[" If "P" is a probability function then show that for any two events "A" and "B],[P(A nn B)<=P(A)<=P(A uu B)<=P(A)+P(B)]

If P is a probability function, then show that for any two events A and B. P(AcapB)leP(A)leP(AcupB)leP(A)+P(B)

If P is a probability function,show that for any two events A,B .P(A nn B)<=P(A)<=P(A uu B)<=P(A)+P(B)

(i) If P is a probability function, show that for any two events A, B. P(AnnB) le P(A) le P(AuuB) le P(A)+P(B) (ii) For any two events A,B show that P(barAnnbarB)=1+P(AnnB)-P(A)-P(B)

For two given events A and B P(A nn B) =

For two given events A and B P(A nn B) =

If A and B are any two events, then P(A nn B') is equal to

For any two sets A and B, prove that P(A nn B)=P(A) nn P(B)

If P(A) and P(B) are the probabilities of occurrence of two events A and B, then the probability that exactly one of the two events occur, is

For any two event A and BP(A nn B)<=P(A)<=P(A uu B)<=P(A)+P(B)