The Colorado Mathematical Olympiad and Further Explorations

Over the past two decades, the once small local Colorado Springs Mathematics Olympiad, founded by the author himself, has now become an annual state-wide competition, hosting over one-thousand high school contenders each year.

This updated printing of the first edition of Colorado Mathematical Olympiad: the First Twenty Years and Further Explorations offers an interesting history of the competition as well as an outline of all the problems and solutions that have been a part of the contest over the years. Many of the essay problems were inspired by Russian mathematical folklore and written to suit the young audience; for example, the 1989 Sugar problem was written as a pleasant Lewis Carroll-like story. Some other entertaining problems involve old Victorian map colorings, King Arthur and the knights of the round table, rooks in space, Santa Claus and his elves painting planes, football for 23, and even the Colorado Springs subway system.

The book is more than just problems, their solutions, and event statistics; it tells a compelling story involving the lives of those who have been part of the Olympiad from every perspective.

Builds bridges between Olympiads and real mathematics by showing how a solved Olympiad problem gives birth to deeper problems and leads to the forefront of mathematical research Appeals to both serious and recreational mathematicians on all levels of expertise Pairs excellent mathematical content with artful exposition

Auteur

Alexander Soifer has published around 100 articles and four other books entitled, Mathematics as Problem-Solving, 2/e How Does one Cut a Triangle? 2/e Mathematical Coloring Book, and Geometric Etudes in Combinatorial Mathematics. The 2nd ed. of Mathematical Coloring Book (forthcoming with Spenser). We are publishing 2nd ed. of the other three books. Soifer is renowned for creating significant problems and conjectures, and this book could be helpful to others thinking about organizing an olympiad. Soifer is at Princeton and Colorado. Author confirms sales of 3000 copies of all three books listed above, (excluding Mathematical Coloring Book) all self-sold by author. These three books are out of stock.

Texte du rabat

This book presents the 20-year account of the Colorado Mathematical Olympiad its dreams and rewards, hard work and conflict. It features more than just original wonderful problems and their ingenious solutions; it tells a compelling story involving the lives of those who have been part of the Olympiad. The reader will meet Olympians and follow their paths as professionals. In the vast field of competition books, this book is unique, for it builds bridges between Olympiads and real mathematics by demonstrating through 20 Further Explorations, the trains of mathematical thought, showing how a solved Olympiad problem gives birth to deeper problems and leads to the forefront of mathematical research full of striking results and open problems.

Like Gauss, Alexander Soifer would not hesitate to inject Eureka! at the right moment. Like van der Waerden, he can transform a dispassionate exercise in logic into a compelling account of sudden insights and ultimate triumph.

Cecil Rousseau Chair, USA Mathematical Olympiad Committee

... this book is not so much mathematical literature as it is literature built around mathematics with the Further Explorations sections, anyone so inclined could spend a lifetime on the mathematics sprouting from this volume.

Peter D. Johnson, Jr., Auburn University

I finished reading the book in one sitting I just could not put it down. Professor Soifer has indebted us all by first making the effort to organize the Colorado Mathematical Olympiads, and then making the additional effort to tell us about it in such an engaging and useful way.

Branko Grünbaum, University of Washington

A delightful feature of the book is that in the second part more related problems are discussed. Some of them are still unsolved.

Paul Erds

The book is a gold mine of brilliant reasoning with special emphasis on the power and beauty ofcoloring proofs. Strongly recommended to both serious and recreational mathematicians on all levels of expertise.

Martin Gardner

Contenu

Preface.- Olympiad History: What it is and How it Started.- Three Celebrated Ideas.- Year 1.- Year 2.- Year 3.- Year 4.- Year 5.- Year 6.- Year 7.- Year 8.- Year 9.- Year 10.- Further Explorations.- Rooks in Space.- Chromatic Number of the Plane.- Polygons in a Colored Circle, Polyhedra in a colored Sphere.- How Does one Cut a Triangle?.- Points in Convex Figures.- Triangles in a Colored Plane.- Rectangles in a Colored Plane.- Colored Polygons.- Infinite-Finite.- Schur Theorem.- Bibliography.- Year 11.- Year 12.- Year 13.- Year 14.- Year 15.- Year 16.- Year 17.- Year 18.- Year 19.- Year 20.- Further Explorations.- Chromatic Number of a Grid.- Stone Age Entertainment.- The Erdös Problem.- Squares in a Square.- Washington Recangles.- Olde Victorian Map Colouring.- More Stone Age Entertainment.- The 1-10-100 Problem.- King Arthur and the Knights of the Round Table.- A Map Coloring "Game".- Bibliography.