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Bibliographic Details
Main Authors: Nath, Triloki, Choudhary, Manohar
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2601.11552
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author Nath, Triloki
Choudhary, Manohar
author_facet Nath, Triloki
Choudhary, Manohar
contents In 1775, Fagnano introduced the following geometric optimization problem: inscribe a triangle of minimal perimeter in a given acute-angled triangle. A widely accessible solution is provided by the Hungarian mathematician L. Fejer in 1900. This paper presents a specific generalization of the classical Fagnano problem, which states that given a nonconvex quadrangle (having one reflex angle and others are acute angles), find a triangle of minimal perimeter with exactly one vertex on each of the sides that do not form reflex angle, and the third vertex lies on either of the sides forming the reflex angle. We provide its geometric solution. Additionally, we establish an upper bound for the classical Fagnano problem, demonstrating that the minimal perimeter of the triangle inscribed in a given acute-angled triangle cannot exceed twice the length of any of its sides
format Preprint
id arxiv_https___arxiv_org_abs_2601_11552
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Minimal Perimeter Triangle in Nonconvex Quadrangle: Generalized Fagnano Problem
Nath, Triloki
Choudhary, Manohar
Optimization and Control
51M16, 51M04, 51M25
In 1775, Fagnano introduced the following geometric optimization problem: inscribe a triangle of minimal perimeter in a given acute-angled triangle. A widely accessible solution is provided by the Hungarian mathematician L. Fejer in 1900. This paper presents a specific generalization of the classical Fagnano problem, which states that given a nonconvex quadrangle (having one reflex angle and others are acute angles), find a triangle of minimal perimeter with exactly one vertex on each of the sides that do not form reflex angle, and the third vertex lies on either of the sides forming the reflex angle. We provide its geometric solution. Additionally, we establish an upper bound for the classical Fagnano problem, demonstrating that the minimal perimeter of the triangle inscribed in a given acute-angled triangle cannot exceed twice the length of any of its sides
title Minimal Perimeter Triangle in Nonconvex Quadrangle: Generalized Fagnano Problem
topic Optimization and Control
51M16, 51M04, 51M25
url https://arxiv.org/abs/2601.11552