Euler's Pioneering Equation e-bog
68,60 DKK
(inkl. moms 85,75 DKK)
In 1988 The Mathematical Intelligencer, a quarterly mathematics journal, carried out a poll to find the most beautiful theorem in mathematics. Twenty-four theorems were listed and readers were invited to award each a 'score for beauty'. While there were many worthy competitors, the winner was 'Euler's equation'. In 2004 Physics World carried out a similar poll of 'greatest equations', and found...
E-bog
68,60 DKK
Forlag
OUP Oxford
Udgivet
22 februar 2018
Længde
200 sider
Genrer
History of mathematics
Sprog
English
Format
epub
Beskyttelse
LCP
ISBN
9780192514066
In 1988 The Mathematical Intelligencer, a quarterly mathematics journal, carried out a poll to find the most beautiful theorem in mathematics. Twenty-four theorems were listed and readers were invited to award each a 'score for beauty'. While there were many worthy competitors, the winner was 'Euler's equation'. In 2004 Physics World carried out a similar poll of 'greatest equations', and found that among physicists Euler's mathematical result camesecond only to Maxwell's equations. The Stanford mathematician Keith Devlin reflected the feelings of many in describing it as "e;like a Shakespearian sonnet that captures the very essence of love, or a painting which brings out the beauty of the human form that is far more than just skin deep, Euler's equation reachesdown into the very depths of existence"e;. What is it that makes Euler's identity, eiI + 1 = 0, so special?In Euler's Pioneering Equation Robin Wilson shows how this simple, elegant, and profound formula links together perhaps the five most important numbers in mathematics, each associated with a story in themselves: the number 1, the basis of our counting system; the concept of zero, which was a major development in mathematics, and opened up the idea of negative numbers; I an irrational number, the basis for the measurement of circles; the exponential e, associatedwith exponential growth and logarithms; and the imaginary number i, the square root of -1, the basis of complex numbers. Following a chapter on each of the elements, Robin Wilson discusses how the startling relationship between them was established, including the several near misses to the discovery of the formula.