If a r. v. X assumes the values 1,2,3,…………,9 with equal probabilities then E(x) = 5.

A r.v. X assumes values 1, 2, 3, …, n with equal probabilities. If Var (X) = E (X), then n =

A r.v. X assumes values 1, 2, 3, …, n with equal probabilities. If Var (X) = 4 E (X), then n =

A random variable X takes values 0, 1, 2, 3,… with probability proportional to (x+1)((1)/(5))^x . P(Xge2) equals

A random variable X takes values 0,1,2,........ with probability proportional to (x with proba bility proportional to (x+1)((1)/(5))^(x), then 5*[P(x<=1)^((1)/(2))] equals

If a c.r.v. X has the probability density function f(x) = C(9-x^(2)), 0 lt x lt 3 = 0 , otherwise Then, the value of C is

The value of int_0^1 e^(x^2) x dx is equal to:

For the following probability distribution. E(X^(2)) is equal to

Let [x] denote the greatest integer less than or equal to x. Then, the values of x in R satisfying the equation [e^(x)]^(2) + [e^(x) + 1] - 3 = 0

The p.m.f. of a r.v. X is P(x) =1/15, for x =1,2, .......... , 14,15 = 0 otherwise. Then, E(X) is equal to

Let X be a random variable which assumes values x_(1),x_(2),x_(3),x_(4) such that 2P(X=x_(1))=3P(X=x_(2))=P(X=x_(3))=5P(X=x_(4)) Find the probability distribution of X .