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1001 Problems in Classical Number Theory
 
Jean-Marie De Koninck Université Laval, Quebec, QC, Canada
Armel Mercier Université du Québec à Chicoutimi, Chicoutimi, QC, Canada
Hardcover ISBN:  978-0-8218-4224-9
Product Code:  PINT
List Price: $65.00
MAA Member Price: $58.50
AMS Member Price: $52.00
eBook ISBN:  978-1-4704-2492-3
Product Code:  PINT.E
List Price: $55.00
MAA Member Price: $49.50
AMS Member Price: $44.00
Hardcover ISBN:  978-0-8218-4224-9
eBook: ISBN:  978-1-4704-2492-3
Product Code:  PINT.B
List Price: $120.00 $92.50
MAA Member Price: $108.00 $83.25
AMS Member Price: $96.00 $74.00
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1001 Problems in Classical Number Theory
Jean-Marie De Koninck Université Laval, Quebec, QC, Canada
Armel Mercier Université du Québec à Chicoutimi, Chicoutimi, QC, Canada
Hardcover ISBN:  978-0-8218-4224-9
Product Code:  PINT
List Price: $65.00
MAA Member Price: $58.50
AMS Member Price: $52.00
eBook ISBN:  978-1-4704-2492-3
Product Code:  PINT.E
List Price: $55.00
MAA Member Price: $49.50
AMS Member Price: $44.00
Hardcover ISBN:  978-0-8218-4224-9
eBook ISBN:  978-1-4704-2492-3
Product Code:  PINT.B
List Price: $120.00 $92.50
MAA Member Price: $108.00 $83.25
AMS Member Price: $96.00 $74.00
  • Book Details
     
     
    2007; 336 pp
    MSC: Primary 11

    In the spirit of The Book of the One Thousand and One Nights, the authors offer 1001 problems in number theory in a way that entices the reader to immediately attack the next problem. Whether a novice or an experienced mathematician, anyone fascinated by numbers will find a great variety of problems—some simple, others more complex—that will provide them with a wonderful mathematical experience.

    Readership

    Undergraduates and graduate students interested in number theory.

  • Table of Contents
     
     
    • Cover
    • Title
    • Copyright
    • Contents
    • Distribution of the Problems according to Their Topics
    • Preface
    • Part 1. Key Elements from the Theory
    • Notations
    • Some Classical Forms of Argument
    • Inequalities
    • Divisibility
    • Prime Numbers
    • Congruences
    • The Function [x]
    • Arithmetical Functions
    • Diophantine Equations
    • Quadratic Reciprocity
    • Continued Fractions
    • Classification of Real Numbers
    • Two Conjectures
    • Part 2. Statements of the Problems
    • Mathematical Induction and Combinatorics
    • Divisibility
    • Prime Numbers
    • Representation of Numbers
    • Congruences
    • Primality Tests and Factorization Algorithms
    • Integer Parts
    • Arithmetical Functions
    • Solving Equations Involving Arithmetical Functions
    • Special Numbers
    • Diophantine Equations
    • Quadratic Reciprocity
    • Continued Fractions
    • Classification of Real Numbers
    • Part 3. Solutions
    • Bibliography
    • Subject Index
    • Index of Authors
    • Back Cover
  • Reviews
     
     
    • There really are 1001 problems in classical number theory here, and each one leads to the next so readers can progress at their own speed. As they read they will be enticed into trying just one more, succeeding, and moving on to the next.

      Book News, Inc.
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
2007; 336 pp
MSC: Primary 11

In the spirit of The Book of the One Thousand and One Nights, the authors offer 1001 problems in number theory in a way that entices the reader to immediately attack the next problem. Whether a novice or an experienced mathematician, anyone fascinated by numbers will find a great variety of problems—some simple, others more complex—that will provide them with a wonderful mathematical experience.

Readership

Undergraduates and graduate students interested in number theory.

  • Cover
  • Title
  • Copyright
  • Contents
  • Distribution of the Problems according to Their Topics
  • Preface
  • Part 1. Key Elements from the Theory
  • Notations
  • Some Classical Forms of Argument
  • Inequalities
  • Divisibility
  • Prime Numbers
  • Congruences
  • The Function [x]
  • Arithmetical Functions
  • Diophantine Equations
  • Quadratic Reciprocity
  • Continued Fractions
  • Classification of Real Numbers
  • Two Conjectures
  • Part 2. Statements of the Problems
  • Mathematical Induction and Combinatorics
  • Divisibility
  • Prime Numbers
  • Representation of Numbers
  • Congruences
  • Primality Tests and Factorization Algorithms
  • Integer Parts
  • Arithmetical Functions
  • Solving Equations Involving Arithmetical Functions
  • Special Numbers
  • Diophantine Equations
  • Quadratic Reciprocity
  • Continued Fractions
  • Classification of Real Numbers
  • Part 3. Solutions
  • Bibliography
  • Subject Index
  • Index of Authors
  • Back Cover
  • There really are 1001 problems in classical number theory here, and each one leads to the next so readers can progress at their own speed. As they read they will be enticed into trying just one more, succeeding, and moving on to the next.

    Book News, Inc.
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
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