Show that `y=log(1+x)-(2x)/(2+x), x gt 1` is an increasing function of `x` throughout its domain.

Show that y= log (1+x) -(2x)/(2+x) , x gt -1 is an increasing function of xthroughout its domain.

Show that y= log (1+x) -(2x)/(2+x) , x gt -1 is an increasing function of xthroughout its domain.

Show that y = log(1+x)-(2x)/(2+x) ,x > -1 is an increasing function of x throughout its domain.

Show that y = log(1 +x) - (2x)/(2 + 2x) , x gt -1 , is an increasing function of x throughout its domain.

Show that y=log(1+x)-(2x)/(2+x),x>-1 is an increasing function of x throughout its domain.

Show that y=log(1+x)-(2x)/(2+x),x>1 is an increasing function of x throughout its domain.

Show that y = log(1+x) - 2x/(2+x), x>-1 , is an increasing function of x. throughout its domain.

Show that y='log(1+x)-(2x)/(2+x)', is an increasing function of x throughout its domain.

Show that y = log (1+x)- frac {2x}{2+x} x> -1 is an increasing function on its domain.

Show that f(x)=(x)/(sqrt(1+x))- ln (1+x) is an increasing function for x gt -1 .