[" 27.Let "E^(C)" denote the complement ...

[" 27.Let "E^(C)" denote the complement of an event "E" ."],[" Let "E,F,G" be pairwise independent events with "],[P(G)>0" and "P(E nn F nn G)=0" .The "P(E^(C)nn F^(C)|G)],[" equals "],[[" (a) "P(E^(9))+P(F^(9))," (b) "P(E^(@))-P(F^(C))],[" (c) "P(E^(C))-P(F)," (d) "P(E)-P(F^(C))]]

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[" 27.Let "E^(C)" denote the complement of an event "E" ."],[" Let "E,F,G" be pairwise independent events with "],[P(G)>0" and "P(E nn F nn G)=0" .The "P(E^(C)nn F^(C)|G)],[" equals "],[[" (a) "P(E^(9))+P(F^(9))," (b) "P(E^(@))-P(F^(C))],[" (c) "P(E^(C))-P(F)," (d) "P(E)-P(F^(C))]]

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