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Mathematics in China emerged independently by the 11th century BC Chinese overview. The Chinese independently developed very large and negative numbers, decimals, a decimal system, a binary system, algebra, geometry and calculus.
Most scholars believe that Chinese mathematics and the mathematics of the ancient Mediterranean world had developed more or less independently up to the time when the Nine Chapters reached its final form. It is often suggested that some Chinese mathematical discoveries predate their Western counterparts. One example is the Pythagorean theorem. There is some controversy regarding this issue and the precise nature of this knowledge in early China. The Chinese were one of the most advanced in dealing with mathematical computations, and created enormous numbers. Elements of "Pythagorean" science have been found, for example, in one of the oldest Classical Chinese texts (see King Wen sequence). Knowledge of Pascal\'s triangle has also been shown to have existed in China centuries before PascalFrank J. Swetz and T. I. Kao: Was Pythagoras Chinese?.
Knowledge of Chinese mathematics before 100 BC is somewhat fragmentary, and even after this date the manuscript traditions are obscure. The dating of the use of certain mathematical methods in Chinese history is problematic and disputed.
In early times the focus was on astronomy and perfecting the calendar and not on establishing the proof. Many works simply listed equations or gave diagrams where a proof was hinted at rather than shown. In other cases a proof was shown but it was declared to be an established method after some fashion.
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Visual proof for the (3, 4, 5) triangle as in the Zhou Bi Suan Jing 500–200 BC.
Simple mathematics inscribed on tortoise shells for writing mediums date back to the Shang Dynasty (1600 BC-1050 BC). One of the oldest surviving mathematical works is the I Ching, which greatly influenced written literature during the Zhou Dynasty (1050 BC-256 BC). For mathematics, the book included a sophisticated use of hexagrams.
Since the Shang period, the Chinese had already fully developed a decimal system. Since early times, Chinese understood basic arithmetic (which dominated far eastern history), algebra, equations, and negative numbers. Although the Chinese were more focused on arithmetic and advanced algebra for astronomical uses they were also the first to develop negative numbers, algebraic geometry (only Chinese geometry) and the usage of decimals.
The oldest existent work on geometry in China comes from the philosophical Mohist canon of c. 330 BC, compiled by the followers of Mozi (470 BC-390 BC). The Mo Jing described various aspects of many fields associated with physical science, and provided a small wealth of information on mathematics as well. It provided an \'atomic\' definition of the geometric point, stating that a line is separated into parts, and the part which has no remaining parts (i.e. cannot be divided into smaller parts) and thus forms the extreme end of a line is a point.Needham, Volume 3, 91. Much like Euclid\'s first and third definitions and Plato\'s \'beginning of a line\', the Mo Jing stated that "a point may stand at the end (of a line) or at its beginning like a head-presentation in childbirth. (As to its invisibility) there is nothing similar to it."Needham, Volume 3, 92. Similar to the atomists of Democritus, the Mo Jing stated that a point is the smallest unit, and cannot be cut in half, since \'nothing\' cannot be halved. It stated that two lines of equal length will always finish at the same place, while providing definitions for the comparison of lengths and for parallels,Needham, Volume 3, 92-93. along with principles of space and bounded space.Needham, Volume 3, 93. It also described the fact that planes without the quality of thickness cannot be piled up since they cannot mutually touch.Needham, Volume 3, 93-94. The book provided definitions for circumference, diameter, and radius, along with the definition of volume.Needham, Volume 3, 94.
The history of mathematical development lacks some evidence. There are still debates about certain mathematical classics. For example, the Zhou Bi Suan Jing dates around 1200-1000BCE, yet many scholars believed it was written between 300-250BCE. The Zhou Bi Suan Jing contains an in depth proof of the Gougu Theorem (Pythagorean Theorem) but focuses more on astronomical calculations.
Not much is known about Qin dynasty mathematics, or before, due to the burning of books and burying of scholars.
Knowledge of this period must be carefully determined by their civil projects and historical evidence. The Qin dynasty created a standard system of weights. Civil projects of the Qin dynasty were incredible feats of human engineering. Emperor Qin Shihuang ordered many men to build large, lifesize statues for the palace, tomb along with various other temples and shrines. The shape of the tomb is designed with geometric skills of architecture. It is certain that one of the greatest feats of human history; the great wall required many mathematical "techniques." All Qin dynasty buildings and grand projects used advanced computation formulas for volume, area and proportion.
