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</div><h2>HL Paper 2</h2><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Nucleosomes help to regulate transcription in eukaryotes.</p>
<p>State the components of a nucleosome.</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>Nucleosomes help to regulate transcription in eukaryotes.</p>
<p>State a chemical modification of a nucleosome that could impact gene expression.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.ii.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>DNA <span style="text-decoration: underline;">and</span> histone</p>
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>methylation/acetylation/phosphorylation/epigenetic tags/modification of nucleosome tails/N-terminal tails</p>
<div class="question_part_label">a.ii.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.i.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.ii.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Distinguish between RNA and DNA.</p>
<div class="marks">[3]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the process of DNA replication.</p>
<div class="marks">[8]</div>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how enzymes catalyse reactions.</p>
<div class="marks">[7]</div>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>DNA is double-stranded while RNA is single-stranded;<br>DNA contains deoxyribose while RNA contains ribose;<br>the base <span style="text-decoration: underline;">thymine</span> found in DNA is replaced by <span style="text-decoration: underline;">uracil</span> in RNA;<br>one form of DNA (double helix) but several forms of RNA (tRNA, mRNA and rRNA);</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>occurs during (S phase of) interphase/in preparation for mitosis/cell division;<br>DNA replication is semi-conservative;<br>unwinding of double helix / separation of strands by <span style="text-decoration: underline;">helicase</span> (at replication origin);<br>hydrogen bonds between two strands are broken;<br>each strand of parent DNA used as template for synthesis;<br>synthesis continuous on leading strand but not continuous on lagging strand;<br>leading to formation of Okazaki fragments (on lagging strand);<br>synthesis occurs in 5'→3' direction;<br>RNA primer synthesized on parent DNA using RNA primase;<br>DNA <span style="text-decoration: underline;">polymerase III </span>adds the nucleotides (to the 3' end)<br>added according to complementary base pairing;<br>adenine pairs with thymine and cytosine pairs with guanine; (<em>Both pairings required. Do not accept letters alone.</em>)<br>DNA <span style="text-decoration: underline;">polymerase I</span> removes the RNA primers and replaces them with DNA;<br>DNA ligase joins Okazaki fragments;<br>as deoxynucleoside triphosphate joins with growing DNA chain, two phosphates broken off releasing energy to form bond; <br><em>Accept any of the points above shown on an annotated diagram.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>they increase rate of (chemical) reaction;<br>remains unused/unchanged at the end of the reaction;<br>lower activation energy;<br>activation energy is energy needed to overcome energy barrier that prevents reaction;<br>annotated graph showing reaction with and without enzyme;<br>substrate joins with enzyme at active site;<br>to form enzyme-substrate complex;<br>active site/enzyme (usually) specific for a particular substrate;<br>enzyme binding with substrate brings reactants closer together to facilitate chemical reactions (such as electron transfer);<br>induced fit model / change in enzyme conformation (when enzyme-substrate/ES complex forms);<br>making the substrate more reactive;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>Many of the candidates scored full marks.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Despite some confusion about which enzyme does what and confusing DNA replication with transcription/translation, many candidates managed to gain full marks. A good number indicate that an RNA primer begins replication on the lagging strand only. Another common error was to refer to the gaps rather than the fragments as Okazaki fragments. Some candidates confused replication with translation.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates lost marks by focusing on factors affecting the rate of enzyme controlled reactions and inhibition and missed the basics. Nearly all mentioned the lowering of activation energy, but many were not able to describe how this is done. Diagrams that were included could have earned more marks if they were more carefully drawn, with axes labels being more carefully included and differences in energy between reactants and products being more accurately represented. Few indicated that the enzyme was not used up in the reaction.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline 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="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the structure and functions of nucleosomes.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain how DNA is used to pass on genetic information to offspring accurately but also produce variation in species.</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>Accurate transmission of base sequences to offspring depends on successful gamete production. Describe how spermatogenesis occurs in humans.</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. found in eukaryotes;<br>b. consists of DNA wrapped around proteins/histones;<br>c. histones are in an octamer/group of eight;<br>d. are held together by another histone/protein;<br>e. in linker region;<br>f. help to supercoil chromosomes / to facilitate DNA packing;<br>g. (function is to) regulate transcription / gene expression;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><em>Remember, up to TWO “quality of construction” marks per essay.</em></p>
<p>a. DNA is replicated/copied semi-conservatively/from a template;<br>b. mutations can be a source of variation / resulting protein has new or different functions;<br>c. mutations/changes in the DNA may not result in changes in the amino acid for which the triplet codes;<br>d. genetic code is redundant;<br>e. genes occur as paired alleles which can be different;<br>f. crossing-over occurs;<br>g. recombines linked alleles producing new combinations;<br>h. random orientation of bivalents / homologous chromosomes (in metaphase I);<br>i. large genetic variation in (haploid) gametes / 2<sup>n</sup> / 2<sup>23</sup>;<br>j. random recombination of alleles during fertilization (leads to variation);<br>k. different phenotypes among members of the same population;<br>l. natural selection may lead to enhanced survival of recombinants;</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. germinal cells / spermatogonia undergo mitosis to keep a supply of germinal cells present;<br>b. some germinal cells / spermatogonia grow larger to become primary spermatocytes;<br>c. primary spermatocytes go through meiosis I;<br>d. to form secondary spermatocytes;<br>e. these secondary spermatocytes go through meiosis II;<br>f. to produce spermatids;<br>g. spermatids differentiate/grow a tail and reduce their cytoplasm<br>h. spermatids associated with nurse cells (Sertoli cells);<br>i. sperm detach from Sertoli cells and enter lumen of the seminiferous tubule;<br>j. testosterone stimulates sperm production;</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>It was common for four marks to be awarded. Students knew this topic well.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates appeared to be giving memorized responses from past mark schemes without recognizing the subtleties of what the question demanded. Better prepared candidates used language carefully. Some muddled the discussion by referring to mitosis.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Candidates struggled to use terminology correctly. The greatest confusion occurs in discussing the beginning stages of spermatogenesis.</p>
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the relationship between genes, polypeptides and enzymes.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline control of metabolic pathways.</p>
<div class="marks">[6]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>gene is a sequence of DNA bases;<br>DNA/gene codes for a specific sequence of amino acids/polypeptide;<br>enzymes are proteins/composed of polypetides;<br>sequence of amino acids determines tertiary structure/folding/shape of active site;<br>change in the gene/mutation will affect the active site/function of an enzyme;<br>enzymes are involved in replication/transcription of genes;<br>enzymes are involved in synthesis of polypeptides;</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>metabolic pathways can be a sequence/chain of reactions;<br>they can be cycles of reactions;<br>different enzymes control each reaction in the sequence/cycle;<br>accumulation of an end-product can inhibit the first enzyme of the sequence/ pathway;<br>(an end-product inhibitor) joins an allosteric site/a site separate from active site;<br>attachment at the allosteric site changes the shape of the active site;<br>preventing the binding of substrate;<br>until the level of the end-product is reduced (and the inhibition removed);<br>this is an example of negative feedback;</p>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This part of the question was poorly answered. Candidates were usually able to relate genes to translation but were less likely to adequately relate their responses specifically to polypeptides beyond that.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Aspects of allosteric inhibition were usually a strength within student responses to this question. Answers for this question were generally not very well constructed.</p>
