If A and B are independent events of a random experiment show that `A^C and B^C` are also independent.

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)=

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 and B are two events of a random experiment such that P(bar(A))=0.3, P(B)=0.4 " and "P(A cap bar(B))=0.5, " then "P(A cup B)+P(B| A cup bar(B))=

If A,B,C are independent events, shows that AcupBandC are also a independent events.

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)=

A card is selected at random from a pack of 52 cards. Let A be the event that the card is a face card and B be the event that the card is a heart card show that A and B are independent.

MULTIPLICATION THEOREM OF PROBABILITY Statement : If A and B are two events of a random experiment and P(A)gt0 and P(B)gt0 then P(AcapB)=P(A)P((B)/(A))=P(B)P((A)/(B))

If A,B,C are three independent events of an experiment. Such that P(AcapB^(C)capC^(C))=(1)/(4) P(A^(C)capBcapC^(C))=(1)/(8),P(A^(C)capB^(C)capC^(C))=(1)/(4) then find P(A),P(B)and P( C).

A and B are two independent events. If the probability that both A and B occur is 1/20 and the probability that neither of them occurs is 3/5, then P(A)+P(B)=