The Solving of Fermat’s Theorem

  • Sattar Abd Karabt Department of Mathematics, University of Thi-Qar College science of Computer and mathematics, Iraq
Keywords: Fermat function, acute triangle.

Abstract

This article is dedicated to the proof of Fermat's theorem in general form. It is shown that besides the second degree equation, Fermat's equation does not contain any other integer solutions. It is suggested to review 4 methods to proof the Theorem for integers x, y. The proof for Fermat's theorem should be considered closed.

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References

A method for the proof of Fermat's theorem in general form. Identify the basic equation (3) and the working of the formula (2), (5), (6), (7) for analysis and calculations.

The solution of Fermat in integer numbers for n> 2 due to the formation on the plane (x, y) distorted (acute-angled) projection function y n + x

n =zn . If the projections in the form of right-angled triangles solutions obtained in whole numbers

Fermat's theorem applies to the whole plane (x, y), except the quadrants II and IV, for odd n.

Published
2016-07-13
How to Cite
Karabt, S. A. (2016). The Solving of Fermat’s Theorem. Journal of Progressive Research in Mathematics, 8(2), 1269-1274. Retrieved from http://scitecresearch.com/journals/index.php/jprm/article/view/819
Issue
Vol 8 No 2: JPRM
Section
Articles

Copyright (c) 2016 Journal of Progressive Research in Mathematics

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