Small Mersenne Prime Factors (page 4378/5025)

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
15897155471	31794310943	11	~2011
15897210503	31794421007	11	~2011
15897411119	31794822239	11	~2011
15897728771	31795457543	11	~2011
15898192769	127185542153	12	~2012
15898979639	31797959279	11	~2011
15899383403	31798766807	11	~2011
15899562361	95397374167	11	~2012
15899982911	31799965823	11	~2011
15900035951	31800071903	11	~2011
15901178617	95407071703	11	~2012
15901331581	95407989487	11	~2012
15901352167	286224339007	12	~2013
15902802283	159028022831	12	~2012
15902937383	31805874767	11	~2011
15903337379	31806674759	11	~2011
15904337759	31808675519	11	~2011
15905205857	95431235143	11	~2012
15905680943	31811361887	11	~2011
15906031931	31812063863	11	~2011
15906313463	31812626927	11	~2011
15906342719	127250741753	12	~2012
15906398411	31812796823	11	~2011
15906986933	477209607991	12	~2014
15906993433	95441960599	11	~2012

Exponent	Prime Factor	Dig.	Year
15907405103	31814810207	11	~2011
15908377139	31816754279	11	~2011
15908387399	31816774799	11	~2011
15908715059	31817430119	11	~2011
15910476863	31820953727	11	~2011
15911117219	127288937753	12	~2012
15911163701	2367...587089	14	2023
15911522821	95469136927	11	~2012
15912076919	31824153839	11	~2011
15912426443	31824852887	11	~2011
15913786571	31827573143	11	~2011
15913789163	31827578327	11	~2011
15914489579	127315916633	12	~2012
15914612347	159146123471	12	~2012
15914850863	31829701727	11	~2011
15915219113	95491314679	11	~2012
15915569699	31831139399	11	~2011
15916082243	31832164487	11	~2011
15917094839	31834189679	11	~2011
15917184131	31834368263	11	~2011
15918279803	31836559607	11	~2011
15918418331	31836836663	11	~2011
15918768143	31837536287	11	~2011
15918953903	31837907807	11	~2011
15919341023	31838682047	11	~2011

Exponent	Prime Factor	Dig.	Year
15919733099	31839466199	11	~2011
15920058041	95520348247	11	~2012
15920310313	95521861879	11	~2012
15920799179	31841598359	11	~2011
15920889983	31841779967	11	~2011
15922408031	31844816063	11	~2011
15923746577	95542479463	11	~2012
15923829371	31847658743	11	~2011
15923922037	254782752593	12	~2013
15923944343	31847888687	11	~2011
15924114539	31848229079	11	~2011
15926212537	95557275223	11	~2012
15926298803	31852597607	11	~2011
15928118231	127424945849	12	~2012
15928221017	127425768137	12	~2012
15928235699	31856471399	11	~2011
15928352711	31856705423	11	~2011
15928944131	31857888263	11	~2011
15929231881	95575391287	11	~2012
15930221089	637208843561	12	~2014
15931058483	31862116967	11	~2011
15931165259	127449322073	12	~2012
15931207169	127449657353	12	~2012
15932716223	31865432447	11	~2011
15933157663	541727360543	12	~2014

Exponent	Prime Factor	Dig.	Year
15933167963	31866335927	11	~2011
15934546031	31869092063	11	~2011
15934921823	414307967399	12	~2013
15935201077	95611206463	11	~2012
15936982931	31873965863	11	~2011
15937444619	31874889239	11	~2011
15937779461	95626676767	11	~2012
15937876631	31875753263	11	~2011
15938108951	31876217903	11	~2011
15938502731	31877005463	11	~2011
15940274771	31880549543	11	~2011
15940573091	31881146183	11	~2011
15940745399	31881490799	11	~2011
15940876751	31881753503	11	~2011
15941626861	95649761167	11	~2012
15942615541	95655693247	11	~2012
15943119011	31886238023	11	~2011
15944005019	31888010039	11	~2011
15946164011	31892328023	11	~2011
15948431581	95690589487	11	~2012
15948502781	127588022249	12	~2012
15948993001	95693958007	11	~2012
15949388783	31898777567	11	~2011
15949618511	31899237023	11	~2011
15949860743	31899721487	11	~2011

4.724.182 digits

25-04-13