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<h2>HL Paper 1</h2><div class="question">
<p>William Bateson and Reginald Punnett used the sweet pea (<em>Lathyrus odoratus</em>) in genetics studies in the early 20<sup>th</sup> century. Pure-breeding plants that produced purple flowers and long pollen grains were crossed with pure-breeding plants that produced red flowers and round pollen grains. The resulting offspring all produced purple flowers and long pollen grains. Two of the F<sub>1</sub> generation plants were crossed. The table shows the ratio of phenotypes in the F<sub>2</sub> generation. </p>
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"></p>
<p style="text-align: left;">What is an explanation for these experimental results?</p>
<p style="text-align: left;">A. Purple flowers and long pollen grains are dominant and the alleles have assorted independently.</p>
<p style="text-align: left;">B. The genes for flower colour and pollen shape are linked and all plants producing long pollen grains are recombinants.</p>
<p style="text-align: left;">C. The genes for flower colour and pollen shape are linked and all plants producing red flowers are recombinants.</p>
<p style="text-align: left;">D. Plants producing purple flowers and round pollen grains arose through crossing over.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This was a wordy question that turned out to be quite time consuming. Many candidates failed to realize that if the alleles had assorted independently the ratios would have been 9:3:3:1. The only way the results shown could have been obtained was through genetic linkage between purple and long and red and round. Purple and round are formed by recombination of alleles through crossing over.</p>
</div>
<br><hr><br><div class="question">
<p>When a cell divides by meiosis, chiasmata can be observed. Which are features of chiasmata?</p>
<p style="padding-left:30px;">I. They are points of attachment between chromatids of non-homologous chromosomes.</p>
<p style="padding-left:30px;">II. They occur during meiosis I.</p>
<p style="padding-left:30px;">III. They increase stability of bivalents.</p>
<p>A. I and II only</p>
<p>B. I and III only</p>
<p>C. II and III only</p>
<p>D. I, II and III</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This question discriminated well. Many weaker candidates failed to recognise that item I was incorrect as it referred to points of attachment between non-homologous (as opposed to homologous) chromosomes. This would have been sufficient to eliminate all the incorrect responses.</p>
</div>
<br><hr><br><div class="question">
<p>Which cell is a polyploid zygote produced by fusion of one haploid and one diploid gamete?</p>
<p style="text-align:center;"><img 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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This question proved difficult and few candidates, including those scoring well on the examination, selected the correct response. The great majority of students opted for response D, presumably by thinking haploid = 1, diploid = 2 and when fused you get a cell with 3 chromosomes. For answer D to be correct the original diploid number would need to have been 2 and, in that case, the 3 chromosomes in the cell would be identical in size. Answer A is the only possible response with the original cell having 2n = 4.</p>
</div>
<br><hr><br><div class="question">
<p>What can lead to reproductive isolation after just one generation?</p>
<p>A. Polyploidy</p>
<p>B. Increased mutation rate</p>
<p>C. Changed allele frequencies</p>
<p>D. Independent assortment of chromosomes</p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The graph shows the relationship between mass at birth and the percentage that die shortly after birth for Scottish Blackface lambs.</p>
<p style="text-align:center;"><img 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"></p>
<p style="text-align:center;">[Source: Dwyer, C.M., Conington, J., Corbiere, F., Holmoy, I.H., Muri, K., Nowak, R., Rooke, J., Vipond, J. and Gautier,<br>J.-M., 2016. Invited review: Improving neonatal survival in small ruminants: science into practice. <em>Animal</em>, 10(3),<br>pp. 449–459.]</p>
<p> </p>
<p>What type of selection for the lambs is shown in the graph?</p>
<p>A. Disruptive selection, as there is a drop in mortality at intermediate birth masses</p>
<p>B. Stabilizing selection, as lambs with low or high birth mass are less likely to survive</p>
<p>C. Directional selection, as lambs with a high birth mass have high mortality</p>
