kYvoinMuHlLH2Xfz4nfeeefVfQBd/WCUfWv+Sk8PW7/Is5902ssNiDmvc4/l1mmeLL2kSdpStMGg8J4IKLlVV/pkHu7UjuJNWximl9OcF+en7W0Fq1WoWOEwI83BJWVKn3zKTnzk5px0zqeOVVD/1xHoCHQEOgIdgTUQ2NQkth3gltXBoCfYZn9ZusTNuFWiX7NdS15bjn06Jn2dmwgsoa9MXlr7qUvyZzsvHEld7dxcRo5XninPhRU29fpanZEeiQh5Ql4vuOCCIrQ+P4soPXjfvbVF9ZEV5K08utaZnZaLcjwP8YLO4x0rV52ib+q3OF5O9pfJSlxk5jjbyHSMHDse1xBe3LwcmmbxGF98PIy1PxG4Q/an+mQKwljOKGO+jwTCW33tI8lt3Vs9WnzmdZEu5M82+bJt04uLrPa8uJTdpo9+0T3n1trqE2S3JLYtK7Kix1qy+rmOQEegI9AR6AgcKQKnBInN4NsOivbb+HgfAZF4pHURvyACy8Aa5R36QlfSpayV7VTG+PLXON+W19Ub8PG+SssTnBACTR/7+SJXzmcrXxtachBSXHosYa6RGRmVrrxbo3cZYfGLF9K8TB62173udcNVV189XHjhheWt/f73vz98/4knVj4Bi7SSFV3iHa2FcCdl2/OiVtJM55U7D3kxKy9hRf5r0yGJC0+rdEWai2SOck0ZCGlNftMGTBmoaQLI3/SRB7q03k7HJXPa2s+vPI7SZ9rB7LE9LJM2cqPHGD9qY5+stEnyVPykcOJaLKOnc61ntE0Tspx6z88lPtuUKZ2Q42wTpz5tGuW4oKSbE9hg2Jad8mzFR1Ybn7Lmcf24I9AR6Ah0BDoC6yGwuUnsNCvvkEfoxQLz4s1YvQyQK9uGPCZOSuQihGkOjHRIqYHa1vGYZ0s94hzPTy9+5YtOlXYkytKuENmp/NY7GYKgLh4rv/LK+GGAuR7z4+QTX5/ha0iuc+NvzDV6caf9Kd1Yn5FMm6uLbAjmxQp79+6tz5LywvoYwnXXv6vK8dKXF772/OCZwgQRrJeQtm0bLM8lIKp5czR6zslr4itD809bLAvz9EmHgArOw7WNF+d4JLLOL2RX+q1b6zE53ZBCvxA0rVyEbDqHaI7ypu00/SFEOHltpWtJLB1G+cpfyKm0DUFOPeRv93NckVO5+p0y6Ns+0k//zNY0APm1dx7JOzeX2R6nL6S8nJPPuSKtDQHNsbWEYbl18jTLJ71tTUeY2im62WY/ZbXbuR7tub5/8hFo2y595ORr1TXoCHQE1kLAEzPX7rInp2vlO9XObWoSGzAZztaQVsNM818Tb1v7toMXT6a/FaIwEqAlT8KrGJzPIJ25mXnhy8kxfpSfssfyFvNeU760mftYL0dNlSjdmn06Lgvz+DYfEiNkIEG+6utNRSJGQrRU5kRoS5b9CRNpEVPyEAlk6fzzz6/jm27+oeHBBx8Yvv3iXcNLL45zYWte5nwN0iUe1uiwoufWs+rlsVZ3OIeILtIvyOdKXPuBgpW2HNPlBS1ylJWlskJ4x/KmF8PyCBzZmryp2gpq6l4krCGa4sksudO8VWkWJNZc1hGzsZ4jhjkvbrxhGuOLeDcyIzvbKr9pl8S3W7IT6J4gjfyCfenSZx0LbT+qiOlfzmebc47JjJxWRvVc18pEmqWLfFt5bRMXmattN5putfw9/tgj0LbjsZfeJXYEOgInAoGy4824cSLKPNFlnBIkFigZGANQO/DZr+Npy5NqTM/j9eRZazvKIyepDP7jQQiDo5S18lLVStkj2UVgk57nNIH+wph/nIKQc2ttF/osluwiq+QhXXS06sLWBcFZJi/lvnpwzOPYagUhKcgsAsuLh6y+/ZprBi8f2X/g3nuHF55/rubIZp6sMuZtknJT16Rpt4s0ywnrsrQI4Bi/IK+tHOXFC9ums49gFYFsPKyOQ/rgIH/JKDwX5LXqMaUtORPZRRJH7+joiY3XVRrn/OSFJdXFI871mxQv2UtIbeqVbdKlfPF0dpx+Jk66pG3jI2e1bfJERtK18eLK4z7dAKmfUDoV9mN95RGX0Mqg82qhzbNamh5/4hGYt1nbnidem15iR6AjcDgI1Au4h5PhFE17ypDYFt/WuNrP8aHbxaCevOsZ4eRPetuS30aIW/Ly1ZhuQWCx4UPnxC5I7EzcIYfjPNtDoo7ZAR5Rek5bj3691Y5s2Ucmnn/++fpZgN4yXO94xztrOajHH3t02Lf35Zon214cMF2GW6s0z+jBVxCthuBM0wOka8/N22gkoMvI64in/Id4Xhu5ZDmXlQUqbUNmWx1rGkFDBkuPJq1j+JRMUxdqasa09FelQ+oWUxWkg0vlm6YvVF3i9Z2I+VynYDmWM/Zh+4ip8sf2GwlhWwZimbypV8p3nHOJsyXPbx7IFbJdyStuGIqk57z8IbVJP5fXj09NBNKeaf9TsxZd645AR+B0RmBTk9j2Jam5Ic3gm3hbjzdtz67F7sf5qwyxn3hEYEGkkAKD+/jzidCDB7cVoWue1Faes7dvr/mImZO4vZaxGpcD4pFbPGYfavkp6fYfsCTS+Mh3XIZrfMxrigGPHH2QR8c1n3GrT4eOj+1X63AZVJxP/qT1sYPUdUyHpCBZo7eQjvLkR8cqd5rHKA8yctFFF5VH9oXps7TS73rrVcOOiy8eHnv00XrhS769L71URZsryiv96quv1AtUmUJRy5tlyserB+tcdLVF6BLIGz3bi/bxKJ5Xm3xBu2UKQtVzemlrrOuhHzVI30Bg5asX06ZG5W3WD2CfD0HYr7Kmx/BIL8+0th3Lho15qYjsYlksfcaqDqXPRHIzd1bc+BW18WUoa+HSS9luHOA89sdDvZfK1A5jHQ5Wn0i/s2RXbjroJZ1zPOqpszhyBW0n0CX7FdEQ1BzbShM8yRXIm4ecS9pspXPzo3w/uJLpp43hTU/x0SnnbCN3Xl4/PvEI5MaPBz5tdeK16CV2BDoCHYG1EdjUJNbAtlZoz7eGNksZLfOYZoqAvONPCQtv7rLyDMjSGoBti5wa8H1S9JXRyCNvSHeRN3Nyy+u4mLcYuTXndSILRfh42cwPfWVBtpP2cLbq79eGsX5jHCIdT6z6hPS06dt9ZIS8Cy68sAgIcvXSSy8NL+/dWy92pazamrox+5BEZI3zQhGkUY/kQxoFZDYENnls4be1vqTdxr52Xx0jM2cTVzKQ8+nFKOnUXai2bL6qRg/npPEb2/mVSpe4+TbTCA6Jnwii2tb0ganfIHEwjFxbwXbZfp2c/TtE9+kmSF5Ecy6q7BSnAAAgAElEQVQjx0QgucsCfaKT8+pxtCE6Rg6cgyudcj77ttH1WJSfcvv26BAY7dnBYcu0xJ620U69jY4O1567I3CiEHCtGoNcy6fzdfvaZ4knCuFeTkegI9AR6Ah0BDoCHYGOQEfgCBHYcjBukCMU0LN1BDoCHYGOQEegI9AR6Ah0BE40At0Te6IR7+V1BDoCHYGOQEegI9AR6AgcNQKdxB41hF1AR6Aj0BHoCHQEOgIdgY7AiUagk9gTjXgvryPQEegIdAQ6Ah2BjkBH4KgR6CT2qCHsAjoCHYGOQEegI9AR6Ah0BE40Ap3EnmjEe3kdgY5AR6Aj0BHoCHQEOgJHjUAnsUcNYRfQEegIdAQ6Ah2BjkBHoCNwohHoJPZEI97L6wh0BDoCHYGOQEegI9AROGoEOok9agi7gI5AR6Aj0BHoCHQEOgIdgRONQCexJxrxXl5HoCPQEegIdAQ6Ah2BjsBRI9BJ7FFD2AV0BDoCHYGOQEegI9AR6AicaAQ6id0g4j/x/g8M11x19fBPf/u3N5hjGL74hdsqj+1Gw1133ll5fv/3Pr2S5Td+7deG9njlxEnYUZef++hHT0LJY5Hw/2s33VwYaQ/tcqTY7NmzZ/iVj398eHj37pNWn7T35z/7uaPWAQ4wIXO1oK7SHClmq8nt8ScGAf1E+7kG9N+Nhr/3U39n8DucoAzXR4I+wxZtlqAvs0Vr9ffNois9jqQN5vrP22R+fqPHsTuxAxuxHavJvv1Lt69pUyL7cMbB1co6VvFwPNy+7FqQ72SHedudbH1OdvmdxG6gBVx8DOYNN9443HYYhHQDotdNosMeC4KzbkEbTHDbbV8Y7rrzrg2mPnbJ4ICwMpi/+clPDvc++ED9fuFjHxv+5ac/fUTE+h98/ONVl527dh07RQ9TUrA8Fjr8wi9+rDDRT1cLu3c/XKd27NixWpIev4kR+PznPld2CIE90XbBdXY4xPl4w8gWswc9nFwE2GZhNbvz8MOjk+CGG284uYpOpRvL9eOdOw/P7v/upz41fPXrXzvpdYCz8Y+972EYOondQC9A3JAMhMkFsJnuKDeg/imfZPS4/Oywa9fO4d//x/8wfPBDt67U6cM//ZHhn33qUzWYHY6XnACEjsyTGe66684BobzlfbecEDUy4Jyo8k5Ipc6QQrSd3wdvvbUIwxdv2/gTnjMEol7Nk4DAl2//0po2zI2G8fNY3Kgfi+rlxmc10n0syugyThwCncSug7U7ti9/6fYiGcgTwoHULgtIlEd9fh4d3X77lw5JtuxxBPnSLyNgyHIeAeYx+iECmwNyPB5J+XOZKVu6NhgUpY1Xp62DeI/rkEiBLnSKznkU5Tz5KZvHNPLkS3r6ZVpG6tXqstr+7/z2bw8X7dhRZHVZGoTMr/WSj8T3oys6RXf5GTG6SmM/j4jU1S+Pv6LjHNt5/aJT8gUHmMzxTtpseWJbDwWMok/SRN9gqhxptAVd7Kcd236U/kMf6aThFdGHM6DQr207adOuKb9vNwcCIa23fujWIrLa028exOm76Yfzx6bOL2vnXPvzPutYelt9yv6ycqOHfprrPOXoo/pZAjmuNefzm+upH7Zy2muYrunr4nOtkbXMztC3LY/ceT+no7zt9SBP7F90V78WX2nUpw3rtUGbtt1PGwSTZeU/O7tmW1wia44vOWu1WfIdyZYNiz2Z54edX3vTDGfYB+e0+7y9l9VdGvmDT/K25UqT87bpG0kTGxidlOPX5nPcXgfp92lnfYBstjn1cExGgnj9rA30lS62vD2X/XlfneOgvf0SlEGusnO9OD/vt8632LW6ktWOM8ps9Vwvr/zz656M49XnUvfaHuxhTQQ+/S9+7+Db33rVwS/92Zcq3a//6q/W8e6HHjok3y//0i8dfO97bjp423/6QsXbOpY3cUnTZnzmmWcqze/81m9V9J133FHHyhXmx23edv/v/u2fOvi3fvz9lV58yv/7P/MzlYz+dInc5FUuPemR/dRNXOQm/bwO0ihXuuQLZp/715+tbKlji0UwidzVtmTKF3xWS5cyowOdUnd56E0OPIWkz7E4OPhp44S16tfWQVkt/vQILpG1bDsvb663PNE1dVOWfLb0E9K+wZxubXvLm7YMLqlbKyf51sN7WV163PFFoO0b2lP7tn1V6bEXaWNx9qXV/m0a/aoN2ly69Cl9zHWTMD9OfLvV/5b1O3GRFR3bPqbfkZ+49MP0Z2XkGs51kOsi1zC9leMnv2Ar/fx6Sd4WA2nkDXbk2Yd7MEn9WtyDb8aI1C9y6JE0aYNSbvZP3emQ+ikz12ySRsd5+eKjY2zBvPxWdnRM/YNHsEx5621X64fJF7zSjtGNLomTNn0v+iyre3RM29KVnPQrctRZe6Ue9HPc4p400ZEM7Z6yl8lN2Wkb+MtHVspKmnk/iNxgkeOU326DT9p3GQ7Kzfngr465duRxvKz9g50tOclDh+jf4ieeHGk3krdt0+RLv2zreSz3uyf2EEr/2gPeD3eZuWv74K0fqkSt18/dhju0n//Yx1YedfPaetR9IoK7JDr84098YmVekvLp4+6KbvT3+MScujaox4+975byzknL45m76h07dtTj+//+p3/SZjlkn+fAHd9vfvKfrOQzV0f5v//pxV2pTOSKF7I9RNiSAzoJP3bL+5acXR4FCzq1eWAjRF7uxvNISR533ryi5twmuMPl+fjdT/3zQ+qnLp//3GdXZJJruknkOU/W/G44cm3lqTJvGOewSjvXWzqP68jzE3g+4pnWRmPc6JFLP+W9hnHmTcnrMTT5kePO2bH6Ro489nefxJfdqkL93yEIuIa1VeyPNtTW8QwlsWtO+/3BZz6TqHqCkfZdiTxOO8p3DbT9znXRBjaI/v9ouiad0+/E5fo0zUZIf7b/u5/6VM0FTP+tBEv+OR/7YutaEEw7Cg6xUfN5vvIGO2npCPd4zlK/1kZIL188w0faBuq+EfurrLZ8fYId8cRQYLPaeoijI9nBohIeg39prxsmGzYXmXakj8DOCsamjI/6sDEM1uk3y7DP1Ku0rX5mP/Wmi996dpj9TL+SHnbkpOzIpZdzwtwGp976VGx++lZlmOYIk6u/60P6h3JTTtK1W20nTdqXzA9/5COVP/Vrx4zo4elMrqe5HrCVzvlgZ1u6NS8Up62UnTptNK/rSHumTdXJ+EtXdT+eoZPYNdDV8C46nShBB3NBtmQwHSkNn7QtiUrc8djOL+6UoWMLmdYQEpOBj9462K0TMc95BjsGObJW25IBj3ndGTWyg4387WPz1eTN42NEduy4aH7qkOOQ0uiSNkp+x+1keHq1+jBsws9/7BdX5NIfVki+/G2Qd8+eZytKnyA7F7A88AvZbPO1+zHo8gu5MUq7JW1rdOmkTvpka6zSB6reEzn98Ed+OiJqu2uqQwYcxpTeqRuDRW/yW9mHCOkHJwUBN0w1oDU3xiEvIVgUM6C3/VqcfPO441EJfdOPHWmDwbLtTwZJN8axM/qcx5+5HuSN7XRNOE/uRsO8rsGk1YGsW6ZBNvaw4mZz09k1+ZAY+i2rX/LlfMpr9d1IG2zU/s7r19YrbRCb0uogXwhfG380+yE+y8ojlz70y/nY6ZbImZ4nTRsnb2x+bDi7ZZ+dStCX8rKVMtazw+w+GbGB6VfzG6289JXzbHBwD8bsfYt9sGjfsyBXev2bnc0NUvRvt3STNjeqOacc9VK/XCPRJXbfTUFC9Itdz01jxqekU0dYBN+MM2kr6TaaVxuEeCvfNeuaEVqMUvax3G47lsJON1lfnOa+ahC/eWD8cmfjXC66pJsfJ/5Ybx+e3jify3XnLaSTMhLumBgNequfDpY6xIiId0ExFi4EhCnn5mXwUpJv/syy4PyJCHNS+q8+84fldTAHiO4XXbQwkvR1obVkMcagvYDJFLTzNV94bf1C3J3n4SBT/sQ7nhuOFosY9Bib+d2+tHSgb4xudEoZkdca2WV1kS79IOWFtDoXgxwPbMqL/L49eQjoR2n3ZdeZgabtZ7nuW43F5aarjT+W++lf68lUn7//0Z895HphYz7fZHQd8by6AUd2Q1xcy/E4NclX3aWT3zJMMri2eieuFeh6gd1qdlba5IusZeWt1waxsYdjf1s97ad8mLU3N226pGnjjnRfW6p7bMpcTmuXnNOPQ8CSdhnpd27eX4OP/s5WsoGIf2zhRuwwfYXoy1baj4zo9Oyz47jlnDwwi03MtZgbreQRL31kiyc3Mv7gk/8kSZduQ1DbMWieMGNG9A2e6X/SRz/60j11XmY7Ij/pWodd4qRZLy8P8qjLjSs3LF6cnuOR8o7ltpPYNdAMSWVM26BxTaAOGcy5+UU3P066Y73duWvnSkdtZYdAxgPnnMHOgPDwJ8aBMQQ2+RiKFWPx2c8V0UXgyZinlYdh1lGtGrBaOBqjmYt1NIbLl46q+uzeXdMpogOdqt0+NU44d5ExWOLIEnK3bV+bzo1r9Fa36BH52UpDNmx+85OLaRcuaHq1ZSRPtjFAOabXHOO5YVMeg9UauhibGKDoHbnZIgTJq29rV3fPLQGis3Pw62FzIBAP/bJ+qO8hK/pJ+miu+1b7ZXHt+WOxn4E0BGA1mXSmD+9N8kibx/DJ51oYr6tPVv2c1z+FjRJZ8v2W1T/XSWsfU3a7jW1gZ1cLkZXrZll5y+Lm8g7X/s7zB09y1sJoXGhvnvvwj9ms1Hmemx2BS0v2YPBjtyyebCbPMtIf25d+LW3wIdcSifqD64IOG7HD8xt8NjiYRRdb8WQ6px5C9JjLcC42OGNnZZimdjgnjPZ++RjmfK6bZVhEXjtmpMzY/aSJfq6dlK0vzHVLetuMiamjuPTp9fL+3Ed/tkTxFreBXZqPqe35Y7XfpxOsgqQG0Ih51N4m07l1EHeQlWZ6bB/3edLmIszxsm06z7JzG41zx0WPXGzJl8GvJVJ51OeC18Hnjy6S1xa5iSGMh649bx+ZIicdPucRJF7QeXzOb3RLvgvL3feyoGzeZem0CQzcNbZYqIfzeZSWdhGXoB1aYys+F/TcA8Nwpm7pAx5NtiHzZSOjPWef3n4pk06wyt2+NI7zOCcDxeiBOHS9xfShDMbZtmUqi64xkAydALM2KI/hbrFpz/f9E4+ANtGPlvWlDGBZuUB76g/z6y59ZC3tc12slWatc/qon4G2DY5bfegiXUsenF+L5Km7G1B5VrNFbZntvulAyzDJNKt2oJ3rnuvSdUoHegfrtgz5UqejaYNW5kbsb5vePh385vVwziNtv2MZ2JO2bVvZuSnJTXL6wbwfkzFvezLT79miue76QaZ+kbtROyxt297Knetv7NDuubZ4P4Xkm8twTpwQe27fOIFHGEPVYVm/qUzTP08LhRYLehjPyKInOx78UmaOIyv6wcg52xDkNk07TipHutbubyQvneRt8ykj+rZ4pOxjve0kdhVEPdJhDOaDfJIjt3WhfXZ8ScGFqsOGPNkiV20I2dTAgg65bJpCm0fHEnRC6ZcFd1g6nEfaOpSQ8nWuGBHx0onT0dWv7XwxFG059KNDHr1Hn1xQmUvkrjj54KCO5ukk/TK9NxrnpSqy50t2KIPOjEvmGuUlNSQy+th6tOGckAua8XQOZuoz1xU28GKMnRfg4Ze6xbC1y645n36w2pSSfHQghDNe+5RDp9xotG0UAlDKTP8yqEcXNyrkyC+o4698/JdrP7JyY6OtBOnnS7nUif7vpCLgOtV+GVDnyuiffrlhba/HpNWu6VfipHftG1QT71rKoJh88+14vYw+vOSbp1G+vruWjRtJ5fgyrPzqx36QGbmuITeKuY6kI9P53DDmenWTScZqIS91pozIIhvBgEVCrjvHZP7Gr/16nY8NTf1ybUmX6yZzAjfSBimv3W7E/rbpV9uPjpZ4SqCvusUpkfij