Answer to Question #122935 in Real Analysis for Ruksan

Question #122935

On R^n show that || . ||∞ ≤ || . ||2

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Expert's answer

Let,"x\\in \\mathbb{R}^n" such that "x=(x_1,\\dots,x_n)" ,thus

"||x||_2=\\sqrt{\\sum_{k=1}^{n}|x_i|^2}"

And,

"||x||_{\\infty}=\\max_{1\\leq i \\leq n}\\{|x_i|\\}"

Let, WLOG , "||x||_{\\infty}=x_k" for some "k\\in\\{1,\\dots,n\\}" but also note that

"||x||_{\\infty}^2=x_k^2\\leq x_1^2+\\dots+x_k^2+\\dots+x_n^2=||x||_2^2\\\\\n\\iff ||x||_{\\infty}\\leq ||x||_2"

Hence, we are done.

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