The Equation that Couldn't Be Solved: How Mathematical Genius Discovered the Language of Symmetry
Simon and Schuster, 2005. szept. 19. - 368 oldal
What do Bach's compositions, Rubik's Cube, the way we choose our mates, and the physics of subatomic particles have in common? All are governed by the laws of symmetry, which elegantly unify scientific and artistic principles. Yet the mathematical language of symmetry-known as group theory-did not emerge from the study of symmetry at all, but from an equation that couldn't be solved.
For thousands of years mathematicians solved progressively more difficult algebraic equations, until they encountered the quintic equation, which resisted solution for three centuries. Working independently, two great prodigies ultimately proved that the quintic cannot be solved by a simple formula. These geniuses, a Norwegian named Niels Henrik Abel and a romantic Frenchman named Évariste Galois, both died tragically young. Their incredible labor, however, produced the origins of group theory.
The first extensive, popular account of the mathematics of symmetry and order, The Equation That Couldn't Be Solved is told not through abstract formulas but in a beautifully written and dramatic account of the lives and work of some of the greatest and most intriguing mathematicians in history.
Mit mondanak mások - Írjon ismertetőt
LibraryThing ReviewFelhasználói ismertető - jefware - LibraryThing
While the concept of symmetry is fascinating I think that it's application to particle physics may be like applying circles to planetary motions. Nature just isn't symmetric. This book includes a great history of the mathematics of Group Theory. Teljes értékelés elolvasása
LibraryThing ReviewFelhasználói ismertető - shushokan - LibraryThing
This book would make a good biography of Abel and Galois but is really a book about maths and not a maths book (if you can see the distinction). We get the intimate details of the two mathematicians ... Teljes értékelés elolvasása
2 eyE sdniM eht ni yrtemmyS
3 Never Forget This in the Midst of Your Equations
4 The PovertyStricken Mathematician
5 The Romantic Mathematician
7 Symmetry Rules
8 Whos the Most Symmetrical of Them All?
Appendix 4 A Diophantine Equation
Appendix 5 Tartaglias Verses and Formula
Appendix 6 Adriaan van Roomens Challenge
Appendix 7 Properties of the Roots of Quadratic Equations
Appendix 8 The Galois Family Tree
Appendix 9 The 1415 Puzzle
Appendix 10 Solution to the Matches Problem
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