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

Suppose f(x) is differentiable at x = 1 and lim_(h->0) 1/h f(1+h)=5 , then f'(1) equal

if f(2)=4,f'(2)=1 then lim_(x->2){xf(2)-2f(x)}/(x-2)

Define f(x) = {{:(x^(2)+bx+c , ",",x lt 1),(x,",",x ge 1):} . If f(x) is differentiable at x = 1 , then (b - c) =

If f(x) {:(=(x^(2)-4x+3)/(x^(2)-1)", ..."x!=1 ),( =2", ..."x=1):} then : a)f(x) is continuous at x=1 b)f(x) is not continuous at x=1 c) lim_(xto1)f(x)=2 d) lim_(xto1)f(x)=2 does not exists.

Let f(x) be a polynomial of degree four having extreme values at x=1 and x=2. IF lim_(xto0) [1+(f(x))/x^2]=3 , then f(2) is equal to

If f(2)=2 and f'(2)=1, and then underset(x to 2) lim (2x^(2)-4f(x))/(x-2) is equal to