| 100 Great Problems of Elementary Mathematics Revised Edition Contributor(s): Dörrie, Heinrich (Author) |
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ISBN: 0486613488 ISBN-13: 9780486613482 Publisher: Dover Publications
WE WILL NOT BE UNDERSOLD! Click here for our low price guarantee Binding Type: Paperback Published: June 1965 Annotation: Problems that beset Archimedes, Newton, Euler, Cauchy, Gauss, Monge and other greats, ready to challenge today's would-be problem solvers. Among them: How is a sundial constructed? How can you calculate the logarithm of a given number without the use of logarithm table? No advanced math is required. Includes 100 problems with proofs. Click for more in this series: Dover Books on Mathematics |
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| Additional Information |
| BISAC Categories: - Mathematics | History & Philosophy - Mathematics | Arithmetic - Mathematics | Recreations & Games |
| Dewey: 510.76 |
| LCCN: 65014030 |
| Series: Dover Books on Mathematics |
| Physical Information: 0.78" H x 5.44" W x 8.5" L (0.93 lbs) 416 pages |
| Features: Price on Product |
| Descriptions, Reviews, Etc. |
| Publisher Description: "The collection, drawn from arithmetic, algebra, pure and algebraic geometry and astronomy, is extraordinarily interesting and attractive." -- Mathematical Gazette This uncommonly interesting volume covers 100 of the most famous historical problems of elementary mathematics. Not only does the book bear witness to the extraordinary ingenuity of some of the greatest mathematical minds of history -- Archimedes, Isaac Newton, Leonhard Euler, Augustin Cauchy, Pierre Fermat, Carl Friedrich Gauss, Gaspard Monge, Jakob Steiner, and many others -- but it provides rare insight and inspiration to any reader, from high school math student to professional mathematician. This is indeed an unusual and uniquely valuable book. The one hundred problems are presented in six categories: 26 arithmetical problems, 15 planimetric problems, 25 classic problems concerning conic sections and cycloids, 10 stereometric problems, 12 nautical and astronomical problems, and 12 maxima and minima problems. In addition to defining the problems and giving full solutions and proofs, the author recounts their origins and history and discusses personalities associated with them. Often he gives not the original solution, but one or two simpler or more interesting demonstrations. In only two or three instances does the solution assume anything more than a knowledge of theorems of elementary mathematics; hence, this is a book with an extremely wide appeal. Some of the most celebrated and intriguing items are: Archimedes' "Problema Bovinum," Euler's problem of polygon division, Omar Khayyam's binomial expansion, the Euler number, Newton's exponential series, the sine and cosine series, Mercator's logarithmic series, the Fermat-Euler prime number theorem, the Feuerbach circle, the tangency problem of Apollonius, Archimedes' determination of pi, Pascal's hexagon theorem, Desargues' involution theorem, the five regular solids, the Mercator projection, the Kepler equation, determination of the position of a ship at sea, Lambert's comet problem, and Steiner's ellipse, circle, and sphere problems. This translation, prepared especially for Dover by David Antin, brings D rrie's "Triumph der Mathematik" to the English-language audience for the first time. |
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