Statement -1 : if A and B are exhaustive events, then `P(AcupB)=1`
Statement-2 If A and B are independent then `P(AcapB)=P(A).P(B)`

If A and B' are independent events, then P(A'cupB)=1-P(A)P(B') .

Let Aa n dB be two independent events. Statement 1: If P(A)=0. 4a n dP(Auu barB )=0. 9 ,t h e nP(B)i s1//4. Statement 2: If Aa n dB are independent, then P(AnnB)=P(A)P(B)dot .

If the events A and B are independent, then P(AcapB) is equal to

If A and B are two independent events, then P( A and B)=P(A) cdot P(B)

Statement-1 : If A and B are two events such that P(A)=1, then A and B are independent. Statement-2: A and B are two independent events iff P(A cap B)=P(A)P(B)

A and B are two events, such that P(A)=(3)/(5) and P(B)=(2)/(3) if A and B are independent then find P(A intersection B)

Let P(A) = 1/3 , P(B) = 1/6 where A and B are independent events then

if A and B be two events such that P(A)=1/4, P(B)=1/3 and P(AuuB)=1/2, show that A and B are independent events.

If P(A)=2/5 and P(B)=1/3 and A and B are independent events, then find P(AnnB) .

If A and B be two events such that P(A)=1//4, P(B)=1//3 and P(AuuB)=1//2 show that A and B are independent events.