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Difference between revisions of "PrimeGrid Prime Sierpiński Problem"
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==Purpose== | ==Purpose== | ||
− | The [[Sierpiński problem]] is attempting to prove that | + | The [[Sierpiński problem]] is attempting to prove that {{Vk}} = 78557 is the smallest Sierpiński number. However, 78557 itself is not a prime number. |
− | The Prime Sierpiński Problem wants to find the smallest Sierpiński number that is also a prime number. The smallest known number that meets these conditions is | + | The Prime Sierpiński Problem wants to find the smallest Sierpiński number that is also a prime number. The smallest known number that meets these conditions is {{Vk}} = 271129. To prove that 271129 is the smallest prime Sierpiński number, all prime values of {{Vk}} < 271129 must be shown to produce a prime number of the form {{Kbn|+|k|n}}. |
==Status== | ==Status== | ||
− | As of | + | *[https://www.primegrid.com/stats_psp_llr.php Live status] |
+ | *Multi Reservation [[Multi Reservation:18|here]] | ||
+ | As of {{Multi Reservation:18-Date}}, there are 7 {{Vk}}-values being searched by the project: [[Proth prime 2 79309|79309]], [[Proth prime 2 79817|79817]], [[Proth prime 2 152267|152267]], [[Proth prime 2 156511|156511]], [[Proth prime 2 222113|222113]], [[Proth prime 2 225931|225931]], and [[Proth prime 2 237019|237019]]. The search is at {{Vn}} > {{Num|{{Multi Reservation:18-NMax}}}}. | ||
− | There are also no known primes for | + | There are also no known primes for {{Vk}} = [[Proth prime 2 22699|22699]] and [[Proth prime 2 67607|67607]], but these are already part of the standard Sierpiński problem. |
==History of eliminated candidates== | ==History of eliminated candidates== | ||
− | *2017-09-17: [[Proth prime 168451|{{Kbn|+|168451|19375200}}]] | + | *2017-09-17: [[Proth prime 2 168451|{{Kbn|+|168451|19375200}}]] |
− | *2016-10-31: [[Proth prime 10223|{{Kbn|+|10223|31172165}}]], eliminating | + | *2016-10-31: [[Proth prime 2 10223|{{Kbn|+|10223|31172165}}]], eliminating {{Vk}} = 10223 from both the Sierpiński and Prime Sierpiński problems. |
==See also== | ==See also== | ||
*[[Sierpiński problem]] | *[[Sierpiński problem]] | ||
− | *[[PrimeGrid]] | + | *[[PrimeGrid Seventeen or Bust]] |
==External links== | ==External links== | ||
* [https://www.primegrid.com/forum_thread.php?id=972 About the Prime Sierpinski Problem - PrimeGrid forums] | * [https://www.primegrid.com/forum_thread.php?id=972 About the Prime Sierpinski Problem - PrimeGrid forums] | ||
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+ | {{Navbox PrimeGrid}} | ||
[[Category:PrimeGrid Prime Sierpiński Problem| ]] | [[Category:PrimeGrid Prime Sierpiński Problem| ]] |
Latest revision as of 11:43, 5 September 2021
The Prime Sierpiński Problem is a PrimeGrid sub-project, launched in 2008. It is a continuation of the Prime Sierpinski Project that operated on the Mersenne Forums.
Purpose
The Sierpiński problem is attempting to prove that k = 78557 is the smallest Sierpiński number. However, 78557 itself is not a prime number.
The Prime Sierpiński Problem wants to find the smallest Sierpiński number that is also a prime number. The smallest known number that meets these conditions is k = 271129. To prove that 271129 is the smallest prime Sierpiński number, all prime values of k < 271129 must be shown to produce a prime number of the form k•2n+1.
Status
- Live status
- Multi Reservation here
As of 2024-11-12, there are 7 k-values being searched by the project: 79309, 79817, 152267, 156511, 222113, 225931, and 237019. The search is at n > 33,582,000.
There are also no known primes for k = 22699 and 67607, but these are already part of the standard Sierpiński problem.
History of eliminated candidates
- 2017-09-17: 168451•219375200+1
- 2016-10-31: 10223•231172165+1, eliminating k = 10223 from both the Sierpiński and Prime Sierpiński problems.
See also
External links
Miscellaneous |
Subprojects |
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Completed |
Others |