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(Original PDF) Axiomatic Geometry by John M. Lee

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Product details:

  • ISBN-10 ‏ : ‎ 0821884786
  • ISBN-13 ‏ : ‎ 978-0821884782
  • Author: John M. Lee

The story of geometry is the story of mathematics itself: Euclidean geometry was the first branch of mathematics to be systematically studied and placed on a firm logical foundation, and it is the prototype for the axiomatic method that lies at the foundation of modern mathematics. It has been taught to students for more than two millennia as a model of logical thought. This book tells the story of how the axiomatic method has progressed from Euclid’s time to ours, as a way of understanding what mathematics is, how we read and evaluate mathematical arguments, and why mathematics has achieved the level of certainty it has. It is designed primarily for advanced undergraduates who plan to teach secondary school geometry, but it should also provide something of interest to anyone who wishes to understand geometry and the axiomatic method better. It introduces a modern, rigorous, axiomatic treatment of Euclidean and (to a lesser extent) non-Euclidean geometries, offering students ample opportunities to practice reading and writing proofs while at the same time developing most of the concrete geometric relationships that secondary teachers will need to know in the classroom.

Table contents:

  1. Euclid
  2. Incidence geometry
  3. Axioms for plane geometry
  4. Angles
  5. Triangles
  6. Models of neutral geometry
  7. Perpendicular and parallel lines
  8. Polygons
  9. Quadrilaterals
  10. The Euclidean parallel postulate
  11. Area
  12. Similarity
  13. Right triangles
  14. Circles
  15. Circumference and circular area
  16. Compass and straightedge constructions
  17. The parallel postulate revisited
  18. Introduction to hyperbolic geometry
  19. Parallel lines in hyperbolic geometry
  20. Epilogue: Where do we go from here?
  21. Hilbert’s axioms
  22. Birkhoff’s postulates
  23. The SMSG postulates
  24. The postulates used in this book
  25. The language of mathematics
  26. Proofs
  27. Sets and functions
  28. Properties of the real numbers
  29. Rigid motions: Another approach

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