Answer to Question #215653 in Statistics and Probability for marri

1. There are a total of 15 brown-eyed people in the class, so the probability that the first chosen one is brown-eyed is "{p_1} = \\frac{{15}}{{30}} = \\frac{1}{2}" .

The probabilities that the second and third chosen are not brown-eyed are equal, respectively

"{p_2} = \\frac{{15}}{{29}},\\,\\,{p_3} = \\frac{{14}}{{28}} = \\frac{1}{2}" .

So, the wanted probability is "p = {p_1}{p_2}{p_3} = \\frac{1}{2} \\cdot \\frac{{15}}{{29}} \\cdot \\frac{1}{2} = \\frac{{15}}{{116}}"

Answer: "p = \\frac{{15}}{{116}}"

2..

The probabilities that the first and second chosen are women are equal respectively

"{p_1} = \\frac{{20}}{{30}} = \\frac{2}{3},\\,\\,{p_2} = \\frac{{19}}{{29}}"

The probabilities that the third and fourth chosen are men are equal respectively

"{p_3} = \\frac{{10}}{{28}}=\\frac{{5}}{{14}},\\,\\,{p_4} = \\frac{{9}}{{27}}= \\frac{{1}}{{3}}"

So, the wanted probability is "p = {p_1}{p_2}{p_3}{p_4} = \\frac{2}{3} \\cdot \\frac{{19}}{{29}} \\cdot \\frac{{5}}{{14}} \\cdot \\frac{{1}}{{3}} = \\frac{{95}}{{{\\rm{1827}}}}"

Answer: "p = \\frac{{95}}{{{\\rm{1827}}}}"