If the p.d.f of a random variable X is given by `f(x)=(2x)/9, 0 lt x lt 3`, then find E(3X+8).

If a random variable X has the p.d.f. f(x)=k/(x^(2)+1), 0 lt x lt infty , then k is

The probability density function of random variable X is given by f(x)= {(k,1lt=xlt5),(0,"otherwise"):} Find (i) Distribution function (ii) P(X lt 3) " (iii)" P(2ltX lt4) "(iv)" P(3 lt=X)

The cumculative distribution function of a discrete random variable is given by F(x)={{:(0, "for "-infty lt x lt 0), ( 1/2, "for " 0 le x lt 1), (3/5, "for " 1 le x lt 2), (4/5, "for " 2 le x lt 3), (9/10, "for " 3 le x lt 4), (1, "for " 4 le x lt infty):} Find (i) the probability mass function (ii) P(X lt 3) and (iii) P(X ge 2) .

The cumculative distribution function of a discrete random variable is given by F(x)={{:(0, -infty lt x lt -1), (0.15, -1 le x lt 0), (0.35, 0 le x lt 1), (0.60, 1 le x lt 2), (0.85, 2 le x lt 3), (1, 3 le x lt infty):} Find (i) the probability mass function (ii) P(X lt 1) and (iii) P(X ge 2) .

If a continuous random variable X has the p.d.f. f(x)=4k(x-1)^(3) 1<=x<=3 , then find P(1 le X le 2) .

If the probability mass function f(x) of a random variable X is find (i) its cumulative distribution hence find (ii) P (X lt= 3) and , (iii) P( X gt=2)

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)

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 distribution function F(x) given by, F(x)={{:(0, x lt 0), (1/2(x^(2)+x), 0 le x lt 1), (1, x le 1):} then find (i) the probability density function f(x) (ii) P(0.3 le X le 0.6)