<div class="question_part_label">b.</div>
</div>
<br><hr><br><div class="specification">
<p>In the red squirrel (<em>Tamiasciurus hudsonicus</em>), the allele for grey fur colour (G) is dominant to the allele for red fur colour (g) and the allele for a fluffy tail (F) is dominant to hairless tail (f).</p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>The genes described above form a linkage group. Define <em>linkage group</em>.</p>
<div class="marks">[1]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>A cross is made between squirrels of the following genotypes.</p>
<p><img src="data:image/png;base64,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" alt></p>
<p>Using a similar format, identify the genotypes of offspring which are recombinants.</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 how the recombinants are formed during meiosis.</p>
<div class="marks">[3]</div>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the role of transfer RNA (tRNA) in the process of translation.</p>
<div class="marks">[2]</div>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>genes that are located on the same chromosome (form a linkage group)</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>
<p><em>Award <strong>[1 max]</strong> if the candidate does not use the same format, but gives the correct letters Ggff and ggFf.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>(recombination) occurs in prophase 1 of meiosis;</p>
<p>homologous chromosomes come together in pairs;</p>
<p>chiasmata form between the (non-sister) chromatids;</p>
<p>chromosomes exchange segments / crossing over takes place;</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>tRNA attaches to (specific) amino acid;</p>
<p>tRNA (with amino acid) moves to the ribosome;</p>
<p><span style="text-decoration: underline;">anticodon</span> of tRNA binds with <span style="text-decoration: underline;">codon</span> of mRNA;</p>
<div class="question_part_label">d.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>This was surprisingly poorly known, with only the better candidates being able to state that the genes are located on the same chromosome.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>As was shown in part c, the candidates seemed to know the theory of crossing over and recombination. However part b showed that very few really understood the products. In addition, in spite of comments from last year's report, the format used in the syllabus and the instruction of “using a similar format”, most did not.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was well answered, the theory was known.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Weaker candidates seemed to recall that tRNA had something to do with ribosomes, amino acids and protein synthesis, but were unable to explain any further and gain some marks.</p>
<div class="question_part_label">d.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Draw a labelled diagram 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>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="specification">
<p>Angiospermophyta are vascular flowering plants.<br> </p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Describe the transport of organic compounds in vascular plants.</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 flowers of angiospermophyta are used for sexual reproduction. Outline <strong>three</strong> processes required for successful reproduction of angiospermophyta.</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>Growth in living organisms includes replication of DNA. Explain 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>a. phloem transports organic compounds/sucrose</p>
<p>b. from sources/leaves/where produced to sinks/roots/where used</p>
<p>c. through sieve tubes/columns of cells with sieve plates/perforated end walls</p>
<p>d. loading of organic compounds/sucrose into /H<sup>+</sup> ions out of phloem/sieve tubes by active transport/using ATP</p>
<p>e. high solute concentration causes water to enter by osmosis (at source)</p>
<p>f. high (hydrostatic) pressure causes flow (from source to sink)</p>
<p>g. companion cells help with loading / plasmodesmata provide a path between sieve tubes and companion cell</p>
<p>h. translocation/mass flow</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. meiosis / production of male and female gametes</p>
<p>b. pollination / transfer of <span style="text-decoration: underline;">pollen</span> from <span style="text-decoration: underline;">anther</span> to <span style="text-decoration: underline;">stigma</span></p>
<p>c. fertilization happens after pollination / fertilisation is joining of gametes</p>
<p>d. <span style="text-decoration: underline;">seed</span> dispersal / spread of <span style="text-decoration: underline;">seeds</span> to new locations</p>
<p><em>Reject fruit dispersal.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. helicase unwinds the double helix</p>
<p>b. gyrase/topoisomerase relieves strains during uncoiling</p>
<p>c. helicase separates the two strands of DNA/breaks hydrogen bonds</p>
<p><em>Accept unzips here but not for mark point a.</em></p>
<p>d. each single strand acts as a template for a new strand / process is semi-conservative</p>
<p>e. <span style="text-decoration: underline;">DNA polymerase III</span> can only add nucleotides to the end of an existing chain/to a primer </p>
<p>f. (DNA) <span style="text-decoration: underline;">primase</span> adds <span style="text-decoration: underline;">RNA</span> primer/short length of <span style="text-decoration: underline;">RNA</span> nucleotides</p>
<p>g. DNA polymerase (III) adds nucleotides in a 5’ to 3’ direction</p>
<p>h. complementary base pairing / adenine to thymine and cytosine to guanine</p>
<p><em>Do not accept letters.</em></p>
<p>i. DNA polymerase (III) moves towards the replication fork on one strand and away from it on the other strand</p>
<p>j. continuous on the leading strand and discontinuous/fragments formed on the lagging strand</p>
<p>k. <span style="text-decoration: underline;">DNA polymerase I</span> replaces primers/RNA with DNA</p>
<p>l. ligase joins the fragments together/seals the nicks</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
[N/A]
<div class="question_part_label">c.</div>
</div>
<br><hr><br><div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline the 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, with an example, the process of exocytosis.</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>Translation occurs in living cells. Explain how translation is carried out, from the initiation stage onwards.</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>vesicles carry material to plasma membrane;<br>vesicle fuses with membrane;<br>(by joining of) phospholipid bilayers;<br>aided by the fluidity of the membrane;<br>material released/expelled from the cell;<br>membrane flattens;<br>name of example e.g. exocytosis of neurotransmitter / exocrine secretion/endocrine secretion / hormone secretion / release of cortical granules;<br>outline of example: (in the presence of calcium), neurotransmitter vesicles release their contents into the synapse / hormones released from one cell have an effect on another cell etc.; <br><em>Accept these points if clearly made in an annotated diagram. <strong>[4 max]</strong> if no example given.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>translation involves initiation, elongation/translocation and termination;<br>mRNA binds to the small sub-unit of the ribosome;<br>ribosome slides along mRNA to the start codon;<br>anticodon of tRNA pairs with codon on mRNA:<br><span style="text-decoration: underline;">complementary base pairing</span> (between codon and anticodon);<br>(anticodon of) tRNA with methionine pairs with start codon / AUG is the start codon;<br>second tRNA pairs with next codon;<br>peptide bond forms between amino acids;<br>ribosome moves along the mRNA by one codon;<br>movement in 5' to 3' direction;<br>tRNA that has lost its amino acid detaches;<br>another tRNA pairs with the next codon/moves into A site;<br>tRNA activating enzymes;<br>link amino acids to specific tRNA;<br>stop codon (eventually) reached;</p>
<div class="question_part_label">c.</div>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>There were some very good answers to this section which included all possible marking points, but far too many only knew one fact, that it expelled material form a cell. A large number of candidates summarized intracellular vesicle traffic which again suggests that candidates have memorized mark schemes rather than applying what they know to novel questions. In this question, the details of a specific example were rarely included.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>It was surprising that so many managed to omit the basic facts on codon/anticodon binding by complementary base pairing. Some explained DNA replication and transcription instead. Answers were in general, poorer on this topic than they have been in the past which suggests that teachers are not spending adequate time on this topic.</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 processes that occur during the first division of meiosis.</p>
<p> </p>
<p> </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>Prior to cell division, chromosomes replicate. Explain the process of DNA replication in prokaryotes.</p>
<p> </p>
<p> </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 outcomes of the human genome project.</p>
<p> </p>
<p> </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><strong>Remember, up to TWO “quality of construction” marks per essay.</strong></p>
