Small Mersenne Prime Factors (page 2904/5070)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Digits	Year
263095117	1578570703	10	~1998
263105543	526211087	9	~1997
263115551	526231103	9	~1997
263116559	526233119	9	~1997
263120909	2104967273	10	~1998
263125403	526250807	9	~1997
263139263	526278527	9	~1997
263141843	526283687	9	~1997
263146813	1578880879	10	~1998
263147399	526294799	9	~1997
263169479	526338959	9	~1997
263173283	526346567	9	~1997
263177279	526354559	9	~1997
263190803	526381607	9	~1997
263191381	1579148287	10	~1998
263193431	526386863	9	~1997
263195287	2631952871	10	~1998
263199731	526399463	9	~1997
263202757	1579216543	10	~1998
263210273	14739775289	11	~2000
263213123	526426247	9	~1997
263215279	2632152791	10	~1998
263225971	2632259711	10	~1998
263226479	526452959	9	~1997
263231737	6317561689	10	~1999

Exponent	Prime Factor	Digits	Year
263232059	526464119	9	~1997
263233871	526467743	9	~1997
263249771	526499543	9	~1997
263254151	526508303	9	~1997
263263463	526526927	9	~1997
263264483	526528967	9	~1997
263268737	2106149897	10	~1998
263269679	526539359	9	~1997
263270933	1579625599	10	~1998
263281019	2106248153	10	~1998
263286311	526572623	9	~1997
263294099	526588199	9	~1997
263303351	2106426809	10	~1998
263303437	1579820623	10	~1998
263314627	4739663287	10	~1999
263317787	2106542297	10	~1998
263319283	2633192831	10	~1998
263322743	526645487	9	~1997
263327063	526654127	9	~1997
263328599	526657199	9	~1997
263330339	526660679	9	~1997
263338123	4213409969	10	~1999
263339399	526678799	9	~1997
263342381	2106739049	10	~1998
263361599	526723199	9	~1997

Exponent	Prime Factor	Digits	Year
263367623	526735247	9	~1997
263381759	526763519	9	~1997
263388011	526776023	9	~1997
263388623	526777247	9	~1997
263392691	526785383	9	~1997
263403011	526806023	9	~1997
263405783	526811567	9	~1997
263408177	1580449063	10	~1998
263408279	526816559	9	~1997
263413439	526826879	9	~1997
263417117	2107336937	10	~1998
263417879	526835759	9	~1997
263421071	526842143	9	~1997
263423123	526846247	9	~1997
263427539	526855079	9	~1997
263427757	1580566543	10	~1998
263436839	526873679	9	~1997
263440427	2107523417	10	~1998
263444387	2107555097	10	~1998
263453623	6322886953	10	~1999
263453699	526907399	9	~1997
263461787	2107694297	10	~1998
263464403	526928807	9	~1997
263470859	526941719	9	~1997
263485979	526971959	9	~1997

Exponent	Prime Factor	Digits	Year
263495777	1580974663	10	~1998
263496377	1580978263	10	~1998
263509619	527019239	9	~1997
263510099	4743181783	10	~1999
263522411	527044823	9	~1997
263529179	527058359	9	~1997
263529401	1581176407	10	~1998
263540243	527080487	9	~1997
263544719	527089439	9	~1997
263551271	14758871177	11	~2000
263554103	527108207	9	~1997
263558831	527117663	9	~1997
263568191	527136383	9	~1997
263570999	527141999	9	~1997
263578019	527156039	9	~1997
263586439	4744555903	10	~1999
263596439	527192879	9	~1997
263603779	2636037791	10	~1998
263616623	527233247	9	~1997
263619817	1581718903	10	~1998
263623873	1581743239	10	~1998
263629451	527258903	9	~1997
263635019	527270039	9	~1997
263640959	527281919	9	~1997
263652971	527305943	9	~1997

4.768.925 digits

25-05-04