Let F X Gt Y Be A Map Between Metric Spaces Prove That If F 3an N 0 Converges In (1)
How do I prove this question about the convergence of sequences implying a function is continuous?
3. Let f : X —> Y be a map between metric Spaces. Prove that if (f @3an n=0 converges in Y whenever (33”)310 converges in X then f is continuous.[Note: it is not given that f (33”) —> f(a:) Whenever sun —> 32.]