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Difference between revisions of "Sierpiński number base 5"

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A '''Sierpiński number base 5''' is a value of ''k'' such that ''k &times; 5<sup>n</sup> + 1'' is always [[composite number|composite]].
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A '''Sierpiński number base 5''' is a value of {{Vk}} such that {{Kbn|+|k|5|n}} is always [[composite number|composite]].
  
Using the same method presented in the [[Sierpiński problem]] article, it was found that ''{{Num|159986}} &times; 5<sup>n</sup> + 1'' is multiple of 3, 7, 13, 31 or 601 (the [[covering set]]) depending on the value of ''n'', so it is always composite.
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Using the same method presented in the [[Sierpiński problem]] article, it was found that {{Kbn|+|159986|5|n}} is multiple of 3, 7, 13, 31 or 601 (the [[covering set]]) depending on the value of {{Vn}}, so it is always composite.
  
In order to demonstrate whether {{Num|159986}} is the smallest Sierpiński number base 5 or not, a [[distributed computing project]] was created named [[Sierpiński-Riesel Base 5]]
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In order to demonstrate whether {{Num|159986}} is the smallest Sierpiński number base 5 or not, a [[distributed computing project]] was created named [[Sierpiński-Riesel Base 5]].
[[Category:Numbers]]
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[[Category:Number]]

Latest revision as of 10:57, 14 October 2020

A Sierpiński number base 5 is a value of k such that k•5n+1 is always composite.

Using the same method presented in the Sierpiński problem article, it was found that 159986•5n+1 is multiple of 3, 7, 13, 31 or 601 (the covering set) depending on the value of n, so it is always composite.

In order to demonstrate whether 159,986 is the smallest Sierpiński number base 5 or not, a distributed computing project was created named Sierpiński-Riesel Base 5.