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

If a random variable "X" takes values ((-1)^(k)2^(k))/k, k=1,2,3,... with probabilities P(X=k)=(1)/(2^(k)) , then E(X)

If the random variable X takes the values x_1,x_2,x_3….,x_(10) with probablilities P (X=x_i)=ki , then the value of k is equal to

A random variable X takes the value -1,0,1. It's mean is 0.6. If P(X=0)=0.2 then P(X=1)=

Gien that X is discrete random variable which take the values, 0,1,2 and P(X=0)=(144)/(169),P(X=1)=(1)/(169) , then the value of P(X=2) is

A random variable X takes values -1,0,1,2 with probabilities 1+2p(1+3p)/(4),(1-p)/(4),(1+2p)/(4),(-14p)/(4) respectively, where p varies over R. Then the minimum and maximum values of the mean of X are respectively

The random variable X can take only the values 0,1,2. If P(X=0)=P(X=1)=p and E(X^(2))=E[X] , then find valu of p.

A random variate X takes the values 0,1,2,3 and its mean is 1.3. If P(X=3)=2P(X=1) and P(X=2)=0.3, then P(X=0) is equal to

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