On Ternary Quadratic Diophantine Equation $z^2=40x^2+y^2$

R. Anbuselvi; K. Usha

On Ternary Quadratic Diophantine Equation $z^2=40x^2+y^2$

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Authors

R. Anbuselvi Department of Mathematics, ADM College for women (Autonomous), Nagapattinam, Tamilnadu, India
K. Usha Department of Mathematics, E.G.S.Pillay Engineering College, Nagapattinam, Tamilnadu, India

Keywords:

Integral points, Ternary quadratic, Polygonal numbers, Pyramidal numbers and special numbers

Abstract

The Ternary Quadratic Diophantine equation $z^2=40x^2+y^2$ is analyzed for its non-zero distinct integral points on it. A few interesting properties among the solutions are presented.

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Published

30-12-2017

How to Cite

R. Anbuselvi, & K. Usha. (2017). On Ternary Quadratic Diophantine Equation $z^2=40x^2+y^2$. International Journal of Mathematics And Its Applications, 5(4 - F), 977–983. Retrieved from http://ijmaa.in/index.php/ijmaa/article/view/1362

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Issue

Vol. 5 No. 4 - F (2017)

Section

Research Article

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This work is licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.

On Ternary Quadratic Diophantine Equation $z^2=40x^2+y^2$

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