Published April 30, 2023
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Proofs of Beal's Conjecture, Fermat's Conjecture, Collatz Conjecture and Goldbach Conjecture
Creators
- 1. Research Scholar, Rajah Serfoji Government College, Thanjavur, (Affiliated to Bharathidasan University, Tiruchirappalli), Tamil Nadu, India.
- 2. Member of Mathematical Association of America.
Contributors
Contact person:
- 1. Research Scholar, Rajah Serfoji Government College, Thanjavur, (Affiliated to Bharathidasan University, Tiruchirappalli), Tamil Nadu, India.
Description
Abstract: In this article the elementary mathematical methods are used to prove Beal’s Conjecture, Fermat’s Conjecture, Collatz Conjecture and Goldbach Conjecture.
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Related works
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- Journal article: 2582-8932 (ISSN)
References
- A. Wiles, Modular elliptic curves and Fermat's Last Theorem. Annals Math., 141(3) (1995), 443-451.
- R.Daniel Mauldin (1997). "A Generalization of Fermat's Last Theorem: The Beal Conjecture and Prize Problem" (PDF). Notices of the AMS. 44 (11): 1436–1439.
- Lagarias, Jeffrey C. (1985). "The 3x + 1 problem and its generalizations". The American Mathematical Monthly. 92 (1): 3–23.
- Fliegel, Henry F.; Robertson, Douglas S. (1989). "Goldbach's Comet: the numbers related to Goldbach's Conjecture". Journal of Recreational Mathematics. 21 (1): 1–7
- Nishad T M, Mathematical Proof of Collatz Conjecture, IJMTT,178-182, Vol 67,Issue7, 2021.
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- ISSN: 2582-8932 (Online)
- https://portal.issn.org/resource/ISSN/2582-8932
- Retrieval Number: 100.1/ijam.A1137043123
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- Publisher: Lattice Science Publication (LSP)
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