Integral Representation of Riemann Zeta Function in terms of Fractional Part

Theorem
Let $\zeta$ be the Riemann zeta function.

Let $s\in\C$ be a complex number with real part $\sigma>1$.

Then
 * $\displaystyle \zeta \left({s}\right) = \frac s {s-1} - s \int_1^\infty \left\{{x}\right\} x^{-s - 1} \ \mathrm d x$

where $\left\{{x}\right\}$ denotes the fractional part of $x$.

Proof
We have:

Also see

 * Analytic Continuation of Riemann Zeta Function using Mellin Transform of Fractional Part