When Least Is Best: How Mathematicians Discovered Many Clever Ways to Make Things as Small (or as Large) as Possible [Hardcover]

Paul J. Nahin (Author)

Book Description

Publication Date: November 24, 2003

What is the best way to photograph a speeding bullet? Why does light move through glass in the least amount of time possible? How can lost hikers find their way out of a forest? What will rainbows look like in the future? Why do soap bubbles have a shape that gives them the least area?

By combining the mathematical history of extrema with contemporary examples, Paul J. Nahin answers these intriguing questions and more in this engaging and witty volume. He shows how life often works at the extremes--with values becoming as small (or as large) as possible--and how mathematicians over the centuries have struggled to calculate these problems of minima and maxima. From medieval writings to the development of modern calculus to the current field of optimization, Nahin tells the story of Dido's problem, Fermat and Descartes, Torricelli, Bishop Berkeley, Goldschmidt, and more. Along the way, he explores how to build the shortest bridge possible between two towns, how to shop for garbage bags, how to vary speed during a race, and how to make the perfect basketball shot.

Written in a conversational tone and requiring only an early undergraduate level of mathematical knowledge, When Least Is Best is full of fascinating examples and ready-to-try-at-home experiments. This is the first book on optimization written for a wide audience, and math enthusiasts of all backgrounds will delight in its lively topics.

Editorial Reviews

From Booklist

How can a factory manager minimize breakdowns? How can a disoriented hiker reach her car in the least possible time? In answering questions such as these, engineer Nahin delivers maximal mathematical enjoyment with minimal perplexity and boredom. Classical minimization problems allow Nahin to showcase the ingenuity of ancient mathematicians--and to let general readers in on the thrill of riding high-school geometry and algebra to breakthrough insights. Knowledgeable readers will probably anticipate the eventual transition from subtle geometry to complex calculus. But even specialists may learn from Nahin's chronicle of how the often-forgotten tangents of Pierre de Fermat paved the way to the calculus of Newton and Leibniz. In addition, Nahin deftly interweaves episodes from the lives of its discoverers: a rash Belgian theorist loses his sight staring at the sun; a jealous Swiss mathematician denies his own son credit for groundbreaking work. A refreshingly lucid and humanizing approach to mathematics. Bryce Christensen
Copyright © American Library Association. All rights reserved

Review

This book was terrific fun to read! I thought I would skim the chapters to write my review, but I was hooked by the preface, and read through the first 100 pages in one sitting. . . . [Nahin shows] obvious delight and enjoyment--he is having fun and it is contagious. -- Bonnie Shulman, MAA Online

When Least is Best is clearly the result of immense effort. . . . [Nahin] just seems to get better and better. . . . The book is really a popular book of mathematics that touches on a broad range of problems associated with optimization. -- Dennis S. Bernstein, IEEE Control Systems Magazine

[When Least is Best is] a wonderful sourcebook from projects and is just plain fun to read. -- Choice

This book is highly recommended. -- Clark Kimberling, Mathematical Intelligener

A valuable and stimulating introduction to problems that have fascinated mathematicians and physicists for millennia. -- D.R. Wilkins, Contemporary Physics

Nahin delivers maximal mathematical enjoyment with minimal perplexity and boredom. . . . [He lets] general readers in on the thrill of riding high-school geometry and algebra to breakthrough insights. . . . A refreshingly lucid and humanizing approach to mathematics. -- Booklist

Anyone with a modest command of calculus, a curiosity about how mathematics developed, and a pad of paper for calculations will enjoy Nahin's lively book. His enthusiasm is infectious, his writing style is active and fluid, and his examples always have a point. . . . [H]e loves to tell stories, so even the familiar is enjoyably refreshed. -- Donald R. Sherbert, SIAM Review

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Product Details

• Hardcover: 370 pages
• Publisher: Princeton University Press (November 24, 2003)
• Language: English
• ISBN-10: 0691070784
• ISBN-13: 978-0691070780
• Product Dimensions: 9.3 x 6.4 x 1.2 inches
• Shipping Weight: 1.5 pounds
• Average Customer Review: 4.6 out of 5 stars  See all reviews (7 customer reviews)
• Amazon Best Sellers Rank: #671,657 in Books (See Top 100 in Books)

