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Exercises

  1. [0ZD]Let \(1≀ d≀ n\) be integers. Let \([0,1]^ d\) be a cube of dimension \(d\), we see it as a subset of \(ℝ^ n\) by defining

    \[ K = [0,1]^ d Γ— \{ (0,0\ldots 0)\} \]

    namely

    \[ K = \{ xβˆˆβ„^ n, 0≀ x_ 1≀ 1, \ldots 0≀ x_ d≀ 1, x_{d+1} = \ldots = x_ n = 0\} \]

    Show that the dimension of \(K\) is \(d\).

    Solution 1

    [0ZF]

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