Breaking Boundaries: Discovering the Impossible Counterproof of Beal’s Conjecture

  • Halima Jibril Mohamed
  • Adela Zyfi
  • Ghedlawit Futzum

Abstract

This paper will attempt to logically differentiate between two types of fractions and discuss the idea of Zero as a neutral integer. This logic can then be followed to create a counterexample and a proof for Beal’s conjecture.

References

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Davide Castelvecchi. Fermat’s Last Theorem Earns Andrew Wiles the Abel Prize. Nature, 531 (2016), no. 7594, 287. DOI:10.1038/nature.2016.19552.

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Richard Daniel Mauldin. A Generalization of Fermat’s Last Theorem: The Beal Conjecture and Prize Problem. Notices of the AMS. 44, (1997) no. 11, 1436-1439.

Joseph Bowden, Elements of the Theory of Integers, The MacMillan Company, London, 1903.

Sonntag, Richard Edwin, Claus Borgnakke, Gordon John Van Wylen, and Steve Van Wycik. Fundamentals of thermodynamics. Wiley, New York, 1998.

Published
2019-07-23
How to Cite
Mohamed, H., Zyfi, A., & Futzum, G. (2019). Breaking Boundaries: Discovering the Impossible Counterproof of Beal’s Conjecture. JOURNAL OF ADVANCES IN MATHEMATICS, 17, 12-18. https://doi.org/10.24297/jam.v17i0.8279
Section
Articles