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

prove int(ax+b)^n dx = (ax+b)^(n+1)/((n+1)a) + c, a ne 0, n ne -1

If f is an odd continuous function in [-1,1] and differentiable in (-1,1) then a. f'(A)=f(1)" for some "A in (-1,0) b. f'(B) =f(1)" for some "B in (0,1) c. n(f(A))^(n-1)f'(A)=(f(1))^(n)" for some " A in (-1, 0), n in N d. n(f(B))^(n-1)f'(B)=(f(1))^(n)" for some" B in (0,1), n in N

If f(x) =x^n and if f’ (1) = 10, find n.

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 ….

Is the function f(X) = {:{((1-x^n)/(1-x), x ne 1),(n-1,x=1):} , n in N continuous at x =1?

If f (x) = (a-x^n)^(1//n) prove that f(f(x)) = x

For n in N, let f_(n) (x) = tan ""(x)/(2) (1+ sec x ) (1+ sec 2x) (1+ sec 4x)……(1+ sec 2 ^(n)x), the lim _(xto0) (f _(n)(x))/(2x) is equal to :

Letf(x) = lim_( n to oo) (x^(n)-sin x^(n))/(x^(n)+sin x^(n)) " for" xgt 0, x ne 1,and f(1)=0 Discuss the continuity at x=1.

If n gt 0 is an odd integer and x = (sqrt(2) + 1)^(n), f = x - [x], " then" (1 - f^(2))/(f) is