Let X be random variable with probability density function
`f(x)={{:(2/x^(3), x ge 1), (0, x lt 1):}`
Which of the following statement is correct

A discrete random variable X has probability mass function P(x) then

A continuous random varibale X has probability density function f(x)=kx^(2) 0 le x lt 1 find k (X gt6)

A continuous random varibale X has probability density function f(x)=kx^(2) 0 le x lt 1 find k P(1 lt x lt 5)

For the probabilty density function f(x) [ {:(,cx(1-x)^(3),0 lt x lt 1),(,0,"elsewhere"):} find the constant c.

A continuous random varibale X has probability density function f(x)=kx^(2) 0 le x lt 1 find k find P(X lt 5)

The random variable X has the probability density function f(x)={{:(ax+b, 0 lt x lt 1), (0, "otherwise"):} and E(X)=7/12 , then a and b are respectively

If X is the random variable with probability density function f(x) is given by f(x)={{:(x+1, -1 le x lt 0), (-x+1, 0 le x lt 1), (0,"otherwise"):} then find (i) the distribution function F(x) (ii) P(-0.5 le X le 0.5)

Find the mean of a random variable X, whose probability density function is f(x)={{:(lambdae^(-lambdax), "for " x ge 0), (0, "otherwise"):} .

A continuous random varibale X has probability density function f(x)=kx^(2) 0 le x lt 1 find k find distrubution function