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</div><h2>HL Paper 2</h2><div class="specification">
<p>Oxygen is needed to complete aerobic cell respiration.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how chemical energy for use in the cell is generated by electron transport and chemiosmosis.</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>Outline <strong>four</strong> different functions of membrane proteins.</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>Distinguish between anabolism, catabolism and metabolism.</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. NAD/FAD carries/is reduced by gaining «two» H «atoms»/«two» electrons </p>
<p>b. reduced NAD produced in glycolysis/link reaction/Krebs cycle </p>
<p>c. reduced NAD/FAD delivers electrons/hydrogen «atoms» to ETC </p>
<p>d. ETC is in mitochondrial inner membrane/cristae </p>
<p>e. electrons release energy as they flow along the chain/from carrier to carrier </p>
<p>f. electrons from ETC accepted by oxygen/oxygen is the final electron acceptor </p>
<p>g. proteins in the inner mitochondrial membrane/electron carriers act as proton pumps </p>
<p>h. protons pumped into intermembrane space/proton gradient across inner mitochondrial membrane/proton concentration higher in intermembrane space than in matrix </p>
<p>i. energy «from electrons» used to pump protons into intermembrane space/generate a proton gradient / high H<sup>+</sup> concentration is a store of «potential» energy </p>
<p>j. ATP synthase in inner mitochondrial membrane/cristae </p>
<p>k. energy released as protons pass down the gradient/through ATP synthase </p>
<p>l. ATP synthase converts ADP to ATP/phosphorylates ADP </p>
<p>m. oxidative phosphorylation «is ATP production using energy from oxidizing foods»</p>
<p><em>Accept H+ but not H/hydrogen in place of protons in any part of the answer. </em></p>
<p><em>Accept NADH or FADH in place of reduced NAD or FAD.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. receptor/binding site for <span style="text-decoration: underline;">hormone</span>/<span style="text-decoration: underline;">neurotransmitter </span></p>
<p>b. cell-to-cell communication / cell recognition </p>
<p>c. channels «for passive transport» / facilitated diffusion </p>
<p>d. pumps / active transport </p>
<p>e. cell adhesion </p>
<p>f. «immobilized» enzymes/enzymes embedded in the membrane </p>
<p>g. electron transport / electron carriers</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. metabolism is all <span style="text-decoration: underline;">enzyme-catalyzed</span> reactions in a cell/organism/is <span style="text-decoration: underline;">anabolism</span> plus <span style="text-decoration: underline;">catabolism </span></p>
<p>b. anabolism is synthesis of polymers/complex/larger molecules/larger substances «from smaller molecules/monomers» </p>
<p>c. catabolism is breaking down «complex» molecules/substances «into simpler/smaller ones/into monomers»</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 a chloroplast as seen with an electron microscope.</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 how water is carried by the transpiration stream.</p>
<div class="marks">[7]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how flowering is controlled in long-day and short-day plants.</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>Award <strong>[1]</strong> for each of the following clearly drawn and correctly labelled. Label lines must be unambiguous in terms of what they are indicating.</em><br>double/inner and outer membrane/envelope – shown as two concentric <span style="text-decoration: underline;">continuous</span> lines close together;<br>granum/grana – shown as a stack of several disc-shaped subunits;<br>(intergranal) lamella – shown continuous with thylakoid membrane;<br>thylakoid – one of the flattened sacs;<br>stroma;<br>(70S) ribosomes/(circular) DNA / lipid globules / starch granules / thylakoid space;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>transpiration is water loss (from plant) by evaporation;<br>flow of water through xylem from roots to leaves is the transpiration stream;<br>evaporation from spongy mesophyll cells;<br>replaced by osmosis from the xylem;<br>(diffusion of water vapour) through stomata;<br>water lost replaced from xylem / clear diagram showing movement of water from xylem through cell(s) (walls) to air space;<br>water pulled out of xylem creates suction/low pressure/tension; transpiration pull results;<br>water molecules stick together/are cohesive;<br>due to hydrogen bonding/polarity of water molecules;<br>xylem vessels are thin (hollow) tubes;<br>adhesion between water and xylem due to polarity of water molecules;<br>creates continuous column/transpiration stream;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>flowering affected by light;<br>phytochrome;<br>exists in two (interconvertible) forms/P<sub>fr</sub> and P<sub>r</sub>;<br>P<sub>r</sub> (red absorbing/660 nm) converted to P<sub>fr</sub> (far-red/730 nm absorbing) in red or day light;<br>sunlight contains more red than far red light so P<sub>fr</sub> predominates during the day;<br>gradual reversion of P<sub>fr</sub> to P<sub>r</sub> occurs in darkness;<br>P<sub>fr</sub> is active form / P<sub>r</sub> is inactive form;<br>in long-day plants, flowering induced by dark periods shorter than a critical length / occurs when day is longer than a critical length;<br>enough P<sub>fr</sub> remains in long-day plants at end of short nights to stimulate flowering;<br>P<sub>fr</sub> acts as promoter of flowering in long-day plants;<br>short-day plants induced to flower by dark periods longer than a critical length/days shorter than a critical value;<br>at end of long nights enough P<sub>fr</sub> has been converted to P<sub>r</sub> to allow flowering to occur;<br>P<sub>fr</sub> acts as inhibitor of flowering in short-day plants;</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>Diagrams were variable in quality. The poorest were very unclear and labelling was often inaccurate. The double membrane, grana, stroma and thylakoid were most often correctly labelled. The connection between the thylakoid and intra-lamellar membrane was often not shown.</p>
<p>Failing to close lines when drawing membranes was also problematic. In some cases thylakoids were coloured in obscuring connections.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The importance of adhesion and cohesion was covered well, although these were not often related to the molecular properties of water.</p>
<p>It was the process of transpiration and the resultant force created that was less often mentioned or just given a brief treatment, losing marks for many candidates. Commonly, how water moves from soil into the root was detailed.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Phytochrome was known about and that it exists in 2 interconvertible forms. A number showed evidence of memory of facts but with lack of understanding because details were confused and terms interchanged.</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 metabolic processes that occur in starchy seeds during germination.</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 light-independent processes of photosynthesis in plants.</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. water absorbed by the seed / seed rehydrated;<br>b. water activates metabolism;<br>c. gibberellin synthesized/produced/secreted;<br>d. gibberellin stimulates the production of amylase;<br>e. amylase digests/hydrolyses starch to maltose;<br>f. maltose converted/hydrolysed to glucose (by maltase);<br>g. glucose used in aerobic respiration;<br>h. glucose used in synthesis/production of cellulose;</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. occurs in stroma (of chloroplast);<br>b. energy/ATP and NADPH provided by the light-dependent reactions;<br>c. Calvin cycle;<br>d. carbon dioxide fixed to RuBP / carboxylation of RuBP/ribulose bisphosphate;<br>e. by RuBP carboxylase/rubisco;<br>f. forms unstable 6C compound / forms 6C compound which splits;<br>g. glycerate 3-phosphate (is produced by carbon fixation);<br>h. (glycerate phosphate) to triose phosphate/3C sugar by reduction/adding hydrogen;<br>i. using NADPH/reduced NADP;<br>j. triose phosphate/3C sugar converted to form hexose/glucose (phosphate);<br>k. most/<sup>5</sup>/<sub>6</sub> of triose phosphate used for regeneration of RuBP;<br>l. ATP used to regenerate RUBP/convert glycerate 3-phosphate to triose phosphate;</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 prepared candidates gave thorough and high scoring accounts of metabolic processes that follow water uptake in geminating seeds. </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was another high scoring part of the question for stronger candidates. A few misread the question and wrote about light-dependent reactions. The use of the abbreviation GP is discouraged as it is ambiguous in accounts of the Calvin cycle.</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. Describe a model that accounts for the ability of enzymes to catalyse reactions.</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>induced fit model; (do not accept lock and key hypothesis)<br>accounts for ability of some enzymes to bind to several substrates;<br>enzyme with active site to which substrate(s) binds;<br>enzyme active site and substrate do not match up exactly;<br>enzyme-substrate complex forms;<br>enzyme changes shape once bound / enzyme moulds to substrate/ hand in glove;<br>change in shape strains bonds/facilitates bonds breaking/product formation;<br>reduces activation energy;<br>once reaction is complete, products leave and enzyme can work again;<br><em>Award any of the above points for a clearly drawn correctly 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>Most were able to score some marks for a reasonable diagram.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some weaker candidates were confused by the link between parts a and b and thought that they had to describe membrane enzymes. A description of the induced fit model of enzyme action was required. The markers were amazed at the lack of detail in the answers, with many not mentioning active site, substrate or ES complex.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates gave a full account of the synaptic transmission. Weaker candidates knew that calcium ions were somehow involved, but little more.</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 role of <strong>four named</strong> minerals needed by 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>Explain the processes by which minerals are absorbed from the soil into the roots.</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>In anaerobic conditions, plants release energy by glycolysis. Outline the process of glycolysis.</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><em>s</em>ulfur – part of amino acids / proteins;<br>calcium – strengthening/formation of bones / muscle contraction / synaptic transmission;<br>phosphorus – formation of nucleic acids / ATP / GTP / NADP / phospholipids;<br>iron – formation of hemoglobin / transport of oxygen;<br>sodium – nerve impulse / sodium-potassium pump / osmoregulation;<br>potassium – nerve transmission / sodium-potassium pump / osmoregulation;<br>magnesium – part of chlorophyll molecule;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>plants absorb minerals in ionic form/mineral <span style="text-decoration: underline;">ions</span>;<br>nitrate / phosphate / potassium / other example of mineral;<br>minerals can be absorbed by (facilitated) diffusion;<br>(diffusion is) movement of ions from high to low concentration/down concentration gradient;<br>root hair cells provide a large surface area for absorption;<br>fungal hyphae help to absorb minerals/phosphate;<br>minerals absorbed by active transport;<br>as mineral ion concentration is smaller outside the root than inside / absorbed against a concentration gradient;<br>active transport requires energy/ATP;<br>occurs through pump/carrier proteins;<br>proton pump transports hydrogen ions/H<sup>+</sup> out of cell (allowing mineral movement in);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>occurs in cytoplasm (of cell);<br>substrate is hexose/glucose/fructose;<br>phosphorylation of glucose/fructose/hexose;<br>to form hexose diphosphate/glucose 6-phosphate;<br>requires ATP;<br>glucose/fructose/hexose (diphosphate) converted into (two) pyruvates/three carbon compounds;<br>oxidation;<br>to produce (two) NADH + H<sup>+</sup>/ (two) reduced NADs;<br>net gain of two ATP (per glucose);</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 part (a), most candidates had no difficulty in naming four mineral elements that are needed by living organisms and giving a role for each. Carbon was not accepted as an answer, as conventionally it is not regarded as a mineral. In plants minerals are absorbed from soil or water. In animals minerals are absorbed in an inorganic form from food or drinking water.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part (b) of the question was not answered as well as expected. There was some confusion between absorption from the soil into roots and movement through the soil to the roots. As a result, many candidates suggested that minerals could be absorbed by mass flow along with the water that was being absorbed. This shows that the selective nature of mineral absorption has not been understood. Another common fault was to suggest that diffusion is the main method of mineral absorption. If plants are able to absorb water by osmosis, they must have higher solute concentrations inside their cells than outside and this can only be achieved by active transport.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There was generally good knowledge of the stages of glycolysis in part (c). To make the marking of this question fair in relation to other choices, there was a restricted set of points on the marking scheme, but the more able candidates were still easily able to score full marks.</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 condensation and hydrolysis in the relationship between amino acids and polypeptides.</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>The protein hemoglobin transports oxygen to cells. Describe the processes that occur in the mitochondria of cells when oxygen is present.</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>Sickle-cell anemia affects the ability of red blood cells to transport oxygen.Explain the consequence of the mutation causing sickle-cell anemia in relation to the processes of transcription and translation.</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><em>Award [3 max] for condensation reactions</em></p>
<p><em>Condensation reactions:</em><br>condensation is two molecules joining (by a covalent bond) with the loss of a water molecule;<br>example of condensation reaction;</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAArYAAABfCAIAAACStRPYAAAYKElEQVR4nO2d34scx53A6w/Yl33ch4BhWfCDIBjRDzHhWD14SRCkHw5jYo5FER3sYA6dH3qN4OwcF/dBbkBBbhMl5wxxG5PYmELidEfUxvsQuYnj89yNgi10ddi+aFse48gVZRm7V9ZqpvLw3Sm1qmdmd2e6uqu7v5+n3dZqqqd+fOvT9auJQBAEQRAEyUDKvgEEQRAEQUwEFQFBEARBkDGgIiAIgiAIMoYyFSEIAndEFEVCCDdFHMf5Jqd8eBRF6Sv5ptUclFyN41hfrmaLLFuFkCbDOacphBCMMfmrvhoSRZHnea7rep6nL5X0V+OcZ79sjpSVk4hplDyKEAQBIaTb7corjuMQQpIk0ZGc8uFJkhBCfN/XkVZzGJurjuPoSItzrhQZpVSpQkiTgepn27a80u12CSFBEGhKznVd27YppXEcB0FgWZa+kAJtTT4+aW1r2Q8Pw1BfTiJmUrIiMMYIIYwxecV1XUJ03VX20ZYQkruAN41skRFC9A3MKEWWrUJIw3EcJ139oIZoaua+7xNCOOfFJAdCnL6iu61lcxLbWqNARUBFmBdUBMQolGaur8+G5+xsVbdt27Ks3JMTqAhI4RihCGEYshEwkqYpOdd1HcdhKVAR5gcUQclVrWHL932ZFgx+YthCJEozhxqio5lPCiDQItJDC3kBilBkW8vmJLa1RmGEIvi+LxfC2LatVRFg1lCCijA/EBCVXNX9ZCPTgpFeDFuIRGnmUEOKVwQddVKGrMLaWjYnsa01imxnvM02X2utHyGEEHJkvf1+f+9ie2N1idzH0Y3Nm3MmjxMNNQAnGhCjKGyiQT7hZG9AUxDDiQakYO6vx4Mbm6fXyOrGy53eQNzc3DhK1tpssH2tfXKJHFk/E/UGQvTfba0ukeVWZzeH5FERagAqAmIUhSmCEMKyrPTuCTF5gUIuoCIgBZOubV/doE8tLT1Fb3wlhBj03jy9urzWvjbY3txYImStzQZCCCEG19prS/d+nY/s5JZuRUi3Z2jMqAhzUqQiZIsM50cRBcuyClME2FEpPzxJEt/3LcvK/VgXAIb601eKVwQ8FKFR3Kttgxv05NLSWvvabq9z4Y3W+tJo2AAUYfVMpz8Qg967Z9aXyJGT9I/zG0IURbDyAFbECCFgVzGM3eW+2AdaF+zr5ZwzxqBvsywLLWFmlCLjnHueB7ma+/7pbJFlqxDSZDjncNSKrCGMMaiQjuNo6tuiKIKxBGgLtm1r8gNKKbQ1iGDZL5sjnHMImOmchLXk+nISMRCpCLs9+sTeGoPVjTa9sMm2R/806DMqFyIsrbdop5fHCAIyI9gXVh3OuaZeBCkLWPOPxYrUDKkI/U5rlZDVVqc/urJ9rf3ihd6uEGLQe/fl06fPvItmUCZwtjFYPAwA6thVhWil2+3aI3QMtOSCPE4YNpcKISilMMEPz69l3yCC7E8cxzCABG2NUqrp0N56IxVhsL15eoksrZ5+szcQon+Nbhxf3aCsPxCwbnH1NL03rqDnVrQtQTAhuTmJ4xgOdoVazjl3XdeyLNPidZG5Wq0SFKO1ZnKQttvtWpbleV65dzUWuf9eXtG6SEgThd1wOqFSEq1TWrkgT92GCAkzkppOqq43qYLfW2ewN5vwxiYbjSfc3Nw4OtrouLbRfuOCnokGVIQpwHNn+kr2bQUmgGFrEmPLK4oiM9d/oSLMnBAqQukkSWJZliIEysJS5IDsV/D999vrj7c6t4QQos826RvtjbVcTkQYcyuoCBOI43isDWg9iXI2MGxNYuzrpsAbDBxIQEWYOSFUhNKZZANE2yuvasz0gt9h7UczRyBs0fUja+1ruQ8koCJMYvohbkatkMKwNYlJJ9Np3bQ2M6AIhR17qglUhCqmNT+T3v5axTpcOgdQBLK28fJopeKg16Gt9eW9sxNyvhVUhAkUfxT8zGDYmgTsT6uWIhT28hRNoCJUMa35URb9SKpYh0tnv/wCJ7h38vLaRvtip5e/HwhUhMlMGo52HEfTC+VmBsPWJOCIJyVsmbmgROBEwxwJoSKUDk405IhBBY+KMAUI0OlNO9C7mLb6BsPWJGAJlTJgkO2JDQEVYeaEUBFKB9qasr4bvMHApcGGY1DBoyIoJEnieR4sNeCcwxpdiNrG7uHBsKUAp1nAz7B/QR5DCYflmRmzUBFmTggVoSzSAROEwPM8uekRNo2XfY/Vw6CCR0VIkyQJzCPIpQZw/Ls8b9i08QMAw1YaeZqFvALnAcMxup7nZVdUmUAURXBQkjw6KQiCKh6dhIpQxbRmAwKm4zhyqDV9dBK80rrcO6woBhU8KoJE+oEcQjBq28IUMGxJFD+I47hCnWs9QEWoYlozoPgBjNKVfVM1waCCR0UAFD+AnsbArfNjwbAFKH4AUwxhGJZ7V3lRlTf+oSJUMa3DovgBND0cM8gLgwoeFUFM8IP06JnhYNgSE/ygZvOgcMyD4ZaAilDFtA7FWD+oUMA0H4MKHhWhBtUdw1YT/AAw3xJQEaqY1sGpQcA0H4MKvuGKUI/q3vCw1Rw/AAy3BFSEKqZ1QOoRMM3HoIJvsiLUpro3OWw1zQ8Aky0BFaGKaR2E2gRM8zGo4BurCHWq7o0NW830A8BYS0BFqGJa+xLHMZwKU4OAaT4GFXwzFaFOfiCaGraa7AeAmZaAilDFtKajRMiqB0zzMaXgRSMVoWZ+IBoZttAPAAMtARWhimlNAf2geIwoeKBpilA/PxDNC1voB2lMswRUhCqmNQn0g1Iov+AljVKEWvqBaFjYQj/IYpQloCJUMa2xoB+UBSpCCdTVD0STwhb6wSTMsQRUhCqmlQX9oERQEYqmxn4gGhO20A+mY4gloCJUMS0F9INyQUUoGnj/WF2re0PCVhRFQRDIn9EPsoAllPv6MVSEKqalEEVRjQOm+RikCE0Dq3sNQD+YQhiG+MI9JC8wYJZCQxUhSRLGGMSvAh504jhmjMHPMmi6rovVfR4gV+XrX3UnxxiT7+aWpYZ+YDLQzOHnAmqIfAdxkiQ1c6MkSWScLDgnZVurgh8Mdz5++zxNcf7tj3eGYvinK/+Zvvzvlz/+YtrH7HJ2+Xz7bKvVarVa51699D+9nUFRX0GlNEXgnAdBYFmWfKuhvEgI8TxPU0WM49hxHNd1KaWO49i2bVmWjoSAIAhs2/Y8D35wHEe+pTSOY7Or+/4wxmA8Od10GWOe5xFC5FB87kDZyVy1bVtfP50kied5tm0HQeD7PiQnOx75AzIWzjnUENu2ZQ3hnEMN8X1fUzNnjIGCQ5G5ruu6ro6EANnMoaqkm3leyJxU2prrulpzstvtwtopz/Mgchack91uF/5JPg+YzHDnVu+jN71jS4QsHfPe/Kh3a2cohNjt/+mj//rZ9xYJIQ8+/dr78a2JXf7dPjv/3HeOLB/fOEffeqfz3jtv/epfTzy8aP3g3O8+2S3ym4woeRSh2+0SQizLSpd9OprkCwxVpbsuuAEdaYlx07Gu6+rrOMtCWp28EsexvjgCY/vpvtn3fU3JKWtL4YplWWgGhwJqiFJG+todNPN0J00ptW1bU3K+76efc5IksW07d0UAsm2Nc67vq0FbC8MwfQP6mjbkpHQdrTmpky26vkzI8jrdSl/d7bSWCSHrtDfxPw532KsnVhYWH3vp/f7d1P/cuvTMKln49nNvxcVbQsmKwBhzHAfUWF7UVwXhEVC5qCk5xhghRKnfnHOtDj4nd6+cfeihs1fu7v+XaeCZXvmymr5mHMfZ8Ql40NeRHERkZSoqDMPS1+ofktuf/t/1/rC05CmllmUpkzL6FMGyLKX6QWejIy14xkh3okIIxpimjq3ItpYkiaIjcFFTcmEYZnfBRFFksCJ8ceXst8fFy1kV4c7Vtv0AIavPv3NL+ZfhJ/R7i4SsPH2xdyenmz8o5SsCpRQCsQwfmqog5zzbZ+uDUlr6iu7DsttpLS+3Ooc0VUopjEamW7jWOFLYQzwMIRSTlkbuXG3b3zzR/kNZlgATsDAkLmuIJkUANVf6bKFtBh1iV3bUU1NyRbY1sJ+sDWuKaTD3lL1u8KqOfqe1Oi5ezqYIg+3L//QgIeRrP7z8RaahDm9cfPIIIUtr7WsFr0owQhHEqH5Aw07XeJITYjRoNkURckwLvgUp9byRGZhZEWCaML2yRFMhQj2ZEqRyTAs+zeRRnwMz3L1On1w59sylrVKmM0ER4FFeFh+5f6NgXqUGaj5FInNMSwgBvfWU755jWqLYtgb2U1hOWpalb8ZED/kqwhdXzn6LTPyDL6+esyf/q0ZMUQSY9IUaqfUBtLBRBFCEhowiQByBWQBYSqKpECFXCxtFgK9TTFqaubv93k8eWSxnOhMUQYxWCcB8M9Ej0KAI2VEETcAESjFpiWLbGiiCXC2om7QuVITpirCwvPq36yn+7vjRhXt9/O3eb3966jtHF49+99nX3+8P9z6NEPLA8+/cHpPWbo8+QQghh58InhNTFEGkwoemoAyNqrCHQkMOmNuP21ubL7VG/PjU8cXF46d+LC+8tLk1rrrejwxbYjRUAyufddxuwR0APPUWk9asDHf7n/cOxP+/1/7+ShmLnqQiiNHw9b4P3zMDNbCwRcEwrFWYs2bbmr4tBgU/U0GVMP2ZanB980UZHp8/dXz5vnj54ubWQIwU4YFH251084svPfvAniIMv7xy7uQzv/jN5qVfP//4yt7igz1FmPCMNlKEb5672lhFEKN5RH1BGZ5BFS8OgkDHdBc8JykbebUu9Z+JnBVBTFi+nhecc/DIYnIVjETZURlFkUnmtxdZDsHiD+gnhS56SiuCGPU9mpq5MggvCYJAxz4pMB5lTV8cx5p24RbZ1mROpvNN36DF2FPI4jg2a7niIRRhykTDX37/81eufDkUQojb77W+vrJOt4TYYe1H951oWDx1qeClGSUrQhAESicKFUVTcnEcw0EI0NK63a7nefqeAOQjdRRFjLEwDF3XNXlr7wwTDTBDpDRjrZunZa6GYcgYi6JIa67CaJDv+91ulzEGpyNoSmsmDj6KwN56/vhCGaMIQRAoj/WQq5qSY4zBYGQURZxzOL1D3+MpfBeIJJzzbrerr0LCWSDpK8W0tSiK4Bwq13ULy0lo2prSyoM81iLcvXL2ob959vLnQgy/uvLCw4SQr7c6t7PLFa/TEyuEHHny4o2C1xyXqQgwhKA8YQghtA4SJkkCXbXneWEY6h7Xgk7FdV3f96GZCSE457B6S2vSMzCDIsgSTJtWkiRa3R+O2JK5qnvNM5wSD2dapA9yKWy+Iw9u99760bEy1iLAvjVKaXroRd8+VQAOGoLuk1Kqu5nLGgJRRVPTnpSTWtsajIjInCygrUFa6ZzknBvZ1uZXhOGdqz/71ndf/fDOUAghhp9cevobhDz8zOZn93vAcPf66ycWycIjL+yNPRSI4fOs9QRGyw08THS25YrNBEaYDRtRmMTd/gcvn3jweJF+kD78GEHmAZaRmdfWZlKEx17bkr387oevPfXcxU/uTeYO+39on3ho4dgPL360Pfqr4e6f/7t94iGy8sQrrK/rq0wGFaEczHwlCSrCoajMO5zuXG3bx/7h4vUi/cBxHK1HmyONwsi2llWE4c7Hb7/+i2cfXVkgZGHlsR8FdPSOhv8IWie+QQghC4+c+ukblz/+Qgz5ey94v/zgL8qwwLB/7WLrpLX48Po//qT96+Cc9/fHl79mPfHz3/X2XxamA4MUoeCl46WvVIe3RZhlCbv9mzf783QkReZq6SUoDI1cWe72P/2ssHOTpB+UvjrdhBpSD0zISfPa2nC3/7kSL4c7tz5Nr//5dPSOhpvpy5/dSv78wS//+V9+c7XX6/V6N/73/K/e/Cz9OYOdmx9euXzpPD1/cfP3V7e2S3xqK7/gJU1TBDHuFQBVp2mKIEyMXGVijh8IY2pIDTAkJ+vS1vrslSdW7m0xWnjw2d9ul31PkzCi4IEGKoKonSU0UBFEfSLXvBjlB8KkGlJ1zMnJKIosy6p4Wxvs3PrsvkGF8t71vC+mFLxoqiKIellCMxVBoCWY5wfCsBpSaYzKSVjI1eS2ViQGFXxjFUHUyBIaqwii2ZZgoB8I82pIdTEtJ9ESCsOggm+yIoi6WEKTFUE01RLM9ANhZA2pKAbmJFpCMRhU8A1XBFELS2i4IojmWYKxfiBMrSFVxMycREsoAIMKHhVBVN8SUBFEkyzBZD8QBteQymFsTqIl6MaggkdFACptCagIQBMswXA/EGbXkGphck6iJWjFoIJHRZBU1xJQEST1tgTz/UAYX0MqhOE5iZagD4MKHhUhTUUtARUhTV0toRJ+IKpQQ6qC+TmJlqAJgwoeFUGhipaAiqBQS0vwPM98PxAVqSGVoBI5iZagA4MKHhUhS+UsARUhS/0sIYoi8/1AVKeGmE9VchItIXcMKnhUhLEkSeJ5HkRkeG86pTQMw/SL21mKJEngPbySIu8WFWEsURS5rgs/x3FMKaWURlEk/yBbZJxz+WvB/XEcxzJpqGZKBSvyZuahQjXEcCqUk3Ecy7bGOY+iiFKaDoNKW0uSpMS2Zj4GFTwqwnSCICCEuK4bhiHMBMs+hjFm2zYhpNvtgiLAk6tt26gI5pAkieu68JRDKbUsy7ZtCEnZIuOc+75PCJGCWBiMMcdxIGlQBDgYnxAShiEqQgOpYk7KgBkEwdi2BiEUFAH+2HGcggOm+RhU8KgIU6CUEkLS1TcMQ3AC+NV1XeUbQfMo9C5REabiuq5t2+kuFoxBXlHmIxhjSqEXRra+ZSuY+VTuho2lcjkJXb6swDAWa1mWHHx1XTcdHjnnhBBKaQn3ajYGFTwqwiSSJLEsy3Ec5TpoL/yMimA43W43G4OUi8ofoCLMSeVu2FiqlZPQ3ysrEuI4Tl9UFEFkWh8CGFTwqAiTgK4iCALlejpqoyIYTrbTFUIkSZIuJlSEfKncDRtLtXISRliz/T1MLsDPqAgHxKCCR0WYBHQV2eoLURviOPzspkBFMArP88b294oi2LYtSxAWBJSoCI7jyJuBtQjF38k8VO6GjaVaOTlWx4UQ0KDgZ6jSSsBERchiUMGjIkwCRxFKT2t+JoUtHEXQR+Vu2FiqlZNQe7P9vWVZOIpwWAwqeFSEScBwdHYtQnqBAiqC4cAiaiUGKeNDqAj5UrkbNpZq5aSy7ACAKOp5HvyKinBADCp4VIQpKAt0Be5oqFoJCiEcx1F2NMAqa9zRoInK3bCxVC4nlb1CIlOlFUUAgUBFyGJQwaMiTAd2yfu+3+12IV7LcxG63S6ei2A+8tUGcPiVbdtmnosAO8TSEZNzDhWsWgfLVK6GGEvlcjLd1rIBE4YZbNuWeyDhicvzvAod+1EMFSv4hiMP5jP2dEVkX+C4NzhdUcYjo05XlHcoj6WjKdIVD0FMJooi3/dd103XW865Up8ZY/LX9JmniChXEQqORFOqBY4vzYySq0rzyzetbJFlqxDSZLLVD6P/bGBOIkDJowgwxS4n1MVoX4qm0R7lw+GEDbmABZkNJVcnLa7MhWyRZasQ0mSghqTXfNTvNVrFAKPx6XfIwWg85mSjKFkRsguytK6KwlWsOih4paQ5y/4RM4HjHOSvk44VQfZFaciQk6jjjQIVAWPHvKAiIEahNHNUhJkZqwjY1hqFEYoQhqFcmZU+ACt34MS69LowjB3zIw95TOeqVkXwfV+mBYOfGLYQidLMJx3Hi+wLGb38ENtaYzFCEeDduADsrdKUHLxqL70MB2PH/MizS9O5qlURYIkyADsDMWwhEqWZQw3BZj4DsKoD21qTMUIRcKKh0uBEA2IUONGQFzjRgKAiYOyYF1QExChQEfICFQEpWRGyk1u6FcG2bfkrHrqZC0UqQrbIYEsbhi1EAm/wk7+iIszMWEXAQxEaRclHJ8HKA8/zIMQHQQDvnA2CIPejk2ADvfxwxhj0bXBIZ75pNQelyOSxwTpyNVtksgrBoqp8k0MqR5IksBTGsqwwDIUQcRzDYdKO4+BuvYOTJAkEzHROQuvDttYo8ABmBEFqglHnWFcazEkEQEVAEARBEGQMqAgIgiAIgowBFQFBEARBkDGgIiAIgiAIMgZUBARBEARBxoCKgCAIgiDIGMYowqAXnVk/Qgghq6cp2y7+nlJ8dYM+tbR6ptMfFJlqaTkw+CM9eXS19W5/3D11LvzbxurjbbZz4E87/H85HF/1OhfbG8fX2tfU4tGedIUopw4f/B4Gvc6F9sbqWpuVeIMIghjJXwHigmWtepAsZwAAAABJRU5ErkJggg==" alt></p>
<p>formation of peptide bond between amino acids;<br>(covalent) bond between carboxyl end of one amino acid molecule and amino end of other;<br>many amino acids joined by condensation to form polypeptide;</p>
<p><em>Hydrolysis reactions:</em><br>hydrolysis is the addition of water to break a large molecule into smaller ones;<br>polypeptide broken down into amino acids/dipeptides by hydrolysis; <br><em>Award any of the above points for a clearly drawn correctly annotated diagram.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>pyruvate decarboxylated/CO<sub>2</sub> is removed and reduced NAD/NADH + H<sup>+</sup> is formed (when entering mitochondrion);<br><em>(both needed)</em></p>
<p>2-C molecule/acetyl group reacts with (reduced) coenzyme A to form acetyl CoA;</p>
<p>acetyl CoA enters Krebs cycle;</p>
<p>2 CO<sub>2</sub> molecules removed (as waste);</p>
<p>energy/electron rich NADH + H<sup>+</sup>/FADH<sub>2</sub> formed;</p>
<p>for each turn of cycle/each pyruvate, 3 NADH + H<sup>+</sup> and 1 FADH<sub>2</sub> formed;</p>
<p>1 ATP formed per pyruvate each turn (by substrate-level phosphorylation);</p>
<p>reduced NAD/NADH + H<sup>+</sup> and FADH<sub>2</sub> enter electron transport chain/ETC;</p>
<p>oxidative phosphorylation uses energy released by ETC to synthesise ATP;</p>
<p>as electrons move along ETC, protons/H<sup>+</sup> move into intermembrane space;</p>
<p>creates H<sup>+</sup> gradient across the membrane;</p>
<p>ATP synthesized by flow of H<sup>+</sup> back across membrane through ATP synthase;</p>
<p>ATP synthesized by chemiosmosis;</p>
<p>ETC reduces oxygen/oxygen is final hydrogen (and electron) acceptor forming water;<br><em>Award any of the above points for a clearly drawn correctly annotated diagram.</em><br><em>Accept reduced NAD and NAD<sup>+</sup> + H<sup>+</sup> as alternatives to each other.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>caused by single base substitution (mutation);<br>mutation in gene coding for (one of) polypeptide chain in hemoglobin/HbA;<br>GAG (on sense strand of DNA) mutated to GTG;<br>when transcribed, RNA sequence/codon becomes GUG rather than GAG;<br>during translation, have one amino acid substituted for another;<br>causes glutamic acid/glutamate to be replaced by valine;<br>change alters folding of Hb protein/makes RBCs sickle-shaped (in low oxygen);<br>sickle shaped cells block capillaries/cause tissue damage and pain;<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>Most were able to gain some marks on hydrolysis and condensation. Very few diagrams/ structures were completely correct.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The processes inside the mitochondria were well known by the better prepared candidates, who were able to explain in detail. Several candidates just tried to draw a diagram of the Krebs cycle without any annotation, hoping that the examiners would find some marks. A well annotated diagram can achieve full marks, but it must be clear. Many risked losing the quality marks by describing glycolysis in great detail, thus giving the impression that they were simply writing down everything they knew instead of answering the question.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most knew that Sickle Cell Anaemia is due to a mutation, but only the better ones were able to correctly state that it was a single base substitution. Few correctly described that the mutation was in (one of) the polypeptide chain of Haemoglobin(A), with many vague statements attributing it to erythrocyte instead. Nearly every candidate remembered that glutamic acid was replaced by valine. Unfortunately this was the only mark gained by many.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The image shows part of a cladogram.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAUMAAADZCAIAAAA128XBAAAU1ElEQVR4nO3dz2saW/8H8Oe/MNBLL/Q2BQMj5st4EQwYGEjBkPIYIqRgQDAgpGCIkDzkC4EUhBQkDaQgpJCC0AuzEHrBheAiXAteEFyEJwUXQgouBBcuhFkIszjfxXkyXx/ND2Nm5pwz836RRWvUfGLmrTOfmXPOPwgAiO8frAsAABMgyQBOgCQDOAGSDOAESDKAEyDJAE6AJAM4AZIM4ARIMoATIMkAToAkAzjBI5I84/GMf6mq2mq1ZjyearV61wMzOzuxtTUzqoX/iK2tjfwhPh4f0289+Ocw/B4IGI/iX2xt7fdAYPx2+vuqqmp/ScOY1/C4JE9XK5JsutjaWmZnx/jvdFuziEke/q2N25mniCDJMJ2RJBNCMjs741v5/YRLcmZnZ+RjuVqtZnZ2mKeIOCPJw7tz1WrV2N8z0kuTbOwQItVPd0+Sh/8c9EOMvuz0FuOvQFMhXJI/Hh8Pb4SZnR26yRk3/h4IGFugEfuPx8f04cNboHE3+sqoqkpfkOHHGs9mPP/wFj58UOOoJI8coRkbCn0Fh39ngTYgPt26dz38byPJxu30UcNvr2L9IeivXK1Whz8JaN6MLXP4ZaGvA/0FaT7pv+ntxsvy8fiYPomqqvQNjt5O79NqtYxvkbEeBH1aeh/Bknxrl+WuJBtGdoqm2A+EEeMdL2OTGv9Mpg+ht9P7UCImmRDyeyBgBIzeYqRo+LcjQ58lRlxHbic3n7FkKK4jP44MvXQjz08fK2SSH9y7NnZgRqI7/D6Kw+anG9+7Nlq7I0k2NtmRLZWIeZxMCPl4fEzLjq2t0V9zZMs0NkLjM/bBJLdarQeTPPwRNfwGemsN9jM5yZRxLEETiySbbjzJxhbp+CS3Wq3Y2lqr1TLCaWyZNMPG7cYuiYlJHt4bpY91cpIpY78FSTbdXUkmd38mO2bvmtxEdKTbdOsnp7lJHnke+hAHJnn4LYoMHR4jyaa7de/61t71cFaHL64QtONF/01bTcaWZmyZw5sobSWYm+Th+xidMwcmmdy8S40cKiPJphvveBkv6T1JJuKfhaL/Ht61JkNb5vDm9/H42PgsMXHveviVH26Pi5RkAOAWkgzgBEgygBMgyQBOgCQDOIFVSb68vLTomeFRms0m6xL4ouv6j6sr1lWYz6okL4RCf3z9atGTw+Q2k8kPR0esq+DIp9PTd1tbrKswn1VJbrfb837/9wlmrgBL9fv9hVCI+fBdTvy4uprzejudDutCzGfhcXKj0fBJ0sjwEbDfz+vreb+/VquxLoSxwWCwGA6XSiXWhVjC2o5XqVQKyHK327X0p8CD6vU63lXfHx5uJpOsq7CK5b3rT6eny5HIYDCw+gfB/YrF4kIo1Ov1WBfCRq1WC8hyv99nXYhV7DgLtZ1Op1IpG34Q3C+Xy71ZWdF1nXUhdtM0LSDLFxcXrAuxkB1J1nV9NRpFB5UH77a2HNm5vd92Or2/v8+6CmvZdGUIOqic0HX9zcpKLpdjXYh9yuXyQiikaRrrQqxl3zVe6KByotfrBYPBP799Y12IHXq9nk+SGo0G60IsZ+vVmvV6fc7rdXkHlQetVssnSfV6nXUhltuIx12yA2L3ddcu76Dyo1arzfv9P6+vWRdiIVVVFUVxSYePwQgK13ZQeaOq6kIo5NQTM+1221U7gGzGQrmzg8qhD0dHsVjMee+q9HTJ57Mz1oXYh02SXdhB5dZmMpnJZFhXYbJ8Pr8ajbKuwlbMxid3u133dFB5pmnaciTy6fSUdSGm+XF15ZMkRw6TuAfLmQbc00HlXLfbDciyM4YW6LquKEqxWGRdiN0Yzxnihg6qEOi7qgPmh3D2MIl7sJ/9x9kdVIFcXFzM+/1C75Q2Go15v9+d5zjZJ5kQks1mV6NR53VQhVMoFBbDYUEvbKTDJCqVCutC2OAiycShHVQRvT88fLu+LuK76t7u7t7uLusqmOElyc7roApK1/VEIiFcJCqVSkCWBd2bMAUvSSbO6qAKTdM0RVG+nJ+zLmRSvV5v3u93wzCJe3CUZEJIs9l0ycgVznW73Xm/X5Rjzs1kMpvNsq6CMb6STG46qO12m3Uhbkevr+B/auhiseieYRL34C7JRPAOqpPQg0+eJ1TsdDpCvN3YgMckE5E7qA6Tz+dfLy1x+666Go3m8/lJ7qnr+uXl5c/ra6duVJwmWdf1jXhcuA6qI+3t7iYSCQ4D8PnsbJLLEFqt1tv19d9evKDLlweDQUc2YjhNMrnpoE74jgvW0XX97fr6+8ND1oX8l1arNef1PthPoVehbsTjtVqNfiynUilHnq/iN8lEtA6qg2mathgO27nQV6PRqN3t+/fvwWAwm82Of2vked6srASDweHc9vv9eb/feSNquU4yEaeD6ng2L/SlKArdGX7s1/AF/Lqu//bixfiJced9IBP+k0wIqVQq834/zx1Ul7BzoS9Tkvz333/PeDx//fWXDQUzJ0CSCSH5fF5RFEe+lYrFtoW+TEly9a+/Zjwel0zMLEaSCSF7u7sb8TiHHVS3sWehr1QqtRqNjn/5/X6fJN36Lfo1/CSaps14POOH991u13mjaIVJMu2gHhwcsC4EmC30dXFx8di282I4PF7q66WlWCxmamnsCZNkctNBLRQKrAtxOyYLffX7/YAsP3ZX+Xu1+suzZ8YYO13XP5+d/fLsmfNmzxUpyeSmg+rsRfeEYP9CX5vJ5HTntAuFwozHQ88qz3m9Mx7PycmJ6eUxJ1iSyU0Htdlssi7E7exc6KtUKi2Gw1MfnLdarZOTk1wul8/nnXpGU7wkE0JKpRLOS/GgXq/bcF6q0+nMeb1OTaBZhEwyIeTT6SnPV/a7hw0Lfb1dX8dkMg8SNcmEkO102p3zofLG0oW+vpyfL0ciOPv4IIGTTDuomCyCBxYt9EXHP2DaiUkInGRy00G188p+uBVd6MvcnrCu68uRCE46TkjsJJObDqptV/bDXUxf6CuXy23E42Y9m+MJn2RCSL1ed9VKudwycaEvd67S9hROSDIhpFgsBoNBnJdizpSFvgaDwUIohPmSH8UhSSY3HVSrr+yHB9GFvp5ygvDg4MCK/pmzOSfJhJB3W1tMruyHEdlsNhaLTXfqiH6qO2+sktUclWTaQbX5yn641XQLfdGpeVwyothcjkoyuemgunAhbN5Mt9DXu60tDFydjtOSTG5mXTSlgwpPQRf6KpfLE96/VCothELodEzHgUkmhNRqNdtmnIJ70IW+Li8vH7xnt9ud8J5wK2cmmdx0UN25vD1X6EJfD54Z3ojHnTdzrZ0cm2RCSDabnWSNArDagwt9FQoFDJN4IicnmRCymUxup9OsqwBycHBw14SK7XYbh0JP5/Ak0w6qI2d7EQtd6Gt/f3/89uVIRKBV17nl8CSTmw6qiVf2w3ToQl8joc3n82/X11mV5CTOTzIhpNls4rwUD0YW+vpxdTXn9WKYhClckWRy00HFmHXm6CCnZrM5GAwURcG+klnckmRCSKFQeOKV/WCKcrkckOV/7e1h8iYTuSjJhJD3h4dTX9kPJvrf/f1Xs7MYJmEidyWZdlCnuLIfTKRpWkCWsfyAudyVZHLTQcWsqwxtp9Pjp6PgiVyXZHJzie/kV/aDiSqVCroVVnBjkslNBxXX69us1+v5JKnRaLAuxIFcmmRCSKVSmeTKfjBRIpHAPBAWcW+SCSH5fP7+K/vBRKqqKoqCEwcWcXWSCSF7u7tv19exeVmt3W5jJmNLuT3Juq6/XV9HK9VSdN2fz2dnrAtxMrcnmRCiadpiOIzhONbJ5/Or0SjrKhwOSSaEkHa7PXxlP5iITgCEK96thiT/R6PR8EkSlts2l67riqKoqsq6EOdDkv9fqVTySRKWpDFRNpvFMAl7IMn/5dPp6eulJZyXMkWj0Zj3+zEpoj2Q5FGZTCaRSOC81BPRYRJoPdgGSR5FT5m8PzxkXYjY9nZ393Z3WVfhIkjyLfr9/kIoVCgUWBciqkqlEpBlHKTYCUm+3c/r63m/H2Nop9Dr9QKyjFnTbIYk36ler+MCwylsJpM4NrEfknyfYrEYkGWcl5pcsVjEMAkmkOQH5HK55UgEh3yT6HQ6uLqGFST5Ye+2tnB5wyRWo9F8Ps+6CpdCkh+m6/qblRUMkb/f57MzrKfHEJI8kV6vFwwGcf3wXejq8xgmwRCSPCm6sdZqNdaFcEfX9ddLS398/cq6EFdDkh+hVqvhvNS4XC63EY+zrsLtkOTHUVU1GAzivJSBjgbFMAnmkORH+3B09GZlBa0dQoimaQuhEGYO5wGSPI3NZPLd1hbrKtjb39/fTqdZVwGEIMnT0TRtORLJ5XKsC2Hpe7WKYRL8QJKn1O12A7JcLBZZF8JGv9+f9/vRyecHkjy9Vqv1anbWnYN+UqkUhklwBUl+kouLC58k/by+Zl3Iw8rlcu7Gp9PTcrk8dcO5VCothsODwcDcCuEpkOSnKhQKC6EQ/4t6b6fTr2ZnV6PR1Wj09dLSq9nZYDA4xXtQp9OZ83oxTII3SLIJ3h8e8n/J8XY6PTx9PJ0XZYpF4d+ur2P1aQ4hySbQdT2RSHB+PmYkyYSQVCr12GuzvpyfL0cinL9nuROSbA5N0xRFOTk5YV3InbbT6eVIpH2jXC77JGlkeqPVaHTG45niCzvbzCHJpul2uz5JKpVKrAu53XY6PRK/VCo18umKJIsLSTbTj6srnyQ1Gg3Whdxi+DO5Xq9XKpWFUOjNysrwfZBkcSHJJqtUKvN+P4cjdcePk79XqzMeT7PZNG5BksWFJJvv89nZQijE22WM40mu1+uThHAwGCyEQtweNQCFJFtib3c3Fotx1ePdTqcVRand+PPbt4VQSFGUBx94cHCA4SL8Q5Itoev62/V1rpZTGe54/fLsWUCWt9PpB48CarXavN/P/3UvgCRbRdO0xXBY6Lkm+/1+QJYxTEIISLKFOp3OvN8v7kD87XR6f3+fdRUwESTZWnRynMvLS9aFPFqpVFoIhTBMQhRIsuVKpZJPksSa+ote5SLiG5BrIcl2+HR6qigKb+el7rERj7t8RhThIMk2yWQyG/E4V+el7lIoFDBMQjhIsk10XV+NRvlvILXbbczpLSIk2T50SPCX83PWhdyJroDFc4VwFyTZVj+vr+f9/pGxhPzI5/OxWIx1FTANJNlu9Xp9zusdHrfAiR9XV3Neb6fTYV0ITANJZqBYLM77/VydlxoMBoqi/PntG+tCYEpIMhu5XO710hI/56XeHx5itXehIcnMvNvaSiQSPJzsqdVqAVnGMAmhIcnM0EZxNptlW4amaQFZrlQqbMuAJ0KSWer1esFgkO0a4plMhv+z3PAgJJmxVqs15/V+r1aZ/PRKpRIMBvk5XIepIcns1Wq1V7Oz9l9W1ev1uJ0/EB4LSeaCqqoBWbb5vFQikfhwdGTnTwTrIMm8+HB09GZlxbbxwKqqKorCQ+ccTIEkc2QzmUylUjb8oHa77ZMkDJNwEiSZI5qmLUciNuzxrkajQk8wBuOQZDuUy+UJZ/PqdrsBWVZV1bpi8vn8yMTX4ABIsuW63e4vz579+vz5hIMTWq3Wq9lZi2a0bDabPknicIkMeCIk2XKfTk+XI5FYLDb55VwXFxdWHMfquq4oiqUf+MAKkmy5hVAol8v98fWrT5Im7xUXCoWFUKjX65lYSTabxTAJp0KSrdVoNGY8nlar1ev1fn3+/NZhg6qqrkaj41//Mz8/+/Jl9J//vPW7q9Hoo2YsaDQa836/uW8NwA8k2VqZTMZoL20mk7e2mnK53HQrJE6+n6xpWjAYxDAJB0OSLTQYDH578eLg4IAuqvbh6GhklVPKhiTv7+9nMhmzfz/gCJJsIVVV6Vpqxtevz5+PDzyyOsmVSiUgyxgm4WxIsoVWo9GRDlM2m301OztySWa73a7d64+vX2dfvjw/Px+5fZLrtHu9XkCW6/W6yb8bcAZJtkq73Z7xeEYOTX9eX894PIVC4bHPVqlU5v3+n9fXj33gZjL5/vDwsY8C4SDJVvlwdHTraafVaPT10tIUT/j57GwhFHrUHD3FYhHDJFwCSbZKt9u9de+33+9PfYnV3u5uLBabMJmdTscnST+urqb7WSAWJFkkuq6/XV+fsAsdi8UwTMI9kGTBaJq2GA5/Oj29/25fzs/frKxgv9o9kGTx0N3mUql01x3o3GAYJuEqSLKQGo3GXVNw6br+emmJ7XydYD8kWVSlUsknSeMjJXO53EY8zqQkYAhJFtin09PFcHj44i36WY1hEi6EJIstk8m8XV+nna3BYLAQCt1z/AwOhiSLTdf11Wh0b3eXELK/v7+dTrOuCNhAkoXX7/cXQqF/7e1hlTY3Q5Kd4Orf/559+dKiqb9ACEiyE6RSKQyTcDkkWXilUmkxHLZt8QrgE5Istk6nM+f1YpgEIMli24jHT05OWFcB7CHJAvtyfr4ciWCYBBAkWVw/r699kjTFLCLgSEiykHRdX45Evpyfsy4EeIEkC+nk5ATDJGAYkiyeH1dXt46CAjdDkgUzGAwWw2EMk4ARSLJg3h8eplIp1lUAd5BkkdRqtXm/H8MkYBySLIx+vx+Q5e/VKutCgEdIsjC20+nxNaUAKCRZDKVSaSEUwjAJuAuSLIBer+eTpMvLS9aFAL+QZAFsxOO5XI51FcA1JJl3f3z9+nppCcMk4H5IMtfa7fac19tqtVgXArxDkvml6/qblRUMk4BJIMn8yufzsViMdRUgBiSZUz+urua8XgyTgAkhyTzSdV1RlD+/fWNdCAgDSebR+8PDzWSSdRUgEiSZO/V6PSDLWKUNHgVJ5oumaQFZrlQqrAsBwSDJfMlkMhgmAVNAkjlSqVSCweDwesgAE0KSeUGHSTQaDdaFgJCQZF5sJpPZbJZ1FSAqJJkLqqoqioJhEjA1JJm9drvtk6Rms8m6EBAYkszeajSaz+dZVwFiQ5IZy+fzq9Eo6ypAeEgyS81m0ydJ7XabdSEgPCSZGTpMQlVV1oWAEyDJzHw4OkokEqyrAIdAktloNBo+ScIwCTALksyApmnBYBDDJMBESDID+/v7mUyGdRXgKEiy3SqVSkCWMUwCzIUk24qu0lav11kXAk6DJNuq3++Xy2XWVYAD/R8MyaBST+9pBAAAAABJRU5ErkJggg==" alt></p>
<p>Using the cladogram, identify one diagnostic feature that characterizes the given groups of vertebrates at A, B and C.</p>
<p>A: .....................................................................<br>B: .....................................................................<br>C: .....................................................................<br> </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>Starting from the concept of gene pool, explain briefly how populations of early vertebrates could have evolved into different groups.</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>Mitochondria are thought to have evolved from prokaryotic cells. Describe <strong>two</strong> adaptations of the mitochondria, each related to its function.</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: gills <strong>or</strong> fins <strong>or</strong> scales <strong>or</strong> no limbs <strong>or</strong> external fertilization <br>B: homeothermic <strong>or</strong> warm-blooded <strong>or</strong> endothermic <strong>or</strong> lungs <strong>or</strong> tetrapod <strong>or</strong> <span style="text-decoration: underline;">four</span> limbs <strong>or</strong> pentadactyl limbs <strong>or</strong> internal fertilization <br>C: hair <strong>or</strong> fur <strong>or</strong> mammary glands <strong>or</strong> milk</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Gene pool is all genes/all alleles. <em>Reject all alleles/genes in a species.</em></p>
<p>Geographic isolation <em>Reject isolation if no type of isolation given</em>.<br><em><strong>OR</strong></em><br>migration to different areas<br><em><strong>OR</strong></em><br>temporal isolation<br><em><strong>OR</strong></em><br>behavioural isolation</p>
<p>Speciation/gene pool split if populations are reproductively isolated/do not interbreed </p>
<p>In different environments there are different selection pressures/opportunities/natural selection/adaptations/niches «to exploit»</p>
<p>Allele frequencies change/diverge <em>Reject gene frequencies</em>.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Double membrane/small intermembrane space/small gap between inner and outer membrane for a gradient «of protons» to develop <br><em>Accept only the first two adaptations in the answer</em>.</p>
<p>Cristae/folds in inner membrane/large surface area of inner membrane for ATP synthesis/chemiosmosis/proton pumping/electron transport chains</p>
<p>ATP synthase/stalked particles generates ATP from ADP + phosphate/Pi. <em>Reject ATPase. Allow ATP</em> synthetase.</p>
<p>Electron transport chains for generating a proton gradient/for releasing energy from reduced NAD</p>
