geometry Geometry (; ) is a branch of mathematics concerned with properties of space such as the distance, shape, size, and relative position of figures. Geometry is, along with arithmetic, one of the oldest branches of mathematics. A mathematician w ...

, Routh's theorem determines the ratio of areas between a given triangle and a triangle formed by the pairwise intersections of three cevians. The theorem states that if in

triangle A triangle is a polygon with three corners and three sides, one of the basic shapes in geometry. The corners, also called ''vertices'', are zero-dimensional points while the sides connecting them, also called ''edges'', are one-dimension ...

ABC

points

D

E

, and

F

lie on segments

BC

CA

, and

AB

, then writing

\tfrac = x

\tfrac = y

, and

\tfrac = z

, the signed

area Area is the measure of a region's size on a surface. The area of a plane region or ''plane area'' refers to the area of a shape or planar lamina, while '' surface area'' refers to the area of an open surface or the boundary of a three-di ...

of the triangle formed by the cevians

AD

BE

, and

CF

is :

S_ \frac,

where

S_

is the area of the triangle

ABC

. This theorem was given by Edward John Routh on page 82 of his ''Treatise on Analytical Statics with Numerous Examples'' in 1896. The particular case

x = y = z = 2

has become popularized as the

one-seventh area triangle In plane geometry, a triangle ''ABC'' contains a triangle having one-seventh of the area of ''ABC'', which is formed as follows: the sides of this triangle lie on cevians ''p, q, r'' where :''p'' connects ''A'' to a point on ''BC'' that is one-th ...

. The

x = y = z = 1

case implies that the three

median The median of a set of numbers is the value separating the higher half from the lower half of a Sample (statistics), data sample, a statistical population, population, or a probability distribution. For a data set, it may be thought of as the “ ...

s are concurrent (through the

centroid In mathematics and physics, the centroid, also known as geometric center or center of figure, of a plane figure or solid figure is the arithmetic mean position of all the points in the figure. The same definition extends to any object in n-d ...

Proof

Suppose that the area of triangle

ABC

is 1. For triangle

ABD

and line

FRC

, Menelaus's theorem implies :

\frac \times \frac \times \frac = -1

. Then

\frac =  \frac \times \frac = \frac

. Thus the area of triangle

ARC

is :

S_ = \frac S_ = \frac \times \frac S_ = \frac

By similar arguments,

S_ = \frac

and

S_ = \frac

. Thererfore the area of triangle

PQR

is :

\begin
S_ &= S_ - S_ - S_ - S_ \\
&= 1 - \frac - \frac - \frac \\
&=\frac.
\end

Citations

The citation commonly given for Routh's theorem is Routh's ''Treatise on Analytical Statics with Numerous Examples'', Volume 1, Chap. IV, in th
second edition
of 189
p. 82
possibly because that edition was easier to find. However, Routh stated the theorem already in th
first edition
of 1891, Volume 1, Chap. IV
p. 89
Although there is a change in pagination between the editions, the wording of the relevant footnote remained the same. Routh concludes his extended footnote with a caveat:

"The author has not met with these expressions for the areas of two triangles that often occur. He has therefore placed them here in order that the argument in the text may be more easily understood."

Presumably, Routh felt those circumstances had not changed in the five years between editions. On the other hand, the title of Routh's book had been used earlier by Isaac Todhunter; both had been coached by

William Hopkins William Hopkins Fellow of the Royal Society, FRS (2 February 179313 October 1866) was an English mathematician and geologist. He is famous as a private tutor of aspiring undergraduate University of Cambridge, Cambridge mathematicians, earning h ...

. Although Routh published the theorem in his book, the first known published statement and proof was as rider (vii) on page 33 o
Solutions of the Cambridge Senate-house Problems and Riders for the Year 1878
i.e., the Cambridge

Mathematical Tripos The Mathematical Tripos is the mathematics course that is taught in the Faculty of Mathematics, University of Cambridge, Faculty of Mathematics at the University of Cambridge. Origin In its classical nineteenth-century form, the tripos was a di ...

of that year. The author of the problems in that section with roman numerals was James Whitbread Lee Glaisher, who also edited the entire volume. Routh was a well known Tripos coach when his book was published and was surely familiar with the content of the 1878 Tripos examination, though as his statement quoted above suggests, he had perhaps forgotten the source of the theorem in the intervening thirteen years. Problems in this spirit have a long history in

recreational mathematics Recreational mathematics is mathematics carried out for recreation (entertainment) rather than as a strictly research-and-application-based professional activity or as a part of a student's formal education. Although it is not necessarily limited ...

and mathematical paedagogy, perhaps one of the oldest instances of being the determination of the proportions of the fourteen regions of the Stomachion board. With Routh's

Cambridge Cambridge ( ) is a List of cities in the United Kingdom, city and non-metropolitan district in the county of Cambridgeshire, England. It is the county town of Cambridgeshire and is located on the River Cam, north of London. As of the 2021 Unit ...

in mind, the '' one-seventh-area triangle'', associated in some accounts with

Richard Feynman Richard Phillips Feynman (; May 11, 1918 – February 15, 1988) was an American theoretical physicist. He is best known for his work in the path integral formulation of quantum mechanics, the theory of quantum electrodynamics, the physics of t ...

, shows up, for example, as Question 100
p. 80
in ''Euclid's Elements of Geometry
Fifth School Edition
'', by Robert Potts (1805--1885,) of Trinity College, published in 1859; compare also his Questions 98, 99, on the same page. Potts stood twenty-sixth Wrangler in 1832 and then, like Hopkins and Routh, coached at Cambridge. Pott's expository writings in geometry were recognized by
medal
at the International Exhibition of 1862, as well as by an Hon. LL.D. from the

College of William and Mary The College of William & Mary (abbreviated as W&M) is a public research university in Williamsburg, Virginia, United States. Founded in 1693 under a royal charter issued by King William III and Queen Mary II, it is the second-oldest instit ...

, Williamsburg,

Virginia Virginia, officially the Commonwealth of Virginia, is a U.S. state, state in the Southeastern United States, Southeastern and Mid-Atlantic (United States), Mid-Atlantic regions of the United States between the East Coast of the United States ...

References

* Murray S. Klamkin and A. Liu (1981) "Three more proofs of Routh's theorem", ''

Crux Mathematicorum ''Crux Mathematicorum'' is a scientific journal of mathematics published by the Canadian Mathematical Society. It contains mathematical problems for secondary school and undergraduate students. Its editor-in-chief is Kseniya Garaschuk. The journ ...

'' 7:199–203. * H. S. M. Coxeter (1969) ''Introduction to Geometry'', statement p. 211, proof pp. 219–20, 2nd edition, Wiley, New York. * J. S. Kline and D. Velleman (1995) "Yet another proof of Routh's theorem" (1995) ''

'' 21:37–40 * Ivan Niven (1976) "A New Proof of Routh's Theorem", Mathematics Magazine 49(1): 25–7, * Jay Warendorff
Routh's Theorem

The Wolfram Demonstrations Project The Wolfram Demonstrations Project is an open-source collection of interactive programmes called Demonstrations. It is hosted by Wolfram Research. At its launch, it contained 1300 demonstrations but has grown to over 10,000. The site won a Pa ...

. * {{MathWorld , title=Routh's Theorem , urlname=RouthsTheorem
Routh's Theorem by Cross Products
at MathPages * Ayoub, Ayoub B. (2011/2012) "Routh's theorem revisited", ''Mathematical Spectrum'' 44 (1): 24-27. Theorems about triangles Area Affine geometry