The function `f(x)=(log(pi+x))/(log(e+x))`s is

The function f(x)=(log(pi+x))/(log(e+x)) is

The function f(x)=log x

The function f(x)=x log x

The function f(x)=(ln(pi+x))/(ln(e+x)) is increasing in (0,oo) decreasing in (0,oo) increasing in (0,(pi)/(e)), decreasing in ((pi)/(e),oo) decreasing in (0,(pi)/(e)), increasing in ((pi)/(e),oo)

Separate the intervals of monotonocity for the function f(x)=(log_(e)x)^(2)+(log_(e)x)

Statement l: f(x)=((log(pi+x))/(log(e+x)) is increasing on ((e)/(pi),(pi)/(e)) statement II: x log x is increasing for x>(1)/(e)

Find the interval of the monotonicity of the function f(x)= log_(e)((log_(e)x)/(x))

For the function f(x) = (log_(e )(1+x)-log_(e )(1-x))/(x) to be continuous at x = 0, the value of f(0) should be

The interval of monotonicity of the function f(x)=(x)/(log_(e)x), is