Small Mersenne Prime Factors (page 3521/5070)

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
1092555853	6555335119	10	~2003
1092591491	2185182983	10	~2002
1092614093	6555684559	10	~2003
1092621899	2185243799	10	~2002
1092649163	2185298327	10	~2002
1092673787	19668128167	11	~2004
1092700643	2185401287	10	~2002
1092703103	2185406207	10	~2002
1092711311	2185422623	10	~2002
1092730043	2185460087	10	~2002
1092800963	2185601927	10	~2002
1092827999	2185655999	10	~2002
1092901259	2185802519	10	~2002
1092910139	2185820279	10	~2002
1092914297	6557485783	10	~2003
1092924011	2185848023	10	~2002
1092963659	2185927319	10	~2002
1092967691	2185935383	10	~2002
1092999731	2185999463	10	~2002
1093010003	2186020007	10	~2002
1093060571	2186121143	10	~2002
1093079219	2186158439	10	~2002
1093124317	6558745903	10	~2003
1093126823	2186253647	10	~2002
1093181123	2186362247	10	~2002

Exponent	Prime Factor	Digits	Year
1093189987	19677419767	11	~2004
1093243573	17491897169	11	~2004
1093264643	2186529287	10	~2002
1093269563	2186539127	10	~2002
1093348163	2186696327	10	~2002
1093358351	2186716703	10	~2002
1093386551	2186773103	10	~2002
1093404479	2186808959	10	~2002
1093419907	19681558327	11	~2004
1093437311	2186874623	10	~2002
1093457213	15308400983	11	~2004
1093460999	2186921999	10	~2002
1093463633	15308490863	11	~2004
1093488419	2186976839	10	~2002
1093500697	6561004183	10	~2003
1093529219	2187058439	10	~2002
1093530773	6561184639	10	~2003
1093537339	19683672103	11	~2004
1093541063	2187082127	10	~2002
1093542239	2187084479	10	~2002
1093543439	2187086879	10	~2002
1093568771	2187137543	10	~2002
1093570997	8748567977	10	~2003
1093581371	2187162743	10	~2002
1093590077	6561540463	10	~2003

Exponent	Prime Factor	Digits	Year
1093610579	2187221159	10	~2002
1093653377	15311147279	11	~2004
1093684079	2187368159	10	~2002
1093689059	2187378119	10	~2002
1093711987	10937119871	11	~2003
1093712899	19686832183	11	~2004
1093724887	142184235311	12	~2006
1093735081	6562410487	10	~2003
1093741477	6562448863	10	~2003
1093803911	2187607823	10	~2002
1093839931	19689118759	11	~2004
1093897391	2187794783	10	~2002
1093928383	37193565023	11	~2005
1093958903	2187917807	10	~2002
1093975391	2187950783	10	~2002
1093982707	10939827071	11	~2003
1094056583	2188113167	10	~2002
1094114303	2188228607	10	~2002
1094129339	2188258679	10	~2002
1094153519	2188307039	10	~2002
1094161631	8753293049	10	~2003
1094166383	2188332767	10	~2002
1094235187	19696233367	11	~2004
1094252983	17508047729	11	~2004
1094263031	2188526063	10	~2002

Exponent	Prime Factor	Digits	Year
1094276411	2188552823	10	~2002
1094318933	78790963177	11	~2005
1094348039	2188696079	10	~2002
1094362463	2188724927	10	~2002
1094364317	6566185903	10	~2003
1094384729	8755077833	10	~2003
1094426741	8755413929	10	~2003
1094527207	10945272071	11	~2003
1094550773	35025624737	11	~2005
1094563451	2189126903	10	~2002
1094576579	2189153159	10	~2002
1094577959	2189155919	10	~2002
1094599223	2189198447	10	~2002
1094685803	2189371607	10	~2002
1094704763	2189409527	10	~2002
1094724623	2189449247	10	~2002
1094726957	8757815657	10	~2003
1094743319	2189486639	10	~2002
1094772491	2189544983	10	~2002
1094828243	2189656487	10	~2002
1094833403	2189666807	10	~2002
1094835551	2189671103	10	~2002
1094840063	2189680127	10	~2002
1094872871	2189745743	10	~2002
1094883851	2189767703	10	~2002

4.768.925 digits

25-05-04