3cIWTm0fy7HyYJJ2ciy0c0Yd69v6XttntBUyx/YL7Jb8SSMuTqPRTo839uvZYTL1f0GZ+hO7GbnKMI6SGc+lOH1EPdTNb07O4v2MfSVbH9ZvyPF+Ajltfy4lmn/GWGUg74L0+h99yciNaGz3vEx5lumHw7Dz5An24Ss+/IYs1/c8rJeXvrAJlpE/5z5zucfyuJPYJWhqbI2y2sAhi8bNQODYxYrYZM04F0I72VoaHZER0bndBZkXFs/oEjUqShkuBBeZKQwx8vP0f/CZP6wLjyEkmx7yhdy16fPCT4hpzpHhgs5ac+QI4ukhwERnN8C42MR7nCMu+dRPPWMEKuOSf9F1tTolizL+25/+SV3MyUM3Rkw5bR1dVPQVoo+tumZaCMylUwftHOMQA5Rybce676y0ypSenNSNbtqeJ8B5P/VZb7CIQQnxVLb2St+AbZ4CxDvLQJXRnb0JDAd6+AmMHp0YTPogsCG2MYAxrinvJ9//gTLMMWotBn3/5CGw7IWuuTbaVt/Q3vpA+n/6o2tz3q7IgRss14B0BjF9Yq0QciS9/r4skKHv6b/SufZyveWGzXn9PbbSNa3PyhvPmOuH/US+Ug8y5Y2e6hQ5uUlbplOLSepL1jIbRQ9YRndTCNg39kJI/diM6CWeTYj9aMtLmmVtMNdVu61nf+d5lh3TkT6wTPn0bXVclq+Ni+1gH9YK2oBcIdhqc/WFW9vveDRh49eGjIttn5GGzU9abeWHHC3qNE4P02bS6Rtr2eEQrdjA2OAi4g+Pba4vGuPaMQV2aVsyBGW2QXxsOblIojR0EuDgmENktZA6uCFVx/G6uKFwlCf6trqkzMhcph8dXEsZO7Wp47TbKHtRx8iy3Uje3Gik/TkAtdWJClus13WiCuvlbA4E3IkZHBiZ+cV4ojXU8fN26Ykuu5fXEegIHH8EkELEZhlpPP6lb7wEtoiXuB3cN5779EsZ72Ru2E+3GhoDkb61lpA83ep8Otane2JPx1Zdp07ueHNnuE7S43oamXbH3kNHoCNweiCACLaPltUKWeBligf19Kjp6V8L003igT4da9t6T0/H+p0pdeok9kxp6WnulscUHiPmMcfJrL4XKzaDHicTg152R+B0QiBTGfJokb1xo2rJu9OZEJ1ObaguHl0bJ07XGw9PB/wyVet0a78zqT59OsGZ1Nq9rh2BjkBHoCPQEegIdAROEwS6J/Y0achejY5AR6Aj0BHoCHQEOgJnEgKdxJ5Jrd3r2hHoCHQEOgIdgY5AR+A0QaCT2NOkIXs1OgIdgY5AR6Aj0BHoCJxJCHQSeya1dq9rR6Aj0BHoCHQEOgIdgdMEgU5iT5OG7NXoCHQEOgIdgY5AR6AjcCYh0EnsmdTava4dgY5AR6Aj0BHoCHQEThMEOok9TRqyV6Mj0BHoCHQEOgIdgY7AmYRAJ7FnUmv3unYEOgIdgY5AR6Aj0BE4TRDoJPY0achejY5AR6Aj0BHoCHQEOgJnEgKdxJ5Jrd3r2hHoCHQEOgIdgY5AR+A0QaCT2NOkIXs1OgIdgY5AR6Aj0BHoCJxJCHQSeya1dq9rR6Aj0BHoCHQEOgIdgdMEgU5iT5OG7NXoCHQEOgIdgY5AR6AjcCYh0EnsmdTava4dgY5AR6Aj0BHoCHQEThMEOok9TRqyV6Mj0BHoCHQEOgIdgY7AmYRAJ7FnUmv3unYEOgIdgY5AR6Aj0BE4TRDoJPYENOTtX7p9eHj37hNQ0vIifv/3Pr38RI89ZRDobbh6U3VsVsfmTDtzMvvCybbzZ1pbH4/69jZcHdXNis26JPbnPvrR4Zqrrq6fSggMReJs/95P/Z3h85/93Oq138Rn9uzZM/zGr/3aIfVR59R1merqqt5rpUk+acjbvfvhRJ3QrbK/fPuXqky6bFTvo1FyrXKQ+bbvZP8n3v+Bk9qH1tL5aLA4FnnbNjxSea5ZGLd4n8wBPzbkSOuTfOT809/+7RxW/U5mvVYUOcyd4KF9ov9dd95ZtjVtZstWsVmnYmA3jRWpz1+76eZD2m5ep9iK4DE/Pz8+FtfJXOZGj+d2ni5+xzusVU57vQdz243iebx0X0vn41XmRuTO23AjeeZpXLO/8vGPr/RxeDs+mU6sY9Hmc2xir+b1PxnH65JYSu3ctWu498EHhlved0tdAP/y058e/uAzn6k48TfceEMZVxU9lYIO95Pv/0B1sH//H/9DU58bywCd7Iv9WGOp/dKOx1r24cr7zU9+cgVvOu3atfOUHqAPt/4nMj0j6pr98Ec+soK5feQPKToZ4Rd+8WOly7EuW18i+1QN//1P/6T0R1R/7qM/O+zYcdFKm7FRbOw/+PjHT7nq6Wf62wdvvXWlPv/sU5+q+iBbJ3OQPx5gGh/9Tnb48E8vrnnXxj/6xCeqHb74hdtOtmqnXfm56Xx2z57BdQxv1+zDux+umzfnT0Y4HjbxeNnvI8FnQyS2Ffz5z31u+OCHbi1Cm3iEZMeOHcMXb/tCompwzN2fO+54ahlh8S3hjSdUZsRR+txFxsvS3t24m4/RY+zn59JZ1rqTH/P98vDzH/tYXdi/8Wu/vnL3tHPnrup8Bv6NXOzq4+4yOqe+ys/duG1IMSySVt7UUf0dt94K5Ytbq45kS5OftOoHVzi3mEsT7G3bssiRL+0wL7c9P88rbepXAg7z389/7BcrR9o1/SB1glf6kITKbzFsy7bf5kt90x45Zxus5uquVb/Ib/PQBT6CbYurNoyBS9ktlvLkGsh5+eWZt6G0a/X5UqD5BzPl/8Fn/vAQcscI/e6nPlWYBh9lt3orJ3XNubae6+Epj3qmnXJdUC9y7UuTerfbtPdq2Difa0c+9bAlW5jrF0ydS9rVrqsScBL/aTP4s60JN9x4Y92I0H216yR4yANXvwR5Wnzsz9ub7LRXm5aMtJn4ti2dSxulrHYrH7kG9Gef3bPS1nTVL91c/8rHf7nNsnQ/5bdtpn5wOtzrhKz5OKNe5KX+8zomj3R+0umD6WeUll86W7+E4LMMu/XKbfNK2/bjyN/oNjd4u6fpbdGd3PzmNrHFW9npe7Zt/5EuYTWscj7b9cqnE1kJ8BanP/nZjw62gvSpy9G04XqyolO2+jBu5OaF409wzer3jnNtBpv0M/FzLPWd1JOc5Em90veck9ZxcJAmZTnvWP7gFRnZyis438pIvrRRyiLLz/mEuX7z8qOjPPM2iYwj3h5cJ/z9n/mZg3/rx9+/kuqXf+mXDr73PTcd/PS/+L2VuPnO7/zWbx18+1uvOvilP/tSnfr1X/3VOr7tP32h4tpzEuS8fXKdJ+OZZ545eOcdd9S+OPu7H3qoyqeXQJ+/+7d/quIdi6efvGuFz/3rz67US/3oIIhXlvx0STmtrKRJ/aRXZo7liQxx9nNOHRwHP/EtnpGlns4lf+oonr6OBWU5Tn2DX+Q7nzpElu0cR3q1ciNnnjftQmfYJ0hHd3LacnI+W+VKB8M2yJ82SP7UIXVWphDdU37b3/SxFl84yQcfZayGVcq0lXat+gWbVn9yg1WwoAs8yGvP059eSR950grRJfWTLmmdP5w+n7Stru0+vVLOvO8Fy7RVrtPoYrsansqIPPURpBcHj9S51SX7sEn/TrrVsMn55J23Pf3grcz0BcfBWJxjP2lTbuSdqG3qQQ9BfdUFZomb65L2kVeIXXI9CPL6JZDT4mNfPxcPD9u237fXlTKcS1tG3xynjGVbuNLNj4xcE7Bu7clc1lzflJk6Sa8Oq9U3fZ8cQT7lt/0v5Qfvto7Sky99ygrWZKqX9ELOpw7yRs8WR2lzHWk/Ie3Q5k25qfNq/b8tp4Q1/+gXm5po8uCuToL80uU45aWe0V356R+pFznJ2/bFYBEZc6xandcrHw6RQ9/0cWWknFyzjqVt29AxGW36yJvrFXm2wlqyKkHzL/0nbdqcqt3oLV10avueOqRdpIHrRvWGYYtT5EeX9lyrV9rMVvvDLWOBdJFLn2XYkCtETnBNXdVPkK5tk8hNn6tER/HvsD2x//gTn1i5q8CqMXd3ivF+YtPultzxucMWeBPcidzWeGrXY90eO+3YsaPuZMhzh+Ouhpyvfv1rdbejTB6LX/jYxyqeTI+o3JnLs1a46647Sz93GX4eswh5/JKy3Z1sJPzY+25Zqe8Hb/1QZSF3Hn7/05+ueuSOGEbK5PVNIEs9g594eIhLfGS76/Pogr7CrR+6NWLW3N42eXrgJcAWjjBt2zK40EXZ7uCVpQ1+d8orf+q8Z8+za5abk3PvApxTJ2W1j0BSZ+0qRHf6CnSUXj59jH7B110wXcVtFKtjUT8y0mf1RXUL1upDd3WGNV3prw2EYO2x1Dwcbp+/6867arrPXE6OTQXyuCuh7XuwpJP+KeSJS9JuBM+NXheRqV/A6nc/9c8r6nCwiQzb9OPYK+1Bpj6k/ySsdl3l/Mnawl2/1kfisYENj0dC2id9XTv5rWf7kt/2kPaebMKy66qmo/z0R1ZskjLp+PnPfbYV95p9bemnT7O59JNPe7g21dG+ftjandcIaiKW2aTmdO1u9DppxxkZV+uv69mkefntsfaAFxnCsvFwtXKPtP+nfGUbp/OLhyy2Zb1rWP7YMXarHXthbFpSbF1s9uFgtV75qcdaW20oKHetfno4epG3lqy5PuysoB8vC4lvbW36nvSwdN2N18L4xCVyNqK3fLED4QDxtkdOu1UeeyKP9pX/SMf0jdih1fp3q9OR7m873Iw6MuNjMMgFoaP7ITUayzmP5NugIYoQjuNhe2rpPkMnMIDk7Zrc823idJx6jLF4ktEmOWH7N9ww6tsWuIzQ0VmdGJXVwjJZwSN5YJIAewOEYH8j4eGHdxcp1XkTtJEQXO3Py43xc86ASg5d3EwcTmDIQ44iS3+iv3gy07/o46JLUKagL86DtMvik+5wsDqa+sVoKTf6eowyD+kj6meqjhBCb57wPKRtjlefb/uestInokdbL3Hr4dnKi4zUOcfZwps8dqRtw41iEzm2wanVl0w/7TggwPsAAA2XSURBVJF+nW3yttdV4k7W1gDjF4zVyf4Xb7utbPDS9rnhxkrDxmwktO2TftpiT0ZssPbxa4M5uyc6zNustUnRJe2/3nUyl9XiEVnpr2vZpKSdb4PdquPhlGGtco+k/0cPtpStTWBbPNrlTEl8+pc09hOi+1pj77Jz8h8OVquVHz3W26YNo+9a/XSjem1E1np6rXc+eqevtrYq5yJjPb3bvMmz2pYsUx9c57khTFrYsQPSbHRM34gdWqt/p+wj3R62JzYFIT8uAj93YEB3YZyMgFTTof3lrmQ1fYDqgs7AlotXHILJcPjNB/HV5B1OvDufVtfsH46MpGWk3VEltN7RxB3rrQ7OOxTvsb4wvxgOt0ztRQ4yDneELxe3O9aW8B6u7KTfKFbHo37qlnZut/oXw+GJBsMpuCOfE4nUIduN9nnGLXKTt93yDOxcQpbbNKvtbxTP1fK38drcTYt+4PpIOBJskvd02YaIaHPXN6w2OsAcSwxc423ftc+TtlaIfWVX2Vxe8PRHZEofcr251ucD91pyN3puo9fJevKOl01ar9xj3f/ZG9eX9hCO5TWcuhwOVsej/NX66eHolbqsJivnsw2JXG0Vonhgj8TWHone0WvZFl9w45enXdIcjzFvWdnHI+6wPLHANNgirnNS4eJgoBgtA3bu6qN0GbHG1d7ePQNwtRB5y1zj6Tij7Nd6QleTKd6FjHQzEhrTi13x/IWQIWm5W11L1uGco/OXNzhFYT25cDOY0TekPcZpvbw8Aw/v/lx1Xu0lJC8ds79MDv0NRAaIDDxwPBaBXjxNdCI/wYCXEK8GHXZMHvucWw3fw8Fqo/UjM9iN/fm1nlN60Vda10/wir626qs/5gZE2rEvvlbe4fb5W25538p0n3nZ+g6d0t9bnewrKzcSOTeSjfFpy5H2vcjKVn15Bug31+VwsIk82+BE39wQ6C9+O3du8HFQK/AE7xvc6W6qUBs8lhNgtrR97rqz+mTqHC9i8rSy5vurXVexwXnaM8+33rFHzmztv/rMH9a4kBdJtDf7qq8r41g6DNL+RzI2LKvPejZpWR5xwW698XC1/Efa/1eTl3hPefShta7h6L7W2Lvs3EaxWq/86OplwAR5VgvRd7V+ulG9yF9P1lwHfVke02uW9WP9X7x087E1fbW1VexywuHonTyrbY3T2nz+tGujY94yuRuxQ8vyHau4w/LEagANwei0pEWj8GQyVgKC63way77B49ZbP7QyuJhHIUgD1LUCedKkYRFpnrrog2zmnLJ4UlP2anKRD+RVXvX5zU/+kxUvg4tGGVYuaL1Cq8laKz6P20LaP/yRny7jEe8pXJTVkrS15LXn1MEvFy0MRvKzSHXRjh1DO5DljHkz8ma5Hnq40GDqt1bI3WQw1vbxyq6Vb61z8GCg6HXRRXQeSZ886pSyHEd3+gr6hjbX9vqYvPYFeZ1Tv/WwqgxlwEbymDLn9csjtHjvlbWWcdV/le1GKem0tz7sGJ4MmH0/bZJ0dGrb8HD7vLL1Ycs1BRMy7SNKzi8zutLAUp9aVk/12SiewXW1ba6F1jOQtOthk3QtXuLSj39nevNXnHLonDljybsZt+yEPquf2CboG+qgTdM+aVf9VVtpUwEG2i+2cW4bIjPbta4rttB1lr6gLP03ZUfGsq0bbH2MnXNtx5vrhsXNC1nL2n6ZrLXijuY6WUuuc+vZpLmdb+VpDzjFntjXptpvvbDR/r+enJzXftrROwwbuYbpvtrYq3+ZAuXaUx/9gU1ZD6vospHylZF3IJSRKVeRMd+u1U/X02vehmvJmpfrWB+GVXvN0lm/t53foEdGbJXxLFi29VxP78hZbxt+QI85r1lvTJ9j05a1nh1q0x6P/cMisRTw+EjHDjlAEBhWDR5vIJCk0ZjOaxB33IDTce1rbOfImQM6r2hA1xnkGfX4w9p6WcadQM4hU9IzmjqO9KsZWp2Ht88dVPJLr7HpmPrM9Tmc43RQF7e60qutP6+EDiLuSIK6Bkt1yGTxENt0MPUKkVaOOo8vwT1bGNEDjpa8WS+oU9sHXHyOhQyY68lAKOiUHwMPA3qRpYy0iXOt/OiO+MkPW23lpy/BJP2T0SaXvPWwis7r1U8Zbf19TEKe1YI+H1wZejq7sYC/c3mRxjk/g7F+on5C24aM3Fp9fpkO7rpdn67D4O3uHh5r9btgmbaSB/YJG8Uz6ZdtXaP6r60+GP1slbsuNpNNgRs5bTCo8DhFLsy1Q1uHNv1m2tf+bC2doz9MBDZLv0n7sHnOsbfaxE/Q5u11tFYflX6t6yrXV/qCspQfG5n4KnjJP/2sSMFto92nr3GDzYkNXpLtsKKO9jpZq7D1bBJs/WLnW1naQ/5l42Gbbtn+ev1/WZ42jv2DdX7aKfpIZ3+t8cN57RxbLE9smetLP3TtZfzQzuth1eq3XvmcS4Iy6OC6WCus1U/X02vehmvJWqaD/Poy+51rNriId361kJu4YNm+D7Ge3qvJnMeHGGdsTJ+w1Y7Kybn5mD7HppW9nh1q0x6P/S1WNlhLsAvPPI/5Y6218vRzHYGOwOmJAKOcG7HTs4Ynp1ZutA0g7OypQLJPDkq91I7AmYGAmw83HN0erN/eh+2JXV9kT9ER6AicDgjwKvEM8JIKDKt982x76Ah0BDoCHYGjR8DTS95QN7GCp228pryf/YZ2fXw3RGINXEDOnJ71xfYUHYGOwKmOgDVWPe7NozFGNo8XT/W6bVb9Yb3a9KfNqnPXqyPQEThyBJBVdjVTPzgOTDHMFIMjl3xm5Fx3OsGZAUOvZUegI9AR6Ah0BDoCHYGOwKmEwIY8sadShbquHYGOQEegI9AR6Ah0BDoCpz8CncSe/m3ca9gR6Ah0BDoCHYGOQEfgtEOgk9jTrklP7wqZN5Q5muZpWz0jLx6ZEJ9lbJwzt2i1+YWWa/H2Z4J08iz7Za6Sc22e5O3bjkBHoCNwOiHAlnqxM/ZwbkvZRHE5z+4uW14xy3fFRnuvJnnmWza4te3Jczrh2uty7BHoJPbYY9olHicEGDUk0hJPFky3/Ijl30IsGVZrq1pf03nrUnoZqTWujDMC28ZR15qAWYTd9qtf/1q9GWoNPOvnietvih6nhu1iOwIdgU2FALvpK07WN21tKRLKhjrvpU/nYofz8ZlUhD1GhNsQ2y1ffmws28rOkrXW2tWtrL7fEYBAJ7G9H5wyCPhyi+BNTqEM30c+UqtmMKwW42cQsyA2oyhkVQ3E9Sff/4HKvx4hZaR9HKIb1IKw/+sIdATOIAQQUPYzC/TnoxY+7ILcsrexjWypr72JT+BY+OJtX1hJk/j5Vjm8tWRZcL+HjsDhItBJ7OEi1tOfNATiLW2NXftdbZ7afP+dktIxsO13y33tKiR3tYogvYwrstyWtVr6Ht8R6Ah0BE4nBHhJ4yxQL6Q1Yfe0bnTrCGB3pckUAMeeiK0VpOcsQJbXs8lryennzmwEOok9s9v/lK49IxiPAbLZGtplFeNV2Iix/PznPrvyGb5lcnpcR6Aj0BE4kxBgZ4UPf2R8urVe3eO5XSsdmWz2RmWuJaufO3MR6CT2zG37U77mP/fRny1Pa+sxONpK8SR4vGU+bQ8dgY5AR+BMR4A95DH1yL/1vh4tLr5KxamQKQtHK6/nPzMR6CT2zGz3U77W3oZ1F++rJnnkn+3RVC7zbjfisT2acnrejkBHoCOw2REwtcrLWRwFecfgWOjs/QQOgx/rn7A+FnCe0TI6iT2jm//UqzzjZxmWPXueHf7VZ/7wEM8AL8Fdd915SKXm82QPObnkQH6ege4dWAJOj+oIdATOGAS8nMVZgMC20wN27dpVGLQrvHAocCJs1FObl22PJTE+YxqmV/QQBDqJPQSOfrCZEWA0LY/FWP7BjMDS+4O3jm/IxrhmjdjD8apaomvnrp2bGYauW0egI9AROK4I8L6as2oKQUtgFfpj77ulbLDpAAJHgX3xGw1etmXHj8XTs42W2dOdnghsOz2r1Wt1OiKQdQiRVAttt8GbsO7qLbOF6CbwIhyOV5VBtlxMDx2BjkBH4ExEgH01D1bgjc063I45BNhadlV8XvhiY//xtPThRjCrJ2STR3cj6XuajsBqCGw5ePDgwdVO9viOQEdggYBpDIx41kdcnOl7HYGOQEegI3AsEECMEWQfPtjo9IRjUW6XcWoi0KcTnJrt1rXuCHQEOgIdgY5AR6AjcEYj0KcTnNHN3yu/EQTiGRjTbnze10Zk9zQdgY5AR6AjMCLgaZepBj10BDaKQJ9OsFGkerqOQEegI9AR6Ah0BDoCHYFNg0CfTrBpmqIr0hHoCHQEOgIdgY5AR6AjsFEEOondKFI9XUegI9AR6Ah0BDoCHYGOwKZBoJPYTdMUXZGOQEegI9AR6Ah0BDoCHYGNItBJ7EaR6uk6Ah2BjkBHoCPQEegIdAQ2DQKdxG6apuiKdAQ6Ah2BjkBHoCPQEegIbBSBTmI3ilRP1xHoCHQEOgIdgY5AR6AjsGkQ6CR20zRFV6Qj0BHoCHQEOgIdgY5AR2CjCHQSu1GkerqOQEegI9AR6Ah0BDoCHYFNg0AnsZumKboiHYGOQEegI9AR6Ah0BDoCG0Wgk9iNItXTdQQ6Ah2BjkBHoCPQEegIbBoE/n8gY9IsF/RZ0QAAAABJRU5ErkJggg=="></p>
