Abstract:In this paper, we determine the primitive solutions of diophantine equations x^2+pqy^2=z^2, for positive integers x, y, z, and primes p,q. This work is based on the development of the previous results, namely using the solutions of the Diophantine equation x^2+y^2=z^2, and looking at characteristics of the solutions of the Diophantine equation x^2+3y^2=z^2 and x^2+9y^2=z^2.
We consider the Pythagoras equation 2 2 2 How to cite this paper: Tanoé, F.E. and Kimou, P.K. (2023) Pythagorician Divisors and Applications to Some Diophantine Equations. Advances in Pure Mathematics,
We consider the Pythagoras equation 2 2 2 How to cite this paper: Tanoé, F.E. and Kimou, P.K. (2023) Pythagorician Divisors and Applications to Some Diophantine Equations. Advances in Pure Mathematics,
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