A Full Axiomatic Development of High School Geometry

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This textbook provides a full and complete axiomatic development of exactly that part of plane Euclidean geometry that forms the standard content of high school geometry. It begins with a set of points, a measure of distance between pairs of points and ten simple axioms. From there the notions of length, area and angle measure, along with congruence and similarity, are carefully defined and their properties proven as theorems. It concludes with a proof of the consistency of the axioms used and a full description of their models. It is provided in guided inquiry (inquiry-based) format with the intention that students will be active learners, proving the theorems and presenting their proofs to their class with the instructor as a mentor and a guide.

The book is written for graduate and advanced undergraduate students interested in teaching secondary school mathematics, for pure math majors interested in learning about the foundations of geometry, for faculty preparing future secondary school teachers and as a reference for any professional mathematician. It is written with the hope of anchoring K-12 geometry in solid modern mathematics, thereby fortifying the teaching of secondary and tertiary geometry with a deep understanding of the subject.


Author(s): David M. Clark, Samrat Pathania
Edition: 1
Publisher: Springer
Year: 2023

Language: English
Pages: 148
City: Cham
Tags: Trigonometry; Euclidean Geometry; Plane Geometry; Neutral Geometry; Geometric Models

Preface
Acknowledgements
Contents
Foundational Principles
Non-triviality and Betweenness
Congruence and Length Measure
Circles
Triangle Congruence
Upgrading Euclidean Constructions
Neutral Geometry
Similar Figures
The Euclidean Parallel Axiom
The Scaling Lemma
The Scaling Theorem
Similarity
Area Measure
Polygonal Regions
Decompositional Equivalence
Polygonal Area
The Area Measure Theorem
Consequences of Area Measure
Angle Measure
Ordering Angles
Degree Measure
Angle Measure and Congruence
The Angle Measure Theorem
Consequences of Angle Measure
Trigonometry
Circle Measure
Jordan Measure of Area
Inscribed Convex Polygons
Circumscribed Convex Polygons
Area, Circumference and the Number
Consistency and Models
Birkhoff's Geometry
Consistency
Euclidean Fields
Models from Euclidean Fields
All Models
The Constructible Plane
Appendix A: Axioms
Appendix B: MCL#9
Appendix C: Font Guide
Appendix D: Theorem Index
Appendix E: Notation Index
Bibliography
Index