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Techniques of Problem Solving
 
Steven G. Krantz Washington University, St. Louis, MO
Softcover ISBN:  978-0-8218-0619-7
Product Code:  TPS
List Price: $59.00
MAA Member Price: $53.10
AMS Member Price: $47.20
eBook ISBN:  978-1-4704-1224-1
Product Code:  TPS.E
List Price: $49.00
MAA Member Price: $44.10
AMS Member Price: $39.20
Softcover ISBN:  978-0-8218-0619-7
eBook: ISBN:  978-1-4704-1224-1
Product Code:  TPS.B
List Price: $108.00 $83.50
MAA Member Price: $97.20 $75.15
AMS Member Price: $86.40 $66.80
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Techniques of Problem Solving
Steven G. Krantz Washington University, St. Louis, MO
Softcover ISBN:  978-0-8218-0619-7
Product Code:  TPS
List Price: $59.00
MAA Member Price: $53.10
AMS Member Price: $47.20
eBook ISBN:  978-1-4704-1224-1
Product Code:  TPS.E
List Price: $49.00
MAA Member Price: $44.10
AMS Member Price: $39.20
Softcover ISBN:  978-0-8218-0619-7
eBook ISBN:  978-1-4704-1224-1
Product Code:  TPS.B
List Price: $108.00 $83.50
MAA Member Price: $97.20 $75.15
AMS Member Price: $86.40 $66.80
  • Book Details
     
     
    1997; 465 pp
    MSC: Primary 00
    Winner of the CHOICE Outstanding Academic Book Award for 1997!

    The purpose of this book is to teach the basic principles of problem solving, including both mathematical and nonmathematical problems. This book will help students to ...

    • translate verbal discussions into analytical data.
    • learn problem-solving methods for attacking collections of analytical questions or data.
    • build a personal arsenal of internalized problem-solving techniques and solutions.
    • become “armed problem solvers”, ready to do battle with a variety of puzzles in different areas of life.

    Taking a direct and practical approach to the subject matter, Krantz's book stands apart from others like it in that it incorporates exercises throughout the text. After many solved problems are given, a “Challenge Problem” is presented. Additional problems are included for readers to tackle at the end of each chapter. There are more than 350 problems in all. This book won the CHOICE Outstanding Academic Book Award for 1997. A Solutions Manual to most end-of-chapter exercises is available.

    Readership

    Advanced high school and undergraduate mathematics students with a modest level of mathematical and/or analytical sophistication; teachers of these students. General mathematical audience.

  • Table of Contents
     
     
    • Front Cover
    • TABLE OF CONTENTS
    • PREFACE
    • ACKNOWLEDGEMENTS
    • Chapter 1 Basic Concepts
    • 1.1 Introductory Remarks
    • 1.2 A First Problem
    • 1.3 How to Count
    • 1.4 The Use of Induction
    • 1.5 Problems of Logic
    • 1.6 Issues of Parity
    • EXERCISES for Chapter 1
    • Chapter 2 A Deeper Look at Geometry
    • 2.1 Classical Planar Geometry
    • 2.2 Analytic Geometry
    • 2.3 Miscellaneous and Exotic Geometry Problems
    • 2.4 Solid Geometry
    • EXERCISES for Chapter 2
    • Chapter 3 Problems Involving Counting
    • 3.1 Elementary Problems in Probability
    • 3.2 More Sophisticated Problems in Probability
    • 3.3 More on Counting
    • 3.4 The Classical Marriage Problem and Related Ideas
    • EXERCISES for Chapter 3
    • Chapter 4 Problems of Logic
    • 4.1 Straight Logic
    • 4.2 Games
    • 4.3 Tracing Routes, and Learning from Parity
    • 4.4 Mysterious Arithmetic Problems
    • 4.5 Surprises
    • EXERCISES for Chapter 4
    • Chapter 5 Recreational Math
    • 5.1 Magic Squares and Related Ideas
    • 5.2 Problems Involving Weighings
    • EXERCISES for Chapter 5
    • Chapter 6 Algebra and Analysis
    • 6.1 A Little Algebra
    • 6.2 Inequalities
    • 6.3 Trigonometry and Related Ideas
    • EXERCISES for Chapter 6
    • Chapter 7 A Miscellany
    • 7.1 Crossing the River and Similar Exercises
    • 7.2 Things That Are Impossible
    • EXERCISES for Chapter 7
    • Chapter 8 Real Life
    • 8.0 Introductory Remarks
    • 8.1 Everyday Objects
    • 8.2 Some Case Studies
    • 8.3 Statistics
    • EXERCISES for Chapter 8
    • Bibliography
    • Index
    • Solutions to Odd-Numbered Problems
    • Preface
    • Chapter 1 Basic Concepts
    • Chapter 2 A Deeper Look at Geometry
    • Chapter 3 Problems Involving Counting
    • Chapter 4 Problems of Logic
    • Chapter 5 Recreational Math
    • Chapter 6 Algebra and Analysis
    • Chapter 7 A Miscellany
    • Chapter 8 Real Life
    • Back Cover
  • Additional Material
     
