Let E^c denote the complement of an even...

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 nn F nn G)=0` Then `P(E^c nn F^c nn 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)`

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