<p>a. (consists of) <span style="text-decoration: underline;">prophase</span>, <span style="text-decoration: underline;">metaphase</span>, <span style="text-decoration: underline;">anaphase</span> and <span style="text-decoration: underline;">telophase</span>;<br>b. chromosome number halved/reduced/(diploid) to haploid;<br>c. <span style="text-decoration: underline;">homologous chromosomes</span> pair up/form a bivalent/synapsis in <span style="text-decoration: underline;">prophase</span>;<br>d. crossing over between <span style="text-decoration: underline;">non-sister chromatids/chromatids of different homologues</span>;<br>e. nuclear envelope breaks down (at end of prophase/start of metaphase);<br>f. tetrads/bivalents/homologous pairs move to/align on equator/cell centre/on metaphase plate <span style="text-decoration: underline;">in metaphase</span>; (accept homologous chromosomes without pairs if pairing has already been described)<br>g. attachment of spindle fibres/microtubules to <span style="text-decoration: underline;">centromeres/kinetochores</span>;<br>h. (homologous) chromosomes separate/pulled to opposite poles <span style="text-decoration: underline;">in anaphase</span>;<br>i. nuclear envelopes reform/do not reform (because of meiosis II) <span style="text-decoration: underline;">in telophase</span>; <br><em>Accept the above points in a series of annotated diagrams. Reject answers with single chromatids forming pairs in metaphase or separating or moving to opposite poles in anaphase.</em></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. DNA replication is <span style="text-decoration: underline;">semi-conservative</span>;<br>b. each (molecule formed) has one new strand and one from parent molecule;<br>c. <span style="text-decoration: underline;">helicase</span> uncoils DNA;<br>d. <span style="text-decoration: underline;">helicase</span> separates the two strands by <span style="text-decoration: underline;">breaking hydrogen bonds between bases</span>; (reject unzips as an alternative to uncoils but accept as alternative to separates if breakage of hydrogen bonds is included)<br>e. <span style="text-decoration: underline;">RNA primase</span> adds <span style="text-decoration: underline;">primer</span> / <span style="text-decoration: underline;">primase</span> adds (short) length of <span style="text-decoration: underline;">RNA</span>;<br>f. <span style="text-decoration: underline;">DNA polymerase III</span> binds to/starts at (RNA) <span style="text-decoration: underline;">primer</span>;<br>g. DNA polymerase (III) adds nucleotides/bases in a 5’ → 3’ direction;<br>h. bases according to complementary base pairing / A–T <span style="text-decoration: underline;">and</span> C–G;<br>i. (leading strand) built up continuously (towards the replication fork);<br>j. (lagging strand) built up in pieces/short lengths/Okazaki fragments;<br>k. <span style="text-decoration: underline;">DNA polymerase I</span> removes RNA/primers and replaces them with DNA;<br>l. ligase seals gaps between nucleotides/fragments/makes sugar-phosphate bonds;<br>m. nucleoside triphosphates provide the energy to add nucleotides; <br><em>Accept the above points in annotated diagrams.</em></p>
<p> </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. complete human DNA/chromosomes sequenced;<br>b. identification of all <span style="text-decoration: underline;">human genes</span> / find position/map (all) <span style="text-decoration: underline;">human genes</span>;<br>c. find/discover protein structures/functions;<br>d. find evidence for evolutionary relationships/human origins/ancestors;<br>e. find mutations/base substitutions/single nucleotide polymorphisms;<br>f. find genes causing/increasing chance of/develop test for/screen for <span style="text-decoration: underline;">diseases</span>;<br>g. develop new drugs (based on base sequences) / new gene therapies;<br>h. tailor medication to individual genetic variation / pharmacogenomics;<br>i. promote international co-operation/global endeavours;</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>First division of meiosis</p>
<p>Most candidates knew the names of the four phases and many knew some of the events in them, but there were few really convincing accounts and some confusion between mitosis and meiosis. Few candidates made it clear in their answer than the two nuclei produced in the first division are haploid. The chromosome/chromatid terminology in mitosis and meiosis is rather awkward, but was expected to be used correctly in answers to this question. In past mark schemes there has often an easy mark for simply mentioning crossing over, whether in context or not. In this case candidates had to say that it occurs between non-sister chromatids. <br><br></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>DNA replication in prokaryotes</p>
<p>Some candidates were confused by the specification that replication should be described in prokaryotes. This is of course the only type of replication included in the IB Biology program. There were some very good answers and stronger candidates did not have difficulty in reaching full marks. Abler candidates seemed to have chosen question 5, perhaps because they knew they could cope with the complexities of DNA replication and knew that they had enough to say for 8 marks. <br><br></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Outcomes of the human genome project</p>
<p>There were some good answers to this question also. Candidates often referred to the complete sequencing of the genome, evidence on human ancestry and the discovery of genes causing diseases or of genes that increase the incidence of a disease. </p>
<div class="question_part_label">c.</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 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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>Draw a labelled diagram of <em>Escherichia coli</em> as an example of a prokaryote.</p>
<div class="marks">[4]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Explain the process of transcription in prokaryotes.</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>Some prokaryotes cause infectious diseases which stimulate the body’s immune system. Outline the principles that form the basis of immunity.</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 [1] for each structure clearly drawn and correctly labeled.</em><br>cell wall;<em> (with some thickness)</em><br>plasma membrane;<em> (shown as single line or very thin)</em><br>cytoplasm;<br>pilus/pili; <em>(shown as single lines coming from the cell wall)</em><br>flagellum/flagella;<em> (thicker and longer than pili and embedded in cell wall)</em><br>70S ribosomes; <em>(shown as small dots)</em><br>nucleoid / naked DNA;<br>approximate width 0.5 μm / approximate length 2.0 μm; <br><em>Award [3 max] if the bacterium drawn does not have the shape of a bacillus </em><em>(rounded-corner rectangle with length approximately twice its width).</em><br><em>Award [3 max] if any eukaryotic structures included.</em></p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>transcription, synthesis of RNA identical to one strand/coding strand of DNA;<br>antisense stand acts as template/is transcribed;<br>RNA polymerase attaches to sequence of DNA known as promoter (region);<br>RNA polymerase separates the two strands of DNA;<br>(unwinding) exposes (10–20) DNA bases for pairing with RNA nucleotides;<br>RNA nucleotides matched to complementary bases;<br><span style="text-decoration: underline;">adenine</span> with<span style="text-decoration: underline;"> uracil</span> and <span style="text-decoration: underline;">cytosine</span> with <span style="text-decoration: underline;">guanine</span> / uracil replaces<span style="text-decoration: underline;"> thymine;</span><br>H bonds between RNA nucleotide and complementary base on DNA strand;<br>(RNA) nucleoside triphosphates used;<br>hydrolysis of (two) phosphate molecules provides energy for reaction;<br>adds nucleotides to the 3′ end of RNA molecule/in 5′ → 3′ direction;<br>terminator is sequence of DNA signaling end of transcription;<br>RNA molecule separates completely from DNA; <br><em>Award any of the above points for a clearly drawn correctly annotated diagram.</em></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>skin and mucous membranes form barriers to pathogens as first line of defence;<br>macrophage recognizes antigens and ingests pathogen (in blood/body tissues);<br>presents antigen/MHC on cell surface;<br>macrophage activates helper T-cells that are complementary to antigen;<br>complementary B-cell becomes activated/stimulated by T-helper cells;<br>activated B-cell increases in size and divides by mitosis / creates clone of B-cells;<br>B-cells differentiate into plasma cells and memory cells; (both needed) plasma cells secrete specific antibodies;<br>memory cells remain/form basis of long-term immunity;<br>polyclonal response / multiple B-cells activated by different molecules of antigen;<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>Although the general level of diagrams has been improving, there were still a few poorly labelled ones, especially not distinguishing clearly between the cell wall and the plasma membrane. There were many pili and flagella seemingly floating in space, and many with eukaryotic structures. Most correctly drew the bacillus shape correctly.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Well prepared candidates gave a very clear and precise account of transcription. However some still remain confused between transcription, translation and replication, so described the wrong process. One common error was to say that helicase instead of RNA polymerase separated the strands. At the end, many forgot that they were explaining the process in prokaryotes and described the mRNA leaving the nucleus.</p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most knew that the stimulation of the immune system involved macrophages, and T and B cells, but only the better candidates could explain the process clearly.</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 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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>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 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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="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 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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>Define the terms <em>chromosome</em>, <em>gene</em>, <em>allele</em> and <em>genome</em>.</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>Compare the genetic material of prokaryotes and eukaryotes.</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 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>chromosome:</em> structure formed by DNA and proteins;<br><em>gene:</em> a heritable factor that controls a specific characteristic;<br><em>allele</em>: one specific form of a gene occupying the same gene locus as other alleles of the gene;<br><em>genome</em>: the whole of the genetic information of an organism;</p>
