Question

A bag contains $3$ red, $2$ white and $2$ black balls. Two balls are drawn at random and none of them is found to be a white ball. The probability that both balls are red is $\frac{a}{b}$ (where $a,b$ are coprime) then $b-a$ is equal to

Answer 1

Answer: 7

$E=2$ balls drawn, none of them is white
$E_1=$ both balls red
$E_2=$ both balls black
$E_3=$ one red, one black
$P\left(E_1/E\right)=\frac{P\left(E/E_1\right)\cdot P\left(E_1\right)}{P\left(E/E_1\right)\cdot P\left(E_1\right)+P\left(E/E_2\right)\cdot P\left(E_2\right)+P\left(E/E_3\right)\cdot P\left(E_3\right)}$
$=\frac{\frac{\_{}^3{C}_2^{}}{\_{}^7{C}_2^{}}}{\frac{\_{}^3{C}_2^{}}{\_{}^7{C}_2^{}}+\frac{\_{}^2{C}_2^{}}{\_{}^7{C}_2^{}}+\frac{\_{}^3{C}_2^{}\cdot \_{}^2{C}_1^{}}{\_{}^7{C}_2^{}}}=\frac{\_{}^3{C}_2^{}}{\_{}^3{C}_2^{}+\_{}^2{C}_2^{}+\_{}^3{C}_1^{}\cdot \_{}^2{C}_1^{}}$
$=\frac{3}{3+1+3.2}=\frac{3}{10}$