Let `E` and `F` be tow 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)` deontes the probability of occurrence of the event `T ,` then

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

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

E and F are two independent events. The probability that both E and F happen is 1/12 and the probability that neither E nor F happens is 1/2. Then

If A and B are two independent events, then the probability of occurrence of at least one of A and B is given by 1- P(A') P(B').

Let E_(1), E_(2), E_(3), ....,E_(n) be independent events with respective probabilities p_(1), p_(2), p_(3), ....,p_(n) . The probability that none of them occurs is ……….

The probability that at least one of the events A and B occurs is 0.6. If A and B occur simultaneously with probability 0.2 then P(A')+P(B') is

The probability that an event A occurs in a singal trial of an experiment is 0.3 Six independent trials of the experiment are performed. What is the variance of probability distribution of occurrence of event A ?

A and B are two independent witnesses (i.e., there is no collision between them) in a case. The probability that A will speak the truth is x and the probability that B will speak the truth is y. A and B agree in a certain statement. Show that the probability that the statement is true is (xy)/(1-x-y+2xy) .

In experiment probability that event A occurs in first trail is 0.4 then ………. is the probability that in three independent trial event A occurs.

Of the three independent events E_1, E_2 and E_3, the probability that only E_1 occurs is alpha, only E_2 occurs is beta and only E_3 occurs is gamma. Let the probability p that none of events E_1, E_2 and E_3 occurs satisfy the equations (alpha-2beta), p=alphabeta and (beta-3gamma) p=2beta gamma. All the given probabilities are assumed to lie in the interval (0,1). Then, (probability of occurrence of E_1) / (probability of occurrence of E_3) is equal to