Small Mersenne Prime Factors (page 2951/5145)

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
269853851	539707703	9	~1997
269858467	2698584671	10	~1999
269863259	539726519	9	~1997
269866097	2158928777	10	~1998
269870591	539741183	9	~1997
269870963	539741927	9	~1997
269873129	2158985033	10	~1998
269874193	6476980633	10	~1999
269894543	539789087	9	~1997
269898427	2698984271	10	~1999
269899391	539798783	9	~1997
269904317	1619425903	10	~1998
269908679	539817359	9	~1997
269911871	539823743	9	~1997
269927771	539855543	9	~1997
269934023	539868047	9	~1997
269938829	3779143607	10	~1999
269944403	539888807	9	~1997
269946359	539892719	9	~1997
269946707	2159573657	10	~1998
269957783	539915567	9	~1997
269963591	539927183	9	~1997
269971727	2159773817	10	~1998
269976191	539952383	9	~1997
269981483	539962967	9	~1997

Exponent	Prime Factor	Digits	Year
269983873	1619903239	10	~1998
269984899	9179486567	10	~2000
269990653	4319850449	10	~1999
269994083	539988167	9	~1997
270006263	540012527	9	~1997
270006983	540013967	9	~1997
270010999	2700109991	10	~1999
270019751	2160158009	10	~1998
270020081	1620120487	10	~1998
270025559	540051119	9	~1997
270037643	540075287	9	~1997
270037739	540075479	9	~1997
270038287	4860689167	10	~1999
270047993	1620287959	10	~1998
270062099	540124199	9	~1997
270068339	540136679	9	~1997
270068861	1620413167	10	~1998
270070571	540141143	9	~1997
270072839	540145679	9	~1997
270075203	540150407	9	~1997
270078563	540157127	9	~1997
270087731	540175463	9	~1997
270089903	540179807	9	~1997
270095297	1620571783	10	~1998
270097259	540194519	9	~1997

Exponent	Prime Factor	Digits	Year
270099629	2160797033	10	~1998
270102191	540204383	9	~1997
270108401	2160867209	10	~1998
270111851	540223703	9	~1997
270112211	540224423	9	~1997
270120419	540240839	9	~1997
270127859	540255719	9	~1997
270135059	540270119	9	~1997
270142391	540284783	9	~1997
270145703	540291407	9	~1997
270164099	540328199	9	~1997
270165743	540331487	9	~1997
270174143	540348287	9	~1997
270179603	540359207	9	~1997
270179891	540359783	9	~1997
270195983	540391967	9	~1997
270198479	540396959	9	~1997
270200999	540401999	9	~1997
270213323	540426647	9	~1997
270214801	1621288807	10	~1998
270236957	1621421743	10	~1998
270248579	540497159	9	~1997
270258539	540517079	9	~1997
270266111	2162128889	10	~1998
270269633	1621617799	10	~1998

Exponent	Prime Factor	Digits	Year
270269819	540539639	9	~1997
270270719	540541439	9	~1997
270273169	18919121831	11	~2001
270277019	540554039	9	~1997
270283241	2162265929	10	~1998
270287219	540574439	9	~1997
270287911	2702879111	10	~1999
270288383	7027497959	10	~2000
270289223	540578447	9	~1997
270292147	2702921471	10	~1999
270314953	1621889719	10	~1998
270322271	540644543	9	~1997
270323351	540646703	9	~1997
270329303	540658607	9	~1997
270334633	1622007799	10	~1998
270338351	2162706809	10	~1998
270360187	4325762993	10	~1999
270363677	1622182063	10	~1998
270378851	540757703	9	~1997
270389593	1622337559	10	~1998
270390721	1622344327	10	~1998
270392893	10815715721	11	~2000
270394763	540789527	9	~1997
270395687	2163165497	10	~1998
270400499	540800999	9	~1997

4.843.404 digits

25-06-08