E. Kh. Aslanyan, “On the solution of the equation $\frac5k=\frac1x+\frac1y+\frac1z$ on the set of natural numbers $N\setminus \{60 n + 1, n\in N\}$”, Proceedings of the YSU, Physical and Mathematical Sciences, 2013, no. 3, 64

Proceedings of the Yerevan State University, series Physical and Mathematical Sciences

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Proceedings of the Yerevan State University, series Physical and Mathematical Sciences, 2013, Issue 3, Pages 64–65 (Mi uzeru84)

Letter to the editorial board

On the solution of the equation $\frac5k=\frac1x+\frac1y+\frac1z$ on the set of natural numbers $N\setminus \{60 n + 1, n\in N\}$

E. Kh. Aslanyan

State Architectural College of Abovyan, Armenia

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Abstract: In the present paper it is shown that for every number $k\not\equiv1$ (mod 60) the equation $\frac5k=\frac1x+\frac1y+\frac1z$ has at least one solution $(x, y, z)\in N$.

Keywords: Serpinsky’s hypothesis.

Received: 11.04.2013

Document Type: Article

MSC: 11A67; 11D72

Language: English

Citation: E. Kh. Aslanyan, “On the solution of the equation $\frac5k=\frac1x+\frac1y+\frac1z$ on the set of natural numbers $N\setminus \{60 n + 1, n\in N\}$”, Proceedings of the YSU, Physical and Mathematical Sciences, 2013, no. 3, 64–65

Citation in format AMSBIB

\Bibitem{Asl13}

\by E.~Kh.~Aslanyan

\paper On the solution of the equation $\frac5k=\frac1x+\frac1y+\frac1z$ on the set of natural numbers $N\setminus \{60 n + 1, n\in  N\}$

\jour Proceedings of the YSU, Physical  and Mathematical Sciences

\yr 2013

\issue 3

\pages 64--65

\mathnet{http://mi.mathnet.ru/uzeru84}

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Proceedings of the Yerevan State University, series Physical and Mathematical Sciences

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