File "markSceme-HL-paper2.html"
Path: /IB QUESTIONBANKS/4 Fourth Edition - PAPER/HTML/Biology/Topic 2/markSceme-HL-paper2html
File size: 1.89 MB
MIME-type: text/html
Charset: utf-8
<!DOCTYPE html>
<html>
<meta http-equiv="content-type" content="text/html;charset=utf-8">
<head>
<meta charset="utf-8">
<title>IB Questionbank</title>
<link rel="stylesheet" media="all" href="css/application-212ef6a30de2a281f3295db168f85ac1c6eb97815f52f785535f1adfaee1ef4f.css">
<link rel="stylesheet" media="print" href="css/print-6da094505524acaa25ea39a4dd5d6130a436fc43336c0bb89199951b860e98e9.css">
<script src="js/application-13d27c3a5846e837c0ce48b604dc257852658574909702fa21f9891f7bb643ed.js"></script>
<script type="text/javascript" async src="https://cdnjs.cloudflare.com/ajax/libs/mathjax/2.7.5/MathJax.js?config=TeX-MML-AM_CHTML-full"></script>
<!--[if lt IE 9]>
<script src='https://cdnjs.cloudflare.com/ajax/libs/html5shiv/3.7.3/html5shiv.min.js'></script>
<![endif]-->
<meta name="csrf-param" content="authenticity_token">
<meta name="csrf-token" content="iHF+M3VlRFlNEehLVICYgYgqiF8jIFlzjGNjIwqOK9cFH3ZNdavBJrv/YQpz8vcspoICfQcFHW8kSsHnJsBwfg==">
<link href="favicon.ico" rel="shortcut icon">
</head>
<body class="teacher questions-show">
<div class="navbar navbar-fixed-top">
<div class="navbar-inner">
<div class="container">
<div class="brand">
<div class="inner"><a href="http://ibo.org/">ibo.org</a></div>
</div>
<ul class="nav">
<li>
<a href="../../index.html">Home</a>
</li>
<li class="active dropdown">
<a class="dropdown-toggle" data-toggle="dropdown" href="#">
Questionbanks
<b class="caret"></b>
</a><ul class="dropdown-menu">
<li>
<a href="../../geography.html" target="_blank">DP Geography</a>
</li>
<li>
<a href="../../physics.html" target="_blank">DP Physics</a>
</li>
<li>
<a href="../../chemistry.html" target="_blank">DP Chemistry</a>
</li>
<li>
<a href="../../biology.html" target="_blank">DP Biology</a>
</li>
<li>
<a href="../../furtherMath.html" target="_blank">DP Further Mathematics HL</a>
</li>
<li>
<a href="../../mathHL.html" target="_blank">DP Mathematics HL</a>
</li>
<li>
<a href="../../mathSL.html" target="_blank">DP Mathematics SL</a>
</li>
<li>
<a href="../../mathStudies.html" target="_blank">DP Mathematical Studies</a>
</li>
</ul></li>
<!-- - if current_user.is_language_services? && !current_user.is_publishing? -->
<!-- %li= link_to "Language services", tolk_path -->
</ul>
<ul class="nav pull-right">
<li>
<a href="https://06082010.xyz">IB Documents (2) Team</a>
</li></ul>
</div>
</div>
</div>
<div class="page-content container">
<div class="row">
<div class="span24">
</div>
</div>
<div class="page-header">
<div class="row">
<div class="span16">
<p class="back-to-list">
</p>
</div>
<div class="span8" style="margin: 0 0 -19px 0;">
<img style="width: 100%;" class="qb_logo" src="images/ib-qb-46-logo-683ef0176708d789b2acbf6ece48c55de4cd5ddac781fb455afe3540d22d050e.jpg" alt="Ib qb 46 logo">
</div>
</div>
</div><h2>HL Paper 2</h2><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the structure of a ribosome.</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 fibrous and globular proteins with reference to <strong>one</strong> example of each protein type.</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>Auxin is a protein. Explain its role in phototropism.</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>small subunit and large subunit;<br>mRNA binding site on small subunit;<br><span style="text-decoration: underline;">three</span> tRNA binding sites / A, P and E tRNA binding sites;<br>protein <span style="text-decoration: underline;">and</span> RNA composition (in both subunits);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>fibrous proteins are strands/sheets whereas globular proteins are rounded;<br>fibrous proteins (usually) insoluble whereas globular proteins (usually) soluble;<br>globular more sensitive to changes in pH/temperature/salt than fibrous;<br>fibrous proteins have structural roles / other specific role of fibrous protein;<br>globular proteins used for catalysis/transport/other specific role of globular protein;<br>another role of globular protein;<br>named fibrous proteins <em>e.g.</em> keratin/fibrin/collagen/actin/myosin/silk protein;<br>named globular protein <em>e.g.</em> insulin/immunoglobulin/hemoglobin/named enzyme; <br><em>Do not accept statements about fibrous proteins having only secondary structure and globular proteins having only tertiary structure.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>auxin is a plant hormone;<br>produced by the tip of the stem/shoot tip;<br>causes transport of hydrogen ions from cytoplasm to cell wall;<br>decrease in pH / H<sup>+</sup> pumping breaks bonds between cell wall fibres;<br>makes cell walls flexible/extensible/plastic/softens cell walls;<br>auxin makes cells enlarge/grow;<br>gene expression also altered by auxin to promote cell growth;<br>(positive) phototropism is growth towards light;<br>shoot tip senses direction of (brightest) light;<br>auxin moved to side of stem with least light/darker side</p>
<p>causes cells on dark side to elongate/cells on dark side grow faster; <em><br>Accept clearly annotated diagrams for phototropism marking points.</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>Part (a) was generally well answered with many candidates scoring marks by including annotated drawings of ribosomes.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part (b) was also answered well in many cases with most giving acceptable examples of globular and fibrous proteins and their roles. There were some doubtful statements about levels of protein structure. Although tertiary structure is more significant in globular than in fibrous proteins, it is not true to say that fibrous proteins have secondary structure and globular proteins have tertiary and quaternary structure. Most globular proteins have regions of secondary structure. Collagen, perhaps the best example of a fibrous protein, has neither α-helices nor β-pleated sheets within its structure and as it has three polypeptides wound together collagen has quaternary structure.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There was an error in (c) for which the examiners apologise: auxin is of course not a protein and is instead indole ethanoic acid in its naturally occurring form. Unfortunately this mistake was propagated in many candidates‟ answers. Knowledge of the physiology of phototropism was good. The best answers included details of how auxin is moved between cells and its effects on cell walls and growth of cells. <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 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>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>Define the <em>active site</em> of an enzyme.</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 the active site promotes enzyme–substrate specificity.</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 possible effects of acids on enzyme activity.</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>region/site where a substrate binds</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. shape of active site matches that of the substrate;<br>b. chemical properties/charges of active site attract the substrate;<br>c. active site can change to induce fit of substrate;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. changes the charge/ionization of amino acids/R-groups;<br>b. changes 3-D structure (of active site)/tertiary structure / denatures enzyme;<br>c. substrate no longer binds/fits so decreases activity;<br>d. could increase activity if optimum pH of enzyme is acidic;</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 students knew the correct definition of active site.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Better prepared candidates got full marks discussing induced fit. Chemical compatibility was discussed more rarely. Students had surprising difficulty describing the relationship between the shape of the substrate and the shape of the active site.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question differentiated performance well. Many stated that acids denature enzymes. Better prepared candidates mentioned increased activity for enzymes with an optimum pH that was acidic. Better prepared candidates also referenced the altered shape of the active site.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram showing <strong>two</strong> different complementary pairs of nucleotides in a molecule of DNA.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the structure of nucleosomes.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain primary structures and tertiary structures of an enzyme.</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><em>The structures underlined must be labelled.</em><br>at least one nucleotide with <span style="text-decoration: underline;">deoxyribose</span> linked to <span style="text-decoration: underline;">base</span> and <span style="text-decoration: underline;">phosphate</span>;{ <em>Labels need not be on the same nucleotide. Do not allow sugar.</em><br>phosphate and deoxyribose linked C<sub>3</sub> to C<sub>5</sub>;{ <em>Position required, not label.</em> <em>Straight line from C<sub>4</sub> to phosphate is acceptable. Do not penalize if the second strand is not antiparallel and the bonding is therefore incorrect on it.</em><br>(complementary) bases labelled with at least one of each of <span style="text-decoration: underline;">A</span>, <span style="text-decoration: underline;">G</span>, <span style="text-decoration: underline;">T</span> and <span style="text-decoration: underline;">C</span> correctly linked to C<sub>1</sub>;<br><span style="text-decoration: underline;">hydrogen bonds</span> between correct complementary bases;{ <em>Bond numbers not required.</em><br>correct antiparallel orientation shown; (<em>as seen by shape or orientation of sugar</em>)</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(eight) <span style="text-decoration: underline;">histone</span> (proteins);<br>DNA wrapped around histones/nucleosome;<br>further <span style="text-decoration: underline;">histone</span> holding these together; <br><em>Do not allow histone wrapped around DNA.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>primary structure is (number and) sequence of amino acids;<br>joined by peptide bonds;<br>tertiary structure is the folding of the polypeptide/secondary structure/alpha helix;<br>stabilized by disulfide/ionic/hydrogen bonds/hydrophobic interactions;<br>tertiary structure gives three dimensional globular shape/shape of active site;</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 often well answered, with many candidates scoring four marks. The sugar was sometimes labelled as ribose rather than deoxyribose, or simply as sugar. Another common error was to link the phosphate groups to the oxygen in the sugar ring, rather than to C<sub>4</sub> via C<sub>5</sub>.</p>
<p>Stronger candidates often drew impressively detailed and accurate diagrams, with the antiparallel orientation of the strands, the numbers of hydrogen bonds and the molecular structure of deoxyribose and phosphate groups correctly shown. It was possible to score four marks without all of this detail, but it was good to see such high quality answers.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was also well answered by properly prepared candidates. A few misread the question and outlined the structure of nucleotides rather than nucleosomes.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was more poorly answered than expected. Perhaps candidates who knew about the primary and tertiary structure of proteins were unable to transfer this knowledge to a question about enzymes, though they surely knew that enzymes are globular proteins. Many of the candidates who did write about primary and tertiary structure failed to include the essential detail that primary structure is the sequence or order of amino acids. There was some confusion between secondary and tertiary structure and also some over-simplified accounts of tertiary structure. Some candidates stated simply that tertiary structure is three-dimensional structure. It was expected that candidates should at least include the idea that enzymes are globular in their three-dimensional structure.</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 prokaryotic cell.</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 transcription in prokaryotes.</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 prokaryotes cause infectious disease in humans. Explain the principles of vaccination.</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, up to [4 max].</em><br>a. cell wall – a uniformly thick wall;<br>b. pili – hair-like structures connected to cell wall / flagellum – at least length of the cell;<br>c. plasma/cell membrane – represented by a continuous single line; <em>(may be labelled as the innermost wall line)</em><br>d. ribosomes (70S) – drawn as small discrete dots;<br>e. naked DNA/nucleoid – region with DNA not enclosed in membrane;<br>f. plasmid – circular ring of DNA;<br>g. cytoplasm – the non-structural material within the cell; <br><em>Award [2 max] if any eukaryotic structure is shown.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. transcription is the copying of a strand of DNA into RNA/RNA formation;<br>b. RNA polymerase binds to promoter region of DNA;<br>c. anti-sense strand as template / only one strand copied;<br>d. RNA polymerase unwinds DNA/separates the strands;<br>e. RNA nucleotides/nucleoside triphosphates pair with complementary bases on DNA;<br>f. Adenine to Thymine, Cytosine to Guanine, and Uracil to Adenine; <em>(do not accept letters alone)</em><br>g. added at 3' end / strand grows 5' to 3' ;<br>h. RNA nucleotides joined with covalent/sugar-phosphate bonds;<br>i. RNA polymerase separates from DNA when reaches terminator/termination sequence;<br>j. no introns/post-transcriptional modification/RNA splicing (as occurs in eukaryotes);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. vaccines contain a dead/weakened form of the pathogen/bacteria/virus;<br>b. vaccine introduced to the body by injection/on surface of skin/orally;<br>c. antigens in the vaccine cause antibody production;<br>d. antigen/pathogen engulfed by macrophage/phagocyte;<br>e. each type of lymphocyte recognizes specific antigen;<br>f. macrophages activate helper T-cells;<br>g. which activate B-cells;<br>h. B-cells divide to form clones/memory cells;<br>i. B-cells divide to form plasma cells/antibody producing cells;<br>j. result is (specific) immunity;<br>k. vaccination/first exposure causes slow production of antibodies <span style="text-decoration: underline;">and</span> lower level of antibodies; <em>(this idea can be illustrated on a diagram or graph)</em><br>l. contact with the disease leads to rapid production and higher level of antibodies; <em>(this idea can be illustrated on a diagram or graph)</em><br>m. second/booster shot to stimulate memory cells/more production of antibodies;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Overall, candidates performed very well on this question. </p>
<p>The diagram in 5a was well drawn by most. A number of students included eukaryotic structures in their drawings. Flagella were often drawn too short in relation to the overall length of the cell. Pilli were often poorly drawn being shown not connected to the cell. The diameter of ribosomes was often too large in relation to the rest of cell structures.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Overall, candidates performed very well on this question. </p>
<p>Many were able to outline transcription successfully. Some confused transcription with replication. A number referred to helicase as the enzyme responsible for separating and unwinding the helix.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Overall, candidates performed very well on this question. </p>
<p>Most scored well on part c of the question. An area of misunderstanding surrounds what happens upon second exposure to the antigen. It should be noted that antibodies are produced more rapidly and to a higher level.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how plants carry out gas exchange in the leaves.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the causes and consequences of the enhanced greenhouse effect.</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 role of limiting factors in 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>gases/O<sub>2</sub> and CO<sub>2</sub> enter/exit the leaf through the <span style="text-decoration: underline;">stomata</span>;<br>by diffusion / down the concentration gradient;<br><span style="text-decoration: underline;">photosynthesis</span> maintains concentration gradients/high O<sub>2</sub> and low CO<sub>2</sub> in the leaf;<br><span style="text-decoration: underline;">guard cells</span> open the stomata during the day / close the stomata at night;<br>gases/O<sub>2</sub>/CO<sub>2</sub> move through <span style="text-decoration: underline;">air spaces</span> in the spongy (mesophyll);<br>CO<sub>2</sub> <span style="text-decoration: underline;">dissolves</span> in moisture in (mesophyll) cell walls;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>burning of (fossil) fuels/coal/oil/gas releases carbon dioxide;<br>deforestation/loss of ecosystems reduces carbon dioxide uptake;<br>methane emitted from cattle/livestock/melting permafrost/waste dumps;<br>heating of the atmosphere/global warming/climate change;<br>melting of ice caps/glaciers/permafrost / sea level rise / floods / droughts / changes in ocean currents / more powerful hurricanes / extreme weather events / other abiotic consequence;<br>changes in species distributions/migration patterns / increased decomposition rates / increases in pest/pathogen species / loss of ice habitats / other biotic consequence;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>factor nearest its minimum/furthest from its optimum is limiting;<br>increasing a limiting factor with other factors constant increases the rate;<br>increasing a non-limiting factor with other factors constant has no effect on rate;<br>light intensity is limiting in dim/low intensity light / at night;<br>photosynthesis (directly) proportional to intensity up to plateau / graph to show this;<br>light intensity affects the light-dependent reactions/production of ATP/NADPH;<br>temperature limiting at low and high temperatures;<br>optimum temperature with lower rates above and below plateau / graph to show this;<br>low temperatures limit the rate of light-independent reactions/Calvin cycle;<br>RuBP carboxylase/rubisco does not fix carbon dioxide at high temperatures;<br>carbon dioxide concentration is limiting in bright light and warm temperatures;<br>photosynthesis is (directly) proportional to CO<sub>2</sub> concentration up to plateau / graph to show this;<br>low CO<sub>2</sub> concentration limits carbon fixation/reaction between CO<sub>2</sub> and RuBP;</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 based on assessment statement 9.1.3, which includes the relationship between the structure of the leaf and its role in gas exchange. All that was needed was an outline of the structure of the spongy mesophyll, guard cells and stomata, in relation to the diffusion of carbon dioxide into the leaf and oxygen out. Scores were typically poor, with many candidates missing the basic points. More candidates for example for example seemed to state that CAM plants open their stomata for gas exchange at night than that most plants open their stomata in the day. </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Scores were mostly much better in this part of the question, with nearly all candidates at least mentioning warming due the enhanced greenhouse effect and an example of the abiotic and biotic consequences. The cause of the enhanced greenhouse effect was less well understood, with vagueness about what is causing carbon dioxide levels to increase and other greenhouse gases often not mentioned. There was considerable confusion, as so often, between ozone depletion and the greenhouse effect. It is easy to assume that candidates will be able to distinguish between these two phenomena easily and that little teaching is required, but all those who marked this exam will know that careful teaching is very much required.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was another area of relatively poor understanding, perhaps because weaker candidates tended to choose question 7. A basic minimum was to know that light intensity, temperature and carbon dioxide concentration are the three main limiting factors of photosynthesis. Many failed at this first hurdle, omitting one or more of the main three and including instead pH, water availability or various other biotic and abiotic factors. Perhaps some candidates were confusing enzyme activity with photosynthesis. What was required for each of the three factors was a clear statement of the relationship between the level of the variable and the rate of photosynthesis, ideally by means of an annotated sketch graph, and then some details of the reasons for the rate of photosynthesis changing as the level of the variable changed. A common misconception was to say that the rate reduces at higher temperatures because of enzyme denaturation when in fact the rate reduction occurs at much lower temperatures than those at which this would happen. The problem at higher temperatures is due to RuBP carboxylase failing to fix carbon dioxide effectively. </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 thermal, cohesive and solvent properties of water.</p>
<div class="marks">[5]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the role of the kidney in maintaining water balance in humans.</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>water has a high specific heat capacity;</p>
<p>a large amount of heat causes a small increase in temperature;</p>
<p>water has a high latent heat of vaporization;</p>
<p>a large amount of heat energy is needed to vaporize/evaporate water;</p>
<p>hydrogen bonds between water molecules make them cohesive/stick together;</p>
<p>this gives water a high surface tension / explains how water rises up xylem;</p>
<p>water molecules are polar;</p>
<p>this makes water a good solvent;</p>
<p><em>Award <strong>[4 max]</strong> if thermal, cohesive and solvent properties are not all mentioned.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>process of water balance is called osmoregulation;</p>
<p>water passes into the kidney tubules by ultrafiltration;</p>
<p>water is reabsorbed in the proximal convoluted tubule;</p>
<p>water reabsorbed into blood from the (descending limb) of the loop of Henle;</p>
<p>process by osmosis;</p>
<p>transport of salts into the medulla of kidney;</p>
<p>changes salt concentration so water is reabsorbed;</p>
<p>ADH released into blood when water is required;</p>
<p>ADH causes concentrated urine / no/low ADH causes dilute urine;</p>
<p>this causes more reabsorption of water from the collecting duct;</p>
<p>excess water is released as urine;</p>
<p>urine concentration depends on the body’s need for water;</p>
<p>drinking a lot gives dilute urine;</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 missed out on one of the thermal marks as they omitted the large specific heat capacity. Very few students failed to gain a mark in this section.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Only very few candidates scored full marks in this section. There were few correct mentions of ultrafiltration, and many some candidates who described it correctly were more determined to describe the reabsorption of glucose and salts rather than water. The role of ADH was well understood, although weaker candidates were confused as to its actual site of action.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the bonding between DNA nucleotides.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how chemical bonding between water molecules makes water a valuable coolant in living organisms.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State a word equation for anaerobic cell respiration in humans.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration: underline;">hydrogen bonds</span> between nucleotides on opposite strands/ complementary bases/adenine and thymine <span style="text-decoration: underline;">and</span> cytosine and guanine;<br>(<em>reject letters instead of base names</em>)<br>covalent bonds between nucleotides within strands/between sugar/deoxyribose and phosphate;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>hydrogen bonding between water molecules;<br>breaking (hydrogen bonds) needs/removes energy/heat;<br>hydrogen bonds must break when water evaporates/vaporizes;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>pyruvate/pyruvic acid →lactate/lactic acid;<br>glucose → (pyruvate/pyruvic acid) → lactate/lactic acid; <br><em>Accept correct chemical equation with formulae.</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>Almost all candidates knew something about the bonding between nucleotides but in some cases the answers were not precise enough to be awarded marks. A common fault was to describe bonding within nucleotides rather than between nucleotides.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates knew that hydrogen bonds form between water molecules, but often the remainder of the answer was weak. A common misunderstanding was revealed by candidates who stating that hydrogen bonds are strong and therefore take large amounts of energy to break. It should be stressed that individual hydrogen bonds are in fact weak, but because water molecules are small, large numbers of hydrogen bonds are formed within water so collectively they have significant effects. Another area of misunderstanding was the difference between the energy needed to heat up water (heat capacity) and the energy needed to evaporate water. Sweating and transpiration have cooling effects because of the energy needed for evaporation, not raising the temperature of water.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Less than half of candidates were able to give an equation for anaerobic cell respiration in humans. Many included oxygen, carbon dioxide or water in their equation and so were not awarded the mark. Others gave an equation for yeast rather than humans. In some cases the answer was not given in the form of an equation but as long as the substrate and product was correct, the mark was awarded. Both pyruvate and glucose were accepted as the substrate, though glucose was preferable.</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>State <strong>four</strong> functions of proteins, giving a <strong>named</strong> example of each.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the structure of ribosomes.</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 transcription leading to the formation of mRNA.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. structure – collagen;</p>
<p>b. transport – transthyretin / hemoglobin;</p>
<p>c. enzyme/catalyst – lysozyme;</p>
<p>d. movement – actin / tubulin;</p>
<p>e. hormones – insulin;</p>
<p>f. antibodies – immunoglobulin;</p>
<p>g. storage – albumin;</p>
<p><em>Accept any other valid function of proteins with a named example. </em></p>
<p><em>For example sodium potassium pump, but do not accept simply “in membranes” without a clear function. </em></p>
<p><em>To award [4 max], responses need a function of protein and a named example. </em></p>
<p><em>Only accept the first four answers</em>.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. made of protein;</p>
<p>b. made of rRNA;</p>
<p>c. large subunit <span style="text-decoration: underline;">and</span> small subunit;</p>
<p>d. three tRNA binding sites;</p>
<p>e. Aminacyl/A, Peptidyl/P and Exit/E;</p>
<p>f. mRNA binding site (on small subunit);</p>
<p>g. 70S in prokaryotes / 80S in eukaryotes;</p>
<p>h. can be free / bound to RER (in eukaryotes);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <span style="text-decoration: underline;">RNA</span> polymerase; <em>(polymerase number is not required) </em></p>
<p>b. binds to a promoter on the DNA;</p>
<p>c. unwinding the DNA strands;</p>
<p>d. binding nucleoside triphosphates;</p>
<p>e. to the antisense strand of DNA;</p>
<p>f. as it moves along in a 5'→3' direction;</p>
<p>g. using complementary pairing/<span style="text-decoration: underline;">A-U</span> and <span style="text-decoration: underline;">C-G</span>;</p>
<p>h. losing two phosphates to gain the required energy;</p>
<p>i. until a terminator signal is reached (in prokaryotes);</p>
<p>j. RNA detaches from the template and DNA rewinds;</p>
<p>k. RNA polymerase detaches from the DNA;</p>
<p>l. many RNA polymerases can follow each other;</p>
<p>m. introns have to be removed in eukaryotes to form mature mRNA;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most candidates gained some marks here with knowledge of functions of proteins with examples. However many answers were very descriptive rather than “stating with an example” as asked.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most knew about the two ribosome subunits and the mRNA binding site. Very few knew that they were made from protein and rRNA. Several answered that there were 3 binding sites, but not what was bound there (tRNA) or what they were called.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The process of transcription was well known by most candidates who attempted this question.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>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,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" 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>Draw a labelled diagram of the digestive system.</p>
<div class="marks">[4]</div>
<div class="question_part_label"> a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Many people cannot digest lactose and benefit from a diet containing no lactose. Outline the production of lactose-free milk.</p>
<div class="marks">[6]</div>
