Japanese mathematics

Template:Short description Template:Nihongo denotes a distinct kind of mathematics which was developed in Japan during the Edo period (1603–1867). The term wasan, from wa ("Japanese") and san ("calculation"), was coined in the 1870s^[1] and employed to distinguish native Japanese mathematical theory from Western mathematics (洋算 yōsan).^[2]

In the history of mathematics, the development of wasan falls outside the Western realm. At the beginning of the Meiji period (1868–1912), Japan and its people opened themselves to the West. Japanese scholars adopted Western mathematical technique, and this led to a decline of interest in the ideas used in wasan.

Records of mathematics in the early periods of Japanese history are nearly nonexistent. Though it was at this time that a large influx of knowledge from China reached Japan, including that of reading and writing, little sources exist of usage of mathematics within Japan. However, it is suggested that this period saw the use of an exponential numbering system following the law of ${\displaystyle a^m*a^n=a^{m+n}}$.^[3]

The Japanese mathematical schema evolved during a period when Japan's people were isolated from European influences, but instead borrowed from ancient mathematical texts written in China, including those from the Yuan dynasty and earlier. The Japanese mathematicians Yoshida Shichibei Kōyū, Imamura Chishō, and Takahara Kisshu are among the earliest known Japanese mathematicians. They came to be known to their contemporaries as "the Three Arithmeticians".^[4][5]

Yoshida was the author of the oldest extant Japanese mathematical text, the 1627 work called Jinkōki. The work dealt with the subject of soroban arithmetic, including square and cube root operations.^[6] Yoshida's book significantly inspired a new generation of mathematicians, and redefined the Japanese perception of educational enlightenment, which was defined in the Seventeen Article Constitution as "the product of earnest meditation".^[7]

Seki Takakazu founded enri (円理: circle principles), a mathematical system with the same purpose as calculus at a similar time to calculus's development in Europe. However Seki's investigations did not proceed from the same foundations as those used in Newton's studies in Europe.^[8]

Mathematicians like Takebe Katahiro played an important role in developing Enri (" circle principle"), an analog to the Western calculus.^[9] He obtained power series expansion of ${\displaystyle (\arcsin (x){)}^2}$ in 1722, 15 years earlier than Euler. He used Richardson extrapolation in 1695, about 200 years earlier than Richardson.^[10] He also computed 41 digits of π, based on polygon approximation and Richardson extrapolation.^[11]

The following list encompasses mathematicians whose work was derived from wasan. Template:Dynamic list

• Yoshida Mitsuyoshi (1598–1672)
• Seki Takakazu (1642–1708)
• Takebe Kenkō (1664–1739)
• Matsunaga Ryohitsu (fl. 1718-1749)^[12]
• Kurushima Kinai (d. 1757)
• Arima Raido (1714–1783)^[13]
• Fujita Sadasuke (1734-1807)^[14]
• Ajima Naonobu (1739–1783)
• Aida Yasuaki (1747–1817)
• Sakabe Kōhan (1759–1824)
• Fujita Kagen (1765–1821)^[14]
• Hasegawa Ken (c. 1783-1838)^[13]
• Wada Nei (1787–1840)
• Shiraishi Chochu (1796–1862)^[15]
• Koide Shuke (1797–1865)^[13]
• Omura Isshu (1824–1871)^[13]

• Japanese theorem for cyclic polygons
• Japanese theorem for cyclic quadrilaterals
• Hungarian mathematics
• Sangaku, the custom of presenting mathematical problems, carved in wood tablets, to the public in Shinto shrines
• Soroban, a Japanese abacus
• Category:Japanese mathematicians

Template:Reflist

• Campbell, Douglas M. and John C. Iggins. (1984). Mathematics: People, Problems, Results. Belmont, California: Warsworth International. Template:ISBN; Template:ISBN; Template:ISBN; OCLC 300429874
• Endō Toshisada (1896). Template:Nihongo. Tōkyō: _____. OCLC 122770600
• Fukagawa, Hidetoshi, and Dan Pedoe. (1989). Japanese temple geometry problems = Sangaku. Winnipeg: Charles Babbage. Template:ISBN; OCLC 474564475
• __________ and Dan Pedoe. (1991) Template:Nihongo Tōkyō. Template:ISBN; OCLC 47500620
• __________ and Tony Rothman. (2008). Sacred Mathematics: Japanese Temple Geometry. Princeton: Princeton University Press. Template:ISBN; OCLC 181142099
• Horiuchi, Annick. (1994). Les Mathematiques Japonaises a L'Epoque d'Edo (1600–1868): Une Etude des Travaux de Seki Takakazu (?-1708) et de Takebe Katahiro (1664–1739). Paris: Librairie Philosophique J. Vrin. Template:ISBN; OCLC 318334322
• __________. (1998). "Les mathématiques peuvent-elles n'être que pur divertissement? Une analyse des tablettes votives de mathématiques à l'époque d'Edo." Extrême-Orient, Extrême-Occident, volume 20, pp. 135–156.
• Kobayashi, Tatsuhiko. (2002) "What kind of mathematics and terminology was transmitted into 18th-century Japan from China?", Historia Scientiarum, Vol.12, No.1.
• Kobayashi, Tatsuhiko. Trigonometry and Its Acceptance in the 18th-19th Centuries Japan.
• Ogawa, Tsukane. "A Review of the History of Japanese Mathematics". Revue d'histoire des mathématiques 7, fascicule 1 (2001), 137-155.
• Restivo, Sal P. (1992). Mathematics in Society and History: Sociological Inquiries. Dordrecht: Kluwer Academic Publishers. Template:ISBN; OCLC 25709270
• Selin, Helaine. (1997). Encyclopaedia of the History of Science, Technology, and Medicine in Non-Western Cultures. Dordrecht: Kluwer/Springer. Template:ISBN; OCLC 186451909
• David Eugene Smith and Yoshio Mikami. (1914). A History of Japanese Mathematics. Chicago: Open Court Publishing. OCLC 1515528; see online, multi-formatted, full-text book at archive.org

• Japan Academy, Collection of native Japanese mathematics
• JapanMath, Math program focused on Math Fact Fluency and Japanese originated logic games
• Sangaku
• Sansu Math, translated Tokyo Shoseki Japanese math curriculum
• Kümmerle, Harald. Bibliography on traditional mathematics in Japan (wasan)

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