Small Mersenne Prime Factors (page 4063/5775)

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
1451408957	11611271657	11	~2004
1451481791	26126672239	11	~2005
1451500247	11612001977	11	~2004
1451508083	2903016167	10	~2003
1451518559	2903037119	10	~2003
1451656331	2903312663	10	~2003
1451673697	8710042183	10	~2004
1451693003	2903386007	10	~2003
1451700311	2903400623	10	~2003
1451726099	2903452199	10	~2003
1451772779	2903545559	10	~2003
1451803763	2903607527	10	~2003
1451831723	2903663447	10	~2003
1451958323	2903916647	10	~2003
1451960483	2903920967	10	~2003
1451967311	2903934623	10	~2003
1451977679	2903955359	10	~2003
1451990201	8711941207	10	~2004
1452009983	2904019967	10	~2003
1452016199	2904032399	10	~2003
1452030233	8712181399	10	~2004
1452050399	2904100799	10	~2003
1452056279	2904112559	10	~2003
1452067499	2904134999	10	~2003
1452083159	2904166319	10	~2003

Exponent	Prime Factor	Digits	Year
1452130457	11617043657	11	~2004
1452147581	11617180649	11	~2004
1452155423	2904310847	10	~2003
1452163067	11617304537	11	~2004
1452172499	2904344999	10	~2003
1452182009	34852368217	11	~2005
1452209579	2904419159	10	~2003
1452227723	2904455447	10	~2003
1452277471	14522774711	11	~2004
1452338099	2904676199	10	~2003
1452347419	14523474191	11	~2004
1452370151	2904740303	10	~2003
1452428843	2904857687	10	~2003
1452480563	2904961127	10	~2003
1452516311	2905032623	10	~2003
1452555703	14525557031	11	~2004
1452598447	258562523567	12	~2007
1452667283	2905334567	10	~2003
1452673763	2905347527	10	~2003
1452697019	2905394039	10	~2003
1452707219	2905414439	10	~2003
1452744179	2905488359	10	~2003
1452773999	2905547999	10	~2003
1452786383	2905572767	10	~2003
1452889631	2905779263	10	~2003

Exponent	Prime Factor	Digits	Year
1452926837	8717561023	10	~2004
1452927551	2905855103	10	~2003
1452941603	2905883207	10	~2003
1452983579	2905967159	10	~2003
1452987619	14529876191	11	~2004
1453014851	2906029703	10	~2003
1453031903	2906063807	10	~2003
1453032803	2906065607	10	~2003
1453045151	2906090303	10	~2003
1453049651	2906099303	10	~2003
1453056461	8718338767	10	~2004
1453092983	2906185967	10	~2003
1453128959	2906257919	10	~2003
1453164179	69751880593	11	~2006
1453189823	2906379647	10	~2003
1453196599	61034257159	11	~2006
1453220963	2906441927	10	~2003
1453382939	2906765879	10	~2003
1453436909	20348116727	11	~2005
1453453643	2906907287	10	~2003
1453477463	2906954927	10	~2003
1453481231	2906962463	10	~2003
1453511827	14535118271	11	~2004
1453537691	2907075383	10	~2003
1453557863	2907115727	10	~2003

Exponent	Prime Factor	Digits	Year
1453593923	2907187847	10	~2003
1453698731	2907397463	10	~2003
1453729523	2907459047	10	~2003
1453764479	2907528959	10	~2003
1453823963	2907647927	10	~2003
1453853111	2907706223	10	~2003
1453857373	8723144239	10	~2004
1453863563	2907727127	10	~2003
1453890131	2907780263	10	~2003
1453989899	2907979799	10	~2003
1454001743	2908003487	10	~2003
1454009939	2908019879	10	~2003
1454029751	2908059503	10	~2003
1454033351	2908066703	10	~2003
1454047691	2908095383	10	~2003
1454057021	8724342127	10	~2004
1454085331	26173535959	11	~2005
1454134811	11633078489	11	~2004
1454161991	2908323983	10	~2003
1454196239	2908392479	10	~2003
1454236403	2908472807	10	~2003
1454275811	2908551623	10	~2003
1454283119	2908566239	10	~2003
1454295179	2908590359	10	~2003
1454303359	34903280617	11	~2005

5.471.290 digits

26-03-29