Real numbers/Convergent sequence/Cauchy sequence/Fact/Proof

Let ${\displaystyle {}{\left(x_{n}\right)}_{n\in \mathbb {N} }}$ be a convergent sequence with limit ${\displaystyle {}x}$. Let ${\displaystyle {}\epsilon >0}$ be given. We apply the convergence property for ${\displaystyle {}\epsilon /2}$. Therefore there exists an ${\displaystyle {}n_{0}}$ with

${\displaystyle \vert {x_{n}-x}\vert \leq \epsilon /2{\text{ for all }}n\geq n_{0}.}$

For arbitrary ${\displaystyle {}n,m\geq n_{0}}$ we then have due to the triangle inequality

${\displaystyle {}\vert {x_{n}-x_{m}}\vert \leq \vert {x_{n}-x}\vert +\vert {x-x_{m}}\vert \leq \epsilon /2+\epsilon /2=\epsilon \,.}$