四个偶数的相等和

Asian Research Journal of Mathematics Pub Date : 2024-06-06 DOI:10.9734/arjom/2024/v20i5802

Kimtai Boaz Simatwo

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引用次数: 0

摘要

设 u、v、w、z、k、m 和 I 是任意整数，使得 k = z - w = w - v = v - u 。关于 I = u2n + v2n + w2n + z2n = k2 + m2 + r2 的整数 I 的研究尚不清楚。因此，本研究通过引入有关四个偶数幂的和为三个平方的精确和的新公式来部分克服这一难题。

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Equal Sums of Four Even Powers

Let u, v, w, z, k, m and I be any integers such that k = z - w = w - v = v - u . The study of integer I for which I = u2n + v2n + w2n + z2n = k2 + m2 + r2 is not known. This study is therefore, set to partially overcome this challenge by introducing new formula relating sums of four even powers as an exact sum of three squares.

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Asian Research Journal of Mathematics

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