If ` E and F `are the complementary events of events `E and F ,` respectively, and if P(F) `in` [0,1]

Prove that if E and F are independent events, then so are the events E and F'.

If E and F are independent events such that 0ltP(E)lt1 and 0ltP(F)lt1, then

What will be the probability of event E + event not E ?

If E and F are independent events, P (E) = 1/2 and P (F) = 1/3 , then P (E nn F) is :

If E and F are independent events, P(E) = 1/20 and P(F) = 1/3 then P (E cap F) is :

If E and F are inedependent events associated with an experiment then P(E/F) = ___________.

Two dice are thrown together and the total score is noted. The events E, F and G are respectively, a total of 4, a total of 9 or more, and 'a total divisible by 5' calculate P(E), P(F) and P(G) and decide which pair of events, if any, are indepenent.

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 | G) equals

If P (E) denotes probability of occurrence of event E, then :

If E and F are independent events, P(E)=1/(2)andP(F)=1/(3) then P(EnnF) is :