Small Mersenne Prime Factors (page 3603/5025)

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	Digits	Year
1440254423	2880508847	10	~2003
1440267943	48969110063	11	~2006
1440352559	2880705119	10	~2003
1440358259	2880716519	10	~2003
1440427991	2880855983	10	~2003
1440514199	2881028399	10	~2003
1440562391	2881124783	10	~2003
1440672851	2881345703	10	~2003
1440674351	2881348703	10	~2003
1440676199	2881352399	10	~2003
1440689483	2881378967	10	~2003
1440723083	2881446167	10	~2003
1440887603	2881775207	10	~2003
1440901621	8645409727	10	~2004
1440911489	11527291913	11	~2004
1440913723	23054619569	11	~2005
1440957491	11527659929	11	~2004
1440966671	2881933343	10	~2003
1440980201	11527841609	11	~2004
1440993923	2881987847	10	~2003
1441045967	11528367737	11	~2004
1441099043	2882198087	10	~2003
1441110683	2882221367	10	~2003
1441172963	2882345927	10	~2003
1441196591	2882393183	10	~2003

Exponent	Prime Factor	Digits	Year
1441221179	2882442359	10	~2003
1441269779	2882539559	10	~2003
1441289939	2882579879	10	~2003
1441302983	2882605967	10	~2003
1441416491	2882832983	10	~2003
1441418483	2882836967	10	~2003
1441426163	2882852327	10	~2003
1441448903	2882897807	10	~2003
1441506299	2883012599	10	~2003
1441609079	2883218159	10	~2003
1441625063	2883250127	10	~2003
1441695011	2883390023	10	~2003
1441760843	2883521687	10	~2003
1441762631	2883525263	10	~2003
1441818179	2883636359	10	~2003
1441848131	11534785049	11	~2004
1441876697	11535013577	11	~2004
1441902491	2883804983	10	~2003
1441911671	2883823343	10	~2003
1441954511	11535636089	11	~2004
1441957931	2883915863	10	~2003
1441969171	23071506737	11	~2005
1442048771	2884097543	10	~2003
1442074043	2884148087	10	~2003
1442121899	2884243799	10	~2003

Exponent	Prime Factor	Digits	Year
1442133029	43263990871	11	~2005
1442140951	14421409511	11	~2004
1442155201	8652931207	10	~2004
1442221439	2884442879	10	~2003
1442221499	2884442999	10	~2003
1442234237	54804901007	11	~2006
1442238211	60574004863	11	~2006
1442335537	8654013223	10	~2004
1442360999	2884721999	10	~2003
1442409359	2884818719	10	~2003
1442415503	2884831007	10	~2003
1442447459	2884894919	10	~2003
1442487131	2884974263	10	~2003
1442493337	8654960023	10	~2004
1442550251	2885100503	10	~2003
1442583071	2885166143	10	~2003
1442618747	11540949977	11	~2004
1442654723	2885309447	10	~2003
1442667059	2885334119	10	~2003
1442694083	2885388167	10	~2003
1442740919	2885481839	10	~2003
1442757383	2885514767	10	~2003
1442794667	34627072009	11	~2005
1442824079	2885648159	10	~2003
1442850917	8657105503	10	~2004

Exponent	Prime Factor	Digits	Year
1442863181	8657179087	10	~2004
1442905159	92345930177	11	~2006
1442915497	8657492983	10	~2004
1442951843	2885903687	10	~2003
1442969471	2885938943	10	~2003
1443021473	8658128839	10	~2004
1443042959	2886085919	10	~2003
1443051359	2886102719	10	~2003
1443091043	2886182087	10	~2003
1443148799	2886297599	10	~2003
1443209459	2886418919	10	~2003
1443213659	2886427319	10	~2003
1443243779	2886487559	10	~2003
1443290003	2886580007	10	~2003
1443365279	2886730559	10	~2003
1443369131	2886738263	10	~2003
1443388139	2886776279	10	~2003
1443401887	14434018871	11	~2004
1443416003	2886832007	10	~2003
1443418393	8660510359	10	~2004
1443490121	8660940727	10	~2004
1443493871	2886987743	10	~2003
1443535343	2887070687	10	~2003
1443594983	2887189967	10	~2003
1443725483	2887450967	10	~2003

4.724.182 digits

25-04-13