mathematics: Chinese and Middle Eastern Advances

Following the decline of learning in the West after the 3d cent., the development of mathematics continued in the East. In China, Tsu Ch'ung-Chih estimated π by inscribed and circumscribed polygons, as Archimedes had done, and in India the numerals now used throughout the civilized world were invented and contributions to geometry were made by Aryabhata and Brahmagupta (5th and 6th cent. a.d.). The Arabs were responsible for preserving the work of the Greeks, which they translated, commented upon, and augmented. In Baghdad, Al-Khowarizmi (9th cent.) wrote an important work on algebra and introduced the Hindu numerals for the first time to the West, and Al-Battani worked on trigonometry. In Egypt, Ibn al-Haytham was concerned with the solids of revolution and geometrical optics. The Persian poet Omar Khayyam wrote on algebra.

Sections in this article:

• Introduction
• In the Twentieth Century
• In the Nineteenth Century
• Western Developments from the Twelfth to Eighteenth Centuries
• Chinese and Middle Eastern Advances
• Greek Contributions
• Development of Mathematics
• Applied Mathematics
• Geometry
• Analysis
• Algebra
• Foundations
• Bibliography

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