Solution of the Grazing Goat Problem: A Conflict between Beauty and Pragmatism

Communications of the Blyth Institute Pub Date : 2021-08-09 DOI:10.33014/issn.2640-5652.3.2.marks.1

R. Marks

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Abstract

What is the ideal solution of a problem in mathematics? It depends on your nerd ideology. Pure mathematicians worship the beauty of a mathematics result. Closed form solutions are particularly beautiful. Engineers and applied mathematicians, on the other hand, focus on the result independent of its beauty. If a solution exists and can be calculated, that's enough. The job is done. An example is solution of the grazing goat problem. A recent closed form solution in the form of a ratio of two contour integrals has been found for the grazing goat problem and its beauty has been admired by pure mathematicians. For the engineer and applied mathematician, numerical solution of the grazing goat problem comes from an easily derived transcendental equation. The transcendental equation, known for some time, was not considered a beautiful enough solution for the pure mathematician so they kept on looking until they found a closed form solution. The numerical evaluation of the transcendental equation is not as beautiful. It is not in closed form. But the accuracy of the solution can straightforwardly be evaluated to within any accuracy desired. To illustrate, we derive and solve the transcendental equation for a generalization of the grazing goat problem.

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牧羊问题的解决:美与实用的冲突

数学问题的理想解是什么?这取决于你的书呆子意识形态。纯数学家崇拜数学结果的美。封闭形式的解决方案特别漂亮。另一方面，工程师和应用数学家关注的是结果本身，而不是它的美。如果解存在并且可以计算，那就足够了。任务完成了。放牧山羊问题的解决就是一个例子。放牧山羊问题最近以两个轮廓积分之比的形式得到了一个封闭解，它的优美受到了纯数学家的赞赏。对于工程师和应用数学家来说，放牧山羊问题的数值解来自于一个容易推导的超越方程。已知的超越方程，对于纯粹的数学家来说，并不是一个足够漂亮的解，所以他们一直在寻找，直到找到一个封闭形式的解。超越方程的数值计算就不那么漂亮了。它不是封闭的形式。但解的精度可以直接评估到所需的任何精度范围内。为了说明这一点，我们推导并求解了放牧山羊问题的一个推广的超越方程。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Communications of the Blyth Institute

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