If f is differentiable at x=1, Then `lim_(x to1)(x^2f(1)-f(x))/(x-1)` is

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(x) + f(y) = f(xy-sqrt(1-x^(2))sqrt(1-y^(2))), f(0) = (pi)/(2) and f is differentiable in (-1, 1). Then |lim_(x rarr 0)(2f(x)-pi)/(x)|=

Suppose f(x) is differentiable at x=1 and lim_(h rarr0)(1)/(h)f(1+h)=5, then f'(1) equal

lim_(x to1)(1+logx-x)/(1-2x-x^2) equals

If a differentiable function f(x) satisfies lim_(x to -1) (f(x) +1)/(x^(2)-1)=(3)/(2) Then what is lim_(x to -1) f(x) equal to ?

f(x)=e^x then lim_(x rarr 0) f(f(x))^(1/{f(x)} is

lim_(x rarr oo) (1+f(x))^(1/f(x))

If f(x )=sqrt(25-x^(2)) , then what is lim_(x to 1) (f(x)-f(1))/(x-1) equal to

f(x)=([x]+1)/({x}+1) for f:[0,(5)/(2))rarr((1)/(2),3) where [.] represents the fractional part of x .then which of the following is true ? a) f(x) is injective discontinuous function b) f(x) is surjective non differentiable function c)min(lim_(x)1-f(x),lim_(x)1+f(x))=f(1) (d) max ( x values of point of discontinuity) =f(1)

If f(x)=sqet(25-x^(2)) , then what is Lim_(x to 1) (f(x)-f(1))/(x-1) equal to?