Hardy-Weinberg Principle
Introduction to Hardy-Weinberg Equilibrium
In this section, the speaker introduces the concept of Hardy-Weinberg equilibrium and explains the assumptions that are necessary for a population to be in this state.
Assumptions for Hardy-Weinberg Equilibrium
- The expression of the gene is simple, with brown being dominant to blue.
- The population has a stable gene pool with respect to eye color, meaning no selection or mutations are taking place.
- A large population is assumed to prevent random changes in allele frequency.
Allele Frequency
- Allele frequency refers to the frequency of a particular allele within a population.
- Allele frequency is different from phenotype frequency, which refers to how frequently a particular trait is observed within a population.
Hardy-Weinberg Equilibrium
- If a population is not evolving and its allele frequencies remain constant, it is said to be in Hardy-Weinberg equilibrium.
- By assuming that a population is in Hardy-Weinberg equilibrium, we can deduce information about genotypes and phenotypes within the population.
Understanding Allele Frequencies and Genotypes
This section explains how to calculate allele frequencies and genotypes in a population.
Calculating Genotype Frequencies
- The sum of all allele frequencies in a population is equal to 1.
- To calculate genotype frequencies, we can square both sides of the equation p + q = 1.
- p^2 represents the frequency of homozygous dominant individuals, q^2 represents the frequency of homozygous recessive individuals, and 2pq represents the frequency of heterozygous individuals.
Applying Genotype Frequency Calculations
- Let's say we observe that 9% of a population have blue eyes. This means that p^2 (the frequency of having two lowercase b alleles) is equal to 9%.
- We can solve for p by taking the square root of 0.09, which gives us a value of 0.3 or 30%.
- Since blue eyes are recessive, we know that only individuals with two lowercase b alleles will have blue eyes. Therefore, the frequency of lowercase b alleles in the population is also equal to 30%.
- The remaining alleles must be uppercase B (brown-eyed), so their frequency is equal to 70%.
Calculating Homozygous Dominant Frequencies
- To calculate the frequency of homozygous dominant individuals (BB), we need to know the frequency of uppercase B alleles in the population.
- Since uppercase B is dominant, BB individuals can only have two uppercase B alleles.
- If uppercase B has a frequency of 70%, then BB has a frequency of (0.7)^2 or approximately 49%.
Understanding Hardy-Weinberg Principle
In this section, we will learn about the Hardy-Weinberg principle and how it helps us understand the frequency of alleles in a population.
Allele Frequency
- 9% of the population has blue eyes, which means that 91% must have brown eyes.
- Of the 91% with brown eyes, 49% are homozygous dominant.
- The remaining 42% are hybrids who also have brown eyes but are not homozygous dominant.
Hardy-Weinberg Equation
- The Hardy-Weinberg equation states that p + q = 1 or 100%, where p is the frequency of one allele and q is the frequency of another allele.
- We know that p (frequency of blue-eyed allele) is 30%, and q (frequency of brown-eyed allele) is 70%.
Phenotype and Genotype Frequencies
- When we square p + q = 1, we get p^2 + 2pq + q^2 = 1.
- This equation helps us determine phenotype frequencies in a population.
- For example, there are only 9% people with blue eyes (p^2), while those with two brown alleles (homozygous dominant) make up for around half (49%) of the population.
- The remaining percentage represents hybrids who carry one copy each of both alleles.
Applications
- The Hardy-Weinberg principle can be used to observe disease frequencies in a population and determine what percentage of individuals may be carriers for certain diseases without showing symptoms.