Topology from subspace metric equals subspace topology

Statement

Statement with symbols

Suppose ${\displaystyle (X,d)}$ is a metric space. Then, we can consider the induced topology on ${\displaystyle X}$ from the metric.

Now, consider a subset ${\displaystyle Y}$ of ${\displaystyle X}$. The metric on ${\displaystyle X}$ induces a Subspace metric (?) on ${\displaystyle Y}$, by restriction. Thus, there are two possible topologies we can put on ${\displaystyle Y}$:

• The Subspace topology (?) from the topology induced by the metric on ${\displaystyle X}$
• The induced topology from the subspace metric on ${\displaystyle Y}$

These two topologies are the same.

Definitions used

Topology induced by a metric

Subspace topology

Proof

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