Small Mersenne Prime Factors (page 2983/5760)

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
172692461	1036154767	10	~1997
172696343	345392687	9	~1995
172701967	5871866879	10	~1998
172704839	345409679	9	~1995
172704971	345409943	9	~1995
172706543	345413087	9	~1995
172707179	345414359	9	~1995
172709279	345418559	9	~1995
172727003	345454007	9	~1995
172737599	345475199	9	~1995
172740713	5182221391	10	~1998
172742099	345484199	9	~1995
172742327	3109361887	10	~1998
172745437	2763926993	10	~1998
172746991	2763951857	10	~1998
172748507	1381988057	10	~1997
172752323	345504647	9	~1995
172753331	345506663	9	~1995
172756861	1036541167	10	~1997
172758337	1036550023	10	~1997
172760461	1036562767	10	~1997
172762319	345524639	9	~1995
172767373	2764277969	10	~1998
172777439	345554879	9	~1995
172778051	345556103	9	~1995

Exponent	Prime Factor	Digits	Year
172778519	345557039	9	~1995
172781701	2764507217	10	~1998
172784351	345568703	9	~1995
172786331	345572663	9	~1995
172789031	345578063	9	~1995
172790713	1036744279	10	~1997
172795631	345591263	9	~1995
172804343	345608687	9	~1995
172808183	345616367	9	~1995
172824419	345648839	9	~1995
172830683	345661367	9	~1995
172831751	345663503	9	~1995
172831811	345663623	9	~1995
172837991	345675983	9	~1995
172838483	345676967	9	~1995
172838621	1037031727	10	~1997
172841183	345682367	9	~1995
172841951	345683903	9	~1995
172842083	345684167	9	~1995
172849093	1037094559	10	~1997
172849223	345698447	9	~1995
172849823	345699647	9	~1995
172852913	1037117479	10	~1997
172856003	345712007	9	~1995
172861853	30077962423	11	~2000

Exponent	Prime Factor	Digits	Year
172865467	1728654671	10	~1997
172865531	345731063	9	~1995
172865657	1037193943	10	~1997
172866119	345732239	9	~1995
172871753	2420204543	10	~1997
172878059	345756119	9	~1995
172885343	345770687	9	~1995
172885343	4495018919	10
172887623	345775247	9	~1995
172890383	345780767	9	~1995
172890733	21784232359	11	~2000
172895759	345791519	9	~1995
172897031	345794063	9	~1995
172899733	4149593593	10	~1998
172903061	1383224489	10	~1997
172903153	1037418919	10	~1997
172904471	345808943	9	~1995
172904783	345809567	9	~1995
172906043	345812087	9	~1995
172909199	345818399	9	~1995
172909283	345818567	9	~1995
172914503	345829007	9	~1995
172917359	345834719	9	~1995
172917683	345835367	9	~1995
172918973	1037513839	10	~1997

Exponent	Prime Factor	Digits	Year
172923697	1037542183	10	~1997
172924523	345849047	9	~1995
172925183	345850367	9	~1995
172928279	345856559	9	~1995
172932233	1037593399	10	~1997
172936573	1037619439	10	~1997
172938911	345877823	9	~1995
172940903	345881807	9	~1995
172945379	4150689097	10	~1998
172948091	345896183	9	~1995
172951703	345903407	9	~1995
172955663	345911327	9	~1995
172955873	1037735239	10	~1997
172955921	1037735527	10	~1997
172959929	1383679433	10	~1997
172962431	7264422103	10	~1999
172963211	345926423	9	~1995
172964633	1037787799	10	~1997
172971083	345942167	9	~1995
172971779	1383774233	10	~1997
172973543	345947087	9	~1995
172979291	1383834329	10	~1997
172981199	345962399	9	~1995
172984373	1037906239	10	~1997
172985311	2767764977	10	~1998

5.456.260 digits

26-03-22