The Elementary Formula of an Ellipse Perimeter

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Mathematical Computation

Mathematical Computation is an international comprehensive professional academic journal of Ivy Publisher, concerning the development of mathematical theory and computing application on the combination of mathematical theory and modern industrial technology. The main focus of the journal is the academic papers and comments of latest theoretical and apolitical mathematics improvement in the fields of nature science, engineering technology, economy... [More] Mathematical Computation is an international comprehensive professional academic journal of Ivy Publisher, concerning the development of mathematical theory and computing application on the combination of mathematical theory and modern industrial technology. The main focus of the journal is the academic papers and comments of latest theoretical and apolitical mathematics improvement in the fields of nature science, engineering technology, economy and science, report of latest research result, aiming at providing a good communication platform to transfer, share and discuss the theoretical and technical development of mathematics theory development for professionals, scholars and researchers in this field, reflecting the academic front level, promote academic change and foster the rapid expansion of mathematics theory and application technology.

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ISSN Print:2327-0519

ISSN Online:2327-0527

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Paper Infomation

The Elementary Formula of an Ellipse Perimeter

Full Text(PDF, 6915KB)

Author: Changrun Zhao

Abstract: Looking for the elementary formula of an ellipse perimeter is a world-class problem. After 20 years of hard pursuit and countless failures, the author sees a little light in the maze of science. Integral mean value theorem lays the strong foundation for the existence of elementary formula, and ultimately the formula is found. At the same time, it also raises a new mathematical constant, which is a major breakthrough in the history of mathematics.

Keywords: Ellipse Perimeter, Elementary Formula, Mean Value Theorem, Mathematical Constant

References:

[1] 周志文编《圆锥曲线的八个主要问题》，1981年，福建人民出版社，21页的椭圆方程，52~55页的椭圆性质。

[2] 牛顿著《自然哲学之数学原理》（王克迪译，袁江洋校），2006年北京大学出版社，38~45页，物体在偏心的圆锥曲线上的运动。

[3] 华罗庚著《高等数学引论》（第一卷，第一分册），1979年科学出版社，273~274页，一些不能用已知函数表达的积分。

[4] B.и.斯米尔诺夫著《高等数学教程》（第一卷，孙念增译），223~224页，积分中值定理，316~318页，椭圆周长的近似计算。

[5] B.и.斯米尔诺夫著《高等数学教程》（第三卷，第三分册，叶彦谦译），263~273页，椭圆积分和椭圆函数。

[6] 赵凯华著《定性与半定量物理学》，1991年高等教育出版社，1~3页理论曲线与实验曲线的拟合。

[7] 郭大钧主编《大学数学手册》，1985年山东科学技术出版社，561~573页的特殊函数，985页的数学常数。

[8] 周衍柏主编《理论力学教程》（修订版），1985年高等教育出版社，116~119页的质心运动定理。

[9] 周培源著《理论力学》，1952年，人民教育出版社，22~23页，曲率半径，274页，弹道曲线的曲率。