A random variable X takes the values `0,1,2,3,...,` with prbability `PX(=x)=k(x+1)((1)/(5))^x`, where k is a constant, then `P(X=0)` is.

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 leq 1)^(1/2)] equals

A random variable X takes the values 0,1 and 2. If P(X=1)=P(X=2) and P(X=0)=0.4 then the mean of the random variable X is

If the range of a random variable X is {0,1,2,3 …..,} with P(X = k) = ((k +1))a/3^(k) for k ge 0, then a =

Let X be a distance random variable assuming values x_(1),x_(2) ,…….,x_(n) with probabilities p_(1),p_(2)…..p_(n) respectively . The variance of X is given by :

A random variable X has the following probability distribution : find the value of k

A random variable X has the following probability distribution. Find the value of K.

A random variable ‘X’ has the following probability distribution: Then the value of k is

If lim_(x rarr 0) (1 + px)^(q/x) = e^(4), where p,q in N , then