f(x) is differentiable, increasing functions, then `lim_(x to 0)(f(x^(2))-f(x))/(f(x)-f(0))` is equal to:

If f'(0)=0 and f(x) is a differentiable and increasing function,then lim_(x rarr0)(x*f'(x^(2)))/(f'(x))

If f(x) is differentiable and strictly increasing function,then the value of lim_(x rarr0)(f(x^(2))-f(x))/(f(x)-f(0)) is 1 (b) 0(c)-1 (d) 2

Let f(x) be a strictly increasing and differentiable function,then lim_(x rarr0)(f(x^(2))-f(x))/(f(x)-f(0))

If f(x) is a differentiable function of x then lim_(h rarr0)(f(x+3h)-f(x-2h))/(h)=

If f is a differentiable function of x, then lim_(h rarr0)([f(x+n)]^(2)-[f(x)]^(2))/(2h)

If f(x) is differentiable at x=a, then lim_(x toa)(x^2f(a)-a^2f(x))/(x-a) is equal to

If f'(2)=6 and f'(1)=4 ,then lim_(x rarr0)(f(x^(2)+2x+2)-f(2))/(f(1+x-x^(2))-f(1)) is equal to ?

If f(x) is differentiable at x=a, find lim_(x rarr a)(x^(2)f(a)-a^(2)f(x))/(x-a)