8. Let n, mEN, E eRn, and suppose that D is dense in E; i.e., suppose that

Question:

8. Let n, mEN, E eRn, and suppose that D is dense in E; i.e., suppose that DeE and D = E. If f : D -+ Rm is uniformly continuous on D, prove that f has a continuous extension to E; i.e., prove that there is a continuous function 9 : E -+ Rm such that g(x) = f(x) for all xED.

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