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Create the page "Proth prime prime" on this wiki! See also the search results found.
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- [[Category:Prime]]13 members (10 subcategories, 0 files) - 13:32, 6 March 2019
- {{Proth prime432 bytes (32 words) - 13:38, 2 January 2023
- {{Proth prime498 bytes (31 words) - 13:34, 2 January 2023
- {{Proth prime334 bytes (32 words) - 15:12, 27 January 2023
- ...oth prime]]s and some others subjects like [[Aliquot sequence]]s or [[Home prime]]s. *[https://www.rieselprime.de/default.htm Riesel and Proth Prime Database main page]380 bytes (59 words) - 14:14, 24 January 2019
- {{Proth prime581 bytes (64 words) - 19:18, 5 April 2023
- ...in the form {{Kbn|+|k|n}} with 2<sup>''n''</sup> > ''k'' are often called Proth primes. *[[Proth's theorem]]656 bytes (91 words) - 07:02, 31 August 2020
- Template Proth prime Display of current data for Proth primes {{Kbn|+|k|b|n}}, comments will be displayed as references at the bot9 KB (1,060 words) - 17:03, 25 July 2021
- {{Proth prime212 bytes (30 words) - 15:35, 2 October 2022
- {{Proth prime {{HistF|2020-10-25|16408818|James Scott Brown,PrimeGrid 321 Prime Search|561613}} ([https://www.primegrid.com/download/321-16408818.pdf Offic3 KB (336 words) - 16:58, 15 April 2024
- {{Proth prime1 KB (144 words) - 11:12, 24 August 2021
- {{Proth prime {{HistF|2012-11-10|5775996|Martyn Elvy,PrimeGrid Proth Prime Search}} ([http://www.primegrid.com/download/PPS-5775996.pdf Official annou2 KB (267 words) - 21:47, 5 July 2023
- DPL statement to display one row in the [[Proth prime table]]. [[Category:Prime collections]]</noinclude><includeonly>1 KB (124 words) - 21:59, 1 August 2021
- Automatically generated table from available [[:Category:Proth prime|Proth primes]]. category=Category:Proth 2750 bytes (108 words) - 14:39, 12 July 2021
- {{Proth prime {{HistC|2024-04-30|5000000|PrimeGrid Proth Prime Search}}3 KB (456 words) - 04:11, 15 May 2024
- {{Proth prime {{HistC|2019-07|3322000-3640000|PrimeGrid Proth Mega Prime Search}}2 KB (248 words) - 08:42, 15 May 2024
- {{Proth prime {{HistC|2019-07|3322000-3640000|PrimeGrid Proth Mega Prime Search}}2 KB (197 words) - 08:36, 15 May 2024
- {{Proth prime {{HistC|2019-07|3322000-3640000|PrimeGrid Proth Mega Prime Search}}3 KB (412 words) - 08:00, 15 May 2024
- {{Proth prime {{HistC|2019-07|3322000-3640000|PrimeGrid Proth Mega Prime Search}}1 KB (149 words) - 04:18, 15 May 2024
- {{Proth prime {{HistC|2019-07|3322000-3640000|PrimeGrid Proth Mega Prime Search}}1 KB (153 words) - 04:17, 15 May 2024
Page text matches
- * Prime (direct) ** Mersenne_prime|Mersenne prime932 bytes (100 words) - 08:26, 15 May 2024
- :<nowiki>{{GP|<prime name>|<Parameter>}}</nowiki> *<nowiki>{{GP|Carol-Kynea prime 2|CKBase}}</nowiki> results in3 KB (311 words) - 18:08, 13 August 2021
- ...n}}-value;Top5000-ID}}: the {{Vn}}-value is given with a link to the [[The Prime Pages]] ::T: [[Twin prime]]3 KB (440 words) - 16:51, 22 March 2024
- ...de=true|title=Example of prime sequence and reservation|content=[[Williams prime MM 5]]}} *[https://www.rieselprime.de/default.htm Riesel and Proth Prime Databse RPPDb]11 KB (1,236 words) - 08:27, 15 May 2024
