If P (A) is the probability for any event A. then `P (A) lt P (barA).`

For given events A and B if P(A) = 0.25 and P(B) = 0.50 probability that both event occurs together is 0.14. Then ........ is the probability of an event that A and B does not occurs.

For some event A, P(A) = P(barA) is possible.

For any event A, P (A) is always greater than P(barA) .

For events A and B P(bar(A cup B))= (1)/(6), P(barA)= (1)/(4) and P(A cap B) = (1)/(4) , Where (barA) is the complementary event of A then events A and B are

The probability that atleast one of the two events A and B occurs is 0.6. If A and B occur simultaneously with probability 0.3, evaluate P(barA ) + P(barB) .

If P(AcupB)=P(AcapB) for any two events A and B, then ………..

If A and B are any two events such that P (A) + P (B) - P ( A nn B) = P (A) then ___________.

A random variable X has the probability distribution: For the events E = { X is a prime number } and F = { X lt 4} , the probability P(E cup F) is ………..

If (1+3p)/3,(1-p)/1,(1-2p)/2 are the probabilities of 3 mutually exclusive events then find the set of all values of p.

Following Vann diagram show the probabilities of three events. Find the following probabilities. (i) P(E_(2)) (ii) P(E_(2)nnE_(3)) (iii) P(E_(1)uuE_(2)) (iv) P(E_(1)nnE_(2)')