Small Mersenne Prime Factors (page 3677/5070)

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
1626235519	29272239343	11	~2005
1626266459	3252532919	10	~2003
1626309953	9757859719	10	~2004
1626377591	3252755183	10	~2003
1626415799	3252831599	10	~2003
1626455723	3252911447	10	~2003
1626550283	3253100567	10	~2003
1626568067	13012544537	11	~2004
1626581219	3253162439	10	~2003
1626588503	3253177007	10	~2003
1626614917	9759689503	10	~2004
1626749843	3253499687	10	~2003
1626763393	9760580359	10	~2004
1626809399	3253618799	10	~2003
1626915203	3253830407	10	~2003
1626918383	3253836767	10	~2003
1627030793	22778431103	11	~2005
1627178099	3254356199	10	~2003
1627240679	13017925433	11	~2004
1627279271	3254558543	10	~2003
1627288583	3254577167	10	~2003
1627293979	16272939791	11	~2005
1627316651	3254633303	10	~2003
1627338761	9764032567	10	~2004
1627513847	13020110777	11	~2004

Exponent	Prime Factor	Digits	Year
1627587179	3255174359	10	~2003
1627622939	3255245879	10	~2003
1627654439	3255308879	10	~2003
1627776071	3255552143	10	~2003
1627802063	3255604127	10	~2003
1627881851	3255763703	10	~2003
1627912901	9767477407	10	~2004
1628024093	22792337303	11	~2005
1628024459	3256048919	10	~2003
1628036359	16280363591	11	~2005
1628080991	3256161983	10	~2003
1628154761	9768928567	10	~2004
1628175383	3256350767	10	~2003
1628180891	3256361783	10	~2003
1628261699	3256523399	10	~2003
1628435411	3256870823	10	~2003
1628555707	94456231007	11	~2007
1628580001	26057280017	11	~2005
1628652743	3257305487	10	~2003
1628710679	3257421359	10	~2003
1628729111	3257458223	10	~2003
1628757023	3257514047	10	~2003
1628784319	29318117743	11	~2005
1628810531	3257621063	10	~2003
1628814683	3257629367	10	~2003

Exponent	Prime Factor	Digits	Year
1628836211	3257672423	10	~2003
1628841359	3257682719	10	~2003
1628845103	3257690207	10	~2003
1628856959	3257713919	10	~2003
1628867711	3257735423	10	~2003
1628868023	3257736047	10	~2003
1628968597	9773811583	10	~2004
1628993161	26063890577	11	~2005
1629010991	3258021983	10	~2003
1629087623	3258175247	10	~2003
1629102017	22807428239	11	~2005
1629166619	81458330951	11	~2006
1629184379	3258368759	10	~2003
1629199763	3258399527	10	~2003
1629219433	9775316599	10	~2004
1629231143	3258462287	10	~2003
1629234443	3258468887	10	~2003
1629293207	13034345657	11	~2004
1629379151	3258758303	10	~2003
1629431339	3258862679	10	~2003
1629447587	13035580697	11	~2004
1629541163	3259082327	10	~2003
1629603719	3259207439	10	~2003
1629645509	22815037127	11	~2005
1629648623	3259297247	10	~2003

Exponent	Prime Factor	Digits	Year
1629703703	3259407407	10	~2003
1629948119	3259896239	10	~2003
1629976391	13039811129	11	~2004
1630068911	3260137823	10	~2003
1630078739	3260157479	10	~2003
1630132139	3260264279	10	~2003
1630144079	3260288159	10	~2003
1630309319	3260618639	10	~2003
1630344173	9782065039	10	~2004
1630359299	3260718599	10	~2003
1630394999	3260789999	10	~2003
1630416811	29347502599	11	~2005
1630435199	3260870399	10	~2003
1630503359	3261006719	10	~2003
1630517783	3261035567	10	~2003
1630578011	3261156023	10	~2003
1630671857	9784031143	10	~2004
1630749863	3261499727	10	~2003
1630796171	3261592343	10	~2003
1630843559	3261687119	10	~2003
1630845239	3261690479	10	~2003
1630858891	16308588911	11	~2005
1630930117	9785580703	10	~2004
1630994663	3261989327	10	~2003
1631004943	65240197721	11	~2006

4.768.925 digits

25-05-04