- ...ese factorisations can be found at [http://www.prothsearch.com/fermat.html Prime Factors of Fermat Numbers] ...</sup> + 1 ≡ 0 (mod 2<sup>{{V|a}}</sup> + 1).) In other words, every prime of the form {{Kbn|+|n}} is a Fermat number, and such primes are called '''F12 KB (1,913 words) - 14:35, 9 August 2021
- {{Proth prime432 bytes (32 words) - 13:38, 2 January 2023
- {{Proth prime498 bytes (31 words) - 13:34, 2 January 2023
- {{Proth prime334 bytes (32 words) - 15:12, 27 January 2023
- ...e covered, meaning that no member of the sequence {{Kbn|+|78557|n}} can be prime. The same arguments can be said of the numbers 271129, 271577, 322523, 3277 ...oices of {{Vk}}. However, sometimes {{Vn}} has to grow very large before a prime number appears.5 KB (650 words) - 10:25, 26 March 2024
- :28 [[Proth prime]]s for 3 ≤ {{Vk}} ≤ 97 :Found factor [[Proth prime 2 5|{{Kbn|+|5|2|39}}]] of {{DGF|36}}2 KB (195 words) - 00:13, 15 January 2024
- ...Sierpiński problem]] article, [[Hans Riesel]] found in 1956 that [[Riesel prime 2 509203|{{Kbn|509203|n}}]] is always composite. *[[Riesel and Proth Prime Database]]827 bytes (112 words) - 08:21, 25 March 2024
- ...oth prime]]s and some others subjects like [[Aliquot sequence]]s or [[Home prime]]s. *[https://www.rieselprime.de/default.htm Riesel and Proth Prime Database main page]380 bytes (59 words) - 14:14, 24 January 2019
- .... When the number is declared composite, the algorithm does not reveal the prime [[factor]]s. That is the job of the [[Factorization|factorization methods]] ...the confidence grows, but we cannot be completely sure that the number is prime until a primality test (which is far slower than a probable primality test3 KB (501 words) - 05:20, 3 August 2021
- ...ne number]]s<br/>a × b<sup>n</sup>±c (only factoring and [[probable prime|PRP]]-testing) | [https://github.com/danaj/Math-Prime-Util-GMP]2 KB (314 words) - 21:23, 29 August 2019
- ...: "The test that we today call Pépin's test is actually [[Proth's theorem|Proth's test]] with a proof provided by Lucas". Pépin's test says: If <math>n>0</math>, <math>F_n = 2^{2^n}+1</math> is a prime if and only if <math>\ 3^{(F_n-1)/2} \ \equiv -1 \ \pmod{F_n}</math>.2 KB (401 words) - 14:40, 6 March 2019
- **[[Proth's theorem|Proth algorithm]] for {{Kbn|+|k|n}} numbers. ...ith |{{V|c}}| ≠ 1 or {{V|k}} > {{Vb}}<sup>{{Vn}}</sup> can be [[probable prime|PRP]]-tested.2 KB (300 words) - 22:00, 16 December 2023
- ...g project|distributed computing project]] in search of the largest [[Proth prime]]s. | New prime1 KB (182 words) - 08:17, 12 July 2020
- ...2^{2p^n}+2^{p^n}+1 \ = \ (2^{p^{n+1}}-1)/(2^{p^n}-1)</math> where p is the prime of apparition rank r (r(2)=1, r(3)=2, r(5)=3, ...) and n is greater or equa #If number <math>\sum_{i=0}^{p-1}\ (2^i)^{m} \ </math> is prime, then <math>m=p^n</math>.5 KB (726 words) - 09:57, 12 September 2021
- '''PrimeGrid''' is a [[distributed computing]] project for searching for [[prime]] numbers of world-record size. It makes use of the [[BOINC|Berkeley Open I *Type Proth:3 KB (458 words) - 10:28, 26 March 2024
- {{Proth prime581 bytes (64 words) - 19:18, 5 April 2023