For an event E, P(E) + P(`barE`) = x, then the value of `x^3 - 3` is

For any event E, if P(E) = 1, the E is called a:

If P (E ) =0.68 then the value of P ( barE) will be :

If P (E ) =0.01 then the value of P (barE) will be

If P ( barE) = 0.4 then P (E ) is

Given X ~ B( n, p) if p =0.6 E(X) =6, then the value of Var (X) is

If P ( E ) = 0.3 then the P ( not E ) is :

consider an event E=E_(1)capE_(2)capE_(3) find the value of P(E) if P(E_(1))=2/5,P(E_(2)/E_(1))=1/5 and P(E_(3)/(E_(1)E_(2)))=1/10

Let E1 and E2 are two independent events such that P(E1) = 0.3 and P(E2)= 0.6. Find the value of: (i) P(E1nn E2) (ii) P(E1 uu E2) (iii) P(E1//E2)(iv) P(E2//E1)

Given X~B(n,p) if E(X) = 6, Var (X) = 4.2 , find the value of n and p.

If E_(1) and E_(2) are two independent events such that P(E_(1))=0.3 and P(E_(2))=0.6 Then find the value of the given expressions