ON THE DIOPHANTINE EQUATION $8^x + 13^y = z^2$

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The Diophantine Equation 8x + py = z2

Let p be a fixed odd prime. Using certain results of exponential Diophantine equations, we prove that (i) if p ≡ ± 3(mod  8), then the equation 8 (x) + p (y) = z (2) has no positive integer solutions (x, y, z); (ii) if p ≡ 7(mod  8), then the equation has only the solutions (p, x, y, z) = (2 (q) - 1, (1/3)(q + 2), 2, 2 (q) + 1), where q is an odd prime with q ≡ 1(mod  3); (iii) if p ≡ 1(mod  8)...

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ژورنال

عنوان ژورنال: International Journal of Pure and Apllied Mathematics

سال: 2014

ISSN: 1311-8080,1314-3395

DOI: 10.12732/ijpam.v90i1.9