<p>D. There is no evidence in the graph of selection, as survival frequency is not shown</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Two thirds of candidates chose the correct answer but the discrimination index was lower than expected. Perhaps some candidates were tiring by this stage of the exam and therefore did not think carefully enough. The shape of the graph looks superficially like disruptive selection, but the y-axis shows mortality, not survival.</p>
</div>
<br><hr><br><div class="question">
<p>Which process could cause non-disjunction if it occurred during meiosis?</p>
<p>A. Sister chromatids do not align in metaphase I.</p>
<p>B. Homologous chromosomes do not separate in anaphase I.</p>
<p>C. Sister chromatids do not align in metaphase II.</p>
<p>D. Homologous chromosomes do not separate in anaphase II.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p style="text-align: left;">The image shows variation in height of adult humans.</p>
<p style="text-align: center;"><img 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"></p>
<p style="text-align: left;">What can explain the variation?</p>
<p style="text-align: left;">A.  One pair of alleles and age</p>
<p style="text-align: left;">B.  Polygenic inheritance and nutrition</p>
<p style="text-align: left;">C.  Nutrition and age</p>
<p style="text-align: left;">D.  Autosomal inheritance only</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What could account for this distribution of height in a population?</p>
<p><img 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"></p>
<p>[Source: Graph adapted from Six Minutes http://sixminutes.dlugan.com/good-public-speaker-average/]</p>
<p>A. Gene linkage</p>
<p>B. Dominant alleles</p>
<p>C. Independent assortment</p>
<p>D. Multiple genes</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>A dihybrid cross was carried out between two plants to determine whether the genes for seed shape and colour are linked. If the genes are unlinked, the expected ratio of 9:3:3:1 should occur. A chi-squared test was carried out on the observed results of the cross. The critical value for chi squared at the 5 % level of significance in this test was 7.82. The calculated value for chi squared was 6.25. What can be concluded from this data?</p>
<p>A. The results prove that the genes are linked.</p>
<p>B. The results prove that the genes are unlinked.</p>
<p>C. There is significant evidence that the genes are linked.</p>
<p>D. There is significant evidence that the genes are unlinked.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>Although slightly less than half of candidates answered correctly and the discrimination index was respectable rather than good, this was a relatively successful question on statistical hypothesis testing, which is typically a difficult area both for question setters and candidates. Performance seems to be improving in this part of the program.</p>
</div>
<br><hr><br><div class="question">
<p>Andalusian fowl have varied colours and types of feathers. The allele for black feathers is codominant with the allele for white, producing blue feathers in the heterozygote. The texture of feathers is controlled by another gene, with silky feathers recessive to normal. Blue silky birds are crossed with black silky birds. What is the expected proportion of blue silky offspring?</p>
<p>A. 0%</p>
<p>B. 25%</p>
<p>C. 50%</p>
<p>D. 100%</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The genetic determination of dogs’ coats can be quite complex, with many different genes acting at the same time.</p>
<p>• The dominant allele <strong>E</strong> gives brown tones. The recessive allele <strong>e</strong> results in red tones.<br>• The colour intensity is due to another gene. The dominant allele <strong>B</strong> gives a dark colour, whereas the recessive allele <strong>b</strong> results in a light colour.</p>
<p>What would be the genotype of a light brown dog produced from a cross between a dark brown dog and a light red dog?</p>
<p>A. EEbb</p>
<p>B. EeBb</p>
<p>C. eeBb</p>
<p>D. Eebb</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The graph shows variations in beak size for the bird <em>Geospiza fortis</em> on an island in the Galápagos archipelago.</p>
<p><img src="data:image/png;base64,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"></p>
<p>What evidence from the graph indicates that disruptive selection is occurring?</p>
<p>A. An intermediate beak size is less common.</p>
<p>B. Median beak size is the most common.</p>
<p>C. Smaller beaks are favoured.</p>
