In a certain race there are three boys A, B, C. The winning probability of A is twice than B and the winning probability of B is twice than C. If `P(A) + P(B) + P(C) = 1`, then find the probability of each boy.

In a certain race there are three girls X, Y, Z. The winning probability of X is twice than Y and the winning probability of Y is twice than Z. If P(X) + P(Y) + P(Z) = 1, then find the winning probability of each girl.

In a competition A, B and C are participating. The probability that A wins is twice that of B, the probability that B wins is twice that of C. find the probability that A losses.

For a post,three persons A, B and C appearin the interview. The probability of A being selected is twice that of B and the probability of b being selected is thrice that of C. What of the individual probability of A, B and C being selected?

The probability of A winning a race is 1/2, and that for B is 1/3. Find the probability that only B wins

The probability of A winning a race is 1/2, and that for B is 1/3. Find the probability that only A wins

The probability of A winning a race is 1/2, and that for B is 1/3. Find the probability that both win

If A and B are events having probabilities P(A) = 0.6, P(B) = 0.4 and P(A nn B) = 0 then the probability that neither A nor B occurs is

If the probability of winning a race of an athlete is 1/6 less than the twice the probability of losing the race. Find the probability of winning the race.

If A, B, and C are independent events such that P(A)=P(B)=P(C)=p , then find the probability of occurrence of at least two of A, B, and C.

The probability of A winning a race is 1/2, and that for B is 1/3. Find the probability that none of them wins