79,00 €*
Versandkostenfrei per Post / DHL
Aktuell nicht verfügbar
Reading, Writing, and Proving is designed to guide mathematics students during their transition from algorithm-based courses such as calculus, to theorem and proof-based courses. This text not only introduces the various proof techniques and other foundational principles of higher mathematics in great detail, but also assists and inspires students to develop the necessary abilities to read, write, and prove using mathematical definitions, examples, and theorems that are required for success in navigating advanced mathematics courses.
In addition to an introduction to mathematical logic, set theory, and the various methods of proof, this textbook prepares students for future courses by providing a strong foundation in the fields of number theory, abstract algebra, and analysis. Also included are a wide variety of examples and exercises as well as a rich selection of unique projects that provide students with an opportunity to investigate a topic independently or as partof a collaborative effort.
New features of the Second Edition include the addition of formal statements of definitions at the end of each chapter; a new chapter featuring the Cantor-Schröder-Bernstein theorem with a spotlight on the continuum hypothesis; over 200 new problems; two new student projects; and more. An electronic solutions manual to selected problems is available online.
From the reviews of the First Edition:
"The book...emphasizes Pòlya's four-part framework for problem solving (from his book How to Solve It)...[it] contains more than enough material for a one-semester course, and is designed to give the instructor wide leeway in choosing topics to emphasize...This book has a rich selection of problems for the student to ponder, in addition to "exercises" that come with hints or complete solutions...I was charmed by this book and found it quite enticing."
- Marcia G. Fung for MAA Reviews
"... A book worthy of serious consideration for courses whose goal is to prepare students for upper-division mathematics courses. Summing Up: Highly recommended."
- J. R. Burke, Gonzaga University for CHOICE Reviews
Reading, Writing, and Proving is designed to guide mathematics students during their transition from algorithm-based courses such as calculus, to theorem and proof-based courses. This text not only introduces the various proof techniques and other foundational principles of higher mathematics in great detail, but also assists and inspires students to develop the necessary abilities to read, write, and prove using mathematical definitions, examples, and theorems that are required for success in navigating advanced mathematics courses.
In addition to an introduction to mathematical logic, set theory, and the various methods of proof, this textbook prepares students for future courses by providing a strong foundation in the fields of number theory, abstract algebra, and analysis. Also included are a wide variety of examples and exercises as well as a rich selection of unique projects that provide students with an opportunity to investigate a topic independently or as partof a collaborative effort.
New features of the Second Edition include the addition of formal statements of definitions at the end of each chapter; a new chapter featuring the Cantor-Schröder-Bernstein theorem with a spotlight on the continuum hypothesis; over 200 new problems; two new student projects; and more. An electronic solutions manual to selected problems is available online.
From the reviews of the First Edition:
"The book...emphasizes Pòlya's four-part framework for problem solving (from his book How to Solve It)...[it] contains more than enough material for a one-semester course, and is designed to give the instructor wide leeway in choosing topics to emphasize...This book has a rich selection of problems for the student to ponder, in addition to "exercises" that come with hints or complete solutions...I was charmed by this book and found it quite enticing."
- Marcia G. Fung for MAA Reviews
"... A book worthy of serious consideration for courses whose goal is to prepare students for upper-division mathematics courses. Summing Up: Highly recommended."
- J. R. Burke, Gonzaga University for CHOICE Reviews
Ueli Daepp is an associate professor of mathematics at Bucknell University in Lewisburg, PA. He was born and educated in Bern, Switzerland and completed his PhD at Michigan State University. His primary field of research is algebraic geometry and commutative algebra.
Pamela Gorkin is a professor of mathematics at Bucknell University in Lewisburg, PA. She also received her PhD from Michigan State where she worked under the director of Sheldon Axler. Prof. Gorkin's research focuses on functional analysis and operator theory.
Ulrich Daepp and Pamela Gorkin co-authored of the first edition of "Reading, Writing, and Proving" whose first edition published in 2003. To date the first edition (978-0-387-00834-9 ) has sold over 3000 copies.
New to the second edition:
A useful appendix of formal definitions that can be used as a quick reference
Second edition includes new exercises, problems, and student projects
An electronic solutions manual for instructors and individual users
Includes supplementary material: [...]