<p>D. Larger beaks are favoured.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Fossil records show that black bears increased in size during the Ice Age and decreased in size with warmer temperatures. What type of selection do these changes in size represent?</p>
<p>A. Allopatric<br>B. Directional<br>C. Disruptive<br>D. Stabilizing</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What is always passed to the next generation as a result of sexual reproduction?</p>
<p>A. Homologous chromosomes from the mother</p>
<p>B. A chromatid from every chromosome of the father</p>
<p>C. A haploid set of chromosomes from the mother</p>
<p>D. All alleles from each parent</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What process occurs in both mitosis and meiosis?</p>
<p>A. Formation of chiasmata</p>
<p>B. Reduction division</p>
<p>C. Separation of chromatids</p>
<p>D. Exchange of alleles between non-sister chromatids</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which event happens in meiosis II but not in meiosis I?</p>
<p>A. Spindle microtubules attach to centromeres.</p>
<p>B. Crossing over occurs.</p>
<p>C. Sister chromatids move to opposite poles.</p>
<p>D. Chromosomes become shorter and thicker by coiling.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Many commercially produced bananas are triploid instead of diploid. The nucleus of a triploid cell has three sets of chromosomes. What is the effect of triploidy?</p>
<p>A. Seeds are larger.</p>
<p>B. Chromosomes cannot pair in meiosis.</p>
<p>C. Sexual reproduction is more rapid.</p>
<p>D. Mitosis cannot occur.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>In fruit flies (<em>Drosophila melanogaster</em>), grey bodies (b<sup>+</sup>) are dominant to black bodies (b) and normal wings (vg<sup>+</sup>) are dominant to vestigial wings (vg). Homozygous vestigial winged, black bodied flies were crossed with individuals that were heterozygous for both traits. 2300 individuals were counted and the phenotypes observed were recorded as shown.</p>
<p style="text-align:center;">965 normal wings, grey bodies <br>944 vestigial wings, black bodies<br> 206 vestigial wings, grey bodies <br>185 normal wings, black bodies</p>
<p style="text-align:left;">&nbsp;</p>
<p style="text-align:left;">Which statement is valid?</p>
<p style="text-align:left;">A. The predicted phenotypic ratio was 9:3:3: 1.</p>
<p style="text-align:left;">B. There is independent assortment of wings but not body colour.</p>
<p style="text-align:left;">C. The expected number of vestigial winged, grey bodied flies was 575.</p>
<p style="text-align:left;">D. The traits are on different chromosomes.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This proved to be the third most difficult question, with all of the four choices attracting some candidates. Perhaps the 1:1:1:1 ratio from a dihybrid test cross was unfamiliar. It was not a quick question to answer and was close to the end of the exam, but the number of questions left unanswered by candidates (blanks) did not rise with the last few questions, suggesting that lack of time was not the problem.</p>
</div>
<br><hr><br><div class="question">
<p>What is polyploidy?</p>
<p>A. Having an extra set of chromosomes</p>
<p>B. Having an extra sex chromosome</p>
<p>C. Having an extra autosome</p>
<p>D. Having two or more nuclei</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>The cheetah (<em>Acinonyx jubatus</em>) is a large cat found in Africa. It has been discovered that organs could be transferred between any two individuals without rejection of the organ.</p>
<p>What is the probable reason for this?</p>
<p>A. Cheetahs have poor reproductive success.</p>
<p>B. Cheetahs have high heterozygosity.</p>
<p>C. Cheetahs have a large gene pool.</p>
<p>D. Cheetahs have a small gene pool.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
<p>This question discriminated well.</p>
</div>
<br><hr><br><div class="question">
<p>Natural selection can operate in different ways. What is the effect of disruptive selection?</p>
<p>A. It eliminates individuals with intermediate forms of a characteristic.</p>
<p>B. It eliminates individuals at random regardless of their characteristics.</p>
<p>C. It favours individuals with intermediate forms of a characteristic.</p>
<p>D. It favours individuals at one extreme of the range of variation in a characteristic.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>How do the concepts of gradualism and punctuated equilibrium differ?</p>
<p>A. The timing of evolution</p>
<p>B. The mechanism causing evolution</p>
<p>C. The sequence of evolutionary events</p>
<p>D. The reality of evolution</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which statement is valid regarding chromatids?</p>
<p>A. Sister chromatids separate during meiosis I.</p>
<p>B. Chiasmata form between non-sister chromatids.</p>
<p>C. Crossing over is the exchange of DNA between sister chromatids only.</p>
<p>D. Non-sister chromatids have the same combination of alleles.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which gametes can result from the following crossover?</p>
<p><img src="data:image/png;base64,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"></p>
<p> </p>
<p> </p>
<p> </p>
<p> </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>D</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>In a plant, dark leaves are dominant to pale leaves and yellow seeds are dominant to white seeds.</p>
<p>A heterozygous dark-leaved plant with yellow seeds was crossed with a pale-leaved plant with white seeds. A large number of offspring were produced. They were either dark-leaved with yellow seeds or pale-leaved with white seeds in equal number.</p>
<p>What is the <strong>most</strong> likely cause of this pattern?</p>
<p>A. Crossing over has occurred.</p>
<p>B. The two genes are linked.</p>
<p>C. The traits are polygenic.</p>
<p>D. The genes are codominant.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>An individual is heterozygous for two linked genes <img src="data:image/png;base64,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">.</p>
<p>To investigate the frequency of crossing over, a test cross is carried out between the individual and another that is homozygous recessive for both genes. What are the possible recombinants in the offspring of this cross?</p>
<p><img src="data:image/png;base64,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"></p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Which example shows disruptive selection?</p>
<p>A. Giraffe necks have become longer over time.</p>
<p>B. Medium-sized beaks in hummingbirds have decreased in frequency over time.</p>
<p>C. The peppered moth became less common in polluted environments.</p>
<p>D. Human babies with a very high or a very low birth mass have a higher mortality rate. </p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Some of the ratios that Morgan investigated in genetic crosses did not correspond with expected Mendelian ratios.  What was the cause?</p>
<p>A. The genetic crosses used insects rather than plants.<br>B. The results were counted more reliably than Mendel’s.<br>C. The genes in the genetic crosses were linked.<br>D. <em>Drosophila</em> has more genes than plants.</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>C</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>What forms when two different chromatids of the same homologous pair cross over?</p>
<p>A. Daughter centromere</p>
<p>B. Chiasma</p>
<p>C. Chromosome mutation</p>
<p>D. Telomere</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>B</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>A hunter tends to kill the bigger individuals of a population for their meat or for large ornamental trophies. Therefore, the population tends to have more individuals who are smaller. What is this an example of?</p>
<p>A. Directional selection</p>
<p>B. Disruptive selection</p>
<p>C. Natural selection</p>
<p>D. Stabilizing selection</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br><div class="question">
<p>Three-spined stickleback fish (<em>Gasterosteus aculeatus</em>) vary in the number of armour plates. The graph shows the frequency of individuals with low, partial or complete plating in a three-spined stickleback population living in Kennedy Lake, Vancouver Island, Canada.</p>
<p style="text-align:center;"><img src="data:image/png;base64,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"></p>
<p style="text-align:center;">[Source: Reprinted from <em>Current Biology</em>, 24, Marchinko, K.B., Matthews, B., Arnegard, M.E., Rogers, S.M. and Schluter, D., Maintenance of a Genetic Polymorphism with Disruptive Natural Selection in Stickleback. <br>2014.  pp.1289–1292 with permission from Elsevier.]</p>
<p style="text-align:left;"> </p>
<p style="text-align:left;">Which type of natural selection could result in this pattern of variation in the population?</p>
<p style="text-align:left;">A. Disruptive</p>
<p style="text-align:left;">B. Directional</p>
<p style="text-align:left;">C. Stabilizing</p>
<p style="text-align:left;">D. Convergent</p>
</div>
<h2 style="margin-top: 1em">Markscheme</h2>
<div class="question">
<p>A</p>
</div>
<h2 style="margin-top: 1em">Examiners report</h2>
<div class="question">
[N/A]
</div>
<br><hr><br>