Small Mersenne Prime Factors (page 4160/5025)

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
7438285697	59506285577	11	~2010
7438548479	14877096959	11	~2008
7438568279	14877136559	11	~2008
7438767431	14877534863	11	~2008
7438820003	14877640007	11	~2008
7439150597	44634903583	11	~2009
7439392379	14878784759	11	~2008
7439406011	14878812023	11	~2008
7439987987	193439687663	12	~2011
7440149621	535690772713	12	~2012
7440534401	44643206407	11	~2009
7440747071	14881494143	11	~2008
7440811211	14881622423	11	~2008
7440979261	44645875567	11	~2009
7441225859	14882451719	11	~2008
7441464313	44648785879	11	~2009
7441514471	14883028943	11	~2008
7441919531	59535356249	11	~2010
7441944397	44651666383	11	~2009
7442425541	595394043281	12	~2012
7443152819	14886305639	11	~2008
7443181199	14886362399	11	~2008
7443208301	44659249807	11	~2009
7443370163	14886740327	11	~2008
7443469223	14886938447	11	~2008

Exponent	Prime Factor	Dig.	Year
7443978461	59551827689	11	~2010
7444752967	119116047473	12	~2010
7444914359	14889828719	11	~2008
7445231819	14890463639	11	~2008
7445308883	14890617767	11	~2008
7445622599	14891245199	11	~2008
7445725717	44674354303	11	~2009
7445782703	14891565407	11	~2008
7446278053	44677668319	11	~2009
7446641963	14893283927	11	~2008
7446900803	14893801607	11	~2008
7446902941	44681417647	11	~2009
7447432523	14894865047	11	~2008
7448220977	104275093679	12	~2010
7448235299	59585882393	11	~2010
7448909387	193671644063	12	~2011
7449012299	14898024599	11	~2008
7449093257	44694559543	11	~2009
7449157403	14898314807	11	~2008
7449871259	14899742519	11	~2008
7449960293	44699761759	11	~2009
7450180931	14900361863	11	~2008
7450186901	44701121407	11	~2009
7450402277	357619309297	12	~2011
7450412821	163909082063	12	~2011

Exponent	Prime Factor	Dig.	Year
7450559951	14901119903	11	~2008
7450662917	59605303337	11	~2010
7450847741	59606781929	11	~2010
7451298839	14902597679	11	~2008
7451318233	44707909399	11	~2009
7452554663	14905109327	11	~2008
7453125347	59625002777	11	~2010
7453265159	14906530319	11	~2008
7453545959	14907091919	11	~2008
7453779083	14907558167	11	~2008
7453973453	44723840719	11	~2009
7454012647	134172227647	12	~2010
7454164979	14908329959	11	~2008
7454260043	14908520087	11	~2008
7454265671	14908531343	11	~2008
7454770643	14909541287	11	~2008
7454938241	238558023713	12	~2011
7455273641	462226965743	12	~2012
7455356959	74553569591	11	~2010
7456222643	14912445287	11	~2008
7456339117	44738034703	11	~2009
7456746179	14913492359	11	~2008
7456874231	14913748463	11	~2008
7456974697	44741848183	11	~2009
7457001749	59656013993	11	~2010

Exponent	Prime Factor	Dig.	Year
7457035823	14914071647	11	~2008
7457726621	44746359727	11	~2009
7458090011	14916180023	11	~2008
7458376559	14916753119	11	~2008
7458479543	14916959087	11	~2008
7458546479	14917092959	11	~2008
7458710827	134256794887	12	~2010
7458722231	14917444463	11	~2008
7458798701	59670389609	11	~2010
7458970559	14917941119	11	~2008
7459231861	44755391167	11	~2009
7459252033	44755512199	11	~2009
7459285139	14918570279	11	~2008
7459292303	14918584607	11	~2008
7459384043	14918768087	11	~2008
7459575269	104434053767	12	~2010
7459598543	14919197087	11	~2008
7459678741	223790362231	12	~2011
7459744739	14919489479	11	~2008
7459809323	14919618647	11	~2008
7459898947	74598989471	11	~2010
7460000489	59680003913	11	~2010
7460107139	14920214279	11	~2008
7460117891	14920235783	11	~2008
7460239181	59681913449	11	~2010

4.724.182 digits

25-04-13