If `f(x)= \sum_{n=1}^{\infty }(sin nx)/(4^(n)) and int_(0)^(pi)f(x) dx="log" ((m)/(n))`, then the value of `(m+n)` is ….

Evaluate int_(0)^(1)((log(1/x))^(n-1)dx .

Prove that : int_(0)^(1)x(1-x)^(n)dx=1/((n+1)(n+2))

int [f(x)]^(n) f'(x) dx = ([f(x)]^(n + 1))/(n + 1) + c, n ne -1

If f(x) is a polynomial of degree n such that f(0)=0 , f(x)=1/2,....,f(n)=n/(n+1) , ,then the value of f (n+ 1) is

Let f:R rarr R and f(x)=(3x^(2)+mx+n)/(x^(2)+1) . If the range of this function is [-4,3] , then the value of (m^(2)+n^(2))/(4) is ….

If int_(n)=int_(-pi)^(pi)(sin nx)/((1+pi^(x))sinx) dx, n=0,1,2,………. then

If m,n in N, then the value of int_a^b(x-a)^m(b-x)^n dx is equal to

int_(0)^(pi/2)(sin^(n)xdx)/(sin^(n)x+cos^(n)x)= ………. .

Let f(x) be a contiuous function such a int_n^(n+1) f(x)dx=n^3, n in Z. Then, the value of the intergral int_-3^3 f(x) dx (A) 9 (B) -27 (C) -9 (D) none of these

Let f be a continuous function on R such that f (1/(4n))=sin e^n/(e^(n^2))+n^2/(n^2+1) Then the value of f(0) is