Small Mersenne Prime Factors (page 2427/5070)

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	Digits	Year
100708031	201416063	9	~1993
100708871	201417743	9	~1993
100708913	21753125209	11	~1998
100710167	805681337	9	~1995
100711139	201422279	9	~1993
100712231	201424463	9	~1993
100715663	201431327	9	~1993
100716023	201432047	9	~1993
100716503	201433007	9	~1993
100716779	201433559	9	~1993
100718003	201436007	9	~1993
100718291	201436583	9	~1993
100720661	3827385119	10	~1997
100724639	201449279	9	~1993
100727843	201455687	9	~1993
100728113	1410193583	10	~1996
100732193	604393159	9	~1995
100734899	201469799	9	~1993
100735223	201470447	9	~1993
100737671	201475343	9	~1993
100739711	201479423	9	~1993
100742039	201484079	9	~1993
100745131	1007451311	10	~1995
100745399	201490799	9	~1993
100746263	201492527	9	~1993

Exponent	Prime Factor	Digits	Year
100746413	1410449783	10	~1996
100751723	201503447	9	~1993
100754761	1612076177	10	~1996
100757231	201514463	9	~1993
100758479	806067833	9	~1995
100764803	201529607	9	~1993
100772471	201544943	9	~1993
100772939	201545879	9	~1993
100775119	1007751191	10	~1995
100783703	9070533271	10	~1998
100790351	201580703	9	~1993
100798679	201597359	9	~1993
100800773	604804639	9	~1995
100802699	201605399	9	~1993
100803869	806430953	9	~1995
100812011	201624023	9	~1993
100812479	201624959	9	~1993
100813763	201627527	9	~1993
100815443	201630887	9	~1993
100819739	201639479	9	~1993
100822523	201645047	9	~1993
100823581	604941487	9	~1995
100823759	201647519	9	~1993
100827971	201655943	9	~1993
100829483	201658967	9	~1993

Exponent	Prime Factor	Digits	Year
100831319	201662639	9	~1993
100832077	604992463	9	~1995
100833913	605003479	9	~1995
100833989	3226687649	10	~1996
100836023	201672047	9	~1993
100837703	201675407	9	~1993
100838603	201677207	9	~1993
100845197	605071183	9	~1995
100849943	201699887	9	~1993
100850593	2218713047	10	~1996
100853201	806825609	9	~1995
100854791	201709583	9	~1993
100857551	201715103	9	~1993
100865473	605192839	9	~1995
100865581	605193487	9	~1995
100868279	806946233	9	~1995
100870853	605225119	9	~1995
100874219	201748439	9	~1993
100875839	201751679	9	~1993
100877789	807022313	9	~1995
100880089	11903850503	11	~1998
100880587	1815850567	10	~1996
100883093	605298559	9	~1995
100887617	605325703	9	~1995
100892117	807136937	9	~1995

Exponent	Prime Factor	Digits	Year
100892579	201785159	9	~1993
100895303	201790607	9	~1993
100896839	201793679	9	~1993
100898107	8879033417	10	~1998
100905023	201810047	9	~1993
100906583	201813167	9	~1993
100907363	201814727	9	~1993
100907377	605444263	9	~1995
100912351	1816422319	10	~1996
100913651	201827303	9	~1993
100913873	1412794223	10	~1996
100916831	201833663	9	~1993
100917779	201835559	9	~1993
100920863	201841727	9	~1993
100923083	201846167	9	~1993
100924259	201848519	9	~1993
100924331	201848663	9	~1993
100924919	201849839	9	~1993
100924931	807399449	9	~1995
100924991	201849983	9	~1993
100926853	605561119	9	~1995
100927451	201854903	9	~1993
100927499	201854999	9	~1993
100929281	605575687	9	~1995
100935539	807484313	9	~1995

4.768.925 digits

25-05-04