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The conjecture was formulated in 1993 by Andrew Beal, a banker and amateur mathematician, while investigating generalizations of Fermat's Last Theorem. [1] [2] Since 1997, Beal has offered a monetary prize for a peer-reviewed proof of this conjecture or a counterexample. [3] The value of the prize has increased several times and is currently $1 ...
Daniel Andrew Beal (born November 29, 1952 [3]) is an American banker, businessman, investor, and amateur mathematician. He is a Dallas -based businessman who accumulated wealth in real estate and banking.
The Beal conjecture, also known as the Mauldin conjecture [162] and the Tijdeman-Zagier conjecture, [163] [164] [165] states that there are no solutions to the generalized Fermat equation in positive integers a, b, c, m, n, k with a, b, and c being pairwise coprime and all of m, n, k being greater than 2. [166]
Beal's conjecture: number theory: Andrew Beal: 142 Beilinson conjecture: number theory: Alexander Beilinson: 461 Berry–Tabor conjecture: geodesic flow: Michael Berry and Michael Tabor: 239 Big-line-big-clique conjecture: discrete geometry: Birch and Swinnerton-Dyer conjecture: number theory: Bryan John Birch and Peter Swinnerton-Dyer: 2830 ...
The reference to Andrew Beal says that it was formulated by him in 1933, but the linked article says he was born in 1952. 192.249.3.142 00:04, 12 November 2022 (UTC) No, it says "The conjecture was formulated in 1993", and the article has not been edited since August . . . . - Arjayay 11:14, 12 November 2022 (UTC)
Andrew Beal, a Dallas banker who has offered $1,000,000 for a proof or disproof of Beal's conjecture Wiles' proof of Fermat's Last Theorem Millennium Prize Problems
Beal Prize: Andrew Beal: Mathematics $1 million prize is awarded for either a proof or a counterexample of the Beal conjecture, a generalization of Fermat's Last Theorem, published in a refereed and respected mathematics publication [3] Becquerel Prize: Edmond Becquerel: Solar Energy Individual with outstanding contributions to solar energy ...
The abc conjecture implies the Fermat–Catalan conjecture. [4] For a list of results for impossible combinations of exponents, see Beal conjecture#Partial results. Beal's conjecture is true if and only if all Fermat–Catalan solutions have m = 2, n = 2, or k = 2.