<div class="question_part_label"> b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how the kidney helps to retain useful substances in the blood and eliminate substances which the body does not need.</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> each for the following structures clearly drawn and correctly labelled.<br></em><span style="text-decoration: underline;">esophagus</span> – connected to top of stomach;<br><span style="text-decoration: underline;">stomach</span> – connected to small intestine;<br><span style="text-decoration: underline;">small</span> and <span style="text-decoration: underline;">large intestines</span> – connected to each other;<br><span style="text-decoration: underline;">liver</span> shown as larger than the stomach with gall bladder shown under/embedded in liver;<br><span style="text-decoration: underline;">gall bladder</span> – connected to the small intestine (via bile duct);<br><span style="text-decoration: underline;">pancreas</span> – connected to small intestine (via pancreatic duct);</p>
<div class="question_part_label"> a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>milk contains lactose / lactose is milk sugar;<br>lactose is broken down to glucose and galactose;<br>by (the enzyme) lactase;<br>which is lacking in people with lactose intolerance;<br>lactose-free milk is sweeter than milk containing lactose;<br>lactase produced by small intestine / produced by yeast sometimes found in milk;<br>can be added directly to milk;<br>immobilized in beads / biotechnological techniques;<br>ultrafiltration of milk to remove lactose;</p>
<div class="question_part_label"> b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration: underline;">ultrafiltration</span> occurs in the glomerulus;<br>basement membrane acts as a filter;<br>preventing proteins/cells from passing;<br>(filtered) substances pass to the Bowman’s capsule;<br>to proximal convoluted tubule (PCT);<br>(where there is) <span style="text-decoration: underline;">selective reabsorption</span>;<br>(in PCT) <span style="text-decoration: underline;">all</span> glucose/amino acids are reabsorbed;<br>(in PCT most) water reabsorbed;<br>surrounding the loop of Henle, is an area of high solute concentration;<br>in distal convoluted tubule, ions are exchanged between filtrate and blood;<br>collecting duct has role in osmoregulation;<br>ADH regulates the amount of water reabsorbed;<br>substances not reabsorbed are eliminated as urine;</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 examiners do realise that they are not testing artistic ability. However all diagrams should be large enough and clear enough to show the connections between the parts. In addition, as the papers are now scanned, the lines should be bold, as should the labelling arrows. Marks were lost for not clearly showing that the oesophagus connected to the stomach, the stomach connected to the small intestine and the small intestine to the large. The location of the connection between the large and small intestine was not well known. The pancreas seemed to float around without any duct leading to the small intestine as did the liver and gall bladder. The liver was often drawn too small.</p>
<div class="question_part_label"> a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most students were quite knowledgeable about lactose intolerance though there were a lot of misspelled words as well as incorrectly applied terms.</p>
<div class="question_part_label"> b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The knowledge of the workings of the kidney seemed to be very school-specific, with whole schools seeming to know little more than there is some filtering at the start and urine is produced in the end. Well-prepared candidates produced some impeccable answers.</p>
<div class="question_part_label"> c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>List the general functions of non-membrane proteins.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the digestion, absorption and assimilation of proteins in humans.</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>Actin and myosin are two proteins found in muscles. Explain how skeletal muscle contracts, including the interaction of these proteins.</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>contraction / movement;<br>acts as a catalyst/enzymes / specific example of an enzyme function;<br>structure / support / specific example of a structural/support role;<br>transport;<br>defence / immunity;<br>as hormones / communication;<br>DNA packing / histones;<br>other function;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>large molecules (proteins) must be digested into small molecules;<br>a protease/pepsin digests proteins into polypeptides;<br>pepsin works in the stomach / requires an acid/low pH/pH 2 to work;<br>polypeptides are digested by a protease/trypsin into amino acids;<br>trypsin acts in the small intestine / requires a basic pH/pH 8/high pH;<br>amino acids absorbed by diffusion/active transport;<br>absorption occurs in the villus/microvilli of the small intestine;<br>(amino acids absorbed) into capillaries;<br>blood carries amino acids throughout the body;<br>amino acids diffuse into cells/are absorbed by active transport;<br>cells use amino acids to build proteins;<br>assimilation is when amino acids become part of a cell;<br>proteins are synthesized at the ribosomes/ER of the cell;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>motor neuron stimulates the muscle fibre;<br>calcium ions are released (from sarcoplasmic reticulum);<br>calcium ions bind to troponin;<br>tropomyosin moved / binding sites of actin revealed;<br>ATP binds (to myosin) causing cross-bridges to break;<br>ATP becomes ADP causing myosin heads to change angle/become cocked;<br>(myosin) heads attach to (new) actin sites/form cross-bridge;<br>ADP released;<br>myosin heads move actin filaments toward centre;<br>making sarcomere shorter;<br>calcium ions are reabsorbed (into the sarcoplasmic reticulum);<br>muscle fibre relaxes; <br><em>Award the above points if shown in a clearly drawn, correctly annotated diagram.</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>The two most common errors for this question occurred when students listed functions of proteins that were membrane proteins and when students were too vague regarding the statement of protein function.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates here strayed from the reference to protein and did not correctly state the breakdown to polypeptides before amino acids. Candidates understood absorption but rarely showed understanding of assimilation. Candidates showed a surprisingly poor ability to summarize the processes involved in protein digestion. Frequently irrelevant aspects of digestion were included such as in the processes involved in digestion of fats and carbohydrates. </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was generally well answered by the majority though the sequencing was often incorrect. The ATP cycle was poorly outlined in the majority of answers.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how abiotic factors affect the rate of transpiration in terrestrial plants.</p>
<div class="marks">[8]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the importance of water to living organisms.</p>
<div class="marks">[5]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. less transpiration/water loss as (atmospheric) humidity rises;</p>
<p>b. air spaces inside leaf are saturated/nearly saturated (with water vapour);</p>
<p>c. smaller concentration gradient with higher atmospheric humidity;</p>
<p>d. more transpiration/water loss as temperature rises/with more heat;</p>
<p>e. faster diffusion / more kinetic energy (of water molecules);</p>
<p>f. faster evaporation (due to more latent heat available);</p>
<p>g. more transpiration/water loss as wind (speed) increases;</p>
<p>h. humid air/water vapour blown away from the leaf;</p>
<p>i. increasing the concentration gradient (of water vapour);</p>
<p>j. more transpiration/water loss in the light;</p>
<p>k. light causes stomata to open / stomata closed in darkness;</p>
<p>l. low CO<sub>2 </sub>concentration inside leaf in bright light so stomata open wider;</p>
<p><em>Accept any of the points if clearly made on an annotated graph.</em></p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. coolant in sweat/in transpiration;</p>
<p>b. water has a high heat of vaporisation / heat taken when hydrogen bonds break;</p>
<p>c. water is cohesive so can pulled up/so can be moved under tension in xylem;</p>
<p>d. water is an excellent/universal solvent/dissolves many different substances;</p>
<p>e. medium for transport in blood/xylem/phloem;</p>
<p>f. medium for metabolic reactions / (metabolic) reactions happen dissolved in water;</p>
<p>g. surface tension due to cohesion allows organisms to live on water surface;</p>
<p>h. water has high heat capacity so much energy required to change its temperature;</p>
<p>i. ice floats so lakes/oceans do not freeze allowing life under the ice;</p>
<p>j. high heat capacity so stable habitat/so temperature of water changes slowly;</p>
<p>k. used in chemical reactions/photosynthesis/hydrolysis in organisms;</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>Accounts of the effects of abiotic factors on the rate of transpiration were mostly good. Few candidates made the point that the air spaces inside the leaf are at or close to saturation with water vapour and very few knew that carbon dioxide concentration can influence transpiration rates through changes in stomatal aperture. Many accounts could have been improved by mentioning how steep concentration gradients are between the air spaces in the leaf and the air outside. This was relevant in relation to both atmospheric humidity and wind speed.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were a lot of possible answers to this question on the importance of water so strong candidates had no difficulty in reaching five marks. Weaker answers were vague and incomplete and sometimes muddled up the properties of water such as coherence and adherence and the various thermal properties.</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 action 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>Explain the roles of specific enzymes in prokaryote DNA replication.</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>Many genetic diseases are due to recessive alleles of autosomal genes that code for an enzyme. Using a Punnett grid, explain how parents who do not show signs of such a disease can produce a child with the disease.</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>Catalyse/speed up reactions</p>
<p>Substrate-specific</p>
<p>Lower the activation energy «of a chemical reaction»</p>
<p>Substrate collides with/binds to <span style="text-decoration: underline;">active site</span></p>
<p>Enzyme–substrate complex formed<br><em><strong>OR</strong></em><br>transition state formed<br><em><strong>OR</strong></em><br>bonds in substrate weakened</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«DNA» gyrase/topoisomerase «II» prepares for uncoiling/relieves strains «in the double helix»</p>
<p>Helicase uncoils/unwinds the DNA/double helix</p>
<p>Helicase separates/unzips/breaks hydrogen bonds between the two strands of DNA</p>
<p>«DNA» primase adds an RNA primer/short length of RNA <em>Accept RNA primase.</em></p>
<p>DNA polymerase III adds «DNA» nucleotides/replicates DNA/synthesizes complementary strand in a <span style="text-decoration: underline;">5’ to 3’ direction</span></p>
<p>DNA polymerase III starts replication/adding nucleotides <span style="text-decoration: underline;">at the primer</span></p>
<p>DNA polymerase I removes the primer<br><em><strong>OR</strong></em><br>replaces RNA with DNA</p>
<p>«DNA» ligase seals the nicks<br><em><strong>OR</strong></em><br>links sections of replicated DNA<br><em><strong>OR</strong></em><br>links Okazaki fragments</p>
<p>DNA polymerase I/DNA polymerase III proofreads for mistakes</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Key or text giving alleles with upper case for dominant allele and lower case for recessive allele/allele causing disease</p>
<p>Reject key showing a sex linked gene such as hemophilia.<br><em>Reject if X or Y chromosomes are shown with the alleles.</em><br><em>Accept Aa or any other upper and lower case letters.</em></p>
<p>Punnett grid showing that both parents can pass on either a dominant or a recessive allele in their gamete</p>
<p><em>For example row and column headings with A and a.</em><br><em>This mark can be awarded if X or Y chromosomes are shown but each parent has one recessive and one dominant allele as if for autosomal inheritance.</em></p>
<p>Four possible genotypes for child correctly shown on grid</p>
<p><em>AA, Aa, aA and aa for example.<br>This mark can be awarded if X or Y chromosomes are shown but the genotypes are correct for autosomal inheritance.</em></p>
<p>Double/homozygous recessive shown having the disease</p>
<p><em>Cannot be awarded with sex linkage.</em></p>
<p>25 % or 0.25 or 1/4 chance of inheriting the disease</p>
<p><em>This mark can be awarded if X or Y chromosomes are shown but the ratio is correct for autosomal inheritance.</em></p>
<p> </p>
<p> </p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This was generally well answered with most candidates able to give enough of the important features of enzyme action to score well. One mistake seen in a number of responses was to state that the active site is on the substrate rather than on the enzyme.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Knowledgeable candidates had no difficulty in scoring full marks by giving an accurate description of the role of enzymes in DNA replication. It was not necessary to focus on the leading and lagging strands as the action of the various enzymes is largely the same, though of course primers are repeatedly added to the lagging strand and then replaced. Some candidates were obviously concerned that they were being asked about prokaryote DNA replication. This is of course the type of DNA replication that is specified by the programme and has been for many years. It is worth making sure that candidates know that they have learned about this rather than eukaryote replication.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This part was very well answered with many candidates scoring full marks. There were a few errors in notation with different letters of the alphabet used for alleles of the same gene or X and Y chromosomes indicating confusion between autosomal and sex-linked genes.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><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>Water is essential to life on Earth. Outline<strong> two</strong> properties of water that are important for 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 roles of the structures in the kidney that maintain the water balance of the blood in humans.</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>solvent: <strong>[2 max]</strong></em><br><span style="text-decoration: underline;">good</span> solvent;<br>due to polarity of water molecules many different substances dissolve in it;<br>most chemical reactions of living organisms occur in solution / transport medium;</p>
<p><em>cohesion: <strong>[2 max]</strong></em><br>cohesive/cohesion between adjacent water molecules;<br>due to hydrogen bonds;<br>long columns of water in xylem/transpiration stream / surface tension;</p>
<p><em>heat: <strong>[2 max]</strong></em><br>high heat capacity / large amounts of energy needed to change temperature;<br>energy needed to break hydrogen bonds;<br>important habitat as temperature more stable / blood disperses heat through body;</p>
<p><em>cooling:<strong> [2 max]</strong></em><br>evaporative cooling / high heat of vaporization/latent heat;<br>heat used to break hydrogen bonds so water can change to gas;<br>cooling effect of transpiration on leaves/sweat evaporation from skin/dogs panting;</p>
<p><br><em>greatest density at 4<sup>o</sup>C:</em><br>allows ice to form on top of water;<br>fish/living organisms are insulated below; [<strong>4 max]</strong></p>
<p><em>(Accept first two properties only)</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>water is filtered freely from blood to Bowman’s capsule;<br>majority/80 % of water in filtrate reabsorbed in proximal convoluted tubule;<br>water balance in blood controlled as filtrate passes through collecting duct;<br>descending loop of Henle has water channels/aquaporins/is permeable to water;<br>loop of Henle creates hypertonic conditions in medulla;<br>water moves from tubule to hypertonic more concentrated medulla;<br>ascending loop (of Henle) impermeable to water;<br>Na+/NaCl actively transported out of (thick portion of) ascending limb;<br>anti-diuretic hormone/ADH controls permeability of collecting duct to water;<br>ADH released when blood too concentrated/hypertonic / <em>vice versa;</em><br>aquaporin channels (in collecting duct) allow water to exit;<br>collecting duct passes through increasing gradient in kidney/medulla;<br>gradient causes reabsorption of more water by osmosis;<br>small volumes excreted if solute concentration too high/blood too concentrated / <em>vice versa</em>;<br><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 knew something about the properties of water, with very weak candidates simply saying that we cannot live without it. Some confused high (specific) heat capacity and high (latent) heat of vaporisation.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The functioning of the kidney did not seem to have been taught in some centres, with some weaker candidates not knowing much more than the fact that it is where urine is produced.</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 src="data:image/png;base64,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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="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>Outline how <strong>three</strong> properties of water enhance its use by living organisms.</p>
<div class="marks">[6]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the role of ADH in osmoregulation.</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 water is moved from roots to leaves in terrestrial 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>cohesive properties help in transpiration pull/movement of water in plants;<br>high surface tension allows some animals to stride across its surface;<br>high latent heat of evaporation/large amounts of energy required for evaporation makes it a good coolant;<br>high specific heat capacity causes it to maintain environmental temperatures;<br>low density as ice forms insulation of lakes allowing life below;<br>transparency for photosynthesis;<br>transparency for vision in animals;<br>solvent properties make it the medium for metabolic reactions;<br>solvent properties allow transport of (soluble) molecules/food;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>osmoregulation is control of water balance in organisms/blood/tissues/ cytoplasm;<br>ADH regulates water levels/solute concentration of the blood;<br>produced/released when water in blood is too low;<br>it increases the permeability of the collecting ducts / increase in the reabsorption of water;<br>leads to more aquaporins (in collecting duct cell membranes);<br>lower volume/less urine is produced/urine more concentrated;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>water enters roots through the root hairs by osmosis;<br>root hairs provide an extended surface area (for active transport and osmosis);<br>active transport of ions from soil into the roots (enhances osmotic pressure);<br>osmotic pressure moves water into the xylem;<br>water is carried (in a transpiration stream) in the xylem;<br>adhesion of water to the inside of the xylem helps move water up;<br>cohesion of water to itself enhances water movement up the xylem;<br>water diffuses into air spaces (in spongy mesophyll) of leaves;<br>it passes out through the stomata by evaporation/transpiration;<br>evaporation sets up a transpiration pull that keeps the water moving;<br>guard cells control the rate of transpiration pull/evaporation;<br>xylem vessels are tubes with helical rings to enhance water movement/resist low pressure;</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 did not understand the difference between heat capacity and specific heat capacity. Heat capacity is a property of a quantity of matter. For example, two litres of water has a greater heat capacity than one litre of water. Specific heat capacity is a property of certain substance. Water has a greater specific heat capacity than iron. Nor did they understand why water made for a good coolant. Many focused too narrowly on an aspect of thermal, cohesive or solvent properties rather than discussing these properties from a more "big picture‟ perspective.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The role of ADH was well described an many candidates scored full marks here. Students need to take greater care when using the term concentration as water represents the solvent.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was generally well answered.</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>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>Draw a labelled diagram of the ultrastructure 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>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 the structure of the ribosome is related to its function in 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 any of the following clearly drawn and correctly labelled.</em><br>cell wall; (<em>shown as a double line</em>)<br>plasma membrane; (<em>less than the width of wall</em>) (<em>reject inner surface of cell wall labelled as cell membrane</em>)<br>nucleoid/(region containing) naked DNA (distinguished from rest of cytoplasm)<br>ribosome; (<em>dots in cytoplasm</em>)<br>cytoplasm;<br>flagella; (<em>at least a quarter as long as the cell</em>)<br>pili; (<em>less than a quarter as long as the cell</em>) <br><em>Award <strong>[3 max]</strong> if any specifically eukaryotic structure shown.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>helicase uncoils DNA/splits DNA into two strands;<br>(RNA) primase adds short length of RNA/primer;<br>primer allows attachment of (DNA) polymerase;<br>DNA polymerase III copies DNA;<br>adds nucleotides in the 5′ to 3′ direction;<br>uses deoxynucleoside triphosphates/nucleotides that are free in cell;<br>two phosphates removed to release energy (required for the process);<br>(complementary base pairing of) adenine with thymine and guanine with cytosine; (<em>reject A with T and C with G</em>)<br>(leading) strand replication towards the replication fork;<br>short pieces of daughter DNA / Okazaki fragments (on lagging strand);<br>DNA polymerase I removes the RNA primers/replaces them with DNA;<br>(DNA) ligase joins short fragments/seals nicks;<br>by making sugar-phosphate bond;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>translation is protein/polypeptide synthesis;<br>formed by (ribosomal) RNA and proteins; (<em>both needed</em>)<br>about 20nm/30nm / 80S in eukaryotes;<br>organized into a tertiary structure/globular shape;<br>a small subunit and a large one;<br>(three) binding sites for tRNA on/in large subunit;<br>A, P and E sites;<br>binding site for mRNA on surface/in small subunit;<br>two tRNA can bind at the same time;<br>ribosomal RNA catalyses formation of peptide bond;</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 drew an appropriate diagram of a prokaryote cell and there was a continuation of the improvement in the quality of diagrams that has been seen over recent years. In a few cases, eukaryote structures such as mitochondria had been included. Pili and flagella were not always distinguishable.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Replication is a complicated process and candidates were expected to be able to describe it in detail in (b). The strongest candidates did this admirably well, but weaker ones tended to reveal misunderstandings or gaps in knowledge. It is usually possible for examiners to distinguish between those who have developed a genuine understanding and others who may have memorized some key phrases but are unable to use them correctly in context.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The emphasis in the answer to part (c) of the question needed to be on ribosome structure, rather than the process of translation. There were some detailed descriptions of translation that made only passing reference to structure and so scored poorly. Diagrams were often included but they needed to be annotated fully to gain marks for a particular idea. Some of the best answers included the idea that ribosomes are composed of both protein and ribosomal RNA, with the RNA having a catalytic role in translation.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Nitrogen is part of many important substances in living organisms.</p>
<p>Draw labelled diagrams to show a condensation reaction between two amino acids.</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>Nitrogen is part of many important substances in living organisms.</p>
<p>Distinguish between transcription and translation.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Nitrogen is part of many important substances in living organisms.</p>
<p>Explain how insects excrete nitrogenous wastes.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. at least one of the amino acid structures completely correct</p>
<p>b. peptide bond shown with N–C and C=O and N–H correct</p>
<p>c. release of water clearly shown</p>
<p><img src="data:image/png;base64,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" width="254" height="177"></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. DNA is transcribed <em><strong>AND</strong></em> mRNA is translated</p>
<p style="padding-left: 30px;"><em>Disallow the first mark, if a candidate gets transcription and translation the wrong way round, but allow marks</em><br><em>after that up to <strong>[3 max]</strong></em></p>
<p>b. transcription produces RNA <em><strong>AND</strong></em> translation produces polypeptide/protein</p>
<p>c. RNA polymerase used in only in transcription and ribosomes only in translation</p>
<p>d. transcription in the nucleus «of eukaryotes» and translation in the cytoplasm</p>
<p>e. tRNA needed for translation but not transcription</p>
<p>f. nucleotides linked in transcription and amino acids in translation</p>
<p><em><strong> OR</strong></em></p>
<p> sugar-phosphate/phosphodiester bonds in transcription and peptide bonds in translation</p>
<p><em><strong>[Max 4 Marks]</strong></em></p>
<p> </p>
<p><em> </em></p>
<p> </p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. excreted as uric acid</p>
<p>b. excretion by Malpighian tubules</p>
<p>c. nitrogenous waste/ammonia «accumulates» in hemolymph</p>
<p>d. nitrogenous waste/ammonia absorbed by Malpighian tubules</p>
<p>e. ammonia converted to uric acid</p>
<p>f. conversion to uric acid requires energy/ATP</p>
<p>g. high solute concentration in Malpighian tubules</p>
<p><em><strong> OR</strong></em></p>
<p> active transport of ions/Na+/K+ into Malpighian tubules</p>
<p>h. water absorbed by osmosis flushes uric acid/nitrogenous waste to «hind» gut</p>
<p>i. water/ions reabsorbed from the feces and returned to hemolymph</p>
<p>j. uric acid precipitates/becomes solid/forms a paste so can pass out with little water</p>
<p>k. uric acid excreted/egested with the feces</p>
<p>l. water conservation/osmoregulation</p>
<p><em><strong> OR</strong></em></p>
<p> reduces mass of water «in body»</p>
<p>m. uric acid is non-toxic</p>
<p><em><strong>[Max 8 Marks]</strong></em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Defence occurs on the micro and macro levels.</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the functioning of immunoglobulins.</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 how antibiotics offer protection from certain forms of infectious disease.</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>Coughing to clear the airways is accomplished by muscle contractions. Explain muscle contraction.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. «immumoglobulins are/function as» <span style="text-decoration: underline;">antibodies </span></p>
<p>b. variety of binding sites / variable regions for binding </p>
<p>c. <span style="text-decoration: underline;">specific</span> to antigens on bacteria/viruses/pathogens </p>
<p>d. constant region aids destruction of the bacteria/virus/pathogen </p>
<p>e. attracts phagocytes/macrophages to engulf pathogen </p>
<p>f. bursting pathogen cells/agglutination/neutralizing toxins/other example of the action of antibodies</p>
<p><em>Award marks for an annotated diagram</em>.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. protect against/kill/inhibit growth of microorganisms/bacteria/prokaryotes </p>
<p>b. bacteria/prokaryote processes blocked but not processes in eukaryotes/other organisms </p>
<p>c. block metabolic pathways/DNA replication/DNA transcription/translation/ribosome functioning/cell wall formation </p>
<p>d. do not protect against viruses as they have no metabolism/are non-living </p>
<p>e. antibiotics fail to protect if bacteria have resistance </p>
<p>f. can be used in humans/animals because antibiotics do not affect eukaryotic cells/bacterial metabolism is different</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <span style="text-decoration: underline;">myofibrils</span> «in muscle fibers/cells» </p>
<p>b. <span style="text-decoration: underline;">sarcomeres</span> «are the repeating units in muscle/myofibrils» </p>
<p>c. <span style="text-decoration: underline;">sarcomeres</span> arranged end to end / <span style="text-decoration: underline;">sarcomeres</span> shorten during muscle contraction </p>
<p>d. actin and myosin/overlapping protein filaments/diagram to show sarcomere with actin and myosin overlapping </p>
