Given two independent events, if the probability that exactly one of them occurs is `26/49` and the probability that none of them occurs is `15/49`, then the probability of more probable of the two events is :

Given two independent events, if the probability that exactly one of them occurs is 26/49 and the probability that none of them occurs is 15/49, then the probability of more probable of two events is

Given two independent events, if the probability that both the events occur is (8)/(49) , the probability that exactly one of them occurs is (26)/(49) and the probability of more probable of the two events is lambda , then 14 lambda is equal to

Let E and F be two independent events. The probability that exactly one of them occurs is 11//25 and the probability of none of them occurring is 2//25. If P(T) denotes the probability of occurrence of the event T, then

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

Let A and B be two events such that the probability that exactly one of them occurs is 1/5 and the probability that A or B occurs is 1/3 , then the probability of both of them occur together is :

If A and B are two events, the probability that exactly one of them occurs is given by