Equivalent metrics $\iff$ same convergent sequences

general-topology metric-spaces

Solution 1:

Hints:

  1. A subset of a metric space is open if and only if its complement is closed.
  2. A subset $A$ of a metric space is closed if and only if for every convergent sequence $a_n \to x$ in $X$ with $a_n \in A$ for all $n$ we also have $x \in A$.

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