<p>e. dark and light bands «in sarcomeres»/diagram to show this/light bands narrower when muscle is contracted </p>
<p>f. thick filament is myosin and thin filament is actin/diagram to show this </p>
<p>g. nerve impulses stimulate contraction/cause depolarization of sarcolemma/T-tubules/trigger release of calcium from sarcoplasmic reticulum </p>
<p>h. calcium ions released from sarcoplasmic reticulum/bind to troponin </p>
<p>i. <span style="text-decoration: underline;">troponin</span> causes tropomyosin to move/exposes binding sites on actin </p>
<p>j. myosin «heads» form cross bridges with/bind to actin </p>
<p>k. <span style="text-decoration: underline;">myosin heads</span> move/change angle/swivel/cock / <span style="text-decoration: underline;">myosin heads</span> cause the power stroke </p>
<p>l. myosin filaments pull actin towards center of sarcomere/more overlap between actin and myosin/Z-lines move closer </p>
<p>m. <span style="text-decoration: underline;">ATP</span> is used «to provide energy»/cause cross-bridges to break/cause movement of myosin heads/cause filaments to slide/cause muscle contraction </p>
<p>n. intercostal/abdominal/diaphragm muscles contract «to cough»</p>
<p><em>Marks can be awarded for any point made clearly on an annotated diagram</em>.</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram showing the ultra-structure of a liver cell.</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 prokaryotic cells and eukaryotic cells.</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 prokaryotic DNA replication.</p>
<div class="marks">[8]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>Award <strong>[1]</strong> for each structure clearly drawn and correctly labelled. Whole cells not necessary.</em><br>(plasma) membrane – single line surrounding cytoplasm;<br>nucleus – with a double membrane and pore(s) shown;<br>mitochondria(ion) – with a double membrane, the inner one folded into internal projections, shown no larger than half the nucleus;<br>rough endoplasmic reticulum – multi-folded membrane with dots/small circles on surface;<br>Golgi apparatus – shown as a series of enclosed sacs with evidence of vesicle formation;<br>ribosomes – dots/small circles in cytoplasm/ribosomes on rER;<br>lysosome; <br><em>Award <strong>[0]</strong> if plant cell is drawn. Award <strong>[2 max]</strong> if any plant cell structure (e.g. cell wall) is present.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img src="data:image/png;base64,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" alt></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA replication is semi-conservative / each strand of DNA acts as template;<br>(DNA) helicase separates two strands/forms a replication fork;<br>new strand built / nucleotides added in a 5' to 3' direction;<br>(deoxy)nucleoside triphosphates hydrolysed to provide energy for nucleotide formation/base pairing;<br>on one strand DNA polymerase III builds continuous strand;<br>on other strand short chains of DNA/Okazaki fragments are formed;<br>each short chain starts with RNA primer;<br>added by RNA primase;<br>then remainder of chain of DNA built by DNA polymerase III;<br>DNA polymerase I removes RNA primer and replaces it by DNA;<br>DNA ligase joins DNA fragments together forming complete strand;<br>replication only occurs at a single replication fork; <br><em>Award credit for any of the above points clearly drawn and accurately labelled.</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>In the light of answers seen by examiners, perhaps the question should have given candidates a clearer pointer to what was expected. The quality of drawings was very variable. Marks were only awarded for structures clearly drawn and labelled. The mark scheme for this paper gives details of the criteria that examiners used. It was not necessary to draw a whole cell, as this would have involved drawing organelles repeatedly, but at least one of each organelle type, accurately drawn, was needed.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was often answered by means of a table. This was particularly appropriate here as the question asked for prokaryote and eukaryote cell structure to be distinguished, rather than compared, so only differences were required. Tables help to ensure that candidates give both sides of a distinguishing feature. This approach only works if candidates fully understand the features, which they did not in some cases. For example, naked DNA in prokaryotes was often matched with DNA enclosed in a nucleus in eukaryotes, rather than with DNA associated with histone proteins. Mesosomes were given as an equivalent of mitochondria although most bacteriologists now regard the mesosome as an artefact of preparation for electron microscopy, rather than as a functionally significant structure. The current IB Biology programme does not refer to mesosomes.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This may also have discouraged answers from some candidates, as it referred to DNA replication in prokaryotes. This is how assessment statement 7.2.2 is phrased, so the wording of the question was acceptable, but there were some answers that showed some candidates had been confused. Some wrote about binary fission, about the replication of a circular DNA molecule, or even about the cell cycle and mitosis. However, stronger candidates coped extremely well and quickly amassed eight marks. The best answers explained the method of replication on the leading strand and then explained how and why the process was different on the lagging strand.</p>
<div class="question_part_label">c.</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 equation below shows the production of glucose and galactose from lactose.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Glucose and galactose are examples of monosaccharides. State<strong> one</strong> other example of a monosaccharide.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>There are several different types of carbohydrate. State which type of carbohydrate lactose is.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the type of chemical reaction that occurs when lactose is digested into glucose and galactose.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Simple laboratory experiments show that when the enzyme lactase is mixed with lactose, the initial rate of reaction is highest at 48°C. In food processing, lactase is used at a much lower temperature, often at 5°C. Suggest reasons for using lactase at relatively low temperatures.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>fructose/ribose/ribulose/deoxyribose other monosaccharides apart from glucose and galactose</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>disaccharide</p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>hydrolysis</p>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>less denaturation / enzymes last longer at lower temperatures;<br>lower energy costs / less energy to achieve 5°C compared to 48°C;<br>reduces bacterial growth / reduces (milk) spoilage;<br>to form products more slowly / to control the rate of reaction;</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This was a question which illustrated clearly the difference between different centres. Most had obviously been well prepared and found the factual elements simple. </p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a question which illustrated clearly the difference between different centres. Most had obviously been well prepared and found the factual elements simple. </p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a question which illustrated clearly the difference between different centres. Most had obviously been well prepared and found the factual elements simple. </p>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was better answered than part (c) with the use of the lower temperature often being understood to relate to less denaturation of enzymes or longer lasting enzymes or less spoilage, but some considered that it changed the amount of the monosaccharides produced rather than the rate of production.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Most of the DNA of a human cell is contained in the nucleus. Distinguish between unique and highly repetitive sequences in nuclear DNA.</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>Draw a labelled diagram to show <strong>four</strong> DNA nucleotides, each with a different base, linked together in <strong>two</strong> strands.</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 methods and aims of DNA profiling.</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 <span style="text-decoration: underline;">pair</span> of statements in the table and <strong>[1]</strong> for any statement below the table.</em></p>
<p><em><img src="data:image/png;base64,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" alt></em></p>
<p>satellite DNA is repetitive;<br>repetitive sequences are used for profiling;<br>prokaryotes do not (usually) contain repetitive sequences</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Award <strong>[1]</strong> for each of these structures clearly drawn and labelled.</em><br><span style="text-decoration: underline;">four</span> nucleotides shown in diagram with one nucleotide clearly labelled;<br>base, phosphate and <span style="text-decoration: underline;">deoxyribose</span> (shown as pentagon) connected between the correct carbons and labelled at least once;<br>backbone labelled as covalent bond between nucleotides correctly shown as 3' to 5' bond;<br>two base pairs linked by hydrogen bonds drawn as dotted lines and labelled;<br>two H bonds between A and T and three H bonds between C and G;<br><span style="text-decoration: underline;">adenine</span> to <span style="text-decoration: underline;">thymine</span> and <span style="text-decoration: underline;">cytosine</span> to <span style="text-decoration: underline;">guanine</span>; <em>do not accept initials of bases</em></p>
<p>antiparallel orientation shown;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA sample obtained;<br>from hair/blood/semen/human tissue;<br>DNA amplified / quantities of DNA increased by PCR/polymerase chain reaction;<br>satellite DNA/highly repetitive sequences are used/amplified;<br>DNA cut into fragments;<br>using restriction enzymes/restriction endonucleases;<br>gel electrophoresis is used to separate DNA fragments;<br>using electric field / fragments separated by size;<br>number of repeats varies between individuals / pattern of bands is unique to the individual/unlikely to be shared;<br><em>Award <strong>[5 max]</strong> for methods</em></p>
<p>forensic use / crime scene investigation;<br>example of forensic use <em>e.g.</em> DNA obtained from the crime scene/victim compared to DNA of suspect / other example of forensic use;<br>paternity testing use <em>e.g.</em> DNA obtained from parents in paternity cases;<br>biological father if one half of all bands in the child are found in the father;<br>genetic screening;<br>presence of particular bands correlates with probability of certain phenotype / allele;<br>other example;<br>brief description of other example; <br><em>Award <strong>[4 max]</strong> for aims</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Knowledge of the nature of unique and repetitive sequences of DNA was very poor. Very few scored anywhere near full marks. Often odd marks could be picked up by linking widely separated comments, as descriptions of the two types were attempted. Where candidates possessed knowledge, some did not follow the command to distinguish the two types of sequences.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was a difficult diagram to draw unless it had been well learnt and many showed that this had not been achieved. A few were good enough to get every possible mark and exceed the maximum. The antiparallel nature of the two strands, arrangement of base, phosphate and deoxyribose and the base pairing relationship were widely known. Individual nucleotides were almost never identified. Hydrogen bonds were indicated with a solid line suggesting that they were equivalent to covalent bonds. Sometimes the bases were only given as letters. Commonly, more than four nucleotides were shown.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>It was clear that this was a popular section but accounts were still rather vague and unscientific. “Suspects can be identified” and “paternity can be decided” but without any indication of having a DNA sample first and then another with which to compare. <br>Very few mentioned using satellite /repetitive sequences in creating a DNA profile. Gel electrophoresis was often outlined but specifics were missing such as the use of restriction enzymes and the creation of a pattern of DNA fragments. Some accounts confused karyotyping and amniocentesis with DNA profiling.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;">Draw molecular diagrams to show the condensation reaction between two amino acids to form a dipeptide.</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 style="text-align: left;">Outline the roles of the different binding sites for tRNA on ribosomes during translation.</p>
<div class="marks">[4]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;">Explain the production of antibodies.</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>a. each amino acid with a COO–/COOH group at one end <em><strong>AND</strong></em> a NH<sub>2</sub>/NH<sub>3</sub><sup>+</sup> at the other <br><em>Both needed</em>.<br><em>mp a requires the double bond to be shown between the C and O</em>.<br><br>b. CH in middle with H or R group attached </p>
<p>c. peptide bond correctly drawn between N and C=0 </p>
<p>d. COO–/COOH group at one end of dipeptide <strong><em>AND</em></strong> NH<sub>2</sub>/NH<sub>3</sub><sup>+</sup> at other end <br><em>Both needed</em>.</p>
<p>e. loss of water</p>
<p><img src="data:image/png;base64,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"></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. A, P and E binding sites are on the large subunit of the ribosome </p>
<p>b. initiation of translation starts with binding of met-tRNA to the start codon </p>
<p>c. large sub-unit binds with «start» tRNA in the P site </p>
<p>d. A binding site holds the tRNA with the next amino acid to be added </p>
<p>e. peptide bond is formed between the amino acids of the A site and the polypeptide at the P site </p>
<p>f. polypeptide is transferred to the tRNA in the A site </p>
<p>g. the tRNA «with polypeptide» in A site then moves to P site<br><em><strong>OR</strong></em><br>P binding site holds the tRNA attached to the growing polypeptide </p>
<p>h. E binding site «exit» is where the tRNA «from P site without amino acid» leaves the ribosome</p>
<p><em>Accept annotated diagrams of the sites</em>.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. each antibody corresponds to a specific antigen </p>
<p>b. antibodies are necessary for immunity/resistance to «infectious» disease </p>
<p>c. macrophage/phagocyte ingests/engulfs pathogen </p>
<p>d. macrophage/phagocyte digests pathogen </p>
<p>e. macrophage/phagocyte displays antigen from pathogen </p>
<p>f. antigens of a pathogen correspond to a specific T lymphocytes/cells<br><em><strong>OR</strong></em><br>T lymphocytes/cells are activated by antigen binding </p>
<p>g. T lymphocytes/cells activate B lymphocytes/cells </p>
<p>h. «B cells» divide by mitosis to form many/clones of plasma cells </p>
<p>i. plasma cells secrete specific antibody </p>
<p>j. some «activated» B lymphocytes/cells act as memory cells</p>
<p><em>Accept annotated diagrams of the process</em></p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>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 src="data:image/png;base64,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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="specification">
<p>The diagram below shows two nucleotides linked together to form a dinucleotide.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the chemical group labelled I.</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>State the type of bond labelled II.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish between the sense and antisense strands of DNA during transcription.</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>Compare the DNA found in prokaryotic cells and eukaryotic cells.</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>phosphate</p>
<div class="question_part_label">a (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>covalent / phosphodiester</p>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><span style="text-decoration: underline;">only</span> the antisense strand is transcribed / the antisense strand is transcribed to mRNA <span style="text-decoration: underline;">and</span> the sense strand is not transcribed/has the same base sequence as mRNA (with uracil instead of thymine)<br><em>To award [1], reference must be made to both strands and transcription.</em></p>
<div class="question_part_label">b.</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>Award marks for <span style="text-decoration: underline;">paired statements</span> only. Answers do not need to be shown in a table format.</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>In part (i), virtually all students identified the phosphate group.</p>
<div class="question_part_label">a (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most were also able to identify the covalent or phosphodiester bond, although some stated it was an H bond. </p>
<div class="question_part_label">a (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question was difficult for most students, although some wrote correct answers. In some scripts, students answered in terms of 3' → 5', whereas others did not refer to the two strands, nor did they relate them to transcription.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Few students got full marks as they did not compare relative characteristics. For example, it appears that many candidates interpret "naked" DNA as not being within a nuclear envelope. With this assumption, it is more difficult for them to gain mark on correct pairs of statements. <br><br></p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>Cells in the alveolus wall produce a surfactant. Its function is to prevent alveoli collapse at the end of expiration. Surfactants are used in the treatment of respiratory system disease in premature babies.</p>
<p>The table shows some of the components of different surfactant preparations.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>The effect of three different surfactants on the growth of three types of bacteria was assessed. Group B streptococci (GBS), <em>Staphylococcus aureus</em>, and <em>Escherichia coli</em> were incubated with three different concentrations of surfactant (1, 10 and 20 mg ml<sup>–1</sup>).</p>
<p>The bar charts show whether each concentration of surfactant increased or decreased bacterial growth, compared with the growth without surfactant. The difference in growth is shown as colony forming units (CFU) per millilitre.</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 surfactant that contains the least amount of phospholipids.</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 composition of natural human surfactant with synthetic surfactants.</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>Phospholipids found in the surfactants form a surface film on the moist lining of the alveoli. Outline how the hydrophilic and hydrophobic parts of the phospholipids in the surfactants are aligned on the alveolar surface.</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>Identify the effect of increasing the concentration of synthetic surfactant A on the growth of GBS.</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 effect of the three surfactants, synthetic surfactants A and B and the modified human surfactant, on the growth of the different bacteria at a concentration of 20 mg ml<sup>–1</sup>.</p>
<div class="marks">[3]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Using all the data provided, evaluate the hypothesis that the presence of proteins in surfactants can decrease bacterial growth. </p>
<div class="marks">[3]</div>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>natural human (surfactant)</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>main component of all surfactants is phospholipids;<br>(natural human surfactant ) has less phospholipids (than synthetic surfactants);<br>(natural human surfactant) has more cholesterol (than (synthetic surfactant) A);<br>(natural human surfactant) has more free fatty acids than (synthetic surfactant) A and less than (synthetic surfactant) B; (<em>comparison with both synthetic surfactants required</em>)<br>(natural human surfactant) has more proteins (than synthetic surfactants);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>hydrophilic groups facing the surface/are in the moist lining/water and hydrophobic tails facing outwards/are in the air <br><em>Award <strong>[0]</strong> for a description of a phospholipid bilayer. The orientation of both hydrophilic and hydrophobic parts must be included.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>growth reduced (by increases in concentration)/negative correlation</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>The question asks to compare how each surfactant affects each bacterium. However, some responses will instead compare how each bacterium is affected by each surfactant. Accept both types of answer.</em></p>
<p>(synthetic surfactant) A decreases growth of GBS most and <em>S. aureus</em> and <em>E. coli</em> much less/slightly;<br>(synthetic surfactant) B decreases the growth of GBS (and of <em>S. aureus</em> slightly) but increases the growth of <em>E. coli</em>;<br>modified human surfactant decreases growth of GBS (and <em>S. aureus</em>) but no (significant) effect on <em>E. coli</em>;<br>GBS greatly inhibited by (synthetic surfactant) A but less/slightly by (synthetic surfactant) B and modified human surfactant;<br><em>S. aureus</em> (slightly) inhibited by all three surfactants;<br><em>E. coli</em> increased by (synthetic surfactant) B but (synthetic surfactant) A and modified human surfactant have no significant effect;</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(<em>hypothesis supported as</em>)<br>(synthetic surfactant) A has proteins and decreases bacterial growth;</p>
<p>(<em>hypothesis not supported as</em>)<br>modified human surfactant has no proteins and decreases bacterial growth;<br>(synthetic surfactant) B has proteins and enhances growth (of <em>E. coli</em>);<br>GBS inhibited more by modified human surfactant which has no protein than (synthetic surfactant) B which has protein;<br><em>S. aureus</em> inhibited more by modified human surfactant which has no protein than by the other (surfactants) which have protein; <br><em>Do not accept answer without reference to proteins.</em></p>
<div class="question_part_label">f.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Part (a) was an easy first question to give candidates confidence. Almost all answered it correctly.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates also answered part (b) successfully. There were plenty of possible comparisons to make and only two acceptable ones were needed for full marks. <br><br></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part (c) was the hardest part of Question 1. Most candidates described or drew a diagram of a phospholipid bilayer. This was not accepted as the question stated that the phospholipids formed a film on the surface of the moist lining of the alveoli. The phospholipids will therefore be in contact with the aqueous solution on one side and air in the alveolus on the other side. The expected answer was a phospholipid monolayer with the hydrophilic heads facing the water and the hydrophobic tails facing the air. Even the strongest candidates struggled with this.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In part (d) there were some very clear and accurate answers, but also many that showed either imperfect understanding of the data or ambiguous phrasing of the answer. The data showed that increases in the concentration of surfactant A caused greater and greater decreases in the growth of GBS. The ambiguous answers included statements such as “Surfactant A increased negative growth”.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The problem in part (e) was to cope with the large amount of data: the effects of three concentrations of three surfactants on the growth of three types of bacteria, though candidates should have only considered the highest of the three concentrations. The best answers worked systematically through the data by comparing either the effects of each surfactant in turn or the effects of the surfactants on each bacterium in turn. A fault in some answers was failure to make genuine comparisons and instead to describe only a single part of the data at once. Another common fault was to ignore the sizes of the effects on the bacteria and thus whether they were significant or not. Given that the y-axis scales were logarithmic, small bars above or below the zero line were not significant.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part (f) was quite challenging. Some candidates failed at the first hurdle, which was to look at the table of data at the start of Question 1 to find out the protein content of each of the three surfactants expected in the answer here. Having done this, it was not too difficult to see that there was some evidence for the hypothesis from surfactant A. It contained the most protein and inhibited the growth of each species of bacterium, albeit only to a small extent with Staphylococcus aureus and Escherichia coli. The remainder of the data did not fit the hypothesis.</p>
<div class="question_part_label">f.</div>
</div>
<br><hr><br><div class="specification">
<p>Migrating birds must refuel along the way in order to continue flying. A field study was conducted among four different species of migrating birds known to stop at high quality and low quality food sites. Two techniques were used to assess food quality in the stopover sites. Birds were captured and weighed at the two sites. Blood samples were taken from the birds to determine nutrient levels in their blood. The two techniques were compared for their effectiveness.</p>
