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Example Questions
Example Question #1 : Understanding Hardy Weinberg Assumptions And Calculations
Which of the following is NOT an assumption required for Hardy-Weinberg equilibrium?
No migration
Random mating
Population size must fluctuate
No selection is occurring
No mutations
Population size must fluctuate
Hardy-Weinberg states that for a population to be in equilibrium, it must not be experiencing migration, genetic drift, mutation, or selection. By this definition, population size cannot fluctuate.
Example Question #1 : Population Genetics
According to Hardy-Weinberg calculations, a population's allele frequency will remain the same from generation to generation as long as evolution is not occurring. There are five conditions that must be met for equilibrium to remain in effect in a population.
Which of the following is not a condition for Hardy-Weinberg equilibrium to remain in effect?
No mutations may occur
Nonrandom mating must occur
No selection may occur
The population must be large
No gene flow may occur
Nonrandom mating must occur
Random mating must occur in the population in order for the equilibrium to remain. If nonrandom mating occurred, allele frequency in the population would change. The alleles frequency of those mating the most would increase, while that of those mating less would decrease.
Large populations must be used to minimize the effects of genetic drift. Mustations cannot occur, as these could introduce new alleles.
It is important to note that no natural populations exist in Hardy-Weinberg equilibrium. This is simply a theoretical tool.
Example Question #2 : Understanding Hardy Weinberg Assumptions And Calculations
Imagine that a population is in Hardy-Weinberg equilibrium. A certain gene presents as two different alleles, and 49% of the population is homozygous dominant.
What percentage of the population is homozygous recessive?
51%
Further information is needed to solve the problem
42%
9%
9%
When a population is in Hardy-Weinberg equilibrium, we can quantitatively determine how the alleles are distributed in the population. P2 is equal to the proprtion of the population that is homozygous dominant based on the equation p2 + 2pq + q2 = 1. We also know that p + q = 1.
Since P2 = 0.49 in this case, we know that p is equal to 0.7. Since there are only two alleles for this gene, we know that the other allele, q in this case, is 0.3. Since homozygous recessive is referred to as q2 in the equation, we can plug in the value of 0.3 and determine that q2 = 0.09. As a result, we confirm that 9% of the population is homozygous recessive.
Example Question #1 : Population Genetics
In a population of fruit flies, the allele for red eyes is dominant to the allele for white eyes. If 50% the population is heterozygous and 25% is homozygous for white eyes, what is the frequency of the allele for red eyes?
We must remember our two equations for allele frequency, according to Hardy-Weinberg equilibrium.
We know that, in the first equation, each term represents a total percentage of homozygotes or heterozygotes. represents the allele for red eyes and represents white.
Using the information from the question, we can solve for and .
The frequency of each allele is 0.50.
Example Question #2 : Population Genetics
The allele frequencies for a population displaying Hardy-Weinberg equilibrium were found to be dominant and recessive. What percentage of the population is homozygous dominant?
For this question we are going to need to make use of the Hardy-Weinberg equilibrium equations. The equation we need to use is:
These numbers represent the percentages of each genotype found in a given population. We were given the values of and in the question.
After plugging the numbers into the equation, we can find the value of . This value will give us the frequency of homozygous dominant individuals.
Example Question #2 : Population Genetics
A population of snails is in Hardy-Weinberg equilibrium. The snails come in two different colors: red, the dominant phenotype, and white, the recessive phenotype. There are sixteen homozygous dominant, forty-eight heterozygous, and thirty-six homozygous recessive snails.
What are the allele frequencies for this population?
We can solve this question using the Hardy-Weinberg equations:
In the second equation, corresponds to the frequency of homozygous dominant individuals, corresponds to the heterozygous frequency, and corresponds to the frequency of homozygous recessive individuals. We are given enough information to find each of these values from the question.
We can find the values of and by taking the square root of their squares.
Example Question #3 : Population Genetics
A population of snails is in Hardy-Weinberg equilibrium. The snails come in two different colors: red, the dominant phenotype, and white, the recessive phenotype. The population consists of sixty-four red snails and thirty-six white snails.
Assuming that the population is in Hardy-Weinberg equilibrium, what is the value of ?
We can solve this question using the Hardy-Weinberg equations:
is equal to the recessive allele frequency, while in the second Hardy-Weinberg equation corresponds to the frequency of the recessive phenotype.
The question tells us the number of dominant red snails and the number of recessive white snails. Using these values, we can find the frequency of the recessive phenotype.
From here, take the square root to find the value of .
Example Question #3 : Understanding Hardy Weinberg Assumptions And Calculations
A population of snails is originally in Hardy-Weinberg equilibrium. The snails come in two different colors: red, the dominant phenotype, and white, the recessive phenotype. The original population has a dominant allele frequency of and a recessive allele frequency of . A new predator is introduced to the habitat that is particularly fond of the red snails. After a few years the dominant allele frequency has been reduced to .
What is the recessive allele frequency after the introduction of this predator?
Most of the information in the question is actually superfluous because we are given the final dominant allele frequency. The dominant allele frequency corresponds to the variable in the Hardy-Weinberg equations.
The question tells us that the dominant allele frequency after introduction of the predator is . Use this value in the first Hardy-Weinberg equation to solve for the recessive allele frequency, .
Example Question #3 : Population Genetics
A population is in Hardy-Weinberg equilibrium. In the population, 1% of individuals show the recessive trait for blue eyes. What is the value of in this situation?
For a population in Hardy-Weinberg equilibrium, every trait follows the equations:
In these formulas, represents the frequency of the dominant allele and represents the frequency of the recessive allele. represents the frequency of the homozygous dominant genotype, represents the frequency of the heterozygous genotype, and represents the frequency of the homozygous recessive genotype.
In this case, the individuals with blue eyes would be represented by the homozygous recessive genotype. Using this data, we can solve for the frequency of the recessive allele.
Use the frequency of the recessive allele to find the frequency of the dominant allele, .
Example Question #2 : Population Genetics
A population of beetles exists in which black coloration is dominant to white. If there are 64 black beetles in the population, what is the dominant allele frequency?
More information is required to solve
More information is required to solve
It is impossible to determine the allele frequency from the given information.
The problem only tells the number of black beetles, but does not give any information that would allow us to find the total number of beetles in the population. We do not have the homozygous recessive population or the distribution of heterozygotes and homozygous dominant beetles. Given information on the number of white beetles would allow us to calculate the recessive allele frequency, and subsequently the dominant allele frequency.
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