<div class="question_part_label"> a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p><em>Responses do not need to be shown in a table format.</em></p>
<div class="question_part_label"> b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>occurs during (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>;<br>hydrogen bonds between two strands are broken;<br>each strand of parent DNA used as template;<br>deoxynucleoside triphosphate provides energy;<br>synthesis continuous on leading strand but not continuous on lagging strand;<br>resulting in 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>complementary base pairing;<br>adenine pairs with <span style="text-decoration: underline;">thymine</span> and <span style="text-decoration: underline;">cytosine</span> pairs with guanine; (<em>both pairings required</em>) (<em>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/seals nicks (in sugar-phosphate backbone); <br><em>Accept any of the above points shown in a clearly 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>This was the most popular question by far. It also tended to be the best answered. Most candidates were attempting to describe chromosome, gene, allele and genome, rather than defining as asked. The definitions in the syllabus were expected or very close alternatives. <br><br></p>
<div class="question_part_label"> a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Better-prepared candidates scored well on part b, being able to competently compare the genetic material in prokaryotes and eukaryotes. Weak answers were caused by missing the word "genetic material‟ and just compared the two, scoring very few marks. A large number inappropriately defined naked DNA as being DNA that is not enclosed within a nucleus rather than DNA that is not associated with histones.</p>
<div class="question_part_label"> b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>The explanation of DNA replication was well known by all but the least well prepared candidates. Many gave answers of textbook quality. It should be mentioned that if diagrams are included they should be clear and well labelled. <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 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 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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 style="text-align: left;">Cells go through a repeating cycle of events in growth regions such as plant root tips and animal embryos. Outline this cell cycle.</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;">Draw a labelled diagram of the formation of a chiasma by crossing over.</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 style="text-align: left;">Explain the control of gene expression in eukaryotes.</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. mitosis is the division of a nucleus to produce two genetically identical daughter nuclei <br><br>b. consists of four phases: prophase, metaphase, anaphase, telophase </p>
<p>c. cytokinesis occurs after mitosis </p>
<p>d. interphase is the metabolically active phase between cell divisions <em>OWTTE</em></p>
<p>e. the interphase consists of the S phase, G1 and G2 </p>
<p>f. DNA replicates in the S phase </p>
<p>g. cell growth<br><em><strong>OR</strong></em><br>preparation for mitosis<br><em><strong>OR</strong></em><br>duplication of organelles in G1 and G2</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. «crossing over/chiasmata shown between» homologous chromosomes <br><br>b. centromere drawn and labelled </p>
<p>c. single strand break «SSB»/DNA cut between homologous chromosomes </p>
<p>d. non-sister chromatids labelled<br><em><strong>OR</strong></em><br>sister chromatids labelled </p>
<p>e. chiasma between homologous chromosomes labelled «shown forming after SSB»</p>
<p><em>Homologous chromosomes must be labelled and correctly drawn</em>.</p>
<p><em>It is likely that more than one diagram will need to be included to demonstrate the stages</em>.</p>
<p><img src="data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAApYAAAC6CAYAAAAUAw1uAAAgAElEQVR4Ae2dC1yUVf7/PzOSWQGS6caMeUlMLDVvSOtqCZhD5pqElZsVY1DpltbGKuRlu6x3cXEtbS3Dn6jZZsGf8tdFTMSyVQhQf7gppOZ1htIMBM0LzPN/fQ/zwMMwDAMMw1y+5/WCeeZ5zuV73ud55vmec77ne1SSJEngwASYABNgAkyACTABJsAEWkhA3cL0nJwJMAEmwASYABNgAkyACQgCrFjyjcAEmAATYAJMgAkwASbgEAKsWDoEI2fCBJgAE2ACTIAJMAEmwIol3wNMgAkwASbABJgAE2ACDiHAiqVDMHImTIAJMAEmwASYABNgAqxY8j3ABJgAE2ACTIAJMAEm4BACrFg6BCNnwgSYABNgAkyACTABJsCKJd8DTIAJMAEmwASYABNgAg4hwIqlQzB6byaV+cvRW6WCyvIvPBHrsopRoUBTHVeL8OW5dc6LKMZ06FXhWJ6vTEFXLqN43WMif21iFi4o8mv48CqM+elYrh+gkCsSieuyUFxhUiSzL15DddTqlyM93whljorM+ZAJtCkBkzEf/8v3Z5u2ARfOBLyRACuW3tjqDq9zGJLyykGbOFX/laFoTiB2PRmG8fWUSCOyZ/0da/JL7ZPCdBy7PyzAH8L+AGz8CnkXGlPjTKjIX43JIa+hcNQHKBcyVaG8KB5ddr2E4PErkS+US3vjyWJa1LHqNDZ13Y6J4xci48xVORJ/MgHXIFCZj+R7Q/CXnQbu+LhGi7AUTMBrCLBi6TVN7cyK+qPPmBewaFU0imYtx5biyxaFf4ZZM//HrOBZXLL4ajryH3yYOQRTZkzCAONWvP/VqUZelJdQtPNTZAfp8WJMf/iK/NTw7TMGz+nHQ5P9KXYWXQJgbzwLgeSv6q4ImzIJOuOX+CTnJ/ksfzIBJsAEmAAT8GoCtYplRTG2L9dDK09phiciVTmNYjIiPzUR4eK6FuGJG7E3/Q30Vj2GdcUVMKZPg8rqVKZX8/XiyrdH1/uj8ZRmNz7cfVyhDP4BCUmzEZadhJlr8upPidchdg7ZKW8jM2w4htx/PybpfsG6d3bgSGODlpTHpUM4cEQ5ca6Gf8QiGKSdmDm0Wt0URdkbr45cyi8BCAy4QXmi9lhM7w+AfvmbSAzXVk/La/VYsTcfe1fIzxo9S+nmKfrK6udIq8eSJcrrG5FvtDUqegHF21dArzWbJGj1WL69rhlCrVB85BoEGmkz+r1NX17bpqpIJKbmwiju/dr7ZPla+TdZBVX4HKQXXwAq87G8bwhmHQWOzgrBdb2XI7/yFNL1vaF9Qo8nxH2iReS6wzDV+V1XQUX3Tnq+uRwATb6Hia6liUn1+6LmHjbn+YT+YfP7ht4hlwGbdXaNVmMpmAATsIOARKE8R0oK00iamFVSjuGKJEll0qGUWEmjeUFKO03ff5XyksZJ0MRKKYfKJKnqtLRjtk4CIEEzW9pRViWy4X/eR+BaXpIUhDApKa+8fuWrDkkpOo2kSdghlUmSVBv3ZPX9hHFSUt6v1ekMaVKMZT5lO6QEjUbSpRySqqQr0um0FyQNHpVSin6rX5biTNXpNClWA3F/amKSpI/SMqQdRSRB3WBvvFq5FXUUz8A4KWx2pmRo6PYXdYKEsNlSGpVfXiilxPSXAI05XZVUnpcshUGu4zXJkDbVLLf5WZTT6FKkIqvlyFz6S7Fpx6Uq+dnFUClhx9m6FeZvLkKgsTaz+L2VqqTyQ+ulGI1GCkvKkcol+T7RSGEJaVJReVXNbzjk++RanpQUBCkoKU+6Jmp9UkqLCZJgfuaqDIVSgeEn8+96jJScYxDPmCFnlaIcSZKafA/L93R/KSalUBJPjHwPhyVLeSRrTZ70/TfJUFAoGaoaq7OLNB2LwQSYQKMEIEm/SUUpj9ZXEMXDHyTFpJ2UqopSJJ3li0q89CEhJk0yNFoMR/BUAlaVrprKml9m5nukTlxzZwZ1XjZKBbVKKtsxu64iWUfRrCnE6kGVIU/KSHtXSgjTVHeARCcoRkrKLKp+2ZlT2ROvWu5qRVV0pigv858mZr10iF6W1oJ4hmSlkSKYnzVMldIM1a97qY4CICsMCoVbkqw/f3J5ZuW9RqGQz/On6xJorM2s3ufK3+kr5g6IspNlcW/Vua8IhflZlBVPOtVoObIS2JR7+Ky0I2GoZHk/1nmH1Hsu7JTFdVuUJWMCTEBBQA2xOGI3YFyM0R3b1a6i1U7EBjHiWY59n25EpkaHyJBOtWOgN3ZElxuBoAE90KX2LB8xgVoCposoLbkETWAAbqo9W33kG4Jpy2fZmBI/j7xtmTDqHsDI3h2q0/jfjcintMj88D+NToerNUMxIfpZLN1pgFRlQF7G+0gaU4BZuvg6C4fsjQdYLN6RylCUNhvBG6YgYn62jdXqNyIw4CZU25z4wC+gExDUGz26+FgSUXy/Db20tdP1ar8ABKIUJaW/KeKYD00Xcf6oEQgMgF+tYUv9eHzGdQg00mamkuPYbzQiM+5OtJNNk1Q3IDjuI8B4HqUXZVuQTgjwk+8j873VWC0V90nlDwVIMwZjzMDbzPcnJW6PwJ69oTEewfES2fyiCfew6RyO7zcAmXEIblfrLaJdcBwy69zDyjwB++vcWAX5OhNgAm1NQA3zj1xQUh6u1azqlVf3HkFqtB9OFJ4CxoTgTv/aN5fp2AFsPzoUE4f0gPzT1taV4fJdjECFAUWFwIBgrXkRjVI+NXyHPo3lSUOqV4nv+Vl5EaYzX+P9jfkWL6guGL2Mzr2NlOxzdeLb/KLWYOiEyZj51kokaD7Dmp1HUWktgb3xRFp/9ImOx98ShsKYVoAfrGZorRA+xwTsITAUCTvOKjwtyL/JaxCtac1fXBMulp6H0R4RbcTRJOxAmdX3STcbqdqqzjZE4ktMgAk0mUCNpnjpbBlorWz9cAMCAgOAklKUyx1llGLfp+nIRC8E31Y7slI/LZ/xXgJXceardGw0jsSkkT0VIyJKIgEYOu1VJIUVYNbEP5tHyOn6ZRzZ9m+sMz6KlKLf6r5cy3YgQZOPjdv+z/oo4YUsJGrNCxOURdGxGGXXIKjTTVDbG88yD2vfgzo5eLTwPErLazVVU3kpSjAEo/pbmRtQ34ROQRqL59OakHzOZQg00mbqwJ4YZOsed1BFfO4YgomaImw/cFqxuK4S5aXnAU1v9Axs3/SS1J3Rc5AWRrtcg9Vm76w615bIR0yACbQWATV8ghA+bRyMG9/Hx4dpFS2t6NuIxPDeZkfWnRASqYMmcwWWZpyACRdQnL4MM2d9BgSFYmAv8zRla0nI+bohAVrxuhpzpu/CmJRX8VgfG/eIPCWurKXZPEOTMA2PWKYV0+FDG35x+Q/BY/FDkBn3EmbXrKKFWHGa+9abSO42FYlje0FtbzylXHWOr8KYtRrzl11B7NTR6F3TRasTqZlfPsK8hR/icIUJJuO3WLlwBQpj/4RI2SRAmau6FyKnRiueT5LrDYSrGlCulWn5uG0INNZm4t4cB+OypViSdUYofXQfrCCH/5HrUFzTwbchvs/v0GtEEBoeMAAgPwPzFmNlLjn6vwpjbgoWztuNsPgohCpmqGyUZHGpE0IfewJhxvWYv2RH9epykxG5wguCefW3RQrx1RF1tpYvn2MCTMDpBNQAjRolIzO+EvPu7AiV6npoZx5E8N8+x9aZofAFuWl5Bdlp43FsYk+0U/XF1G+voLsGwIhe0IpZGbP7C3Y35PQGdI0CszErxK/WPlfVEcGLSjBqUxpWx8q+JBuSVJ4SH1cTodp3pRZPRd4N/5qz8kFnhMU9D50xE9vyzssnFZ8BGDpzM4p2xKJLVhy0sp1XOx1WV03A1s2zEaGhkRh748lZW9bxemjnX8JTO9KwMrpHAyOyctqmfurweGAmIvzaoZ12GvYPWI7slVHoalV5bY+u0YuQnRmLyun0fF4P7ej/IHR9BtZP6etguZpaD45vnUBjbRaAofFrkbd+EPaMvk3YWVbfB28gb/2T6GP1PrAs6VYM1z+F4GWj0VE1DenG2hHw2pjmchYH4tN7tNX3TlQuBqzais3x9NvfnEDP8wvYnLcUoXv01c9fOy2i9g/AqryVmGLZUawpwhF1rsmMD5gAE2hDAipayNPk8mkase+T2L8gC1/E8suryfw4AROwSoA6aNOhnQikGVa1si2dVQH4JBNgAkyACTCBFhFovO9LznZ7q1CzT7PpDLKWLMUyRGNqZC8eEWkRfk7MBJgAE2ACTIAJMAHPIdD48kKfAXjiww04O/NJdFRVrxXUxCQjMzsOY7o2w7jbc9hxTZgAE2ACTIAJMAEmwAQUBJo3Fa7IgA+ZABNgAkyACTABJsAEmAARaHwqnDkxASbABJgAE2ACTIAJMAE7CLBiaQckjuI5BNasWYMzZ854ToW4Jl5BoLi4GKdPn/aKunIlmQATcG8CrFi6d/ux9E0kcOzYMQwePBhbt25tYkqOzgTajkBCQgJOnDjRdgJwyUyACTABOwk0vnjHzow4GhNwBwLLli1Dhw4dMGPGDOzcuRPz5s1Dp06d3EF0ltFLCXz77bei5iNGjPBSAlxtJsAE3IkAL95xp9ZiWR1GYMWKFfjkk09QUVGBlStXgl/aDkPLGTmYQFRUFGbNmsX3qIO5cnZMgAm0DoF2r7/++uutkzXnygRcl8Dw4cOFUnnhwgVkZ2fj+PHjCAkJwXXXXee6QrNkXkeARit/+OEHvPDCC15Xd64wE2AC7kmAbSzds91YagcQmD59Ou677z507twZ165dw6hRo7B//34H5MxZMAHHEEhKShKjlY7JjXNhAkyACbQ+AVYsW58xl+DCBEi59PHxEStu33rrLTz33HNYtGgRfvvtNxeWmkXzBgI0WtmnTx/x5w315ToyASbgGQRYsfSMduRatIDAm2++KVK/9957+PLLL8Xx448/DnLxwoEJtAUB6ti8/PLLeOaZZ9qieC6TCTABJtBsArx4p9nonJeQRi527dqF0tJSUWhAQIB46dxwww3OE8LDS6IX+YsvvoiBAweCRjGJOb3Y6fjRRx8Fs/bwG8DFqpeeno69e/eCvBhwYAJMgAm4EwEesXTx1lq1ahVGjhyJjIwMF5fUvcUjxZFGLg8cOABiTqvEafTy4MGD4NFL925bd5OeOjlLlizh0Up3aziWlwkwAUGARyxd+EbIzMxEZGQkyPaPRs5sBZq2pREOUoTI4J8DE2ACbU9g2LBhCAsLQ/fu3YWtJHkesOU3lRaPbd68WcxQ3H333SDzDA5MwBEEyGUV3Yc6nY7tdh0BlPNokAArlg2iafsLoaGh0Gq1NkcraZu3N954A2fPnkVMTAz69++Pbt268dRtC5rPclqcsjp//rwYRfr111/x2muv4bbbbmtBCZzUWwjQfXPu3DnhziovL088y6RoktmF8h6iqW8apezXr59QKsnP6p133skKgLfcKK1cT/pNO3XqlBh8oHuNFoVZ3oOtLAJn70UEWLF00camkQvaenD37t0NOkYmpTI6OhoLFiwQvVAXrYpbimVNuaSK0I/yxIkTkZaWJti7ZeVY6DYjQPfVF198Ie4heraHDBkiXvAkEI0o0YwD21a2WfN4TcFyR4bMfWyNoHsNEK6oQwmwYulQnI7LbMOGDdDr9bh06VKDo4+8I4fjeFvLqSHlUh4lpjQ8emmNHJ9rjADdQzSzQCOTBoNBLNKh+418qW7atIlHKhsDyNdbTIDeMdSR4QViLUbJGVgQ4MU7FkBc5Ss98ORqpKHVyLKPO96KsPVazHJBj1wSTWGuXbsWY8eOFaOWZAvLgQk0hQDdQ0uXLhWeB1555RWRlEYyaZqcpik5MIHWJkDeLsgen8w1ODABRxJgxdKRNB2YFy3Guf322xvMcd++fbj//vsbvM4XHEOgIeWSciczBJpSevvtt5GQkMA/0I5B7hW50PNNI0U33XQT/v3vfwuH/GRjSXZvHJiAMwjQbxuZX5ANMAcm4EgCrFg6kqYD8/rkk0/Qt2/fBnM8efIkevbs2eB1vuA4AvQDTKNLNHVEroiUgUaePvjgA7Fo6oEHHgCPXirp8HFDBGjB3S+//IKLFy+KfcDpeafFd8oFPQ2l5fNMwFEEaJU4zY5xYAKOJMCKpSNpOjEvGvGQHaY7sVivLYoM3Gl00ppySYonKQVkGyePXpK9HAcmYI0ATT1+/fXXNZdor3pagDd58uSac3zABJxB4OrVq6KD44yyuAzvIcCKpZu2NfU0aQceDs4jQKNJsnJJNq6WgWzj5NFLWoRBK/s5MAFLAocOHRJ708vnaSqSZid4da5MhD+dReDatWvw8/NzVnFcjpcQYMXSTRs6MDBQ+MZzU/HdVmxZuaTtHq0pl/Lo5bvvvovnnnsOixYtEvZzblthFtzhBL7//vt6eV533XX1zvEJJuBIAjSLQrbgZK5DXgkokDkGubziwAQcSYAVS0fSdGJeNCJGDpc5OJ9AY8olSTRo0CDh6JqOefTS+W3kyiVa65DwAgpXbjHPkI06vWRuQWZUtPBw/Pjx+Pjjj1FWVuYZFeRauAwB9mPpMk1RVxCVSmXTCTf7vKvLqy2+yQ7qyRehLbdPNCVOo5e0LSe5+KAfeA7eS+Dhhx+2upuWJEneC4Vr7nQCtBCRXFzRaDn5UiU78ZEjRyI4OJh/o5zeGp5VII9Yuml7knJC061PPvmk6IG6aTXcWmx7Ri6pgvLoJa2+fPzxx7m93LrVWy48vcQ5MIG2JECj5rQQ8Z133hGdHLIdJxvx1atX48YbbxQmPDRlzj4u27KV3LdsVizdt+2EwiIrl2Q7Qz8W/EPg3Aa1V7mkjgD5LXz++edFZ4B+1HnluHPbylVKy83NdRVRWA4vIkDvBnpH0LuCHKOTMkm/XxToU6fTiY0faLc32dTqlltuwbPPPiviynaZLUN2Cun63lDp02G0K6OrMOZnId941a7YDolkTIde1Rv69FMOya7VMzEZkf+/+TCaqKRKGNOnQaWahnRjpfWinVC/RqbC6SYIx0QsgyE1GhrrYrbBWYI3HdqJQJphFaI1Pm0gQ+sW2dhUuLJ0UlCys7OxZcsW7Ny5EydOnEDv3r15lakSUisfk9uOH374AT169ICvr6/N0iorK2E0GkGfXbt2Rfv27a3GJwUkNDTU6jU+6b4EGlIsbbU1vezpOacXPQcm0BQCpFAeOXJEJCEby7i4OAwfPtzu6W4y5aF97b/66iuRB23MQVPmNBPT2qEyfzn6hnyGaXlbMXOo7d9Vh8lCipc2AUjbidTobg7LtnUyqkD+8vEIWTMOeYdnYqg9qpAT6mePGK3Dg3N1CAHqRb755ptCsSQbGZpqJcfpx48fd0j+nIn9BGgBBjm+/tOf/oR+/fo1mjA/Px9z5szBq6++atVGMzIyEvPnz280H47gXgSoXa0FW2195coVqNVqYQ9nLS2fYwK2CPzud7/DsWPHsHfvXtAWok2x9yYFkv4oDb1vsrKyxJT5gQMHEBUVJUY3aWU5247bagEvuybZDCeltJggCTFpksFmPGdfvCYZ0qZKwFQpzXDN2YU7pbwJEyZIs2bNslnWqVOnpGHDhklpaWk24/FF5xHYt28frcCQdu/ebVeh1IbPPPOM+KNjZaB8OHgegd69e4t7hNpX+ed5NeUauSKBX375RVq4cKH4zbl06VKzRaR8tm3bJt5TdB8/+uijUm5uriSVF0mZSTGSRr6/NTFSUmaRVC5KstQpyqSizGQpRiM/C/2lmKQvpaLyKulaXpIUJOcBSEFJedI16YpkyEuTkmL6m58djRSWsEHKM1wx16M6f83kGGmyyFMj6VIOSVX1alkllRd9qcintlzJkCbFgPJdICWEaczl6KSEtEPmOpj1D02UFDPZLIcuRSqqItk2KNJQnmn1ZYtZLL2boDPn21+KSd4h5e1ZVcsgbLaUVlRmltiyvsRJJyWsz5EMVeVSXlKY4jckTErK+9VCN7Ksp05KSIqXwhAkxaSdrC7DZnvVA2fXCftsLE9+i/cTI0HTsyqVFuGJ6SiuEBP6Qg03GXORWnNdBa1+OdLzjaiOUW1TodUvwdqaOAOgX5GF/L2roddSniqowucgvfhCrVpPdgOpiQgXZaqg0uqxPF22I6iNJh/ZloFiXYUxV1GeVo8lS/TQKmwRbOdhzXbB8twFFG9fUVsn1QDol2+rw0qWt7FPMqS2FWhajFxG0Ipk+uTgGgSoZ0/TRjRVRPZMjQWybVq7di3Gjh2Lbt26CVumxtLwdfcm0L9/f/euAEvv1gTIET/NlAwcOBApKSnNqgtNr5Ojf3JdRH9Dhw7FzTffDKAUWfMnQ/dZL2wyXIEkleHQAh8k6+ZhS/Fli7JMuJC1BGG6L9F102lUSVUoPzQTSH4aM7YUQz10Jg7nJSEIYUjKK8eRmYNxOX81Joe8hsJRH6BckiCVZ+KpkmUImbwa+QqdxLj5Fwze+iuqDJlYMrYXLBUd05kMvBT2AJJ93sDpKrncBxA2PxvVWogR2RuPIfhfh6vrkHIbNk58tW4djDk4OTgF5VUGFCyJROA+km0ZSh76CIYqCVWGNRhU+Fp92TbsxJF7VqKc2KSEYnv8aITMPgd9/hVI5TlIwnpMnPExik2AqXgTpijrW2VATnIgNk55Hv/MvoyhM7ciLykMCEpC3rWd9c0FKvKwZuoL+CzwDRSVV6HK8CoCCzORXdMS55rQXjWJGj2w5G09QXYmCoP/gXLR8IvRfeN00fBCcazIRfLkKMwueQg5dCNVGZAxqBDTQ55Fcn5pTX7GJsCkmzM/+VmEzC7BQzkGVElXYMgIReH08ZicnIuKmlzNB43KYEIF3ZD3rAEWFKLcnN+hNzfUGhA3modloZbfbT8ktWq4ZbrmfS8oKEBYWJjVKdTm5cipHEWAXA+RcklO1O01eKfOwalTp4T7DzKu50VYjmoN18uHVt1aBlv2lZZx+TsTcAQBsrWcMWOG3YsIydaSFh3SYh6y9aX97WkAhNwWkU9lWmE+bFhflJbQe98fHf3I0s4ffWNTYJC2ILZPBwuxTbhYeh5GXIdOHW+CGmr49tUj1WDAtti+9ZRB4Dxyt7yPbN3LmDulP4TFpW9/TJn7MnTZ72NL7vna/HXReGhwANSa/hissbRhv4wj2/6NdcZHsSDxQXRVy+VKMCyNgL/IRQPdglmY0pe++aPv2HEYgwLsOni2tgyMxFMP3Q1ftQaDB1+PPFm2l0ZAowbUmhF4yapskxAX1Re+8EefkSMwAEGImRGLCJLT9y6EjwsGjp5HuQlQ94nFNqkQqbHm+qo1CBk3CgNQipLSxrYNNuFCbgaSs4fgqbgH0cdXDbVmOOL04xXrZX5rQnspqt7IoX2KZU1DUgNEYMKYG5G563v8BFnwkVgwNw6hBEatQehLs7FAV4DkLQVm7R+Azn6YuFCALckF0C2YjZdCNVCjPTShcZi7YCSykzOQe0Gpptkjg+UNKef3qBmPPXk0QhJNfUgay8/29V27doGMqDm4JgFSLuXRZHuVS3n0kka0HnjgAdesGEvVYgI0UmQZaLEdBybgTAJkEzlr1izRobVWLv1u0cpx6ujSrCK5IqJAacjnKnm5oJXk8sry6jy6Qjf7b4gpikeIXzsxe/lx+ucNrOr2gUY3HSkxJzAr5ObqWcmP0/FJzWynhVSmczi+3wBkxiG4nXmmU6VCu+A4ZFoqWoEB8GtQu6lE+XlSEDshQCi/FuWIrzciMICUXVtBkb7yBArS8hE0ZiB6KRKpA3tikMaA/cfPmWdwAShkU/sFIBDdMKAHjfY2EGj29pN00Rbp6xIxWtS3gbh1Tl/CDwV7YAwKxcBeslKvhv+dIRhTE68p7VWTqNEDBQIbcRUg6sayJjgAdWf0HKSFcf9xlMg6oCKPxmBW/lCANGMwxgy8TdGw7RHYszc0xiM4XqJ0PWCHDFetNbo5P1EhO/KQ61EXgOJbEx8SRcrmHJaWlopFOs1Jy2mcQ6A5yiVJRouwNm3a5BwhuRSnE7C2mjYoKMjpcnCBTIA6seRflwLNkpDvStqGlkbQabEO+VylleTklYBMdui3ybaZljz6V4aiHRlYNR7YOn0cQrTjMSfrTK1yJaP37Y/Y1AMoL9qJtFWRwNbXEBUyFKPnbDe7z5Ej1n5qEnagjKbB6/wdcc0V3BdLUWKfX6XaCiqOTMbtmDN6KEL+mQMx/xswFv/Kexc6RZyWHTaxvewszD7F0s7MaqPJw6u1Z1p+JI8I2puTI2RoYh7NeEjsrY1lPJqW4K24LKm43vfmKpe2f7xdr54skf0E7rrrLnTp0qVOArLJ5cAEnElA6aaOVnfTLAlNaYeEhODLL78UjtNJuaSOUNNXfPujT8QERD8yE6mnDyFFV4jFqTn4yWoF1fDtE4bo6MmYmfodilJGIntxGvb8ZOGHUR6w2vgV8urMWlrN1MZJH/h1oufvPErLLcqwkcrmJZ8eGDJxKI5uP4BjikEoU3kpSqDFoJ6dFYNkNnNSXLyMI1+sxeKiKdjxyWLERkcjOvo+aMt+RKEiVsOHN+KOIcOhOZqLA8dq7VurZbJM1ZT2skxb/3sLFUvrgsN0EaUll6AZ1BOBzSjB544hmKgpwvYDpxU9nEqUl54HNL3RM1BpM2GHDO2tNfpVlBw/YraxtCMPq/W4DMOxIguqdj4kFqksv5JBdEBAgOXpmu/0sHfs2LHmOx+4LoHmKpeuWyOWrCUEaOrQcuqbXuYcmEBrE6D3imwnSba+ZNfdvXt3YSdJ/lVpUQ9Nb9MCn2YF0wmkxw2AVr8aucKpuQkVxTnYVQjoRt2FW+tkehVnyB+1Vo8VuebFvhVHsHvXIUAXiv63+sBH2wsjUI6zZaQYdULoY08gzLge85fsqB7RNBmRu4IW4T6GdfUWB9UpTPGlA3pH/gmxmo8wb+nnOEOLZGhkMFwLVeQ6sWhGEdnOQ7NsmUbvgQIAACAASURBVCuwcOW3QjaT8VusXLgCmWFP4LHQ5vCUZ2nz8VUe8SGWGVg4f33t2hB0gLZXMHDpPMouKTRaIbUa/qFRiA/bjXkLP8ThChNqZJJr1aT2khM1/mlVXWo8mRxDKXhK9Y1EDb1yMeZlDkH8Y0PMhrByfDs//YfgsfghyJy3GCvFDUcrulOwcN5uhMVHIdRfKbY9Migaff1BVFADHf4QC+d9ZBbInjzUuCmgEzT4Fp98cRgVYpV5Kt5MltdXNf6Q2Fl7seCDDKNtvWxI6Tx7VmlIbG/uHK8tCLBy2RbUXbfMBQsW1HQMn3nmmea/yF23iiyZCxGg6W2yk6Qddyi88MILYip58ODBoPuvrp1kCwRX90DUghQsDvwU92ivh0rVDn53bkbg4gysn2K5IKc9ukbNxdbFgfj0Hi3akQcYPx02BiYgb/2T6EOv+VvvgX72LVg2ugtU+gyUD30Bm/OWInSPHlqys2ynRdT+AViVtxJT6i0Oarge6q5RWJn9JeIrX8Nt7VRop9VjT+jS2nIbTtrAFTV8hWwJCPz0USFbO+007B/wBvI2v4ChvkqdpYEs6p1Wwz9sBjKSA7F+9G1oRyyn5iD4hXjEaI5ie84PuAAf3Dp8ImYHr8fojn3q7xbkG4r4zRlYHLgZd/q1Qzvt31EyQIcwuawmtZecyI5P206JLH1OUez656oMOdL6Gr9MkDQxSVJansHsO6p+/Go/UeRzqdqzlSSZ/TEFJUl5slvKKoOUtz5BCpP9WJEvrLQ8ySAcUtX3Y2lbBpL7imTIUfqKipeShMy1vjAbzcNCJk2NPypzHhbXIXxhKX1s2aYtX33rrbeEbyryE9ZQIP9hFI+DexEg/5bke9TSZ6W1WpBvOA6eS2Dy5MniOT9z5oznVpJr5hIEioqKJEuflfSdfmNsvWdcQngWwu0INLKlox2aqdtGuYzidTEIntcbOw4vQESdUdC2qxRNVQQHB+Ott94SxtMNSUL2MbSfKy3yYHu8hii55nnyb0muiJR79VqTlEYYyECdg+cRkO+BKVOmYN++fWL3rKbbsXkeF66R8wjQlDit/Kbpbw5MwJEEmjM+68jynZTXOWQlhkAV/gayauw+PkfKxgIrU+tOEslKMfSQP/nkkxg2bJjYz9VKlJpT9BIidzYU3x5H3DUJ+aDNCdC0OBnFk+9Ke10RtbnQLIBDCNDKW/L7Rx2Ld999F08//bRwLP3iiy8KR9MOKYQzYQI2CNCgBN2D33zzjbgPbUTlS0ygWQS8ZsSSdtXZ+M+/YcqyTDMoHRLWz8dfngoVzkybRc9Biehls2bNGsydO1colY2NZCmLpRFO8jNGgRSVu+++G2SUTbu48AiIkpTrHdOPO40aNNTePGLpem3WFIno2aRAttBHjx4VL/L33ntPzEaQCxflAgm6B+heoEDPcWBgYI07MX6WBRb+10wC1Hkld0F0H9LoON1n5DaIHKTzO6KZUDmZTQJeo1japNDGF+XpbxKjsSnwhkTdtm2bUFBomy3qiXJgAkzANQjce++96NGjB4YPHy5W3FquCJelpJEkWrS3c+dOMZJNz/KPP/4oX+ZPJtAiAg8++CD69euHqVOngv2mtgglJ26EACuWjQBy1mXqVVJPkkYt09LS7N7/m9LFxsaKbbkeeughMdLhsBV+zqq8l5eTkZGBI0eOiO3Vrr/++hoaERERyMrKqvnOB+5H4MqVK2KkiDY0oDb+6quvEB4eDpr6lm2jSaH89NNPsXDhQqGAkinM7bffDn9/f/HnfrVmiV2NAN2H5Fro2LFj2Lp1K8i2l1aG84ilq7WUZ8jDiqWLtSPtw0rTZfQj0JiCSCOdNG2m1+ttuiZysSqyOFYIWFMuWbG0AsoDTpET6tTUVLz99tvC9IWeeZPJhEmTJrEi6QHt6+pVICXziy++wC+//CJ20/Ec5fIU0vXhmIhlMKRGK/bDdvUW8Tz5vGTxjvs03NKlS4Wwsr1VQ5LTKAf1OGlaw5a/y4bS83nXIkA7X9AUKZlC0A8/B88lQM/rq6++iueffx7z589Hhw4dQMoljVByYAKtTYBmRej3hu476uBwYAKOJmCHYlkJY/o0qFTTkG500PZHjq6FB+VHBv2kXNCUOC3qaSgUFBSIbeFor1cOnkGAlUvPaEd7akFbOo4fPx6LFy/GI488Yk8SjsMEHEqA7r8///nPwozKoRlzZl5PwA7F0usZOR0AKRgUaMqsobBnzx7QrgkcPIuAUrn0rJpxbZQELly4IPZipnPff/+98hIfMwGnEKAR8scff1yYXTmuQPNAlFaP5WsTEU676ahUYovHvflZWKEfIL6rVJFITKcd7CjUplmyhLZnpDRahCduRL5wD9iAdBXF2L5cGX8Dck5eaiAyn3YmAVYsnUnbzrLItnLChAk2FUuywSSXJBw8j4CsXHpezbhGMgHa2ODw4cPia3JyMtRq/imW2fCn8wjQyPnx48cdX6BxOz47cg/eKb+G8kPrMWb7dAwPWYqz+i9RJf2KvKTrsGziq9ii3N/buAFvHgpFhuEKpPJMPFWyDCFTNjWwd3cp8tfEQ/dZV6wqKoNUlY+lgcXYmG10fF04xyYTqP01q6P9Uw9jBbYXX1Bk+CNy3q/tgajC5yC95joZzfaG9gk9ntBW9zYi1x2GyWREfqoiDfVi0vOrN49X9FLs79mQOFdhzN+IRNowXvRsBkC/PF3Rs7mA4u0roBdykCx0fRuKK+QN2htLb66LfgnWJkbWlrEiC/l7V9fmW6f+tIl9PtJrek8qqMITkZpPG8dToM3jt2F5TW/NGl8FakCsGKWVpBy8k4A8au2dtffsWtNo5ccff1xTycrKSuEcnZXLGiR84CQCt9xyCyoqqscNHVvkSDwV9yD6+PrAt889GDVAA8RMxYyIrlAjAAPDwxCEszhfrjSvG4f4F59AqKY94NsfU+a+DF3m20jJPldftAsF2JJcAN1TMYjq4w+oNQiN0+MpTf2ofMb5BKoVS9MJpL80EbpkP6w6Tb2FQizAOujCliDrgqyQZWJj4d34V3mVuJ7SfSsmzvi4Tm/CuPkXDN76K6oMmVgythP2JT+LkNkleCjHgCrpCgwZoSicPh6Tk3PNQ+AAmtSzMaEifzUmhyxDyUMfwVAlocqwBoMKX0PI5NXIr6jEhawlCNN9ia6bTqNKqkL5oZlA8tOYsaUYJlLwbKaX6woYN+zEkXtWolwqw6GUUGyPH42Q2eegzyc+OUjC+tr6V+QiefJ4TC+MQBbxoTRPncPskGeRnF8KXMjG/LCn8VnXZCFzDV8Lfs5vfi6RCTABZxM4efJknSJ/+ukn7N+/X6wMZ+WyDhr+0soEaGW4r69vK5TSCQF+PtX5qm9CQOCNCBrQA11slnQbemlrZVH7BSAQpSgp/a1eqsofCpBmDMaYgbehZnTM/w7cMyaoXlw+4XwCok1MR3bgnXW/QLdgOqK6VvcWYlMLIRkWKfbQfhQL5k5CX1814NsXYyeMADJzcfAnRY9DF42HBgdAremPwTcdrO5RLJiNl0I1UKM9NKFxmLtgJLKTM5Bbo7A2pWdzHrlb3ke27mXMfWmE2DFHrRmBl6hnk/0+tuSew8XS8zDiOnTqeBPUUMO3rx6pBgO2xfaFGo2lVyyW0U1CXFRf+MIffUaOwAAEIWZGLCJEb+ouhI8LBo6eR7nJhAu5GUjOHlnLB/7oO2UWFugKkLylABculqKERug7dYQfEfftD8F3Wyz61DwVTWt82o2jpKSkaYk4NhNgAm1OQJ4CVwpCO/NQILdDNBPDgQk4gwDtxtOzZ09nFMVleBGBasWy/DyO4kYEBpAy1lBQ9EAaihIYUK04kTmutR4F2iOwZ29ojEdwvOSqORdFvo31bCpPoCAtH0FjBqKXQlB1YE8M0hiw/3gpbtVNR0rMCcwKuRkqmnr/OB2fyFPSjaY/Z566BqCoS3XPqRsG9LjZSs2vouT4ERjxEeKCbzBPnaugancn4jKNMJaU4qLmfsxOGYuiWffAT0zNb0b6J7JJgJUs7TgVGhoqtueyIypHYQJMwIUIyEqkUqQTJ07UfJUkqeaYD5hAaxEgk4wPPvhAbP/bWmU0Ld/zKFVMjZvKS1GCIRjVv/44p88dQzBRU4TtB07XvrNNF1Fawot3msa8dWIr1LPWKaBuribziGLdsy3+Jo8IUkZiNPAAyot2Im1VJLD1NUSFDMXoOdvNtp1WSlOmt3LZrlOa2dhRRtPgUt0/4ajVH31jU2AoL8KOtDcwHtswPSoE2tFvIMvWqjcbBd933304d+4cDh48aCMWX2ICTMDVCFizabM2iulqcrM8nkWAduB59913XWj3nY8wb+GHOFxhgsn4LVYuXIHC2D8hsneH+uD9h+Cx+CHInJeE9Ycv0CIH5K5cjHmZvHinPiznnxGKpdqvE4JwCSWlF2u1/xbKYrVHgUqUl54HNL3RM7B900vw6YEhE4fi6PYDOFZrDonqno0Wg3p2No+4quHbJwzR0ZMxM/U7FKWMRPbiNOz5paud6ZsimjwKm4lteYqpdGtZ+PZBRHQ0HpmZitNFKdBlb0Tqnp+sxUR2dja6d+9u9Zp8ct26dWLnBNobnJ1qy1T4kwm4NoGmrsLlqXHXbk93k462AV67di0uX76MJ5980oXE1+HxwExE+LVDO+007B+wHNkro9DV6vBXAIbGr0Xe4s7YeGdHqNoNRWJJHzwVxqt3XKFBhXWtuvdoTI1dgYnzViEjMhnRmrPImheL0Ys7IqVoHcY2R1Jzj2LZvMVY2X8JXgq9BT/lpmDhvN0Ii5+JUH81ypucbyeEPvYEwpatwMKVwVjy0gjc+lN1zyYzLBaLQn1xJn06hk0vx6wMKlMDdcUR7N51CNC9jP63/g5am+k7ATjTRKnU8A+NQnzYesyavxqRd85GhAYw5q7FK1ELUbIgC59Ffo+pw15D5aw1QmaN+gKKd3+LQgzBJCvD/CTAd999h1deecWmLOSWiBRQUjDHjh2LuLg4oYzSjgr8MrKJzm0u2vJl6jaVYEHrEDhzxvpvTENtfd111+HixYvCkXXHjh3r5MVfmIA9BK5du4by8nLhM5U6NnPmzBFbiNqTtmlxfKCJXoO61hzdEJ16BNGKjHyGzsQRaab5jLxO43aM+Msq/GPp+4qYNg7VGgzVL8VOffVuddUx50L5zUZqvtSKBKqXbal7IHplGjLvXAj9bddjIhUYloD1eX/BU3064KdmzbaaexRd/omZ92gRT3lqYpC0aiuWRA2FL41eNrliavgOfQGb8zrjnzMfhTaehr37IybpDeQt+SOG+rYHouZia7miTGgQlrAUeUsmoQ/5irOZ3mrXqHEpfUMRvzkDXf75N4zWXl8dv6aufeGj7oUFWy8qZJb5LhB8Gy+g4Ri0Uw9t7RgUFISUlBTxR1sD0o48bKvVMDd3uDJu3Dh8++237iAqy+gAAg21Na0UJ5dEP//8M/uudQBnb8uCBhkyMjKEC7vIyEgkJCRgxIgR3oaB6+tEAiqJtQ8n4ra/KPoxSEtLQ3S0sp9XP/3XX3+N6dOnIzw8XCiTtFqc9oLlwASYgGsSiIiIsCpYVlaW1fN8kgk4ggAt1iFXV5mZmfDz88OyZctAs15tH2jnnenQTgTSDKsQrTG7KWp7wViCZhLgFmwmOFdIRkrltGnT8Prrr4t9w11BJpaBCTAB2wSGDBmCgoIC25H4KhNwMAHawpFmsuiPzC4efPBBYUpFs15tG6xNn7etRFx6ywg0c+63ZYVy6pYT+O2338RIJSuVLWfJOTABZxKg0SIOTKAtCYSEhOCRRx4RgxJtKQeX7ZkEWLF003alRTs0/U17vXJgAkzAfQhYe2bZ5s192s9TJCVfyG+99RbOn2/Em4mnVJjr4TQCrFg6DbVjC9qzZw9okQ4HJsAE3IsALbSzDBoNu0mxZMLfW5cA2eJPmjRJ+ENu3ZI4d28jwIqlm7Z4WVkZAgIC3FR6FpsJeC+Bfv364dZbb60DoG/fvnW+8xcm4AwCt99+O2+y4QzQXlYGK5Ze1uBcXSbABNqWAK3EJRdCciDflAMHDpS/8icTcBqBG264wWllcUHeQ6D218176sw1ZQJMgAm0KYGYmBjIq3F79OiBW265pU3l4cK9kwC5H/L19fXOynOtW40AK5athrZlGT/zzDPYu3dvg5mQv8off/yxwet8gQkwAdclEBYWhjFjxqBz586YO3eu6wrKknk0gbNnz6Jnz54eXUeunPMJsGLpfOZ2lXjzzTfj119/bTDu/fffL7Z9bDACX2ACTMBlCdDCCbKzpD/e0MBlm8mjBSOH6TQ40adPH4+uJ1fO+QTaXrE0pkOvGgD98jeRGK4Ve1yrtHqs2JuPvSv00KpUUKm0CE9MR3GFCQB56Z8GirNkifL6RuQbrzZM0GREfvpy6LWUn/kvPBGp+UZQrq4Wfv/73+O9994T+wNbk23QoEFi94SG9he2lobPMQEm4BoEDh48iJ07d+K5554Tz/mVK1dcQzCWwmsI0PuFR8u9prmdWtG2VyxFdQ9iw2cluOedw5DKC5EypgDxw8dj9tknkV9VhfK8WcCy6ZixpbhWCTRuwJuHQpFhuAKpPBNPlSxDyJRNKLaqJV5G8fqXEDL9EEZllYk9tKsMu5Hc/XNMGf8Wsi9YTeTUhrAsrFevXuKUrR06aEuujRs3ii26+MVkSZC/MwHXI0CjRLRvM73UP//8c7z44osYOnQoVq9ejSNHjriewCyRxxGgezA5OVksGCN3QxyYgKMJtP1e4TRiqZ2OkpQsfBHbF2pcRvG6GATHdardN7QyH8v7hmDNtDwcnjkQZ8W+oqeRlLcJM4dWu9wxFa/D2OC3MWjHl1ga0dkOTlbKsSOVM6NERUUJB+hr165tsFjagYdeSuvXr8fo0aPF3q+BgYEiPjli5mm2BtHxBSbQKgSok0e2a3IoKSkRTqi///57HD9+HE8//TSmTp0K5Ypc2p510aJFuHz5snjh02IecgUjB3qOrTlWl6/zJxOwRoDuQ3nQgaa9v/vuO5w4cUKMVLJSaY0Yn3MEARfZK/xGBAbchOrhUx/4BXQCgnqjRxdb4t2GXtra1WxqvwAEohQlpb81yMVkzMfWPSdQBRNKc9YiblkmgKkNxm/rC88//zwiIyPFiyYuLq7Oi0iWjV5OM2fORGxsLHJyckCO0+kHxGQy4Z133pGj8ScTYAJOJECKIwUfHx+xOIL2ByeFsiF7tvvuuw/0d/r0aRQWFuK///2vUAKuXq027+Fn2YmN50FF3X333Rg+fLi4D2mP8FdeeQV0Lyo7NR5UXa6KixCwpbm5iIiOEOMqjFmLMXn0O0DCG5hxzy0IiFyGvOCOCIlzRP6tk4dOpxNbbs2YMQMbNmwArSSVA/1AyO5K6Bwdjx07VvzJcdasWSMf8icTYAJuQIB8XNIfPcvKwM+ykgYfMwEm4MoE3FixPI/S8kpAU10FU3kpSjAEk/pb2TvbdAxfLH0HRQmbcHhpBPxFi5xDVuIxUslcuX0wffp0DB48GPv27QP5HKNAO+5wj9Olm42FYwJMgAkwASbglQTcWLH8CPMWjsMfVj+FPuV7sHLhChTGvoF1vTvUb0h1Z/QcpIUx9xvkGUciQnMZxenJmL8sH0BI/fgudmbEiBGgPw5MgAkwASbABJgAE3BlAi6yKrw5iHR4PDATEX7t0E47DfsHLEf2yih0tVqjzgj7y0okd/8Yo7XXQ6Xqi6k5t+OFpBhokIecQ6XNEYDTMAEmwASYABNgAkyACSgItP2qcIUw9h2SH8vp0E5E7apx+xJyLCbABJgAE2ACTIAJMIFWJGB1fK8Vy+OsmQATYAJMgAkwASbABDyUACuWHtqwXC0mwASYABNgAkyACTibgBtOhTsbEZfHBJgAE2ACTIAJMAEmYA8BHrG0hxLHYQJMgAkwASbABJgAE2iUACuWjSLiCEyACTABJsAEmAATYAL2EGDF0h5KHIcJMAEmwASYABNgAkygUQKsWDaKiCMwASbABJgAE2ACTIAJ2EPAjXfesad63hHnt99+wzfffIO8vDxkZGTgu+++846Kcy2ZgBsQmDBhAvr06YPf//73CA0NFXuBWxObnuOCgoKa7Vuzs7P5WbYGis81i8CwYcMQFhaG+++/H/feey9vC9wsipzIHgK8KtweSi4c59tvv8XLL7+MqKgojBo1Cj169GjwxeXC1WDRmIDHEiguLsbZs2eFwrhhwwbxcn/mmWeEskmVJoXyiy++wJIlSzBw4ECMHTsW/fv3R+fOndGpUyeP5cIVcy6B06dP48SJE/jkk09AnZYVK1bwVsHObQKvKY0VSzdu6vT0dNCLatWqVaxMunE7sujeRSAzMxPz5s0TL/YhQ4bgxRdfxM0334xXXnmFFUnvuhXarLbU2XnyySfx7rvvYtCgQW0mBxfsmQRYsXTTdj1//jweeOABkHJ52223uWktWGwm4J0EaPQoOjpaPMMdOnTAnDlzvBME17rNCOzfvx+vv/66MJ9qMyG4YI8kwDaWbtqsNJURExPDSqWbth+L7d0EqDN4xx13YP78+fjhhx+8GwbXvk0IyCOV1MnhwYk2aQKPLZRXhbtp0+7duxeDBw92U+lZbCbg3QTIhIWmxCm89tpr3g2Da99mBGhR2blz59qsfC7YMwmwYumm7Xr58mV06dLFTaVnsZmAdxOgKUj5hb5582bQqBEHJuBsAuSp4NixY84ulsvzcAKsWLppA586dQplZWVuKj2LzQS8lwAtnKCOoTLs27dP+ZWPmQATYAJuS4AVSzdtOrLP6tixo5tKz2IzAe8lQL4qjUZjHQDse7YODv7iJAIVFRVOKomL8SYCrFi6aWt3794dx48fd1PpWWwm4L0Evv/++3qVP3z4cL1zfIIJtDaBgwcPCp+prV0O5+9dBFixdNP2poU7X331lZtK731ikyN7mgKlQIs2VCpVzZ98nj6V5+XFHeRaSnme/JZSIMfatJOLfE2OLy7yP5clcPTo0Xqy8VR4PSR8opUJkF0veRfp1q1bK5fE2XsbAfZj6cYtTrvtPP/889DpdG5cC88WnZQ/2uEiNze3VR3Zk/JJgXdqcf376eGHH7bqO1CSJNcXniX0CALUiSUH6QsWLOD3h0e0qGtVghVL12qPJklDPc7p06eLvV8nT57MSkWT6DknckJCAgICAsS2mzfccINTCqX74pZbbuG9gJ1Cu+mF0AiztcCKpTUqfM5RBOS96Hft2iU6NqxUOoos52NJgBVLSyJu9t1yn2HaGo528rjxxhtx6623ulltvFvcESNG2ARQWlqK//73vyJO165dG4xLJhK0HzD5R6T9pjk4lkB5eTkuXLjQ7ExjY2Otpt22bZvV83TyypUr4s/f37/BOHyBCZw5cwYXL16sAfHzzz+LhWI5OTkoLCzErFmzxEDEvffeyx3PGkp84GgCvPOOo4k6OT8aBfP19RW7eHzzzTdo3749xowZI9yZyNOjThbJ64ujaaZr166hX79+drOgFwIpHBEREaJTcPvtt4sOArmlIT9zpMhQ+z7xxBPQarU4dOiQzbwHDhyIv/71r/jjH/8o9qG2GZkvugSBv/3tbw3KcfXqVVRWVop7o8FIfMHrCVx//fVitkIJgjqX1GklxZJ+m/r37y/ss501g6KUhY+9gwCPWLp5Oz/99NMgw/9XX30VYWFhPB3ehu0p21P++OOPYrSwOduk0f69n3/+OTZt2gTaco2+ky3Ugw8+KL43pXqUlrwHsN1lU6i1flyeCm99xlyCdQJkJpORkQHa+YlsvxubJbGeC59lArYJsGJpm49LXyWlkl5Sq1ev5mkNF2gpWvlNSn5cXFyL2oMU1OjoaGg0Gvz97393yD6+tGKcF3m5wE0CiBkFax4d2MbSNdrHG6SQF+9QB5a2deTABBxJgN0NOZKmE/Mih8r5+fmsVDqReWNFUe+fFlO1ZIqJRhRCQkIwbtw4rFu3ziFKJcn90UcfiVXpjdWBr7c+ATJd4cAE2pIAKZM0YkmLCzkwAUcTYMXS0USdlB8tzpg5c2aLlBgnierxxdCUM/21NNBIJY0q/vnPfxYKakvzU6Z/8803hd9TGqng0LYErC2oItdhHJiAMwlQR9hgMPA+9c6E7iVlsWLppg1No5VBQUFuKr1niU2La+ivJYGUykceeUT4JaVRT0cHGkWlFaHWlBpHl8X52SZATu0tA7eLJRH+7gwCZJd/7tw5ZxTFZXgRAVYs3bixu3Tp4sbSs+hKAomJicI9VGsolXI5NELBC3lkGm33OWzYMAQGBtYRgNy/cGACziZAHiZ4O1FnU/f88tjdkOe3MdfQxQmkpqbi66+/xp49e1pVUnI/xYplqyK2K/Pg4GCUlJTUxO3Rowfuvvvumu98wAScRcDHxwfkl5UDE3AkAR6xdCRNzssrCYwdO1a4empO5Q8ePIilS5di/fr1rW4vu2TJkpr9ypsjK6dxDAEyS3j55ZdrMlOr1U12JVWTmA+YQAsIkH/cu+66qwU5cFImUJ8AK5b1mbjFmb59+4KUEg5tT4AUheaMBB45ckQs1HnllVdYsWj7ZnSqBPHx8cKdFDm0XrlypVPL5sKYgEyAfO6ySZVMgz8dRYAVS0eRdHI+NEqWkpLi5FK5OGsEyEUQ/TUl0GIdUi7uuOMOxMTENCUpx/UAAuQ8/09/+pPYBYWmxjkwAWcTIA8RBw4cYD+WzgbvBeWxYummjUxuaWgKbdWqVW5aA88ROzc3F/RnbyAl9Pe//z26desm/JDam66l8ahMXn3cUoqOSU/O9Hfv3o1ly5aJnZWa2jFxjBSci7cSIHtr8mFJviw5MAFHE2DF0tFEnZgfLfrYsWOH2GPaEX4UnSi61xb1xRdfgEabaZtGci9ENk7OCrSbT3Om7J0lnzeUQwrkokWLd5nnigAAEnlJREFUhI1lenq62BueXu7UNtRJ5OfYG+6CtqsjKZR03z3wwANipoS3dGy7tvDkknlLRw9o3XfeeUf8WNC2fbTNY7t27YQCQSOaHFqfQFFRkSjE1pQm/aBnZ2dj8ODBQolQ2jWR8fytt97aLEFpSr2goAA//fRTo+nJnqpr165o3759o3E5guMIVFRUCHtomnokh9TkUurRRx+ts1hLvj+o4/Hee++J6x07dhRxOnToIGYnGtpj3HGSck6eSMBkMoF+o+i5px243nrrLbERA2/l6Imt7Rp1YndDrtEOLZLCz89PuC/p1asX6CVGjtNbsq1gi4TxwsTEnYIt5v3798eDDz4If3//eoS+//57ca6pyiV1JGg6a8CAAaLsxtyG0GgY3Rt0v3BwDoGzZ8/i2rVrwp0U+aoku8qIiIh69wrdO2SmQIt5KJA7IuoY0jlb95VzasGluDsBcmn1888/i2qQ30oypeLABFqLAI9YthZZJ+RLo1UTJkwQyiSNVPbu3dsJpXIRrUXA3pFLandauPXNN99g4sSJdq/qpJFt2oOcFo5wcD4BUjL37duHrVu3CjMIcopPSiMp/Hq9Hv369cPw4cPFgi5ZwXS+lFyiJxO4cuUKfvjhB6xZswZxcXFiAaEn15fr1jYEWLFsG+4OKfXZZ58Vq5FfeumlmpEOh2TMmTSJACkMFJTT203KQBHZHuWS2r20tFS8GJqigLBiqQDdhof0cv/4449x+fJlvPrqqyATCtrLnUa1OTABZxCge3D16tViC1my+ebABBxJgBVLR9J0Yl5kq0X2chkZGVanV50oitcXRSOHFBy1LZ8t5ZIWeOzatavJSiXJR34zaSV6U5RRr2/cVgSQnJws9mmmhTshISGtWBJnzQTqE6CFZMuXLxcuh+pf5TNMoPkEeHVH89m1acotW7aIlX3WbPbaVDAuvMUEyObS2mIcsqlcu3Zts5RKEopMJVipbHHzOCwD6kDs3btX2Mg6LFPOiAnYSYBMYm6++WbejctOXhzNfgKsWNrPyqVikq0WrRrl4JkELJVLGl2IjIzE3Llzm60ckmsjmgLj0PYEqH3JNIHC//zP/7S9QCyBVxIIDAyEbMrjlQC40q1CgBXLVsHKmXoTAdpeU6PROLzKsnJJi3Wef/55/OMf/2iRHecHH3zALxGHt1LzMvzXv/6FsrIykZhmH6iNOTABZxOgUXNrsyPOloPL8ywC7G7ITduTXJhwcA0CtGjHEQt3rNWGRqbJCX7Pnj2FD0xrcficexGgEaJz587VEfq///0vQkNDQT4HOTABJsAE3JkAj1i6aetdd911biq554lN08utMcVMeZIz46tXr+Lhhx/2PHBeWqPCwsJ6o0QHDx6sUSp5YwMvvTHaoNo0K9JU/7ltICYX6WYEWLF0swaTxaXRjRMnTshf+bMNCdA+4bRjiiMDjWotWLBALLiJiopySNa0fRsv9nIIyhZlcvLkyXrplc8yjVr6+PBkUj1IfMLhBMgEo7VmWxwuLGfoNgRYsXSbpqorKDlGp8UYtKiDQ9sSIBvL/Px84fqppSOXlJ7cF02aNEk4v3eUUkmEyE8iK5Zte69Q6UolUpaGXEEpQ2VlpdiaVXmOj5mAIwnQu+P48ePgrR0dSZXzIgKsWLrpfUCuIkaNGoX58+fzgow2bkPq8c+bNw8XL15sdluQQknToTRKSdNTH374oUN8G9LIJ/mq4w5IG98kiuKtbb155swZRYzqw6qqKvD+4PWw8AkHEKDfG1o0NmfOHAfkxlkwgboE2EF6XR5u9Y2mMWJjY/Hvf/8bL774olBEeLs+t2pC4bScFMpt27Zh0KBBDt1ykZTJhQsXYvLkyQ5z3u5edF1TWtor3FrIysqydprPMQGHEqDR8Q0bNgi77fj4eIfmzZkxASLAiqUH3Af/+7//i0WLFuGXX34Rzm5pF4/WcH/jAaicUgXaqu+7777D3Xff3aCvUaPRiLy8PAwbNkz4pSTH5R06dHCofKRY3nTTTcIJskMztsiMFhfxamYLKDa+0ip/a2H06NFihNJylFKSJGFzSZ4g6JhYyz5sHX3PWJOrtc7dfvvtYq/01sqf861LgGx7//Of/6B79+5ipPK+++6rG4G