Small Mersenne Prime Factors (page 3530/5025)

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
1195444319	2390888639	10	~2002
1195469711	9563757689	10	~2003
1195477253	7172863519	10	~2003
1195552079	2391104159	10	~2002
1195561277	9564490217	10	~2003
1195562803	11955628031	11	~2004
1195566937	7173401623	10	~2003
1195584839	2391169679	10	~2002
1195664279	2391328559	10	~2002
1195683179	2391366359	10	~2002
1195683877	7174103263	10	~2003
1195729609	28697510617	11	~2005
1195780477	7174682863	10	~2003
1195848541	133935036593	12	~2006
1195873751	2391747503	10	~2002
1195877279	2391754559	10	~2002
1195885871	2391771743	10	~2002
1195890659	2391781319	10	~2002
1195895531	2391791063	10	~2002
1195933619	2391867239	10	~2002
1195980671	2391961343	10	~2002
1195986443	2391972887	10	~2002
1196012711	2392025423	10	~2002
1196013323	2392026647	10	~2002
1196111963	2392223927	10	~2002

Exponent	Prime Factor	Digits	Year
1196145011	9569160089	10	~2003
1196159863	11961598631	11	~2004
1196178443	2392356887	10	~2002
1196269703	2392539407	10	~2002
1196271071	2392542143	10	~2002
1196316119	2392632239	10	~2002
1196342831	2392685663	10	~2002
1196372833	26320202327	11	~2004
1196385959	2392771919	10	~2002
1196554657	7179327943	10	~2003
1196612519	2393225039	10	~2002
1196644369	28719464857	11	~2005
1196648441	7179890647	10	~2003
1196658293	7179949759	10	~2003
1196660411	2393320823	10	~2002
1196686103	2393372207	10	~2002
1196745971	2393491943	10	~2002
1196752643	2393505287	10	~2002
1196758019	2393516039	10	~2002
1196832023	2393664047	10	~2002
1196988983	2393977967	10	~2002
1196996483	2393992967	10	~2002
1197028103	2394056207	10	~2002
1197075727	105342663977	12	~2006
1197086903	2394173807	10	~2002

Exponent	Prime Factor	Digits	Year
1197098663	2394197327	10	~2002
1197098761	47883950441	11	~2005
1197218843	2394437687	10	~2002
1197231209	124512045737	12	~2006
1197269039	2394538079	10	~2002
1197285359	2394570719	10	~2002
1197289811	2394579623	10	~2002
1197293039	2394586079	10	~2002
1197299219	2394598439	10	~2002
1197329579	2394659159	10	~2002
1197377737	7184266423	10	~2003
1197387671	9579101369	10	~2003
1197441277	19159060433	11	~2004
1197594401	9580755209	10	~2003
1197601033	7185606199	10	~2003
1197643399	11976433991	11	~2004
1197644303	2395288607	10	~2002
1197650819	2395301639	10	~2002
1197707411	2395414823	10	~2002
1197709237	7186255423	10	~2003
1197720143	2395440287	10	~2002
1197734381	7186406287	10	~2003
1197743303	2395486607	10	~2002
1197748199	2395496399	10	~2002
1197764417	7186586503	10	~2003

Exponent	Prime Factor	Digits	Year
1197764891	2395529783	10	~2002
1197779483	2395558967	10	~2002
1197826451	9582611609	10	~2003
1197835571	2395671143	10	~2002
1197872939	2395745879	10	~2002
1197875579	2395751159	10	~2002
1197900311	2395800623	10	~2002
1197940643	2395881287	10	~2002
1197944179	50313655519	11	~2005
1197949163	2395898327	10	~2002
1197950317	57501615217	11	~2005
1197996623	2395993247	10	~2002
1198012091	9584096729	10	~2003
1198045223	2396090447	10	~2002
1198078433	7188470599	10	~2003
1198178183	2396356367	10	~2002
1198258421	9586067369	10	~2003
1198282931	57517580689	11	~2005
1198285463	2396570927	10	~2002
1198291331	2396582663	10	~2002
1198291463	2396582927	10	~2002
1198336283	2396672567	10	~2002
1198337663	2396675327	10	~2002
1198340243	2396680487	10	~2002
1198426259	2396852519	10	~2002

4.724.182 digits

25-04-13