Small Mersenne Prime Factors (page 2967/5190)

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
267160147	4808882647	10	~1999
267160447	2671604471	10	~1999
267170863	6412100713	10	~1999
267172379	2137379033	10	~1998
267174311	534348623	9	~1997
267183503	534367007	9	~1997
267186767	2137494137	10	~1998
267187441	1603124647	10	~1998
267195839	534391679	9	~1997
267203243	534406487	9	~1997
267204599	534409199	9	~1997
267209843	534419687	9	~1997
267213923	534427847	9	~1997
267215519	534431039	9	~1997
267216143	534432287	9	~1997
267223919	534447839	9	~1997
267225421	4275606737	10	~1999
267249511	4275992177	10	~1999
267251657	2138013257	10	~1998
267252809	2138022473	10	~1998
267264689	3741705647	10	~1999
267266399	534532799	9	~1997
267273683	534547367	9	~1997
267275069	3741850967	10	~1999
267279599	534559199	9	~1997

Exponent	Prime Factor	Digits	Year
267288839	534577679	9	~1997
267307511	534615023	9	~1997
267314893	1603889359	10	~1998
267327817	4277245073	10	~1999
267328403	534656807	9	~1997
267329423	534658847	9	~1997
267331741	5881298303	10	~1999
267334271	534668543	9	~1997
267334559	534669119	9	~1997
267336071	534672143	9	~1997
267338411	534676823	9	~1997
267341939	534683879	9	~1997
267353699	534707399	9	~1997
267355391	534710783	9	~1997
267356711	534713423	9	~1997
267368531	2138948249	10	~1998
267370199	534740399	9	~1997
267376619	534753239	9	~1997
267377801	2139022409	10	~1998
267399323	534798647	9	~1997
267408893	1604453359	10	~1998
267409531	2674095311	10	~1999
267409559	534819119	9	~1997
267416339	534832679	9	~1997
267427703	534855407	9	~1997

Exponent	Prime Factor	Digits	Year
267431891	534863783	9	~1997
267433703	534867407	9	~1997
267436931	534873863	9	~1997
267437719	32092526281	11	~2001
267438863	534877727	9	~1997
267440759	534881519	9	~1997
267444179	534888359	9	~1997
267447371	534894743	9	~1997
267451553	3744321743	10	~1999
267462131	534924263	9	~1997
267464521	1604787127	10	~1998
267468059	534936119	9	~1997
267471551	534943103	9	~1997
267474023	534948047	9	~1997
267482903	534965807	9	~1997
267484391	534968783	9	~1997
267487151	2139897209	10	~1998
267487859	534975719	9	~1997
267494837	2139958697	10	~1998
267499391	2139995129	10	~1998
267505759	2675057591	10	~1999
267518021	2140144169	10	~1998
267522743	535045487	9	~1997
267525851	535051703	9	~1997
267530321	1605181927	10	~1998

Exponent	Prime Factor	Digits	Year
267533219	535066439	9	~1997
267539663	535079327	9	~1997
267544399	23543907113	11	~2001
267565379	535130759	9	~1997
267568943	535137887	9	~1997
267569999	535139999	9	~1997
267572891	535145783	9	~1997
267573107	4816315927	10	~1999
267578243	535156487	9	~1997
267581063	535162127	9	~1997
267584287	6422022889	10	~1999
267584621	2140676969	10	~1998
267592739	535185479	9	~1997
267599609	2140796873	10	~1998
267601157	6422427769	10	~1999
267602417	1605614503	10	~1998
267621311	535242623	9	~1997
267623771	535247543	9	~1997
267629039	535258079	9	~1997
267650879	535301759	9	~1997
267662743	2676627431	10	~1999
267663551	535327103	9	~1997
267667019	4818006343	10	~1999
267668237	1606009423	10	~1998
267668759	535337519	9	~1997

4.888.230 digits

25-06-29