<p style="text-align: left;">It is known that oysters and gastropods have hard parts composed of calcium carbonate and that ocean acidification is increasing. Studies were carried out using juvenile oysters and gastropods to investigate the effects of acidification on the decrease in the population of oysters.</p>
<p style="text-align: left;">The first step was to raise oysters in two different mesocosms. One had seawater at a normal concentration of CO<sub>2</sub> and the other had sea water with a high concentration of CO<sub>2</sub>. Gastropods were raised in two further mesocosms with normal and high CO<sub>2</sub> concentrations respectively.</p>
</div>
<div class="specification">
<p>A juvenile gastropod will attack a juvenile oyster by using its tongue-like structure (radula) to drill a hole through the oyster shell. Once the hole has been drilled, the gastropod sucks out the soft flesh. Researchers investigated the shell thickness at the site of the drill hole in relation to the size of the oyster. The results are seen in this graph.</p>
<p><img 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QlO7NNXjh19TXJXLJcD1QdpCbb8X0b4A6BlOPzXkDMgARIggbAm8PJLL6nx19bWCqzEt3buHNbzibTBQwTnPZcn27ZuUZZgiGBa8CNtla09H1qGrb3+nD0JkAAJhJQANl+d//q8GkNTU5M8vSw3pONh51cJNDY2Ss6sHIEl+PXXj9sswWYRwhjfxuJiwZWJBNpCgJbhttBjXRIgARIggTYR2LB+vTRdbLK1cbi6Womb6OhoWx5vgksA4rKstFQ2biiW6JgYJYLNIoBBQo+veP0GiYqKkt7x8cK/l+D+jURabxTDkbainA8JkAAJhBGBI9WHnUa7+tlnZf6CBU75zAgsAS0yIYKbm5slY0KGzHzwwcB26kPrjz32uBw+eECNLyMzk0LYB4asYk8gqhl/8UwkEIYEfvj9m+XjTz8Jw5FzyCRAAiAAX+GZWTPkm2++sQPSvn17eevUu3Z5fAgcAYjgkuJiKS0ptYlgM4tM+DDDEkxrcOD+JqzWMi3DVltxzpcESIAETEKgqKDQSQhjaOfOnWOYtSCskRbBJRtLlLvBhImZkpaebnqR2bFjxyDQYRdWIkAxbKXV5lxJgARIwEQEbu/RXf7zhz90OSJa/Vxi8VsmNp7lPbdaieDMSRNNJYIRb/qPZz6RRx+d5bf5siESaIkAxXBLdPiOBEiABEggYAToFxwwtG4bhtDMz8uXxoYGMaMIxtjqa2tlbFKS2znwBQn4mwBDq/mbKNtzSWDtmiLpcVs3l+/mz50r8P/FB2VQlokESIAESMB/BCCC+/dLlJxHZsldd/WUnS/ulhnZ2SF3iYCrBjZMdr+tm21sB48clqXLlvpv8myJBFohQMtwK4D4uu0EIG7XFbkWuNlZWXL61Gk5+c7bEhMTI/V1dTJy2HDV6ZRpU9veOVsgARIgAQsTUJbg1flSX1cro8feJ+WVFWIWn9s33jghU++/X23aM5uV2sJ/MpacOsWwJZc9OJNuaGiQmVlZ0qVrV+ndJ16OHqmx6xjCd9+evQLRCyGMFBsXJ126dpGqzZtVvl0FPpAACZiSAE6Nq6islD/96c8izc3Sv3+ijBw1MuRWR1PCCtKgjCIYLgflm8wjgjWCG2+6SWbMzFan2dFHXFPhNRQE6CYRCuoW6RPuDwjYPisnx+sZw5+NiQRIwPwEdmzfIcOGDJX2Md+TKVOnSnJqqhw6fETS09J5MlgIlg8n+o0cPkK5HPTq/TPRLgdmsQYbkXTscJNMYJxgIxLeh4gAxXCIwFuh26TkcZJXUOB2qrACJ41Llr179gqsyEiwFsNtYvJUuki4BccXJGASAvD3fOqJJ6Ti11tk9qMPS6+ed8qgewbIhvXrpNPNP5ClS+j3GaylggjGF5CUpGS5vv31phHBiCXNRAJmJ8BDN8y+QhEyPvgGw00CvsGOqX9CPyWCdX58n3gprajQj7YrNtg5Jh664UiEzyQQPAL4Kf5wzWvy7KpnnDqtqz8ro4YNk5Nvv+X0jhn+IwARXFi4Rmqqq6VXfG/Jzs6Wnr16+a8DH1syumns+d3v5JZbfuxjS6xGAoEnQMtw4BmzBzcEYA3GZrm4uFh1khyErRbL6ampTrXw3vhxKsAMEiCBoBL47OxZ+eGPXIucuNiO0vDVV0Edj5U6gwhOTUlRluCmpotSWbVZ+W2HUgjjlwLEL9ZRK7SbBoWwlf4yw3Ou3EAXnusWEaOu2rRZTp86ZWcFxka6wUOGCvyNa47UCKzETCRAAuYk0KFjR9n7W9c/g8MyHHPDDeYceBiPCiI4Ly9PjtUclfiEBCWCQymAgRIiuKy0VIrXb1CHeIweM0bSMtJNE7UijJebQw8SAVqGgwSa3TgTaGy87CeM6BHGpJ8hlJlIgATMS2DgoEHy9ok3ZNv2XU6DfOKJJ2XsL3/plM8M3wicPXtW5syeoyzB58+dVyK4tKzUFC4RiASx7YVtkjEhQw5UH5K58+dRCPu2zKwVIgK0DIcIPLsViY2NUxiwaS6ma1cbkoaGRnWPkGxMJEAC5iUAEbTs6VyZ/ehsefutN2Xo0KHy2Z8+l19v3iTf/ON/ZfrKFX4fPEThmjVr5NjRY/LVl/8tffolyrjkX5pCFPp9siKC+RbkF8jWqiqJjeski5YskSWLF8mtnTsHojuf2zxw6KDPdVmRBEJNgJbhUK+AhftHJAkI3uW5ubYNdPAjXle0RrlH0EXCwn8cnHrYEIB1eOeLu+T6674rawry5eD+V2RccpJs37Hd73GGEc94xL3DVRi31QX5sn33bvnRLT+R6dOmy/79B8KGmScD1ZbgxD595djR1yR3xXI5UH1QvvrqS7nw9QXZvXOnJ82wDAmQgAcEGE3CA0gs0nYC7qJJQPxCDMN/WCccwuFJbGJEl2A0CU2NVxKIfAITMjKlx109Zcb0KXaTfemV/TLnkYcjInIFRHDec3mybesWZQmeMXOGOpRCTxhH1uO/mzf8y7/Iibfe1NkBvSIyRHlZufzfIUNl6tTJAe2LjZNAKAhQDIeCOvv0CwGKYb9gZCMRQgC7+HGAQaQmbNLq/tPb3H4Bvu++JHn4Vw+GrbsE5rf4qcWXRXCnTjIj214EY11hGUcEnqamJml3bTspq6gI2HwxHsQIzs/Ll/raWsEpdmlp403nnhGpf++cV3AJ0Gc4uLzZGwmQAAn4nQBE0uInnxK4LJjxpDF/TBhzvP3Ou9w21T46Wr3DiXg7d+6SwwcPyE9v7y733HO3pI5P9bvLhtuBePlCR2LYuKFYndgJdwhEY3CVSjeWKCGMd00Xm2Tlimfk1y9sdVXU5zyMp6S4WEo2lghOAh099j4przTfUc4+T5AVScAFAVqGXUBhVngQoGU4PNaJoww8gdmzHpUXtm6VjMwJMn/BgsB3GKIe8P/5/YcPC2IYO6aBAwfJrT+5Vf7whz/IlOlZcs+ARDn+xgn5dVWV/Pff/qp8mB3rhPLZKIKbm5tVJIaMVo4mvr3rT+XcuXN2w8Zxy/78AvTAAw+pLxKZkyZKWnq6ab9E2EHgAwm0kQDFcBsBsnroCFAMh449ezYXAS2Svv3tb8t7H35grsH5cTTz5s2Try/8j9OJd48tWCjHao7IV19+Ja8c2C8xMZetxLpruFAk9I2XGdnZOitkV215LS0pFU9FMAaL+MJpqanKImwc/JixY2XZ8qeNWW26h88yooTgw0QCViFANwmrrDTnSQIkEJEE4Nd54e8X1NzgS4rNTu5+Zg93ADk5OTIze6YMHPhzGTHqF2o6b715Uj756CP5WXxvubFjnJMQRqFJkyfL5srKkE5fi2C4H0RFRcmEiZleWV43rF/vJIQxoV07d8rcx+b7Tbz608ocUuDsnAS8IMDQal7AYlESIAESMBuBrVu22EQSxPCzz6w02xD9Nh5YK0tKS2TqlPulXVSz+gz5v4Nkx+6dKh7vj3/8I5d9RbdvrwSoy5dByMQXlMS+CQJrMNwPcDAFrNTeWF+PHqlxOdJ//OMfaqOby5cuMvHlqaJyk4s3zCIB6xKgZdi6a8+ZkwAJRACBI9WH7WbxxRdfqJ/UQ31Er92g/PzgyvLds2dPOVxdLYPuGeDUGw4Cad++vVN+oDMggnU0hgcf/pVXlmDHsZ3+w/uOWV49G8fy8yGDJTVlnFf1WZgEIpkAxXAkry7nRgIkENEEYOWDNdiY8FxUuCZgIbeMfZnpfviI4YIDKpKSfin/1flW29B+/977svTJhbI0d5ktL9A3RuEZymgM2jVj+/YdKjxaKMcSaOZsnwTaQoBiuC30WJcESIAEQkigqKDQSQxjOLCQYiOUlfw/MdcVq1ZJWkqKDBk2XP79P26U8+fPy9bNlTL2vvtU2LlAL5USwavzpb6uNuQhyXAi3yMPPWTzTx45apSl/h4CvdZsP7IIUAxH1npyNiRAAhYiAH/RDh06uJwx4vJaSQwDwshRI+WOO++QXTt3SVRUs0Rff51UVFYE/KAIowjG4RTlm0Ifl/fHt9ziUbg2l388zCQBixFgaDWLLXgkTZeh1SJpNTkXEgg/Agh3Vli4Rmqqq9UJbVkzsiz3BST8Vo0jJgFnArQMOzNhDgmQAAmQAAm4JWAUwb3ie0tLB1/AXQXlkTp37uxXKzWs/7d27ux2nHxBAiTgGQGGVvOME0uRAAmQAAlYnABEbXpauqQkJUtT00WprNosFZWVbq3By5YuU5v69v72JXn73dMyPiVV1cfGtrYkuGX0T0iUYUOGygcffNiWpliXBEhAROgmwT+DsCVAN4mwXToOnATCigBEcF5enhyrOSq9+/QRuEO0FrouPy9Pqg/XyIpnVtiOj25oaJQVz6yUuk8/kdKyUq8YQEAjeogO1QbfZLpleIWQhUnALQG6SbhFwxckQAIkQAJWJgA3hMWLFysRHJ+QoCzBrYlgzWvjhmIpWLvOJoSRj2OiH3n4V3J3YqJ46uIAEVxWWirF6zeoyBD3DBwk5ZWh36Cn58krCUQCAYrhSFhFzoEESIAESMBvBODnW5BfIFurqsRbEYxBoL5ERUmvnnc6jQmCuE9if3nPQ3/fZhHZ9sI2RoZwIskMEvAfAYph/7FkSyRAAiRAAmFMwCiCY+M6yZp1a32KT4xjlhu+/NItiXPnznl8FHNMdLQcOHTQbVvevIA1Gj7On3/+F2m+dEnuvPMOSR2f6vFYvOmLZUkgnAhwA104rRbHSgIkQAIk4HcCEME5s3LUZrdjR1+T3BXL5UD1QZ+EMAYHMdzp5pulpKzSaaw4Ee/QKy8HPQoEDuHAhrsbO8TJ5ClTJDk1VT78+I9+2dDnNElmkECYEeAGujBbMA73KgFuoLvKgnckQALeE4AIznsuT7Zt3SKxnTrJjOwZMnrMGO8bclEDm+6ypk2XGQ89LBlpKarEseNvyIL582XkyBEyPWu6ykNkiF27dssvxoyVEcPvddFS27Pgd9w/oZ/MffwJGT1quF2Djy1YKM2XmmTRoqfs8vlAAlYiQDFspdWOsLlSDEfYgnI6JBAkAhCH+avzpHj9er+LYOMUIIjn5MyRutpPVXbMDTfIAw89JGnpaaJOrcvLl/raWnVgR1ra+IBZixGF4vn1xbJlS5VxeOq+rv6sDOjbVz7+9BOnd8wgAasQoM+wVVaa8yQBEiABixPQkRkQ6SE6Jka5Q/jLEuwKLSJP7D90wPYK/ZcUF0v327pJY0ODjB57X1AiQ8BXuPsdzpv5MLC42I628fGGBKxKgGLYqivPeZMACZCARQgYRXBzc3PIIjPgwI7aTz6RzEkTJS09PWgb13BKHSzDrhIsw0wkYHUCdJOw+l9AGM+fbhJhvHgcOgkEgYC2xJaWlEooRbCeKnyUsbkOn2Cnu/vfLdNnPuDkM/zgQw/Ldd/9joqnHOwxsT8SMAsBWobNshIcBwmQAAmQgF8IaBFcsrFEHVQxYWJmUC2x7ibRsWPoXBLyC/IkdVyKvP3Wm9I3IUHOnTsvv968Sb75x/96fRqeu/kxnwTClQAtw+G6chy30DLMPwISIAFHAtiYtvipRSERwdio9vf/+V8ZPnyY47BM8QzL9K6du+T48ePKZ/ruAQNk5KiRphgbB0ECoSRAMRxK+uy7TQQohtuEj5VJIKIIGKMzPPjwr4JqCVZ9r86X+rpa+fmQwVJQWBhRbDkZEoh0AnSTiPQV5vxIgARIIIIJGEVwsKIzACdcMdB3WWmZLTxa+aYKCaUrRAQvM6dGAgElQDEcULxsnARIgARIIBAEjNbYYIpgzAWnuT3y0EPKFQOh2dIy0imCA7HIbJMEgkSAYjhIoNkNCZAACZBA2wkYRfDYpCQJhTX2+vbtQxaere0E2QIJkIAjAfoMOxLhc0AIrF1TJOuKiuTkO287tV+1abOsLSqS+ro69W7w0CGSV1DgVM4xgz7DjkT4TAKRSwCnuRUWrpGa6mp1YlvWjCxaYyN3uTkzEggqgWuC2hs7syQBLYRdTR7vIITzCvLVcaA7du+S06dOS3pqqqvizCMBEvAzAUQYMGz7fOsAACAASURBVHOCCMZhFSlJydLUdFF2790jS5ctDbgQxqltTCRAAtYgQDFsjXUOySwbGhqUqG1sbJDefeKdxoD3sBYnJSdLl65d1Xtc8VxzpMZmKXaqyAwSIAG/EVi2eImYURA7iuDKqs1SUVkpOE0tkAluGCOHj5BhQ4bKZ5/9KZBdsW0SIAGTEKAYNslCROIw5s+dq2JZzsrJcTm9fXv2CgTxkKFD7N5PmTZVWYlj4+Ls8vlAAiTgXwKIiPDbffvkyYUL/dtwG1qDCE5NSVGW4OZLl0SL4J69erWh1darQgT375coOY/MUoIbFugOHW5qvSJLkAAJhD0BbqAL+yU07wSSksdJvAuLsB4xhHBMTIzU1dULhDOswUhJ45Jl0ZIluhivJEACASKAQyLatWsnhw9Vq1BhoTgmWE8NbgmLFy+WYzVHJT4hQYngQAtg40l1jQ0NEuyoFHruvJIACYSWAC3DoeUf0b23JIQx8fr6yxvmZmZlCYTzx59+ojbYufMZxoY54yei4XFyJBAEAqUbS6SpqUm++eYb2VRREYQenbuAi8ac2XOUW0K7dtcqEVxaViqBFsIYSeO584IjmzMnTZQ3331HcpfnBtwX2ZmAuXLwBYGJBKxGgGLYaituovnCMozP5KlTBREkkGAp1j7D2lKshwyxbPzofF5JgAS8JwAR+t7vf2+riM2swUxaBCf26SvHjr4muSuWS7BEsJ5nxw43yZvvvC0zsrMllFZxPR4zXJPGjjXDMDgGEggqAYrhoOJmZ0YCcVd8gh0tyF26dlHFTp86ZSzOexJolcDG4mKBz6mZE8Znhg1rL+7aZYfpwt8vCNwmAp0w95xZOWIUwQeqDwoOr2AKLQGs/4cffBiUv4PQzpS9k4A9AYphex58CiKB6OgY1VtDg+uf5WAlZiIBbwg8v3adrFzxjDdVglZ22dJlys1nxTOrZMSw4XJ3/wEhFe6V5fZuEU0Xm2T5styA8TCK4NdfP64swYEWwRB3CMu2f//BgM0rkhouKihU0zHr/4ciiTXnYi4CFMPmWg9LjUZbhI/WHLGbN3yGkfR7u5d8IAE3BLAB6//97W9y8sQJU1hejcOcN2+evPnW27L/8GHZuvXXcvKtN2X8hIkqYkIoLNkQpl988YVxiOq+tq7W7+zgg7pk0WJlCbaJ4EOBtQSryBAJiTJt8hS5/vrr5Mb/+D9Oc21LRiT61WJO77zzjsJy5swf/f530BberEsCgSZAMRxowmzfLQEVU3hcsuAEOn36HHyIqzZvVhElGFrNLTq+cEFAbwbDq/znVrsoEZosiPTf7d0nzz+/TuJiO9oGkZGWIvOfXCRFRetsecG6AR9snHNMsA77K8waxFV+Xp70T+gnL2zdetkSHEARjP5WP/usLTxar94/k4NHDktBYaHfYxNHol/t7p07pd217dSfBP4OEH+aiQSsQoCh1ayy0iadJ0KoxcbGychhw9VmOgwTcYkRa5iJBLwh8Lvf/tZWfNfOnTL3sfmm2BSFn+rHJKdITEy0bXz6ZtSIYbJowXz9GLTrnT3vkpvcxNBtH+08Tm8GBlFaVloqGzcUS3Nzs2RMyJCMzMyArwVcTxAebcLETBk5alTAokIY/WoHDhrkDRpTl1VfJi9e/YL06iuvhDzcnqmBcXARRYBiOKKW07yTySsocDs4CF+KX7d4+MIDAnA1wAYwnZouNQksXSnjx+ssl1fUC0YIL5edq+gpbROe7tptLT8Qm9UggkuKi1WosqioKEnPSA+KCNZzXZa7TFmAAx0VwuhXGyliGG4zZ86c0SjV9VLzJRVub+r06Xb5fCCBSCRAN4lIXFXOiQQsRmDD+vWCn3Z1wv2qlav0o9vrpMyJAfeNhGB69eWXxNVG0W3bd8lPb+/udnzh8EK7JyT2TZDSklIVs/dA9SGZ+eCDAbcGG/ngS02ghTDmGol+tY6RRcAV/x/ChlQmErACAYphK6wy50gCEU7gSPVhpxmeO9fYYrQGbLL6+4ULyprpVNmPGbd27iwdbrpRVjyz0k4QHzv+hix9cqHMyJ7hx96C2xQYOorgQMXshRV//4HQRoWIVL/astIyl3842MMBtxAmEoh0AnSTiPQV5vxIIMIJ4B/rixcvOs0Sli2EiPr1C1ud3iFj05XQYpsqKmX+ggUuy/grc3XeasmekS0DEhOlW4875Fxjo/zxww/lsccXyIAB/f3VTdDagQjOz8uX+tpayZw0SWbMDNyhFaqv1flSX1crY5OSZED/xKDN07GjSPWrTUpOcpyq7TnQ1nZbR7whgRASoBgOIXx2TQIk0HYC+McaG6ZcpWgXm9ZQzvhzN/yLK8vLW/UvdtW+p3kYI05Xg2/mZ2fPqmqwGIeb0DCK4NFj75PyyoqAbFTD+uBLjhbcEMGFRf6PCuHp+qFcJPvVwqWFiQSsTCCqGdt9mUggDAn88Ps3q+OZw3DoHHKICUD8PvXEkzaL8o033iiHXzsa4lGZt3ujdRYiOPuB7ICIYBDAKYJ5z60WbMK7Z+CggPblDfGiwkJZ8fRypyo4HOjkO2875TODBEggfAjQMhw+a8WRkoClCGjrICypCPeFjWgdO16N09sWGEWFa2xCGO188dcvlH9xKCNLtGU+gaoL6+ySRUtsLgrlmwJjCTaOv9P3f6A24aWlp5vKct6aX22kRJYwrgXvScAqBCiGrbLSnCcJhBEBHFSROi5F/vPHt0hCYn8582mdOsFsxapVMnLUyDbNBD93f/7553ZtwL8YApli+DIWbFYrLFwjNdXVyk83GCJYL8iAAYmCj9kS/WrNtiIcDwn4jwDFsP9YsiUSsDwBiFj4wrYlwSIMITz38Sdk9KjhtqaSkn4p6Skpct1131VWYtsLL29chZFCE4erq5VfqL+sz14OyxTFjSK4V3xv2b13T5vX09XE8IUk3DjTr9bVSjKPBCKDAEOrRcY6chYkEHICEDi/HDtWbU5ry2B2bN8h3e64004Io73/6nyrzFmwUF7cs68tzavjv9018JsXXnD3KqLzIYLTUsdLSlKyNDVdlMqqzVJRWel3IQzf4/S0dGXl/+yzP0U0U06OBEggfAjQMhw+a8WRkoCpCcDieuHrCx6d/NbSRL6+cEFu797DZZE77+guS5543OU7TzMPHnGOSexp3UgrBxGcl5cnx2qOSnxCghLBgXAVMUahQGQIiO0Obo6DjjTGnA8JkID5CVAMm3+NOEISCAsClVfi9uLkt9aOQW5pQohvc/78eZdFzp07J51+8AOX75jpOQFY8Wfn5ARUBMPdBcczb9++Q8UjDmQoNs9nHpqS2Hz33KpV0vDVV2oAXbt1k9mzc+ijHprlYK8k4ESAbhJOSJhBAiTgLQGIK0RkQGrt5LfW2u7RvZvb44uff3693PLjH7fWBN+7IYB1mjN7jnJTaNfuWmWhRfzjQFiDz372uZRsLJHRY0YLrPG5y3OD5icM33WzpGVLl0lFRaUUrF2nQkF+/OknMuIXY5RLCizzTCRAAqEnwDjDoV8DjsBHAowz7CO4AFSbPetReWHr1ZPeetxxh9uT3zzpft68efLRR3+UXz38sPTqeafU1Z+VlStXSe0nZ9ThFeF2WIUncw5kGYjggvwC2VpVJbFxnWTGzBkyesyYQHYZ0rYH9EuUpbnLAiLyvZkYuCf26Sv7Dx+WuFj7sIAlZZWy8zcvyPYd271pkmVJgAQCQICW4QBAZZMkYDUCiEdrTCdPnFCRGYx53twvXrxYEvslyLzZOYIvPaOGDZPrr/suhbA3EK+cmpYzK0cJsmNHX5PcFcvlQPXBiBbCsArX1daqUHle4vJ7cVh+7x31CychjI4y0lLk1Ns8rMPv0NkgCfhAgGLYB2isQgIkcJUAxMeFCxeuZly5y39utVOeNxnTs6bLqwf2q5+WT779lixa9JTfD2HAxq5ITLBIahH8+uvHAyKCIfQQGeL1N06YCmHpxhI1Hh0qL5SDg990+/btQzkE9k0CJOABAYphDyCxCAmQgHsCz69dJ998841TgZ07drQ5zJpTo37MgFDJeWRWmyzYfhyOX5rCnPLz8pQl2CaCD/nXEowvEP0TEm1h2Npf912/jN1fjRh/pcAGvlCmXr16ybHXXpOGhkanYRw7/oZ0upmbQZ3AMIMEQkDAYzG8dk2R9E/op36yxM+W+MyfO1fq6+pswz596pTKR9m2JrSBPtAmUnZWlvS4rVuLzWI8xr49qePYT4sdiKjxYFzGflqrw/ckEMkEXvrd7+S7131XWW3hy6s/EMhGYWI2BnpsyxYvMdvQvB6PFsH4b3Tx+g2XLcF+FMFof2NxsfTvl6i+QPTq/TO1KS4QsYi9nryhAn6lOP/11UgkmyoqDW+Df4sDaDrcdKOseGalnSCGD/yC+fMlPSM9+INijyRAAk4EPAqtlp6aKnV19fJoTo4MHjpENQIRDPE5cthw2bF7l8TGxTk1HswMiOaqTZtlVk6OV91OmTZV8GEiARLwjcCGko1uK3boaL9pyG3BELzQP6e/+soryoIdjpvyIFLLSktl44ZiaW5ulowJGZKRmel3d5LEvgkSFRWlfI3TMtKDFhXC2z+LVStXCo7W1qnpUpNUlpe3KdSfbsvX6+q81TIze6aMGTNGev2styA84IvbfyOTpkyRtPQ0X5tlPRIgAT8SaFUM1xypEXwWLVliE8LoH+IXwhNieG1RkXrvx3GxKRIggTAhEIiwXIGeOnxq3/v971U3l5ovyaaKCpk6fXqgu/Vb+xDBcAFA6DKIVFgYAyGC9YBzlz+tIjOY/QvDkWr7A1UgjIsK1/gkhsEYlua2/n2DWUlpiWrr2LFj6ovKIw8/ZNovFHrNeSUBKxFo1U2isaFB8Wi4cjXC6dK1q9rcAqFsTPX1dQJrsnanwL3RnQJl4WZgdLuAS4OrPozturvft2evEuV4vzw318mdQrtCYDxwtTC6OOh32h0DbaA9x/G3NDb0qV0nUA73yIPlXDPAlwa0a0xggnnrMuAB67YxOXJybMexDbSFfplIgATcE8BpeTpBMMHvORwSBNrqZ58VWGpLS0olc9JEOVB9SGY++KDfrcFGHgMHDQpo+8a+fL2H2wus444J8a99iee7e+dOWbigbacdGscCl4kJmZnKut7RxL+YGMfMexKwCoFWxXDvPvHKCqzFnaNYcwUKZQYPGaqEMv5DDReL7KwZtqIQeGgvKTnZVqa+rl7SU8fbynhzA9cNuGogwVp98p2r4WogTo/WHFF5CHaeNC5Z9e0oTHV/sIJDoCKhvB6/u7FhHpgP+jW6WyAvJiZGtYHxxMREK5GqRTWuaanjBfNGH2psycmqjGaMMaL9KVOnqvcoExsXq8anv1yAK9rAO3zAAfUoiPWK8koCzgT0aXn6DfxMtQ+xzjPbFRvXRgwbbieCZ2Rn+0WkQiyeOHHSbFP2ajxbt2yRa665RvHQfuvakl1eWuZVWygMi/JHH34YURssvYbACiRgEQKtimEIuryCfInvE6+sltraCQslhJoWd0ZeEJz4IMGdAnVheUVZiDjUg4DV4hFlFi1ZrMpARPo7wXKNeSBBgCOdPn15Y556MPzPuqI16klbuzE21MH4IZSNCWN1JYRRRruR4B5948sB5n/0ShtgABaYN8oigQe4wO0ESY8R/HTKKyhQohd10B7G1aVrF/1aYK2H+Nbjt73gDQmQgCIAF4kvvrh8Wp5GAuvwyhXP6EdTXVX0hisb1wYOHKi+PPtLBKPtkcNHqMgQ27f/xlTz9nYwD/3qV1JcWiJr1q21+5RVVEhW9lVjjCft4m/kr3/9qyr65MKFnlRhGRIggTAm0KrPMOYGgVVaUaHE17qiInWF9RJCDNfSinJVRnOIjbXfTKeFKN5rQRkf30cXV1f0gXKw4mqRbFfAxwe0qcUmmoi+IordNXf61GlV3lgH49FjwpyR9u3dq+YPoarfGds0ClTkGxngGRzQB+ZtTF26dFWWXbzvHd9Hie29e/ZKY2ODEuXGcaFN9A9LMHjW1dW5HIuxfd6TgNUJIP5xU9PVTVaax5kzf1RWQLP8hA2hmp+XL/W1tTJ67H1SXlnhNz9TY9tjk5Jkztw5bfaN1RxDdYUbgr/SC1u2yMWLF1Vzhw9Vh+0GS3/xYDskEOkEWrUMGwFAfMEdAFZH/CSPe1gn58+dZyzW4j3KI2kLs/aXxRXvXMVjbLFBP7683H+Dk3B11QVEMYQoRKs7lwtX9XQefLFhGTbOH/ewGCPhPdqHJRg+2LBAax9rXQbl8CUFVnhYk5GPNuDv7MuY9Nh4JYFIJrD/1VddTg/W4dWrnnX5LpiZyhKccDmE2V139VQhzHKX5/pFCCM8WvfbuqnwaLrtpcuWhr0Q9vf6GN0qECIQGyyZSIAEIpdAq5ZhCCtYS41+uBoHLKKw5EIQapGr37m7agspRJ4O0+aubLDzMTZ8PJkL5o4vAxCoT19x+/BmvLBQw8qrfZ3d1QUjfPAFBAIcole7kqB/JFxnXYkoh3dVmzerLxvw99a83bUfrHyMC78quPo7Mo4B7jdIrXEx1uE9CXhD4PU3Q+sbi5/gXVmf4bO8ZNESqa+rFVhryzf5zxKs+Xzrn/5ZbbpLS0/3i6+xbjeSripW8fmrsYoxN/z3K5yijUTSenAuJBAMAq1ahvFTPcShO0sjNsdpFwdPBgxrJ5L2h9V10AciPRitnvpdMK9wb4DFFh+d4AoCi6sWociPjr7sg4zYyyjr7bjBAfUchTfaAQfHfPQJzvgSAYELlwhXCSIdPs6ob5yDq7LBytNCuLX+UE67obRWlu+tRwCRFGA1RTQFs292a2l1fjlmrN1rfazxtMlTRB9mAWutK8FsV9GHh9SUZPGXv7EP3YdFFcSfdnSjufD3C2H9NxcW4DlIEgghgVbFMMQVhBvcGoxiEGILURcguLSF0pN5wBqqfta/svkMddDWzKws5c87eapvB2BoCyh8a9siAidPnaamoaMxYGywtOpxO85RW269FXKIEIGEeevxQnSjHTDAfLQwNn4RwXuMCT7CuEI4w3qvE9qCPzOEs6M/si4TrCvGh7FhTWClbinh1wXMV69jS2X5znoEdmzfoY4APlzzmlzz7X+W59cXy93971axW8OJBkT8X/78Z3UQhBbBKUnJ0tR0UXbv3SP+EMGwPDP5TgD//XRMcKFZvuyyC5vjOz6TAAmEP4FWxTCmCL9UCDSIQu3jChGGhJ+ztbXXUxz4yR8CWren2yqrKPdZDGmxCrEI1wUIMV8S5gLrKxLmirEhLFpLY8N8IOK88Z3WLhJwlzD6AoMLvoAg4R7cjf7VYIb+8IUCfWLzoh4rxou2EH5N56uXIfofjBvza+3LEtYKZTEncGEiASMBiMannnxSCtaulWdXPSMzpk+RLVuqZPrMByR1XIra3GQsb+b7ooJCNbzFTy1SERwggiurNos/jjWG0E5PS5fhQ+81MwJTjw1/a19//bXLMZ45c4Zh1lySYSYJhD+BqGZXUcrDf16cgQkIwNqrvyjhVwSElXPlMwwhDL90fLHyxmcY4h8bOZkim8ADDzwkP7rlJ0oEO870sQUL5ZYf/0hSU1McX5nuef+r+2XyxIm2cc1b8Jg6hMGW4eONigyxOl/5Gv98yGBJS0tzuyEOVuPKyk3yhz98INLcLHffc7cMHz6M/sM+smc1EiCByCDgkWU4MqbKWQSbgBbCLfUL1xB8WrMet9QG30U2gXPnzskdPbq7nGS327vL8ePHXb4zSyYEaGpKihLCODpZp+qDh/St11f4TyMyRP8r8Ye1r3FBYaFbIYyNYSPuHS7nv76gDvJJTk2VAwcPKWsy2mMiARIgAasSaDWahFXBcN6BJwD/ZvgJQwh7IpxhCWayHoGWfryCUDarnzlEcEF+gWytqpIuP/2p3HjjjfL555/bFvBwdbXPcY1PnHhT8lfnqaN90zLSPdpsNyMrW+Y+vlBGj7ocsQUDGXTPAIF1fd68+ZKXt9o2Nt6QAAmQgJUI0DJspdU22VzhHoHoHdpHurXh6SOn9bW18nwfGQTuvKOHVFVVOU0GMck3lZfJ7d1uc3oXygyI4Dmz50hin75y7OhrkrtiueQXFtgJYT2+kuJifevVdcCARHUS3dz58zwSwvCF/d6//qudENYdPvLwr2Tf7t36kVcSIAESsBwBimHLLbk5JowQavApxgcWX/1BPj54NkbRMMeoOYpQEEgdnyq1n5xRFsy6+suREnC9//7JctNNNyrraCjG5dgnRHDOrBw7EXyg+qAa34u7djkWV8+bKipd5nuSGR0d7UkxWxl3p29ig/DNP/yRQDAzkQAJkIAVCdBNwoqrboI5I+ybq81v3mygM8E0OIQgEIDoKy0rlaefXi4D+vZVPcbccIOM/eUvZXrW9CCMoOUuIILznsuTbVu3SGynTsoSPHrMGLtKZaVlds/64R//+IeKnexYHsK0vLxCZs+dKx073KSLt+laV1vrsj4s7J98/JFbX2OXlZhJAiRAAhFEgGI4ghaTUyGBSCUAQbxo0VPqY5Y5YtNZWWmpPPvMSrciWI911XPuj3k2WngRGaK8rFxOv/uu9IrvLecavhLxgxju2auXXLp4UUrKKiUjzT7yxopnVkqSIVa5HjOvJEACJGAVAhTDVllpzpMELEBA/9R/a+fOAQsXpkXwxg3Fgs19noRIgxh1l9CeCo+Wly/1tZePYsbhG5iDP1N+QZ6Ky/zHjz+SvgkJqulfV1XJf//tr8ry7s++2BYJkAAJhBMBv/kM47ALbIjyNuHABfiHIqpASwlxavXhHNqnFH0i4Yo2kO8uoS7aaGty7Lut7WH+GJuvh4S0tf9g1cdBJq5iDDv2j1jD+DCRgDcEcEJdj263y/zHFsi69cXS/ae3ybx58/x6IAdEa35enjrYpnj9BknPSJeDh6vbFCsYbSb2TZAlixbLXXf1lINHDqtT6PwthMESbe58cbdc98/fkcqyUvXp17ePEsJG67Q33FmWBEiABCKBgN8sw+uKilo9crctwPSpcG1pw4x1sUkMERXMGh7KjMw4JhIwEsDJa4vUCXXrpFfPO9Ur+MFOun+yX0KGQbAi6kPJxhJBnGCI4IzMTL9YniFCFyxcKAPuHuBTe/BX/uzK8cstWZ81r44dO8rsObP1I68kQAIkQAIi4jcxTJq+ETh9+pT0ju/jW2XWIgESkMLCNTJnwUKbEAYSREhY//w6uTsxUXDYhC+WVkcRnDlpoqSlp/skWltappGjRrb02uU7jC17Rrb6NaxbjzuksaFBznz0oTz2+OPiS3suO2EmCZAACViEgEduErBepqem2sJfwSVBu0RoNwdcUa41dwWcNga3AJTDFc/GBHcJ5KN9lMEH7RrdJIzlvbnHPxhoR7eLyAVo25gwHuTrMpi3Yxljedzj8Ahju/0T+jnNy7GOfkbbQ4YO0Y8+XbWbCK7oW48dz3DrMK5da+4oPg2AlUgghAROvf22y/i5EMSDhw0XWI69TfDhHTFsuJSWlApE8IHqQzIjO9snIQw/5g8++NDbIbRYPi01TeK+f7PsP3hQNqxfJ1u3/loK1q5TFnLtN91iA3xJAiRAAiRgI9CqGIaYgtDTobAQDgsuCxBxEFb4eR95uA4eOkTdo6yrBHEGkTt56lRVDr6h+/bai1HUg7CGwNR9oV1/JMS01eO9POZoNR7trwshjPHBbQHv8UHC/FHXVULdtNTxUl9Xr/7BRJ2k5GTVjqPQd6yPNhH7MzYuzvGV7RniFmLWmFzl4T1YllWUq3EnjUtW65OeOl6SksepPJz0hjVobVzGvnhPAlYiABGsjziGD29bRDDaSk9Ll5SkZNm5c6ffMELcf/33v8tTTy5UFnDdMFxEYCFftqzl/Re6PK8kQAIkQAKXCbQqhqs2b1ZiDUJKJ4hTCDh3AlGXc7yiLRy7q08cQxtTpk51LKaeBw8ZevnqJyGMxtDfoiVLbP2hD4jZo1eE7tqiIiX6jWVKKypUPXcWVeRDuC9asliVQ+OYHxihvZbS0ZojbbYKG9uHCNfCWvPDFw/9ZQLjwpcBuGYwkUCkEOjarZts2+686RJ+w/t275KBgwa1OlUlghMSJeeRWbaNbLnLc32yBBsF9fXXXyeVVZvl0UdntToGTwt89NHHMmLUL1wWv2dAosBSzkQCJEACJOA5gVZ9hrUwhDWxvr5OtQwRDIuxOwuwq+5RHqIRgs2YINRi5sYYs9Q9rLP+To5tQhjqZBufQfTrdxDwav51l+ev83EFCwhQRxZdunRV1nO8R31Xae+evXbi3FUZb/KM88NPxO6StoS7e898EggnAtOnT5M5ObOlw0032vyGcULdIw8/Ir16927RXxjCNX91vtTXXQ5pVr6pwqPjjV3x2VhcLDhcA+HRRo+9T8orfW/LVfvGvPPnzxsfeU8CJEACJNAGAq2KYQjYy24AdUrUQfRB0Fa1oVMzVoWbg7ukRbMrEQk/ZOTDT9dVwntXCVzxzp1QdlWHeSRAAs4EYPltd+23JGvKZPnev/6bxHWKk0Ovvir3T5sm06a5/uUJfrWzH53tFxGsR/Stf/pnGT1mtIwcNcpnQa3baunao0d3mf/Y4zJtyv12bhKoU165WYaO8H5DXkv98R0JkAAJRDqBVsUwfGgh2hAjVotCQIELgPE53EHFxsW6nYIWwbAAQ8Qak/b59TY2LqzC2n3B2B7vSYAEvCcwYEB/Ofn2W6I3j61atdKliwPeI/pETXW1jE1KkrZYgh1HmZpi/6uX43t/PSOE2k03/ocKHffMMyskLrajahqnyz379DLZvXePv7piOyRAAiRgCQKt+gyfPnVauQEYhS/EoTuLpztqsChDTDpumIMbgRab7uoGI9/d+NC3doUwMtBjgmUXAtlxDvAlbukwDfgLw5XCkwTfRyYSIIHWCUAo4uN4iAREsN7M1tR0mE+UEgAAIABJREFUUfnx4pQ3xN31JiGkmRlSXn6e3NGjuwzo21cmTpwkPW7vLuUbN6h5+RJGzgxz4hhIgARIIFQEWhXDvfvEK/9gHV4Mwm9mVpYSf0YBCAupdjUw5hsnhs1y8M1FRAMktOVuY5qxXrDu9fhgDdcJkRwwTu07rfP1VW8ABBOUQ4J/MeaIzWuuBDT44EuGp5ZhMMMH9RDZAl9EIJAh0vW66PHwSgIkcJUARHBqSoqK6KBFcEVlpRLMV0u1fqfFNMKtmSFB7OfkPCpvvvuOTL5/klRUVsirB/Z7PS8zzIVjIAESIIFQE2hVDEMEwvqp4+giBq/yGx6XfEWUXfaJ1UISvrM6OoPj5BDuC+0hqgTKIUTY4CFDXApGx7rBeNbjg1DVsXrRL0LJufPthbUbLhL4MqBj/ELgI/qGjprhOHYIWGx2cyWUHcviGeXAHWHSwBkiG+IY/eDLChMJkIA9AaMIbtfuWmUx9UUE6ygTCI8GMb0sd5l9RyF+giiGJZzW4BAvBLsnARIIawJRzc3NzWE9gwgfPAQ2YgdDdDPZE8AXFh0L2v4Nn6xKAMcTL12yRH63d5/EJyQIIk1ALHqT4AoBEawjQ8C3OGtGltcuFd70ybIkQAIkQAKhI9DqBrrQDY09wy0Crhe4ut/eR04kQAIQwQX5BbK1qkq6/PSnyhLsrQjWFA8cPCT5q/PknoGDAhoeTffHKwmQAAmQQGgJUAyHln+LvWt3E26gaxETX1qYgFEEx8Z1ktwVy2X0mDFtIjJi+DDpn9jPaRNemxplZRIgARIgAdMSoBg27dLgxLzL9uC4FsK+mXj4HBoJtErg/ffe88nfFSI477k82bZ1i/hLBBsH6xiNwviO9yRAAiRAApFFgD7DkbWelpoNfYbDY7nhg/vySy/JX774m/zzd76tjkdGSDPk9/nZz+Td3//e44nYieBOnWRG9gyvLcHYXFdWViZLli2TmGj3JzV6PCgWJAESIAESCGsCrUaTCOvZcfAkQAIhJQDLLzaB7v3tS3JJouTMp3WS2Kev7Ni+QwnkC19fkMry8lbHCOGcn5cnI+4dJq+/fly5Qxw4dNArIYxNcTrW8LnGc3LOJDGDW508C5AACZAACQSUAC3DAcXLxgNJgJbhQNJte9sQsBDCcx9/QkaPuhqf9/fvvS/pKSnSvn17tUH0xhtvlMOvHXXZIdooKy2VjRuKBYFvsh+YKRMyM12WdZcJEZyfly/1tbXq1LmRI0d4HWHCXdvMJwESIAESCH8C9BkO/zXkDEjAlARg/R0yfISdEMZA/6vzrTJt5oOy9InH1bi/+OsX6hhlY/QHRxGcMSFDMjIzvdrUBpeK4UPvVfHQR4+9j5EhTPlXwkGRAAmQQOgJUAyHfg04AhKISAJfX7gg//4fN7qc25dffmnLb7rYJEWFa5S1FiK4pLhYSjaWSFRUlKRnpHstgnXD8EtesHChDLh7gFciWtfnlQRIgARIwBoEKIatsc6cJQkEnQCO8zl//rzLfnf+5gW7/MPV1bLoySflN9t+o0Rw5qSJkpae3mYRO3LUSLt++EACJEACJEACjgS4gc6RCJ9JgAT8QqBH926yrWqzOMbJrqs/K3/+7DOnPiorKgUi+ED1IZmRne2REEZkiM/+9CentphBAiRAAiRAAp4SoBj2lBTLkQAJeEUAPsCDBv9c7r9/shw7/oaqCyE8aeIktRnOqbHmZo+twQjVpiND7Nq5y6kpZpBAoAjgmO4JGZmSmTlJHnjgIeXvHqi+2C4JkEBwCDCaRHA4s5cAEGA0iQBADUCTCIm2/TfbpfaTTyTmhhvk6/PnpampSQnia6+9Vr7zne/INddco+IOt3aCnIoMsTpf6utqpVd8b8nOzmZkiACsGZt0TWDUyFHyrW//k0yaPFmi27eXz/70uSx9cqHMfPBBSUtPc12JuSRAAqYnQDFs+iXiAN0RoBh2R8ac+UYhmzhggMCf99/+7d/sBtuhY0fBxjfHtLG4WGCR0+HRsmZkuSznWI/PJOAvAoUFhXLwULVs2VJl1yRCBaalpMjO3bv4N2lHhg8kED4EuIEufNaKIyWBsCQAv97Zj85W1tyxSUlSvqnCa9Hwt//3pQwcOFDSMtK9rhuW0Dho0xF45ZVXZWpWltO4ECpwbHKKwF1netZ0p/fMIAESMD8BimHzrxFHSAJhSQAiuLBwjdRUV6vDLnwRwXris2Y9rG95JYGQEHj3rTel5513uOz7+uuvl6ioZpfvmEkCJGB+AtxAZ/41iogRrl1TJD1u6+Y0l9OnTkl6aqrA5UF/lufmOpVjRvgQgAjWm9uami5KZdVmWbpsKS264bOEHKkLAn37D5Djb5xw8UbkL3/+XJovXXL5jpkkQALmJ0AxbP41CvsRQgivKypymkd9XZ2kp45X+SffeVs+/vQTySsokKpNm5VAdqrADFMTgAhOTUmRlKRk0SK4orKy1Q1uqJeWOl7t0Df1BDk4SxMYMXyYrMjNdQoVCJ/hzWWlMnzE1SPHLQ2KkyeBMCRAMRyGixYuQ25oaFCitrGxQXr3iXcadtVmxKBtkEVLlkhMTIx6P3joEJk8darUHKkRWI2ZzE/AKILbtbtWWYI9EcHYUDdy+Aglni81X5KpUyebf7IcoWUJYMPnnXfdIWPGjJWSskp56ZX98tiChTJiyBBZsWoVf/mw7F8GJx4JBCiGI2EVTTqH+XPnSnRMjMzKyXE5QuTDGhwbF+fyfX1dvct8ZpqDwNmzZyVr+nQlZrUILi0rbdESjOOWIYL790uUnEdmya2dO8vuvXvEE/FsjllzFFYmsHjxYln01BPy8Yd/kMqyUrnun78jB48cVpFRrMyFcyeBcCfADXThvoImHn9S8jiJd2ERbm3I9fV1qkiXrl1aK8r3ISAAEVyQXyBbq6okNq6TsgTjgA1P0q7de2ThvLkyeux9Ul7pfVQJT/pgGRIIJAH8rXv69x7IcbBtEiAB/xGgGPYfS7bkQMAnIVxXJ/v27BW4SzhajLHBjil0BBxFcGsHZLga6Yjh98rwYUM9OmrZVX3mkQAJkAAJkIC/CVAM+5so2/OZAPyHs7NmKBEMP2LHBJcKY6I4NtII3D1EcN5zebJt6xZlCfZFBOvRtW/fXt/ySgIkQAIkQAKmIECfYVMsAwcBAjOzstSGuryCfNuGOpIJHQGI4JxZOZLYp6+8/vpxgQg+UH1QRo8Z43ZQ2EwHP2ImEiABEiABEggXArQMh8tKRfA4EWINm+3q6uqlrKLcyT0igqduyqlhk1tZaals3FCsNkB6Ygl++aWXpKKiUh2wEZ+QIBDSro5VNuWEOSgSIAESIAFLE6AYtvTyh37yiCkMIdyla1fZsXsXLcIhXBKjCG5ubpaMCRky88EHWxwRIkPk5+VLfW2t/HzIYK8207XYMF+SAAmQAAmQQJAIUAwHCTS7cSZgFMKlFeUUws6IgpLjSgRnZGa2uMnt/ffek+nTpisRzMgQQVkmdkICJEACJBAgAhTDAQLLZlsngEM3kHC4hqujmhGHeMq0qa03xBI+EYAILikulpKNJRIVFSXpGenSmgjWHSE+8ITMTBlw9wC6Q2govJIACZAACYQlgahm/B7KRAJhSADRJBwjTIThNEIy5NXPPmsTwRMmZkpaenqLluCQDJKdkgAJkAAJkEAQCNAyHATI7IIEzEJA+/g2NjRI5qSJLYpgRIboGBcnHW66ySzD5zhIgARIgARIwO8EGFrN70jZIAmYj4DxCOS77uopO1/cLTOys11agyGC01LHq2OWT544ab7JcEQkQAIkQAIk4EcCtAz7ESabIgGzEVCW4NX5Ul9X2+oRyMayveJ7MzKE2RaT4yEBEiABEggIAYrhgGBloyQQWgJGYTs2KUnKN1W43eimyl4Jj4ayhUWFgg1yTCRAAiRAAiRgBQIUw1ZYZc7RMgTg4rB0yVI5/e670poI1lCqD9cIXCfKK90LZl2WVxIgARIgARKINAKMJhFpK2qh+TCaxNXFhgguLFyjToDD4Rdz5s51awm+Wot3gSaAk/g+O3tWddOhY0euSaCBs30SIAES8IEALcM+QGMVEjALAaMIpp+vWVbl8jiWLV0m69eulX73DFQZh155We6fNk1ych4110A5GhIgARKwOAFGk7D4HwCnH54EIIJTU1JUxIempotqs1tFZaX07NXLbkK63AMPPGSXjwecIscUGAKFBYXy5ltvy/7Dh2XD+nXqg/uTJ9+U3NynA9MpWyUBEiABEvCJAN0kfMLGSmYgYEU3CYjbvLw8OVZzVOITEmT69GlOAhhrg01xu3btVm4Tvfv0kawZWXblcPrc4EE/l5pjr5lhKSNuDD26dZftu3dJXGxHu7nV1Z+VAX37ypvvvuMyrJ1dYT6QAAmQAAkEhQAtw0HBzE5IoG0E4Hs6Z/YcZQlu1+5aZQkuLSu1E7joASK4f79EyXlkltx0002qXFlFuVO53Tt3yl/+/GdVvm0jY21HAvjC8oMf/chJCKMcxDHcJmiVd6TGZxIgARIIHQH6DIeOPXsmgVYJQAQX5BfI1qoqiY3r1GLs3/nzF0hVRXmr8YTRaenGEtX32sI1MnrMmFbHwQLeEfjqyy/dVsDpf0wkQAIkQALmIUAxbJ614EhIwEbAUQTnrljeqmjNyZklU6dObjViAdo+c+aM6qu2rlZZKRlX2Ia+zTfw2/7vv/1Vjh1/Q3r1vNOuvd+/976c+egjxnG2o8IHEiABEggtAbpJhJY/eycBOwIQqjmzciSxT185dvQ1gQg+UH2wVSGMRtq3b9+qEEa5F3ftsvXZdLFJnl6Wa3vmjX8IPPb44zJj6hQliHWLEMfpKSnywEMP0l9YQ+GVBEiABExAgJZhEywCh0AC2NC2+KnFsm3rFont1EmJYEf3Bfii7tixU5YuW9omYGWlZXb1D1dXC/qPjo62y+eD7wRGjhqpKmdNmSzf+9d/U/ewFj/w0EOSlp7me8OsSQIkQAIk4HcCFMN+R8oGScBzAhChZaWlsnFDsUTHxLgVwfpADUSQgPW4Y0f7KAWe9oiNW//vb39zKr762Wdl/oIFTvnM8J0ABDE+erMcXVF8Z8maJEACJBBIAhTDgaTLtknADQGjCG5ubpaMCRky88EH7UojMkT+6nypr6sVfx2ogY1zTU1Ndv3gYdvWFyiGnaj4J4Mi2D8c2QoJkAAJBIoAxXCgyLJdEnBBACK4pLhYSktKRYvgjMxMOxcFWH7Hp6RKfW2tjE1KkvJNFW4twXCd2LV7t5ytPyuxcXEy7N6hTmHUjMN4+aWXjI+2+3Pnzqkwa46uGbYCvCEBEiABEiCBCCVAMRyhC8tpmYuAFsElG0skKipKJkzMlLT0dDsRrEfcPjpaBg4cKGkZ6W5FMMrm5+VJSfFGybh/igwbPlL+8MGHkjVtuvx8yGBZvHixbs7uWri2yO7Z+NDBR9cLYxu8JwESIAESIIFwI8AT6MJtxTheGwGzn0AHqy0+n5z5RA4eOCDXtGvXogi2TcyDG7QL4VtaWSn/1flWWw2ccPaL4cOlYE1hixZiWwXekAAJkAAJkIDFCTC0msX/ADh9/xPAhqmRw0cKDsG48I8maW53rcANYdbsHJmRna2swSjT2HjO5853v7hHWYSNQhiN4YSzGQ89LBWVm3xumxVJgARIgARIwEoE6CZhpdXmXINC4MEHH5K7ev1Mnnpyoa2/+++fpGLMnms8J4cOHZRjNUdl5erVMnz4MFsZb27q6+rk3mHDXVb5yS0/luqDB1y+YyYJkAAJkAAJkIA9AVqG7XnwiQR8JoDoD3d17yHXt4+2E8JoEBbcOQsWyoYNG+SaqGvUscq+CmG0hzBs8BF2lT770+dy3XXfdfWKeSRAAiRAAiRAAg4EKIYdgPCRBLwlABHcPyFRch6ZJf91223S/+57XDYxetRw+dtf/iJlFeVt9udNTRknBc+ukoaGRru+8FxUWCCJ/RLs8vlAAiRAAiRAAiTgmgDFsGsuzCWBVglgE9vI4SOUCO7V+2dy8Mhh6dH9djl//rzLutjc5q/Us1cvGTT45zJmzFjZtn2XOvYXVzzfddcdHh3f7K+xsB0SIAESIAESCGcCjCYRzqtn8bGHKpoERLA+EQ5hzObMnWsLgfbBBx9IanKKvHJgv8TE2B9vnF+4Vj54//eSl7fabyuHuMEv7tmnNui1b99eEvrGUwj7jS4bIgESIAESsAIBimErrLIJ5rh2TZGsKyqSk++8bTcabASbP3eu1BypseVPmTZVZuXk2J7d3QRbDBtFME6Ey87OdunuMG/ePPnooz/Krx5+WHr1vFO5MpRXbpaN69bKzhd32YSzu3kxnwRIgARIgARIIHgE6CYRPNaW7UkLYVcAsrNmKLG4Y/cu+fjTTySvoECqNm1WAtlV+VDkQQSnpqRISlKyNDVdVJvfKior1VCypk+Xxx573G5YOPACPrtZUyYLBHuP226TE8dfk4oWTpKza4APJEACJEACJEACQSNAMRw01NbrqKGhQdJTU6WxsUF694l3AgCr8OlTpyQpOVm6dO2q3g8eOkTwMVqKnSoGKcMogtu1u9YmgnGaXHpauhLH589/LfcOHew0oulZ0+Xk228pgQ+RX1JaIrd27uxULtAZiGeMDX5MJEACVwngCzq+qOLjmPBLlX6H/34xkQAJRD4BiuHIX+OQzRD/qCAEmDuXBy14u3TtYjfGLl26ihbKdi+C9HD27FmZM3uOErtaBJeWlQryETVi2uQpcv311ylxjHxsZjNrKt1YIksXLzHr8DguEjAVgeW5ueqXKQwqvk+8lFZUmGp8HAwJkEBgCPDQjcBwZasikpQ8Tv2D4g5GfX2dehUbF2dXJCYmRj3X19XbLMZ2BQL0ALFbkF8gW6uqJDaukxK7WujiNLmqinIZm5Qk5WHk7oANdjj9DlZuPZcA4WOzJBDWBGAtxgeJQjisl5KDJwGvCdAy7DUyVvCUAP5BaUuqq7ssltvShid1tSU4sU9fOXb0NcldsVwOVB+0E4/Tp09TodOWLlsaNhvg4CJx/uvzcunSJVm54hlPULAMCViSAEQwrMJI7oQwfskaOWy4nQsF3LyQ8EuWdq3Qv3ipFyJKYONd/4R+Kgv94Hnfnr26CK8kQAIhJkAxHOIFYPehJZAzK0ccRfDoMWOcBnXTTTeGjQjWg1+1cqU0XWxSjydPnFBuHvodryRAApcJYMOuFsL4VcqVawSEK/yHtfhFTS2OkYdft/SX/31799ihrdq8WT1jbwQS3MawjwB7I5hIgATMQYBi2BzrwFG4IBDn4D6hLS/66qKK11nf+qdvK0vwsqeXyV/+8oXX9c1c4Uj1Ybvh5T/nv/jGdg3zgQTCmAD2NuiETb8Qx47p6StWYy1kIWaTxl0Wt1pIDx4yVFWDcEY7SBDMsBoj6fLqgf9DAiRgKgIUw6ZaDmsNJjb2sq+w/sdCz17/QxIbF6uz1BX/ABk/di99fBh271DZuWOn2ix3/PhxH1sxXzX4Cjc3N9sNbNfOnYJIGEwkQAL2BGDV1RFtIG71f4NQCv990v+N0i4O+EKuRbN2i4DYhWUZdY9eiZt+tOaI6ki/s++VTyRAAmYhQDFslpWw4Dj0z4qnT522m/3p06fUPyr6Hye7l35+mJ0zWy41X7JFhvBz8yFrDlEkvvnmG7v+my41ye6dO+3y+EACViegfYR11BuIWW3tBZu6uvpWEWmxrK2/e6+4SmjBrK3GrTbEAiRAAiEhQDEcEuzsFATgZwfBu7aoyOaLh58Y8dH/qASa1IFDBwUHaERSpAVYf4+99poTOvgPr1q5yimfGSRgZQLaRxiiWPvxQsRqi2+c4RcqlDX+OqXvdUScwUMu+wHjv2FoA8La6E9sZc6cOwmYmQDFsJlXxwJjW7RkseAfG71LOzsrS/2DpK00FkDg9ykiisQPfvAD6dChg9Pne//yL9xI53fibDBSCDxqOAYevsRazGqxu65ojc2FwvjfLD1/fLnXv2hpX2S9cU6X4ZUESMB8BKKaHR0LzTdGjogEXBKA3x4sM0wkQAIk4A0BYyg1x/+GGN9NmTZVRX+ApRdf1F0lHCWvBTDewyKshTCeT77ztnL7clWXeSRAAuYgQMuwOdaBoyCBiCOAgz4eeOAhubv/3ZKZOUmd6scNfBG3zBE3IeNmNwhjhE6D+0ReQYGd6NW+xkYhDBgoqw8OMralQelNeBDYTCRAAuYgQMuwOdaBo/CBAC3DPkALUpUd23fIU08+KRPunyL9ExPk3LnzUlVVJYcP7JedL+4Ou5jNQcLGbiKAAMQzXCiQ4GOsNwpHwNQ4BRKIWAIUwxG7tJE/MYphc64xrL84batg7Trp1fNOu0Eue/oZef/0u1JaVmqXzwcSCHcCju4RsBjDhYKJBEjA/AToJmH+NeIIw5wA3AW2vfBC0GaB/rCJLlQJ/f/nj29xEsIYz7Qp90tNdXWohsZ+SSBgBPQmO3QAa3BeQX7A+mLDJEAC/iVwrX+bY2skQAKOBDasXy8n3zghro55dizrj2f0h7TuytUfbXrTBoT4LT/5icsqMTHRLvOZSQLhTgAC2HEzXrjPieMnAasQoGXYKivNeYaMAI5FPnfunMBiGox0+FC17H/l1ZCdNoeYza7iHGPudfVng4GAfZAACZAACZCAxwQohj1GxYIk4D0BHIvc1NQkly5dkqeXLvO+AS9rwB0DfSGtXbPGy9r+KQ4xfOniN1JSVmnXYENDozzxxJMyacoUu3w+kAAJkAAJkEAoCXADXSjps+82EQiHDXSjR4yUd955xzbPg0cOBzSSgrG/9u3by1un3rX1HcwbuEqkjkuRbnfcKX0T+sn58+dl1/bfyE033Sir81ZLdDTdJYK5HuyLBEiABEjAPQFaht2z4RsSaBMBRFUwCmE0lv/c6ja12VJlx/4u/P1CUDfuGcd2a+fOcqD6kPTr20c+/vAPcuF8o0yZcr+UlJZQCBtB8Z4ESIAESCDkBGgZDvkScAC+EjC7ZRguC3Nnz5ami022KX7rW9+S4ydPBEQQVpaXy+OPLbD1hRscy/zS/lft8vhAAiRAAiRAAiRwlQAtw1dZ8I4E/EpgbeEaOyGMxi81X5LdO3f6tR/dWFGhs49wbW1tSMOs6bHxSgIkQAIkQAJmJUAxbNaV4bjCmsDZs2flzJkzTnOAlXjlimec8tuagf7++te/OjWDzXtPL8t1ymcGCZCAuQnguGb8+qVPs3McrX6PI6PNnHAiH+bhyTjr6+pEH1eNOnr+7uo2NDQ4lceBP+7Km5lTIMcGHvPnzvVbF2jLyLjHbd0kOyvLb+2HoiGK4VBQZ58RSQA+u8uWLpMe3W6XxD591RyxUew/f/hDufXWW20fBOeHePVnQtSKixcvumzyMA+5cMmFmSQQLAKLnnzS564gJiEQIz1B3EPIYr7Yb4CYzfgMHjJEzd9RbKH8gCvl8woKbOWnTJ0qVZs3qy8RENdMIuuKigRfHPyRsD44bdGYTr7ztmANwjnx0I1wXj2O3VQEZmbPlAt//x/Zvnu3xMV2FIQSW7P2edm6qUL9xz2QERQmZGYKPkwkQALmIoAvqiXFGyUjM9PnSDKwwvWO76NOtjPX7PwzGohWWBtxcElpRYVdo1OmTZXGxgZlidw3ZK8MHjpECTuU79K1i1P5pHHJqh1Y1LOzZvBIbDuafHBHgJZhd2SYTwJeEMA/eJ/96XN5/vl1SgijKk5bm/3ow9K3/wDJtYBlxwtcLEoCliGwqeJyvO2S4mKf5gwxGBMT45F1GFa79NRU5V4AFwNHlwHtWmF0RcA9xLZ2ZUAd7aKAfMc2Ha3UaNPYJ+p6+5P82iuWy8lTp7lkNHnqVAEHnbSl0115/PoGUezKiqnbcHWFKIcFWs8fghptGBOYwC1Al0F5owUadfAxlkN5PDsm4zqgjKPFFXWM64G+jBZeXR/10Kcek+aPssjDVa895oN66A/ldB28R9Jt6ny0q9/himddDm0g4Wq03KM/Y9toC+0aE9rBxxNOxnqBuqcYDhRZtmspAh//8YyMGPULJYAdJ56UlCTvv/8Hx2w+kwAJRDgBuE7p0xi1KPZ2ytHRMQIxCBGjRY6rNiDI0lPHq1f42RouBknJyUqEOAqxvXv2ql+r4I6AMjrt27tXyirKL9cdd7ku2kxKHqfyZuXkKPGiRRvGBBHUpWtXm5sCfi6HaHIUP7oPV9eaIzVK8MMy7CrhywD6hlUYCeNHnrvyKANLOtLp0/ZiVmW6+B8IuLTU8XL61GmbmwYMGpg/3iGBP+aFsYAv+NXX1at6ugzKgcvRmiOy/4q7B8aNelpUogy+QGBdtIsHxDva12XwDnWwPsa+9BqrAV35H7iFLFqyWJVbtGSJEtWoC0aoiyvGgHusFRLGi78Z5GEMeI+11H8byL9cN1qNC+VRZsfuXao+GODvzFXCGLGmKKvbx98M5mxMnnAylg/kPcVwIOmybRIQUQdNNHz5FVmQAAlYjAB+MdInQmIzK8It+pJgFYXwg6CAyHCVnr5ieVtdUKDED8qgHgSMtqTqemgL1lP90fkQXshDGjxkqLpCiKMNJG2l1gITIgzlIYx0QlnkuRunLme8NjY0SHRMjDGrxXtPysOFAgni1pMEthCH8DnWDGB5hgjEOwg3XMEAwhUJ5SBCUQ+MjQmiFCIUCW0iaW5ggw/a0WzBEOWrNm9S7UHM4h36Q9J9YRyOX26wblrkok1P+es1Rj+YA4S48W8A/eKLEBgcdfN3pwZn+B+MDWN8NCfHNia0j78jzFmLfV2lJU66TDCu9BkOBmX2EfEErvvud+XQ4SMu57lr9x7p8tOfunzHTBIggeASwE+2/k6wfrlKm8or1HHseAcx/OwzK2X0mDGuiraaB9GAn5VhPYRF0jFBrEAAagGm38fH91ECBCJEv4uNvSx4dRlHzk7WAAAgAElEQVR91QISz7CKuksQR0gYE5ISkvWXN6tB8EAMaXGmCvjxf9A3Plqw+qtpWHKRjNZm3Ou11QJUW5x1v5gnxgKLqv5SAM7G8TkKffBB6tLlspVWt6UtreCJhLUzJvSFtjFWLZLx3rhueNbrbKzr6t5YD+PFXMEWQhwJ93osruq7yoPgR/9a5OsyQ65Yx2tqjtjetcZJ1w3GlWI4GJTZR8QTGDlqpDy3apWUlFVKRlqKbb7Hjr8hG59fK4VrCm15vCEBEggdAS1uAj0CxxMh0d8XX3whx48dk569enndPcQKxBbEMD5GoaQFoqPoQidaGKGMvve6czcVYE2EawGuEI4Qa7AsVrkp7y4b44a115OkBRT6bClpi7BR8LVUHhuekVwxRD428SG5+pKAMbU2HlX5yv9cbcu1NRxrhaTX2lgX93qsjvltfYYIhujHfGBhxhVfeDAOTxPcRlwlzVXPzVWZUOZRDIeSPvuOGAKIFFGxqVJmZM2QyvIyuXvgIHnzxBvyxw8/lMceX+DTP34RA4cTIQELEtjkEBUBCGAdxuE4vohh1IdA2bd3j7LWQajohHt8XAlKLT7irrg/6Dr+uEIkoU9YNI3jwYY443NrfcFqCBEGq7LRMmusB8t2HdwYpk0VT8q7s74a2zTea5GL+bgaO3y3kVwJUTA2WoKN7bq6v9qW6y8Aun/ty+uqDX/ngT3WAHy1hRt9eGsZjo2LdfnFQP9tBuLv0B8s6DPsD4psgwRE5NbOneXVA/tl0VNPyHe/3U7un5QpB6oPCqzGTCRAAtYiUFluHyJMzx5xv9sSZ1z7BOuf7XW7vfvEK/9YLX51Pn6WRvLUQqrreXKF9RUiUIs31EH/Wvh40gbKwJ8Ubawrcj5FE+8hhI3RCnR5/XO+Yz+w0sKHV1mqr/j3OpZxfNbuDxCFOqEduNVg45cW6dqdQpeB6EY5b/hiXEjah1i3hcgRiMyg+3J8D7Z4727euh1fru6+PNRfcX/xtE24fmCcjr7BcCNBcuei42n7gSpHMRwosmzX9ATef++9Nv2j5G6CsPrMfPBBGThokAQytrC7/plPAiQQWgJwkbjhhhukQ4cOLj/4b4+vCaLRaLnT7WDDEtJMQ/gtCGaIEpT3xnKp22ztelmAn7IJH4hC3b+jKG+pLcwJP8dDiEJ4amGGOhB+EMIQiNpPFuVLK8qVCEV5o/CCJROuG5hvXkG+rVuwMIYLw1iNSW88w6ZA/U5vSsRGOi2s0Y62lqLc/LnzVF+u1sTYvvEec8EH49ZjR7toD0IfY8d4kIcPEniCLdwNUMabhDrafcHdumgBjg18Ojn2j3ywR4Krh+aky+OKNQIrsNPriDniywn6wLzMmCiGzbgqHFNQCJRuLJFliy9vAAlKh+yEBEjAEgTwJXj3vr1yqOaIyw++KLclQVA4blCCgIJARIL1EMIPwg4iTYvItvTpqi4ELAQOxCr6wwY/LRphHXYnvFy1hfkgFBeEG9rRwhUCGXNwPIwD/SB0Ga66f9SBiwb8ltGW/gKAcUCM6VBfcIkAm//f3vn92HFc+b21MIJ9MDj/gGYsw14Em52xvDaCBCIt24sgAIeWrCBeQJQoKfE6IqWR9GYTkv2wcCRClBMsYJnmiJuH0KJEYvMQRbaGwMKJ1zJHsJEYsMVJdhEIsDX0y+ZJw4eNAcc7wafufK/OFLv79v05fe/9FtC3u6urTp3zqerq09XVfWPAyeOzcjzm17d9cSCZqiBHEXvRBQedskhHevLJSYwy67axh3qU7ugX60ploSdlUaeEQcriaxY4psip+ioEHCmT0X7SpbSb15JOlKsR4uioY39ZHdMOYaZ6xEZszeuwjs+kj922u7u7O+lCXZ4JjIIAJ+swL8P84crHil//+tfFT376PzyCO4oKsQwTMAETmAICmmaA8+lgAhDwyLDbwVwS4Puff/d//674zW9+U5S96DKXUGy0CZiACcw4AUZIGW3ud6rBjGOZe/PsDM99E5hPAP/pL/6i+O3/+20yXnOy5pOErTYBEzCB+SCAI8wcX+YS9zutYT4Iza+V/rTa/Nb9XFt+7c0fde1nhJiR4mHn8XUFesMETMAETKBVBPgMHPNhmc9qR7hVVdMKZTwy3IpqmG8l6KQ0YZ+XBMY9UstfovK9TwVGiL/xfOcfdxTntQmYgAmYwGwQ4GsGfAGCkWG9XNjPH0nMBgVbUUfAI8N1dHxs7AR4y5S7dX20nU+18AYqYVxvQMe/SJWB726/mz6zdvvttyvKaxMwARMwgRkgwJcq3jlW/pfZM2CeTRgBAY8MjwCiRQxGAMeXO3b+TUiPrfhsCx8vzz97M1gJt+Yq+4tUUjE6/PU//dNbMzjGBEzABEzABExgpgnYGZ7p6p1e4/r9B6OmljI3uCrw/UWcZQcTMAETOGgC+i6sPgOW68NAAtPLNK2MNfvkaxoGyZPLRj99l5fymYZQpTN5ma7AH2VoahzrzhPC5nrnOszaPgNF+Z+PDGMj9RynhYyi3ofRp4157Qy3sVbmRCd9vJu/adSHu+kEmDYxrs/e/MsvfCF9m5jvE+fL1t/8tb83PCdtz2aawKwRYFoZfRp/njCJQF+NE8xnyvj3O/WnfLuXPp3pburXpQ8OHk4ZOio9U+QIpMdJcygSP7iOKvCHHrEuJt1WRmXHOOV4zvA46Vp2TwL84w0dqv5dhwz8c8245gv3VMgJTMAETMAEehJ4cu2JlCb/OgP/NMa0N0Z79a9qJGS0GAePf3SL/55HWuK+tvBMSsM+MhxMYJIEPDI8Sdouax8B7lQZDVhaWrxllIARhDzEx2psO5iACZhAmwn85Mc/Lp588qnii1/8UvGv/9UXi9f+82tjU7fs0TdTEuIUBtIw8ICjGsPVjY196eIj9ZhO2/oyA397rPc9dIw1zi4jxIcOLaRo+nryMNARHeGYh/TI4u+U+wnYFG3Mp2gwbSROyyBtHIGO001iOrYZ/Y6hV1mkh62uVZSF3QpNykJ/2cD1EXnKR7xkKw3Hot4cV/3BnX3WkgEP7CA+TqlBT8qTfGSSR0Fl5+lUltJN69rO8LTW3AzozUnFyfjoqce61tAZHl09lkYQ8sdEeqymdTeTN0zABEygZQRwfNcee7z4h7//B8WjJ08Wx0+cKF69fKW47977JqIp/SuOCg4rfeYP3vxhgdOLY5QHpjXwRxSkY5SWvHK28rTsb2115vfWTcng6Z6e8OFUUe5dh4+UiUtx9P28PI1DmTuhVZlw6tCTl7Clu+LIg5xHTjyUsjMdgzTwIA/pYmAUm2sPaV777uvF9vaNQqPfpJPcqrKw7+ETDxU3tm8k1iqLOoBnDHVlcVPAQkAP6kOBeqIeWbCD6yfOcpx2Qnp4YyNM0SNdV/cYldWZ2gr8Sc9CQHZ+Hebl9mfPPJfS8GS3V1uR7m1f2xluew3NsH43b3Y6ZU7AGLQf71rjcW+bgAmYQJsJ/OpXvyr+7de/Xlx85ZXiicdPFv/0n/zj4p//sz8q/vzPLxT/4Hd/t/j2uW83Vh8nTKN1cY2jUhcYYcXxkUPKOxonT50qzUK8nCRGbkmbO0Exoxxqnuo1CUqPU1YXpAPvjTQJOJXoKucR3Rl9lvP5wtnO9+O/ee5cdwQbHqQjr/SiLOI0PQM9kMM1SGl6lYXzifONo4hOBJWVj3b3KqvKdnRCthYc02i/7CCurv5y+WorOLcKFy9dSrKxKwaccNUTvPotK8pq07ad4TbVxpzpsrjY6TDyUYCdnc4XHXTCzRkWm2sCJjDlBF7/L68Xf3z8weIP/tHv77NkYeFQ8aVHHy2+//3/ui++bgeHSqN1cR1HDPP89KksR1dX9x3CCStzSDUAocRlaXRskLUGPkYpF2cPRxUHMQacOL2UxxeCsC0v9/DhIylvnAag65FkxTxNyiINjmF+3VpeXkl1EZ3TurJUftk6z4fzyiixRmdxXJnq0M9AEmnL2grl64YgXqPH3VbK7J5EnF+gmwRll1FKgLtK7mw5gTmp6Ujo3C6sn08nYd7JlQpxpAmYgAn0QYDR1bqgR8Rlaary5nlu+53fKT74wQ+WiUgjxI9/6U9Kj40qUqOZo5KXy5GjyFQC+u1eQU7cdjYHN88nJy53uPJ07Ovzm9IlTwMDlkMlo9HKw3Ft5/njfq+ypA/yqtqIZES5w27jpHamZmynayaOOCO3V/oQzLSOqiA22DXrwc7wrNdwy+3jTWScYV40UGAkRI+9FOe1CZiACYyCQO649iOzad7dv//74m//9v+Uiv7L7/+34mN/+InSY6OKlBOjEdlRyZUcRlYZjcR5rRq0wFFjsIO+nBFp+vm3Nq91p21IVlwzPQLnuomDLSe3ylGDAUuZE6o8Sw0cefTrVZbSoDfzfKtCHImuStNPPPORsU//4Kq8THtQG1Bc1XqxZqqLODWpjyr50xLvaRLTUlMzqicnLKPCXGS02BGe0cq2WSYwJwTu/fy9xeXvXCz+5//6630WMwXsP1y4UDz8cOelrn0HR7gjhzI+mke8HvcPWxTOLaOQOLtymKJMjVhqJJh+nieBlK/5vDE92zh2yKqa15ynxwlHbm4jchidJf6uNO936xYdNzevJXFNRqBJ2KQs0mB3zoObAL7gkcfn9gyyr5uH6PhSTtkNQJV86pH2wsuVeYAhx6L8PM2s7NsZnpWatB0mYAImYAKtIHD77bcX/+7P/qz4/Opq8fwL/7748U/+e/Efv/NK8YUv/HHxe7/3keK+fzH+L0rgVDJyq68m4KjhmI0q8PUJAl9riA4u28xbJcQXsjRCjLMa9cB542VA8pFGL7ElAT1++HMm7JKN2MvoK44pC38GQnhqba3rjJKWNJTVz4hnr7LkxFMWOhGwifLI249DqbRMYZCsJDD76Tj7HZs5RFrZGp1vRrY1HSLGS5zaCnWjoE/LxTrUsVlc2xmexVq1TSZgAiZgAgdKAIf3r679qLht97fFeT5b9r//pjh18t8Uzz333ET0wqnEkWH0lpFSpqLxQh2OVtPpAXWK4kgyJQCnU6OxlIOjS9m82CWnTnJ46Q+dcFpJy6I/XEIWU+QUGJXkmNLkI8Ck05Q62YgTzqg1L9ER0JGpeATJ0tSNWFZK0OOnSVnYgOMJa7HA6e63LGyAKzcJ8fNuuYqwVDrKw/40b/iB42l0WI6vnF3S8FJhHtRWGGkmDQuB+kL+PITbdnd3d+fBUNs4ewQ4YZvO4Zs9622RCZiACfRHgJFDHLVBHLT+Sho+NY4dL4PhqKXR3I2N2vm4w5doCfNMwC/QzXPt23YTMAETMIGZJMBIKHNi4zd2GcFltBQHs+0hvog2ipHstttr/Q6WgKdJHCx/l24CJmACJmACIyeQTw/gSRqP8L9z6eVbpi+MvPARCuRRP19H4M8sHExgXAQ8TWJcZC137AQ8TWLsiF2ACZiACRwYARxhXtBjWse8zF09MNhzXrCnScx5A7D5JmACJmACJtA2AulLDOvrBV+t4KUwBxMYJwGPDI+TrmWPlYBHhseK18JNwARM4EAIMCKsr0xIAeY684UKBxMYBwGPDI+DqmWagAmYgAmYgAkMRIBPsvlLQQOhc6YBCfgFugHBOZsJmIAJmIAJmIAJmMD0E7AzPP11aAtMwARMwARMwARMwAQGJGBneEBwzmYCJmACJmACJmACJjD9BOwMT38d2gITMAETMAETMAETMIEBCdgZHhCcs5mACZiACZiACZiACUw/ATvD01+HtsAETMAETMAETMAETGBAAnaGBwTnbCZgAiZgAiZgAiZgAtNPwM7w9NehLTABEzABEzABEzABExiQgJ3hAcE5mwmYgAmYgAmYgAmYwPQTsDM8/XVoC0zABEzABEzABEzABAYkYGd4QHDOZgImYAImYAImYAImMP0E7AxPfx3aAhMwARMwARMwARMwgQEJ2BkeEJyzmYAJmIAJmIAJmIAJTD8BO8PTX4e2wARMwARMwARMwARMYEACdoYHBOdsJmACJmACJmACJmAC00/AzvD016EtMAETMAETMAETMAETGJCAneEBwTmbCZiACZiACZiACZjA9BOwMzz9dWgLTMAETMAETMAETMAEBiRgZ3hAcM42OgJXXr1cfPbuTxcfvePDaXlybW10wi3JBEzABEzABEzABGoI2BmugeND4yfw0vn14qX19eLFc98q3vnlL4rXvvt6sXV9q3jkxInxF+4STMAETMAETMAE5p6AneG5bwIHB2BnZ6e4sL5e3H/8eLG8spIUYc3+5rXN4sb29sEp55JNwARMwARMwATmgoCd4bmo5nYaefWNjQKHePXY6j4FTz52Ko0SLy4t7Yv3jgmYgAmYgAmYgAmMmoCd4VETtbzGBHCEFxYWiu3tG2lahOYMf+2ZZxrLcEITMAETMAETMAETGIbAbbu7u7vDCHBeExiUAE4vo8OEZ8+cKY4eW00jxY+ceKhYWDhUXLx0aZ9onGUHEzABEzABE5h3Arxj4zA6Ah8YnShLMoH+CDAyzPLl06eTI0xuRoqZM4yjzLzhw0cOd4XmJz/OcR7XTTwHG7bf9e/2P78Ogc//+T3/PTA0+gu8p0mMnqklNiSwtDcnODq8ZF1eWU4Stq5fbyjJyUzABEzABEzABExgMAJ2hgfj5lwjIHDo0EKSsrNzs1Qao8QOJmACJmACJmACJjBOAnaGx0nXsmsJaET4rc1r+9LxnWGCju876B0TMAETMAETMAETGCEBv0A3QpgW1T8BvUTHn23wKTXmEPMCHVMleKnOwQRMwARMwARMwATGScDO8DjpWnYjAvwLHX++gSNM4IU6vjXsYAImYAImYAImYALjJmBneNyELd8ETMAETMAETMAETKC1BDxnuLVVY8VMwARMwARMwARMwATGTcDO8LgJW74JmIAJmIAJmIAJmEBrCdgZbm3VWDETMAETMAETMAETMIFxE7AzPG7Clm8CJmACJmACJmACJtBaAnaGW1s186nYje3t4pETJwr+blLLN86e7QsGf+NM3mn+B7urb2wU991zb5fBZ+/+dMFXN3oFbB6WX68yxnl8VHbDYFrrfxTnAHVE+2GZxkBb/+SdH++2f+qTttEr5G1ffUiTc6eX7EkcH7T9oxs2yl7W02Jz5DpI239ybW2f3ZHBNHIYtO3nbYdzAZ4ODQnsOphAiwh8/nP37LJcf/vtpNXG997Y/cTH7tz96tNPN9KSfKT/yIfu6MpolLFFid57771kw8MPPrjLNmH92+eTTZdfebVS0+13370ln/ghq+1hFHbLxicefzyxgMm0hWHPAexVe0HWtAXaLOfvC88/31Wd9ktcr/rsp6/oCm/JxqDtH/XhE/sL