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

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,

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

lim_(h rarr0)(f(2h+2+h^(2))-f(2))/(f(h-h^(2)+1)-f(1)) given that f'(2)=6 and f'(1)=4 does not exist (a) is equal to -(3)/(2) (b) is equal to (3)/(2)(c) is equal to 3

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 :

Let fRtoR be a function we say that f has property 1 if underset(hto0)(lim)(f(h)-f(0))/(sqrt(|h|)) exist and is finite. Property 2 if underset(h to 0)(lim)(f(h)-f(0))/(h^(2)) exist and is finite. Then which of the following options is/are correct?