Introduction to Analysis
International Edition
3rd Edition
Published on 8. January 2004
Book
Paperback/Softback
648 pages
978-0-13-124683-6 (ISBN)
Description
For one- or two-semester junior or senior level courses in Advanced Calculus, Analysis I, or Real Analysis.
This text is designed to challenge advanced students while encouraging and helping weaker students. Offering readability, practicality and flexibility, Wade presents fundamental theorems and ideas from a practical viewpoint.
This text is designed to challenge advanced students while encouraging and helping weaker students. Offering readability, practicality and flexibility, Wade presents fundamental theorems and ideas from a practical viewpoint.
More details
Edition
3rd edition
Language
English
Place of publication
United States
Publishing group
Pearson Education (US)
Target group
Professional and scholarly
Dimensions
Height: 234 mm
Width: 177 mm
Thickness: 23 mm
Weight
890 gr
ISBN-13
978-0-13-124683-6 (9780131246836)
Copyright in bibliographic data and cover images is held by Nielsen Book Services Limited or by the publishers or by their respective licensors: all rights reserved.
Schweitzer Classification
Other editions
New editions
Book
08/2009
4th Edition
Pearson
€134.93
Article exhausted; check for reprint
Content
Part I. One-Dimensional Theory
1. The Real Number System
2. Sequences in R
3. Continuity on R
4. Differentiability on R
5. Integrability on R
6. Infinite Series of Real Numbers
7. Infinite Series of Functions
Part II Multidimensional Theory
8. Euclidean Spaces
9. Convergence in Rn
10. Metric Spaces
11. Differentiability on Rn
12. Integration on Rn
13. Fundamental Theorems of Vector Calculus
14. Fourier Series
15. Differentiable Manifolds
1. The Real Number System
2. Sequences in R
3. Continuity on R
4. Differentiability on R
5. Integrability on R
6. Infinite Series of Real Numbers
7. Infinite Series of Functions
Part II Multidimensional Theory
8. Euclidean Spaces
9. Convergence in Rn
10. Metric Spaces
11. Differentiability on Rn
12. Integration on Rn
13. Fundamental Theorems of Vector Calculus
14. Fourier Series
15. Differentiable Manifolds