+gl40Q6mKYyi7WMvLD/zqbvTtWSa7B+07XPdy+ubayYMdA2ZJg4HoatHhhveNDjZ+AlwF8to3v3HjxfLKyupwKPHVgsWRnt7BUaQWR49Nd3fKOYOn28u86cj+ktqvrvMn5JsbV2vxHDl8uVb8sEOHvBr+0jpMHYD5eKlS102Xzl9OrGAyTSFYc8BbKWuOQ/UdqbJ/qT/5rXU1vneuIL+gKeuH4Ad583ycqfvUN5pWQ/a/skHl0dPPdat8/sfOJ7+wXOa2v8o2r7qmj9zurmzU7x47luKmor15oBtX/VMvSscXT2WRoZpHw69CdgZ7s3IKSZEQBc6/n0uBi5u6ihjfNzm0RL5v3nuXIyeym0cXhwZnN8Y+Hvquo4N5+GdX/7ilnyScWP7hjZbuR7G7p/+/GettKlfpYY5BygLZxBHgIti3n761eWg0sMg7wOwhQVnoSqI3bT+jfug7V8OVG43N4c/ePOHVbhaF6/6y+u+Sf8fjaGPZJnGc2DQth/tz7f1Z1Z5vPf3E7AzvJ+H9w6QwI0bnflN+UVcI1x1zhwXAv7SWWkP0Iyhi966vlXqyGAbHVu/nZu45heZoRUdsYBR2S2HEF48ZZimoLoa5BzATo0IayR1mmxHV+qOG9+l7EaQY9RnXR8AO9JwM6B5o8yZrruBbBOfQdt/h9diceXVywXvFmA7862nbc7wsG1fdfnS+npqB9P2hHCYtn/y1KlkM21A4erGG+k6EkeLdczrWwl84NYox5hAOwls17wMoGkV7dR8tFpx8VvYm0bSSzJpcQaYLpE7WL3ytu14E7txfjQdRFNL2mbHMPrUnQNcCFnidJFhympjXtpAVVC984Tk4qXOVAnaPi9YXVy4lKYNVOWdhviq9r+9fSNNCdjZuVl859LL6TyHxSMnHkpmzcpf29e1fdUfI6vYjs3cGM1SqGv79O04/5oqKLvpC2aNg2wb9dojw6Mmankm0BICjDQ8ufZEujhO60hhvyh5OsBUEdY4hrxRPQ+BCyUXQhzB/HH5PNiPjVz4mS4Tb4x1E8ho8awG5sZyrj975rnuDS8MsP3Ceu8v0MwSF0ZDCdP2RGjYOuApAOf/i+fOpf6PPpA+n/5P00+GLWPW89sZnvUaniH7yh6dzpB5jU1pOsL71NpaukjyEsksjA40tRuQcga4ENSNqDSG3pKEVecAzh7TYGZlFLAKdz9tQDLgQhvAYZzmUGU78Zzf8SYAOxcXl5LNGjGfZtvRvartR7t4EgCHKlYx7bRt19nETQ83wdwAKWjO9IX184ryuoaAneEaOD40WQJ03oTcedFFbHFpcbIKHVBpunjnxcOBi14vxxZ+jAjw+FSPTXNZbdwf1u7cJnFS+8mPt3F/kHMAZwenn0VzZVkTz8L2tMybpc646Jc9EqceB+0Dmpw3B90eBm3/vZjoPDho+3qVP0jbjzJp/7SRo6vvO4TxeNu3B2372MyS3wxhL22KuegOvQnYGe7NyCkmRECPd/OTV29Zl53sE1JtosXw9jSdW35TQGdP51YXmBrASzTMH2SqQN1oQp2cgzg2qN04/ticBxjqApMfa+v+IOcA5wWPRfOFeB2LI0ZttV16wSDvAzgXWGgjVYGXxsqmxSDrriOHq7K1Jn7Q9q98+Q0PL6Rx/k9LHzBI24+VpxHwab5ODNL21ceV3UAyhabXNSMynOdtO8PzXPsts51Om46Mt4HVsdHBs8zTG7E4LnRwPPrGoSMwJwxn4P7jD1TWGo5w53H5SnHx0ss9R5ArBR3QgUHt5vuqsIlvz6vd8FIJLKcl+BwoisOHj6T6jPN82aYe6/oBfU+bm0YFzgkcAr473fYwaPtnaoz6TdlI/8k5wFcGpiUM2/b1NYqlKX6COGjbp57fura5rw+k7XMu0D86NCBwEP/04TJNoIoA/6Sjf5viH3VY8n+f45+piOffesqC/n1L/2JXlqbtcfyDFP/GJAb8s1b+b1I5h5he+eI6z99GBk3slp3xn5VoC7HdkKbu3/raaLt0anIOlP1TlfJrDQOWaQy0Vf2TJG0YO/LznTiOxXZAPv51S+2eNjFN/UCT9p+f96pf+knZDYNpbP9N2n6V/U/s/eukeEzretC2n7cd2n5+zkwrk0nofRuFNPCZncQETMAETMAETMAETMAEZo6Ap0nMXJXaIBMwARMwARMwARMwgaYE7Aw3JeV0JmACJmACJmACJmACM0fAzvDMVakNMgETMAETMAETMAETaErAznBTUk5nAiZgAiZgAiZgAiYwcwTsDM9cldogEzABEzABEzABEzCBpgTsDDcl5XQmYAImYAImYAImYAIzR8DO8MxVqQ0yARMwARMwARMwARNoSsDOcFNSTmcCJmACJmACJmACJjBzBOwMz1yV2iATMAETMAETMAETMIGmBOwMNyXldCZgAiZgAiZgAiZgAjNHwM7wzFWpDTIBEzABEzABEzABE2hKwM5wU1JOZwImYAImYAImYAImMHME7AzPXJXaIBMwARMwARMwARMwgaYE7Aw3JeV0JmACJmACJjABAje2t4v77rm3+OgdH07LS+fXJ1CqizCB+SVgZ3h+696Wm8BMENi6fr14cm2t6zjgQOBI5A4EaT5558dHYjNykEegfMrMy+unIPIiA1ltCDs7O8UjJ050mW5e2zxQtb72zDND8W2qPO3m6hsbTZOPLd2Vy5eL5ZXl4p1f/qK4eOlS8Y2zZwvqxMEETGA8BOwMj4erpZqACUyAAE4aDgwBx0HL0dXV5EDgRE1DOPnYqaT78spKK9S98urlAravfff1pNfhI4cPTC9uENBn3IHRWJajx1bHXVRP+V8+fbp49syZlA6n2MEETGC8BOwMj5evpZuACYyRwIX188Xi0lLx4rlz+0rBucSpwYnCwXHoj8DNm51RSNjOS8D5b6PjyagwzvHCwsK8VIXtNIGJE7AzPHHkLtAETGBUBHZ2bhY3Kx4f4yAzUpw7dJqSwLQEpjvk0xtwnuO0i8/e/emhRyZ59B6nHeTlSidGQXkcjm5VS5xKgaMU0+W2lHFGPiPmMR9yFKJucTqIjsc1Nxtxbis2apoBelJGlK288IUroY4NxzTyjxz0UcjzUXbOhvTRVukmGXF9deON4ujqsRi1b1uyYtugTNqL6g970TfqMWg+Ckf3xcWlgps7BxMwgfERsDM8PraWbAImMGYCTIfAucMBwVnqNa+S429tXit++vOfJUf5/geOp3xykjj+8ImHihvbN4ofvPnDTprjx5NTMuijemQmp2ZpKcnDQX/01KlUbplMRgA13UNr5o0SGO3WVAocMfLL6Wd9YX09lVWH/ZETD+2bAkE+5CCPABs5X2xzvCyQB7s0txVdCTiLnVHWlYLpFRvZHNxUB9c2i9VjnbqrY4O9TNUgMDqKPgTkUw5BjNjGtvgkgLLYJw121E2B2Lq+lfRNQit+sHl5eSXJo32QB6eeNkUZ0u/JtSf2Seg3H840cilLdbFPoHdMwARGS2DXwQRMwASmmMD6t8/vfuRDd+xbvvr007uXX3l1n1VPPP54SrP97rvdeLbJ+8Lzz6c48rF//e23u2nYIO9nPnV3N+4TH52D4xoAAB1GSURBVLszxRFBWvKgR1nY+N4b6XiuT0wrG/JySYOOlP35z93TzYKssjLr5JBZx9EphjweHsh/7733YrJ927lOOhjjy2yX7thadlxytC7jSxkseSCOuiLIhjruyo8eka/i45o6z8t8+MEHd4mPQSzVzgbJhy7wj4vkxbK8bQImMBoCHhke7b2FpZmACUyYACNnjMrxwhHbjJxq1FKjh1KJUdc4beJQNg+TEUeOa/RV+RihY4SR4/2Gu44cTjJ5DM/jdI1CN5WjUcYXz32rm2Vrq/PVCUZXY9CLblV6kg8G+Qip5GxuXoviKrcZuYQHI/N5QIfu8WOryXa+jqAAB/iyDMKGcllkq+SyZpT6rayOmswDxu4yW6JsyY9xefuJxxiVVsh16JVPLy5q1Jt1bLeS67UJmMBoCHxgNGIsxQRMwAQOlgBTHghfPl0kZ4nH7zieV1c3bnH+qjRl/jFODHM/y0LV/OSytIrD+fzOpZcLHEKmMSQnaa0z5eErp0/XOjnYgGPJNInoDMnR0rxblaW1XoDTvtZM/ygLcs4ktyxNjKuSQxrsJSBrsSiK+493pqJgB8dw1JnyoLT9spGO3PCwlAWlKTtWFodOz56pni9clsdxJmACs0PAzvDs1KUtMYG5IoADwzxXHKt8XiWO46OnHkuOF6Oh+UhoFSicQvJqnmpVun7jkYmeLDhqOMWMEuNUVpXFcZw98uSjoHI4maOq7SY6LS4tphuFPK2c/KWGX49ATlWQIyrnnZsU7OVmgJfBCBqJZrtfNrKXOofNsEGj6DnjYeU6vwmYwPQQ8DSJ6akra2oCJhAI4LzgSF3dKP+TBB6lE5ji0DQgk3xy6JRPXzLI43W8nzXOHE4cDrp0zPPjoFEmjmTu6JNWNuVTAhgJZ1S7aioG+bAhP66X3OSs5vrk+0xxqGKP7hyT08qa6RCUyYtmqrdcJvtN2CCbRU5slMOLlPr6RIyv22bE2o5wHSEfM4HZJ2BnePbr2BaawMwSYJoBzgwjxKwVGFF9aX09OTlNR4XJe/JU5xNWT62tdR3VJOv8evoChBw8ldNkLQeVkV6F5Bhe2ywdscZBpnwcTv3xgvJpjZPM8RfOnu06ttjPPo5dlc2aU0068UIXRm7Jp6kmKqduDStkMJVDgXpA/1zv+48/kJxwHNj4+bImbMScqR+6eVDZcU64ppT0O1rMzdThw0dkgtcmYAJzSMDTJOaw0m2yCcwKAZy+15ZeT45vHBFk5JC5qmWjqnW2k49pCziLmo+r0cp+ZakcdHx250yaJsBorwJOW5lMphMweruz951epdda+dATeckh7HxlLDmzuSOqfFpfvPRyyhd5oUe/TqQcZ/TVHGscaj5hlo+0so/zjjMbHfUmbFJdPnA8TSvhhoKpIZRNvVy5/Gq3bOSXlS27y9bok+tUls5xJmACs03gNj5KMdsm2joTMAETMIGDJpC+m7uyXPnd4oPWz+WbgAnMLwFPk5jfurflJmACJjARAkw1YQRW01AmUqgLMQETMIGGBDxNoiEoJzMBEzABE+iPAHOE9c92TN9gKoODCZiACbSNgKdJtK1GrI8JmIAJmIAJmIAJmMDECHiaxMRQuyATMAETMAETMAETMIG2EbAz3LYasT4mYAImYAImYAImYAITI2BneGKoXZAJmIAJmIAJmIAJmEDbCNgZbluNWB8TMAETMAETMAETMIGJEbAzPDHULsgETMAETMAETMAETKBtBOwMt61GrI8JmIAJmIAJmIAJmMDECNgZnhhqF2QCJmACJmACJmACJtA2AnaG21Yj1scETMAETMAETMAETGBiBOwMTwy1CzIBEzABEzABEzABE2gbATvDbasR62MCJmACJmACJmACJjAxAnaGJ4baBZmACZiACZiACZiACbSNgJ3httWI9TEBEzABEzABEzABE5gYATvDE0PtgkzABEzABEzABEzABNpGwM5w22rE+piACZiACZiACZiACUyMgJ3hiaF2QSZgAiZgAiZgAiZgAm0jYGe4bTVifUzABEzABEzABEzABCZGwM7wxFC7IBMwARMwARMwARMwgbYRsDPcthqxPiZgAiZgAiZgAiZgAhMjYGd4YqhdkAmYgAmYgAmYgAmYQNsI2BluW41YHxMwARMwARMwARMwgYkRsDM8MdQuyARMwARMwARMwARMoG0E7Ay3rUasjwmYgAmYgAmYgAmYwMQI2BmeGGoXZAImYAImYAImYAIm0DYCdobbViPWxwRMwARMwARMwARMYGIE7AxPDLULMgETMAETMAETMAETaBsBO8NtqxHrYwImYAImYAImMBECL51fn0g5LqScwOa1zeLG9nb5wQnGjsUZfuTEieKjd3w4LRhKoMEpjvV999xbXHn18gRNHU1RuR3RJrarArZ+9u5Pdxl88s6PJyZV6fuNj3qN4uSWvH71UHry0w4GCZwYsNy6fr1ndtLAcmdnJ6WV3qqXrz3zTFcGaWl3OlbVBikfmVXtEznIiMextQn3WL70YD0oq65xE9qAyzfOnk2ljboNj8KEyFd9j+Syz/HYVkbFXW0i1qm2n1xbkwpjW9MWqY+qwHkgfVjDIedTlbdXfNN2wHkF76tvbPQSectx2lzUX9tNzjmE1fULHI/y6afjuR2VgVvsU+Kxsm3sHVUbK5M/iTjaCbyHaS+jkDGorfBXe+E8jYFjb21e60aRrmmb6maq2IjlqnzWde2rQtRA0ZTPUhXyc4K2XdXuq2SUxfdT16RFx+3tG2WiSuNiXzYKfbuF7I4hPPzgg7uf+dTdXcnr3z6/+4mP3bl77UfXunFfffrp3Y986I59cd2DLd7AFvTuJ2A3ecircPmVV2+J07FB1vCG6ajCIHbGsqnvF55/PkY13t743hupvTTJgN2wJIip9nPutMvPf+6e3e13303p2UfPGK6//XZqu9SX5MTjbCMjP04+ZEl2nof99957L+XLueR6luVtQxw25na3QS/pIP1Yl4UnHn881Z2OsZ/XhY71u9b5kpetuq1qS/2WU5UeO7CnLNAvcJ5IN9ohbZ+6rGuvZbKGiRMjyu83cM6xxIDNTWzo1S/ouFjk+5SJzjrv++ln4czicDAEqNO6PiuvH9LG6/QwWueyJYv4Ju1W6QddV5WPPGxsg0+m/pF1P6FXvfYjS2nHMjLc9bT3Nq5cvlwcPbZaHD5yuHvo2TNnioWFheLqxhvduOjxM9ogr7/sTkNpycwdDuk18qqRK0ZkdEfGXY+G4hkZyo/pjlGjkqO6O0Q/bFxcWipOPnaqa+v9DxxPTGCjIJuiztKLOO6gZGPkwzH0hhfbBDGRLDHhGHLgoWOM1MBYslnHu2XpF9cwRI5kiC/xxLFGh1iu8uf8oy2k2dq6XtwV2ory5WvsvbmzU8CSAOfllZXuPu2N5erGRtIHG+8/fjzVBenvP/5Aihdj5D259kRB26wK2IT+eaDc5ZXl4qX16kduan/Lyyv7sqMj7ePGjU4dwlJsKY982oetWEsIesOQY6yxUyEe4zjyFLCjTm7eJtRWsZM2Q1kE5Ei22hA6ihP6sx/1I690Yc0xLWVtRjqTVraqTI5xPlMGgXUugzh0pq6V7q1rm8WhQwtd3YiXzshBhnTCrsg1FRR+bt7stAnaQQzULf0cdUuo0j8yjPkplzqU3tIHXdVuSY9uebuSHI6hh3RDn2+eO5cOb13fSmvSIFPy89Hs2I5iG4vtAEFVzIhXnZBffZ10ZE0Z2FsWaEO0uxhkb6yzeFzbdf0CaehvOP9YCLAiqL7h/Ed3f7r48unT3TQpQR8/kR9toKq+YcQ5mQedI/F8zetIaahDGFMmATuIU/2yVtp4HaROFK/06Kn84kGaeA6ST0H1Kh1IG3WQDNbSh7TYpXpkm3YQj6vtqJy4rpJFvNoTeuVciSMNCzoocO0jn2wQR46rjXKMpU4vycvXur5s7D0hKevfaXOcW5SBfjGo/oiLvEnLsdgvxHxxe1ifDFmxX6dstUfxlN7oE+tSdS27kUUcMmhXagfE6zyRrGjDyLflFY9yzR1JHBlmxIK7kLo7Lt3l6w5BI8eMEpbdPeg4emvEARncwTMCInlscxdB+ehFQB/u8jUSQDzHm4xYqKx+eClP3YiC0mj0RjajK4E7yXgnh87ESec4MgyzeIerkQ6YEJSXdJTHgmzpp/TIKAuUSXliyD7b4itbpFsug3TKyzHVleqDY9I1zxv3SSedY3zcJg0LNmKP2hdp8rtL7CYuj5c84lUHyCJ9DNhd147ERXWsvCqP42Ihu6pY6/xSXUsXnWvkU3msCapXGFTJVR2Kl/SQLLUJ9FTbVFo4R37kieWwrXaNHLW/yFI6ciwP0iG3R7aje1W7kY6SK+ZlOlOuOKq9wKGubtXOcp2xGfvQuZf+8RxGDumRiwzKVt1wjHi1AZUh23IdyFenu9hIPvukV90jN9aR2FBubAeKr2KGTNWP6pl6IMjGMhukn+qd9OSrYp7bX7Yf8+a65PuUL5vyOiqTHeNgqvonXm0AeeIV08NI7TnGK5/aA/lzueSVnkrPvtKSl8C+jquOtY99sI3MlZ+1zhvSE2LbEDfyEqhrdCRPLgNdY3ujXOlXxaysbSC7Tpb0LWOKjpQlPdhHXxb0JVBH7NM+IxOOkYayxSJlCD+5bB3K5WC3uFMO+8iVbeigoLwcU52JtxgrfVX5yFLbq9KdNKo/saCtwEL1IL3RWe0AedKDNcewTYzRm3zaj2llW9SJbfLnoVe95umb7E9kZPgre3fU3EXp7oU7mngHwx0XI6e6K+fuiTv1jTBy3OtO4OjqahqFYQQEeYxGs42cn/78Z8XFS5dSmdxxnTx1qnuXzygJdyDxDrBXWdiRL9hUFrALXZCvux/SxvJI884vf9EdvYEDejPyqcBoqfgcXT2Worm7ygPMsFsj0YycssTyFhYWuny468J+Rj4IGrXO5WofOZT74rlvJR2TrNXVdAeLHEbJiGMpC9TDa999vct/cbEzIkNeAu1Coz5l+Ykjba902EUaRoN3dm5WierGY7dGh7qRYYNR40dPnSqWlhZD7Pub1A16MeJYFhgdhIlG6EgDR+RSLuWjL3I0elDFmnwsL5w9m/KRl/D+aPdWcWF9PR2L7YDyGfmokqu2wAg3OkkPyZfupFMdsY3ci5deTnkOhXpXORwjDbapDcfR/829eXuUw3nA+RIDXKvsYWSPwCindIp52b6xNydtca/uNCKqNhx1pg7oIzgfpGunDZXXrdqi0qps6ueREw917e6lP+2KPATZiw5wU/8l2YySqm+QLZGn0rGmfyM9oy5lI1nEUdeclwTqGFnUK6Gujakd9GKGPSyMxBN0nmmuIO0EHfN6J6300PWDPpSRO8qkXfUbkEde6pRAm6PuNBpI3xxHgeGR120/ZWKrzkHW7F+5/GqxunosMaGtEdALRmUMVB7tVecRetOmCGpb0pNy0JtyFLg+EpSGbTFQHPvoR17WeqIhGaov7aMr5yu6oHsMMOQYcmJgRJS0ejpBWVyPqRMWAjaK2epeX7Bddq1rICuW3WQbm8Tj8OEjKQvnGH1i0nXvCS9pYh00kY3dX3vmq8k+7JLN8pGwmzomHZyQT/sQ23