The probability distribution of a random variable `X` is given as under: `P(X=x)={k x^2forx=1,2,3 2k xforx=4,5,6 0ot h e r w i s e` , where `k` is a constant. Find (i) `P(Xgeq4` ) (ii) `E(X)` (iii) `E(3X^2)`

The probability distribution of a random variable X is given as under: P(X=x)={(kx^2, fo r (x=1,2,3,4)),(2kx, fo r(x=5,6,7)),(0, otherwise):} where k is a constant. Calculate P(Xge4)

The probability distribution of a random variable X is given as under: Find k , and P (X lt 6) .

The probability distribution of a random variable X is given as under: P(X=x)={(kx2, fo r (x=1,2,3,4)),(2kx, fo r(x=5,6,7)),(0, otherwise):} where k is a constan. Calculate E(3X^2)

The probability distribution of a random variable x is given as under P(X=x)={{:(kx^(2),x="1,2,3"),(2kx,x="4,5,6"),("0,","otherwise"):} where, k is a constant. Calculate (i) E(X) (ii) E(3X^(2)) (iii) P(Xge4)

The probability distribution of a random variable x is given as under P(X=x)={{:(kx^(2),x="1,2,3"),(2kx,x="4,5,6"),("0,","otherwise"):} where, k is a constant. Calculate (i) E(X) (ii) E(3X^(2)) (iii) P(Xge4)

The probability distribution of a random variable X is given as under p(X=x)={:{(kx^(2), x=1 2 3),(2kx,x=4 5 6),(0,"otherwise"):} where k is a constant. Calculate E(X)

The probability distribution of a random variable X is given as under p(X=x)={:{(kx^(2), x=1 2 3),(2kx,x=4 5 6),(0,"otherwise"):} where k is a constant. Calculate P(Xge4)

The probability distribution of a random variable X is given as under p(X=x)={:{(kx^(2), x=1 2 3),(2kx,x=4 5 6),(0,"otherwise"):} where k is a constant. Calculate E(X^(2))

The probability distribution of a random variable X is given as under : P(X=x)={(kx^(2)",",x="1, 2, 3"),(2kx",",x="4,5,6"),(0"", "Otherwise"):} where k is a constant. Calculate (i) E(X), (ii) E(3X^(2)) and (iii) P(x ge 4) .

The probability distribution of a random variable X is given as under: Calculate the value of k if E(X)=2.94.