Let `f:RtoR` be such that `f(1)=3` and`f'(1)=6`. Then `lim_(xto0)[(f(1+x))/(f(1))]^(1//x)` equals

Let f : R to R be such that f (1) = 3 and f'(1) = 6. Then, lim_( x to 0) [(f(1+x))/(f(1))]^(1//x) equals

f:RtoR such that f(2)=5 and f'(2)=10 then lim_(xto0) ((f(2+x))/(f(2)))^(1//x) is equal to:

A function f:R rarr R is such that f(1)=3 and f'(1)=6. Then lim_(x rarr0)[(f(1+x))/(f(1))]^(1/x)=

Let f:R rarr R be such that f(1)=3andf'(1)=6. Then lim_(x rarr0)((f(1+x))/(f(1)))^(1/x)=(a)1( b) e^((1)/(2))(c)e^(2) (d) e^(3)

Let f:RrarrR be such that f(a)=1, f(a)=2 . Then lim_(x to 0)((f^(2)(a+x))/(f(a)))^(1//x) is

Let R rarr R be such that f(1)=3 and *f'(1)=6. then lim_(x rarr0)((f(1+x))/(f(1))) equal : (1)1(2)e^((1)/(2))(3)e^(2) (4) e^(3)

If f(1)=3 and f'(1)=6 , then lim_(x rarr0)(sqrt(1-x)))/(f(1))

If f'(x)=f(x) and f(0)=1 then lim_(x rarr0)(f(x)-1)/(x)=