Suppose `f(x)` is differentiable at `x=1` and `lim_(hto0)(1)/(h)(1+h)=5`, then `f'(1)` equals :

If f(x)=f'(x) and f(1) =2 , then f(3) equals :

Evaluate lim_(hto0)(log_(10)(1+h))/h

Let f(x) be a polynomial of degree four having extreme values at x = 1 and x = 2. If lim_(x to 0) [1+(f(x))/(x^(2))]=3 , then f(2) is equal to :

lim_(hto0)(cos^(2)(x+h)-cos^(2)x)/(h) is equal to :

If f(x) is differentiable increasing function, then lim_(x to 0) (f(x^(2)) -f(x))/(f(x)-f(0)) equals :

If f(x) = x tan^(-1)x , then f^(')(1) is equal to

If g is the inverse of a function f and f'(x)=(1)/(1+x^(5)) , then g'(x) is equal to :

Evaluate : lim_(x to 0)[((x+1)^5-1)/(x)] .

Let f(x)=x^(3)-(1)/(x^3) , then f(x)+f((1)/(x)) is equal to :