Statement 1: The function `f(x)=x` In `x` is increasing in `(1/e ,oo)` Statement 2: If both `f(x)a n dg(x)` are increasing in `(a , b),t h e nf(x)g(x)` must be increasing in (a,b).

The function f(x)=log (1+x)-(2+x) is increasing in

Prove that the function f(x)=(log)_e x is increasing on (0,\ oo) .

Prove that the function f(x)=(log)_e x is increasing on (0,oo)dot

The function f(x) = tan ^-1 x - In(1 + x^2) is increasing for

The function f(x) = x^(2) e^(-x) strictly increases on

Function f(x)=a^x is increasing on R , if (a) a >0 (b) a 1

The function f(x)=x^2-x+1 is increasing and decreasing in the intervals

The function f(x) = 7 + x - e^(x) is strictly increasing in the interval

Statement 1: The function f(x)=x^4-8x^3+22 x^2-24 x+21 is decreasing for every x in (-oo,1)uu(2,3) Statement 2: f(x) is increasing for x in (1,2)uu(3,oo) and has no point of inflection.

Statement 1 : f(x)=log_(e+x) (pi+x) is strictly increasing for all . Statement 2 : pi+x gt e+x, AA x gt 0