If `f(x)=e^(x) and g(x)= log_(e)x`, hen which of the following is true?

If f(x)=e^(x) and g(x)=log_(e)x, then (gof)'(x) is

Consider the function f(x)=e^(x) and g(x)=sin^(-1)x, then which of the following is/are necessarily true.

If f(x)=e^(x) , and g(x)=log_(e )x , then value of fog will be

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

Consider the functions f(x)=e^(x) and g(x)=x^(1,000,000). As x rarr oo which of the following is true?

If f(x)=e^(x) and g(x)=log_(e)x(x>0), find fog and gof .Is fog =gof?

Let f: R->R and g: R->R be two non-constant differentiable functions. If f^(prime)(x)=(e^((f(x)-g(x))))g^(prime)(x) for all x in R , and f(1)=g(2)=1 , then which of the following statement(s) is (are) TRUE? f(2) 1-(log)_e2 (c) g(1)>1-(log)_e2 (d) g(1)<1-(log)_e2

If f(x)=e^(x),g(x)=log e^(x) then find fog and gof

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