If `P(A)=(1)/(2)`, `P(B)=(1)/(5)`, A and B are independent events then `P((A)/(AuuB))=`

If P(A) =(3)/(5) and P (B)=(1)/(5) find P(A cap B) if A and B are independent events.

If A and B are two independent events such that P(B) = 2/7, P(AcupB)=0.8 , then P(A)=

Suppose A and B are independent events with P(A)=0.6, P(B)=0.7 then compute

Prove that A and B are independent events if and only if P((A)/(B))=P((A)/(B^(C)))

If A, B are independent events with P (A) =0.2, P (B) = 0.5 Find P(A nn B)

Suppose A and B are independent events with P (A)= 0.6 P (B) = 0.7. Compute P (A nn B)

Suppose A and B are independent events with P (A) = 0.6 P (B) = 0.7. Compute P (B//A)

If A and B are two independent events such that P(B) =(2)/(7) and P(A uuB^(C )) = 0.8, " then " p(A uuB) =

Observe the following statements : Statement-1 : The probabilities of the events A,B and C are respectively (2)/(3) , (1)/(4) and (1)/(6) then A,B,C are exhaustive Statement-2 : If the probability for A to fail in an examination is 0.2 and that for B is 0.3 then the probability that either A or B fails is 0.5 Statement-3 : If A and B are two independent events then P(AnnbarB)+P(A)P(B)=P(A) Which of the above are false

If P(A)=(1)/(3)P(B) and P(AuuB)=0.5 . When A, B are mutually exclusive events. Then P(A)=