Small Mersenne Prime Factors (page 2973/5025)

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
320187377	1921124263	10	~1999
320188951	3201889511	10	~1999
320190263	640380527	9	~1997
320197627	5763557287	10	~2000
320207963	640415927	9	~1997
320208173	1921249039	10	~1999
320219831	640439663	9	~1997
320228231	640456463	9	~1997
320257921	22418054471	11	~2001
320261099	640522199	9	~1997
320262791	640525583	9	~1997
320263271	640526543	9	~1997
320275643	640551287	9	~1997
320276003	640552007	9	~1997
320280271	44198677399	11	~2002
320281163	640562327	9	~1997
320282327	2562258617	10	~1999
320302403	640604807	9	~1997
320303981	1921823887	10	~1999
320315393	1921892359	10	~1999
320325443	640650887	9	~1997
320329571	640659143	9	~1997
320338559	640677119	9	~1997
320342047	5125472753	10	~2000
320345471	640690943	9	~1997

Exponent	Prime Factor	Digits	Year
320350883	640701767	9	~1997
320358719	640717439	9	~1997
320359063	3203590631	10	~1999
320380979	640761959	9	~1997
320396123	23068520857	11	~2001
320422021	1922532127	10	~1999
320435663	640871327	9	~1997
320435723	640871447	9	~1997
320441903	640883807	9	~1997
320442131	640884263	9	~1997
320449919	640899839	9	~1997
320452343	640904687	9	~1997
320452981	1922717887	10	~1999
320456651	640913303	9	~1997
320482439	640964879	9	~1997
320483699	640967399	9	~1997
320486473	1922918839	10	~1999
320491679	640983359	9	~1997
320492339	640984679	9	~1997
320492903	8332815479	10	~2000
320493581	2563948649	10	~1999
320507459	641014919	9	~1997
320516831	641033663	9	~1997
320532011	641064023	9	~1997
320537491	3205374911	10	~1999

Exponent	Prime Factor	Digits	Year
320539889	4487558447	10	~1999
320542151	641084303	9	~1997
320543183	641086367	9	~1997
320547611	641095223	9	~1997
320549363	641098727	9	~1997
320550299	641100599	9	~1997
320551151	641102303	9	~1997
320554571	641109143	9	~1997
320602433	1923614599	10	~1999
320609441	2564875529	10	~1999
320621137	1923726823	10	~1999
320627579	641255159	9	~1997
320635517	1923813103	10	~1999
320644979	641289959	9	~1997
320649599	641299199	9	~1997
320651207	2565209657	10	~1999
320683841	1924103047	10	~1999
320684543	641369087	9	~1997
320685719	641371439	9	~1997
320686403	641372807	9	~1997
320699303	641398607	9	~1997
320710199	641420399	9	~1997
320725319	641450639	9	~1997
320730251	641460503	9	~1997
320747639	641495279	9	~1997

Exponent	Prime Factor	Digits	Year
320750021	15396001009	11	~2001
320769103	5132305649	10	~2000
320769947	2566159577	10	~1999
320777543	641555087	9	~1997
320779523	641559047	9	~1997
320784439	3207844391	10	~1999
320786099	641572199	9	~1997
320791571	641583143	9	~1997
320793503	641587007	9	~1997
320795231	641590463	9	~1997
320804279	641608559	9	~1997
320811899	2566495193	10	~1999
320812031	641624063	9	~1997
320818103	641636207	9	~1997
320825903	641651807	9	~1997
320832251	641664503	9	~1997
320833619	641667239	9	~1997
320834777	2566678217	10	~1999
320841803	641683607	9	~1997
320843903	641687807	9	~1997
320853119	641706239	9	~1997
320866739	641733479	9	~1997
320871983	641743967	9	~1997
320880551	641761103	9	~1997
320882843	641765687	9	~1997

4.724.182 digits

25-04-13