If A and B are any two events of a random experiment then show that
(i) `P(A^(C) nn B^(C)) = P(A^(C)) - P(B) "if A" nn B = phi`
(ii) `P(A^(C)//B^(C)) = (1-P(A uu B))/(1-P(B)) "with P(A)" ne 0 and P(B) ne 1`

If A,B,C are three events in a random experiment, Prove the following. P((A)/(A))=1

If A and B are events of a random experiment such that P(A uuB)=4//5, P(barA uu barB)=7//(10) and P(B)=2/5 then P(A)=

If A, B, C are any three events in an experiment then show that (i) P(A//B^(C)) = (P(A) - P(A nn B))/(1-P(B)) "if P"(B^(C)) gt 0 (ii) A sube B rArr P(A//C) le P(B//C) "if P(C)" gt 0 (iii) If A, B are mutually exclusive, then P(A//B^(C)) = (P(A))/(1-P(B)) "if P(B)" ne 1 (iv) If A, B are mutually exclusive and P(A uu B) ne 0 "then" P(A//A uu B) = (P(A))/(P(A) + P(B))

If A and B are two independent events of a random experiment such that P(A capB) = (1)/(6) and P(overlineA cap overline B) = (1)/(3) , then P(A)=

For any two events A and B, shows that P(A^(C)capB^(C))=1" +"P(AcapB)-P(A)-P(B).

If A,B,C are three events in a random experiment, Prove the following. P(A-B)=P(A)-P(AcapB)

If A,B are two events, then show that P((A)/(B))P(B)+P((A)/(B^(C)))P(B^(C))=P(A).