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Why do we need the real numbers? How should we construct them? These questions arose in the nineteenth century, along with the ideas and techniques needed to address them. Nowadays it is commonplace for apprentice mathematicians to hear 'we shall assume the standard properties of the real numbers' as part of their training. But exactly what are those properties? And why can we assume them? This book is clearly and entertainingly written for those students, with historical asides and exercises to foster understanding. Starting with the natural (counting) numbers and then looking at the rational numbers (fractions) and negative numbers, the author builds to a careful construction of the real numbers followed by the complex numbers, leaving the reader fully equipped with all the number systems required by modern mathematical analysis. Additional chapters on polynomials and quarternions provide further context for any reader wanting to delve deeper.Read more
- Contains clear explanation of the various number systems used in mathematics
- Entertaining and accessible to undergraduates
- Solutions to all exercises are available online
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- Publication planned for: February 2020
- format: Paperback
- isbn: 9781108738385
- dimensions: 228 x 152 mm
- contains: 1 b/w illus. 255 exercises
- availability: Not yet published - available from February 2020
Table of Contents
Part I. The Rationals:
1. Counting sheep
2. The strictly positive rationals
3. The rational numbers
Part II. The Natural Numbers:
4. The golden key
5. Modular arithmetic
6. Axioms for the natural numbers
Part III. The Real Numbers (and the Complex Numbers):
7. What is the problem?
8. And what is its solution?
9. The complex numbers
10. A plethora of polynomials
11. Can we go further?
Appendix A. Products of many elements
Appendix B. nth complex roots
Appendix C. How do quaternions represent rotations?
Appendix D. Why are the quaternions so special?
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