Universal Journal of Computational Mathematics(CEASE PUBLICATION) Vol. 4(2), pp. 16 - 20
DOI: 10.13189/ujcmj.2016.040201
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New and Renewed Variations on Prime Numbers

Andri Lopez ^*
Institute Polytecnic of Leon, Spain

ABSTRACT

In this article the why and how of the prime numbers were shown; to be more specific, I present the pattern that was defined, i.e. every prime number is in the interval between (30a + (p)) and (42a + (p1)); p = (11;17;23;29); p1 = (13; 19; 25; 31; 37; 43). This verifies the accuracy of the series of Dirichelet, and improvement, because any series that of a prime number matches the prime number of this pattern. Another contribution of this work is to know whether a number is prime; both for a small number, as for one he is infinitely large, without applying the process of factorization.

KEYWORDS
Arithmetic, Group (G₅;G₇), Equation Twin Prime Number

Cite This Paper in IEEE or APA Citation Styles
(a). IEEE Format:
[1] Andri Lopez , "New and Renewed Variations on Prime Numbers," Universal Journal of Computational Mathematics(CEASE PUBLICATION), Vol. 4, No. 2, pp. 16 - 20, 2016. DOI: 10.13189/ujcmj.2016.040201.

(b). APA Format:
Andri Lopez (2016). New and Renewed Variations on Prime Numbers. Universal Journal of Computational Mathematics(CEASE PUBLICATION), 4(2), 16 - 20. DOI: 10.13189/ujcmj.2016.040201.