Geometry : a metric approach with models

Geometry: A Metric Approach with Models, imparts a real feeling for Euclidean and non-Euclidean (in particular, hyperbolic) geometry. Intended as a rigorous first course, the book introduces and develops the various axioms slowly, and then, in a departure from other texts, continually illustrates the major definitions and axioms with two or three models, enabling the reader to picture the idea more clearly. The second edition has been expanded to include a selection of expository exercises. Additionally, the authors have designed software with computational problems to accompany the text. This software may be obtained from George Parker.

• Preface
• 1. Preliminary Notions
• 2. Incidence and Metric Geometry
• 3. Betweeness and elementary Figures
• 4. Plane Separation
• 5. Angle Measure
• 6. Neutral Geometry
• 7. The Theory of Parallels
• 8. Hyperbolic Geometry
• 9. Euclidean Geometry
• 10. Area
• 11. The Theory of Isometries
• Bibliography
• Index

Geometry: A Metric Approach with Models, imparts a real feeling for Euclidean and non-Euclidean (in particular, hyperbolic) geometry. Intended as a rigorous first course, the book introduces and develops the various axioms slowly, and then, in a departure from other texts, continually illustrates the major definitions and axioms with two or three models, enabling the reader to picture the idea more clearly. The second edition has been expanded to include a selection of expository exercises. Additionally, the authors have designed software with computational problems to accompany the text. This software may be obtained from George Parker.

• Preface
• 1. Preliminary Notions
• 2. Incidence and Metric Geometry
• 3. Betweeness and elementary Figures
• 4. Plane Separation
• 5. Angle Measure
• 6. Neutral Geometry
• 7. The Theory of Parallels
• 8. Hyperbolic Geometry
• 9. Euclidean Geometry
• 10. Area
• 11. The Theory of Isometries
• Bibliography
• Index

"Geometry: A Metric Approach with Models", imparts a real feeling for Euclidean and non-Euclidean (in particular, hyperbolic) geometry. Intended as a rigorous first course, the book introduces and develops the various axioms slowly, and then, in a departure from other texts, continually illustrates the major definitions and axioms with two or three models, enabling the reader to picture the idea more clearly. Topics covered include the fundamentals of neutral (absolute) geometry; the theory of parallels; hyperbolic geometry; classical Euclidean geometry; proof of the existence of an area function; the cut and reassemble theory of Bolyai; and the classification of isometries of a neutral geometry. Over 700 problems and 250 figures are included in this revised second edition. This second edition has been expanded to include a selection of expository exercises. Additionally, the authors have designed software with computational problems to accompany the text. This software may be obtained from George Parker. This textbook on geometry is intended for undergraduate students in mathematics.

Contents: Preliminary Notions.- Incidence and Metric Geometry.- Betweenness and Elementary Figures.- Plane Separation.- Angle Measure.- Neutral Geometry.- The Theory of Parallels.- Hyperbolic Geometry.- Euclidean Geometry.- Area.- The Theory of Isometries.- Bibliography.- Index.