• Title/Summary/Keyword: ${\ll}$양휘산법(楊輝筭法)${\gg}$

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Liu Yi and Hong Jung Ha's Kai Fang Shu (유익(劉益)과 홍정하(洪正夏)의 개방술(開方術))

  • Hong, Sung-Sa;Hong, Young-Hee;Kim, Young-Wook
    • Journal for History of Mathematics
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    • v.24 no.1
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    • pp.1-13
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    • 2011
  • In Tian mu bi lei cheng chu jie fa(田畝比類乘除捷法) of Yang Hui suan fa(楊輝算法)), Yang Hui annotated detailed comments on the method to find roots of quadratic equations given by Liu Yi in his Yi gu gen yuan(議古根源) which gave a great influence on Chosun Mathematics. In this paper, we show that 'Zeng cheng kai fang fa'(增乘開方法) evolved from a process of binomial expansions of $(y+{\alpha})^n$ which is independent from the synthetic divisions. We also show that extending the results given by Liu Yi-Yang Hui and those in Suan xue qi meng(算學啓蒙), Chosun mathematican Hong Jung Ha(洪正夏) elucidated perfectly the 'Zeng cheng kai fang fa' as the present synthetic divisions in his Gu il jib(九一集).

Chosun mathematics in the 17th Century and Muk Sa Jib San Beob (17세기 조선 산학(朝鮮 算學)과 ${\ll}$묵사집산법(默思集筭法)${\gg}$)

  • Jin, Yuzi;Kim, Young-Wook
    • Journal for History of Mathematics
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    • v.22 no.4
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    • pp.15-28
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    • 2009
  • In this paper, we study the 17th Century Chosun's mathematics book ${\ll}$Muk Sa Jib San Beob${\gg}$ written by Chosun's mathematician Kyeong Seon Jing. Our study of thebook shows the ${\ll}$Muk Sa Jip San Beop${\gg}$ as an important 17th Century mathematics book and also as a historical data showing the mathematical environment of 17th Century Chosun.

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The Unique Achievement of 《SanHak JeongEui 算學正義》on KaiFangFa with count-wood: The refinement of ZengChengKaiFangFa through improvement of estimate-value array (산대셈 개방법(開方法)에 대한 《산학정의》의 독자적 성취: 어림수[상(商)] 배열법 개선을 통한 증승개방법(增乘開方法)의 정련(精鍊))

  • Kang, Min Jeong
    • Journal for History of Mathematics
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    • v.31 no.6
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    • pp.273-289
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    • 2018
  • The KaiFangFa開方法 of traditional mathematics was completed in ${\ll}$JiuZhang SuanShu九章算術${\gg}$ originally, and further organized in Song宋 $Yu{\acute{a}}n$元 dinasities. The former is the ShiSuoKaiFangFa釋鎖開方法 using the coefficients of the polynomial expansion, and the latter is the ZengChengKaiFangFa增乘開方法 obtaining the solution only by some mechanical numerical manipulations. ${\ll}$SanHak JeongEui算學正義${\gg}$ basically used the latter and improved the estimate-value array by referring to the written-calculation in ${\ll}$ShuLi JingYun數理精蘊${\gg}$. As a result, ZengChengKaiFangFa was more refined so that the KaiFangFa algorithm is more consistent.