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The Beal Conjecture - http://www.math.unt.edu/~mauldin/beal.html
$75,000 prized problem pertaining to the Diophantine equation of the form A^x + B^y = C^z where A, B, C, x, y and z are positive integers and x, y and z are all greater than 2, then A, B and C must have a common factor. |
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NOVA Online | The Proof - http://www.pbs.org/wgbh/nova/proof/
NOVA Online presents The Proof, including an interview with Andrew Wiles, an essay on Sophie Germain, and the Pythagorean theorem. |
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Beal's Conjecture: A Search for Counterexamples - http://www.norvig.com/beal.html
Results of a computer search by Peter Norvig. |
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Beal Conjecture - http://www.bealconjecture.com
The official Beal Conjecture site with information and links regarding the problem. |
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Fermat's Last Theorem -- from MathWorld - http://mathworld.wolfram.com/FermatsLastTheorem.html
Article in Eric Weisstein's World of Mathematics. |
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Fermat Corner - http://www.simonsingh.net/Fermat_Corner.html
Fermat's Last Theorem by Simon Singh. Discusses the early and recent history of people trying to solve this perplexing problem, including Andrew Wiles' final success. Includes information about poems, limericks, the off-Broadway show and a quiz. |
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Wiles, Ribet, Shimura-Taniyama-Weil and FLT - http://math.albany.edu:8010/g/Math/topics/fermat/
A collection of links based on the former e-math gopher archive. |
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On a Generalized Fermat-Wiles Equation - http://algo.inria.fr/csolve/fermat.pdf
Steven Finch's essay on the Diophantine equation of the form x^n + y^n = c.z^n. |
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Is There a "Simple" Proof of Fermat's Last Theorem? - Several new approaches are discussed. - http://www.occampress.com/
Provides papers on several mathematical subjects, including Fermat's Last Theorem and the 3x + 1 Problem. One paper offers reasons why we might be close to a solution of the latter problem. |
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The Solving of Fermat's Last Theorem - http://math.stanford.edu/~rubin/lectures/fermatslides/
Slides for a talk by Karl Rubin on the story of Fermat's Last Theorem for a general audience, including the history of the problem, the story of Andrew Wiles' solution and the excitement surrounding it, and some of the many ideas used in his proof. |