Metric Space is T5

Theorem
Let $M = \struct {A, d}$ be a metric space.

Then $M$ is a $T_5$ space.

Proof
Let $S, T \subseteq A$ such that $S$ and $T$ are separated in $A$.

Then:
 * each point $x \in S$ has an open $\epsilon$-ball $\map {B_{\epsilon_x} } x$ which is disjoint from $T$


 * each point $y \in T$ has an open $\epsilon$-ball $\map {B_{\epsilon_y} } y$ which is disjoint from $S$.

Then:
 * $U_S = \displaystyle \bigcup_{x \mathop \in S} \map {B_{\epsilon_x / 2} } x$


 * $U_T = \displaystyle \bigcup_{y \mathop \in T} \map {B_{\epsilon_y / 2} } y$

are disjoint open neighborhoods of $S$ and $T$ respectively.

Hence the result by the definition of $T_5$ space.