Heron's Formula in Higher Dimensions
Author(s)
Havel, Timothy F.
Download6_2023_Article_1305.pdf (1.533Mb)
Publisher with Creative Commons License
Publisher with Creative Commons License
Creative Commons Attribution
Terms of use
Metadata
Show full item recordAbstract
This paper shows how geometric algebra can be used to derive a novel generalization of Heron’s classical formula for the area of a triangle in the plane to higher dimensions. It begins by illustrating some of the many ways in which the conformal model of three-dimensional Euclidean space yields provocative insights into some of our most basic intuitive notions of solid geometry. It then uses this conceptual framework to elucidate the geometric meaning of Heron’s formula in the plane, and explains in detail how it extends naturally to the volumes of tetrahedra in space. The paper closes by outlining a proof of a previously conjectured extension of the formula to the hyper-volumes of simplices in all dimensions.
Date issued
2024-02Department
Massachusetts Institute of Technology. Department of Mechanical EngineeringJournal
Advances in Applied Clifford Algebras
Citation
Havel, Timothy F. 2024. "Heron's Formula in Higher Dimensions." Advances in Applied Clifford Algebras, 34.
Version: Final published version
ISSN
1661-4909