The Liar Paradox and the Towers of Hanoi , livre ebook

Turner Publishing Company - Danesi Marcel

Découvre YouScribe en t'inscrivant gratuitement

Je m'inscris

Obtenez un accès à la bibliothèque pour le consulter en ligne
En savoir plus

181 pages

English

Vous pourrez modifier la taille du texte de cet ouvrage

Obtenez un accès à la bibliothèque pour le consulter en ligne
En savoir plus

A propos
Informations
Extrait

Description

A walk through history's most mind-boggling puzzles
Ever since the Sphinx asked his legendary riddle of Oedipus, riddles, conundrums, and puzzles of all sizes have kept humankind perplexed and amused. The Liar Paradox and the Towers of Hanoi takes die-hard puzzle mavens on a tour of the world's most enduringly intriguing braintwisters, from K?nigsberg's Bridges and the Hanoi Towers to Fibonacci's Rabbits, the Four Color Problem, and the Magic Square. Each chapter introduces the basic puzzle, discusses the mathematics behind it, and includes exercises and answers plus additional puzzles similar to the one under discussion. Here is a veritable kaleidoscope of puzzling labyrinths, maps, bridges, and optical illusions that will keep aficionados entertained for hours.
Marcel Danesi (Etobicoke, ON, Canada) is the author of Increase Your Puzzle IQ
ACKNOWLEDGMENTS.

Introduction.

1. The Riddle of the Sphinx.

2. Alcuin’s River-Crossing Puzzle.

3. Fibonacci’s Rabbit Puzzle.

4. Euler’s Königsberg Bridges Puzzle.

5. Guthrie’s Four-Color Problem.

6. Lucas’s Towers of Hanoi Puzzle.

7. Loyd’s Get Off the Earth Puzzle.

8. Epimenides’ Liar Paradox.

9. The Lo Shu Magic Square.

10. The Cretan Labyrinth.

ANSWERS AND EXPLANATIONS.

GLOSSARY.

INDEX.

Sujets

Recreations

Sciences et techniques

Marcel Danesi

Tower of Hanoi

Mathematics

Liar paradox

Games

Informations

Publié par	Turner Publishing Company
Date de parution	06 janvier 2011
Nombre de lectures	0
EAN13	9781118045817
Langue	English

Informations légales : prix de location à la page 0,0800€. Cette information est donnée uniquement à titre indicatif conformément à la législation en vigueur.

Extrait

Table of Contents

Title Page
Copyright Page
Dedication
Acknowledgments
Introduction
The Uses of This Book
Format

Chapter 1 - The Riddle of the Sphinx

The Puzzle
Mathematical Annotations
Problem-Solvi ng
Insight Thinking
Reflections
Explorations
Further Reading

Chapter 2 - Alcuin’s River-Crossing Puzzle

The Puzzle
Mathematical Annotations
Reflections
Explorations
Further Reading

Chapter 3 - Fibonacci’s Rabbit Puzzle

The Puzzle
Mathematical Annotations
Reflections
Explorations
Further Reading

Chapter 4 - Euler’s Königsberg Bridges Puzzle

The Puzzle
Mathematical Annotations
Reflections
Explorations
Further Reading

Chapter 5 - Guthrie’s Four-Color Problem

The Puzzle
Mathematical Annotations
Reflections
Explorations
Further Reading

Chapter 6 - Lucas’s Towers of Hanoi Puzzle

The Puzzle
Mathematical Annotations
Reflections
Explorations
Further Reading

Chapter 7 - Loyd’s Get Off the Earth Puzzle

The Puzzle
Mathematical Annotations
Reflections
Explorations
Further Reading

Chapter 8 - Epimenides’ Liar Paradox

The Puzzle
Mathematical Annotations
Reflections
Explorations
Further Reading

Chapter 9 - The Lo Shu Magic Square

The Puzzle
Mathematical Annotations
Reflections
Explorations
Further Reading

Chapter 10 - The Cretan Labyrinth

The Puzzle
Mathematical Annotations
Reflections
Explorations
Further Reading

ANSWERS AND EXPLANATIONS
GLOSSARY
INDEX

Copyright © 2004 by Marcel Danesi. All rights reserved

Published by John Wiley & Sons, Inc., Hoboken, New Jersey Published simultaneously in Canada

Design and production by Navta Associates, Inc.

No part of this publication may be reproduced, stored in a retrieval system, or transmitted in any form or by any means, electronic, mechanical, photocopying, recording, scanning, or otherwise, except as permitted under Section 107 or 108 of the 1976 United States Copyright Act, without either the prior written permission of the Publisher, or authorization through payment of the appropriate per-copy fee to the Copyright Clearance Center, 222 Rosewood Drive, Danvers, MA 01923, (978) 750-8400, fax (978) 646-8600, or on the web at www.copyright.com . Requests to the Publisher for permission should be addressed to the Permissions Department, John Wiley & Sons, Inc., 111 River Street, Hoboken, NJ 07030, (201) 748-6011, fax (201) 748-6008.

Limit of Liability/Disclaimer of Warranty: While the publisher and the author have used their best efforts in preparing this book, they make no representations or warranties with respect to the accuracy or completeness of the contents of this book and specifically disclaim any implied warranties of merchantability or fitness for a particular purpose. No warranty may be created or extended by sales representatives or written sales materials. The advice and strategies contained herein may not be suitable for your situation. You should consult with a professional where appropriate. Neither the publisher nor the author shall be liable for any loss of profit or any other commercial damages, including but not limited to special, incidental, consequential, or other damages.

