A CYCLIC POLYGON PROBLEM
A cyclic polygon is a (convex) polygon whose vertices all lie on the same circle. They have been studied since atleast the time of Euclid and continuing research has revealed many of their properties. Although not all polygons are cyclic, a cyclic polygon with a given set of side lengths has the maximum area for a polygon with these side lengths. Interestingly, for a given circle, multiple non-congruent cyclic polygons with these side lengths may exist, and therefore have this same maximum area. Students will enjoy constructing the different cyclic polygons within a circle. We calculate the number of such non-congruent cyclic polygons, a precise result we could not find in the literature, but one which follows after we show its equivalence to a well-known bracelet problem. However, even here, our case-by-case solution to the bracelet problem that essentially uses only basic counting principles accessible to a large audience follows a much different path than the ones using results from abstract algebra employed by Polya and Burnside.
cyclic polygon, necklace, bracelet, equivalence class.
Received: February 22, 2023; Accepted: March 29, 2023; Published: May 2, 2023
How to cite this article: Shahla Ahdout and Sheldon Rothman, A cyclic polygon problem, Far East Journal of Mathematical Education 24 (2023), 21-34. http://dx.doi.org/10.17654/0973563123008
This Open Access Article is Licensed under Creative Commons Attribution 4.0 International License
References:
[1] Brahmagupta, Propositions XII. 21-27 of Brahmagupta Brhmasphuṭasiddhnta (628 a.d.), https://en.wikipedia.org/wiki/Brahmagupta%27s_formula[2] George Polya, Kombinatorische Anzahlbestimmungen fr Gruppen, Graphem ud chemische Verbindungen, Acta Math. 68 (1937), 145-254.[3] Howard Redfield, The theory of group-reduced distributions, American Journal of Mathematics 49 (1927), 433-455.[4] William Burnside, Theory of Groups of Finite Order, Cambridge University Press, 1897.[5] Ferdinand Georg Frobenius, Ueber die Congruenz nach einem aus zwei endichen Gruppen gebildeten Doppelmodul, Crelle’s Journal 101 (1887), 273-299.
