Question: assume that E is compact, show that if a sequence {fn} of continuous functions on E and if f is a continuous function on E

assume that E is compact, show that if a sequence {fn} of continuous functions on E and if f is a continuous function on E with the property that for every sequence {xn} that approach x in E, one has lim(n goes infinity) fn(xn) =f(x) the fn converge to f uniformly

inverse of the statement is false actually but what happens when E is compact? i need clear view

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