If `E_1 and E_2` are equally likely, mutually exclusive and exhaustive events and `P(A/E_1)=0.2, P(A/E_2)=0.3`, find `P(E_1/A)`

If A, B and C are mutually exclusive and exhaustive events associated with the random experiment. Find P(A), given that P(B)=3/2P(A), P(C )= P(B)1/2

If A and B are mutually exclusive events, given that P(A) = 3/5, P(B) = 1/5, then P(A uu B) is

If A and B are two mutually exclusive events such that P(B) = 2P(A) and A uu B = S , then P(B) is

If e_1 and e_2 are the eccentricities of a parabola and ellipse respectively, then:

For any two independent events E_1 and E_2 P{(E_1uuE_2)nn(bar(E_1)nnbar(E_2)} is

If e_1 and e_2 are the eccentricities of a hyperbola and its conjugate, prove that: 1/e_1^2+1/e_2^2=1

If P(E_(1)) = p_(1) and P(E_(2)) = p_(2) and E_(1) and E_(2) are independent events then P( neither E_(1) nor E_(2) )=

The Probability that at least one of the events E_(1) and E_(2) will occur is 0.6. If the probability of their occurrence simultaneously is 0.2, then find P(barE_(1))+P(barE_(2))

Given P(A)=3/5 and P(B)=1/5 . Find P(A "U" B) , if A and B are mutually exclusive events.