<p>The table below shows data collected from the two sites during one season.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>A method was used to determine the average mass change in grams per hour (gh<sup>-1 </sup>) during the study. Graph A represents a summary of data collected during one season whereas Graph B represents a summary of data collected over 17 years. </p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>Among birds, high triglyceride concentration in blood plasma indicates fat deposition whereas high butyrate concentration in blood plasma indicates fat utilization and fasting. The following data summarizes triglyceride levels and butyrate levels measured for the same groups of birds.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAmcAAAG0CAIAAAD4khdaAAAgAElEQVR4nO2dz6skR37g/V+8Oo1hjAbGWGIXuorxjvEe+jZGA6+psiXj9co7BsMYXlN1E17BGDeMoal3GhpaN8EY8iCQQAeBDoI8vEN7dRjoAR0SWtAGQR90aOhDw2M39/D1++r7IvJHVFZGZkbW50PxeK9eVkZGVkR84ldG/EEJAAAAYfzB2BcAAACQDFgTAAAgFKwJAAAQCtYEAAAIBWsCAACEgjUBAABCwZoAAAChYE0AAIBQsCYAAEAoWBMAACAUrAkAABAK1gQAAAgFawIAAISCNaGW3Xa7ODurfFUevzg7u9zvW8+5Wi4jXOx/crnfV15e3fuVFEWxODvLsiz2VcHsqcxEm/V67OtqISQvh5Nl2eLsrCiKvk44LlgTatms13mel55FVstltwwgJUhUa1Yi0gr0lkS2R2seFDrMDyf7yJ/D54JwJLn2ZU1RJtaEk0CzjZPtsyzrnAFitzXroK0JY+EnJxFJawLL87xHdR2UnmlrNoA1oZ0eLYI14dTwk1Oe5yEJbLVc9qWuQ9Mz1mwAa0I7lRbZrNeiQPmXc4yUC/Yl/1Jrygc1c0q+UqFu1mt/BEiHiPRN+ZQ4Sd50rKwfcbyl599tt63x1T7bxdmZdFn7kbJX5fy3vG1NPVuPLQmYMn72kcQvv9tcIMlSEpIzDmpTviahoij8LKAHSxqzqVcD9bOSg7Xm8enfsaaeqjL3TR+sCe342V5zpuQEZyzQHi8ZRjJbedtqu+3WZlr9XXzsnGe33dqBVfnTGYBxxk3t+W2RoeO1ZU2d2oZbFIWe0Gb+y/3e5nl7Qn1HI26tuVmv5Qw9tiRgyjje8l1lU4JNtPZ9SXv6kd12q8q0adgetlmvbfrX7ONnJf+a9Zy9pH/7wd12K29qNk8OrAntNLQ1K4+RDGOrljbHaiaUj0gWyvPcfta/BqfckZM4RYk9v5xcr0G91VqEOXHRuTxODdqWJkVR2NLBvqTocaw5/SmU0CN1bU2rrlZr+ofJL34WsEFUWrMyKzk4SffI9O9Yc8ozoULAmtDOodYsTQ53DOr3oGrPqrxTWQrIyf0La7CmE656K8/z1kzrtHHrWoSb9VrNqqFUVp+tNW3f9WxGeqCByuxjdRVoTU3tWZZp287PAuLLoiicvhbbD9R6zSq8XtK/tabf35scWBPa6WBN6wb7Qcea2tzUUzm2UyrzWKs19SNOW7NZV05bs65pmGWZhGX7xyqV7M8G0rKj4TJgHlRmn9Vyeag19R2b7/yeW/14pTXLmqzkYNuax6f/ytlA6VYcsSa0062tWXkqv39GBiNtNrYFSnnTDJXDnDcbrFl6BZNaarNe++evi6/8ruWC9iQL0glmc/7CzDAqiqKyh9ZWuivvEsyJumkBmqh0cFHrUiIqcWSe507LsrIBKjjp37GmzNqrzEoOdlzz+PRfOa4pB2NNmCF2cRNfQs6kvoWZT+u87Kmc5qZfmdXz2+ztTA60Iy6aIZ3z6wFOSWHP7+RbJy7l7Xazc6nOhCbn41oTt3G53O819ER7qCCcugW2/Mc3JcE4jUU/ydm842cBm/zs5DjJO+ozJys516z/soMsndO/HewUj2roPT7cNSRYE6Lg9CzJfL/KI53aKwA0kOi80zmBNaF/Nuu1Y82GWaNMKAUIRDpsx76KUwdrQhSc/ig/q2vnEqUAQDPaR8oDvlMAawIAAISCNQEAAELBmgAAAKFgzRFwlmatOyDdp4ABjkSGvVsTf8iaFQD9gjWHRp9VqrOmXdSmblFWgBmjz7O26lByE9aEIcGaI+As9uYgT8HrnxQKcIKE7MiYZVlgkxSgR7DmCDRb09+LbsBLA5gEIdaUtdmwJgwM1hyBZmuWZtNaZ41HgBOh1ZqyOAbWhOHBmiPQas3SbHdu3/z906fZbX7/9GnkiwUYgWZr6lZZvjW//PJLJ4+8ePFioIuG0wBrjkCrNWXARhZfdlZ5vn9xoa9333nn3vn5IJcMMCjN1mzYV+7Bgwc2j/z87bd3u90QVwwnA9YcgWZr2m2Tm59R+f3Tp3fv3o11lQDj0WBN+1yW3d+j7jz3Ly4iXyycFlhzBJqt6Wy+46+ErmBNmCshs4HKgHFNrAm9gzVHIGQOrd24lbYmnBpYEyYL1hwau0utdivJY2dqR7vZbMPwJ9aEWWL3TNaOFsk4jiCxJgwP1kwYrAnQDNaE3sGaCYM1AZrBmtA7WDNhsCZAM1gTegdrJgzWBGgGa0LvYM2EwZoAzWBN6B2smTBYE6AZrAm9gzXT459/9at75+f3zs/v3r3LinoADWBN6B2smR7fPHt2dXV1dXX14ePHWBOgAawJvYM1E4YeWoBmsCb0DtZMGKwJUMlHH3308OHDhw8fvvfee1gT+gVrJgzWBPC5vr5+9OgR1oRIYM2EwZoAzdBDC72DNUegeddMpSgKZwFrB6wJ0AzWhN7BmkOj+zk0W1N2eMiyrOEYrAnQDNaE3sGaI9C8v2ZZsymSD9YEaAZrQu9gzRFotmarUxWsCdAM1oTewZoj0OzF3Xa7Wi518+q6Qc0SawK0gTWhd7DmCDRbc7VcbtZrGdG83O/tka9evXpu+PSTT1gbCKABrAm9gzVHoNmaziQgaXfK7//6618v79zR11tvvok1ARrAmtA7WHMEDrLmZr1WazrQQwtzRXpZGibE6Vz0utwhYM0U+e67757fZuwrugXWHIFmazqa3KzXPK8JJ8VquRQj1llzt91K9pGs1CBOrJkc19fXf/Gzn0lf2h/+4AfSr3Z1dTX2dX0P1hyBZmvK4ga2UKg7D9aEuSIrgdRZ03bGyOy5hvNgzUS5urqa5ggU1hwanRxr68jOrB+RpbwaToU1Ya40W9Nyud9jzVmCNaF/sCbMlYOsSQ/tLMGa0D9YE+ZKuDWdhqbuEcaeJ6mDNaF/sCbMlUBrXu73zlrNWHM2YE3oH6wJcyXEmnmeN6ycpefBmomCNaF/Yljz9evX77///v2LC/v65tmzfkMBaKbVmkVRbNbrkPPM2JrX19dXt/nd73439kX1BtaE/onU1vzss8+yLNvtdj9/++0sy7Ise/XqVe+hADTQbM2iKOxwZkOjc97W/Prrr++dn987P3/rzTf/7Kc/vXd+/j/+5m9ev3499nX1A9aE3vj0k09kzOb+xUW8VDVAcfP55587jdp/++1vo4YISaDr/tjdC3T7PPtcVusDWvO2pvLBBx98+Pjx2FfRD/6X2/oM3sBgzfSIas0hk+zvnz6Vtuwf//jHjx49yrLsyZMnMQKCkwVrJsfi7Kz8f//XeWFN6IcYPbSLs7PNX26cV+wku7xzZ2pLTcI8wJrJgTUhIlgToBmsmRxYEyKSujUnPnoBMwBrJgfWhIjMwJoDN2rh1Ji3Nac/caYDWBMigjUBmpm9NScumA5MP1JYcwTkWbS6ncIszYdhTYBmsGZyTD9SWHNo9Fm0VmvKA2pYE6AzWLMvvvzyy4e3+eqrr2IEhDWhguZdqfUYZ9NNH6wJ0AzW7At9THxxdia/fPnllzECwppQQYg1d9ttURRYE+BQrq+vHz16dAp7nowimCHOjzXBodWaokysCdABrBk90Njnx5rg0GzNPM9ly0Dfmv/6618v79zR11tvvhljRT2sCbOBHtoogcY+P9YEh2Zr7rZb+cW35qtXr54bPv3kE6wJ0ADWjBJo7PNjTXBosGblfg51+wjSQwvQDNaMEmjs82NNcAiZDVRWtTUdsCZAM1izx7CGWYQIa0IFSVvzm2fPstt03t4La0JssGa8sLAmDISsXSAvHcKsfDRzmtb84osvZAfpP/rhD//+F7+4f3Hx6NGjvsKaVN6AGYA144WFNSE9xu2hPX57L6wJscGa8cLCmpAeWBOgGawZLyysCemBNWGuyJhFURR1B8j4hR3mqARrxgurc0Dffvvt1W2+/fbbhoCwJvTGKNbscSod1oRKVsulpKs6a4oy5b+77bZBnFgzXlidA3r06NG98/N75+eLszP5xc6NwJoQkbGs2VeCxppQh+ymV2dNa0pr0MrzYM1IYR0fUOUZsCb0zzfPnkm3xoePHw+/NhDWhAFotuZquZRVJyv/dM6DNSOFhTUhGf75V7+Sbo27d+/O25offfSRs6XfixcvuoX12WefOY+Zvnr1qtupYAAarOk/kbVaLi/3+7rzYM1IYWFNSI+rq6sZW1N3rnjvvffu3r0r1myYHtLA69ev33///fsXFz9/++2f/OQn8rzpN8+edbtsGIBu1ry+vn7w4IF8v/L6+dtvY81IYWFNSI8TGdf8/PPP33vvvY7xuc28Wx5zonNb0+lU2O12M/7GE7Vm84xCrAkRwZqHgjVT4aBxzcXZGeOaaVnzoBIGa0JvYM1DmXcZOicOnUPbcJ4Zf+NYcxSwZsLM25qV3TjdwurxVDAMzda0T5ts1uu6qUAl1owZFtaE4ZASoWFZdl3hvW5nTWH21uwr87RGCibFZr3Wmo0aUTKFelR3omVtIKw5MFhzaLREqLPm5X4vgzRSoW4QJ9bsK1IwV7BmvLCmn/EjgTVHoHl/TTuvQVbjrDsP1uwrUjBXsGa8sKaf8SOBNUcgcFfq8qYvt+6/WLOvSMFcwZrxwpp+xo8E1hyBg6xJDy3WhM5gzXhhTT/jRwJrjkC4NTfrtZ1GKEWAvt59550Zrw2ENeF4RrHmkydPnOUbIy1EhTVHAWuOQKA1syxzptT//ulTmxUfPHiANXuJFMyVUaz56NGj+xcXf/+LX/zRD38oFdwvvvgiRkA95pEnT54s79yxr5+//fb19XVDWNPP+JHAmiMQYs2iKJqn1Jf00PYXqR65vr5+fpvvvvsuRkAQwog9tC9fvvzRG29EDaLHPKLp9u9/8YtHjx49f/7c2SkhxYwfCaw5AiHWXC2XrefBmn1Fqke++OILqar/4Q9+8Nabby7v3NlsNjECghCw5qHcv7ioXJ4wxYwfCaw5Aq3WtEmkodGJNfuKVAzunZ9fXV1FDQJawZqHgjVbwZpDo+v+LMyyJvJcZp7nsrKB86pbVwxr9hWpGGDNsdCN4cbdKQxrNlw21oRxwJp9RapH/ErPgjVvB0f3Cxtxp7BerPnNs2dXt7G7qWPNUcCaCYM1+4pUj4zSroU6Uu+h3e12987P/+JnP/vDH/zg3vn5vfPzzz77TP+LNUcBayYM1uwrUj2CNSfFKNbsvbPh+fPnyzt3KgPqMY80X3aKGT8SWDNhsGZfkeoRrDkpxrJmv4X+MNacX8aPBNZMGKzZV6R6BGtOCqwZfs3zy/iRwJoJgzX7ilSPYM1JgTXDr3l+GT8SWDM97p2f66gDK+r1EqkewZqTInVrHjrWiDUHAGsmDG3NviLVI1hzUszAmhPJIylGKhJYM2GwZl+R6pHWsO5fXDjLZH/00UcxrgRKrHlEQDPI+JHAmglzdXVFD20vkeqR1rBevnz5/PnzJ0+e/Nf/8l9kvezXr1/HuJJ00RWyGjYwkOW0Fm0PdWDNzgHNIONHAmsmDG3NviLVI4FhDbDcWqKIMmUVyd12WynOLMv0mCzLVvVbHWDNzgHNIONHAmsmDNbsK1I9gjWPxJrSGtQ5ZrNe22PqzoY1Owc0g4wfCaw5AlJTbt4pTLqetGioBGv2FakewZpHslou7Ypuzp+CdM/K70VR0NbEmkOCNYdms16LEZt3CpP/Xu73DeLEmn1Fqkew5jFIw9FmjdVyebnf+0cuzs5Elg3KLLHmEQHNIONHAmuOQPP+mo4pG47Emn1F6uOPP5alsfX1j7/8ZV+RwprhhFtTZwzZ/tvr6+t/+Id/sN/jn/30p1izW0AzyPiR6GJNKfRtF2JzR+LEWS2XDVP1YtBszc16bYsJ508L1uwrUt99951sw3T37t0PHz++urr6+uuv+4qUHy//1S2s+RFuzcv9Pssy6bmxx//ud7+z+2o9ePAAa3YLaAYZPxIHW1M2VdZkKgJI2prD02zNxdmZHcjZrNd1UseafUVKOX4r6SFv4CxZ3R7IdLKDIL6U32WMs27ndnpoOwc0g4wficOsWTmNJc/zVePQQlSKoji0pZjneV3rbRg6W/P3T59mhgcPHvC8Zi+RUrDm6PhzaP1jnKrkqmrGkIA1Owc0g4wficOsuVouKwU5cA+npaEpVkddn89gdLbmh48f37+40Ne777yDNXuJlII1R8c+bVI3PGHbl3VPpwhYs3NAM8j4kTjAmpI6WxW1Wi4X3lMTIipdzsMKQ4d2bPbQN9UfIg9p7Or7GpacU2wkoYjddcKqBrowg0mS0+qCtjGVEKV3uiGLBnLQuGaD4+mh7StSCtacAjpzwuZByX2a9TQzNudHrNk5oBlk/EgcYE1Jys3WtF0lKk51m5T+m/Vahar+s4t96A1Su6j8JPTddqtNXm2K+TlNzqmHaaDWQ46wVWa2iuAofHX07KFD59DWFQpYs69IKVhzZmDNzgHNIONHok9rOktbWTdYUem6HpUPI2pr0mmD2o7Ky/3et6aG6DtGtF1pzdK0NZ3rcUTutHrb7lYTzdYsjbzrVhQTsGaPkap8RQpryiXCzMCanQOaQcaPxGHjmouzpumyVmblTXNN22e+Ne2yWPYklZ7oZk3xpcwYarWmcz3WbT1a0/Ys2RhZj+qzaKwNNFaJkETpA61gzc4BzSDjR+IwazqFu7LbbouicKaA20ev6tqaK29uUd1azB2saS0YaE373diz9dvW7AusGS9SSZQ+0ArW7BzQDDJ+JA5+XlOGGJ1JnnYsU31mOzwrrelML8rzXM5j3xQZl23WLIoiyzLfmnrYarl0LkZmD5XGmnI9VrQaIta0BySXebDmyYI1Owc0g4wfiS5rA9md7fymp75vp/xoh6TO6xGfaVekPd6+ubpZalKPsT2cejGr5dIOiNoZPRq0nk1+l+AWt0dPnY8474itFwF9p8OANeNFKonSB1rBmp0DmkHGjwTr0CYM1owXqSRKH2gFa3YOaAYZPxJYM2GwZrxIJVH6QCtYs3NAM8j4kcCaCYM140UqidIHWsGanQOaQcaPBNZMj/fff192Qbp79y4r6kWKVBKlD1Ri9wtjp7DOAc0g40cCa6bH119/Lbsgffj4MdaMFKkkSh+oQ/cLY6ewzgHNIONHAmsmDD208SKVROkDrdBD2zmgGWT8SGDNhMGa8SKVROkDrcSw5jfPntmth+5fXLz//vuvX7/WA04kj0w/UpHAmgmDNeNFKonSB1qJYc1Xr17JBrc/f/vt3W6XZdlnn31mDziRPDL9SEUi1Jq6Rs+h1K2k07qC+RSQJRTGvopasGa8SCVR+kArUXto719cVO6GfSJ5ZPqRikSoNS/3+w6bSspKQBNZf246LNpWF7LrHDXcdqwZL1JJlD7QCtbsHNAMMn4kQq3Z2XyBq7bKWrLdghiMXlbR0xZ25UZp5e1WuPxedyqsGS9SSZQ+0ArW7BzQDDJ+JIKsqeuqdyDEmnX7Yk6Kyn3NDsXfcdrvo3a2gmm4M1gzXqSSKH2gFazZOaAZZPxIBFmzTnurm6XMbcm+ODvT5d2LohBr6pLrKgnd89n2RopRVsulnkF2Jll4K7zLp5x15PUypGfYDsTqIuy636ftOpb39SL9XVN00XnnDPKp8Nu9Wa/tVTl/OndGr63ubFgzXqSSKH2glRjWdMocfdkDTiGPTD9SkQiyZmUbyzaJVsulyGNhNirRz6ppREvWlOIG29ZUE+sZVje7jGnXpX7c2SZT6315nlfOXVpUbfjl61Det9uklLfbmpf7vcbooAbowttkrVK6chPkAMY1seapoXXcwG4qJ1tZIlmTPJJEpCLRbs3W7lknfTeLQVVnW1ROD+3q9q7RgppSWqvypz3AWrwus1Vas+F9u0OnY83OSTPEmuXNXXX6b1+9evXc8Oknn7A2UKRIJVH6zBJRppQGdo9bH6mRN8/Dx5qnHKlItFuzIdVqo7DOQKUnBjViuDXlSJku1GBNG3Rsa2rcGyq5rRfg3xwb5cv9Xhq79vj3339/eeeOvt56802sGSlSSZQ+s8Sa0hrUQZTZejasecqRikR3a9oSP9yajvZarWlN2WpNaW5mWVZX/ezRmnqprbVdizOQWdmqzvNcA5Vo1p2fHtp4kUqi9JklkoXr/hScsf8GsOYpRyoSLdZsMNBmvVaLLBp7aCvFU2lNUYhvTTmhVUilNSX0lRlV9f9rh0j1sg+y5uV+r+OacrXh1vTn0Po539Fz5YwhAWvGi1QSpc/8sDVjobJmKYWPztFr6O/BmqccqUi0WLOhe9ZObdWJM/qOM1N0cXvs03+KX1O/Padegw3FCcixjvWZj865lSynvb56zXpm+a8GZ69ZzqP/PXTJJC0U6sZsnPYlbU2seToEWlNyqOYjWw784y9/KXuExdspjDySSqQiMbd1aKe/DpF62jYoRedaWNgnahoaslgzXqSSKH3mR4g1/WNs5VX30Yu3Uxh5JJVIRWJW1iyKYvrW7BGsGS9SSZQ+s2R1eyBz4XXABrZHBXpoTzlSkZiJNVfL5aJxRHOWYM14kUqi9Jkl/hxa/xhHk6uqGUMC1jzlSEViJtY8TbBmvEglUfrMEvu0Sd1UODvrPsuyhuoy1jzlSEUCayYM1owXqSRKn7niTHEXnFk/OjuvuYcJa55ypCKBNRMGa8aLVBKlD7SCNU85UpHAmgmDNeNFKonSB1rBmqccqUhgzfT49JNPHj58+PDhw/sXF6yoFylSSZQ+0ArWPOVIRQJrpsdHH32ENWNHKonSB1rBmqccqUhgzYShhzZepJIofaAVrHnKkYoE1kwYrBkvUkmUPtAK1jzlSEUCayYM1owXqSRKH2gFa55ypCKBNRMGa8aLVBKlD7SCNU85UpHAmiOw8FZvr0TXeWenMKwJ3cCapxypSGDNoVncLDzt7LXpICuhNOx6VmLNmJFKovSBSq6vr3/+9tvLO3eWd+788Y9/jDVPNlKRwJqD4u9KXbkRmLN4WB1YM16kkih9oI4XL148f/78+fPnjx49wponG6lIYM1BcVajrlycWhbhbNhWU8Ga8SKVROkDrdBDe8qRigTWHBSn03WzXvsbgu6229VyKc3NRf2gZok1Y0YqidIHWsGapxypSGDNQQmx5mq53KzXctjlft/Q7sSa8SKVROkDrWDNU45UJLDmoIRY0zlG2p3y+wcffCBzHOT11ptvsqJepEglUfpAK1jzlCMVCaw5KM5A5ur2lvRCg1lfvnz53PDpJ59gzUiRSqL0gVaw5ilHKhJYc1D8ObT+RFmnAVq3nX1JD23MSCVR+kArWPOUIxUJrDk0i5txyt1263fPljeLG8gxMp+27lRYM16kkih9oBWsecqRigTWHBpd8cc2Op1ZPyJLeTWcCmvGi1QSpc9c0TxSWa30j2x4shlrnnKkIoE1EwZrxotUEqXPLLEirOuPUTbrNdZMLt1iTRgNrBkvUkmUPrPEmrK5KZllmXTSYM200i3WhNHAmvEilUTpM0tWy6Xz5FXdasy77VbGMrBmWukWa8JoYM14kUqi9JkfdiqcsKp6OqssS5kWgDVTTLdYE0YDa8aLVBKlz/wItGaWZXaSOdZMK91iTRgNrBkvUkmUPvMj0Jo68OlY0+4Rxk5hRCoSWDM9vnn27Orq6urq6sPHj1kbKFKkkih9Zsnq9kDmwttlNsuyxc1zWfpSj+oeYewURqQigTXTY7fb3Ts/v3d+fvfuXawZKVJJlD6zxJ9D23AwPbQpplusCaNBD228SCVR+swS+7RJw3KSAtZMMd1iTRgNrBkvUkmUPnNF18aySxzIjrOOILFmiukWa8JoYM14kUqi9IFWsOYpRyoSWDNhsGa8SCVR+kArWPOUIxUJrDkCC2/19oYj7Sx8B6wZL1JJlD7QCtY85UhFAmsOjYrQ2WvTRwZysCbWhM5gzVOOVCSw5qD4u1LXSTHPc2f7MB+sGS9SSZQ+0ArWPOVIRQJrDoozk75hYv1uu/XXSXHAmvEilUTpA61gzVOOVCSw5qAsbi90slmvK7cPFGViTawJR4I1TzlSkcCagxJizTzP5RisiTXhSLDmKUcqElhzUEKs6SwnZq35b7/97f2LC329+847rKgXKVJJlD7QCtY85UhFAmsOijOQufL2c9BVUexLJxA9efIkMzx48ABrRopUEqUPtII1TzlSkcCag+LPoW1YDIweWqwJHXj9+vXdu3fZKYxIRQJrDo2K0O7tUAnWxJrQDd0vjJ3CTjlSkcCaQyMutP2uZVlWPpqJNbEmHAk9tKccqUhgzYTBmvEilUTpA61gzVOOVCSwZsJgzXiRSqL0gVaw5ilHKhJYM2GwZrxIJVH6QCtY85QjFQmsmTBYM16kkih9oBWsecqRigTWTBisGS9SSZQ+0ArWPOVIRQJrJgzWjBepJEofaAVrnnKkIoE1EwZrxotUEqXPXNGnsxoeaN6s163HlFjztCMVCayZHvfOzxc3i+2xol6kSCVR+swSUaasmVW3Eshuu5XnmGUFygZxYs1TjlQksGbC0NaMF6kkSp9ZYk1pDWqxWyDsttvVcll3Nqx5ypGKBNZMGKwZL1JJlD6zZLVcWik6f/pc7vdYM610izVhNLBmvEglUfrMD38VyZW3L5DD5X5PD21a6RZrwmhgzXiRSqL0mR8drNnQ0Cyx5mlHKhJYM2GwZrxIJVH6zI9DrXm539v+2+vr65/85CeL29vTYs2TjVQksOYILLw9Txx2223rMSXWjBmpJEqfWbK6PZC5ODurG9fM87y5GVrS1jztSEUCaw6NVqWdHaoVrT5LvbtBnFgzXqSSKH1miT+HtvKwoiia65QC1jzlSEUCaw6KY8pF1faZtmYt+27WnQ1rxotUEqXPLLFPm2zW68rWZFEUKzOc2dDoxJqnHKlIYM1BcUqBukJBybIMa2LNU0PWLljcXr5Ahi2KotD/2lfdqbDmKTNxqjAAACAASURBVEcqElhzUBa3B2k263XremD00GJN6AzWPOVIRQJrDsqh1tys13ZhlG+//fbK8OHjx6yoFylSSZQ+0ArWPOVIRQJrDspB1syyzOm/ffTo0b3zc33dvXsXa0aKVBKlD7SCNU85UpHAmoPiDGSu6p9FK4qiuRla0kMbM1JJlD7QCtY85UhFAmsOij+H1l+ZWlg1rngiYM14kUqi9IFWsOYpRyoSWHNoFjdPm9TtgiTH6O8NjU6sGS9SSZQ+0ArWPOVIRQJrDo3uuGsbnfJcZp7n+l/7qmuPYs14kUqi9IFWsOYpRyoSWDNhsGa8SCVR+kArWPOUIxUJrJkwWDNepJIofaAVrHnKkYoE1kwYrBkvUkmUPtAK1jzlSEUCayYM1owXqSRKH6jk9evXb7355oKdwk4+UpHAmgmDNeNFKonSB1qhrXnKkYoE1kwYrBkvUkmUPtAK1jzlSEUCa6bHo0eP7l9c3L+4ePedd1hRL1Kkkih9oBWsecqRigTWTI8nT55kWZZl2YMHD7BmpEglUfpAK1jzlCMVCayZMPTQxotUEqUPtII1TzlSkcCaCYM140UqidIHWsGapxypSGDNhMGa8SKVROkDrWDNU45UJLBmwmDNeJFKovSBVrDmKUcqElhzBBbe6u3djsGa8SKVROkzV3QPg4YtZkOOKbHmaUcqElhzaBY3O4U5e20eekyJNWNGKonSZ5aIDmWfn7rd9EKOEbDmKUcqElhzUPxdqcWOhx4jYM14kUqi9Jkl1oLWjoceI2DNU45UJLDmoGzW68v9vu7P8GMErBkvUkmUPrNktVxmWVb3Z/gxAtY85UhFAmsOyuLszGbvzXrtdy6FHCNgzXiRSqL0mR/ScLSdK6vl0qk1hhyjYM1TjlQksOagYM3msKZTIiRR+swPrNka1gzSLdaEAzjSmh988MHiZv8jXrzqXr3XpQbjeGvevXt39PvPa/qvDz74oHMqxZqD4gxSVtaRQ44ZhXvn51dXVwME9Pnnn7/33nsDBFSW5fLOnefPnw8Q0IePHx+TUU8HZ5BycbsSGX7MKPzojTdevnw5QEAPHz58+PDhAAG9fPnyR2+8MUBAZVnev7iYyPfYDNYcFH9+rD/3L+SYUcCax4A1A/Hnx3Y7ZhSw5jFgTahmcdO51PCcWcgxw4M1jwFrBmKfJKmbQB5yzChgzWPAmlCNrmliG5SX+/3CDNVUHjM6WPMYsGY4eZ5L+rdVxt12a/tdKo8ZHax5DFgT5gbWPAaseQpgzWPAmjA3Pvvss1evXg0Q0IsXL7788ssBAirL8uOPP76+vh4goKIovvrqqwECghEZrND/6quvhpnucH19/fHHHw8QUFmWX3755YsXL4YJ6xiwJgAAQChYEwAAIBSsCQAAEArWhP9ks17rwhk6d9euppFlmT3GvlbLZXhA9lM6W1hecoDMKLbTI/WAPM8v9/vOIzqX+71/qavl0o9R3T4zPnpPGp6RkNdvfvMb/X233WZZ5t9wPVsS0yJOEJnK6yR7m4Qu93t7jPMKCUKnB4enE/sRucjOEaxbsMx/hWfD5mxlI6h5X6Jm76Tmrw4X0C9YE75H8p6Tsq1pxHP+kYc+Zr5aLp2VHByZZVmmmWS1XGo2lsKic26R0s3PupJv9bR1h9WhZZb/LykFNLIiUY2afNAppHbbbXjQMDzyJTrVGklC8vtmvZZv0DlSs09gEIHpxAnl0FqsH25DStY/D/WWkxEskqk1snInNQvIB5273TmCvYA14XtarelkY5uyDwrIFjHlTcawOXC33Vo9V/7rULTq6lelHWtKoOGRyvNczux/REoKW1jstlv752a9doqAST2kCz6t1tRk4ByZZVl40g1PJ34PSuckJMuqVHZ1ONaU+Ib3iGgT3Cle8jx3rFl6y4g6ebYoinEf0sWa8D2t1mw+MhxnAW6/GHIaZ71kEmkBSNZ1/nW8NbVQcE4r6yPaUsypMfhBT2elG6ik1ZrNRwYSnk4OFVgDEqLTFSQcb808z/0zS4vZyW5OjWG33doiSE4VHKf+wZrwPYNZs7w9fCI5UPNJnuc2N+rYxjHBFUUh55crryzypEiSku6gLiApwvwzS4+cY83y9mrjTiP1mFFbGIZhrFkekk50YLVbQIIOi/h9P+Vta0pSP6hFKxnEOXNRFJLRHGs6PUzOiMnoq0FhTfgeO6fAvmJY02bC3Xbr/OnkWDtfoJtUZFaF/O5XeO35O8RLK/62G026nuRNJzj7jlSr7SyPg+MGw+JMYbOvyiM7W/OgdKKVy85jfjrs6oyqCnaeTodsqA1E23V0ud9LKH5w+k5RFBK0/ok1YUIM2da0BcpmvbZ/1uWKYxqdzcOo2tasbIm2ota0H9cpIb41bXCX+73+KQXEoVGDgRmsrdkhnXRudGolT/CHUbVe68zWCUStaXOfXqdvTe2VlQ/qn1mWjT5XDmvC9wxpzfKmk1b7Y6UJ6AzsOQVEt2FOpym58B4UsT20ld1TzdhrXi2XUmfXm+Zbs7zpfJN+Nq3ajz5gAyEMZs0yLJ04Iuk2zFn5tIw9rdMbdKiY9Zo1C8vsPI2mY03tpJVjVNVT6IzBmvA9A1tT8qH2x2o/jDWWjkcqzkyBEPwZ/05V2plq4Ve0m/GnZthtkyutKW/aDrfK5+RgggxpzZB0Yh/TEg7dyt5W8hSneurMBqqcMdSANb1I1+ZK35p6AY5Zp5BHsCZ8z8DWlDLFTgLypxg4jcsOxVBlTnOm7TnWLG8eRwsMwmkfSy+Z/llpTQnRTu6oLDhgggxpzZB04jQu/cTcyma9rnvUxHluUv976KQ5a00n45c11nSeVJEHVKbQGYM14T8JWRuo4chuOJViv45cFEWWZbaL9aAyqHKKhJ30JB2q+qczrTekXLB3Qz9rhzkr+7sqn72ZQokAzYSsDdRw5KGEpBN5DNQGd5Ay9eL9lqW+Xzm0oce0FgJ+caFLNDiTjJx4LbxnXcLjFQ+sCQAAEArWBAAACAVrAgAAhII1AQAAQsGaAAAAoWBNAACAULAmAABAKFgTAAAgFKwJAAAQCtaEqeAsNdLvgpOr5XIKK1gCHIMuRCUL1PWyE7Vw/OJ/pwPWhElgF8+UheiQHIBFd8sqb6qYSG4UsCZMAmcnhynsPQswKRxNyvrMI17PyYI1YRLICtGHbhAPcDrITgNjXwVgTZgGMqxSuX+CbKipm5DYTVF0mMc2TCv3ObEf1LDs9hHyKbufH8CkqMwCgmwWpCnfbopSuVmQv8+Js/ef3a5H67LyKbub9GmCNWFC+JlZCwJ5x+75t1mvNZNrUWL3rNY3bVljN+DVwdQ8z+2W8UNGGSAcW+FTC2qukXekKin/0l+sFHU/Pn1THSkH5HmumUi31bzc7+X8HbaFnxlYE6aF3+h0cqnMhrXFhx4vb1Z286o1nf38pKzpZZNtgGHwG512Y1qdDWt3pdXjsyyr7Oa1WcDZUFPed3alPmWwJkwCp8/HDnM61pR5Q3me+5lfcn6zNXfbrd/BVdZ09gJMBydl2mFOZzt3sab02TonudzvW60pAyL+MZWdvScI1oRJoHu7C3bPer+tebnfVzYrK3e6F2xbs6F/SWxdqVWAcXFsZ0cT/LamPM3pC7JuDMJpazbUHaVD+JQ7ZrAmTAJnDq19NM3+y+b5zXptCwXJ53ZQpzTVczuuab0ohYuOa5b1jVGAcXHm0NqFO+y/nKF9PaYoCh3m1wP0TWtN+V0blJJBdFxTgsOaACMjWVfnNTg6FEE6M/rs8fZ97WvVN+24Tnl7fqAUH2LNukm8AFNAu1j8oQQxqJ937PHOlHL7ps0RokM7JqoT8TSIE69WYk2YOszZA2jGGdeEqGBNmDpYE6AZrDkkWBMmjXa3sioKQCWVfbYQD6wJAAAQCtYEAAAIBWsCAACEgjUBAABCwZoAAAChYE0AAIBQsCYAAEAoWBMAACAUrAkAABAK1gQAAAgFawIAAISCNQEAAELBmgAAAKFgTQAAgFCwJgAAQChYEwAAIBSsCQAAEArWBAAACAVrduf6+vo5QAr8x3/8x9iXACPw7bffjl1MzhCs2Z2nT5+++Sd/srxzhxevib/+59/+7ejXwGv413/70z8du5icIVizO1dXV/fOz8e+CgCAan70xhsvX74c+yrmBtbsDtYEgCmDNWOANbuDNQFgymDNGGDN7mBNAJgyWDMGWLM7WBMApgzWjAHW7A7WBIApgzVjgDW7gzUBYMpgzRhgze5gTQCYMlgzBlizO1gTAKYM1owB1uwO1gSAKYM1Y4A1u4M1AWDKYM0YYM3uNFhzs14vzs70tdtuy7IsisK+WRTFsNfbD7vtViNVFMXlfi/v53m+ODvL87zzmTfr9Wq57Okyx0G/3DzPL/d7/Yp3223nqGVZpqft70rhJMCaMcCa3Wlua4pFFmdnWZbpmyLOeJdkrdz51XD+y/1eD5DSXK15DFqfiGfNXu5M881ZLZdSPSpvqk3HV4zyPNdzrpZLxAkHgTVjgDW7c6g1L/f72G2pxdnZ5i83x7xaxWA1KS2qyiM36/WhF39Mg6yVXnzTcBL5uq0mpS1eeXD4zbFVruNb83BqYM0YYM3uHGTNzXrdS7OsmdjWlCZU62VIM/TQi0/amtJc1nZhA7vttkOVQoPAmhAO1owB1uxOuDUXZ2d1BaX0eWqBawdESzOmVRRFSI9obGtqpHw9yOXJSKczoFuaDlLbeHJI2pqlGfH1xbZZryUB2O9XbkX4sGXs7n2YH1gzBlizO4HW1JcvPClnsyyTAlEOkILV9uuGD4/FtqaG4sTI2r302pr6e3MfY+rWLG8rUL81+UK12mTbmlmWacWiNfqX+31DnQPAB2vGAGt2J7ytqS0MRxi2eNW5MDo1Ro45qF93GGuWVY1ObWuWt61pRVJXexBmYE3Bb3RqW7O8bU1nrnXDBKKiKLr168IpgzVjgDW7c9C4pl8sOg+iWFNKsStti4PmYca2ptMxa4c566x5ud+HjPaViVvTPoRTesOcddZcLZeB45QoEzqANWOANbtzkDX1TyuGumEwFeqhE4gGmA1kLW4njja0NQNdmLo1HbE5bcq6tmbIV+zcdoBAsGYMsGZ3Dn3yxBenM+Jli11pbh46YXIAa9oDrAwqrSlKsK0up01mSd2aTjTtV19pTelLsN9y5Rj2Zr22yYBGJ4SDNWOANbsTvjaQyKByeM8e6TTjnPIxcA7t8a+G86sF5eUoU2OhbWUp7m1fdJ0X7QXEeLiilzvTbM0sy+x9sMq0t0uPkf/aKcf+l7taLp0LYEIQhIM1Y4A1uxN1HVophSOdHABOAawZA6zZnRjWlIaIfSABAKAbWDMGWLM7MaypY58sAQMAR4I1Y4A1u8NOYQAwZbBmDLBmd7AmAEwZrBkDrNkdrAkAUwZrxgBrdgdrAsCUwZoxwJrdwZoAMGWwZgywZnewJgBMGawZA6zZHawJAFMGa8YAa3YHawLAlMGaMcCa3cGaADBlsGYMsGZ3sCYATBmsGQOs2R2sCQBTBmvGAGt2B2sCwJTBmjHAmt3BmgAwZbBmDLBmd7AmAEwZrBkDrNkdrAkAUwZrxgBrdqfOmkVRyB6Z8sqyrLzZblpfzjH2dbnfh4QeEkq/8S3LMvzyBNkutCiKHq9ht91u1useTwjKarl0vt+6hNpXiJp047FaLsfd411yZeW/Yl8b1owB1uxOc1tzt92ulkvnTS2V8jzXot8emWXZQbmoOZRx0R22e7TmbrtdnJ1hzRjI9+Unp/J2MlOPHh+i6GTe36ZWZEcJHWvGAGt250hr5nleeeRBwhvRmpf7vUbBQctB2poJsVmvpVLif61+Eq087FCkpdV7CpkaDW3N2GDNGGDN7hxjzdYjAxnLmtLgqCw3rdWwZioURSEJaXF25vd2xLCmdLdIQppC10g8sObMwJrdiWdNyWYhRUlIKFLG2c43Pb/2j8nwklT8JYfrp3TYSQq4LMu069Xv0Nus13aoVa25Wi7twfK+BCH/0vjKGWz3tZTjWpSLNfUa5l3gDsblfi9ftNxw57/OIIJjVvkuDh2f22234t3Neu2kIifZSGLQpGUrYU7iKW9azPK+xMhJJP4EAk3q/nm0f7Vy8NUPy04s0FqFvKkp1t4oG6JkW72Y45vyJdaMA9bsTqs1Ayf7HNnWbA5F8qH8vlmvN+u1Zmx935lSZP+r16ajWXLMQW1NKen0I5XFhzW9niHPcznG1tbt0Oblft/51oFFb698O44knGR2fHDatC2NVOwFaLLRP+UAO31mtVyKQbU+55vVT+pWbzZZljf6LI2hJazKHOqHlWWZHmab43b4VuuLzrX5dcdeOlSwZgywZneS6KHV3GiLPL/LyBaUUoOW362WtGwqu/bQ6sf9nts6a/qh2POP2Pc1J5w5aKvl0imyNZmJDI7vcreVudLrFq5LNqVJnFau1nA29erHJazL/b5BRbajpazPBRYnrNVyaWsbaj4nldo867c19RisOVmwZneSsGZlGZeKNUuv1l9izQjYfnXbztMDbDLzO1Q74Ffm7PcYYk1pWVbGpc6adSoSX2ZZZpNTB2s6bXS9aU4qtWfDmimCNbuThDWd+q+QkDX1ncqyD2sej30ISvBn6DjJbHH4KKbFf7zK6RYOb2v6J29ua/qZxSah461p/9SE6rc19TCsmSJYsztJWNPpUvOHCYXO1qyMjg46HmRNCVQHUGXKj21iYs0YrJbLykdNnGRjk5l8fZ2L9cr+D2nv2vM3W7P0epJbe2glael/8zzX9qWEZWdCdbCm5DW9VGdcU373o4Y1kwNrdueYtYEajizD5tCGh2KncmRZZmcM6myIxc1MBO0606f39EgnLDnSv0g77dB+RH//X3/3d/q7M89wcXYm+rSzgfR6StOXKEVMZXcihGO/en3Tfu//+5/+qTKJ6jEyFTaw9emnIsF2Ee92u8pk4yRO5/oltTccYMXpHKOf8ufWObnAxsUPq7w9HdfWRWxEKm/+99Hfbm0iD/kSG8CaMcCa3WEdWgCYMlgzBlizO1gTAKYM1owB1uwO1gSAKYM1Y4A1u4M1AWDKYM0YYM3uYE0AmDJYMwZYsztYEwCmDNaMAdbsDtYEgCmDNWOANbuDNQFgymDNGGDN7jRY0y6zWd5+Fluex9ennv1HrWW9kpB9gg4NpW7fTbs8ypE0rLQ3JJXLL4CPPlBfebvsmgC/+c1v7JP49rF9f9Hgyn21BJvO/f86G570Fc1K7FpXpdnwZEjqVh1yrq0zWDMGWLM7zW1NZ5FrKSzsAXa5OLsxkKxFEiie8FDqlvLpES1kx7VmgwbAR0Xl/8vuwFp669NWLgmku2Y2IMattIVup9olJofg7Hw3Crq/rPN+j9eGNWOANbvTbE1nwUlnE8HyZpnWsqp9pv9qJTyUsr6t6dBhAUynYI1hzYOuCmuGo8sW+ndMlOms9Wr/9Pc/CfmadP9zxwqy6abdQTMqfbXnjoG2Zopgze60jms66d4pmGz5sjhuLezAUEKs2WE9dH+F996teehi1lgzHFmC3y5cLsiSxY41neTh9O1XrubvI2MQvnEv93vZ2BlrYs0pgzW702pNf88saxdbvujyzX4+8TtdO4ci1tSw1G06ouOsIl3eHtmq2xfMLkKt1tQhLr0Su0q1vFm5SrW9Bt3XXt/xF6nXD+qlyhkqi2+5mXanKrknGguNo7PkvV6w7P6xuFkHX4r4ytslF6D9n/IdOYN2U+jQFtU5e3WVZblaLouicKxZ3q6lOY1USQDyu3xrlWOT2Q1O3Bc3K7Drt2O/aKtSZ0NQ3TFbrtk/vnKhf8dMdl+XunBtrBdmS079fm3nc3gS0pPonXSurTIb2g0M6pIQ1owB1uxOqzVtTVx1pX86Cd3OgzioGA0PxQ5t6iZHjslsY0J6zPxQHPy2pkZBcr7d/Es/tVmv7R5JcgbbVLWzM5zdwez2YXUf9K0pTRl7Nmdmim5WZfu9NQgtqfXeOgWiXIP8V85g9wbXL8LZgmr03Vq0gWgbf7rppm9NZwze/hnYHyCyKW9v9aVfq7WmU09yvhF7Bv067EbQ+k05kwbkfWsmed9uFu2H60Shrn/Fbv/ZnIT0su3+fXYnPv3dz4aadJtvNdaMAdbsTsiTJ9ZS9s+6PqiGRufxodRt4Gf9ZK1pa+gNV9XQQ6shOu87Wwr7/VFaT/ev1mlnSCFid/ota3poKydJ2nviX4aEpbHz91O0rWTnGmxw9oN2I8kpdCOrNW1zUzY3LausqQW3fFD/dDo2GlBr2uamNBPL29YUNB3KAXU7X9rfrbScaqizk2tlW7MyXItNz3bbzqIonDxyUBLSu22vrS4bhgy4YM0YYM3uhFhTinstUKQ6L6W8c5j9c3HgMGdgKIdaUzeCtvi9uB2s6Y+eWtPbvi//ait3UXYKo0prlqaDVIs2p+hx2p0ihvAiz/7XNlM0LlKqahN8UtYsbxr9tnHjW7O8uUvSUNa+9/ApbGrN8iapa9O2vG1N7TawFrQJo86gerw/0F5ppvK2NSvDdbC9NXpJfh/1QUlI07nTDq4bbsCao4A1uxNiTclOOh0/u9lu2ilf/EruQRvShodyaFszRN6dremMaTmmrLOm7dpVnMK9zpp6VbaJ47Q1nWLuIGvaP52awcKMp0p0RJx1FzkY1po6LGfH4fw0IG/ab8S5M81Ya17ePH1h04zfyenYq25EvM6azvy45rZmQ7hOLOT7lbNpTcK/mIOSkM0v2taszIZYcyywZncC1wZa3J6es6h6QstpXDYX+p1DOciaOrVHP5LneXMPrZ0N5IToV/ntLCcdJXKGr3xrar3eTmWyDTg9iX8PdVyzNA1WHVJ1QrGtmcAiz3l+0bG79N/avtDOs6b7xZn46sw+q7SmVsvkz7qB5DqsNcvbSbf0rGnHqnWcsnWkwBlWdHpT/XHN0rOmH66PfN128NK5J3oPG5JQZRvaGdeszIZYcyywZncCrenkk8paufYF+cV96xzawFBst6qtqtse19KbzmOvqq6U12PszEP7+1+/+67fNapR8wtNvc7FzaiSnk1vl3+v9M26pw8vzVxZ2yepb9rLsLdL/2vvg50h6d8K/wKceSUhRd4A2EFieUcbTDYuTo3HqQNVPm5UN4fW/9LVgjbNyGf18uwkZ3vn9VY7E1ady7b/tcrU4500UBlu5d1zpq/b+LYmIY2+c0OcayursqE9ecP3izVjgDW7wzq0M2Ai9oJwKutDo1zJ9MGaMcCa3cGaMwBrpoUz+7oMXlrhNMGaMcCa3cGaqRPYzQWTwnkSYyLDw9MEa8YAa3YHawLAlMGaMcCa3cGaADBlsGYMsGZ3sCYATBmsGQOs2R2sCQBTBmvGAGt2B2sCwJTBmjHAmt3BmgAwZbBmDLBmd7AmAEwZrBkDrNmd//Pv//5Xf/VXGcDk+fTTT8e+BBiB//7nfz52MTlDsGZ3vvvuu/sXF7x4Tf/14F/+ZfRr4DX8659/9auxi8kZgjUBAABCwZoAAAChYE0AAIBQsCYAAEAoWBMAACAUrAkAABAK1gQAAAgFawIAAISCNQEAAELBmgAAAKFgTQAAgFCwJgAAQChYEwAAIBSsCQAAEArWBAAACAVrAgAAhII1AQAAQsGaAAAAoWBNAACAULAmAABAKFgTAAAgFKwJAAAQShRrLs7OFmdnm/W6LMvL/V7+LIricr+PEVw4u+1WriTq2eT91XLZSyh5nuv9zPM8y7K6AxZnZ2VZht9ke/1Zlu222+ZjxkKSUJ7nrYdlWVYUhdwKGx05gyTIunf0Nu6226Io7L8qsbd9cXam38tquWz9bCCBER/lzJrehCzL7N3ocEL54gYoIvy4b9Zre/Hh19/jF+QkJ0lCemE2Med5rn9u1mu9Y30VON3Issy5gNVy6RdW6oKGUzkftDdE0Dwub66WS+eA2MSyptwXiZ6+Obo1y7JcLZeBDsiyrDU/+GdT/ayWy+OzkxRGEoTkK+ceypsakJPBWgm5G+F3rANFUfhZy6c1S+y2W7kzeqSaLM9zrcDJMf47pVfbyPO8tRjKskzOUxSFHpxlWXg6lwzScHvDywK/2GrmyFLGr2bpO5f7vfzSGjuH3XbbLcscGXcbEambdj5VZ5xqh6QiydpyG+WqNMmVN061iW2sCq5cvP0KxGQ2a0tJ1ZrZnQ9qZFfLZV1WLU2OHoa41rRFzxTamuUhDgjRnn82WxAfj1Pt8u+hTUxCWtaUhl3zMXmeN99SW/tWtOzebbe2IVj5jmRpp+Rt9Z89j9YON+t1X7erNeIjntm3i96Nun6LVoZpLTXE3X6hR57qUBz5lbcbsvqLc4u0siiE9JFEwq9lbtZrp8kYWB1xPijYGqrfHzAra5Y3dQfnAO15KIpCCizJZlJy6Tv6vpxEz2N7feVsTi61vZryjtSGdtutOkDPWRSFhGVPq1coidLpBPDPJsh59CWddZKY9OSSIOS/ch7pWvRLbYlFQxHccICeTSKiN0qvTW+sfgW2q8dGVo6RqFm7yHk0J9jvtO6C9VMiS3uHnUjJd6raa85vlQeo8+x3JL/778if8h3ZkzSX43oevVT9iCYPvSHyizYp5Nr0rpYmhWhcNF5+t7NNaRKizWjOjQ28pVrN15+X+73TRJBvubJtZ3OWnLw1djbNS9XHCU5jrVHQzhXbDXN83EtP9v4Fd/6C7NfU2oehArCFmJzWr8Y51izrK21yAXJVtj/Glqt+N7teg3wjcgcqa5PN1pR7a0/VQKU1tWasI0q2qJmbNUuvFLZ1Uq1VyR3RW2/LLz1e7qbePttZ4aAVYS0T5bR6r21vkpatcjbNXTbzyy9yAf7ZbNC2G3Bh+lVsn1We51ozkHesw/RUckzDfXasqYleLlgTsUZZc6NjRHvZTmTL26WhXI8Unc6nnO/UR/vrtEbsZz/9uL17rU2Ql5fdPwAABcVJREFUytawtmJDrKmfcroKGtrZdiDKVqcu93tJOTo0pWmg9IpsTUuX+33lt1Pe7ueU66nrGdaqp3TraTYJuaVanEnZqg6TkTPNIxqLunqqTZANsdMzOMWCBuekFs2zohD96eSvbnF37mTlBR//BVk5+Reg2PauI2O/Kexbs665bKsjciv8zOvEwomgfll2MNWev8Ga8mWVAWVaWWNNqcDZd2wtZ4bW1Dd9N0j5UmlNp/KuaI3P1pJ8NMFJr6ZtSGnodmBAHakJXd/RVqlEoe5senlqTb1ym5TlDI7V7N3QUwVa0/mIpk7Hmuoqm5N9azqRLW9nIa1GaN2z7jv1r1aFodfs9/JpytGLrOx9dfDTm+3KPsiaWuA2x6Ws6YqXrgUJ3Snp5KdzfmsIecd+g+oV259s07MzymWLQv/mNNxSW/jaGqeWklJC+cfYM2g0NXXVxc5RlF6nE5yfWnT2h/yyMJ0oneOuN1Z/r7zg478gTWnN1tTDNAtLMSXhhlizstPYFghOCaY21Xaq3E9bE9ILqCuRmq1pE4zkKadda3sdKq1Z+a3pvZ2VNXMz59PayHorxJoNrYFKpHOs9BKxvqO+sbZosGbdBXSwphwQYs3StAAUJ3EsvPl1ddYsTa+RTcG+NZ0YHWrNuvkUTkXHLzpt5TG8e7bymu1d0qvVEP13lOL2yHFDW7PyX7ZBoz2T0kGisbAtbG2a2Ig7jX5bXtu6f+XNdG5+4C21QdjGmVS25B3bVKrsnnXO0BA7f+BTouYE51SLFzcDOtrT49QCu8W99YPOBXf7gsobJ7WO0NvGt5aKUrk/sq3pWFO7yvQjqkkNt1JFi6p5na1tTWvQujzlf1DfqTxynm1Nm4U0lWtrvbzJbLa/1LemTRk60KL/qrwAW9AXN4NJpelLUUn4vU++R21/lHz9ztls0JXWtP2WkmgCrel0AvsJTsef5E9NPbZyrcWNn9Yre2htZMswa/rfqY/91qQ65Xx99ktZmHkQIZUke9/0LklDJw+bQ6ufde5PZYh+GVGaZOyXUHqXbKPfF4BNJxpxTQC2CuVctgahJY6W0a23VJNKYQYLnK+4uD0q4TvP1nFbY2ffcToJNSJ1qWV3e7zmyLiXXhqQcqDhgrt9QXp5zYnZXoxW/SVQuQmtLcs6J/m1Gb2T9pY6n1qYMSZbJ/CPbLam/Wxdnqr8YGlyd3b7oYadmUg4N2valrjtFrPvFOb5m8XZ2V+/++7i9rixcwZtM13ePGzg9zhpq1/Syu5m6oG8tFalHRTyvu0o2N1MEaq7AD2bH+7Ge9Bqd3swXP+rgepHnJtpb2Blq8tWbP2bLKeVfGIP0/6Wxc3UD+faFrdnRdl77ryj42H2AjY306CUy9vzoXZmtpegX8qlmXahX4HWqPwz2zxj42ir7YvbT3Q572g0nTaHJjAbol6eX2Bp+1KjZus99oY7hznfvo248+3YG2WDlgP0YLmS5luqaCKU2+JU8uQd+UUqVYuqOTKaoez7lbErTfrXP53gnNSi93ZhFGWTaLe4O52QtkipvMOdv6DSWFBvjq83pwND85Resz2nUwyWxmf++cVb9ni9bHnfFghO6tWcsquZ0WOLU+d22WqELR/qcD5oB4y0o8i/hllZMyEaRrDmQZ7nTj9z7BDjBeGfuW44pzNO3bnzyXu/Cbamv/CafTA6dV+QkxJsp304Wf0UyPJ2weucv7J3xD+5/j5A+dAjM7HmYtjFGo5n9ta0gzdZwAIOR9K7xlrPLEM1vQTh9EF1i0tIj1wHdrfnWGLNqeF8QavlUvqQnW6MzsVjHjChyT9/qzWdEZOE0tVqHmsDJYe2+se+kIjYzqiEskSi2DHCGGd2OsRgOjhfUHbz/Ou4VxWS8W136GAXliJYEwAAIBSsCQAAEArWBAAACAVrAgAAhII1AQAAQsGaAAAAoWBNAACAULAmAABAKFgTAAAgFKwJAAAQyv8HmV2gCztILecAAAAASUVORK5CYII=" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Considering all the birds sampled, identify which species was sampled the most and which was sampled the least. </p>
<p>Most:</p>
<p>Least:</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>Using the data from the table, calculate the percentage difference in mean bird mass for the hermit thrushes refueling at Site 1 compared to those refueling at Site 2.</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>Compare the 17-year summary data for the hermit thrush and the magnolia warbler.</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>Evaluate the one season data for the hermit thrush and the American robin with regard to average mass change per hour at Site 1.</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>Describe, using the triglyceride levels graph, the results at Site 1 and Site 2 for all of the birds.</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>Explain the differences in the triglyceride level and butyrate level for the hermit thrush at Site 1 and Site 2.</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>Scientists have hypothesized that the food quality is better at Site 1 than at Site 2. Evaluate this hypothesis using the data provided.</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<strong> one</strong> advantage and <strong>one</strong> disadvantage for blood sampling rather than weighing birds to assess food quality at stopover sites.</p>
<div class="marks">[1]</div>
<div class="question_part_label">h.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>most</em>: white-throated sparrow/WS<br><em>least</em>: American robin/AR<br>(<em>both needed to award the mark</em>)</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>5% / 5.03% / 5.3% (<em>unit required</em>) (<em>Accept answers in the range of 5 % and 5.3 %</em>)<br><em>No indication needed of whether percentage difference is an increase or decrease.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>both birds show an increase in mass at <span style="text-decoration: underline;">Site 1</span> <span style="text-decoration: underline;">and</span> a decrease at <span style="text-decoration: underline;">Site 2</span>;<br>MW has a greater increase than HT at Site 1; (<em>do not accept larger/greater change</em>)<br>MW has a greater decrease than HT at Site 2; (<em>accept negative change</em>)<br>MW has larger mass change at both sites/Site 1 and Site 2; <em><br>Do not accept answers quoting only numerical statements.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>HT data is reliable whereas AR data is unreliable / differences not significant / uncertainty higher with AR;<br>(because) error bars/variation/range/standard deviation large for AR / larger for AR than for HT;<br>(because) smaller sample of AR than of HT; <em><br>Do not accept comments about whether the data is accurate or not.</em></p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>all have a higher concentration of triglyceride at Site 1 than at Site 2;<br>HT (and WS) highest at both sites/at Site 1;<br>MW lowest at Site 1 <span style="text-decoration: underline;">and</span> AR lowest at Site 2; <em><br>Do not allow answers quoting only numerical statements.</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>triglyceride higher at Site 1 because more fat deposition / HT eats more;<br>butyrate higher at Site 2 because more fat/triglyceride utilized / HT fasts more;</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(data supports hypothesis) because mean mass at Site 1 is greater than at Site 2 (for all birds);<br>because mass gained at Site 1 but mass falls (mostly) at Site 2 (over 17 years);<br>because triglyceride levels higher at Site 1 / butyrate levels higher at Site 2 / more fat deposited at Site 1 / more fat utilized at Site 2 / more fasting at Site 2;</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>advantage:</em><br>need to capture bird only once to get data / no need to mark and catch birds again;<br>more informative data can be gathered; (<em>do not accept unqualified “more precise”</em>)</p>
<p><em>disadvantage:</em><br>removal of blood is more stressful/risky for the bird than weighing;<br>danger of infection / spread of disease / harm to birds;<br>extra time/money/laboratory equipment is needed to analyse results;<br>could include fat/triglyceride/butyrate from previous/long-term feeding;<br>nutrients from food eaten at these sites may not have been absorbed yet; <br><em>Award <strong>[1]</strong> for one advantage and one disadvantage that are not the converse </em><em>of each other. Do not allow a second advantage or second disadvantage </em><em>given in the answer.</em></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 intended to be an easy start to the question and almost all candidates answered it correctly.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The percentage calculation in (b) was only answered by about half of candidates, perhaps because of the wording of the question, which did not make it clear whether the difference should be calculated as a percentage of that at Site 1 or at Site 2. Candidates were expected to calculate the difference between the two masses by subtraction and then divide either by the mass at Site I or at Site 2. Candidates performed many other calculations, but as only one mark was available, no credit was given for these.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The best answers in (c) made it clear whether the mass changes were increases or decreases, but many answers were vaguer, referring only to mass changes. There was some confusion between mass and mass change, with some some candidates implying that a negative mass change was a low mass. In some cases answers to this question consisted only of figures quoted from the bar chart, rather than a genuine comparison and so did not score any marks.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In (d) candidates were asked to evaluate data. The command term evaluate is defined as assessment of the implications and limitations. In this case it was the limitations of the data that were relevant. Candidates were expected to use the size of error bars and the sample sizes to assess the reliability of the data. Many candidates wrote instead about the differences between the data for the hermit thrush and American robin, without any actual evaluation.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part (e) of question 1 tested a different skill in data analysis. Candidates were expected to pick out the most significant features of the data and as in (c), answers that merely quoted numerical figures from the bar chart mostly scored few marks. The points that the stronger candidates were made were that the triglycerides level at Site 1 was higher than that at Site 2 in all bird species and that the hermit thrush had the highest levels at both sites, whereas the Magnolia warbler was lowest at Site 1 and the American robin was lowest at Site 2. </p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>1(f) was another part of the question where it was important to pay attention to the command term. The term explain indicates that causes, reasons or mechanisms are required. In this case the causes of triglycerides levels being higher at Site 1 and of butyrate levels being higher at Site 2 were expected. The stem of the question had given the explanations that should have been given –fat deposition or fat utilisation.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Part (g) involved another evaluation, in this case of a hypothesis. Candidates were expected to conclude that the data supported the hypothesis. No mark was given this and instead marks were awarded for evidence. </p>
<p>Most candidates only considered the butyrate and triglycerides levels and so scored a maximum of one mark. The second mark was only awarded if candidates gave a broader answer by referring back to differences given earlier in the question for mean mass or mass change between Site 1 and Site 2.</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The last part of the question involved suggesting and advantage and a disadvantage of blood sampling. A huge variety of answers were given but few candidates gave both an advantage and a disadvantage that the examiners considered acceptable. The disadvantage was the easier of the two and many candidates wrote about the stress of the procedure for wild birds or harm that the loss of blood might cause. The advantage that was most often given was the opportunity to obtain precise measurements for many different nutrients in blood, compared to the rather blunt assessment of food quality that weighing gives. There was some confusion about the meanings of terms such as precision and accuracy. Birds can of course be weighed accurately with great precision, whereas some candidates implied that blood tests were inherently more accurate and precise.</p>
<div class="question_part_label">h.</div>
</div>
<br><hr><br><div class="specification">
