Ordered field/Convergent sequences/Rules/1/Fact/Proof

Denote the limits of the sequences by ${\displaystyle {}x}$ and ${\displaystyle {}y}$, respectively. Let ${\displaystyle {}\epsilon >0}$ be given. Due to the convergence of the first sequence, there exists for

${\displaystyle {}\epsilon '={\frac {\epsilon }{2}}\,}$

some ${\displaystyle {}n_{0}}$ such that for all ${\displaystyle {}n\geq n_{0}}$ the estimate

${\displaystyle {}\vert {x_{n}-x}\vert \leq \epsilon '\,}$

holds. In the same way there exists due to the convergence of the second sequence for ${\displaystyle {}\epsilon '={\frac {\epsilon }{2}}}$ some ${\displaystyle {}n_{0}'}$ such that for all ${\displaystyle {}n\geq n_{0}'}$ the estimate

${\displaystyle {}\vert {y_{n}-y}\vert \leq \epsilon '\,}$

holds. Set

${\displaystyle {}N={\max {\left(n_{0},n_{0}'\right)}}\,.}$

Then for all ${\displaystyle {}n\geq N}$ the estimate

${\displaystyle {}{\begin{aligned}\vert {x_{n}+y_{n}-(x+y)}\vert &=\vert {x_{n}+y_{n}-x-y}\vert \\&=\vert {x_{n}-x+y_{n}-y}\vert \\&\leq \vert {x_{n}-x}\vert +\vert {y_{n}-y}\vert \\&\leq \epsilon '+\epsilon '\\&=\epsilon \end{aligned}}}$

holds.