Real numbers/Bounded, not convergent sequence/pm 1/Example

The alternating sequence

${\displaystyle {}x_{n}:=(-1)^{n}\,}$

is bounded, but not convergent. The boundedness follows directly from ${\displaystyle {}x_{n}\in [-1,1]}$ for all ${\displaystyle {}n}$. However, there is no convergence. For if ${\displaystyle {}x\geq 0}$ were the limit, then for positive ${\displaystyle {}\epsilon <1}$ and every odd ${\displaystyle {}n}$ the relation

${\displaystyle {}\vert {x_{n}-x}\vert =\vert {-1-x}\vert =1+x\geq 1>\epsilon \,}$

holds, so these members are outside of this ${\displaystyle {}\epsilon }$-neighbourhood. In the same way we can argue against some negative limit.