Small Mersenne Prime Factors (page 4294/5745)

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
2604413639	5208827279	10	~2005
2604648023	5209296047	10	~2005
2604659177	20837273417	11	~2006
2604691961	15628151767	11	~2006
2604729847	26047298471	11	~2006
2604826699	26048266991	11	~2006
2604995483	5209990967	10	~2005
2605093181	20840745449	11	~2006
2605149203	5210298407	10	~2005
2605278419	5210556839	10	~2005
2605379363	5210758727	10	~2005
2605511593	187596834697	12	~2008
2605755641	15634533847	11	~2006
2605758383	5211516767	10	~2005
2605867391	5211734783	10	~2005
2605948831	26059488311	11	~2006
2606125493	83396015777	11	~2008
2606364671	5212729343	10	~2005
2606393771	20851150169	11	~2006
2606406797	36489695159	11	~2007
2606435963	5212871927	10	~2005
2606455811	5212911623	10	~2005
2606616017	15639696103	11	~2006
2606667263	5213334527	10	~2005
2606718599	5213437199	10	~2005

Exponent	Prime Factor	Digits	Year
2606832491	5213664983	10	~2005
2606909771	5213819543	10	~2005
2607057041	20856456329	11	~2006
2607084131	5214168263	10	~2005
2607153863	5214307727	10	~2005
2607367439	5214734879	10	~2005
2607388919	5214777839	10	~2005
2607438187	46933887367	11	~2007
2607443281	41719092497	11	~2007
2607521099	20860168793	11	~2006
2607535163	5215070327	10	~2005
2607546131	5215092263	10	~2005
2607827279	5215654559	10	~2005
2607838391	5215676783	10	~2005
2607907199	5215814399	10	~2005
2607916583	5215833167	10	~2005
2607997031	20863976249	11	~2006
2608099997	15648599983	11	~2006
2608105943	5216211887	10	~2005
2608147177	41730354833	11	~2007
2608168471	26081684711	11	~2006
2608197131	5216394263	10	~2005
2608198963	41731183409	11	~2007
2608210153	15649260919	11	~2006
2608367759	5216735519	10	~2005

Exponent	Prime Factor	Digits	Year
2608497803	5216995607	10	~2005
2608512611	5217025223	10	~2005
2608581331	41737301297	11	~2007
2608582373	15651494239	11	~2006
2608693693	15652162159	11	~2006
2608875673	15653254039	11	~2006
2608965011	5217930023	10	~2005
2608979231	5217958463	10	~2005
2609043259	26090432591	11	~2006
2609194853	15655169119	11	~2006
2609217059	20873736473	11	~2006
2609353753	15656122519	11	~2006
2609396213	15656377279	11	~2006
2609521391	5219042783	10	~2005
2609715851	5219431703	10	~2005
2609776223	5219552447	10	~2005
2609807251	41756916017	11	~2007
2609837459	5219674919	10	~2005
2609843339	5219686679	10	~2005
2609893343	5219786687	10	~2005
2609897903	5219795807	10	~2005
2609972797	41759564753	11	~2007
2610050873	15660305239	11	~2006
2610080051	5220160103	10	~2005
2610248183	5220496367	10	~2005

Exponent	Prime Factor	Digits	Year
2610264053	15661584319	11	~2006
2610667751	5221335503	10	~2005
2610685919	5221371839	10	~2005
2610745601	20885964809	11	~2006
2610780311	5221560623	10	~2005
2610843419	5221686839	10	~2005
2610997393	15665984359	11	~2006
2611023307	88774792439	11	~2008
2611157771	5222315543	10	~2005
2611201031	5222402063	10	~2005
2611203131	5222406263	10	~2005
2611292903	5222585807	10	~2005
2611307057	15667842343	11	~2006
2611328807	20890630457	11	~2006
2611449439	47006089903	11	~2007
2611451819	5222903639	10	~2005
2611630643	5223261287	10	~2005
2611633859	5223267719	10	~2005
2611640651	5223281303	10	~2005
2611757089	62682170137	11	~2007
2611995959	5223991919	10	~2005
2612007383	5224014767	10	~2005
2612268959	5224537919	10	~2005
2612285323	26122853231	11	~2006
2612418383	5224836767	10	~2005

5.441.361 digits

26-03-15