X is continuous random variable with probability density function `f(x)=(x^(2))/(8),0 le x le 1`. Then, the value of `P(0.2leXle0.5)` is

Let X is a continuous random variable with probability density function f(x)={{:(x/6+k,0lexle3),(0," otherwise"):} The value of k is equal to

Let X be a continuous random variable whose probability density function is f(x)=x^3/4 for 0 What is the value of the constant c, that makes f(x) a valid probabilitty density function? What is cdf of X?

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

If f (x) =x ^(2) -6x +5,0 le x le 4 then f (8)=

If f (x) =x ^(2) -6x + 9, 0 le x le 4, then f(3) =

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

If the p.d.f of a random variable X is f(x)={(0.5x, 0lexle2), (0, "otherwise"):} Then the value of P(0.5 le X le 1.5) is