Difference between revisions of "Zu Chongzhi" - New World Encyclopedia

Zhu Chung Zih bronze staute. Partly damaged.

Zu Chongzhi (Traditional Chinese: 祖沖之; Simplified Chinese: 祖冲之; Hanyu Pinyin: Zǔ Chōngzhī; Wade-Giles: Tsu Ch'ung-chih, 429–500), courtesy name Wenyuan (文遠), was a prominent Chinese mathematician and astronomer during the Liu Song and Southern Qi Dynasties.

Life and works

Zu Chongzhi's ancestry was from modern Baoding, Hebei. To flee from the ravages of war, Zu's grandfather Zu Chang moved to the Yangtze, as part of the massive population movement during the Eastern Jin. Zu Chang (祖昌) at one point held the position of "Minister of Great Works" (大匠卿) within the Liu Song and was in charge of government construction projects. Zu's father, Zu Shuo (祖朔) also served the court and was greatly respected for his erudition.

Zu was born in Jiankang. His family had historically been involved in astronomy research, and from childhood Zu was exposed to both astronomy and mathematics. When he was only a youth his talent earned him much repute. When Emperor Xiaowu of Liu Song heard of him, he was sent to an Academy, the Hualin Xuesheng (華林學省), and later at the Imperial Nanjing University (Zongmingguan) to perform research. In 461 in Nanxu (today Zhenjiang, Jiangsu), he was engaged in work at the office of the local governor.

Zhui Shu

Zu Chongzhi, along with his son Zu Gengzhi, wrote a mathematical text entitled Zhui Shu (Method of Interpolation). It is said that the treatise contains formulas for the volume of the sphere, cubic equations and the accurate value of pi. Sadly, this book didn't survive to the present day, since it has been lost since the Song Dynasty.

His mathematical achievements included:

• the Daming calendar (大明曆) introduced by him in 465.
• distinguishing the Sidereal Year and the Tropical Year, and he measured 45 years and 11 months per degree between those two, and today we know the difference is 70.7 years per degree.
• calculating one year as ${\displaystyle \textstyle {365{9589 \over 39491}}}$ (≒365.24281481) days, which is very close to 365.24219878 days as we know today.
• calculating the number of overlaps between sun and moon as 27.21223, which is very close to 27.21222 as we know today; using this number he successfully predicted an eclipse four times during 23 years (from 436 to 459).
• calculating the Jupiter year as about 11.858 Earth years, which is very close to 11.862 as we know of today.
• deriving two approximations of pi, which held as the most accurate approximation for π for over nine hundred years. His best approximation was between 3.1415926 and 3.1415927, with ³⁵⁵⁄₁₁₃ (密率, Milu, detailed approximation) and ²²⁄₇ (約率, Yuelu, rough approximation) being the other notable approximations. He obtained the result by approximating a circle with a 12,288 (= 2¹² × 3) sided polygon. This was an impressive feat for the time, especially considering that the device Counting rods he used for recording intermediate results were merely a pile of wooden sticks laid out in certain patterns. Japanese mathematician Yoshio Mikami pointed out, "${\displaystyle {\tfrac {22}{7}}}$ was nothing more than the π value obtain several hundred years earlier by the Greek mathematician Archimedes,however Milu ${\displaystyle \pi ={\tfrac {355}{113}}}$ could not be found in any Greek, Indian or Arabian manuscripts, not until 1585 Dutch mathematician Adriaan Anthoniszoom obtained this fraction; the Chinese possessed this most extraodinary fraction over a whole millennium earlier than Europe." Hence Mikami strongly urged that the fraction ${\displaystyle {\tfrac {355}{113}}}$ be named after Zu Chongzhi as Zu Chongzhi fraction^[1]. In Chinese literature, this fraction is known as "Zu rate." Zu rate is a best rational approximation to π, and is the closest rational approximation to π from all fractions with denominator less than 16600^[2].
• finding the volume of a sphere as πD³/6 where D is diameter (equavilent to 4πr³/3).
• discovering the Cavalieri's principle, 1000 years before Bonaventura Cavalieri in the West.

