`Aa n dB` are two independent events. `C` is event in which exactly one of `AorB` occurs. Prove that `P(C)geqP(AuuB)P(A'nnB')dot`

If A and B are two independent events the write P(Auu B ) in terms of P(A) and P(B)dot

If M and N are any two events, then the probability that exactly one of them occurs is

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(AuuB).P(A'nnB')<=P(C) , where C is an event defined that exactly one of A and B occurs.

If A ,B ,C be three mutually independent events, then Aa n dBuuC are also independent events. Statement 2: Two events Aa n dB are independent if and only if P(AnnB)=P(A)P(B)dot

If Aa n dB are two events, the probability that exactly one of them occurs is given by P(A)+P(B)-2P(AnnB) P(Ann B )+P( A nnB) P(AuuB)-P(AnnB) P( A )+P( B )-2P( A nn B )

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( barA nnB)=2//15 and P(Ann barB )=1//6 , then P(B) is

If A and B are independent events such that P(A)=p ,\ P(B)=2p\ a n d\ P (Exactly one of A and B occurs ) =5/9 , find the value of pdot

If Aa n dB are two independent events such that P(A)=1//2a n dP(B)=1//5, then a. P(AuuB)=3//5 b. P(A//B)=1//4 c. P(A//AuuB)=5//6 d. P(AnnB// barA uu barB )=0