Events are said to be independent, if the occurrence or non – occurrence of one does not affect the probability of the occurrence or non – occurrence of the other.
Let $A$ and $B$ be two independent events such that $P(A)=D_{1}$ and $P(B)=p_{2}$. Describe in words the events whose probabilities are $1-\left(1-p_{1}\right)\left(1-p_{2}\right)$
Let $A$ and $B$ be two independent events such that $P(A)=D_{1}$ and $P(B)=p_{2}$. Describe in words the events whose probabilities are $1-\left(1-p_{1}\right)\left(1-p_{2}\right)$