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I'm writing a program in which hyperrectangles are represented by products of closed intervals. So if the dimension is k I use two verctors to represent a hyperrectangle:

min = (x_1,x_2,...,x_k), max = (y_1,y_2,...,y_k) where the hyperrect is the product [x_1,y_1] x ... x [x_k,y_k]

In my program I test whether a k-dim point lies inside the hyperrect or not. Here is how I do it, is it correct?

The point p=(p_1,...,p_k) lies inside the hyperrect if x_i <= p_i <= y_i for all i=1,...,k

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1 Answer 1

Yes (if you don't care about boundary cases).

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What boundary cases? –  saadtaame Oct 24 '13 at 14:34

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