c.d.f F(x) of a continous random variable X is defined as .

The p.d.f of a continous random variable X is f(x)=x/8, 0 lt x lt 4 =0 , otherwise Then the value of P(X gt 3) is

The p.d.f of a continuous random variable X is f(x) = (x^(2))/(3), - 1 lt x lt 2 0 = otherwise Then the c.d.f of X is

The p.d.f. of a continuous random variable X is f(x) = K/(sqrt(x)), 0 lt x lt 4 = 0 , otherwise Then P(X ge1) is equal to

If the p.d.f of a continuous random variable X is f(x)=kx^(2)(1-x), 0 lt x lt 1 = 0 otherwise Then the value of k is

Given the probability density functio (p.d.f) of a continuos random variable X as. f(x)=(x^(2))/(3),-1 lt x lt2 Determine the cumulative distribution function (c.d.f) X and hence find P(X lt1),P(X gt0), P(1 lt X lt 2) .

The following is the p.d.f (Probability Density Function ) of a continous random variable X : f(x) = (x)/(32), 0 lt x lt 8 = 0 , otherwise Find the expression for c.d.f (Cumulative Distribution Function ) of X

The pdf of a discrete random variable is defined as f(x)={{:(kx^2","0lexle6),(0", ""elsewhere"):} Then the value of F(4) is

The following is the p.d.f (Probability Density Function ) of a continous random variable X : f(x) = (x)/(32), 0 lt x lt 8 = 0 , otherwise Also, find its value at x = 0.5 and 9.

The following is the p.d.f of continuous random variable X. f(x) = (x)/(8), 0 lt x lt 4 =0 , otherwise. Find the expression for c.d.f of X

Let X be a continuous random variable with p.d.f. f(x) = kx(1-x), 0 b). . find k and determine anumber b such that P(X le b) = P (X ge b)