Small Mersenne Prime Factors (page 4411/5610)

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
4528018499	9056036999	10	~2006
4528241339	9056482679	10	~2006
4528347503	9056695007	10	~2006
4528421879	9056843759	10	~2006
4528428901	27170573407	11	~2008
4528585703	9057171407	10	~2006
4528661363	9057322727	10	~2006
4528904293	108693703033	12	~2009
4528971149	36231769193	11	~2008
4529083241	36232665929	11	~2008
4529202131	9058404263	10	~2006
4529208851	9058417703	10	~2006
4529362919	9058725839	10	~2006
4529714531	9059429063	10	~2006
4529855903	9059711807	10	~2006
4529990039	9059980079	10	~2006
4530076571	9060153143	10	~2006
4530113723	9060227447	10	~2006
4530143537	27180861223	11	~2008
4530372599	81546706783	11	~2009
4530483257	27182899543	11	~2008
4530985691	9061971383	10	~2006
4531090357	27186542143	11	~2008
4531134143	9062268287	10	~2006
4531180957	27187085743	11	~2008

Exponent	Prime Factor	Digits	Year
4531228193	27187369159	11	~2008
4531314143	9062628287	10	~2006
4531416061	72502656977	11	~2009
4531580519	9063161039	10	~2006
4531727897	27190367383	11	~2008
4531781677	27190690063	11	~2008
4531993751	9063987503	10	~2006
4532012539	45320125391	11	~2008
4532017559	9064035119	10	~2006
4532024201	498522662111	12	~2011
4532072123	9064144247	10	~2006
4532209687	45322096871	11	~2008
4532252531	9064505063	10	~2006
4532493863	9064987727	10	~2006
4532811071	9065622143	10	~2006
4533259331	9066518663	10	~2006
4533266141	27199596847	11	~2008
4533506303	9067012607	10	~2006
4533533111	9067066223	10	~2006
4533606043	45336060431	11	~2008
4533860927	117880384103	12	~2009
4533972041	27203832247	11	~2008
4534025183	9068050367	10	~2006
4534203497	36273627977	11	~2008
4534230923	9068461847	10	~2006

Exponent	Prime Factor	Digits	Year
4534281611	9068563223	10	~2006
4534322423	9068644847	10	~2006
4534552163	9069104327	10	~2006
4534652711	9069305423	10	~2006
4534837403	9069674807	10	~2006
4534865399	9069730799	10	~2006
4534951847	299306821903	12	~2010
4535303351	9070606703	10	~2006
4535428379	9070856759	10	~2006
4535449999	45354499991	11	~2008
4535574731	9071149463	10	~2006
4535623993	27213743959	11	~2008
4535706997	27214241983	11	~2008
4535724077	27214344463	11	~2008
4535776499	9071552999	10	~2006
4535905403	9071810807	10	~2006
4536139403	9072278807	10	~2006
4536212503	108869100073	12	~2009
4536248399	9072496799	10	~2006
4536253679	9072507359	10	~2006
4536345629	63508838807	11	~2009
4536421079	9072842159	10	~2006
4536516203	9073032407	10	~2006
4536787043	9073574087	10	~2006
4536890411	9073780823	10	~2006

Exponent	Prime Factor	Digits	Year
4537461251	9074922503	10	~2006
4537462883	9074925767	10	~2006
4537501537	27225009223	11	~2008
4537556063	9075112127	10	~2006
4537589711	9075179423	10	~2006
4537593419	9075186839	10	~2006
4537641371	9075282743	10	~2006
4537737487	45377374871	11	~2008
4537761671	9075523343	10	~2006
4537773503	9075547007	10	~2006
4538246831	9076493663	10	~2006
4538710259	9077420519	10	~2006
4538711809	326787250249	12	~2010
4538712131	9077424263	10	~2006
4538785739	9077571479	10	~2006
4538845931	9077691863	10	~2006
4538858497	27233150983	11	~2008
4538920439	108934090537	12	~2009
4538927339	9077854679	10	~2006
4539043403	9078086807	10	~2006
4539185797	27235114783	11	~2008
4539225011	9078450023	10	~2006
4539355319	9078710639	10	~2006
4539693419	190667123599	12	~2010
4540102367	81721842607	11	~2009

5.307.017 digits

26-01-11