<p>Matrix contains <span style="text-decoration: underline;">enzymes</span> for Krebs cycle/link reaction/oxidation of fats/oxidation of substrates/aerobic respiration</p>
<p>Ribosomes/DNA for <span style="text-decoration: underline;">protein</span> synthesis/replication</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 was much criticism of the cladogram from teachers in G2 forms and predictions that candidates would not understand it. In practice, most candidates realized for point A, they were expected to give a feature of fish that is absent in birds and mammals, the reverse of this for B, and for C a characteristic of mammals that is absent in birds and fish. This was an effective test of candidates’ knowledge of the characteristics of these three chordate groups.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In this question candidates were expected to apply their understanding of evolution and speciation to the context of the early evolution of vertebrates. All that was expected was a methods of reproductive isolation, differential natural selection and divergence until the differences between populations and their gene pools were great enough to prevent interbreeding. Candidates mostly got at least part of this.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question setters try to include some stimulus material to make questions more interesting but the first sentence of this question proved to be a distraction rather than a help. Candidates only really needed to think about the second sentences and so describe two structures and explain how they help the mitochondrion to carry out its function of producing ATP.</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 structure of the plasma membrane.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The light-dependent reactions in photosynthesis take place on the thylakoid membranes. Explain the light-dependent reactions.</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 two factors that affect the rate of photosynthesis.</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><strong>Remember, up to TWO “quality of construction” marks per essay.</strong></p>
<p><em>Award <strong>[1]</strong> for each structure clearly drawn and correctly labelled.</em><br>a. <span style="text-decoration: underline;">phospholipid bilayer</span> – <em>with head and tails</em>;<br>b. hydrophilic/phosphate/polar heads <span style="text-decoration: underline;">and</span> hydrophobic/hydrocarbon/fatty acid/non-polar tails labelled;<br>c. <span style="text-decoration: underline;">integral/intrinsic protein</span> – <em>embedded in the phospholipid bilayer</em>;<br>d. <span style="text-decoration: underline;">protein channel</span> – <em>integral protein showing clear channel/pore</em>;<br>e. <span style="text-decoration: underline;">peripheral/extrinsic protein</span> – <em>not protruding into the hydrophobic region</em>;<br>f. <span style="text-decoration: underline;">glycoprotein</span> with carbohydrate attached – <em>carbohydrate should be outside the bilayer</em>;<br>g. <span style="text-decoration: underline;">cholesterol</span> – <em>positioned across one half of bilayer and not protruding</em>;<br>h. thickness indicated (10 nm); <em>(allow answers in the range of 7 nm to 13 nm)</em></p>
<p> </p>
<p> </p>
<p><em> </em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>Remember, up to TWO “quality of construction” marks per essay.</strong></p>
<p>a. (chlorophyll/pigments/antenna complex) in photosystem II <span style="text-decoration: underline;">absorb</span> light;<br>b. light/photoactivation produces an excited/high energy/free electron;<br>c. electrons pass from carrier to carrier/along electron transport chain/e.t.c.;<br>d. protons pumped across thylakoid membrane/into thylakoid space;<br>e. ATP produced (by the light dependent reactions);<br>f. ATP production by <span style="text-decoration: underline;">chemiosmosis</span>/by <span style="text-decoration: underline;">ATP synthase/ATP synthetase</span>;<br>g. electrons from photosystem II passed to photosystem I;<br>h. light/photoactivation excites electrons in photosystem I (to higher energy level);<br>i. production of NADPH/reduction of NADP<sup>(+)</sup> (using electrons from photosystem I); (reject NAD in place of NADP. Accept reduced NADP instead of NADPH)<br>j. electrons from photolysis (needed) for photosystem II;<br>k. oxygen from photolysis is a waste product/by-product/passes out/excreted;<br>l. in cyclic photophosphorylation electrons from photosystem I return to it;</p>
<p><em> </em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><strong>Remember, up to TWO “quality of construction” marks per essay.</strong></p>
<p>a. (increase in) light (intensity) increases rate (of photosynthesis);<br>b. until a plateau is reached at higher light intensities/when another factor is limiting;<br>c. light needed for light dependent reactions/example of light dependent reaction;<br>d. (increase in) temperature/heat increases the rate (of photosynthesis);<br>e to an optimum temperature above which the rate drops;<br>f. temperature/heat affects rate of Calvin cycle/enzyme activity/rubisco activity;<br>g. (increase in) carbon dioxide (concentration) increases rate (of photosynthesis);<br>h. until a plateau is reached at higher CO<sub>2</sub> levels/when another factor is limiting;<br>i. CO<sub>2</sub> needed for light independent reactions/Calvin cycle/carboxylation of RuBP/production of glycerate phosphate;</p>
<p><em>If the candidate outlines more than two factors, only mark the first two.</em><br><em>Accept the first two points relating to each factor if clearly shown on a graph with both axes appropriately labelled.</em><br><em>Accept level instead of concentration, intensity or rate.</em><br><em>Do not accept enzyme denaturation as a reason for reductions in photosynthesis at higher temperatures.</em></p>
<p> </p>
<p><em> </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>Structure of the plasma membrane</p>
<p>Of the three diagrams tested on this exam paper, this was drawn most successfully with many candidates scoring full marks. Some candidates misinterpreted the question and drew a diagram of a whole eukaryotic cell with a plasma membrane around its margin. On diagrams showing the expected structure the commonest errors were to place particular types of proteins or cholesterol in the wrong position.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Light-dependent reactions of photosynthesis</p>
<p>Answers were polarised with strong candidates writing accurate and detailed accounts of the light dependent reactions but other candidates revealing very little knowledge. Diagrams were sometimes included at the start of the answer but they often didn’t help because they were not annotated fully enough to make any of the points on the mark scheme.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Factors affecting the rate of photosynthesis</p>
<p>Only light intensity, temperature and carbon dioxide concentration were accepted here. Candidates could score two marks for any two of these factors by showing the trend in a graph or by describing it in text but for other marks the answer had to include a cause of the effect of the factor, for example rising temperature increasing the activity of enzymes in the Calvin cycle. Denaturation was not accepted as a cause of decreasing photosynthesis at higher temperatures because the decreases happen at much lower temperatures than would cause denaturation. </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 ultrastructure of <em>Escherichia coli</em> as an example of a 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>Describe the events that occur in the four phases of mitosis in animals.</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 aerobic cell respiration after glycolysis has occurred.</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 structure clearly drawn and correctly labelled. </em></p>
<p>a. cell wall; <em>(with some thickness)</em></p>
<p>b. plasma membrane; <em>(shown as single line or very thin) </em></p>
<p>c. cytoplasm;</p>
<p>d. pilus/pili; <em>(shown as single lines) </em></p>
<p>e. flagellum/flagella; <em>(shown as thicker and longer structures than pili and embedded in cell wall) </em></p>
<p>f. 70S ribosomes;</p>
<p>g. nucleoid / naked DNA;</p>
<p>h. approximate width 0.5μm / approximate length 2.0μm;</p>
<p><em>Award [4 max] if the bacterium drawn does not have the shape of a bacillum (rounded-corner rectangle with length approximately twice its width). </em></p>
<p><em>Award [4 max] if any eukaryotic structures included.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em> Accept the following points as a diagram if clearly drawn and correctly labelled.</em></p>
<p>a. supercoiling of <span style="text-decoration: underline;">chromosomes</span> in prophase;</p>
<p>b. <span style="text-decoration: underline;">chromosomes</span> consist of sister <span style="text-decoration: underline;">chromatids</span> in prophase;</p>
<p>c. formation of mitotic spindle / centrosomes/centrioles move away in prophase;</p>
<p>d. nuclear membrane breaks down in (late) prophase/(early) metaphase;</p>
<p>e. attachment of spindle microtubules to centromeres;</p>
<p>f. <span style="text-decoration: underline;">chromosomes</span> on metaphase plate/equator/centre of cell in metaphase;</p>
<p>g. parting of (sister) chromatids at onset of anaphase;</p>
<p>h. movement of sister chromosomes <em>(accept chromatids)</em> to opposite poles in anaphase;</p>
<p>i. re-formation of nuclear membranes in telophase;</p>
<p><em>Award [5 max] if response does not mention all four phases of mitosis.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. pyruvate produced by glycolysis;</p>
<p>b. pyruvate enters <span style="text-decoration: underline;">mitochondrion/mitochondria</span>;</p>
<p>c. pyruvate loses CO<sub>2</sub> in link reaction;</p>
<p>d. and NADH+H<sup>+</sup>;</p>
<p>e. with formation of acetyl CoA;</p>
<p>f. to take part in <span style="text-decoration: underline;">Krebs cycle</span>;</p>
<p>g. where two CO<sub>2</sub> are produced (per molecule of pyruvate);</p>
<p>h. one ATP from ADP+Pi;</p>
<p>i. along with (three) NADH+H<sup>+</sup> (and one FADH<sub>2</sub>);</p>
<p>j. NADH+H<sup>+</sup> provide electrons circulating in the electron transport chain on the inner mitochondrial membrane;</p>
<p>k. allowing H<sup>+</sup> to accumulate in the intermembrane space;</p>
<p>l. and come back to the matrix through ATP synthase/synthetase to produce ATP (by chemiosmosis);</p>
<p>m. presence of O<sub>2</sub> required as the final electron acceptor for the electron transport chain;</p>
<p>n. producing water with H<sup>+</sup>;</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 automatically lost points for not showing the bacillus shape and/or including eukaryotic organelles. Diagrams are meant to be an accurate representation of the organism. Pilli and flagellae floating around outside the cell, not even touching the cell wall did not gain marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The process of mitosis was well known by the majority of candidates answering this question. Common errors were pairing the homologous chromosomes and explaining meiosis rather than mitosis. Many candidates included neat labelled diagrams for which marks could be awarded.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates were able to describe the link reaction, Krebs cycle, electron transport and chemiosmosis with almost textbook precision. Others tried to draw half remembered diagrams, hoping for the best and not scoring many, if any, marks.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe <strong>four</strong> properties of water that are due to hydrogen bonding and polarity.</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 how water is carried through a flowering plant.</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>Some of the water carried to the leaves of a plant is used in photosynthesis. Explain the role of water in the light-dependent reactions of photosynthesis.</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>Descriptions of properties expected not lists of properties.</em></p>
<p><em>hydrogen bonding:</em><br>a. high specific heat capacity requiring large amounts of energy to break the H-bonds/to raise the temperature;<br>b. boiling point is high/100°C as H-bonds must be broken to change from liquid to gas;<br>c. cooling effect of evaporation due to H-bonds taking energy from liquid water to break / high latent heat of evaporation;<br>d. water molecules on surface resistant to forces because of surface tension;<br>e. water is most dense at 4°C due to more regular hydrogen bonding;</p>
<p><em>polarity:</em><br>f. water molecules stick together through cohesion; (<em>full idea required</em>)<br>g. water molecules stick to other <span style="text-decoration: underline;">polar</span> molecules through adhesion; (<em>full idea required</em>)<br>h. good solvent of polar organic molecules</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. active transport of solutes from soil into roots;<br>b. draws water by osmosis<br>c. root hairs provide a large surface area for water uptake;<br>d. carried through xylem vessels;<br>e. transpiration is the loss of water (vapour) from leaves and stems / stomata;<br>f. (transpiration) creates suction/pull/negative pressure;<br>g. cellulose wall with rings of lignin give strength to resist (low) pressure;<br>h. water pulled up due to capillary action/cohesion/adhesion;<br>i. continuous column of molecules/transpiration stream;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. water only plays a role in non-cyclic photophosphorylation;<br>b. chlorophyll absorbs light/photons and activates electrons of photosystem II;<br>c. excited/active electrons of photosystem II are passed to carriers;<br>d. photolysis is the splitting of water;<br>e. produces O<sub>2</sub> and H<sup>+</sup>/proton and electrons;<br>f. O<sub>2</sub> released (as waste);<br>g. electrons (from water) replace lost electrons in photosystem II;<br>h. electrons from photosystem II pass (through carriers) to photosystem I;<br>i. electrons from photosystem I pass to NADP<sup>+</sup> (in stroma);<br>j. NADP<sup>+</sup> accepts H<sup>+</sup>/proton (from water) to form NADPH;<br>k. electron flow causes protons pumped across thylakoid membranes/into the thylakoid space;<br>l. creating a proton concentration gradient;<br>m. <span style="text-decoration: underline;">chemiosmosis</span> couples electron transport to ATP synthesis;<br>n. protons pass through ATP synthase/synthetase;<br>o. NADPH/H<sup>+</sup>/proton is passed to the light-independent reactions (to fix carbon);</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 was a popular question. </p>
<p>7a, few completely related hydrogen bonding to surface tension. In discussing solvent properties, a number neglected to draw in that water performed best at dissolving polar substances. When discussing adhesion, students should have referenced the polarity of molecules.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a popular question. </p>
<p>In part b, many referenced the role of xylem. Many used terminology correctly in this section making reference to transpiration pull, cohesion, adhesion and the transpiration stream. The stages of water uptake that occur in the root was covered in less detail and with less accuracy in general.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a popular question. </p>
<p>Part c was in general poorly done as the question required students to discuss the role of water. The details of photolysis were often excluded as were the correct details of chemiosmosis. </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 mitochondrion as seen in an electron micrograph.</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>A supply of oxygen is needed for aerobic respiration in mitochondria. Describe the features of alveoli in human lungs that adapt them for efficient absorption of oxygen.</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 of human lungs.</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 one of the following labelled structures</em>.<br>a. outer membrane and inner membrane shown as two separate lines;<br>b. inter-membrane space / space between inner and outer membranes;<br>c. cristae (shown as projections of inner membrane);<br>d. matrix;<br>e. (70S) ribosomes (shown as dots in the matrix);</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. large <span style="text-decoration: underline;">surface area</span> from having many alveoli;<br>b. single/flattened layer of (thin) cells in wall;<br><em>Reject one-cell membrane/thin membrane.</em><br>c. (surrounded by) dense network of capillaries/capillary bed;<br>d. short distance for gases/oxygen/carbon dioxide to <span style="text-decoration: underline;">diffuse</span>;<br>e. moist lining / film of moisture on inside of alveolus;<br>f. moisture allows oxygen/gases to dissolve;<br>g. diffusion of <span style="text-decoration: underline;">oxygen</span> down concentration gradient;</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><em>Award these points either for inspiration or expiration but not both:</em><br>a. ventilation is movement of air into and out of lungs;<br>b. <span style="text-decoration: underline;">volume</span> of thorax/lungs/chest increased/decreased;<br>c. <span style="text-decoration: underline;">pressure</span> in thorax/lungs/chest decreased/increased;<br>d. air flows from higher to lower pressure / air flows until the pressures are equal;</p>
<p><em>During inspiration/inhalation:</em><br>e. <span style="text-decoration: underline;">external intercostal</span> muscles contract so ribcage moved up/out;<br>f. diaphragm contracts so moves down/becomes flatter;<br>g. internal intercostal/abdomen (wall) muscles relax;</p>
<p><em>During expiration/exhalation:</em><br>h. external intercostal muscles relax so ribcage moved down/in;<br>i. diaphragm relaxes;<br>j. recoil of elastic fibres that stretched during inspiration;<br>k. <span style="text-decoration: underline;">internal intercostal</span> muscles contract (during forced ventilation);<br>l. abdomen (wall) muscles contract (during forced ventilation);</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 some excellent diagrams of mitochondria that scored full marks but also many incorrect ones. A frequent fault was to show the cristae as an extra membrane, rather than as part of inner membrane. Some diagrams showed so many gaps and overlaps in the membranes that a mark was lost. The weakest candidates depicted in their diagrams whole cells with eukaryote features.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were some strong answers to this relatively easy question that quickly gained the six marks. Other answers lacked precision and so scored less highly. One common misunderstanding is that it is the spherical shape of alveoli that give the lungs a large surface area for gas exchange. In fact a sphere has the less surface area for a given volume of any shape and it is the small size and large number of alveoli that gives the large surface area. </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a standard and relatively straightforward question and strong candidates scored full marks. As with other questions on this paper, the weaker candidates revealed a wide range of misunderstandings. Cause and effect were confused in some answers, so it is that movement of air into the lungs that causes the diaphragm to move down rather than vice versa. One particularly common misapprehension is that pure air is breathed in and pure carbon dioxide breathed out. Were this to be possible it would make gas exchange much more efficient but unfortunately it is not.</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 RNA and 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>Explain the process of DNA replication.</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 enzymes catalyse reactions.</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>DNA is double-stranded while RNA is single-stranded;<br>DNA contains deoxyribose while RNA contains ribose;<br>the base <span style="text-decoration: underline;">thymine</span> found in DNA is replaced by <span style="text-decoration: underline;">uracil</span> in RNA;<br>one form of DNA (double helix) but several forms of RNA (tRNA, mRNA and rRNA);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>occurs during (S phase of) interphase/in preparation for mitosis/cell division;<br>DNA replication is semi-conservative;<br>unwinding of double helix / separation of strands by <span style="text-decoration: underline;">helicase</span> (at replication origin);<br>hydrogen bonds between two strands are broken;<br>each strand of parent DNA used as template for synthesis;<br>synthesis continuous on leading strand but not continuous on lagging strand;<br>leading to formation of Okazaki fragments (on lagging strand);<br>synthesis occurs in 5'→3' direction;<br>RNA primer synthesized on parent DNA using RNA primase;<br>DNA <span style="text-decoration: underline;">polymerase III </span>adds the nucleotides (to the 3' end)<br>added according to complementary base pairing;<br>adenine pairs with thymine and cytosine pairs with guanine; (<em>Both pairings required. Do not accept letters alone.</em>)<br>DNA <span style="text-decoration: underline;">polymerase I</span> removes the RNA primers and replaces them with DNA;<br>DNA ligase joins Okazaki fragments;<br>as deoxynucleoside triphosphate joins with growing DNA chain, two phosphates broken off releasing energy to form bond; <br><em>Accept any of the points above shown on an annotated diagram.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>they increase rate of (chemical) reaction;<br>remains unused/unchanged at the end of the reaction;<br>lower activation energy;<br>activation energy is energy needed to overcome energy barrier that prevents reaction;<br>annotated graph showing reaction with and without enzyme;<br>substrate joins with enzyme at active site;<br>to form enzyme-substrate complex;<br>active site/enzyme (usually) specific for a particular substrate;<br>enzyme binding with substrate brings reactants closer together to facilitate chemical reactions (such as electron transfer);<br>induced fit model / change in enzyme conformation (when enzyme-substrate/ES complex forms);<br>making the substrate more reactive;</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 of the candidates scored full marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Despite some confusion about which enzyme does what and confusing DNA replication with transcription/translation, many candidates managed to gain full marks. A good number indicate that an RNA primer begins replication on the lagging strand only. Another common error was to refer to the gaps rather than the fragments as Okazaki fragments. Some candidates confused replication with translation.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates lost marks by focusing on factors affecting the rate of enzyme controlled reactions and inhibition and missed the basics. Nearly all mentioned the lowering of activation energy, but many were not able to describe how this is done. Diagrams that were included could have earned more marks if they were more carefully drawn, with axes labels being more carefully included and differences in energy between reactants and products being more accurately represented. Few indicated that the enzyme was not used up in the reaction.</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 effect of inhibitors on the activity of 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>(mono-, di- and polysaccharides) consist of one, two and many units;<br>example of <span style="text-decoration: underline;">monosaccharide</span> (e.g. glucose/ribose/galactose/fructose);<br>example of <span style="text-decoration: underline;">disaccharide</span> (e.g. maltose/lactose/sucrose);<br>example of <span style="text-decoration: underline;">polysaccharide</span> (e.g. 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>inhibitors reduce enzyme activity/reduce the rate of reaction;</p>
<p><em>Competitive inhibitors</em>:<br>have a similar shape to the substrate;<br>bind to/attach to/enter the active site;<br>block/compete for occupation of the active site / prevent substrate binding;<br>example (<em>e.g.</em> succinate dehydrogenase by malonate);<br>increase in substrate concentration reduces inhibition / graph showing this;</p>
<p><em>Non-competitive inhibitors</em>:<br>not chemically similar / different shape to substrate;<br>attach to a different part of the enzyme/allosteric site;<br>shape of the active site changes preventing/reducing substrate binding;<br>example of non-competitive inhibition (<em>e.g.</em> respiratory enzymes by cyanide);<br>increases in substrate concentration do not reduce inhibition / graph showing this;<br>end-product inhibitors are non-competitive;</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>The types of carbohydrate referred to in this question were structural. Candidates who outlined monosaccharides, disaccharides and polysaccharides, with examples of each were able to score the marks quite easily. Those who classified carbohydrates according to function without any reference to structural differences did not fare so well.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The examining team adopted a broad interpretation of the meaning of this question, as it would have been difficult to sustain an answer of its literal meaning beyond a few marks. Many candidates wrote good answers, explaining both the need for digestion and the relationship between hydrolysis and digestion. </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was well answered by many of the stronger candidates, with detailed accounts of competitive and non-competitive inhibition. The only common omissions were end product inhibitors and examples of each type of inhibitor. Although not specifically requested in this question, examples are always worth including and are often rewarded with marks. <br><br></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 glycolysis.</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 pancreatic cells directly affect blood glucose levels.</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 why diabetes could be detected through the analysis of urine.</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>occurs in cytoplasm;<br>hexose is phosphorylated using ATP;<br>hexose phosphate is split into two triose phosphates;<br><span style="text-decoration: underline;">oxidation</span> by removal of <span style="text-decoration: underline;">hydrogen</span>; (<em>do not accept hydrogen ions/protons</em>)<br>conversion of NAD to NADH (+H<sup>+</sup>);<br>net gain of two ATP / two ATP used and four ATP produced;<br>pyruvate produced at the end of glycolysis; <em><br>Accept glucose/fructose/6C sugar instead of hexose.<br>Accept 3C sugar/glyceraldehyde instead of triose.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>α cells (of pancreas) produce glucagon;<br>glucagon promotes release of glucose/breakdown of glycogen by liver cells;<br>glucagon secreted when blood glucose levels are low / raises blood glucose levels;<br>β cells (of pancreas) produce insulin;<br>insulin promotes glucose uptake/storage of glycogen by liver/body/muscle cells;<br>insulin secreted when blood glucose levels are high / lowers blood glucose levels;<br>negative feedback mechanism; <em><br>Do not accept answers implying that insulin or glucagon catalyse glucose-glycogen conversions directly.<br>Award <strong>[3 max]</strong> if the response suggests that the hypothalamus has a role in regulation of blood glucose.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>urine of diabetics contains glucose;<br>whereas urine of non-diabetics contains no glucose;<br>glomerular filtrate contains glucose / glucose filtered out;<br>glucose (normally) reabsorbed from filtrate/into blood;<br>through wall of / in the proximal convoluted tubules;<br>blood glucose concentration higher than normal in diabetics;<br>reabsorption not completed / pumps cannot reabsorb all glucose in diabetics;<br>glucose in urine can be detected using test strips;<br>type I diabetes is lack of insulin secretion / lack of β cells;<br>type II diabetes is body cells not responding to insulin / not absorbing glucose;</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 was answered by large numbers of candidates. The better-prepared ones had little difficulty in scoring highly in both parts (a) and (b). As in part (a) of Question 5, it was possible to score marks in 6(a) with a clearly annotated drawing, in this case a flow diagram of glycolysis. The only caveat is that one of the quality marks for Section B questions depends on at least two of the three parts being written in continuous prose. In weaker answers there was confusion about what was being oxidized and what reduced. Teachers should stress that oxidation in respiration is achieved by removal of hydrogen from respiratory substrates, because each removed hydrogen has an electron. Oxidation is loss of electrons. <br><br></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In part (b) a familiar problem was in the spelling of glucagon and glycogen. This is one place where terms do need to be spelt correctly to avoid confusion. Two other common errors were the implication that insulin and glucagon catalyze interconversions between glucose and glycogen directly and the suggestion that the hypothalamus controls hormone secretion by the pancreas.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part (c) was often well answered, with candidates write detailed accounts of cause and effect, linking the high blood glucose levels that characterize diabetes with the presence of glucose in urine. <br><br></p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question">
<p>Describe the process of photolysis in photosynthesis.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>a. water is split/breaks</p>
<p>b. using <span style="text-decoration: underline;">energy</span> from light</p>
<p>c. electrons «from photolysis» pass to <span style="text-decoration: underline;">photosystem II</span></p>
<p>d. oxygen is a «waste» product</p>
<p>e. hydrogen ions/protons are produced</p>
<p><em>Allow answer given as an equation</em></p>
<p><em><strong>[Max 3 Marks]</strong></em></p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Photosynthesis and transpiration occur in leaves. Explain how temperature affects these processes.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>photosynthesis rate increases as temperature rises (up to an optimum temperature);<br>(due to) increase in the rate of enzyme catalysed reactions/light independent reactions/the Calvin cycle;<br>(steep) drop in rate of photosynthesis above the optimum;<br>at high temperatures enzymes/Rubisco/RuBP carboxylase denature(s);<br>graph with correctly labelled axes showing relationship between temperature and rate of photosynthesis;<br>transpiration rate increases as temperature rises;<br>(energy/heat leads to more) to more evaporation of water (in the leaf);<br>faster diffusion of water <span style="text-decoration: underline;">vapour</span> at higher temperatures;<br>relative humidity falls as temperature rises / warmer air can hold more water vapour;<br>stomata may close at very high temperatures reducing the transpiration rate;<br>some plants open their stomata at very high temperatures to cool by transpiration;</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Here candidates were able to outline the effects of temperature on photosynthesis and transpiration, but explanations failed to adequately address mechanisms such as the role of enzymes in photosynthesis and the role of evaporation in transpiration.</p>
<p>A very high number of candidates stated that higher temperatures meant more light and it was this that increased the rate of photosynthesis. Others went off into the idea that transpiration was a type of sweating and was used <strong>normally</strong> by plants to keep them cool. Few linked increased rate to enzyme activity and a further increase beyond optimum to a decrease in rate because of denaturation.</p>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the light-dependent reactions of 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 effect of light intensity and temperature on the rate of photosynthesis.</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>(chlorophyll/antenna) in photosystem II absorbs light;<br>absorbing light/photoactivation produces an excited/high energy/free electron;<br>electron passed along a series of carriers;<br>reduction of NADP<sup>+</sup> / generates NADPH \( + \) H<sup>+</sup> ;<br>absorption of light in photosystem II provides electron for photosystem I;<br>photolysis of water produces H<sup>+</sup>/O<sub>2</sub> ;<br>called non-cyclic photophosphorylation;<br>in cyclic photophosphorylation electron returns to chlorophyll;<br>generates ATP by H<sup>+</sup> pumped across thylakoid membrane / by chemiosmosis / through ATP synthetase/synthase;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>both light and temperature can be limiting factors;<br>other factors can be limiting;<br>graph showing increase and plateau with increasing light / description of this;<br>graph showing<span style="text-decoration: underline;"> increase</span> and <span style="text-decoration: underline;">decrease</span> with increasing temperature / description of this;</p>
<p><em>light:</em><br>affects the light-dependent stage;<br>at low intensities insufficient ATP;<br>and insufficient NADPH \( + \) H<sup>+</sup> produced;<br>this stops the Calvin cycle operating (at maximum rate);</p>
<p><em>temperature:</em><br>affects light-independent stage / Calvin cycle;<br>temperature affects enzyme activity;<br>less active at low temperatures / maximum rate at high temperatures;<br>but will then be denatured (as temperature rises further); <br><em>Award <strong>[5 max]</strong> if only one condition is discussed</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>This gave the stronger candidates an opportunity to demonstrate the sophistication of their understanding of the photochemistry of the light-dependent reactions. There were some exemplary answers. Weaker candidates tended to give partial accounts with errors of understanding and the weakest candidates gave only a broad outline of what is achieved by photosynthesis.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The challenge was to explain in sufficient detail the effects of light intensity and temperature on the rate of photosynthesis. Weaker candidates tended outline the effects (assessment statement 3.8.8) rather than explain them (assessment statement 8.2.8), which often only gave them two marks. Rather few candidates gave convincing explanations of light intensity and temperature in terms of rate-limiting steps. This question was therefore highly discriminating, helping to separate the most able and best prepared candidates from others.</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 effect of temperature and substrate concentration on the activity of enzymes.</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>Distinguish between competitive and non-competitive enzyme inhibition of chemical reactions, giving an example of each.</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 light-independent reactions of photosynthesis.</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>enzymes most active at one temperature/optimum temperature;<br>any deviation from that temperature lowers the enzyme activity;<br>denaturing/change in active site/no activity at higher temperatures / inactivated at (very) low temperatures;<br>increasing the substrate concentration increases the enzyme activity/more enzyme-substrate complex formed/more collisions between enzyme and substrate;<br>eventually no increase in enzyme activity with increased substrate concentration / plateau when enzymes are working to the maximum/when all active sites occupied/saturated; <br><em>Accept answers shown graphically.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>example of competitive;<em> (e.g. malonate competes with succinate dehydrogenase)<br></em>example of non-competitive;<em> (e.g. opioids inhibit nitric oxide synthase)</em></p>
<p><em><img 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" alt></em></p>