/MQEHEWALcQeBbKtsaNSSpmArKipwxx134IknnhAvJ3d+4bQVS0eW269fP6SlpQmn5g3ZMNEoMwfvI9CQYqnX623CoKlx2sqVgid4hSAzDeoMu3OgToA7LLSSN0cgG2vqmFCHkwMTaC0CrFi2Flkn5EtKZVxcHG688UZha8kLM5wAvQlFDB8+HOnp6Q6xlbS3WJpWJ+VDp9PZm4TjOZlA165dYc2m0h4zlh49ejhZWi7O0wjQTMZf/vIXngr3tIZ1ofrw4h0XaoymipKYmChcRdAoJSuVTaXX+vFpUc/UqVNbvyBzCbSX+OrVq0G7aXBwXQLk7J4DE2grAtSBoa1hd+7c6XA3aW1VJy7XtQjwiKVrtYfd0hQXF+PAgQN4/fXX7U7DEduOALkQotXestJ37733CmHIzpJGnuVA/knJ3pIM7MkOUw50nnxl9urVq2YrQLpGro5IgaX4//d//4e///3v7JdOhuain76+vvUkGzJkSL1zfIIJtBYB+o157LHH8Morr2Ds2LGtVQzn66UEWLF004bftWsXyNifg3sQGDhwYI2gN9xwQ81xQEBAjWJJ5+kH31Y4deqU1dHp3r17Y+bMmbaS8jUXIWBtOvvmm292EelYDG8hQCOXNHpOgxQN2YF7Cwuup2MJsGLpWJ5Oy41s6Wj1Nwf3IECmCvIopVJiUgjpzzJYO08OzmnhhzOn1y3l4u8tJ0DtaBmCg4MtT/F3JtDqBGi2gxZRsWLZ6qi9qgC2sfSq5ubKujOBbt26Ccfp7lwHlh3C3YuSA7kOIpMGDkzA2QTI9dBPP/3k7GK5PA8nwIqlhzcwV89zCNA0+YMPPsi76Lh5k9LotdKMpaysjEeM3LxN3VV8pX23u9aB5XY9AqxYul6b2C1RaWmp3XE5omcQIKfrtAiIg3sTeO6550QFyJ8guX5p3769e1eIpXdLAj/++KNYEOiWwrPQLkuAFUuXbRrbgv3hD38QK4Ftx+KrnkaAVoXT6m8O7k2AbNuWLFkiXuoPPfSQe1eGpXdbAmSrT9PhHJiAIwmwYulImk7Ma8yYMWIhB+2owMF7CJCd5eeff44rV654T6U9sKbUfrQV6y233CK29vTAKnKVXJwAuToLCwtDp06dXFxSFs/dCLBi6W4tZpaXfgzIye17773HSoabtmFzxCY7y0mTJoHcDnFwTwLUGSRH9mRn+c477yAhIQE0csSBCTiLAO2+k5qaKvxYOqtMLsd7CLC7ITdu68cff1zsEf7Xv/5VKBvkK5F34HHjBrVTdHKyfuzYMatuiuzMgqO1AQFyYk8K5Jtvvol3330Xzz77rJCiqKgIjz76KGh/edoG9I477mjUn2kbiM9FegABci307bffIjs7WyiW9mwj6gHV5io4mYBKkiTJyWVycQ4mQA5uN2zYgIULF2LChAno0KFDzQ4vDi6Ks3MBAr/88gto+0bqWHBwXQInT54UHb+rV6/i//2//yfai0YpH3744XrTj7Q6l172n332mRjNDA8Px+9+9zvQLj1sA+e6bewOktHvBbkUok6NRqPBM888A7LrVW7U4A71YBndhwArlu7TVnZJSkrmpUuXxIiWXQk4klsSmDhxohhxsLY9oFtWyAOFpraR9wVvqgNqmqqk55hGmNjPoAfeHE6uEjnl79y5c70OjZPF4OK8hAArll7S0FxNzyKwaNEijBo1CiNGjPCsinFtmAATYAJMwK0J8OIdt24+Ft5bCdB2nvv27fPW6nO9mQATYAJMwEUJsGLpog3DYjEBWwRoAc9XX31lKwpfYwJMgAkwASbgdAKsWDodORfIBFpOgFZzGgwG3t6x5Sg5BybABJgAE3AgAVYsHQiTs2ICziQQFRWFEydOOLNILosJMAEmwASYgE0CvHjHJh6+yASYABNgAkyACTABJmAvAR6xtJcUx2MCTIAJMAEmwASYABOwSYAVS5t4+CITYAJMgAkwASbABJiAvQRYsbSXFMdjAkyACTABJsAEmAATsEmAFUubePgiE3AiAWM69Kre0KefaqDQShjTp0GlmoZ0Y2UDcfg0E2ACTIAJMIG2I+DTdkVzyUyACTSNgA800WsgSU1LxbGZABNgAkyACTiLAI9YOos0l8MEmAATYAJMgAkwAQ8nwIqlhzcwV8/VCFxA8fYV0GtVUKlUUGn1WL69GBU1Yl7CyZwNSAzXVl9XRSIx/bD5uuVU+FUY89OxXD/AHJfyjERiai6MJnOGFcXYvlwPLZVVr7xTSNf3hla/BGsTI815DIB+RRby966ulTF8DtKLL5gztKPMmrrQgVlmqufaRISb5dDqV2NvfhZW1MiurKcs1xtYoryurFedMqq/mIz5SFfWNTwRqflGyCisJOFTTIAJMAEm4GACrFg6GChnxwQaJnAVZ9LnIEy3Dj6rjqNKKsOhBT5I1k3G/Kxz5mRGZG88huB/HYZE11Nuw8aJr2JL8eV62ZqKN2FKyGsoHPUByiUJUpUBOcmB2Djlefwzm/I7h6z5k6H7rBc2Ga5U5yfKm1cnP+OGnThyz0qUi/JCsT1+NEJmn4M+/wqk8hwkYT0mzvgYxSag8TLriVl9wrgdnx25B++UX0P5ofUYs306hocsxVn9l6iSfkVe0nVYZlFP44aPcWjQGhiqqlB+aDJKZkdhyvrD1hXFilwkTx6P6YURyCqvqq7rU+cwO+RZJOeXNiAUn2YCTIAJMAFHE2DF0tFEOT8m0BAB0zFseycdRt3LSIzqATX80Tc2BQYpD0sjOptTaaBbMAtT+voDdH3sOIxBAXYdPFsvV3WfWGyTCpEa2x++dFWtQci4URiAUpSU/gbgN5SWkFLlj45+ZE4tl7cFsX061Oanm4S4qL7whT/6jByBAQhCzIxYRGjaA753IXxcMHD0PMpNQONl1mZb92gknop7EH18feDb5x6MGqABYqZiRkRXqBGAgeFhCMJZnC9XLEoKi8WLzw6HRq2Gb99JmLtgJDLnbUD2BcsxSBMu5GYgOXskFsydhL6+9LPmj75TZmGBrgDJWwogj7fWlYm/MQEmwASYgKMJ8OIdRxPl/JhAQwRMF3H+qBEYEQC/Brt0NyIw4CY0eNkyb5MR+Vv34EQVgNIcvBW3DNmkGIp4XaGb/TfERExBiF88NDFJeHPCXbh9+P0YSkqjHAJr5VH7BSAQ3TCgx83y1fqfNsusH736TCcECOWWFOCbEBB4I4IG9ECXhqLT+e49oBVKIn3xgV9AJ8B4HqUXTYC/ktBVlBw/AiM+QlzwR4izzDOwFBeFqml5gb8zASbABJiAowkof50dnTfnxwSYQCsSMBm3Y87ooQj5Zw7EZG/AWPwr713oasqkkT49Ug1lKNqRgVXjga3TxyFEOx5zss5Yn1KuSWv9oPEyradzylnNbOwoo2lwqe5fajQ0ThGAC2ECTIAJMAEeseR7gAk4i4D6JnQK0gAlpWJaWdOibt1lHPliLRYXTcGOwwsQIUbwTLiQlYlCAIF16uSPPhET0AdAdPQfMWpsBOJSczAjYlidWI1/aUqZjefWaIw6nCpRXnoe0D2A/rda/my1R2DP3tAYM7EtLx4RNWYFjZbAEZgAE2ACTMDBBFr0anOwLJwdE/BsAupeiJwaDU3mCizNOAETrsKY9QbCVVpErmtgUUqDRGRlKh9f5dHKZxMqijOwcP56GOU0phNIjxsAWoGda7wKiDg52FUI6EbdhVvleHZ/2lGm3XnZETFzBRauP4gK4pSbgoXzDiF26mj0rverpYZ/aBTiwwxYNn81skRdKQ2tbG8OWztk4yhMgAkwASZglUC9n2irsfgkE2ACDiDQHl2jFyE7MxaV03uinep6aEf/B6HrM7B+Sl/77SqFJGr4h81ARnIg1o++De1U7eA3NQfBL8QjRnMU23N+wAV1D0QtSMHiwE9xj/Z6qCjOnZsRuLg55VGhdpTpAEo1WYSNQuCux+FHnKJyMSA1DSujadGTleAbivjNGVgf+h+MFnU1p1m1tRlsreTPp5gAE2ACTMAuAiqJDJI4MAEmwARchgD5sQzHRCyDge0jXaZVWBAmwASYgD0ErHb+7UnIcZgAE2ACTIAJMAEmwASYgJIAK5ZKGnzMBJgAE2ACTIAJMAEm0GwCPBXebHSckAkwASbABJgAE2ACTEBJgEcslTT4mAkwASbABJgAE2ACTKDZBP4/+avFUdeVG9kAAAAASUVORK5CYII="></p>
<div class="question_part_label">b.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>a. mRNA conveys genetic information from DNA to the ribosomes «where it guides polypeptide production» <br><br>b. gene expression requires the production of specific mRNA «through transcription» </p>
<p>c. most genes are turned off/not being transcribed at any one time/regulated<br><em><strong>OR</strong></em><br>some genes are only expressed at certain times </p>
<p>d. some genes are only expressed in certain cells/tissues<br><em><strong>OR</strong></em><br>«cell» differentiation involves changes in gene expression </p>
<p>e. transcription factors/proteins can increase/decrease transcription </p>
<p>f. hormones/chemical environment of cell can affect gene expression </p>
<p>g. example of cell environment<br><em>eg: auxin/insulin/cytoplasmic gradient in embryo</em></p>
<p>h. transcription factors/proteins may prevent or enhance the binding of RNA polymerase </p>
<p>i. nucleosomes limit access of transcription factors to DNA/regulate gene expression/transcription<br><em><strong>OR</strong></em><br>activate or silence genes </p>
<p>j. DNA methylation/acetylation appears to control gene expression «as epigenetic factor»<br><em><strong>OR</strong></em><br>methylated genes are silenced </p>
<p>k. «some» DNA methylation patterns are inherited </p>
<p>l. introns may contain positive or negative gene regulators<br><em><strong>OR</strong></em><br>gene expression can be regulated by post-transcriptional modification/splicing/mRNA processing</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;">
[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>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 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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>The micrograph shows a cell from the root of an onion (<em>Allium cepa</em>) during mitosis.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the magnification of the image.</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>Deduce the stage of mitosis shown in the micrograph.</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 align="LEFT">The onion (<em>Allium cepa</em><em>) </em>is an angiospermophyte. The honey bee (<em>Apis mellifera</em>) is an arthropod. State <strong>three</strong> structural differences between the cells of an onion and a honey bee.</p>
<p> </p>
<div class="marks">[2]</div>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State what is indicated by the presence of polysomes in a cell.</p>
<div class="marks">[1]</div>
<div class="question_part_label">b.</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>136 <em>(accept answers in the range of 132 to 140) </em></p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>anaphase</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p><img 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" alt></p>
<p><em>Award <strong>[1] </strong>for two correct, <strong>[2] </strong>for three correct answers. </em></p>
<p><em>To award the mark both parts of a comparison must be stated explicitly or unambiguously implied.</em></p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>much protein of one type needed/produced by polysomes;</p>
<p>mRNA is being repeatedly translated;</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>About half of candidates calculated the magnification of the image correctly. Those that did not were usually one more orders of magnitude away from the answer. A common problem was the use of centimetres rather than millimetres to measure the size of the scale bar image. This very often leads to an error of one order of magnitude.</p>
<div class="question_part_label">a(i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was well answered with more than 90% of candidate recognising that the cell was in anaphase.</p>
<div class="question_part_label">a(ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was also well answered by many candidates with each of the three statements in the answer referring both to honey bee cells and to onion cells. A few only mentioned one organism or the other so failed to score any marks. It is not enough to imply a difference in questions such as this – the difference should be stated explicitly.</p>
<div class="question_part_label">a(iii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>This was very poorly answered with fewer than 25% of candidates knowing that polysomes are groups of ribosomes that are translating the same mRNA, which indicates that the cell needs multiple copies of one particular polypeptide.</p>
<div class="question_part_label">b.</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 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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 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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 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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>Genetic engineering allows genes for resistance to pest organisms to be inserted into various crop plants. Bacteria such as <em>Bacillus thuringiensis</em> (Bt) produce proteins that are highly toxic to specific pests.</p>
<p>Stem borers are insects that cause damage to maize crops. In Kenya, a study was carried out to see which types of Bt genes and their protein products would be most efficient against three species of stem borer. The stem borers were allowed to feed on nine types of maize (A–I), modified with Bt genes. The graph below shows the leaf areas damaged by the stem borers after feeding on maize leaves for five days.</p>
