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

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 the values 0,1,2,3,..., with probability P(X=x)=k(x+1)((1)/(5))^x , where k is a constant, then P(X=0) is.

Random variable X takes integer values from 1 to n with equal probabilities then E(X) = ………..

A random variable X has the following probability distribution : then P(X le 1) = ….......

Let X be a random variable taking values x_(1), x_(2), x_(3), ......., x_(n) with probabilities p_(1), p_(2),p_(3),………, p_(n) respectively. Then var (X) = ………..

The random variable X can take only the values 0, 1, 2. Given that P(X = 0) = P(X = 1) = p and that E(X^(2)) = E(X) , find the value of p.

A random variable X has the following probability distribution: Determine (i) K (ii) P(X lt 3) (iii) P(X gt 6) (iv) P(0 lt X lt 3)

If a random variable X can take all non- negative integral values and the probability that X takes the value r is proportional to alpha^(r)(0 lt alpha lt 1) then P(X = 0) is ………..

Mean and variance of random variable X are 2 and 1 respectively. Then ……….. is the probability that X takes more than one value.