Small Mersenne Prime Factors (page 2970/5670)

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
180712867	2891405873	10	~1998
180716183	361432367	9	~1996
180719471	361438943	9	~1996
180729551	1445836409	10	~1997
180737279	361474559	9	~1996
180738443	361476887	9	~1996
180740723	361481447	9	~1996
180742091	361484183	9	~1996
180742517	1084455103	10	~1997
180743441	1084460647	10	~1997
180754793	5784153377	10	~1998
180759443	361518887	9	~1996
180760631	361521263	9	~1996
180761699	361523399	9	~1996
180763811	361527623	9	~1996
180765803	361531607	9	~1996
180767243	361534487	9	~1996
180767771	361535543	9	~1996
180771971	1446175769	10	~1997
180781639	1807816391	10	~1997
180787559	361575119	9	~1996
180789569	9762636727	10	~1999
180791069	1446328553	10	~1997
180792071	361584143	9	~1996
180800647	7232025881	10	~1999

Exponent	Prime Factor	Digits	Year
180807661	1084845967	10	~1997
180810139	3254582503	10	~1998
180812917	1084877503	10	~1997
180813613	4339526713	10	~1998
180828071	361656143	9	~1996
180829637	1084977823	10	~1997
180834011	361668023	9	~1996
180835763	39060524809	11	~2000
180843359	361686719	9	~1996
180853537	1085121223	10	~1997
180854291	361708583	9	~1996
180860777	2532050879	10	~1998
180862867	1808628671	10	~1997
180865403	361730807	9	~1996
180865871	361731743	9	~1996
180867173	1085203039	10	~1997
180869063	361738127	9	~1996
180869879	361739759	9	~1996
180871979	361743959	9	~1996
180876119	361752239	9	~1996
180876959	361753919	9	~1996
180881231	361762463	9	~1996
180883823	361767647	9	~1996
180885311	361770623	9	~1996
180886781	1447094249	10	~1997

Exponent	Prime Factor	Digits	Year
180891149	1447129193	10	~1997
180892319	361784639	9	~1996
180894491	361788983	9	~1996
180896783	361793567	9	~1996
180897083	4341529993	10	~1998
180899107	2894385713	10	~1998
180905111	361810223	9	~1996
180912191	361824383	9	~1996
180914291	361828583	9	~1996
180917339	361834679	9	~1996
180918121	2894689937	10	~1998
180920699	361841399	9	~1996
180922433	1085534599	10	~1997
180922499	361844999	9	~1996
180928211	361856423	9	~1996
180929117	1085574703	10	~1997
180930131	1447441049	10	~1997
180932417	1447459337	10	~1997
180939433	1085636599	10	~1997
180950603	361901207	9	~1996
180951059	361902119	9	~1996
180956003	361912007	9	~1996
180960083	33658575439	11	~2000
180966911	361933823	9	~1996
180967211	361934423	9	~1996

Exponent	Prime Factor	Digits	Year
180968617	1085811703	10	~1997
180969443	20630516503	11	~2000
180972677	1447781417	10	~1997
180975563	361951127	9	~1996
180977231	1447817849	10	~1997
180981071	361962143	9	~1996
180981743	361963487	9	~1996
180990923	361981847	9	~1996
180997259	361994519	9	~1996
180998399	361996799	9	~1996
181001603	362003207	9	~1996
181003631	362007263	9	~1996
181005899	362011799	9	~1996
181011893	1086071359	10	~1997
181013363	362026727	9	~1996
181016123	362032247	9	~1996
181017961	1086107767	10	~1997
181018451	362036903	9	~1996
181024631	362049263	9	~1996
181027993	1086167959	10	~1997
181033091	362066183	9	~1996
181033939	7603425439	10	~1999
181036577	1448292617	10	~1997
181037767	3258679807	10	~1998
181042481	1086254887	10	~1997

5.366.787 digits

26-02-08