English

On angular measures in axiomatic Euclidean planar geometry

History and Overview 2021-11-16 v4

Abstract

We address the issue of angular measure, which is a contested issue for the International System of Units (SI). We provide a mathematically rigorous and axiomatic presentation of angular measure that leads to the traditional way of measuring a plane angle subtended by a circular arc as the length of the arc divided by the radius of the arc, a scalar quantity. We distinguish between the \emph{angular magnitude}, defined in terms of congruence classes of angles, and the (numerical) \emph{angular measure} that can be assigned to each congruence class in such a way that, e.g., the right angle has the numerical value π2\frac\pi2. We argue that angles are intrinsically different from lengths, as there are angles of special significance (such as the right angle, or the straight angle), while there is no distinguished length in Euclidean geometry. This is further underlined by the observation that, while units such as the metre and kilogram have been refined over time due to advances in metrology, no such refinement of the radian is conceivable. It is a mathematically defined unit, set in stone for eternity. We conclude that angular measures are numbers, and the current definition in SI should remain unaltered.

Keywords

Cite

@article{arxiv.2011.05779,
  title  = {On angular measures in axiomatic Euclidean planar geometry},
  author = {Martin Grötschel and Harald Hanche-Olsen and Helge Holden and Michael P. Krystek},
  journal= {arXiv preprint arXiv:2011.05779},
  year   = {2021}
}

Comments

The earlier version has been split into two companion parts. The other part is the more opinionated one, but short on technical detail. The present part covers the technical side of the issue

R2 v1 2026-06-23T20:04:59.901Z