If `A` and `B` are two independent events, prove that `P(AuuB).P(A'nnB')<=P(C)`, where `C` is an event defined that exactly one of `A` and `B` occurs.

If A and B are two independent events,prove that P(A uu B).P(A'nn B')<=P(C), where C is an event defined that exactly one of A and B occurs.

If A and B are two independent events such that P(AuuB)=0. 60\ a n d\ P(A)=0. 2 , find P(B)dot

If A and B are two independent events such that P(A)=0. 3 ,\ P(AuuB)=0. 5 , then P(A//B)-P(B//A)= 2/7 b. 3/(25) c. 1/(70) d. 1/7

If A and B are two independent events such that P(A) gt (1)/(2), P(A nn B^(C ))=(3)/(25) and P(A^(C )nnB)=(8)/(25) , then P(A) is equal to ("where, "A^("c") and B^("c") represent the complement of events A and B respectively)

Let A and B are two independent events such that P(B)=(1)/(2) and P(AnnB)=(1)/(10) , then the value of 9P((barA)/(AuuB)) is

If A and B are two independent events, then, P(AuuB)=(4)/(5) and P(A)=(1)/(3) , then P(B)=

If A and B are two independent events, then P( A and B)=P(A) cdot P(B)

If A and B are two independent events such that P(A)=(1)/(2),P(A uu B)=(3)/(5) and P(B)=p , then p = _________.