Commandino's theorem
Commandino's theorem, named after Federico Commandino (1509–1575), states that the four medians of a tetrahedron are concurrent at a point S, which divides them in a 3:1 ratio. In a tetrahedron a median is a line segment that connects a vertex with the centroid of the opposite face – that is, the centroid of the opposite triangle. The point S is also the centroid of the tetrahedron.[1][2][3]
The theorem is attributed to Commandino, who stated, in his work De Centro Gravitatis Solidorum (The Center of Gravity of Solids, 1565), that the four medians of the tetrahedron are concurrent. However, according to the 19th century scholar Guillaume Libri, Francesco Maurolico (1494–1575) claimed to have found the result earlier. Libri nevertheless thought that it had been known even earlier to Leonardo da Vinci, who seemed to have used it in his work. Julian Coolidge shared that assessment but pointed out that he couldn't find any explicit description or mathematical treatment of the theorem in da Vinci's works.[4] Other scholars have speculated that the result may have already been known to Greek mathematicians during antiquity.[5]
References
- ^ Claudi Alsina, Roger B. Nelsen: A Mathematical Space Odyssey: Solid Geometry in the 21st Century. The Mathematical Association of America, 2015, ISBN 9780883853580, pp. 97–98
- ^ Nathan Altshiller-Court: The Tetrahedron and Its Circumscribed Parallelepiped. The Mathematics Teacher, Vol. 26, No. 1 (JANUARY 1933), pp. 46–52 (JSTOR)
- ^ Norman Schaumberger: Commandino's theorem. The Two-Year College Mathematics Journal, Vol. 13, No. 5 (Nov., 1982), p. 331 (JSTOR)
- ^ Nathan Altshiller Court: Notes on the centroid. The Mathematics Teacher, Vol. 53, No. 1 (JANUARY 1960), pp. 34 (JSTOR)
- ^ Howard Eves: Great Moments in Mathematics (before 1650). MAA, 1983, ISBN 9780883853108, p. 225