Let E^(C ) denote the complement of an ...

Let `E^(C )` denote the complement of an event E. Let E, F, G be pairwise independent events with `P(G) gt 0` and `P(E cap F cap G)=0`. Then `P(E^(C ) cap F^(C )//G)` equals

A

`P(E^(C )) +P(F^(C ))`

B

`P(E^(C ))-P(F^(C ))`

C

`P(E^(C ))-P(F)`

D

`P(E )-P(F^(C ))`

Verified by Experts

The correct Answer is:

C

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