<p><em>Award <strong>[2 max]</strong> for examples and <strong>[1]</strong> for each correct <span style="text-decoration: underline;">paired statements</span> up to <strong>[3 max]</strong>.</em><br><em>Answers 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>take place in the stroma of the chloroplast;<br>produce carbohydrates;<br>ribulose bisphosphate/RuBP is a five carbon compound;<br>carbon dioxide fixed/added to RuBP / carboxylation;<br>by RuBP carboxylase (enzyme)/Rubisco;<br>forms unstable six carbon compound;<br>this splits into (two molecules of) glycerate-3-phosphate/GP;<br>ATP and NADPH produced in light-dependent reaction;<br>ATP provides the energy;<br>GP reduced to triose phosphate/TP;<br>NADPH provides hydrogen;<br>some three carbon sugars go to form hexose sugars;<br>some go to making more RuBP;<br>called the Calvin (Benson) cycle;</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>Was generally well answered with many candidates scoring marks by including annotated drawings of the changes in enzyme activity.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Was answered much more poorly, not due to a lack of understanding of the different types of inhibition, but due to not comparing equivalent factors. For example, most gained the mark for mp (c) for inhibitor attaching to the active site in competitive and to another site in non-competitive. However, many mentioned similar structure to the substrate in the first but there was no equivalent comment for the second, thus no mark. </p>
<p>Few students could give specific examples of either. It was insufficient to say a heavy metal is a non-competitive inhibitor without specifying the metal and the enzyme. </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Was generally well answered, with students showing very good understanding of the light-independent reaction. Many included clear, annotated diagrams to support their answers. A few students mistakenly described the light dependent reaction and a few respiration.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The enzyme ATP synthase has an essential role in aerobic cell respiration.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;">The sketch shows the relationship between the reaction rate and substrate concentration in the presence and the absence of a competitive inhibitor.</p>
<p style="text-align: center;"><img 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"></p>
<p style="text-align: left;">Explain the effect of the competitive inhibitor on the reaction rate.</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 style="text-align: left;">Describe its location.</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 style="text-align: left;">Describe its function.</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. competitive inhibitor «slows the reaction rate as it» competes for the active site<br><em><strong>OR</strong></em><br>competitor has similar shape/structure/composition to substrate «and slows the reaction rate» </p>
<p>b. binding of competitor is reversible </p>
<p>c. «as the substrate concentration increases» more substrate binds to the active site than the competitor «and reaction rate increases» </p>
<p>d. «as the substrate concentration increases» the reaction rate reaches the maximum plateau «same as with no inhibitor»</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>the inner mitochondrial membrane critstae/thylakoid membrane</p>
<div class="question_part_label">b.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. protons build up in the intermembrane space due to electron transport chain <em>OWTTE</em></p>
<p>b. protons move through ATP synthase down the concentration gradient <br><em>Accept H<sup>+</sup> ions in place of protons </em></p>
<p>c. catalyses formation of ATP <em>OWTTE</em></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;">
[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.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.ii.</div>
</div>
<br><hr><br><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,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" alt></p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the importance of enzymes to metabolic processes.</p>
<div class="marks">[4]</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> </p>
<p> </p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. increase rate of reaction/speed up reaction</p>
<p>b. lower <span style="text-decoration: underline;">activation</span> energy</p>
<p>c. a specific enzyme for each reaction/substrate</p>
<p>d. metabolic process/pathway blocked if an enzyme is inhibited/absent</p>
<p>e. end-product inhibition can control metabolic pathways</p>
<p>f. differences in metabolism as cells produce different enzymes during differentiation</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>Explain chemiosmosis as it occurs in photophosphorylation.</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>Draw an annotated graph of the effects of light intensity on the rate of 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>Using a <strong>named</strong> example of a genetically modified crop, discuss the specific ethical issues of its use.</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><em>Remember, up to TWO “quality of construction” marks per essay.</em></p>
<p>a. <span style="text-decoration: underline;">photophosphorylation</span> is the production of ATP;<br>b. (some of the) light absorbed by chlorophyll / photosystem II;<br>c. photolysis/splitting of water separation of hydrogen ion from its electron;<br>d. the electron transport system moves the electrons through a series of carriers;<br>e. (electron transport system occurs) in the thylakoid membrane;<br>f. electron transport linked to movement of protons into thylakoid space;<br>g. a proton gradient builds up (in the thylakoid space);<br>h. small thylakoid space enhances the gradient;<br>i. hydrogen ions move by diffusion through the ATP synthase;<br>j. ADP + inorganic phosphate (Pi) forms ATP;<br>k. (the kinetic energy from) movement of hydrogen ions (through ATP synthase) generates ATP;<br>l. ATP synthase is a protein complex in the thylakoid membrane;<br>m. formation of proton gradient / ATP synthesis linked to electron transport is chemiosmosis; </p>
<p><em>Award marks for a clearly drawn correctly annotated diagram.</em></p>
<p> </p>
<p> </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p> </p>
<p><img 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" alt></p>
<p>a. vertical axis labelled as “rate of photosynthesis” and horizontal axis labelled as “light intensity”;<br>b. drawn showing that at low light intensities, increased intensity leads to increased rate of photosynthesis (sharply);<br>c. drawn with plateau formed at high light intensities;<br>d. plateau annotated as maximum rate of photosynthesis;<br>e. curve intersecting horizontal axis at a value above zero;<br>f. arrows added to axes or student annotates axis with “rate of photosynthesis increases” and “light intensity increases”</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. named example of verified genetically modified crop; <em>eg</em>, Bt corn / golden rice;<br><em>Example must be verifiable.</em><br>b. specific gene added / new protein synthesized by the crop plant / specific modification; <em>eg</em> gene from <em>Bacillus thuringiensis</em> / cry protein;<br>c. biological effect of the modification; <em>eg</em>, makes the plant toxic to (herbivorous) insects / insect pests / corn borers;<br><em><strong>[2 max]</strong> for benefits and <strong>[2 max</strong>] for harmful effects / costs;</em></p>
<p>d. a benefit of specific genetic modification; <em>eg</em>, increased crop yields / less land needed;<br>e. a second benefit of this specific modification; <em>eg</em>, reduced need for use of chemical pesticides;<br>f. a harmful effect of specific genetic modification; ingestion of toxin by nontarget species;<br>g. another specific harmful effect; <em>eg</em>, concerns about contamination of neighbouring non-GMO crops affecting trade;</p>
<p><em>To award <strong>[6]</strong> responses need to address the name, description and the effect of the modification. Effects have to be linked to the specific example discussed. Marks have to be all linked to one example. Assistant examiners are required to research examples.</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>Students appear to have a general understanding of mechanisms but make a number of errors in terms of the location of events such as where the proton gradient builds up.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was well answered by most students. Many did not draw the curve intersecting the horizontal axis at a value above zero. Many constructed a diagram of the curve but provided text below the curve in a paragraph rather than annotating the curve itself with explanations of what was occurring at various levels of light intensity.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The best answers outlined the biology of the example well though a very large number dealt in hypothetical or speculative costs and benefits of genetic modification.</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 relationship between genes, polypeptides and enzymes.</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 control of metabolic pathways.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>gene is a sequence of DNA bases;<br>DNA/gene codes for a specific sequence of amino acids/polypeptide;<br>enzymes are proteins/composed of polypetides;<br>sequence of amino acids determines tertiary structure/folding/shape of active site;<br>change in the gene/mutation will affect the active site/function of an enzyme;<br>enzymes are involved in replication/transcription of genes;<br>enzymes are involved in synthesis of polypeptides;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>metabolic pathways can be a sequence/chain of reactions;<br>they can be cycles of reactions;<br>different enzymes control each reaction in the sequence/cycle;<br>accumulation of an end-product can inhibit the first enzyme of the sequence/ pathway;<br>(an end-product inhibitor) joins an allosteric site/a site separate from active site;<br>attachment at the allosteric site changes the shape of the active site;<br>preventing the binding of substrate;<br>until the level of the end-product is reduced (and the inhibition removed);<br>this is an example of negative feedback;</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>This part of the question was poorly answered. Candidates were usually able to relate genes to translation but were less likely to adequately relate their responses specifically to polypeptides beyond that.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Aspects of allosteric inhibition were usually a strength within student responses to this question. Answers for this question were generally not very well constructed.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the absorption spectrum of 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 the process of photophosphorylation in chloroplasts.</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 the glucose produced as a result of photosynthesis is transported and stored in plants.</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><em>labelled x-axis</em>: wavelength / colour;<br><em>labelled y-axis</em>: absorbance / <span style="text-decoration: underline;">%</span> absorption;<br>peak between 400 and 500 nm / blue light;<br>peak between 600 and 700 nm / red light;<br>blue peak higher than red peak;</p>
<div class="question_part_label"> a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>using energy from light to provide energy;<br>absorbing light/photoactivation produces an excited/high energy/free electron;<br>absorption of light in <span style="text-decoration: underline;">photosystem II</span> gives electron to chain of carriers;<br>photolysis;<br>H<sup>+</sup> pumped across <span style="text-decoration: underline;">thylakoid</span> membrane;<br>protons pass through <span style="text-decoration: underline;">ATP synthetase</span>/<span style="text-decoration: underline;">synthase</span>;<br>producing ATP;<br>chemiosmosis;<br>(chlorophyll/antenna of) <span style="text-decoration: underline;">photosystem I</span> absorbs light;<br>cyclic and non-cyclic photophosphorylation;<br>(in non-cyclic photophosphorylation) photolysis of water produces H<sup>+</sup>/O<sub>2</sub>/e<sup>–</sup>;<br>in <span style="text-decoration: underline;">cyclic</span> photophosphorylation electron returns to photosystem I; <br><em>Accept any of the above points shown in a clearly annotated diagram.</em></p>
<div class="question_part_label"> b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>glucose transformed to sucrose;<br><span style="text-decoration: underline;">translocation</span> of sugars/sucrose;<br>by phloem;<br>active process / requires energy;<br>from source to sink;<br>source is photosynthetic tissue/leaves;<br>sink is fruits/seeds/roots/storage organs;<br>(sucrose) converted to starch;<br>stored in storage organs/roots/tubers;</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>The syllabus statement for 8.2.7 does say "explain‟ as a command term for absorption spectrum. Draw is a lower level skill, and students should be able to draw the typical absorption spectrum. The x-axis is commonly not understood conceptually. If the axis is "wavelength‟, then red should be shown as longer wavelength than blue. This was commonly reversed. The y-axis was often insufficiently labelled as absorption. Absorbance or percent absorption was required.</p>
<div class="question_part_label"> a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most of the better students who attempted this question explained photophosphorylation very well. Students who had done poorly on the rest of the paper avoided this question.</p>
<div class="question_part_label"> b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>As mentioned before, some centres seem to have regarded the plant topic as optional, so the function of phloem was not well known. Many did not demonstrate awareness that sugars are translocated as sucrose, not glucose. </p>
<div class="question_part_label"> c.</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.<br> </p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the processes by which light energy is converted into chemical energy.</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>Describe how energy flows through and is used by organisms in ecosystems.</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. plants/producers/autotrophs convert light to chemical energy by <span style="text-decoration: underline;">photosynthesis</span></p>
<p>b. chlorophyll/photosynthetic pigments absorb light</p>
<p>c. electrons are excited/raised to higher energy level</p>
<p>d. excited electrons pass along chain of electron carriers</p>
<p>e. energy from electrons used to pump protons across thylakoid membrane/into thylakoid space</p>
<p>f. chemiosmosis/proton gradient used to make ATP</p>
<p>g. ATP synthase generates ATP</p>
<p>h. pigments arranged in photosystems</p>
<p>i. electrons from Photosystem II flow via the electron chain to Photosystem I</p>
<p>j. electrons from Photosystem I are used to reduce NADP</p>
<p>k. ATP and reduced NADP used in the light independent reactions/Calvin cycle</p>
<p>l. carbohydrate/glucose/carbon compounds produced containing energy</p>
<p><em>Award marking points for any point made on a clearly annotated diagram.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. producers/plants/autotrophs obtain energy from light/sun/inorganic sources</p>
<p>b. food contains energy / energy passed in the form of food/carbon compounds (along food chains/between trophic levels)</p>
<p>c. consumers obtain energy from other organisms/from previous trophic level </p>
<p><em>This mark point distinguishes consumers from producers.</em></p>
<p>d. energy released (in organisms) by (cell) respiration </p>
<p><em>Reject energy used in respiration.</em></p>
<p>e. ATP produced</p>
<p>f. energy/ATP used for biosynthesis/movement/active transport/other valid use of ATP</p>
<p>g. less energy available / energy lost at each trophic level</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">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Obesity (excessive weight) is recognized as a global health problem and has been correlated with a large number of health issues, diseases and deaths. The increased consumption of fructose, now widely used as a sweetener, has been associated with the increase in obesity.</p>
<p>In a study, mice were divided into four groups. Each group was given the same amount of food and either a soft drink with a different sweetener or water.</p>
<p><img 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" alt></p>
</div>
<div class="specification">
<p>As it has been shown that high triglyceride levels correlate to obesity, another study was undertaken with humans. Over a ten-week period, one group was given glucose-sweetened drinks and the other fructose-sweetened drinks. Triglyceride levels in blood were measured throughout the study. </p>
<p><img 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" alt></p>
</div>
<div class="specification">
<p>Studies investigated the role of glucose and fructose in the development of pancreatic cancer cells. Pancreatic cancer cells were grown in equal concentrations of each sugar and the uptake of each into ribose-producing pathways was measured. The graph shows the range of uptake of sugars and the mean value.</p>
<p> </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>Describe the overall trend in body fat accumulation for the four groups of mice.</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>Compare the body fat accumulation between the four groups.</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 results for the two groups.</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>This study also showed a significant reduction in insulin sensitivity when participants were given fructose-sweetened drinks, but not when they were given glucose-sweetened drinks.</p>
<p>Describe possible effects of the reduction of insulin sensitivity.</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>Discuss whether the results provide clear evidence of a difference in uptake.</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>Determine which sugar is <strong>primarily</strong> used in the production of ribose.</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>Using all of the data, evaluate the evidence that suggests the consumption of large amounts of fructose poses a risk to human health.</p>
<div class="marks">[3]</div>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>positive/direct relationship / correlation (in all four groups) / (all four groups) accumulated fat over time</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. body fat accumulation increased over time for all four groups;<br>b. fructose caused the (significantly) greatest accumulation of fat and water the least;</p>
<p><em>(both needed)</em><br>c. sucrose and artificial sweetener/diet soft drink had the same increase;<br>d. sucrose, artificial sweetener and water did not start accumulating fat until after 20 days while fructose increased from the beginning;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. glucose-fed group has no/little increase in triglycerides while fructose-fed group has a (large) increase;<br>b. glucose-fed group has smaller variability than the fructose-fed group;<br>c. more triglycerides in fructose-fed group than glucose-fed group (from week 2 to week 10);</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. raised blood glucose/sugar levels/higher glucose in the urine;<br>b. decreased glycogen;<br>c. excess glucose will be converted to fat/increase obesity;<br>d. possibility of developing diabetes type II / late/adult onset diabetes; (<em>do not award this mark if answer refers to type 1 diabetes</em>)</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. glucose has a much greater range of uptake / <em>vice versa</em>;<br>b. but a (much) lower mean/uptake / <em>vice versa</em>;<br>c. there is no overlap (so there is clear evidence);</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>fructose</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. evidence that fructose causes (body) fat accumulation/obesity;<br>b. evidence that fructose is related to increased (blood) triglycerides which are correlated with obesity/coronary heart disease;<br>c. evidence that fructose is related to reduced insulin sensitivity/diabetes;<br>d. evidence that fructose is used in ribose synthesis but no clear evidence that fructose causes pancreatic cancer;</p>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most were able to describe the overall trend.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates successfully compared the two groups, though weaker candidates gave descriptive answers without using comparative term.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was another question that was effectively answered though students tended to give descriptive answers.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question tended to differentiate in terms of preparation as better prepared candidates drew in a discussion of type 2 diabetes, reduced glycogen levels, higher blood sugar and sugar in the urine.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most believed that the data supported the conclusion that a difference existed. The lower mean and the lack of overlap was noted by most. <strong> <br></strong></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Answers were roughly split between both sugars suggesting that students had difficulty making the link that higher rates of uptake suggest higher rates of use.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Prepared candidates were able to draw in the link to fructose and type 2 diabetes. Fewer acknowledged that the link between cancer and fructose was difficult to establish. Most were able to summarize the data but fewer were able to make a link to health effects.</p>
<div class="question_part_label">h.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The graph shows the absorption spectrum for two types of chlorophyll.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>(i) Sketch on the graph, the action spectrum of photosynthesis.</p>
<p>(ii) Explain the relationship between the absorption spectrum for chlorophyll and action spectrum of photosynthesis for green 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>Outline photoactivation of photosystem II in the light-dependent reaction of photosynthesis.</p>
<div class="marks">[2]</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) line slightly <span style="text-decoration: underline;">above</span> absorption spectrum with peaks in red and blue and a trough between but not as low as for absorption spectrum<br>(ii) energy/light absorbed by pigments/chlorophyll is used for photosynthesis;<br>peaks in action spectrum correspond to peak absorption by chlorophyll;<br>differences due to absorption by accessory/other pigments (<em>eg</em> carotene);<br>least absorption in green range/approximately 600nm as most light reflected;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>light/photon absorbed by pigment molecules (in photosystem II)/chlorophyll;<br>energy/electrons passed to chlorophyll molecule at the reaction centre;<br>causes electron to be raised to higher energy level / electron is excited;<br>this electron passed along chain of carrier molecules in photosystem II;</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 line above and including all the peaks was required for (a)(i). Most candidates were familiar with the terms absorption and action spectra, but could not explain the relationship between the two in 4(a)(ii). In part (b) most knew that an electron became excited, but how or why this came about was not well explained.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A line above and including all the peaks was required for (a)(i). Most candidates were familiar with the terms absorption and action spectra, but could not explain the relationship between the two in 4(a)(ii). In part (b) most knew that an electron became excited, but how or why this came about was not well explained.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>The following diagram shows the synthesis and regulation of some amino acids.</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>State the type of inhibition shown in this diagram.</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 how this type of regulation could affect the synthesis of an amino acid.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>end-product/non-competitive/(negative) feedback inhibition</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>amino acid/end product produced if used up/not enough present;<br>production stops if amino acid/end product unused/accumulates/in excess;<br>amino acid/end product changes active site of (first) enzyme of pathway;<br>(this is an example of) <span style="text-decoration: underline;">negative feedback</span>;</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>Almost all candidates gave a correct answer, probably because there was a strong hint in the diagram. End-product or non-competitive inhibition was accepted, or references to feedback.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates found this part of the question quite hard and it exposed a wide variety of misunderstandings of the interactions between enzymes, substrates, active sites, allosteric sites and end-product inhibitors. Many candidates failed to relate their answer to pathways used to synthesise essential metabolites in cells.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>Isoprene is a chemical synthesized and emitted in large amounts by some plant species, especially oak (<em>Quercus sp.</em>) and poplar (<em>Populus sp</em>.) trees. It has been suggested that isoprene increases the tolerance of plants to high temperatures, which can cause a decrease in photosynthesis rates.<br>Black poplar (<em>Populus nigra</em>) plants were subjected to two raised temperatures and to drought. Measurements of photosynthesis and isoprene emission were made during a 35-day-long drought stress (drought period) and 3 and 15 days after re-watering stressed plants (recovery period). The rate of photosynthesis was recorded as the carbon dioxide taken up per unit of leaf area per second.</p>
<p><img 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" alt></p>
<p> </p>
</div>
<div class="specification">
<p>The effect of isoprene on photosynthesis was assessed in detached oak leaves that were supplied either water (control) or fosmidomycin dissolved in water. Fosmidomycin inhibits the emission of isoprene without affecting photosynthesis. The measurements were taken at 30°C, but at three points in the experiment the leaves were subjected to heat treatment of 46°C (indicated on the graph by the arrows). The rate of photosynthesis was measured as uptake of CO<sub>2</sub> in μmol m<sup>–2</sup> s<sup>–1 </sup></p>
<p><sup><img 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" alt></sup></p>
</div>
<div class="specification">
<p>To test the effect of isoprene on a plant that does not normally produce it, leaves of common beans (<em>Phaseolus vulgaris</em>) were treated with heat stress at 46°C and were supplied with isoprene in the airstream. The percentage recovery compares the rate of photosynthesis before and after heat treatment. The data show the recovery of photosynthesis at different isoprene concentrations 1 hour and 24 hours after the heat treatment.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>one</strong> method other than measuring CO<sub>2</sub> uptake by which the rate of photosynthesis could have been measured in these experiments.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest why heat treatment may reduce photosynthesis rates.</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>Outline the effect of drought and of re-watering on the rate of photosynthesis.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the isoprene emissions during the drought and recovery periods at 25°C.</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>Compare the effect of the two temperatures on the emission of isoprene.</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>State the effect of heat treatment on the rate of photosynthesis.</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>Using the results in the graph, deduce the effect of the presence of fosmidomycin on the rate of photosynthesis in the leaves.</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest possible conclusions for this experiment.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the difference in percentage recovery of photosynthesis 1 hour after heat treatment between the 22 μL dm<sup>–3</sup> isoprene treatment and the 0 μL dm<sup>–3</sup> isoprene treatment.</p>
<div class="marks">[1]</div>
<div class="question_part_label">i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the evidence provided by the data in the bar chart for the hypothesis that isoprene improves plants’ tolerance to high temperatures.</p>
<div class="marks">[2]</div>
<div class="question_part_label">j.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>two</strong> reasons for some plant species synthesizing and emitting isoprene, but not other plant species such as common beans.</p>
<div class="marks">[2]</div>
<div class="question_part_label">k.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>oxygen production/release; (<em>not count bubbles</em>)<br>production/increase/change/ measurement of biomass;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>high/higher than optimum temperatures denature enzymes (of Calvin cycle);<br>ribulose bisphosphate carboxylase/rubisco stops working/does not bind substrate;<br>wilting / withering / loss of water / decrease in turgor / increased transpiration;<br>closure/reduced aperture of stomata;<br>lower CO<sub>2</sub> level inside leaf / reduced CO<sub>2</sub> diffusion/uptake into leaf;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>rate decreases/drops (to zero) with drought <span style="text-decoration: underline;">and</span> increases when re-watered/recovering</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>slight decrease/constant initially then falls / falls increasingly rapidly / decreases exponentially (in drought/up to Day 35);<br><span style="text-decoration: underline;">increases</span> almost to original level/ but doesn’t reach original level / rapidly at first then less rapidly / increases then reaches plateau (during recovery/after Day 35);</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>higher/greater (emission) at 35°C than 25°C during both drought and recovery;<br>both at (approximately) same level at end of drought period/at 35 days;<br>both increase during recovery but not to original level;<br>less/little difference in emission between temperatures during recovery/after watering / converse;</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>decreases (rate of photosynthesis);</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>no effect before (the first) heat treatment;<br>lower rate/greater reduction in rate during heat treatments with fosmidomycin;<br>lower photosynthesis/fosmidomycin reduces recovery after heat treatments; <br><em>Ignore statements that fosmidomycin reduces the rate of photosynthesis if this is not related to heat treatments.</em></p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>high temperature/heat stress/treatment reduces rate of photosynthesis;<br>repeated heat treatments cause greater reduction in photosynthesis;<br>isoprene causes less change/less reduction in photosynthesis due to heat/46°C /higher rate of photosynthesis during heat treatment with isoprene (than without);<br>isoprene helps photosynthesis to rise again after heat (treatments);</p>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>26 (%) (<em>Allow a range of 25 % to 27 %</em>)</p>
<div class="question_part_label">i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>faster recovery with isoprene than without/than with water treatment;<br>recovery faster/better/improved with higher isoprene concentration (than lower);<br>after both time periods / after 24 hours and 1 hour;</p>
<div class="question_part_label">j.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>different plants live in/evolved in/are adapted to different temperature regimes;<br>(selective) advantage for plants that produce isoprene in high temperature regions;<br>isoprene synthesis uses energy/materials/only beneficial at high temperatures;<br>some plants do not have the enzymes/genes for making isoprene;</p>
<div class="question_part_label">k.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This question had parts that ranged from easy to very challenging and there was a wide range of scores on it. </p>
<p>In (a) candidates were tested on their knowledge of methods of measuring the rate of photosynthesis. Most answered it correctly. A few candidates made vague statements about growth or suggested that use of water could be a measure of photosynthesis. Neither of these answers was accepted.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question had parts that ranged from easy to very challenging and there was a wide range of scores on it. </p>
<p>Part (b) was also testing knowledge rather than data analysis skills. There were some good explanations of why heat may reduce photosynthesis rates, including the idea that stomatal closure would reduce carbon dioxide uptake. Enzyme denaturation was accepted although photosynthesis rates drop at much lower temperatures in most plants than could be due to denaturation. Candidates were not expected to know about photorespiration and the reactions that are catalysed by rubisco at high temperatures. <br><br></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question had parts that ranged from easy to very challenging and there was a wide range of scores on it. </p>
<p>Part (c) was intended to be an easy question and almost all candidates answered it correctly. </p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question 1: This question had parts that ranged from easy to very challenging and there was a wide range of scores on it.</p>
<p>Answers to (d) were more mixed. The command term "describe" requires a detailed account so the marks were not awarded simply for stating that there was a fall in isoprene emissions during drought and a rise during recovery. There had to be some qualification, such as the changes in the rate of rise or fall, or an indication of whether recovery was complete. Some candidates stated that the emissions "spiked upwards" during recovery. This was allowed but strictly speaking a spike is a sharp rise and fall, not just a rise.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question 1: This question had parts that ranged from easy to very challenging and there was a wide range of scores on it.</p>
<p>Part (e) was quite well answered but relatively few candidates scored both marks. Fewer candidates than in the past simply described the results for 25°C and then for 35°C, without proper comparison, but there were some simple comparisons on the mark scheme that most candidates missed. The best approach was to think about the difference between the results at each time during drought and recovery, not to overcomplicate things by trying to compare rates of change. </p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question 1: This question had parts that ranged from easy to very challenging and there was a wide range of scores on it.</p>
<p>Part (f) was intended to be an easy lead in to the third graph, but a higher than expected proportion of candidates stated that heat treatment increased the rate of photosynthesis rather than decreased it. The arrows on the graph show when the heat treatments were administered and at these times there is clearly a decrease but some candidates thought that the rise following the times indicated with an arrow showed that the heat treatment had positive effects on photosynthesis. <br><br></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question 1: This question had parts that ranged from easy to very challenging and there was a wide range of scores on it.</p>
<p>By part (g) of the question some candidates were starting to struggle. There were two independent variables in this experiment; temperature and presence or absence of fosmidomycin. Marks were only awarded if the effects of fosmidomycin were related to the heat treatments.<br><br></p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question 1: This question had parts that ranged from easy to very challenging and there was a wide range of scores on it.</p>
