Small Mersenne Prime Factors (page 4784/4980)

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
106062630599	212125261199	12	~2017
106064773211	212129546423	12	~2017
106069172591	212138345183	12	~2017
106069671371	212139342743	12	~2017
106070126557	636420759343	12	~2018
106076631239	212153262479	12	~2017
106078188899	212156377799	12	~2017
106101792551	212203585103	12	~2017
106102918139	212205836279	12	~2017
106107000899	212214001799	12	~2017
106115143091	212230286183	12	~2017
106115768039	212231536079	12	~2017
106118770031	212237540063	12	~2017
106118940611	212237881223	12	~2017
106122532991	212245065983	12	~2017
106124953391	212249906783	12	~2017
106133370971	212266741943	12	~2017
106144568951	212289137903	12	~2017
106146758639	212293517279	12	~2017
106148593151	212297186303	12	~2017
106149259379	212298518759	12	~2017
106150906811	212301813623	12	~2017
106152250091	212304500183	12	~2017
106166882183	212333764367	12	~2017
106181973563	212363947127	12	~2017

Exponent	Prime Factor	Dig.	Year
106189445753	637136674519	12	~2018
106194494111	212388988223	12	~2017
106205823263	212411646527	12	~2017
106220319481	637321916887	12	~2018
106228799639	212457599279	12	~2017
106230968939	212461937879	12	~2017
106238926763	212477853527	12	~2017
106244186651	212488373303	12	~2017
106249524779	212499049559	12	~2017
106255252331	212510504663	12	~2017
106255610711	212511221423	12	~2017
106265209223	212530418447	12	~2017
106267484657	637604907943	12	~2018
106272148217	637632889303	12	~2018
106273806491	212547612983	12	~2017
106279135439	212558270879	12	~2017
106284418739	212568837479	12	~2017
106294994137	637769964823	12	~2018
106302026951	212604053903	12	~2017
106307924483	212615848967	12	~2017
106313514143	212627028287	12	~2017
106320063119	212640126239	12	~2017
106323412271	212646824543	12	~2017
106335004019	212670008039	12	~2017
106335085079	212670170159	12	~2017

Exponent	Prime Factor	Dig.	Year
106342595759	212685191519	12	~2017
106344654797	638067928783	12	~2018
106346360231	212692720463	12	~2017
106360384573	638162307439	12	~2018
106377267263	212754534527	12	~2017
106378618799	212757237599	12	~2017
106380792383	212761584767	12	~2017
106381698959	212763397919	12	~2017
106384878779	212769757559	12	~2017
106396999763	212793999527	12	~2017
106403699459	212807398919	12	~2017
106405156199	212810312399	12	~2017
106411430159	212822860319	12	~2017
106422460811	212844921623	12	~2017
106432025831	212864051663	12	~2017
106435586123	212871172247	12	~2017
106437032519	212874065039	12	~2017
106444636163	212889272327	12	~2017
106447410059	212894820119	12	~2017
106448426351	212896852703	12	~2017
106451842859	212903685719	12	~2017
106454120603	212908241207	12	~2017
106456072559	212912145119	12	~2017
106464389639	212928779279	12	~2017
106484641331	212969282663	12	~2017

Exponent	Prime Factor	Dig.	Year
106497033491	212994066983	12	~2017
106530281783	213060563567	12	~2017
106531689839	213063379679	12	~2017
106537807643	2039...828703	15	2023
106547249531	213094499063	12	~2017
106557343439	213114686879	12	~2017
106558270319	213116540639	12	~2017
106562093003	213124186007	12	~2017
106577900171	213155800343	12	~2017
106588210199	213176420399	12	~2017
106589520593	639537123559	12	~2018
106589945639	213179891279	12	~2017
106595230523	213190461047	12	~2017
106599863159	213199726319	12	~2017
106603036019	213206072039	12	~2017
106608297371	213216594743	12	~2017
106609657991	213219315983	12	~2017
106610032513	639660195079	12	~2018
106635891731	213271783463	12	~2017
106639635779	213279271559	12	~2017
106640221091	213280442183	12	~2017
106640730773	639844384639	12	~2018
106640939291	213281878583	12	~2017
106657328171	7359...437991	14	2024
106662824399	213325648799	12	~2017

4.679.597 digits

25-03-23