Title
Transition To Higher Mathematics: Structure And Proof,Used
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This Text Is Intended For The Foundations Of Higher Math Bridge Course Taken By Prospective Math Majors Following Completion Of The Mainstream Calculus Sequence, And Is Designed To Help Students Develop The Abstract Mathematical Thinking Skills Necessary For Success In Later Upperlevel Majors Math Courses. As Lowerlevel Courses Such As Calculus Rely More Exclusively On Computational Problems To Service Students In The Sciences And Engineering, Math Majors Increasingly Need Clearer Guidance And More Rigorous Practice In Proof Technique To Adequately Prepare Themselves For The Advanced Math Curriculum. With Their Friendly Writing Style Bob Dumas And John Mccarthy Teach Students How To Organize And Structure Their Mathematical Thoughts, How To Read And Manipulate Abstract Definitions, And How To Prove Or Refute Proofs By Effectively Evaluating Them. Its Wealth Of Exercises Give Students The Practice They Need, And Its Rich Array Of Topics Give Instructors The Flexibility They Desire To Cater Coverage To The Needs Of Their Schools Majors Curriculum.This Text Is Part Of The Walter Rudin Student Series In Advanced Mathematics.
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For more information, please visit www.P65Warnings.ca.gov.
- Q: What are the dimensions of this book? A: The book measures six and a half inches in length, nine point six one inches in height, and zero point six inches in width.
- Q: How many pages does this book have? A: This book contains three hundred four pages, providing a comprehensive exploration of higher mathematics.
- Q: What is the binding type of this book? A: This book is bound in hardcover, ensuring durability and a professional appearance for academic use.
- Q: How should I use this textbook? A: This textbook is designed for students transitioning to higher mathematics, aiding in developing proof techniques and abstract thinking.
- Q: Is this book suitable for beginners? A: Yes, this book is suitable for students who have completed a mainstream calculus sequence and are preparing for advanced math courses.
- Q: What topics are covered in this book? A: The book covers a range of topics essential for higher mathematics, including proof techniques and abstract definitions.
- Q: How do I keep this book in good condition? A: To maintain the book's condition, store it in a cool, dry place and avoid exposing it to excessive moisture or direct sunlight.
- Q: Can I clean the book's cover? A: Yes, you can clean the hardcover by gently wiping it with a damp cloth to remove dust or stains.
- Q: What if my book arrives damaged? A: If your book arrives damaged, please contact customer support for assistance with returns or exchanges.
- Q: Does this book have a return policy? A: Yes, the book usually comes with a return policy, allowing returns within a specified timeframe if you're not satisfied.
- Q: What is the author's background? A: The book is authored by Bob A. Dumas, a knowledgeable educator in mathematics, ensuring quality content.
- Q: Is this book part of a series? A: Yes, this textbook is part of the Walter Rudin Student Series in Advanced Mathematics.
- Q: Are there exercises available in the book? A: Yes, the book includes a wealth of exercises designed to provide students with rigorous practice.
- Q: What makes this book different from others? A: This book offers clear guidance on abstract thinking and proof techniques, making it ideal for math majors.
- Q: Is this book appropriate for self-study? A: Yes, this book is appropriate for self-study, especially for students who have completed calculus and wish to advance their understanding.