Small Mersenne Prime Factors (page 4723/5340)

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
22215767891	44431535783	11	~2012
22216020833	133296124999	12	~2013
22217222231	44434444463	11	~2012
22217313731	44434627463	11	~2012
22217346661	133304079967	12	~2013
22217812751	44435625503	11	~2012
22218782363	44437564727	11	~2012
22218803729	311063252207	12	~2014
22219505681	133317034087	12	~2013
22219507657	133317045943	12	~2013
22220787731	44441575463	11	~2012
22222033657	133332201943	12	~2013
22223112173	311123570423	12	~2014
22224967841	133349807047	12	~2013
22224996877	133349981263	12	~2013
22225136723	44450273447	11	~2012
22225170239	44450340479	11	~2012
22225696151	44451392303	11	~2012
22225924463	44451848927	11	~2012
22226106503	44452213007	11	~2012
22226964059	44453928119	11	~2012
22228098911	44456197823	11	~2012
22228106531	44456213063	11	~2012
22228714691	44457429383	11	~2012
22229115851	44458231703	11	~2012

Exponent	Prime Factor	Dig.	Year
22229666243	44459332487	11	~2012
22229795519	44459591039	11	~2012
22229891867	177839134937	12	~2013
22229968031	44459936063	11	~2012
22230510881	133383065287	12	~2013
22232540639	44465081279	11	~2012
22233166421	133398998527	12	~2013
22234781879	44469563759	11	~2012
22234840559	44469681119	11	~2012
22235365213	355765843409	12	~2014
22236368939	44472737879	11	~2012
22237325399	44474650799	11	~2012
22237387121	133424322727	12	~2013
22238489099	44476978199	11	~2012
22238623223	44477246447	11	~2012
22239206063	44478412127	11	~2012
22240079111	44480158223	11	~2012
22241502029	177932016233	12	~2013
22242266021	133453596127	12	~2013
22242451739	44484903479	11	~2012
22244122861	133464737167	12	~2013
22244669081	133468014487	12	~2013
22245073523	44490147047	11	~2012
22246158743	44492317487	11	~2012
22246749179	44493498359	11	~2012

Exponent	Prime Factor	Dig.	Year
22246999597	3844...303617	14	2024
22247644151	44495288303	11	~2012
22247670671	44495341343	11	~2012
22247686379	44495372759	11	~2012
22247859239	44495718479	11	~2012
22248018491	44496036983	11	~2012
22248131459	44496262919	11	~2012
22248808943	44497617887	11	~2012
22249268257	133495609543	12	~2013
22249882859	44499765719	11	~2012
22249901111	44499802223	11	~2012
22250406979	222504069791	12	~2014
22251199571	44502399143	11	~2012
22252882297	133517293783	12	~2013
22253618423	44507236847	11	~2012
22255359911	44510719823	11	~2012
22255624151	44511248303	11	~2012
22255924979	44511849959	11	~2012
22257160043	44514320087	11	~2012
22257405959	44514811919	11	~2012
22257493283	44514986567	11	~2012
22258395403	534201489673	12	~2014
22261581263	44523162527	11	~2012
22262854079	44525708159	11	~2012
22264246643	44528493287	11	~2012

Exponent	Prime Factor	Dig.	Year
22264277999	44528555999	11	~2012
22265723351	44531446703	11	~2012
22265732063	44531464127	11	~2012
22267324223	44534648447	11	~2012
22268072003	44536144007	11	~2012
22268212777	133609276663	12	~2013
22268484131	44536968263	11	~2012
22269164077	133614984463	12	~2013
22270653137	178165225097	12	~2013
22271106779	44542213559	11	~2012
22271462243	44542924487	11	~2012
22272103541	133632621247	12	~2013
22273659451	222736594511	12	~2014
22274323381	133645940287	12	~2013
22274455967	400940207407	12	~2014
22274982427	3772...348527	15	2025
22275135517	356402168273	12	~2014
22275170759	44550341519	11	~2012
22277050619	44554101239	11	~2012
22278242219	44556484439	11	~2012
22281085157	133686510943	12	~2013
22282173671	44564347343	11	~2012
22282489403	44564978807	11	~2012
22282801823	44565603647	11	~2012
22282896071	44565792143	11	~2012

5.037.460 digits

25-09-07