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        和算?中算的?承??新-以?孝和的內?法?例

        곡안경,Qu, Anjing The Korean Society for History of Mathematics 2013 Journal for history of mathematics Vol.26 No.4

        Japanese mathematics, namely Wasan, was well-developed before the Meiji period. Seki Takakazu (1642?-1708) is the most famous one. Taking Seki's interpolation as an example, the similarities and differences are made between Wasan and Chinese mathematics. According to investigating the sources and attitudes to this problem which both Japanese and Chinese mathematicians dealt with, the paper tries to show how and why Japanese mathematicians accepted Chinese tradition and beyond. Professor Wu Wentsun says that, in the whole history of mathematics, there exist two different major trends which occupy the main stream alternately. The axiomatic deductive system of logic is the one which we are familiar with. Another, he believes, goes to the mechanical algorithm system of program. The latter featured traditional Chinese mathematics, as well as Wasan. As a typical sample of the succession of Chinese tradition, Wasan will help people to understand the real meaning of the mechanical algorithm system of program deeper.

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        和算家的累约术

        曲安京 한국수학사학회 2013 Journal for history of mathematics Vol.26 No.6

        Japanese mathematics, namely Wasan, was well-developed before the Meiji period. Takebe Katahiro (1664–1739)and Nakane Genkei (1662–1733) , among a great number of mathematicians in Wasan, maybe the most famous ones. Taking Takebe and Nakane’s indefinite problems as examples, the similarities and differences are made between Wasan and Chinese mathematics. According to investigating the sources and attitudes to these problems which both Japanese and Chinese mathematicians dealt with, the paper tries to show how and why Japanese mathematicians accepted Chinese tradition and beyond. As a typical sample of the succession of Chinese tradition,Wasan will help people to understand the real meaning of Chinese tradition deeper. 以和算家的累裁招差法为例, 通过探讨和算家的问题来源, 及其处理这些问题时与中算家的不同方法和态度, 说明中日两国数学家在数学创造方面的一些异同之处。和算作为继承并发展中国古代数学的一个标本, 对于深刻理解机械化的程序算法体系的数学传统, 是有益处的。

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