Small Mersenne Prime Factors (page 4535/5730)

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
5055133199	10110266399	11	~2007
5055264191	10110528383	11	~2007
5055319319	10110638639	11	~2007
5055587819	10111175639	11	~2007
5055605587	333669968743	12	~2011
5055620873	30333725239	11	~2008
5055999803	10111999607	11	~2007
5056116899	10112233799	11	~2007
5056495523	10112991047	11	~2007
5056747849	121361948377	12	~2009
5056850033	283183601849	12	~2010
5056996943	10113993887	11	~2007
5057214431	242746292689	12	~2010
5057257141	30343542847	11	~2008
5057413289	40459306313	11	~2008
5057804231	10115608463	11	~2007
5058251357	30349508143	11	~2008
5058263783	10116527567	11	~2007
5058384371	10116768743	11	~2007
5058562583	10117125167	11	~2007
5058680911	50586809111	11	~2009
5058763019	10117526039	11	~2007
5058941411	10117882823	11	~2007
5059037411	212479571263	12	~2010
5059239359	10118478719	11	~2007

Exponent	Prime Factor	Dig.	Year
5059280797	30355684783	11	~2008
5059282619	10118565239	11	~2007
5059304741	40474437929	11	~2008
5059327943	10118655887	11	~2007
5059420637	40475365097	11	~2008
5059539539	10119079079	11	~2007
5059565471	10119130943	11	~2007
5059627823	10119255647	11	~2007
5059982783	10119965567	11	~2007
5060148713	30360892279	11	~2008
5060315699	253015784951	12	~2010
5060325373	30361952239	11	~2008
5060608379	10121216759	11	~2007
5061182099	10122364199	11	~2007
5061320213	30367921279	11	~2008
5061402791	40491222329	11	~2008
5061581891	10123163783	11	~2007
5061659411	10123318823	11	~2007
5062140953	30372845719	11	~2008
5062177871	10124355743	11	~2007
5062266439	121494394537	12	~2009
5062359941	40498879529	11	~2008
5062517503	50625175031	11	~2009
5062658411	10125316823	11	~2007
5062825259	40502602073	11	~2008

Exponent	Prime Factor	Dig.	Year
5063167757	243032052337	12	~2010
5063388899	10126777799	11	~2007
5063666099	10127332199	11	~2007
5063982971	10127965943	11	~2007
5064049691	10128099383	11	~2007
5064122159	10128244319	11	~2007
5064145799	10128291599	11	~2007
5064204697	30385228183	11	~2008
5064215231	10128430463	11	~2007
5064453083	10128906167	11	~2007
5064462059	10128924119	11	~2007
5064488483	10128976967	11	~2007
5064729503	10129459007	11	~2007
5064760693	30388564159	11	~2008
5064792263	10129584527	11	~2007
5064874943	10129749887	11	~2007
5064936491	10129872983	11	~2007
5065227539	10130455079	11	~2007
5065484003	10130968007	11	~2007
5065555843	50655558431	11	~2009
5065630019	10131260039	11	~2007
5065686551	10131373103	11	~2007
5065935599	10131871199	11	~2007
5065955903	10131911807	11	~2007
5066135023	81058160369	11	~2009

Exponent	Prime Factor	Dig.	Year
5066760203	10133520407	11	~2007
5066844791	10133689583	11	~2007
5066854631	10133709263	11	~2007
5066904203	10133808407	11	~2007
5067067367	40536538937	11	~2008
5067276983	10134553967	11	~2007
5067614399	10135228799	11	~2007
5067723623	10135447247	11	~2007
5067947629	111494847839	12	~2009
5068168667	40545349337	11	~2008
5068267637	70955746919	11	~2009
5068355879	10136711759	11	~2007
5068365059	10136730119	11	~2007
5068755437	40550043497	11	~2008
5068791191	10137582383	11	~2007
5068836499	212891132959	12	~2010
5068895759	10137791519	11	~2007
5069226763	81107628209	11	~2009
5069354651	10138709303	11	~2007
5069459159	10138918319	11	~2007
5069552699	10139105399	11	~2007
5069718197	40557745577	11	~2008
5069777677	121674664249	12	~2009
5069821739	121675721737	12	~2009
5069949539	10139899079	11	~2007

5.426.516 digits

26-03-08