Small Mersenne Prime Factors (page 3895/5670)

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
1152729911	2305459823	10	~2002
1152735061	18443760977	11	~2004
1152771863	2305543727	10	~2002
1152773857	18444381713	11	~2004
1152789311	2305578623	10	~2002
1152829543	11528295431	11	~2004
1152850793	16139911103	11	~2004
1152887707	11528877071	11	~2004
1152943163	2305886327	10	~2002
1152953843	2305907687	10	~2002
1152975179	2305950359	10	~2002
1153031063	2306062127	10	~2002
1153051439	2306102879	10	~2002
1153062173	6918373039	10	~2003
1153067039	2306134079	10	~2002
1153069559	2306139119	10	~2002
1153136711	2306273423	10	~2002
1153186091	2306372183	10	~2002
1153206521	6919239127	10	~2003
1153220339	2306440679	10	~2002
1153254611	2306509223	10	~2002
1153266071	2306532143	10	~2002
1153317551	2306635103	10	~2002
1153326431	2306652863	10	~2002
1153353059	2306706119	10	~2002

Exponent	Prime Factor	Digits	Year
1153363999	11533639991	11	~2004
1153369619	9226956953	10	~2003
1153406363	2306812727	10	~2002
1153426679	2306853359	10	~2002
1153450163	2306900327	10	~2002
1153460653	18455370449	11	~2004
1153539923	2307079847	10	~2002
1153569779	2307139559	10	~2002
1153584119	2307168239	10	~2002
1153600991	2307201983	10	~2002
1153651277	9229210217	10	~2003
1153707593	6922245559	10	~2003
1153710697	6922264183	10	~2003
1153776419	2307552839	10	~2002
1153782863	2307565727	10	~2002
1153798813	6922792879	10	~2003
1153800077	9230400617	10	~2003
1153808699	2307617399	10	~2002
1153828393	27691881433	11	~2004
1153847459	2307694919	10	~2002
1153849427	9230795417	10	~2003
1153866541	6923199247	10	~2003
1153874783	2307749567	10	~2002
1153875743	2307751487	10	~2002
1153905059	2307810119	10	~2002

Exponent	Prime Factor	Digits	Year
1153915151	2307830303	10	~2002
1153957991	2307915983	10	~2002
1153962479	2307924959	10	~2002
1153962583	11539625831	11	~2004
1154005997	6924035983	10	~2003
1154040011	2308080023	10	~2002
1154051153	27697227673	11	~2004
1154208101	6925248607	10	~2003
1154286853	6925721119	10	~2003
1154353199	2308706399	10	~2002
1154357531	2308715063	10	~2002
1154384089	27705218137	11	~2004
1154400211	18470403377	11	~2004
1154406349	27705752377	11	~2004
1154482319	2308964639	10	~2002
1154495101	25398892223	11	~2004
1154508119	2309016239	10	~2002
1154542271	9236338169	10	~2003
1154558609	43873227143	11	~2005
1154582111	2309164223	10	~2002
1154593883	2309187767	10	~2002
1154600423	2309200847	10	~2002
1154639543	2309279087	10	~2002
1154656121	6927936727	10	~2003
1154672663	2309345327	10	~2002

Exponent	Prime Factor	Digits	Year
1154785871	2309571743	10	~2002
1154791271	2309582543	10	~2002
1154832443	2309664887	10	~2002
1154837441	9238699529	10	~2003
1154842043	2309684087	10	~2002
1154898341	6929390047	10	~2003
1154921699	2309843399	10	~2002
1155036251	2310072503	10	~2002
1155036479	2310072959	10	~2002
1155054161	9240433289	10	~2003
1155057131	2310114263	10	~2002
1155062819	2310125639	10	~2002
1155065783	2310131567	10	~2002
1155078971	2310157943	10	~2002
1155112559	2310225119	10	~2002
1155120023	2310240047	10	~2002
1155144383	2310288767	10	~2002
1155152333	6930913999	10	~2003
1155161291	2310322583	10	~2002
1155165839	2310331679	10	~2002
1155168923	2310337847	10	~2002
1155171323	2310342647	10	~2002
1155261011	2310522023	10	~2002
1155272603	2310545207	10	~2002
1155303959	2310607919	10	~2002

5.366.787 digits

26-02-08