摘要
通过对《诸乘方变式》、《开方别术》、《开方古义》等著作的研究,阐述了清末数学家华蘅芳(1833—1902年)在方程变换理论、整系数数值高决方程求根方法,及其对“开方作法本源”的新探索等方面所作的出色工作,从而进一步拓展了清代数学家关于方程论的研究领域。
By researching on Zhu Cheng Fang Bian Shi (Transformation of Equations), Kai Fang Bie Shu (A New Method for Solving the Numerical Equations of Higher Degree) and Kai Fang Gu Yi (A Study on Jia Xian's Triangle), this paper reveals Hua Hengfang's contributions to the theory of equations, such as the transformation of equations and the method for solving the numerical equations of higher degree. Thus, Hua's work expanded the field of the theory of equations for mathematicians in the Qing Dynasty.
出处
《自然科学史研究》
CSCD
1996年第3期239-247,共9页
Studies in The History of Natural Sciences
基金
徐州师范大学青年科研基金
关键词
华蘅芳
方程论
方程变换
方程求根
theory of equations
transformation of equations
method for solving the numerical equations of higher degree
Hua Heng fang