More About the Author

Paul Nahin was born in California, and did all his schooling there (Brea-Olinda High 1958, Stanford BS 1962, Caltech MS 1963, and - as a Howard Hughes Staff Doctoral Fellow - UC/Irvine PhD 1972). (The lovely lady in the photo is his wife of 49 years, Patricia.) He worked as a digital logic designer and radar systems engineer in the Southern California aerospace industry until 1971, when he started his academic career. He has taught at Harvey Mudd College, the Naval Postgraduate School, and the Universities of New Hampshire (where he is now emeritus professor of electrical engineering) and Virginia. In between and here-and-there he spent a post-doctoral year at the Naval Research Laboratory, and a summer and a year at the Center for Naval Analyses and the Institute for Defense Analyses as a weapon systems analyst, all in Washington, DC. He has published a couple dozen short science fiction stories in ANALOG, OMNI, and TWILIGHT ZONE magazines, and has written 11 books on mathematics and physics, published by IEEE Press, Springer, and the university presses of Johns Hopkins and Princeton. His new book NUMBER-CRUNCHING was published by Princeton in September 2011, and Johns Hopkins recently reprinted his 1997 book TIME TRAVEL FOR WRITERS. Princeton has just released the corrected paperback edition of his 2006 book DR. EULER'S FABULOUS FORMULA. He has just completed (for Princeton) his next book, ELECTRIC LOGIC, that treats the works of George Boole and Claude Shannon and how they created the information age (to be published 2012). Two of his other Princeton math books, CHASES & ESCAPES and DUELLING IDIOTS, are scheduled to be reprinted in 2012, each with a new Preface (the one in CHASES includes an analysis of the B-29 Enola Gay's escape maneuver from the blast wave of the atomic bomb drop on Hiroshima). He has given invited talks on mathematics at Bowdoin College, the Claremont Graduate School, the University of Tennessee, and Caltech, has appeared on National Public Radio's "Science Friday" show, and advised Boston's WGBH Public Television's "Nova" program on the script for their time travel episode. He recently gave the invited Sampson Lectures for 2011 in Mathematics at Bates College (Lewiston, Maine). When he isn't writing he is battling evil-doers on his Xbox360S and, now and then, he even wins. (And he gives a big thumb's up to Valve's terrific PORTAL 2, as well as to the oldie-but-still-goodie original Xbox greats RETURN TO CASTLE WOLFENSTEIN:TIDES OF WAR and THIEF:DEADLY SHADOWS!)

FINALLY - readers have written asking about the solutions manual to THE SCIENCE OF RADIO. I now have the pdf file (3 MB) for the solutions, and if you write to me I'll send you a copy. paul.nahin@unh.edu

Customer Reviews

Most Helpful Customer Reviews

120 of 123 people found the following review helpful:

5.0 out of 5 stars Off the Charts, March 10, 2004

By 

Dennis S. Bernstein (Ann Arbor, MI USA) - See all my reviews
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This review is from: When Least Is Best: How Mathematicians Discovered Many Clever Ways to Make Things as Small (or as Large) as Possible (Hardcover)

Nahin's book is a tour de force about the deep intellectual threads that surround the notion of optimality. In physics, engineering, and mathematics, while touching on a wide range of applications, he asks over and over again: What is the optimal solution and why does it matter? Since I've spent most of my professional career thinking about optimality in one form or another, I was skeptical about how much new I would find in this book. But I was astounded to find something new and interesting on virtually every page. Some examples:

--Preface: Torricelli's funnel, which has finite volume and can be filled, but has infinite surface area and cannot be painted; and a slick proof that an irrational number raised to an irrational power can be rational.

--Chapter 1: An optimization problem that is not amenable to calculus, but whose solution can be discerned by some clever insight; an optimization problem that is amenable to calculus, but whose solution can be arrived at by algebra; and the use of the arithmetic mean-geometric mean inequality in optimization.

--Chapter 2: The ancient isoperimetric problem of Dido on maximal area, how it remained unsolved until modern times; the fact that there exists a figure in the plane whose area is equal to the area of the period at the end of this sentence and which contains a line segment one million light years in length that can be rotated 360 degrees within the figure (the shape of the figure is a little hard to picture); and the fact that there are two consecutive prime numbers the gap between which is greater than a googolplex (don't ask what they are).

--Chapter 3: Optimization problems involving the viewing of a painting, the rings of Saturn, folding envelopes, carrying a pipe around a corner in a hallway, the maximum height of mud ejected from a wheel, and other daily concerns.

--Chapter 4: Snell's law, the path of light, and the feud between Descartes and Fermat.

--Chapter 5: The power of the calculus, the aiming of basketballs and cannon, Kepler's wine barrel, United Parcel Service package size constraints, L'Hospital's pulley problem, and the geometry of rainbows.

Chapter 6: Galileo's work on the descent of a particle sliding along the arc of a circle; the discovery of the minimum-time brachistochrone curve by Jacob Bernoulli arrived at by an argument based on the path of light in a variable-density medium, his feud with Newton, and Newton's anonymously published solution to the problem; the isochronous property of both the circle and brachistochrone, which states that the descent time is independent of the starting location along the cure (a point mentioned in chapter 96 of Moby Dick and which left me wondering which paths are isochronous since a straight line is clearly not); the fact that the brachistochrone is about 1.5% faster than the circular arc and that a brachistochrone tunnel dug from New York to Los Angeles would entail a travel time of a mere 28 minutes assuming frictionless sliding and no propulsion; the fact that 45 degrees maximizes range of a golf ball but 56.466 degrees maximizes arc length; the Euler-Lagrange equation of the calculus of variations and its proof formulated by Lagrange at age 19; the hyperbolic cosine shape of the catenary loaded by its own weight as compared to the parabolic shape of a string under uniform loading; the rigorous solution of the isoperimetric problem by Weierstrass; and the theory of soap bubble shapes by Plateau who was blinded by an optics experiments he performed during his Ph.D. research; and a brief illustration of optimal control theory

Chapter 7: Hofmann's solution of Steiner's problem on minimum distance inside a triangle and its use by Delta Airlines to save money on its phone bill; the traveling salesman problem, linear programming, a tutorial on dynamic programming along with a brief bio of IEEE Medal of Honor awardee Richard Bellman with emphasis on the fact the IEEE is an engineering society.