<p>Part (h) of the question was also found difficult by some candidates. Marks were awarded for conclusions about the effect of heat on photosynthesis, but not for conclusions about fosmidomycin. This chemical was used in the experiment as a means of investigating the effects of isoprene so the expected conclusions were about the protective effect of isoprene during heat treatments. There were some excellent answers from the stronger candidates who understood the experiment and were able to analyse its results effectively. <br><br><br></p>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question 1: This question had parts that ranged from easy to very challenging and there was a wide range of scores on it.</p>
<p>Few candidates had any problem with part (i) and calculated the difference in percentage recovery successfully. <br><br></p>
<div class="question_part_label">i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question 1: This question had parts that ranged from easy to very challenging and there was a wide range of scores on it.</p>
<p>Answers to part (j) were very varied, with fewer candidates scoring both marks than expected. There were separate marks for stating that recovery was faster with isoprene than without (an all or nothing effect) and for stating that the higher the isoprene concentration the faster the recovery. There was also a mark for stating that these trends were evident both after one hour and 24 hours.</p>
<div class="question_part_label">j.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Question 1: This question had parts that ranged from easy to very challenging and there was a wide range of scores on it.</p>
<p>Part (k) was another two mark question where most candidates scored either one or no marks. Two reasons were required, with four interrelated reasons on the mark scheme. Few candidates suggested that some plants might lack the genes for isoprene synthesis and almost none that there is a cost to synthesis in terms of energy or resources so there will be selection against it in areas where hot conditions are never experienced.</p>
<div class="question_part_label">k.</div>
</div>
<br><hr><br><div class="specification">
<p>Investigators carried out experiments to find the relationship between the energy used by mice (the metabolic rate) and their activity. They found that the amount of time mice are active depends on the time of day, whether they are single or in groups and on the temperature of their surroundings. The bar chart below shows the percentage of time mice were active during three-hour periods at three different temperatures.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>The investigators also found that the metabolic rate of the mice changed at different times of the day. Mice were kept at one of the three constant temperatures for 24 hours and their oxygen consumption was measured. The graph below shows the results for single mice and the mean values for group mice.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate how many minutes the group mice are active between 21:00 and 00:00 at 8°C.</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 relationship between activity and temperature from 21:00 to 03:00 in all of the mice.</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>Animals which are active at night are nocturnal. Suggest <strong>one</strong> advantage for mice being nocturnal.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the relationship between temperature and metabolic rate.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Compare the results for the single mice at 15°C with those for the group mice at 15°C.</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>Suggest <strong>one</strong> reason why the results differ for single mice and group mice.</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>Explain why oxygen consumption is used as a measure of metabolic rate.</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Using the data from both graphs, evaluate the hypothesis that increased activity causes an increase in metabolic rate in mice.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>90 (minutes)</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>as temperature increases activity increases/positive correlation.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>avoid predators / less competition for food</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>as temperature increases metabolic rate decreases/negative correlation (<em>accept converse</em>)</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>metabolic rate of group mice is always less than single mice; (<em>accept converse</em>)<br>both follow similar pattern of increases/decreases/fluctuations at same time of day;<br>fluctuations greater in group mice;<br>both most active/higher metabolic rate during evening/21:00; (<em>accept any reference to times between 18:00 and 00:00</em>)</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>single mice need to produce more heat/have greater heat loss because of greater surface exposed to air / group mice huddle together to reduce the surface exposed to air<br><em>Allow any other reasonable answer.</em></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>oxygen is required for (aerobic) respiration;<br>respiration produces ATP/releases energy/heat in the mice;<br>metabolic rate is a measure of total energy released/consumed in the body / oxygen consumption is proportional to energy released/consumed in body/ proportional to metabolic rate;</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>metabolic activity high when mice more active supports the hypothesis;<br>activity is normally correlated with energy consumption;<br>but another factor may be causing both to increase at the same time / correlation does not always establish cause and effect;<br>grouping/environmental temperature also affect metabolic rate;</p>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Part (a) was an easy start to the question and almost all candidates gave the correct value.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In (b) most students correctly identified the relationship between activity and temperature at the given time, although there was a low but significant number of students who only described the data without being able to state a trend or a relationship.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The most common answers in (c) were that they were more protected from predators or that there was less competition for food although some students said it was easier for them to find their prey at night (mice are rodents).</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In (d) candidates were again asked to identify the relationship, this time between temperature and the metabolic rate. Most were able to do this although some inverted the relationship.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In part (e) of question 1, candidates were expected to compare the results of the single and group mice. However, many listed values without making the comparisons. </p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In part (f) there were some correct answers related to the sharing of heat in a group of mice and thus a lower metabolic rate, but many referred to groups of mice having less oxygen or that the sharing of tasks diminished the metabolic rate or that the value was a mean, implying a lower value could be expected.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There was good general comprehension in (g) of the use of oxygen consumption to measure metabolic rate but many students had difficulty providing clear answers, although most gained at least one mark by saying that respiration requires oxygen.</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most students had difficulty in (h) relating the data on the two graphs. Some were able to see that both metabolic activity and activity increased at the same times but others were not able to do so, simply restating data. Many did not make any evaluation of the data. Many implied that temperature was a factor, but not with sufficient clarity.</p>
<div class="question_part_label">h.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram to show the ultrastructure of <em>Escherichia coli</em>.</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 chemiosmosis assists in ATP production during oxidative phosphorylation.</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>cell wall – with some thickness;</p>
<p>plasma membrane – shown as single line or very thin;</p>
<p>cytoplasm; pilus/pili – shown as single lines;</p>
<p>flagellum/flagella – shown as thicker and longer structures than pili and embedded in cell wall;</p>
<p>70S ribosomes; nucleoid / naked DNA;</p>
<p>approximate width 0.5 μm / approximate length 2.0 μm;</p>
<p><em>Award <strong>[4 max]</strong> if the bacterium drawn does not have the shape of a bacillum (rounded-corner rectangle with length approximately twice its width). </em></p>
<p><em>Award <strong>[4 max]</strong> if any eukaryotic structures included.</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. Award <strong>[3 max]</strong> if no examples are given. 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>occurs during aerobic respiration;</p>
<p>oxidative phosphorylation occurs during the electron transport chain;</p>
<p>hydrogen/electrons are passed between carriers;</p>
<p>releasing energy;</p>
<p>finally join with oxygen (to produce water);</p>
<p>occurs in cristae of mitochondria;</p>
<p>chemiosmosis is the movement of protons/hydrogen ions;</p>
<p>protons move/are moved against their concentration gradient;</p>
<p>into the space between the two membranes;</p>
<p>protons flow back to the matrix;</p>
<p>through the ATP synthase/synthetase (enzyme);</p>
<p>energy is released which produces more ATP/combines ADP and Pi;</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 of the diagrams were of a pleasing standard. Marks were lost by drawing an oblong rather than a bacillus shape, including eukaryotic organelles and showing the flagellum as an extension of the cell wall, rather than embedded within it.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In a “distinguish” question, points should be contrasted, rather than writing about passive movement and then active movement.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were a few comments from the G2 forms about the difficulty of gaining nine marking points. Better candidates obtained these with ease. Many of the better candidates' answers incorporated clear, annotated diagrams. Weaker candidates tried to use half-remembered diagrams without any explanation and failed to gain many marks.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Label the structures indicated on the X-ray of a human elbow.</p>
<p><img 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" alt></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>Explain the role of calcium in muscle contraction.</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>One of the stages of aerobic respiration is called the link reaction.</p>
<p>Label the diagram to indicate where the link reaction occurs.</p>
<p><img 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" alt></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>Outline the role of coenzyme A in aerobic respiration.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(ii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>X</em>: humerus;</p>
<p><em>Y</em>: synovial fluid / cartilage / joint capsule / elbow joint;</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>action potential/nerve impulse/motor neuron causes release of calcium;</p>
<p>calcium released from <span style="text-decoration: underline;">sarcoplasmic reticulum</span>;</p>
<p>calcium causes binding sites on actin to be exposed;</p>
<p><span style="text-decoration: underline;">myosin</span> heads bind to binding sites/to actin and push actin (inwards);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p><em>Accept a line or arrow pointing to any part of the matrix, or a circle in it. It is not necessary to state link reaction unless more than one area is indicated.</em></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>accept/bind acetyl group/acetate / acetyl coenzyme A/acetyl CoA formed;</p>
<p>passes acetyl group/acetate to <span style="text-decoration: underline;">Krebs cycle</span>;</p>
<div class="question_part_label">c(ii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Well prepared candidates had no difficulty in naming the humerus and the synovial fluid. For the latter structure certain other answers were accepted because, given the three dimensional structure of the joint, it wasn’t entirely clear what the labelling line was touching.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some candidates confused synaptic transmission with muscle contraction and wrote about the former, but there were plenty of accurate explanations of how calcium is used within muscle fibres to trigger off contraction. Details of troponin and tropomyosin were not expected, but with the new program they will be.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates were able to label the matrix as the site of the link reaction.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were few really strong answers to this question. A common misconception was to think that coenzyme A is an enzyme, rather than a carrier of the acetyl group that acts as a substrate of enzymes. In many answers it was not clear that coenzyme A first accepts an acetyl group and then passes it to an intermediate (oxaloacetate) in the Krebs cycle.</p>
<div class="question_part_label">c(ii).</div>
</div>
<br><hr><br><div class="specification">
<p>The diagram below shows the structure of lactase</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A study of 600 adolescents in Sweden showed that milk consumption has a positive effect on height which shows continuous variation. However, milk contains lactose which some people can digest but some cannot.</p>
<p>State the pattern of inheritance that contributes to continuous variation.</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>Explain the production of lactose-free milk.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the protein structures indicated by I and II.</p>
<p>I: ...............................................................<br>II: ...............................................................<br> </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>Describe how structure I is held together.</p>
<p> </p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>This protein is described as a globular protein. Distinguish between globular and fibrous proteins.</p>
<p> </p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">b (iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>polygenic / more than one gene <br><em>Accept polygenetic. Mark only first answer if more than one answer given.</em></p>
<div class="question_part_label">a (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration: underline;">lactase</span> added to milk / <span style="text-decoration: underline;">lactase</span> immobilised;<br><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>for people who are lactose intolerant/lack lactase;<br>increases sweetness/solubility/smooth texture (in processed foods);</p>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>I is <span style="text-decoration: underline;">alpha helix</span> <span style="text-decoration: underline;">and</span> II is <span style="text-decoration: underline;">beta pleated sheet</span><br><em>Reject (α) double helix but accept α/A/a and β/B/b instead of alpha and beta.</em></p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>hydrogen bonds;<br><em>Reject hydrogen and covalent bonds unqualified and hydrogen bonds </em><em>between bases.</em><br>(hydrogen bonds) between N–H and C=O (on different amino acids);<br><em>Reject between amine and carboxyl groups.</em><br>(hydrogen bonds) between adjacent turns of the helix/every fourth amino<br>acid; <em><br>Accept above points in an annotated diagram.</em></p>
<div class="question_part_label">b (ii).</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><em>A table is not required but for each feature the difference between globular and fibrous proteins must be made clear.</em></p>
<p> </p>
<div class="question_part_label">b (iii).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>About half of candidates knew that polygenic inheritance contributes to continuous variation. </p>
<div class="question_part_label">a (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was generally well answered with stronger candidates able to score full marks. A few confused lactase with lactose and the products of lactose hydrolysis were not always known. </p>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p> About a quarter of candidates knew the names of the two secondary structures.</p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Few candidates stated that hydrogen bonds stabilise secondary structures and even fewer earned a second mark for giving a detail of the hydrogen bonding. </p>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>N/A</p>
<div class="question_part_label">b (iii).</div>
</div>
<br><hr><br><div class="specification">
<p>During aerobic cell respiration, oxygen is consumed and carbon dioxide is produced inside cells. This generates concentration gradients between respiring cells and the environment, which cause diffusion of oxygen and carbon dioxide. Both oxygen and carbon dioxide are soluble in water. As the temperature rises, water becomes saturated at a lower concentration of the gas.</p>
<p><em>Laternula elliptica</em> is a mollusc that lives on the sea bed in Antarctica. Its body temperature is always similar to that of the environment around it. To investigate the effect of temperature on <em>Laternula elliptica</em>, specimens were kept in temperature-controlled aquaria. The oxygen concentrations of water near the gills and in the body fluids were measured, at a range of temperatures from 0°C to 9°C. The graph below shows the mean results.</p>
<p><img 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" alt></p>
</div>
<div class="specification">
<p>The world’s oceans can absorb large amounts of carbon dioxide. This process has been studied in the Pacific Ocean near Hawaii, by measuring carbon dioxide concentrations in the atmosphere and in surface water every month, from October 1988 onwards. The graph below shows the carbon dioxide concentration expressed as partial pressures (Pco<sub>2</sub>).</p>
<p><img 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4dAIGCz2eZv6ChW51D+jHN6evr+++8/ePAg6F8ymayvr6+rq3O5XAyrUsaxwuGwXq8vsWej0RgKhWD9T6FQyOVylUpFby7v8XjOnTuXyWSMRiNdWQGif7cWRP8IBEIJ2tvba3g8gUAA05pcLufxeNxudzqdpihqPo5YTP8g7jrr0wOBgEwm27Jli0KhqK+v//3vf3/XXXfx+fx33nnn5MmTOp2ObsjC5XLpFm4lxsN0Oj0yMiKTyeDcYE1RqVTSBTUSiSiVyqVLlwoEgrq6uvxXMX9B43Ig+seE6B+BQCiG3++XUNQfWx2x2Zs3b87Rckawu0r5ZDKZeDxeepti+lfaxhNDUVQkEvn00083b96sVCo1Go1YLH7ppZeuX79+/fr17du3Y8PuVCrFkPBi42EkElGpVG1tbVqt1mAwpFKpbDbb2dnJWI9UqVTQ3iiRSNTU1Hz7299m7Iehf6lUyuFw6HQ6i8VCn0TOE0T/mBD9IxAIxTDt2sVBiIsQd6bVbSqVMplMY2NjuVxOLpcnk8ny9+bz+QQCgVKpVCqVCoVCJpNZrdb8PZRoqFTMxhMTj8eVSiVI3aeffnrixImVK1fef//912c4ePAgTnjJ7wtRbDzU6/VQephMJo1Go1wuVygUJpOphEP3okWLHn/8ccZ+6PqXzWYNBoPD4YhGo36/Xy6XV+RuUwVE/5gQ/SMQCMWw2+08NpuDEEKIixCfz8/lciqVanp6OlehIdnExIRKpYrH436/X61WK5XKeDze0dFBt18BSkwryzmiXC4fHx8HtTObzW63W6FQXL58+fr162+88caiRYs+/PBD2DI/GlnQZTubzXK5XPzn2NiYwWDIb3mPE0Hxq8iv1hgbG9PpdH6/3+FwTExM0NXX6XTS7UPnA6J/TIj+EQiEYsRiMYqiuGw2QkgkEvX19eVoa2Z6vR67X84Krt5ra2sLhULw3GQyyeVyfT4fPShaQv/0en2xXvPJZLK7u9tutz/xxBMNDQ0PP/zw+vXrm5qaMpnMxMSERqPh8/kikUiv18vlcpgCDg4OWq1Wxn4KHl2j0YyMjMBtp9NZrIbd4XDo9fqBgQGHw4EQSiaTiURiZGSkt7fXYrFotVqEkEAgsNlsXq/3gw8+oPuFdnd3z5OfKoboHxOifwQCoQSxWOz+++9HCD3xxBO5XC4ejysUCnioovG0v78fUh+tVqvP51MoFGNjY0qlkqKozs5OKFSHLUvoX2trK9YhOul0WqPRdHd3j42N2e327du3h0Iht9uNky3HxsZWrFjx0UcfXb9+PRqNQt5Kf39/vpIxjj4yMmIwGFasWCEUCo8ePWo2m1UqVbGobzab/cpXvmIymRQKBUJILpfLZLKWlhan0xkIBKLR6NTUFB5vM5nMmjVrnnvuuVgsFgqFZDLZ5ORkWW9ltRD9Y0L0j0AglMbj8Wi1WjBGofdht1gs5RtyptPplStXnjx5sqOjg8vl6vX61tZWhJDL5crlciMjIzAZYjTkY1DMGpthYw3dHuh+Mb29vV/60pfwKuCuXbsmJibcbnd+iJLL5eIlxnA4rFQqr1y5Mjk5abFYmpubg8EgvQdTMpkcGxsDadfpdFwuF/yv9+/fz+fz8zN96OPt2NjY4cOHly5dqlKpDAYDzsqZP24b/RseHlY0NMC/ghscsVgUDQ1bmpvxPee6umB7CM2XCdE/QnUEg8EdRqNp166C1+OEzxIej8flclEUlclk6DFDUKNkMnn69GnTrl29vb3FklOy2WwsFnv00UcPHz7c0dEB8UCZTIblB8te6RGpu7u7p6cn/34oScR/WiyWoaEhuv4NDQ3de++9Y2Nj27dvX7VqVUNDw69//euCakpfYvzCF76AE0evXbsmk8l+/vOfB4PB7u5us9kMk1fIYfH5fJFIBEvjb3/7Ww6HE4/HGYk88Oqy2ezOnTslFMVmswUCwXe+851ir3duuT307+rVq+e6uuD2EYvlyJ9aHly9elXR0MC481xXFzxlenq6Igkk+keogjfffJMSiyEtUCwSvfPOOwt9RoS5IRwOOxwOp9NJT8cH1TEajWNjYz09Pd3d3XC/y+Xq6elZsmSJoKaGg5CEovY/8ED+PoPBoEwmU6lUcrmcfrXU2dmJw49+v5+iKIfDMTQ0lD8iTU9P7zAa5XK5Uqk8duzY+Ph4T0/PwMAALEOGw2G73S4QCF599dVcLjc6OgqJqXT9y2azq1evlkqlly5dmpycPH36tMlkKhhNBf0Lh8NOp/Pee++l659QKFy2bFlbW5vb7Q4GgwVNaoBYLCaVSmUymUwma21txckyMN4GAgGxSMRFiIUQFyGJRFJpX9/quD30j65ew8PD9EkeiN+Fvj7G9nTNw1pYDkT/CFWwatUqLkIchHgIcRG660+TyAkLSDweP3fu3HGbrWC7u9KMjIwolcqXXnrppZdeUigUeKyEeZLH4+nu7u7s7PT5fHC/x+N54IEHhHw+VEfwEBKJRAxViMViCoUCVrZg4Q1HBZPJpE6n0+v1BoOBoqienh6fz6dUKhcvXkzfQyaTaViyhMdmcxFiI8Rhs4VCIRshSixWqVTBYFChUHz961+32WwcDgchpFarYSmR4Zd98uTJZ599FodAVSrVxo0bGdk0cLYtLS0rV6585ZVXYJIK8U+bzXbo0KEy38nz58/jKg63242zTME04NSTT3IQYs/8q6+vvwnFf7nbRf/oXOjrGx4exn9uaW7O1zaGRjL+LA3RP0IVLFu2jDuTE89FaMWKFQt9RoRcLpeLx+NSqbSGy+UgJBaLz507V9HTDQbD2NgYyMPly5dxY3TQP/AGo8+ZfD7fqlWrWCwWmikQlEqlDEVh5Fja7XZ6V4RsNhsOh41Go9/vh3vee+89erFBLpcbHR2tlUh4MxdbCCHOzOHEQuG6desuXboE5wzVBfiJjA60Z86cef755/FkbuXKlYsXLx4ZGRkYGHA6nSaTSSaTQcYKn8+fnp6GLY8cOaJSqTQajdPpLH+WZjQaN27ciF8jvaIRIRQIBERCIUKIjRCLzP+KMTw8TJ/q4ckfrPNhkTvX1UUPh8LaYZmHIPpHqAKn0ykWiWDUEwuFOCBGWFjOnj1bw+XyaLOxigZWtVqNx326vbXNZhscHMxmszKZDCZz2Wz27NmzXC4XIcRmsyGOx0Fo8eLF2E4snU47nU6odseSiWvn6bS0tODsjx/+8IdsNpv+6NjYmLS2Fl4RVCKyZq69OAgtXbo0Go3COTMM0hjLe1NTUxRFvf3229Fo9MSJE2KxGCHE4XD27t3r9XpHRkYgSrl9+/ba2lo8TRweHj5w4ED57yFw8OBBXNsHNSR4ZRRK+NVqNZfL5XA4XC6XrP8VADJc6Et9oHygiBDzhLlgmfoH1zgMDAYD0T9CpWQyGavVCsVMDoejtCUH4aZx7Ngx9kxcmoeQRCLJL9MuSCaTcTgcUqnUZrNdu3bt2rVre/bsqaurg3Di5s2bx8fHg8EgaMbhw4e/+tWvikWiPwoth8NisXg8HsMJ2maz2e32WCxmNBoRQj09PW1tbQW76/X29prNZhDO48ePy+Vyxrk1NTXxuVwuQjw2m8Vi/f+VM4rau3fvY4899umnn167du3UqVN0d2m73e7xeIaGhlwul9lslkqlCKFFixY1NDSIxWIcwKivr6d/gU0m08aNG1955ZXr169/8sknu3btwnPT8nnttdf4fH5vb++zzz67du1aes4O1FdotdqXX35ZIpHgZNqbwO2kf8CW5mZFQ8PVq1dzeToHcph/fzH9i0aj43kUXG0mEGYlEolAJGehT4Tw/xkaGuLz+ayZqdLqVavKfGJ3d/e+fft+/etf33fffQKBQCAQiEQicFG5fPmyWCz+6le/CqtuCCFBTY1UKsVrfjyEWCzW66+/Tt9hMpmkKApmn5lMprOzE9rjFbxUymazdrudoiipVKpWq/MbFSWTyccee6xxxYqDDz741ltvURTF4/G4XO5DDz1kNBrXrVuHM02uXLnS39/f0dGh1+vBa62trc3j8ezfv18sErFYLIqiZDIZRFDhjaqVSHAVfywWa2pquueeexobG1euXCmXy6u7vAsEAgcPHnQ4HEuWLDl79iy+PxaLIYReffVVjUaTSqUQQjfTDvv2079cLldM/7DOMRb8LvT1kfU/wnwzNjZW0OGJsLBs374dISQUCu+6664SCYoMNm/eHIlEIOL3j//4j4sXL3788cdxDHDv3r26zZs5MyFHHkJsNhvPMrkI8bhc+hTH7XbL5XIul6tQKCAVxe/30+sTCpJKpXw+33333VdaEiYmJhobGymK4vP5SqXy5MmTzz333IEDBxobGwUCgV6vhwydiYkJi8UC12eJRILP5/NmZo0CPp/H4WD9A1PTXC4Xi8XkcvmXv/zlS5cu7dq167HHHqt6WQ73OYLCxEgkMjExEQgEFAqFWCwGE+2f/exnRP9mZ0tzM+R2MiZ2WPby8z8ZCaIlIPpHqI5AIIAQIit/txrYeauiZxkMhvfffx/ULhwOr1ixYt++fVj/1q5du3v3bg5twsflcoVCIQchSLS57777oIw9l8uNjo5qtdpUKmW32+VyuVwuhxTNckbeRCIhkUiKKWU6nf7Zz362aNEiWF1DCHG53K1bt7pcrmAwmG+egof7cDgsk8l4kD6KEBshqVTK43JZCImEQpwl1N3d/fTTT8NL/uSTT+hmnpXi8/mgtCOdTu/duxcEDyE0ODgI9RVtbW2PP/44mGhXd4gquP3070JfHz3h84jFgv/c0tyMU0NxzQPkyJS/f6J/hOrwer0ymWwBm3kSCmKxWBBCZS77YQKBgFKpfOutt95+++3Vq1e//PLLGo3mzJkzV65cOX78uEQiMRqNIpEIpoCUWLz/gQei0egjjzxy/333DQ0N0du6ut1umAtC/otMJtPr9eWbJKhUqv3798Nthnkml8tds2aNXC73er0ul8tqtXq93mJWnDnacJ9MJmHBD8RPIpF861vfEggEYrF41apVOp0OLhccDgcs+wH0Uo1KwaUXvb29NpsNyv8FAoFGowH9CwQCGzduNJvNZP2PCXZyyS/1y82sCCoaGuh1ETlavgzxfyHcBNxut1arzTfvJywskGxSZuQzlUodPXpUIBDI5fLjx48fPnz48OHDYGmWSqWgcG3RokV9fX2XLl3S6/WrVq1qampyuVz0nrG5XG5sbAwntvh8PjyBS6fTMpmsTDHOZrPRaHTz5s0ikWjDhg2LFi1imGdmMplUKqVQKNLpNLRusNlsuBgxH/pw/73vfU8ikVBiMYfDOeNwtLa27ty5E56Ly/BDodDatWshA/aVV17B6a+VMjU11dHR8dxzz+VyObPZDNoP2bNcLrexsRHmf3fffbfX672Zw+/toX83E6J/hOqw2+12u30Bm1nfgaRSqUgkwtAeBiqVSqVSlTnMHT58+NSpU9euXfvoo4/uueee/ETH9vb21157DeZD8XhcIBAUTAaJRCJ6vT4Wi1ksFpVKhRCy2+39/f1arbZEhDzfPFOlUnE4HJlMtn37dqVSWbDVkdPpvOeee86fPy+RSDQaTYklOsZwn0ql3n77bSiupyjq0KFDoPS4C1IqlXI6nQKBAFzNyl89xWSz2QcffFAikUACUTgcdrvdODLs9XoRQlKpdMOGDS0tLRs2bAiFQkT/FhKif4TqMJvNPT09VV8jEyrF5/PJZDKdTofb9xQEIdTW1lamLbVAILh27RoueN+3bx9jg0OHDuHq8mvXrhXrTBuLxVauXAkdGKampvx+P5fLtVgsjPOcmpoqbZ5pNBpPnjwJgkGfR2Li8bjZbD537lx7e7tQKCydn6LT6fJ9VQQCQSqVMhqNGo1mdHQ0GAweP378scce6+3tlclk4ETz0EMPlfPu5TMwMECJxbwZY5eGhoZUKgVhks7OToVCMTAwsG7dupdffhnOhN4O4iZA9I8J0T9CdRiNxkAgQL48N4fJyUm1Wg2BxEgkIpfLC+NIeW8AACAASURBVOpQIpGQy+V2u31gYKCc3cpkMmgJBL1hDx8+zNggGAzec8898Xj82rVrTz/9dLFK8Gw2ixDS6/X4no6OjpdffjkcDvt8vs7OTr1eT1EUVCOUMM+kKOq5556DlbPJyUl6ezxw9VQoFCKR6M0338yV0Qu+YLNcnU4XDocjkQibzRaLxUuXLhUIBIsXL8ZdjTo7O0UiUSKRSCaToVBodHS09ISbjsVi+WN+LEIchCiKisfjmUxmaGiov78fTgZEaHp6Wq1W3+Thl+gfE6J/hOqAJuAlWrUR5oRgMOh0Os1mMz2QWGwgi0ajWq2W4XtZkGw2OzIycuTIkc997nOXLl26ePGiUqks2Fr2y1/+skgkqqmpWb16dYm0UqFQuH79+lAo1NPTY7FYpFIpj8fT6XQQCB0fHy8nl7K1tdVsNsPJg9co3J9KpeRyORjHTE5OKpVKmDmV7gVfcAOr1QoXBwghq9UaCARSqRQUyMMGfr9/2bJlAwMDUqm0TiqVSaUrVqwoMxHG7XYLamqg0IKDkEQiyVdo+OxGR0fNZnM8HlcqleXseU4g+seE6B+hOiAUhluBE+aDzs5Og8HQ399vsVh0Oh0Mpul0WqVSFZw/jY6OtrS09Pf3O53OEruFoNy+ffseffTRuro6o9F49OjRYn3VYYjIZDIqlQq3qM3lcplMJhqNYvNMcPNau3btqVOnIO3zww8/rPT1Tk9Py2SyxsZGnU63adMmLLd4iQ5wuVz9/f0lesEDBfWvt7fX5XIlEgk2m40fHRwcxDp08eJFsVi8bt06XO9Rw+Va/rTfTjFSqdTy5ctrKYrNZotEooLGMSBC+DO6mVeQRP+YEP0jVAHEu3JFhhjCnADl2LDElc1mjUZja2urx+PR6/XFKuSgDoFejVAQt9t96tQpCHtGIpHSUxA8RPj9/p07d545c6atrQ2qEbRaLRQhXL58+e677x4aGoL8l9bW1qobGjidztOnT1+8ePGee+7Bd0ajUbVajedSsMBZrBc8puCXMxQKmc3maDRaW1uLo8T9/f1cLhemniqVau3atUKBgEfrcNLU1FTm+afTaSgm+e53v1twA6vVOjQ05HA4QB2J/i0kRP8IVYC/Nlqt9ua0brnFicfjPT09Lper9IykIsLhML04zOPxtLa2ulwuaFMgl8tdLhcjvObxeNxu99jYWLG83EQiEQqF7r33XpzVcv36deiWx9gym81OTk4ODQ2BM5lcLheLxTweD1bgjh07huf9YGsiFAqXLFmS721dKbinLkVR9Pt3796t1+uhzy1MhYv1gscUlBYInI6MjOzYsUOlUpnNZrPZDMH8wcFBj8fz5S9/2Wq1btq0iTPjF8Njsx+qsM6nxHUhnHZLSwtIEdG/hYToH6EKIpEINJq5kV/UZ4apqSmFQuF2u/v7+9Vq9eDg4JzsFha9QFCTyaRGo4GmrGazOZFIJBIJo9HIWOfr6Ojw+/1QjZC/w4mJCblcfvDgwVWrVj3yyCO4ZxCMAKlUamJigm6eqVar29raQG9++9vf4gXCdDqt0+kgxXRychLGervd/uKLLxaU0orAqiaXy2OxWDqd9ng8J06cOH78+P79++12e29vL8yJ3W536WXOgtKSzWa5XC4UXaRSqWAwGAqF6HmkEGuNRqNSqZTNZguFwuXLl1daCK9QKIo9BV6gQqGAN4ro30JC9I9QBbje2WKx0Nu53ZnAoAy3p6am5jCjYXR0VKFQqFQqmUwGh4AWRfBoNBqlt7vL5XJmszkUChX7UWu1WjA5++STT+66665Nmzbt379fLpfv2rVLpVIxzDNxugrWA/pkFC9fgRVLbkaNzGZzmaUXxcD6ZzKZLl++rNPpHn300TfeeOPRRx81GAz0+W5/f38J85dccWnRarU4yyYfvNaYTCYlEsmhQ4eqWOEuoWp2ux1KWfCWN619CtE/JkT/CFWAV5hmjUF95hkaGlIqlXa7PR6PRyIRrVaLEJLL5Td+WZDNZiHaCeXkMEfRarW4WcHY2BhUneOnQEpIJpNhtJDN5XLpdBohhGOeY2Nj4Ez2xS9+saB5JgYa2MJkFIui1WoF8xRYh8vlcl6v9+zZsyqVCp9edVitVphAnz592mg07tq1C58ztGFinFiJXRUTIYvFIhAIinU1oufaQI5oFa+ihP51dHTY7XbcHfBmrqAT/WNC9I9QBYyr/oU+nQWju7sbslEQQgqFQqlUQod0WGQqISrl0N/f39LSAoVoNpsN5ls+n0+j0QSDwWAwCD1UocEsLLxhzxSBQDA9Pc0wz6yvr8cm12fOnMG+JKXB1zq9vb1qtdrtdpvNZr1eD2VtdrsdROLxxx9ftmzZrE0eZgXG6Gw2u2HDhsbGxsceewzr38GDB+kF9YykUAapVArPsRh4PB6EUDEPAXrdIUIIZr2ZTKa9vZ3P5/P5/JNPPFF6xlZsUJ2amurp6WlsbEQIIYRg4Zzo30JC9I9QBdjjuKen5w5sARGLxQYHB0OhkEAgSCaTmUwGJBBqwGE4c7vdOChaBYlEYvPmzTibBgrb4XYgEAAFksvlEAsNh8PQYAEh5HQ6W1pauFwu3Tzzgw8+uP/++6VSKUVRZrN5165dOp2uzOYG9GzS8fHx/fv3Hzt2LJvNdnd363Q6v9/vcrm4XK7BYFi/fn3VrxcDY/TIyMiuXbtisVhDQ8PExMT169fff/99hUJBtxKdmprCs6h8SoxswWAQIVRsnoqfCOU9CoUil8udPXtWLBRCOYSQzy9dXkI/dDKZvHz5ssvl2rZtG3xDFi9ezGazjxw5AvUhRP8WEqJ/hCrAYc9ZU+0XHNCq0dHRuVplCQaDcrncarWCAuHUCb/fr1Kp8FEgFaWK/afT6QMHDigUipqamrVr18KID/4v9M2+9rWvPfzww9g8k8ViLVmyhKKonp6ekZERcDnBG5tMpvPnz1+/fv1Xv/qVWq12Op3lvxu9vb30S5xAIPC1r31tenoatB/u9Hg8x44dYyxGVgeM0V6vF1oRXblyZfny5WDUwkguTaVSjBxROiVGtsnJSYRQsfwU/ES4ARWuTU1NXFq/w2XLlpV4CRMTEzqdLhAItLe3azQakL3t27c/88wz77777rPPPkuffRL9W0iI/hGqALvaQ3vPhT6dokDnOfDpNplMVbczpSOTyXDJh06ngyhiMpnU6XQajaa1tTUQCDidToqiBgcHq0iG7O7ufvzxx69du3b58uXa2tpt27YFg0GdTge2Ydg8UyAQSKVSMM/82c9+tmrVqkAggNM+W1paRkdH4TZkPOIo4qVLlw4dOlT++dDdZKanp3U6nVarValUdO0PBAJQ+Vfpi80HxuhIJKJSqcCbbXJyctGiRQXlqoT9QrGRbWJiYvXq1Ww2W6PRFJwCMvQPSiPWrVsH+gcdoO4qMu/8+c9/fuHChZ07d9bU1CCEZDLZgQMHent7f/KTn/zf//0fbAPRVxwbJ/q3kBD9I1SB0WgEK5DSazALDkVRWKtsNhu9R3l1JBIJCIgBAwMD0DwI8jOz2Wx/fz/EQjUaTVtbm0KhqKgkLpVKbdiwIRqNglZ997vfZbPZUqlUIBAwzDOz2axOp7NarX6/v6Wlpa2tDSq7YT+MvCSKoqCtz/Xr1/v6+p566qnyT4mufyaTyev15nK5bDar0Wgg/TKZTOr1+jfffHNOUvmxHvj9frlcvnXrVoVCUWytroR4FBzZEokEJRZzZpRMJpMVvECBFwJmciaTaWxsLBAIiIRCDkIIIaFA8M477+CN//CHP/zwhz98/vnn9+zZA7K3ZMmSxsbGixcvFlwAhlp7PP82Go03rYKI6B8Ton+EKsDjzuTk5K3ZAmJgYEChUED+AliFwRxlfHy80t6wmHg87vf76UtHoKmMhTSfz2c2m2GAC4fDZZZD9Pf3y2QyiUQil8vfeOMN0Kr3339frVYXM89Mp9Ner/fUqVOwMOb3+zs6OuAhl8sFQgWcP39erVa/8cYbX/nKVxQKRUWdfaAiAm4LBAI83wqFQpD1Q1EUTIKLdYeoCLqkpdPp0v2eDAYD3ZKNTsErs6GhoVqJBHexl9XWFqzWAP2DPWAz8WAweP9997FYrLNnz+Zyud///vfDw8Nnzpy5++67IcJ59913nzlzZnh4+MKFC8UWBWKx2No1a1gs1po1a0CKbmYFLdE/JkT/CFVAURTEvm7N78/Y2JharY7H4zKZzOFwgHWWzWYTCAQmk0kmk9G1oUympqbkcrnNZnM4HDKZDNb/DAZDfkzVZrPRS+AL9rFjmGdKJJL6+vrJycnr16+//PLLUqn0/Pnzzz//vEKhwGHMEthstv7+fvpEDYxg8AYul+vw4cNPPfWUy+WqtK0dfSpJtwD1+XxWqzUej+N3YE5CeRXtBOodCz5UUP9CoZC0thbrX51UWtBBja5/9Hcyk8kghI4ePWqz2aDNIZ/P37NnzwsvvPDDH/7wD3/4A2xWrDAxk8k0rljBYbHYCHERktbWxmIxon8Lya05fhFuZWA9Cd++BVtAOJ3O/v7+3EyuCpfLVavVcrkc1pASiYRSqazUts1qtcI+czO9eIrl1PT29uLLfzB0zmazyWRydHTU6/VarVaGeebIyMizzz4L+SnA5z73uXXr1mk0mosXL5Zzbu++++6RI0cOHDiADS1xXlI6nYbXi6vmK4Wuf4ODg3K53O12g8M14z2kD6/gnVaFN15F+lei01NB/ctkMitWrBDweFyEajicVatWFfwEZTJZKpUKhUJtbW3wTv7kJz/p7e3ds2cPTPUaGhoOHz584cKFn//85/lPL9Z/IxwO19LUl8/jeb1eon8LCdE/QqUwvjO3YAsIr9eLI4GTk5MCgcDlctELmaso26ePHZlMRiAQFNsynU5v3rzZYDA88MADYrH47rvvlkqlYrF427ZtDodjYGCAHtPLZrNer3fTpk3YkOzatWvLli1js1gshCQU1dfXV/rEJiYmlEqlxWKpra29++67Yc8wdjscDoqiFi1a1NjYWPXMDOc6AZFIpKenx+v15u8Q1iBzudzzzz8vEonqpFKKotrb2ys6HD3EOislOj0VW5lOJpPt7e06ne706dPForWgwa+99trevXsfeeQRqVQKsrdy5UqE0O7du+kXE+FweEtzc11d3dmzZ2Eq3N3dXbD0JRqNUhSF9U9QU9Pf30/0byEh+keoFIa95C3YAiKZTKpUKrfbHQgETCaTw+GA+gG42M9ms3q9vpy4Ih2n04k11e/3M8bWfPNMhUKxcePGJ598srGxUUJR9TJZbW3tE088IZVKhUJh26FDkHlx4MCBhx9++Dvf+U5dXV1nZ+cbb7xhMpkkFIXNl/l8fukTU6lUMKhBSyPQg/Hx8bVr15pMJhji+/v7jUZjRa8XU/6gCVcV09PTYrEYj/IURVU05lYUToDmugUfgiuA8neF+fDDD6G+ZdmyZSB7fD7f5XJdvnz5Bz/4AZfLpV9IRaNRkUjEhrwYPn/nzp254ldX2Wx208aNQj4fPLXr6+rA2WCuDGNnhegfE6J/hErB5p/ArdkC4ve///2iRYtOnDiBfcg6Ozt1Op3H4zEYDHQry3LIZrM//elPN23atHr1ar1er9FoPvjgg1Ao5Ha729raSphnnj17ViQQ4LoxFovFnbn2v//++ycnJzds2HDt2rXr169/9NFHGzZs2LFjh3r1ai5CoH88hPh8fomkkmQyiV1O5HL5wMAApIDGYjGRSERfG4OYXkWvGih/0ITZWCgUqqWoP3ZOQEjI5+O4cTlUpH/QcangQ5VWpv7DP/zDt771LYvFsnTpUoQQRVHr1q279957f/SjH+FTCgQCKpWKfunjdDp5bDboHw8hoVCYSCRsNlux6EIqlbLb7SqVat++fbAQezMdBIn+MSH6R6gUxshyIz+q6enpUChU9dJUCUKhUH74a2RkRKlUymQylUql0WjKlO1UKtXc3NzU1NTU1LR48eL169dTFKVQKMxms8vlKm2euWXLFkiax+CJEZvNnpiY2Lt3L1726+rq6u3t9fv9kKPPQojHZs9aVA5tGWAhtrOzE5I1kskkn8/H9R7xeLxEqXhpyr++gbyP6elpkUiEZvRPMp/zvxLlN+Xo37Vr18bGxl588cWWlhaBQAARzkcffXT16tVvvfUWDq7iDCav19vS0kJPeG4/eVLE57NmPlmRSJRIJCr6RRD9W0iI/hEqBZt/AlW3gOjp6VEoFFAkdyNWYQygFd/evXu/+tWvMh4aGxvT6XQQeBwZGaHbtTBIJBLYPFOpVLa3t4NEvfjii9u3by+/qv3JJ5/kcjjsmfkfVgWY2EEnd2jFNzk5qVQqQUrb29s5bDabzd6wYcOsseWRkRG5XA6ezvR8VChO6O7u7u/v12q1FU3C6JQf34bmfLlc7tSpUxAPFIlEJ594ovxjlTDtLMj09HSx4auE/n300Uff//73z549e88998BFiU6n+8IXvjA0NPTv//7vuRmdwPqHqyw8Hk9HRwe9oGV8fByEEyFUw+Vu2rgxV6HMEP1bSIj+ESoFm38C1f2AYUEOInKQoFhpXn5BoBWfy+Xq7e1VqVSM6i6n04lL2XK5nE6ng5lNNpuNRqODg4Ngngn17Ng8c/369ZFIBPTv448/rmiATiaTtbW1Aj5fVlsrEgo5HA7kvouEQjAVi0Qi0OFBoVDQLyOee+65e++9t8yjxONxj8ej0Wjocq5UKq9cuWK1Wp1OZ6WLnXTK1z88GxsdHUUIHThwoNJeEJUORyUs0PL179e//vW3v/3txx9/fNWqVQghHo9nMpncbvfo6CijiAV0wuFwwEUDbkkBX3XGDNXj8YhEIi6XazKZoLSU3qNqVoj+LSRE/z7DZLPZvr6+jVrtgf3753CJjvGLrbQFRDqd7u7uZkQgLRZLMBjMZDLnzp1ramrasGFDpUkB6XQaivxwQjx4aNG38Xq92LIkFAoJhUJwreRyuRqNxmKxgHkmw2rr8OHDr732GujflStXCraWLcHRo0e3bt163333fetb3+rs7FyxYoXBYHj99dfh0Wg0qlAo8jMeXS5X+YuU0H62ubmZPo5rNBqn01naqbkcyl84BMOU3IwtTrGVuRJUMRwVSz/Gs7e//du//cY3vvHggw/W1dWBOctDDz3U19f3s5/9rNg+W1tbR0dH8fe8u7sbLvja2tqCwSDDNcbr9XZ3d4NNDNxTUUZYsWTR+YDoHxOif59hHA4HJRazEGIjJBAI5koCGQnxlbaAMJvNnZ2dQ0ND0CdvbGystbVVIBBAV1KRUMhFiIuQWCwuWJucTyKROHToEEVRFEUplUpcoE1vgzc1NRUMBru6uoRCoVgs5vP5XC5306ZNPp8vEomU9gWFOWVXV9fTTz+tVCorGkHS6XR9fX1HR8fFixd37dr1wAMPQLe83Eyc9siRI/lx2lwuB1kS5RxidHRUIpHwuNwaHq9hyRIYmrPZrFqtXrVq1YMPPniDn3v5C3KxWAxigx6Pp7W1tdILhVxVw1FBsUmlUo8++qjRaDQajSwWCyG0Zs2akydPvvnmm//8z/886z5B+bD+4SxT0A9wBMUbQ9UH/aJQIBCU7zRbooRjziH6x4To32eVbDZbU1PDQwghxEGIg9CxY8fmZM9Go5HeW6CiRLtYLIb7GHR0dOCsEIfDMTo6ymKxODMrZByEtm/fXs4+Dx06dObMmWvXrn388cdNTU2f+9znkslkOBw2m82NjY16vR500Ww2u93uv/iLv3A4HA6HQ6vVzurMOT4+vm/fvs2bNz/88MNer7dg0Vtp/H4/Luz79NNPly1btnjx4hxNU7/+9a/nx2lzlejfokWLuAixEeIgJODxPv/5z+dyOafTuXjx4qeffhps1W5EAitKSIGNOzo6enp6KgoUA1NTU5Xa6dEt0P71X//1u9/97lNPPbVhwwb4Xm3duvVLX/rSX/3VX3388cfl7xPEDF/njYyMwFULBDYZKqJUKhOJBA6W5ip8x4j+LSRE/z6rpNNpHo/Hpenf/ffdV+Zzo9EoNE3t7u7Ov5JlXHFX1AJiamoKNxfN5XJ2u12r1eLxi8flsmby/rkI7SivZI2iqE8++QQ05t133xUIBCwWi8fj1dfXP//888XMM6FWr8RuoanepUuXJiYmDhw4UF2bp56eni9/+cs4w3Pr1q01NTWpVOqxxx67ePEi3BkOh/N/g2XqXzabZbPZXNqbdu+2bZFIRCAQnDhxAhow4ahvFZTuMZQPxAbBlqyYu3QJqrBTN5vNfX19r7766iOPPLJ8+XIoXWhtbd2zZ4/dbq+u6RXoH1YLbHILPqt007V4PI6nvCBj9IqUciD6t5DcLvqXTqc72tvFYnFDQ8NNC5ff7uzZs4fH4SCE2AhRYnExp0QGEMUKBALRaNRut+OWAhiKougrLuWPWfF4PBQKKZVKt9sdi8VGR0dlMhldDlevXs1hsyFJUiwSFfQmzuWZZwqFQtww4a233tq/f38ikSjW3Y3xMkts0NnZ+corr+CpW0W+JJhwOLx48eJYLAZrhyqVatOmTeFwGEYivHMcp8WYTKZZf5iZTCYejy9VKHBaKb+mRiwWGwwGgUDw8MMPw8A6MDBQWulLUOn4ALFBnU4XiUTg/4oOV/536X/+538++OCDr3zlK8uWLYOuCytWrDh27Nhrr732i1/8IkfzwKsCyJ/CapFOp8HuByZ29FAnrrIfGBiAK6RK3zGifwUYHh5WNDTAvxIPXaB5I53r6oI7K6qmul30z2q1Cvl83szKEE4fuNPIZrORSCQajZZzYZtIJFY1NYGBRfljgcfjwemd2WxWoVDQZ3vZbJZh/VVmCwhoZ9PW1qZUKhFCKpXKYDCMjIzo9fqOjo7x8fH+/v7ly5fr9XrwV/zOd76Dn4vNM202GzbPtFgsbrd79+7dIpFo2bJlFy9efOmllyqK9TGaxDI4ceIE7sNw7do1bPldEYlEQiaTCYXCuro6iqKWLl26e/fuvXv3qlSqNWvW/OIXv4CGRPv27WM8cVb9e/HFF0UiEUVRHA5HIBDU19VJKIrL5f72t7/N5XIGg4HH4504cSIej6vV6mJXErNS6fgAI6xCoYjH41UUxsyqf4lE4tKlS06ns7m5GVtxNjc3f+973/vd735H3/JG8ipBk7RaLa7slMlkk5OTcrk896cJX93d3eCljivxJycn6Zd0s+Lz+aqenVfK7aF/V69ePdfVBbePWCxH/jSNCj/EuBPun56erkgCbxf9EwqFuHCYi9C2bdsW+owWgHg8rtPp9Ho9dB4op4+PxWLRaDT0VgCzgn/SuZllqra2NpxAn/+FKecrFI/HsY6m02n62lsqlXK5XNCW4Z/+6Z+6u7sVCoXVah0aGnK5XGazGaoRjEZjvnmmwWA4c+bMJ5988vLLL8vl8gcffLCiCcczzzzj8XgYS3o+nw/Msg8ePLhy5cpIJBKPx0+dOnXgwIHy94yZnJxcuXLlypUrw+EwTAFra2vPnDkzOTnp8/mEQuHq1at1Ol3+smJp/RsdHZVQFA8hSG6qr6//8Y9//OKLLz7++OOwQSKRALNKhUJBL/mo4vwrGs3b2togsylHS5ssn2L695vf/GZgYODEiRNqtRohxOFwdu3a9dxzz/31X/91sTj2jesfPc6v0+mGhoZg6Zpe/9rS0gKKgs+80hBupT41N8LtoX909RoeHt7S3Ez/8+rVq/nb0zUPa2E53C76R1EURHhgnX/njh0LfUYLgNVqxReePT09UGtcGq1W63Q6y/yBJZPJzs5OpVIJWY7RaBRsvXw+n0qlghlkJBJh5OWX0wKCYZnG6E4H5pkqlWrJkiVCoRAhxOVy29rawExrenoa6vMYi0lQKw3mYdevX3/ttdcqivJB9b3JZKJX3wcCgQ0bNkxNTX388cePP/74zp07NRqNTCZ77LHHqujkDi+8qanp6aefxkuAGzZsmJiYgNvHjx9/7rnnCj5Rq9XSG+0yeOqpp6CJK9iMyaTSaDQK1f3Y43T9+vWzesfMSqWjud1ud7vdMKTQ+xGWCUMMfvrTn37zm988dOjQokWLIFv40KFDXq+XPmsvtvx8I/rX09MDrwLrH5iJw1tBP0kcFcBRkNHRUfpXfVaI/pXiQl/f8PAw/nNLc3N+UDRfI+l/luZ20b+zZ8+KxeI/9l8WCquO58wrkUgkEAhUuuZRDplMZmhoSCaT4VQR/MElEolicTmIVfr9/nJ+YNBP3OPxRKNRr9fL5XIRQq2trTDLjMVisKoP5QqM5866NhaNRpVKJeShwIG6u7s9Hg82z1y6dKlcLn/qqafWrl0rlUrlcjme3Y6Pj8vlcplUKhaLj89IfjwedzqdPB4PZ7689NJL5ceRJicnIZch96fV94cOHRoeHsbLclV7hmECgcC2bdvoKaCLFi2ampqCP0+dOlVscgbt5Yrt9qWXXuLzeFj/eDweyHNrayu0rDOZTLt3765o6laQSvXP4/G0tLTAFdLY2FilptuBQOCxxx577733zp8/v3PnTnDWvOuuu+x2+xtvvFHQIWF8fLzgUW5E/0CT6GUMTqfTYDCA0GKFm5ycxFcYEOHIVa5nRP+KMjw8fOFPu5/AJA+W+vBD57q66DFSWCAs8xC3i/79sZR740aE0K0pfi6XS6lU2u12pVI5twH9VCql1Wrb2to0Go1AIICcbIjG6HQ6egNuBhC8KvMHxhhHLBYLQohegQfDccG9lS749fl8MplMqVTy+fxly5ax2Ww+n88wz6QoCtTIbrfbbDa1Wo3r3yG/HyyhxSJRIBBIJpNKpfL8+fPbt2/ftWvX2NjYW2+9JZPJyr/yYKSEYMPiw4cP4zW/Sq1eCtLb2/vFL35RrVafOnXq4sWLO3fuXLJkyYsvvjg9PX3p0iW5XF7sfSutf6lUqnHFCmFNDUKoViLBn342mx0cHPR4NP4FewAAIABJREFUPIODgx9++OEN/rQjkYjT6SyzCgXo7++HgHmOJgnl8G//9m9vv/327t27oUodIdTc3NzV1XXp0qX/+I//KPHEYiPYjYz18CWnv/9er1cmk8E3PxwOQ2kj41tU4gcy67GqO89KuZ3074jFAlO9I4VsFEDksBx+5vUPGB8fvwW7reZm5jdwtZhOpzUaDZ6o3ThutxsGuHA4DM7LnZ2dIHuQ4J5KpUwmU34j0GAwaLFYyryEHxgYoE/soDKhtbUVXhRMKXIzbheM52IjMYBunqlWq1ksllartdlsp0+frqmpyZ/xQENdCNxZLJZnnnnmc5/7HM6mE4vFUMUBoW/r0aO9vb1nzpyBtJQXXngB0moqKnELh8P0dkgqleonP/nJGYdjsVxeV1c3PDz8/vvvb9269cYT85xOp9frTaVSHo+nvb09EAjEYjGFQqFUKvfu3VviSwJZQiX2nE6nfT4fQqiEt9mN/FgcDodYLBby+Vwut+DVVUHAHgxf/83aGzIajUIfeXi9cIX01a9+9W/+5m/+93//t5wj4uRMTCKRaNm7l8ViiUSi6lJA8/UvGAwihOD7gMdMh8MBP0AA6j0qzecMhUL5KdbzxO2kfwAEPPPX/HK53BGLBUKjZeqfyWRChbjt9K+6Ni6lmZqauq+lRSKR7H/ggYpqnMPhMCzF3WB71RLQ/VZisZhAIPB6vTgbDSjY7Qx+iuXk1BkMBljoMpvNyWQyGAxCCp/dbqcoisvl4hwNt9vNqD/JZrMGg8HlcrlcLmyeaTKZrFarXq9XqVRHjhyhv5aC0/fW1lYYNLdt27Z27dpXX30Vvpbg4cKaSfQQ8vnQfLyvrw+vqK1du7aK+m5o1Nfd3a3X6x0Oxw6jERqzsRGSyWQ7duzwer3VVY/RKdgKx2q1zvr1gN/mrPsvvQ1FUdX9WCKRCPTw4yDERqi2trZEjws68AvFaS8ajSb/idevX//Rj37U09Ozb98+iqIQQsuXLz969Oirr756+vTpinK1AIbfys4dO7hsNgshDkISiaSKcFEoFDIYDPTfVyQSQQjBojVWXMZlH0RBKtW/Kkoeq+b2079cLldM//DSIGPB70Jf32dv/Q+AX9ecd1tNpVKLFi3isdlg4t6wZEmZme6QGOLxeCDsOU/zv97eXhwhGR0dxcUGMpkML5J5PJ78oCuYas76A7NarTBgTU9PGwwGLpdrNBpxLDGVSjkcDjwq2e32/v7+sbGx/v5+u90O5pkURRmNRrp5JthaDgwMeL1ehBBMIGCmVXAkhbJigUDA4/FOnjyZy+U0Gs3U1BT4ePF4PA6LxeVwGhsbU6lUOBxetWrV9PT09evXL168WKljCGZ8fPzuu+9+/fXXY7GYRCLhzlTRcdnsKkbhghQccXp6emadUc2J/lXdmjgQCNRS1P/XP4oq83ouGo0ihPDG9FLx//zP//zBD35w7ty5LVu2wKvTarWdnZ2Dg4P4JKsrhqO/TLB9wCujFdk+YMDkjD4wJpNJ+uvicrmQfkW/QoLPuqOjgz4pLOdYRP9KsaW5uWA9wxGLBe7Pz/9krBqWgOhfLpcLBoP1MhluT1NfV1dOqXgmk6EoCp8MNEYBIYRZNT3F8UbIZDItLS06na61tVWhUODkN6/Xq9FofD7fqVOnFi1alP+2QAHT9PQ0thwrCL2yLRKJ5CdNvPfee4sXL+7u7jabzTKZjKIog8HgcDh8Pl84HE6n0/nz3Y6ODohzZrNZk8kkEAigBfmsOav4J3r06FGj0dikUm3dujUcDp88eXLt2rWZTCaZTEaj0TVr1kilUplMZjAYqmscAUtlLS0t3/zmN3/1q1/VyWRshNgzLVtPnz5dxT7zUavV+acXDAZnDXmVo3+JRII+R8nHaDRWdx2G53/sSuZ/k5OTzzzzDH3Z2OFwnD9//s0333ziiSfWrFmDEGKxWDt27Oju7r5y5cp//dd/MfZQnf4ZjUY8rGPbP6x/Vdj+MfRvbGxscHCQz+fTHa4HBwcZeTcg9pXGfoj+leJCX1/BYoYLfX2M4nfY7OrVq+Uv/uVuN/0LhUIIoRI1y9URDAZrJRKsf7USSTn6xzAQCQQCra2tBoPBYrEkEonJyUmDwVDRlWA+2WwW+trodDrwnmdMTEOhkMPhUCgU3//+9/OfKxAIstlsiY84nU5HIpFNmzbhX4Xf729rawuHw1CWi80z1Wq10Wi02+3r1q3Lf//zhy167TPEMB0ORznV0BBTmpqagkIIFkISieT5558HFXc4HDKZbPPmzcuXL8+viKgIeqpkW1vb+vXr2SwWRFk5HI7dbp/VQaYcCnqAzeoYkEgkFArFrDbKs/54W1tby/QQzwfW/2p4vJqamnLW/37wgx+IRKIaLhchVFdX9+6777788ssbN26Ez7G+vv7gwYMvvfTS3/3d35XYSXX6Bz8N/Ofp06fF0ICXzRZWZfsOXf0MBkM2m925c6eEomopisvl4riuXq+3Wq2Mt4XhGlr+sYj+/QnYyYXh8FLM+QXA+TKfSf8XAFbXq/4Ii5FKpRbL5Vxw3mKxFsvlZcY/lUolKGUmk2ltbQ0EAgqFAo934+Pj5bewKYjH4zEajZOTk6CmxSaUTqcz3xMOVy4X+4gjkYhSqbznnnvkcnltbe3OnTvvuusuDodTU1Oj0+kgzgnmmT09PTjMy+Vyf/nLXzJ21dvby0iKCYVCOp1ueno6nU67XK7yDUIhlnXcZuPQPC1ramri8bhUKt27dy8UPFy6dKnqsGduphEuzn/RarUwfLNYLIlE8sILL3R3dyuVyhvR19yfNqCgA/k+JRJD4CObNXo564/3BtehI5HItm3byrQbXLx4MQSQYbEWui4oFIrly5f/+Z//+W9+85tydgJBhUrPkxFyzGazzz77LJvNlkql7e3tVbjWTU9PI4RMJlMgEBCLRNh2QywWw8hgMpnkcjljZRHq/SvVGDCKq/QMq+P20L+bCdE/YGpqavPmzQghbRkdtzFg9aTX6xUKBUT2VCoVnjeMjIzc4JUdvUNewcgkEAqF8mvygsEgpOQwRmFsnrls2TKodbt27dq+ffvUavWxY8fee+89RtJHKpWiV+PRr4IxBXO4jxw5IpPJBAKB1WotX0hg0N+9ezfuk85DiMfjpVIpiUTy1ltv4bQXyNApc7elT9hqtXZ3d0PdPX75HR0dVRtIAiV+XFqttsS8ZK70rwoHFgbljJi/+93v/vIv/xIm6wALoSVLlsDac0WXKdUJNmPWGI/HKYqC/Bchn1/FbzAWi4H+nXrySQ7tewg+A3CeCKGtW7fK5fL777sPPia4CqzU9fRmjsBE/5jcjvpX6S8km80ODAx0dnb29vaWSIcbGxtDCJV5tZvJZDo7O+VyuUAgMJlMeM7t9XqNRuPY2FggEFi7du0NlirSDSonJiYKXidGo1GbzWYwGPr7++nS5fF44LXA0j3DPPPQoUMSiQRryZUrVw4dOlTwHOjLh9lslsfj5Sfa5GefQt5KRaEIQKVS/fznPz9w4ACHw+HMZKNsv/feXC4nlUrPnz8PJwxjXBWX9vhF4dq7WCy2ePHipqYmlUpVU1ODt2G0ua+CiYmJYgGA0t6YECCdVf9mNSfLn5dXSgmd/uUvf/n6668/+uijjY2NCCH2TMoleJeDr02xGXAxqtM/v99/8uRJr9e7devW/fv3d3V1iQUCNJPNJJFIKl0hBv2DNN2C87/Pf/7zbDabx2ZzEeKx2Q0NDel0Gi6qKs05Ivq3kNwJ+me1Wo1GI9igaLXaYoMm7LzMxD+XywXeKIlEwmg00i8//X4/lAG88MILFZ1nPj6fT6/Xh8NhKLnNDw1NTU3J5fL+/n5oUQbKNDk5OTQ0pNPpNBoNVCNASRbDPLO+vn5ychLk5Pnnny+2xgNJm7Ck8ctf/rKmpiZ/4KavYSQSiQMHDkBSaPl1YxixWNzY2OhyuR555BE2m81isbbfey/MPhsbG5cvX/7oo4/29fWtXbv2BidngUBALpfrdDq5XD44OOjz+Z566imEELy6qakppVJ5IyvN3/nOd+rq6jgcznGbLT+c7vF4SigTvJ+zjqSzLh3deG014xyy2eyPf/zjr33taw888IBEIkEILVu27MiRI6+88so777zTsGSJTCqVSCR79+zBXzOlUln+ZVB1+hcMBpuamiixGBJe+DU1bBaLjSdtlbc/hEtGaJ+E1//EYjF4so+Pj0ulUhZtXiivrw+FQvAbxL5C5TA6Omqz2aRS6Zzn9BWE6B+T20v/enp6EEIVrRBAuTEegOx2e36dOAD6V+Z4QZ/cFIzg001yq8Dj8UCm5fbt27dt22Y0GguOC06ns7u7e2Jior+//8SJE2w2WyAQqNXqtrY2iqIGBgbgJOkBzNzM9GLJkiX19fWgNGq1ukSIElYKdTqdRCJZtmxZ/gb0tqWHDh36/Oc/f+3atY8++uiee+6pNAOI/hFkMpnGxkZ88W4ymWw2244dO5xO56yta8shnU5Ho1H4bsDK07Jly9avXy+TyeRyebHvSTmMjo5SYjEkTwprah588EHGBqWbJs6V/uHGrVWDEMpms8lkMhQKuVwug8EAEc7169efOnXqu9/97r/8y7/gjSG0zphsmUym8j8sqNip9CQ/+OADNpuN1Qgmo3+Mn7PZjY2NVcQJ6N9DyP+Ez2JqakoikbBnFqf/KLG1taFQCByUyvcceP3118UiEaxz19bWVpfGXBFE/5jcXvrn8XiwC0OZRCIRMCsCXC6X3W4v1hBVpVKVmamh1WpxlH9sbCw/zFVFJ2uM3+/funVrLBb75JNPTp48eeLECfqj09PToVAIzDMlEgmPx4MWQj6fTyqVfvjhh7lcLpvN0r0rGSMpdhf70Y9+pFQq29vbZ833AQfqS5cuFUzcx98iOC4Oq166dKlYWLUYjM/XYDDAJCyZTO7YsYNe/jG3QFN7tVodi8VuMO0ll8s98MADMK5BCLeGx2O8w6VTQOdK/yYmJip14KTzi1/8gs/nt7e3r127FmRv+/btzz777LvvvvvJJ5+UuZOK6uGqG6B//etfs1gsHi37ZqNWu3TpUi6X21ykeGxWEEIFJ+hfPHtWLBDwZj5cevwTEsLL1z+pVIo9/XlsdqW/lCog+sfks61/4XAYUhbhCtRms8Gytlwuz69wgFT4MlfL/X6/RqMZGRkZGRnRaDTYrBKTTqfvuuuuJ598soQ9VTH27dt3+fJl3HlOLBb7/X6Hw2E0GsH/DJtnXrx4ESrMMpmM2+3GJ/+1r32tTiZzu92g9PSRlOHKGAgEyjfpLxFPwz97uVwej8fh5F955RWGeM8KQkipVELXoZaWlpqamuPHj3d2dspksvr6eqFQOIfGAnRkMhnYyFWRLp/P4Ycf5syU0/AQqqmpYUxB0uk0h8Mp5mwZCARgsbZ01d2s+lfdr/vv//7vL1y48PDDD8vlcoQQuAJ94xvfqO6d7+3tLScQks1mz58/LxQI9uzZU+lM6Ec/+hGLxQLPFzZC4rJbPZeg2DjzzDPPcGaWAyHNddeuXfDjSqVSFdlp0eesXITol+nzBNE/Jguuf5FIBJavyvGa8ng8crm8THfpkZERpVLp9Xq9Xi84LkIzBDioXC5nDEkejwecl0vsM5FItLa2IoQoitJoNGazua2tLb/cB1rcQQmBVqutyEwEFhRxouNHH30kEolsNpvX6x0dHc2fmvj9foVCUVNTs3XrVmwhzefzWQjxebylS5emUim9Xo9nq+l0GptN53K57u7u8k/P6/U+9NBDdrvd6XQyBiloAZFMJs1m87p1695+++2+vr5Kl16g7m1oaKihoQEhtHjx4u9973tWqxVO2O1222y20k3bqyMej8NuzWbznGQXh8PhP5agISShqPb2dvqjV65ckclk0Lf261//ev7T4Tpj1tFq1uW9VCpVZguL//7v/37//feff/753bt3Qzv1pqamffv2NTU1/epX/4+9749vor7/fze5/L6kKYS2QAtBSg0QsEAKBYq0ErSTIhUDFCxYEbW4im2tiFikWLVqLEWr66Bqxeqn1Q7LVjRudYtdt2Vf8xjZ1rluq1u3xa3ObMtmNrMtm/f947Xebpfkcne5pGHc89EHD5pe7i6X972f9379eD5/xGYP0UAawzLjuuuuS4OknUSi1WrZ58Nu3rMH12hgeSqVSGbNmvX000/Hc8IEQXR3dyuVyohrR4h/wspPJZevXr2a+ldO/LdmzRrZFAWqVao4i63YQOQ/OqaX/6CxDOxPS0pKYlJgU1NTXl4eyxRdUVERufYaHBxECFEzOtQAJqC6urq1tZVZsb6srKyuro4gCK/Xa7FYogV2Ojo6yJMMBAIGgyFa3SnEFXt6eqjimQsWLJDL5S+99NL58+dXrVrFRkemp6enpqaGIAifz6dWqyVTkTelXG6326nj3u/3HzhwoKCgoKOjo66ujlOXW0lJyZw5c7q7u8E8j0qBRqPR5XIZjca6urqqqiqw1uO6liJHI7Wjo6amBiE0MDAA1Yy8Nb0YMDg4CHHd6upqrpbl0fDYY4/p9frCwsKWlhbqwPb7/aDoDQE0XKMJj+gKxX9ELIE0r9fb19dXW1u7YsUKoJCVK1fefffdr7322m9+8xuHwxFn+pBg19/23HPPkbFiSNqxfMZ1Op34lA8whpBWq+UX7aTi9ttvB0LFJBIcx8N7bJxO57Jly7KysvZWVdHu65ycHPYBZ6/Xu3TpUlyjUalUUGsT55nHhMh/dCSf/0ZHR202G3RYU9UxoH+c+b0wKcS85wcGBsAnuri4GO6HsbExKGiGDbxer16vp6VkoPaMYb6AtmXqUaIlC2ltvNTll9/vp4lnmkwmm81GimdOTEwYDIZnnnlm27ZtW7ZsYVkO53K5YKryeDz69HTJVORNitDBgwdh3AeDQZvNptfr9Xo9hmGwpmSvjwzKUuTnamlpAcYFFBQU7Nu3j+wegQYDlnsmQY5G6qIBgt79/f3d3d27d+8O/+LiB1ms1NjYKJRweUtLCzwq0eB0OvXp6aSTMyaRhD/4t7e319XVCcJ/ER8XfvjDH3Z2dt58883gsqRQKDZt2vTQQw997Wtf++tf/8pp/zERbQ3q9Xo7Ojpeeuml22+/3WQyKRQKMhgoRYg0smdGe3u7XCol38hSuZAB0LBBpvdkEklDQwP7t5vNZq7thgz+nYJD5D86ksx/kHzq7Oz0eDwHDhygdi/V1dVZrVZm6SAwh2O2VwZrU6fTCesGk8kEApVg31xSUgKLnvz8fFqZMqgoGQwGhvUQNXJIXeTR4HA4LBYLUMvZs2dnzZp1+PDh8vLynJyccPFMeEsgEAgGg8Fg0GKxsOxBpGJychJKUs+ePZuh16OppIJarR4aGqqoqICSmfLy8mAwGAqFIJbI6RB+v18mk5G1fL29vUD/oVDo6NGjCoVCoVDUU7T6cBznWkhCjkafzwfy2RMTE6CgXVlZuXv3bhzHhVKmBvh8vq6ursLCQuB1fvpbEWGz2cKzwgRBjI+Pq1QqUloaHA1p28BpCMJ/pEfBv/71r29+85uPPfbYli1b0tPTQZzlpptuam9vj9avzTJ1FxPhInAOh0Oj0ShlMtAbev/99xebTBAMhPZBlllzcv0nm2r1i3P95/P54NsB/mPPxARBBIPBlStXlpaW8m5LTTRE/qMjyfzX3t5O3lE+n0+pVELwp6mpCSEEfdwM83J1dTUsARkO0draClOk3+8vLy9HCCmVSpvNFggEQqHQ4OAgmAfddNNNM2bMUCqVFRUVQGkwOJjDa8ePH1+5cuXg4GBHR0d2dnZ4fC8QCIB4psViwTAsLS1NIpGsW7euqampv78/YmJ/cnIS2hWg2+GGG25g+HQMuPrqq3Nycvbt27dq1SqtVqtWq2UyWVtbGzG1tKWO/kAgwMPcNSMj4+DBg3DOFosFQoVHjx7FNRpSOfOLX/wiQRBdXV08tN+o9Yoej8dqtRqNRqvV6nQ6ocHjqquu4rpPBng8nvT0dJVCIZFIcBwfGxvr7OyMs2GcIIhQKOR0OufMmfO9730v4ga33HKLTqdLQwiTShcvXhwe+GLJf2z4af369Y888sh99923bt06iHAuXrz4wIEDL730UkyqaGpqEuRp4Kqrrnr55ZeprxiNRjICrMCwXbt2eb3e4vXrJRJJRkbGiy++yH7nkP/TajQajebEiRPxn23+okVSSnSaJRNPTEzMmzdPJpPJ5fJ58+YJIh4rOKaB/yJaF6UOksx/ra2t1DsKPOfAmBBoD8zkojUMVVdXHzhwIFqEPRQKdXZ2FhQUlJSUwPgDFZJwlnI4HGTZJOnsCoMj2hAJBAK33HILjuNKpXLevHnV1dVQm+f1egcGBlpaWsDrValUkuKZg4ODp06diplBqaioqK2tDYVCfr9/06ZN/O5hyDJOTExA1czGjRvbKAqxwH8VFRXkUsPj8TBLh0REbm7uxo0b9Xq9QqEAlyKCIDL0emwqmidBCCK64F7Edf/MBY2Cj9W1a9fKJRLoGJNJJFdv2BB/xM/n8+UvWqTTahFCmbNmReMYEC6fNWtWxLUCSM/EnK0YVqsffPABhBZhqYcQWrt27X333fflL3/597//PcvPEr+NZSgU2r17N1T65ObmkkMC+vNIfdc4BTBdLld3d7dQ/XPj4+PLli3DMEwul0esToqI6667To5h0PEpx7AkNDPwQJL47+LFi8PDw8PDw29euMDJjSH5SDL/jY2NZWdnOxwOUFUuKCjwer1QoEFu09jYGK3io6KiArr0Iv71wIEDkEQ0GAxwlKqqqoj9ajU1NdT8HNSAGI3G8fHxaPLtdXV1O3fu/OSTTz755JPKysp169aVlJRAo3RZWVljY2NPT4/H46E9yweDwfT09Keeeqquri5aYy/VfmhoaIg5uhsNHo9nzZo1ZONdW1sbNflUW1t7/Phxp9Op1+tbW1vtdrvRaOTRaIzjOPB0W1sbmfzT6XTSKaMcDCGqZilXMPOfz+fjsWYNx9mzZ2dkZEgkEkwqlU4562IIGQwGp9PJXqo7IvZWVSnlcuiPlkska9eujbZlKBSC7vLwP7F0EgjnP6imttls2dnZCKH09PT58+dv3bp1eHj4X//6F9fPAmFzru+ioqOjQ6NWS6Za3JYsWQKvLzaZSH1zlVx+++23x3OURICrb3BGRgY2FTKFsZSgE4sHCee/k21tpEUD+cPveMlB8utfBgYGcnNzoakIIo2QFITHN7/fbzKZovU4gyJ7xBP2+XyGKd+GiYmJoqIisCyI+HxdV1dHFh0Eg0F4I0Q+ac+8Pp/vwoULDz/88KxZs8bGxoBdQBxrcHAwptBRMBg0mUx79+599tlnN27cWFNT4/f7aadELaTs6enhN//C+g/O8NNPPy0qKiI/BTjFA1XbbLa6urra2loetwG1p97j8SxcuBA8kjQaDSaVguqxRqN54YUXeJw/IGZDG/vm4mhwu91qtRqKg0CvGcoOFRi2bds2l8vFT7Lc5XKtXLkyKzNTpVKlUcRBFAoFw7siugMSU/wXc/kF/Pfpp59+7WtfO378+KZNmxQKBUJo/vz5N998c2dn5w9/+MN4MprxTJeADcXF2FRgAHTMIRHodrszMjIkEkm6Trd48WJ+JvUphbVr10op9TugWJtqSDj/ZWdlnTlzZngK4vqP5RGhia2kpCQjI2PhwoXR7oeSkpKBgYGIiwCayytU0EU7B5DN7OzsdDgcpaWlUGwNlS81NTU2m62xsbG8vBzkrTEMk8lks2bNevvtt4H/2BsbdXV17dmzB971ySefaLVauVyOYVhlZSXJgi0tLSaTqbe3F3KKvAdoT09Pdnb2zp0709PTCwsLyYWFyWTavn17c3Oz3+8vKCjg/URP/eJcLpder6+oqABavf3222E6O3bsGL+dA2KGH+PxfAC0tLTIMQwmKbBj1ajV+vT0ebm5UHzLQ7UH7OOlU/uUpKWRTc3Lli1jeGM0fz42/Peb3/xm69atxcXFK1euhAhnQUEBmCxSL1FnZyd7fQMaICLC772Au+66SzYV6sQQwjUa8k/vv/9+dna22+1OQt1/EuDxePR6vVqp1Go0GRkZgqgoCI6E89/qwkLaK2L+jwqv13vPPfeALCRt3Hu9XqfT+aMf/ejGG29cs2ZNQUFBa2srbRv4/sIXAcFg0OFw5ObmQkMecCGzUJbH46msrNy0aZNUKn3ssccOHDgAlTJ6vd5kMjU3Nw8MDJw6daq4uNjn84VCoZ07d2ZkZDz99NNPP/10dnY2S4vL5ubmEydOkGFJk8mETbW71tXVud3upUuX6vV6nU63Zs2a6urqOMW9fD7fiy++mJ6eTiYdYW1NFkp0dnZSmxY4we12k5nXkpKSnp6e/v7+qqoq6NXr7u7Oy8uLM10Uk/+iLZjYw263a5RKKaVj7MUXXxwaGoLHEQiDc93nI488osNxyVTRhCQtTYvjGenpOp2O2QqntrY2ooo38GJE/vvRj350+vTpvXv3LliwACEklUpLS0uPHTv29ttv/+UvfwnfVW9vL9n2wxU02Vge8Hq9swwGpVwOxoqnT58m/zTtyhuCA2qJu7q64tfPSxASzn8XL17s6+sjf/X5fOL6jwRMLkAtVqs14mMpiLY4HA6Px7N58+aCggKj0Xj1hg1ADBH5b2xsLC8vb8uWLYWFhRqNJj09HaSfI54DVTzTaDQqlUq1Wl1RUdHR0YEQ8vv91CmYqu0SCoVUKtX+/ftramrYjyGn0zl//nwoS3n77bfVU14qUoTAV/1LX/rSP/7xj9HR0ZycHGaxK5YYHBzctm2b0WgcGBhob28HJQuyVaOxsZF3/8DQ0BCZTIWVwfj4uNFohOv/wgsvZGRkxBkui8l/8UfkvF6vdsocTqNWb7rmGtoGPEKsdrtdIZOhqfBXuk73+OOP9/b2xiSP9va6BMMRAAAgAElEQVT2iI3e8DGp/DcyMvL444+Xl5dnZGQghDIzM7dv315YWBhzwR2PvXj80WaCICCmsmDBAtqz3f8e/6U+ksF/Vqs1Pz9fzP+Fg+pGFgwG9Xp9+ARB7ZqyWq2gICWd0keHqkKaw0hJScnzzz9P+vhQn3aDwaDb7Y4mngl8Ay5fpCrmwMAAOcvX1NSQCi+Tk5NQ/cH1U9vtdoPBkJmZqVAoyAwBQkghl69fv55cGtbX1/No+wtHS0sLdF7PnTsXjNcRQvPmzSsqKuKq9kIDlZyqqqogq3TkyBGoNpo/f/7cuXPjPPmuri7mYB30aMZ5lLGxsRkzZixbtqypqSk8PRwujBcTExMTkPbDEFLK5UuWLGE5TqL5M8A8tWfPnnvuuef+++9fv349RDivvPLK22677cUXX/zZz35GsKvPZBbaZgBo0fF4YzgicjBNmF5EEpBw/svPz99hs51sa4Of5uZmkf8Avb29CxYsWL58ObmiilgoSE5wfr9frVYjSkr54MGDUKJCa9HDcfzjjz8GFoG6jNbWVpvNBl6vBQUFDOKZLpervLx806ZNx44dg+sA92ooFLLb7RaLRa/Xt7e39/b2WiwW3gJ9wWDw3Xff1el0SoXi35E3DDMYDEaj8dNPP4Uz37lzJ1eroIioqKg4f/58dnY2eYmqqqqWLFmyaNGi5ubmeCIzdrudXDt6vd6CggKz2Ww2mwsKCux2+1NPPRWn2T3Bov08/op8AEOXJz99tXvvvXfOnDlz587dtWsX+4sMS2faiz//+c8XLFgAuVWgvaKionvvvXdgYODjjz+mbsnmapDSplwR8dz4ISL/xbMwFcEPyeA/2isnKW1YKYiE8t/Y2BhInZWVlZlMpsceeywzM3P+/Pn9/f0dHR0RH0shjQSOrzIMo+p47dmzh8Z/IJ65dOnSV155BVjkySefBAnK7u5uj8fD/CAPKWto1FuxYkVGRgZBEBDTKy8vr6qqcjgczc3NGIZZrdb4ZSGh6GbmzJlXXnnlO++8YzQat2zZsn79+rNnz9533315eXk8ZJC8Xu9dd921obi4o6MD1hw5OTnvvfcedebq6uoqKyuLf65pamqiJqtCoZDb7SbrFwSZzmLyn1D6LOD2EPFPxcXFPIoXDhw4wIOYqS0Q3/ve955++ukdO3bMmTMHIaTRaIxG4/XXX//uu+9GW02ynM74hTEF5CeR/1IECee/vr4+WsHLDhba59OIxPEfVeosJycHxnpXVxc05BYXF0crZOjo6DCbzbm5uenp6ZBWkSKk0WhAXrm7u9tkMlmtVhDPNBqNq1at0ul0O3fu3Lp1a05ODvuH99raWrLR8K233pJIJMFgcHJyMiMjw2g0kpMOJwOzaJeio6Oju7t727ZtGIadO3cOZAa9Xq9KpYL2QR4rM2j5kGOYFCEtjt+8Z4/P54OH/ZycHHCrCYVCVqsVFMbj+QhErNUGPDfEeYiY9BanqzAJBkrgN0eQMmOcEAwGs7OzDx06tHnzZpVKBZHq3bt3z5w586233op5NVieKrOkXzQwO/RyQkQvTJH/ko+E898Om211YeEOmw1+rFbrZRv/pEqdmUwmpVIJE4TH42Ej9+B0OgsKCiAFqFarV61aBd6SFoslOzu7sbFxeHi4tLTUbDYXFxdnZmYeP368t7eX031+4MABskzG6XRiGAZrAqBncrOmpqZ4MnMOh0OtVquVSplMJpVKoUvhjTfeQAhZrdabb76Zd/33o48+CqX8/241k8tPnz4NVuMOhwOEdcAL/t13343HBxXA7A0kyEA6cuQI86UWRJF5cnKSoT2ZhwUEdEay/x4nJyf7+/vr6uosFgtEOJcvX37XXXf93//9369+9StiKgYrFP/xa2Po6uqK/1IDIo4Nkf+Sj4TzX0N9fXZWlsh/xH9LnR05cgQhNDQ0BOZ20e5qUjyztrbWYrFIJBLolrNYLCCeCY/tZWVlDoejtbW1qqoKJp2BgQEeSX6wiQAVtBtvvDEzMxNenzlz5uzZs6EMBxav8VRmgtQhdIbJpdJdu3ZduHBBp9OBp4/VamXjjhYRBw8epMqXSKVSqVQqkUh27tgRDAb9fr/T6YRnDkG+ZebAoCDlEjETWoI48jBfjZqaGq6RTI/Hw6aU48c//vGZM2duueWWhQsXIoQwDNu4cePKlSsPHjz4ySefULfEMCwUCgnFf/xmPQGlwEX+SxEknP/Gx8dpAc/LNv4J6a6BgQF4kjVMobGxkXxSZhDPdDqdLS0tK1asqKioIKc84D9SHYoqE8rDbYCYKs6UyWQLFy7ctWsXvAjNA1qtFjTy48z8gdQhFLKC1KHdbq+pqcFx3O/3h0Ihaq0KJ7hcLrVKhRCSoH8DShBVSiUtSCjItxyzMCT+cvmY/EcVyOYNp9PJsBMe835XVxeDX923v/3tJ5988oYbbpgxYwZCyGAwVFRUPPXUU9APYLfbw4Ua4ErGPBOTycTmyYyfjFldXR0b40k2EPkvRZCM+Cf11+bm5osXL/I7XnKQ0PoX0EkxGo0VFRUTExPBYNDj8XR1dYG3GbN4ptPpXLlypUqlWr16NXmGMC/s3bt33759FouFnDjcbnc8tuCdnZ3r168nK+/Xr19//Phxs9ksiDLFYpNJ8t9Sh6BuTNIJv9QR4PTp05K0NISQRCIBFgTZkQULFlA3m5iYiN82PaaTeBL4T5DhyiyyarfbuVpA1NbW0vpN//SnP124cOGBBx7YsGEDfDOLFi269dZbn3/++Z/85CfULan9NiRY8h/LUlV+RbNCldoSUb61np4erg5cIuJEAvkPBM+ys7KGKXjzwoXwitCUQnL6H8bHx6EbwWw222w2u93OLJ4JTX4XLlz4+OOP29radDodVHIihILBYGZm5tKlS5ubm81ms9VqrampYS/IEhEej8dgMMBc43A4FArFmjVrTCZTRUVF/BTodrvT09MxDNOnp+fn5/t8PpfLlZOTA6U6IGcaj2EYTIK5ubkYpVfk6g0baJvFSU6hUCim9nS4zRtX2Gw25va+aGaqnMCcROSRYrRYLGSc+ZVXXqmpqTGbzbAiX716dUNDw7lz5373u99FfG94f57f74dLLRT/8bMxslqtLK1/YiLiJCNIKlcEJySQ/yDzF/7DT84/aUgO/0EfOvtZvrW1tb6+nuwNX7x4cX9/fyAQAGGX/Px8uJ9BtPrIkSP84odUyGSyjRs3dnZ2zp07d+vWrd3d3aFQqLy8PJqODCeESx12dXVJJBKdTmc2m+OUCoRcUX9/P67RSKeUZcJ11OLkPzbjhF/nHBVs7s/4V5kdHR0MInCDg4Oc6h5DoZBarT516tSuXbugREuj0Vx33XUPP/zwN77xjb///e/Mb4dKYOor5KVm1rAlWF9wfkWzFoslTjU+EiSjUyHyX/KR2PjnxYsX8/Pzh/8bKasFB0hNFaL29vY77riD5L9FixY9/fTTcKpg10c+z5aUlEChfzzo7u7Oyspqamqy2Wwymezuu++GVnehSuAihh9LSkrOnz8f/85JPnA6nftvvfXgwYMRG0vipA232x0zW5Mc/uPU4hIRzOsqlnmpv//979/4xjcefvjhtWvXQoQzJyensrKyo6OD6wNNTk4OtT6TvCVjMgRLfU5+TBP/t0lF+PAT+S/5SHj+780LF2iviPrXPAC9gx0dHW63++67787Ly2tvb4dTdTqdmZmZkDmAtB+PtnEaDAbD6OgoOAfhOL5mzRrIAIFwjACfJ9L9H7+UZbQ9R0SctDE0NBRzVVRcXBznswiba8Ky6IMBdXV1EVWnAePj4wy1xB999NG5c+fq6+tXr14NEc65c+cuXrz4lVde4X15aZFGspMyJkOw/OodDgePKJRSqYz/ziIh8l8qIOH85/P5SPEz+Al3hEgppCb/EVMpwCVLltTW1p48ebK2tpY8VZvNJpfLCwoKsrOzoznFswcEZ6g6nDKZbMmSJVar1WKxxJOZo2La+S/Ox3k2s1X8n4hNKVD8R2Gu7Ih4R/zkJz95/vnnq6urFy1aBNVGV1999QMPPPDmm2/ecccdVC9lHqAJLJALUKH4z+VycVXaDIVCtKhsnBD5LxWQjPpPavIvPz9///79PA7W19fHLJ/dUF/fUF9PewW259Trmpr853a7m5ubFQoFPIFC19fExMScOXNsNtvy5cuXL1/OKaHIjKVLl/b19cH674Ybbti+ffvSpUv7+/sFdCYLp5+YtR4skRz+s9vtMWso4q+YYHOSlZWVcXakQP8owwbkJXW5XHa7vaKiwmAwIIRmzpx5ww03PPnkk9/+9rfJjS0WC7PJUUyQ7lQAwfmPxz0u+LQQfqoxtc5FCI5k+N/6fL4dNhu0PUAKkOuRhoeHSW6DPvrwDbKzsqj8R9Lh+Pg4JwpMQf47e/asWq1WyGRSqTQrM9Pn84Gf38svv4xhWHd3d3t7+8yZMxk6rrjC7XbrdLqrrroqOzv7pptueueddwTvTAqf2YWqL2c5CcYZnKSJf0ZE/J+IDf9RVXv4gXkW+OSTT+Ry+f33379x40apVIoQysvLu+WWW7q6un784x/TNgbllzifw2hKY4LzXzAYVCqVnE7J7XazEWlij/BTFbC/XgRLJIP/CILo6+sjyYlH/JPKXn19feF7aKiv32GzkYegcV740pABKch/OI5jCEkQkiCklMmA5zAM27Zt28KFCwmCcDqdGzZsUCqVQq3/CIJYsmRJX18fTL6CSFlSAcbrr7/+OvXFJPNfnGFDNmebHP6Lf96MqAf2q1/96tVXX73ttttmzpxJ2qnX1dX19/cz1JiwFPNjhsfjMZvN5K+9vb0gCcTMf5zuXAzDON0sgjenQ5Uy9RWR/5KPZMQ/Ybm2urCwubl5//79ceqfnWxroxrqwiugMkOSHI0jI1JmNKQa//n9foVcLpuy0sYQKi0tJQjCZDKtX7/+yiuvJKacwxgk/HmAOvOCrrRQe3711Ve1OI5hmFqtPnz4MPk61VyQN9ifapz8xyz+CWCuK2EDHMdj1lzE7AqIiZycHK/XC////ve//+yzz+7evTs3N/ffMgISCRhUZWZmxjyZnp6e+IN4gUCAuj4jaS9iazwJTncu1+h3d3e3sM3p4Scg8l/ykQz/WzA8unjx4urCwvz8fBp7cUJfXx/NPml4eBheofIfLAep72JPuqnGfwRB5OTkSKekvDRqNbQilJeXb9++XaVSeTye999/X6fTCft8SiuPFMT5miAIv9+vnVrOShHCNRpy/Aly/7P/+uJMm7FxBYr/E7G57PHXTSCEnE7nI488UlZWBip3c+bM2blz5z333INrNLKpsafFcdKKORrip3xAdnY2ScnkB2RehHG6c7kmKaMZ0/OGyH+pgITzn4AgS2mo3EbNC3LlP4fD0R0Gu92eavzndrtnGQxpaWlarfbazZshbFJXV1dRUZGfn5+Tk6NWq9VqNZvOJ/agzbw0i3necDqdGXq9bIr/JAiRJrpJ5r84g5PJiUyy4T9m9TIGfPzxxwMDA4cOHYKsHkJo6dKld95558svv/yLX/yCIIjBwUF9ejrJf2qlMmZhZ/wtH+R+yErmzs5OaM8XkP9KSko4VUoLTk4i/6UCpoH/4vS/XV1YCJpqxFTkE17nwX+tra3VYbDZbKnGfwRBfPDBB3q9ntrH3dHRgeM4PBfzyOfHBG3mzcvL42EZE46JiQnakoJchF1a/MdGdayzszPOYCAb/uNazf/Tn/70xRdf3L9//5VXXgm0p1Qq77///sHBwT/+8Y/ULQOBwMyZM6VTuWetVkuuyaKBTcCWDagtEOTACOe/YDA4MjICQkKQBWC5f67ffvyelzSI/JcKSDj/0Zr/Tra1xe9/RPIfcCHtZ3x8nJbw49R0mILxTyLSHDc4OIgQIgNfQsUnAeH6TEI15xEEcdddd2lxXJKWhms0a9euheVsKBSqq6vbtGlTzBmWGey/vsbGRt69/KFQiE2WMc7IJEsHJZYf+f/9v//X1tYGtlYIoYyMjK1btz7++OPPP/88Q8WK2+3Oz8+HVoeYA2B0dJRatxIPqC0Q0fhvfHw8KytrRkaGPj190aJF58+fZ58C4BqnraysjBn75YRw/hMqdCyCPZJR/0n74df/R8XqwsLwtQhz/Sf7RWdq8h9ZAkcCzP8SxH/hF4GfZUw0DA0NzZ49+/HHHwfyCwQC+fn5KpVKLpdrNJp4lLvZf33xPG5PTEzk5eXF3CxORX+Wn4VWLUL709tvv93U1FRaWiqTyRBCV1xxxd69e0+fPv2jH/0ItmFT2RjThhcglINBKBR68MEHV61aBQwRjf/Wrl0rk0hA4lwpl1+7eTN7/mP/7ft8vl27dsnl8gULFgj1CEgksv9HBHskO/555syZOP2PTra1RWxmoPIfQel5gNZA9vtPTf6jdQQTBBEKhaj8J6w4YfhFEPzmpJ7wiRMnNGq1dMq3VqvV8t5tcviPjfgnEXfRPPvPghCiFtN7vd7e3t7Pf/7zBQUFEOFctWrVoUOHXn/99d/85je09/b29lZWVjLvn+W1EmQFEwwGV6xYoVappFKpSqU6e/Ys2eBIu54KhQLMPcDiKjMzk/3VZq9ku3LFCoVMhhCSIqTRaISSwA5PlIr8l3wkm/+gF57ru6hWEtFWcjT+Iyj1Mv8D+i81NTXU0oOJiYmdO3YoFIqVK1dCG5Ow/Bc+cYNFn1D7J/675t5ms4FRA5gCajQa3rU2tNYxBsRT0Tc0NMTGpD5p/Aff/g9/+MMvfOELN9988/z58yGrt2nTpuPHj3/ta1/79NNPo72XTZC2tbWVjQWgIMUv7e3tGrUam8oQ4xrN3r17gRho8dUrr7xSOmXxKJNIVq5cSfpCxwStxT4aJicn1Wq1bOooGqWSwSiDE8JnXpH/ko+E8x/N/OHMmTPx5/8SitTkv7KyMjIq6PP50tPTZRJJGkIymYxsB4zocsAP4RM3yxmQPagB2xMnTqhVKtmUKXw86z/2lBNPcq67u5tNYUucoiFsvN3/9a9/DQ8PZ2VlFRcX63Q6hNDs2bNtNtupU6dY1vc3Nzc3NTUxb8PyWuE4Hn8H6r59+2BJB5SD47jNZgNioN2bLpdLo9EghDRqtWHmTLvdzv4LZTlOaPwnk0jibLUkIfJfKmAa8n87bDaIYcafCEwEUpP/qBr/7e3tGqVSNlWVh+P46OiogPUpRKRGY8HFean8FwgE8hct0uK4TCaTy+Xx5P+Sw39sxD+JuMcSw2f5/e9/f/78+fvuu2/t2rUQ4Zw/f/7tt9/+0ksvffDBB5yOcuTIkZgrezbXanR0lE1ONCba29s1lIchHMe3bt0Kuefw63nu3DmEUENDg9/v5/SFgoIgmy1Xr16tkMtBfUKpVMZpTklC5L9UQLLXfwBoYz9z5gy/AycUqcl/VLmm1tZWOYbJpszN09PTIR0lIP+FTyWDg4MM0htcAXZO1FdCodDg4OCDDz64fPnyePbMnv9YRsAioqmpiY3FgeD8Nz4+DktPk8kEtLdu3brDhw+XlJTwrs5nM+2C3jrzNuElWvwQDAZXrlih0+kkEolKpTp37hw5tsOvZ3d3N0IIko6c+G9ycpKlTpDP59uwYYNKpbJYLALeYiL/pQIupf735CAF+Y/GFqOjo2q1GpsKyOTm5gaDQWHrM8OnEmH1DxkuMs37lCvYn2c8n6i6uppNNXw8fZmhUKixsdFoNPb397/33nvt7e033XRTdnY2Qig9PX3Lli2PPfbYN7/5zc8++4yITzqOje0Gm2sVTz8JDaFQyOl0zp0795133iEok1Q0/oOcHNcFPfuS6Y6ODqHSfiTCZ96YLhwiBIfIf3SkIP+NjIwUFRVRXxkYGJg1a5ZEIlm1ahWwhbAPj+E5IWEvC4NKcl1dXTxdwMnhPzbinwB+fSmhUMhisSjkcoQQhmFgp240Gquqqjo7O8PdbuOpZWUzBbhcLtoIDIfVao3fe5IK8sSKi4sZ+C87OxuypFwvAntJIzYhYq6oqKigPXYIG8IRwQYi/9GRgvzX09MTs0JdcP6jTSXCSmAzcI/H44knjcSe1TjJhdBQXFzM0nKdK/99+OGHr7322tatW0lNMqhystvtH374YbR3dXR08K5lNZvNMXNabG4KYeXXCcrClKxtDj+N1tbWqqoqGJlc+S8vL49lyVhVVZXgkcnwG1bkv+RD5D86UpD/WlpaYtZeCtufEDGWJWCLvcPhYJCszMvL422gyiZTBYjnizYajSx1alj2pYyOjn7xi1+sqqpasGABQkgqlUrS0tIQkiAkQ0iv0zGHKONxJ2BzhjGvFftyEvYgGYI8w0AgQJOdA87T6/U+n48r/7Gf+xLBTCL/pQISwn8+n4/n6aQAUpD/2GgPCiseGHE1KZQENhErVdPS0sK7ypx9EiieL5qN+CeAgV0+++yzkZGR1tbW8vJyvV6PEMrKytq+ffvJkyd7e3txHAc1AGgIYb6n4onlsrGNjJnIjKeYKBrIIU29hrSHMNgGKlO43gIxE58Oh2POnDnwOHL27FnOH4ARIv+lAhLCfzAQ+/r6LkUiTEH+s1qtMRPjLS0tMbu42CMi/wklgU3EYqnx8fGcnByaO6gge6aCpbpmOFiKfwLMZjMtUvrHP/7xK1/5yuHDh9evXw8RTpPJdNttt3V3d//sZz8jNzt16pREItHiuEajOXfuHPNR4mk0ZLmsZ96ssbFR8AyZ3W4HzSOlUklqatNOAwIV1dXVEAFmU5RLgpSViQiv16vRaLCpTkStViusv4rIf6mABMY/h4eHG+rrm5ub37xwgd8BpgUpyH9sEhXC9udFZFwB78+YbF1UVMSvmILTdeAX0WUp/gkgL9rPf/7zs2fP3nHHHUuWLAHaKyoqamxsHBgYiPiYGAgEoLOFjU35G2+8wcacNhzsRzuzYbrVao2nazMiyK+S+jXRvjJgEbvdXldXxzUFzrxe7Onp0Wo00GKUhpBOq43HLTIcIv+lApKR/3vzwoXm5uaG+nowbUhxpCD/MU89AGH5L+KwCK9Y442Yoar29nZ+zkFJ4D+W4p+AVatW1dbW7tixY/bs2QghnU73uc997tFHH3333Xf/+c9/xn+UYDC4du1aUH7R6XRc1SnHxsZYcjlzmhAycJwOHRNkKjcm/w0ODpaVlXHlP2YBvMHBQS2Og7JoGkJaHBe2OSG8ZUVYCUMRbJC8+hefz9fX15f6Hlepxn/hreIR0d/fL0j3McBisYTPpAKWmMYMVU1OTur1ejZLHxo48R+bB4twxBT/DAaDQ0NDzc3NVqsVyjjnzZu3Z8+e55577gc/+AHLo3R2drJJgp44cQL8FEEtJWfuXJb7B7BPHDLMzhCv5nRcNgD5N1rqkcZ/UJk5NjaWnZ3NdXwyD5VQKJSfn69WKiUIyWSyZWYzv4B8NITPhCL/JR/TUP+Z4knBVOM/p9MZUwSSELo/PeKt2NTUJNSzS8yp6oknnsAwTC6X33DDDZwGDCf+4zfjdHd3R+yG/u1vf/v666/fc889q1atggjnVVddZTKZampqfv3rX3M9Sm1tLUN2isSG4mJsKkaHIaRSKjldLvayPhaLJVpRbiKKX4ipO5F2P9L4j5y/lEql1WrlFKKMecsEAoEjR47k5OSUlZUJYupLhch/qQCx/4GOlOK/sbGx2267jU1BfxL4L9yDiTdsNhvDVHXu3DmNWg3qpiq5fHP0TolwJIH/aOKf77///pkzZ/bt27dw4UJoVy8pKXnwwQcdDkcgEOC9aC4uLmbTBNLY2KhWKEAMVorQjIwMTkdhf7kYZopEFL8QUybMtPuRVoRMnlVBQQGO45zmMpZFQ2VlZfGbWoRD5L9UgMh/dKQO/9ntdhzH5TKZXC7ftWsX88YCWm8TUWriBUwxMg87q9VKdQCQy2Tsn745BdiNRiOPitampqbOzs5vfetbTzzxxNatW2fMmIEQmjVr1o033vjUU09997vfpW3Mb9HMMvzr9/uvuOIKHY7LpFKZTMa1CIWssYwJBnmX8vJywYtfAAgh2v1IIwlyIFVWViKEOM1lLO90o9EobOUnQOS/VECy+e/NCxdOtrX19fURBDE+Pr5//36hSuqFQorw3+TkpJLyXK/FceYpRtjTjlgYAlUGguyfedjt3LlTSonpyeVy9qkXTvzHdfT7/f4LFy4sW7bMZDKlpaUhhPLz82+99dYXXnjhpz/9afznQ2JiYoL900wwGOzt7b377ruZ5WxcLte83FyEUIZeT44l9qfHsJA1GAws1QC4Iicnp6enhxr/p5EEafvV0tLClf9CoRCGYczbBAIBvV7P6ZxZQuS/VEBS+e9kW5vVan3zwgVgQfDCTbWi0BThP6fTmaHXkxwgQYh5nhLwtIPBYMR5gWUmkg2Yb3WPx4PjONjhqpRKTspegvPf0NDQAw88cPTo0TvvvNNsNkNib/HixQ0NDW+88cbvfvc75rfz800cGBjgWs0UDAZxHI/2oADdFKRVukajgevPRloBEI3/vF6vgMJ4NJhMpo6ODmpgnzZy4Fe32713716E0FtvvcVp/9TOwojweDy8RfKYET5QBdSXEMESSeW//fv3U9nuzQsXrFaryH8RQa7/gP9irv8I4fTJol0BAa9MzEddl8t17ebNs2bN4irrJSD/Xbx4saCgQIZhsNSTyWTXXXddS0vLsmXLWIp/EnyDxs3Nza2trVzfVVBQEE3Jc2hoaEZGBumZpVIowDOIfXoymr1DuFWkgCgpKWlubmbmv7a2NrVarZTLEUKzDAb25T9+v3/27Nnvvfcewza9vb28heWYET4wBNQXFMESSeW/ixcvwrKPfKW5uVnkv2iA/F9aWppGo4mZ/yMSz38+n0+oWFDM524Aj+IRTvwXvv+//e1vX//610+cOHHttdcqlUpSgVqKkFqthlg9p4QQP/6rqKjgkVFjcEFyu93pOi1i+pUAACAASURBVJ1kiv+0OA7+Tezv/2gXtqmpSUDhIRpsNltlZSWVX2n8p9frqSotcgxjGS24cOECjuMymQzDsIMHD0bbjN+DCBuI/JcKSBL/jY+PDw8Pp3jnAyB1+I8giO9///sSiYRlUzMbIUc2cLlc0WI+Qt2iLPeTNP776KOPvvSlL9XX1xcWFgLnLVu2rKSkRKlQSKbKcEgRavbinwTf5VFeXh6PjFpXV1c00YBQKAQfTYqQUiabP38+PH8UFRWxLG6MJtlTXl4uoPEkDdXV1cXFxVSeoPEfQkghl8um4rpShEpLS2PuNhgM6rRabKq3XafVRhN2qKysFErzgQaR/1IBCec/n8+3f//+7Kws+Enx5ncixfiP08kIlT9naKXIzs6Ov9IhXMU/GniYWnDivxtvvPHWW2+trq7Oy8sDmeOrr7766NGjb7755p///GeXy6XVaoH/pAjhOO71ekOhECfVUB59KbxrLphrgD/66COE0DKzuba2ljQqYj9moi1kE1f8QhBEc3Oz0WikHreoqIj6OIgQmj9/vnRqXYur1WyWax6PR6fTwVugzaawsDAizxUUFLCPdXOCyH+pgITzX3Nzc35+/pkzZ4aHh4eHh/fv33+yrY3f8ZKDlOI/kMBgubFQ/Dc0NBTNnIi9ZRoD2F9hHsWTbJzQv/Od79jt9m3btqnVaoTQzJkzt23b9uSTT37nO9+hbXn48GGZTCaXydLS0p566ik4eZPJxP58ePCfy+Xi3cqJ43i0wPLExARCiLaeZq9bFpH/Elr8QhCE3W7X6/XU41InLCjgdLvdM2bM0Kenq9XqsrIyNqXCfr9foVCQq0YIcWu12jtuv522JY7jgsRUwiHyXyog4fyXn59PzfD5fL78/Hx+x0sOUor/OClrMJQ/cAJDykoQid7x8fHE8V+0kOmf//znN9988+jRo1dffTVokmVlZWk0moyMjMcee4xhh9u3b//85z+/bt06SJhxEv8keBnjdXR08LZ/Kikpidal5/F4UFgVMfs5N6JSzMDAAIOPY/zo7u6mnTN1BJK3aiAQcLlcnJ7Mjh8/jms0sPiD9b0MIa1WS32CTOhUIPJfKiDh/JedlUX91efz0V5JNaQU/3V2dkaU2ooIofTjGfhPEAls9ksiHrbmNP775S9/+eqrrx48eHD58uWQ2CssLKyrq9u/fz8pMYNrNC+88ALzDgcGBkArZGhoqLKykv358BhOLJXPIqKxsTFaANDpdCKEqMPJ5/OxX71Rv7VQKHT06NGMjAyFQrFixQrBtcFIOBwONvzHD06ns7S0NG1qCShDaEZGBjUbyt5LmQdozxMgdpOgY4mIhoTz3w6bDbrdialcYEIfGONHSvFfQru5o4FBE0QQCWz2/MdcPOn1eh977LHm5mbqMzucocfjefbZZysrK3NzcxFCarX62muvPXHixNe//vW//e1vBEEYjUYolwCP2QULFkQ7SkVFxcDAQCgUysvLGxkZiSb+yXCSXF0GGZQ2Y4IhYNDf36/X66lzLqehTu3+fOKJJ9QqFRSPKORyhvrJODEyMpI4/iMIwul0gno4PAnp09OpXN7e3s57Ic7m0NS7IKWmncsHCee/ixcv5ufnW63WHTZbdlZWfn7+xYsX+R0vOUipgciJbyorKwWxKGMgXUEksHt7e1kuoRj4b3R0VKfVYhKJRCLR6XRDQ0P/+Mc/nE7nihUrli1bhuM4Qmju3Lk7d+585plnwofc7NmzqfzHYF9A3iHt7e0VFRU08U824BrXiifnxEC33d3dJpOJWtk7MjJSVFTEcs/U+yIvL49sOZAilLiIDuQsqVYh1AmLU3Y8Go4fP65QKLQ4npaWRvMZ5mqoywki/6UCktH/4PP5Tra17bDZmpubU03tLBwpNRDLysrY94EJ5U/EQHKCSGCzb4ljMHW6dvNmKSV5k5GRsWbNGohwzp0798477+zp6fnFL34Rbc9Hjx7VqNWwgsE1mqNHj0bbkrxD/H6/wWCoqqpiKZhCghP/jY2NxanjGq1G1263V1ZWUtmRU20O9b5YuXIl2TyAITR//vx4TpgBfr+fVrNDnbCE0nz3+/0ej6e2tpam1MMgeRo/RP5LBSRb/zPFF39Eig1ETqGwAwcO8M4bUcHAo4JIYDP7jlLBMMHNnTNHglAa+g+Ki4uPHDlitVqfe+65mHsOhUJHjhzRarUYhh09epShaJCsKgoEAualSxFC6enpIJ7CEnq9nuw3iIn4fRyj5WhhWY8QIj8sp2/T7/eTXSsDAwNQPJKGkEatbktkRTeN/6qqqqAQiRDa8wQsJ6nKBgkVJBP5LxWQcP7r6+ujFnz29fWJ/Q/skZOTw76lQShvYQb+E0QCm/15hk9w3/3ud5966qkbb7yRFGdBCEkkEtLIhpMXAZvvmuwq2bljB4hsSWOVzETbAxs0NTXFKTjS0tIScY0O0TzqyXCqriL+eyE7ODhoMBjy8/Nfe+21eM6WAaFQ6Omnn1apVHv27CEDwtTBOTAwIKzv4JEjR8iEH5XvEwGR/1IByeh/OHPmDPWV1YWF/I6XHKTUQOQUOhOK/6DiI+KfBMm4sO9qh8MFAgGHw9HU1FRSUiKTyRBCV1xxRWVl5YIFCyQSCYZhM2bMIOd0TgOaTXEKEEYoFFIqldAuBv9uSExfJj/lMyqGhoYiroqAOaiCL1wHDG00gjlfHGcaA1dv2KBRqRBCCplssckEy1Yq/wloyAVoaGhIS0vDMGzr1q1DQ0Ns3AF5w+12U3OxKTXtXD5Idv9DxFfYoK+vjxSRYfM6QRAN9fXwOqekY+oMRK6lg+y93JjBMCYEuTgs85S//vWvn3nmGa1We9VVV8E6b9WqVffcc8/rr7/+29/+FraxWCy1tbXUIg6uAzrmEwYZvVSpVKR+NEudLQB7jTGCIIxGY5xyKtEWLpBLpjoP19XVRZS0Zjg3kvA8Hk9CbxO32w0SLVKEMIpEWeL477nnntPiOBSCKmSyZcuWcWp04QrareRyudjXIokQCgnnP5rDw8m2Nh7rv+Hh4Yb6evj/Dpttx1SCJNrrBEE01NfDn8bHxzlRYOrwn8fj4fQEKtR0wDAmBOlSYua/H/zgB1/4whf27Nkzf/58hFBaWprVam1ubh4aGgqvijQajaOjo0qlksxpcR3QGIYxF1uSBHno0CGQWpYipFKp2B+F/SkJ1QRmNpvDlRDgNGpra8nkJdeCKSr/tbe3C7v2omFgYEA/JVEWzbCCa/yWGaWlpaTrMoZQWlpaQsUaafOMsLlMESyRpP6Hhvp6MP/Lzsp688IFrkeisldfXx/JoAyvUzmP5EI2SB3+czgcnHolheI/5nhd/CoVVqvV4XBQX/nnP//57rvvPvroo5/73Od0Oh1CaPbs2Tt27HjooYfmzJnDsCuodSwoKCCrhLgO6JjBSfLzhkKhtra2wsLCjRs3cgpRsi8jFGoSrKqqCq+EAqtYagUvV992qsBQRUWFIMXG0eDz+XQ6HRltVqlUIO9C5T+hAv6A8i1bpFOLewlCEolEkG6iaBD5LxWQjPrP8fHx5uZm6H+Iv/6TtI9neJ3KheG/MiN1+I8Tn3k8nhUrVqhUqkOHDvHW4+jt7d25Y4dWq33nnXeibZOTkxNngI4ccz6f7/z5842NjWvXroUI55IlS+64446zZ8/+/Oc/JwgiFAox0y389cCBA2SfFtcBnZeXxxAbSMJ6lwqhGq47OjrCjSCA6Xt6ekhDO67Xirp9opN/BEE4HA6tVqtWq9VqNUlFieM/p9Op0WikCEkRSktLk8lkhw4dSpD4NSHyX2og2f0PcSJa+Sjt9Yb6emosFHKELA+ROvwXzXEmHBMTE3q9HurRVQoFvxvp2LFjWq1WihBCSKvVRlNThGUEj/2TWLx48YkTJ2677TaTyQS0t379+sOHD3/lK1/5wx/+QNuYgf9In/quri5B5vRwJDPfSQjXweJ2u8Mj5xDppc6zzNwfDvJaJTr5RwWtA4FaPCUs/xEE4XQ6y7dsWV1YKJfLEUJKuVyj0dBiFUJB5L9UQKL478yZM6sLC0HwRaiGB1CQyc7K2vHfDVLhr7Pkv7q6upIwFBUVpQj/sZefaGpqwiQS6EeWIYRrNFyfzUOhkFwuJ0U9ZBLJ3ii217xHzHvvvXfy5MmbbroJ5Kf1ev2WLVtaW1tHRkY+++yzaO9i4D9yBhkdHSU9GbiKhzEHJwXhP2rKjRnxKJ9REQwGwx2G4UpSxcc5ddcQFCJPdPKPAVTOq66uFuRxgQaQVkibCr0u4ihfzhITExNU1SGR/6YFCeG/M2fOAPPtsNmABQV8TIMdhrvGU19nyX8ej8cZht7e3hThP2qpHjPuOnhQrVCQ/Jeens51iUZ1hEGM9Y02m429BPZf/vKXr371q8eOHbvmmmvgmXrBggUqlaq1tZVlZMlgMETrQR4bGyOtFXAchypNriZQzIszriVIEcF+mSKUgzFBEBaLhXpjk7XEQI3wItdULnmtEp38YwCN/xJxGvNyc7GpRhcZQgqFQvBDAKjXn8F0TETikBD+s1qt1HqThvp6YT2PIvIf9XVawo9T0WnqxD/Zfzejo6NarRZk7OUYxk9Aa8WKFbKpRSRDfzebSefDDz/s6+u7++67V6xYARHOFStW3H333a+99tqHH37Iadpl4DPqIzNZU8OD/xjWEII8lbPkP2b3Wq6g9TZQRzV4/lGJkP0+YSGbhORfNCSB/w4dOoSr1UB+cgy7/vrrBT8EgHojCN7LKIINEsJ/2VlZVFNNmudRROrihNWFhRHzFuTr4fWf7GOwqcN/nKZyh8OxKC8vLS2tuLiYn2jT5ORkUVGRQqGQpKUdO3Ys2mYMs/no6GhnZ2dVVZXRaEQIKRSKa6655qGHHvrqV7/617/+ldxMKP6j1sceOXIE0kJc+Y+ZnAThP5Zl+vErn1HR09ND1UahChdAdwSPcQ7XKpnJPxpCodAtt9yye/duCO1yrV9liUAgUFpaims0GrXabDYnTgJN5L9pR6L4j/YKOU/F7/93sq0tYjMD7XWy52F4eJjTEVOH/8JTODERvz/f+fPnN27cyLABrcv+s88+++Y3v9na2rplyxa9Xg++sjfddFN7e/t7770X/nav18tgthAOBlNf6pQxMDAAzj48+I+hyEgQTmI5tTFY9/HA2NhYtPQSrJU9Hg/X5Sbw33Ql/3w+X/6iRQqFQiGXZ86aNT4+LpThV0RMTEzEWecVEyL/TTsSxX9geAQ/Vqt1dWEh/B+ydFyPRCq5ZGdl0eo8I74OIOtiLkX9F37yg/HPoTHvQ9jgD3/4w5e//OXDhw+vW7cOIpwmk+nAgQPd3d0MV3tsbAykO1999VWW58MwQKnrKtLKlSv/MX9eQWYlljsRfDVDVXPu7u4mS2Qh5MtjadvV1VVdXT1dyb9bbrlFrVCAPotcIlm7dm1C+S8JEPlv2pEo/tu/f//Jtrbwn/3794v+72wwPj6ex73wjNoJwA/MDkcffPDBvffem5ubu2TJEqC9tWvX3nfffefPn//973/PvOexsTG9Xo9JJGkI6bRahhArFQwDlBa6NBqNUNyYavzHkmmi+RbxhtVqJXVcqR8Erltvby/XpS3sZLqSf2azmTRdgrIUocplpwsi/007khT/ZP/XaUeK8B+/zBMnR9OIOHLkSPgK0u12nzp1ymazzZ49GyEklUqvv/76Rx99dHh4+J///GfMffr9fpfLdeONN8ooTRpyuZzBdYhEWVlZtAYs2qmC/S/X9nzm6yyIpCqbr9Ln8wmifEZFU1MTaWhHfVbo6uqClTrXCbe/v99oNE7X3bF9+3YFhpFe7cuWLeP6rJNqoPorifw3LbjE+t+TgBThv56eHh7yu/FPo2RN3aeffjo0NHT8+HGr1QpmQ/Pnz7/55ptbWlqYNclocDgcOI5nZGRIJJJ/i2tAZblMxsYVj6HGj/YnEE/hWtPPTE6CdFjTlP4jIpppA2/4/f7S0lKlUgmNENQPAiZW7NUVSDidToTQdE3TExMTmZmZGrVaKZdL0tKAjC9p/qOef0dHB0tTTBECQuQ/OlKE/3hLYUF1O+/jbtiw4dixY4cOHVq1ahVEOAsKCj7/+c/39vb++te/JjhKggWDQVLFEZRlwDFcKZevX7eOzR4Y+A8WfOSvoKDPlf+o/eDhEIT/2IwooZTPSJSWlv7HrRDHb7jhBvIyQlNjU1MT+482MTFx7bXXpqenI4QaGhoEPE9O8Pv93d3dHR0dJ0+eLCkp+V/iP8G1bESwgch/dKQI/0WMQ7KBxWJxuVxc3/X++++fPn1637590KUuk8lKS0ubmprefvvt8BpU9hzj8Xh0Uyr+aQilISSVSiUSyQbWTRoM/Ecbu8FgEApQWZ4bgPnrZi/Bw/sQgIiK1bzh8/lAzQCeNmQSyRVXXEFexsnJSYPBwL55LhgMzps3T45h8ASjUCgSp4rJHlarNX4p9umFyH/TDpH/6EgR/uPd21tZWcl+Jv3Wt771+OOPb926NSMjAyGUmZmpUqkefPDB7373uwzvYpNjm5yctG7ahGFY2lTNggQhjUrFlU4Y5oVwprdYLFznRGaJbUE6rAOBQMxSXqqFRfwg+U+CEMSc58yZQ73PMQyrqKhgqS7k8XjSpx5ipAgp5XIB+zT4wev1XnfttWlpaTdWVAhbNJRMiPw37RD5j44U4b+SkhKWpjk0tLS0kFUPEeH3+wcHB48cOVJcXJyWloYQys/P379//4svvvjTn/6UDX+YTKaYK4DS0lI5hsESBE1pyixcuJCrvhfDvBAe/uKR/yMYl7NCKYwwn1UoFIppQ8gVpaWlaqUSSkVwjWbFihVUD14oY+GkLkS14uPkmis4AoFAVmamTCKRICSTSDJnzeJteDK9EPlv2iHyHx3Tzn9Op9NsNkul0nXr1vFIb0Sra//FL37x8ssv33nnnUuXLoXE3po1a+6999433njj448/hm3ILjpmxBw0gUAA1h/SqZVfXl5eV1cXjymeYV4Ilwbt7e3lwX8My1mhevKYz4pHK3pM+P3+ffv2paen63Q6p9NJe1YoKSlBCEUTFqAhFAotM5sVMhl4/2q4q6sLi8HBwQy9nuRjfXo62eZxaYGq7SDy37RA5D86ppf/xsbG1Gq1dMqEYeEVV7BpEqCCNpl+73vfe+aZZ3bu3Dl37lyEEI7jZWVljzzyiNPpDN8zVVGaATGFuUOhkFKplEzln6QI7d69m9OnIMEgHhZOKmfPnkUIURc6bMBQRiFUhzVzpUZPT4+AymdUuN1uGAy05sLKykqEEHsa8/v91dXVRqPxuuuuY8maicPAwIBh5kyS/2ZmZMSpeTRdoI4ukf+mBSL/0TG9/Pfoo49C2BAhJENIp9VyTQsFAgGlUvnOO++cOHFi8+bNarUaIZSbm7t79+5nn332+9//PsN7WTYdsvGdueuuuzAMg/yTFsd5T5rR+qLgY1Jfuemmm9J1OlyjSU9Pv+2229gfori4OBplJof/hFU+o4K8SrRnhcbGRoTQJRo29Pl8Wq0WekmlCBlmzmTTSJOCoI4uQSqtRHCFyH90TC//tbe3Q6CJdPJjzxyTk5Nf+tKX6urqZDIgULR8+fK77rrr1Vdf/dWvfsVmDyybDtk8q4ZCoaVLl+bn519//fXxrBii8R/taxoaGiJrNGQIabhcN4Z7wGw2C1LryGwaXFZWlggdZ4DRaPR4PGAUDOjp6cFxHCFUvH79Jdo/MDo6unHjRoPBsHHjxmlfj/IGdeAlyMtCBDNE/qNjevnP6/XqdDqIHCpkshUrVsR8y49//OOurq5bbrklLy8PxFn0en1lZeVbb7315z//mdPRWTbh2u12Ns1qgiyeBgYGqD4GJKietwRBdHV1aTWa/+SEdDqWxY0EQVRWVvb09ET8k1AdZsyXwmAwJK6Isby8vL29nRzSbrcbx/F/qxBIJDw09kQIBZH/ph0i/9Ex7fUvY2Njy8xmjUaz/9ZbGQI73/nOd5588slt27bNnDkTIWQwGCoqKux2u8vlqqmp4RdLYZmEYKnVxKZMNCaihWRpr4+MjFBrFNVqNftDM0w9SeC/yclJwZXPqKirq6uuriafFWpra6UUFU29Xp8KzXyXJ0T+m3aI/EdHovnP7/e73W7mqpZoPQx/+tOf3nzzzQceeODqq6+WSCQIoUWLFlVXVz///PPU8JrdbmdexoVCoY6Ojg3FxXfddRd15cHyJqQa7zFAEPKIxn+Dg4NgeETi7tpatVqdoddrWYtrA0jvwHDgOC5Iksxms0Wr0RgcHBRW+YyGzs5Oo9FIHuL48eOYREI+KGi12ku3f+5SBxhRhUIhu90+a9Yss9nMQ7lCRDwQ+Y+OhPLfnXfeqdFo9OnpGRkZDO19tAXcL3/5y1deeeXgwYPLli2DxN7q1avr6+vPnTv30Ucfhb8dBB4ZTmP79u0atRqUQTIyMsgugvLycjal5CxVtjEM41q8SkMgENi3b59Opzt69CiNhyKuQcfHx/v7+znZXREEcfjw4WirXqEURhgeLFgGk3nD5XIhhMjxMDExodPpoHhErVJZN21K3KFFMANGxaFDhzQaDbQJ6XS6SzedeSlC5D86Esd//f39mqkcFYaQTqeL1g8HBREej6ejo6OysjInJwchpNForr322ocffvjrX//63//+d4YDMbcxeL1etVoNlZkyhOQYduLECfhTUVERm+YBNpeIWVeFDUKhUP6iRSqFAiGEq9XLzGYqmwqiF9zZ2anRaDAM0+l0EetTksB/nPR6eMDn89FEq8fGxrZt22axWE6cOBHnA4qIeACjgqbUw7tTSAQPiPxHR+L4747bb5dOxZ1kCM2YMSP8We8f//jHN77xjaysrHXr1kGRXk5Ozq5duzo6Oi5evMjyQMx6Ih6PR4vj8LwJLeoHDx6EP7GMWLLx5o3/Mg4ODurT08lMlRbHqUZI8fdLuVwutVqNTTXpz507l7YBSzUANmhqaooYYh0cHMzMzHz88ccFOUpEOJ1OqVQqlUqLiorEtUVKAfhPIpHIKJ2y127ePN3ndRlB5D86Esd/HR0daqXyPzUaKhVZ3vK73/3u3LlzDQ0Nq1evhgjnkiVLampqenp6+KXQmGtPcnNzSSsGjVpNZh2USiVLiZaYC6OxsTFqfSYP9PT06LRakv90Wi21pLOxsTFOFa6jR4/KJBLZVDGIPj2dRg8CjoSIbL1v3z4tjiOEtDheWloqyIFogLV+2tTyYsaMGZdoz9//JID/rr32WoVMloaQFCGdTneJatlcohD5j47E8V8gEFi0aJFWo8EkEhzHjx8//pOf/OSFF1649dZb8/PzEUISiWTDhg319fVKpfJPf/pTPMdizuSNjIxgGIYQMsycefbsWfL0aB3lDMjJyWEmZn7+vVR4vV4tjmMIIYQwhLRaLVXtLP56ObvdDo8jwH9qtZqmpibgSAgvaBodHdVoNFR2T0QLYEdHh0oul07FutN1usQ1GorgChjDk5OTm63WtLQ0tVo97cLilxtE/qMjofUvwWDwySefNBgMsOTKzs5GCGEYVlJSYrfboXBjdHQ0fjXIuro6hnvJ5XJZLJbi4mJqDQ6nDx6zt2FgYIBWn8kDDodjlsGAEMqcNYtWLlRRURGn6pXP58vQ65VyuRShtLS08LwLGArGcwgS4dU6AwMDOhyXTkWhVQpFe3u7IMeioqenR61SkSGHDL2eqziciMSB+gx3qXsZXqIQ+Y+ORPc/gPsa/L+zs7Onp4dmVxuzepMNOjs7Dxw4EO2voPNSV1dHTUo5nc7i4mKW+485blj2CLLBokWLwrlWkOZ6r9d76NChnTt2RDSjj38JSyL8ani9Xo1GI5niP1yjEdD/iITf78/KzFRgGIaQWqG48sorxYKX1AE1Kyy4AYgINhD5j44k9L8zJ8+YqYslhoaGGNYuTU1NTU1Nvb29VGmVaEor4Th9+rRGo5k5c+bRo0ejzad2u72xsZHraUdERKc6YQ3z8vLywus/BeS/iNf2hRdekMlkcrlcoVA8+uijghwoHF6vd29VVUFBQWNjo5j8SylQs8KXupfvJQqR/+hIAv/RxPhpYGjHZg/qKjMcoPg1Pj6ek5NDvtjV1cWGd/v7+/GpdiVcozl06FDEzQTUsz9y5Ei4GoCw8aKIbou9vb1s1FDZIBqVdnR0lJWV0fKOIi4TkPeI1+vNzs6e7tO5HCHyHx1J4L+Iqw0SVVVVgigh4TgeTT6NdE7X6/UkE7NkrKKiIgyh/wTuojRCHDhwoLOzk++5/xf6+/upiyev1+t0OnU6HS1uHA8iVtMIGMKNxn8CHkLEJQfyjpt2zcXLFiL/0ZGEsch80YuLiwXx3GGIEOr1eiCPsrIyskyUpWrohuJiaFRi5j8B9QxHR0fJdv7nnnsOx/EMvR4h1NDQIMj+CYJoamoK534BySmaIgGDu6GI/3mQ/MdSUEmE4BD5j44k8B9z7aJQkT2bzRbR1sDn85GkBYlAcns2ngkQ/4SecYb4Z8SIIj9AO38gEICaEQwhsHfS4rhQeokRc66tra0RVVh5INqgEl1PL2eQ376AmWYRnCDyHx1J4D9m/1iEkCBFelRuo8LlchUUFMD/BwYGSCVr9kPh9OnTRqNRIpEw1L8wmMryAKxl+/v79Tod2bGnlMnibIEnEbFbQ0By8nq91FRrIg4h4pJDe3s7aPix9N0UIThE/qMjCfzHMOtFmyh5oKenx2azhb/e29tLvu71eknznby8PE7K0czbC1ufAiKZ4+PjIKAKq0+dVivUEtPtdpPPBCSEJaeIBX4i/13OIAPsYhp4uiDyHx1J4D8GyX8BMwER53QiTIskJycHaIxMCrIEg6cPQRAGg0HAssbW1la4Yg0NDbhGI5VI5DLZDVu3CrX/iOWyNTU1QpXwECL/iQgDSXvR/M5EJBqXDP/19fVlFebSDQAAIABJREFUZ2XBD/X14eFh8nXacqShvj7i68xIAv8xPO4JWHMfTaW6qqqKGn2tqKjo6enhYdfA3OEnbD/TwMAAqQngcrmWLl360EMPCbh/IlIDsrCWpBHLcUX+u5xBzgPiMJguXBr8Nzw83FBfD//fYbPtmArfjY+Pk//fYbNRqa6hvh7eMj4+zokCk8B/DP6xra2tQrWNE1EWYTSTo5aWlrq6Oh6femRkJNqn8Pv9wnqaT0xMUBukcnJyBHctNxqNtEEiLP9FDAgLu8QUcWmB5D8Bm4VEcMKlwX/Uiamvr291YSH5f+o22VlZ8AqN80guZIMk8B/Ib0b8U21trYA6kEVFRdQMWW9v78KFCyUSydatW8lQ59DQUHFxsdvtjnZK0RAIBKI1PyTiGuI4DufMxn2JB8LvhLKyMqrjUpyIyH/CUqyISwsk/4nDYLpwafAfFSfb2qi0RwXJf1SODP+VGUngP4ZDsHRgZwnqc6XT6VSpVGCnoJTLN11zDbzu9/uVSiU/0VGz2RxxHcZA8LxhsVhgpDqdTsF3TkSSHRBEYpREUVFReLeGOPFdziCTHVarVcAnLRHscYnxX19f38m2tmh/Jdd8DfX1Oyilj5A7ZHmIJPAfg9OQsLKWZNkIQRB7q6qkU50DMoTkMhmpBpmXl1dXV8ejAq2qqipii2Ei+pnI9vz29vZE9IyHy84Jy38R9yby3+UM8jYRdqSJYI9Lif8gw5edlbUjUlk/lRpTnP+I6E1+BoNBQFkvalvbnXfeSeU/6CiHP1VVVRmNRh4VaO3t7RELWZ9++unNmzcL+EEICu1VV1ez0anhsX9oxiJhMpkYZOq4QuQ/ETSQ/McsiCgicbiU+A+wurAwOytreHg4/HXy/yz5r6SkBEVCEvgvYjaIkwMtG4yOjpIm7B6PBwx30hBSq1Rbrr+e3KyhoQEhtH//fq599xG7NZ544gmFQiGXy7Va7alTp+L8CCQcDgccq6CgQCjZFypoKqOE0C2MEamOpeaOiP9JkPwnmv9NFy49/iMIIpz/aCtCWsLvZFtbSuX/CIIoKCjweDy0F8fGxki6EgTBYJC60BwZGVm6dKlKpWpsbCRr/Z988kmlUokQUqlUFouFEwUCYVPfMjo6ilNs7TQajVAPtj6fT6/Xh0IhpVKZCB+f8JxlEvhPDHxdziD5TzT/my5ckvy3urCQWhHaUF9Po8Pw+k+GrCENyeG/iNedoS+CN4xGI5WBaK2HUPwCcpoYQhqVimto0Ww2U4m8q6tLq9FIEJIiJENIr9MJuL4xGAyDg4PCPiKQCPegUSqVAs5KtbW14ddW5L/LGST/ieZ/04VLj/9OtrVRmxka6uup5aDkQpDseYAGefb7Tw7/RTQ5YunAxwllZWWDg4PkrzT+c7vdGRkZoCgGrg633XYbp/3TuuldLpdapYIUo+C25iUlJZWVlRFF3QQBLSkr7KwUscdZ5L/LGcB/ovnfNOLS4D9SySU7K4u6kiMrYpj/mmr6L0QUs6GILjxxora2lioSTeO/YDCo1WqxKbrSaDRcl2vUspFgMLh79+60tDSpRCKXSnU63c179gjyKQiCCIVCn/vc5+RyeeKUEmkBT5H/RCQUMNWI5n/TiEuD/5KJ5AzH8NlwYmJizZo1d9xxh7DJrY6ODmq3QLj02rlz5/Tp6Rl6vVar5UFXVJXRXbt2paWlSRGSIqRQKO6///44T56KDcXFCoUCIaRSKm/Zt0/APZOgOi8KKEQO6OjooNWXEiL/Xd6AqUY0/5tGiPxHR3L4j2Z8Ojg4qFKpJGlpKqUyKzNTwM4Bh8NBbcWLKD3q9/tHRkb41XoEg0G5XP7tb3/7o48+kkgk0qmlJIZQIeuao5gYHBzU4jg2lafU4rjg+mcEQVRWVpLtjIIPg4hXnqvnhoj/JcAYE83/phEi/9GRHP6jOX7NnDkTOvMwhJQy2cGDB4U60Pj4eGZmJlnHIazheCAQsFgsUqlUp9UqFAoMw2QU/lu7dq1QB2pvb5dLpbKpspoZGRkCquSQqKurI2PFyeE/sfD9cgaMMdH8bxoh8h8dyeE/6kNfKBSSSCRQhAnMsaG4WJCjeL3e5cuWIYQwDLv99ttDoZCwSvOHDh1SKRTQU5iG0IwZM9QqFQalpGq1gJ3dbrdbo1aTzKrVar1er1A7J0H1pRoZGSkW6FsARHzMF/nvcgZMNaL53zRC5D86ksN/Ho/HbDaTv87LzZVO8Z9GrT58+LAgRylev16OYWlTMUO73S4s/5nNZmzKjRb4u6GhITc3d8GCBS+88IJQRwEcO3ZMqVRmZGRoNJqzZ88Ku3MA1RlY8KiUyH8iaICpRjT/m0aI/EdHcviPdhSXy6VWqzEMS9fpli9bJlQJDCwrJVPtDWvWrBGW//ZWVckxDJtaluXMnSvUniNicnLS5XKFu+gJBWolguD853K5wsscRP67nAHyEaL53zRC5D86klaOTCuvP3XqVHl5udvt5ipCxgAcx7Ep/pMiVL5li7A3G7QuadRqjUql1WovdQ37iYkJsuazp6enqqpK2J2Hjyth5V5FXHJACInmf9MIkf/oSBr/0QzBGxsbW1tbhT3Ec889B5qfkrQ0LY57PB7BHzYDgUBPT09HR0ciEnLJB/lQInhWJuK4EoU/LnMghEQN9GmEyH90JI3/aLGvioqKREghOxyOa665Zt68eXCsxsZGaju8CBpycnLgQgnOfxHtgkX+u8yBEBLN/6YRIv/RkTT+KyoqGhkZIX81m80CSoVRQa21ER82mUF+KS0tLU1NTcLuPJztRP67zIEQEjUQphEi/9GRNP4rKyujPvcplcoEVXb4/X5y5SHyHzNIQ6JEVCWI/CeCBoSQaP43jRD5j46k8R+Virxer8FgSNyxyFyjyH/MqK2tbW9vJxLDfzk5ObQsqch/lzlwHDcYDGIN8HRB5D86ksZ/1IKXRGsAki5FIv8xo7W1tbGxkSCIAwcOUH0tBAEt4yu4xKiISw5GoxEhJJr/TRdE/qMjafzX3NxMZpi6urqErbanoby8HATDRP5jBilGlYgLZTKZqJEuUfhfBPDfdJ/F5QuR/+hI2qxErTA8cuRIS0tL4o5F2i1VVFQkQjnzfwZOpxNkzxLBf7SbTeQ/EUajUTT/m0aI/EdH0malgYGBiooK+D9ZdpEgkGE9sdiMGeS3b7Vah4aGhN25yH8iaDAajeIYmEaI/EdH0mYlqsJWQUGBy+VK3LHIsJ7If8wIhUIQj0rEhaItvkX+E2E0GkXzv2mEyH90JG1WGh8fJw+E43hCdbDI+hqR/2IiOzvb6/Um4kLRYqqjo6NUDXQRlyGMRqNo/jeNEPmPjqTx3+TkJPQ8TE5O6vX6hB4LhDoJkf9YwGKxuFyuRDjT0vhPND4VUVJSIpr/TSNE/qMjmVEpCLWNjIxYLJYkHCsUCon8FxNQK5sIZwZalZPIfyJKSkpE879phMh/dCST/7KzsycnJ5NjAG00GsfHx81m8+joaKKPdUkDamUTwX+0nnqR/0SUlJSI5n/TCJH/6Egm/0GQrampSXCpyXDANy0azsUE+JEmoiuLpikq8p+IkpIS0fxvGiHyHx3J5D+4+pWVlT09PYk+VlVVVXd3t8h/MdHd3V1VVZUI/qN5Soj8d5njiSeekEgkCCGLxSLeldMCkf/oSCb/VVRU9Pf3Q8FFoo/V1NTU3Nws8l9MAC0lgf+AaAU/iohLAgMDAxq1Og0hKUIyiWTJkiXTfUaXI0T+oyOZ/AcFgXq9fnJyMtHH6urqqq6uFvkvJsbHxxFCiRgD/f39pOIBkQCLQRGXECp37ZIihCEkQ0iGEK7RJGESEEGDyH90JJP/mpuba2trw21REwGHw2G1WkX+i4lgMJgg/qMFPEX+u5xRW1uLSSSyKf5TKhSBQGC6T+qyg8h/dCST/+x2e3FxcUFBQRKONTY2lpeXp1QqRbH5mDAYDCL/iUgoJiYmdFqtTCLBEMI1mv233jrdZ3Q5QuQ/OpLJf93d3RiG2Wy2JBwrEAgolUpRbJ4NzGZzIipTxsbGTCYT+avIf5c5JiYmqqurS0tLT58+Pd3ncplC5D86ksl/DocDIZS0BiCDwSDyHxusX79+6dKlNK/a+EEbWu3t7bW1tcIeQoQIEewh8h8dyeS/b33rWwihXbt2Jacn3WKxiPwXE9u2bZNhGCaVKhWKs2fPCrhn2tBKhMW8CBEi2OOS4b++vr7srCz4Cf9rdlZWQ3097cWG+nrYnpOQY9L4LxAIgPulQiZTq1Qvv/xyoo9YUVEh8h8zent703U6CUIShDCENBqN3+8XcP/U6y/ynwgR04tLg/+Gh4dJetths+2gJMxIXqTxX0N9PbwyPj7OiQKTxn92u12tViOEZAhhCOm02lAolNAj1tXVifzHjKNHj0JVuhQhGUL69HS3+/+3d/8hctz3/cc39lleSyf5FMvZ9eniKLEdG6pvbeybreI6qerm+03TpiAns6D8cNAfMjhQys1WUOGaYpo/jtTsXYmgIjXxQQz19Gtala9K9YcIyjgYoW/I9yhKaGAKV+pS1XW/uEYCG/aP6R9v9O5Hn5nZ273d2Zndz/PBIe4+Nzvz+cyPz2s/n5nV/WSM6yf/gOqYjvwz0ysMw5bnWQu0PM/MPyvzNAsHMbH8+8Y3vnHLB4Dm5wv9ZMLW1tajv/zLu3bteuGFF3gENM8rr7yyb37+jptvSur1+nj/LtX8/Lw+5k7+AeWajvwzrXW7YRhahVb+WRmZGZl5JpZ/Z86c2bN7t3a18reQCvLuu+8uLCzc/pGP1Gq1u+6883Of/Wxx25pqvV6v1Wot3H333fv23VWvr66ujnf9+vnLXq938uTJkydP8l4EKMuU5V8Yhmvdbrrcyr9OEKTnSAfcxMTyr9fr/cbTT+/du/ej+/ffddddFy9eLG5b6+vru+v1uVrtI7XaHbXa3fv28Vcg8vR6vfPnz29sbGxubo595ZJ/77777kMPPbRr167du3c3hrw/DWBcpin/2r4vt/raqQ/M7Sz/Lly4sJHy8ssvT+z5zyRJNjc3L126NN6HLNJWV1d3zc3dcXO69aP794/3thYGtLy8/JOf/OTrX//6rrm5227+34+f+cxnyq4X4KJpyj/R8rxmoxFFkVW4g/xbXV09keL7/iTzbzKuXr26Z88eCb/ba7WDBw8y7VYKud7u//jH52q1224+ZXPnnXeWXS/ARdOXf0mSbJt/1g2/tW63gvf/JuzcuXP33nvvbbfd9vjjjzPhVha53r7whS/ccdttkn+312oPP/xw2fUCXDSV+dfyPKsH3/b5z8y7hplmNf9QBfIXP+I4vueee26//fY7d+1aWFhgLhooxfTl31q3m/4wg5V/ifGZhyiKBn/4JSH/UCTJvyRJ3nvvvUceeSQIAv7qDVCW6cg//Z9cmo2GNZKTeMv8r2H0eZlq/v8vcNDzzz9/9uxZ+X6Uaw/A6KYj/yaJ/ENxzM+8Hzp0iBuxQInIPxv5h+JY+cffIgZKRP7ZyD8U58yZM/o3j5aWlsg/oETkn438Q3HMv3nL/0UOlIv8s5F/KA75B1QH+Wcj/1Ccixcvfv7zn0+S5IMPPqjX62VXB3Aa+Wcj/1CcS5cuHT16NOE0AyqA/LPRMaE4ly9fPnLkSMJpBlQA+WejY0Jx9Oy6evXq4cOHy64O4DTyz0b+oTh6dulEKICykH828g/Fee+99xYWFhLyD6gA8s9G/qFQ8rGHc+fOHTt2rOy6AE4j/2zkHwol+Wd+EBBAKcg/G/mHQi0tLb399tvkH1A68s9G/qFQ8t9er66unjp1quy6AE4j/2zkHwr14IMPxnFs/iEIAKUg/2zkHwollxz5B5SO/LORfyiUXHInT57UPwQPoBTkn438Q6GOHTt27ty5EydObGxslF0XwGnkn438Q6Ek+cg/oHTkn438Q6Ek+Ua58ACMBflnI/9QqNOnT6+urpJ/QOnIPxv5h0LJk59PPfXUj3/847LrAjiN/LORfyiU5J98Cr7sugBOI/9s5B8KJQ+/kH9A6cg/G/mHQkn+NZvNa9eulV0XwGnkn438Q6HeeOMN3/flr0AAKBH5ZyP/UCj5y7fkH1A68s9G/qFQly5dWl5enp+fL7sigOumJv/CMGw2GvJl/aoTBFIex/Eg5f2RfyjU1atX5+fnOceA0k1H/kVR1AkC+b7t+23f1191gkB+FcexGXV55dsi/1Cora2tWq3GOQaUbjryz0yvMAxbnqflg2Selg+C/EOhJP8ee+yxsisCuG468s+01u2GYSjfm1lo/phXPgjyD0Wr1WpHjx4tuxaA66Ys/8IwXOt29cdOEJhzoXKPsE/5IMg/FI38A6pgmvKv7fvyPItmG/mHaVSv148fP152LQDXTVP+iZbnNRuNKIqSkfNvZWXlaMqRI0fIPxTq0KFDJ06cKLsWgOumL/+SJNH8s27srXW7mff/tNyyubl5KeX1118n/1Ao8g+ogqnMv5bnybOd6ec85e5gXvkgmP9E0ZaXl1988cWyawG4bvryb63bNT/MoJ9tiKLInOTMK98W+YeiHT169KWXXiq7FoDrpiP/9H9yaTYa6ZGcPhdjfcg9r7w/8g+FunDhwq5du2q12uLi4sWLF8uuDuCu6ci/SSL/UJy33357z549H6nVbq/V5mq1vXv38leQgLKQfzbyD8V57bXX9u7ZM1erzdVqd9Rq+/buff3118uuFOAo8s9G/qE458+f3zs/f0etJl975+cvXLhQdqUAR5F/NvIPxen1ep/+9Kd31+u312rzu3f/j8OHe71e2ZUCHEX+2cg/FOr69eunT58++mu/9sILL1y/fr3s6gDuIv9s5B8AuID8s5F/AOAC8s9G/gGAC8g/G/kHAC4g/2zkHwC4gPyzkX8A4ALyz0b+AYALyD8b+QcALiD/bOQfALiA/LORfwDgAvLPRv4BgAvIP9vW1tbS0tIWAGCmHTlyhPy7xdbW1tzc3KGCLSwsLCwsFL2Ver3ebDaL3kqtVit6E81ms16vF72V+fn5AwcOFL2Vubm5paWlQjextLTEOTwUzuGhzMw5XK/Xyb9bbE1k/nN9fX1lZaXorRw7duzcuXNFb6VWK/xMuHTp0tGjR4veysrKyvr6etFbeeyxxzY3NwvdBOfwsDiHhzIz5zDznzb6jmHRdwxlZvoOzuGhcA4PhfwrB33HsOg7hjIzfQfn8FA4h4dC/pWDvmNY9B1DmZm+g3N4KJzDQyH/ykHfMSz6jqHMTN/BOTwUzuGhkH/loO8YFn3HUGam7+AcHgrn8FDIv3Jcu3bt+PHjRW9lY2NjY2Oj6K2srKwUfZomSTKBq3pzc3MCXe3q6uqFCxeK3srx48evXbtW6CY4h4fFOTyUmTmHjx8/fvny5Z29djbzDwCA/sg/AICLyD8AgIvIPwCAi8g/AICLyD8AgIvIPwCAi8g/AICLZjz/mo1GJwjShfIVRVFm+Vq3O0j55HWCoNloZBamW5pXHkVR6c3Z2XExy7UVzUYjjuNJVDrfWI6LkHYVWNccst0wDNOF8jVIuerTwAkYS1vMcuuEnIyW52Vep3nX77DlkzSutuStZ8dmNv/CMMy8CPXCkF2sZ3bL83TJlufpxZNXPnmZV2knCNq+L9+bVc0rN7vXtu9P/pIY9rhklsdxrK1r+365ETiW46LkCi+4yjaNZPP0lh0uO3at29Va5ZULKSmxqx1LW+I41jXI9xM+wdq+L1uU60X3Z971O2z5JI2rLXnrGcXM5p+wupgwDLX3SYzOSE5x7XM7QSA7N6+8LOnuxrwyzYs5rzzvPJuwAY9Ln3ItNLuqsox+XHQ96VVNRno3Wmd7y/Pkx7zy5OZ+KGW0ZBq9LdLDmuWTbFQcx+bm2r5vvtsbSxZOzLja0mc9o3Ar/8x338mtZ7n5hqITBHrx5JWXwuoc0x2oXPZ55fKNeRqVOLczyHHpc7xMVcu/HRyXJEniOF7rdvPaWLR0ZpjBlhjHIq+8Cm9ExOhtSU8OlTjBYF4FedfvsOVlGaUteesZhXP5Z3YuZl8jXVgYhmEYmpdEXnkpMvtZ8zo3+9m88rz+d5IGPC59jpep3PnPZOTjIt/r0LY6+Zc5+M4r15nPzPntSRq9LYkxr94JgtIzQ3qeYd9XVed6VztuS956RuRW/snOtaZr9LfS26av27zyyUtPjrU8r+V58r152WeWV+d6GPC49D9eooLvS5Ihj4uswby3MdHapyojrMlMnXHKK5dvzPnDsrra0dsi5F5s6SNaPWFmIP923Ja89YzIrfxLjOcv5Ms63WXvWyPrvPLJywwAsznmqZMur871MPhx6XO8dFUTqnS+EY+LzHzKb6uTf4nxLEnz1ofuMsutucRx3aHZgdHbkiRJFEUyyGiW/TiPxvO0598obclbz4icyz9lPdti3uI2R3t55aXo/3BE2/czq2eWm0229sAkDX5c+peX/o5EjHhcdM4wsyOejP537/JS2SzPu5c2eaO3RdYg32d+mmIy5LaLWZJ3/Q5bPnmjtyVvPaNwN//MXsl60xGGoYwq8srL0qefHeSqTlLPVpXVnAGPS//y0m/MqNGPy7blReufGXm/MsutwOsEQVlvFkdvy1q3a14apbRFBqBWYd71O2z5hI2lLXnrGYWL+SeXh/Xm1Bzbmad7Xnkp8vrZvM/ApcvN54xL/Djj4Mclr9x6FrfcgeDox0VVLf/yPmuVWa5rKOUzc2r0tlhjvslfKVEUWU8+h8anYNO1GrZ8ksbYlsz1jGJm80//B4Gm8dlkvZmUN73WTD26llc+efp/H5hXZl7F+lRYd0IpdzWGOi555ZIfJc4WmsZ1XEQp+WdOwGoXozfGrIXzypNbL5aywm9cbTFvPE84Nqx73s1GwxwD5V2/w5ZPxrja0n89Ozaz+QcAQB/kHwDAReQfAMBF5B8AwEXkHwDAReQfAMBF5B8AwEXkHwDAReQfAMBF5B8AwEXkHwDAReQfAMBF5B8AwEXkHwDAReQfAMBF5B9QLeZf0TP/+Jz5Vw/L+ut6wCwh/4Aqkj/NauVc2/fL/SPMwCwh/4CKavu+9ceyCT9gjMg/oKJkInSt25Ufm41GufUBZgz5B1SXzoKudbsahEmShGGo9wK10LxrKCWaoNaSABLyD6i4ZqPR8ry8idBOEMivOkHQ9n19yVq3q8/RaDkAE/kHVJoM9aIo0hLzQVDrcVDNPBksyo/mawEo8g+otCiKrAdBW56XjjSJOhkLtjyP/AO2Rf4BlZbOv7bvm/cChWZeQv4BgyH/gEpL5581Iyq3+lqeJzcFzadGyT+gD/IPqC7zVp/54T99pFOjTp8IbXmevKrleen/RAaAIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/AAAuIv8AAC4i/wAALiL/HHXmu9/98jPPVPCr0+mUXge++BrX1zvvvFP2tY5c5J+jvv61r21sbLxVPVeuXCm7CsB4fOUrX7l8+XLZ1zpykX+OOnHixIULF8quBTDLvvzMM2+99VbZtUAu8s9R5B9QNPKv4sg/R5F/QNHIv4oj/xxF/gFFI/8qjvxzFPkHFI38qzjyz1HkH1A08q/iyD9HkX9A0ci/iiP/HEX+AUUj/yqO/HMU+QcUjfyrOPLPUeQfUDTyr+LIP0cNkn9hGDYbDfNLytu+ryVr3W7xlXVRs9EIw3Bnr43jeJSXT6koipqNRhRFZVfkv5F/FUf+OWrw8V/L85qNRtv3zcK277vWvU6SvLdgD0878q/iyD9H7Tj/ZGxRqXfZRVvrdiffXgfzLwzDYZtcyqEZHPlXceSfo3aWf2EYtjyv4KolSZL889Y//em3V1dOPHf25fV/fftftPwXV3/+nRdfkvL33/tPLf/p5St/fOr07598/tUzZz/84IMx1qSsvHcw/4ZtcvXfipF/FUf+OWoH+dcJgmajEcdxehm59dJsNCQdzRuH0qOZNwt1sTx/+8ZfPzR/z68ffvw5/6tPPvhLjyw03rz4wyRJXj1z9v65+S8uP/mt488+sfTAE0sP/Gzz75Mk+c6LLy3W6seeevo5/6uHDxz8lUMP//PWPw2/SxKtp97s1HZpnWU/aAOjKNJlOkGQ3iFWn66v0oVlAb2lqrtXymWfm+XS6et6dOG1bleXtO6EmZXJTAt9rd7izWuCFMZxLGeFeRzNg661NVfSp2lmo6QOnSBo+77sFj1t+h8aqUDmpgepfxHIv4oj/xw1bP5ZfY1J+h3p0FuepyNFa9Z0wCdl/vXtf3lkofEHz/9ur9dLkqTX60na/b8r//f+ufk//faqLHbj+vWvHP1fv3748Z9evrJYq//Va38h5f//3f/43COPfu03f2eQbVmkz5Xvtds1BxmaUtJY+dFsr3S+0smaO0f6304Q6HpkDVYstTxPd6/Zcbc8TyujC+gWreOi/b6sU3t8qUD68K11u1rY8jypWGYTrDAzn7KRZWR5yS1Zie5PiVizydo0662A1NNK620PjaZvn0PQp/4FIf8qjvxz1A7Gf9rFmAOd5GYMSD8i30sfZJYP/pjoX732F5+sL5hzmP9+7d8Wa/XT3/q9J5YeMJeU5Fs58dyxp542y//2jb9erNVvXL8+4BYtmijpTjYxoiu5NTnMmGn7vtleTZ3M+EmPTmRbZrlu1ByomSli9ePmeqzKpGUOCvOaYDbT3G7L89JBojFmxXxm06xyM/BU/0NjvgUZtv4FIf8qjvxz1M7u/2mPZnYu1gDRGnlIvzN4/p19ef3R5ifMkl6vt1irf+O3jn2mJzFqAAAOfUlEQVRx+UmzfCv+x8Va/Ztf+vJz/lfN8p9t/v1irW7eNRyQ9KdSYXPINWz+6Wt1MRmL5E1dahdsbiszJDpBkLkn++SfVZnMJqfzL68JefmRGSR5DwnvIP8GOTRm/g1b/4KQfxVH/jlqx89/atqZkdDM+SCg/GqouyxvXvzhYq3+08tXtOTCuf+zWKv/2Z+sfbK+YN7Ye2X9zP1z83/2J2uPNj9hPgvzRyunDh84OPgWldlpjph/Zt9tLibMmbr0+C9dbo7/0qOiZLvxnzVe7/9abX5mE/qM/9InQCcIMje9g/wb5NBY+TdU/QtC/lUc+eeoUT7/Z0WgTsrJbztBYD2D0L//Tfvml555tPmJv3n9f//i6s//cuMHhw8cXDnxXK/X+5+PtZ588Jcunv+7+B9+8cr6mYfm7/nOiy/duH79Vw49/MXlJ9+8+MNfXP1596Vv3z83/+qZs0NtUdslVZWO1epk5cdB8k86YrO/tu7/JUli5pzu27ww0HKzYrLRbec/zRuQUmfrCSbrsSbZUF4T8vJDzgHzdp0urJuWO3B5TdPyMAzjOE7n37aHxsy/YetfEPKv4sg/R+3s/3+RBxfNEp3etO5IqZbnWR3utiPC99/7zz/83ZVP1hcWa/WH5u/541On5Xbgv1/7t28df/b+uXkpP/vyujwjsxX/49d+83cWa/XFWv3wgYM/OPvKzvaJtldGD03joR7pTDX49WlYbbI1sZl+Aja5OXqzCmUrutrk1mlSa6PJrY81tn3fWthaIF2ZzGG62RZrOGXW1iqx1pl5DpiLyRujPk3Tfa57yXrYp8+hST99Omz9i0D+VRz556iJ/f+fO+5cer1e5scYPvzgg8zyG9ev7+CeX+mKHoKgRORfxZF/jio6/5o3Hxmt8seTq4D8m2HkX8WRf44qOv9kYmrYO39OSU9dYsaQfxVH/jmKv38EFI38qzjyz1HkH1A08q/iyD9HkX9A0ci/iiP/HEX+AUUj/yqO/HMU+QcUjfyrOPLPUeQfUDTyr+LIP0eRf0DRyL+KI/8cRf4BRSP/Ko78c1Sn07ly5cr2ywHYKa6yiiP/HMX4Dyga47+KI/8cRf4BRSP/Ko78cxT5BxSN/Ks48s9R5B9QNPKv4sg/R5F/QNHIv4oj/xxF/gFFI/8qjvxzFPkHFI38qzjyz1HkH1A08q/iyD9HkX9A0ci/iiP/HEX+AUUj/yqO/HMU+QcUjfyrOPLPUeQfihBFUbPRiKKo7IpUAvlXceSfo8g/oGjkX8WRf44i/8auEwRxHJddi1GtdbvDjt5mo+FFIP8qjvxz1DTm3/vvv/9mFL0ZRTdu3Ci7LjaZ95v2GIjjeNjZy9loeEHIv4oj/xw1dfl3/vz5Bz71qWaj0Ww0HvjUp/7m3LkitiLrbzYaSZK0fV++D8NQf1zrdiUk5KvleUmShGGoJW3ft1YlL5c1dIKg5XlmoVrrds2tC0kXaz0aObIqqYMwa6KZZBZKieacttHalqyzEwRt39eGm42Sl6QbLiW66WHrP2PIv4oj/xw1XfkXx/HHl5Y+du+BhX3zC/vmP3bvPYv33VfQmKPt+9LXJ0my1u1q7xxFkQZhJwiSmykihdYwSJNGnwfRpMmstrmhlufJ+uW1Uii5EoahmShxHJt1kGW0FRpIsrYkSSR9zfyWoZ7Gmzn+6wSBuUxyMw61gfISs+Eah/LjsPWfPeRfxZF/jqps/v3s6tUw5ZvPPnvwvvvu2X+3fi0tLn7z2WfTS/7s6tURK2BGkYzJJAA0FIX24+n8M0dF8iWv1eBMy5x1NJM4uZleSVbWSh1anpcOEs3ddOroFluel86/5NbAUxqf6fxLbh3/DVv/2UP+VRz556jK5t+ff+973vKy9SUzn42P3atfMguaXvLPv/e9EStgZsBat6uhpdEl3bcEQ2b+rXW7mTmXl395d900loSEcZKfH5lB0vK89Jp3ln/yW8kwfUmf/Bu2/rOH/Ks48s9Rlc2/TK9+//uL9923/+75hX17Fvbt2X/3/MeXDr76/e8XtDkJKpms0w5d+2izv84b/2Xe0+o//suMLjN+dGDaZ/xnDVKT1CBM7Cz/zPUPmH9D1X/2kH8VR/45arryr9frfe6zn106ePDAR/cf+Oj+pYMHf/XJJz/88MOCNicBpn29DHrM/trs+q380+dENOq0sE/+yc023YQsJlliRk7evUYpN2drrZVooTy/s23+yY/p/DNvfFr5Jz+a+Tds/WcP+Vdx5J+jpiv/kiS5ceNGsLKyvPzE8vITp06dev/994vblvVQhhUD+qBm2/flCUbz2Uh5VfoZUVmyaTwgatHnTcxkMm8lmg+5aIl1i9F8iFTrbxbKx/sy1yDZpi3SG4c6ltWFZWCnL9FVpZ8+Hbb+M4b8qzjyz1FTl3/A1CH/Ko78cxT5BxSN/Ks48s9R5B9QNPKv4sg/R5F/QNHIv4oj/xxF/gFFI/8qjvxzFPkHFI38qzjyz1HkH1A08q/iyD9HkX9A0ci/iiP/HEX+AUUj/yqO/HMU+QcUjfyrOPLPUe12e319/a3quXLlStlVAMbjN55++kc/+lHZ1zpykX+OOvPd7375mWcq+NXpdEqvA198jevrnXfeKftaRy7yDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8m8qdYKg2Wg0G404juM4lu/DMOwEwcTqsNbtynbbvm9WSb/MykRRZP225XkTq2oeaUIURdsuFoahNmGt29VfSavNlqZLzL0RRdG2x6jt+81Gw6qkHOuhWrcDbd8Pw1C+Nw9u3jITY54/eubomW9Vsu37/Y+p7GG9aqRQT2DztbLzO0EQhmH6t5h25N9U6gSB9sLaH3WCYMKhYiXuWrdrZYO5cBzHZvWkNymubnEcD9JNp/t3i+5qWVL6XOkEtfnSP2aW6E7QAAvDcNuNWhnTJzLNHT4i6eJlu5kJYS0zSeYWde9ltl2Ssk9KxXGsvw3DUNaceba0fd+6oLZNVkwX8m8qmfnX8jy9Jic5/ku2yz+LlX9JklhjqfHqBMG2A6YoivpXIHO4Ziai7Pk4jqVTTpdoHczMkwFl/8pby+ctuW2UDk7TLo5j2aKMfsytpxNxwrRuOvizFpBdN2BK6cGVwZ/Z0rVuN3PsS/7NEvJvKpn5J52U1SXpfJFc4fJ2XvoOWVhK5LKXN7/m5J52LvKjrC0dJ33yLx0b6fzTLsaayNIpRHkjr23p3+1qe63KW/uk7fudINBRWv/uLHMBTS+z85Xv0yVCpk/NXdE/t9a63Zbn6Q635iTDMGx5njkv2vI83ZPyfkjmCde6XWnptpOo0ihrJ1tjqcxlzDbKPjcPlp5Xej60PE9Hlvo2wpzVbHme1DyzqrondTBtNkpetYP8kzW0PM+sp5yB5klL/s0Y8m8qmfmXpHo3M2mkK0mM+TedWzPTTpaPoki+0Zf3v+2Uzr/Mm38iM/+kRKNCwilJ9UTJzYzMrIb8Sm6FSgyEYWiFn3SUya19+rbTxWYIKY2uAfNPbyyZK+kz96sjMGmCTtBptc3kkCUlEZObR0Te0LR9v+37EoH9815Xkp7tNBOif/5pS+WFeiLJDpRyzWNds76ZkFNaRuR6QNObSL9v0FXp0HDAlMoc/UuF5VzVqWDzXgP5N0vIv6lk5Z8Wau+j3ZbebcrMP30Tba5Nx0/bjrrGMv6Lokg7NTOApaOxHpzJ7H20W9cF0v1U+s3BII+ipHvhKIrM0Zi5ZGaJ+aO5J/u8sdDAk3pqn64vN/to3QM60Nc9oG9uZPdmTujpy5Ose3vWcz2Zy1jrMaflpYF6BBNjn+tBN280SpxnvnnKrJLSBuqPevTN4aZ1PmcOMSWDzXPSvF9L/s0Y8m8qmR2N2SPI9WnGkl7J/fPPXEk6qPKM5f6f2dfoMmb+bXuLS7u2vA2Z9Rx88jPJGv+ZldHe0OzN86pt3fPrM/6znmyS4aC2SIdW5t6W3SVJo3tAaq6D8rxDY73d0bNCDk1yczyauYwlnX8yBk1uHeKba8hMFGtWU5lvPqztJsZpMMhseZITpRKK5g433yeRfzOG/JtKVkdjjkj0ExFyoWq3a85EWflnTi3KanWdfXocecTR/K2Vf/J2Xn9MP/9pzrLq7SKtgHY0TeN5y8zex5xptOLfqpj5gYc+kWA209yiOd5KBnv+M3Nv9Ln/J2Gj3+uwSZaXhLNm+XTQrGFjDui17dvedDTHduaw29yZ247/rOGdHhqdmbBea45KZW9b86LW+tOhmC4cJKXiOM6cojCjTidmtSbk34wh/6aSNf7TO0xamH7uQJeRN+Bf+u3fNhNIRwnafzWNz1qln3+R9Zv9afrzf+Zv05//y/yt9VFCqy06xkrPo5pv+dOfwDM/uqfzqLq79DZkes3aj1sDILOXtLZllWTO3JpvSqwBpblnzMTSPSDLaIsk77VW8q/57kFfa94SzgxCzTbrYJnvEsz8S69HNm0N73Tr+mCONYjUl+jEo3n0rfWb3+eN8wZJKfO9lB7c9PxE+uCSf7OE/JtKmff/3FFc2zPvqo53c9bn/0o5juPaqLWebfeVmVUDfkCzUsi/GUP+TaWO8f+/lF2XSSsu+/PWvO3H9QZnPXRTyv+lMq6Nptez7aEx76fmfcKhmkL+/5dZRP4BGINBEkKXGeTmK1A08g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOAi8g8A4CLyDwDgIvIPAOCi/wKDAfrTrsWc0QAAAABJRU5ErkJggg==" alt></p>
</div>
<div class="specification">
<p>The concentration of carbon dioxide in the atmosphere is currently 385 ppm (parts per million). Variations in the concentration of carbon dioxide in the atmosphere can be studied using ice-cores. An ice-core record covering the last 400 000 years has been obtained from Vostok in the Antarctic. The graph below shows the carbon dioxide concentrations that were measured at different depths in the ice. Atmospheric temperatures are also shown on the graph. These were deduced from ratios of oxygen isotopes. The upper line on the graph shows CO<sub>2</sub> concentrations and the lower line shows temperature.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAn0AAAE9CAIAAADxoUNrAAAgAElEQVR4nOy9aVwUV/b/P7+ZSTKZbzLZTFCT0ZgoiholSqOi4gIKyiJgo4AQBTQiqyA7su9Ls8gOImIAWxBlU9y1ERVlVwGx2UFkB4Heu6r/D+qfSk93Aw30Btz3iwdQVFedW7erPnXPPfecv7EAAAAAAACIir+J2wAAAAAAAOYRQHcBAAAAABAdQHcBAAAAABAdQHcBAAAAABAdQHcBAAAAABAdQHcBAAAAABAdQHcBAAAAABAdQHcBAAAAABAdQHcBAAAAABAdQHcBAAAAABAdQHcBcwFdLHahlBT3D5FIFMjx7WxtdbHYifchEokLpaTwePyUDiuPwczMNBFBJBLDcThxWwEAzAWA7gLmCAQCYaGUFIFAQLcg0mtnazvDI9vZ2i6UkppUd+c24TicoF5iAIB5DtBdwByBW3dZf46DpzQGRcHj8egH+Rnvzm1m/voCAAAQgO4C5gg8dRfx/U5PMtkFe57rLoFAmN67CwAA4AboLmCOwFN3WSyWPAazUEqKfR+OqV9EX9EZYiKRiKg1+sP6U3fRj/Oc6WQ3ADkCgUBAD8vTZl0sll3O0Z15bpxgxMneLm5PO8dnEfvZLwJyicZrF2ucwS5HG5GJasQnz7MjAAAAAtBdwBxhPN1FVAHZAdUzRHhYbMqEfFAeg0EDnTjGu6gchuNw3MFQqPIRCAR22UYOy1PSEMNQk3SxWETe2OOzELFH7ZlA7xEFZQ/U4ngJQA6OWMVuvzwGg3x2grgw7rE+RxvRP1Gz57N7AACYGKC7gDnCpONddCjGLYqo2LAfZDw/Mx6P5zl+5TneRW3gKZmoPiGf5fgvx7B7PIe5LhbLffBwHI59Z8RmRF+528v+wz20Hc/JPEEb57lbHgCYGKC7gDnCpPO7ulgsT/1g1yF2LRGl7vI8JoFA4B5Yc/vAeR6cQ/nGe59AHOzchnEciud2oLsAwPQAuguYI0wQz4xstLO15Skh3OM/7nGhaMa7HAt1kINMunoHdVCzgwzuOWwbb7w78fGB7gIAggXoLmCOMN76XVQMkB3Yh3ro+I97kpX1pz7h8XgikShs3WX979Qy60+108ViuTdygNiDtgtZaMsRyM3+zsExiSuPwbBrJMcp0KvEDdBdAGB6AN0FzAXGy1fFsRsiURwTmcjv3BOoyDERCUHDkdBIYI6RKPtEaUxMDPo7zzNy2MwuvdyWs28cb+zLfhZU/Ng90uwRWxy7sdiCy7iv2HiDXfb2crSR/XLx/CwAMM8BuguY7yycbmINAAAAmAZAdwHzHaC7AABAlADdBcxfxvO7AgAAgPAAugsAAAAAgOgAugsAAAAAgOgAugsAAAAAgOgAugsAAAAAgOgAugsAAAAAgOgAugsAAAAAgOgAugsAAAAAgOgAugsAAAAAgOgAugsAAAAAgOgAugsAAAAAgOiQXN1FqpoItpoYWkwGPSyaKZA9Qy9aX2XS0qcCMYmjbAvPs3NfDZ6WTwmOOm4IaPUb9np5/NgzVdCqNZNeeWG0XXjwbBd7Qkq0aUJqF/eJ0GpL41U6mrivxQh6Mbk3TnrdJK0tfII+o7grWs7e+4K7H1FT2QtezaV+nBgJ1V07W1skX244DifAxLnch0K7Ux6DQX4hEAiIEBKJRGEXMkPuMfaz8Dw7z6vBbfmUQL/i7Lc3UmuWfTf+7ZkS4Tgccl7kpprgyguj7cKDZ7tYvL54QmoXe8Fd9BqyP8XYqwjz09diBL2Y7MWD+bxuktYWPiEQCEij8Hg8ajbPPp1F9wXPfkQbxf4ImjP9OCkSqrtoByDyIJBjIm/97J2Hx+PR7g/H4ZDvBPqFZrFYulissN8c2W+w8c7OfTV4Wj4NeL5Ws4sEn/bMBHkMBr0tRdl2YYO2Cy1Vy3Gphdou9LAcRYLR7zOffS1GUMvxeDy72fxcN0lrC5+gTSYSidxfAPbbbRbdFzz7kd3rg/53zvTjpEii7iLPKfRPQXkYkIMg6otsYX//QntdHoNBe5e914UEh+5yn53n1eBp+TRgFwP0IrM7f/i0Z3pnR0+BvuSKsu3CBm0X+uaOOtBE0C6e4wM7W1t2k1iT9fVMDBAgqIX8XzeJbQuf8FRNtE9n6X3B3Sg8Ho8+f+ZkP46HhOou+yND4J59tP/YO5K9p9m/CqLXXY6z87waPC2fBtzzu+xn4d+e6Z2d9b/v9SJuu1DhOV5BmyOCdrGPLVB4Ps0n6OuZGCAQ0Lk9xBj+r5sEtoVP0Akg7i8A2qez7r7g6EcEdNIXHRHNpX6cmPmou+gzURJ6WjJ1F52SEbbusivBXNLd8bx8iLUiaBdP1ef5ZZ6gr2digABBfVTzQXcREKHiuDfZx/2z8b5g9zWioB6XOdmP4yGJusv639kLgU+nE4lENHiBfUaBexCsi8XylCUBMvH8LnJ27qvB0/JpMIHucr+ETmDP9LCztWU/u4jbLjw42sXxL+QXobaLZ6egfTredhF/86cEz3nNCa6bJLeFTzjM5ujT2XhfsNj6EQWPxyM3xVztR55IqO7ydAULCl0sln1+C/mdO6qW46VSSHDoLs+z87wa3JZPA566SyQS0RuAf3umSjgOxz5zM6VzCaTtQoK7XSh4PB5tgvDahX690fdLdDv3zpP2tSSAPppZfF83iW0Ln3C80XL36ay7L1j/248o7Go69/pxPCRUd1l/Li4UoLcEXQPHrjRorCn7ZFj4n0vohP3dRac92L9SPM/OfTV4Wj4lOC4IT2P4t2dKoFM7HE0QWduFBM92octnOR46Qu1TjsvI4WSeUl+LC3R58fSum0S1hU/QrwqHG5lnn86W+4K7H1E7JeppLEokV3cBAAAAAJh7AN0FAAAAAEB0AN0FAAAAAEB0AN0FAAAAAEB0AN0FAAAAAEB0AN0FAAAAAEB0iEJ3kcUVHAUJJt0CAAAAAMDcQ+i6i2a+RqtJsCdYQVZ0cW8BAAAAAGBOInTdZS9Biggwew4zRG65t6BwrBkHP+AH/IAf8DMnf4QtRpKDiOZ32VPWsScGQ37n3oJ+UASdQaFQSktL09PThX2iqQLDcFtbm4+Pj7gMGBsbMzIyEtfZEWJjY1tbW2EYFq8ZgqWmpubixYtDQ0NiOfvY2FhUVFRzc7NYzi5YGAxGamrq8+fPxW2ISGltbc3Pz6+qqhK3IYIE6K6AQZPSoQ7nKemuNRcJCQkCNA/o7ngA3RUSQHcFBdDdOQPQXaGgi8Uic7dT1d0uLgYHBwVoGNDd8QC6KySA7goKBoNx9erV6upqYZ+ITqdXV1fn5ubW1tbS6XRhn25igO7OdkSnuwQCAdFd9tlc5Fpzb0ERQWdQqdSampqCggJhn2iqwDD8/v17wQ7upwSNRsvIyBDX2RFKSkoE+5olCXR1db148YJMJovl7DQarbi4eGBgQCxnFywwDI+OjlKpVGGf6M2bN2ZmZjIyMs7Ozi0tLcI+3cQMDg6+fv363bt34jVDsADdFQpofbQpxTOLoDNgGKbRaGNjY8I+0TRgMpkfPnwQ19lhGBb7ZaFSqRAEidcGgcNkMqlUqrgG8TAMUyiUuXdVhcqbN29MTU2XLl165swZsesuk8mk0WhMJlO8ZggWoLuCBK2Mxl6GDCntxF38jnv97rzqDAAAIJmMjIycO3fOyMjo5s2bYvczz0nm1aNe0vNVzavOAAAAkgmZTMbhcCYmJk+ePBG3LXOTefWoB7oLAAAAk0AmkwMDA42MjEpKSsRty9xkXj3qge4CAADAJIyNjXl7e+vp6QHdFRLz6lEPdBcAAAAmgUQieXp6YrHY4uJicdsyN5lXj/pZoLvNzc3Nzc0tLS39/f3iNgcAAMxHyGSyl5cX0F3hAXRXglgoJRUbGxsbG5ucnMyeTwMAAABEw9jY2MWLF3fs2KGtrf348WNxmzM3AborQSyUkhocHBwcHBwaGiKRSOI2BwAAzDseP36sqqr66aef7tq169GjR+I2Z24CdFeCmFedMbcZGBjw8/MLDQ2dY3l2AHOesrKyffv2/f3vf1+2bFlqaqoI0mPNQ+bVox7oLkAUwDB8//59OTm5vXv3enh4iNscAGAKDA8POzg4/PTTTwsXLty5c2dAQMDLly9Bwq9pAEFQd3d3aWlpY2Mjg8Fg/9e8etTPAt2lUCiNjY1VVVU9PT3iNgcwTWAYLisr++WXX9avX3/27FlxmwMATAESieTm5vb777+rqqouWrRo+fLlDg4OYs8WORtpbW11c3PbsmVLYGDg8PAw+7+A7koQC6WkGhoabGxs9u/fHxoaCt4xZy8kEmnv3r2qqqpNTU3itgUAmALIIqKzZ88ePnz4008//fbbb/39/cHyikkhk8mVlZV5eXlv375Ftrx+/frIkSM//PCDg4MDR70ToLsCBsnPrIvFolvsbG2RjUQiEdmC1OjlmZ+5sbHRyspq3bp1Tk5OQHdnLwwG48CBAyoqKi9evJhjKd0Bc5vu7m5vb28cDmdkZPTRRx9t37797t274Ds8KY8fP1ZTU1u7dq2NjU1XVxcMwxUVFdbW1p6entzlFIHuChJUbuUxGKQ0AoFAQKsPIf+duB4RmUy+c+eOhYVFbm7uHKvDOq+g0+mqqqoqKioaGhqNjY3iNgcA4AsGgxEbG4vBYLS1tRUUFD755JP9+/eXlpaK2y5Jh8FgXL58efny5cuWLTMzM+vp6aFSqdnZ2adOnaqpqeGY3GUB3RUSqMpyl/9jr7/LMeRdKCUFQVBNTY2/vz9YsT6rodPpioqKixcv3rp1K+rnAAAkHAqF4uXlJSsru3//fgwG89VXX2Gx2IqKCnHbJdHQaLSSkhJ7e/vTp09bWlqGhIQwmcza2lpvb++UlBSeAeFAdyeC3V08JdC690QicaGUFIFAwOPxSEVeXSwWzYnB/juLxVooJQXD8KtXr/z9/cHKudkFg8EoLS3F4/FVVVUwDNPp9G3btn3xxRfJycmgkpp4+fDhQ09PD41GE7chswAIgtLS0tTU1Pz8/ExNTdetW3fkyJGHDx8CPzNPqFRqeXl5QECAubl5REQEkUi8dOlScHDw0NBQUVGRvb39q1eveH4Q6O5fEInEcBzOxMREF4vVxWKVlZWnfXXCcThUUJHZXNSlPLHuWllZmZqa7t+//+DBg9bW1tbW1vHx8WCiV2IZGRlBHuh9fX0HDhzQ1NQ0MDAgk8mI7n711VdPnz4Vt43zmqGhIRMTE1lZWTs7u7a2NnGbMwu4ceOGhYVFQUFBenq6oqLi0qVLT58+TSQSwbQXlUqtra0tLS0dGBjo7u6uqqoKCQnZuHHj0qVLVVRUHj58SKfTCwsL7ezs8vLywsPDk5OTx3vbA7r7F/IYjDwGg4juDHWXfeLWztaWQCAslJLiZ7zb1dVVX1+flpYWHR397t27rq6ugYGB6dkAECoQBJWXl3t6ep4/f57FYg0NDenp6cnKyp48eZJGoyG6++WXX4K5MfHS3d2toqLyxRdfqKmp1dfXi9ucWcDdu3cDAwOvXbvm6ur6ww8/LF26dNOmTSCBBoPBKCkpwWKxmzdvPnnypJGRkaGhoaWlpbKy8rJly3777bfW1lYYhl+/fu3t7W1mZubu7l5WVjbe0YDu/sVCKam+vj72LdPzM7N/Co/HI7O5iMOZ9b/zuxxXH/lzcHAwPT3dz88P+HYkGQaD4e/vv2fPni1btjg7O9vZ2amrq+/cuVNJSen9+/foeHeCew8gAmg0mqOj448//hgZGcmxlgPAk9u3b1+7di0/P9/AwOC777779NNP165di8fj5/l0SXt7+9mzZ9evX799+3ZLS8v6+vqmpqaenp729va6urr29nYkeKqzs9PPz2/9+vX29vYcasIO0N2/8PLy4giBQQWSf5DRLYvFwuPxBAIhHIdDw5iRaz1xPDOLxRoeHs7IyHB3dwe6KyFAEEQmkzm6g8lkXrhw4YcffpCTk9u4cePWrVuXLFmipaW1e/fu4uLic+fOrVixAuiu2IEgyNfXV1ZW9sGDB9xhpQAmk1lWVnb37l1k6QuVSo2MjExMTGxqasrOzvb29jYyMgoLC0P+K25jxQCDwSCRSC0tLeHh4ZqamlZWVqGhoU+ePIEgCLkgMAyjv7NYrM7OTjc3t4ULF5qamk6Q+wjo7v/g5eWVlJSEDEm9vLymenXkMRhkqS778lxdLBbZgviZWSxWOA433vpdFotFoVDu378fFBQ0Ojo6pbMDhAGNRrt9+/bvv/9+6dIlxNVGpVJbWlpaWlrq6+s///xzNTW19evXL1269PDhwzIyMtra2kZGRsrKyt9///3ixYtfvHgh7hbMayAI8vb2XrduHYFAAHESHEAQRCAQdHR01qxZExER0d/fTyKRvLy8wsPDkd+HhoZycnKysrImGLrNYYaHh/F4vIaGhrKycnBwMJFI7OvrGx4eniBG7/37976+vmvWrPHw8Pjw4cN4uwHd/Qs0wQX7j2gsQ0BOB8NwVVXV2bNni4uLwZNCvMAwPDQ0dPLkyYMHD27cuDE9PZ1Kpd69e1ddXf3o0aOlpaXffPPNqlWr1q1bt3z5ci8vr+XLl//000///e9/Fy9eLCMjs3r1aqC74oXJZPr4+MjKys6Tu4lKpfb09AwPD/PjLYNh+O7duzt27Pjqq6+8vb07Ojrq6+tNTEzc3NzQeh65ublBQUEvX74UsuGSSFNTk4uLy88//7xz586bN2/y8/2h0+nt7e3l5eWdnZ0T7A909y+QBT/on319fWLRXTKZXFhYuGfPHnNz89bWVlEaAOBmbGwsJCTk559/xmAw+/fvf/XqVWZmpoKCwpo1a5ycnBQUFOTl5RctWvTLL7+4u7urqant2LFj+fLl33333Z49e1avXv38+XNxt2BeQ6FQHBwcdu/e/fz58/mgu1lZWcrKysgE5KQ7U6nUjIwM5K0xMTExJSVlx44d33777fr16zMzMxHvTk5OjoODw5MnT4Rvu8TR2dnp6uq6YsWKs2fP8p8wH4IgJpM58ZcN6O5f6GKxHO4UERefRzpjZGQkPT39119/PXToUE1NjSgNAHADQVBbW9vGjRtXrVplaGjY3d1dVla2fv16OTm53bt36+joKCgo7Ny58/vvv9fX179w4YKSkpKKioqJiQkOh9uxYwdYRyRe+vr6Tpw4oaurW1ZWNh/mdz09PVetWrV9+/bbt29PuvODBw8OHTr07bffLl++XEtLS1ZW9uOPP/7oo4/WrFmTmZmJeFNzcnIsLCxu3bo1H64eB42Njb6+vp6enm1tbYJ9aQO6+xc3Cgu9vLwIf3KjsFAs411kgcrx48dDQkKGhoZEaQCAGwiC3rx5Y2BgcPTo0YqKCgaD0dzcrK6uvmHDhnXr1hkYGOjo6KipqSkoKCgrK9+4cQNZde3i4vLu3TsXF5fq6mpxt2Be093dbWxsrKSkdO7cud7eXnGbI3SSk5PXrVtnaGg4qWeYRCK5u7v/9NNPixYt2rBhw6ZNmxYsWPD111+rq6tnZ2cPDAzAMEwmk3E4nIyMjJGREZIQRjStkASQap42NjZFRUUCD3EFuvsX7FFR4prfdXV1dXFx8fX1PX/+/PXr1+eDZ0zCYTKZt27dMjY2jo6Ozs7ORkJRXFxcXF1df/zxRycnp1evXt25cwePx8vIyOTk5Dg6Op44ccLU1JRMJmdkZNTW1oq7BfOa7u5uKysrZWVlLy8vdM5yDvP8+XMrK6srV66QSKSJ92xqajI1Nf3555+PHz9uZWWloaEhLy/v5eXV0NBAJpMRiR0cHHR1dZWRkdHV1S0uLp5Xukun069cuXLmzBlhlBQDuvsXSGIp8Y53u7u737179/TpUzc3N3t7e1BFTuwwGIzc3Nxjx45duHDB09OTSqUGBQW5u7uXlJSsXr3a09OTyWSSSCRra2tpaemjR486ODiYmJjo6+tTqdScnBygu+Kluro6Jibm6NGjXl5enZ2d4jZH6FRWVpqbm1++fJlCoUy8Z1NT09GjR9evX5+YmBgcHKyionLq1CmOWXAmk3n//n01NTUbG5vm5mYh2y5ZvH371t/fPz4+XhgOdqC7/wPHhK645nezs7O1tbVPnTqVnJw8r94xJQ0Igrq6upKSko4ePVpQUODg4HD37l05Obn9+/dXVFTIysqGhoayWCwGg2FoaPjjjz/Ky8sbGhr+8ssvBw4cQHS3qqpK3I2Y16SmpgYHB5uZmfn5+c0H3S0vL9+3b5+fn994ee5gGB4bG3v//n1NTQ2yGvX9+/f5+fl79+51dHTkDuTs6uqyt7c/d+7cvFrWSKVS8/LynJ2dhbT+HujuX/T19dnZ2kpLSy+UklJWVkaX24oMpDOoVOrjx4+NjIw0NDREbwMABYKg6urqgwcPbtiw4dixY/39/aampgEBAVu3btXQ0Hj69CkGg0lPT2exWHQ63dDQ8P/+7/82bNiwYMGCb775RkNDg0qlXr16taioSNztmNdER0f7+vpGRUXFxMTMBz/zixcvdu/e7eHhMV6lehKJFBwcLCcnp6ioqKCgkJiYSCKRysvL1dXVbW1tOzo6OPbv6+tzcnKKjY0lk8nCN19SePz4sYqKyp49ex48eCCM4wPd/QtdLFZaWtrLywvJmyEtLT2NfFXcde/ZtyP5sCaoe8/684X06dOnnp6eiYmJHFO8MAwzGIx5GFsoehgMRn5+/pYtWzZs2GBhYTE2NrZ//35XV9cdO3YkJycjMefW1tY9PT0MBsPY2Pj//u//vv766yVLlnz11Vf6+vo0Gi0tLc3Z2Rl4LMRIVFSUr6/vnTt3oqKimpub53xfILp79uzZ8TJdDA0NWVlZffvttwsXLly4cKG1tXVTU1NxcfHOnTsNDQ3r6uo49u/r63N0dIyKihobGxO++aKARqN1dnbW19dPkPo+Jydn3bp127dvv3TpkjBsALr7FwulpCorK9E/KysrpaWlp3QC7rr3LBaLvSgCi488kSwWC4ZhEol09+5dd3d39tSVNBqturo6IiLiypUrc+Y2kFiQSGYMBvPll1/6+/uTyeTff//9yJEjAQEBQ0NDoaGhGhoaO3fuREq1PHr0yNLS0tTUNDo6+vvvvzc1NW1vb9fX19+4cePDhw/n/ONeYomLi7t06dIff/yxa9eu8PDwOZ93qby8XElJydXVdbz1pgMDAyYmJj/99NPmzZuVlJTOnz/f29ubmJgoKyu7Y8eO27dvc3xXBwcH3dzc5pKfuaGhwdbWVk5OLjIycrwBzIMHD/bv329sbCykhCFAd/+Ce5CK6u5UJ3rRuvcsrnQcE9e9R3+HYbijoyMqKsrNza22thb5fvT29iYkJKioqBgYGNy5c2dKJgGmwfDwsJqa2g8//PD48WMajebn57dq1aqXL19CEFRRUWFhYREeHo4EjlKp1N7e3vfv39+4cWPx4sW2trZ37tz57rvv/v3vf+/evbu7u1vcTZmP0On0iIiIvLy8I0eObNmyZevWreXl5XP7HaisrExJScnFxWU83SUSiWfOnImJiWloaGhra/vw4QOTyXz27JmFhYWFhUV5eTnH/qOjo6GhoSkpKXPmRb+6ulpXV/fzzz93dHQcr9hDTU1NbGxscXGxkKpBAN39i6SkJKSqAUI4Dof8OY3AZrTuPTKoZc/PPHEdQPaDDA8PI6vxrK2tGxoaaDQaEqy4Zs0aPT09kHBf2EAQVFNTo6Ojs3Pnzuzs7La2Nj09vQ0bNiCF/2g0Wm9v74cPH9if40i082effbZq1arCwkJlZeVPP/10w4YNQHfFQnd392+//ZaXl+fg4LBlyxYVFZWXL1/Obd1F/Mzj6S4EQenp6R4eHlVVVezZ/KlUal9fX19fH3exPySe/8aNG3NGd6uqqkxNTZcvX+7q6jqerBYWFjo4OHB73QWFsHW3srISUTF2B8+NwkKhnnQ8prN+d3oLedG693a2tsjAF/E2s6aiuyMjI5cvX1ZQUDhy5EhxcXFjY6Ofn9+aNWvWr18fFhY2z8thigAGg3H9+vXVq1evX79eSUnp4cOHhw8fxmAwMTEx432EQqH4+fktXLhw5cqV1dXVtbW1u3fvzszMBPPxYqGtrU1TU/PWrVtPnz7dt2/fxYsXJ0hVPzcYb7xLJpNfvnyZk5NjaGh48eLFCTL7cwBBUF5eXnJy8tzIWYusvw8NDQ0KCgoJCWlvb+e5W0FBgbu7u/AC4IWqu3g8XlpaWlpaOikpiV13Kysr7WxtRT/VMrX1uzNZyItO3LIrqzwGQyAQJtZdMhsjIyOlpaWnTp06dOhQUFCQoaGhgoLC0qVLZWVlY2Njp2QPYBowGIwrV67o6OjIy8tv37799evXlZWVubm5E6Q9gmG4tbUVCWMmk8lIcmAwvysWYBhOTU395ZdfUlNTq6ur9fT0Hjx4MOeLyI6nuxUVFXp6eosWLfryyy89PT35f/hCEHTlyhVPT0/22JfZC4VCycjICA4OJhAIbm5uAQEBb9684bg9P3z4kJ6eHhsbK7zXZaHqbl9fn7KyMs8urqysnF5R+Zkw5fW7k27nCXvD7Gxt0YgqXSyWSCROXPfemw0vLy83NzczM7NDhw7p6+sfPHjQ2tr68uXLp0+fBrorAoaHh+3t7fPz8ysqKl69ekWj0RgMBoVCmVhEkWK9VCoVhmEikaihoaGpqVlcXCwys2cpY2NjdDpdgC8oHz58MDQ03LFjx7Fjx4qKio4cOUIgEOa842E8P3NFRYW6uvrHH3/8r3/9y8rKiv8kGBAE4fF4Z2fnuVHho7a2NjAwEI/Hv3nzxtHREYPB2NnZcaQnampq8vX1PXfunPDMmEB3kbqx01hKgxKOw02wAFVZWZmjzLywEcX6XY669wQCAQmeQsOYJ45n7uXi3r17qqqqiLf59u3bjY2NwcHBQHeFDQzD3d3dWCz24cOHDAZjGglaYRguLCzEYDA7duwIDAwUhpFzAxiGX7165e7uHhcX1y3evSEAACAASURBVNvbKyjppVKpv//+u7y8PBJD5OLi8vz587mquwwGo6enJzc3187ObuXKlWfPnuXwyrS2tlpYWJibm6ekpLx8+ZL/cT8EQVlZWU5OTs+ePROC4SKFyWTm5eX5+Pi8ffu2vr7e0tJyyZIle/fuvXPnDvtyzbq6unPnzt24cUN4lvDUXSKRuFBKikMUpgGHG3VK/xUGQl+/y7PuPVLlHl28y5qs7j0H9fX1xsbGmpqaeXl5ZDK5vb09LCwsLi5uSoYBpgqdTk9NTV21alViYuK0laC3t/fkyZMKCgrcYaIAFAaD4ePjY2ZmpqqqWlpaKihXMAzDERER4eHhLS0tJBIpNTX11atXc9LPDMPws2fPDAwMli9f/v33369YseLcuXMDAwNdXV1PnjxpaWkhk8mXLl367bffCgoKxsbGpvTyAUHQ9evXnZycSkpKhNcE0dDT0xMVFRUaGjo2Nkaj0Z48eeLn53fq1CkbG5vi4mLk3ZrJZN69ezcoKOjt27fCs4Tno14egxFIoiQTE5MJjiMtLS1Zujvz9bszhGdn9PT0+Pn57d69G7Gto6MDh8MB3RU2ZDJZV1d3zZo1v/3227SrkUAQdOPGDQsLi3mV62eqQBAUHx+vrKysoaHx+vVrQdV+GR4etrS0vHPnDoVCoVKp6enp1dXV/McTzSKYTGZcXNyOHTu+++67//znP7/++uv58+cHBgZwONymTZvMzc2TkpLU1dUXL178xx9/TPUlkkqlhoeHy8rKurm5cWezml1UVlaePXs2IyMDuQg0Gm14eLipqSk6OlpPT8/BweH8+fNVVVXI+F6o+ai5H/V4PF4eg0GczDOcgsXj8ePN7yYlJYlY1FiiXL87PXjqblNT08mTJzds2HDlyhUWi9Xe3h4aGirUuQcAi8WiUCh2dnZbt25NSEiYieezubk5NDR0rro3BQIEQRcuXHB0dDQ2Nn779q2ganC9e/fu6NGjxcXFDAaDSqXicLisrKw5WVgTGZLu3Lnzv//9r6ys7O7du1NSUvr7+z08PH766ScsFhsYGLh9+/avvvoqLS1tqgdHohwWL16MlAIUhv2igclkXrlyxdHR8c2bN+zbIQjq7u6OiorCYDBKSkoxMTFXr14NCwsTatVI7ke9na0tOkc5w/ndvr4+eQxGWVn5RmEhqr5IaNEMjzw9RLd+d3rwPEt1dfWBAwe2bt0aERHBYrHa29sDAwORdPwA4UGhUMzNzdPS0kZGRmZynIGBASSXpKAMm3tQqdTAwMCioqIzZ85UVFQIxBXc19cXGBhoYGDw+vVrGIapVKqnp+ccLo3w9OlTpEL73r175eXlbW1ta2pqkpKS1qxZ4+/vn5+fb2xsHBoa2tXVNdUjMxiMW7du7dmz58yZM7P66vX09ERHR0dGRnIvRIYg6Pnz5wYGBhs2bHB1dY2MjIyNjRWIawSG4erqah8uuB/1ulgs6hxGpGcm562srFRWVuZeDTvzyeNpILr1u9OD51n6+/uvX7+emJj46tUrFovV1tbm5+cH4nSEzejoqJWVFcer8TQYHh4+fPgwqOc4HgwGIycnx8TEpLKyMi4u7uLFi4ODgzAMj4yMdHV1ffjwgc/hLwzDFRUVMTExubm5w8PDGRkZ27dv//nnn8+fPz88PNzc3Hzw4ME1a9ZkZ2dPWph21kGlUmNjY0NCQtLT01VUVKSlpZWVlW/evOnl5bV48eLAwMCIiAgcDkckEqfnS3j37p29vX1cXNysni6prKyMiIh48OABT/cVhUJ58eKFs7OztbW1r69vbGysoOY7KBRKDxc8x7voSHTmuouApE1EfkxMTEQ8rYsiuvW704PnWZB1KSMjI8g4oK2tzd/fPygoSAT2zE9gGP7w4UNgYKBAAu5HRkYOHz48c/2evbS1tcXHxz969IhnwqO6ujo9Pb0tW7Y8ePCgoKDg8OHDcXFxRCLRzc1t27Ztjo6OnZ2d/Pj5yWSyh4eHkpLSyZMnW1paUlJS1qxZ8+233yYlJX348CEpKUlWVnbJkiV+fn5zz/eQlZWloKAgJyfn7Oy8bdu2Tz/99JtvvjE2NtbR0ZGRkXF1dT116lRGRsakFXnHY2Bg4OzZs4mJibM3Vw+dTs/Ozg4KCpqg90kkUkZGhq6u7pkzZ/Lz84VqD/ejHk2sxPoz04NQDRAlIlq/O234UXegu8IGSQ+5ZcsWDAbz8OHDGR6NRCKdOnWqoaFBEKbNSoKDg/X09AwMDJ49e8btu6utrdXU1Ny+ffv9+/dTUlJ0dHS2bt1aWFhoYGAgJSW1evXqsrIyfkYedDo9JCTk119/PXXqVFtbW11dnbKysp2dXXNzMwRBr1692r179xdffJGQkDAbU1a1tbUlJSWFhYVVV1dz++Hj4+N//fXXVatWnTp1avPmzf/+978XLVq0du3a3bt3//bbbzt27NDQ0Hj06NG0J84pFEpSUlJWVhaq3EQiEbGnvLx8VsQudHd3JyQknD9/foLvEgzDL1680NXVlZeXT01NFWroO89HPbryZeZRzcg8KUe+KnExue6Kl4VSUtbW1tbW1g4ODllZWTz3QfzMQHeFBwRBRCJx165durq6jY2NMz9aamrqHFj7OG18fHwUFBR0dHSqqqq4n9FkMtnKyiowMPDdu3ePHz/eu3eviopKeXm5n5/fsmXLNDQ03rx5w49gwDB8/fp1VVXVq1evjo2NIRki8Xg8MsgmEol79uxZtGhRUFCQUONlhAGTybx69eq2bdt++OGH2NhY7veGmpoaPT09c3PzrKwsdXX1FStWrFixYvXq1crKykeOHFm9erWGhkZZWdm0wwNhGM7NzU1LS0MLGGdmZiorK8vIyOBwuFmRt/nZs2e+vr53796dYB8Igh4/fnzw4MElS5aYmpoKtVqzUB2oNwoLkXhmJLBZeCfik1mgu11dXV1dXd3d3eO9lYPxrrCBIKixsfH48eOvXr2a+bs8DMOXLl3y8/MTiG2zDiqVevr06RUrVsTExBQVFaWlpXV2drLrKJPJdHR0vHjx4vDwMJlMjo2NvXTpUl1dnY2NjYyMTEpKCv/D05s3b+7YsSM8PLy2tvbFixfbt2+/cuUKMpvb1dV16NChJUuW4HC48QrCSzLPnj3btWvX6tWrr127xu0zaG1ttbOzu3z58sDAgK2trbW1tbGx8bZt22xsbAwMDOTl5Xft2pWfnz+TQPHc3NygoCC0KN69e/d2794tKyt75coViV0SDcMwnU6nUqkkEiktLc3V1bWtrW3ij7x9+9bJyWnbtm3BwcFC9YsIVXcnSEUsFmaB7k66T1tbm6+vL9Bd4QFBUFVVlY2NjUCiSJAswRYWFjM/1KwDhuGSkpLTp09raWkFBwcbGhqqqakhKR3QfZ4+faqurm5jY9Pe3o7sn56e7ujoqKamtm7dumvXrvEfBnXjxo1169YtXbp03bp18vLyK1assLW1RRLfMxiMBw8e2NnZVVRUzAq/KAeDg4PW1tYqKioPHz7kls+WlhYnJ6e8vLyBgYGTJ0/u27dv27ZtCxYs8PLySkxM1NfXd3Nz485CPCVyc3N9fHwqKiqQP2tqag4dOnT8+PEZHlaodHR0xMXFnT59OjIy8uzZswkJCZN2PZ1O7+7ubm5uHhgYENR6Np4IVXfZkxPLYzAizgrJDQ/dFVdpJJ7wr7uBgYES+3Wf1UAQ9Pbt2zNnzoSFhQnkxoNhOCsry9raeuaHmnVQKBRfX98//vjD2dk5PDx8x44d69atCwsLY9ddf39/fX19HR0dZKbw8ePHfn5+2traGzdulJaWjoqK6u/v5+erTqFQAgICli5dumDBgk8//fTjjz/+8ssv1dXV0Yi22tpac3Pzmpqa2XjjkEikc+fO7dq168KFC9z151tbWxMSEp49e5afn6+rqystLf35558vWrQoOTm5t7e3o6Ojt7d3hqPSO3fuhIaGommFysvLtbW1LS0tJbZIEQRBV69e3bt377p163744YdNmzalpKTw80EYhkXwDRGq7hKJRGVl5XAczsTERPSrdbnhrbteXl5eXl6SIMCTdgYMw/X19cePH9fX15/PoTrCA1noqaGhoa+vP8OVuygvX7709vYWyKFmF+Xl5a6urg0NDfn5+ZmZmfr6+itWrAgODkaTMA8NDf3+++8yMjLe3t7v3r2DIAgZlYaFhf3666/Lli1TVFREFgJNei4CgaClpbVo0aJPPvnk//2///e3v/3t73//u46ODjpDX1tbe+zYsYqKitmou729vdHR0RgMZteuXVeuXOG4IOXl5X/88UdDQ0NFRcWJEyd27969cuVKKSmp6Ojo0dFRgQhJW1vb5cuX0XSnmZmZsrKyp06damlpmeGRhQSTybx48aKMjMzXX3/95Zdfrl27NjAwULxT0f39/aWlpU+ePHny5IkIFsgQCASxj3QRxvUzI1PQiADPsNwVEpDGnfqK3c+OLFjiMz8zOwwGo6SkRFNTU0dHJzU1dSZ2AnhCpVJ9fX03btx44sQJQS30RLI0z7pwnhkyOjoaEhJy5cqVkZGRu3fvOjg4aGlpLV26VE5O7tGjR8gkZUZGhqGhoZycHBIMxWKxnj175urqeu7cOUVFxVWrVq1duzY4OHjSGVkYht3c3PT09FavXv3JJ5/87W9/+9vf/vbll19GRUUNDg4i+9TV1R0+fPjFixezUXerqqr09PQWLFggJSVlamr6+vVr9v9euHAhICCgoaGBQqE0NTVdvXpVTU1t5cqVx48fF1SGqf7+/nPnzl2/fh2JBz5//ry0tPTx48cl5MnOTVtbm4+Pj62t7YULF/T09BQVFS9duiTeKYbOzs7r169nZ2dnZ2eLZmGqhDD5/C4iwMjwfBpfKVRu5TEY9gE+sjYL0d2J6xFNfHwmk/nixQstLS0NDY2bN29O1TzApDCZzAcPHigpKQnQITkwMIDE5QrkaLOC2tpaCwsLdXX12tpaJNE8kkdp+fLly5YtQ5ylZDL57NmzW7duPXDgQHl5OeIIbW9v9/f3P3DggIqKiqWl5e+//15dXT3B4xKGYQaDUVxcrK2tra2tvWvXri+++GLBggULFizw8/Pr6OhAJwvq6+u1tbVLS0tno+4+ffr06NGj8vLy0tLSZ8+eZc+TDMNwTEyMu7t7fX0968+shyEhIZqamjgcTlAZlfv6+nx8fC5cuEChUJhMZmpqqoKCgo2NjWR63SgUCh6PP3PmzJMnT8bGxnp6ejo7OwXlvpo2DAZjdHR0ZGRkZGQE6C5vkAVq004agiQKQf+0s7VFx7vs9Xc5hrz8dMbg4OC1a9eioqJm4zJEAQJBUF9f35MnT/hcZ8InTCaztLT06NGjAnRJDQ4OIgokqANKPhEREVpaWioqKkiOpHv37snKyqqpqbm6uh49evTly5dMJrO1tVVXV3flypWBgYF9fX2IHHZ2dhoaGm7atAmDwaSkpISHhzc1NY3Xv8PDw7GxsceOHbOwsCgoKKirqwsMDESG1BgMhqPKfUNDg66u7vPnz2ed7sIwXFxcbGZmdvr0aSsrq/v377O/iCCLiBQVFW/cuIFshyCov7+/tbV1YGBAUEmXXr9+feTIkZ07d966dWtwcBCZrXdycpJA3YVhmEAgWFlZXbhwQWLXOAHdFQoEAgHVbGTojOruBEHe/HQGlUp9/PhxaGgo6kCbnwwPD0dERCgrKxsbGwvwTZbJZBYXF8fHxwvqgcVisYaGhlRVVRMTE+dkMRyepKamysvLGxsbI9mmHj9+vGXLFh8fn+zsbBcXFyR0ubGxUV1dff369ZmZmWis0MWLF1evXr148WIMBpOamnrgwAE3N7fW1lae0kskEg0NDTdv3nzy5Mmmpqb29nZLS0sZGZkvvvhCT0+vsbGRXWKbm5sNDQ1nnZ+5r68vLy/P0NBw5cqVDg4OkZGRNTU17DskJCRs3rxZWlo6MTERvYwCDw4qKCjYsWPHf//73+Tk5J6entjYWDU1NRcXF0nz4gwPDxcVFR0/ftzT07Onp0di+3qCRz37wGxuIDrdDcfhUK8ychH51N3m/6WxsZEjFzmNRnv48KG9vb3ERjSIhv7+/tOnTysoKGhqagrwFQSpeoaUfhIIMAzn5+evXbtWUVExMzNTUIeVcMrLy0+fPl1aWkqj0WAYbmhoUFVVjYmJycvLc3BwaGtrg2H49evXhoaGBQUFvb29qKxev3599erVn332mb6+fkxMzLFjx/bs2UMgEHi+srS3tx86dEhBQQFZ/jswMGBhYbF8+fJPP/0Ui8W+ffuW/bHb3t5uampaXl4usc9ibqhUqp+fn4yMzI8//vjLL7+YmJi4u7tXVlaiTejv74+Njd22bduBAwcePXokvPnLjo4OZ2fnH374QU5O7sSJE0jZWg8PD4ka7zKZzOzs7G3btq1evTokJESoC4FmyHi6SyQSZ14yKCkpaeaBSgJEdLrLPthFfuFTd2O5KPzfQOuRkZHMzMwDBw7k5OTM3nSpM2dsbOzcuXP//e9/TUxMBJWuHYbhgYGBo0ePTqNc2gQQCARZWdlNmzYVFRUJ8LCSTGZm5vnz55H3IRqNdu7cOR0dHTMzs/j4eHt7+9bW1tbWVg8PD3d3966uLnYh7OrqsrCwWLp0qaur6/Xr13V0dDQ1NSsrK3kqColE8vLyio2NRWKhGQxGWVmZh4eHoqKivLx8YmIi+wsZmUwODAysq6ubRbpLJpPNzc2/+OILKSmpffv2paSk2NvbFxYWIv5zMpkcHx+/c+dODAaTkZEh1HoPTCbz5cuXenp6ixcvlpKSMjIyOn36tKenp1CLw0+VsbGxyMhI5B03OTlZ3OZMxHi6i1QDnPl4d4aBSoJFRLrLPrPLUdQIj8ezuxE4rv5CKalBLjiW63V2drq7u69du9bY2JhIJM5b6R0bG4uPj1dVVT116tRUMxDBMEwikV6+fFlVVcVkMul0ek1NTXV1NYVC8fPz2759u76+vgCz55NIpLCwMEtLS4mdbRI4wcHBeDwe+erSaLSoqCgkaUZkZKSzs/PLly+dnZ337NljZmbGUZkOCQuqr6/v6ekZGRlJTk5++vQpu6Iwmczq6urc3Nyamprh4eGgoKCbN2+iF5ZOpxcWFm7ZsmXRokW+vr7snQjDcEJCwuvXrwU4gyBUaDRaVlaWjY1NdnZ2bW1tW1tbZ2eno6Pj5cuXKRQKg8GIjIxcv379smXLMBhMXl6esId3g4ODISEhy5cv/+STT+zs7JCygxKluxAElZSUWFhY4HA4CV8+wFN38Xg8MkEpQD8zGqiUlJQkLgGevu4SiUQ+jUZrFyMXEd2ODm1nEs/MYrF6enpCQkJ++umntWvXWlhYZGZmzp9ZQxQYhnt6eqysrBwdHX/55Rd/f/8p1TNnMBgEAkFfX9/AwKC+vr6kpERVVfXgwYPV1dXW1tYKCgqqqqrTqFQ6gbV37twJCAiYRSOtmcBgMNgz+MMw3NHRcfHixby8vGfPnoWHhxOJRCSS2cDAgDvgFv4T1p83EbvuDg8PW1hYGBkZWVhYvHr1ytPT8+7du+wOj5GRETwejxQ14hglh4SE5OTkSH5AIlLIITIyUkNDA3EbIBdkeHjY0dExPT2dRCINDw+fOHFi8eLFGzduDA0NFUFlXAiC6urqDh069J///CcqKiohIUHSdJfFYuXn5588ebKoqEjC7zWej3pEDgSruyiVlZXIQlk8Hi/iYglT0F08Hi+PwehisXa2tkQisbKykh9RZK/gyxGrzO5SRupOTGP9LovFYjKZg4ODpaWlLi4u+/bts7CwkBw/vshgMpmvXr0yMjIyNjY2NDRUV1evq6vj/+M0Gu3atWu7d+8+cuTIzZs309LS9uzZo6WlVVhYmJSUdOLECYFkZmYH8VLMkzekpqYmJNAJHYFBEIQsHBoYGMjNze3t7U1NTUWq3E98TdLT06Ojo9nHLiMjI2ZmZkiu/+fPn7u6ut65c4ddmBFnxujoKPe41t/fPyUlRfLzMzc0NOjr6y9fvlxRUfH27dtoQz58+ODs7IzoLgRBkZGRSkpKYWFh7e3tohnEUyiUwMDAZcuWxcbGIulQJGp+l8ViXblyxcLC4vnz5+I25P8HhuGurq57XPCsv4v+ItS4qsrKShEPfKegu9LS0qie4fF4PnV3hvB/iqGhodTU1G3bttna2kpsqjbhQaVSi4qKLCws0tLS9u7dO9Vk90wms6KiYtOmTSYmJt3d3SUlJTIyMgcOHGhqanJycrpw4YLAn2K9vb2HDx+WcN+XoKitrTU1NW1paeEec4yMjMTHx799+/bChQvPnj2bdGI+PT09ICDg/fv36BYIggoKCuTk5NasWePs7KyhoREZGcnn+7ufn19cXJzk90JbW9uxY8eWLFmCxWLZA8FGR0fd3d0vX76M6G5KSkpoaKhg19FNDFLk+LvvvvPy8qqtrb17966kjXcLCgri4uIkZ60HDMOtra3Z2dlXr17NycnJyclBfuF+1HPMSHJnXpq9TEF3dbFY9pcCJMxMCCb9D/yfAoKg+vp6b2/v8+fPz8Y87zNkdHT0/PnzV69ebWlpcXd3b2trm9Kjh8lklpeXm5qa2tjY9PX13b9/X19fX0tLq6ysTE9PT1CpBtjp6+vbv3+/UCuLSQ43b95MTEzk6fkfGRmxt7e/du2al5dXS0vLpL2Wnp7u5eXF4fN/+vSpkpLSnj171qxZg8FgtLS0Xrx4wU/+YT8/v8jIyO7u7ik1R/SMjY0FBAQ4ODiUlpayF6un0+mxsbEFBQUjIyO3b9/W0dFxdHScealK/nn//r29vf3SpUvNzc0fPHhw//59idLd/v7+qKio6OhoiYpkptPpo1xM8KgX9nhX9ExtfpcjY7MIEjhPSdrb29sjIiIuXrwoPHskE2Ry19LSsqysbHR0NCMjA8nUw3PP0dHR3NzcqKioly9fouMGGo129erVY8eO/fbbb/X19YmJiR4eHqdPn8bhcN7e3sKoazY8PCwkRRc9EASNjIwMDw8PDQ0NDAwgK4XYd8DhcOPV72toaFBXV1dSUnJ0dOSIZOZJRkaGh4cH+/sKUldRTk5u8+bNUlJSP//888GDB1+9esXPo9bPzy88PJx99Cw8GAzG8PAwu7sbhmEmk8nPvCOJRAoPDz9//jxHcB8Mw0VFRQQCoa2tzdbW9sCBAwcOHBBlkDyS+/PXX38NDAysqam5ffv2eLeeWOjs7PTz84uKipLwyV3WhI/6+aW7SJQTMqGLFlESMVPS3Y6OjqioqPmWpRmG4b6+vvDw8IMHDzY2NpJIpIsXL8bExPDcGRnXbtu2bf/+/WhdPwiCWltbzc3NT548icPhkLzclZWVzs7Oq1atunTpkjDMhiAoIiJC7IUwBUJnZ+epU6e0tbU1NDQ0NDTS0tLY47QhCAoNDb137x77QA0lPT1dX19/5cqVHh4e/DiHr1+/jpRMQLfAMBwVFSUrK/vNN98sXrxYUVGxqKiIzyU0/v7+9vb2dXV1wp4NhWH40aNHhw4dOnXqFLJy6d27d9nZ2WFhYcXFxZOGtXd2dgYFBd2+fZtjtQIMw3l5ebGxsTU1NcHBwfLy8vb29qIc7yIL7VpaWgYGBpqbm2NiYm7duiU5g8vGxsbY2Ni8vDxxGzI5Is5XRSQSkdtNxBFVCLx1t7Kykj0eCo2KEn280pQ64927d4mJiX/88Yfw7BEjSM1qGo3GcVfT6fTS0lIkJOry5cujo6MpKSkeHh48DzI2NpaZmblmzZqtW7caGhoi37mRkRE/Pz9FRcV9+/b5+flZWVkdPXq0pqZGU1Pzxx9/jIuLE9RzhCNnUHR0dGRkpECOLF4qKiq0tbXl5OSkpaXXrVvn4uLCPp3W399vY2ODpGXm/uyrV68Q3b18+TI/q6qQOHB2PzMMw2FhYcga3xUrViQkJPBZKLCnp+fw4cNLliyJi4ubUvT7NGAymefOndu3b5+ysvLDhw/r6+tPnjz5448/fv3118ePH580FqmmpsbCwqKwsJB7CiknJ8fb2/vJkye+vr44HK6pqUn0ZeeRq93S0oLD4fLz88WluxAEvXnzJjQ0NCgoqL6+HoIgAoEQERFRXV0tFnumhMh0t6+vTxeLRasDIMMM0ZwahYfuEolEaWlpXSwWWbGAcKOwUBeLlZaWFvHbwUIpKXNzc3Nzczs7u0nH3D09Penp6QLMrCQ5wDDc39+fmZkZHR394sUL9hubwWBUVFTIy8sfPHgQWdmZmprq5OTE8XEKhVJXV3f16lVLS8t79+5VVVVZW1snJCRQKJSRkRFPT095eXlTU9Nbt25hsVgPDw8ikaiqqorFYj09PQUSdYzkY2J3aUZFRY33fjC7aGlp2bdvH5JsWVdX99mzZ+yPfiRZY2NjI8/HMZVKjYyM3LBhQ1ZWFj+D1MHBwaSkJI64qsjISB8fH2lpaVlZ2crKSj6f+83NzSoqKlJSUsHBwVO6r5GxHXfV2wmAIAiPxysoKKxbt66wsPDJkyd79uz5+OOP//nPf1pZWU2aae7Fixfe3t7Pnj3jblp2drabm1t+fr6NjU1WVpaQRBeJPJ846k3sujs8PBwTE7N9+/YtW7bgcDgajXbjxo2AgACOYk2Sich0NxyHU1ZWlsdg2JM1iT+e2c7W1sTEhOfeJiYm066LMD0WSkl1dXV1dXW9f/9+0pqjJBKptLS0UALKBgsQGo1GJBLv379/+/bt/fv3nzhxwtnZmX2mkE6nP3/+3NjYuLS0dGxsbHh4ODQ0VFVV9eHDh+igh0KhXLt2TUtL69ChQ0iKQeRTZmZmGRkZo6OjaWlp2traFRUV2dnZq1atwmKxPT09N27cSE1NZZ8GnglMJtPKygqtV8pisTIyMuZGFd7R0VFTU9Nr1651d3fb2NhwrLl69uzZuXPnxgsv7+rqOn36tKamJj/V/VgsFoVCBxwbfQAAIABJREFUCQ8PZw+NhiAoPj4+Kipq/fr1W7du5X9+kUKhpKSkGBkZjecD58ng4KCVldXWrVuTkpIGBgb4/BSTyUxISHBzczM0NAwJCSksLNTT0ztx4sTOnTvDwsImDahOSEjw8fHhOSy+evXqyZMnDxw4cPjwYQKBIKSJzOrqant7++Tk5AkcAy0tLWFhYXl5eeLKQzI2NpaQkCArK7t48WIDA4Pnz59fv349Pj5+VkQvikx3dbFYZBg5XpJEEcBDd6WlpccTf2QoLGST/ocpdQaNRistLUXGcMIzSZQwmcy6ujpNTU01NTUVFRVdXd1NmzZFRUWxv9SPjo7Gx8dHR0dTqVQmk0kkEg8cOKCqqhoaGoo+gz58+BAQEHDo0CEsFouOLSgUypMnT6ysrK5fvx4bG5uUlDQ2NhYTE7N7924lJaWenh4KhTI6Oiqo4HA6na6trf306VN0S3Nzs5ubm+QnbZgUEonk6OhYU1PDYDCOHTtWXFzM7iFISkpKTEwc760RWYGqr6//xx9/8HMpyGSylZUV+5AagqDc3Nxbt27t2bPH1tZ2Sg/ZxsbGy5cvd3R08C9XbW1tWlpaS5YscXJyam9v5/NTg4OD3t7eBQUFVVVVZmZme/bs0dHRuX//fnx8fERExKTjXT8/v7CwMJ6pMG7evLl169ZFixYtXbo0PT1dSGsZnj17tn//fnV19WfPno23T0tLS0hICFqRV/QwGIycnBxjY2NfX19fX199ff0tW7YYGhpKbD6D3t7eR48ejbd+V0jY2dqy6y6yIFbEl4iH7k7cfhHPfk/pdBQK5datW7a2tvw/DiQcJpNZU1OzZcuW7du3h4WF1dTUuLq6spcGQjIfoaVGEXe0v7+/rKxsbGws+3j3ypUrOjo6eXl57JJAIpHu3r2L6DQOh6PT6dXV1UiCX4HntqXT6Zqamvfv30et6urqQpL1C/ZEomdwcDAqKgop9mJjY/Po0SM0/AepBYsWsecGCWp78uQJey2ECSCRSMePH3/06BHajzQaDVlP7+DgkJGRMalbiJ3Ozs68vLwprSMaGho6fvz4pk2bJmgUN5WVlZ6enkhRYVtb2x9//HHjxo0EAqGkpMTX15e9sAE379+/d3V1RZMwswNBUGpq6tq1az/77LNVq1YJSfPodHpqaqqZmdnJkydv3rw53ilaW1tDQkKuXbsmLt0dGhoKDw/39/dHQr08PDwwGMyePXsSExPFYs+kdHV13bx5My8vLy8vT2TKUllZqYvFKisrJyUlJSUlSUtLj+ffFR48dFceg5ml49329nZvb29kqDc3hrwwDLe1tZ06dSomJqa3t5dCody7d8/MzAz1y5FIpKysLGdnZ/bRT1NT0759+yoqKtCDDA4OBgQExMfHc6gp8tBXU1PT1dU9fvz40NAQnU4fHBwcGRkRrL9ucHCwvb199+7dWlpat2/fRjZ2dXVt27YN/XP2Ul1d7eDggHRKfn7+zZs30es8NDTk6uo6ccAwBEHcS4/Gg0QiHT169P79+6i0Dw4OOjk5PXjwwMLCIjg4eEpptDs7O3Nzc6eku3Q63dvb293dnaOq4ATAMIzD4UJDQ9va2lgslre399KlS7du3fr06dOenh5PT0+OArrskEikCxcu7Nu3Lzs7mzv1+sjIiIODw5o1axQVFdPT06f0zsE/JBIpNDQ0NDT07NmzE7guxK67yIAbWYCAZO0+c+bMiRMnSkpKxGLPpDAYjLE/EeWIrrKy0sTERBeL1cViw3E40Yc089BdLy8vnvrf19cnlvldPvdEaquZmZlt2bLF3t5+biTcZzKZtbW1yJpaGIYRmTxz5syDBw9YLBYMw8hQ4Nq1a+yf6unpUVVVRYMYKRRKamoqUq2Muy7v6OhoYmIiFou9fPmykGJSIAgKDg4uKCjYsmXLF198ceLECWR7fX39+vXrdXR0Znt+sdLSUisrK0Twbt68GRISgsYzd3R0GBsbv337VlCxNiQSydjY+N69e6gIDQwMWFpa2tnZKSoqImXY+X/p7OzszMnJmdL6XRqN5u7ujsViq6qq+NmfyWTm5OQoKSlFR0cj88HNzc1Xrly5f/8+8p537ty5goKC8aK0Wltbjx8/vnTpUicnJ0S22aHT6Wlpafv370dWIQtpcvfly5ceHh55eXnXrl0LDg7mKPfLbqp4dbesrCwwMBB9kaXRaJ2dna2trbNiECIy3b1RWCiJ9Yj6+vqkpaXlMZikpCQ0njkpKUkeg5lePDN3li/uLXg8ftr5mVGGh4czMzMRL5yklViBYZjBYNDp9Ck9Gmg02pMnT9zc3FC9HBkZuXTpUkhICI1Go9FoL168sLCw4Fiw2NPTs3fvXnS8SyKRQkJC5OTksFgs95MLhuGRkZGuri7hvakwmUxdXV1TU9NFixZ9/PHHBw8eRLZfuHBh69atsrKy2dnZQjq1aCgrK0OceywW6+bNm87OzuhtUl1dHRAQIMB642Qy2cLC4v79++jDtK+v7/jx4z4+Prq6uocOHXr27Bn/8ectLS2+vr5TKgXY29urrq4uKytbWlrK5/76+vpfffUVks2DxWIxmUwymYwO8a9du+bq6jqemHV0dBgZGf3www+enp48p65HR0e7urqGh4eFF0VcVFRkaWl569at27dvOzs7P3r0aDxTw8LCxKi7yJIqdlFBXtbFYsxUEWVcldjTBoy7fldZWVkg63dRcZXHYNBy9xxbZliPCAWCoLdv3yYlJb1582aqdgoVCIKam5s9PT3t7OyQoSqfjIyMpKWlhYaGoncyg8GorKy0sbF58+bNnTt3Dh8+zJ31qbe398CBA6juMhiM58+fb9++/datW6Jf2ogYoKqq+tVXX3300Ucff/yxjo4Osr22tlZZWVlVVVUEpWOEB1JbKTc3F/Et19XVBQUFobqbkpKCw+EEmB2XQqF4eXk9fvwYHe/29fWZm5sTCISysrK6ujoSicS/iDY2Npqbm7948YJ/qWhra0PqqE8QYcQOMiG9cuVKT09PnunJurq6bGxsLl68yNN/+/79ewcHh5CQkMbGRnHlf71165a1tfWdO3fq6+vPnz8/Xo2Bjo4OHA7Hc44ZWXzPYDB6e3vLy8urq6sFvmB6bGwsLi7O19dXLIkgZg7PRz2aRkKASnmjsDApKYl9C1oxT2RMlK/qRmEhUhk3HIebeUpIPB7Pkdga3cJef5djyDvVl6CWlpaoqKibN2/OzFgBgyyx3b9/v7a29pSqTw8NDSUkJFy/fh19kiKRU5GRkcgi3Z07d+7YsYNj/mZwcNDS0hLVXWTG98SJE/yv+hAsDAZj7969//jHP/75z39+9NFHqO7S6XRfX19bW1tJc05MCTqd7uDgkJubiyzu7O3ttbKyQiZ0yWSyo6NjUFCQAB+yEATduXMHKY2MbOnv77e1ta2urkYC2vk8DvKNIhKJx48ff/r06ZR0V1FRUUZGhk/dhSAoKCgoOjq6ubmZp3CSyeRjx47Jycmh9YnZaWpqcnFxuXfvnhi/JPfv309OTm5oaBgeHk5PT3/06BHPN5vxdJdGo927d8/JycnHx+f333/HYDBKSkppaWmT1sCYEuXl5WfPnsXj8bP0buJZjwgZuyPV6gR1IhMTE44hpWB1nR9EVPeexWIh5Yt5bplgKdVCKaknf1JSUlJcXEwgECZYBt7c3BwSEpKVlSWcRkwTZDnQoUOH9u3bx38YEQzDaMoF9u00Go1AIFhbW0dHR2/evNnHx4djfo5MJl+9ehV9KyeTyampqREREeLyOCG6+/e///0f//jHxx9/vG/fPnTYHRYWZmtrK/nJYyeATqefOHHi+vXryGN0YGDg2LFjZWVlNBotMzNTWVlZS0urtbVVUG2EIKioqKioqAhddDQ0NJSSktLZ2TmltUAlJSUDAwP5+fkbN250d3fnf4q3oqJCT09v8+bNfOru8PCwi4vL7du3x/N+E4lEHR2dn376ycDAgNvbfOnSJT8/PzEmPabT6RERETExMf39/WNjY8HBwWlpadwRXiwWq6enJy4uLj8/n0P5ampqjIyM1q1bt337dllZ2UWLFq1cuTI5OVmAuovkV4+JiZlSVJ1oQMokd3d3T/z9nHQdjaAmZQkEwkIpKSTnM/IjLS0tft0Nx+GQQC8OmbSztZ3JIqdwHI6jbeiWiXU3m42srKysrKzHjx9DEDQ0NMTttmptbQ0PD5e0lFVMJrO+vv7YsWMODg78Z/lBCmZZWVlxZBVAx6+urq5ubm79/f0c9zmZTM7JyUlPT0e+6KOjoz4+PvHx8YJqzlRhMBh79uz5/PPPP/vss3/+858yMjLo2qHw8PDTp0/PFt3t6Oggk8kc1tLpdCQFGPIsHhkZsbCwSE5Ozs/PP3jwoLKy8s6dOxsaGgT10gNBUHZ29oULF1B3IpFIzMjImFItv9evX9vb29+