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An Alternate Simple Proof of Fermat’s Last Theorem


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1 Suryatoran, Flat No. 2B, 234A N. S. C. Bose Road, Kolkata 700040, India
     

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ℜ denotes the real line as well as the set of all real numbers, and the real numbers are considered as if they are points on the real line, and the points on the real line as if they are real numbers. Hence, three positive rational numbers a, b & c, satisfying the condition cn = an + bn, where abc ≠ 0, and n is an integer greater than 1, will represent three sides of a triangle, say ΔABC, on a two dimensional plane. Consequently, the algebraic equation will yield the trigonometric equation SinnA + SinnB = Sinn(A+B). The solution of this equation, in general, will be in the form of B = f(A), where the relation between the variables A & B has to be linear in nature on account of the properties of the ΔABC, which is on a two dimensional plane with the relation between the vertical angles given by (A+B+C) = π, as well as the exponent of the variables A & B of the trigonometric equation is also one; but this condition is satisfied only when n = 2. Hence, the algebraic equation has rational solutions only with n = 2 and the FLT is true.

Keywords

Rational Numbers, Real Line, Triangle, Trigonometric Equation.
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  • Singh, Simon; Fermat’s Last Theorem, 1998(Paper Pack), Fourth Estate Limited, London.
  • Burton, David M.: Elementary Number Theory, 1995(Reprint), Universal Book Stall, New Delhi.
  • Courant, R., Robbins, H., and Stewart, I.; What is Mathematics? An Elementary Approach to Ideas and Methods, 1996, 2nd Edition, New York/Oxford: Oxford University Press.
  • G. F., Simmons; Introduction to Topology and Modern Analysis, Tata McGraw-Hill Edition 2004, Tata McGraw-Hill Education Pvt. Ltd., Delhi.

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  • An Alternate Simple Proof of Fermat’s Last Theorem

Abstract Views: 442  |  PDF Views: 3

Authors

Nirendra Mohan Ganguli
Suryatoran, Flat No. 2B, 234A N. S. C. Bose Road, Kolkata 700040, India

Abstract


ℜ denotes the real line as well as the set of all real numbers, and the real numbers are considered as if they are points on the real line, and the points on the real line as if they are real numbers. Hence, three positive rational numbers a, b & c, satisfying the condition cn = an + bn, where abc ≠ 0, and n is an integer greater than 1, will represent three sides of a triangle, say ΔABC, on a two dimensional plane. Consequently, the algebraic equation will yield the trigonometric equation SinnA + SinnB = Sinn(A+B). The solution of this equation, in general, will be in the form of B = f(A), where the relation between the variables A & B has to be linear in nature on account of the properties of the ΔABC, which is on a two dimensional plane with the relation between the vertical angles given by (A+B+C) = π, as well as the exponent of the variables A & B of the trigonometric equation is also one; but this condition is satisfied only when n = 2. Hence, the algebraic equation has rational solutions only with n = 2 and the FLT is true.

Keywords


Rational Numbers, Real Line, Triangle, Trigonometric Equation.

References





DOI: https://doi.org/10.24906/isc%2F2019%2Fv33%2Fi6%2F191727