<p>The diagram below shows the process of transcription.</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>DNA replication involves a number of enzymes including DNA polymerase. Identify <strong>one</strong> other enzyme involved in DNA replication.</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 the role of Okazaki fragments in DNA replication.</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>Label the sense and antisense strands.</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>Draw an arrow on the diagram to show where the next nucleotide will be added to the growing mRNA strand.</p>
<div class="marks">[1]</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>helicase / RNA primase / (DNA) ligase</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA fragments/sections (formed) on the <span style="text-decoration: underline;">lagging</span> strand;<br>because replication must be in the 5' –3' direction;<br>replication starts repeatedly and moves away from replication fork;</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>both strands clearly labelled<br><em>Check carefully whether the correct strand has been labelled if the labels </em><em>are shown in helical parts of the DNA.</em><br><em>Reject if the sense strand label points to the mRNA.</em></p>
<p><em><img src="data:image/png;base64,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" alt></em></p>
<div class="question_part_label">c (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a clearly drawn arrow pointing at the free 3' end of the mRNA strand or to the first free nucleotide on the antisense strand to the left of the mRNA or to a nucleotide added by the candidate to the left hand end of the mRNA</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>All but the weakest candidates were able to name an enzyme involved in DNA replication.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This question discriminated very well with the best candidates writing authoritatively about Okazaki fragments, but weaker candidates struggling. Some teachers felt that the word role was inappropriate here, but any answer explaining that Okazaki fragments are formed on the lagging strand because nucleotides can only be added in a 5' to 3' direction would have scored both marks. A common error was to refer to the lagging strand as the antisense strand. This is not correct -on a DNA molecule the lagging strand is the antisense strand for some genes and the sense strand for others.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About half of the candidates knew that the transcribed strand is the antisense strand, with the others either getting the strands the wrong way round or thinking that the mRNA was either the sense or the antisense strand. </p>
<div class="question_part_label">c (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p> When asked in part (ii) to show where the next nucleotide will be added to the mRNA strand the weakest candidates labelled various places other than an end of the mRNA; of the other candidates, more than half labelled the right hand end, whereas the left hand was the 3' terminal so that is where the 5' end of a nucleotide would be added. <br><br></p>
<div class="question_part_label">c (ii).</div>
</div>
<br><hr><br><div class="specification">
<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>Outline the cell theory.</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>Annotate the electron micrograph of the <em>Escherichia coli</em> cell with the function of the indicated structure.</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>Calculate the magnification of the electron micrograph.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the role of the following enzymes in DNA replication.<br>Helicase</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>Explain the role of the following enzymes in DNA replication.<br>DNA ligase</p>
<div class="marks">[1]</div>
<div class="question_part_label">c (iv).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. living things are composed of cells;<br>b. cells are the basic/smallest unit of life;<br>c. cells come from pre-existing cells; <br><em>Do not accept cells are the “smallest organisms”.</em><br><em>Do not accept “cells are the building blocks” of life on its own.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>attachment to surfaces / holds bacteria together / conjugation<br><em>Do not accept “exchange material” on its own.</em><br><em>If more than one function is given, mark the first answer only.</em></p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>× 15 000 <em>(accept answers in the range of × 14 000 to × 16 000)</em></p>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>helicase: unwinds /unzips the DNA (into two strands) / breaks H bonds;</p>
<div class="question_part_label">c (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA ligase: joins/seals the nick between the (Okazaki) fragments;</p>
<div class="question_part_label">c (iv).</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Most students earned these marks. A small number demonstrated knowledge of the properties of cells but seemed to be unfamiliar with the cell theory itself.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A number failed to state a correct function. The pilus plays a role in adhering to surfaces and in bacterial conjugation. A number annotated the picture with the name of the structure without stating a function.</p>
<div class="question_part_label">b (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>About half of candidates correctly answered this question. A number were making order of magnitude errors such as writing 150 000x and 1500x. Some were unfamiliar with the interpretation of the metric prefix.</p>
<div class="question_part_label">b (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most were able to explain the function of helicase.</p>
<div class="question_part_label">c (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Similar to primase, the mechanism of action of ligase was very rarely accurately described, most limiting it to bond formation between Okazaki fragments, not acknowledging that ligase has a role on the leading strand as well.</p>
<div class="question_part_label">c (iv).</div>
</div>
<br><hr><br><div class="specification">
<p>This image shows a normal red blood cell.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p style="text-align: left;">These images show two red blood cells that have been placed in solutions with different concentrations of solutes.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;">Outline the properties of water molecules that permit them to move upwards in plants.</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;">Define osmolarity. </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 style="text-align: left;">Deduce, with a reason, which red blood cell has been placed in a hypertonic solution.</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 style="text-align: left;">State what change there has been in the cell surface area to volume ratio in red blood cell 1.</p>
<div class="marks">[1]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>a. water molecules are polar<br><em><strong>OR</strong></em><br>can form hydrogen bonds <br><br>b. cohesion between water molecules allows continuous water columns<br><em><strong>OR</strong></em><br>cohesion between water molecules allows transpiration stream «to form in xylem» </p>
<p>c. adhesion of water to the walls of xylem vessel «helps water rise» </p>
<p>d. water evaporates at environmental temperatures allowing transpiration pull <em>OWTTE</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>«measurement of» solute concentration of a solution <em>OWTTE</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>cell 2 because it has plasmolized/lost water/volume has decreased</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>decreased</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="specification">
<p>Gibberellin promotes both seed germination and plant growth. Researchers hypothesize that the gene <em>GID1</em> in rice (<em>Oryza sativa</em>) codes for the production of a cell receptor for gibberellin. The mutant variety <em>gid1-1</em> for that gene leads to rice plants with a severe dwarf phenotype and infertile flowers when homozygous recessive. It is suspected that homozygous recessive <em>gid1-1</em> plants fail to degrade the protein SLR1 which, when present, inhibits the action of gibberellin. The graphs show the action of gibberellin on the leaves and α-amylase activity of wild-type rice plants (WT) and their <em>gid1-1</em> mutants.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>Most rice varieties are intolerant to sustained submergence under water and will usually die within a week. Researchers have hypothesized that the capacity to survive when submerged is related to the presence of three genes very close to each other on rice chromosome number 9; these genes were named <em>Sub1A</em>, <em>Sub1B</em> and <em>Sub1C</em>. The photograph below of part of a gel shows relative amounts of messenger RNA produced from these three genes by the submergence-intolerant variety, <em>O. sativa japonica</em>, and by the submergence-tolerant variety, <em>O. sativa indica</em>, at different times of a submergence period, followed by a recovery period out of water.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>The <em>OsGI</em> gene causes long-day flowering and the effect of its overexpression has been observed in a transgenic variety of rice. Some wild-type rice (WT) and transgenic plants were exposed to long days (14 hours of light per day) and others to short days (9 hours of light per day).</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 which variety of rice fails to respond to gibberellin treatment.</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>The activity of α-amylase was tested at successive concentrations of gibberellin. Determine the increment in gibberellin concentration that produces the greatest change in α-amylase activity in wild-type rice plants (WT).</p>
<div class="marks">[1]</div>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss the consequence of crossing <em>gid1-1</em> heterozygous rice plants amongst themselves for food production.</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>Determine which gene produced the most mRNA on the first day of the submergence period for variety <em>O. sativa japonica</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the difference in mRNA production for the three genes during the submergence period for variety <em>O. sativa indica</em>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Using only this data, deduce which gene confers submersion resistance to rice plants.</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>State the overall effect of overexpression of the <em>OsGI</em> gene in plants treated with short-day light.</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>Compare the results between the plants treated with short-day light and the plants treated with long-day light.</p>
<div class="marks">[2]</div>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State, giving <strong>one</strong> reason taken from the data opposite, if unmodified rice is a short-day plant <strong>or</strong> a long-day plant.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Evaluate, using all the data, how modified varieties of rice could be used to overcome food shortages in some countries.</p>
<div class="marks">[2]</div>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p><em>gid1-1</em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>between 10<sup>–8</sup> and 10<sup>–7</sup> mol dm<sup>–3</sup> <em>(units required)</em></p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. 25% / 1 in 4 / 1:3 seeds produced would be homozygous recessive;</p>
<p>b. no response to/inhibits gibberellin in homozygous recessives results in less germination;</p>
<p>c. less growth / dwarf plants produced; <em>(must be in context)</em>;</p>
<p>d. would produce plants with infertile flowers that cannot produce rice grains;</p>
<p>e. would lower rice production/less yield because infertile plants cannot produce seeds (that humans can eat);</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Sub1C</em></p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <em>Sub1A</em> is expressed strongly/the most / <em>Sub1A</em> produces the most RNA;</p>
<p>b. <em>Sub1B</em> (always) has the lowest expression/produces least mRNA;</p>
<p>c. <em>Sub1A</em> expressed/produces mRNA for the longest time/days 1 to 10;</p>
<p>d. <em>Sub1C</em> expressed/produces mRNA for the shortest time/days 3 to 7;</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <em>Sub1A</em>;</p>
<p>b. is only expressed in <em>indica</em> / <em>Sub1B</em> and <em>SubC</em> are expressed in both rice varieties;</p>
<p>c. <em>indica</em> is the variety showing submersion tolerance / vice versa for<em> japonica</em>;</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>it increases the length of time <span style="text-decoration: underline;">before</span> flowering</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. long-day light exposure increases time before flowering only if (<em>OsGI</em>) gene is not overexpressed/in WT and –/–;</p>
<p>b. long-day light exposure decreases time before flowering for +/– and/or +/+;</p>
<p>c. length of day does not make much difference/makes least difference for +/+;</p>
<p>d. overexpression for +/– reduces time before flowering;</p>
<p>e. –/– acts as a control / has nearly the same length of time before flowering as WT;</p>
<p><em>Accept numerical answers if they are making a clear comparison</em>.</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>is a short-day plant <span style="text-decoration: underline;">because</span> WT has shortest time/shorter time before flowering in shorter days than longer days / as it takes less time to flower under short day conditions;</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. the mutant <em>gid1-1</em> would not be useful because it produces sterile plants;</p>
<p>b. genetically modified rice/rice with<em> Sub1A</em> is more tolerant to submersion/can withstand seasonal flooding/torrential rain;</p>
<p>c. <em>OsGI</em>+ varieties adapted to different latitudes / day length could be produced (to overcome food shortages);</p>
<p>d. short flowering time possibly means more crops per year;</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>The word “increment” seemed to confuse the weaker candidates who stated a value rather than a range. In addition there were a large number who omitted or misquoted the units. In spite of being clearly stated in topic 9.3.5, very few candidates correctly gained the mark in part (iii) for saying that the amylase catalysed the breakdown of starch to maltose. Many answered glucose instead of maltose, but a surprising number did not even realise that amylase is an enzyme.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The word “increment” seemed to confuse the weaker candidates who stated a value rather than a range. In addition there were a large number who omitted or misquoted the units. In spite of being clearly stated in topic 9.3.5, very few candidates correctly gained the mark in part (iii) for saying that the amylase catalysed the breakdown of starch to maltose. Many answered glucose instead of maltose, but a surprising number did not even realise that amylase is an enzyme.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most of the better candidates realised that it was a simple monohybrid cross (although several thought it was dihybrid) and realised that 25% would produce dwarf plants, but did not explain the consequences on potential yield in sufficient detail for the third mark.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In spite of doubts from the G2 forms, candidates had little difficulty in interpreting the photograph.</p>
<p>In part (i) most correctly answered <em>Sub1C</em>.</p>
<div class="question_part_label">c(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The answers to (ii) tended to be descriptive, not making clear <span style="text-decoration: underline;">differences</span>, as asked.</p>
<div class="question_part_label">c(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates correctly identified <em>Sub1A</em> with a correct reason.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most answered correctly that it increased the time <span style="text-decoration: underline;">before</span> flowering.</p>
<div class="question_part_label">e(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In (ii) almost every correct answer was from the first two mark points.</p>
<div class="question_part_label">e(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In (iii) most candidates identified it as a short-day plant with reasons.</p>
<div class="question_part_label">e(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>In spite of the stem saying “using all the data”, most of the answers were very vague and did not use the data. The ideas that the mutant <em>gid1-1</em> should be avoided as it produces sterile plants and those modified with <em>Sub1A</em> would withstand seasonal flooding were missed by most candidates.</p>
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>The diagram below shows the structure of lactase</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>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>Bottlenose dolphins (<em>Tursiops truncatus</em>) inhabit almost all tropical and temperate oceans between 45°N and 45°S. Over a two-year period, aerial surveys were carried out to investigate the seasonal distribution of these animals along the mid-Atlantic and eastern coastal waters of the USA. Sightings were recorded using a global positioning system (GPS) while flying in a regular pattern within approximately 65 km of the shore. A total of 12 760 dolphins were sighted over the two-year period and the data are summarized in the chart below.</p>
<p>Each bar corresponds to a single survey and the length of the bar corresponds to the total number of bottlenose dolphins counted in that survey. The circles with numbers indicate numbers of dolphins.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>As part of the same study, coastal aerial surveys were carried out over the same time period by flying parallel to the coast approximately 500 m offshore. The diagram below shows a map of the section of coast surveyed. The bar graph shows the seasonal data for summer and winter at the corresponding latitudes (°N). A total of 5431 bottlenose dolphins were sighted during these surveys.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>In a different study, researchers investigated the role of water temperature as a possible factor in the distribution of bottlenose dolphins. The rate of metabolism (measured as the rate of oxygen uptake per unit mass) of five captive adults was measured under a range of water temperatures. The rate of metabolism was found to increase significantly when the water temperature fell below a certain value known as the lowest critical water temperature (LCT<sub>w</sub>). Below this temperature the body uses more energy to combat the cooling effect of the surrounding water. The data for these animals are summarized below.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAoYAAALDCAIAAAAHfVbxAAAgAElEQVR4nOy938ss13mgO/9FtxPrt/a2HScOttSdQ+RD7ON9YluWZEvuPli2J0O2E8bKGXuovsiQOB62lRAIojqJMZ5oOxmTIYPrIuCJJCMw2FAHdGEwIuCgXBRkQBcGs9GFQRcCXdS5eNNv3m+tVfV1dXWtWlXf89BsetdXXbXqrXetZ61V1V3/rgYAAIAE+HdjFwAAAADqGiUDAAAkAkoGAABIApQMAACQBCgZAAAgCVAyAABAEqBkAACAJEDJAAAASYCSAQAAkgAlAwAAJAFKBgAASILJKLkoiufA4/m/+quxizB5vvnNb45dhLnx/PPPj12E6UFd7kNRFGM76jxMRslPP/30s88+O/Z5T46nnnySsPThD/7gDz732c+OXYq58dRTT5GWnXj22WefevLJsUsxVZ599tmnn356bEedh8koefXww6+//vrYpUgOwtKTV1555aknnxy7FHODtOzKz3/+8+vXro1diqkyp+ih5GlDWHqCkoeAtOzKnKQSnzlFDyVPG8LSE5Q8BKRlV+YklfjMKXooedoQlp6g5CEgLbsyJ6nEZ07RQ8nThrD0BCUPAWnZlTlJJT5zih5KnjaEpScoeQhIy67MSSrxmVP0UPK0ISw9QclDQFp2ZU5Sic+condFlVxV1XKxKMvy+I+UZblcLHZZ1n/v+zxfLhbLxWKf5z03lULbVxSFHM5ysaiqap/nVVWNW6TjOaOSt5vNWdLD32ynRE2BPmmpueTXUKmDNtnOUdgLFEXhnMRBd6f0kYoTluVi0fK7Gf5qcrzOFuzrmKwuy9Lf6XazCZ5HaX6ds9yn7qDkETive0SKnZJAxLPdbM5SAEnWGShZwqJVbr1aDd14nZdzKVlbmf6bcja7Xq3Ou80I9ExL7bM6NbRp+RnxO0AqvGSVLEiT0pItGj09kF2WaZumtdhZbZdlx0TbX2eXZdK+SdVwdmpripQcJQtXVMlijrM3oMczGyVvNxunFbiaStaG7Lw/7LfP8/5JEp/+StYBlrN8UCUHO0DzULJOZTlHURSFKFlDGjT3pXv317HnbpdlUi90487K+zxHycJVVHJZltpTG6u9m5OSncmDqzlxvcsy6eedd1A7xVnr+hxKVoVoF6csS7XjQEr2Z63ruShZkjM4ydc0FXH88RZF4WdpUMktpw8lC1dRyXLugw2ovcpina3VUnLaXiORN7IdHXxrNtvrrP5czQyUbA/Qr1TOsMZe9NI/jTsxexYly4U0PSKnedL+n3MNz15RC242OGjT3JNPOaOf4DjS33V9MVflfVEU9mz2Sc7+Sq6qyuntSXn8o7MB0eU2troFPeSmgAc7QFbJ/imz2+xj7kGVrIdwzDk9QclNirW1vqoqv5t1LlDyCJxdycEG1HbD9b38SdbX6m1rpm3dpP3VHNV1nOWzUXLtdTs0nnLIRVFIQ2YvLMlq8qdRy34eJctp1UOzLZQ973LSpT2S7NIeXrAlbZq1ttupzbREMOC60Mlnaxf5k5xH+ZT0ME4OyFmU7Pc2ak/Jso69QUnSb7vZSGxF7fWh/sqngtFuumzvjJLtTXzaldG9n5zPgyrZGWC001XJ0ui1FGnpXaVGyS1cOSXrHEuwAbXN1jFKlk1JzbQtYPBmh7kqWbCDFQmLrdi2sdAGYribdI7njEquTRD0T/ZE2xyQ93a5Pz5rmrV2biXTLGoKuNCkZLsLm8l9OIuS68MRyTy2Tapg5tjDsTcuCZp1TTsNzlrXF5W8Xq1suPxG4GTZTFfJwVnr9i2j5BaunJL9iSZbSwdSsu5UPz4bJQe/MbLLMud7DkFRpfCI0/5K1obGvvTQmkbJtgcTbKfa77VWo+tMQ3vAbSGd9Z2W17/4cgLnUrIc5nq1cqadnKyzF0ScyNsl7X3Bpg6Q8xUjW2enMkrWc33MF0a6Kvn4jvVwtwKg5BE4i3vKsrQ1KngLyXmVrAMgp9s+GyU74wap/P5EooP/RYix6K9kp5nz2z6rw6Cqg7RPHWsja9cJBly/T+9MwDYpuT7HF7rOpWT/IqjfpquHgj0bqZs2JnZ+wlkzWBhnlOxszXat+nRiBlKy/E5AbWqcX0gnYp2UrNvvVMhgavXpoKPkETiLe/xUcL4NdV4l2y0496rMScm2kZIo6fU855D1jUwSHtltH5SeStZbSRVndq5psOtfKHVUeum91v50dzDg/q1bLUper1b2NrFusTCcS8m19013R8la3fRw9Ocv7DV7uXHBDrWdqtc0a11715LtyLjlU10ZSMm2j+Lr0PnGsNBJySd8vcK/r1Yi3GkjDih5BHpWcjutpzlq56MkBfW97fxK46j/tV+alOYg+Ck7nWVXk3t2dHnPr7iMrmTnFnSnJjvL7aDHRn684vdSsh6dWtC5uVq+bemkma7ccnvzMb8QUpal36HxT4QWQN843w6wO9KvcvXMzLP8epfehikl9C8Q2FvA1quVHrvccOR80VF7gcGOYEsHSHcn/RV7yvyrYCd3ss/76132Fbx91T/1zsHaU6AXXGSJnRg7rUfi3BDav1+OkkdgdPekCWHpydC/cR28xHuWi+gipP7bGYIrkpaOWvwu6fEkLpXlYapPplvGLo5L4tHrBEqeNoSlJ0MrebvZOCOnngNQ0cAZp0yH4IqkZXAMetqmEpeKyti/UpMCiUevEyh52hCWngytZH9SseelCt1gyr/qdUXS0p9LP3lTiUtll2Uyt79erVDyoKDkaUNYesLDGYeAtOxK4lKRG2jqVH/BPvHodQIlTxvC0hOUPASkZVfmJJX4zCl6KHnaEJaeoOQhIC27MiepxGdO0ZuMkm985CMvvvDCK3CRD3/oQy8Qlh58+9vf3m42Y5dibvxfH/4wtbUTL77wwoc/9KGxSzFVXnzhhRsf+cjYjjoPk1Hyk5/61BOPP/7Uk0/ysq9HP/5xwtLn9YlHH/3EJz4xejFm9nr0Yx8jLTu9nnj88Uc//vHRizHR1xOPP/7kpz41tqPOw2SUzFRYEMLSk1eYuB4A0rIrc5p6jc+cooeSpw1h6QlKHgLSsitzkkp85hQ9lDxtCEtPUPIQkJZdmZNU4jOn6KHkaUNYeoKSh4C07MqcpBKfOUUPJU8bwtITlDwEpGVX5iSV+Mwpeih52hCWnqDkISAtuzInqcRnTtFDydOGsPQEJQ8BadmVOUklPnOKHkqeNoSlJyh5CEjLrsxJKvGZU/RQ8rQhLD1ByUNAWnZlTlKJz5yih5KnDWHpCUoeAtKyK3OSSnzmFD2UPG0IS09Q8hCQll2Zk1TiM6fooeRpQ1h6gpKHgLTsypykEp85RQ8lTxvC0hOUPASkZVfmJJX4zCl6KLkzuyxbLhZjl+JfSScsx7NcLPZ5PnYp/pVklVxV1XKxkFdZlrp8u9nocnmNWMgm4qTlerXabjZ2SVNwjglaWZb616qqhi68QyJSsUGQV7CqFkUxYqx8EoneWUDJ3UitHUwkLMfTUs9HIVklr1creSNdQLFyVVVFUeg6ZVk6TkqEodNSzWEPvyk4xwStqipduMsyDX40EpGKUzG3m43tDgoSfFku7+OVr4FEoncWUHJn9nmeQhYK6YTleFDypViF1CZiTvu4z3NnzUSIk5bbzcbKtSk4xwTNDvVG0UwiUnFiFeya7PPcLk9hoJxI9M4CSu4MSu4JSu7KerUKRmy9Wo3eGgYZRckOTcG5NGhFUcTPzwSlUhTFLsuCy62GU2gME4zeyaDkzqDk+iAJCYXUT728pM2ZvS5lm05HybrOKAO+qSg5OH+Y5qx1nYCSm4JzadDKsgx6aGgSlEpw1lpYr1bSBm43mxQ6hQlG72RQcmdQslRINav8VxoyGxwd29mLT/VFJevKzjrRSF/JTZJIdta6TkDJTcFpD5pctl8uFlf2WrKlPQj+jYcjkmD0TgYldwYl1xenUndZpi2jjJXtmjp69pVs79sc67av9JXc1DImO2tdJ6Dkk2et68Pt2ZG7O6lJpWnWWv+6z3PpwaTQL0wten1AyZ1ByfVxSpb3uyyT7/P4SpZaHb3sF0hcyRI9f3nKs9b12Eo+edZaWa9WV1zJLbPWZVlqN1Hq+Ohj5dSi1weU3BmUXB+hZKvhJiUXRRF/htAhZSW3zLLKhfzI5TmecZXcFJzjg9YipIFITSotTZyt73Vdbzeb0VMxtej1ASV3BiXXRytZjOJ0pZ1ryTpQrqqKiWvF8YczXE551roeW8l9Zq3rui6KIv4MRFJSuXTW2qnOjJLPCEruht7ZlMhFlFHCohEQGesdMXoDttyDrTfL6Bt78Vh8Y3+japQRc5pK1ojZUOtfE5+1rodPS5s2zvdiO81a63cBbOpyx7U/SSDx0YU2XKP7uE4sej1BydOGsPQkTSVPHdKyK3OSSnzmFD2UPG0IS09Q8hCQll2Zk1TiM6fooeRpQ1h6gpKHgLTsypykEp85RQ8lTxvC0hOUPASkZVfmJJX4zCl6KHnaEJaeoOQhIC27MiepxGdO0UPJ04aw9AQlDwFp2ZU5SSU+c4oeSp42hKUnKHkISMuuzEkq8ZlT9FDytCEsPUHJQ0BadmVOUonPnKKHkqcNYekJSh4C0rIrc5JKfOYUPZQ8bQhLT1DyEJCWXZmTVOIzp+ih5GlDWHqCkoeAtOzKnKQSnzlFDyVPG8LSE5Q8BKRlV+YklfjMKXqTUfLnP/e5Tz7xxFNPPsnLvjZPPUVY+rwee+yxTz/11OjFmNnr05/+NGnZ6fXJJ54gD/tE7/Of+9zYjjoPk1HyjY985IUXXngFLvLhD32IsPTh29/+9nazGbsUc+PDH/4wadmJF1544cMf+tDYpZgqL7zwwo2PfGRsR52HySiZqbAghKUnrzBxPQCkZVfmNPUanzlFDyVPG8LSE5Q8BKRlV+YklfjMKXooedoQlp6g5CEgLbsyJ6nEZ07RQ8nThrD0BCUPAWnZlTlJJT5zih5KnjaEpScoeQhIy67MSSrxmVP0UPK0ISw9QclDQFp2ZU5Sic+cooeSpw1h6QlKHgLSsitzkkp85hQ9lDxtCEtPUPIQkJZdmZNU4jOn6KHkaUNYeoKSh4C07MqcpBKfOUUPJU8bwtITlDwEpGVX5iSV+Mwpeih52hCWnqDkISAtuzInqcRnTtFDydOGsPQEJQ8BadmVOUklPnOKHkruxnq1Wi4Wy8Vin+djl6WukwlLJ9KJXp2wkquqkkxbLhZlWfor7PN8u9nEL9gxxEnL9WrlR0BraFEUx6zvM0pgk5LKdrPR3KuqyvlrWZb610Qaw6Si1xOU3IHtZiMJWhRFColYpxGWTiRSh5VklbxereTNLst8K4uwr6yS1QpOBNarlaSWxEet3LS+z1iBTUcqZVn6vRmLU3m3m02wyxiTdKLXH5R8LFVV2czbbjYpNIijh+UEUPKlOG2iH7Fdlu2yLIUMDBInLZ06WJal9mPqut7nuf2vv36QsQKbjlR2Wda+giNgJ8ijkE70+oOSTySRBjG1sBwDSu6KDv6EoijKskwkA4OMomTHwTIytvOulyp5xMAmIhWdTrhUzEJRFEeuOSiJRO8soOQT2WVZCl4ZKywiiX2e6wUnmcy3urXXnGwb5yhZ12mfLhuIqShZhyZVVUkjiJJ9JVsHd1XyuIFNRCoarqYLyQ4pzFrXyUTvLKDkE0lhuqYeKSzOPW7yX2nOpFnU1WQFaRy16lol68rOOtFIX8kybtP/6nuU7ChWLgNrfKSPeLySxw1sglI5Zp4/kWYwweidDEo+hV2WpdA3rMceJct724RJO2jX1NGzr2T904i3bqavZNvqycyqvEfJvjOcm4GPv5Y8emATlIp0cVpWSGTWuk4yeieDkjtTFMUoU6xBUlayvN9lmdRtX8n7PB+9SieuZIme/td+O6X9K1LjMpaSLf6lkJb1Rw9smlJpHwQnMmtdpxq900DJ3XBmEUcnWSVbDTcpuSiK0Se+UlbyPs9bOn+MklsUGwzOkd+SYJQsVFXVHof2MXRMEozeyaDkDpRlaXM0heFy4kqW+MjCpmvJ2sWpqoqJa0XuntP/OsPlGiU3K9afsm5f3wElC+vVquX2rnRmresko3cyKPlY/Aufo4/w6pHCohGQxkujoTdgy2018hsXspreU+1cNra/UTVKPNNUskbMhtpf58oq2aaN3sOlF5L9jnJw/bqug78KcpWV3PS7XVK1nR9mSGTWuk4memcBJU8bwtKTNJU8dUjLrsxJKvGZU/RQ8rQhLD1ByUNAWnZlTlKJz5yih5KnDWHpCUoeAtKyK3OSSnzmFD2UPG0IS09Q8hCQll2Zk1TiM6fooeRpQ1h6gpKHgLTsypykEp85RQ8lTxvC0hOUPASkZVfmJJX4zCl6KHnaEJaeoOQhIC27MiepxGdO0UPJ04aw9AQlDwFp2ZU5SSU+c4oeSp42hKUnKHkISMuuzEkq8ZlT9FDytCEsPUHJQ0BadmVOUonPnKKHkqcNYekJSh4C0rIrc5JKfOYUPZQ8bQhLT1DyEJCWXZmTVOIzp+hNRskfeP/7f/SjH70OFyEsPfnud7/76KOPjl2KuUFaduW111578IEHxi7FVHnttdeuPfjg2I46D5NR8uOPP/7wQw+tHn6Yl3199KMfJSx9Xh94//v/7xs3Ri/GzF4fIy07vh5+6KGPfvSjoxdjoq+HH3ro8ccfH9tR52EySl4xFRaCsPSEieshIC27Mqep1/jMKXooedoQlp6g5CEgLbsyJ6nEZ07RQ8nThrD0BCUPAWnZlTlJJT5zih5KnjaEpScoeQhIy67MSSrxmVP0UPK0ISw9QclDQFp2ZU5Sic+cooeSpw1h6QlKHgLSsitzkkp85hQ9lDxtCEtPUPIQkJZdmZNU4jOn6KHkaUNYeoKSh4C07MqcpBKfOUUPJU8bwtITlDwEpGVX5iSV+Mwpeih52hCWnqDkISAtuzInqcRnTtFDydOGsPQEJQ8BadmVOUklPnOKHkqeNoSlJyh5CEjLrsxJKvGZU/RQ8rQhLD1ByUNAWnZlTlKJz5yih5K7sVws5FUUxdhlqetkwtKJ5WKxz/OxS/GvJKvkqqo02cqy9FfYZZn8NX7ZLmXotGwPznq12m42/sL2mrvdbHSb8QOblFRsKKqqalpNz8Lo1Tmp6PUEJXdgvVrJm6Io2pM1GimEpROJ1GElWSVrsol6rXikKdQVEmTotGwKTlmWkmCOkterlaSchM63clVVdmFZlr7UByUdqZRlecx4QyKfyMgknej1ByV3wDq4aewSmRTC0hWUfClOS2cjJlLZZdkY5TqWQdOyJTjCdrOxQi3L0nZf9nnu92acurzP88iySUcqx6SW+DiFMYmQTvT6g5JPoaqqyJ3oJpIKy5Gg5K7oIK/2fJMmMdPSBkdwQuQ4WEbS7TpZr1aRfZOIVHSaoUXMsk4KAxIlkeidBZR8CunMGY4VFmkH93muF5xkMt/qVqu3M5HoKHncy/NTUbK0gDJE1rCneSG5jq5kRw++kq2DL1Vy/FnrOhmpaFhaLiTvsmy9WumtDCl0rxOJ3llAyd1Q8SQybzNKWPROGamN8l/pVkvzp6vJCk632lZjXXmsrnf6Si7LUocskn76X/+iaSJES0sbHMVRsjPVf+mNIPFnreskpdI0HyN3z0mIpL6PPmJOMHong5JPQRIxhet5446S5f0uy7TqSntn19ROjK9k278Zq8edvpJbroOmc5uhQ7S0DM5X+S6xEzaX3hkXf9a6TlIq0pXxlzsTWjJijliuAAlG72RQ8onssmz0RKzTVrIO6aRu+0re5/noMUxcyRI9/e8Jl0VHIU5aOsFR2i+3t18iGWXWuk5VKsG+ixPA7WYzei1OM3qngZJPRK6kjl2KdJVsNdyk5KIoRr8qn7KS/RlUx8Hy3zGKdgkR0rJlerlFyTZXmzY7Sr1OUCpNN7E6Dt5uNqO3hAlG72RQ8ik0TenEJ3ElS6MpC5uuJWv1rqqKiWvFcYOOCG20U2gNgwydlk3BEZqUfMyXuUeZta6TlEpTKGwPO5FOYYLROxmUfCz2ctToYztllLBoHEQPGhN7J3BVVXpPpr6xF4/tTzeMGNU0lawRs6HWv2rM0/RxPXBatgTHppNOJ2jN9UfVzv1xY81a18lIpel3u5zbuGxjOFJJL5BI9M4CSp42hKUnaSp56pCWXZmTVOIzp+ih5GlDWHqCkoeAtOzKnKQSnzlFDyVPG8LSE5Q8BKRlV+YklfjMKXooedoQlp6g5CEgLbsyJ6nEZ07RQ8nThrD0BCUPAWnZlTlJJT5zih5KnjaEpScoeQhIy67MSSrxmVP0UPK0ISw9QclDQFp2ZU5Sic+cooeSpw1h6QlKHgLSsitzkkp85hQ9lDxtCEtPUPIQkJZdmZNU4jOn6KHkaUNYeoKSh4C07MqcpBKfOUUPJU8bwtITlDwEpGVX5iSV+Mwpeih52hCWnqDkISAtuzInqcRnTtGbjJL//ec//8wzz/znL3+Zl31tN5vfIyw9Xr/zhS88/ZnPjF6Mmb02n/40tbXT65lnntluNqMXY6KvZ5555t9//vNjO+o8TEbJT37qU9+6fbuAizz2iU8Qlj7kef7Zp58euxRz47HHHiMtO/Gt27cf+8Qnxi7FVPnW7dtPfupTYzvqPExGyUyFBSEsPWHieghIy67Maeo1PnOKHkqeNoSlJyh5CEjLrsxJKvGZU/RQ8rQhLD1ByUNAWnZlTlKJz5yih5KnDWHpCUoeAtKyK3OSSnzmFD2UPG0IS09Q8hCQll2Zk1TiM6fooeRpQ1h6gpKHgLTsypykEp85RQ8lTxvC0hOUPASkZVfmJJX4zCl6KHnaEJaeoOQhIC27MiepxGdO0UPJ04aw9AQlDwFp2ZU5SSU+c4oeSp42hKUnKHkISMuuzEkq8ZlT9FDytCEsPUHJQ0BadmVOUonPnKKHkqcNYekJSh4C0rIrc5JKfOYUPZR8CmVZLheLsUtR14mF5UiWi8U+z8cuxb+SuJLXq9V2swn+aZ/nTX8anThpGQzOerVaLhbLxWKXZbpwu9nIQn0FN7jPc/lrWZYDljtEUlKx4aqq6uR1opFU9HqCkk9Bqv3YpajrxMJyDFKHUfKlSLdvuVgEvVtVVdOfUmDotGwKznaz0SXbzUbSrKqqoijsZ4Nxs12c+FZORyplWdpwnbxOTNKJXn9Qcmf2eS696bELUtcpheV4UPLxWMdYdlm2y7Irq2TBD85ysVBV7PNcBsqOXPd5HtSJ1XD8GYh0pGJnF/qsE5N0otcflNyNqqqkSqPkk0HJxxNUclEUZVmiZD8469VKbSFdZ/9T69XKn2h1LkXFvzKViFR0+qFFusesE5lEoncWUHI3pAlAyevVSmcL5GKSxMTqVquuM8HoKFnXGWUqbHJKrqpKmkKU7AdHknCf59Jl8T/SMmu9Xq3sapEvkSYiFT3klovEx6wTmUSidxZQcgf2eS75d8WVrHfQiFnlv9IC2il90XZ9aOB0VtAqWVd21onG5JSspkHJwSkEycCWe+KCPT+U7NN00aTrOhFIMHong5KPRaas5f0VV3JtdFtfdIMfGR09+0rWP+kr/oT2tJQsU9byHiUHfSDz0svFwirW+au/HCX7SBj7rxOBBKN3Mij5WHSSdlyFOKSsZHm/yzKpt76S9QacEZmWkv0v84wytXApYyl5u9noINj/ilTTrHXtXTyO3+dOUyrBbs0J6wxNmtE7DZR8CoySL1Wy1XCTkouiGL0+T0vJFkbJTnCcNPNv0Wq64Utw7riO3FlMUCpVVV2aYMesE4EEo3cyKPkUUPKRSpYhiyxsupasbZ+9NBANlDwEI95xrUv8LzI1zVo760vqRr5rKUGptIfr+HUikGD0TgYln8IVV7JOmYoV5L1I2v6gzy7LdDW9p9qZ85fmT7cQ+UDqhJVsIxM0xFVWcktwgjf51w2z1s5qmqhX9te7mn6TS6q2hCWp3+0SEoneWUDJ04aw9CRZJU8a0rIrc5JKfOYUPZQ8bQhLT1DyEJCWXZmTVOIzp+ih5GlDWHqCkoeAtOzKnKQSnzlFDyVPG8LSE5Q8BKRlV+YklfjMKXooedoQlp6g5CEgLbsyJ6nEZ07RQ8nThrD0BCUPAWnZlTlJJT5zih5KnjaEpScoeQhIy67MSSrxmVP0UPK0ISw9QclDQFp2ZU5Sic+cooeSpw1h6QlKHgLSsitzkkp85hQ9lDxtCEtPUPIQkJZdmZNU4jOn6KHkaUNYeoKSh4C07MqcpBKfOUUPJU8bwtITlDwEpGVX5iSV+MwpepNR8gfe//4f/ehHr8NFCEtPvvvd7z766KNjl2JukJZdee211x584IGxSzFVXnvttWsPPji2o87DZJT8ySeeeOgDH1g9/DAv+/r4xz728EMPjV6M6b4+8P73/+aNG6MXY2avj33sY9TWTq+HPvCBj3/sY6MXY6Kvhz7wgU8+8cTYjjoPk1HyiqmwEISlJ0xcDwFp2ZU5Tb3GZ07RQ8nThrD0BCUPAWnZlTlJJT5zih5KnjaEpScoeQhIy67MSSrxmVP0UPK0ISw9QclDQFp2ZU5Sic+cooeSpw1h6QlKHgLSsitzkkp85hQ9lDxtCEtPUPIQkJZdmZNU4jOn6KHkaUNYeoKSh4C07MqcpBKfOUUPJU8bwtITlDwEpGVX5iSV+Mwpeih52hCWnqDkISAtuzInqcRnTtFDydOGsPQEJQ8BadmVOUklPnOKHkqeNoSlJyh5CEjLrsxJKvGZU/RQ8rQhLD1ByUNAWnZlTlKJz5yih5KnDWHpCUoeAtKyK3OSSnzmFD2U3JnlYiGv9Wo1dlmihkUPvKqq8255u9lsN5vzbvNIklVyWZbBgDctT4o4ablerZy02W42Ghx52ZVlyS7Lglurqko/VZblsEX3iC+VfZ77KaRBaIqSonlYFMWQxTwKlDwCiSh5n+dJtYPRwrJeraSdWq9Wl9FZ3b4AACAASURBVFbXTkgzipItVVVpQHZZpp2/puWpMXRaqg9s2lRVZfVQlqX+1fb5tpvNPs/9bWowd1kW38qRpaIdFNuaiY9lyS7LWqq51Nn4HZcmUPIIJKLk89qoP3HCIi3gcNtnlOzgD4vbl6dGnLR00sYxxD7P1dB2MLfPc78WO0O95WIR1PZwxJdKURSOkq2GrZ4dxMeRSnkcKHkEUlCyTPUkMlcjxAmL1N7hto+SWyiKIqiHpuUpMIqSHdarlRrFTu3s8/zSuK1Xqyuo5PVqZVs2579Nn0oBlDwCKShZElFGJ4nMGUYIi70+p0etE1/acu2ybLvZ2CtMel3KtpvB63xO26p7jDAnkbiSy7IMBqFpeSKMrmQ7a10fRLLP8yPjppdpojG6kqW22qMO9ksk5lpDExmcoOQRSEHJlvhTW0FGGSXr+EOqcVEUcvlN7Sv/FX+LpKWqi7ZlIzaAzqU+bRciBDllJWtUnf5f0/J0GF3JdtZalxx5y8Io3Z2pKFliqNU5kREzSh6B1JRcFMVYc62W+Eq2d/zasazVrV3fr+o6evaVbO969UfYQ5CykgUZkfjDkablKTC6ku2stV1yTD9mlI7OJJTsr5PIyAQlj0BqSrb3vo5IfCU39UWOUbJtE22F17a1LMvIDWL6Sq4bruq1LB+dcZXszFrLmhoo/6tTll2WjTLsG13JtZdOfofvyJF0fFDyCKSm5ERurhlrlOyvc4ySbQUOKrnlPs+BmISS7WT+MctHZ1wlOzdwOSJpuVPdn+6ORgpK9u+49j/lODiRTiFKHoGklFxVVSKX8ca6lmybwuMnrvXGV1nYdC3Zxnboq3rpK7lpWiKRSydBxlVycNZa19zn+TEijzxcTkHJtkPc9O1t6dDIOkVRJNIMouQRSEHJ/o3HoxP5jmsVpHPjtK4jnWj9k1R7fa//lSZSNqif1YZSb+eOMGJOU8k2hrZT0rQ8NYZOS+eeA+fr2kHjBu9OcG5I9O+QiEZkqdhKbdWrd4rYw3du47K1OFqB20HJI5CCkhOEsPQkTSVPHdKyK3OSSnzmFD2UPG0IS09Q8hCQll2Zk1TiM6fooeRpQ1h6gpKHgLTsypykEp85RQ8lTxvC0hOUPASkZVfmJJX4zCl6KHnaEJaeoOQhIC27MiepxGdO0UPJ04aw9AQlDwFp2ZU5SSU+c4oeSp42hKUnKHkISMuuzEkq8ZlT9FDytCEsPUHJQ0BadmVOUonPnKKHkqcNYekJSh4C0rIrc5JKfOYUPZQ8bQhLT1DyEJCWXZmTVOIzp+ih5GlDWHqCkoeAtOzKnKQSnzlFDyVPG8LSE5Q8BKRlV+YklfjMKXqTUfJnn376j5999jm4yFNPPvksYenBH/7BH3zus58duxRz49NPPklt7cQfP/vsU08+OXYppsofP/vsZ59+emxHnYfJKLkoirHPe4o8/1d/NXYRJs83v/nNsYswN55//vmxizA9qMt9SOGxzWdhMkoGAACYNygZAAAgCVAyAABAEqBkAACAJBhBydvNZp/nzsKyLJeLhb+8E8dvpCzL7Waj/93n+XKxKMuyz96bKIpil2UtK1RVtV6tum52uVgsF4uTb2qQQ14uFk1lk2DKCvs8r6rKKbP8VUquK8e8yWK72SwXC/3vLsukDPryPyLLy7IMJol+sKqqS+PTE4mbswuNqkZbjlFLK/+VQ9vneTDasmU/Grvd7rwnqCiKI2vN8Wv2ob0eSRk6HX6EYi8XC9sQKdvNJngs69XKWX5p8xLcSG1yqaW+zAY/mFLX/JOrFee85/2YlkTyLbaSq6raZVkw2/Z5foxN2w/syI0oZVlKLd1uNkM3GWdkl2VS8mB9PpKWWIliRQwtDdMuy7SNuzTs4rmTSxvEaUdseaTFsT0J/et2s2nKIrvBExq7I5G96MY1vOvVqqqqqqrktOoJ2m42VVVpP9IudxyjEZaNq6WKopDDOW+fya81TRFLoX5devja9dSjGLrYzthAaepenNZ9t0iO1Ydj1JgcXzdFZn3KEJ+yLINWDubDECe9qQOtSCZUVRVbyUVRSFb5x3ykTduzoauSbTM9epNxPGcpbUusnJmMoiiCu9MGQns2p+3uZFqUXNf1erWye5Thvr6/dIMDKVm6U3aJVFc1cX1wsPwrJdnnuTYrtnr7YyZ7CE4LPrSSWyKWQv269PBVVxrDmSnZF4MesjMNNhy7LDv7vo4ZmUglOuZTQ3Q4Lk0kXSG2kqXGOq3zerXSCVJpU2RGVLpjMqqWkYS8kdGPzjD4G5ElOg0oYz5J5fVqJeMnWVNW2Oe5DDiceSRZQf7VmqCTjbq+FljWlIZJ3kgZdEyzXq20cyrLpY7JTp3ZYNm4bkpLZfeoBZAW3E7MyqdkBYmAk4Itjjx+3kY2og2xPSkaXo2txE0P0w+LoNPgsh0/DrI1WeJklw2UnFb9r+635XDcyd7DWNM/L5qc9SGp5L0eqbS2srItht+kim7LsnQGZ7qmqk7TpumQHYJKtsmsKaQZoscua8r51Z1qBfQ7snrW5GCd6VBdUzNEAih71KDZuOlZdqJaX0wzG1jNNF3frmCrvD18p/roSxb6e/QTUv9q/yu128l2Wxg5OgmXrSB64vRKnJZHlmvt1ubF1nftt8mfbEV2cs+mh2apbE1qpQ6IncorhdQzLnuRN9pWBw9cW2ltQiWSOpej50iqw/Iw0SUflE3Z+mjLYFtXGUXYk3Jkb8Z2kmw+O/HRxkcPxymwpJMWyW925IjsRQR5H1vJGlONjrYpzphGEkKSTGbttEGs61rbLw1QcCMaXzvpV19s47RxUWfbTpyeCckVHeLIarsss622pqYkhNP/kITWSquF0bLpqEg2q5vyBx+2pdA2S7cmIbJHJNt3MvIsSpaVpdj+IesKtTcNW5v52/YZJCcOdjK2k5J1od8+OkUVNOz+edFmVMqjTq0PQdZ1nEjaobAtto1e3axkbXzt4bTMPfhK1tyQfps1qw2XbX9FLbbYNjLBUbJWE92mnkp7IEVRNOWkFkAqmp5x2U4wzTTmzmHaw1dd6QBANuvUfacn4ezRSUj9q4RLmoX6ULudbPcD5dTN9WqlU4n1IV312G0741/FsEdhy6A0XYeW9f0zpUMF2/5Y4dkcU4trlPzM1GbKduX1vGj9VWHrEUlMVG/a16kPQ38psHaRpUlxWhXfiz46qFuay0k/+MEPnPhIjXDqixZYNyJ9RH8uRI7Ibk1PTVQl29HP8uL1s9rklq4mYdVssEq23WpNhTrUQunp0XSpG5TslEfQ5ZJMzjBCP26ncP1OgJ4e7WBKq+GsqRkjS5ym3x6UVbI63k5m2g6+HpFzaC2tuWbMMVhz2JNil9jd6dDEDomcA7QzHE4cbDTalexPXOv7psoZbDcvPS/ahddi2xGVc1xO5dRS2T/pGbRZrW2cjUBXJdts35lbwGQ7uimntXWGU3q+mpRsp0O1vZarGzZDnMS2IyFbANtZqUNpZs+Of5j+4atv9K+yuyYlO3t0EsDGzQZWXeu0eE5J7Ab1hFol6zBG8sFpZ2zzYuu7M7enEbb/tfVF3lvP2ebCXrrS5NRD0JbZaZT23m2h2lezPrP9MBl96ajG9sCCoatNp0c7E3a8Z/d+jJIl3+zMn3azbHxEKHIsfoGdiuxU0sLcAyQbsRUhqpJtsWwmaf3ROZPaqFTHENZbznlyNmJ3KqHUyqP94q5KVhkEK/kxStYD1y1IwXRNVUhxuHZ4vJKlCslfbSNYH6dkp0urkxPOYQbR/fqVxyrNHyVbnLDYQ3DioFVO++n+6ai9+7Hri9eSOym56bzYelsfhvtOqxecsPILrJ0V6f77ra3UBSe16stOTbuS9xevLB6jZGl2Lx0lbw/T+JoSznDTWV/Hl7Z11v1WF+8ncjZilx+p5N1hxktHgbbNqZtHyc6OtI+o69toS+1uynYdxerYV2u0HTZpQJwpokuVrEW19bolOVW06jlt2fQM1l4fqz50321MNLv0U/4elxe/ViARtnMYemi2rdZ8kC3Yvktt+lXa5tsCtE9cq26cqDoj7+3FSVP/bNqurR6RVAfbv7FnvzY9lTqmkm0XuD5M02t9Wx6uKv3RV76if5KTrX1Me1GhMteSd+by5Na7z1YrjJ1p0WHu/nCdRjfldC11WGznKOT1ta99TQtmr5HYN1/+0pfkzXe+8x1n8KSf1WGKPQpdZ3fxMpVTJBsZ+9+9+Q6PHNHWXK6ozYVe24W3E4k28tqQ+U2hc3ZsBPT92lzksydruVj84Ac/sGFxdm1HGDYOOgpZmuG1HfPZI9Xzvj/M+i7NpVDbYNljsQF0zovNXpsGdjrdxtwfFutAQffozw8Fa83aXPvUJeH6ZrbmFGxnLovqBvUodN5CJp+CWb0+XAZzTlxpblmwu96bK7i6kd/5whf0XFTm6qDGxBZAt6ATg1ok5/Td/O3f9g/TWcdOvNl15MDLwz0r2hY5e2xKyOVBqzaRbLbbdmltbgQRf9hM8A/cni+/edE3Wt/10GynRDthTm5oIeXjf/SVrzjVZ3lx3mtvbvrRPmVTsjnpIa26f+J25uK6rSDaRGid1fIsF4uvf/3rS3MzhI2AjWdt5syXoatyuln5rw2IH5/9xYtHToGlSFpCWdkfry9Ny2Brceo/FeIPECPjdLQB+rM8YgLtGNqHyDAD2i9MnIAzVXYuEm8n24fIYyFdserit0OTVrIdzo5SgP3F+zMBzkX/BmJ/2TcdYeroyO+8tju7nHTEf97NnpEEfVwf5hKcsiWtZAAAgKsDSgYAAEgClAwAAJAEKBkAACAJUDIAAEASoGQAAIAkQMkAAABJgJIBAACSACUDAAAkwTSU7Px8cYI/E6MPA9ElTpnbP74+PD+xD8XFZ8rW5vfAg//tifODzFXDc2H1B/zKi48v9XGeXbM3j4l1DrA4PIizKbzOE5n8n8iRHwF21m//5cJjorczD0z1/+Qc+M57Enbwp5rsD0fXzXHWIPhxqw9P9fBzbH94Nm3wcGx5/P0Gf3tIfya69iIWXF+xZ3NpfgT7mHQN/p5zT/zfJfaxGVtefMzdpel0KUP8WqqcAo2SX02cxz05H/dbuZMJ/sJlcXjW9THLgyV0DrCdNH+WcRpKri+egJ65rg/VOi/+I1/s85r02SDBwutPovdhd3hwss11J3HP+Au3zqN+nEf6yDrSZjlP1wnWBP2hV/mdSPtfFYmtk/K0HFuS4NbsQ4GcFZwW4ZgfEz4mep0i7Dy6Sk3mrOY8+qn24rw7PCE4GLeq4XHUzn6bluuTHux+K/MMY/tUDOdcrL2nNDalumZv8LE/l3L2n26+9Nf17fOj9CF9Nubn/W3qrshTZPzlzum2FcF54laQoX9WvWn7x++3569tj/tIhXoqStbsHz1etde4K342L80j29qz5LyJHkfJ1eFRvs6h6ZOOpFVyHjhYNxysfVJb8HD0MTLO+u1tX1NgE1Sylsd5AGh9sa23n1UT2OcD2pLIm/bUamrCmsoj/3VMLMuD506i4a8fpPCeoJyskv2T4vecRqQp81FyC8GKFplpKFlnLPV5sfJeckgnAO18nX1c2vLwADUxhAhyaR4gaB+EWZuHhdm/6qaWFx/B5jwuVLETWbZITvH0iZPactm5WfuERLu8fULPluRIJctwVifiNLAyJdiU4vJXZ6E+GdQ+Z9SO6lo0uQxdldAHtdYXHwutJW8Jhd2XnZ2TlkgftVZffDBt0yxoS7uvOWmf56qT6nY+bRl6lH17l6VJyTbO/onQj+jz/jSSdmZVnlDpTCm3lEf2ax96sTw8b9R/GKVGw18/+KxPX8n6TE+/5BbdkX1mok546vz80jzSVBuN4AMffSXbLdvabU+TLtTkt02TfbSf7a8vzeMFpXjyrEx9UKY+ElHraX0xUe1q9pGO9tmO+gBBR8m2ebFHaovnV17nobF2R4994hP6keLw5HU5lbpfqSmaDxoxW3gn+P4jPu3Hl+YJmzo3aUtoryRK99E+R3Kf5/pQRRWE0023jxCtDxe/pBlxNl73YBpK3l180nvtNd96aVDW1PXXhydIa4tgZ8Z2h8eP7w6PNK8P7YXMx0omyTnWTalEtYWtzKPXFefZ47XpkGpjJOvYOT0dEcqO7NNMazPUaOkGSnuh/z1+lOw8nVvrkh570+5sE6xjVi2GbZSd1iGIM7fvG9cftDVtqg7pTWPu9G/0fNlT4GytJXqaNsvDw7ylkDqBHOy8n6xkO0HtXBfQw9QZY31ErpbEfiT4VPam8jjXF/TYJVf1jPuXJH0lB/GVrE9f9ktukR3pZRTtAtorF2VZ6sOza2MFe1ptZXSe9ets+chRsjwpXP+7OzzWXhocDYsUz15u0IRZmod2y2nVCXO7U13NtoRaNk3vllGyVnmNsG027Wb9aNiG0Z5le4HJYstpGwonPrq+v1zdHKxofgm1YNqo2isy2q7KRiTOTpOuxygNuB1mOBvvwzSUHGwKNbdsaLabzXe+8x1t+jVetkqoreV0Lg9jaO1NLy8+r1um6bTbW5v81vPqN7h6/pxKbmeHtE7qxmUj6jntomqrqv2Jplg5f+qkZN27LVV9WZ7Zhsm2RLb3rTsVwTeN/iVcupHgpLTtc1x6xc5pmCSethtUH86UVbU/ANKPB6Nn22JZx7+G2q7k2gTZX9Nv/e2p8Qtsw6Lb143Yj8hCe97twfrl0f3qynqwdqLbHpQzce1fMrA0TVzLoTkltx+UNW3PWIrtK9l3ntNrDCrZ33K7kp2y6We1PFI2O7qSXTh70WO3HXSdx7Ln3VnNOQtLMynSpOT6MC1Rmz6QrqwKlFPplFPL4/Tkmmabbb2wjYATH13fX64pEaxowfNlR7G2WdYY6hksL967aiNQe0Mmu37PIXI9CSU7SaPjxe1m40wxSQdKwyp9N2eQZ+dRa9Pn0j6aDsd1rrs26SUr28qs+eG4wbZo6tGiKPRwtMMuNVPKqQ2Qzr04oZARf/tYrTbTCSco2TnY9usr1qC6Badlt0OQ5WX30Go1tm2QM3FqV26/bmSHoXY07M9AOKPkIE3R043YQYNGz8mZYPHqi0nlrOacgmCcrY9t3HQdf5TsbE3Gc/5y383O1I7T1tvt+y1m0XonY7uSt94dlHbN+tC82iW2C96uZK1ZQSX7W75UyTbaTktSH/Jtf/Gh18crufbyJKhkJ+3rViVLi2R3ujvcH1CZu3n0ioCNht9EVN5ktf/XOjTppfPMNk/85ZoSwYp2aQkdrejMlrOacxVGpwD9bn3wME8gdSX7wym5mqjDTTklTgdNeoV+b1E/4gxMdbl2drR11nH20lwKsntcLhbf+MY37DivvPh1CKdUtekY6nKdLXFGAM4oWSevajNHag/Nnx5wdmT7g44dtVR2hkC35ti0unhZxW58efHrCrZV9ced/onWCuYMAnbm5gD9lG00l97XJPSItG2SAstG9ubLQqW5S0BL4jR5Nnp+30IHWHauVTdiL4PZ/pY9Ii2hMxHndMCb4mxPqz1x/ijZpoqe2aW5pu6spt5y9utcgdb1ncHZ0nQT7fo771qyRkm7sLL+9nCJ2im5Pcu6Uyeq9mzaNsTuy+5FVpPvXzkRtlvWOPvjJH2Jz2yVt8Niv+LI9WMnOfXYbRMkb+yh+avJFv7oK1+xh//lL33JnhGn0ViakfTy0A7Yk1iY+3WcODvDfb96Onq2PtMPam9gaa7oO6upd7WETRXNKaEzHNdA+a3E+nCXiRyLjp2cmQDdgr/xugepK/kYWkZ+k8a2O9rHt0cqS07evvNxp/tcXHbHaYK0T2JfcZyZQBiFnXejwDxw7v/wFzpU5maFOARLmODGJ69k23WaGbbnJb02m8Tt88mX4nx8f/EuR3/Ekz7L5iH4FSd4YQziU1z8Vshs8Kfo1s2/q+PMvsTBn3VLduOTVzIAAMA8QMkAAABJgJIBAACSACUDAAAkAUoGAABIApQMAACQBCgZAAAgCVAyAABAEqBkAACAJEDJAAAASYCSAQAAkgAlAwAAJAFKBgAASAKUDAAAkAQoGQAAIAlQMgAAQBKgZAAAgCRAyQAAAEmAkgEAAJIAJQMAACQBSgYAAEgClAwAAJAEKBkAACAJUDIAAEASoGQAAIAkQMkAAABJgJIBAACSACUDAAAkAUoGAABIApQMAACQBCgZAAAgCVAyAABAEqBkAACAJEDJAAAASYCSAQAAkgAlAwAAJAFKBgAASAKUDAAAkAQoGQAAIAlQMgAAQBKgZAAAgCRAyQAAAEmAkgEAAJIAJQMAACQBSgYAAEgClAwAAJAEKBkAACAJUDIAAEASoGQAAIAkQMkAAABJgJIBAACSACUDAAAkAUoGAABIApQMAACQBCgZAAAgCVAyAABAEqBkAACAJEDJAAAASYCSAQAAkuB0Ja9Xq+Vi4b+2m01d1/s8X69W5ytnX5aLRVEU/ddR9nm+XCx6l2sybDcbObPD0Sn+p21/n+fHr79erXZZdq69bzeb4NbKslwuFmVZHrmdoigmkXhVVdlmoSWStiWpqmqXZVVVSViCr4GSpCnD16tVp7Q5ZpsATZyuZG0XpI2oqqqu66qqJIOXi0U6Sj6mJneq7XKAk2gZp8Kgra1u/+S2tSfbzaZdS0cidW1CibfLspZ2QLxrwyJ6rqqqKApdbsW2z/MhTqKcIF+fUp7T9ti0TYAWTleypqlVsi5nlAzHYBus0UfJZVkO5+ymUXJXuo6SZdDZf7+n0a7kYDdlvVqVZVkUhRbbGWsOdI4YJUMKnOFasqNkASXDpTh2GV3JfRrfSxlFyTIMTVPJUoP8GfuiKJyFccSGkiEFhlWyXk+yjdEuy+xVZx9dQV+6F6nG8kGZF5KX1mFp1vVPWipZrlsONlKyjl7Z0uX2qpjuyFGyzijqOjq5vc9zvTAmzZP+N3jguyyTcNmJL2eqfJdl281GtyNDCieqsqQsS9mO7Foj4ByIM68r25cPykK9sOpf5NM9auicGZT1auW3s3a/suWmcxSMv0WvlegKwRyzBfOTxx6R7NpRuFNamzN+mTV0dvZ1l2WaJ9r5sNVH37dUEFlHz4ItjAZBzrXNye1mo2dHrtfaM6WJ53xKt2xPeqc61aJkCVHwT/6ax4vNth4aZMkQJ0n0TxKfdiX7TUptEt75oLNNP4FtwP19aTllAt+pU3ZrNra6fZtyThJC+gyoZKdpkOXSKsn74O0zVnXSjtSmmXDael1NqoST9+vVSlPWVtGmbq+tcvpZuTruH6ktp4jcll8KIA2Z3b4eu3/gWpeccGlt1+WOb+S/VvZlWTqtgP5XCqARU23bI/K1LU2MKlmPQk+QrKP3E9hQO3ux+KNk/xw1xV/xu1BNOab5E0ye+mJiOPmm5Zdj0T6EU2Y9g/7lG3s5WU+rJrZtfO2p9BNVVpOP23XsRVY9KGeUrL09JwhVVWlkdAW1qfTqZKEmSdOxO7QoWU5c8E8OxyvZHq/u2ukpBs+4fLBJyXr2bTdCOpryfnmxYxrcps0u6RUFd7Q0nWBNGKdVlIW2ou2yTEvYkoSQPjEmrm090Zrs9/KEoITq5vk67ZDKf6327L2sdnnTFGLws3YwZ9sgW0ls5awv1nm7TVtOv6kN3nnbFI2m5VZ+jghti2A/rkus2PwV/DZXPiKn1R86q7RaJv1aJq71HDXF3ylbcDjr5JhfGCd5/O1oo2ajYRM+WOZgjbBZZ2uHP0q2EfYrSNM6/jcgak/JfoWSwuuFWzt5oH0Ff9bq+DoVWcn2I/bUB5Pf9qRb9uKoVI7a+axW3pZt2uDv8zw4qdBUSf3Wz86Q1aE4B5MQ0ieqkiWh27fm9HNbklJvzrSr2WbCOqmrkvWzuywLSsUq2fGErR62/mug/FlcLZj1WUsEzqhkaXC1eP4K+nEbNJ0+1f8GmzNnKtXhGCU3xd8pm9NoBlezSg4mT5OSnWgc09Xz5/BPUHJwfNO0TrD99a8l2z6lHpcttp+Z280meI2/p5Jtl66dTkqWSiSd6XYlO+E98lqyHLXzWVV1+zZ1U00zycco2Q6+9RQEL+74SQjpM8Io+dKvYNpeubMXu46VSssouWU04+B/tvZGSPYArZKdi+X6ES2DrKDXii49fF8GQyi5aR6iXcn+nKozRe9g51r95frfplHypc2x32gGcywY1SOVbMt5fF6JHvRiwQmj5EuDpnPRzlSNX1S7TRnP6V9tv8FPTjvdbTlZyXbeNXgFxynD8Uq2gT1GyTaSx4+SJWI2sFrX2repHdlgF6epnPXFk768OPHmbErnNmwZ/NUgWWIr2Wnd/Aqpl0CCe7EftPXNKlnf22biSCXb4YJey7T60epk6568t/XEuX9Er/RIWIJ7t/dl6NDQOUztppxXyf6paVey3wWpL54Fu1AL2WIXKVjwHDXF3ymbzZmmHLOKDSaPbKcsSx0B2xywFm/PK5vDOsQ8Xsl23NN0Ad7erGBvbrCXje0KNoDObIEdGTuTHzK/Kh/Rw9Q5ntOUbMfcfl8tmCedlKyn3rnRwU9+2ydouaXOZojTpFj9H7nN9un6I5Vsr1U715Lrw3xJMAkhffoq2V7BskbRhYV3K/I2dKe04l87FD8tzcWt+uJEzc7c36T/1Zpg15SmsKnu1d5NK4K9UGr710szjrdL/OvBWnWb2tn6oGSnbE7hZXcawLW509gJ9de+9rXgcqnn+nF7BnXvusTvDcix+CfIiZ5Vu7PEYm86azlHfvyDp8wqwc8xu/2m5JH3OiWo6/v51p5XhbkPWbsm+tem2qF3eOkKTc2o/ZSTaX4C+5taGiX7c+P70B34TgodU6fsOs7Ldt+d1RyvO/coSG9pebiZWQ7fmR5wzqyzcSf57VchWsTfNAMcTMv2bTYNOZySN9VxHaAvzV30MvGmH9H7A5wkrC+OWCBNkvuN68L8RIDQ6UJIS0MGkDj+DRPg2cMrnwAAIABJREFUUxxuC1+2TgKnSdONXQBCWkrWSzV2SdOtEEFQMkwXlHwMZVnKZLvMn02rvjNIhXbSUnJ9cYps2eWHsp3JtEELCXB2/Ksz0MTy8B0BuVVt7OJcjs4qj10QSJ3klAwA0I7cGe5PqgFMHZQMAACQBCgZAAAgCVAyAABAEqBkAACAJEDJAAAASYCSAQAAkgAlAwAAJAFKBgAASAKUDAAAkAQoGQAAIAlQMgAAQBKgZAAAgCRAyQAAAEmAkgEAAJIAJQMAACQBSgYAAEgClAwAAJAEKBkAACAJUDIAAEASoGQAAIAkQMkAAABJgJIBAACSACUDAAAkAUoGAABIApQMAACQBCgZAAAgCVAyAABAEqBkAACAJEDJAAAASYCSJ0xRFMvFoixLZ/lysdhl2ShFAgCAk0HJU2W72SwXC0fJImmUDAAwRVDyhCnLMjhKXq9WKBkAYHKg5AmDkgEA5gRKnjAoGQBgTqDkCdNHyS+//PJzzRRFMVipAQAgDEqeMMMp+YOPPPLKK68MVnAAAAiAkifMcBPXTz35JEoGAIgMSp4wKBkAYE6g5AmDkgEA5gRKniq7LJNfBbE/DCKS1tfJG0fJAADxQckQACUDAMQHJUOAK67kt95668033xy7FABw5UDJEODKKvnv//7vH37ooV/8hV+4653vfN+v/Eqe52+//fbYhQKAqwJKhgBXU8m/98wz169dsxfjrz344Mc/9jGsDABxQMkQ4Aoq+R/+4R/edf269bG8fuWXf/m//P7vj106ALgSoGQIcAWV/MFHHvF9LK+777pr7NIBwJUAJUOAK6jku++6q0nJ1x58sKqqsQsIAPMHJUOAq6bkt99+u0XJ77p+/Z//+Z/HLiMAzB+UDAGumpLrun7k13+9Scnv/MVfHLt0AHAlQMkQ4Aoq+a//+q9/6T3vCd7e9cwXvzh26QDgSoCSIcAVVHJd15//3OeuPfigcxX5kV//9bfeemvsogHAlQAlQ4CrqeS6rr/1rW9dv3bt3nvuue/eex+4//7/+tWv4mMAiAZKhgBXVsnCG2+88bOf/WzsUgDAlQMlQ4ArrmQAgFFAyRAAJQMAxAclQwCUDAAQH5QMAVAyAEB8UDIEQMkAAPFByRAAJQMAxAclQwCUDAAQH5Q8YZaLxS7LnIW7LJNfnurz8CKUDAAQH5Q8SYqiEO86St5lmSypqqqPlVEyAEB8UPKEWa9WVsmOhlXPJ4CSAQDig5InjKPkoijWq1XTfzuBkgEA4oOSJ4yj5F2WbTcb/a9Mbp+2ZZQMABAflDxh+ij55Zdffq6ZDz7yCEoGAIgMSp4wKBkAYE6g5AnTfi15n+dcSwYAmBAoecJcesf1Ps9P2zJKBgCID0qeMI6Sa/PFp7IsT763q0bJAABjgJIniRhXX/ZP282GX+8CAJgiKBkCoGQAgPigZAiAkgEA4oOSIQBKBgCID0qGACgZACA+KBkCoGQAgPigZAiAkgEA4oOSIQBKBgCID0qGACgZACA+KBkCoGQAgPigZAiAkgEA4oOSIQBKBgCID0qGACgZACA+KBkCoGQAgPigZAiAkgEA4oOSIQBKBgCID0qGACgZACA+KBkCoGQAgPigZAiAkgEA4oOSIQBKBgCID0qGACgZACA+KBkCoGQAgPig5LmxXCzkVZblyRtByQAA8UHJs2K5WBRFUdd1WZZ9rIySAQDig5LnQ1EU281G/7vLMvvfTqBkAID4oOT54Di4KIrlYtG08htvvPF6M48/9hhKBgCIDEqeD7sssw5uV/LXbt1aPfxw0+uX3/telAwAEBmUPB/k+vE+z+W/+zxvUXI7TFwDAMQHJc8KGRnri2vJAAATAiXPk6qquOMaAGBaoOR5st1sdll28sdRMgBAfFDy3JDx8clT1gJKBgCID0qeD3ohuc/vdgkoGQAgPigZAqBkAID4oGQIgJIBAOKDkiEASgYAiA9KhgAoGQAgPigZAqBkAID4oGQIgJIBAOKDkiEASgYAiA9KhgAoGQAgPigZAqBkAID4oGQIgJIBAOKDkiEASgYAiA9Kjk1VVUVR7PN8n+f2x6i/99JL/X+b+lygZACA+KDk2FRVdfPmzfVq9b2XXnL+tM/zoihGKZUDSgYAiA9KHoEbN27cuXOn6U9VVUUujw9KBgCID0qOTVEUt27davrrPs9v374dszxBUDIAQHxQcmzkKvJpf40GSgYAiA9Kjk1RFDdv3mz6640bNxglAwBcTVBybO7cubNcLIK3cRVFsVwsuJYMAHA1QckjsM/z5WKxy7KiKMqyLMvyey+9tMuy5WLRcpk5JigZACA+KHkcbt++ff369eViYV9n8bFurc81aZQMABAflDwad+7cuX37ttzPtc/zs8xXr1erXZbp+5O/5YySAQDig5LnQ1VVy8VCfwJsl2UnD5RRMgBAfFDyCNy6devmzZs3b948+5VjO18t16pP2w5KBgCID0qOjf0S1M2bN8/7C5py41hRFPIz2i1rvvzyy88188FHHkHJAACRQcmxsT8GMsQPg8id23pFuQmU7PDGG2+MXQQAuOqg5NhUVbVere7cuXPnzp31anX2byGvV6uyLJeLxXazOXkjV2fiuqqqTz7xxN133XXvPffcf999/+G3futnP/vZ2IUCgCsKSh6BsizlWvLZn8YoPpb3x4yVm7giSv7+97//wP33/+I73qHfHLvrne+8fu3aP/3kJ2MXDQCuIih5PsjgWIfdRVGsV6vTNnUVlPzGG288+MADzlfDl4vFtQcfXK9Wb7/99tgFBIArB0qeFXZkvMsyRskt/Pe/+Zt77r7bV/Jysbh+7doPf/jDsQsIAFcOlDwr5KvJ8jrZx/XVUPJnP/vZoI9FyX/5l385dgEB4MqBkiHAVVDy/7PdNin5wQceeO6558YuIABcOVBybF599dUUnvXUzlVQ8u3nn7/rne8MKvnagw9+//vfH7uAAHDlQMmxqarq9u3buyy7fft2sm6+Ckr+6U9/ev999/k+vu/ee3/1fe976623xi4gAFw5UPJovPrqq7du3bp161ZRFHfu3Bm7OBe4Ckqu6/rv//7v77v3Xuvjd/7iL1578MF//Md/HLtoAHAVQcnj8+qrr8rd0d976aWxy/KvXBEl13X94x//+P/84AfvvuuuB+6//+677vrkE0+8/vrrYxcKAK4oKDkhvvfSS7du3UpBzFdHycJbb731+uuv811kABgXlAwBrpqSAQBSACVDAJQMABAflAwBUDIAQHxQMgRAyQAA8UHJaVGW5XazGf37yigZACA+KDkt7ty58+qrr5ZlqT8nMkoxUDIAQHxQclpUVXXr1q3tZrNcLG7cuIGSAQCuDig5LcqyvHHjxq1bt27fvv3qq6+OVQyUDAAQH5ScFlVVFUUh/243m+1mM0oxUDIAQHxQclqUZblcLNarlVxIHmugjJIBAOKDkmOzz/PlYnHr1q3gbdXyLIr4pXJAyQAA8UHJsdnn+S7Lxi7FJaBkAID4oOTY7PN8n+dNfy2KoiiKmOUJgpIBAOKDkmMjo+SygRs3brQIOxooGQAgPig5NnItueXVR8nr1cpuar1anbYdlAwAEB+UHJv2ieubN2+erGQZZ+t/i6I4+aI1SgYAiA9Kjk27kh2tdsL5oEyPn7YplAwAEB+UHJt9nsf5AZDlYnHyZ1EyAEB8UHJs5Ge5dlk26OOeLp21/tqtW6uHH256/fJ734uSAQAig5LnyaWz1m+88cbrzTz+2GMoGQAgMig5NmVZ7rJMfr/aWvN7L710xq8/9Zm1rpm4BgAYA5Q8Arssu3nz5p07d5zlYuv+2+9zr7WAkgEA4oOSY3Pnzp0bN240/fXmzZv9HzWxy7KePwGGkgEA4oOSY3P79u2WCer2r0gdSc9Z6xolAwCMAUqOTbt0b9261VPJ/Weta5QMADAGKDk233vppZaJ6/VqxWMnAACuJih5BK5fvx4cyO6y7Pr16/5tX/FByQAA8UHJI/C9l16SZ0LsskzmsW/duiVPjEhhiFyjZACAMUDJ4/Dqq69uNxvnqU3fe+mlscv1r6BkAID4oOQxefXVV/VJyWOX5QIoGQAgPig5FaqqSuEqsoCSAQDig5JToaqq7WZz48aNFEbMKBkAID4oOS1u3Lhxxl+6PhmUDAAQH5ScFmf59a7+oGQAgPig5NhUVdXypGSUDABwZUHJsWmXLkoGALiyoOTY7PNc7uEKst1sUDIAwNUEJcdmn+f2F0L8F0oGALiaoOTY7PP85s2bTX+9efMmSgYAuJqg5Ni0/1ZXIr/khZIBAOKDkiEASgYAiA9KhgAoGQAgPigZAqBkAID4oGQIgJIBAOKDkueJPIx5vVqd9nGUDAAQH5Q8N8qyXC4W282mz0ZQMgBAfFDyrBAf9/9mM0oGAIgPSp4V69Vql2X9t4OSAQDig5Lngw6R5Yc52y8kv/zyy88188FHHkHJAACRQcnzQWQss9ZVVS0Xi5YRM0oGAEgNlDwfdllm7+oSQ5+2KSauAQDig5Lng6PkoihQ8lXgzTff/PGPf1wUxQ9/+MM33nhj7OIAwOmg5PngOLgoCr6XPHtefPHFa9euXb927YH7779+7dr99933jW984+233x67XABwCih5Vmw3G71+vF6tiqI4bTsoeRL8r+9+94H773eet/3AAw/80Ve+MnbRAOAUUPLcWK9W0jSf7OMaJU+BN998813Xrzs+ltf999334x//eOwCAkBnUDIEQMnp8/LLL//Se97TpOSv/OEfjl1AAOgMSoYAKDl9/uzP/uwX3vGOoJKXi8Unn3hi7ALOnH/8x3/8wz/8w4/+5m9+9umn//vf/M1bb701dolgDqBkCICSY/L222+fcKf0//y7v3vPu98d9PEvvOMd/+/v/d4QRQXhS//pP1178EHtEv3Se97zS+95DxcLoD8oGQKg5Di88sorv/Ebv3H3XXfde889737Xu/7L7//+8YOt//0v/3L/ffcFlfzA/ff/z7/7u0FLfpX58/3+Xe96lx/2d12//vOf/3zs0sG0QckQACVH4C/+4i+c+6Xvu/fe1cMPH9+s/4ff+q13e264/777Vg8/zPegBuLNN9+87957gz2he++550//9E/HLiBMG5QMAVDy0PzTT34SHOO+593vPv7Bmj//+c9v3LhhrfzL733vr77vfVVVDVr4q8wrr7wSHCLL60Mf+tDYBYRpg5IhAEoemi9+8YtNzfrdd93105/+9PhN/a/vfvcLN2+uV6tPP/XUX/23/8Z9RoNSFEXT9QK5qDx2AWHaoGQIgJKH5uGHHmpq1t/z7ne//PLLYxcQwvzTT35y/dq1pnP3xOOPj11AmDYoGQKg5KH51fe9r6lZf/e73vXiiy+OXUAI8/bbbzd9HfyBBx74H//jf4xdQJg2KBkCoOSh+cLNm01Kvveee15//fWxCwiN/OhHP7rfu8Prrne+86O/+ZtjFw0mD0qGACh5aH784x8/+MADwS/SPPrxj49dOriE/68s3/Pudz/4wAO/8I533HP33ffde+/v/u7v8g0o6A9KhgAoOQL/9atfdb4Ede899/zye9/LAxYnwZtvvvn973//z//8z//2b//2n//5n8cuDswElAwBUHIcXnzxxV993/vueuc777/vvrvvuuuL//E/MtICuMqgZAiAkmPy5ptvdvrWEwDMFZQMAVAyAEB8UDIEQMkAAPFByRAAJQMAxAclQwCUDAAQH5QMAVAyAEB8UPLcKIpCv+e6z/PTNoKSAQDig5Lnxi7L+m8EJQMAxAclz4qiKMqy7L8dlAwAEB+UPCvWq5VMWffcDkoGAIgPSp4VVVXVdb3Lsj4XkmuUDAAwBih5nshNXmLoIC+//PJzzXzwkUdQMgBAZFDybNluNkVRNP0VJQMApAZKni37PG9RcjtMXAMAxAclz5btZtMycd0OSgYAiA9Knif7POf2LgCAaYGS58NZfrdLQMkAAPFByRAAJQMAxAclQwCUDAAQH5QMAVAyAEB8UDIEQMkAAPFByRAAJQMAxAclQwCUDAAQH5QMAVAyAEB8UDIEQMkAAPFByRAAJQMAxAclQwCUDAAQH5QMAVAyAEB8UDIEQMkAAPFByRAAJQMAxAclQwCUDAAQH5QMAVAyAEB8UDIEQMkAAPFByRAAJQMAxAclQwCUDAAQH5QMAVAyAEB8UDIEQMkAAPFByfNkl2W7LDv54ygZACA+KHmGlGW5XCxQMgDAtEDJM2SXZdvNBiUDAEwLlDw39nleVRVKBgCYHCh5VpRluc/zuq5RMgDA5EDJs0I1jJIBACYHSp4PMmUt7y9V8ssvv/xcM//Hr/3af/7yl1tWAIAJEaUFgjOAkufDerVaLhbOSyXt0K7kX/u1X/tyGkr+kz/5k3vuvnvsUvwbq4cfTiQyjz766NOf+czYpXjuuZRiklS2PP2Zzzz66KNjl+K555577unPfOarX/1q5OYITgMlz5PZTFz//Oc/v37t2til+DfSicxXv/rV288/P3Yp6jqlmCSVLbeffz4REaZTErgUlDxPUPJApBMZlOyTVLakI8J0SgKXgpLnCUoeiHQig5J9ksqWdESYTkngUlAyBKCRbSKdyKBkn6SyJR0RplMSuBSUDAFoZJtIJzIo2SepbElHhOmUBC4FJUMAGtkm0okMSvZJKlvSEWE6JYFLQckQgEa2iXQig5J9ksqWdESYTkngUlAyBKCRbSKdyKBkn6SyJR0RplMSuBSUDAFoZJtIJzIo2SepbElHhOmUBC4FJUOAH/7whz/72c/GLkVd1/Wbb7754osvjl2KfyOdyPzoRz/63//yL2OXoq5TiklS2fJPP/nJP/3kJ2OXoq5TKglcCkoGAABIApQMAACQBCgZAAAgCVAyAABAEqBkAACAJEDJV5ddli0Xi+CfiqKQxy2XZSlLyrKUJfs8H6Iwy8XCeU6G8/jn9WrllLzladBDlEcWBoMwaHnkXOiJsAudsNhCbjebs5dEz4hz+E25MVzO6JaDMQ+eu4HOUVNMusaqJ3p0znnfbjayvCmZh8gT6ANKvqJoi+b/SVoT23JJOyLvt5vNeVsTtYttNcqytBIqikL/ussyeV9V1RAWDJanruv1aqVL1qtVURQRyqNNqhMNPR27LLNW1jX3eX7e1na72cihyd41B5pyY7icqapKD03iozFvOncDnaOmmHSNVU/2eS7ZKEenwdllmSSDLNeMrYfME+gJSr667PPcV/J6tfIHXk1N7RmxwpO92L86jYs2qdrUDl0e2a+WapdlEpAI5ZGA24BsNxuneZX/Os2rP7Y+maqqnAJYKXbSc3/ssfuyqRvO3dnPUVNMTohVT+zh20ptex5218PlCfQHJV9dfCUHJV17lXaIOuw0o34B5E1RFLbH4Px30PLY4c4uy6QdjFAeX8mOhPTZ2M7A6+zzGcouy7RNb8qNCDmjW25XcpycsTFpWh4hJnYGxWIPOVqewAmg5KuLL2Bpy/QymLQXogTb4/Ybwf60KNmZtbYNX1MDNER5JFxFURRFYd08dHmCSrZlUyU3qfrs6CRBU27EyRndsjMR7Zy7ODmjMWlaHicmRVH4PQOdSA/ud7g8gRNAyVcXR8l6IUpqr1ylqxNQss5a16MquT7cRBO5ufeVLMXQM6JFjdbU6pBrdCXb7pEtXnwlN428L43VeYvh2Fcqtbx0Xyg5ZVDy1cVRstNk6FW60ZVsCzmukterlUTD3kETX8m1ue3LtrZxmlrbQxpdyUERxleyjUnT8ggxCXZQdNcaK5ScMij56tKu5NpUXasE50anc9GkZDtrXXsXAvd5Hu1asvhY3utYOUJ5gkoO7tG5KLherc5+jVDm7e2SptyIkDNNtwq3X0s++znyY9K0fNCYVFXVYlYbhAh5AieDkq8u/rXkpm9KOHeKDmHBJiXrjVSCf/fsQK2Jfwe482UbCUKE8rQo2WnW/Ttpz/uNrLIs/XPUlBtD50zTwLQ+4o7rM56jYEyalg8ak/atlWWpuTF0nkAfUPLVxVeyndOz9dZ+YcN+JfeMNCnZn2PUL7EM9HWspvLYq8j2izRDl6dJyXq7mVNIWfPsX8eybXpthoBNuTFozjgdNWe47J+7gc5RS0w6xao/zk0hTddc7PoD5Qn0BCVfUexvY/nfa1x6P+ujP8Iw6C8x+V2EYHuhV1KH6N03lcfeKeOUarjy6K8y2Z3K7oKjIi3keX//Qc++vpyvFQVzY6Ccca6jL73f4gjm0tnPUVNMTovVydi01Jcco7/E/xS/E5IaKBkAACAJUDIAAEASoGQAAIAkQMkAAABJgJIBAACSACUDAAAkAUoGAABIApQMAACQBCgZAAAgCVAyAABAEqBkAACAJEDJAInS9Hvjiv5Q+dl/eLyqKmebAz1gEQAsKBkgaUS6vgv1EQtD7HSf5/ZBBfqUApQMMCgoGSBptpvNerXyB8rbzUaebjTETv0HcDFKBogASgZImu1mI0/0szqsqmq72fhPvD4LZVn6j/JFyQARQMkASSPjY+chzbssK4rCUbJ9BrZOO8tIep/n+nF5BnPLs+uDy62S9dnD8l//CcGYG+A0UDJA0oiSxb4qWjGxVfI+z9erlbxfr1aiVdG2/WtZlvqnphF28G4yVbK80eVySVsc7BQSALqCkgGSRgWpA+V9nqtofa3KONV61zrSGjRIcNa6PijZil+wamdyG6AnKBkgaVTJMuFcVdV6tRLLOkrWG7C3m41OPvtflNJp5+AEddNstt507Ut3uViIxVtG3gBwDCgZIGlUySJFnZSuLyrZati+1yUqTkEE73+huV3JZVn6Q3N7LZkhMkAfUDJA0tgru+JR1Z6jZH+KW68l14c7t/VasmzNUbKsECyGc3uXTl/Lvd/nOFAAQMkAqaK/3qUutP6zdzjv81x/OUR8LL/5VRSFvFdJi5KbfhSsaYhsN14UhZ36tn+Sl3OxGQCOByUDwOlUVeXcDlaWJdPXAKeBkgHgdNarlaNk5rEBTgYlA8Dp2DuxnV8pAYCuoGQAAIAkQMkAAABJgJIBAACSACUDAAAkAUoGAABIApQMAACQBCgZAAAgCVAyAABAEqBkAACAJEDJAAAASYCSAQAAkgAlAwAAJAFKBgAASAKUDAAAkAQoGQAAIAlQMgAAQBKgZAAAgCRAyQAAAEmAkgEAAJIAJQMAACQBSgYAAEgClAwAAJAEKBkAACAJUDIAAEASjKDkoiiWi8VysaiqSpbs83y72fhrLheL4PJOrFer9Wp1zJrLxULfV1W1XCx2WdZz70Gqqrq0SOvVSuNzJLss6xOxsizlvLSUTVcoy7IoCuev281GVijLsq7r9Wp1ljN4PPs8173XJtP0pX9yyrzP832e+xvUIyqK4pj49GG72VRVJXu0u5AwarTlGDWq8l85tLIsgxkrW/aj8Ttf+MLZk/zIDUr9Csb8vLTXo675GaHYUov9MsuJ9pf76x/TvPgbKctSc6mlvswGqRT+woHa/OMZR8nOYe+yLFhzyrI8psJIc9n019MSNFjOlNHmOFhvj99IS8BVDC0Nk92CSKJ9j2eP8HazsTu1J1FaHNuT0L/u87wpSewGT8ilTsXWTN5uNhLeXZZJgWW/Gt59nsty6Ufa5U5I9SzoxqWuVVUlGz/vKQjW7uCaTd2gmFzawmjXU99EKHZTN6Lr8iPRHHPavU6HKd30k8swCk1dn1EKo4yvZOm/77LMj8WRSnZaYYeuzagWb1pKPktpWwLuzGRUVdWUu3o6Li3PEIZrUbIUyR5FURT636bSRlByURROMLWDpbsTB6uJZTxdH5oVOz6WEY9uSvpPdoltwSMo2U4+WSahZKurWSrZn1nRI+2j+a5lOHtI93l+aRdBK1GnTw3N+Ere57m0KTY6MhujDaidSJGJaFlBxgQ6tahTcxJWGRXJEFy3LBODRVHIfKBO18hmdXJyu9lIOWV9zU6d0NaP6zalYshn5b+yI1kiW5bDWa9WOqaRo5A+uLyX/WpDJtuRMshy3aYNqZ1u0mPUmSjZhbyRDWpU7alpaaF03HYp4i05rbWZDy+KQuKjh6Pv64uz3DYsulmNg8bHxkG2JoFtUbIUxpbWnsemA7ex1Vzyz4tOO9eHBJYg6JFKa64nyO7Caf60kbJKlmyXomrnIJgM7Zb1lWyTXCtUfZjX1WMPJrOuH+zI2ig51zXUbbbayjrbzUZeTtxkTY2J3a9NM9271iPZpqaNjbPuSNWr2/EncqUkTcWWJU55JEq2dtcN13Q0qjqN4aecnHfbAMpyu2utBba+Sxu79K7ROB04mx5y+Bol2YW+t3liLw7K7uS/NuxaVOfANch64BpJCYI2yxI950zpprTV1XyWXWs10eDYT/WcYBiCJJQsbzQ6uoIzppFk0nNWH4YI2grbyT07leeMbHRH8kZm9mwbp43L8uBsm8SaLtI/0CGO9C5F9rKmJFltHOxMP9oJImeySHJd67BuVjflqMUWW9a0fcCl6XyoQmqvQp5FybJZe1prb3wpsdKFephy4lrmzWzVsnGwrVgnJdemKWw6cH+UHDwvklQaWD0ENa78yY+kP/LWMl+qZD2tWshLR36Okm2S2+BrN07jEExmJzJNo2StJrpNrVZOpXDOoC63BbC1XlI6mGa1mdhfHnrtfj5I9Zc38lf5r87t16FRsl/sXZZpAWwjoFcT5INOtgeLKgeonSTNeU1y2wA6dcE2ffYopPF0cs/pDtoAqpLtIWtHOdgLlPZQD03aXrlioiex9tBIaoOvbaxuWfwqL1lTl9emwZHugp5HVbKePqcA7TOsozC+kp1OaG3CZxsX6d1IVtl018ppR122M+jXUtv6+Kv5E9e+km2LabvSzsU521dwOgG2ztjhjraA2nxrxlj31K1K9scrWiedCOsboaU11zpwDNro1BfPr5Z8eRg0a4VxTtwydBfhksVRAAAOHUlEQVSVdH5t81RfbJHr7hPXunJT5Qwq+dLzYrvwOlLUQYY/LrH/taXSP+kZdKqGThLoml2VbJPcTrfYfm3dnMy1l8ZBJdtMkw/aHra+6ouJbcPoFMBXr5Nmdu96IL6SbQtja7r2DoNKbiq2FMwWT/Zoa7eT7cGSyPadP6mSnQbQyT3bvNj6rgN3Gx9HyTY+VrQ6aHFG2PpGujv2EKQYOqOgkwe2wanNzLn4W6fW9KRr52N3uFemvlhl/NBpNdEI6FE7BUDJde2ddU0Im0l6kiRjJKBaGezMVX2xrtq9aCV0aq/OvdikOUHJup0mYV+qZC2PbkG6tLVpyLTNtdWyPkLJ2t2uDxWvq5Lte9s3r0Mtr8Uq2ak8toH2B50W5wqT+Mw2EzYO1vdNSnZGk/XFa8mdlNx0XmxLKtuXXTiNoLMju4I9j3aU5ozJJGJ2d/qm/dTUrUouL15ZPEbJUoMuHSXbySo96c7kvHMg/gDLFkAba7tNnyOVrDNedu9167XkYLE1DlpZbG7LCQ1mu55Kbe7Uf9rC+EoOdgeblKz7svXamSezyam9QJ3nsMlQH9JbC2BzyY7a9dB0RGurgx2/aiFtB1HnI/XQbLI5Iw1nykr7VdqTdgrAxHVdX5yXXnoXAzQdl4frWF//+teXh2sqy8NlBh1p6Xbk9OiausHt4Vsutgz6WZ1pkY1Lguq+ZImOb7T8Tn9cS/5HX/mKFkxHz7IFmVyyW9bLPEtzOUo+qyXXgtn+tW5KQ2cP3EZGy2D7yDtz8c8eha5gu/DaQNSHqqWfrUPdndoMAuxEpR6mLadu0B5mcbjM7+jTOUAnDhoBnd50zpQzPlDB6zrBI9o2fwnKnhd7apYXr7+qp50McWqETmnqmnpy7Qn1a83OXPvUJS0d/2DBbJL76aHzFsFktlkt36paXrxeq+faVnANZnm4i8JP7PXhqqQ9g1oAG1W59qT/dU6f7tePlQ2g89/S3I+iEfjyl77UXmynGdG8sonkZLuWZG9uatGhyPLiNXvnwIvDNV1bBvmTFlWPSM+ObQxtJ8ypJnosy8PVfTt542SROljf2zNik81pMbRV9+udHppKd3+4pUDLVptqLp+yVcxGQCOjO9L+9LbLVbmhGX/iuiv+nFVkepYfwOdcE2gk5+w5ewPojKHPhTO5mCAJDpHrRH4qpBO2fxQf7esNkcRwldmGfrugE2XDT4XAnBiiAWyfWTltg/5sUFL0r24DwQ9qAgAAJAFKBgAASAKUDAAAkAQoGQAAIAlQMgAAQBKgZAAAgCRAyQAAAEmAkgEAAJIAJQMAACQBSgYAAEiCNiU7P6x/FvTBpe2r6c+L1xd/i9//1fIUkF/ZtD/o6pS5/ZfbdoenF/eh9B7hrk/jkP/Kr66f62fz9IdF7TMK/d/5059u1vWbfva2uPhsysI8H945QH0wakt4bfCX3vMcz8Klvwy8Ns9194sXLLD+Vw6/6ZEe9oE5fgTsz1yvvSfG6xN7/MK3FNgpj79f/+Eucsb1AT5OMYIPgxH8x5/I4xyOqfj2kQyXrnwkxeGR0u2r2SeH2scv9vnxYGWIX6Z0mh3/GS2yvOkntc/Saumu/d8HlXj6K/vLm55Gap9Ac0IBzos+QuPSNS8ZJQ+RCpf+uKgEyD6bz/4of8+fMt8dHnZ9XvwfibVPc9NnlgVPvD6QpGcBavP0Q6cMwhkfDro7POldH1Mjy5feI7OaHrIb3KA+E8l/LpM9EHmUkP2gjxOH0w81xDE9y66PB/AbQee5n4Ke0+rwOHp9Fp5uR/NNY24t3rXATnn8/eoDBrRqS3xsstl201/fok+01XS1z+O7lCEeS3NpxdHILM0TpWzMx/055WPqSO09NvfSRmnon7Bu2v6R++2ZCf6jnXtyZHnalHzps9BP49KA+q22PmB19B8KbwpIsMz66Mb2U3vePppt5oZTsuxCH5iq2GfBykOFnUdZB58PYwscPPX2MY52/fqy5kb9cV52WXbpKPlkJVsTBwfKwQGu/asTE7vBljI3FbilPPoUVM0HfWK8syPn0cvO+kGCT6q+lFGU7Ge1niZ5rOd5y9OVI92Gki1nf0DWGZSseebMGa5XK52fkTOnT/GU4bk+G1W2oxPO9oHktqDO7KIzx+U8p9ZOiOke9dnDkv06CSNv5ECkGV0uFj/4wQ9kF/pMe33GtS2A/evSPNxXg7A8PMvTj7XzMNf6MNdn3+t/9dw7cfZn8PTZqy254jyf/Bgla5RUe8vDE1JbxoLyV8eg+zzXg7J7tMfe1AoHJ3bkcLQF9xuRpvZOg6bD7uXhAe/OpOjy8MBmfYi9Hpo+DNg5RnkWfVNkJJKaVM4jmXU+zZnS0Pe2W+O3PsH96hNqpZPkK1kH1vrgZ+eqkDzRVqr20rsK01QefbCx7kiKJ8G0yWMrvrN+fXFyxW7cUXLwepaTgbYy2sf6tpxorch64E7l9SuOnd3VkjhVz27EPkHOJp6mSn3x2pM+4lcehGwbWE1OfRB1faiM/mplWWoQvvOd79hi+2fTzl3bk+U8/9g+yduPs/3vcrG4+du/rR+RJsU+gl234zz5WBsNGx+7vl3uB1AbDc0E58BtCb/+9a8vzeUwqQJ6TkUcy8PD4/1Y6bOxNeC2ebFpcwYlr1crfTa4blEUZS/OyRIbBclgfdK7xleGLP4FJzlUbTEdZ9vnV9uzooenKStraj2XYEl85bMaFAm0iFzeaOMibZM+kVubmNq0TSpFObpgI6hZ4mSw7kvX0TDaONcm47XF1E01eciZbDl+lKz+kMjoxKOdiwvuzkkyPWpn7tHW9pb+hDO37xvX6qFunZFeeqNkjb9sQa81OGHX9Laz6LpT3WCTkvWMS3bVxkBigqaaebKStbHQYjth0f9qKGQjmlHyETnXsnHbaDaVx06MyxLZjpxESWn9U7uSgzhKlmZRtuOU3H7K1nEdp9oK5Z9oZ+P2ALWltnmomeNP3dt1/FGyhNcGU/v3Gistnl5usBcOpFaKMCQVZYM2J+1q2sMIBtZXsgZTGwSNiW1v7WadOOup0UeF6mabKr5tCe0enfjo+s5y5+NaQnui7fnyS6iBkrzV9kHf1N4VH6dSaybYo3Y+0lfJ/387Z3PUSAxE4TBQJI4EImCv7MFXNgYfXAThNByHg9EeuubV02tpmDJmkb3vKw5mGEk9Uk//SQa2GO4HShMril/D9HAeg2nKvjArN27AAsuTdB0JG6bSppuIgOA1uRqDTAXxWowYioWQudJ+IVQkmrDihszZSvLWsoQaMHawXJiZPM+I1KIraNho1bIt3u6SMXoInw1oF8kM8KEbKsaE5+yfV7zbIcgxx0iw7MxyjMzX+QWWPIzj9EN7cC9bGdH5vIf6qUvGy9y9U9YUIYLMKgsM54qG0Qk3iVeYjRq3yvJwrIOb8SpJGFQHheuVkkkdFK6jH5GcW3VNTVlqP7W30NJ5NAkl6bpkmDt2/yOXLLKV9kQkbpbli55lFFgezlLih9c934aBLu2pzBWXjGQJMVC3ttGdZ8gjkdy6S+bKIq9Xbc1pvo7mIiEHN3m9WEKOvQqd0YNLLqlwKy81KwCsnxjbK10y66uoI6K2stR/ch0VrVDTRlusIusuHhuRVz7xwXqDhDJ8Ks/Oadn8YMvLms3DhbahSciJaQ0bdKBjWRJzQWbEj+IbMPWoH8jrAY1H7JLnOfsbRIXdtcSTSjKEG7a45JATs/qpGkE1uYfRiFlNhTOd6eOskeXkm1cS7pFLPiyldbmOSIjzmxWHMcqSoVRIGjhkjMLDuktmE5wFkJQdqRUusmFl2833SJace+PZy/LIuGzRUACv7bnFbMVq72VnVlzyZXwi8kJHDqHDbBnyQufOS1vSEzV+eX5GNUic32iZOI3jwmHcIPEQX6wbXLLoycglo1qwJUsOp1XbXAIvODsCmWc8LIOKUZec5gYcNF/aQjdf5xCBJeTgjNcrSyjLFyZCXnAub+SXGj2wBROuz5JLu2Fwon3ZSsF4xALH45GH2dHBWtxTljr7x8eHJBbndve0tquS06lYfqjIbtkB4mAZg15SnXy37DfDE0O3YD0L7fmdl52ksmw5vCx7zHgo3oqoFIeKVNgBYvEgbZ7nOsiSof3i3nhQ6Ar/it7CaEpz3MwVAgmou8OJqCWlvIgzyvirIOe0CcSPE+sok1Nb9xyakMXDiCFhrDj+CjWIB5dBu0vAo+P9F/eAsaIhRkS1rdAWFAsMbYnnleKYrKm8HRj9RBs3/OJ0Q+FDuw96aDdoMS7L0x2Xc0ruR9YXSyb3lxSrYTlYf/BEnBry5MuiSzlktNDS+Z/3dyxHeXr6/fYmMyzrBUlGVaKyVIZguAptKpfe2ZE9fWcmxPj1+sp/4g9h0ER4/mv0EJYKzwUthdpkmSFteCl+TG6ey075Bcz5d9ZYqVOe2q1lpG18/UKb9CIhljW/Xywhtthlr/2wnC3gZ9nTrlaeGZYH/eQNiHVm+Vch8WDreU+XlczvruHtE9ZF3MBJzxVIcwkJz99z2P5bWcloR7dtbPJ47NN39sy/p6RCzgMQZlw+88XMejnq5nQlvBWRnefP9R5dsgS8W9il49kPAwfaknPUL5/vl+aI+KBAHLzfBbvN/waEk6SvxDR3St4YMz+CJKkPA6eV2PUfPSYszw9KeNvOpTQl1+/JJRtjjDH/OXbJxhhjzBTYJRtjjDFTYJdsjDHGTIFdsjHGGDMFdsnGGGPMFNglG2OMMVNgl2yMMcZMgV2yMcYYMwV2ycYYY8wU2CUbY4wxU2CXbIwxxkyBXbIxxhgzBXbJxhhjzBTYJRtjjDFT8BcBpoSR0lk4UwAAAABJRU5ErkJggg==" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the largest number of dolphins counted in a single survey.</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>Calculate the mean number of dolphins counted per survey for the winter season.</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>Compare the data for the dolphin populations in winter and summer.</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>Compare the distribution of dolphins in summer and winter.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d (i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest <strong>one</strong> reason for the differences in distribution.</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>Outline the relationship between body mass and LCT<sub>w</sub> for male dolphins.</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 for the high LCT<sub>w</sub> measured for the female dolphin.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Evaluate the hypothesis that water temperature determines the range and distribution of bottlenose dolphins in the wild.</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>Explain how an increase in water temperature due to global warming could affect the distribution of bottlenose dolphins along the eastern coast of the USA.</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>2200 (<em>allow answers in the range 2175–2225</em>)</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>800 (<em>allow answers in the range 750–850</em>)</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>more surveys in summer / fewer in winter;<br>larger average/biggest number sighted (per survey) in winter / converse;<br>larger <span style="text-decoration: underline;">total</span> number of dolphins (from adding up all surveys) in summer;<br>variation in both seasons / overlap in numbers between summer and winter; <br><em>Do not accept answers relating to distribution.</em><br><em>Do not accept answers stating that the dolphin population is higher in winter.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>more evenly distributed in summer than in winter (across latitudes);<br>many near Cape Hatteras/35.0/2–35.4/6 °N in winter/more than in summer;<br>more dolphins overall in the survey area in winter than in summer;<br>wider summer range / reaches 36.6 and 34.2 °N/ less far N and S in winter;<br>unimodal distribution in winter versus bimodal in summer / <em>OWTTE</em>;</p>
<div class="question_part_label">d (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>seasonal variation in food supply/prey/predators/water temperatures;<br>migration to find food/prey/warmer water/mates;<br>migrating dolphins rest/congregate near Cape Hatteras/35.2 – 35.4°N;<br>Cape Hatteras /35.2 – 35.4°N may be a mating area in the winter;<br>seasonal variation in human activity / valid example;<br>more food/warm water between mainland and Cape Hatteras in winter;</p>
