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 Hyper-volume by integration Xorter Fellow Posts: 93 Threads: 30 Joined: Aug 2016 04/08/2017, 01:52 PM (This post was last modified: 04/08/2017, 05:15 PM by Xorter. Edit Reason: spelling ) Hi, everyone! My dream is to get a formula to get the n-dimensional hyper-volume of an n-dimensional function in cartesian AND polar coordinates, too! So the length of f(x), the area of f(x,y), the volume of f(x,y,z) ... etc. According to the other existing formulas I have created an own in cartesian coordinate system: $V_N = \int ... \int_{V_N} \sqrt{1+\sum_{k=1}^N {}{df \over dx_k}} dx_1 ... dx_N$ 1st question: Do you find it correct? 2nd: How could it look in polar coordinate system? (My final goal is to use these formulas to determine a few things about the base units of the hyperdimensional and interdimensional spaces from its derivatives and its existences. But for it, I need these formulas!) Xorter Unizo « Next Oldest | Next Newest »

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