If A and B are two events, then probability that exactly one of them occurs is -

If A and B are two events, the probability that exactly one of them occurs is given by a. P(A)+P(B)-2P(AnnB) b. P(Ann B )+P( AnnB') c. P(AuuB)-P(AnnB) d. P( A' )+P( B' )-2P( A' nn B' )

If Ma n dN are any two events , the probability that exactly one of them occur is a) P(M)+P(N)-2P(MnnN) b) P(M)+P(N)-P(MnnN) c) P(M^c)+P(N^c)-2P(M^cnnN^c) d) P(MnnN^c)+P(M^cnnN)

If A and B are two events, then the probability that one and only one event occurs is -

Let E and F be two independent events. The probability that exactly one of them occurs is 11/25 and the probability if none of them occurring is 2/25 . If P(T) denotes the probability of occurrence of the event T , then (a) P(E)=4/5,P(F)=3/5 (b) P(E)=1/5,P(F)=2/5 (c) P(E)=2/5,P(F)=1/5 (d) P(E)=3/5,P(F)=4/5

If A and B are two independent events, the probability that both A and B occur is 1/8 are the probability that neither of them occours is 3/8. Find the probaility of the occurrence of A.

If A and B are 2 event with probability P(A) and P(B), then find the probability that exactly one of them occur.

A problem of Statistics is given to three students A, B and C, where chances of solving the problem individually are 1/2, 1/3 and 1/4 respectively. Find the probability that exactly one of them solve the problem.

if P(A|B) = 1/3 , P(A) = 1/4 and P(B) = 1/2, find the probability that exactly one of the events A and B occurs.

Show that the probability that exactly one of the events A and B occurs is P(A) + P(B) - 2P(AB).

The odds against two events are 2:7 and 7:5 respectivel. If the events are independent, find the probability that at least one of them will occur.