Small Mersenne Prime Factors (page 4465/5025)

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	Dig.	Year
21941913131	43883826263	11	~2012
21941944919	43883889839	11	~2012
21942581477	307196140679	12	~2014
21945035699	43890071399	11	~2012
21945540059	43891080119	11	~2012
21946165229	175569321833	12	~2013
21946395833	131678374999	12	~2013
21947226551	43894453103	11	~2012
21947543903	43895087807	11	~2012
21947578403	43895156807	11	~2012
21947775431	43895550863	11	~2012
21948181571	43896363143	11	~2012
21949664153	131697984919	12	~2013
21953039519	43906079039	11	~2012
21954064043	43908128087	11	~2012
21955043399	43910086799	11	~2012
21957350183	43914700367	11	~2012
21957810463	526987451113	12	~2014
21959128739	43918257479	11	~2012
21960255659	43920511319	11	~2012
21960799613	131764797679	12	~2013
21961481041	131768886247	12	~2013
21962250899	43924501799	11	~2012
21964268411	43928536823	11	~2012
21965583551	43931167103	11	~2012

Exponent	Prime Factor	Dig.	Year
21968459939	43936919879	11	~2012
21968524871	43937049743	11	~2012
21969853993	131819123959	12	~2013
21970148231	175761185849	12	~2013
21970456853	307586395943	12	~2014
21970789271	43941578543	11	~2012
21972395639	43944791279	11	~2012
21972451883	43944903767	11	~2012
21972558761	131835352567	12	~2013
21972840551	43945681103	11	~2012
21973780739	43947561479	11	~2012
21973992541	131843955247	12	~2013
21974084339	43948168679	11	~2012
21976662839	43953325679	11	~2012
21976807141	351628914257	12	~2014
21978133139	43956266279	11	~2012
21979757603	43959515207	11	~2012
21981340571	43962681143	11	~2012
21982889381	175863115049	12	~2013
21983477459	43966954919	11	~2012
21989260103	43978520207	11	~2012
21991419083	43982838167	11	~2012
21991634183	43983268367	11	~2012
21991802951	43983605903	11	~2012
21993069947	175944559577	12	~2013

Exponent	Prime Factor	Dig.	Year
21993919691	43987839383	11	~2012
21994088783	43988177567	11	~2012
21994543691	43989087383	11	~2012
21995117561	131970705367	12	~2013
21995611343	43991222687	11	~2012
21996106343	43992212687	11	~2012
21996428159	43992856319	11	~2012
21996960599	43993921199	11	~2012
21997819331	43995638663	11	~2012
21999043679	43998087359	11	~2012
21999797819	43999595639	11	~2012
21999972251	43999944503	11	~2012
22000200251	44000400503	11	~2012
22001444603	44002889207	11	~2012
22003733597	132022401583	12	~2013
22003792691	44007585383	11	~2012
22003944239	44007888479	11	~2012
22004741039	44009482079	11	~2012
22009185727	352146971633	12	~2014
22009731671	44019463343	11	~2012
22009862341	132059174047	12	~2013
22009907137	352158514193	12	~2014
22009972861	132059837167	12	~2013
22010748983	44021497967	11	~2012
22012746443	44025492887	11	~2012

Exponent	Prime Factor	Dig.	Year
22014532103	44029064207	11	~2012
22014544823	44029089647	11	~2012
22014626321	176117010569	12	~2013
22016458391	44032916783	11	~2012
22016579831	44033159663	11	~2012
22016587121	176132696969	12	~2013
22016856503	44033713007	11	~2012
22017384563	44034769127	11	~2012
22017393529	484382657639	12	~2014
22017538199	44035076399	11	~2012
22017987011	44035974023	11	~2012
22019725883	44039451767	11	~2012
22020119591	44040239183	11	~2012
22020409331	44040818663	11	~2012
22022217913	132133307479	12	~2013
22023122657	132138735943	12	~2013
22023230843	44046461687	11	~2012
22023921851	44047843703	11	~2012
22024022963	44048045927	11	~2012
22025490083	44050980167	11	~2012
22025965463	44051930927	11	~2012
22027046003	44054092007	11	~2012
22027373453	660821203591	12	~2015
22027456043	44054912087	11	~2012
22028992633	132173955799	12	~2013

4.724.182 digits

25-04-13