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Euler Books
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Euler: The Master of Us All (Dolciani Mathematical Expositions)
by (shelved 2 times as euler)
avg rating 4.40 — 404 ratings — published 1999
Euler's Gem: The Polyhedron Formula and the Birth of Topology (Hardcover)
by (shelved 2 times as euler)
avg rating 4.29 — 442 ratings — published 2008
Dr. Euler's Fabulous Formula: Cures Many Mathematical Ills (Hardcover)
by (shelved 1 time as euler)
avg rating 4.11 — 289 ratings — published 2006
Remarkable Mathematicians: From Euler to von Neumann (The Spectrum Series)
by (shelved 1 time as euler)
avg rating 4.13 — 61 ratings — published 1903
A Most Elegant Equation: Euler's Formula and the Beauty of Mathematics (Hardcover)
by (shelved 1 time as euler)
avg rating 3.83 — 670 ratings — published
Con algoritmos y a lo loco: Porque no son tan malos como parecen (Paperback)
by (shelved 1 time as euler)
avg rating 4.00 — 4 ratings — published
Elements of Algebra (Cambridge Library Collection - Mathematics)
by (shelved 1 time as euler)
avg rating 4.37 — 84 ratings — published 1765
Alex's Adventures in Numberland (Kindle Edition)
by (shelved 1 time as euler)
avg rating 4.12 — 5,723 ratings — published 2010
Fermat's Enigma (Paperback)
by (shelved 1 time as euler)
avg rating 4.30 — 33,834 ratings — published 1997
God Created the Integers: The Mathematical Breakthroughs That Changed History (Hardcover)
by (shelved 1 time as euler)
avg rating 4.06 — 2,031 ratings — published 2005
The Great Equations: Breakthroughs in Science from Pythagoras to Heisenberg (Hardcover)
by (shelved 1 time as euler)
avg rating 3.83 — 607 ratings — published 2008
“Accordingly, we find Euler and D'Alembert devoting their talent and their patience to the establishment of the laws of rotation of the solid bodies. Lagrange has incorporated his own analysis of the problem with his general treatment of mechanics, and since his time M. Poinsot has brought the subject under the power of a more searching analysis than that of the calculus, in which ideas take the place of symbols, and intelligent propositions supersede equations.”
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“I have been able to solve a few problems of mathematical physics on which the greatest mathematicians since Euler have struggled in vain ... But the pride I might have held in my conclusions was perceptibly lessened by the fact that I knew that the solution of these problems had almost always come to me as the gradual generalization of favorable examples, by a series of fortunate conjectures, after many errors. I am fain to compare myself with a wanderer on the mountains who, not knowing the path, climbs slowly and painfully upwards and often has to retrace his steps because he can go no further—then, whether by taking thought or from luck, discovers a new track that leads him on a little till at length when he reaches the summit he finds to his shame that there is a royal road by which he might have ascended, had he only the wits to find the right approach to it. In my works, I naturally said nothing about my mistake to the reader, but only described the made track by which he may now reach the same heights without difficulty.”
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