A first course in real analysis Sterling K. Berberian
Material type:
TextPublication details: New York Springer 1994Description: xi, 237p. 23cmISBN: - 3540780394
- QA300 .B457
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| QA297 .C426 Numerical mathematics and computing / | QA299.6 .Olu9 Introduction to real analysis | QA300 .B457 A first course in real analysis | QA300 .B457 A first course in real analysis | QA300 .R8 Principles of mathematical analysis / | QA300 .R8 Principles of mathematical analysis / | QA300 .R8 Principles of mathematical analysis |
Includes index
Chapter 1. Axioms for the Field R of Real Numbers
Chapter 2. First Properties of R.
Chapter 3. Sequences of Real Numbers, Convergence
Chapter 4. Special Subset of R
Chapter 5. Continuity
Chapter 6. Continuous Functions on an Interval
Chapter 7. Limits of Functions
Chapter 8. Derivatives
Chapter 9. Riemann Integral
Chapter 10. Infinite Series
Chapter 11. Beyond the Reimann Integral
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