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Main Authors: Celik, Mehmet, Duguin, Mathis, Guo, Jia, Luo, Dianlun, Spinelli, Kamryn, Zeytuncu, Yunus E., Zhu, Zhuoyu
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2410.18863
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author Celik, Mehmet
Duguin, Mathis
Guo, Jia
Luo, Dianlun
Spinelli, Kamryn
Zeytuncu, Yunus E.
Zhu, Zhuoyu
author_facet Celik, Mehmet
Duguin, Mathis
Guo, Jia
Luo, Dianlun
Spinelli, Kamryn
Zeytuncu, Yunus E.
Zhu, Zhuoyu
contents In 2021, Dan Reznik made a YouTube video demonstrating that power circles of Poncelet triangles have an invariant total area. He made a simulation based on this observation and put forward a few conjectures. One of these conjectures suggests that the sum of the areas of three circles, each centered at the midpoint of a side of the Poncelet triangle and passing through the opposite vertex, remains constant. In this paper, we provide a proof of Reznik's conjecture and present a formula for calculating the total sum. Additionally, we demonstrate the algebraic structures formed by various sets of products and the geometric properties of polygons and ellipses created by these products.
format Preprint
id arxiv_https___arxiv_org_abs_2410_18863
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Exploring a Geometric Conjecture, Some Properties of Blaschke Products, and the Geometry of Curves Formed by Them
Celik, Mehmet
Duguin, Mathis
Guo, Jia
Luo, Dianlun
Spinelli, Kamryn
Zeytuncu, Yunus E.
Zhu, Zhuoyu
Complex Variables
30J10, 53A04
In 2021, Dan Reznik made a YouTube video demonstrating that power circles of Poncelet triangles have an invariant total area. He made a simulation based on this observation and put forward a few conjectures. One of these conjectures suggests that the sum of the areas of three circles, each centered at the midpoint of a side of the Poncelet triangle and passing through the opposite vertex, remains constant. In this paper, we provide a proof of Reznik's conjecture and present a formula for calculating the total sum. Additionally, we demonstrate the algebraic structures formed by various sets of products and the geometric properties of polygons and ellipses created by these products.
title Exploring a Geometric Conjecture, Some Properties of Blaschke Products, and the Geometry of Curves Formed by Them
topic Complex Variables
30J10, 53A04
url https://arxiv.org/abs/2410.18863