Book contents
- Frontmatter
- Contents
- Preface to the first edition
- Preface to the second edition
- 1 Real numbers
- 2 Continuum property
- 3 Natural numbers
- 4 Convergent sequences
- 5 Subsequences
- 6 Series
- 7 Functions
- 8 Limits of functions
- 9 Continuity
- 10 Differentiation
- 11 Mean value theorems
- 12 Monotone functions
- 13 Integration
- 14 Exponential and logarithm
- 15 Power series
- 16 Trigonometric functions
- 17 The gamma function
- 18 Vectors
- 19 Vector derivatives
- 20 Appendix
- Solutions to exercises
- Further problems
- Suggested further reading
- Notation
- Intex
Preface to the first edition
Published online by Cambridge University Press: 05 June 2013
- Frontmatter
- Contents
- Preface to the first edition
- Preface to the second edition
- 1 Real numbers
- 2 Continuum property
- 3 Natural numbers
- 4 Convergent sequences
- 5 Subsequences
- 6 Series
- 7 Functions
- 8 Limits of functions
- 9 Continuity
- 10 Differentiation
- 11 Mean value theorems
- 12 Monotone functions
- 13 Integration
- 14 Exponential and logarithm
- 15 Power series
- 16 Trigonometric functions
- 17 The gamma function
- 18 Vectors
- 19 Vector derivatives
- 20 Appendix
- Solutions to exercises
- Further problems
- Suggested further reading
- Notation
- Intex
Summary
This book is intended as an easy and unfussy introduction to mathematical analysis. Little formal reliance is made on the reader's previous mathematical background, but those with no training at all in the elementary techniques of calculus would do better to turn to some other book.
An effort has been made to lay bare the bones of the theory by eliminating as much unnecessary detail as is feasible. To achieve this end and to ensure that all results can be readily illustrated with concrete examples, the book deals only with ‘bread and butter’ analysis on the real line, the temptation to discuss generalisations in more abstract spaces having been reluctantly suppressed. However, the need to prepare the way for these generalisations has been kept well in mind.
It is vital to adopt a systematic approach when studying mathematical analysis. In particular, one should always be aware at any stage of what may be assumed and what has to be proved. Otherwise confusion is inevitable. For this reason, the early chapters go rather slowly and contain a considerable amount of material with which many readers may already be familiar. To neglect these chapters would, however, be unwise.
- Type
- Chapter
- Information
- Mathematical AnalysisA Straightforward Approach, pp. ix - xPublisher: Cambridge University PressPrint publication year: 1982