`f(x)=log_(e)x, g(x)=1/(log_(x)e)` . Identical function or not?

f(x)=In" "e^(x), g(x)=e^(Inx) . Identical function or not?

f(x)=sqrt(1-x^(2)), g(x)=sqrt(1-x)*sqrt(1+x) . Identical functions or not?

int log_e xdx = int 1/(log_x e) dx =

f(x)=log_(e)abs(log_(e)x) . Find the domain of f(x).

f(x)=log_(x^(2)) 25 and g(x)=log_(x)5. Then f(x)=g(x) holds for x belonging to

If f(x)=log_(x^(2))(logx) ,then f '(x)at x= e is

Which pair of functions is identical? a. sin^(-1)(sinx) " and " sin(sin^(-1)x) b. log_(e)e^(x),e^(log_(e)x) c. log_(e)x^(2),2log_(e)x d. None of the above

If f(x)=log_(e)x, g(x)=x^(2) and c in (4, 5), then clog((4^(25))/(5^(16))) is equal to

If f(x) =|log_(e)|x||, then f'(x) equals

If f(x) =|log_(e)|x||, then f'(x) equals