If dominant allele = p, and recessive allele = q,
and p+q = 1, then:
[tex] {(p + q)}^{2} = {p}^{2} + 2pq + {q}^{2} \\ where \: {p}^{2} \: is \: homozygous \: domin \\ {q}^{2} \: is \: homozygous \: recessive \\ and \: 2pq = heterozygous[/tex]
So if 75% have the p, then p^2 = homozygous dominant
[tex] {p}^{2} = {(.75)}^{2} = .5625[/tex]
And if the other 25% have the q, the q^2 = homozygous recessive
[tex] {q}^{2} = {(.25)}^{2} = .0625[/tex]
Now those remaining MUST be the heterozygous, thus 2pq are those:
2pq = 2(.75)(.25) = .375
Therefore homozygous dominant are 56.3% and heterozygous are 37.5%
