De Gua's theorem

De Gua's theorem is a three-dimensional analog of the Pythagorean theorem and named for Jean Paul de Gua de Malves.

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.

 A_{ABC}^2 = A_{\color {blue} ABO}^2%2BA_{\color {green} ACO}^2%2BA_{\color {red} BCO}^2

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.

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, Tinseau d'Amondans (1746-1818), as well. However the theorem had been known much earlier to Johann Faulhaber (1580-1635) and René Descartes (1596-1650).[1][2]

Notes

  1. ^ Weisstein, Eric W., "de Gua's theorem" from MathWorld.
  2. ^ Hans-Bert Knoop: Ausgewählte Kapitel zur Geschichte der Mathematik. Lecture Notes (University of Düsseldorf), p. 55 (§ 4 Pythagoreische n-Tupel, p. 50-65) (German)

References

Further reading