Let $X$ be a metric space. I want to show that:
If a subset $A \subset X$ is totally bounded, then its closure $\overline{A}$ is totally bounded.
Definition of "totally bounded": A set $A$ is totally bounded if, for each $\varepsilon > 0$, there is a finite $F\subset A$ such that $A \subset \bigcup_\limits{x \in F} B(x, \varepsilon) $.
This is part of a bigger problem I want to prove.