Small Mersenne Prime Factors (page 4100/5745)

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
1647602219	3295204439	10	~2003
1647708947	13181671577	11	~2004
1647743491	29659382839	11	~2005
1647744491	3295488983	10	~2003
1647781823	3295563647	10	~2003
1647781931	3295563863	10	~2003
1647802463	3295604927	10	~2003
1647811369	36251850119	11	~2006
1647861191	3295722383	10	~2003
1647862873	9887177239	10	~2004
1647900179	3295800359	10	~2003
1647902077	9887412463	10	~2004
1647992471	3295984943	10	~2003
1648004951	3296009903	10	~2003
1648006091	3296012183	10	~2003
1648030739	3296061479	10	~2003
1648183297	9889099783	10	~2004
1648191653	39556599673	11	~2006
1648252583	3296505167	10	~2003
1648267919	3296535839	10	~2003
1648306871	3296613743	10	~2003
1648372091	3296744183	10	~2003
1648507277	13188058217	11	~2004
1648534403	3297068807	10	~2003
1648555211	3297110423	10	~2003

Exponent	Prime Factor	Digits	Year
1648643123	3297286247	10	~2003
1648794299	3297588599	10	~2003
1648799963	3297599927	10	~2003
1648800431	3297600863	10	~2003
1648843139	3297686279	10	~2003
1648851251	3297702503	10	~2003
1648943771	3297887543	10	~2003
1648974851	3297949703	10	~2003
1649014751	3298029503	10	~2003
1649045231	3298090463	10	~2003
1649074331	3298148663	10	~2003
1649086091	3298172183	10	~2003
1649086823	3298173647	10	~2003
1649103553	39578485273	11	~2006
1649128513	9894771079	10	~2004
1649161541	9894969247	10	~2004
1649324063	3298648127	10	~2003
1649359139	3298718279	10	~2003
1649432117	9896592703	10	~2004
1649510789	23093151047	11	~2005
1649513683	26392218929	11	~2005
1649515379	3299030759	10	~2003
1649557037	9897342223	10	~2004
1649572289	13196578313	11	~2004
1649589731	3299179463	10	~2003

Exponent	Prime Factor	Digits	Year
1649609411	3299218823	10	~2003
1649615699	3299231399	10	~2003
1649617751	3299235503	10	~2003
1649656139	3299312279	10	~2003
1649706011	13197648089	11	~2004
1649713001	9898278007	10	~2004
1649715443	3299430887	10	~2003
1649736443	3299472887	10	~2003
1649770631	3299541263	10	~2003
1649816879	3299633759	10	~2003
1649845283	3299690567	10	~2003
1649862443	3299724887	10	~2003
1649869691	3299739383	10	~2003
1649883671	3299767343	10	~2003
1649921219	3299842439	10	~2003
1649923031	3299846063	10	~2003
1649947867	26399165873	11	~2005
1649979337	9899876023	10	~2004
1649993759	3299987519	10	~2003
1649994683	3299989367	10	~2003
1650037619	3300075239	10	~2003
1650058703	3300117407	10	~2003
1650111731	3300223463	10	~2003
1650112979	3300225959	10	~2003
1650182519	52805840609	11	~2006

Exponent	Prime Factor	Digits	Year
1650193739	3300387479	10	~2003
1650215639	3300431279	10	~2003
1650240941	9901445647	10	~2004
1650390239	3300780479	10	~2003
1650410543	3300821087	10	~2003
1650468119	3300936239	10	~2003
1650522613	9903135679	10	~2004
1650523153	9903138919	10	~2004
1650649601	52820787233	11	~2006
1650688759	135356478239	12	~2007
1650706973	9904241839	10	~2004
1650730751	3301461503	10	~2003
1650817439	3301634879	10	~2003
1650830939	3301661879	10	~2003
1650861923	3301723847	10	~2003
1650871511	3301743023	10	~2003
1650927539	3301855079	10	~2003
1650950519	3301901039	10	~2003
1651006613	9906039679	10	~2004
1651053011	3302106023	10	~2003
1651083601	9906501607	10	~2004
1651127659	16511276591	11	~2005
1651145231	3302290463	10	~2003
1651231859	3302463719	10	~2003
1651235123	3302470247	10	~2003

5.441.361 digits

26-03-15