Element in Bounded Metric Space has Bound

Theorem
Let $M = \left({X, d}\right)$ be a metric space.

Let $M' = \left({Y, d_Y}\right)$ be a subspace of $M$.

Let $M'$ be bounded in $M$.

Then:
 * $\forall a' \in X: \exists K' \in \R: \forall x \in Y: d \left({x, a}\right) \le K'$

That is, if there is one element of $X$ which satisfies the condition for $Y$ to be bounded in $M$, they all do.

Proof
Let $a \in X$ such that $\exists K \in \R: \forall x \in Y: d \left({x, a}\right) \le K$.

Let $a' \in X$.