Let X be a distance random variable assuming values `x_(1),x_(2) ,…….,x_(n)` with probabilities `p_(1),p_(2)…..p_(n) `respectively . The variance of X is given by :

A random variable X takes values 0, 1, 2, 3,… with probability proportional to (x+1)((1)/(5))^x . P(Xge2) equals

The probability distribution of a random variable X is given by The variance of X is

A random variable X takes the values 0,1,2,3,..., with prbability PX(=x)=k(x+1)((1)/(5))^x , where k is a constant, then P(X=0) is.

Let x_(1), x_(2),….., x_(n) be n observations and x be their arithmetic mean. The formula for the standard deviation is given by :

Let X be a discrete random variable. The probability distribution of X is given below : Then E(X) equal to

The distance between two points p(x_(1),y_(1)) and q(x_(2),y_(2)) is given be :

The distance between the points p(x_(1),y_(1)) and q(x_(2),y_(2)) given by is :

A random variable X has the distribution. Then , variance of the distribution, is

Given that bar(x) is the mean and sigma^(2) is the variance of n observation x_(1), x_(2), …x_(n). Prove that the mean and sigma^(2) is the variance of n observations ax_(1),ax_(2), ax_(3),….ax_(n) are abar(x) and a^(2)sigma^(2) , respectively, (ane0) .