Small Mersenne Prime Factors (page 4101/5670)

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
1844970671	14759765369	11	~2005
1844994491	3689988983	10	~2003
1845000203	3690000407	10	~2003
1845008771	3690017543	10	~2003
1845072731	3690145463	10	~2003
1845117119	3690234239	10	~2003
1845165011	3690330023	10	~2003
1845172559	3690345119	10	~2003
1845283057	73811322281	11	~2007
1845374159	3690748319	10	~2003
1845412319	3690824639	10	~2003
1845448883	3690897767	10	~2003
1845455831	3690911663	10	~2003
1845468907	33218440327	11	~2006
1845565751	3691131503	10	~2003
1845571463	3691142927	10	~2003
1845614321	11073685927	11	~2005
1845628801	11073772807	11	~2005
1845771971	3691543943	10	~2003
1845836879	3691673759	10	~2003
1845839939	59066878049	11	~2006
1845848111	3691696223	10	~2003
1845874031	3691748063	10	~2003
1845880703	3691761407	10	~2003
1846011539	3692023079	10	~2003

Exponent	Prime Factor	Digits	Year
1846023617	25844330639	11	~2005
1846044443	3692088887	10	~2003
1846047839	3692095679	10	~2003
1846110131	3692220263	10	~2003
1846159037	25846226519	11	~2005
1846272839	3692545679	10	~2003
1846282631	3692565263	10	~2003
1846287563	3692575127	10	~2003
1846313351	3692626703	10	~2003
1846353277	55390598311	11	~2006
1846440443	3692880887	10	~2003
1846493381	14771947049	11	~2005
1846533131	3693066263	10	~2003
1846570763	3693141527	10	~2003
1846614083	3693228167	10	~2003
1846661951	3693323903	10	~2003
1846671419	3693342839	10	~2003
1846693811	14773550489	11	~2005
1846716917	11080301503	11	~2005
1846759801	11080558807	11	~2005
1846962989	88654223473	11	~2007
1847013521	14776108169	11	~2005
1847083897	29553342353	11	~2006
1847104739	3694209479	10	~2003
1847176211	3694352423	10	~2003

Exponent	Prime Factor	Digits	Year
1847283239	3694566479	10	~2003
1847305931	14778447449	11	~2005
1847328491	3694656983	10	~2003
1847347693	11084086159	11	~2005
1847355641	11084133847	11	~2005
1847358059	3694716119	10	~2003
1847479451	3694958903	10	~2003
1847512679	3695025359	10	~2003
1847537381	11085224287	11	~2005
1847749199	3695498399	10	~2003
1847749331	3695498663	10	~2003
1847758631	3695517263	10	~2003
1847830241	11086981447	11	~2005
1847846303	3695692607	10	~2003
1847852243	3695704487	10	~2003
1847947817	14783582537	11	~2005
1847981279	3695962559	10	~2003
1847995211	3695990423	10	~2003
1848031331	3696062663	10	~2003
1848129011	3696258023	10	~2003
1848168761	114586463183	12	~2007
1848197699	3696395399	10	~2003
1848206431	133070863033	12	~2007
1848220571	3696441143	10	~2003
1848251063	3696502127	10	~2003

Exponent	Prime Factor	Digits	Year
1848279677	11089678063	11	~2005
1848321743	3696643487	10	~2003
1848325621	29573209937	11	~2006
1848448519	33272073343	11	~2006
1848468683	3696937367	10	~2003
1848476111	3696952223	10	~2003
1848553121	14788424969	11	~2005
1848606251	3697212503	10	~2003
1848652859	3697305719	10	~2003
1848679769	44368314457	11	~2006
1848714599	3697429199	10	~2003
1848721379	3697442759	10	~2003
1848738299	3697476599	10	~2003
1848768941	11092613647	11	~2005
1848780803	3697561607	10	~2003
1848784403	3697568807	10	~2003
1848790739	3697581479	10	~2003
1848852899	3697705799	10	~2003
1848932399	3697864799	10	~2003
1848964343	3697928687	10	~2003
1849018043	3698036087	10	~2003
1849043711	3698087423	10	~2003
1849053023	3698106047	10	~2003
1849071493	11094428959	11	~2005
1849117091	33284107639	11	~2006

5.366.787 digits

26-02-08