The real number system
Material type: TextPublication details: New York Dover 2018Description: 216 pSubject(s): Numbers, RealDDC classification: 512.786 Summary: Concise but thorough and systematic, this categorical discussion of the real number system presents a series of step-by-step axioms, each illustrated by examples. The highly accessible text is suitable for readers at varying levels of knowledge and experience: advanced high school students and college undergraduates as well as prospective high school and college instructors. The abundance of examples and the wealth of exercises—more than 300, all with answers provided—make this a particularly valuable book for self-study. The first two chapters examine fields and ordered fields, followed by an introduction to natural numbers and mathematical induction. Subsequent chapters explore composite and prime numbers, integers and rational numbers, congruences and finite fields, and polynomials and rational functions. Additional topics include intervals and absolute value, the axiom of completeness, roots and rational exponents, exponents and logarithms, and decimal expansions. A helpful Appendix concludes the text.Item type | Current library | Call number | Status | Date due | Barcode |
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BK | Stack | 512.786 OLM/R (Browse shelf (Opens below)) | Available | 56702 |
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512.75 HAN/C Classical complex analysis | 512.75 LIN/C Classical complex analysis : A geometric approch- vol. I | 512.75 LIN/C Classical complex analysis: a geometric approach-vol.2 | 512.786 OLM/R The real number system | 512.8 SAS/I Introductory methods in numerical analysis | 512.86 PAS/P Permutation groups | 512.896 KIS/T Texbook of matrices |
Concise but thorough and systematic, this categorical discussion of the real number system presents a series of step-by-step axioms, each illustrated by examples. The highly accessible text is suitable for readers at varying levels of knowledge and experience: advanced high school students and college undergraduates as well as prospective high school and college instructors. The abundance of examples and the wealth of exercises—more than 300, all with answers provided—make this a particularly valuable book for self-study.
The first two chapters examine fields and ordered fields, followed by an introduction to natural numbers and mathematical induction. Subsequent chapters explore composite and prime numbers, integers and rational numbers, congruences and finite fields, and polynomials and rational functions. Additional topics include intervals and absolute value, the axiom of completeness, roots and rational exponents, exponents and logarithms, and decimal expansions. A helpful Appendix concludes the text.
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