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Thinking Geometrically: A Survey of Geometries (Mathematical Association of America Textbooks) (Maa Textbooks, 26)

معرفی کتاب «Thinking Geometrically: A Survey of Geometries (Mathematical Association of America Textbooks) (Maa Textbooks, 26)» نوشتهٔ Thomas Q. Sibley، منتشرشده توسط نشر MAA;Mathematical Association of America;athematical Association of America در سال 2015. این کتاب در فرمت pdf، زبان انگلیسی ارائه شده است.

This is a well written and comprehensive survey of college geometry that would serve a wide variety of courses for both mathematics majors and mathematics education majors. Great care and attention is spent on developing visual insights and geometric intuition while stressing the logical structure, historical development, and deep interconnectedness of the ideas. Students with less mathematical preparation than upper-division mathematics majors can successfully study the topics needed for the preparation of high school teachers. There is a multitude of exercises and projects in those chapters developing all aspects of geometric thinking for these students as well as for more advanced students. These chapters include Euclidean Geometry, Axiomatic Systems and Models, Analytic Geometry, Transformational Geometry, and Symmetry. Topics in the other chapters, including Non-Euclidean Geometry, Projective Geometry, Finite Geometry, Differential Geometry, and Discrete Geometry, provide a broader view of geometry. The different chapters are as independent as possible, while the text still manages to highlight the many connections between topics. The text is self-contained, including appendices with the material in Euclid s first book and a high school axiomatic system as well as Hilbert s axioms. Appendices give brief summaries of the parts of linear algebra and multivariable calculus needed for certain chapters. While some chapters use the language of groups, no prior experience with abstract algebra is presumed. The text will support an approach emphasizing dynamical geometry software without being tied to any particular software. A self-contained, comprehensive survey of college geometry that serves a variety of courses for students of mathematics and mathematics education. A self-contained, comprehensive survey of college geometry that can serve a wide range of courses for students of mathematics and mathematics education. Topics include Euclidean geometry, axiomatic systems, analytic geometry, transformational geometry, symmetry, non-Euclidean geometry, projective geometry, finite geometry, and differential geometry, while connections between topics are emphasised throughout. This is a self-contained, comprehensive survey of college geometry that can serve a wide variety of courses for students of both mathematics and mathematics education. The text develops visual insights and geometric intuition while stressing the logical structure, historical development, and deep interconnectedness of the ideas. Chapter topics include Euclidean geometry, axiomatic systems and models, analytic geometry, transformational geometry, symmetry, non-Euclidean geometry, projective geometry, finite geometry, differential geometry, and discrete geometry. The different chapters are as independent as possible, while the text still manages to highlight the many connections between topics. Appendices provide material in Euclid's first book as well as Hilbert's axioms, and give brief summaries of the parts of linear algebra and multivariable calculus needed for certain chapters -- Provided by publisher Survey Of College Geometry. 1. Euclidean Geometry -- 2. Axiomatic Systems -- 3. Analytic Geometry -- 4. Non-euclidean Geometries -- 5. Transformational Geometry -- 6. Symmetry -- 7. Projective Geometry -- 8. Finite Geometries -- 9. Differential Geometry -- 10. Discrete Geometry -- 11. Epilogue -- A. Definitions, Postulates, Common Notions, And Propositions From Book I Of Euclid's Elements -- B. Smsg Axioms For Euclidean Geometry -- C. Hilbert's Axioms For Euclidean Plane Geometry -- D. Linear Algebra Summary -- E. Multivariable Calculus Summary -- F. Elements Of Proofs -- Answers To Selected Exercises. Thomas Q. Sibley, St. John's University. Appendices: Pages 491-514. Includes Bibliographical References And Index. Content: Preface 1. Euclidean geometry 2. Axiomatic systems 3. Analytic geometry 4. Non-Euclidean geometries 5. Transformational geometry 6. Symmetry 7. Projective geometry 8. Finite geometries 9. Differential geometry 10. Discrete geometry 11. Epilogue Appendix A. Definitions, postulates, common notions, and propositions from Book I of Euclid's Elements Appendix B. SMSG axioms for Euclidean geometry Appendix C. Hilbert's axioms for Euclidean plane geometry Appendix D. Linear algebra summary Appendix E. Multivariable calculus summary Appendix F. Elements of proofs Answers to selected exercises Acknowledgements Index.
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