Numbers and Functions: From a Classical–Experimental Mathematician’s Point of View

Victor H Moll

ISBN: 9781470425968 | Year: 2016 | Paperback | Pages: 504 | Language : English

Book Size: 216 x 280 mm | Territorial Rights: Restricted| Series American Mathematical Society

Price: 1850.00

About the Book

New mathematics often comes about by probing what is already known. Mathematicians will change the parameters in a familiar calculation or explore the essential ingredients of a classic proof. Almost magically, new ideas emerge from this process. This book examines elementary functions, such as those encountered in calculus courses, from this point of view of experimental mathematics. The focus is on exploring the connections between these functions and topics in number theory and combinatorics. There is also an emphasis throughout the book on how current mathematical software can be used to discover and prove interesting properties of these functions. The book provides a transition between elementary mathematics and more advanced topics, trying to make this transition as smooth as possible. Many topics occur in the book, but they are all part of a bigger picture of mathematics. By delving into a variety of them, the reader will develop this broad view. The large collection of problems is an essential part of the book. The problems vary from routine verifications of facts used in the text to the exploration of open questions.

Contributors (Author(s), Editor(s), Translator(s), Illustrator(s) etc.)

Victor H Moll is Professor at the Department of Mathematics, Tulane University, New Orleans, USA.

Table of Content

Preface 
Chapter 1. The Number Systems 
Chapter 2. Factorials and Binomial Coefficients 
Chapter 3. The Fibonacci Numbers 
Chapter 4. Polynomials 
Chapter 5. Binomial Sums 
Chapter 6. Catalan Numbers 
Chapter 7. The Stirling Numbers of the Second Kind 
Chapter 8. Rational Functions 
Chapter 9. Wallis’ Formula 
Chapter 10. Farey Fractions 
Chapter 11. The Exponential Function 
Chapter 12. Trigonometric Functions 
Chapter 13. Bernoulli Polynomials 
Chapter 14. A Sample of Classical Polynomials: Legendre, Chebyshev, and Hermite
Chapter 15. Landen Transformations 
Chapter 16. Three Special Functions: G, ?, and ?
Bibliography 
Index

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