Answer to Question #122938 in Real Analysis for Ruksan

Question #122938

Show that {fn}, where fn : [0, 1] → R is the map fn(x) = x
n, is not uniformly convergent.

Expert's answer

Given "f_n: \\ [0,1] \\to R" such that "f_n(x) =x^n" .

Now, Pointwise convergence is "\\lim_{n\\to \\infin} f_n(x) = \\lim_{n\\to \\infin} x^n = \\begin{cases} 0 \\ if \\ x\\in[0,1) \\\\ 1 \\ if \\ x=1 \\end{cases}" .

Each "f_n(x) =x^n" is continuous for every n but it's pointwise limit is not continuous. So "f_n(x)" is not uniformly convergent.

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Answer to Question #122938 in Real Analysis for Ruksan

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