`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?

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

f(x)=log_(e)x, find value of f(1)

f(x)=e^(ln cot),g(x)=cot^(-1)x

If f(x)=log_(e)[log_(e)x] . then what is f (e) equal to ?

Consider f:(0,oo)rarr(-(pi)/(2),(pi)/(2)), defined as f(x)=tan^(-1)((log_(e)x)/((log_(e)x)^(2)+1))* The about function can be classified as

Draw the graph of f(X)=log_(e)(1-log_(e)x) . Find the point of inflection

If the function f(x)=log(x-2)-log(x-3) and g(x)=log((x-2)/(x-3)) are identical, then

If f(x)=log_(e)(log_(e)x)/log_(e)x then f'(x) at x = e is