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Was Pythagoras Chinese?: An Examination of Right Triangle Theory in Ancient China
Contributor(s): Swetz, Frank J. (Author), Kao, T. I. (Author)
ISBN: 0271012382     ISBN-13: 9780271012384
Publisher: Penn State University Press
OUR PRICE:   $20.74  
Product Type: Paperback
Published: January 1977
Qty:
Additional Information
BISAC Categories:
- Mathematics | Geometry - General
- Mathematics | History & Philosophy
Dewey: 516.220
LCCN: 76041806
Series: Pennsylvania State University Studies
Physical Information: 0.28" H x 6.18" W x 9.08" (0.37 lbs) 108 pages
 
Descriptions, Reviews, Etc.
Publisher Description:

The title of this monograph, while intended to intrigue and attract the otherwise unresponsive reader, is not whimsically conceived. Of course, the historical figure of mathematical fame known as Pythagoras, born on the island of Samos in the 6th century B.C., was Greek, not Chinese. But there is another Pythagoras equally deserving fame. He is the man who first proved the proposition that the sum of the squares of the legs of a right triangle is equal to the square of the hypotenuse. For hundreds of years this theorem has borne the name of Pythagoras of Samos, but was he really the first person to demonstrate the universal validity of this theorem? The issue is controversial. Seldom are mathematical discoveries the product of a single individual's genius. Often centuries and thousands of miles separate the appearance and the isolated reappearance of the same mathematical or scientific theory.

It is now acknowledged that the Pascal Triangle method of determining the coefficients of a binomial expansion was known in Sung China 300 years before Pascal was born, and that the root extraction algorithm credited to the 19th-century British mathematician W. G. Homer was employed by Han mathematicians of the 3rd century A.D. If, then, these mathematical processes are to bear the names of the persons who devised them, surely Pascal and Homer were Chinese. So too might such an argument be posed for the Pythagorean Theorem on the basis of evidence contained in ancient Chinese mathematics texts. It is the purpose of this monograph to present and examine this evidence.

This is a joint publication of the Penn State Press and the National Council of Teachers of Mathematics.

Penn State Study No. 40


Contributor Bio(s): Swetz, Frank J.: - Frank J. Swetz, a member of the Department of Mathematics-and Education at The Pennsylvania State University, Capitol Campus, received his Ed.D. from Columbia University. He is the author of Mathematics Education in China and numerous articles.Kao, T. I.: - T.I. Kao, an engineer with the Pennsylvania Department of General Services, took his graduate work at the New Mexico State University.