EDB — 1NY

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E5

[1NY]Let \(A⊆ ℝ^ n\) be open and let \(f:A→ℝ\) be a function. Show that \(f\) is continuous if and only if, for each curve \(𝛾:[0,1]→ A\) we have that \(f◦ 𝛾\) is continuous.

Solution 1

[1NZ]

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Authors: "Mennucci , Andrea C. G." .

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