Small Mersenne Prime Factors (page 2879/5070)

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
249862919	499725839	9	~1997
249872411	499744823	9	~1997
249878459	1999027673	10	~1998
249885011	1999080089	10	~1998
249888251	499776503	9	~1997
249901259	499802519	9	~1997
249907919	499815839	9	~1997
249931079	499862159	9	~1997
249950639	499901279	9	~1997
249951599	499903199	9	~1997
249952453	1499714719	10	~1998
249954599	499909199	9	~1997
249956803	2499568031	10	~1998
249957011	1999656089	10	~1998
249961331	499922663	9	~1997
249962927	1999703417	10	~1998
249968291	499936583	9	~1997
249970121	1999760969	10	~1998
249972011	499944023	9	~1997
249973343	499946687	9	~1997
249987539	499975079	9	~1997
249990803	499981607	9	~1997
249991799	499983599	9	~1997
250001399	500002799	9	~1997
250006979	500013959	9	~1997

Exponent	Prime Factor	Digits	Year
250020539	500041079	9	~1997
250024679	500049359	9	~1997
250028803	2500288031	10	~1998
250029959	500059919	9	~1997
250030799	500061599	9	~1997
250033991	500067983	9	~1997
250061893	1500371359	10	~1998
250064663	500129327	9	~1997
250065323	500130647	9	~1997
250068023	500136047	9	~1997
250075979	500151959	9	~1997
250082117	2000656937	10	~1998
250082137	11503778303	11	~2000
250084643	6002031433	10	~1999
250085057	1500510343	10	~1998
250090019	500180039	9	~1997
250090271	500180543	9	~1997
250106033	43518449743	11	~2001
250106123	500212247	9	~1997
250119251	500238503	9	~1997
250127099	500254199	9	~1997
250127653	4002042449	10	~1999
250129001	1500774007	10	~1998
250131887	2001055097	10	~1998
250131967	46524545863	11	~2001

Exponent	Prime Factor	Digits	Year
250133269	18009595369	11	~2000
250134011	500268023	9	~1997
250135049	6003241177	10	~1999
250135283	500270567	9	~1997
250137623	500275247	9	~1997
250163183	500326367	9	~1997
250164419	500328839	9	~1997
250170803	500341607	9	~1997
250172231	500344463	9	~1997
250172291	500344583	9	~1997
250174217	1501045303	10	~1998
250181699	500363399	9	~1997
250182071	500364143	9	~1997
250192259	2001538073	10	~1998
250203071	500406143	9	~1997
250206683	500413367	9	~1997
250219633	1501317799	10	~1998
250221371	500442743	9	~1997
250233839	500467679	9	~1997
250234403	500468807	9	~1997
250240853	1501445119	10	~1998
250244723	500489447	9	~1997
250246751	500493503	9	~1997
250254239	500508479	9	~1997
250258499	500516999	9	~1997

Exponent	Prime Factor	Digits	Year
250261159	2502611591	10	~1998
250270799	500541599	9	~1997
250273613	1501641679	10	~1998
250278851	500557703	9	~1997
250282049	3503948687	10	~1999
250283471	500566943	9	~1997
250283597	1501701583	10	~1998
250299113	6007178713	10	~1999
250304783	500609567	9	~1997
250306843	2503068431	10	~1998
250308937	1501853623	10	~1998
250310651	2002485209	10	~1998
250314419	500628839	9	~1997
250334099	500668199	9	~1997
250334407	4005350513	10	~1999
250338899	500677799	9	~1997
250344911	500689823	9	~1997
250348643	500697287	9	~1997
250350851	500701703	9	~1997
250352699	500705399	9	~1997
250354061	1502124367	10	~1998
250363259	500726519	9	~1997
250365539	500731079	9	~1997
250366139	500732279	9	~1997
250366517	1502199103	10	~1998

4.768.925 digits

25-05-04