Reading, Writing, and Proving
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A Closer Look at Mathematics, 2nd ed. 2011 Series: Undergraduate Texts in Mathematics Author: Daepp, Ulrich / Gorkin, Pamela Publisher: Springer ISBN: 9781441994783 Cover: HARDCOVER Date: 2011年06月 DESCRIPTION This book, which is based on Polya's method of problem solving, aids students in their transition from calculus (or precalculus) to higher-level mathematics. The book begins by providing a great deal of guidance on how to approach definitions, examples, and theorems in mathematics and ends with suggested projects for independent study. Students will follow Polya's four step approach: analyzing the problem, devising a plan to solve the problem, carrying out that plan, and then determining the implication of the result. In addition to the Polya approach to proofs, this book places special emphasis on reading proofs carefully and writing them well. The authors have included a wide variety of problems, examples, illustrations and exercises, some with hints and solutions, designed specifically to improve the student's ability to read and write proofs. Historical connections are made throughout the text, and students are encouraged to use the rather extensive bibliography to begin making connections of their own. While standard texts in this area prepare students for future courses in algebra, this book also includes chapters on sequences, convergence, and metric spaces for those wanting to bridge the gap between the standard course in calculus and one in analysis. TABLE OF CONTENTS -Preface. -1. The How, When, and Why of Mathematics.- 2. Logically Speaking.-3.Introducing the Contrapositive and Converse.- 4. Set Notation andQuantifiers.- 5. Proof Techniques.- 6. Sets.- 7. Operations on Sets.- 8. More onOperations on Sets.- 9. The Power Set and the Cartesian Product.- 10.Relations.- 11. Partitions.- 12. Order in the Reals.- 13. Consequences of theCompleteness of (\Bbb R).- 14. Functions, Domain, and Range.- 15. Functions,One-to-One, and Onto.- 16. Inverses.- 17. Images and Inverse Images.- 18.Mathematical Induction.- 19. Sequences.- 20. Convergence of Sequences of RealNumbers.- 21. Equivalent Sets.- 22. Finite Sets and an Infinite Set.- 23.Countable and Uncountable Sets.- 24. The Cantor-Schroeder-Bernstein Theorem.- 25.Metric Spaces.- 26. Getting to Know Open and Closed Sets.- 27. ModularArithmetic.- 28. Fermat’s Little Theorem.- 29. Projects.- Appendix.-References.- Index.
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