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| viXra.org > Number Theory > viXra:1411.0075 |
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Number Theory |
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Authors: A. A. Frempong
Assuming the sum of the original Riemann series is L, a ratio method was used to split-up the series equation into sub-equations and each sub-equation was solved in terms of L, and ratio terms. It is to be noted that unquestionably, each term of the series equation contributes to the sum, L, of the series. There are infinitely many sub-equations and solutions corresponding to the infinitely many terms of the series equation. After the sum, L, and the ratio terms have been determined and substituted in the corresponding equations, the Riemann hypothesis would surely be either proved or disproved, since the original equation is being solved. Solving the original series equation eliminates possible hidden flaws in derived equations and consequent solutions.
Comments: 9 Pages. Copyright © by A. A. Frempong
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[v1] 2014-11-08 23:05:43
[v2] 2018-09-03 02:47:47
Unique-IP document downloads: 442 times
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