For a control audience, the connections between control and optimization are addressed by the lengthy discussion on the calculus of variations and the tutorial on dynamic programming. My only (minor) disappointment was the lack of more discussion about the nature of optimality in mechanics, that is, the least action principle, the specialization of Hamilton's principle to conservative systems. This underlying principle of mechanics is not, in fact, a statement of optimality but rather one of stationarity.

This book is clearly the result of immense effort. The author's notes suggest that most of the book was written in a single year, which is amazing. Not only are many topics covered, but mathematical details abound. The author, who is known for popular treatments of technical subjects (An Imaginary Tale: The Story of i, Dueling Idiots and Other Probability Puzzlers, The Science of Radio, Oliver Heaviside: Sage in Solitude, Time Travel), just seems to get better and better.

The book was produced with painstaking care. While there are surely errors somewhere, I spotted exactly zero. I would guess that the book has roughly half as many figures as pages, all drawn with great accuracy. To say the price of the book is reasonable would be an understatement.

Who might find this book of interest? The book is really a popular book of mathematics that touches on a broad range of mathematical problems associated with optimization. Some mathematical sophistication, and certainly calculus, is needed to follow the details. But much in this book could be digested by students in high school, even before calculus. The flavor and richness of the subject matter cannot help but whet the curiosity of neophytes. Undergraduate and graduate engineering students of all disciplines will find something that relates to their coursework.

21 of 21 people found the following review helpful:

5.0 out of 5 stars More would be better !, August 2, 2006

By 

Michael LaDeau "ladeau" (Texas) - See all my reviews
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This review is from: When Least Is Best: How Mathematicians Discovered Many Clever Ways to Make Things as Small (or as Large) as Possible (Hardcover)

Mr. Nahin states in his preface that 1st year undergraduate math and physics is enough to manage "a lot of mathematics in this book." He is fairly on the mark, discounting my comments about chapter six below. As usual, the reader must keep pencils and scrap paper ready to fully appreciate this book. I hoped to find a book based on applications of math and physics, an engineer's approach. This is one such fascinating book.

I was familiar with the AM-GM inequality technique to find extremas. However, Mr. Nahin dispenses of this method early and shows the reader so much more. And in this book, there is a constant exercise of looking at problems a different way.

If you like geometric solutions along with the typical lines of algebraic manipulations, you'll love this book. The first five chapters are packed with problems and solutions with excellent graphic representations. Integration requirements increase throughout.

In finding extremas in chapter six, the author goes beyond ordinary calculus with the calculus of variations including the Euler-Lagrange differential equation and Beltrami's identity. The focus problem is the minimal decent time curve. It is in section 6.4 that the author truly breaks from his stated reader requirements of "high school algebra, trigonometry, and geometry, as well as the elementary integration techniques." I think most authors of this book's scope typically underestimate reader requirements. As for my part, I did not understand the calculus of variations technique on the first reading. After reading sections 6.4 through 6.8 again, I gained an appreciation of how the method works. After one more reading of these sections, I might know just enough to be dangerous. These challenging sections are well written, but a struggle within the stated reader requirements.

Chapter 7 found me in more comfortable ground where great geometric solutions to problems are shown and there is a keen introduction to linear programming.

In various cases, Mr. Nahin works through problems with results generated by computer programs. These are not my favorite problems because I lack access to the high end (very expensive) programs that he uses.

This book is well written and engaging; and it is easier to manage than An Imaginary Tale. This is my second book by Mr. Nahin, and I view him as a favorite author of technical books. In this review, I intentionally avoided mentioning specific problems covered because I do not want to spoil the surprises. I found them all quite fascinating. The reader will see so many real world physics in a different light. I highly recommend this book.

1 of 1 people found the following review helpful:

5.0 out of 5 stars Pretty darn amazing, March 12, 2008

By 

Jonathan Fischoff (Chapel Hill, NC United States) - See all my reviews
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This review is from: When Least Is Best: How Mathematicians Discovered Many Clever Ways to Make Things as Small (or as Large) as Possible (Paperback)

This book does so many things well, that I would get bored trying to explain them all. What really impressed me was the explanation of the Euler-Lagrange equation. What is incredible about the treatment is that it is so easy to understand but doesn't leave out any of the math. For anyone trying to teach themselves the calculus of variations I recommend this book as an intro before jumping into a textbook.