About this Title
Ilka Agricola, Humboldt-Universität zu Berlin, Berlin, Germany and Thomas Friedrich, Humboldt-Universität zu Berlin, Berlin, Germany. Translated by Philip G. Spain
Publication: The Student Mathematical Library
Publication Year 2008: Volume 43
ISBNs: 978-0-8218-4347-5 (print); 978-1-4704-2152-6 (online)
MathSciNet review: MR2387369
MSC: Primary 51-01; Secondary 51M04
Elementary geometry provides the foundation of modern geometry. For the most part, the standard introductions end at the formal Euclidean geometry of high school. Agricola and Friedrich revisit geometry, but from the higher viewpoint of university mathematics. Plane geometry is developed from its basic objects and their properties and then moves to conics and basic solids, including the Platonic solids and a proof of Euler's polytope formula. Particular care is taken to explain symmetry groups, including the description of ornaments and the classification of isometries by their number of fixed points. Complex numbers are introduced to provide an alternative, very elegant approach to plane geometry. The authors then treat spherical and hyperbolic geometries, with special emphasis on their basic geometric properties.
This largely self-contained book provides a much deeper understanding of familiar topics, as well as an introduction to new topics that complete the picture of two-dimensional geometries. For undergraduate mathematics students the book will be an excellent introduction to an advanced point of view on geometry. For mathematics teachers it will be a valuable reference and a source book for topics for projects.
The book contains over 100 figures and scores of exercises. It is suitable for a one-semester course in geometry for undergraduates, particularly for mathematics majors and future secondary school teachers.
Undergraduate students interested in plane geometry.
Table of Contents
- Chapter 1. Introduction: Euclidean space
- Chapter 2. Elementary geometrical figures and their properties
- Chapter 3. Symmetries of the plane and of space
- Chapter 4. Hyperbolic geometry
- Chapter 5. Spherical geometry