Sold out

Cosimo Classics: Non-Euclidean Geometry

Authors

Roberto Bonola

Book rating

Add rating

Parameters

268 pages
10 hours of reading

More about the book

Non-Euclidean Geometry is a history of the alternate geometries that have emerged since the rejection of Euclid s parallel postulate. Italian mathematician ROBERTO BONOLA (1874 1911) begins by surveying efforts by Greek, Arab, and Renaissance mathematicians to close the gap in Euclid s axiom. Then, starting with the 17th century, as mathematicians began to question whether it was actually possible to prove Euclid s postulate, he examines non-Euclidean predecessors Saccheri, Lambert, Legendre, W. Bolyai, Wachter, and Thibaut, and non-Euclidean founders Gauss, Schweikart, Taurinus, Lobachevski, and J. Bolyai. He concludes with a look at later developments in non-Euclidean geometry. Including five appendices and an index of authors, Bonola s Non-Euclidean Geometry is a useful reference guide for students of mathematical history.

Book purchase

Cosimo Classics: Non-Euclidean Geometry, Roberto Bonola

Language
Released: 2007
product-detail.submit-box.info.binding: (Paperback)

We’ll email you as soon as we track it down.

Payment methods

4.0

Very Good

4 Ratings

Add rating

We’re missing your review here.

Edition detailsSuggest a correction

Title: Cosimo Classics: Non-Euclidean Geometry
Language: English
Authors: Roberto Bonola
Publisher: Cosimo Inc
Released: 2007
Format: Paperback
Pages: 268
ISBN10: 1602064652
ISBN13: 9781602064652
Series
Tags: Non-Fiction, Science & Math, Mathematics
Rating: 4 out of 5
Description: Non-Euclidean Geometry is a history of the alternate geometries that have emerged since the rejection of Euclid s parallel postulate. Italian mathematician ROBERTO BONOLA (1874 1911) begins by surveying efforts by Greek, Arab, and Renaissance mathematicians to close the gap in Euclid s axiom. Then, starting with the 17th century, as mathematicians began to question whether it was actually possible to prove Euclid s postulate, he examines non-Euclidean predecessors Saccheri, Lambert, Legendre, W. Bolyai, Wachter, and Thibaut, and non-Euclidean founders Gauss, Schweikart, Taurinus, Lobachevski, and J. Bolyai. He concludes with a look at later developments in non-Euclidean geometry. Including five appendices and an index of authors, Bonola s Non-Euclidean Geometry is a useful reference guide for students of mathematical history.