Small Mersenne Prime Factors (page 4426/5025)

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	Dig.	Year
18956899823	37913799647	11	~2011
18958328273	113749969639	12	~2012
18961610233	113769661399	12	~2012
18963572843	37927145687	11	~2011
18963993311	37927986623	11	~2011
18964066463	37928132927	11	~2011
18964264199	37928528399	11	~2011
18965874079	644839718687	12	~2014
18966409043	37932818087	11	~2011
18966485579	37932971159	11	~2011
18966988363	189669883631	12	~2013
18967226251	303475620017	12	~2013
18967970519	37935941039	11	~2011
18968383691	37936767383	11	~2011
18970108447	189701084471	12	~2013
18971617663	189716176631	12	~2013
18971712899	37943425799	11	~2011
18971795123	37943590247	11	~2011
18972288119	37944576239	11	~2011
18973965929	151791727433	12	~2013
18974120279	37948240559	11	~2011
18975193513	113851161079	12	~2012
18975263519	37950527039	11	~2011
18975517927	303608286833	12	~2013
18975832283	37951664567	11	~2011

Exponent	Prime Factor	Dig.	Year
18976157423	37952314847	11	~2011
18976308959	37952617919	11	~2011
18977628599	37955257199	11	~2011
18978262091	37956524183	11	~2011
18978339983	37956679967	11	~2011
18978543383	37957086767	11	~2011
18978623843	37957247687	11	~2011
18978691019	37957382039	11	~2011
18978982091	37957964183	11	~2011
18979291319	37958582639	11	~2011
18979907543	37959815087	11	~2011
18980226371	37960452743	11	~2011
18981129203	37962258407	11	~2011
18981475631	37962951263	11	~2011
18982240141	113893440847	12	~2012
18982571291	37965142583	11	~2011
18982705151	37965410303	11	~2011
18982935659	37965871319	11	~2011
18984617423	37969234847	11	~2011
18986385857	151891086857	12	~2013
18986804051	37973608103	11	~2011
18987748361	151901986889	12	~2013
18988404887	151907239097	12	~2013
18988952039	37977904079	11	~2011
18989148683	37978297367	11	~2011

Exponent	Prime Factor	Dig.	Year
18990220853	265863091943	12	~2013
18991959391	189919593911	12	~2013
18992384891	37984769783	11	~2011
18992956319	151943650553	12	~2013
18995081123	37990162247	11	~2011
18996288743	37992577487	11	~2011
18998600143	303977602289	12	~2013
18999129491	37998258983	11	~2011
18999881113	113999286679	12	~2012
19000610159	38001220319	11	~2011
19000626923	38001253847	11	~2011
19001082239	38002164479	11	~2011
19001546183	38003092367	11	~2011
19001781503	38003563007	11	~2011
19001895551	38003791103	11	~2011
19002594251	38005188503	11	~2011
19003868699	38007737399	11	~2011
19005356827	304085709233	12	~2013
19005935579	38011871159	11	~2011
19006275943	304100415089	12	~2013
19007045471	38014090943	11	~2011
19008063551	38016127103	11	~2011
19008067163	38016134327	11	~2011
19008451457	114050708743	12	~2012
19009325879	152074607033	12	~2013

Exponent	Prime Factor	Dig.	Year
19010115791	38020231583	11	~2011
19011100319	38022200639	11	~2011
19012103783	38024207567	11	~2011
19012177559	38024355119	11	~2011
19012311599	38024623199	11	~2011
19012878743	38025757487	11	~2011
19013789527	304220632433	12	~2013
19015221119	38030442239	11	~2011
19015575011	38031150023	11	~2011
19016227403	38032454807	11	~2011
19016288003	38032576007	11	~2011
19016568673	114099412039	12	~2012
19017712823	38035425647	11	~2011
19018069403	38036138807	11	~2011
19018400171	38036800343	11	~2011
19018408943	38036817887	11	~2011
19018922449	418416293879	12	~2014
19019246219	38038492439	11	~2011
19019351447	152154811577	12	~2013
19019913959	38039827919	11	~2011
19020243491	38040486983	11	~2011
19021861031	38043722063	11	~2011
19024032743	38048065487	11	~2011
19024463519	38048927039	11	~2011
19024514107	190245141071	12	~2013

4.724.182 digits

25-04-13