# On the sums of many biquadrates in two different ways

**Authors:** Farzali Izadi, Mehdi Baghalagdam

arXiv: 1701.02687 · 2017-01-11

## TL;DR

This paper explores the representation of numbers as sums of multiple biquadrates in two different ways, utilizing solutions to a quartic Diophantine equation to generate numerous examples and parametric solutions.

## Contribution

It introduces a novel method to generate infinitely many solutions for expressing numbers as sums of biquadrates in two different ways, based on solving a specific quartic Diophantine equation.

## Key findings

- Infinite solutions for sums of biquadrates in two different ways.
- Explicit examples for sums involving 2 to 10 biquadrates.
- Parametric solutions for arbitrary rational h.

## Abstract

The beautiful quartic Diophantine equation $A^4+hB^4=C^4+hD^4$, where $h$ is a fixed arbitrary positive integer, has been studied by some mathematicians for many years. Although Choudhry, Gerardin and Piezas presented solutions of this equation for many values of $h$, the solutions were not known for arbitrary positive integer values of $h$. In a separate paper (see the arxiv), the authors completely solved the equation for arbitrary values of $h$, and worked out many examples for different values of $h$, in particular for the values which has not already been given a solution. Our method, give rise to infinitely many solutions and also infinitely many parametric solutions for the equation for arbitrary rational values of $h$. In the present paper, we use the above solutions as well as a simple idea to show that how some numbers can be written as the sums of two, three, four, five, or more biquadrates in two different ways. In particular we give examples for the sums of $2$, $3$, $\cdots$, and $10$, biquadrates expressed in two different ways.

## Full text

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## References

7 references — full list in the complete paper: https://tomesphere.com/paper/1701.02687/full.md

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Source: https://tomesphere.com/paper/1701.02687