5c8fAwGDVqlUbN25EvSOTEhkZqaamtm3bNj7nd7u7u93c3JB7lucOHz58sLKyWrx4sZmZGXdq5eDg4ISEBDHKCVLpD5ksGBsb8/HxSUxM5CmZJBIpPz+fQCBw3I8tLS2WlpbS0tIWFhZ5eXmhoaFGRkbXrl0ToNt8ZGQkMTExLi5OAkuxMRiMBw8eREdHTxxtLsr1q0lJSaiKE4nE8+fPiz9fFbJYiKdj2cTEZNrSyx0IjW6ZWHdHuCCTyUNDQzk5OdHR0RzHHB4evn37dm5urkQ9yhkMRlVVlZGRkaGhIUcFtwkgk8m3bt3y9/fndhwNDAzY29tv2LAhOTmZ+3FGJpPT0tLMzc1v3LhRW1vb09Pj6uqKhLSIBQaDoaKioqKiEhAQ8K9//Wvx4sXoWDwhIcHFxUWiOosnEARdv35dS0vr6NGj7OmoYBju7e11dXV99+4d0oo3b97o6ent3LlTR0fn0qVL0dHR+fn53GHkM7Hk8uXLOBwOTXaRkZGRkJAwJd19+vSphobG/fv3IyIili9frqenx/9zx8vLa//+/YqKinzqLoFAiIyMnCADMwzD1dXVBw8e1NbWLioqYo/v6+josLe3LyoqEqPvlEwmu7u743C4oaGhsbExX1/fpKQknrpLpVIfPHjw/PlzDmt7eno8PDyQOo8UCqWjoyMgICAoKEiAYQ2NjY0RERFXr16VwFupq6vL09Pzt99+Q5arQRBUUVHhysUEykogEARYj6iyspLAhrKysogX6bDGG++OlwkZWfY0jdNwlyxm38I+v8tx9cfrjP7+/pSUFD8/P47tFAoFSQUu+tB5pMReZWVlQ0MDx403NjZWUFBgbm6OxWKbm5v5POCHDx/++OOPtLQ07n8NDg7a2Nhs2LDB3Nyc+w2XRCLFxMQsWbJET0/PwMDg9evXhoaGU8qmK1iYTKaWllZERMTLly9XrVq1YMGCe/fuIf/Kz8/39/cXl2H8w2QyY2JilJWVf/3113v37rG7TMvKyk6cOIHKXnV1taam5ubNmxMSEvr6+j58+EChUAT4NIQgKDMzU11d3cfHp7GxkU6nI+Ul+B8RQhAUExMjJydHIBB6e3u9vLxcXFz4X8oVGBhoZWWlqak5XngRx7liY2MDAwMn/tq/evXq8OHDv/zyi52dHeoLgWG4uLh4gnU7ooFdd+l0ekxMTHp6Ok/dpdFojx49Kisr47j937596+7ufunSJeRrQ6fTs7KytLS0HB0da2trBeIIuX37tpubW3Fx8cwPJXDa2trOnDmjp6eHLhOnUCjdXExcB1CA9iBFETh+RByMxjtP5AQfmMZ4H40WQwotcG+ZRjxzX1/f+fPnfX19ObZTKJQ7d+64uLgIcITBJ8jbrrq6+vHjx2tra9n/NTQ0dPHiRScnJ21tbT4HFshSXWdnZ54zWyMjIzgcTkFBISAggHsoQCKRYmNj//Of/yAl0Kurqx0dHQVS22B6MJlMLBZ77dq13t7erVu3fvLJJx4eHojZLS0tcXFx4jJsSpSUlPz66//H3ndHNZX1XY8FsGDXR0RFZEbE0VEBQUUBURRGBRGpolIUaYL0XkOvIr3XQYr0qiBVUemiFOkC0ntLQpJ78/1xvsnKSyihCOjz7DVrlsbcm5vk5uzza3szCwkJTXE4yM/Pl5GRIfAuCoVKT08PDQ3t6ur6EQV1CIIiIiLu3r3Lw8Pj4+OTnZ0tISHx999/5+bmTlt0nPYMlpaWf/zxR0hIyOjoaG1trZKSko+PT0dHx5wX3N/fr6Oj4+rqKi0tXVxcPOdrFRYW8vHxiYmJVVRUzHLyrq4uPT29Y8eO6evrE0bdMBiMn5+ft7f3ypo0T0xMEHgXhuHU1NR//vln2ommycnJ5OTkzMxM4i8ChuHs7GxjY+M3b96A7RcEQaAGwc3NHRQUtPgfZm9vr5WV1ZMnT+a0dVoRNDQ0KCkpiYuLz95DMNNSv+SmBUArg3hE1s/Pb+V5dxZm7evrmy/vEvsJAnIlfQT/b8ca+fO7M/EuGo3OzMzU0dFZftVfJBKZnJzMwsIiKChIrP6Px+NbW1uVlZWB0yqZsohAMUNVVXXamxWCoL6+vsrKymmVhoaHhxUVFXft2sXCwhIfH5+cnDxtOnrZAHg3MTFxcHCQk5Nz7dq1ysrKgHe7urpUVVWXf5M0X4C18vTp0zo6OlOak/Py8szNzYknhVAo1Pj4+A/6wEGemY2NjZOTMzU1NTY2VlhY+Pz585GRkWR+jDgcztzcnJaWVltbu7Oz8/v372JiYn/++SfQ9Q0JCWlvb5/24sfHx01MTNjZ2VlZWc+ePUtOX5W3tzc7Ozs7O/vsDck4HK6xsVFXVzc9PZ1AWl1dXQYGBrGxsUsuWTovjI2NGRoaErRQ4uPjLSwspi2Ho9FoT09Pf39/4i8Ch8NFRETY29sT//BLSkqkpaVPnTrl5eVF5m5pJvT09Dg5OZ09e/bBgwfE4uerBDgcLiUl5dSpU1JSUgvgXeIJn6WKesvLy6ew7KrQieTl5Z1paigqKoqUGn8oZuHdwMBAUt7FYrGlpaUuLi7Lz7toNDojI4ONjU1XV5d4YgeCoNraWnl5+aysLFlZWTL3pCB6NjMzm6lRAoZhHA43bQKzp6fn3LlzFy9epKen9/f3d3NzmzKvtswAuhmJiYkDAwMXL15ct26dkpISWIW7u7tFRETmpVO4IqisrBQQEKCjozM0NCS+tSAIiomJycjIWNqZkFkAw3Bubu65c+fk5eWbm5u/ffsmLy8vLS396dMnMoezIQiysLDYt2+fiopKe3t7S0uLiIjIn3/+SUNDQ09Pf/z48dDQ0Gl/PmNjYyoqKjw8PMeOHePg4CAn3n358iUXF5eysnJdXd3syXYcDqenpxcRETE+Pj42Npaenq6qqnr69Gk/P78VLJHg8fixsTEDAwNHR0cC7xobG0/73tFoNOh8Jv70JicnnZ2dra2tiW9yFApVUVGhra3t6uq6SG1LIM9+5swZcXHxtLS0xZzqRwCLxSYkJPDy8lpZWc2Xd6d4wP+gluO+vj5iT8DlwTS8C6SiSfunysvLGRkZl7C+TQ5o9u4lbXHE/1vfJeVdGIabm5sDAgKWf/AAiUQmJiays7MbGxsTr8KgTGtkZPTt2zdra2syNT3Gx8fj4+Pt7OwWcCWDg4MyMjIcHBwCAgJ2dnaurq4ZGRkLOM9SAYfDKSsrA0kHBQUFKioqAu/29PRcv3599ftYeHp6Xr16lYGB4cGDB8R6hBgMxtTUlFi18UcDRN4cHBxPnjxpb2/HYrH29vZeXl7k91UB3qWjo1NVVW1vb8dgMFFRUZycnA8ePDhy5MjRo0ejo6OnpToIgnx8fISFhT08PBQVFfX09PLy8mYhRRiGvb29dXV1gR3CnBempqbm5eU1ODj4zz//cHJy7t+//8SJE05OTvOSsVxyAKORf/75B7SMJCQkmJiYzMS7zs7O7u7uxLzb2trq4OAQGRk5JZ+MwWASEhL09fXfvn27mMsbGhp69uzZnTt3goKCVqHfH3j7Dx8+RCAQAQEBs6RkllOvakpxdxYLvh+E6ed3gVgVyIOD/8CsMS8v7/L73gMLnbGxMeL98ky8i8fjm5ubHR0dl9mFF4bhnp6eZ8+eSUtLa2pqEmfGBgYGPDw8XFxc+vv7g4ODyelGwf9rcbMwzwAcDtfe3l5SUvLy5UsrKysJCYkVGX/E4XB1dXUDAwPV1dUWFhYYDAaCID8/v82bNxPzLj8/P6l65WqDu7s7CwsLHx/flStXiE0Ompubb968aWdnt2z5FRQKpa6uzsPDIyIiUlZWBjp9cnNzyQ+4IQiysrISFhZGIBBgpf7+/buhoWF6erq4uLinp2d3d/e0eWbAu8+ePWtsbFRTUzt58iSxHCkpKioq+Pn5+fn5S0pKyOkse/r0KRiTtbOzY2Ji2rp1KyMjY3Bw8Mo6RZaWlpqYmKSnp4PPpKSkxMfHZ9qxDhDvenp6El9wTk6OpaXltOTa1tZmbm7u4uKyGEGbtrY2R0dHDw+PoaGhVaiY8eXLFysrKy8vr8DAQFVV1devX890Jywn78rJyRGozcXZefnlmmfUzQDTxMSbAk0NjeVXIKPZuzciIqKwsNDJyamhoeHdu3dgDgfUdxEIBOkhTU1NVlZWM7VkkwMIgkZHR1tbW4n38mBiuLGxcVrtISAsxc7OfvnyZVVVVcIsBARBDQ0NRkZGZWVlr1+/5ubmFhcXLykpmfMaOjs7FRUVFzz8A8MwGo0uKir6+++/b9y4sfxCjMBJKTo6uqqqSl1dXVdXFzwYGhq6efNmQn23v7//zp07c9qvriyGh4e1tLTCw8NLSkqAyDC4eAwGY2RkxM3NffPmzc+fPy/PqofD4WJiYkRERDQ0NFpbW2EYDgwMBH8g8wwQBIWHh/v7+zs4OIA2ZjQarampGRkZKS0tnZqaSkrhnZ2dbm5uvr6+8vLycXFxw8PDysrKNDQ07Ozss2SbX7x4wc3N/fvvv6emppLz4cTGxr58+bKwsFBRUVFWVjY4OLi8vPyHCi+Tg4KCAl1d3VevXoHL6OjoSElJmfaHScq7wLYhKChoWqFQLBabkpKiqakZFRXV19e3sKb39+/fm5ubE7YFqwooFOrly5fq6urV1dWDg4MpKSmqqqq+vr5VVVXV1dVTboll492oqChiol0Rj4TZ9Kr6+voITV8rZeBAs3evkJDQ3bt3ubm5jY2NHR0dwf56pr4qPB7f2tr67NmzxUhn9PX1eXt737t3z8XFpaGhobGxsbGxsayszMnJSURExM7OjjS31tHRoaWlxcnJefLkSR0dHQLvAjllVVXVhoaG4ODg06dPX758eYp9ECkwGExRUZGWltZivAqAOCUXF5eqquryT1XhcDgzMzNVVdXi4uIDBw4ICAjgiXiXEO/W1tZyc3ObmZn9IAe3xQOCoKSkJD09vY6OjtHRUSsrq69fv4KLx+Fwfn5+HBwc0tLSra2ty7bwjY2NlZSUyMnJGRoafvr0ycvLa14JRgiCYmNjo6OjpaSkgEIkBoNRVVUNDAy8f/9+eno66d3i7+/Pw8Nz5MiRffv2ubi49Pb2Kikp0dPTO8/qoZaRkXHp0qV79+59/vyZnA8nPT3d3t5eXl4egUBUVlZOTEyshgCuoKBAT0/v9evX4C309PSkpqZ+/vyZ9JloNNrV1ZWYd4eGhuzt7YOCgmZKszc0NDx8+JCRkZGQe5gXcDhcWFiYnp7eCup5zYLm5mZra2s7O7vx8XEYhgcGBnx9fYWEhExMTF68eIHBYKqqqiwsLOac311aTJGIyM/PNzc3X56XJmD5dCIXBpq9e8HAnKysbEJCgoWFBZjW7+vr8/f3B/EuFosdGBjo7+8HhwwNDaWmpr548WJh+0cYhhsbGzU1NcXExI4fPy4kJHT79u3bt28LCAhcuXLl9u3b8vLypAWngYEBZ2fnc+fO6ejoeHh4EIh5YmLi9evXDg4O4+Pjzc3N+vr6d+7cmbO1amJiIjY2Vl9ffzFznxgMJj8/n4uLS1RUdPmNIrBY7L179/j4+IqKijZs2HDp0iU8Ee8qKiqCJdXHx4eZmfnSpUur0xphbGwsPDych4fHyclpbGwMg8EEBgYWFBSAWh0Oh3NwcHB1da2vr19mnaAPHz7w8vKysLCoq6uDBivyj4UgKC4uLjw8/ObNm3l5eVgsFmyS/vnnnwcPHkzLu15eXkePHqWkpNyxY4eYmFh1dbWSktLx48dTUlJmGYN58eKFjo4O+f5I4eHhnJycFy9eTE5OXj3Wde/evbOysiooKAA/xt7e3pcvXxYVFZH+Nkl5t7m52cPDY5bkant7u6Ki4rZt2x4+fLiAKaD29nY7OzsfH58VnBKcCRgMJi4uTklJqaKiArx9GIaLi4vv3Llz6dKllJQUkJPr7e2dc353qRAVFeXi7MzOxkYsErladCJXFWj27g0NDU1JSVFSUnr16pWhoSHwAOjt7fX19bWwsMDj8Z2dnf7+/iEhIeAQIFJhamq6gDZIYIqXkZFx+/ZtNTW1iIiIioqKysrKL1++lJWVhYWF3b5928jIiHRRQKFQGRkZd+/ezc/Pt7e3JyROR0ZGYmJivL29IQjC4XDNzc1OTk7BwcGzbORhGO7u7nZwcFikuwMSiQwPD79w4cLVq1eTk5MXc6oFAIvFSkpKcnFxZWdnU1JScnNz4//lXWpqagUFBUBUeXl5XFxcPDw8q1BXFo/H9/T0iIuLc3JyOjg4jI6OYrHY58+fh4eHg/p9S0uLjIzMx48fl3nVg2E4MjKSi4uLgYEBgUDcvXt3Xks2DocDGV0REZH8/HzwRYB2ocuXL798+ZI0yxIdHS0qKnr16lVWVlYnJ6fu7m4VFRVaWtqgoKCZfmUQBIWGhkZHR5NfnFJRUaGhobl58yaZ9eDlQWlpaUZGBiEY7e3tNTU1DQoKIu2km5ycdHNz8/b2BrlxGIY/fPjg7OxcWFg408mRSGRyUS+uAAAgAElEQVRERAQ/P7+Li8ucya3u7u6UlJS8vDyw/gBdETs7u1Voaw9BUHl5uZmZWUREBPGvo76+3sLCwtbWlrQNcBl4Nz8/f1rRjOXvW/o5eDcxMfHu3bs+Pj53794FU4M9PT3e3t6Ad1taWszNzR0cHMAhoBNYWVl5vt0KaDS6tLTUwMDg6dOnOTk5HR0dINMFgMViOzs7vb29LS0tSbNGaDQ6Ly/v0aNHHz9+1NDQIDSbdHZ2IhAIgmEnBoMpLy9XV1evqamZ6TIgCGpsbFRVVV1k7giHw9XX15uamlpZWS0zq2EwmI6ODklJyYMHD4qKis7Cu0gkMiUlRUNDY9nmcOaF0dFRVVVVXl7ehIQENBoNeDc4OBjkzdLT05WUlOYUfF9yQBDk7OwsKip64sQJMTGxS5cuzXI7kQJUiN+/f+/o6FhRUQG+iMzMTF5eXkZGRm9vb9JipJOTk6mpaVFRUX19/cDAABaLffLkyc6dO58/fz6T1VJ/f7+KikpKSgr5nd6ampqHDx8mNQJZWVRUVBQWFhLeZm9vr6amppubG+kdOzk56eXl5e3t/f79+xcvXmRmZrq7uzs7O8+iBQY02E1NTb28vGYP8ZFIpK+vLzs7u4CAQEpKChaLnZycBFbcK9vvPS1QKBSwVW5qaiJ+fHJysre3d2BggLTusGx5Zjk5uVXqv7t6AHg3IiKCmZlZRkaGjY3N398/JyensbHRzs5OT0/v3bt3mpqakpKShJEbFAqVlpb25MmTeW1hgISytLT0hQsXpKWl0Wg06Z0BXOg1NDRIaQyNRhcUFDx9+rSkpERJSYkgKdDU1KSkpEQIR4CcLxionSkzicFgSktLdXV1Fz+2iMVi+/r6pr3LfxwgCIqOjraxsblz5w4FBQU1NTUlJSUPDw8ej4dhOCwsjImJ6cmTJ4SW76qqKm5ubhcXlyWPGiEIysnJsbKyKi8vX1ilEIPB2NraZmZmAq0iGIbfvHnzzz//jI+Pj4+PW1tbx8TErMiOobKyUlVV9fLly4yMjIyMjPPqv5ucnHR3dy8sLHRwcMjMzARhVk5OzuXLl0+dOkUwEsbj8cPDw1VVVdnZ2eLi4uHh4cPDw/C/UFFR2b59u5OT00zWws3NzVZWVmVlZfMyA87JyWlqaloRl+hpAcPw27dvc3JyiHlXS0trWt7FYDA+Pj6WlpYqKipMTExMTEz09PSSkpKze06A7LSuru7sPTRjY2M2Njb79+//66+/vLy8JiYmurq6nj9/HhAQsHpy8gT09PQ8f/7cwsKCdNc1r35m4B20tMO7fX19U6hh+eUNfgLedXNz8/T03LVr1x9//PHnn38qKiry8/ObmZldvXr1+vXrDx8+3LNnDyMjI4F3QT+Rg4PDfHm3rKwM1B4MDAymfQ4Mwy0tLa6urpWVlVPunsnJyZKSEnd399ra2qdPn4IiNAqFys7ONjExIWaUycnJ9+/fa2lpzdTEi0KhXr9+raGhsQobFMkBKBaeOXOGnZ398OHDu3btoqWl5eXlxf/LuxcvXhQWFiasMkFBQSdPnrxy5cqSB+XDw8OysrK3bt0yNDRcmOZRf3//3bt36+vrCd/Fly9ftLW1W1tbfX19xcXFi4qKVsQBZnJyMjs7+/Hjx0ePHqWlpZ1XQbS3t1deXv7Vq1daWlqOjo4gWvr27ZugoOCuXbucnJwIrRIWFhb8/PzHjh07fvz448ePa2trwecAw7CysvK2bdtsbGxm+pWFhIQYGRnNK2eDw+EmJydX1W2PRqPt7e09PT2JeVdbW9vd3X0m3rW2tn78+DEtLe2mTZv27dsnLi4+u2wyDMOZmZk2NjazTxh++fJFXV1dUlJSVlZWXV29vLz8w4cPdnZ2OTk5qycnT0BxcbGOjk5MTAz510bKuw0NDYQHlzAa7uvrk5OTA5574L9p9Sp+KH4C3uXl5T1z5gwVFRUVFRU9PT0/Pz81NTUNDQ01NfXWrVt37dq1bt26AwcO2NragkNgGK6vr3d2dp5X2QPwroaGRlJS0pTcCDH6+/tDQ0NDQ0OnrA4TExNv375NSEhobW1FIBBguGJ4eDg8PNzJyYn4mTAM9/X1ubu7Ozo6ThsqjY+PJycn+/r6kn/xqwpYLFZfX3/z5s3/+c9/TE1Nubm5BQUFb9y4gf+Xd7m5uW/cuEEI0QoLC8+cObN7924hIaGYmJglbGEdHh6+d+/eiRMnjI2NF8a7XV1dDx8+bGtrIywf1dXV4uLiOTk5goKCV65cSUtLWzbFjClAoVA1NTVgTuzhw4ekgxkzobu7W1ZW9tWrV+rq6paWlqByicFgZGRkqKmpubm5wVeDxWKFhIT27NlDRUW1a9cuAQGBT58+EXhXVVV1+/btFhYWpLslGIa/fPkiKiqqq6tLvt3CKsTY2Fhzc/PTp0+dnJwIvNvX16ejozMT7wYHBxsZGWloaBgbG9vZ2d25c8fc3HzOD6GxsdHW1vbly5fT/isMwx0dHXZ2dqamptXV1WVlZZqamsrKypqamnp6eqtQk7m/v9/b29vQ0HBekQ8ps7o4OxO0IUEn1JJcnqaGBjsbGyMjIy8vr6iICC8vr7m5+S9Y3wWJAmIDoqioqClqzKSPEI7dsmXLhg0b1q1bt3btWioqqq1bt65fv37t2rVr/sXatWv3799vY2MDDoFhuKGhwcbGJjExkfyLHB0djY+PNzIyQiKRs6xfKBQqJyfHyMhoSlmrp6fH3d395cuXAwMDcXFxr169Aq71NjY2nz59mnISMFykpKREmh4EY69KSkqZmZnkX/zqARaL/fjx49OnTykoKLZs2eLm5nb9+vWnT5/q6enhiXiXm5vb+d9fERqNNjExoaKi2rJly40bN5awWDU8PCwjI8PCwpKZmbmwqLSqqsrW1pb4u66rqxMXF09PTz937hyQHV7BVlIUCoVAIG7evKmurj7FrWEW9PT0WFpaFhcXa2pqWllZAd6FIEhOTo6amvrkyZNlZWVIJDIwMPDo0aO7d+9WUVFxd3fPzs4mzHrBMKyvr79nzx5ra2vSBWt0dFRbW1tYWPjatWu5ubmrKn4lH62trQYGBqdOndq7d6+lpSXhHkChUMHBwdOqRoMyxP379588eVJcXDwyMtLV1QXK4bO/VldXl52d3bTtlhgMJjc3V0pK6u+//46NjcVgMJOTkzk5OXfu3Nm3b5+UlNS0E00rCAiCiouLDQ0N52tKSMq7QLgJ/JmYgxcJMEcUFRVFGB/6BeeICHTLzsYGPkRS96HZ/YjWr18PiHbdvwCk+9u/WLNmDSnvWlpazmuE9/v3766urnMegsPhKioq1NTUKioqiB/v7OwE1b7R0dGYmBgEAgFkmdXU1EgNd4G4lZOTk5ub25RVCYvFVlZWKikprXIpiZkwMDBw6dIlHh6e9evX7969OyYmRlBQ0NvbGyhBAt7l4uI6e/askpIS4Sh/f/9NmzZRU1NbWFgsoQh+TU2NgoKCmZmZh4fHwqqwycnJpqamxPJDIyMjT58+1dLSMjMzS0lJGRwcXMEsH9ilZWdn19bWkh929/b2vnjxorGxUVtbm8C7Y2NjkpKSmzdvPnHiRFlZWX9/v7KyMgcHBxMTU2pq6vDwMBqNJrxTJBKpoKAwU54ZhULZ29tzcXEJCgoWFxevwizonMBisVFRUaysrOvXr6egoDA3Nyfec7x+/TorK4u0/XhgYMDKyurIkSOPHj2aV4J9YmLC19fX3d2dtBX08+fPjx8/ZmRklJCQICTw2tvb9fX1mZiYREVFs7KyVtUnjMViX79+bWFhMVMgDsNwe3t7Ggmm5V2C/NHS8m5aaiqQZQZ3Ly8v7y+bZ46KigIcTOy2C+iW9BECAO+uW7cOxLXr1q0DfyWmXsC7hDwzHo9va2vz9PSMjY0l89ogCPr06ZO6ujo5c64dHR22trYeHh5THjQ3N4+LixsdHY2MjFRSUkKhULm5uTo6OtO2R4Eqr5KSUlVVFfHj4+PjUVFR8vLyK1I1XDx6e3sBg65du5aBgaGnp+fWrVvh4eGE/GRYWBgnJyc7O/ujR48IR1VXVx88eJCBgeHLly9LuIj4+fmZmJgkJiYubKgMj8fHxsaCyV3wVxiGS0tL7927x8XFFRcXNzIysuJLHgRBaDR6Xsn5np6e+Pj41tZWQ0NDGxsbwLsfPny4ePHiwYMH2dnZy8rKvn37JiMjc/ToUVNTU9LR6i9fvly7do2GhsbR0bG9vb2goCA/Px9EhDAMY7HYN2/eqKqqpqSkLEb4ZUUAwzAEQcBZT0lJiZ+ff8eOHRYWFsS6LsnJyc+fPyddK9ra2nR0dOjp6aWkpKbsy2cHFotNTEy0t7efshrg8fjGxkY5Obk9e/YQt2disdh3794ZGRkFBASstgG8kZGRkJAQS0vLmXa6MAx3dXXlkmDZeBfkVsvLy8EsLxBF/mV5Nz8/H3xwxHIh4M+kjxCOotm7V1ZWVuZfyMrKgk6Zffv2/UaEffv2EeJdPB4/NjYG+k7JzHH19vYGBQU9f/6cnOYUJBKZlZVlbGxMnH7s6OhAIBBJSUljY2PR0dGPHz8eGxtLSEhAIBDT5iFByOvi4uLk5ER8gw4PDwcGBrq4uJBz2asQPT09hLQEIyMjFov19PQkpI5hGA4PD7906RIHBwcx7xYVFR08eJCFhWWm5lj8vws6+VeCw+GkpaUzMjK+ffv2+PHjlpaWaW+GoaGhN2/evH//HohA5eTkgK5d8K+GhoYZGRmEUBKG4YyMjGvXrl27dm0FK7uLRGRkpLOzc1NTk5GREYF3Ozs7Hz58SEdHx8zMXFZWpqqq+tdffx06dAh49E45Q0NDw+3bt/fu3Wtvb//q1avbt2+fOnUqISFhYmIiPT1dTk7uzJkzMjIyVVVVK74vmS96enoQCISkpKSgoGBoaGhMTIyKikp6ejrxvRcXF6evr09qg4hEItPT0w0MDBISEua74SgrKzM1NSUtjdXX1+vp6QEfbuKVBI1G9/f3j4yMrLY0fk1NjaGh4bNnz2a5MBwOhyTBnPXdxUj/TkF+fj6IdF2cnUH4u1RnJhPLx7vAahg/f949QYRTp06dOnWKkZGRmpp6Ft5FoVCZmZmmpqbkDCQAUUY9Pb3y8nJylgkcDvflyxcjIyPiREpnZ6ednV1WVhYSiUxLS1NVVe3s7DQ3N09KSprpnFgs9suXL2ZmZoQKDcjAmJqaTrHvXf2AYXhoaOjLly/d3d0gOUFJScnIyIjH44mXBhiGExISJCQkuLi4Hj58SDjcy8uLgYGBnZ2dOKPb0tKSm5tLSDsnJCS4ubmVlpaSudB8/vz5wYMHnZ2d4+Pj2traJSUl0waFISEhgoKCly9f1tHRuXnz5q1bt2JiYgiEysfH9+bNG+K7aGBgICgoyN/fv7Ozc7UteWTCzc3NwsKisbGRmHdxOFxDQ4OHhwcXF5eenh4zMzMjI+OFCxeysrJIN45g1M3BweHly5cZGRm8vLwHDhyIiYkBlnmnT5/eunXr3bt3l18lbfFoa2uTlJTcuHEjGKkaGBhoaWmZImIaFxenra1N2rYJwzASiRwcHEQikfPdcPT09ABfqSl1ltTUVENDw4KCgtUgmTkngAyIgoICaVPLnJiln5m4sXnxSEtNXSnZYwKWj3cJO5f58i7Fv6CkpNzwL9auXUvMuzQ0NFN4NyMjQ0tLi5yIZGhoKCoqytramszKIsiTeHp6hoeHE35d3d3dvr6+NTU1wAjB0tKysrJSWVm5srJyllONjIxEREQoKysnJSUNDw8DpQsEArH6/WinAIfDBQcHm5iYtLe3U1BQrFu3bsOGDceOHSN95tDQUFVVFT8/v6SkJIHPkpOTjx8/Tk9PT/CzGx4eFhMTk5WVdXBwAF+ioKDgrVu3ZjEkJgZw6fHx8QFVST8/P0dHx2mTGWFhYcBN1tTUlJ+f/88///T29gYZiPHxcUlJSWL3Ify/imYjIyM/xTo4LZ4/f25ubt7Y2GhiYmJra0tQYoIgqKKi4sqVK3R0dBcvXoyLi/v69esUHzACsFhscXHxq1evPn78eOXKlXv37lVXV0MQFBUV9ddff1FRUamqqv6MzcxpaWnCwsJ///03AoGoqakBaecpn0BcXJyuru4sKlQLAA6Hc3Z21tTUJG7smJiY8PDwsLe3J0x2rWbAMPz582czM7OAgIAFNBtOy6wgJ7y087tTKGZFsEy8S9zMTFzNBZ816SME0OzdS9w/RUVFtW/fvkOHDhH3VZHGu2g0Ojs728jIaE7eBd1PRkZGQC+UzLczNjaWkpJiaWlJoOru7u7w8HAQrrW0tMjLyzs5OWlqas6euEahUCkpKefOnZOVlc3Ly2ttbTU3N5eQkPjpAgXgAsvFxfXx48d169ZRUlKeOHGCmZmZ9JkwDGMwGAQCceLECcISMzw8rK+vz83NfenSpbCwMBA98/PzX79+/cmTJ0gkcnJykp2dnZmZWUhIKDs7e85f9dDQkIKCAkGO/8OHDwgEYtqCU3h4uIyMTHp6em9vb3Z2Nh8fX2pqKjj/mzdv1NXVF+PRtjoBBA1aWloiIiL8/f0JmzygxvX777+vX79eRUXl27dvswf0FRUVenp69vb2LCwsJiYmXV1dY2NjkZGRx44d27BhQ2Bg4E9X3AUzQhISEhkZGb29vTOtHmVlZZ6enrMYMS0MKSkpVlZWxIXhuro6W1vbyMjI1SMkMgvQaHRycrK5ufnCekKXTa8qLTV1ilCGpobGL6jPTHhXUVFRwNpoXv3MBHJdu3YtmHM4d+4cSGaCZqu1a9fS0tJaWloSQhAIgurq6may3yIGmAvS0NCY170CBoF0dXVBmy5IuxkYGAAabm5uFhUVVVZWtra2nv08aDQ6KyuLlZX18uXLcXFxycnJV69evXv37k9X3wW8S0tLKyYmtmHDht9//93a2pqTk3PaJ8Mw7O/vf+jQoerqasIjr1+/PnHixLZt265du9bf3z80NCQgIHDy5Mno6GgMBhMbG6usrFxTU5OUlHTv3r2goKDZ13QgPUbIWvf09Ny/f7+hoWEKkXR1dT158uTNmzdA9xGNRqekpKirqwPpx9DQUG1t7ZU1f/0RAPFuW1tbZWVlamoqoSEZg8FYW1uzsLCcOXMmJydnzrW+tLT06tWr9PT01NTUfHx8fn5+kpKSdHR0lJSUVFRUAQEBPx3vfv361d7ePiUlBYVCzbIL7+npCQ4OzsnJWdpCw+fPn42MjIKDg8EGEYPBxMfHOzk5ff369acok4+Pj4eHh1taWi5MP2s5dSJJJZp/Nd5lZ2MjvDdCr7KLs/OUaV3SRwCmxLvbtm27evWqtLQ0JSUlYFzQ4bxz504ZGRliI63m5mY3N7c5TeY7OjqeP3/u6+s7r54dMJtrZ2cH/AYmJyffvXunqqoKeLepqYmPj4+fnz8nJ2fO8/T29oaEhCgpKZmbm+fm5vLw8CgrK8+rGXI1AIvFWltbgxncTZs2aWpq1tTURERETPtkIOvPwMBA4F08Hj8+Pi4nJ0dJSbl9+/agoCBXV1czMzNxcfGYmJi+vj55efn8/HwcDjcxMVFQUKCjo+Pj49PU1NTV1TXtkuTq6uro6EiIV5BIpIGBQUFBAfG3DEFQQkKCmppaT08P4SSDg4OPHj16/fo1CoXy8vJKTU1dVc1Tw8PDi290d3V1BbxbU1OTnp5OyGHCMFxbWxsaGpqUlEROlF9aWnrhwoWtW7dSUlKePXtWTEzs4MGDYDdMQUHBy8ubn5+/Cn1yZsGnT59SU1NbW1tnf9rAwICZmVlgYODS3huVlZUSEhLnz5+PioqamJgYGBhwdHR0dXX9WbYv379/DwwMfPHixcK2I8vGu0B7ktiS6H9+RFNB4N01a9ZQU1MzMjI+ePAAgUBs3bqVjo5OUFBQUVHx6tWrmzdvvnnzJnGjU1NTk4ODQ1ZWFuERUJcNDg52cXGpq6uDIKilpUVNTe327dsLSBkNDw/HxcV5eHiASfa8vDxFRUWCTY2AgAAPDw85avUQBI2OjhYXF0tJSQkICNy9e7e7u/unSCsRAMNwU1PT9evX161bR0FBwcDAEBISgsViZ6mXt7W1cXJyEvMuHo9//fo1AwMDKAxfvHjR2to6ISFBWVlZXV1dT0+P0FU7OTn57ds3W1vbCxcu8PLyJiUlTSm1jo2NPXjwICcnh/A4Dod7/vy5sLAwsJsFD46Ojurq6kZERBBvz2EYBm1xX79+vX//PrFS1Qqira3t1atXDQ0NBgYGhYWFi1zufXx8IiMjBwcHa2trzc3NicMpLBY7Pj6OQqHIWTpLSko4ODhoaWmvX79++/ZtOzs7Dg4Obm5udnb2Y8eOsbGxZWRk/ES8i8ViY2JigoKC2tvbZ39mf3+/np7egofCZ0J8fLyQkNDp06dNTEwGBgYKCgpMTEyAAs8SvsqPQ05OjpKSUlpa2sIOXzbexePxfn5+xK1VUVFRy9xp9dPwLiUlJSsrq5aWlr6+vq2t7YEDBx49elRVVfXlyxcLCwsWFhZJSUniWfWWlhZnZ+eMjAzCIxMTE0lJSby8vOLi4r6+vmg0uqKigpOT8+rVqwvoUAceCVpaWqAOlJeXp6ysPDExAcPw169fb9y4ISAgQH7uuqOj4+HDhxcvXhQQEFjxXrv5AofDRUdHb9u2be3atRs3blRUVJxTc2pgYICXl3cK705MTLi6uu7Zs2f37t3MzMx2dnbZ2dmsrKycnJx5eXnETACa19jY2C5cuKCpqUkcsOLx+A8fPsjKyg4MDBAeHBsbU1BQ4OHhkZeX//79O3i8rKzs8ePHoBWO+DK+f/8uJiYWGRnJzc0NeoUW+fksHllZWeC25+TkTExMXMxyD0GQt7d3UVERGo2ura0VExOb1kqWHIB4l4WFxcbGRlhYmI+P7/z58y9fviwsLAwPD09ISFh+p6bFAI1Ge3h4+Pr6zjkR29/fr6uru+S829zcrKend/HixYCAgNHR0dDQUEtLy1VlzTQtYBiemJjo7Ox88eKFtrZ2fX09+cd+/vzZ0NBQS0tLS0trOXkXTO6CGNfPz28JJ5TIxE/Au0AlY/PmzWJiYu/evQsLC7O3t6enpzcwMBgfH+/s7HR1dRUQEHj06BFxO1JPT09UVFR6ejoGg2lra3v//n1cXJyUlNSRI0eYmZnv3btXU1NTVlZ28eLFe/fuvX37dr4XBkHQ169fNTU1IyIivn//XlBQoKWlhUQiJyYmEhISzp49e+3aNYIl8JwYGhpydnbm5uaWk5P76bpAsVhsQEAA0BTbtGmTqanpnFw1ODh49erVKfkAYG936tQpOjo6RUXFmpoaUCRmYWGZwrt4PB6FQpmZmQkLCysoKKioqLx7966urq6ysnJ0dNTKyioiIoI4Z4BEIg0NDVlZWR89etTb2wvIwMHBwdnZmVRPY3h4WEJC4o8//tixY4e+vv7iXaEWj5SUlAcPHly9epWOjs7Dw2PKWMu80NXVJSUlBcq3tbW1t27d+vDhw8LYsby8nJOTU05OLiws7OzZswcPHjx27FhMTMzIyMjExAQSiVwNWxbyMTQ0ZGJiEhoaOmc6AfCum5vbEmqr4f+ViDc0NIyIiGhsbLS2tvb19V2d/pjE6O7u9vHxERAQ4OXltbe3n1cdBIVC9fT0dHV1dXV1LRvvRkVFARcv4iGaX1CfeTEAc0Tr16/funXrw4cPJyYmWlpanJycwJwDDofr6ury8vISExOTl5cn5t3x8fFXr145ODhUVVVpaWnx8/OLiIgEBQW9evUqNjbWwcFBRUXl4cOHfHx8ycnJC7i5wRwFDw8PJyenurq6mpqahIREZ2cnEKISEhK6efNmdnY2mWfD4XCdnZ15eXnV1dU/nVIVBoNxd3cH40PU1NT29vZzHjI4OHjt2jVS3gXNsRwcHHl5eRgMJjU19fz58yIiIs3NzVO4AYbh/v7+lpaW1tbWvLw8eXl5fn5+MTExCwsLWVnZKS1UQE/RyMjI2NgY5Kvb2trAlCHpOND4+LiioiItLe2uXbuePHmysn1VYLQMzBZzcHD8/vvvmpqapMqj5KO9vd3FxaW+vh5UcxfMuxAEhYSEMDEx8fPzx8XF3bp1a/fu3UePHk1OTl5VFXEygcFgKioqlJWVp+zYpsUP4l08Hj8xMeHi4mJlZRUXF2dubv7mzZvVnzD4/Pmzubm5iIjIvXv3gA/bwrBsvAtksGYZXl0G/By8S0FBsW3bNnl5eRwO19fX5+3traysDJKZSCSyqqrK3d1dQUGBuL6LRCLBCG9ZWZmSkhIHB4eCgkJLSwsajUYikR0dHcHBwTw8PPfv3w8LC1vAxhyHw5WXl/Py8h45coSNje3s2bOSkpIZGRkwDI+Pj5eXlxcUFMyrIQKCoMnJyZ9uKhSG4bq6Oj4+PjBg/Z///IccofZp4108Ht/e3h4bGwtkv/B4/NjYWEZGRkVFxUxLIfCCBWNjly5dEhISOn78uKioKKkZOwRBlZWVgJKB8buVlRVw1Z3yTCDBHRERERoaWlxcvLK19vr6+nv37h05cuT06dMnTpwQFhbW1dVtb29f8HJcWloaEBAAOhAXw7tYLNbBweH48eNnz5599eqVpqYmBwdHcHAwcXr/J0J1dbW+vr6GhkZZWdmcq8GP410IgtLT042NjR88eGBmZkbcKLo6AcNwbm6unp5eenp6Z2fnYrZc5PAuoUt3MTQJfO8JXNvX1/e/vqqpoNm7d8OGDfv37xcQEPjnn3+AiV5AQIC5uTlB8heo0ykoKBDHu2g0+tWrV2pqah8+fFBXV3dzc6uvryeEklgstrS0VFxcXEREJDU1dWEJsYmJiS9fvrx9+zY+Pl5YWPj27dsgXw0UDVekowSM+S/nK+JwuLCwsB07dmzcuHHHjh1CQkLkvHHAu1Pqu3g8HoIgIBpHWLvRaDQ5CQAkEpmQkHcJDEcAACAASURBVMDPz8/ExOTi4jLt7x+49/j7+w8ODurp6WVnZ8/EqaApbGJi4keQLuhmIqc9Cow179u3j5KSctOmTZs3bxYXFwfTawvmtoCAABsbG9A6tBjehWE4Ozv77t275ubmNTU1qqqqfHx8Hz9+/BlJF4bh1NRUe3v7jx8/ksMcP4538Xh8UVGRqKjo8ePHfX19V39X2sTERFBQkKKi4izeqWRiTt7V1NAAvS9g+GXBL5SWmgr8d/Pz80HsBNzBlxM/Ae/S0dGxsrJqaGi8efMGj8ePjIxkZmZGRkYSnjM5OZmVlTWFdzEYTGFhoZGRUVZWloaGRnl5OWnXa1lZ2YcPHxZcwINhGIfDYTCYsbExQMAr2/GPxWJrampmN9n+ES/q4+MDfFtZWVnJTDQNDAxcvXqVVAV+Meju7hYUFKShofH09JxJE/v169c6OjpAtb+jo2NFSKK4uPjs2bNSUlKtra2zX0BwcPDx48d37dq1a9cuKioqCgqKO3fuaGlpzXngLAAikWDuvKamRlBQcMH1XSQSCXzuhoeHlZWV+fn5fzp9UwAYhuPj4z08PMhsaRwdHbW1tQ0ICPgRvFtSUnLv3r1Dhw5ZWlqu5gkiYHNua2t7/fp1XV3dxddH50WlNHv3Lqb/FJR4CQa1y2yKgP8peNfS0jI8PNzIyCg3NxePx0MQND4+TtxaMi3vgtvC0tLSzs4OgUCQJh5BVLpUAQ0Oh1vxzSkSiYyKirK0tFzOF8Visd7e3tTU1CoqKrq6umRWygHvktoPLwatra0XL14UFhZ+8uTJTAvW9+/fHz58eP/+fRsbm5Va1IqKik6ePPn33383NTXNQngoFOr+/fs7duwAbfyMjIyUlJTCwsKqqqotLS0L5l3C8C5+0bxLQGVlJS8v76FDh4KDg0lNFFYc4eHh0dHRs0joYDCYsLCwqKioOWV2ALBYbFJSUmpq6o/oufv06RPgXXt7+9XcVDU0NOTv76+oqJiWltbY2Lj4Atl8eXeRL7ey+Al4Nz09vayszMzMjFiGgnilmJyczMzMfPz48RR5xbq6uvv37/Px8WVkZPxcrZULw8TERHBwsK6u7mJOMt8PCvDuli1bDA0NyfefGRgY4OLiWvCo30znlJeXv379ekRExEx7oIGBAUlJSXZ2di0trZVqmPr48ePJkyevX78eFRXV1tY204JVUVFx4cKFTZs2cXBwpKamysvL79q1S0hIiIuLq6ysbGHL3MjIiKampo2NDejMWirezcvLu3Llyu7du+3t7Ze5L5QcmJmZWVtbz1IrHRkZMTY29vPzI5NHIQhKTEwEyi1Ld5n/H2NjYx8/fkxJSWlsbFzNSfuKigodHR1vb28UCrUkXSnkU2l+fj5BV3hhAOZ4oiIiy68QCfAT8O7w8HB9fb2Xl9dMOUzAuwoKCrW1tcAPBI/HQxAE+o1v3rz5003ELgyAd7W1tRd2OA6Hq62tffHixbyOAnnmEydO5OXlkd+JPT4+LiEhYWFhsYQrCwRBbW1ttbW1s9jiDgwMSEtLs7Gx6enprciAEBKJ9PLyoqen5+HhuXHjRlxc3Ey5yvz8/NOnT2/atImTk/PDhw8+Pj6HDh0SEBD4448/3r59u7Cm96SkpIsXL8bGxoJAqra2dkl4F5hgqqqqrngbGilwOJy+vr65uTmpizABAwMDRkZGgYGBZOaNIQiKjo42NDRccolm/L8C5vP1VF5mTExMABXVOTVGSAHD8Ldv32JJAHhXVESEVMRxyhkWacSblpoKtBFFRURERUQYGRnNzc0Xc8IF4CfgXeCu1dHRMVOAQoh3Kysrq6urU1NTQY9renr6uXPnpKSkltY5ZNViYmIiJCRES0trYYej0ejAwEBJSUkys20AWCw2JCTk+fPn86IxCII8PT21tbWXdkc/Z1sZDoerrKzMysqqr69fkXWtvr7+/PnzmzZtYmVlPXPmTGho6LSf24cPH/z9/S9evHjr1i1nZ+fu7u6EhARGRkaghzyvLQ4BMAwHBwczMzO/evUKsGNtbe3ly5djYmIWmc/E4XCDg4P9/f0rXmohRV1dnYSEhJGR0UzxLgzDhYWFhoaGWVlZZCZ7AO/q6uqSWvD+l6C5udnU1NTCwmIB3ziYACwhAZnxrqiIyCLjKBDmEv5aXl7OyMj4P72q/wPwZUzrxkUABoN5/fr1zZs3AwIC8vPzzczMhoeHMRhMfn7+lStX7t+/v7T9O6sWi4x3gV4PMzMz8TjWnMBisREREaTztbMDhuGgoCAtLa3lz6RhsdgVDCaqqqqOHTtGSUlJT09/9OjRkJCQaXnXwsJCSEjo6dOnpaWlAwMDOBwuMTFRSEgIjOuYmpoCt8R5ITAw8MyZM3R0dDk5OYC229vbb9y4YWtru4Cz/SwoKiq6ceOGgYHBTPFuXl7e7du379y58/79ezLPCUEQ0Gb67+RdkGZ/9OhRQUHBwn6/YGZyCsjhXeK08IKjXtLc8v/md6eCnC8DgqAvX75oaGjY2dllZmZqaGj09fXBMDwyMlJaWvrp06dVuA1fcsAwPDw8HBAQcP/+/YWpG6JQKGdn57179wYEBJB/FBaLjYyMnO/CDXhXTU1tNVewfgSqq6uPHTsGDCT27t3r6+s7bSOSlpYWLS1tZGQkMErC4/EpKSmqqqppaWlmZmYGBgbznexEIpF37tzZuHEjFxcXoQyPwWB0dHQcHR1/Or9n8vH+/Xt+fn4w9Ez6rxgMxsTEZM+ePTIyMsQqs7MDxLs6Ojr/nbw7MDDg6elpbGy8tBaZcy71xBY7ixnhbWhoIE4s9/X1EWxqgZnHwk47L/wKvIvH4zs6Otzc3Ozt7TMzM9XV1YHFCuhY/unkn+YLGIbHxsbS0tIsLCy8vb1ZWVmfPXs233cNw3BHRwcvL++WLVtMTEzIPKShoSEmJubZs2fz9eUGvHvs2LFfeMWfFjU1NX/++ScTE9OFCxd2796toqJSV1c3Jfiur68XFhbesmVLfHw8wbOhoaHh48ePg4ODwcHBJiYm8+XdwcHBS5curVu3Tk5OjthvB4FAuLi4zKmn/ZMCgqD8/HwgjzNt0uvr16/37t1jZmaOioqa1+68vb3d2Nj4B40SLTPGx8fr6+vndGEiABiWP3/+fGmbVVfWB3CZDQF/Ed7t6ury9vZ2dHT8Vb3KZwEWi/348SMbG5uYmJi7u/vevXvV1NTm294CnA3Z2Ng2btwoJCQEZmxmz8disdjQ0NC//vrr2rVr86VPUGvcuXNnUlLSvA782fHp06djx44xMzMLCgry8PCIiIjo6urW1NQQ75OcnJwOHTq0bt26uLg4Au8CJRYYhsPCwkxNTefLu6CBnIKCwtvbm7hPwsrK6tmzZ78q73779k1LS4uGhoaLiys3N5eUJ+Li4lRUVCIjI+e7YmCx2LCwMAMDg590ZJkYFRUVtra2qamp5DwZi8W+efPGyMhoyXUCVtAHcPkNAX8d3vXy8nJ0dMzOzv5v410MBpOZmbl9+/bbt2+7u7sDK+L5CrYB3j1z5gwFBcWRI0e+f/+ORqPd3NwSEhJmOgSLxfr5+W3duvXPP/+c08KFFAUFBfv37zczM5vvgT81LCwsQJhbVVWVkJBw6dKlU6dOTbEY0tXVpaWl3b59e1JSEqmFeHh4+AJ49/v37+fPn6eionrx4gXxa+Xm5oaGhv6qvOvq6nr48OG1a9eeO3fuzZs3pLwbExMDlOwWUO9obW0l00dhNWNiYsLX1/f8+fPPnj0j542MjIz4+/sbGhou4Cc/O1bQB5CAZTME/HV4F8S7/4W8Ozk5+erVK2pqamFhYQ8Pjy1btrCwsMzXsgbwLjs7OwUFxeHDh9va2pBIpImJSVBQ0EyHgAmiLVu2iIuLL0CDoqur6/Tp0/r6+vM98OdFV1eXmJjYli1bwKjo27dvGRkZ9+7dGx0dTUhXjo6OiomJgUR0VlYWKe+GhYWJiYklJSXN6zN//fr1yZMnGRgYUlJSiM/Z3NwcExOzsrzb3t7e19e35J1uMAyDXQ7g3aysrCkvgUQi3dzc4uPjF0acvb29JiYmPj4+q1ndYk60trYaGxv//vvv6urq5Cwa3759s7Ozm0mKdTFYQSmMZSvrEvBL8a6NjU1CQsKTJ0/+C3l327ZtQkJCHh4emzZtoqOjm+8nAHj30qVLrKyshw8fbm1tRSKRpqams/Our6/v1q1bVVVVFzC1icPhzMzM/nt4F4bhqKgoJiYmenr6rKysycnJ3t7e+/fvHzx4MDIyksC7bm5udHR0XFxcRUVFwM55ynmAC9B8W5qDg4PV1NQKCwsJjVoATU1NKioqJSUlKzgtCloTlla8DIZh0MlMRUXFy8srJSVFmFomoLe3V1NTMzIycmHNfX19fWZmZv7+/qR7o1ULDAbT399PLN5XWVmpra3Nysr69OlTcgYI6+rqrKys/Pz8luSG+f79e2JiIvH87jKgvLxcTk5uqbq0FoZfhHe7u7t9fX319PQsLCzu37//38a76enp27Ztu337tpub2+bNmw8cODCvRifQ+52QkCApKamrq8vAwNDS0kJOvOvn57djxw5dXd2FNa+5uLgYGBgs4MCfEWg0Wltbe/fu3Tw8PLW1tRAEjYyMKCkpHT58mJh3LS0t9+zZY2JiMtM3GBIScvjwYV1d3XnV1AMCAoyMjEitnRsbG6Wlpd+/f79SvDs5OWlnZychIVFUVLRU54RhuKKiQkpKatu2bWvWrFFXV1dSUnJzc5uipdXe3u7m5rbgBXdwcNDa2trPz281qygTA4bhz58/29vbx8fHE1LuFRUV2tra58+fV1dXJ4d3q6qq3NzcsrKylmQSYXBwsLy8fF7zu4uHnJwcLy/vipR1CfhFeHdkZCQpKQn46YqJic23vfanxuTkZEpKyubNm8+cOSMhIUFFRTUT74LO5+bmZtIzREVF/fHHH4qKinZ2dvT09CDeNTEx8ff3n+l1Ae/+8ccfL1++XNiP8NmzZzIyMkAr+JdHS0sLOzs7AwNDfHw8YNnJyUl3d/cTJ05ERUUReBeBQOzevfvZs2czJf2CgoIOHTqkra09X941NDSciXcLCwtXinfHxsaePHly/fr1xVi3TkF/f7+xsTEtLe2aNWt+++03HR0dRUVFR0fHKSXJnJwcGxubBWtO4XC40NBQBweHxsbGpbjqHw4cDhceHs7Dw+Pr60v4uj9+/GhtbS0lJUVOvAvDcGJiopqaGjlen+SAeJB3OXl3CssuW1mXgF+EdzEYTHZ2Njs7++7du0VERFahSOwPwuTkZF5enoCAACUl5datW3fu3Ll+/XpaWlrSYURgjGhvb6+hoQFBEAaDAVbB/f39QKlqy5YtT548cXJyArw7Pj6uq6v78OHDmYSosFisv7//8ePHgfvhAhAUFLRv375lNnJYKTQ0NJw4ceLUqVOE6WoYhgsKCoSFhQlMjMfjEQjEnj17nj9/PpM6W2Njo66uro2NzRLGuyvIu729vTIyMry8vOTLVsyJ6upqCQmJmzdvcnNzb926VVdXd1reTUlJsbCwWHBDMugtNzExqaysXIqr/uHo7u42MDA4duyYl5cX+LqBiae2tnZ4eHhISMicaUJQK5GTk1sq3iUG+bwLgtQFv1B5ebmfnx/xI+bm5stsSfSL8C7obj927NimTZtERUX/e/LMKBTqxYsXNDQ0a9asWbNmzbp16ygoKHbs2KGnp9fQ0EAcho6MjGhoaDx48EBMTKylpSU6OhqDwbx9+9bZ2Xl0dNTR0XH37t02NjYpKSnMzMwg3tXR0eHh4ZlpE4NGo21tbf/8888Fy3A2NjbS09Orq6v/N6hnNDY2njhxgpmZ+evXr4QsHwqFys/PLygomJJndnV1nSnexWKx+fn5bm5unZ2dZH5uOBzOxcXFwcEB2CFMuSppael3796tCO/CMJyUlMTMzMzIyPjy5cv5Nih1dXW1tLSQTtBWVla6uLjk5OSEhYX99ddf08a7OBzO1dUVgUAsOFqFYTghIcHOzm5pK9M/Dk1NTY8fP/7jjz8IvIvBYHx8fFRVVdPT0wMDA+dkUxiGo6OjFRQUampqlvzyyFzqGxoaaPbuXaQvgqaGBvBFAP/9r747FeTzbnZ2NhMT08aNG+/cufML694RA9RlQ0NDd+7c+dtvv/32229r167dvn07DQ3N9evXFRUVQdkVhuG+vj4EAiEiIiIsLMzOzm5sbMzJyenp6fny5UsuLq6PHz/eunWLgYEhLy+vpqaGh4eHwLucnJzTfpgwDPf29goKCjIxMS04Q9jZ2cnAwPD06dNfhndHRkba29unrXY3Njb+9ddfrKysxLyLx+MrKyvT0tKAl0NTU5O4uPiOHTs8PDxmsUtqaWlRVlaura0l3/1JQkIiOTmZlNhaWlrk5OQKCwtXRF4Gh8NpaWlt3759x44djo6O80pTodFoR0dHZWVl0kjlw4cPsbGxra2tPT09ysrKzs7OHh4e/v7+xJJVk5OThoaG9vb2i1krvn79amNjk5aW9lPcwA0NDY8fPz516lRISAj4ujEYjLe3t6qqakZGhp2d3Zz+YCgUKi4uztnZ+UeUtMlc6gFlLoZ3zc3Nge3u/3h3RsyXdykoKDg4ON69e/ejL2y+wGKx3d3dSzuwMTY2FhgYqKGhsX37dsC71NTU0tLSMjIy58+fv3r1Kvh1QRDU1NR09uxZDg4OTk7OAwcOXLlyhZaWVkpK6p9//jl8+HBKSsrly5eZmJjKysoaGhp4eXnBHBHg3WlXQxiGu7q6eHl5b968ueCV69fj3aysLH19/WmL6+/evWNkZOTj45uiZV1YWKiqqtrY2IhEIi0sLOjo6H7//ffU1NRZumRbW1ulpaXJd13s6em5fv36q1evSCWZRkZGbGxsysvLV4p3nzx5wsDAQEtLa2NjM6+RUCQSaWBgICwsTJqg9vX1dXV1bW1tRaPRKSkp79+/T0pKUlVVJTYSnZyctLCwIN/7b1p8+/ZNU1MzODj4p7AZbWxsfPr06enTpx0dHUEpF4PBhIaGmpmZZWdnW1lZJSYmzn6G+vp6BALh7e39I36w5Cz1UVFRwMJvMbwrKiKS9n9FQv6XZ56K+fLu2rVrmZiYYmJifvSFzQIMBlNVVRUSEkI84jY8PBwWFjZLm9K8gMPhenp6uru7Hzx4cOXKlS1btgDepaWlfffuXUREBAsLy9mzZ4E/KARBDQ0Nx48fP3PmzPnz53fu3HngwIHt27cLCAiEhITs3bvXzs7u7Nmzt27dGhwcbGpq+vvvv4l5d6Z4F/Du48ePF7zo/Hq8m5KS8vjx42n5w97enoaGxtLSkniKA4/Hf//+/e7du6Wlpc3NzZycnMeOHZOTk/v69essid/W1tb79+9//vyZzE8+PT0dTCiSkisOhzM2No6MjJzvwPfi0dTUFBERISIiEhAQICUl5ejoOK8NHBKJ1NPTExQUnLLJxmKxZmZmFhYW3759A1ZmaDQ6MzNTRkaGOJ4rKirS19fPzMxcDGX29vYiEIiIiIifhXf19PTY2dlNTExA6P/t27fnz5+HhYWVlpZaW1vPKR73+fNnXV1dT0/PH3F5ZPoigP8vhnfTUlOjoqKIH/lfX9VUkM+7OTk5bGxs+/fvZ2JiioyM/NEXNgvQaHRBQYGamhpxNmZgYMDd3d3BwWFJXmJsbOzly5ctLS2ioqKcnJxbtmxZu3btmjVr6Ojompqampub9+/fD9pi8Xg8BEF1dXX79+8/dOjQ+fPnt27dumHDBioqqiNHjsjJyVFQUPznP//Zvn27vLw8BEHDw8MIBKKtrW1gYEBWVnYW3u3s7OTh4VFWVl7wuxgcHLxy5covxrvy8vLT8q6dnd3du3fT09OnBLIjIyMPHjwoLi6uq6u7cOGCo6NjS0vL7PPQ7e3tDx48+PLlC5mfW0BAwNOnT6fU+wEgCNLS0nJ3d1/+0oyTkxMTExMrK+ubN2/Mzc3d3d3n1SmGRCL19fVPnjwZEhJCXOLt7++Xk5MzNjYmlvTKy8uTl5cn8O7w8LCNjY2WltYi+4NAh7C3t/d85cN+HGbxbWtqagoKCnr8+LGpqSng3U+fPiEQiJiYmK9fv7q6us4iTgfw5csXfX19b2/vRV7k5OTkEAnm9N8lGBAtknejoqJERUT+N0c0G8jvZ87LyxMUFLxx4wYDAwOhcWBFgEajc3NzFRQUpvCuq6uroaHhYtRtQAdyX1/f6OhoWFhYc3OziIgIJyfnzp07N2zYQEFBQUdH19zc3NHRsWvXLmpqajMzMxQKBUHQ169ft2/fvnXr1qNHj1JTU69bt27dunUbNmzYs2cPaMWipqZWU1PD4/EoFCowMDA5Ofnz588nTpy4dOnStCwCePfy5cuL4V0cDuft7W1kZPTL8G5qaiop72IwmKGhIT8/v8rKyrGxsSlvdnR0VFZWtri4uLq6WkBAICcnZ06BfhDvks+7/v7+BgYGpM3MeDwegiBNTc3nz58vP++amZnt2bNHQEDg06dPsbGxlpaW1dXV5B8OeHf//v2Ojo5ThCAUFRUjIiKIf2j9/f329vYpKSlgQ1NcXHzv3j1/f//FS01FRERYWVn9iD6jBWBiYqKkpOTTp0/T/uvnz58jIyMdHR1tbGyampqwWGxsbKyhoWFNTQ2wMnN1dZ1dhaqystLKyio+Pn4xFwnGiO1IMOdSP4WMCSZC84WLs/NK2SEQ8Evx7u3bt4WFhXfu3CkvL7+Yss0iMRPv2tra8vPzL8YMGIPBlJSUWFhYtLe3h4aGNjU1CQsLc3FxnTx58uTJkxQUFIcOHSLw7saNG+/fv29tbT00NBQWFrZ582ZKSkrw/7Vr1wLqXb9+/fr167du3Xrjxg1w56FQqGfPnrGwsDx58mT37t2XLl2aKd5tb2/n4uJSUlJa8NvB4/ENDQ1Tevp/ahDzLgzDYNPT1tYWExNjZmbW3t5OmpAk8G5CQgIfH9+HDx/mLLW2t7ffv3+/oqKCnPQmBEGOjo4vXryYdjpzBXnX1NSUlpbWwcFhYGAgPT3dyMhoXjU2Qjnc3t6e+K29ePFCRkbm9evXxDtvCIKsra2dnZ27u7thGM7MzLS1tS0tLV38hi8iIsLCwmKVOHx///7d2NjY0dGR9J9gGE5PT7e3t4+OjjYxMYmJiRkcHHR0dNTT0+vv7x8bG/Pz80MgELOUG7BYbGpqqpWVFfnORTMBjUb3kYD8OaJFxrt9fX1TAtz/6UROBZlfBg6H+/Tpk6ampqys7KFDh6SlpYeHh1cqigK8q6ioSMy7/f39pqamBw4cUFBQWLAf8OTkZHZ2tri4eENDQ1hYWF1d3bVr1+jo6NjZ2Xl5edevX3/w4EEC727YsEFAQICfn7+ysvLChQsgrl2/fj0FBQX4M4F66ejoEhISwFYXiUTa2dlt3Lhx586dVFRUFy5cmNa4FIfDpaWlgbezsPcC0NXVFRoaupgzrCoQ55lBjNXS0hIREaGtrX3nzp2mpibSe3J0dFRGRiY5OVlbW/vChQtFRUVz8m5bW5uoqKi7uzs5AkOjo6NycnIZGRnTNmrBMGxgYODp6bmcvAt2JObm5qampjU1NTgcrq6uDoFAfPz4kfzf7MTERFhYGAcHh4uLC3G8GxwcbG5uTkqECATCysrq+/fvk5OTLi4urq6uS5IcjoyMNDMzmynEXGaUlpYKCQlNq70KzOoRCERcXJyGhoa7u3tjY6O5ufnz589xONz4+Li/v7+RkdEsrW1oNDo8PFxXV/cHqXkvG+/i8fi+vj5CTTc/P3/59R5+Ed7F4/FIJLK+vj4tLU1fX19FRWWWMYwfDVLexeFwNTU1AgICmzZt4uDgWLBn59DQkKmpKR8fX0NDQ2BgYGpq6uHDhzdv3szKynrjxo3jx4/T09O3tLQA3qWgoGBhYWFjYyspKTl69Oiaf7F27dqNGzeys7Nv2bIFUO+hQ4cI2z0kEmlvb0+gZBoaGhcXF9JyIwqFEhcX37JlyyKLPUBY+5fJMycmJhL6qkDD1OfPnx0cHBQUFG7cuNHY2Ej6TtFotLGx8YMHDw4cOMDCwlJaWjon73Z0dNy5c0dAQKCoqGhOZeza2toHDx68f/9+ptMmJiYmJSWRQ+FLhW/fvmloaFy4cCE9PR1cVVdXl5qaWnx8PBKJJPNmaG1tdXR0ZGNje/bsGYF3IQjy8/ObVkMqMDDQ09Ozvb0diUSCCaIlcdT59OmTsbFxQkLCCha2CCgsLOTj49PS0iL9rsfHxwMCAhAIRGlpKQKBsLS0TE9PNzAwyMjIwOPxOBwuNTVVS0trlll8NBodEhKiqalJOgW+JFg2vaqGhgZGRkZCbhnINS/PSxPw6/AuHo/H4XDDw8OJiYlaWlo/iHfBLCzQl5/pOaR5ZiwWW1JSws7OTkVFxcbGtjDehSCoqqqKlZX18uXLdXV1Dg4ODg4Oe/bs2bJli5SUlKioqJGRETs7O4F316xZQ01NfejQIcC7vxFh+/bttra2PDw8IPClp6cn5l0HBwdqauoNGzZs2LBh+/btPDw8o6OjUy4GiUSePXt227Zti8ywdXV1SUlJ/Rrz1lgs1tnZWVZWFizoHz9+/Pvvvz99+mRra/v48eM7d+5MmSACgGE4IiKCiYlpx44dOjo6IBE6+wtNTk6amppeuHAhJSVlzgplZmbm06dPv379OtNpCwsL37x5M6XL+scBh8Pl5uaeP3+enp4+MzMTPDgwMKCrq3v16tXo6GjSm21aFBcXKykpHTt2zMXFZXBwsLW1taKioqqqSkVFJSwsjDS4LysrCwwMrKqqGhsb09bWtrW1XRLebWtrMzU1DQsLW3ASawkREBCwf/9+sCGb8k89PT1OTk4gq+/p6fn48WM9PT1FRUWCsF1ubq6uru7/Y+/M46H6/j/+KdllixASkRZKC4kWVKIS2ddCO1GDskdSdt09BAAAIABJREFUSLSgpIX4yCilFNpLkVSWSmVN2fd9DLP+/ji/z33Md4Yx1qjzfPT4PHyu694z5945r/N+n/d5vx8/fjzQxbFY7I0bN4aaGJxxxk13nVAokKIZGfSMDA3hPqL/YagPA4vFPnr0aOx0F4/Hv3//3sjIKDY2dqAlZFp7F4fDZWdnL126lIWFZUi629HR8fz5c3AdPB6fk5MjJia2du3az58/o1Aoa2trAQEBQUHBsLAwsBnX1NT058+fQHf/+eefadOmiYqKZmRkyMjIIKI7ZcqUGTNmxMXFOTs7s7Ozs7CwSEtLI/NcHA6XmpqKQqGEhYXnzJmzcePGFStW0HYmBoNZvny5oKBgRUXFMLoRob6+fvPmzf26sicdnZ2dZmZm5ubmYBoRGRm5YsWK3NxcoLvh4eEDadvt27fnzp27fft2xvfRnjlzRkZG5uTJk4OmIk9NTT18+DCdbRLv3r2LjIwct0fw7ds3CwsLLS2to0ePFhUVgYN4PL6srMzR0TEoKKi6unrQi9TX1wcFBWlpacnKygLdTUpKOnXq1L1793bs2JGYmEg7ycjLy/Px8Xn69GliYqKOjs7ly5cZFHj61NbWHj9+/MaNGxNBd8PCwgQFBdeuXUu7E7e+vj4kJCQ0NBSDwaSlpVlZWWlqanp5eSHvDyh48OjRo4EujsVinz59ikajx6je8LjprpGhYUZGBvgvOALXd6kZ6sPA4XBv37718PCgTVA8VIhEYm9vL9UXGI/Hv3nzZtGiRTo6Ov0GiJL7092Ojo7w8HA+Pj5mZmZFRUUGs72QSKSKiordu3fX1NT09fXl5eXFxMQICgrOmTPnypUr9vb2urq6fHx8M2fOvHLlipWV1aNHj9LS0rq7u2tqagQEBP755x8mJiZ2dnZFRUUuLi5K3eXn579z505sbOz06dPZ2Ng2bdqExFOAkOmPHz9KSkqqqKiYm5svX768X3tXSUlp+/btIxy86uvrtbS0/ozSCB0dHXp6eqampsCQCg0NlZeXf/v2bUBAgJWVVUJCwkDP/c6dO3JycoyIKEJoaKi4uDgj1RHS09N9fHzoTI+ys7NNTU3Hbb6fnZ29Zs0aZ2fnoqIiSic5gUC4ffs2g1HNjx49UlVVXbRoEaK7//77r6am5rZt2w4fPtxvyuX8/HwPD4/bt2+7uroaGBi8evVqVDbd9vb2JiYmMuJ4GAcuXLggKCi4evXqO3fuUP3qy5cvYWFhoI5QaWnpvn37FixYcOXKFaQTmpub4+Pjb968OVC31NbWRkVFjV2SkHHTXV9fX7CVCGgtGo0WFhKC+3f/h6E+DBKJVFxc7OvrO/Jg98rKShAzTHkcBE7PmzdPTU2NtrAPoLe398WLF3Z2dsg4W1FRoaGhwc7OPn369EWLFjGYip1EIpWVlRkZGVVWVra1tQUGBtrY2AgKCoJMF1ZWVoKCgszMzIKCgjExMYcOHfrw4QMWiyWRSM3NzVu2bOHn5wfLtCwsLNOmTUNimJmYmAQFBZOTkxMTE3l5eWfNmhUcHEw5vQD7fcGs2cbGhlZ3QRogKSmpAwcOjHCaX19fv3Hjxj9Dd9vb23V1dfX19RMSEpqbm8+cOSMqKurv7+/t7T1//vywsLCB5ijJycnKysp37txhfOx+9OiRrKysk5MTfd0lkUiPHz9+/PgxnThVkCX0w4cPnZ2d4P1hsA3D4+3bt6qqql5eXrThOampqSdOnADpjtvb21++fDlQ6Oz9+/cVFBSWLVu2ePHic+fOtba2xsXFycnJcXNzHzhwoLi4mPZPPn365OnpmZiYGB8fn5qaOlp+dSKRGBMTc/78+d/7Dn/58uXSpUuGhobz58/X09O7ffs21Qn37993cnLKzs4mk8lVVVUODg66urqUmaXb29tDQ0O9vb0Hihj48ePHmTNnLl++PNl1t6mpycjQUElRETicR57teRj8abpLJpPLysqOHz8+wtQZRCLxy5cvR44coSo2gsPhMjIyZGVl1dXV+9VdkEnq4cOH+/fvR5Yti4uLZWRkBAUFNTU1JSQkrl69ykgbgO4aGBj8+vWrtbXV3d195cqVwMA9deqUmZnZ1KlT//nnH0FBwfv37//8+ROR+b6+vqysrAsXLrCwsDBRMHXq1GnTpvHx8ZmZmX358iUxMVFQUNDU1JRqeRUo99WrV2tqavbs2bNixQpKwSCRSC0tLWZmZjNnzvT19R1hfsGJoLujNY60tbXp6uouXrxYVVX1w4cPQUFBM2fOVFFRsba2FhUVvXTp0kALE8nJyRs2bHj27BnjHryamholJSVnZ2dEd9va2p48edLY2EgpnL29vSdOnHjy5AmdpY13795t27YtKSnJ3t4+Li5urBNXvX37Vltb+9KlS7SLF+np6f7+/mBf8suXLy0sLB49etTvPCA5OXnZsmV79+7dsmXLuXPnysvLPT09hYSEFBUVk5KS+u3n6urqS5cuXbt2LSoq6uPHj6P10EkkEogEHtLm41Hn2rVrIPu3m5ubn5/fmTNnqJwrycnJrq6uIO66p6fn+fPnd+7coXzW7e3tQUFBrq6ufX19OByutbWVappYVlYWFBREaSKPnMrKSjQaHRcXFxcXN6a6m5eXl5GRgTiTm5qaoqKiQNKMcfYwA6Du9g8oJr969erc3FzK452dnSC3Yr/2LrCSvb29fXx8TExMrl27Bo4XFRVJSUmJi4vv27dPXFycwURrwCMERuSWlpYjR44ICgpycHDMnDnz5MmTZmZmwG8sKCiYmppKmaeGRCL19fWVlZWxsbEBuQWKy8zMzMvLa2dnl5ub293dnZCQICgoaGdnRzvDJRKJXV1dGAzGxcVFWVmZSnebmpq2bdu2efPm6urqEZpHv11329rakpKSRmXXWXt7u56eHi8vr6CgYFZW1unTp2fOnDlv3jxjY+Nly5ZlZWUNZEm8ePHi+PHjlZWVQ9pFg0Khjhw5gqyGlpWV7d+//9OnT5TDYltb2759+9LS0uhY0kB3g4KClJSUAgMDB91TAWaWw3arvn371tzcvN8EjS9evAgODv769SsobbtmzZp79+4hfdLQ0JCenv7jxw88Hn/69GkFBYWAgAAHB4crV64kJCSYmZlt3bo1MTFxoEfZ1dV14cKFPXv2oFCot2/fjqJZ/+TJEwsLi5s3b47WBYdKb29veHi4iYnJ5cuX8/Pzw8LCXFxcKNcsuru7o6Ojz58/D54a2MeFwWAoH0F7e/vp06fd3Nz6+vrevn1raWnp6uoKtlrhcDiQg+/IkSNpaWmj2PLOzs6ioqJv3759+/ZtTHXXyNBw/Bdx6fBn6u6xY8euX78+kvv29vYmJycvXLjw5cuXlMebm5tPnDjBzs7er70LlHLbtm2ysrIrVqxwd3cHx0tKSsCa1pEjR8TExMLCwhhpA/CZKyoqnjt3rq6uztnZmY2NjYWFRUhIKCAgANFdISEhsBmAiq6urhMnTqirq4P6gGxsbOzs7AICAiBrT19fX0JCgpCQ0MGDBwfSAzwen5aWtnHjxn5119TUdOQz35aWFn19/THSXRwON+g2m4qKCisrK/qaRyKRaPNM0dLR0eHu7j537lwBAYHMzMygoCABAQFpaWkTE5MNGzYUFhYOtNWko6OjtrZ20KZSNendu3c2NjaIT7WkpMTKyiovL4/yoWRnZ+/bt+/Dhw903BLZ2dk6Ojr+/v4KCgonTpzoN7Yci8Uija+trXV3d6ezMYk+b968sbe377fabllZ2e3bt8vKykBpZxUVFUrdzcvLQ6FQr169wmAwrq6uvr6+JSUld+/ejYyMBFWl09PT6TwmDAbj5eUlKSm5b98+JJ5rVCgpKTlw4ACDTqyxoKioyNPTMzw8vLOzs6+vLywszM7ODtmdTCAQsrOz9+/fT3/Y6e3tvXPnTmRkZGdn582bNxUVFU1NTd+/f08mk3NycqKiokJCQuzs7Ea36CGJRML/x1jrLlUthN/LH6i7IGrA1tZ2JEs4vb29d+/e5ePjQ/2XFBTQ2Nh47NgxVlbWdevWUS39kslkUNFWRkaGnZ1dQkLC3t6eTCZjsdjU1NRNmzalp6f7+vqKiIgMSXcXLly4cePGCxcuHD58GCS+mDlzZkBAgKWlJTMzMzs7+9q1a/tNU0cikWpqag4fPjxlyhSwE1dAQGDmzJlgJkEgED58+KCgoGBvbz/QiE8gEN6+faulpUWru7q6uqampox8CvoQCISrV68OtFI+QkJCQp48eUJfz8rKyvT09EAO/YHOqa2tRaFQ9+7dKygooHO1jo6OyMhIRUVFPj6+iIiIkydPzp07V1ZW1tjY2M/Pj44dSSKRhmF+FRcXm5qaIu7NfnX38ePHTk5OJSUldK4D7N2TJ08qKCj4+fnR6m5NTY2rq2tubi5oZEVFxY4dO548eTIM3X348OGhQ4euX7/e7x6eqqoqPz+//fv3P3nyJCwsjFJ3iURiQkKCvr4+8Jm7urpGRUW1tbW9fv3aw8PDxMQkJCSE/uwNi8WePHlyzpw5Xl5eo7sTpq+vLyoqCo1G/5aQZjA5dnBwQKoaxMbGmpqaInu0fv365eHhYWtrSz90jkQiZWZmRkZG5ufnR0RE6Ojo2Nra7tixIzAw8MCBA4sWLVq2bJm7u/uoBIH3y1jrLh1jl/5vx4I/UHd//Phx8OBBU1PTkWQhAbrLxcVlY2ODHMTj8SUlJV5eXszMzHPnzgWb0Cn/qru7Oy4ujpOTk5WVVVRUFORQbG1tPXPmjJqa2qtXr44fPy4iIsK4n7m4uFhKSkpYWBiFQqFQKDY2NhEREVlZWW9vbwsLCxYWlunTp1taWra0tPR7hc7OziNHjkydOpWLi0tXV1dBQUFaWvrVq1fk/xIsa2trHzt2bKABFMyUN23a1NHR0dfXl52dDeyJxsZGHR2dUdFdMpmcmJg48sxz/bJhwwYUCtXV1dXT03Pr1q3m5mZaeWNEd3/8+LF582Y7O7sbN27QiUVvbW29evWqsrIyJyfnrl27XF1d161bJycnt3379sjIyFHf2FZSUmJiYoLobnFxsaWlZW5uLqXupqenOzs70y/tXlNT4+Licvbs2YHs3fLycmNjY0RoQTWOBw8eDENmTp06paCgEBYW1u8bW11dvXfvXklJyWPHjnl6eq5cuRLRXSwWGxwcvGHDBkR3r1271tHRUVNT4+bmJi8vf+XKFfrbBEgk0r1791RUVHx9fUd9v/jVq1dPnTo1RtNH+mAwmMuXL/v7+yNxaoWFhYcOHTpz5gx4Xg8fPrSxsbl58yadypKAt2/fOjs7Ozg42NnZBQYGHj16VEBAYNasWbNnz960adP+/fujo6PHLuyO8aEe1E4YUjCUkaEhyHJF+w+U44W6+z8MQ3e7uroSEhJsbGwY35VBC6K71tbW4AiBQCgsLDxw4IC1tTUTExMrK+uCBQuocgtXVVVZWlqC+GE+Pj4QrlJRUeHv77927dqXL18eP35cQEDAwcGB/uy4t7f358+fWCwW6C4fH5+tre3BgwcFBQW9vb1dXFw0NTV1dHT4+PiEhYWtra0HioVBdJePj+/kyZPPnj2LjIwEviMymdzT0/PkyRM6kgN0V1tbu6Ojo6ury8HBISAggEgkNjQ0bN26dbR0NyYmJj4+flQuRcWqVassLCza29tbW1u3bdvWb58zorsVFRXq6upSUlLh4eH0dTc6OtrIyIiXl1dcXFxRUTEmJkZZWZnBLFRDhUp3S0pKNDQ0Ll++TPkyMKK7BALhwoULly5dWrp06UC6u2nTpoMHD4KNcxUVFevWrQsMDBzG98vHx0dYWNjf37/fOXF1dbWtrS0PD4+5ubment7y5cvt7e1BmBUWiw0KClq/fn1qamp8fDwQfhwO197e7ujoKC8vn5iYOOg84MOHD/b29levXh31JCFRUVEeHh6/JbSqtbX13LlzISEhSOhcU1PTqVOnAgMDwTrLjRs3HBwc8vPzB71UaWmpnZ2dlJTU0aNHy8vLv337dufOHQcHB21t7ZcvXzY2No5pEkBGhvrS0lJhISGn//VBMgJY36WsdY/827BhA9Rdaoahuz09Pffv37eyshqJFQV0l5OT08LCAgQjEAiE3Nzc7du36+rqsrCwsLCwiIqKUnqMgXmqqanJwsICPMCSkpL6+vpfv35FdNfPz4+Hh0dTU3Pnzp0DhZgSicRfv375+Pi8f//e09OTl5eXg4NjxYoV5ubmwsLCly5dSktLW79+/ZYtW5YvX66oqGhjYzPQ9wHo7pQpU/j4+M6dO4fFYqurq5GBlUQi9fb20lmjpdTd7u7u48ePr1+/3snJ6eLFi6tWrXJ1dR1291ISERFx+PDhIa1uMoiysjKiu6tXr/b19aWNBiorK9u+fTul7ra2tlItxAKl4eLiOnv2LJ16G/n5+cePH3/w4IGSkhI3N/fcuXPBBiEZGZnCwsJR331Bq7sKCgpqamqUu2jS09NdXFxoF0SoOHHihIWFhbS0tL+/P60HuLy8fOPGjTt37gT6XVhYqKys3K9HelB8fX2FhIQGWkUGujt9+nRTU1MdHR17e3sDA4MHDx7g8Xjg3JaXlw8ICNDV1V2zZs3Lly9JJFJHR8fBgwf19fWzs7MHNcUwGMzPnz+bmppGPafjlStXwEa+0b0sLUQiEbxIRCKRQCB0dHTk5ub6+/vHxMQgE7uurq6IiIjAwMDOzs7a2tqAgIDTp08PauySyeTOzs6oqCgHB4cvX74QCAQ8Ho/BYD59+vT06dOR2DAMwshQr6SoSFU6l0Hoe5Jh3gxqhqG7BAIhJydn3759tElbGAfoLgsLy6pVq0AMCFgQVVFRkZSU1NHR0dHRmTVrFqXuNjY2+vr6ioqKLlq0aPbs2dOmTWNlZV2yZElhYeHJkyfV1NQyMzOvX78uISHBzc29Zs2agSwnIpFYUlKye/fuhw8fqqmpgQ240tLSRkZG8vLyHz9+zM7OlpOTk5KSUlFRUVVVtba2HmjRBYPBhIeHy8jIyMvLX7hwAXwKxgUA6K6WllZHRwe41PLly3l4eERERIyMjEar5mhERMTixYvHIukrpe6uWrXK09OTdq6D7NRCRm03N7eCggJK87SiomLNmjWsrKyampq1tbUDje9paWl2dnaFhYVbtmzh5OSUlJQE6VN27txZU1Mz6g664uJiY2NjSj/zkiVL5OXlkcyd3d3diYmJjGSAcnV1FRMTs7a27nfltaysbMOGDTY2NkB3AwMDpaSkTp48OVTdBf7hrVu3pqam9hsOTaW7Z86c2bFjx7179/B4fH5+vr6+vpiYmIaGhpSUlKqq6uvXr0FZew8PD2tra6p9B/1CIpHolKcdCVlZWYcPH2bE5h4Jra2td+/eTU5Orqmpef78eXh4+P79+y0tLZ2dnePj45HJBJFIfPjwIQqFevbs2du3b48dO/aQsZAiEonU2dnZ3NxM+fKDYOYx2rNLyaBDPRqNVlJUBE7moRYBpK+7eXl541wa4Q/UXRKJ9O3bNzc3t5FE9oN4ZhYWFgUFhXv37lVUVNTW1kZGRs6aNUtMTOzo0aNHjx5F7F08Hv/9+/fjx49v376dn59fTU1t0aJF06ZNY2JikpOTKygouHDhwrFjx5qbm8vKynbs2MHGxqaiokJHd4uLi21sbFJSUlatWjV16lQWFhYpKSkjIyNVVdWGhoa3b9+KiYlxcXENqrvAdD569Ki7u/swEnhR6W5ERMTSpUtBaLSlpeVopYu7dOmStLT0WIQ0Kysra2tr19bWtrS0qKioDKS7VPbu1q1btbW1KSOcgb3LysoqLi5eUVEx0MCdnJy8b9++8vJyGxsbbm7upUuXfvr0KSgoKCAgYCyqDhQXF5uYmHz+/JlEIlVXV7u6ugoJCcnJyRUWFuJwOBCwZmdnd//+/UFjYY4ePSovL+/v73/8+PHi4mLKD0gikdLT0xcvXrxjx46ioiI8Hu/l5aWsrDwkby0Wi+3t7c3LyzM3N79582ZnZ2e/fVhdXW1jY8PDw6Ompqaurn7+/Hlra+vk5GQ8Hv/x40crK6vdu3ebmpqKiIioqKgA3SUSidevX3dycmJEd8eO7u7u0NDQs2fPjkrO54H49euXg4ODsrKytbW1urr67NmzBQQElixZYmtrm5ycTBVPd/DgwTt37qDRaB8fn9GN3x45PT09tTQMOtQ7oVBOKBSQz2Gs79ra2o5/3aGB+DN1FwTWj2TVsL29PTIycsaMGSBHsampaWxsrLq6OgiY8vT09Pb2RuxdUJ5PUVFRRkaGj49PQ0NDXl4elLaVkJAICwuLj48vLS0FK6OOjo5sbGyrVq0ayGMJ7F1bW9vU1FQjIyMZGRlmZmYw01+9enVjY2NWVpaoqCgQb/q6SyaTu7q6goODIyIihuHIRfzM7e3tYAOVgoLCtGnTWFhYRlF3IyMjx0h3V65cOXPmzPfv3zc3Nw9k75aWlq5fv54ySkhTU5OHhyc+Pr6pqQmJ4F2zZg0LC4uwsHC/tQ3IZDIej3dxcbGxsamvr79z546kpOSBAwcaGxvT09PfvHnDiJdvqBQXF+vr60dHR3d0dHz+/HndunVsbGyLFi0qLCxMSkr6+PGjpaWltLR0UlLSoHttjx49qqGhcenSpcOHDxcUFFCO4CQS6fr161JSUlZWVlFRUSkpKQcOHNDQ0IiNjWUwwwaJRIqLi7t7966vr6++vv7r168HMp6A7srJyc2bN09OTu78+fM2NjbA3k1LSzMxMfHz89PS0