What question did this study set out to answer?

This research aims to explicitly calculate the Fermat-Torricelli points in spherical and hyperbolic triangles.

April 1, 2026Open Access

Fermat-Torricelli points of a spherical or hyperbolic triangle

Puntos clave

This research aims to explicitly calculate the Fermat-Torricelli points in spherical and hyperbolic triangles.
Defined Fermat-Torricelli points for spherical and hyperbolic triangles.
Calculated the number of Fermat-Torricelli points in each type of triangle.
Explored the angles formed by geodesics passing through these points.
A spherical triangle can have up to 8 Fermat-Torricelli points.
A hyperbolic triangle can have up to 4 Fermat-Torricelli points.
Each Fermat-Torricelli point creates angles of π/3 with extended geodesics.

Resumen

In this paper, we consider and calculate explicitly Fermat-Torricelli points of a spherical or hyperbolic triangle. Fermat-Torricelli point is the point s.t. all angles between two of three extended geodesics passing through the point and vertices are equal to π 3 . A planar triangle has at most 2 Fermat-Torricelli points, however, a spherical (resp. hyperbolic) triangle can have 8 (resp. 4) Fermat-Torricelli points. We also consider another kind of ermat-Torricelli points of a spherical or hyperbolic triangle.

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Cite This Study

Kenzi Satô (Wed,) studied this question.

synapsesocial.com/papers/69cd7b475652765b073a92ca https://doi.org/https://doi.org/10.18880/0002002331

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