Small Mersenne Prime Factors (page 3198/5760)

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
254170781	2033366249	10	~1998
254174579	508349159	9	~1997
254177321	1525063927	10	~1998
254187359	508374719	9	~1997
254188691	508377383	9	~1997
254191799	508383599	9	~1997
254198039	508396079	9	~1997
254199767	30503972041	11	~2001
254202323	508404647	9	~1997
254203931	508407863	9	~1997
254206991	12201935569	11	~2000
254210003	508420007	9	~1997
254222797	1525336783	10	~1998
254226359	508452719	9	~1997
254232623	508465247	9	~1997
254234219	508468439	9	~1997
254234297	2033874377	10	~1998
254236447	8644039199	10	~2000
254239639	2542396391	10	~1998
254259059	508518119	9	~1997
254272643	508545287	9	~1997
254275943	508551887	9	~1997
254276111	508552223	9	~1997
254277973	6102671353	10	~1999
254291299	4577243383	10	~1999

Exponent	Prime Factor	Digits	Year
254301191	2034409529	10	~1998
254301479	508602959	9	~1997
254305151	508610303	9	~1997
254305631	508611263	9	~1997
254306471	508612943	9	~1997
254307731	508615463	9	~1997
254307923	508615847	9	~1997
254311679	508623359	9	~1997
254317991	508635983	9	~1997
254320471	4069127537	10	~1999
254326907	2034615257	10	~1998
254336297	1526017783	10	~1998
254341187	2034729497	10	~1998
254344151	508688303	9	~1997
254344451	508688903	9	~1997
254344943	508689887	9	~1997
254345281	5595596183	10	~1999
254345699	508691399	9	~1997
254349457	1526096743	10	~1998
254349983	508699967	9	~1997
254351711	508703423	9	~1997
254354173	1526125039	10	~1998
254361139	2543611391	10	~1998
254361319	8648284847	10	~2000
254363699	508727399	9	~1997

Exponent	Prime Factor	Digits	Year
254365337	2034922697	10	~1998
254366771	508733543	9	~1997
254370899	508741799	9	~1997
254371583	8139890657	10	~2000
254371979	508743959	9	~1997
254372879	508745759	9	~1997
254375939	508751879	9	~1997
254382473	1526294839	10	~1998
254387363	508774727	9	~1997
254390663	508781327	9	~1997
254396563	4070345009	10	~1999
254396591	508793183	9	~1997
254396711	508793423	9	~1997
254400983	508801967	9	~1997
254410451	508820903	9	~1997
254416031	508832063	9	~1997
254416819	22388680073	11	~2001
254420653	1526523919	10	~1998
254422319	508844639	9	~1997
254427343	4070837489	10	~1999
254428799	508857599	9	~1997
254433323	508866647	9	~1997
254438003	508876007	9	~1997
254438651	12213055249	11	~2000
254450639	508901279	9	~1997

Exponent	Prime Factor	Digits	Year
254450699	508901399	9	~1997
254458903	47329355959	11	~2001
254463239	508926479	9	~1997
254465647	4071450353	10	~1999
254467523	508935047	9	~1997
254480483	508960967	9	~1997
254497511	508995023	9	~1997
254499359	508998719	9	~1997
254508257	1527049543	10	~1998
254511311	509022623	9	~1997
254511371	509022743	9	~1997
254512283	509024567	9	~1997
254514959	509029919	9	~1997
254520023	509040047	9	~1997
254524871	509049743	9	~1997
254526743	509053487	9	~1997
254530163	509060327	9	~1997
254533199	509066399	9	~1997
254537351	509074703	9	~1997
254545559	509091119	9	~1997
254550761	1527304567	10	~1998
254552351	509104703	9	~1997
254557883	509115767	9	~1997
254561903	509123807	9	~1997
254565797	1527394783	10	~1998

5.456.260 digits

26-03-22