Small Mersenne Prime Factors (page 3947/5205)

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
2647706987	21181655897	11	~2006
2647711499	5295422999	10	~2005
2647726439	5295452879	10	~2005
2647771957	42364351313	11	~2007
2647810883	5295621767	10	~2005
2647811429	21182491433	11	~2006
2647837163	5295674327	10	~2005
2647929923	5295859847	10	~2005
2647970639	5295941279	10	~2005
2648003051	5296006103	10	~2005
2648058191	5296116383	10	~2005
2648079431	5296158863	10	~2005
2648245157	15889470943	11	~2006
2648249843	5296499687	10	~2005
2648284643	5296569287	10	~2005
2648498117	15890988703	11	~2006
2648609399	5297218799	10	~2005
2648673659	47676125863	11	~2007
2648715437	15892292623	11	~2006
2648721451	26487214511	11	~2006
2648732711	5297465423	10	~2005
2648762159	5297524319	10	~2005
2648786453	37083010343	11	~2007
2648827061	15892962367	11	~2006
2648828111	5297656223	10	~2005

Exponent	Prime Factor	Digits	Year
2648850779	5297701559	10	~2005
2648997731	5297995463	10	~2005
2649051479	5298102959	10	~2005
2649447791	5298895583	10	~2005
2649547643	5299095287	10	~2005
2649556379	5299112759	10	~2005
2649679463	5299358927	10	~2005
2649757813	15898546879	11	~2006
2649762359	5299524719	10	~2005
2649785711	5299571423	10	~2005
2649829277	15898975663	11	~2006
2649847877	21198783017	11	~2006
2649955753	15899734519	11	~2006
2649985463	5299970927	10	~2005
2650069679	5300139359	10	~2005
2650114847	21200918777	11	~2006
2650300379	5300600759	10	~2005
2650336631	21202693049	11	~2006
2650430351	5300860703	10	~2005
2650436231	5300872463	10	~2005
2650541303	5301082607	10	~2005
2650637711	5301275423	10	~2005
2650660283	5301320567	10	~2005
2650695427	47712517687	11	~2007
2650699379	5301398759	10	~2005

Exponent	Prime Factor	Digits	Year
2650824959	5301649919	10	~2005
2650918691	5301837383	10	~2005
2650930211	5301860423	10	~2005
2650940161	15905640967	11	~2006
2650974659	5301949319	10	~2005
2651068163	5302136327	10	~2005
2651131943	5302263887	10	~2005
2651218571	5302437143	10	~2005
2651350151	5302700303	10	~2005
2651392559	5302785119	10	~2005
2651405279	5302810559	10	~2005
2651423657	100754098967	12	~2008
2651433563	5302867127	10	~2005
2651434403	5302868807	10	~2005
2651572439	5303144879	10	~2005
2651636831	5303273663	10	~2005
2651707979	5303415959	10	~2005
2651784463	26517844631	11	~2006
2651798393	15910790359	11	~2006
2651866823	5303733647	10	~2005
2651903123	5303806247	10	~2005
2651948263	42431172209	11	~2007
2651961491	5303922983	10	~2005
2652005399	5304010799	10	~2005
2652172223	5304344447	10	~2005

Exponent	Prime Factor	Digits	Year
2652512617	15915075703	11	~2006
2652535703	5305071407	10	~2005
2652562103	5305124207	10	~2005
2652765539	5305531079	10	~2005
2652905639	5305811279	10	~2005
2653025099	5306050199	10	~2005
2653231717	15919390303	11	~2006
2653320023	84906240737	11	~2008
2653430831	5306861663	10	~2005
2653522777	15921136663	11	~2006
2653528499	5307056999	10	~2005
2653581851	5307163703	10	~2005
2653592471	5307184943	10	~2005
2653839317	15923035903	11	~2006
2654026139	5308052279	10	~2005
2654131283	5308262567	10	~2005
2654136533	15924819199	11	~2006
2654155019	5308310039	10	~2005
2654195917	15925175503	11	~2006
2654320811	5308641623	10	~2005
2654375519	5308751039	10	~2005
2654394377	15926366263	11	~2006
2654674391	5309348783	10	~2005
2654857151	5309714303	10	~2005
2654866199	5309732399	10	~2005

4.903.097 digits

25-07-08