Limit Points in Particular Point Space/Proof 2

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Theorem

Let $T = \struct {S, \tau_p}$ be a particular point space.

Let $x \in S$ such that $x \ne p$.

Then $x$ is a limit point of $p$.

Proof

Follows directly from:

Particular Point Topology is Closed Extension Topology of Discrete Topology

Limit Points in Closed Extension Space

$\blacksquare$

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