The probability distribution function of a random variable x is given by

value of c is `(1)/(k)` find k

The probability distribution of a random variable X is given as follows: Find the value of k.

The probability fuction of a random variable is always

If f(x) is the probability distribution function of a random variable X and X can assume only two values x_1 and x_2 then the value of f(x_1)+f(x_2) is

Probability Distribution of Random variable

The probability density function of a random variable X is f(x) = k(x-1)^2 , 1 le x le 2 . The value of the constant K is

The probability distribution of random variable X is given as follows : {:(X = x_(i),0,1,2,),(p_(i),3k^(3),4k - 10k^(2),5k -1,):} Find the value of k.

The probability distribution P(x) of a random variable X is given by p(X=x)={(K,when x=0),(2K,when x=1),(3K, when x=2),(0,elsewhere):} ,where K is a constant. The value of K is

In each case determine wheather the given values can be looked upon as the values of a probability distribution of a random variable which can take up only the values 1,2,3 and 4 and explain your answer : f(x)=(x+1)/(4) .

State which of the following are not the probability distributions of a random variable. Give reasons for your answer.