Small Mersenne Prime Factors (page 2605/5025)

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
147953843	295907687	9	~1995
147956657	887739943	9	~1996
147959039	295918079	9	~1995
147961601	887769607	9	~1996
147964871	295929743	9	~1995
147965513	887793079	9	~1996
147973753	887842519	9	~1996
147974363	295948727	9	~1995
147975547	1479755471	10	~1997
147977939	295955879	9	~1995
147980831	1183846649	10	~1996
147988441	887930647	9	~1996
147991439	295982879	9	~1995
147995417	7991752519	10	~1998
147999431	295998863	9	~1995
148001041	888006247	9	~1996
148008359	296016719	9	~1995
148009451	296018903	9	~1995
148010747	2664193447	10	~1997
148017071	296034143	9	~1995
148019563	3552469513	10	~1997
148024403	296048807	9	~1995
148026301	888157807	9	~1996
148031111	296062223	9	~1995
148033079	1184264633	10	~1996

Exponent	Prime Factor	Digits	Year
148033703	296067407	9	~1995
148033859	296067719	9	~1995
148035817	888214903	9	~1996
148036631	296073263	9	~1995
148037339	296074679	9	~1995
148037699	296075399	9	~1995
148044191	4737414113	10	~1998
148045951	1480459511	10	~1997
148046891	296093783	9	~1995
148055291	296110583	9	~1995
148059479	296118959	9	~1995
148062779	296125559	9	~1995
148064219	296128439	9	~1995
148073039	296146079	9	~1995
148080329	1184642633	10	~1996
148088183	296176367	9	~1995
148088483	296176967	9	~1995
148109603	296219207	9	~1995
148111081	888666487	9	~1996
148111813	888670879	9	~1996
148112171	296224343	9	~1995
148114619	296229239	9	~1995
148117019	296234039	9	~1995
148118111	296236223	9	~1995
148119737	1184957897	10	~1996

Exponent	Prime Factor	Digits	Year
148120033	3554880793	10	~1997
148120631	296241263	9	~1995
148125443	296250887	9	~1995
148126691	296253383	9	~1995
148129181	1185033449	10	~1996
148130357	1185042857	10	~1996
148133663	296267327	9	~1995
148138283	296276567	9	~1995
148141207	1481412071	10	~1997
148142399	296284799	9	~1995
148144027	1481440271	10	~1997
148144253	37628640263	11	~2000
148144259	296288519	9	~1995
148147873	2370365969	10	~1997
148149557	1185196457	10	~1996
148151831	296303663	9	~1995
148158887	2666859967	10	~1997
148159871	296319743	9	~1995
148164431	1185315449	10	~1996
148166171	296332343	9	~1995
148167683	296335367	9	~1995
148171319	1185370553	10	~1996
148178039	296356079	9	~1995
148178813	889072879	9	~1996
148179643	3556311433	10	~1997

Exponent	Prime Factor	Digits	Year
148181699	296363399	9	~1995
148182071	296364143	9	~1995
148182383	296364767	9	~1995
148192991	296385983	9	~1995
148200097	889200583	9	~1996
148200617	8299234553	10	~1998
148200803	296401607	9	~1995
148203959	296407919	9	~1995
148204799	296409599	9	~1995
148205363	296410727	9	~1995
148210019	296420039	9	~1995
148211543	296423087	9	~1995
148214873	889289239	9	~1996
148216823	296433647	9	~1995
148219871	296439743	9	~1995
148222273	889333639	9	~1996
148224551	296449103	9	~1995
148226737	2371627793	10	~1997
148229351	296458703	9	~1995
148231679	296463359	9	~1995
148235519	296471039	9	~1995
148236083	296472167	9	~1995
148243943	296487887	9	~1995
148244699	1185957593	10	~1996
148247279	296494559	9	~1995

4.724.182 digits

25-04-13