A New Construction of Holditch Theorem for Homothetic Motions in C p

Erişir, Tülay and Scarfone, Antonio (2021) A New Construction of Holditch Theorem for Homothetic Motions in C p. Advances in Mathematical Physics, 2021. pp. 1-9. ISSN 1687-9120

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Abstract

In this study, the planar kinematics has been studied in a generalized complex plane which is a geometric representation of the generalized complex number system. Firstly, the planar kinematic formulas with one parameter for homothetic motions in the generalized complex plane have been mentioned briefly. Then, the Steiner area formula given areas of the trajectories drawn by the points taken in a generalized complex plane have been obtained during the one-parameter planar homothetic motion. Finally, the Holditch theorem, which gives the relationship between these areas of trajectories, has been expressed for homothetic motions in a generalized complex plane. So, this theorem obtained in this study is the most general form of all Holditch theorems obtained so far.

Item Type: Article
Subjects: Academic Digital Library > Mathematical Science
Depositing User: Unnamed user with email info@academicdigitallibrary.org
Date Deposited: 20 Jan 2023 07:01
Last Modified: 08 Nov 2023 08:57
URI: http://publications.article4sub.com/id/eprint/75

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