<p><img 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" alt></p>
</div>
<div class="specification">
<p>Before the use of genetically modified maize as a food source, risk assessment must be carried out. A 90-day study was carried out in which adult male and female rats were fed either:</p>
<p>• seeds from a Bt maize variety<br> • seeds from the original non-Bt maize variety<br> • commercially prepared rat food.</p>
<p>All the diets had similar nutritional qualities.</p>
<p><img 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" alt></p>
</div>
<div class="specification">
<p>Studies have shown that Bt proteins are released by plant roots and remain in the soil. One study looked at the biomass of microorganisms in soil surrounding the roots of: <br>• Bt maize <br>• non-Bt maize <br>• non-Bt maize with an insecticide (I). </p>
<p>The graph below shows the biomass of microorganisms at two different times in the growth cycle of the plants (Flower and Harvest). Error bars represent standard error of the mean.</p>
<p><img src="data:image/png;base64,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" alt></p>
</div>
<div class="specification">
<p>Bt proteins act as toxins to insects, primarily by destroying epithelial cells in the insect’s digestive system. Below is the three-dimensional structure of one such protein.</p>
<p><img 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" alt></p>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Calculate the percentage difference in leaf area damaged by <em>Sesamia calamistis</em> between the control and maize type H. Show your working.</p>
<div class="marks">[2]</div>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Discuss which species of stem borer was most successfully controlled by the genetic engineering of the maize plants.</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>Calculate the change in mean mass of male and of female rats fed on Bt maize from day 14 to 42.</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 use of Bt maize as a food source on the growth of the rats.</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>Comment on the use of Bt maize as a food source compared to the other diets tested.</p>
<div class="marks">[1]</div>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Compare the biomass of microbes in the soils surrounding the roots of Bt maize and non-Bt maize.</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>The researchers’ original hypothesis stated that microorganisms would be negatively affected by the Bt protein released by the plant roots. Discuss whether the data supports the hypothesis.</p>
<div class="marks">[2]</div>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>State the type of structure shown in the region marked A in the diagram above.</p>
<div class="marks">[1]</div>
<div class="question_part_label">i (i).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Outline how this structure is held together.</p>
<div class="marks">[2]</div>
<div class="question_part_label">i (ii).</div>
</div>
<div class="question" style="padding-left: 20px; padding-right: 20px;">
<p>Region A inserts into the membrane. Deduce, with a reason, the nature of the amino acids that would be expected to be found in this region.</p>
<div class="marks">[2]</div>
<div class="question_part_label">i (iii).</div>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question" style="padding-left: 20px;">
<p>50 12 38 (mm ); <em>Accept 12 50 = 38 </em> </p>
<p>(38 50) 100 ( )76(%); (ECF)</p>
<div class="question_part_label">a.</div>
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<div class="question" style="padding-left: 20px;">
<p><em>Sesamia</em> (was most successfully controlled);<br>in control plants <em>Sesamia</em> caused most damage;<br>all types of Bt/genetically modified maize/A–I show (significant) decrease in damage by <em>Sesamia</em>;<br>mark for correct numerical <span style="text-decoration: underline;">comparison</span>;<br><em>Sesamia</em> caused no damage to type E/ in one instance;<br><em>Busseola</em> not controlled/affected by Bt/genetically modified maize/caused largest amount of damage in types A–I/increased damage in some varieties;<br><em>Eldana</em> controlled by some types of maize / B/C/D but not others / <em>Eldana</em> caused least damage in control and not much difference in many maize types;</p>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px;">
<p><em>males</em>: (440 <em>– </em>325 =)115g ; (<em>Accept answers in range 105–125 g</em>)<br><em>females</em>: (268 <em>–</em> 215 =)53g ; (<em>Accept answers in range 51–57 g</em>)<br><em>Units required, no workings required</em>.</p>
<div class="question_part_label">c.</div>
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<div class="question" style="padding-left: 20px;">
<p>(promotes) highest rate of growth at start of study / tapering off later in the study;<br>Bt maize appears to cause less growth/mass gain than rat food / vice versa;<br>more pronounced difference in females;<br>no difference in growth/mass gain between Bt and non-Bt maize;</p>
<div class="question_part_label">d.</div>
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<div class="question" style="padding-left: 20px;">
<p>(Bt) maize may not be as good as the (commercially prepared) rat food;<br>Bt maize appears to be as good a food source as non-Bt maize;<br>Bt maize an acceptable/safe food source; <br><em>Answers require a judgement about Bt maize as a food source rather than a </em><em>description.</em></p>
<div class="question_part_label">e.</div>
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<div class="question" style="padding-left: 20px;">
<p>(for both groups) overall biomasses were higher during flowering than harvest / vice versa<br>the microbial biomass for the Bt crop was (slightly) lower than for the non-Bt crops at flower time;<br>the microbial biomass for the Bt crop was (slightly) higher than for the non-Bt crops at harvest time;</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>data does not support the hypothesis as there is little difference between biomass found in the soil (surrounding) roots (of the Bt and non-Bt) at either time;<br>data does not support the hypothesis as there is a slightly positive effect at harvest;<br>data supports hypothesis as there is a slightly negative effect at flowering;</p>
<div class="question_part_label">h.</div>
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<div class="question" style="padding-left: 20px;">
<p>helix / alpha helix</p>
<div class="question_part_label">i (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>hydrogen bonds;<br>between the turns of the helix (rather than between R-groups);<br>bonds between carboxyl and NH groups/C-O---H-N;</p>
<div class="question_part_label">i (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>non-polar amino acids/R-groups;<br>(inner part of phospholipid) bilayer is hydrophobic/non-polar;</p>
<div class="question_part_label">i (iii).</div>
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<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question" style="padding-left: 20px;">
<p>In comparison to similar questions in previous years, candidates were relatively successful in answering this question. Where candidates did not answer correctly, it was due to a lack of ability to calculate percent difference rather than a problem with interpreting the data.</p>
<div class="question_part_label">a.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates scored at least one mark. A common error was to interpret the results without comparison to the control.</p>
<div class="question_part_label">b.</div>
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<div class="question" style="padding-left: 20px;">
<p>Most candidates calculated the mean masses correctly and included the correct units.</p>
<div class="question_part_label">c.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates scored at least one mark. A common error was to focus on the difference between male and female rats rather than the food source and to not make reference to growth.</p>
<div class="question_part_label">d.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates gained the mark, but some simply repeated their answer to (d). The command term "comment‟ requires candidates to give a judgment. Commonly, candidates mistakenly described the data in response to this command term.</p>
<div class="question_part_label">e.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates gained both the marks by recognizing the difference between harvest and flowering. Like answer (f), word choice affected performance with candidates referring to the biomass of flowers for example rather than biomass of soil microbes.</p>
<div class="question_part_label">g.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates scored both marks. A common error was to answer without reference to the hypothesis.</p>
<div class="question_part_label">h.</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Many candidates identified the alpha helix, though a surprising number referred to the double helix.</p>
<div class="question_part_label">i (i).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Most candidates identified hydrogen bonds as stabilizing the structure but very few could identify the parts of the molecule that were connected by H-bonds.</p>
<div class="question_part_label">i (ii).</div>
</div>
<div class="question" style="padding-left: 20px;">
<p>Only a minority of candidates recognized the importance of the hydrophobic nature of membrane proteins.</p>
<div class="question_part_label">i (iii).</div>
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