
Preface  Table of Contents  Supplementary Material 
Mathematical World 2006; 125 pp; softcover Volume: 24 ISBN10: 0821839330 ISBN13: 9780821839331 List Price: US$30 Member Price: US$24 Order Code: MAWRLD/24 See also: The Knot Book: An Elementary Introduction to the Mathematical Theory of Knots  Colin C Adams Knots and Links  Dale Rolfsen  Crisscross, zigzag, bowtie, devil, angel, or star: which are the longest, the shortest, the strongest, and the weakest lacings? Pondering the mathematics of shoelaces, the author paints a vivid picture of the simple, beautiful, and surprising characterizations of the most common shoelace patterns. The mathematics involved is an attractive mix of combinatorics and elementary calculus. This book will be enjoyed by mathematically minded people for as long as there are shoes to lace. Burkard Polster is a wellknown mathematical juggler, magician, origami expert, bubblemaster, shoelace charmer, and "Count von Count" impersonator. His previous books include A Geometrical Picture Book, The Mathematics of Juggling, and QED: Beauty in Mathematical Proof. Want to learn more about knot theory? See The Knot Book by Colin Adams and Knots and Links by Dale Rolfsen. To read a review published in the Gazette of the Australian Mathematical Society, click here. Readership General mathematical audience interested in the mathematics of lacing. Reviews "... a very interesting book ... Polster 'ties together' the relevant combinatorial questions in an effective way."  Art Benjamin, Harvey Mudd College "It's a fun book ... interesting and it'll have a wide audience"  Fernando Gouvea, Colby College "... well thought out and well presented."  Ian Stewart, University of Warwick "The analyses are elegant, simple, and should be accessible to a reader with a basic understanding of calculus. The book has a formal mathematical layout, and is very readable. Beyond that, it must be mentioned that it is beautiful!"  Gazette of the Australian Mathematical Society "This clearly written book with many helpful illustrations uses combinatorics and elementary calculus in a series of theorems, lemmas, and proofs. Some proofs are left as exercises for the reader. The book seems most appropriate for upperlevel undergraduate mathematics students but could be used to create an enrichment project for a talented high school student."  Mathematics Teacher "A very enjoyable book indeed."  European Mathematical Society Newsletter 


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