Small Mersenne Prime Factors (page 2992/5670)

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
187712341	1126274047	10	~1997
187715519	1501724153	10	~1997
187720691	375441383	9	~1996
187721951	375443903	9	~1996
187732763	375465527	9	~1996
187733639	1501869113	10	~1997
187735631	375471263	9	~1996
187735657	1126413943	10	~1997
187737311	375474623	9	~1996
187737323	375474647	9	~1996
187737479	375474959	9	~1996
187740067	4505761609	10	~1998
187749143	375498287	9	~1996
187750763	375501527	9	~1996
187750879	3379515823	10	~1998
187754689	4130603159	10	~1998
187757051	375514103	9	~1996
187757891	375515783	9	~1996
187758611	375517223	9	~1996
187765559	375531119	9	~1996
187769327	1502154617	10	~1997
187770263	13894999463	11	~1999
187777211	375554423	9	~1996
187779887	13895711639	11	~1999
187780319	3380045743	10	~1998

Exponent	Prime Factor	Digits	Year
187784477	1126706863	10	~1997
187793267	1502346137	10	~1997
187796159	375592319	9	~1996
187797133	1126782799	10	~1997
187798159	1877981591	10	~1997
187802353	1126814119	10	~1997
187804739	1502437913	10	~1997
187805459	375610919	9	~1996
187806863	375613727	9	~1996
187809683	375619367	9	~1996
187811579	375623159	9	~1996
187812623	375625247	9	~1996
187814339	375628679	9	~1996
187814789	1502518313	10	~1997
187815599	375631199	9	~1996
187816703	375633407	9	~1996
187818083	375636167	9	~1996
187828559	375657119	9	~1996
187831799	375663599	9	~1996
187836661	1127019967	10	~1997
187841963	375683927	9	~1996
187842719	375685439	9	~1996
187850711	375701423	9	~1996
187852409	1502819273	10	~1997
187853173	1127119039	10	~1997

Exponent	Prime Factor	Digits	Year
187853531	375707063	9	~1996
187854983	375709967	9	~1996
187855331	375710663	9	~1996
187856891	375713783	9	~1996
187857431	90547281743	11	~2001
187860131	375720263	9	~1996
187866607	3005865713	10	~1998
187872271	1878722711	10	~1997
187875119	375750239	9	~1996
187878683	375757367	9	~1996
187883833	1127302999	10	~1997
187884419	375768839	9	~1996
187884839	375769679	9	~1996
187889129	1503113033	10	~1997
187891159	1878911591	10	~1997
187892251	10897750559	11	~1999
187897943	375795887	9	~1996
187898167	3006370673	10	~1998
187904819	375809639	9	~1996
187909691	375819383	9	~1996
187910581	7516423241	10	~1999
187918109	2630853527	10	~1998
187918147	3006690353	10	~1998
187919219	375838439	9	~1996
187921121	1127526727	10	~1997

Exponent	Prime Factor	Digits	Year
187922159	375844319	9	~1996
187929607	1879296071	10	~1997
187931519	375863039	9	~1996
187935773	1127614639	10	~1997
187936019	375872039	9	~1996
187941263	375882527	9	~1996
187942451	375884903	9	~1996
187944923	375889847	9	~1996
187945133	1127670799	10	~1997
187947143	375894287	9	~1996
187957463	375914927	9	~1996
187957811	375915623	9	~1996
187959833	1127758999	10	~1997
187960859	375921719	9	~1996
187963403	375926807	9	~1996
187964113	10150062103	11	~1999
187964599	4511150377	10	~1998
187967999	375935999	9	~1996
187973699	375947399	9	~1996
187975393	1127852359	10	~1997
187978361	1127870167	10	~1997
187982189	1503857513	10	~1997
187990079	375980159	9	~1996
187991183	375982367	9	~1996
187991411	375982823	9	~1996

5.366.787 digits

26-02-08