Answer to Question #217039 in Differential Geometry | Topology for Prathibha Rose

Question #217039
Prove or disaprove ,The closure of an open vall in a metric space.is the corresponding closed ball
1
Expert's answer
2021-07-22T18:16:22-0400

Let "(X,d)" be a metric space where "d" is the discrete metric. Let "x\\in X". Consider the open ball of radius "1" around "x". It's closure is the singleton set "\\{x\\}". But the closed ball of radius "1" is "X" by the definition of the discrete metric. So the assertion is false.


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