Limit Point in Metric Space iff Limit Point in Topological Space

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

Let $T = \struct {A, \tau}$ be the topological space with the topology induced by $d$.

Let $H \subseteq A$.

Then:
 * $x \in H$ is a limit point in $M$ $x$ is a limit point in $T$

Proof
From Open Balls form Local Basis for Point of Metric Space, the set:
 * $\BB_x = \set{\map {B_\epsilon} x : \epsilon \in \R_{>0}}$

is a local basis of $x$.

From Local Basis Test for Limit Point:
 * $x$ is a limit point of $H$ in $T$ $\forall \epsilon \in \R_{>0}: H \cap \map {B_\epsilon} x \setminus \set x \ne \O$

By definition of a limit point in $M$:
 * $x$ is a limit point of $H$ in $T$ $x$ is an limit point of $H$ in $M$