Open Balls and Open Sets
Statements
Corollary. Let be a metric space, every open ball is an topological open set with respect to the induced topology of the metric .
Proof. Trivial from the proof available in Induced Topology of a Metric.
Search
Corollary. Let (X,d) be a metric space, every open ball is an topological open set with respect to the induced topology of the metric d.
Proof. Trivial from the proof available in Induced Topology of a Metric.