S+7dUNfOCLTgT0gbX6hTp9VJ7OKUZu+/HJpDftBZ3VDlRnKlv9v+oa/ahrnYNKxxo7WHiSq8C1SvWvuHGtPzAuwVEuAHB+qFB1xkBieXGvo+aYnCLlpXKBVnT6LEVXrtUouKAgbyk7CcmoC0ca0h/ivRYaYT8BO4tzncekdDA08NRQbmx3nVAamB5FYzd2RMer7EJf5uRho05m6UheNUzi4iNH9KGOaNQKpFcnrTit1Vj1CErxWqN71YWZNOgRHRh1gOig7br8yFA9kqcswO6ptbXUmdChpHZUlrBhnB73cbLLYcmzqv2VddqkRWfaJRfzGNCPDgL+pOEiogBrOppop+oJWehy+PD76al32qY6UFiz5KFXHZI/6kGZ6EC7oVzqCZ0JtB90lF7iw/nHBSQeIz1yFha2UvqFlZVUDu2eDhn9Y7nSmxsMytXFW/E4sdKHtZxdHdea9oZ+qiP2I1fpTBqx4eLA0iuoLdJG1E6UhzKePfNccsbr9Cc9uunRKXUGa53HyJVjor6haws3jysrXf4qW2ts0kCAOKOLbgSQlzMnDxdV6rmqjYk77aAXM90gyh71P8je2VlOzpwumNJba+xGH24IFCibGw3OcTnxOla3przYL5CWaxJOHvIpBx48tqX9Un/DBtksOdjOzVlqf2c7Az5sc+FnjQ5lgfjYD3C9VB2wLmt/CwuHuqLUXroRe22OfZWpdUwTt7GFBWYs9F0MzBCH06L2hZ7E0Taizsgqu96QlqBzSe0jll223UuW5JblrYoru86SFt1oP3n/XSWHeNpSnp56oK3DZXOvb472Es+CbfCjXukPuPak68HeTU1Hp3qfoUo35A/jk6meynysWCY2ELgRz0OZ70L/Lqc88Snpm3I5o9qfyMiwlOVEY6SJhQs2jaJujqXyjWNNQ0CHuOR3NeMolzKwn46XbRq6OjKcAU42QlknMg59BpGJjnSCkZ22qWOOV50k2CsHg86cekgXhT1nnM6j7sLeRF/Kf/jEQ8mZ0MhmvCg0kRHTII+RF5yHQYMuWtS5WGmNjqnz27uJg4cCZecXKGQR8tFO5WEth/wHb/7wlvJwfJBbVYcaWYjlUiZ5qDN1hLphYT/eyFKHBBxTnKm8LZBeeUkHE/TEaYztIwnZ+5E9uU7oinxYcKzsgo8I8sNYIbWzMHdbOnNRUlrVT1zHupEs3cBF1ujBQt2y7qU/shg1hTEL7e3RU4+lIrhx1wggjgfldGztzKHFsW9y0Zc+Gk2l76UsQuTKfqrrPa7sl91kxHbQi5nsVx1QHgsXy9zxTwqFH8qJzgKHyMtIp+otJK/cxKa8XyAx5ePIiQEsYdXPU8nKQnsc4OLPjSe6JT32nviVZYtPL8qOc17Htsp2PzcKZTLL4pBJv03/AX9uHHCMqdvOeXwmtUfsYcCkalClTHbb4zj/c8bsVwXaktLrhpO23OR8RSZMSctNBv0MC9wJ9JXD+gy0efooFvSk3Y/aJ6MMMYjrMgbwJT32dvqFTj9axXeU8WN3hqk87owwLA/A4CJLhQNAdxFKly5Y4aUJXaQ5LodAaeNa8tQBx2PqVPvpRGP+Qba5K5IDGPPrDhS70h3fsdXUedEwaRTR3piv1zY26kKltBoZg00ecGTojCNT0lcFjcaVHae+kSPb8jSMfuiijBNEWkaNVC+Uq+08b5N9dcCMqMcLgexGPwU98utVHm0FPfUYVSPi1GlZvUp+XMOXUMWFY9QZ5wFLXaCjKOtIyINu6CQZsU6jzLo6VLqYVxc06g6GrCmDNOxHfTiPOUYauEc5cCA9Dix1Rd+gc5H0tHvtS4+qNToh+67DR9KThrp6pI3t0zG7YYs6o3s/517ZucWNE3biJFSFqD9psJ/AtARskb6k4wJIv0Cc2qNuQLBN27Es2MCXi2YMnbrpjE7GeG1TR5Shx+qK11ptLLaDXsw65/X+0WtsREZ0/FWG1mpfYqN41qqzGFe1XdUvKL2mb2h/lOtb+mJuHvem6+gRMHVOiDeJuQ55H439cGGBf12fncsadp8yaY84v5yzeqKBXLVVHB/00hQolVl2vdE5X3cOK39cj1JWlFu2jW6ca4MGrnc4xLRF9QuyN7YR6plF5zQ3wOzjpHL+w5QwqM/AOTesTya9y3ysyAcbdA7H+KptbKM90eelJyVhFLwqz6jix+4Mc9JQgVR+7JRp/DQKPfbkBOK4Tgq2aQDMqxJ43amTBlh1AXmkoeIJ3EHhlEofOmAdo6x4Ua6TO8gx5plia3ScYuPGYeiMonUeo9N4eJTHepAAM2wT7y7rvTvKXCasaISUSejFV6MZOT94a7SyahSDeGxnwT4edbLWCV51Yc91VpuQDhzHXhhjT3SEOYZ82iEdiLheWD+f4mkTdQF58Y6WCwCBiwGLgnTJR0I5rnati6DyxDUdS34xVMcg2YzCwI5OlbTYhU0EbOcYTxXIxzHd5ZOfc4CFUFeHnfa41GWF7rHz5qILSwLlESJDOnbZkZjvnYekZX50Sr/8/jxM6oHAcfJKdorc+5HTIHukE3aSHvuiDjEv9c0ih4e07EtH0kadufhwXOePHCkxiLLZps1GWcTBkHZDXuzqpT951KY5jzQqTDz1qPaD7upHiJctykt6BY7Dhpsn5ecYdlEGzi7M0JU02Kw6kv51bSy2g17MOiP37z+yRw/KRi90L6tz0sj5yG8iqQvY0rf2CnX9AnnTObbRGZ1lH6Ys9KOjCMhSW2INY85RApyxPdVHGJ2uKjf20divGxY4IIM4Aly53qncKnn9xlNGdKTiOUudUCb2SgfaVF53GoWXLcjgvKY9VJ3DVXoOK6szKND7fRLK1/sYOv/Qm/6UPrlpwCGmvVEvcJLN3Awhj4B8zl31GerLO+fs+21yUJ+BMmlz1FdsH7QZ2k8zn6xTV7HfoO71RQnxkG/BPGnaAgFepGVfT2zj4IP6EvQRA8kb67rJW3b9puFNwfwNQL2ZqLc1y97C1NuKpCF/fANUb6pyjLcRn9h7yxPdeOOQ+DwojfLorUvecERH4lmiLnpLMb7RGOWqLOXN13rzMuZhW29FxvR6k5fj6IbNOo7u6IhuBOKjTuKh8sgb5ZGWvJIX8yKXJYZYPvnEJ6aJ2zlb1RX8VK7eOo359Dap9EIO6dGdeiFe9ZTbGOWwjY7kV1C5kh3XpIk2cgxm4icZrNUGZFM8VndczLEjD7R/9KsL2EK6POSso85sy+7cHo7FNiXGkp/LjfZGVnr7F1kEylN7Ys3xGGArO/JzTe0q1nHUEZ3K+CG/zB6Vi05Rf8VrjY7SK9dZ7U42kYdttZ9or+RpXZZXx7ARGTov6/RXHsqCQQyxjiWPNfZyjpGnKqAf5csW1rCItubnJHVEnEIsP7axnEsdM/X/sa0ovdqCyotrpYn6s52XLRtjXm2TNs+vfaVR/jLZSsMa+1Wf7KuviDxjeliSR+0PXfJ2qjfxy/pLyRIHnT/oqXNMacRYtklP6o841gqSp33ZEXWTrXl+5VU56KRzNvYpUcdcBvtiQrp43iOPRUG6VTGuk6W80S7JZS326FB2LpOPY5RBYD+2J/SkjLKQ26E0lIMM+JKXhbSUwwKX/JxQ3YozskiDDOWDIXKQTagqX3pIpvKTL2cczwvKihzRO9Yh5aFfXtfoGdOxLZ7oomOxPRPHoiA9tE/Z6B310bFB18WgGevyAQVwDiYwTgLqmGIHMc7yesmm3esC1CvtvB6nw1NnPa8MquxWB896HgLnyqjOF5gdVLvChtyJ6Kf+cAx66S4HtB+5Tjs7BKj//CZ5dqy71RKupXXnlPrKUTrDY58mMdZhbQufawI8guExlx4NHiQMHnnxWEePPw9Sl7aUDY/4SBVG1FWTR9ttsWGSeugTZjw6n/WgtjCq80WfoZo0Nx71Dvs4l8+f8SjcwQTKCNDG0nsie595K0szS3G6lk50ikRRFGNzhpn/Ms55uLNU+bZlcAK8qMT8b81HGlzScDmZf8U83nlwZJqSYl4ac+SYA0dfwPw6LvrEObxPgBsE+DCvVm+cv3909rZ4AY+2wHz7UZ0vejlp0rQWFhbSS2SD2MFFn3pnvvqobgombb/LGy8B5vQyv5YXwhn8mfXAnGP6hrprKdcTvcQ+Sh63MUA9SoGWZQImYAImYAImYAImYALTQmBsI8PTAsB6moAJmIAJmIAJmIAJzC8BO8PzW/e23ARMwARMwARMwATmnoCd4blvAgZgAiZgAiZgAiZgAvNLwM7w/Na9LTcBEzABEzABEzCBuSdgZ3jum4ABmIAJmIAJmIAJmMD8ErAzPL91b8tNwARMwARMwARMYO4J2Bme+yZgACZgAiZgAiZgAiYwvwTsDM9v3dtyEzABEzABEzABE5h7Av8fY8YBxdBTrpcAAAAASUVORK5CYII="></p>
</div>
<div class="specification">
<p>Equal numbers of oysters raised in seawater with a normal CO<sub>2</sub> concentration and in seawater with a high CO<sub>2</sub> concentration were then presented together to the gastropod predators in seawater with a normal CO<sub>2</sub> concentration. The same numbers of oysters from the two groups were also presented together to the gastropods in seawater with a high CO<sub>2</sub> concentration. The bar charts show how many of the oysters were drilled by the gastropods and the mean size of drilled oysters.</p>
<p style="text-align: center;"><img 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"></p>
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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how acidified sea water could affect the shells of the oyster.</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 trends shown in the data in the graph.</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>Estimate how much smaller drilled oysters raised in seawater at a high CO<sub>2</sub> concentration were than drilled oysters raised in seawater at a normal CO<sub>2</sub> concentration.</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>Deduce from the data in the bar charts which factors were and were not correlated significantly with the number of oysters drilled by the gastropods.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest reasons for the differences in the numbers of oysters drilled, as shown in the bar charts.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The radula in a gastropod is hard but not made of calcium carbonate. Outline how this statement is supported by the drilling success of the gastropods in seawater with normal or high CO<sub>2</sub> concentrations.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Using all the data, evaluate how CO<sub>2</sub> concentrations affect the development of oysters and their predation by gastropods.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>Shells might dissolve/deteriorate / become smaller/thinner/weaker / OWTTE<br><strong><em>OR</em></strong><br>shell formation reduced / more difficult</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. positive correlation between shell thickness and shell size<br><em><strong>OR</strong></em><br>as shell thickness increases, shell size «also» increases </p>
<p>b. (positive correlation) occurs at two different CO<sub>2</sub> concentrations / both high and normal concentrations </p>
<p>c. trend for thickness is «slightly» lower with high CO<sub>2</sub></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«approximately» 0.2 mm<sup>2 </sup><br><em><strong>OR</strong></em><br>«approximately» 40 % «smaller» </p>
<p><em>unit required</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. significant factor: concentration of CO<sub>2</sub> in which oysters were raised </p>
<p>b. insignificant factor: concentration of CO<sub>2</sub> at which oysters were presented to gastropods</p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. (because) shells are thinner/smaller when the oyster is raised in high CO<sub>2</sub>/lower pH<br><em><strong>OR</strong></em><br>«because» lower pH/higher acidity prevents/reduces deposition of calcium carbonate </p>
<p>b. gastropods target smaller/thinner-shelled oysters more </p>
<p>c. gastropods can eat/drill thin-shelled/smaller oysters at a faster rate (and move onto another) </p>
<p>d. eating smaller oysters «from high CO<sub>2</sub> environments» means given population of gastropods require more oysters for same food intake</p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. data shows that similar numbers are drilled regardless of conditions <br><br>b. since radulas are not affected by acidification <br><strong><em>OR</em></strong><br>radulas not made of calcium carbonate so (remain) strong/successful at drilling</p>
<p> </p>
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. the data/trend lines indicate that a higher CO<sub>2</sub> concentration diminishes the shell thickness, making gastropod predation more successful<br><em><strong>OR</strong></em><br>the bar graphs suggest that oysters raised in a higher CO<sub>2</sub> concentration are smaller, making gastropod predation more successful </p>
<p>b. CO<sub>2</sub> concentrations «during feeding» do not change the occurrence of drilling/predation «by gastropods» </p>
<p>c. «limitation» no information about how exaggerated the CO<sub>2</sub> concentrations were<br><em><strong>OR</strong></em><br>«limitation» no information about numbers of gastropods used «in each setting»</p>
<div class="question_part_label">e.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.iii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<br><hr><br>