Small Mersenne Prime Factors (page 2943/5025)

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
299277899	598555799	9	~1997
299297423	598594847	9	~1997
299298911	598597823	9	~1997
299311139	598622279	9	~1997
299313247	19156047809	11	~2001
299316551	598633103	9	~1997
299322203	598644407	9	~1997
299339171	598678343	9	~1997
299341583	598683167	9	~1997
299346959	598693919	9	~1997
299355299	598710599	9	~1997
299360863	4789773809	10	~1999
299364683	598729367	9	~1997
299366609	2394932873	10	~1999
299382137	2395057097	10	~1999
299386463	598772927	9	~1997
299389019	598778039	9	~1997
299390857	1796345143	10	~1998
299396093	1796376559	10	~1998
299398259	598796519	9	~1997
299401559	598803119	9	~1997
299409263	12575189047	11	~2000
299421179	2395369433	10	~1999
299429771	598859543	9	~1997
299430143	598860287	9	~1997

Exponent	Prime Factor	Digits	Year
299431703	598863407	9	~1997
299454731	598909463	9	~1997
299455571	598911143	9	~1997
299455619	598911239	9	~1997
299457131	598914263	9	~1997
299459939	598919879	9	~1997
299468783	598937567	9	~1997
299470271	598940543	9	~1997
299482223	598964447	9	~1997
299491691	598983383	9	~1997
299499841	1796999047	10	~1998
299505851	599011703	9	~1997
299506979	599013959	9	~1997
299526971	599053943	9	~1997
299527331	599054663	9	~1997
299527463	599054927	9	~1997
299532419	599064839	9	~1997
299535073	1797210439	10	~1998
299538973	30552975247	11	~2001
299544281	2396354249	10	~1999
299550299	599100599	9	~1997
299563163	599126327	9	~1997
299572151	599144303	9	~1997
299578523	599157047	9	~1997
299581283	599162567	9	~1997

Exponent	Prime Factor	Digits	Year
299590943	599181887	9	~1997
299592539	599185079	9	~1997
299598457	4793575313	10	~1999
299605721	2396845769	10	~1999
299607871	31758434327	11	~2001
299608487	2396867897	10	~1999
299616089	2396928713	10	~1999
299620463	599240927	9	~1997
299632139	599264279	9	~1997
299633309	2397066473	10	~1999
299648161	21574667593	11	~2001
299651167	2996511671	10	~1999
299656211	599312423	9	~1997
299665423	2996654231	10	~1999
299680691	599361383	9	~1997
299702003	599404007	9	~1997
299707379	599414759	9	~1997
299712131	599424263	9	~1997
299712503	599425007	9	~1997
299712863	599425727	9	~1997
299715359	599430719	9	~1997
299715659	599431319	9	~1997
299727503	599455007	9	~1997
299733211	4795731377	10	~1999
299733877	1798403263	10	~1998

Exponent	Prime Factor	Digits	Year
299735603	599471207	9	~1997
299736329	2397890633	10	~1999
299753459	2398027673	10	~1999
299759639	599519279	9	~1997
299772877	7194549049	10	~2000
299776811	599553623	9	~1997
299786657	1798719943	10	~1998
299794193	4197118703	10	~1999
299811623	599623247	9	~1997
299812283	599624567	9	~1997
299817923	599635847	9	~1997
299822903	599645807	9	~1997
299835127	2998351271	10	~1999
299845691	599691383	9	~1997
299846639	599693279	9	~1997
299847013	52173380263	11	~2002
299850251	599700503	9	~1997
299864531	599729063	9	~1997
299870371	2998703711	10	~1999
299874119	599748239	9	~1997
299891399	2399131193	10	~1999
299896901	1799381407	10	~1998
299904287	2399234297	10	~1999
299917141	1799502847	10	~1998
299918231	599836463	9	~1997

4.724.182 digits

25-04-13