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.
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