Special Spirals are Produced by the ROTASE Galactic Spiral Equations with the Sequential Prime Numbers

Academic Journal of Applied Mathematical Sciences Pub Date : 2022-08-25 DOI:10.32861/ajams.84.69.77

H. Pan

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Abstract

In this paper, the sequential prime numbers are used as variables for the galactic spiral equations which were developed from the ROTASE model. Special spiral patterns are produced when prime numbers are treated with the unit of radian. The special spiral patterns produced with the first 1000 prime numbers have 20 spirals arranged in two groups. The two groups have perfect central symmetry with each other and are separated with two spiral gaps. The special spiral pattern produced with natural numbers from 1 to 7919 shows 6 spirals in the central area and 44 spirals in the outer area. The whole 7919 spiral points can be plotted with either 6-spiral pattern or 44-spiral pattern. The special spiral pattern is well explained with careful analysis, it is concluded that all prime numbers greater than 3 must meet one of the equations: P1 = 1 + 6 * n (n > 0, n is an integer) P5 = 5 + 6 * m (m ≥ 0, m is an integer) Matching one of the equations is a necessary condition for a number to be a prime number, not a sufficient condition. Twin prime numbers can only be formed between P1 and P5 prime numbers, n must be 1 greater than m. The largest prime number is known at the moment 2^(82,589,933) – 1 is a P1 prime number.

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用序列素数的ROTASE星系螺旋方程产生了特殊的螺旋

本文采用序素数作为变量，求解由ROTASE模型导出的星系螺旋方程。当用弧度作为单位来处理素数时，会产生特殊的螺旋图案。由前1000个素数产生的特殊螺旋图案有20个螺旋分成两组。这两个群体彼此具有完美的中心对称，并由两个螺旋间隙分开。由自然数1 ~ 7919产生的特殊螺旋图案显示，中心区域有6个螺旋，外围区域有44个螺旋。整个7919个螺旋点可以用6螺旋图或44螺旋图绘制。通过对特殊螺旋模式的分析，得到了所有大于3的素数必须满足以下方程中的一个:P1 = 1 + 6 * n (n > 0, n为整数)P5 = 5 + 6 * m (m≥0,m为整数)满足其中一个方程是一个数为素数的必要条件，而不是充分条件。双素数只能在P1和P5素数之间形成，n必须大于m 1。目前已知的最大素数是2^(82,589,933)- 1是P1素数。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Academic Journal of Applied Mathematical Sciences

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