Lao Hussein Mude, Maurice Owino Oduor, Michael Onyango Ojiema
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引用次数: 0
摘要
设 n、x、y、z 为任意给定的整数。对 n = x2 +y2 + z2 的 n 的研究是一个历史悠久的问题。最近对大量文献的调查表明,许多研究人员在提出将整数分解为三个平方之和的算法方面取得了一些进展。另一方面,关于整数表示为三个平方之和的现有成果仍然非常少。如果 a,b,c,d,k,m,n,u,v 和 w 是任意的非负整数,本研究确定了形式为 abcd+ka2+ma+n = u2 +v2 +w2 的三方之和公式,并建立了它在各种情况下的应用。
Let n,x,y,z be any given integers. The study of n for which n = x2 +y2 + z2 is a very long-standing problem. Recent survey of sizeable literature shows that many researchers have made some progress to come up with algorithms of decomposing integers into sums of three squares. On the other hand, available results on integer representation as sums of three square is still very minimal. If a,b,c,d,k,m,n,u,v and w are any non-negative integers, this study determines the sum of three-square formula of the form abcd+ka2+ma+n = u2 +v2 +w2 and establishes its applications to various cases.
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