A) Occurrence of \[E\Rightarrow \] Occurrence of F
B) Occurrence of \[F\Rightarrow \]Occurrence of E
C) Non-occurrence of \[E\Rightarrow \] Non-occurrence of F
D) None of the above implications holds
Correct Answer: D
Solution :
\[P(E)\le P(F)\Rightarrow n(E)\le n(F)\] \[P(E\cap F)>0\Rightarrow E\cap F\ne \varphi \] These do not mean that \[E\] is a sub-set of \[F\] or \[F\] is a sub-set of \[E.\] i.e., \[E\subseteq F\] or \[F\subseteq E\] or \[\bar{E}\subseteq \bar{F}\]You need to login to perform this action.
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