@article {MATHEDUC.06381163,
author = {Conway, John},
title = {A characterization of the equilateral triangles and some consequences.},
year = {2014},
journal = {The Mathematical Intelligencer},
volume = {36},
number = {2},
issn = {0343-6993},
pages = {1-2},
publisher = {Springer US, New York, NY},
doi = {10.1007/s00283-014-9447-3},
abstract = {Equilateral triangles are characterised as having three sides of equal length. The author generalises this characterisation to what he calls Conway's Little Theorem: Equilateral triangles are characterised by the assertion that each ratio of two sides and each ratio of two angles are rational. For the proof, the triangle $ABC$ is placed in the complex plane and scaled such that the side lengths $a$, $b$, $c$ are rational and the angles rational multiples of $\pi$. Expressing the complex number $C$ through $A$, $B$ and the angles and side lengths, Conway finds an equation of the form $c+a\omega^{kq}=b\omega^{kp}$, which holds for all $k$ prime to $n$ (modulo $n$) and where $\omega$ is a primitive $n$th root of unity. This leads to $\phi(n)$ triangles with the given lengths, angles and base $AB$. But there are only two such triangles, which then implies that the angles are positive multiples of $60^\circ$. Hence the triangle is equilateral. Conway also gives two consequences of his Little Theorem: Let a {\it rational angle} be an angle that is a rational multiple of $\pi$. Then, the only rational angle $\theta$ in the open interval $(0,90^\circ)$ for which $\cos\theta$ is rational is $\theta=60^\circ$. The only rational angle $\phi$ in the open interval $(0,90^\circ)$ for which $\sin\phi$ is rational is $\phi=30^\circ$. The other consequence is, the only rational angles for which the square of any of the six standard trigonometric functions is rational (or $\infty$) are the multiples of $30^\circ$ and $45^\circ$.},
reviewer = {Wolfgang Globke (Adelaide)},
msc2010 = {G60xx},
identifier = {2015d.00645},
}