-Preface. -1. The How, When, and Why of Mathematics.- 2. Logically Speaking.- 3.Introducing the Contrapositive and Converse.- 4. Set Notation and Quantifiers.- 5. Proof Techniques.- 6. Sets.- 7. Operations on Sets.- 8. More on Operations on Sets.- 9. The Power Set and the Cartesian Product.- 10. Relations.- 11. Partitions.- 12. Order in the Reals.- 13. Consequences of the Completeness 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 Real Numbers.- 21. Equivalent Sets.- 22. Finite Sets and an Infinite Set.- 23. Countable and Uncountable Sets.- 24. The Cantor-Schröder-Bernstein Theorem.- 25. Metric Spaces.- 26. Getting to Know Open and Closed Sets.- 27. Modular Arithmetic.- 28. Fermat's Little Theorem.- 29. Projects.- Appendix.- References.- Index.
| Erscheinungsjahr: | 2011 |
|---|---|
| Fachbereich: | Grundlagen |
| Genre: | Mathematik |
| Rubrik: | Naturwissenschaften & Technik |
| Medium: | Buch |
| Seiten: | 378 |
| Inhalt: |
xiv
378 S. 56 Illustr. |
| ISBN-13: | 9781441994783 |
| ISBN-10: | 1441994785 |
| Sprache: | Englisch |
| Herstellernummer: | 12784769 |
| Einband: | Gebunden |
| Autor: |
Daepp, Ulrich
Gorkin, Pamela |
| Auflage: | 2nd 2011 edition |
| Hersteller: |
Springer US
Springer Nature Singapore |
| Maße: | 243 x 164 x 28 mm |
| Von/Mit: | Ulrich Daepp (u. a.) |
| Erscheinungsdatum: | 29.06.2011 |
| Gewicht: | 0,718 kg |
Ueli Daepp is an associate professor of mathematics at Bucknell University in Lewisburg, PA. He was born and educated in Bern, Switzerland and completed his PhD at Michigan State University. His primary field of research is algebraic geometry and commutative algebra.
Pamela Gorkin is a professor of mathematics at Bucknell University in Lewisburg, PA. She also received her PhD from Michigan State where she worked under the director of Sheldon Axler. Prof. Gorkin's research focuses on functional analysis and operator theory.
Ulrich Daepp and Pamela Gorkin co-authored of the first edition of "Reading, Writing, and Proving" whose first edition published in 2003. To date the first edition (978-0-387-00834-9 ) has sold over 3000 copies.
New to the second edition:
A useful appendix of formal definitions that can be used as a quick reference
Second edition includes new exercises, problems, and student projects
An electronic solutions manual for instructors and individual users
Includes supplementary material: [...]
-Preface. -1. The How, When, and Why of Mathematics.- 2. Logically Speaking.- 3.Introducing the Contrapositive and Converse.- 4. Set Notation and Quantifiers.- 5. Proof Techniques.- 6. Sets.- 7. Operations on Sets.- 8. More on Operations on Sets.- 9. The Power Set and the Cartesian Product.- 10. Relations.- 11. Partitions.- 12. Order in the Reals.- 13. Consequences of the Completeness 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 Real Numbers.- 21. Equivalent Sets.- 22. Finite Sets and an Infinite Set.- 23. Countable and Uncountable Sets.- 24. The Cantor-Schröder-Bernstein Theorem.- 25. Metric Spaces.- 26. Getting to Know Open and Closed Sets.- 27. Modular Arithmetic.- 28. Fermat's Little Theorem.- 29. Projects.- Appendix.- References.- Index.
| Erscheinungsjahr: | 2011 |
|---|---|
| Fachbereich: | Grundlagen |
| Genre: | Mathematik |
| Rubrik: | Naturwissenschaften & Technik |
| Medium: | Buch |
| Seiten: | 378 |
| Inhalt: |
xiv
378 S. 56 Illustr. |
| ISBN-13: | 9781441994783 |
| ISBN-10: | 1441994785 |
| Sprache: | Englisch |
| Herstellernummer: | 12784769 |
| Einband: | Gebunden |
| Autor: |
Daepp, Ulrich
Gorkin, Pamela |
| Auflage: | 2nd 2011 edition |
| Hersteller: |
Springer US
Springer Nature Singapore |
| Maße: | 243 x 164 x 28 mm |
| Von/Mit: | Ulrich Daepp (u. a.) |
| Erscheinungsdatum: | 29.06.2011 |
| Gewicht: | 0,718 kg |
Ähnliche Produkte
Lieferzeit 4-7 Werktage
Lieferzeit 1-2 Wochen
Lieferzeit 1-2 Wochen
