Small Mersenne Prime Factors (page 4491/5190)

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
14983998979	149839989791	12	~2012
14984718299	29969436599	11	~2010
14984765219	29969530439	11	~2010
14985804083	29971608167	11	~2010
14985874499	29971748999	11	~2010
14986123391	29972246783	11	~2010
14986539779	119892318233	12	~2012
14986733207	119893865657	12	~2012
14987167619	29974335239	11	~2010
14989320119	29978640239	11	~2010
14989527901	89937167407	11	~2012
14989940783	29979881567	11	~2010
14990005229	119920041833	12	~2012
14990337143	29980674287	11	~2010
14990375111	29980750223	11	~2010
14990375657	809480285479	12	~2014
14991125603	29982251207	11	~2010
14991215303	29982430607	11	~2010
14992941539	29985883079	11	~2010
14993929733	209915016263	12	~2013
14994594071	29989188143	11	~2010
14994690479	29989380959	11	~2010
14995243163	29990486327	11	~2010
14995430617	89972583703	11	~2012
14995538639	29991077279	11	~2010

Exponent	Prime Factor	Dig.	Year
14996068463	29992136927	11	~2010
14997327071	29994654143	11	~2010
14998245551	29996491103	11	~2010
14998436363	29996872727	11	~2010
14998638923	29997277847	11	~2010
14998770443	29997540887	11	~2010
14999226839	29998453679	11	~2010
14999654161	329992391543	12	~2013
15000867851	30001735703	11	~2010
15001026307	240016420913	12	~2013
15001174453	240018791249	12	~2013
15001254659	30002509319	11	~2010
15002238473	90013430839	11	~2012
15002840003	30005680007	11	~2010
15003151139	30006302279	11	~2010
15004222319	30008444639	11	~2010
15004630127	360111123049	12	~2013
15004895039	30009790079	11	~2010
15006092663	30012185327	11	~2010
15006603323	30013206647	11	~2010
15006827903	30013655807	11	~2010
15007013111	30014026223	11	~2010
15009689909	120077519273	12	~2012
15010119419	30020238839	11	~2010
15010284683	30020569367	11	~2010

Exponent	Prime Factor	Dig.	Year
15010540253	90063241519	11	~2012
15011528663	30023057327	11	~2010
15012205319	30024410639	11	~2010
15012246107	120097968857	12	~2012
15012614159	30025228319	11	~2010
15013706243	30027412487	11	~2010
15013891031	30027782063	11	~2010
15014187803	30028375607	11	~2010
15014248919	30028497839	11	~2010
15014361539	270258507703	12	~2013
15015148859	30030297719	11	~2010
15015647653	90093885919	11	~2012
15015918131	120127345049	12	~2012
15017020979	30034041959	11	~2010
15017387039	30034774079	11	~2010
15019472483	30038944967	11	~2010
15019490201	120155921609	12	~2012
15019937819	30039875639	11	~2010
15020907779	120167262233	12	~2012
15021050123	30042100247	11	~2010
15021103403	30042206807	11	~2010
15021401891	30042803783	11	~2010
15022559603	30045119207	11	~2010
15023142637	360555423289	12	~2013
15023401331	30046802663	11	~2010

Exponent	Prime Factor	Dig.	Year
15023543471	30047086943	11	~2010
15024631541	120197052329	12	~2012
15025143659	120201149273	12	~2012
15025483873	360611612953	12	~2013
15026176147	150261761471	12	~2012
15026318291	30052636583	11	~2010
15026474591	30052949183	11	~2010
15028821611	30057643223	11	~2010
15029367139	150293671391	12	~2012
15029880961	330657381143	12	~2013
15030107969	120240863753	12	~2012
15030567011	30061134023	11	~2010
15031170851	30062341703	11	~2010
15031698371	30063396743	11	~2010
15031960451	30063920903	11	~2010
15032197931	30064395863	11	~2010
15032972351	30065944703	11	~2010
15033067979	30066135959	11	~2010
15033090851	30066181703	11	~2010
15033877739	30067755479	11	~2010
15034335731	30068671463	11	~2010
15034841617	90209049703	11	~2012
15035899559	30071799119	11	~2010
15035942863	150359428631	12	~2012
15036133583	481156274657	12	~2013

4.888.230 digits

25-06-29