Small Mersenne Prime Factors (page 2934/5205)

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
246399443	12319972151	11	~2000
246400811	492801623	9	~1997
246407099	492814199	9	~1997
246407573	1478445439	10	~1998
246408593	3449720303	10	~1999
246435493	1478612959	10	~1998
246442919	492885839	9	~1997
246444743	492889487	9	~1997
246452399	492904799	9	~1997
246454343	492908687	9	~1997
246458603	492917207	9	~1997
246461723	492923447	9	~1997
246465911	492931823	9	~1997
246470659	2464706591	10	~1998
246476651	492953303	9	~1997
246478871	492957743	9	~1997
246486113	1478916679	10	~1998
246493739	492987479	9	~1997
246503039	493006079	9	~1997
246503773	1479022639	10	~1998
246503819	493007639	9	~1997
246504851	493009703	9	~1997
246512219	493024439	9	~1997
246523391	493046783	9	~1997
246524659	2465246591	10	~1998

Exponent	Prime Factor	Digits	Year
246525179	493050359	9	~1997
246527443	5916658633	10	~1999
246534973	1479209839	10	~1998
246537251	493074503	9	~1997
246540499	4437728983	10	~1999
246545699	493091399	9	~1997
246559283	493118567	9	~1997
246562919	493125839	9	~1997
246567263	493134527	9	~1997
246568631	493137263	9	~1997
246575957	7397278711	10	~1999
246581903	493163807	9	~1997
246596653	1479579919	10	~1998
246598637	1479591823	10	~1998
246600037	7398001111	10	~1999
246600863	493201727	9	~1997
246608423	493216847	9	~1997
246611243	493222487	9	~1997
246611831	493223663	9	~1997
246614003	493228007	9	~1997
246617243	493234487	9	~1997
246618623	493237247	9	~1997
246624803	493249607	9	~1997
246628391	493256783	9	~1997
246633641	1973069129	10	~1998

Exponent	Prime Factor	Digits	Year
246648001	9865920041	10	~2000
246650189	3453102647	10	~1999
246650893	1479905359	10	~1998
246655571	7892978273	10	~1999
246656143	3946498289	10	~1999
246674999	493349999	9	~1997
246675251	493350503	9	~1997
246679361	1973434889	10	~1998
246682379	493364759	9	~1997
246689039	493378079	9	~1997
246689279	493378559	9	~1997
246689549	1973516393	10	~1998
246691271	493382543	9	~1997
246699983	493399967	9	~1997
246703139	493406279	9	~1997
246706283	493412567	9	~1997
246708551	493417103	9	~1997
246710957	1973687657	10	~1998
246736799	1973894393	10	~1998
246738887	1973911097	10	~1998
246741779	493483559	9	~1997
246741851	493483703	9	~1997
246744983	493489967	9	~1997
246745703	493491407	9	~1997
246746183	493492367	9	~1997

Exponent	Prime Factor	Digits	Year
246752711	493505423	9	~1997
246752879	493505759	9	~1997
246755611	2467556111	10	~1998
246758423	493516847	9	~1997
246764471	493528943	9	~1997
246770327	5922487849	10	~1999
246773063	493546127	9	~1997
246773167	2467731671	10	~1998
246776141	1480656847	10	~1998
246782381	1480694287	10	~1998
246784091	493568183	9	~1997
246794617	1480767703	10	~1998
246797543	493595087	9	~1997
246806291	493612583	9	~1997
246822503	493645007	9	~1997
246826319	493652639	9	~1997
246832583	493665167	9	~1997
246835139	493670279	9	~1997
246848111	493696223	9	~1997
246848149	5430659279	10	~1999
246850739	493701479	9	~1997
246852251	493704503	9	~1997
246862223	493724447	9	~1997
246868091	493736183	9	~1997
246875879	493751759	9	~1997

4.903.097 digits

25-07-08