We learn by doing. We learn mathematics by doing problems. This book is the first volume of a series of books of problems in mathematical analysis. It is mainly intended for students studying the basic principles of analysis. However, given its organization, level, and selection of problems, it would also be an ideal choice for tutorial or problem-solving seminars, particularly those geared toward the Putnam exam. The volume is also suitable for self-study. Each section of the book begins with relatively simple exercises, yet may also contain quite challenging problems. Very often several consecutive exercises are concerned with different aspects of one mathematical problem or theorem. This presentation of material is designed to help student comprehension and to encourage them to ask their own questions and to start research. The collection of problems in the book is also intended to help teachers who wish to incorporate the problems into lectures. Solutions for all the problems are provided. The book covers three topics: real numbers, sequences, and series, and is divided into two parts: exercises and/or problems, and solutions. Specific topics covered in this volume include the following: basic properties of real numbers, continued fractions, monotonic sequences, limits of sequences, Stolz's theorem, summation of series, tests for convergence, double series, arrangement of series, Cauchy product, and infinite products.
Author(s): W. J. Kaczor, M. T. Nowak
Series: Student Mathematical Library 4
Edition: 1
Publisher: American Mathematical Society
Year: 2000
Language: English
Pages: 396
Tags: Mathematical Analysis
Cover
Title
Copyright
Contents
Preface
Notation and Terminology
Problems
Chapter 1. Real Numbers
1.1. Supremum and Infimum of Sets of Real Numbers. Continued Fractions
1.2. Some Elementary Inequalities
Chapter 2. Sequences of Real Numbers
2.1. Monotonic Sequences
2.2. Limits. Properties of Convergent Sequences
2.3. The Toeplitz Transformation, the Stolz Theorem and their Applications
2.4. Limit Points. Limit Superior and Limit Inferior
2.5. Miscellaneous Problems
Chapter 3. Series of Real Numbers
3.1. Summation of Series
3.2. Series of Nonnegative Terms
3.3. The Integral Test
3.4. Series of Positive and Negative Terms - Convergence, Absolute Convergence. Theorem of Leibniz
3.5. The Dirichlet and Abel Tests
3.6. Cauchy Product of Infinite Series
3.7. Rearrangement of Series. Double Series
3.8. Infinite Products
Solutions
Chapter 1. Real Numbers
1.1. Supremum and Infimum of Sets of Real Numbers. Continued Fractions
1.2. Some Elementary Inequalities
Chapter 2. Sequences of Real Numbers
2.1. Monotonic Sequences
2.2. Limits. Properties of Convergent Sequences
2.3. The Toeplitz Transformation, the Stolz Theorem and their Applications
2.4. Limit Points. Limit Superior and Limit Inferior
2.5. Miscellaneous Problems
Chapter 3. Series of Real Numbers
3.1. Summation of Series
3.2. Series of Nonnegative Terms
3.3. The Integral Test
3.4. Series of Positive and Negative Terms - Convergence, Absolute Convergence. Theorem of Leibniz
3.5. The Dirichlet and Abel Tests
3.6. Cauchy Product of Infinite Series
3.7. Rearrangement of Series. Double Series
3.8. Infinite Products
Bibliography - Books
Back Cover