<div class="question_part_label">d (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>male dolphin with the lowest body mass has the highest LCT<sub>w</sub>;<br>with larger dolphins/above 180/185/187 kg no change in LCT<sub>w</sub> with body mass;<br>weak negative correlation / as mass increases LCT<sub>w</sub> drops / <em>vice versa</em>;<br>uncertainty due to small amount of data;</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Accept any of the following points about the female:</em><br>older so (possibly) has a lower metabolic rate / other result of age;<br>higher surface area to volume ratio (than male);<br>less active than males so releasing less metabolic heat;<br>less insulation due to subcutaneous fat/adipose tissue;<br>suckling / pregnant / part of mass was fetus;</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>supported as water temperature affects metabolic rate;<br>supported as dolphins will avoid areas with water below their LCT<sub>w</sub>;<br>water temperature is unlikely to be a factor for bigger males;<br>wide (latitude) range in summer suggests temperature does not determine range;<br>few animals / only one female / only narrow range of latitudes investigated;<br>data may not be reliable since the study was conducted in captivity;</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>may migrate/move range further north;<br>migrate to area with cooler/suitable water temperature;<br>ocean currents may change;<br>most productive waters/food supply may be further north;<br>distribution more spread out (due to warmer waters in more areas);</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>The unusual circular form of the graph made it more difficult to read off the value for the largest number of dolphins in a single survey and only about two thirds of candidates did this carefully enough to earn the mark.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There was quite a lot to do here; three values had to be read from the graph and then a mean value calculated. Again about two thirds of candidates scored the mark. <br><br></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>There were plenty of valid comparisons for candidates to make and most scored two marks. Some candidates failed to understand that the results are merely sightings of dolphins and not total population counts; they therefore incorrectly implied that the population size varied considerably during each season.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates found this question more challenging and in some cases it was clear that they had not studied the data carefully enough. As in all compare questions, the answer should make genuine comparisons and not describe the two things separately, in this case the winter and summer distributions. Some candidates did not understand that a population is a number of organisms and a distribution is where those organisms live. </p>
<div class="question_part_label">d (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>A huge variety of suggestions for the difference between the summer and winter differences was given by candidates and many of these answers were considered valid. The answer could have been based either on possible differences in dolphin behaviour between summer and winter for example breeding, or possible differences in the environment such as water temperature. <br><br></p>
<div class="question_part_label">d (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Answers were in many cases weaker than expected. Most candidates stated that as mass increased, the LCT<sub>w</sub> of make dolphins decreased, which earned one mark. The difficulty came in earning the second mark. The mark scheme gives a variety of other points that can be made, for example that the individual dolphin with the lowest mass had the highest LCT<sub>w</sub> or that above 187kg there does not seem to be much if any further decrease in LCT<sub>w</sub>. Many candidates seemed to realize that to get the second mark they needed to give more than the negative correlation but then merely restated the correlation in different phraseology.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Any possible reason for the high LCT<sub>w</sub> in females was accepted, though not simply that she was older –some reason for higher LCT<sub>w</sub> in an older female was required.</p>
<div class="question_part_label">f.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates found this question hard and the examining team had some sympathy with them as there isn‟t very much basis in the data for evaluation of the hypothesis. The most effective answers concentrated on the graph of mass against LCT<sub>w</sub> as this shows that the metabolic rate of dolphins will have to increase if dolphins are in cold water. Some candidates realized this, but few then went on to comment on the small sample size or the fact that this data was obtained with dolphins in captivity and that in the wild there could be a different trend.</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was expected to be an easy and high scoring question, but many candidates struggled with it and revealed gaps in their understanding of the data given earlier in the question. It is important to read all of the text in a data-based question, as it places the data in context and often gives information without which the data cannot be understood properly. In many cases candidates based their answer on faulty understanding. For example, a surprisingly large number decided that Cape Hatteras was on the equator and that to find cooler water dolphins could move north or south. No detailed geographical knowledge was needed to score two marks, but geographical misunderstandings did not help. The answer expected in advance by the examining team was that the dolphins population would move north in response to global warming to find cooler water. It was given be a minority, but other valid answers were accepted. </p>
<div class="question_part_label">h.</div>
</div>
<br><hr><br><div class="specification">
<p>The image shows a nomogram.</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>(i) Using the nomogram, state the lower weight limit for a woman with the height of 155 cm who is classified as overweight, giving the units.</p>
<p>Lower weight limit: .........................................................</p>
<p>(ii) State a major health problem of the circulatory system that is correlated with obesity.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw the structure of a saturated fatty acid.</p>
<div class="marks">[2]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe how the hormone leptin helps to prevent obesity.</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>(i) 60 kg <em>Units required</em>.</p>
<p>(ii) coronary heart disease <em><strong>or</strong></em> coronary artery disease <strong><em>or</em></strong> thrombosis <em><strong>or</strong></em> stroke <em><strong>or</strong></em> hypertension <em><strong>or</strong></em> high blood pressure <em><strong>or</strong></em> atheroma <em><strong>or</strong></em><br>fatty deposits in arteries <em><strong>or</strong></em> plaque «in arteries»<em><strong> or</strong></em> arteriosclerosis <em><strong>or</strong></em> atherosclerosis</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>[CH<sub>2</sub>]<sub>n</sub> / hydrocarbon chain with single bonds and at least four carbons</p>
<p>COOH head at one end <em><strong>AND</strong></em> three hydrogens on other end</p>
<p><em>The minimum of four carbons includes the end of the hydrocarbon chain and the COOH group.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Hormone produced by adipose/fat cells/adipose tissue. <em>Reject produced by fat. Reject produced by</em> <em>pituitary.</em></p>
<p>Acts on/target cells are in the hypothalamus «of the brain»</p>
<p>Inhibits/reduces appetite/hunger<br><em><strong>OR</strong></em><br>causes feeling of satiety<br><em><strong>OR</strong></em><br>makes you feel full</p>
<p>More leptin with more adipose tissue/fat «storage» tissue/cells</p>
<p>Eat less/decreases/reduces food intake/in humans obese people can have leptin resistance</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>(i) Teachers expressed fears in G2 forms that candidates would be unable to use the nomogram through unfamiliarity. In fact most candidates successfully read off the value as instructed.</p>
<p>(ii) Many candidates could name a health problem of the circulatory system correlated with obesity, but vague terms, such as clogged arteries, were not allowed.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was generally well answered. Most candidates showed a saturated hydrocarbon chain correctly and many also showed the carboxyl group.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Despite the fact that the hormone leptin is a new concept in the syllabus many candidates were able to answer this question accurately. In weak answers there was some confusion over the origin of leptin and its role.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="specification">
<p>The Chinese soft-shelled turtle, <em>Pelodiscus sinensis</em>, lives in salt water marshes. The turtle can live under water and out of water.</p>
<p>These turtles have fully developed lungs and kidneys, however, many microvilli have been discovered in the mouth of <em>P. sinensis</em>. A study was undertaken to test the hypothesis that oxygen uptake and urea excretion can simultaneously occur in the mouth.</p>
<p>Initial experiments involved collecting nitrogen excretion data from <em>P. sinensis</em>. The turtle urinates both in water and out of water. When in water it allows waste products to be washed out of its mouth. When out of water it regularly dips its head into shallow water to wash its mouth. The table shows the mean rates of ammonia and urea excretion from the mouth and kidney over six days.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="specification">
<p>It was noted that during long periods out of water, turtles rhythmically moved their mouths to take in water from a shallow source and then discharge it. Changes in the dissolved oxygen and the quantity of accumulated urea in the rinse water discharged by the turtles were monitored over time as shown in this graph.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="specification">
<p>In order to test whether a urea transporter was present in the mouth tissues of the turtles, phloretin (a known inhibitor of membrane proteins that transport urea) was added to the water in which a further set of turtles submerged their heads. The results of that treatment are shown.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="specification">
<p>Further research was conducted to determine where mRNA expression of a urea transporter gene might be occurring in <em>P. sinensis</em>. Gel electrophoresis was used to analyse different tissue samples for mRNA activity.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="specification">
<p>Expression of the urea transporter gene by cells in the turtle’s mouth was assessed by measuring mRNA activity. Turtles were kept out of water for 24 hours and then injected with either a salt solution that matched the salt concentration of the turtle, dissolved ammonia or urea, followed by another 24 hours out of water.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Deduce whether the excretion of ammonia or urea changes more when a turtle emerges from water.</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>Compare and contrast the changes in urea excretion in the mouth with the changes in urea excretion in the kidney when a turtle emerges from the water.</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>Describe the trends shown by the graph for dissolved oxygen in water discharged from the mouth.</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>Suggest reasons for these trends in dissolved oxygen.</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>Deduce with a reason whether a urea transporter is present in the mouth of <em>P. sinensis</em>.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the additional evidence provided by the gel electrophoresis results shown above.</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>Identify which of these turtle groups represent the control, giving a reason for your answer.</p>
<div class="marks">[1]</div>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Suggest a reason for the greater expression of the gene for the urea transporter after an injection with dissolved ammonia than an injection of urea.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The salt marshes where these turtles live periodically dry up to small pools. Discuss the problems that this will cause for nitrogen excretion in the turtles and how their behaviour might overcome the problems.</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>a. urea </p>
<p>b. for both mouth and kidney </p>
<p>c. percentage change/change in μmol day<sup>−1</sup> g<sup>−1</sup> greater with urea/other acceptable numerical comparison</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. both higher/increased on emergence from/with turtle out of water </p>
<p>b. both increased by <span style="text-decoration: underline;">0.66</span> «μmol<sup>−1</sup> g<sup>−1</sup> when turtle emerges from water» </p>
<p>c. % increase is higher in kidney / kidney 940% versus mouth 73/75% / increase is higher proportionately higher in kidney / kidney x10 versus mouth nearly double/x1.73 </p>
<p>d. urea excretion by mouth greater than kidney out of water «despite larger % increase in kidney excretion»</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>decrease «when head is submerged» <span style="text-decoration: underline;">and</span> increase when head is out of water</p>
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. oxygen absorbed from water/exchanged for urea when head dipped in water«so oxygen concentration decreases» </p>
<p>b. lungs cannot be used with head in water / can «only» be used with head out of water </p>
<p>c. oxygen from water «in mouth» used in «aerobic cell» <span style="text-decoration: underline;">respiration </span></p>
<p>d. oxygen from air dissolves in water when head out of water «so oxygen concentration increases»</p>
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. urea transporter is present </p>
<p>b. less urea «excreted»/ lower rate «of urea excretion» / excretion almost zero when phloretin/inhibitor was present</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. <span style="text-decoration: underline;">mRNA</span> only in mouth and tongue/in mouth and tongue but not esophagus intestine kidney or bladder </p>
<p>b. <span style="text-decoration: underline;">bands</span> / <span style="text-decoration: underline;">lines</span> indicate mRNA for/expression of urea transporter gene </p>
<p>c. <span style="text-decoration: underline;">urea transporter gene</span> expressed / <span style="text-decoration: underline;">urea transporters</span> in mouth/tongue / not expressed/made in esophagus/intestine/kidneys/bladder </p>
<p>d. mRNA/transcription/gene expression/urea transporters higher in <span style="text-decoration: underline;">tongue</span>/more in <span style="text-decoration: underline;">tongue</span> «than mouth»</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>salt solution is control because it does not contain a nitrogenous/excretory waste product / it matches the salt concentration of the turtle / the turtle’s body already contains salt / because the turtle lives in salt water/salt marshes / because nothing has been altered</p>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. ammonia is «highly» toxic/harmful </p>
<p>b. ammonia is more toxic than urea/converse </p>
<p>c. ammonia converted to urea </p>
<p>d. urea concentration raised «by injecting ammonia» </p>
<p>e. difference between ammonia and urea «possibly» not «statistically» significant</p>
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Problems:</em></p>
<p>a. urea becomes more concentrated «in small pools» / lower concentration gradient «between tongue/mouth and water» </p>
<p>b. less water available for urine production/excretion by kidney<br><em><strong>OR</strong></em><br>less water in ponds for mouth rinsing/more competition for pools (to use for mouth rinsing)</p>
<p><em>Behaviour to overcome problems:</em></p>
<p>c. «still able to» dip mouth into/mouth rinse in water/pools </p>
<p>d. «still able to» excrete urea «though the mouth» in the small pools </p>
<p>e. more conversion of ammonia to urea/urea excretion rather than ammonia</p>
<p>f. more urea transporters/expression of urea transporter gene </p>
<p>g. urea excreted «in mouth/via microvilli» by active transport/using ATP </p>
<p>h. excretion with little/no loss of water</p>
<div class="question_part_label">g.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">g.</div>
</div>
<br><hr><br><div class="specification">
<p>Auxin can be used to promote the development of roots from stem and leafy cuttings in some plants. In a study into the distribution of auxin in the development of these roots, scientists measured the amount of auxin in different leaves of a shoot tip of <em>Petunia hybrida</em>.</p>
<p>The figure indicates the numbering of leaves on the shoot, from L1 as the youngest and smallest to L6 as the largest and oldest leaf. The developmental stage of L5 and L6 was very similar, so L5 was not analysed. The stem base is the lowest part of the cutting where roots may form.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p style="text-align: left;">The graph shows the auxin concentration in the different leaves.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<p style="text-align: center;"> </p>
</div>
<div class="specification">
<p>N-1-naphthylphthalamic acid (NPA) is an inhibitor used to block auxin transport. NPA was sprayed onto the leaves of a set of cuttings for 14 days. Development of the roots in control (non-treated) and NPA-treated cuttings was measured 14 days after taking the cuttings.</p>
<p>The table shows the influence of NPA on rooting.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="specification">
<p>The scientists also measured the changes in auxin concentration in L6 and the stem base during the early period of root formation. They recorded the concentration in the control and NPA-treated cuttings for 24 hours after taking the cuttings.</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
</div>
<div class="specification">
<p>The scientists wanted to know whether the accumulation of auxin over time in the stem base of the controls affected expression of the <em>GH3</em> gene, known to have a role in growth regulation in different plants. The technique that was used to quantify the level of transcription of the <em>GH3</em> gene was Northern blotting. In this procedure the darkness<br>and thickness of the band is an indicator of the level of transcription of a particular gene. The image shows the result of the Northern blot from 2 hours to 24 hours after cutting.</p>
<p style="text-align: center;"><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAe8AAACwCAYAAAAmJuZbAAAgAElEQVR4Ae3dzZJkR3Yf+MiPqgKaNEObzDhmo5GA/UjopcxEoR9A7H4AEtB+2NB+2OB+COgBiNYDECD3A5BrqWHcT8O4ljWMy5EN0FI3G1X5MfY7fv6RXoHMqszqSlRlwL3qpt/rfvx8/N3vOe5+b0QcnJ+fn29WWggsBBYCC4GFwELgziBweGc0XYouBBYCC4GFwEJgIVAIrOC9BsJCYCGwEFgILATuGAIreN+xDlvqLgQWAguBhcBCYAXvNQYWAguBhcBCYCFwxxBYwfuOddhSdyGwEFgILAQWAit4rzGwEFgILAQWAguBO4bACt53rMOWuguBhcBCYCGwEFjBe42BhcBCYCGwEFgI3DEEVvC+Yx221F0ILAQWAguBhcAK3msMLAQWAguBhcBC4I4hsIL3Heuwpe5CYCGwEFgILARW8F5jYCGwEFgILAQWAncMgRW871iHLXUXAguBhcBCYCFwvCDYDwT+63/5L5vT09PN119/XcejR482p2enZdzBwUHVnTw62Rzfu+jyg81B0Wjn/ODwYHN4eLg5Pj7e1I/NnW82R0dHxeN8c140yRXie3R8tLl/7361Ozk92ZB7fHS8uX//frV9+PDh5uzsrGjv3bu3efDgQZ2T4/roeNCSh+705GTjZ+7+x69+tfntb3+77Rz1DvadoDk/35CHz+HB4ebsfMhgx5zYdHR4YQPbHtx/UO3on4SPhL+Eju4OdWSRqc2943tFAxsHWserr7467D4+rjaIzk5PC3t8tD87P9/8029+s3n46OHm0cNHlZ+fQfV8o3/02SsPXilsnJ+dnhXG7Cpbjw7LHrwc0Zud9a/7Wlv9QD/9W+lgs8UKyNqmf4PF4dHR5sH9+1s7lKNjm/PQ6StYsY9N+kSZ3CEd6ZvCjh2npS9d6C3pf230M/zwfnTyaAMPCR1ebIO5azjqC+V46/uMc1gZB8oOjw5rXOJjjMKCPOOSjdHReDwsuSeb87OzMQZPT6s+un398OvH+pAODoksetPNPyn9oCx1GZ/qleNd46fHZjesbPcPbNJXconexom6suvBg8Kbfffu3y+af/Nv/s0uq3W9RwhcePI9Muq7agqHwFnEYXMmHEm5lXYkl2HDmYh5gpz2nGAFAwGhHdPskPBQ7kgq59VOV9ukBAdOBz3HKcUZxTFV+9LjYHNwfl4OyURAYpej2h0dbg7PD8sBHm2OhiPswM2R7sTux3QsBtOfsrttUVz2UP18yFTP6VZwnRyxcsEhNpVdnOoOHnhy54LbaesvQERuYXB4tDk9vwhoyvDGMwf60m0nWOAfXA7OR5ANXcnuIKksY0F/nJ/UiNjqgVaKXjmP/A39T09rXNEvdM4l/SVVQJtkKgtt9Er78JYncDs3Bs82o6+1LZz1ayft7x+OyaIi4zJ9rv9jZ+gjN9f64uBMgDdZNRE6rPxY8IWNuh6rArxgaAxIsVeeCWHdJ93vGSeRlbxsbSXpm/bahqd7TvvSl0nTWAofecojf1vXuM8027p1spcIrOC9J93qph4utDxaWRVHYWUSR6gsDi6BSVuOL4FWQMiKAiMOBk05m/N22O1c0KnH38GpzI4lPPGpQBMn04E8zis85FZpVuQOK3EJbzrgfX44Vi7yrCrZNTvSatR/2I9v0WSV1PqW7W1fYdQBwHmcduFhR+LouFaGrslK0NjKqtVXByx21kRorDpr5ckOuwtW4yenY1LlbwdH/UJPcrbpQJvzzdnh2UaATqIbewpThQcmCWebewf3Cif9IuGtD8hka8rSrjDN7gqMi2JMOPq0xlVWqvg5wkd7R9nVq2/Bnu0mLMofSzXWeuLnnL1W4KfdRzDLRGfeWejyCvRW4uf3agWO99FZT+K6XenTduNffZ9+h3/XZeKI/vDe2E2hM7wEdnaqM35qQts84G4HS33xhhr8e5JZ/cX2njwX/83oj0z66K28+vB8TE71X3ZL1CUVVWNVbZxPEzx6kF16T+3SfuX7icDkJfbTwO+KVbWya8cqMGSbl/1u7AoI/EEtskegO3k4toI5MUExjig5Z1IB5ehwu1UcR4hn1XXQ33UgFbTbqaOV0FidCcqHvcVaKvX2Mxr8OXLBRi5olPPrVV4xKjOG44yu2Trl6JLoN8t2bWsaja1UNuNdwZS8Xeev/v7YEq3JzTGnfjACr63us/PN4b0xsdFWH4wQUJ65bDmdnGnsYpODzrPsktGBtAJG68Me2Ck7PBuPCKqsp2t0qklNB1U2xZHDR1KmP88endUEJGWFs6DfjwKEZbLQy0NH94etT8YAG9jtKJt6S7za9SRFXXQpvq1LMe4/VsGbtlvgNz4yAZDjIZFLXyn9DbPTgxFc9S8Zh/71I4Eah22TOrxKv4w1E7dghHEmdd3GfSRwV57+8Phhc1g7BMGaXviGt/K61+T1fxqXTUdHOsemugc9FjF52MG/+O1gp9/TF5HNvkx4C6j1Z28RWMF7T7qWc3Xjuskr6HK8vRRPYI4DylZkOY+DsTIDQ7bLneNTDiRM2tlVm3buc6C0HW7rkeOdV1uzs8SXk4kbK52PjmpNQhbelTrgKUubUTHa48Fpq+foyl5bwa1X2tRWpDJOrp+N1qRmc745PjvenB+PIFXb8/3YAA88S4ZVGyfdW6kVXK38j3qHge69smO/IOR6V2/dgEeCXQXm6Rk9ev+yfUz2nBKAyi6PJg43NRlLfx4fHo9dh16JF78Ju+h4djKCUAWVxqTkGCo72EUHfXmwsxJliyAn6JRNAnu/21A61p/xvBqfCkZw6aBl6xpWeKsv/WDUOtjKJoMdkMijlgroAncHykJtGqd41XFwMfnAJ+UGnkcu2/7pfqkt9JZVtMZp15kIS3TUP/h5xoyucKjagV9dd9eV7nM/Wpmfnm08ESh7jy4eP9Qk0NgX75tv2TZtqytnNxnaw50eUk3KTnqCk0lQ67Wy/UVgBe896VurBze1m5vjELCl4TjHKursYb/QsxkOjDPKrD8xOgFcwPNPyjZgOY3Tk/JsCSjaO447cGUSgVbyAlIFiymYcNJ59qhtnBAHlURyHFVWWRzpw0cPy3F5WYd6HNfDrx9WTl88ynGenW9lF93R2GbGv7asp1VS5JwdnJWDZZuyrOToH6dK39Kz5xmcqGton/UzU9uySYWPVfbpab3Mhxaecnpuj36/oGz1pKC3YfGBpYkDW0009E10Cs76rZz46VltqWYlrj591d1ZvMOXHnSjh/Eg6RuBFQbS+VSvDD27K4BPthXtZLvJhRQ+qSfzrMfDXJ8VY2wiR1v6K4MqPZWxNW0zPhEod52JEB0y0ZPjUxNNL8j1ZLImBfiSR//J/tKhJ1rBlD7sjy7Oy8bu9rJv1q93BKqve4xuMemxpU3ZqD824xFC7bJsLiYfaYMP2uqvfvGwdDkcE8QCZv3ZewRW8N6TLrZaqa1HTvhoPI/jxMrRs7Edi5ucoyhH0udFx5n2zD8vP3EQUjnEDnYVIPvZbDmMdubhy8GEv5xcdeFVDMnvoJTVVxy1POfa4xfne7K52KZFw4kWTT8zxLt070AXXcoGk5qOXnYeqkyw1rYDXrakD0/H83Hlgin5hc3p0Ge2tVj2y9zn9+7V1jm90EjynNO1MEm57XsrpUE6dPLikslAT75iQwI2Iv0lKOlnEx80FfTTxxPDtNeOHfhWWQeUamtC4vls6xpcazu7g3m17/Ggz6Q8F66JWI8l/VJ1sb93A9iEP3nBowj7j/LSaxqbeGUCUC8D9njQJGOC3ZGpPHLCWx/aqWCTMVg20r37IHTpAvl521JtjnpC3I9aQp9Jm2t8HdHD5DD6sck5fPOcWpvSq3XQNuNCnfO6PhwTn2/Y1FgFR7lAXnpMk6LouvL9RGAF7z3pVzcuJ3qYbUjbxJvT7SqPA+DoObs4gwQzjsX/cfOPQMXpcEYcWJy5a04CfTmlXtU5l/AN75TxkmmPpsrtDHA2VrjTs0IOkYyTR4+GLb2TEF6CluBzcO8iIMZxcYYcfelw0HoIHFZivRrEB/3R+dj6dq6eTNupcbKcr2fiAqYt6XniA8PdQFe4dWArXvU28pggCGUlPzsTjRVdtAteZNdEoScWsNI/6RO60NESf1veAaNsnN70p1/x6o9MRSeyyFVPHrzYCof0TbByrV3p13pWW8G1t8Czy5JgXvx7xWkSpb8ETnwyBsI/MqtNY1JKtNxgk7KMEzoYU6nXPv2hnNxMdNL3RdNjgFxzHEe9aW7C0kG9VrKbzXZV7fr49MJF1kTh4GIbHV/8ogumZJKf8s3p0DX2yv3z6CX9UjaNWyjmjrxX5eEVeUW/c7/RAV1NpNrWx5mtq31D4GJk7ptl3zF7BEJbt25wjpITqaO3UwW9WnGebMpp13b2tPrgACvV0mO8EMT5lmM87NV6rVcGGUdWjqifO89wK5fQYDs7z6rgcAWRdpx1HmfUk4Y4a/TaZwXGtgpiPRFQJ9Wq5mzomTZyji7OLs6y6A8Oa1s9NqLhVFNXuvcKzzk6Ttln2iuAZ5LUq644TrbY/o1DT4DDl+4SWvxOzi4+Oy6Ywqry0ExOuOQLFP3IIwEiW7bVUyZoBxcrcX3uY1XMYvuMhbfXBW7tYWfXIdu1bEBbL0HSO32QlwcPDjYnZ158G5Ot8CUjesLM+DMq8a2g1s/1YaCNvpNL8KqyioBD3ww3fKV5HKWtSZt2hWlPHgtb2+VnY8Vb7Yzkrhe0835CMaZPT25tmTtPX8Fw017y9Osx5vHZvuA37RToEzKP7o9+Lrt6F0i/6qNtkPVxzN7pGGOndyTGEBz29j2ZcRld0Uv1noHHQT2BwDvP70O78v1FYAXvPelbN20m725iToeDLmfaHzFyzvGUs+jPcruWlKVeoAwP9d7Q5syq3RwMLSu6LeecpE216495ccKcF561uumPEeHp+qSfqXJJZEgcaLYmOWfnsxNDVyvHbduLjxhx9glWyfGMXvIKzvXe1dA19XTyXBkNGQJbBRWr/uOjzcPz/nKODjal67QVfGwrfwpO6sum5hebTZ4SeNVz/FImKbCSyNam+hECvfV8dNAv6lWwuQheCXTalp29esavgsvEVxn7ZrqSFV3RJjB0v5CfbeUEOu0jr076D519ZrsmgGdD98Ki6wtXskwOT2v68dhkL7hsx9YQU/pqq9xBzuHxwAvr6luP2+ul9ebbK3r24StPqscDHUhjS3YXjE8BWXIf+HiifzWjyTsdzSiTOpfBtKtKT+f0Jn9rUwh28uhRfM5Pa0chYyETPNf1pn3vpqTNDqt1uacIrOC9Jx3LIfBtVk1J5fza+Spzs3M8dfMfDQej3E1fN36esQnyB+0pm1mCi+CAb/g5V8ZhJkBnVScIKhN0vQzmW6F2E7noajW0fYbdK3PaToEhgYnjK3sF4X4bGN9y2pPj1LZs7i1lgXF22uod4RvdtJE4bl9oUgFCkDkddv/mn35Tq+/ogEcmJspq9YNBBwR5dFHv8Ly6Jie9tZygvcW34U9wFaCyEh2sR8Arm9FauAuWB+MZa+HefcMegYXtPtpGF6s2vK3UyY5epX8HbXQJdgVIT0SUo8tzaNdJyoOfsvSVMmPo64dfV9sag2kE7n7fQhF+hfnpxTsbM33V9yQytHmLHJ0dDdhK9LFFjQ628m3qvsrb7B7XCNoVzIdK9Rl05fj6bDe8a7LQn3aIDHIKEwG9J3+RFd3ZVDiU3MPtPYbOkXssEzc2OK9HGz4O2BMO/eY87UqHHhy1bT75gK2t62TvEFjBe0+6tG7kWo087qTKIbS/srrJ6rWcbL8cBQLty7n1VnnKzAjwqAC88/Gm0CSACPjlnM6HA58dUmBWZsVWAa6f05UuymtyMSYgRdfON06R85PimDk2k5EEi+TscEixK+1Kp3Z0zrWJU4/TlJfT7Ge1nC/b4lzr+frByebs/vjoTwmKrnY9+qs+ayI1r1g7cES30q+/yIMe5DjYG1lF05MP5QIHvHMu8LKjvj60JztWu/orW+zMxV+bbQDoFXjZlW/96p0Q/OhuW7zmBWj1Wb+FTydBbk6zTemnyCRffb4Rr/Q5vJhkElIYk9s2CFj4lJ39Al/1T3/kKkEUr6Hv+ebgaEyu8CuMzvob24wr4/po3AjV73gKmL0SVyYZl2e9Q3TSY5IO25THQIXMmByo39ra48C1VPdOT94OevchvIpvv2tiRd8sy57QsJne8mChbiuvXwjNfeD7EzY7fRNeK98vBFbw3pP+rBfA+uM7cURudv+2Dk6A7u87j9lF086nHFw7z9TLh7Ozx+z/eX2dZ9W3I0sAsVUffpHjenY8nE5eVhNIHFa4VivlkPrZcK1eOmhFB7zq+797BZXnjnGUcgd90UquEwiU07FWmv18XBm7pQoI59PHjPqZbvTHy7mkHR2toNkQebu5oEcTNkc/QSm61Mt3m4PNo7PxVbCcPX6CGbqaWPgsfn+JTj0nF8B7cmIiEay1Sx/hjxd98UJDN9dbzPtjfGVQJh8daKq9yU1Wq8VvBJDw0K5kNh74B3964eGQyubTce7aVjT6kqOvehe72kwTSLTKYiPZocETLlL6Tt8qTzvjtV6eq37oMUGnBOsEao9l9C1dum7eOdn2q4msl+JMhI7H6jfYRiYd4QAbh3P9lQlwKVe35dCnJi69OxDbDBr3BTn4zX1YNOyha0/M6t7d2S0rOevP3iKwgveedO33vve9uslrtdSraCtUTqMcqm8Xc22bud8An885iDhITqGcb7+ktX3O146U86hk1XA0vjCiyvjR4Y+2q4gKMv0FKPTA2xEHZIVH9rasHPFw/ByxRBdBSfv64Yq2L21iY3Jttg5P8OnVOXo22mLl4Gtqw9Z29qWfoC6Y3+uA01vimQSFd35gpRScVlvsYRtd5h0CjlhQEPArMG/G57ETCCr4eHbbq358BabqO8F6c1rb9qVj74TgFTyKvl9UzAouumpDH/Zn9QeTmiDVLsj4mBPZ6duEWW2k9FddtL0VuDtAa1s2VGAcK1K0sK3+s2NyNrbnlQf72gI+GM/0IwcfOhddj5f0dSaK0bP6fPpBktQHR3T5rnT88LU6ldMfnTz8yk71PTnSxmocXX0E895ARh/qu9LxZIwrbfGik3Pfiy4Vzh5p9DjTNmMSHd7VN/N90feYevepZ9uSCSt65WlTGOc+wmutvAurff+zgvce9XBu5rp5+7uiY14cuBtdUMgqIC+jVaDolR4+UuV8qFFyMlY3HFgFfz+o4TO2HEt/3EiQ51g46zgqNPdEwqMRUOs5cq2GTzaPOEW/6tQBi7xHfq2pHRedSkZ/vE1QFRDLsZ9vNl+fjV8Y045MgYwu5Qx9zOtoPKNUxtlJngmjj4ONnerj0M+O+pvIGgPOVpCJHPaTIdGR3dkehX3RdRAvxy9wmzixs3caKuicDJxqYkBWf8SoJir5dawOiujZjjd9Ts5Pyl46xLbkhU9pN4KVUzhufF+OCcTDscuBn2Azf1Wsto5zPwrT3+BV/eNX4rar3hHc2GZrGU80ZDhnBxtqjJ2MnYEaX1NALjrP/vMqdwdWus76s7uC687uiPKkTJLqrfaWoY0UvHLuWsrkhN5oS6Yx0OPERy43vlhnCpLhBX+2znoWZo1FztHTM7q63soXzOHcuXKYRE8K1r3ZH1lUX2Oux96WD5k9Maiyuh4Tn2K2/uwtAit470nXegGJE6uV7LRa8aJSHPejzVj1cRJo42S0lcpJt4PmcFyPYHu+eXT6qFYLHIRDfQImfj5Cpbx0aIdCrp/fLKfEZw6/ud2edBknS0/6VPCbtnbPHw3nlFVm9M4EgR6c1yybXIHjxHNpq53e3o9zZGtWneRrq45818GhgnR/d7vPhuNpxVTB89F4mQh/7a2I8lIYHgKdVCu4duoVyNM3/XY5/aODAFdtelvdilE9ewrvrK6mFRrZDrr7ic5y8D2pKGx6NQgjv15GX7a6ltJfdhIe3HtQfGBTNvRWf/QT2OqZqobk9kQlH1OsydMUVOkFK7rpL3g6Tx9iY3yUDT1xcU7vSt1vxcPEsieJD/tb9rZ6dcDWBn/2qYOHCdz9B2Nspv9LXk2WRh/BTJmkjzwHlwRuKTzRwc9RuMHQ8/wO5OGPXmIHLLVzzg7nsb+CbvepNukbuqCVBPBM6krv1rMqTUL6HQj4qscntoRm5fuJwAree9Kvtug4CE6LExGQBRpJ0OE0yvn052KVo3Ozx1mrn8vVK6uVVDsxtJJ26h1xFpxYgkF4Fz8rA89mD043JhAmBPSU0ja8ats5q7/Wr5zjtCsQh2UFyWZt8YxOeEYX5zlC6zr6lVPtZ5TKJHwSGLwEpRxdJgFWqnHYaB2xJbJwio2pgyU9HXDalmcbtbdVlZMZuWTXBKtfHty2m4JO6IOB722v/szLYKU840psYRK9ywY7FwJNf3RsfGtAr1wzLtjZz2HrZ0B7fFih6rcebqU32XSSm9h8/fDrqo/M2AhHqR5lTI9VhpYDBzR4Sc6DMV7O5bCWR6Z8rtcO7pLyGgul88X7A7VjNQiKzg4QPjm029rYQRMhXtFjO076sYQ2NQ6672oS0xNlkzMvFZbIfhN9CCZm/Kv25+Neqf6cxmdo0dSkovGYx11oVr5/CKzgvSd9yjFZ7fl5xfqGsmlLrm7udmz1Qk87FE4padfZ1Uy+v5wlk4ByeJMzS1tOxarLS0hoyMNPOadZW8ucaTuo2prEpx1RnFItzq0sskVo5eEFpA6QePse80wQ6vrhw3KcdMnEgiNVl0nJrtNGG2cbu2ed1ZORgIBXdIzNttaVw4mOdZ5JByffNhTGCXK9XYtvbcNbbebFOS8C2vLv4Fn4Z4tXP9V/D/7Hc2T6sCGJ/knBi5waF5uLXYPH6KyGOz06eLTll3a1Cq3Jm4/7jR8IUSext2xkSx5l6Do7Ctj2W+H0tCMheGtTeHTwwsc1ntG51amMfenLlJfcyE8QnHYk0M99hb82KXMdvoK1MRieaOjhy2n0f7DSpsp7bFcA7l0EbcMvNNEVDzzZl5fbPPeXoqcAXvymiaxVt3q857rSffpu9PQFfmSTp93FXR1NVr6PCKzgvSe9WjduPW+2zdrPUutGPq8f83BzcwSV940e0zlXKc4LL8GY4+dAOA1JMIwjE5CzIkePb5yYaykOKOVVVj9fOXYBBAftatU2GpQO9UUnWf32d2PTg3xboVahzrUlq5zatGXIjuigXc6je+yhV/QsPbLCrtLxti8HiZ+0Pffc8WR87lfgPjrNN9rVPm/RahO78fYMFYr1LBVFr4jhiEewPT4/rkmO68gtG9sl41Jbqh7J9mfc2eOITDsT9a/7LX1V27T9ol62aLUrHBJ4Dzb1ohVe1evNQ6Db8iev+7sCfGNPn7KjX3SEvVW3z0fXI4fmFT5wyfhSJilz0GmmS1/BosZxTwSNXXT4ONBlslYMQQ2PXik/OHxQE9wH98c35RkB2klpB5N8Mx47oxPZ+qrGU80xR4A1LvAoe/J1sz15AeLp4eMBnix6Vr/N29796EDf+BIeKbrZtao39I/G+x3qyDMpYL9zetWLlNVy/dl3BFbw3pMejrNjjnNOs5wDh9lvanMK6hxudDmazOCr/NEIJOUMNv2CVFZ5/RJStcOUd8e7Hany8KQH3pwP52JF6fkjvciro7dgydJOIDi3/a1dr6bwUS8o0Nk5noK4czKUyyM/ziw6yCX1aZ9rZXSJrinHQxl6NFL0VschR77gyLasVMdUZ+hdQS4To6zc2oZiyj6r9+4PP74Sm1KfwOA6+qYuOugHz7Sjq3oBC25JqZPv2oaGfXn8YoJUwSzb5N234VWfZdcvPbmDifYmFvXNfj2hsPPih170v/cGKrh3X+1inms5fjCRS3IHrEwsk9I/2sQueNEl1yaZNdHsz1Szq/oS78YCrYOMsqN/OQxfMvAUuOt8+jEU9OpqctBY4KOs0sHFLo5yiQ1li/Hbn4QonTdjEggruHnerT66aYuu+PTn2917vuiQTbkP6bjS/iOwgvee9HEcA6fqBo9zYB4HFOeiznXKrZZys3PYCZDqPffEpxzjZjxHDm3Fbg4zq4X+vLEgVg6vA3rkvfrKq/Wdz/RLwjtOlv7ON/270Nxc6dIvWOETXeeVN1kJ7NU+gbIDe+SXQ55WaGXTFJS3dnWApFtWdc7pN+vrPPqEV4I2mfSvb+5q/MIDH7I4Wo5ZQOCoJfYWdq27MrSxQZ1+lPKGOEePZ9oJDK7TL+xOAI8O4StXloSuJlf9eX3l7Ih9waDKfTKgf0DGNTn0rz44vXg2Xf3Wq+LwSR4+rh2hLYx6PJVMb3cfnI4dgf4edrjQPf0WninXDj80hRnYequ7VtV9n9CXjfJgnWs88E156df3SzBlA/4V2PtTFvrAgXFecqyA7ZFIr7T1eZ33/Uj+937ve5uvvvxqc//ofgVu45wOJSM7IDj2GKoJW/+kbnYNHj66aFMN15+9ReDCk+6tid8Nw9zQHBUnwE9xOI5yKnl7ud9IFnQ4D23M7rVz8wsmc0DCiPMRKKQ4qTjbknk+vv60ghDHdnzxdre2EqeuXp6VHUdYb2JPX0SBX4WmXYfZL2xZbf/617/e/NM//dM2YMfhs7XaTyswsjnZ0rMDcIIEm0OPh5SynHOe8FTuEMwd7JCy0qlV0snJ5rg/V1+V3qTun2mkW9H3Cp9chsbJk1+Y9m+QKy8aKy1vMk9feJLr2rY/Gl/iQSepVqQdpGJz8eoJFhvSd+jRsE+ectf6+/75/a3dpUsHWHQSm5yjP8WjV8lkVL1dntPxdn6Nt2nSiF/ao3cOUzjk7epi4g+cDkcwRGMMoscDFnSI/iYy6mvcTivpWnUbivVUY0wSKoDTu+3xe/R4RS886ZajJkM9ntGFtlQ08eh7qupax9hQOrl4dIGbS7Ikdrv/Xn311c1//3//e8lU5gZvID8AACAASURBVEj9w83DemteX8P87NH4mJnHAJJ7tx6nOG+bqmL92VsEVvDek66tG7qd2giZwzlweDkEslotdTDgoByS4BrHyGmgiwPxTJfj47s4qTiHctz93JUjypEVhyAQWrx++/Vvt89T62NGHUy04yTRRqZzB2euTJKjZQ/9slNQTn1y4mhjGx7aSM6T6B7b8ZLSJuVoOFXXzqUEGzy3E5121soEhbKt9dXOQbbyx3h4g763YNU7T/9UwOHg8w1qHXi0L1q4dxm59IKDRF80/plAeeZMh6wC1UmcvfPUDf0v3o2wpVxHrfT796ITnDt4k5vvpa8+rIHSOvaOQunROpXc3gEpJaZ+iV7GISxgT6e69izZZMDz68KyH9H083WPLlp07Tpol3EDFztCMC1+CdLGxfTIBA7SwGGMuWCpnB30ws+RSRb6uu57AF3q6JqjePR1zuXa/va3v63AncdBxkHh2Y8QyKBf9VljwGY0dKz78nh8E19wxHul/UVgBe896Vs3dpxEHI5rNz1HwCn85te/eSxIhy5OEhQcHGeCnvNzrr7qpmd55OEdB+kcv+TF0yTh6EKH8NH2fq9i8eWAHDnHEy8rKatbQdrBDk7Oypterh3OYwv54aNMgoNVafHsz8+SF8xsNVabfK94B5rgUu16cpHzV155ZSu7djcyeREMC8fxfeBkaxOs6BvMgm/peDY+3udteuXRLe3wkfByuEZXtvXnsp071BfP+byDnKCSPioZQlIHCPbWCjOBVvviNP5E9ozxdrJiG/3k0Ta4osFXyvms12N1/Xnpub7O+xm1sVg69mQD3gJ5xk30Iiv613lvMad+DnbVtidweEcf7y2csb/1rpc/e6Km72JLJhHa0Sf9iq/xOGOkbNtu7pO+P/Wjw66SPsnYdp5EDh7ug6H7YZ17Qa12u+jr8+enJ+NnYNNw5XuLwAree9S1bnrOR56A59wh6HGCzuMInJcj6MCUc44owZJzCL16yTUaCV34cJLqBIHkHLqVXzmv/jKVqq/WYzVtKxBvbZzff/CgfiY0DpGjFHQSuBO8yRV4ybUi4bg4QUmZhKfzONPUJTCnDTrOEm3aZpXlugLdFEA5WskXgBS2D7+ubU/y0TrYRG6cMxlScI6uyn/9m19vvv7t14Wra3X6S6IrnKNHbHFduDbm6MJfe3yiQ31VZ78BrY2j9LRFfv9+HbDH06RJnVW363vTewrRAe/YSZbzVx68UmPh7GQE7l09S7kpmOPhkIIF/jVm/Ora9Gtn6IyB2JVHFnTX99rVjk9jUnrfH+PKefXl6UmNr+LVwRA+ZWu/+Bgd0RRPBf2tZuhyD9ExEyG60Mt4jM3y8Ei/5FoeWuehlc84xNbQqKcTfnK2280yYXGf5p6sXYgYsvK9RWAF7z3pWo5lOKnhNDgrN78buo6HY4XKaSjnCJSX45ocKmfGWcRxyNHIOQ3tpOTO44zk2tNDsAnvR0ePyrloX3qi6SCmPfokPNBYmVdApm9vJ3Ocv/nNbypYCtp0oFeS6+iFj4R3ylzTT9IuctHObYug/6CJg9cmvAQ6h+1KNLW121hlAsWOHNri4yjd+vvefQuctpZ6+sNEQMIzDt5kpWS0TbEtvOT4Rz/Xs55zW7y1x1t/yOu9Bh9Z807CvftVr42g7XsDEsSVJTnX/qEdGmPCBMLz2MOjzcOz0ff4xW707KNb+ETfevzQLziWfmfnm69Pvq5n79nu9tlx7aM7HvAXRPGRYJ0X+CKjyjLp7MljvqIWTWGp/41d2MTAHhN1uS0c2GlDZ/rAOXzokXGPpnjvvIiI1hHb07b6oevojG94sNM5eZJr7dDhE14mE76cZ6XvBgIreO9RP3OmbmwOkhfKqtJNLygIfs45Cs5BzgHEoXAQziUOQULHIeU8DgldaNTF+ThHk0AtJ9fq2+rge4++t5WBt3oJP+2USZyp8+3qZlrBxmFXfQdsbaOb9uf1sThBjHO7cLBH3lbuQIUOVmnHhqTgEBq2olNOZzgqc9BDHV7wvFerwYGj8gS4wn2yqx4L9CQqNuGLX/qm2vQqWbmUPIGQTHK0jY7R27UjtPTXPvawpa77xbgS0P1RHwfrgJL26vFI4BAqXKvHxypQwDX2lElsMIbkxqcUG7SNjcrpZWZXz3Dp3s930TiStGdvZNMnyZjJKlxZ8IGDVG2miYgy/KAbGtfVv32vKJ/lm1CGJu2Dv/GOPrwiE72y2eborW3OyQ2NtlLahS8c0XknxOQY1trPOnXTle0pAit470nH5saPg6i8P+frOSrnaQWnnKMox5Rny70a4gAcnBSaBFa0zvGIE0HnPM6Cs3GNji6u8ZDwQ6ds6DUcY8q0kyrPql8A84a649Fw/pxieNFJwsMRWVXYvOgo4RsZAvlZBwR1dEoKzVzOHrLQ4WfFf//kfsmjC51Kr+0voHGoj8bPnk6rzPzYSnjH+ZOZLVh1bCFPuQmXc3LlOY+e0T19H95ySX14OXewJxhqF94wPrl/8V3wzaJ+KMb2bGSQHbl01d6hPGs+k5Lzk7GDIvjqG7RoaiLYE0tvV2ukHA8JLtpEd23Jjh3RC33kz7l2xowdgMjc1dln7+0WHHf/mCiW/j1Jih3KYVV1PS7pU/j1uwP0UZbykt87Ds61pT9dcpSd3cfO8UuujRQ8tJHYj89cX3r1S3TREa0xutL+I7CC9570sZvcDX4qUAqq/fJKnAoHoV7OgRbtFJTiLMChDj8OgbNIO2Vx4nEiaNTnWvs4GbIc6hzKHeWQesXl2ioCH8kb2WVLOztlrukcftG96NoJDudlgpCADY/h+AYPASKOcazSIrMEt92hCZ/UKT85udjyjC7RQa4s1/UZ727MJhIFDBrAwiOB4JrVpethx8WkCM9Zzy1+08Qj+KcPkhOvvZQy7fFzDVO5Aw+7I7GBHY/Ud3+4NkaiX5tWmbfNjTtBkV31EcF+DECGtmRob5KQRKZktW61XBOaqc/UB0/tycbDeMkYVmZyIZe0iZ6u793vlX5/MUrZ6l7pcYnGYw7l7hvtZxvJh4mj9KFnf9Y75e6xrLbhm0RHSTsJL8du2SwvdspDN7c3+QqN+owd54WVTyEsr17Y7fuf1c170sMcgJs8zx9dx7nk5pdzMrPj4wg4uzgLDkBbCX0coXPlnEdSHJFydA50cVpoOTbONnVoi3/n6OPwwiOy1bEh+pKXAw91rqO7gGu7PMkKOwl9+02WpfixPDQjwI2JgDL88eKXySM3eER3jKKLXDt1bNL+UQtXLinDQyBIP+1OtHKNToKn9tGpCvtPsCPbIZGRQ5v0gf7IhAlvNAkK2qmT1Pn8c+yR45GkXcntl9uil3Ipugjm+pA9AnW99X0w3pbOY5HdwJ22+MCHfvJgmnLy5zJ0El2swH3drPNa0Xdf1i++mQwI4og74OqZ+vx37fpcBNyvH47HTdEpjzjokz5KHxYePclhs2vyc0Q3vOAkl+Roc67OUbpP752Ejz7Shnz2p5zNdj5W2n8ELjzx/tu61xbGCdRHXXoVXg7l0cVqMI6GUw49UHLjx1HkOo7RNV5SAknaxclU5cRLOQdj6zdO6DG+/etaZODJAaGTnHOwnLy6WW9OWBl9Bj+BkvMbK+t5S1x9eEa265OTx4ObVXUCfXjOwTo8YObctiQdXMsl7VzLZ4edNspLUQFvspWz5eThJDe5Yi96NuLvwNM1+eqi05ynjkxJmyTnyuWZBDjXRwl4aRee1Q+tq7r0EfnRIbQlr3dW9NE2SLfe6PMc2ga7a6twfB1VH2WniVDxbd2dwyJjMbLhFRvwYZfvGPDsvXYCsrKecGGLZMQJ4pK2DvoU7o0//g7l+iuPcejhUJdz7dMP4acu5eTEXnTOU0ZvCa0UPtEVbejR5Br/2g24d9FHxWD92WsEVvDek+6No3DbO+d8cnNzLgkMdaPvBG9OIo4ifLR3HoeSes5LuWvBVS6RlfMEB7nggBf54VnbyNOb2JGZrohMTss53tpeHMPphz6BN9dPyr3AZoUee8je+GHGCuADO/xcX6zih1OFXRJdXAu2SXnqyz56D94j4AQbtIJF+iYrT7wSBPBWn74KHzk+6uVkzHKKdwcg52gc6YNg6Y19esOXHJ9ZdyTRw3W1Z0fjnyBCD+2knM8BsGzqbfDYglZ7P+NababfWQ+v2OU6ZXSOHO1hspXZQU49evoacyXT2+teVPQCXX9U0aOk0KKJPVUGN3LZ5jBpPLkI2ugFbfrDzmRLmXENr5I5BWLX9KEXnZ1L8ln/XKcsbdAqi47hlz5U50CfNgK4vq7HFiVt/dlnBFbw3qPerRu5b3pmcRxucDc+B+PaeY7c/Gi1lYq+v3YSferiRLVNu+RFdLp5bJWD/jGZ/ZywdLBSsCJrx8xBldxexZZ+dLXKntttZXPoAtzFqpcO1I3OpVOVDZrdZ9jkJTgPMy+Crbo2vdmExwickRHH6aUr59pJ9Y1jvZ0bPQa6BXDpmM8G4zV0uVhJDfkjgMECDTxzRFba5pqs6JDztEEriARrdPpHmVzQw0fKFrPzKmnboueWrvuj9BVIqvXQITSKql3/AIdzAU8+yyyaKRhHV+3pDge2zHQ5Tx4c0Ali5wejP1qtalt8fW2t4I1fgimcO4AL4sXT9wtMP+YTDBOw8cqRviCrxm8H75wrp18O5VJ0r4spuOc6NNolkCsjT7+x9cEr4ytSlZc+RxeTzJnPOt8vBFbw3pP+dBOXM+xnrNtXf/PrQ1Pgnh0N8znrpF1ngpbjkJxLrtFxQDkn34dtXOeIY9Mm25g+LiZ5Nn/EgfXb6Xij9yKRt7XlcXAJOPiSM2w92jx6dBGA6TOnscK+CKh+ZHo3gM/Xu+3n6yF3YGBF7lp9MCeXjj4jLVl5z+3RnaL3dav9Gd3oGqzYP+Obcny1x0+98uAR+vBKPpdrmzbwldRH/wSX6qvpq2jJqKMfb0SfmZ8gljEAnTwOCP/oI7d9bddGXfTPpGGmD27GsvrZ7pkudswyUkYnX55DDr2lwuCwbcrEyljtOs+9z4y7mjSOyULkhQf981gjYzs5GeRG31mX2CQPjs4dmShFBpyyQ2BnK7qHH53mPqv7qb4mYIx/dXYMVtp/BFbw3pM+dtPWjZ03Y6eAzOHOjozJnAVnxEFolzI5ekl5zuOAqmJa4cXppN618zgZzs4WbD17PBzPeysocKwtZ3Z6zvOmdrY9vU2cVRq+g/fQOfokj/z5WpC+rBzNrv5zO+exy1b6wQG7LlbI9KCXiQkc58AWG9kjld69emQfPNKWDjkik9xgr61zefQtpv0HrXL1kvPoLbj4iGASmUloSq8OCOFDN/IcymolyobeZo9e+JBVtvYLZUXfQSn6oAtveYKy8uCTdnL8Y0PGBlr8Qpdz5ZLyYKC9LW6h+f7ZeBO92vXqv9pqA8/6StjDzWF2N2ABl/7SGO3oUEd/MYtzPHLAWMq1PCnndHKOn5Q8dHiW/pvHafyM6m7CC73kXCre/eMku7yLYP3ZOwQu7uS9M+27ZZAbdutI87nY/lrR3OhBBG0OM3/tHCnbzed2sxOa28w0JgXqyOWoOZasJvI2b1wSWeEpz/Pi+oIQz52nN8bx3E0jMD++6kZ3dOTLR8ZK6Lx/59qXsxwe+oGNixfU8BtOdazMtXXs0qAbfKP5uK4yfOvLX0bAG+0np9oOO5OVbKujC9bOkwqvKRCnLo46bQRNyTWa0M1locVTkuNTWPdOBj62meWpK54CjtXk9Nn9YtJ8IkeubYJYfc571ql/8914GFiPSQNZ5CTtjtPUz23YGDlpJw8fbdDjRaeyYxrfsa9W3NnRqOfZY7W61aZPyMMjugejlKWcDjknPyn9UnX9636pi86RkXaupdjtPGVpK4+t+EQfExa/wrbS/iOwgvee9PHWAfRqKg6OI+UEHGji0NQr4wCUcy5SnEQcQ/imnJNwnms8ksLPKjQOJfLwnz+TKliQoV47x+z8uK98NWZkRHbkyT23FmhPT4deo2w4M8F6fkEt365G98PDQePcBGO8tDYCLh55aS3mkXEhb+gd22Bcbzb35GNQDizZmJQXomY7YFUr8P4Fs+AxZI0IQsdgi9a5svlQ5gju6pLo4IhcdNLcHl92SOHl7Xjn6OgVPq6dZ8ygMZ7Yhy67EMVs+pPVrLZS5Kff6TfzxUtd6MIKzWxLztE5315PjzjUPbj/YIsDnYtP46T+pMbowHH7AL+D8vyRPjrNx2V6RQcygqHx7zy2o5kTHXbrtQ+9Om2SO9/ysHXu19gOTuunR2e+63w/EVjBe0/6tZxPPzN2/r1Xv1eO1HNJTlCZlBufU8gWqm3SJHQcgryc246DmZ1ReGo7n3PS944ugnMcEL6ex6GlUwI4R6gOHS09746e944Hn5m/8xzUE6SlOeCGPnUCt1W6IGMbXnJOB8cI4GMFmRfZ0PfituiHzIFVnCadS29vdecHPvobydDDGC176ll4b7F6C1q9gGnbPXroLwk+0Qn/yEOnTpmEr0NCA0t2xX516f/SobGLzvSDhyNtwpt8NqU87Wd9ooNAX/b1ljldtKvDZ7vPx0e3zo7GJC24qEfriF3OyZInuY78uQwNHuGnjn54wQrOrgs3Hx/rXQT1Uj0S2JEzKi6w9fjGJwm29kw6K5Oim+vgE53nd0rUK5fCL23lwSF80WnvnlLnwF/KdfGq3aTxtbCxrYjWn71FYAXvPelaTtsNb7uZE6jnsKdjOzdOUR6nwAEcb0ZgAYGVI2egPrnyvFAzw6QtuhyhD2+0ztFxmnGYPrIznn1fPNNM2zic2ZEVj2k7OnLloY+sBNqh04XTTyC2jR79xpY4Jz9sxSPBffAbznHwGs6ZnmPlPoJ1bPINXuFrOzzlKaNrbPIZ/CTbm3jWm+qeznYd+mAydLmQ7xp/B1wlvB0CtjEgae/ASwCGlcM5Oc7VOcILvzqO79W3khlH6uuN7J4UaIcveZGTc3WCtyPPzNGon3dcTFYim77qtZXo5ghPdMFCuWv5lm+PV9ehC5/ks62ll6B+/37ZSk5hBq8d3MjBsyouum2re3SRX5bwFnCPDsZOBBr88jJZbEvbmU9sxUMbdc5DQ2d9qU55TUjP7ts8GuNpGmfhv/L9Q2AF7z3p03IW08w9jtYN7jzO2U0/OwWOwrXcIcVhVH52EXzQSZySNALxRQBUhkcCmDwOZ7zXO1aUCWJxPnHerrXxRjZ9rZrC08pQGX5xZqXDtK0Y/WMLfufnFzwixwpdnYAvx09wl0b55K2rdKzmxjPzsUWOVwW+44vJCdJg6zx64F+6JQBNq/WsDGfa8CCj2k2ToWAKC+ccOZ3lVu0cOXnSsGsE7lzLo7t6uBbmcPelJoKrF9ZaVx+fOuwgOeuIj+vY5iW8cyv+qdz2OVl4xibBMHbROTyVaVxbv9PLWOrVae8gj42OJGXwkEKjzJE+UoePyUgeB9SX5nSfW4HXtfsBpvnX4yMTEvok5ZycJGXbMdRzSHLTR2hTj7buoalNeLFjy984PTjfPpqZZYWfsmrbGIZm5fuLwAree9S3nIIk+HEKrh1uak4sX8ThDXCOU0p9nE7K4nA4kfANv+TFoP+gkyKLM/UxlnKY7cDpZEWXVR2ZqY+zmtsnQOUXySqAH9/bBihto3eeSQvIUsrrIo6tc/p7Fv74atskxkoQXgn4MBx2jZV9B+x79wpLP6yRSQV8S59pAkAH9pCnLpgLjGzTVl+wT30Fmt4WF5xm+/BSn/TP/tk/27zy6iubL/+/L7fb6wnEc1+kr6JD6shPH6VdbeFPb80HR22iX+zBj06SMvrWqrtW32MiyC4pfWvSp41dIVvReO7y83HDlMvJ0d6xxa93XiIfnbEWWtewMt6qf6bf9Q7Npse/gO2uwUtdArq2DpMrvNJHeM8HvdgQXbZY7OxM4T3TwSVt/JzZ+E2zgqv+oDeZkrSTIte1cynyTXycZ3u/KtefvUbgwhvstZn7bxxH4IbOqjbPyNzonA8nFufnOqsX7VxLHIZDmcN5ytO2HETTpR6N8uhADxOF3//93y+n6pxznT97G1qynWtPBr2sgpT53DS9HfNEII5LnralaDtEvNRFPzkccj30vQj8rgef4SRji7LNZtA5x5NOdBG45bbNvQjFjkxMIps8vCTyHa6tUrO7IICy2xdtsB2N3RH8nJMb/cNXmz/4X/5g8wd/8Aeb//bf/tvmV1/9qujwwX+WmfbKtE9dgncFNxOGfu4u16YCcQdX11LskTuqr3bGDBn1wppJ1Igvm+OTi/HlmbfkxaoKjD4VcD5+7EMAis1oZt3prY6NZEvy6EaXkt27TKEpQr3YL1GGb2Ep2OnXHr8wj01kwSLJdZU1f7i5Rk8H+pEZuXJl6ugcPcMvZSk/OB/9PO9q4R9+9M2YiJ3aopGbDJ1sxm/DZ5crsla+nwis4L0n/eoGTgCJSSkTZDgShxtfznnEUSlDG0ehfcqch9a5tuhylOPoAKVMO3qQ+Xu/93ubV7/3agXyCuAJch0Uoucuz9qq9c1RDx7Uoa0tYbkjOsnJzHN5uqTMi24+spZrzjv1yrSxssokBx+JLo7Qco4OyUqITgJ3dHFdjrxtCi368FQWXJL7jW/8YOXAjz76xCHBPfpEDzzRu37lwSubf/6//vNq9z//5/+sdtqgcbBhzsNDOZ0TPJ2zgw4mImV740GPgWqptLUJXyn5VlYHk0xKbIOzmR3KfIwJ5ofnFzsk6ua+yA5A+sab3pEFG5MbdkrkOsiYD5Oq/KKYpTWej6UJn5mPSYtVeXSa2xQuPRFjS/BEAweHdqHLefozdPJgEh5pry42ycMDnX6XMvFSj0/koknbIlx/9hqBFbz3qHvjCKy+3cSuBbHTB48HgTg+9eWk+qafb/44BvCg54ASGGbI0OEROjw4GcGAYyFfrlyezzhzONrK8Y5jirNSvuntZUHFd0qbDPz2t7/dOiu0Dr8cJY/+2pas04vVd+RHJvok9K6TC+yCvRTdgwddEuzKiXrBq58/C3J4ONCTOSc2ovU2vdCHN34S+VZM1U6gqR9bGfbBfdYfrS9e+fLLLysA1+r/wVj9q3PAFC+J3Ogjd2RVyU47IvorfUUv2MeW+XxblpVx46hf6UkiXSOTLvhVXetzWG9WDTr8Sud+Cz3Y0dvLXtLJwePPt+nPvuAb2zKGlCfA1aTNm/2bi1UqehPE3f4i271TOvXjklKgbcWfLYVfB03XxgP7StfGHY8cyp0nRX/XzqXYgi4y1LmeaYJtxpxr9XX0L7aFPvJWvp8IrOC9J/3qhk2AZRKnVSu7e8ebe2fj97I5SXQcDUfEMSiTlHMaOZfn2rk2Dm3SLnmcjes4Fw6NgxEk1DvUpX0cjDwHGvV089KQHJ9sVQvenhFL5fD7+53DU/vU4RmHqozs1KMPFsrDK3xmTNIu+lt1Z8u8noPaZuY028bIdx0b8cNbigzBDj71xPV84KuOPDsGVpvaa2syIfjAgyzfHqb+V//jV1Xm3MrSUfzPBoaxVxu88K7nuAKG/70Cr8Ddz9pLSXhNW7IeB0h0iU2uS78eDxXgp3FUevTHq0puT2TSXn3O6RnewcCKnY7aSrNdka0u9HjlqJV790dsT10mImeC/zTefS0qXvSYk3vo5HBMhPR3AjXaWY/Yoty5fOY3l4fW+Axt7MTTufL0nzLtXatLHjq0Dte1w3AxTygd15/9RGAF7z3p19zAcqsKgcFzVFuPHJIbOw6A04iTUpZDW6l49IopDgI9OnkOkwUJDYeiHRpBxnXl/caxVd2c0IU+bfFVxkE6P/z661oNWhnef3R/83u//3sVkNHbOiXfEV7KpZThIeGpzqGM/Y7YhgaP3UM7NLFH+23wfqWfc+O7fav6ImDjlZTz4B6+eFfqIEVOBdcOtrFHOyk2nN67WOVV+fRsdiwnLwItWUmZZLhOucANb7LVp0599E5ZVU5/0l/ojDkTrsdo+wdbanXfn63XJkf4wyFY6Dvn+Z585wmYJe/sYEx4evKBR7WftsXRw0p5TWLhql5/Nh7Rvd6SNzGpN8wvxoGdD7xhgg98tIFXxheM5j5FX20y6er7LOWwSX3pNk3w8EqfyOd6bZLUsS15yuWZmM30c/063y8EVvDek/50Q3MkFbQfPBg/7HE2trvjLDmEh/fGTxjms7ecgEAoOXdsnY2g0t8LHpjwIgdNnGStbnpbMqtEW7lWLfRBR7bEWTonR5LTXcJbwls5Ok7z1VderY8QxQ51dPYc3BFnhd7BuaJVHln4SNFdrk5CG/zSRj052qkLnwTv7er76GIrFR90oQ2PyIyeyctG33GOR3/T2vnReT0GsLrO6hhfCd8Ekay26Va2Hl2sBPHPtrg2rq3cE9hThycd/CNfCnZWogeNUexCO+seu7RTLoBL9dy4TsaWPR3xre/St7vSv9ZVdnWQPD0f/SE4lv49JorhNLkqrHqHpuT31+fOuhlzcDJ2K3Xsy5Z49U92gXoyoaxsNh47UMPLy3bn9wYD8tDhX5j2GDUW0w/q0LAt+LBdqn7qMVm2D+2qD8KPHXg58NlNwabsm7bM0W4xuJiv7TZf13uEwAree9KZbmrJTXz/3r3N1/0ilJucE+EsHALptuzUm8/j4zB185d3H5/jRssZxIHEuSg/Ppu+3KU/DpT6w9PhcBLY68Wh/gxunHp0jb5pG+fj2kF2Dk7Ry1S+OU6dZ+Ds4OTY54hDk9NTnRQ7wleuHm95zlOfcu3JlePhqJXqgzEZqbL+sRVvyHuWjVb7pLQLb+V6yiQmtPrAlmx9trh1Q58U+a7xy7UcXeRFllzZYzJ7QhRc1BVdAhydpvP65jGTBn3Rk4fo8xhe6kzEJn3n8+hWbc57InF0sPF2Nfmx0wts0UmwU6eNJI9N+MW2BEc04bN9vACDHtupM7mocxjqIzRWBqE5wgAAIABJREFUz80fH2P0oMeGazzuH4xv5KsgfTw+llZ1ec7feNObTvpFci6ln1zHptjALocU25KnPDR01x6/0Bifxvuc1K20/wg83uv7b+/eWpgb3M2dFRBnbEVVzqS+RnQ4SNcOzqZW1g8unCg+PnaSj/nUgq3LOA8rn3PfC14haFOTAaDOjkpVAmscTRwRHrMTijPDQ7kUWzjXBHzl5Ugf3B9vik+rdzzKlnbs4UV2eEauOvT0Iye6yNFvZU/b1JyhcvU1KTl+PEDjyX46+PYuvNDHiWYywfmrE+SzfetaQlv61q+XDb1mPtE1edrEbuWOlOPHTnrhmzTbqC/tmujL9EMFgmn3RWCTjtsmOpUN2RLWXz0hQWfspY1Amsc2sRNNPc8urqOvawxO33YX3Ytfy6f3bMeMQ+i0Uy7PoS6PA+prd/V77xzV9yHo82zV9y4OLHJk+zwTq7qnfKzufDwGCubRgZ1kJ6l35P6Yy52nXjvn0du5NPeX6/TTXG8npb7CdeJRjdefvUZgBe89696smASHuvGtDK2ojjflcOJYOAuOgBPwPeR183vByL9e9cRBgMh5Hdsf6BjBzkpUEkTigOaAEnlFJFD1Si5OKLzRaZ/r6MaOyI1jY1cCYjnV/jhSeKDHC53cEXnO1aMNHZmcq7IKXm2vyQLsQuvaChlNdhaKR2/R054chzZSzulCBvmpm+U9OhiPLsiwKp3bOtcv9R/+XnA7GG/Ey/HBV5pzugUrfSIFE3UJatrkY1ml29QPxtNZBx912m0TLHviwc7U1MSkJwwmLLspcq22C78aE+MFNdclJ+Pw9Gz7K1nBFr8Zx22bSbfqt51HPtqZXFhZyw/77Xi8TDiUlb3dn+jp6t5IPyqjX/Xn0ejP9K1xQZfYVFj22/7ROTma8HKO/27fFUHGYo+nmbdzMiKnMGHztifCYeX7iMAK3nvSq3EGtYVZjnk4Ri+KlfOpX9/q58H9Qwtueu3KoR+NoMYBxEk6nx1KHMXsQGzbSSmrNtPqUV14Cl54y62onUsJmKGNTO4NHbl2EOa8zgVnX3V6ePHZZzyjC5rSp4MR/uqVsTl00amCs7eL/aRpv91dwbQnA6HHl87lrK0um2e542migF5dUoJ32d7P1PFCJ8kdmTDMbfOcOIE9z8j56dipn0v35lPPsbHuXRcy8PZ8uZK5lEok3WezLtVvHezQRB801Uetd50n4JPRgVs5WlibHBwfjMcZeG15mPidnlR92VY78N1u2jXyneCz/FJ6woys0qODa+qHbsM+7eulutZVsPaZ7mqrn1pfbaussQmv6qv+2BmbHDWR6olfyqptj4OSP62gS4cpUOPpiEy45Ehd8vByTZbxl7L5hdD0afRe+X4isIL3nvVr3egJAtk+tJo7GwFCvRueo+QAOIoEIasMTtxLZ1IcjfM4EG2cbwORMNdv5KKL4yEjjiVtw1Pb+cU19VLalH5sqKBttTu+cKUCeP+whXPf1hUZ5ApMaZvyOLKsRmql3tv/Ah97BQ+fFecABeu8BOcjamjw3k0lD5a95SwEKpOTnUMZHF2z+7HU/aTMFnbpj2MHl9meR+ePahJGPwcauN87uDf2rQXBzUn92Ax+pV/vHLAPxjDQ5mgzvm8cTdFNkyNtS1eTIONHUJt2MFIfGbFJm7JT+6xi4dD4kONcjm7u89Ihz9t7srFdPPYjmHn7PfjQ4aqEnt3GSX4MhO3ZFTKOS8+ePFl5xwb6scvhvOzqwO5eSVlNhHxTXK+AlTuX8CJDIlM5fuxWN9uAzjG31w5t9Vvz1wYPtMrlW779Va5o8Flp/xFYwXtP+piDcGNLCXqn7Ugq0B0M58T5xAGhdbNndVmO4Px0vP18PLacvdU8O2C8EqzLKeVjTf22Mh7emOZA8HYIGpxN5NWz7CnQV5sp4JVOHVjYQl9y48w4rTixYjrxQhO5cWLhPxRAfPEssRzm9HEgvB1si3OMXHzjgAuH/mUwk50ELPwcaUumNtoqi06P2cg5+2nQdvboawJ1OFbK8Ku3+K1iPW/1xTu9ctc3Ehsd6uVJCZixQd3ZwVn1cbUzAegfV0Ej0dHz4WPBocuKdgpM9dEqgYJtHbDpFPu1L7xO+iWtnihFz/BDo8wPb0h0qO/5Hpe1Ii/bvRHf+GQrfrazGvefYOzSrkwmrsZR+kJd3Sd9D7Cj7Jb7ula/3HXS7yhMdmkXHjWROhs7J/SmH3ukYFkXLaPs7HGOR67Rlt0ddMNDWzSpV+5wHSxcm4jXROX86Bv9H/kr3z8EVvDekz7dOp5e1bi5OStBiDPKt1rVqmtaoZYT6WUOR1HfOZ2t9HZEIConMq2OOBBBhRx5VuzZfs0EgV5zgCm4OaFpZR+nNHcFx6p8fnNZvdVObKOT80E3nk/SyzW5peMUcNiawF02tf41MejgqU3qTFIiQy7hHb7K6uit89qS7ccI6NRFl2pc+l8EVtu2Mz7RndzzU9/21d+v7Ze4fFvc8ZgAzB/1sgUOc19alokVmaVr76LQA2/8pAo6/bno9KH+Kpp+nBG94Vu8OnDgJdVLaZEzfc85e8qmyTa4e1fg5Gx8kx75SWTa7jcgjNOeixRu0dsYpg9agRt/dfOxtblxxz965Kdv0y7lmZiYeKV92Vc76CNQwha9gx1y+kj0KfqaCBzUV76qUxZ+6NHlWjvnuU774Jz6EjBtt7tGi1eOlGWXwiTHown1K+0/Ait470kfxwkk2HFMuck5aOf1lng7wQpiJ/3MeCdIb3m1w9BeQBEcONjU1wo8AT0rmOmjLNpZEeymOK+EsTiymS4yLq2bvupSfZxq7E0bOT7J0bn2b55QZHUa+UWzE7hnPqGbc+Eycufy+Vz9CKtdGic+Fc48yBRwK6j1s+0E4OiDU+nffaQ+z7TRJLE5Tj581dX5HISmoDjbRK85ELm+4N4BaScwRXby2DbrPtfhbxISG6OfdoKo1Xl4pN1uXnpNdld9P/qAk3pyCpvie/HpjMibec49Vnpof+qRwoX1M81jbdO/XVgyc09N43Ju4zx0u+ehu6o+2KzgHaT2Oz84T4/vt53LuoXAQmAhsBBYCOwNAmt/ZW+6chmyEFgILAQWAt8VBFbw/q709LJzIbAQWAgsBPYGgRW896YrlyELgYXAQmAh8F1BYAXv70pPX9POr776avPTn/7Z5vXX/8X2+MlP/nTzxRdfXJPD3SF7//2/KBvZfFfT55//YvP223+y7Svnd7Gv6G2c7aaPP/5o86Mf/dHWvrfe+sPNz3724S7ZS3m92zfuKWPuSWkfxuST7Ft1zw+BFbyfH5Z7wYkT/fzzzzeffvq3my+++MfNZ5/9fQWDt9/+481dDnK7nfPZZz+/M0FgV/dcs0Fg+/GPf1x99fnn/1BVd62vBG2BbjcJ3CaSb731VtlnPL7zzn+oAPiyB3ATKPeSpF/o/rOf/ecNm1K+a+8+jMldm9b17SGwgvftYXvnOH/66SflRN95553Nm2/+oPR//fXXN++9914FcI5nH1J2F1577bU7bc7777+/eeutH27efvudsoM97777bvWVvnzZk4Cdycdlun700UebMf7+fFv9k5+8WzZ/9NFfbctexhP6GWcffPCfNhlnP/rRjzfvvvsfN4L07mRlX8bky9gX+6rTCt772rPPYBfnYoWQYBAWcT5ffvlliu50bqX32mvf/4add8koKzsBwKp7ToL5ZX0407ws51ag9DfuLkt2f+z87Cbjkf0v807Qe+/9efWDycdlaffRxj6MycvsXGW3h8AK3reH7d5wto0uvfHGG3feJrsHgp4tzLucvvjil6W+QMbx5x0FAXE3MLysduoDK+mbJv0nKGZSedP2L5L+l78c/ZadLbrsy5h8kbh+F2Wv4P1d7PUb2pzty90V+Q3ZvHByQc0LQbYur1oRvXAlr6lAArRnwj/4wQ9qlWfFLaDdlWfedglumgQ6tnv2fdcSvT3OsNOQ8bdPY/Ku9cdd13cF77veg7esv1WdVd5dX6mCiS1WPM+y2rtlmG/MPlvGAuBsz9iu/aJWczdm+pI3sOI2+RL8ZptfcrVLPf01dkjeqOfg0XmfxmRsWvm3g8D6bvNvB+c7KYWjtFIQuOdtvrtojLeTv/rqy83HH//1XVT/Gzpn5WbVPadsJ//iF998e3umu2vnVqgJdHdxIkn3Mf7+Zrvdv29j8q6Nqbuu7wred70Hb0l/ziaB+6oXim5J9K2w/fDDv6wXnN588199g78yKzmr1ruSEryv0vcuPg++yhbjcHz++Y07N/ky6fBow+7Vxx//zXa7nK37Niav6r9VfjsIrOB9O7jeWa62Jscq4av6rPddX3GnI/IZ6FzLBQSrH3V3LdjpFwH8k08+eWwLWbCwRbu7Ip/tvkvnAp/n3CaQd23FTW/666tPP/27b4yxfRuTd2lc7YOu65n3PvTic7KB4/e2Mudve3lfAvdzguelY+PFO5MtQSLJhES/3fWXC9mzL4HbvXTXJocZTyt/eRFYK++Xt2++dc3yxRIE+/KM3XQXVz+7NuzTtQAtKHz44YcV6Nimj/bhuf6YQI5JiW1zH4XbTT4H/rJOMH1CQzK5uuxRjUc0d+2lu1381/WLRWD9nveLxX9JXwgsBBYCC4GFwI0RWNvmN4ZsNVgILAQWAguBhcCLRWAF7xeL/5K+EFgILAQWAguBGyOwgveNIVsNFgILgYXAQmAh8GIRWMH7xeK/pC8EFgILgYXAQuDGCKzgfWPIVoOFwEJgIbAQWAi8WARW8H6x+C/pC4GFwEJgIbAQuDECK3jfGLLVYCGwEFgILAQWAi8WgRW8Xyz+S/pCYCGwEFgILARujMAK3jeGbDVYCCwEFgILgYXAi0VgBe8Xi/+SvhBYCCwEFgILgRsjsIL3jSFbDRYCC4GFwEJgIfBiEVjB+8Xiv6QvBBYCC4GFwELgxgis4H1jyFaDhcBCYCGwEFgIvFgEVvB+sfgv6QuBhcBCYCGwELgxAit43xiy1eCmCPzkJ39av8fsN5mfdPjtY/U/+9mHNxXxrdLT8623/rB0zW81//Snf/bS6w2kXT2/+OKLzdtv/0n97nRAZJM++zbT++//xcZxWaJLcL6sfpUtBL6LCBx/F41eNn+7CPzsZ//5MYGc8aeffrL5/PN/2Lz22muP1X3xxT8+dv0yXrz//vulVnQVzD/++KPNe+/9+cuo7lany/TUD5999vPNZvPeRPcP2/Nv64QeH3zwn74tcUvOQuDOI7BW3ne+C5cB3zYCX3311ea1177/bYvdW3lW/zB9660f7q2Ny7CFwPNGYAXv543o4vfMCOxum9s+zzZ6tqlzjdZ2b7bhd7dcBYR5u157q+OnJSvAmS/+tpql6CfPOR1/9KM/qno6zNu7u7x2t6dDj3/s0OaqhD505Mz2XLa1LCCi1w7fXT2VOyR1eEjztnlkkoUm8oNJNeg/6S808E7bpz0GGbr9eGZ16fnMn467fNk7YxnbZ2azbSknH22wZ6e+yjjQBm/1KUN/mQ7hufKFwG0jsIL3bSO8+P/OCHzyySebjz/+m41t6rfffqeCAif6zjvvVJntao48wYyjffvtP94I4J999vdF8847/6Ece2guU0pAHkHwzWpDni1/TlsgevPNH1S5POc/+cm7m08//dtiRw+PAiRb0QmG+GSLnd70SqKr68j60Y8uD2LasZE+aOEgUCXghN9VOb67etI3W/3qdh9vzLw++uijzQcffFCybW/DMYEfHV0+/PAvt/rh+ySsZ94///nPNz/4wQ/mom+cwwkdfGM/+bP9MII7W4InHZTfNOHz5ptjHGQ7f0wMXi/e+L/77n8sDK5r5011WPQLgSchsIL3k9BZdS8FAoL066+/Xrr8+McjuHGcCXQCqGfnv/jFL4qGUxcQBZu0Q4NegLkqCVDoE9DQafP6629sPvvss6uaXVoeR//xx3+9rXdOzznoqYxNsWfboE8EEoeAHRo64kXnbyPpAxMWiR5wCiawHkHyQj96ontaEpRNmmLXk+gF0bwjYTImpc9NbPCBS/TE0zgZAf3qHY2rZEYGPnjQdZ5kGFOZSFzFY5UvBG4LgRW8bwvZxfe5IWAFlBTnnes551wljlZwiRMPDccr0Ki/LAkOVuoCkQDrsIUqKNwkjZX0F5c+w6XTrvzZvsvkfP7551U8Bw4FVqHz5OCyts+rbFfH+Zl/7PnhDx9/Zr17fZkuVs4weVK/aqc+E7Fcz/wEcTS7k4BcW7XfJO3K8zyefLtAJgrziv8mfBftQuB5IbDeNn9eSC4+Lw0CgrjDc8nLUoL8bp2gm+12zlrAsuK86eL2q6++LNYmAVdtqV6lw65Orr/8cvB7WoC7rO23URZbdvXbvb5MF0H3OkH+srZzmb67LEWH6HgZzXXK8PHo5qOP/qp2b8LP5MBqf55YXIffolkI/K4IrOD9uyK42r90CHC0trrzjPe6Ctrq5pR3P8Jmq31eaT6NX2htq85b8E9rd1X9978/3mxPwLiK7kWVJ0AKoPNux3X0tYL99NO/+51VFzy/+OKX3+ATHZ5HcMVDfzrwHc/4P6zdnJuOtW8ougoWAjdEYG2b3xCwRf7yI2DVzJHHcUdj2+B5czhlc257XNBPMFKHxy6fuc1l55y8I8+EZxrb8I6bpGxZ5/lu2nqjmz1XpZtu91/F52nl8JZ29ct2/1XtbbePidZ4n+EquuuUe6Sgn3a3s3P9xhtvbNns9udVq/Ztg0tO6C2IW3lfNmm4pMkqWgg8VwRW8H6ucC5mLwMCXlKSvO0dx2z72rNKdXNwnvUVhAS8OHxt8RgBfGxdz/Q5z0rb9nbkkYNX3jhHa2Wv7L33Lr4QJTyelNPLMVap48UrtpAVWxO8lEvq8mUy4X2ZnsECfXQP/XVzExUvp8E42Mmf9HIg3p5D55n0dWVdRWeXw6rfBC2TlugAu7w8lz7epbmKb8rx8hgm+CpXZgLyvGyIrJUvBK6DwNo2vw5Ki+ZOISCY2IrlyK1OpayUOPmrkhfWBOoEXG3yZjVHrS7BbuaR4MWxO2y7a4d2vME+nr0LLj6OJYDcNHkxjT2zblZ+sSc5GgedvC2dIEXeZXoKPF7Cwpd+z7r9Czur2+g3y3J+WYKpds8rBaN5ZwMucEoizyQqNPrCBAhmT0pw0lZ/zrRzHzyp/apbCDxvBA7Oz8/PnzfTxW8hsBBYCFiJC5SC6rNMWBaCC4GFwNUIrG3zq7FZNQuBhcA1ELB1bEtZoE6yBW+VKmivwB1UVr4QeH4IrJX388NycVoIfGcRsMoWrOdt+t0t6+8sOMvwhcAtILCC9y2AulguBBYCC4GFwELgNhFY2+a3ie7ivRBYCCwEFgILgVtAYAXvWwB1sVwILAQWAguBhcBtIrCC922iu3gvBBYCC4GFwELgFhBYwfsWQF0sFwILgYXAQmAhcJsIrOB9m+gu3guBhcBCYCGwELgFBFbwvgVQF8uFwEJgIbAQWAjcJgIreN8muov3QmAhsBBYCCwEbgGBFbxvAdTFciGwEFgILAQWAreJwAret4nu4r0QWAgsBBYCC4FbQGAF71sAdbFcCCwEFgILgYXAbSKwgvdtort4LwQWAguBhcBC4BYQWMH7FkBdLBcCC4GFwEJgIXCbCKzgfZvoLt4LgYXAQmAhsBC4BQRW8L4FUBfLhcBCYCGwEFgI3CYCK3jfJrqL90JgIbAQWAgsBG4BgRW8bwHUxXIhsBBYCCwEFgK3icAK3reJ7uK9EFgILAQWAguBW0BgBe9bAHWxXAgsBBYCC4GFwG0isIL3baK7eC8EFgILgYXAQuAWEFjB+xZAXSwXAguBhcBCYCFwmwis4H2b6C7eC4GFwEJgIbAQuAUEVvC+BVAXy4XAQmAhsBBYCNwmAit43ya6i/dCYCGwEFgILARuAYEVvG8B1MVyIbAQWAgsBBYCt4nACt63ie7ivRBYCCwEFgILgVtAYAXvWwB1sVwILAQWAguBhcBtIrCC922i+wy8v/jii81nn/38GVquJguBhcBCYCHwXUHgmYP366//i02OgPWzn324LVP3ox/90ebjjz9K9d7msft5GPjWW3+4+fzzz5+ZFdzpc1mKnk+iuazd8yx7881/VWPk889/8VS20fcnP/nTx2hNbthw1SQn7R5rdAsXz1sOfm+//SfPpKn7DLbPkvSFtl999VUd8IavQzm9kiIn9fS9rC8//fSTam8yOqf33/+LLW/+IX1INlmX8Zrb755HTvRJjld400H5TXnvynL905/+2YYNv2uiE+yir/MZq12cZt1htdt2rv9ddXuZ2rOVT4T7nOYxahzN9ut3bYLtTfqLvLSb81m2c31ljM3xbaafz/UV/VM2t9nle6Pr82dM//Jf/m/nf/Zn/+e29Ycf/uX5v/7X//v5z3/+X7dl6tHNZdvKPTphOzufR8IHv2dNT2r/7/7dv32sz55VxrO2++ST/7twMk7+4i/+r6ey+aM/+vc1ptj05ZdfbumNJ2VXjavn2R9bod/CyXVxuUwVeP7pn/4fl1U9tcy4+Oijvyo69yw9fvGL/6eugyWs9YG6P/mTP666X/7yl+fa7srFS/840CTNvJThg1/6Vr0+v0li9+74mHk7N+7I+V0TTMjC73dNcAtGyWN7bEq5fMYJ3VznHL99TMFijjXO2ZuxpV/g49oBD2MpyfjE5zrpOmOFvPRf7pvLeGe8516Kbk9qcxmfq8qeeeW9O0P46KO/2vzoRz/evPXWD7dVH3zwnzavvfba5pNPPqmy3dnmPGMyWzIzyWxZg8xWnJv9m+lkRpXZ1O4MLLNXMzH8M9sx+zGrktAon1cUVdF/6DC33aWdZ3b0+fnPH9/mjt6RPdupjC5sca59bHYusQ2NZJYWm9HH7qrcbDaz/c6vStqyGz/nl+F5nf6Z5bHLyif6yecZ8K4uH33Elh/WOHna7BMmeL333p8Xm8vo8WOLY8Z4V67+mFdi1+mf2SY2zuMhusCQ7Oum3RUTnjDPbF+O524f469uxn531v/ZZ59tfvCDH1xXlS0dW4Ze71SZ67fffmfz5puD109+8m6VG+P6BK37Wnr99derLzN+lcHW/R6aIuw/ymcf8c477xS/jBlyv/jil4+tZub2l53Dj678zJx+/OMfF2/1v/jFL7Z+adcv7I4b1/BPf8NZm4wBMvSD66fxmvWZz2FML/h9/vk/bD7++K+rGj/leEswVI8O7sEfnfTpp3+7rdcu5VV5xR9+xdiOffEFIY9fyH2FNuMdTcZ87jn18VW79btjdL7v1OH1pMQesnf7VplxBBdJ/7/++huFW7AzlpKMhdmGlF+Wz2Plsnp89P9l43um1x/GEf+Ve2mufx7nzy14UxBwux1i8MVQRrs5P/vs72vQMUDHM/Q6yQDWaXjqEOCQaRDjibcBgo4snf7FF/9YdSkjR6crj2OaZYcuNOgEHLJyc+GtTN277/7HbfDFh/06mE7q3ZjaffjhxUB1E+pU9QYdfuSyQVKXdux5553/sOWFdzCmE165iZ+E45D1ejlm5xKZM57X6Z/hJIbDYZc2cTJ4vv/++8V79492dNVvcay50XZpXXP0+sBNCOtMAGda8jOWvvrqy81Pf/rTubrO4UcOPPG5Tv/g+7Of/ecaZxkPdIYbvOCu/CZpYP3vt/1sDEv0M04zSVGe85n/6BsYGuf/WLhoC1e86RxnNrd72rkJEJuS8J7lz3ZmfM1y3njjjZKfOtcJRuGZ3DiFq4SvewIv/SLB4aq+LoJL/hhTsz4h4YTxU2diIyeTv4lfyH0A2yQ+xHh57733Cme09ISRg5/Tjp5P4xWeu3kwxSM2yx1D34s+RutQHnrnl6XXXvv+ZcXfKNNXb775Ztmhr+NHYOmcT2Nj/JEyCS7O3e/qB48L3+3e+vDDv6z+V4+PMYovvzX7Rfc1Xhk331CyJ0lkwWU3ff/737RVnyfttoGhe+RpySPLcS9dvSj4+OO/Kb/9JF7s1k+XxZgntbtJ3XML3gaBQKRDMitjQACTOwbd69UhbmSgPsmJ7xrDieoYN5HBkBsKUBwfx6HcoIijUPfuu+/WIIo+u3xzjTc+aaucTCm6yuPgDMLZ+emsMbDHysUNR742Sdo4JINTHZ13E6fBzgwAvLRzg0jauEZD7w8++GCXxVOvgyfC6/RP6ONI2J5zOed3WdLHdAw9TC4LyNoGZ5MWicyMn5m3enzwJXu3bzkTco0JGEnX6R+8gmlsSx/88Ic/LP3m/px1uup8HpPRmV0cG15ffvll2cGWyxIbBD9tJUFSMmmJ3XS9SSJX2yet2DMu0xdP4x+cnkSnX7Ki3eVLl2DyJB7q3ONs2NU/EzTBQ4qNsI2PCG8BKH2Jzrl7MlgKiKknL/g/jVf4X5ZnDJIj0ZeM2Y8oN3atbNWxJWOD73Fu9QxHeuEV3S6TOZehi2y6uM6uGN+VPlQOh9jvfnVfzL4rOuHPL6kLdvigxzs8ogcbyLpKZ3FE211MtFdGl/CEX/rurbfeKhEZt7DJwin00eGyHB99TjeHuDEvMNl3lc7hh4cxvDu2U/+88uPnxYhBnAuAAC8B0JEgrUyHJGnj+OUvf1mzuJQ/KU/73LiXAYmfZGDvput0oDYGBD7o58mFMjLnQct5zDQ6z4CVdOK46YezVRbH6zy8OO/dhM9o+82t2dg/8wo2u3yedJ02eUku19rQzTH3D2eXBIMZh5RfluexSujdgDAe9j2+koAl3HPjyk0EYfrBBxfjZ9blMpnGIXkmlXN6Wv/MweAmNs4yds8zUeGML0tWh3F6l9W7j7KyyOoAHdvU6bdge1n7y8rgMHg8jn9o9QMMbxIY0vZJOafucG9wjFICRvrUJHAei5fxi/50jM9Bp53ggGdogm3ua3S5NyMHrsZ7aNHQg8M2HvEy4Up6Eq/QPC3Hg+50SEBNG+NeAIH9o7mmAAAIt0lEQVSR8S/RJfd+6OTGhrrrpNgbWtd4SuwMlvM4U8f+GRtl4RWd2OOYk3HJluEDPMocGJuQON9N5BjTn376d7tVdQ0nuyXx73hHr+DIBpjhL4hmHFzKcCo0uZsT3mS5FzJG5/rLzvkpNl+3Py7jcZ2y57byjjBKA9dh4AEzM5/QfBs5PTJ7mvN08lU6GLwcbFa3+GSVfVWbudzANSPOzXDZAMXzuik38GyD87uU4iTdkHmWlht8nvTEpjnQoc9NmqAeuqfl6bc4I/TX6Z+n8X2W+gSB3X50PcbqmBRexpvOcd4maybJxgXHpC3HnRXHZe2fpUyfcVowvC0n5F507L4zQl/34dPSxWTmHx671+ETR2tSxAfBiT25r8eux99XeSYMY5J6MTnk8OlhizY7Sgk2T+P1NN3VG5cOGNA5if8x7oOB3R4JTvyKNvQQaIwf9o1gN56Vh89V+VX+h73utUzkYXTTvjdedse4XSP62oYXF9hLX3Zedv97/IVPsN61g/54Ro7FId1DT+dgk61/PGAX/3NZnntsV95Nr9nExqtwvim/q+ifS/AewP2L6pBdQZyKrb3cIGiTgOmYV48ZsGjm87RJrqOAo/1uwk/bWdYuzVXXF4Hmr7eTkJkWbzJn3eJE0Ak8HKvBZaA6n2nRcBJJ4TWv9lLnpqTPZSn2z7yexd7wvm7/hP4mOUzom5stuQFuNj4neLA5k7/QwhOOl93sc/v5nAM3eeIogs11+mfm8bzOjdXdcRDedFN32RhAw2kbCzBhE1oYKZOcz/dQ+D5rzolZ7XGgCYJ4xTkGS2V0YVvqniRTYJgnUnP73XbXcXzGCgyeROvezNg2djj2BBC40T/Y7b70lyDGh6mTjFnpabyK6Al/4GBSNgLZeGFtl9y4lTK5YWcmEcrpPid4XCfFrtDqTza6N8gwkchYm3nC+rK2+MQfzb4w/Oc8+LuvyYptoSGPPmPVPJ47K0uwD92cw8Fx1f1jV5N+ZMefXJZ7gVJQn33MLsaz3MvOcy/POzSX0T2PsucSvHWqQZgBGcXcHEC3bYHGgSYDQgfpQAFOnWQASdrOIFbhzh+dgSbOJM+AlONrBhfwOSPOI9c7rLaXcUK5Wemf2Tqi8Dbzlnb11D4dSBa6XZl4aieNQXqxVUfvbKHnbVw0EtzYmK1GgYkDCK+rXharxk/587T+eUrzK6vZnjGwS2SAsyn6qxfMMyZmeuMLthkfc92TzgUf7fIy23X650n8nrXOPTCPVf0WR5H7gd2XJeWcNjp46n+58oy1BKjL2l9VlntudsjGq/6K857b6gMy80iIPvpL+XVS7tfcD/qd/rOjiy67jzou46+9/nxSQpPgTPfc1+TmvlIuwXjG0cRYHZxyT4b2abyeppP+l4YNI0gZD/TKs1K+UhkaCU65D2CfFbo29IHvdRL6yJfjhbcdBn2jXiI/sl2jUWd8SNqmL13zR8Z46rXlc9HhNVb1g7c6bXcDrv7cDazK2JZVtDHK9sgeOI1PPtAPZrHPNZ2CaSl+xZ/4wNnHsCXyr2j2WPHF+H3yuHys0TNePJfgTbaVEYAz4AAIZB2a2bvtDTdlBh3wtQOOwcdhAFpbgUhQf1KyMkAjoGkTPfDCVzJg1JFFvjqDVVk6uAj7jw6c7chLGKp1THi70fEYA+nCeXnBQSLXgd4NlxtCHQy029VLHdn0YpN2MyZww0+ZBFf0nDlev2t6Uv88K+/cyPTcTcrYs3uzpHyX3g3optd/N0nwgj9cr9M/N+Ed2ieNKTT6ah6rbKZXJq5w0I/G/24aW4jjvhnj+eKdC3K1TSAezubC4Y/J4eVjQztjLKulODry0864ctANPV0iY4zH71fZrs6XXWtLXu5JMoJB6OmChqzImQNI6NzPjl3nn3p5aPJIwfjOfZv7K/RsRx8clbvfM4mInPmevYqXtsEv/Od8Hu9zec6NFVgl0YnucJG87Zxz1+rhCLOnjUP0/C0d2MK/aYuH+04ef2qik/sWPsYqvWLb4HERpOjtSL0xo03soXN4q1Me/mXYNf/QwUtlGUf6Kb6d/uoTh8jjN8i6TsLHOMi4ZyO8YXudpK2UcXOdNs9Mc9UHwJ9W7oPw8wfnn0a/6gcCu18gsHDZHwTcD/OXQ7wMlvliiCd9QYkvjJi/AORF6pwvgZm/xMKXYeRLLl6kbjeV/TTcb8rvJvRPGoe+GCdfsnMTnlfR6p8VB65C5/Hyl/ZLWp559rAaLgT2AAEzbitEK42XKVnJP2l1oy6r3Bett5U2XaIvPMcK6+Ilshet43XlPw336/K5Kd1tjkO7hVa72fnSX87zQt1NdV30vxsCB+YGz8LCtkKSZxQrXQ8BuNnWue42zvW4LqqFwLMjYEvUNqZnitfdHnx2aZe3FHRsw3vcZetzpdtBQD9Leax4EykCtS3xPMYwVubHojfh9V2jhZvJjuQxRSaovwsOzxy8fxehq+1CYCGwEFgILAQWAs+OwHN7Ye3ZVVgtFwILgYXAQmAhsBC4CQIreN8ErUW7EFgILAQWAguBlwCBFbxfgk5YKiwEFgILgYXAQuAmCKzgfRO0Fu1CYCGwEFgILAReAgRW8H4JOmGpsBBYCCwEFgILgZsgsIL3TdBatAuBhcBCYCGwEHgJEFjB+yXohKXCQmAhsBBYCCwEboLACt43QWvRLgQWAguBhcBC4CVAYAXvl6ATlgoLgYXAQmAhsBC4CQIreN8ErUW7EFgILAQWAguBlwCBFbxfgk5YKiwEFgILgYXAQuAmCKzgfRO0Fu1CYCGwEFgILAReAgRW8H4JOmGpsBBYCCwEFgILgZsgsIL3TdBatAuBhcBCYCGwEHgJEFjB+yXohKXCQmAhsBBYCCwEboLACt43QWvRLgQWAguBhcBC4CVAYAXvl6ATlgoLgYXAQmAhsBC4CQIreN8ErUW7EFgILAQWAguBlwCBFbxfgk5YKiwEFgILgYXAQuAmCPz/WcRH5jz18M4AAAAASUVORK5CYII="></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the difference in the concentration of auxin found in L1 and L6.</p>
<p>. . . . . . . . . . . . . . . . . . pmol g<sup>–1</sup></p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Identify the relationship between the concentration of auxin and the age of the different leaves.</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>Analyse the effect of NPA on the formation of roots.</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>Compare and contrast the changes in auxin concentration in the stem base over time for the control and NPA-treated cuttings.</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>Deduce the effect of NPA on auxin transport between L6 and the stem base.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Based on all the data presented and your knowledge of auxin, discuss the pattern of auxin production and distribution in the leaves and the possible relationship to root formation in leafy cuttings of <em>Petunia hybrida</em>.</p>
<div class="marks">[3]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the name of the molecule which is produced by transcription. </p>
<div class="marks">[1]</div>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Compare the pattern of <em>GH3</em> transcription with the pattern of auxin concentration in the stem base control cuttings. You may use the table provided to help you to record the patterns before you compare them. (Please note: a simple<br>comparison in the table will not gain marks)</p>
<p style="text-align: center;"><img src="data:image/png;base64,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"></p>
<div class="marks">[2]</div>
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p style="text-align: left;">The scientists concluded that auxin activates the transcription of the <em>GH3</em> gene. Using the information on the auxin concentration in the stem base in the graph and the Northern blot, evaluate whether this conclusion is supported.</p>
<div class="marks">[2]</div>
<div class="question_part_label">f.iii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>45 «pmol g<sup>–1</sup>»</p>
<p><em>Allow answers in the range of 44 «pmol g<sup>–1</sup>» to 46 «pmol g<sup>–1</sup>»</em>.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>less auxin as the leaves become older/larger <em>Vice versa</em><br><em><strong>OR</strong></em><br>negative correlation from L1 to L4 </p>
<p>L4 and L6 leaves have least auxin concentration <br><em><strong>OR</strong></em><br>L4 and L6/older leaves have about the same concentration of auxin/do not have significantly different concentrations</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. NPA decreased the «mean» number of roots per rooted cutting «by about 5» <em>OWTTE</em></p>
<p>b. NPA decreased the «mean» length per root «by more than half» </p>
<p>c. NPA decreased the «mean» total root length per planted cutting «to about 2 % of control» <em>OWTTE</em></p>
<p>d. NPA inhibited the formation of roots<br><em><strong>OR</strong></em><br>decreased all three measures</p>
<p><em>Accept other correct statements of overall changes in values.</em><br><em>The word “mean” is not required.</em></p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. both decrease up to 6 hours/initially </p>
<p>b. NPA-treated decrease more/at a faster rate than control «up to 6 hours» </p>
<p>c. after 6 hours, control increases while NPA treated continues to fall</p>
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. NPA «appears to have» no effect on concentrations/transport of auxin in L6 as control and NPA-treated remain at same «low» level <br><em>OWTTE</em><br><em>A valid reason must be given for the mark</em>.<br><br>b. NPA «probably» inhibits the auxin efflux pumps/transport «in the leaves» as the levels drop in NPA-treated in stem base «but not in control» <br><em>OWTTE</em><br><em>A valid reason must be given </em><em>for the mark</em>.</p>
<p>c. the transport of auxin to the stem base must occur from younger leaves<br><em><strong>OR</strong></em><br>L6 is not the source of auxin in the stem base </p>
<p>d. NPA inhibits the auxin pumps/transport «in the leaves» as the levels drop in NPA-treated in stem base</p>
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. L1 has the highest concentration of auxin so appears to be/is the main source/the producer of auxin <br><br>b. as leaves age, they «appear to» decrease the production of auxin <br><em>Vice versa</em></p>
<p>c. the stem base is an auxin sink as seen by the accumulation in the control stem base «where roots form» <br><em>OWTTE</em></p>
<p>d. high concentration of auxin «in the stem base» promotes root formation<br><em>Vice versa</em></p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>mRNA/RNA</p>
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. at 2 and 24 hours, auxin levels are similar and at 2 and 24 hours <em>GH3</em> levels are similar </p>
<p>b. the pattern for the formation of auxin is similar to the pattern of transcription of the <em>GH3</em> gene<br><em><strong>OR</strong></em><br>both decrease and then increase </p>
<p>c. «however» there is a lag between the peaks of the <em>GH3</em> transcription and the peaks of auxin</p>
<p><em>A comparison must be made to award marks. Do not award marks for simple completion of the table</em>.</p>
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. the data «partially» supports the conclusion<br><em><strong>OR</strong></em><br>the relationship is not clear <br><br>b. the auxin concentration «seems to» rise before the transcription level increases<br><em><strong>OR</strong></em><br>there is a lag between auxin concentration changing and transcription level changing<br><em><strong>OR</strong></em><br>the auxin concentration falls before the transcription level falls <br><em>To award mp b, awareness of the lag should be demonstrated</em></p>
<p>c. more data is needed «before two hours/after 24 hours»<br>OWTTE</p>
<div class="question_part_label">f.iii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">d.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.ii.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">f.iii.</div>
</div>
<br><hr><br>