In mathematics, De Gua's theorem is a three-dimensional analog of the Pythagorean theorem named after Jean Paul de Gua de Malves. It states that if a tetrahedron has a right-angle corner (like the corner of a cube), then the square of the area of the face opposite the right-angle corner is the sum of the squares of the areas of the other three faces: De Gua's theorem can be applied for proving a special case of Heron's formula.[1]

Tetrahedron with a right-angle corner in O

Generalizations

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The Pythagorean theorem and de Gua's theorem are special cases (n = 2, 3) of a general theorem about n-simplices with a right-angle corner, proved by P. S. Donchian and H. S. M. Coxeter in 1935.[2] This, in turn, is a special case of a yet more general theorem by Donald R. Conant and William A. Beyer (1974),[3] which can be stated as follows.

Let U be a measurable subset of a k-dimensional affine subspace of   (so  ). For any subset   with exactly k elements, let   be the orthogonal projection of U onto the linear span of  , where   and   is the standard basis for  . Then   where   is the k-dimensional volume of U and the sum is over all subsets   with exactly k elements.

De Gua's theorem and its generalisation (above) to n-simplices with right-angle corners correspond to the special case where k = n−1 and U is an (n−1)-simplex in   with vertices on the co-ordinate axes. For example, suppose n = 3, k = 2 and U is the triangle   in   with vertices A, B and C lying on the  -,  - and  -axes, respectively. The subsets   of   with exactly 2 elements are  ,   and  . By definition,   is the orthogonal projection of   onto the  -plane, so   is the triangle   with vertices O, B and C, where O is the origin of  . Similarly,   and  , so the Conant–Beyer theorem says

  which is de Gua's theorem.

The generalisation of de Gua's theorem to n-simplices with right-angle corners can also be obtained as a special case from the Cayley–Menger determinant formula.

De Gua's theorem can also be generalized to arbitrary tetrahedra and to pyramids, similarly to how the law of cosines generalises Pythagoras' theorem.[4][5]

History

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Jean Paul de Gua de Malves (1713–1785) published the theorem in 1783, but around the same time a slightly more general version was published by another French mathematician, Charles de Tinseau d'Amondans (1746–1818), as well. However the theorem had also been known much earlier to Johann Faulhaber (1580–1635) and René Descartes (1596–1650).[6][7]

See also

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Notes

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  1. ^ Lévy-Leblond, Jean-Marc (2020). "The Theorem of Cosines for Pyramids". The Mathematical Intelligencer. SpringerLink. doi:10.1007/s00283-020-09996-8. S2CID 224956341.
  2. ^ Donchian, P. S.; Coxeter, H. S. M. (July 1935). "1142. An n-dimensional extension of Pythagoras' Theorem". The Mathematical Gazette. 19 (234): 206. doi:10.2307/3605876. JSTOR 3605876. S2CID 125391795.
  3. ^ Donald R Conant & William A Beyer (Mar 1974). "Generalized Pythagorean Theorem". The American Mathematical Monthly. 81 (3). Mathematical Association of America: 262–265. doi:10.2307/2319528. JSTOR 2319528.
  4. ^ Kheyfits, Alexander (2004). "The Theorem of Cosines for Pyramids". The College Mathematics Journal. 35 (5). Mathematical Association of America: 385–388. doi:10.2307/4146849. JSTOR 4146849.
  5. ^ Tran, Quang Hung (2023-08-02). "A Generalization of de Gua's Theorem with a Vector Proof". The Mathematical Intelligencer. doi:10.1007/s00283-023-10288-0. ISSN 0343-6993.
  6. ^ Weisstein, Eric W. "de Gua's theorem". MathWorld.
  7. ^ Howard Whitley Eves: Great Moments in Mathematics (before 1650). Mathematical Association of America, 1983, ISBN 9780883853108, S. 37 (excerpt, p. 37, at Google Books)

References

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