= Metric space aimed at its subspace
{wiki=Metric_space_aimed_at_its_subspace}
In the context of topology and metric spaces, a **metric space** is a set \\( X \\) along with a metric \\( d \\) that defines a distance between any two points in \\( X \\). A **subspace** of a metric space is essentially a subset of that metric space that inherits the structure of the original space. \#\#\# Definition of Metric Space A metric space \\( (X, d) \\) consists of: - A set \\( X \\).
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