     
  • Reviews
     
     
    • Krantz has collected a thoroughly engaging arsenal of problems and problem-solving techniques. Most scientists will want to have a copy for personal reference and for the mental stimulation that it provides. It is well written in a style that encourages the reader to become actively involved ... a myriad of fascinating related problems are provided. After a delightful introductory chapter, the chapters are primarily organized around specific techniques and their applicability in areas such as geometry, logic, recreational math, and counting. The book is written in a linear fashion that makes it advisable to tackle problems in sequential order ... would be an excellent tool for teaching novices to read some mathematics.

      CHOICE
    • The book will help students to: translate verbal discussions into analytical data; learn problem-solving methods for attacking collections of analytical questions or data; build a personal arsenal of solutions and internalized problem solving techniques; become “armed problem solvers”, ready to do battle with a variety of puzzles in different areas of life.

      Zentralblatt für Didaktik der Mathematik
    • It may be an enjoyable task for high school undergraduate mathematics students, their teachers, and people interested in the field to read the book and to learn from it by working on the challenging ideas which are provided throughout the text.

      Zentralblatt MATH
    • Steven Krantz is a teacher, scholar, and artist. How else could he have written a book that not only introduces students to many of the great problems of mathematics, but also informs them about the process of solving these problems? Although many books include collections of intriguing problems, Techniques of Problem Solving uses clear development and lucid explanations to guide students through the process of problem solving. The text gives compelling examples that capture students' interest and encourages them to work problems at the end of the chapter ... Although the book would be excellent for a senior-level capstone course in mathematics, it would also appeal to advanced lower-division or strong high school students as well. [T]his superb book connects the worlds of great mathematical problems with effective classroom instruction.

      The Mathematics Teacher
    • [Krantz] exposes, and analyzes in detail, the solutions of various types of mathematical and logical problems. The choices of problems solved is very varied indeed, both in content and level of sophistication. Traditional ‘recreational’ problems are well represented.

      The Mathematical Gazette
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Desk Copy – for instructors who have adopted an AMS textbook for a course
    Examination Copy – for faculty considering an AMS textbook for a course
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
1997; 465 pp
MSC: Primary 00
Winner of the CHOICE Outstanding Academic Book Award for 1997!

The purpose of this book is to teach the basic principles of problem solving, including both mathematical and nonmathematical problems. This book will help students to ...

  • translate verbal discussions into analytical data.
  • learn problem-solving methods for attacking collections of analytical questions or data.
  • build a personal arsenal of internalized problem-solving techniques and solutions.
  • become “armed problem solvers”, ready to do battle with a variety of puzzles in different areas of life.

Taking a direct and practical approach to the subject matter, Krantz's book stands apart from others like it in that it incorporates exercises throughout the text. After many solved problems are given, a “Challenge Problem” is presented. Additional problems are included for readers to tackle at the end of each chapter. There are more than 350 problems in all. This book won the CHOICE Outstanding Academic Book Award for 1997. A Solutions Manual to most end-of-chapter exercises is available.

Readership

Advanced high school and undergraduate mathematics students with a modest level of mathematical and/or analytical sophistication; teachers of these students. General mathematical audience.

