Sum of the series `sum_(r=1)^(n) (r^(2)+1)r!` is

Find the sum of the series sum_(r=1)^(n) r x^(r-1) using calculus .

The coefficient of x^(50) in the series sum_(r=1)^(101)rx^(r-1)(1+x)^(101-r) is

A derivable function f : R^(+) rarr R satisfies the condition f(x) - f(y) ge log((x)/(y)) + x - y, AA x, y in R^(+) . If g denotes the derivative of f, then the value of the sum sum_(n=1)^(100) g((1)/(n)) is

Evaluate sum_(r=1)^(n)rxxr!

Consider (1 + x + x^(2))^(n) = sum_(r=0)^(n) a_(r) x^(r) , where a_(0), a_(1), a_(2),…, a_(2n) are real number and n is positive integer. If n is odd , the value of sum_(r-1)^(2) a_(2r -1) is

Find the sum sum_(r=0)^n^(n+r)C_r .

If A_(1), A_(3), ... , A_(2n-1) are n skew-symmetric matrices of same order, then B =sum_(r=1)^(n) (2r-1) (A_(2r-1))^(2r-1) will be

For integer n gt 1 , the digit at unit's place in the number sum_(r=0)^(100) r! + 2^(2^(n)) I

If sum_(r=1)^(n)T_(r)=(n(n+1)(n+2)(n+3))/(12) where T_(r) denotes the rth term of the series. Find lim_(nto oo) sum_(r=1)^(n)(1)/(T_(r)) .

If a_(n) = sum_(r=0)^(n) (1)/(""^(n)C_(r)) , find the value of sum_(r=0)^(n) (r)/(""^(n)C_(r))