If m is mean of distribution, then `sum(x_(i) - m)` is equal to

In the formula bar(x)=a+h(sumf_(i)u_(i))/(sumf_(i)) for finding the mean of grouped frequency distribution u_(i) is equal to

If mu the mean of distribution (y_(i),f_(i)) , then sum f_(i)(y_(i)-mu) =

If x_(i)'s are the mid-points of the class intervals of grouped data, f_(i)'s are the corresponding frequencies and bar(x) is the mean, then sum(f_(i)x_(i)-bar(x)) equal to

A randam variable X has Poisson's distribution with mean 2. Then , P(X)gt 1.5) is equal to

sum_(r=0)^m .^(n+r)C_n is equal to

sum_(i=1)^(n) sum_(i=1)^(n) i is equal to

If in an A.P. the sum of m terms is equal to n and the sum of n terms is equal to m then prove that the sum of (m+n) terms is -(m+n)

If in an A.P. the sum of m terms is equal of n and the sum of n terms is equal to m , then prove that the sum of -(m+n) terms is (m+n) .

The sum of mean and variance of a binomial distribution is 15 and the sum of their squares is 117. Determine the distribution.

In a poisson distribution, the variance is m. The sum of terms in odd places in the distribution is