Small Mersenne Prime Factors (page 4838/5850)

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	Dig.	Year
9216030443	18432060887	11	~2009
9216301777	55297810663	11	~2010
9216508957	55299053743	11	~2010
9216550019	18433100039	11	~2009
9216561983	18433123967	11	~2009
9217087991	18434175983	11	~2009
9217609883	18435219767	11	~2009
9217634579	18435269159	11	~2009
9217803443	18435606887	11	~2009
9218582603	18437165207	11	~2009
9218857751	18437715503	11	~2009
9218898361	645322885271	12	~2013
9218961839	387196397239	12	~2012
9219037343	18438074687	11	~2009
9219082357	55314494143	11	~2010
9219313871	18438627743	11	~2009
9219577793	55317466759	11	~2010
9220440563	18440881127	11	~2009
9221266139	18442532279	11	~2009
9221300639	18442601279	11	~2009
9221585057	129102190799	12	~2011
9222004931	18444009863	11	~2009
9222277523	18444555047	11	~2009
9222308573	55333851439	11	~2010
9222437339	73779498713	11	~2010

Exponent	Prime Factor	Dig.	Year
9222892859	18445785719	11	~2009
9222960119	18445920239	11	~2009
9223340521	55340043127	11	~2010
9223690523	18447381047	11	~2009
9223761577	55342569463	11	~2010
9223800899	73790407193	11	~2010
9223993451	18447986903	11	~2009
9224215823	18448431647	11	~2009
9224383211	18448766423	11	~2009
9224853311	18449706623	11	~2009
9225218671	92252186711	11	~2011
9225234743	18450469487	11	~2009
9225317099	18450634199	11	~2009
9225531923	18451063847	11	~2009
9225793943	18451587887	11	~2009
9226070573	55356423439	11	~2010
9226731191	18453462383	11	~2009
9227036129	221448867097	12	~2012
9228086303	18456172607	11	~2009
9228087433	55368524599	11	~2010
9228478681	55370872087	11	~2010
9229055963	18458111927	11	~2009
9229102979	18458205959	11	~2009
9229445471	18458890943	11	~2009
9229474229	73835793833	11	~2010

Exponent	Prime Factor	Dig.	Year
9229796813	55378780879	11	~2010
9229966477	55379798863	11	~2010
9230954651	166157183719	12	~2011
9231177503	18462355007	11	~2009
9231229057	276936871711	12	~2012
9231312653	55387875919	11	~2010
9231905833	55391434999	11	~2010
9232007051	18464014103	11	~2009
9232720439	18465440879	11	~2009
9233114711	18466229423	11	~2009
9233318561	73866548489	11	~2010
9233411017	55400466103	11	~2010
9233424779	18466849559	11	~2009
9233988193	55403929159	11	~2010
9234304763	18468609527	11	~2009
9234685079	18469370159	11	~2009
9234771901	55408631407	11	~2010
9234773903	18469547807	11	~2009
9234817301	55408903807	11	~2010
9235464779	18470929559	11	~2009
9235775621	73886204969	11	~2010
9235864763	18471729527	11	~2009
9235992971	18471985943	11	~2009
9236595073	55419570439	11	~2010
9236607431	18473214863	11	~2009

Exponent	Prime Factor	Dig.	Year
9237262883	18474525767	11	~2009
9237856561	55427139367	11	~2010
9238300091	18476600183	11	~2009
9238345801	55430074807	11	~2010
9238403777	73907230217	11	~2010
9238504447	221724106729	12	~2012
9238763267	517370742953	12	~2012
9238880681	55433284087	11	~2010
9238898951	18477797903	11	~2009
9239108951	18478217903	11	~2009
9239194859	18478389719	11	~2009
9239244863	18478489727	11	~2009
9239729183	18479458367	11	~2009
9240018803	18480037607	11	~2009
9240096577	221762317849	12	~2012
9240110279	18480220559	11	~2009
9240134231	18480268463	11	~2009
9240295511	18480591023	11	~2009
9240332411	18480664823	11	~2009
9240645503	18481291007	11	~2009
9242251043	18484502087	11	~2009
9242332207	92423322071	11	~2011
9242835401	73942683209	11	~2010
9243605411	18487210823	11	~2009
9243737339	18487474679	11	~2009

5.546.121 digits

26-05-03