Small Mersenne Prime Factors (page 2951/5040)

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
300187703	600375407	9	~1997
300192923	600385847	9	~1997
300196471	12608251783	11	~2000
300200737	1801204423	10	~1998
300201481	1801208887	10	~1998
300209353	33623447537	11	~2001
300228961	1801373767	10	~1998
300232453	1801394719	10	~1998
300239591	600479183	9	~1997
300241631	600483263	9	~1997
300246337	1801478023	10	~1998
300270673	1801624039	10	~1998
300273899	600547799	9	~1997
300283523	600567047	9	~1997
300283817	2402270537	10	~1999
300284399	600568799	9	~1997
300296723	600593447	9	~1997
300301559	600603119	9	~1997
300321053	31233389513	11	~2001
300331259	600662519	9	~1997
300332891	600665783	9	~1997
300339511	3003395111	10	~1999
300360551	600721103	9	~1997
300381691	3003816911	10	~1999
300382151	600764303	9	~1997

Exponent	Prime Factor	Digits	Year
300382331	600764663	9	~1997
300390479	600780959	9	~1997
300396793	1802380759	10	~1998
300398519	600797039	9	~1997
300400643	600801287	9	~1997
300402853	1802417119	10	~1998
300409523	600819047	9	~1997
300412501	1802475007	10	~1998
300419363	600838727	9	~1997
300424721	1802548327	10	~1998
300426779	267379833311	12	~2004
300429223	3004292231	10	~1999
300431171	15021558551	11	~2001
300434723	600869447	9	~1997
300440599	3004405991	10	~1999
300442529	18627436799	11	~2001
300456683	600913367	9	~1997
300481991	16826991497	11	~2001
300482921	2403863369	10	~1999
300485477	2403883817	10	~1999
300502151	601004303	9	~1997
300504613	1803027679	10	~1998
300507587	2404060697	10	~1999
300511903	3005119031	10	~1999
300517463	601034927	9	~1997

Exponent	Prime Factor	Digits	Year
300524459	601048919	9	~1997
300526703	601053407	9	~1997
300527233	13824252719	11	~2001
300541781	2404334249	10	~1999
300542899	3005428991	10	~1999
300547523	7213140553	10	~2000
300552997	1803317983	10	~1998
300569903	601139807	9	~1997
300581371	5410464679	10	~2000
300587351	310206146233	12	~2004
300599291	601198583	9	~1997
300612341	2404898729	10	~1999
300618371	601236743	9	~1997
300621179	601242359	9	~1997
300628571	601257143	9	~1997
300646007	2405168057	10	~1999
300652211	601304423	9	~1997
300660323	601320647	9	~1997
300665203	21647894617	11	~2001
300674219	601348439	9	~1997
300682463	601364927	9	~1997
300690479	601380959	9	~1997
300691151	601382303	9	~1997
300691823	601383647	9	~1997
300708251	601416503	9	~1997

Exponent	Prime Factor	Digits	Year
300732787	7217586889	10	~2000
300743759	601487519	9	~1997
300749699	601499399	9	~1997
300752603	601505207	9	~1997
300753311	601506623	9	~1997
300759311	601518623	9	~1997
300759653	1804557919	10	~1998
300760697	1804564183	10	~1998
300763943	601527887	9	~1997
300767651	601535303	9	~1997
300777563	601555127	9	~1997
300779663	601559327	9	~1997
300788401	13836266447	11	~2001
300790951	3007909511	10	~1999
300794951	601589903	9	~1997
300794987	7820669663	10	~2000
300800411	601600823	9	~1997
300807359	601614719	9	~1997
300815759	601631519	9	~1997
300815843	601631687	9	~1997
300823951	3008239511	10	~1999
300840311	601680623	9	~1997
300855959	601711919	9	~1997
300856043	601712087	9	~1997
300856943	601713887	9	~1997

4.739.325 digits

25-04-20