$$f(x) = \frac{\sqrt{x}\int_a^1 e^{-xs} s^{b+1}~ \mathrm{d}s}{\int_a^1 e^{-xs} s^{b} ~\mathrm{d}s}:\left]0,+\infty\right[\ \to \mathbb{R} $$
where $0 < a < 1$ and $b > 0.$
By applying elementary rules of differentiation I can only prove that the function is monotonically increasing in $\left]\ 0,\frac{1}{1-a}\ \right]$
But I need to prove that it is monotonically increasing in $\left]\ 0,+\infty\ \right[$
