The Mathematical Principles of Natural Philosophy

Hardback

Main Details

Title The Mathematical Principles of Natural Philosophy
Authors and Contributors      By (author) Isaac Newton
Edited and translated by C. R. Leedham-Green
Physical Properties
Format:Hardback
Pages:790
Dimensions(mm): Height 260,Width 208
Category/GenreHistory of mathematics
Classical mechanics
ISBN/Barcode 9781107020658
ClassificationsDewey:531
Audience
Tertiary Education (US: College)
Illustrations 20 Tables, black and white; 270 Line drawings, black and white

Publishing Details

Publisher Cambridge University Press
Imprint Cambridge University Press
Publication Date 4 March 2021
Publication Country United Kingdom

Description

Newton's Principia is perhaps the second most famous work of mathematics, after Euclid's Elements. Originally published in 1687, it gave the first systematic account of the fundamental concepts of dynamics, as well as three beautiful derivations of Newton's law of gravitation from Kepler's laws of planetary motion. As a book of great insight and ingenuity, it has raised our understanding of the power of mathematics more than any other work. This heavily annotated translation of the third and final edition (1726) of the Principia will enable any reader with a good understanding of elementary mathematics to easily grasp the meaning of the text, either from the translation itself or from the notes, and to appreciate some of its significance. All forward references are given to illuminate the structure and unity of the whole, and to clarify the parts. The mathematical prerequisites for understanding Newton's arguments are given in a brief appendix.

Author Biography

C. R. Leedham-Green is an Emeritus Professor of Pure Mathematics at Queen Mary, University of London. He is an algebraist, working mainly in group theory, and most of his publications concern p-groups, pro-p-groups, and computation in matrix groups defined over finite fields. He is a joint author, together with Susan McKay, of The Structure of Groups of Prime Power Order (2002).