This text provides an unusual approach to the teaching and learning of geometry. Placing the subject in a wide general context Heilbron combines history and science. A cross-cultural examination of topics are given in this book. It covers classical plane geometry, emphasizing the methods of Euclid but also drawing on the different and often effective approaches of the Chinese and Indians. Applications as well as theories are considered, and the book offers a wide range of problems, solutions, and illustrations. A chapter on trigonometry is included, and the material covered prepares the way for study of solid geometry and conic sections.
Sprache
Verlagsort
Verlagsgruppe
Zielgruppe
Für höhere Schule und Studium
Für Beruf und Forschung
Illustrationen
4 plates, 40 halftones, 450 line figures, bibliography
ISBN-13
978-0-19-850078-0 (9780198500780)
Copyright in bibliographic data is held by Nielsen Book Services Limited or its licensors: all rights reserved.
Schweitzer Klassifikation
Preface. 1: An old story. 1.1: Euclid and his modern rivals. 1.2: Geometry in and as culture. 1.3: No royal road. 2: From points to proof. 2.1: Necessary ingredients. 2.2: The size of the Earth. 2.3: The point of proof. 2.4: Exercises. 3: Tricks with triangles. 3.1: Bridge of asses. 3.2: Practice. 3.3: Similarity. 3.4: Deception. 3.5: Exercises. 4: Many cheerful facts about the square of the hypoteneuse. 4.1: The Theorem of Pythagoras. 4.2: The Chinese Pythagoras. 4.3: More trigonometry. 4.4: Exercises
