1. A Minimization Problem Based on Straight Lines.
- Author
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Fang, Yiqi, Zeng, Xianle, Fan, Rongyu, Chen, Zhu'an, and Ciappina, Marcelo F.
- Subjects
CALCULUS of variations ,MAXIMA & minima ,HISTORY of mathematics - Abstract
This article explores the problem of finding the fastest descent path under uniform gravity, known as the brachistochrone curve. The traditional method involves using variational calculus, but the authors propose a simpler approach using straight lines. By dividing the path into segments and calculating the time for a particle to cover each segment, a curve resembling the brachistochrone can be found. This alternative method helps students understand kinematical and dynamical concepts and introduces them to mathematical optimization. The article also discusses the properties of the cycloid curve and provides equations for calculating the descent time. The authors compare their method to the analytical solution and suggest that prior knowledge of the solution can improve accuracy. [Extracted from the article]
- Published
- 2024
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