Small Mersenne Prime Factors (page 4476/5130)

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
16787220397	100723322383	12	~2012
16787228179	302170107223	12	~2013
16787326511	705067713463	12	~2014
16788592441	100731554647	12	~2012
16789063849	369359404679	12	~2013
16789308611	33578617223	11	~2011
16789825919	33579651839	11	~2011
16791543557	235081609799	12	~2013
16791617543	33583235087	11	~2011
16791912743	33583825487	11	~2011
16795302011	33590604023	11	~2011
16795753319	33591506639	11	~2011
16796112973	100776677839	12	~2012
16796351003	33592702007	11	~2011
16796457239	33592914479	11	~2011
16796524103	33593048207	11	~2011
16796732081	100780392487	12	~2012
16796865551	33593731103	11	~2011
16796891173	503906735191	12	~2014
16797213599	33594427199	11	~2011
16798568723	33597137447	11	~2011
16798768709	503963061271	12	~2014
16799460803	33598921607	11	~2011
16800667199	33601334399	11	~2011
16801141319	33602282639	11	~2011

Exponent	Prime Factor	Dig.	Year
16801494911	134411959289	12	~2012
16802036159	33604072319	11	~2011
16802911319	33605822639	11	~2011
16803012623	33606025247	11	~2011
16803138377	100818830263	12	~2012
16803600851	33607201703	11	~2011
16804152419	33608304839	11	~2011
16804616711	33609233423	11	~2011
16805846159	33611692319	11	~2011
16805856377	134446851017	12	~2012
16806003719	33612007439	11	~2011
16806340079	33612680159	11	~2011
16807075927	168070759271	12	~2013
16808041643	33616083287	11	~2011
16808380361	100850282167	12	~2012
16808963411	302561341399	12	~2013
16809135923	33618271847	11	~2011
16809542159	33619084319	11	~2011
16810414199	33620828399	11	~2011
16810459223	33620918447	11	~2011
16811039699	33622079399	11	~2011
16811328181	100867969087	12	~2012
16811799923	33623599847	11	~2011
16811824583	33623649167	11	~2011
16812472511	33624945023	11	~2011

Exponent	Prime Factor	Dig.	Year
16813057277	134504458217	12	~2012
16813535699	33627071399	11	~2011
16814126429	134513011433	12	~2012
16814608451	33629216903	11	~2011
16815244571	302674402279	12	~2013
16816762073	504502862191	12	~2014
16816906103	33633812207	11	~2011
16817653679	33635307359	11	~2011
16819097843	33638195687	11	~2011
16821018443	33642036887	11	~2011
16823112431	33646224863	11	~2011
16823564903	33647129807	11	~2011
16825037057	235550518799	12	~2013
16825347323	33650694647	11	~2011
16825582139	33651164279	11	~2011
16825851743	33651703487	11	~2011
16826265143	33652530287	11	~2011
16826778911	33653557823	11	~2011
16826851831	269229629297	12	~2013
16827661451	33655322903	11	~2011
16828491863	33656983727	11	~2011
16828596173	100971577039	12	~2012
16828975463	33657950927	11	~2011
16829253383	33658506767	11	~2011
16829607611	33659215223	11	~2011

Exponent	Prime Factor	Dig.	Year
16830543599	33661087199	11	~2011
16831754099	33663508199	11	~2011
16832157659	33664315319	11	~2011
16832454071	33664908143	11	~2011
16832474759	33664949519	11	~2011
16832912879	33665825759	11	~2011
16834207583	33668415167	11	~2011
16834293419	33668586839	11	~2011
16834644083	33669288167	11	~2011
16834945733	101009674399	12	~2012
16836656099	33673312199	11	~2011
16837351763	33674703527	11	~2011
16837660379	33675320759	11	~2011
16838008091	33676016183	11	~2011
16838597423	33677194847	11	~2011
16840861619	33681723239	11	~2011
16841688671	134733509369	12	~2012
16842588299	33685176599	11	~2011
16844379179	33688758359	11	~2011
16845052073	101070312439	12	~2012
16846858073	101081148439	12	~2012
16846912931	33693825863	11	~2011
16849140239	33698280479	11	~2011
16849398899	33698797799	11	~2011
16849615031	33699230063	11	~2011

4.828.532 digits

25-06-01