Small Mersenne Prime Factors (page 4708/5235)

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
28738339193	172430035159	12	~2014
28738502063	57477004127	11	~2013
28739721293	689753311033	12	~2015
28740210491	57480420983	11	~2013
28740362279	57480724559	11	~2013
28741132261	172446793567	12	~2014
28743176999	57486353999	11	~2013
28743566281	172461397687	12	~2014
28743620231	57487240463	11	~2013
28743994051	287439940511	12	~2014
28744780703	57489561407	11	~2013
28746985931	57493971863	11	~2013
28747802903	57495605807	11	~2013
28748843699	57497687399	11	~2013
28749190081	172495140487	12	~2014
28751165843	57502331687	11	~2013
28752717481	172516304887	12	~2014
28754518817	172527112903	12	~2014
28755152807	230041222457	12	~2014
28755233863	287552338631	12	~2014
28756369319	57512738639	11	~2013
28758349799	57516699599	11	~2013
28758626471	57517252943	11	~2013
28759870739	57519741479	11	~2013
28760909473	460174551569	12	~2015

Exponent	Prime Factor	Dig.	Year
28761528479	57523056959	11	~2013
28762461863	57524923727	11	~2013
28762465331	57524930663	11	~2013
28765052423	57530104847	11	~2013
28765261823	57530523647	11	~2013
28765519199	57531038399	11	~2013
28765891997	230127135977	12	~2014
28765892231	57531784463	11	~2013
28766803151	57533606303	11	~2013
28769097947	747996546623	12	~2015
28769648639	57539297279	11	~2013
28769856833	172619140999	12	~2014
28769997287	230159978297	12	~2014
28771325603	748054465679	12	~2015
28773487733	172640926399	12	~2014
28775795831	57551591663	11	~2013
28776127151	230209017209	12	~2014
28777460639	57554921279	11	~2013
28778577623	57557155247	11	~2013
28779134759	57558269519	11	~2013
28780047281	172680283687	12	~2014
28780251551	57560503103	11	~2013
28780931363	57561862727	11	~2013
28782092723	57564185447	11	~2013
28782638039	57565276079	11	~2013

Exponent	Prime Factor	Dig.	Year
28784909459	57569818919	11	~2013
28786837223	57573674447	11	~2013
28788439811	57576879623	11	~2013
28788931799	57577863599	11	~2013
28790059889	403060838447	12	~2015
28790063579	57580127159	11	~2013
28791190661	172747143967	12	~2014
28791418559	57582837119	11	~2013
28792422551	57584845103	11	~2013
28793967017	172763802103	12	~2014
28794392521	460710280337	12	~2015
28794836051	57589672103	11	~2013
28795938973	172775633839	12	~2014
28796325839	57592651679	11	~2013
28797690121	633549182663	12	~2015
28797992711	57595985423	11	~2013
28798207523	57596415047	11	~2013
28798560179	57597120359	11	~2013
28799818403	57599636807	11	~2013
28804911263	57609822527	11	~2013
28810250099	57620500199	11	~2013
28811184959	57622369919	11	~2013
28811454491	57622908983	11	~2013
28813375631	57626751263	11	~2013
28813531199	57627062399	11	~2013

Exponent	Prime Factor	Dig.	Year
28814451173	172886707039	12	~2014
28815381059	691569145417	12	~2015
28816172999	57632345999	11	~2013
28816467731	57632935463	11	~2013
28819834091	57639668183	11	~2013
28821137783	57642275567	11	~2013
28821371531	57642743063	11	~2013
28822131973	691731167353	12	~2015
28824688577	172948131463	12	~2014
28825515611	230604124889	12	~2014
28826347919	57652695839	11	~2013
28826369843	57652739687	11	~2013
28827644819	57655289639	11	~2013
28828714973	172972289839	12	~2014
28828906133	403604685863	12	~2015
28830106813	172980640879	12	~2014
28830679271	57661358543	11	~2013
28831913003	57663826007	11	~2013
28833272183	57666544367	11	~2013
28835370143	57670740287	11	~2013
28836297551	57672595103	11	~2013
28836762239	57673524479	11	~2013
28838005661	230704045289	12	~2014
28838049193	173028295159	12	~2014
28839505391	57679010783	11	~2013

4.933.056 digits

25-07-20