Small Mersenne Prime Factors (page 5307/5610)

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
87539060159	175078120319	12	~2016
87540101111	175080202223	12	~2016
87542289251	175084578503	12	~2016
87542600659	875426006591	12	~2018
87547763483	175095526967	12	~2016
87549523823	175099047647	12	~2016
87554128631	175108257263	12	~2016
87555313801	525331882807	12	~2018
87559472411	175118944823	12	~2016
87562410431	175124820863	12	~2016
87565737221	525394423327	12	~2018
87570344579	175140689159	12	~2016
87571030259	175142060519	12	~2016
87571979783	175143959567	12	~2016
87572138791	875721387911	12	~2018
87576610739	175153221479	12	~2016
87579207671	175158415343	12	~2016
87581708531	175163417063	12	~2016
87583430183	175166860367	12	~2016
87588541939	875885419391	12	~2018
87588933683	175177867367	12	~2016
87592990643	1541...353169	14	2024
87593181743	175186363487	12	~2016
87596840843	175193681687	12	~2016
87604713083	175209426167	12	~2016

Exponent	Prime Factor	Dig.	Year
87606588383	175213176767	12	~2016
87610576187	2961...751207	14	2023
87612952333	525677713999	12	~2018
87615839123	175231678247	12	~2016
87616645283	175233290567	12	~2016
87623204423	175246408847	12	~2016
87625545961	525753275767	12	~2018
87627670199	175255340399	12	~2016
87631108871	175262217743	12	~2016
87632621171	175265242343	12	~2016
87633536603	175267073207	12	~2016
87634742081	525808452487	12	~2018
87638222137	525829332823	12	~2018
87639529319	175279058639	12	~2016
87639558277	525837349663	12	~2018
87643433897	525860603383	12	~2018
87654658073	525927948439	12	~2018
87656644331	175313288663	12	~2016
87658229651	175316459303	12	~2016
87663883019	175327766039	12	~2016
87668022779	175336045559	12	~2017
87671450759	175342901519	12	~2017
87674089799	175348179599	12	~2017
87675282899	175350565799	12	~2017
87677076359	175354152719	12	~2017

Exponent	Prime Factor	Dig.	Year
87682257479	175364514959	12	~2017
87682567319	175365134639	12	~2017
87688997171	175377994343	12	~2017
87692613779	175385227559	12	~2017
87695868059	175391736119	12	~2017
87701629259	175403258519	12	~2017
87708037619	175416075239	12	~2017
87711061717	526266370303	12	~2018
87716491451	175432982903	12	~2017
87716689601	526300137607	12	~2018
87718169351	175436338703	12	~2017
87718561211	175437122423	12	~2017
87719493971	175438987943	12	~2017
87727733123	175455466247	12	~2017
87728767391	175457534783	12	~2017
87729836063	175459672127	12	~2017
87731648951	175463297903	12	~2017
87737671691	175475343383	12	~2017
87742952483	175485904967	12	~2017
87746956259	175493912519	12	~2017
87755288417	526531730503	12	~2018
87755901899	175511803799	12	~2017
87761020163	175522040327	12	~2017
87768488903	175536977807	12	~2017
87774808091	175549616183	12	~2017

Exponent	Prime Factor	Dig.	Year
87778059557	526668357343	12	~2018
87778834973	526673009839	12	~2018
87778893121	3563...607127	14	2023
87787436183	175574872367	12	~2017
87791604011	175583208023	12	~2017
87792716161	526756296967	12	~2018
87804234239	175608468479	12	~2017
87809184119	175618368239	12	~2017
87809784071	175619568143	12	~2017
87811361999	175622723999	12	~2017
87828894551	175657789103	12	~2017
87829830611	175659661223	12	~2017
87838211599	878382115991	12	~2018
87841859891	702734879129	12	~2018
87842618411	175685236823	12	~2017
87843351577	527060109463	12	~2018
87844916053	527069496319	12	~2018
87856106363	175712212727	12	~2017
87873412943	175746825887	12	~2017
87875252579	175750505159	12	~2017
87880165343	175760330687	12	~2017
87882778651	878827786511	12	~2018
87883436363	175766872727	12	~2017
87884206513	527305239079	12	~2018
87885578603	175771157207	12	~2017

5.307.017 digits

26-01-11