Astronomy

Zu was an accomplished astronomer who calculated the values of time to almost pinpoint precision. His methods of interpolating and the usage of integration is far ahead of his time. Even the astronomer's Yi Xing isn't comparable to his value(whom was beginning to utilize foreign knowledge). The Sung dynasty calendar was backwards to the "Northern barbarians" because they were implementing their daily lives with the Da Ming Li. It is said that his methods of calculation was so advance, the scholars of the Sung dynasty and Indo influence astronomers of the Tang dynasty found it confusing.

Mathematics

Most of Zu's great mathematical works, are recorded in his lost text Zhui Shu. Most scholars argue about his complexity. Since traditionally, the Chinese developed mathematics as algebraic, and equational. Logically, scholars assume that his work, Zhui Shu yields methods of cubic equations. His works on the accurate value of pi describes the lengthy calculations. Zu used the method of exhaustion, inscribing a 12,288-gon. Interestingly, Zu's value of pi is precise to 8 decimal places. No mathematician since his time, computed a value this precise until another 1000 years. Zu also worked on deducing the formula for the volume of the sphere.

The South Pointing Chariot

The South Pointing Chariot device was first invented by the Chinese mechanical engineer Ma Jun (c. 200-265 C.E.). It was a wheeled vehicle that incorporated an early use of differential gears to operate a fixed figurine that would constantly point south, hence enabling one to accurately measure their directional bearings. This effect was achieved not by magnetics (like in a compass), but through intricate mechanics, the same design that allows equal amounts of torque applied to wheels rotating at different speeds for the modern automobile. After the Three Kingdoms period, the device fell out of use temporarily. However, it was Zu Chongzhi who successfully re-invented it in 478 C.E., as described in the texts of the Song Shu (c. 500 C.E.) and the Nan Chi Shu, with a passage from the latter below:

When Emperor Wu of Liu Song subdued Guanzhong he obtained the south-pointing carriage of Yao Xing, but it was only the shell with no machinery inside. Whenever it moved it had to have a man inside to turn (the figure). In the Sheng-Ming reign period, Gao Di commissioned Zi Zu Chongzhi to reconstruct it according to the ancient rules. He accordingly made new machinery of bronze, which would turn round about without a hitch and indicate the direction with uniformity. Since Ma Jun's time such a thing had not been.^[3]

Named for him

• ${\displaystyle \pi ={\tfrac {355}{113}}}$ as Zu Chongzhi ${\displaystyle \pi }$ rate. Zu Chongzhi computed π to be between 3.1415926 and 3.1415927 and gave two approximations of π, ²²⁄₇ and ³⁵⁵⁄₁₁₃ in the 5th century.${\displaystyle \pi ={\tfrac {355}{113}}}$ as Zu Chongzhi ${\displaystyle \pi }$ rate.

• The lunar crater Tsu Chung-Chi

• 1888 Zu Chong-Zhi is the name of asteroid 1964 VO1.

Notes

References

ISBN links support NWE through referral fees

• Needham, Joseph (1986). Science and Civilization in China: Volume 4, Part 2. Taipei: Caves Books, Ltd.
• Du, Shiran and He, Shaogeng, "Zu Chongzhi". Encyclopedia of China (Mathematics Edition), 1st ed.

Further reading

• Needham, Joseph (1986). Science and Civilization in China: Volume 3, Mathematics and the Sciences of the Heavens and the Earth. Taipei: Caves Books, Ltd.

External links

• Encyclopedia Britannica's description of Zu Chongzhi
• Zu Chongzhi at Chinaculture.org
• Zu Chongzhi at the University of Maine
• John J. O'Connor and Edmund F. Robertson. Zu Chongzhi at the MacTutor archive

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