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An Excursion through Elementary Mathematics, Volume III

Discrete Mathematics and Polynomial Algebra
BuchGebunden
648 Seiten
Englisch
Springererschienen am26.04.20181st ed. 2018
Propositions are proved in detail and subsequently applied to Olympic problems or to other problems at the Olympic level.The book also explores someof the hardest problems presented at National and International Mathematics Olympiads, as well as many essential theorems related to the content.mehr
Verfügbare Formate
BuchGebunden
EUR37,44
BuchKartoniert, Paperback
EUR26,74
E-BookPDF1 - PDF WatermarkE-Book
EUR53,49

Produkt

KlappentextPropositions are proved in detail and subsequently applied to Olympic problems or to other problems at the Olympic level.The book also explores someof the hardest problems presented at National and International Mathematics Olympiads, as well as many essential theorems related to the content.
Zusammenfassung
Details
ISBN/GTIN978-3-319-77976-8
ProduktartBuch
EinbandartGebunden
Verlag
Erscheinungsjahr2018
Erscheinungsdatum26.04.2018
Auflage1st ed. 2018
ReiheProblem Books in Mathematics
Seiten648 Seiten
SpracheEnglisch
Gewicht1152 g
IllustrationenXII, 648 p. 24 illus.
Artikel-Nr.44482971

Inhalt/Kritik

Inhaltsverzeichnis
Chapter 01- Elementary Counting Techniques.- Chapter 02- More Counting Techniques.- Chapter 03- Generating Functions.- Chapter 04- Existence of Configurations.- Chapter 05- A Glimpse on Graph Theory.- Chapter 06- Divisibility.- Chapter 07- Diophantine Equations.- Chapter 08- Arithmetic Functions.- Chapter 09- Calculus and Number Theory.- Chapter 10- The Relation of Congruence.- Chapter 11- Congruence Classes.- Chapter 12- Primitive Roots and Quadratic Residues.- Chapter 13- Complex Numbers.- Chapter 14- Polynomials. Chapter 15- Roots of Polynomials.- Cahpter 16- Relations Between Roots and Coefficients.- Chapter 17- Polynomials over R.- Chapter 18- Interpolation of Polynomials.- Chapter 19- On the Factorization of Polynomials.- Chapter 20- Algebraic and Transcendental Numbers.- Chapter 21- Linear Recurrence Relations.- Chapter 22- Hints and Solutions.mehr

Autor

Antonio Caminha M. Neto received his PhD from the Federal University of Ceará, Brazil in 2004. In the same year he joined the University as a Professor of Mathematics, where he is now a member of the Differential Geometry Research Group. The author of several research papers, Caminha was distinguished by a CNPq Research Grant on Differential Geometry. He is also an Affiliate Member of the Brazilian Academy of Sciences. Prior to his academic career, Caminha was himself an Olympic competitor, who has placed 4th in the 1990 Brazilian Mathematical Olympiad. Subsequently, as a high school teacher in the 1990s, he coached Brazilian students in preparation for various mathematical competitions, from regional meets to the Iberoamerican Mathematical Olympiad and the International Mathematical Olympiad, where several of them were medalists. He was also a Leader of the Brazilian Team at the 1996 and 1999 South Cone Mathematical Olympiad, and Deputy Leader of the Brazilian Team at the 1995 and 2001 International Mathematical Olympiads. In 2012, Caminha published a six-volume book collection entitled Topics in Elementary Mathematics with the Brazilian Mathematical Society, which gave rise to this book. He also published a book on selected topics on Differential Geometry, especially the Bochner method and harmonic maps.