Damascus Road
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Let [tex]f: X \rightarrow Y[/tex] be a function. The graph of f is a subset of X x Y given by [tex]G = {(x,f(x) | x \in X }[/tex]. Show that if f is continuous and Y is Hausdorff, then G is closed in X x Y.
Any tips on how to start?
Is it saying that [tex]f: X \rightarrow Y = G[/tex] ?
Any tips on how to start?
Is it saying that [tex]f: X \rightarrow Y = G[/tex] ?
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