  • Front Cover
  • TABLE OF CONTENTS
  • PREFACE
  • ACKNOWLEDGEMENTS
  • Chapter 1 Basic Concepts
  • 1.1 Introductory Remarks
  • 1.2 A First Problem
  • 1.3 How to Count
  • 1.4 The Use of Induction
  • 1.5 Problems of Logic
  • 1.6 Issues of Parity
  • EXERCISES for Chapter 1
  • Chapter 2 A Deeper Look at Geometry
  • 2.1 Classical Planar Geometry
  • 2.2 Analytic Geometry
  • 2.3 Miscellaneous and Exotic Geometry Problems
  • 2.4 Solid Geometry
  • EXERCISES for Chapter 2
  • Chapter 3 Problems Involving Counting
  • 3.1 Elementary Problems in Probability
  • 3.2 More Sophisticated Problems in Probability
  • 3.3 More on Counting
  • 3.4 The Classical Marriage Problem and Related Ideas
  • EXERCISES for Chapter 3
  • Chapter 4 Problems of Logic
  • 4.1 Straight Logic
  • 4.2 Games
  • 4.3 Tracing Routes, and Learning from Parity
  • 4.4 Mysterious Arithmetic Problems
  • 4.5 Surprises
  • EXERCISES for Chapter 4
  • Chapter 5 Recreational Math
  • 5.1 Magic Squares and Related Ideas
  • 5.2 Problems Involving Weighings
  • EXERCISES for Chapter 5
  • Chapter 6 Algebra and Analysis
  • 6.1 A Little Algebra
  • 6.2 Inequalities
  • 6.3 Trigonometry and Related Ideas
  • EXERCISES for Chapter 6
  • Chapter 7 A Miscellany
  • 7.1 Crossing the River and Similar Exercises
  • 7.2 Things That Are Impossible
  • EXERCISES for Chapter 7
  • Chapter 8 Real Life
  • 8.0 Introductory Remarks
  • 8.1 Everyday Objects
  • 8.2 Some Case Studies
  • 8.3 Statistics
  • EXERCISES for Chapter 8
  • Bibliography
  • Index
  • Solutions to Odd-Numbered Problems
  • Preface
  • Chapter 1 Basic Concepts
  • Chapter 2 A Deeper Look at Geometry
  • Chapter 3 Problems Involving Counting
  • Chapter 4 Problems of Logic
  • Chapter 5 Recreational Math
  • Chapter 6 Algebra and Analysis
  • Chapter 7 A Miscellany
  • Chapter 8 Real Life
  • Back Cover
  • Krantz has collected a thoroughly engaging arsenal of problems and problem-solving techniques. Most scientists will want to have a copy for personal reference and for the mental stimulation that it provides. It is well written in a style that encourages the reader to become actively involved ... a myriad of fascinating related problems are provided. After a delightful introductory chapter, the chapters are primarily organized around specific techniques and their applicability in areas such as geometry, logic, recreational math, and counting. The book is written in a linear fashion that makes it advisable to tackle problems in sequential order ... would be an excellent tool for teaching novices to read some mathematics.

    CHOICE
  • The book will help students to: translate verbal discussions into analytical data; learn problem-solving methods for attacking collections of analytical questions or data; build a personal arsenal of solutions and internalized problem solving techniques; become “armed problem solvers”, ready to do battle with a variety of puzzles in different areas of life.

    Zentralblatt für Didaktik der Mathematik
  • It may be an enjoyable task for high school undergraduate mathematics students, their teachers, and people interested in the field to read the book and to learn from it by working on the challenging ideas which are provided throughout the text.

    Zentralblatt MATH
  • Steven Krantz is a teacher, scholar, and artist. How else could he have written a book that not only introduces students to many of the great problems of mathematics, but also informs them about the process of solving these problems? Although many books include collections of intriguing problems, Techniques of Problem Solving uses clear development and lucid explanations to guide students through the process of problem solving. The text gives compelling examples that capture students' interest and encourages them to work problems at the end of the chapter ... Although the book would be excellent for a senior-level capstone course in mathematics, it would also appeal to advanced lower-division or strong high school students as well. [T]his superb book connects the worlds of great mathematical problems with effective classroom instruction.

    The Mathematics Teacher
  • [Krantz] exposes, and analyzes in detail, the solutions of various types of mathematical and logical problems. The choices of problems solved is very varied indeed, both in content and level of sophistication. Traditional ‘recreational’ problems are well represented.

    The Mathematical Gazette
Review Copy – for publishers of book reviews
Desk Copy – for instructors who have adopted an AMS textbook for a course
Examination Copy – for faculty considering an AMS textbook for a course
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
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