Given that `f'(2)=6 and f'(1)=4` then `{:("Lim"),(hrarr0):}(f(2h+2+h^(2))-f(2))/(f(h-h^(2)+1)-f(1))` is :

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 EE f'(1)=4,f'(2)=6 then lim_(h rarr0)(f(3h+2+h^(3))-f(2))/(f(2h-2h^(2)+1)-f(1))=

If f'(3)=2, then lim_(h rarr0)(f(3+h^(2))-f(3-h^(2)))/(2h^(2)) is

If f(x) is derivable at x=2 such that f(2)=2 and f'(2)=4 , then the value of lim_(h rarr0)(1)/(h^(2))(ln f(2+h^(2))-ln f(2-h^(2))) is equal to

If f'(a)=(1)/(4), then lim_(h rarr0)(f(a+2h^(2))-f(a-2h^(2)))/(f(a+h^(3)-h^(2))-f(a-h^(3)+h^(2)))=0 b.1 c.-2 d.none of these

Let f be differentiable at x=0 and f'(0)=1 Then lim_(h rarr0)(f(h)-f(-2h))/(h)=

lim_(h to 0) (f(2h+2+h^(2))-f(2))/(f(h-h^(2)+1)-f(1)) given that f'(2) = 6 and f'(1) = 4,