pKRkbG3t0cM/cTERBBuzVi3jQkkEuny5ctBQUFjmub658+fBw4cEBERERYWFhISEhQUFBcXnz9/voWFBVUhQqC7cXFxoaGhJ0+e/I3FyKkgkUgEAuHr169naQBDPTBnqf6BvzUyNESczKEhIUNa5UWj0SCKatQ/0fD4M3W3pKTk2LFjI9HdHz9+7N69e/Xq1QsWLODi4lq+fHlERISCggITE5OoqKiXl9eJEydmzZp19OjRvLy83t7eR48eiYmJcXJyysjIHD16dNu2bSAvIwcHx7x58wwMDEC0IciwyM3NLSMjA9zgIGaEUhQRP/Pz58/PnTvn6enJwsLCysrKx8enqqoKqiEJCwszqLtgJn7x4sVhdAKBQHj//v22bduam5tzcnKMjIxAaQdlZWUGi64zwrdv31atWjUWIc0rV67k5OR88+ZNU1PTQLr7+vXrOXPmaGpqXrt2rbKykkgkampqsrGxLV++PCMjAzwXxM9MR3d7e3u3bt1qYmLS0NBQX1+vqqrq5ubW2tqKwWBos3yPChgMxs/Pz8TE5MOHDx8/fly1ahULC8vChQs/ffrk5OR08+ZNPT09eXn5R48eDTpDOnr0qImJSXR0tKOjI9VOpN7eXgsLCw4ODkNDQxsbGzc3N3Nz8w0bNly/fp1BI55EIvn7+587d+7QoUP+/v50MkXX1tbu3bt3xYoV0tLSW7duTU5Otre3v3//fnFxMTB2QRLmo0ePFhcXI/OkhoaG0tLS31j3E3D9+vUzZ87Qnz7i8fje3t5hry5XVFQcOXLE0NAQVCtZv379smXLli9fbm1tTZUa88WLFy4uLq6urk5OTnfv3h0HL/GQ6O3tbaGBEXsXEc6h6u5EA+pu/5SWlu7fv9/JyWn58uXMzMwLFizw9PSUl5efOnXqrFmzTp06lZ6evmHDhoMHDz5+/Li3tzc9PV1ERISbm9vAwKCysjI2NhbYu6DQHrJ+SSQSP378CLIinzhxoq+vr62tLS4uLjMzE7k10N1du3a9fPkyLi4uJSVFWFgYrBarqqo2NzcD3WVnZ1dVVV29ejWdeGYymdzV1RUSEjI83SWRSHV1dUeOHAHGk6am5rJlyzg4OA4dOjSK61jNzc3q6upj5Gfm4uJ68+ZNY2PjqlWr3N3daXX3xIkTPDw8CgoKxsbGz549w+Fwmpqa7OzsIiIi6enp4GMyors9PT2ampqGhoYNDQ2dnZ0aGhoeHh5jWtSWRCI9ePBg69atL168yMnJUVFR4eLimjdv3vXr1zdv3nzlyhVTU1N/f39GlpbBa1ZQUODj40OV8QqLxW7atGnq1KnCwsKzZs2ysbExMzPbuHHjjh07GCwB2d3dbWlp6ePj4+joGBoaSmexGQRVHDlyZOXKlVZWVtnZ2VFRUVlZWe/fv7ewsIiOjs7MzNy0aVNgYCBlx4IIo99ewvnVq1eJiYl07N2+vr709PSgoKB3794NTwgrKiq8vb09PDzAvP/hw4fx8fGxsbHJyclUFm1NTc2///67f/9+Ozu758+fD+Ne48+gQ31GRgZyjpKi4sRJPjUM/ljd9fb2HqHuOjo6njt3zsLCgomJiZ+ff/Xq1RISElOmTBEREQkJCfnx44eLi4uZmdm9e/ewWOyDBw+EhYXBbtqenp709PTp06czMzODNI3z588HUUhEIrGgoEBISIiHh8fY2LiqqqqysvLw4cOUTQW6a2lpef78+cjIyJycnDlz5oBV1dWrVwPdBb6mEydO2NvbHzhwgM5kfyS6SyaTe3p6goKCHjx4MG/ePGtr67Vr1y5atOjp06fDu1q/tLa2amhojJ3ugi0Qq1atcnJyonW4OTs7c3FxSUtLq6ioPHz4sK+vT1NTE0gsortlZWVqamp8fHwiIiID6W53d/fmzZudnZ1bW1u7urq0tLTGWnfJZHJjY6OpqemzZ8/ev3+/YcOGBQsWiImJ7dy5U05O7tKlS56enlQBYgPR2dnZ09PT2dkZFxcHFkSQX1VWVqqqqnJycrKwsEydOtXS0tLMzGzLli0LFy48efIkIwkoGhoatLW13dzc3NzcYmJi6ERjkUgkDAaTn59vYGCwc+fO/Pz8pKSkFy9ehIWFWVtbv3nzJj8/f9OmTcHBweNWLZhxPn365OHhQSeWs6mpyd3dXUpKCoVCFRUV/fz5s7q6mkEBJhAImZmZAQGX6/DNAAAgAElEQVQBZ8+efffuXUNDQ2NjI8j12N3djcFgqN5JDAYTHBwsJSXl7e091gm3RwtGhvrQkBDgeR5eVPPEAepuPxAIhLy8vF27dsXHx0dGRjIzM7OxsfHz83NxcQHdBdP2o0ePLlu27Nq1a58/f/by8uLi4uLl5bWxscHj8aWlpaampmJiYsDbvGDBAqC7IIeUnZ2dsLDwkiVLfHx8bt++bWdnFxMTg9wd6O62bdtWrlx57Nixjx8/zpkzZ+rUqaysrIjuAuPj5s2bFRUVOTk5dMbWkeuui4uLra2thITE5cuXz549e/fu3dEd9cZUdzk4OGJiYurr65WVlcFdKEeo9vb2nTt3srOzc3Nzz5w5MyUlpaamZvXq1WxsbJS6+/Tp0wMHDuzZs2fZsmUD7fT98OHDmjVrkpKSwKqBj4+Pr6/vWOtuZ2fn+vXrIyIiXr9+bWhoaG5uPnfuXAMDg/nz51+8eDEgIGCgUpX9gsVib926VV5eTikGsbGxUlJS2traYmJi//zzj7m5ubGxsb29/a5duxwdHb9+/TqooVlXV6epqeng4ODh4fH69etBnd7l5eWWlpbHjh2rqKi4fPlyeHg4CoU6e/ZsVVVVeXm5kZFRSEjIWHfsMPj8+fP+/fspv8hU1NXVubi4qKqqHjt27PHjx97e3u7u7gyWr25ubvb09BQUFLS0tCwsLBw0wVlPT4+fnx8/P7+/v/+ob5oaI8atHtFE4I/VXU9PT8azq+BwuO7ubrAt4cWLF46Ojs7Ozhs3bkxISIiJiQGRRNzc3MLCwvz8/LKysomJibW1tS4uLlJSUnZ2dj4+Ptu3b+fk5NywYUNOTg6ZTG5ubr5y5crRo0eBq3nRokXIrhs8Hl9cXOzp6Tlr1ix5efkzZ87s2bPnzJkzyBIviGfW1tYWFxd3dXX9+PGjhIQE2E0E/MyZmZkiIiKioqK3b98mEon0Xb5dXV1nzpxhMEMWLT09Pbt27eLn5xcQEECj0a2trT09PaPr02ttbV2/fv3wdDcxMfHOnTv9jix1dXVLly6dO3fu7t27k5KSJCUl58+fX1xcjIgKgUAICwtbuHChmJiYsLCwtLR0SkrKs2fPZGVl586dKy4unpaWBvo2NjY2KCjo0aNHYHdsvzZKWlqamZkZMBZBjZoxCmOmpKurS0lJydfX9/nz52ZmZl5eXkuXLtXX15eVlb148WJgYOCQVs2B7qakpFy7dq2goODUqVMfP348f/68hYXFvXv3rl+/vnjx4jVr1igqKjo7O6PR6B07drx8+XJQexrorpKS0saNG58/fz6oDGCx2C9fvlRVVWGx2PDw8MDAQD8/v4yMjN7e3r6+vsLCwsrKylFPQjJyPn/+vG/fvujo6IFOqK6uTkhIuHr1qqurq4uLi6mp6cKFC0ERw0EvDnLfzp4929fXl5FZL9BdCQmJiIiI3+6BZxCouxOI4eku8BI7OzszEsTb19eXm5t7+fLlvr4+kPN94cKFYG9+QkJCdHQ0qOTDzc29cuXKVatWGRsb19XVtbW1nT9/XkhISERERF5eXkFBgYeHx9TUFGwwx+Fw5eXlcXFxEhISfHx8W7Zsofx24fH4wsJCPT29OXPmBAQEmJqaIrkeSSQSDofLzs5esmQJPz8/CoXKzc2VlJQEGbKAvfv27VsRERExMbFbt24N+ul6e3ufPn067LWQnp6e3bt3s7GxCQkJ0Rb1HBVaWlo2bNhQVlY2jAHC29vb39+f9iljsdhjx47Nnj3b3Nx8/fr1IEROSUnp69eviGricDgUCiUnJ7d582bgR01OTn7w4MH8+fP19fWlpaWBvQsCekNDQ3NyclatWhUVFdVvwpN79+7t3r0b2UYSExNDtQw5FgDd9fb2fvLkiZWVVWZmpo2Njbm5+cKFC318fI4cOTKkzIVYLDYhISEiIgKFQnl7eysqKsbFxdnb26elpXV1deXn54PkIby8vOHh4RkZGWZmZoxkaa6rq9u4cSMbG5uOjk5+fv6gTxnkyicSiTgcLiwszMnJydzc/NmzZ+DBDWkD+njy5csX+rqbk5MTERGRmZl59+7drVu3Kioq6urqWlpa3rp1a9Bh6vHjx4cOHQoODv78+TMjHx+Hw6Wnp0dFRQ26dXviAHV3AjG8h9HR0REfH+/o6MhI+A8Wi338+PHhw4exWGxFRcXOnTvFxMS2bNmioaFx9+7d6OhoJiamadOmcXNzq6qqampqent7E4lEEMMsLi7OwsLCzs7OycnJz8+/e/duZKm1s7Pz3r17Wlpay5Yti4iIoByegLf5wIEDEhISgYGBJiYmRkZGdXV1VVVV7969w2Kxd+7c4eTk5ObmPnToEKWfee3atU1NTZmZmaKiovLy8u/evRv004E1s2FXbcPj8U+ePFFWVvb29h6jrRotLS0gifFAWaYHgkgkOjo67t27l9YC6OzstLKykpSUBAWCBAUFt27dunDhwtDQUMTP2dfXd+jQocWLF2/fvp2VlXXKlClJSUkRERELFizw8/NbsmRJWlpacnLyp0+fIiIizpw5k5OTo6ioeOzYMdrocSwWe/DgQQsLC2Tx8s2bN2lpaXSq3o4KXV1dK1asMDY2vn///o4dO759+4ZCoaysrHR1dXV0dAwMDPqtAD8QWCzWw8Nj0aJFM2fO5OfnZ2FhOX36tIGBwYsXL8DeD3V19WnTpi1ZsiQrK6ugoMDIyCg9PX1Qzaivrzc2Np4/f35QUBBtrXs64PH48PBwR0fHrVu3pqWlTXC7raam5sSJEwNNhUkk0tOnTwMDA3NychoaGry9vUF1+nPnzq1du/bYsWMDeSb6+vo6OjrQaLSHh8fbt28Z3A0IvvVdXV0Tc47SL1B3JxDDexhYLDYtLc3JyWmgxaSGhoYbN26g0eju7u6enp7U1NQdO3ZkZ2enp6fv3LlTXFxcR0fH3Nz858+fMTExoAoQDw+Pqqrqpk2bTpw4QSaTcTjcixcvxMXFgQdYRERETU3typUriButu7v73r17Ojo6mzZtys7Oprw7iUSqr68/fPjwnDlzAgMDLSwsLCwsfv36lZKScvjwYQwGg0ajwR2dnJwqKysdHR0FBQVnz54dFBTU1dWVmZkpKSm5cePGoQrVMCASiV++fAGZJcYoF09LS8uCBQsWLVo0pEGZTCZXVVWtXbtWSUmJKtUDmUzu6OgAYbcFBQXKysrA2Jo3b56XlxcyBenr63N0dAS6y8bGNmXKlLi4uB07dgBnsrq6enp6uoKCgrKysqen5+nTp0tLS0ESDKootpqamsTERAMDAzMzM0R3sVjsqDvkacFisVZWVosWLYqNjbWysvr+/fvhw4dXr17t4uICylgNSXfxeHxYWNjs2bOnTJkyZcqUf/75R01NTVFR8dmzZ3g8HuguMzOzvb39r1+/vn79qqamdvHixUHDdqqrq6Oioh4/ftzY2DiktUagu3Z2dtra2hNfd0GikuvXr9MGOVZWVr5+/fry5csnT558//49kUisqakpKCioq6urrKw8d+6ctra2o6Pj58+faS+blZUVFBS0a9cuBqPYJhf5+flOTk52dnZ2dnZQdycQw3sYRCKxqKjo4sWLA60afvr0ac2aNVpaWuXl5RgMJjk5ecuWLSEhIcHBwVZWVmxsbIKCgsbGxp2dnUlJScrKyvPmzZs1a9bmzZs3b9586tQpMpmMw+FevnwpISEBUjGvX78+NzeX0q8IdNfY2Hjnzp1UOy6A7qJQqNmzZ/v5+ZmZmenr6xcUFCQkJKirq2dlZSUkJDAxMfHx8bm4uPT19b1582b+/PkrV678/v07gUD49u3bunXrtLS0xmc7PBaLLS8vH7voDAKB4OrqOnfuXPrp+2kpKiqSk5NbsmTJt2/fqOb1nZ2d5ubm+vr6wInNysoKdNfT0xPR3Y6Ojt27dx86dGjfvn1cXFxTp0718PAwMDDQ1tZuaWlRVVU9f/68oKAgKyvroUOHbt682dXV9evXr0uXLnV2dra3tyPZMDIzMy0tLbW1tffs2TMOaWwpAQvJ6urqAQEBxsbG379/P3jwIKheNXfu3IsXLw51V2teXp6Ojg4/P7+VlZWMjAw/P7+IiMjjx49BURB1dXVhYeH4+HgMBoPBYEJCQjw9Pek8td7e3p6entjY2NDQ0PLy8qEKJ4FAiI6OdnZ23rJly8TXXTKZfPXqVT8/P8oOAZWbHzx4sH37dmVl5WPHjoHUUYgvnUgktrS0xMXFbd68OTAwkMpz09bW5u3tLSwsLCkpefr06WF7rSYsWCy2rq6OwXxVfxJ/pu6SyeSysrLAwECkCCUlGAwmKSlJQkJCRkYmJiamoaEhICBgxYoVx48f9/LysrS0nDZtGicnp6GhYVdXV3Jyso6Ojo2NjYeHx7lz5/bs2QO2ChAIhIKCAjU1tWnTprGxsW3ZsoWqzBwGg0lNTXVxcfnw4QOVQCL2Lj8/v4GBgZaW1vLlyyMjI3ft2rVgwYJLly7dvHmTiYmJl5f3yJEjBALh8+fP8vLy69atA8FZHR0dFy5cMDAwGLc0NGPtrQoKCuLm5o6LixvSjb59+zZ//nyQAfvDhw+UgbhdXV1gNgOCttjZ2XV1deXk5Cjt3bKyMiMjo/z8/OTkZJBPW0VFRUdHx8/Pr7u7e9myZbKysuzs7FOnTl23bh1w8YEsZu3t7QUFBbt37wZp5x49eqSjo7N161Y0Gj3OIyOJRHr06JGVldWOHTs2b978/ft3e3v7GTNmODo6SklJ3bp1a6jt6evry8nJMTExuXfvXmxs7Pz58zk4OFJTUwkEQmNj44ULF7y9vQsLC8F+WbCcDAIJ++Xp06c3b950d3f39/cfXo287Ozss2fPHjhwICsra+Lr7pUrV3x8fEC1Y1B0pKSk5OTJk1ZWVsuXL+fn5/f19aWdmZFIpLa2NlAdBKkVBvjw4YOFhYWgoODKlSvv3r078XtgJEDdnUCMRHd9fX3RaDSYVIKU3yUlJSQSqaGhAWRLEBMTO336dFVVlZOT08KFC+3s7BQUFPT09ECeKWNjY6C7Bw8eBDl+29ra6urqkLzK1dXVBw4cmDp1KtBdKq8vkUjs6upqbGzE4XBUXxiguy4uLkJCQmvWrFm3bt2CBQucnZ35+PhmzJixf//+ixcvghyT165dI5FIP3/+tLW1PXnyJFgkJhAIJSUlcXFxo5Wp8bdz+vRpZmbmdevWMV5Vm0QipaamiouLy8rK5uTk+Pv7X716NTU1FdiglLq7ceNGXl7es2fPnjp1KigoCEnZWFxcbGhoWF5enp+fb2VlBYo+6ejogOwZu3fv5uHhYWJiYmJikpWVfffuHR6P7+jocHFxefz48c2bN7W1tevr65uamvT19VetWqWjo5OZmTkWVZXod0J2dvbevXtVVFS0tbVLSkquXbsmISHh4uKipKT08OHDYbwhOByutrYWbAzV09OTlpbOyMhAqt+0trYiyw25ublWVlagaki/xMbGHj9+3MHBYdi6W15ebmFhYW9vPySH+e/iypUrx44dA039+vXrvn37JCUl+fj4wM4FGRkZPz+/fqORSSTShw8f3N3d79y5gxwkEolpaWmenp6RkZGvX7+egFunRheouxOIkeguCoVyc3Pr6Ojo7e3t7u4uLi4+e/ZsdXV1fX29t7c3FxeXiIiIr69vfn6+lpbWggULdu3axcPDIyEhwcrKKiQkdPz4caC7Tk5O/dphdXV1hw8fBpmkaHWXDkB3vb29NTQ05s2bp6Kisn79+lWrVjExMXFycq5YsWLNmjXMzMxycnIgj1VbW1toaOi5c+cQ/cbj8WDj0/A6Z6Jx5swZsEbu4+OTk5Mz6OciEolv3rzR09MTExPbtGmTra3thg0btm7damZmBrwOiO62t7cbGhqKiopmZWXl5uZGR0cjUlRUVGRoaPjjx4+urq6nT58KCgpKSEjIycllZGTg8fjY2NgZM2awsbGxsrJKS0tnZ2fj8fjW1lZdXd2wsDB3d/fVq1fX1dWVlJRISkqKiopu3769rKxs/MNYOjs7fXx8Zs+e7eHh0dDQUFBQICcnFxERcefOndra2hG2JzIyEoVCDaR5X79+tbGxAdMUql+Byq/R0dHa2tpLly51c3Mb0k5ihN7e3iNHjri5uQ1aynAikJaWduHCBVCAJC4uDqSYVVFR2bx58+7du83MzIKDgwdaDi8qKvL19b158ybyyEpLS52cnPz8/Orr60Fc/fh9kt/BkPJmTOokkeQ/W3ft7Oysra2fP3++c+dOAwODqKiogwcPvnv3rq6uDqS5APUJjh8/LiwsPG/ePFtbW5CK2cDAYOnSpS9evABrtM7Ozv2OXy0tLcHBwbNmzRIRETl8+PCQvL49PT3Z2dkXL16cMWOGuro6sLdAakkeHh5ubm4+Pr4VK1YAv1N7e3t4eDil7v5hZGVlrV27loWFRUBAYNAdhyQS6fHjx+rq6oKCggEBAR4eHnPnzp0+ffrMmTO1tLQaGxuBb8PMzMzAwKC7uzsrK0tVVTUvLw+kt/3+/TuRSGxra8vOzjYwMABL158/fxYQEGBlZWVnZ3/+/DmI4p49e7aJiYmSkhJi7zY3Ny9cuFBGRgZUZc/Pz//w4YOoqCgLC4uent5Q48JGBRKJFBQUJCoqevbs2ba2tqKiIgUFhX///be1tXXkkwBQFW4gIx6Lxe7bt09WVvbff/+lKq718OHDsLAwHx+f+fPngyITw64M8f79+5ycnN+efpkRiouLT58+/eDBAwKBEBIS4uDgkJmZWV1dXVtb29jYWF9fT+eh9PX1BQYGWllZhYWFpaent7W1gVWqp0+fTqKY5JEwpDyR41+pfnT5k3XX1tZWRUXFxcWFh4dn6dKloaGh9vb2WVlZlZWV7u7u06dPZ2JiEhcXNzc35+HhkZWV3bVrFzc3t5GR0YsXLxITE1taWrq7ux88eODq6trvq4/D4fLy8kxNTdXU1HJycob09QCB/s+ePRMXF/fy8rKysqLM58zJyblmzZqtW7eCStpAd8+ePfun6i4Wiz169ChIqxkcHEz7Mb99+5aenk4kEl++fNnb2xsTE8PHx6ekpPThw4eAgADgEGZmZtbU1AS6+/nz56VLl27fvh2DwTQ3N2/btu3Tp08/f/5cvXp1SEgIBoOJi4vz8/Pbtm0bMFILCwtnzJgxdepUWVnZz58/EwiEhoaGa9euvXjxYtOmTcCVjcfjm5qapKWlOTg4hISEQMI/S0tLXl7eadOm6evr/65w01evXhkZGYH6esXFxdu3b3/z5s04ZJYgEAh2dnY8PDzh4eFUupiYmOjh4eHi4iIjIyMoKJiSkjLsuLy+vr7JYu2Vl5cHBATcvXu3tLTUzc3t4sWLA9X67JeXL1/u3btXU1Nz69atu3fv3r59u7e39yTagDtCGNFdJUVF8DPMzzy2jER3gRHJz8/PzMw8f/58FxcXa2trNBrt7u6+YcMGXl5eHh4efn5+OTk5Dg4OSUlJfX19Xl5eS0vL6upqDAYDdu6Xlpa+fPlyoK99VVWVnZ3dli1bhlEEHphZOjo60dHRgYGB3NzcLCws06dP5+XlBfUVAgMDge52dHRcuXLlxo0bk2L0GQYkEuns2bOcnJysrKw7duyg1YyUlBQUCoXD4bZs2fLo0aOoqChQaLarqysoKGj69On8/Pzs7OwbN24EhZJMTU25uLh0dXUxGExbW5uent6XL19qa2vXr19/4MCBR48eeXh4iImJrV69GmSYArrLzs7u5OQEPNVEIrG7u7u+vt7c3HzBggWI7s6dOxfkUWFnZ+fn50eycP9G3cVisfX19WCzZltbW15e3vhYhyQSKSYmRlpaul/d1dDQ0NLSUlZWjo6OniwpgkdIdXW1v7//jRs3wOs61BhsLBbb0NBQUVERExNjaWlpZ2cHaq6MXYMnFIwM9UqKiqEhIRkZGdDPPLaMRHctLS2nTp0KMiRzcnKKiYkpKira29vPmTMHJH1UV1cH3kUmJiZQlGb58uU7duxABlAQ7k/n1a+pqXF0dNTT0xvGmEsikSorK11cXJKSkpKSkoSFhTk5OVevXm1nZ8fLy7tr166fP3+CiFkcDvfjx48xLan926mqqjI0NOTk5FRQUKDaKIzFYo8cObJ06dKLFy9KSEhs2LAhKCgoLi6ur68Pj8dfuXJl5syZmzZtmjVr1tq1a21tbd+8eaOhoQFimDEYTHt7u4mJSWFhYW9vr6en586dO/X19bdv387BwbFmzRoQBf3t2zdhYWEeHp6YmBhKjyiBQDh37tyyZcuA7jY3N8+fPx+4JUA2FZC7e8uWLYcPH54IVbWJRCIejx+3+VlTU9OpU6euXbv26dOnjo4O4PLp7u52c3PbuHGjrq7upUuXamtr/9T5IhXd3d3BwcFqamrKysp+fn6gBNlQIZFIHR0dv379qq2tHYct4BMHBod6YSEhI0PDsW7MWPMn6y5w3jL9Bysrq4yMjK6uLhcXFxMT06xZs7Zt2yYoKIgI89KlSzdu3GhhYcH4Ql1NTY27u/uxY8eGkZkIZK3y8vJ68OBBbm6ukpISBwfH1q1bw8LC+Pj49u7dS5kSb8KmxxstiETi69evnZ2dV6xYAXS3tLS0ra2ttbX1y5cvurq67OzsgoKCHBwcPDw8y5Yt+/jxI+iQ/Pz8JUuWGBkZzZ49GyRhjo6O1tTUVFVVNTAwwGAwfX19KSkpwIoNCgrasmWLlJQUDw8PCwvLgQMHwPGWlpZDhw5JSEjEx8dTTbOuXr26YsUKsL6LwWAcHR1nzJgBbFzwdnFwcMTFxdXU1EyWBPSjCIlEevfunZaW1pw5c8AqL4lEev/+vZaWlrq6+rx58xISEv4eiw2Hw6HRaAsLCz8/v2/fvg37fSD9x+g2b4JAIpG+f/8eRsOgde/JZDIwc40MDRGH8yTlD9ddMD4CWRUQEODn5xcXF2dlZZ02bZqoqOjevXsNDQ3B6MnFxQVKjO3Zs4dxy7Kuri4wMDA+Pn54X5Le3t7v3783NjZWVVXp6+tzcHDo6en9+++/4uLihw4d+lO/eAMBMoSsXbsW6O7BgwcvX77s4OCgra0N9tcyMTEJCAjMnDlTWloa+JPJZPLPnz9tbGySk5O1tbU5OTnZ2dkVFRVlZGQuXLjw9u1bsNO0p6cHnBwcHCwsLAxK2s2ZMyczMxP4tIlEYkVFhb29/ZMnT6is7atXryopKQHdJZFItbW1lpaWYPGCmZmZl5d33rx5jx8/HqNkXhMfLBb76tWrzZs3nzt3LjQ0NDo62sTERFhYWENDA+whHue9Vb8RYKrW1NS0trZOwMoNEwcMBlNFw6BDPRqNRixdI0PD0JCQsW/pWPGH6y4IVuLk5FRTU/Py8po7dy7wKrOysi5cuNDT0xOFQgFhnj59up6eXlZW1qNHjxg3Xru7u9+/fz/szYUkEgkYsu3t7WfOnOHk5DQ1Nf3+/butre1kqVY9uuTm5iorK79+/bq2tlZTU1NDQ4OXl5ednX358uUzZsxgYmLS0NBwcnJavHgxort4PL6hoaGnp+fdu3cg7RQbG9uMGTP6zWIRHBzMzc0NiiLLy8tTFvUjEolNTU20pUyvX7+O6C6ZTCaRSEePHlVRUZk1a5aoqOj+/ftTUlLq6ur+bG8Efdrb2/ft26ehobFw4UIREREODg4ODo5Dhw6pqqreuXPn79FdwN82XR4GIH6CCkZ0FznHyNBwUpfg/ZN119HRccWKFdzc3Dw8PLa2toWFhY6OjsAC5ufn37dvH9irDlyFc+bMAbs5sVgs498cEokEVhmH10gEPB6fl5e3ZcuW69evYzCYz58/D3vfxaQmNzdXWlp6/vz5GzZsmDFjBicnJ1gFMDQ09PT05OfnP3jw4K9fv9TU1AoKCqikrq2tbf369cCWFRAQuHPnDu1zOX36NPAws7Kyampq1tXVDfqsy8vLg4OD6+vrkTM9PDwsLS1Xrly5bdu2mzdvtre3/82iSyaTiURiVlbW6tWr+fn5hYSE5OXlwb4mPT29e/fu/W26CxkejAz1TigU3L87Hgxbd6uqqoKDg42NjQUEBPj4+Pbs2VNXV3f+/HlmZuYpU6YICgp6eHjU1NR4enqysbEpKyv7+vqam5sPqV7pKAJirBwcHN68eQOCuX5LM347ubm5c+bMYWNj4+DgYGJimjJlCnAvm5qafv36VVVVNS0tDYvFurm5/fjxg0oye3t7ra2tWVlZp06dumjRoqKiIlo5jI2NlZWVBfUtkpKSGFl6JBAI7e3tlGt1Xl5e1tbWq1evNjU1TU5O/jtnSFR0dXWZmpru27cvKSkpNTVVS0vr0qVLhoaG9+/fh7oLYQSYr2oCMeyH0dfX9+vXrxs3bixcuBCEB9fX10dFRQkLC7OzswsJCXl5edXX13t5eXFzc+vr6ycnJwcFBSH1ZMYZEolUVVWFQqEYKe33B5OXlzdnzhxQDZeDg4ONjQ3sjjUxMamqqgKTJxKJBLJvUv0tHo/fu3evnJycoKDgwYMH+906WVpaqq2tHRgYmJmZ2dnZOTyX4O3bt+Pj4zdu3GhmZgZ1F0AikQoLC8vLy7u7u7u7u3Nzc4uKim7fvj28ssqQvxCouxOIkTwMIpFYW1sbHh6+ffv2K1euNDU1xcXFqaurCwkJzZo168SJE/X19T4+PvPmzQsNDS0sLGxra/tdIakkEqm6utrZ2ZlOlvm/gby8PCkpKS0tLX5+fh0dnX379nl5eamoqJibm3d0dFRUVNB5QDgc7sCBA35+furq6rTWMKC6utre3r6oqKi3t3fYetDd3f3x40dXV9fw8PD8/HxozwGQkHvgsAHh33+t5wYyVKDuTiBG+DAIBEJLS0tFRUVHR0d3d3dGRoaDg4O4uPjixYufP38OdFdJSenp06fDSHwxioCMzadPn54U+d/Hjry8PElJSWdn5+YjgAoAABNiSURBVIULF4aHh1dWVlZXV6ekpLi7u2OxWPrLqDgczt7ePjQ0VFtbu9/s82QyuaWlJT09feQWKgaDqaura2trmyyplCCQCQ7U3QnEyB8GshOORCKBPQ+LFi0CtWwbGhpOnTq1bdu2xsbG3z4xx+FwNTU1f89mx3759OnTvHnzIiMjwdYgYEJhMBjKwOOBwOPxJ0+evHXrFh3dJRKJo5KL4A/eXgmB/Bag7k4gRv1htLS0XLp0ydjYuLi4GIfDVVRU5OfnT5CMB395WCyZTO7u7ra2to6Oji4sLKTcRc1Iz5BIpLq6uoqKiqCgoGGkMYFAIL8RqLsTiFF/GH19fS9evNi1a1dRURH5v7x6o3sLyLAhkUi+vr4JCQk4HG4YsxCwH7qtrQ0aoxDI5ALq7gRi1B8GHo/PyspycHAoKSkZ3StDRoVfv34xXskYAoH8GUDdnUCM+sMgkUgNDQ0ZGRmtra2je2XIqEAkEqG1CoH8bUDdnUCMxcMgEom9vb1jsZgKchZWVVWN+pXHFBwON+n2DXd1dYEK9r+7IUOgsrKyra1tcrWZQCB8//59UpSdR2hra6upqZl0a/yVlZWTa+jAYrE1NTWjlfMA6u4EYnI9DAwGk5mZmZaW9rsbMjS6uroOHjz4u1sxNH79+hUeHj651ubv3btXWFg4ufb7YrHYiIiIybUo8/nz58ePH0+6ivEPHjxITU393a0YAg0NDU+ePBmtKfvkGupHCNTd0aS7u/vly5fJycm/uyFDo6OjY+fOnb+7FUPjx48fQUFBk0vDEhMT8/PzJ1flop6enuDg4G/fvv3uhgyBvLy8lJSUysrK392QoZGUlHT37t3f3YohUFdX9+DBgzdv3ozK1SbXUD9CJrfu4nA4qty5tODx+M7OTvpOJ1Aqjn7tepCnl7bEDSWM6C64Dv3BF4/HD+q9IRKJjJQbIxAIg9bfZkR3CQTCoGWJMRjMoKvmwBVP/xwymTxoGhMGdbe2tpa+X7e3t7elpYX+OR0dHbR1iqjoN3UlFQzqbn19Pf1Lgfdw0PYMeqPe3t7W1lb692JQd1taWuhvPScQCK2trfTP6e3t7ejooN8ePB7f3t5O/zqM6C4outzV1UXnHDKZ3NbW1tnZSecEHA7X0dFBPxNLT09PV1fXoJsVB9VdcJ1B1yk6Ozvb29vpn4PBYOh/LhKJ1NXVRf86jOgukUjs7u5mZJ0C6u4Egv7DqKqqSklJof9ytLS0PHnyJDc3l845JBLp27dvgYGBdM5pbW198OBBXl4enXMY0d329vbk5GT6CznNzc0XLlygP7B2dXXdvHmzubmZzjlkMrmtrc3Dw4P+OYPqLolEam1t9fPzo3MOkUh8+/btrVu36N+roaEhODiY/jlkMtnNzY3++MKg7np5edEfX0pKSmJjY+mPm48ePfrw4QP9e124cOHXr1/028yg7gYEBNCfdiQnJ3///p3+dcLDwwct8lFUVJSYmEh/OsWg7v7777/FxcV03tiOjg40Gl1aWkrnIt+/f09PT6f/2Zubm5OTk+mndWNEd/F4fExMzKtXr+icQyaTb9269eLFCzqPtbq6+vHjx2BT4kAUFBS8fv26paWF/jd6UN3Nz89//fp1v4nHKXn69Om9e/fon/Px48cnT57QmQrg8fjXr1/fv3+fzkUY0V0sFpudnc2I/xzq7gSC/sOoqKhAo9H0bazGxsb79+9nZ2fTOYdEIhUUFLi7u9M5p6mpKTExkf5iBiO629raGh8fX1FRQeechoaGEydO0P+WdnR0REVFDWoWt7S07N+/n/45jOhuc3Ozk5MTnXOIROLLly+jo6Pp36uurs7Ly4v+OWQyee/evaOiu/b29vSnZd++fbt48SJ9N8bdu3czMzPp65y/v39ZWdmo6K6bmxt9zYiPj//y5Qv965w6daq8vJz+jb58+XL9+nX666AM6u7ly5cLCwvpvLFtbW3Xrl2jf53Pnz/fvXuX/nShoaEhPj6+sLCQzjmM6C4OhwsLC0tPT6dzDplMjo6OTktLo/O5fv78mZyc/OXLFzoXycnJefLkSVNT0wh1F1xnUBs9JSUlPj6e/jlZWVkpKSn0s50/efIkISGBzkUY0d2enp5Xr17dvn2bfnvIUHcnFOOju0QiEeounROg7v7Nunv69Ok/T3fxeDzUXai7v4tJoLvwH/wH/8F/8N8f/+93q834MdF1FwKBQCCQPwmouxAIBAKBjB9QdyEQCAQCGT+g7kIgEAgEMn5A3YVAIBAIZPyAuguBQCAQyPgBdRcCgUAgkPED6i4EAoFAIOMH1F0IBAKBQMYPqLsQCAQCgYwfUHcZBUlmlpGRAY6EhoT0m94sIyOD6syBTlZSVBQWEnJCoUarkeDWlFVfGG/M72o5bZvJE7u3kYtTXmqC93O/bSZP7H5G7hgaEjKMZkycNpMndj8DSktLlRQVh9GM39jmyQvUXYag+haRyWQ0Gm1kaEgmkzMyMsAPgNLSUuRVQ37o92QjQ0M0Gk0mk51QKPDDCEHefkTDGG/M72o5bZvJE7u3MzIyQPPArcGlJng/99tm8sTuZ3Ap5Nbg9Zjg/dxvm8kTvp+RCyK6O/H7ebIDdXdwwItFOWCRKd4hMpmspKhIOY1FZnNOKBT4ytGeTPmyZmRkUM40R95Uyi88I435vS2navMk6m3kjpOin6nuOMH7mXIehgzcE7yf+23zBO9nABqNDg0JQa4zwfv5DwDq7uBQzrWRqSulU4XyJTMyNETOQd5I2pPRaHS/s8uRN5VSwxhszO9tOa3ukidJbyPT9knRz1Rtniz9HBoSMrneZ6o2T4p+dkKhKLVwsvTz5AXq7hCg8qhQDgeUbyGlHw95C6lORvww5DHWXUYa83tbTtVmquPg54nWZuTiQ2rGhGozwkTuZ7AciFxnUvQzVZsRJmw/g7tQ6e7E7+dJDdTdoeGEQoH3aWK+hX+S7pIndm9T2WETv5+p2kzJRO5nSktxsvQzlXWLMAH7OSMjA9wR6u54AnV3aCArGVQLGAMtqaL/80NSnUy12kFrhQwP+uu7AzXm97acvu6CHyZam9FoNOWoOin6marNlEzYfkbu3u86+sTsZ6o2UzIB+9kJhRL+3+LzpaWlk6ifJylQd4dARkYG8oYh0zfKeRyZYipH+Z71ezLyalK+oyOESsMYb8xvbPlAujthe5uyYeCHid/PtG3u91cTqs0IyCg/8fuZts0IE7yfKe3dSdTPkxSou4ODbESjmqMhU0Wq89FotDDNbrZ+Txbub0vlsCn9L3KSUsYYb8xvaTltmyd4byPNo7raRO7nfts8wfsZuR3VnGwi93O/bZ7g/YxAFWM8kfv5DwDqLgQCgUAg4wfUXQgEAoFAxg+ouxAIBAKBjB9QdyEQCAQCGT+g7kIgEAgEMn5A3YVAIBAIZPyAuguBQCAQyPgBdRcCgUAgkPED6i4EAoFAIOMH1F0I5P8R/t8iqaPFQNUIIBDI3wnUXQiETP4v191YpGuHWfEgEAglUHchEDKZTFZSVAQZZUfXNkXqrEEgEAgA6i4E8v+FyQYqmzoSoLELgUCogLoLgZCdUChQSsXI0JCyKguAss4MZd2VjIyMfmvmUF2Z6oiSoiL4EyDw4OKUJceparZQ3gVxg4O/ArVuwEHwh5TFUKmagVyE0v6m+lyUBWLBEdregEAgIwTqLuRvp7S0FFEXoGeU5cyA7IEjQOeAxFLW7gbHaa+MRqP7dTI7oVCUC8mUBUqRWyPCrKSoCH5AWoLMAxDTHKlpHxoSQquU4A9Bs51QKOQE4Fon/1eNEbmakaEh8rOSoiKUXghkdIG6C/nbCQ0JofQtU9UHBSIHfgb6BKSR0oKkLT4KGMjJTHkdZAGYshQxbcVWqhKnlK1C/nfQlWlgxSI6Smn7GhkagtYCkaZqKlyihkBGEai7kL8dxPFL+Y/yBER4KNXOyNBwUDWis7iLmLyU/uR+LUtwUycUilKtqXSXTOO+pgIobkZGBqVBTGl29/sZkV+N7po3BPKXA3UX8leDRqOp1BEYfJSaSrm+ixi1TigU/ZgpNBpNawEjICKKXAQcobJZKbWWvu4CgL5STQgotZbKEU27skvraYf2LgQyukDdhfzV9OueBeoFfi4tLe13Uy+VPNOq7KCRzMBTTflXVFFdiI1LaYkO5GemXJ2l1V1KM50yhqtf1zQwnZErw/VdCGR0gboL+UuhXE+lFCoklBccpwwnpgrxpbSDqVS2tLR0UN9sv4pO6fRGIqGQWyANoDoHWO39tgRA2U7EkU7rYEcmAcivoOhCIKMO1F0IhB6lpaVU5mNGRgYdBzLj/PaUGrQzA7iOC4GMA1B3IRB6KCkqUqnjaOWSHIuclIwTGhJC1YDQkJBRmU9AIBD6QN2FQOhBu71nhIkkwWprv/uOxhlKjzoMWoZAxg2ouxAIBAKBjB9QdyEQCAQCGT+g7kIgEAgEMn5A3YVAIBAIZPyAuguBQCAQyPgBdRcCgUAgkPED6i4EAoFAIOMH1F0IBAKBQMYPqLsQCAQCgYwfUHchEAgEAhk/oO5CIBAIBDJ+QN2FQCAQCGT8gLoLgUAgEMj4AXX3rwYUogH14JA6OYzUbB8VKEvKU/2KqiQ7bXuQE9BoNFJ/vt+S76MFUqYeKeND+SuqUkW0R6j+ysjQkH5dI9A5lB98HD4jAI1Gg0+KPCDKioG/vZ4SGo1WUlRE/hfpaqRnaI/QgarOoxMKRfVwwduF3BG8eL+3hiNksgN1968GEQYwVCEHx60kXGlpKeUYSomRoSEY2cHoTzvKIyeAn8e0zRkZGaCdSJFaJxQKGXyVFBVLS0spPwvVkYH+ir50ITcF0J8PjeLHp9IVyv8Fz6K0tBTo02jdkXGoVJBMJhsZGgLhRPqT9shAABFFdBeNRgOpRmYeyBNEfkUmkzMyMqDuQkYC1N2/GkR3KYf4cbN3yYzpLrm/4vOUJww6vI4c2kYiMxXKUdgJhcrIyKA9QvtXA12W9hbIn4Mr93vmKJasB4I6kO6C35aWlgL9o30o4wDVdARMcUDbELmlOkIHRKTJ//uwwEVCQ0KQ7wJyU6i7kBECdfevhtIRCub+VCcg3tHS0lJg64BZP7A5kCPIccT9C/6c0ncNrkbl+mNEd8EQT+uVBTYu1a/oNBK0MyMjg7bB4DoDtQT8Ce1xxJZFhmbwM+0R2r8CUKkyFaEhIZRmFiIPoLWhISFgOoL4VMHPiGENjDagjkgv0XfAIoI6qO6CXu1X1UBPUuk31YIC0mzkIOLTBtcEnxGNRtNOAal0F3EhUDaS6ggdKHWX6megr5Q+FcQBA3UXMhKg7v7VUIkW1doVYi6AUZJMJoeGhIAhm9LvigymyPlg/ELkCvHa0UJfd8FAPOgJVNI1UCORlWA0Go3cF9iUYHDv16om96ed4OLg4JB0F/krOlem/C2ZTKbUKjKFqCA9j/Qz+BWlzQc+ppGhIVhOBo8bWaimBZmvDKS7SAfS0V3KX4Gng3xM5A1BXjzENqV8HOT/JLPf5QMq3SX/997Svsn0V9ABlFobGhJCtXYAdRcyFkDd/avpd2yitAUprWEwgNJKGmI8UY2GiLHbb+QUYFB7dyBbEzmB0shD7jtQI5ERExnfKR2/lMYlJU4oFO3oj5w5JN2luj5l71EBbEryf1qV8R9IdyGtRcQMUVbkY1JabIhtPVBIFLgLma7ukimmOwMJG2Ujqfy0iB4jYWXIU6Z8VUCzB3pn+l32NjI0pFoooTzyf+3cUXKjMBCE4WOYiyR3ce6UXFl5ULmrPSOJJOCpVPF/T7ssxgK21EgaHIbX/jDnudtswqbvQO7iFcjdS/P1XfU+ykLP3d7p7Oaud8TrwVz4rswDYziumk1En567+UR8PdV7YaVI2JI/NTuy/5MfP4wXm43Ovf1hmOhPDOsHoPYcqF5bt43Kd/tM8vA4OXd1g9R+BW24L8E2KvHL67v9DzrZvGUh5K43uz3fIF06chcHkbuX5rmbu+9QfNssmfriYnvOXe/mesb4FPSwASF3PZk8sYZp4Tto7XbdyFnu+tgrf1EYc2vRUQVou/XMw0+15fquB8b721v/q1qo4WDI+D6XrkIzv7Z+L9ZFWOvxbnus4M4+7ve9XwfFra9E5C/V7VOyDqfEQ+76krZm5sOWhZy7PttMPTNegdy9tDDezfOHmnbz1416R7zdbh/3u9fCNBtUqaDUB0+hrirMLm7pLUkdWW3TZ30HP87X5+eskZr3Vqu06tmPptXoPBPrJbLeYH9q8esWtgw/1expZnuuW9Z0a9+ipNQp9D+osqzHgM5C+wzfu/XCpeFEsQ4YblB75H1Yot5SaZvuTt9Tt69v1zSyD3m1j575wn+tcHG8unh3y4yaoceCPMLONXfkLg4idy9t1vNeR3ixRxtzd7/bif+Wv/6Uv7FAnxI//Tg/uVZ+smUvrZ2F3MVB5O6l+QjjmnLuzmJjUQb8B/57Va8I9V2LIvODx9k9nbCOXvALXCfi96pwHLmLS6MbPZ3PHs/474CWNQz4J8hdAADqkLsAANQhdwEAqEPuAgBQh9wFAKAOuQsAQB1yFwCAOuQuAAB1yF0AAOqQuwAA1CF3AQCoQ+4CAFCH3AUAoM43Z/JcPUj3jj4AAAAASUVORK5CYII=" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the relationship between temperature and oxygen concentration in the body fluids in <em>Laternula elliptica</em>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a (i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>two</strong> reasons for the relationship.</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>In its natural environment, <em>Laternula elliptica</em> buries itself in the mud on the sea bed. In this investigation, it was found that above 6°C it is unable to bury itself. Suggest a reason for this.</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>Describe the trends in atmospheric carbon dioxide concentration, shown in the graph.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c (i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>two</strong> reasons for the trends that you have described.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c (ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Diffusion of carbon dioxide only occurs when there is a concentration gradient. Deduce the pattern of carbon dioxide diffusion, between water and atmosphere, from 1988 to 2002.</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>The graph provides evidence for the hypothesis that there will be no net diffusion of carbon dioxide between water and atmosphere by 2020. Explain this evidence.</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>State the highest carbon dioxide concentration shown on the graph.</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>State the highest temperature shown on the graph.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e (ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Using the data in the graph, deduce the relationship between atmospheric carbon dioxide concentration and temperature.</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>Using the data in this question, explain reasons for concern about the long-term survival of Antarctic species, such as <em>Laternula elliptica</em>.</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>oxygen concentration falls as temperature rises / negative correlation/inverse relationship;<br>steady decline below 4.2/4.3/4.4°C / vice versa:<br>rapid decrease between 4.2/4.3/4.4 °C and 5°C;<br>zero oxygen concentration at/above 9°C;</p>
<div class="question_part_label">a (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>warmer water can hold less oxygen / lower oxygen solubility as temperature rises;<br>lower oxygen concentration of water reaching gills / less oxygen available from the water to diffuse into the gills;<br>higher metabolic rate / faster rates of respiration / more oxygen consumption as temperature rises;</p>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>not enough energy/ATP/aerobic respiration (for muscle contraction/movement)</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>rising trend overall;<br>annual rise and fall / fluctuations;</p>
<div class="question_part_label">c (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(CO<sub>2</sub> emissions from) increased burning of fossil fuels/deforestation/other anthropogenic factor;<br>variation in photosynthesis rates during the year / variations in CO<sub>2</sub> uptake in the oceans;</p>
<div class="question_part_label">c (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>diffusion in both directions during each year;<br>diffusion from atmosphere to water during most of the year;<br>diffusion from water to atmosphere for part of year/autumn/fall/seasonal;<br>increasing diffusion from water to atmosphere in later years;</p>
<div class="question_part_label">d (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(no net diffusion because) concentrations will become equal / there will be no gradient;<br>water concentration higher than atmospheric concentration as often as atmospheric concentration higher than water concentration;</p>
<div class="question_part_label">d (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>300 ppm (<em>Allow answers in the range 295–305 ppm</em>) <em>unit must be included to earn mark</em>.</p>
<div class="question_part_label">e (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>3.3°C (<em>Allow answers in the range 3.0–3.3°C</em>) <em>unit must be included to earn mark</em>.<br><em><strong>N.B</strong>. A maximum of <strong>[1]</strong> per exam can be deducted for a missing unit.</em></p>
<div class="question_part_label">e (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>positive correlation / higher temperature with higher CO<sub>2</sub> concentration</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>oceans may cease to act as sink / store for CO<sub>2</sub>;<br>atmospheric CO<sub>2</sub> concentration may then rise more rapidly;<br>atmospheric CO<sub>2</sub> concentration is higher than for at least 400 000 years/any time in recent (geological) time;<br>Antarctic temperatures will (probably) rise higher than at any time in 400 000 years/any time in recent (geological) time;<br>rising (sea water) temperature would reduce oxygen availability in water;<br>significant changes in habitat/abiotic factors;<br>populations may not be able to adapt;</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>Many candidates stopped at outlining one aspect of the data.</p>
<div class="question_part_label">a (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidate's gave one factual statement rather than the required two.</p>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many were able to successfully link the concept of aerobic respiration to the question.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There was poor understanding of the second graph. Even those who spotted the regular oscillation usually linked this to a 2 year interval rather than an annual cycle.</p>
<div class="question_part_label">c (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Some answers to (c) ii) were vague making reference to "pollution‟ as the cause. Some showed confusion by arguing that the general rise in CO<sub>2</sub> was caused by the greenhouse effect rather than being the cause of the greenhouse effect. Candidates should be familiar with the atmosphere data as this is required in the syllabus.</p>
<div class="question_part_label">c (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>For the greatest number of candidates, the pattern discussed in (d) i) was that of concentration rather than the pattern of diffusion. There was very little reference to time data.</p>
<div class="question_part_label">d (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many were able to discern that the lines would intersect, so that there would be no net diffusion.</p>
<div class="question_part_label">d (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Very few failed to put in the correct units though many included the solidus in the units; i.e., the units were CO<sub>2</sub> / ppm rather than just ppm.</p>
<div class="question_part_label">e (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Surprisingly some candidates managed to get the highest temperature wrong. Very few failed to put in the correct units though many included the solidus in the units; i.e., the units were CO<sub>2</sub> / ppm rather than just ppm.</p>
<div class="question_part_label">e (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The greatest number of candidates earned this mark. The graph suggests that CO<sub>2</sub> levels were the cause of the temperature. The markscheme did not penalize candidates for this, but candidates did confuse the dependent and independent relationship.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were two aspects of the prompt that were commonly left unaddressed by candidates. “Using the data in this question....” invited the candidates to consider all of the data but many referenced just the first graph on page 2 of the booklet. “...Antarctic species, such as ...” was meant for candidates to discuss organisms more broadly than the particular species in the question. Some talked about habitats other than the Antarctic ocean.</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>
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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 align="LEFT"> </p>
<p> </p>
<p><span style="font-family: ArialMT; font-size: medium;"><img 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" alt></span></p>
</div>
<div class="specification">
<p align="LEFT">Lipid in <em>O. nerka </em>was measured to evaluate possible differences in energy status during their first 15 months at sea. The graph shows the relationship between fork length and lipid content for <em>O. nerka </em>caught during autumn 2008 and winter 2009.</p>
<p align="LEFT"><img 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" alt></p>
</div>
<div class="specification">
<p align="LEFT">Persistent organic pollutants, such as polychlorinated biphenyls (PCBs), have been shown to reach unpolluted arctic areas by air currents. Another method of transport of these pollutants into these ecosystems is provided by migrating <em>O. nerka</em>.</p>
<p align="LEFT">Pollutant transport was studied in a population of <em>O. nerka </em>in the Copper River (Alaska). The graph shows concentration of PCBs in muscle lipids of <em>O. nerka </em>in relation to the distance of upstream migration.</p>
<p align="LEFT"><img 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" alt></p>
<p> </p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p align="LEFT">Identify the <strong>total </strong>number of <em>O. nerka </em>with fork length from 240 to 245 mm caught in autumn 2008 and winter 2009.</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>Compare the data in the graph for autumn 2008 and winter 2009.</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 align="LEFT">Suggest <strong>two</strong> factors that could affect the distribution of <em>O. nerka </em>in the North Pacific Ocean.</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>State the range of lipid content measured in <em>O. nerka </em>caught during autumn 2008.</p>
<p>.......g</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p align="LEFT">Outline any correlation between total lipid content and fork length in autumn 2008 and in winter 2009.</p>
<p align="LEFT">Autumn 2008:</p>
<p align="LEFT">Winter 2009:</p>
<p> </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>Suggest reasons for the differences in lipid content.</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 align="LEFT">Describe the relationship between the distance of upstream migration and the concentration of PCBs in <em>O. nerka</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p align="LEFT">State the concentration of PCBs in muscle lipids at 125 km from the ocean estimated by the correlation line.</p>
<div class="marks">[1]</div>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p align="LEFT">As the <em>O. nerka </em>migrate upstream they no longer feed. Suggest a reason for the relationship of distance of upstream migration and concentration of PCBs in muscle lipids.</p>
<div class="marks">[1]</div>
<div class="question_part_label">i.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>59 <em><strong>or </strong></em>50 + 9 </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>higher average/mean/mode/median length in winter;</p>
<p>higher minimum length in winter / none below 225 mm in winter;</p>
<p>higher maximum length in winter / none above 260 mm in autumn;</p>
<p>smaller range (of length) in winter;</p>
<p>higher peaks in winter;</p>
<p>overlap between lengths of 260 and 225 mm;</p>
<p>more data/more caught in winter than in autumn;</p>
<p><em>Allow the converse for any of the mark points.</em></p>
<p><em>Allow size instead of length and allow the two groups to be referred to either by season (autumn/winter) or year (2008/09).</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>migration;</p>
<p>ocean currents;</p>
<p>food availability/distribution;</p>
<p>predation / fishing;</p>
<p>temperature;</p>
<p>location of rivers (flowing into the ocean);</p>
<p>depth of (sea)water;</p>
<p><em>Reject "pollution" and mark only the first two responses.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>11.7 g; <em>(</em><em>accept answers in the range of 11.4 to 13.0 g) </em></p>
<p>1.8 to 13.5 g; <em>(accept answers in the range of 1.6 to 2.0 g and 13.4 to 13.6 g)</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>autumn 2008</em><em>:</em></p>
<p>positive correlation / fork length increases as lipid content increases;</p>
<p><em>winter 2009</em><em>:</em></p>
<p>no correlation / no overall trend; <em>(reject "constant" or "almost same")</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>lipid stores accumulated during summer/in freshwater/before moving out to sea;</p>
<p>food resources/availability may decline rapidly during autumn/winter;</p>
<p>more food close to the shore (than in offshore water);</p>
<p>lipid stores used up during winter / more active/migrating in winter;</p>
<p><em>Do not accept answers relating to the size of O. nerka because O. nerka with similar sizes showed different lipid content values.</em></p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>direct/positive correlation / higher PCB concentration further up the river</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>1000 ng g<sup>–1</sup> <em>(accept answers in the range 950 ng g<sup>–1</sup> to 1050 ng g<sup>–1</sup>)</em></p>
<p><em>Do not award the mark if the units are missing or incorrect. </em></p>
<p><em>Allow units shown as ng g<sup>-1</sup></em>.</p>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>lipids used up so same quantity of PCB in smaller amount of lipid;</p>
<p>no excretion of lipids so same quantity of PCB in smaller amount of lipid;</p>
<p>PCB absorption through gills;</p>
<div class="question_part_label">i.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p align="LEFT">Most candidates read off the two numbers from the bar chart and added them together correctly, though some misread the intervals on the x-axis or read off the values on the y axis incorrectly.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The essential skill in questions such as this is to pick out significant features in the data. The answer should tell the reader the overall differences between the two populations and not simply quote values. There was some overlap between the two populations in fork length but the winter 2009 population had a larger sample size, larger average length and larger maximum and minimum fork lengths. It also had a smaller range of fork lengths than the autumn 2008 population. In future exams the command term ‘compare’ will mean only similarities, not similarities and/or differences.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates suggested two acceptable factors that could affect distribution.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates found it hard to read off values from this scatter graph, perhaps because of the large size of the squares and diamonds used for the data points. Candidates should be reminded that it is the centre of any data point that indicates the precise value, not the upper or lower edges. Because of the difficulties, a relatively wide range of answers was accepted, but even so only about half of candidates gave an acceptable range.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was generally well answered with candidates stating that there was a positive correlation in Autumn 2008 and no correlation in Winter 2009. The commonest mistake was to state that there was no variation in total lipid content in Winter 2009: there was, but no clear trend lipid content according to fork length.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates gave a wide range of reasons for the differences in lipid content. The best answers were from candidates who had read all the information in the question about the biology of Sockeye salmon and had used it to deduce the reason for depletion of lipids in the salmon in winter.</p>
<p>There was confusion in some candidates’ minds between cause and effect, with statements such as that the sea water is colder in winter so the salmon are less active, need less energy and therefore have smaller stores of lipid. If we applied this sort of logic to humans, the reason for obesity would be a need for more stored energy reserves in obese people because they are more active. Some candidates assumed erroneously that the physiology of fish is the same as that of mammals, with constant high body temperature and subcutaneous storage of lipids for heat insulation.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates correctly stated that there is a positive correlation between PCB concentration and distance upstream.</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This proved to be quite a discriminating question, with the strongest candidates working out that if lipids are used up, but PCBs cannot be removed from the body, then the concentration of PCBs in lipids will increase.</p>
<div class="question_part_label">i.</div>
</div>
<br><hr><br>