For general information about our other products and services, please contact our Customer Care Department within the United States at (800) 762-2974, outside the United States at (317) 572-3993 or fax (317) 572-4002.

Wiley also publishes its books in a variety of electronic formats. Some content that appears in print may not be available in electronic books. For more information about Wiley products, visit our web site at www.wiley.com .

Library of Congress Cataloging-in-Publication Data:

Danesi, Marcel, date.
The liar paradox and the towers of Hanoi: the ten greatest math puzzles of all time / Marcel Danesi.
p. cm.
Includes bibliographical references and index.
ISBN 0-471-64816-7 (paper)
1. Mathematical recreations. I. Title.
QA95 .D29 2004 793.74—dc22
2003027191

To Alex and Sarah; their existence is a gift and their life is a blessing.
ACKNOWLEDGMENTS
I wish to thank the many people who have helped me, influenced me, and critiqued me over the years. First and foremost, I must thank all of the students I have had the privilege of teaching at the University of Toronto. They were a constant source of intellectual animation and enrichment. I must also thank Professor Frank Nuessel of the University of Louisville, for his unflagging help over many years. I am, of course, grateful to the editors at John Wiley for encouraging me to submit this manuscript to a publishing house that is renowned for its interest in mathematics education. It is my second book for Wiley. I am particularly grateful to Stephen Power, Jeff Golick, and Michael Thompson for their expert advice, and to Kimberly Monroe-Hill and Patricia Waldygo for superbly editing my manuscript, greatly enhancing its readability. Needless to say, any infelicities that this book may contain are my sole responsibility.
Finally, a heartfelt thanks goes out to my family, which includes Lucy (my wife), Alexander and Sarah (my grandchildren), Danila (my daughter), Chris (my son-in-law), and Danilo (my father), for the patience they have shown me during the research and the writing of this book. I truly must beg their forgiveness for my having been so cantankerous and heedless of family duties.
Introduction
PUZZLES ARE AS OLD AS HUMAN HISTORY. They are found in cultures throughout the ages. Why is this so? What are puzzles? What do they reveal about the human mind? Do they have any implications for the study of mathematics?
This book attempts to answer some of these questions. Its main focus is on showing how certain ideas in mathematics originated in the form of puzzles. I use the word puzzle in its basic sense, to mean a challenging problem that conceals a nonobvious answer. I do not use it in the figurative sense of “anything that remains unsolved,” even though the two meanings share a lot of semantic territory, as the mathematician Keith Devlin recently demonstrated in his fascinating book on the seven greatest unsolved mathematical puzzles of our time ( The Millennium Problems , Basic Books, 2002).
In the humanities and the arts, there is a long-standing tradition of identifying the masterpieces—the great novels, the great symphonies, and the great paintings—as the most illuminating things to study. Books are written and courses taught on them. Mathematics, too, has its “great” problems. Significantly, most of these were originally devised as clever puzzles. So, in line with teaching practices in literature, music, and the fine arts, this book introduces basic mathematical ideas through ten puzzle masterpieces. Needless to say, so many ingenious puzzles have been invented throughout history that it would be brazenly presumptuous to claim that I chose the ten best. In reality, I went on a mathematical dig to unearth ten puzzles that were demonstrably pivotal in shaping mathematical history and that, I believe, most mathematicians would also identify as among the most important ever devised.

The Uses of This Book
Above all else, this book can be read to gain a basic understanding of what puzzles are all about and to grasp their importance to mathematics. Anyone wishing to acquire a basic skill at puzzle-solving and at doing elementary mathematics can also use it profitably as a self-study manual. It is not meant, however, to be a collection of puzzles, challenging or otherwise. There are many such books on the market. Rather, it is a manual on the relationship between puzzles and mathematics. In a word, it is written for “beginners,” not for inveterate puzzle solvers.
Teachers will find that as a classroom text, it covers the same kind of topics found in more traditional introductory math texts, even though it takes a different, more creative slant toward them. Students can discuss each puzzle and its implications for the study of mathematics, then can follow up on the sources in the Further Reading sections. They can also come up with their own puzzle activities or research each great puzzle further and report their findings to the class.
This book is based on materials I prepared for a noncredit course that I’ve taught at the University of Toronto for over a decade. The course is aimed at so-called math phobics. I have consistently found that an engagement with puzzles allows such students to gain confidence and go on to more complex areas of mathematics with little or no difficulty. The congratulatory e-mails that I receive from ex-students are a source of great pride. Nothing makes teachers happier than to witness students become proficient at what they teach! I truly hope that this book will allow readers to achieve similar results. I invite the readers of this book to contact me at my e-mail address any time they wish: marcel.danesi@utoronto.ca.

Format
Each of the ten chapters is divided into five sections: The Puzzle, Mathematical Annotations, Reflections, Explorations, and Further Reading.
The Puzzle
Each puzzle is explained in an easy-to-follow manner. Complete adherence to the original solutions and to the mathematical implications that ensued from them would make some of the puzzles extremely difficult to understand. In such cases, I made appropriate modifications. Nevertheless, I tried to retain the spirit of each puzzle and its solution. Regarding the reader’s background knowledge, I took very little for granted. Every mathematical symbol, notation, formula, and concept introduced into the discussion of a puzzle is fully explained. For example, if knowledge of exponents is required at some point, then I provide a brief explanatory note on that topic in a sidebar.
In-depth discussions of the selected puzzles can be found in W. W. Rouse Ball’s Mathematical Recrea