In the Han Dynasty, numbers were developed into a system and used on a counting board and a set of counting rods called chousuan.
The Nine Chapters on the Mathematical Art (九章算術) is a Chinese mathematics book, its oldest date being 179 AD, but perhaps as early as 200 BC. Although the author(s) are unknown, they made a huge contribution in the eastern world. The methods were made for everyday life and gradually taught advanced methods. It also contains evidence of the Gaussian elimination.
The Suàn shù shū (writings on reckoning) is an ancient Chinese text on mathematics approximately seven thousand characters in length, written on 190 bamboo strips. It was discovered together with other writings in 1983 when archaeologists opened a tomb at Zhangjiashan in Hubei province. From documentary evidence this tomb is known to have been closed in 186 BC, early in the Western Han dynasty. While its relationship to the Nine Chapters is still under discussion by scholars, some of its contents are clearly paralleled there. The text of the Suan shu shu is however much less systematic than the Nine Chapters; and appears to consist of a number of more or less independent short sections of text drawn from a number of sources. Some linguistic hints point back to the Qin dynasty.
In the third century Liu Hui wrote his commentary on the Nine Chapters and also wrote Haidao suanjing which dealt with using Pythagorean theorem (already known by the 9 chapters), which in China was known as Gougu theorem, to measure the size of things. He discovered the usage of Cavalieri\'s principle to find an accurate formula for the volume of a cylinder, and also developed elements of the integral and the differential calculus during the 3rd century CE.
In the fourth century, another influential mathematician named Zu Chongzhi, introduced the Da Ming Li. This calendar was specifically calculated to predict many cosmological cycles that will occur in a period of time. Very little is really known about his life. Today, the only sources are found in the book Sui Shi, we now know that Zu Chongzhi was one of the generations of mathematicians. He computed the value of pi till 7 accurate decimal places and suggested 355/113 as a good approximate. Along with his son, Zu Geng, Zu Chongzhi used the Cavieri Method to find an accurate solution for calculationg the volume of the sphere. His work, Zhui Shu was dicarded out of the syllabus of mathematics during the Song dynasty and lost. Many believed that Zhui Shu contains the formulas and methods for linear, matrix algebra, the value of pi, formula for the volume of the sphere, and maybe integral calculas.
In the fifth century the manual called "Zhang Qiujian suanjing" discussed linear and quadratic equations. By this point the Chinese had the concept of negative numbers. By the Tang Dynasty study of math was fairly standard in the great schools.
Four outstanding mathematicians arose during the twelfth and thirteenth century: Yang Hui, Qin Jiushao, Li Zhi(Li Ye), and Zhu Shijie. Yang Hui, Qin Jiushao, Zhu Shijie all used the Horner-Ruffini Method to solve certain types of simultaneous equations, roots, quadratic, cubic,and quartic equations. Yang Hui was also the first person in history to discover "Pascal\'s Triangle", along with its binomial proof. Li Zhi on the other hand, investigated on a form of algebraic geometry. His book; Ce Hai Yuan Jing revolutionized the idea of inscribing a circle into triangles, which could be calculated using equations with the Pythagorean theorem. At this point of mathematical history, a lot of modern western mathematics is already discovered by Chinese mathematicians. Things grew quiet for a time until the thirteenth century Renaissance of Chinese math. This saw Chinese mathematicians solving equations with methods Europe would not know until the eighteenth century. The high point of this era came with Zhu Shijie\'s two books Suanxue qimeng and the Siyuan yujian. In one case he reportedly gave a method equivalent to Gauss\'s pivotal condensation. He also worked with a form of Pascal triangle in the thirteenth century, but called it "the ancient method of powers up to the eighth."
However after the overthrow of the Yuan Dynasty China became suspicious of knowledge it used. The Ming Dynasty turned away from math and physics in favor of botany and pharmacology. A revival of math in China began in the late nineteenth century, but this would largely be based on Western modes or knowledge.
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