Small Mersenne Prime Factors (page 4522/5025)

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
27240244403	54480488807	11	~2013
27241000019	54482000039	11	~2013
27241860011	54483720023	11	~2013
27242506139	54485012279	11	~2013
27242726663	54485453327	11	~2013
27244695503	54489391007	11	~2013
27244882351	490407882319	12	~2015
27246666827	7394...768479	14	2023
27249377339	217995018713	12	~2014
27249552419	54499104839	11	~2013
27249668711	54499337423	11	~2013
27251048711	54502097423	11	~2013
27252593591	54505187183	11	~2013
27254068871	54508137743	11	~2013
27254596799	218036774393	12	~2014
27255345127	272553451271	12	~2014
27257297917	163543787503	12	~2014
27257421959	54514843919	11	~2013
27258171131	54516342263	11	~2013
27258572111	54517144223	11	~2013
27261360239	54522720479	11	~2013
27262169999	54524339999	11	~2013
27263357701	163580146207	12	~2014
27266381771	54532763543	11	~2013
27271740401	163630442407	12	~2014

Exponent	Prime Factor	Dig.	Year
27277242803	54554485607	11	~2013
27277826783	54555653567	11	~2013
27284672531	54569345063	11	~2013
27286591517	218292732137	12	~2014
27286665559	272866655591	12	~2014
27286744993	163720469959	12	~2014
27287684003	54575368007	11	~2013
27288624659	54577249319	11	~2013
27289186163	54578372327	11	~2013
27291112703	54582225407	11	~2013
27293275739	54586551479	11	~2013
27293590931	54587181863	11	~2013
27294183551	54588367103	11	~2013
27294380237	218355041897	12	~2014
27294734437	163768406623	12	~2014
27296448449	218371587593	12	~2014
27296787659	54593575319	11	~2013
27297505853	163785035119	12	~2014
27297992713	163787956279	12	~2014
27299745659	54599491319	11	~2013
27299960761	163799764567	12	~2014
27300532151	54601064303	11	~2013
27301810531	436828968497	12	~2015
27303081023	54606162047	11	~2013
27303843431	54607686863	11	~2013

Exponent	Prime Factor	Dig.	Year
27304687211	54609374423	11	~2013
27305838971	54611677943	11	~2013
27307138571	54614277143	11	~2013
27308572283	54617144567	11	~2013
27310064891	54620129783	11	~2013
27311126039	54622252079	11	~2013
27311215931	54622431863	11	~2013
27311346371	54622692743	11	~2013
27311555267	218492442137	12	~2014
27313288679	54626577359	11	~2013
27314313479	54628626959	11	~2013
27315455171	54630910343	11	~2013
27316321583	54632643167	11	~2013
27316421123	54632842247	11	~2013
27317980229	218543841833	12	~2014
27318142561	163908855367	12	~2014
27318146467	273181464671	12	~2014
27318322373	163909934239	12	~2014
27318818531	54637637063	11	~2013
27319036541	163914219247	12	~2014
27320333297	163921999783	12	~2014
27320439383	54640878767	11	~2013
27320764781	218566118249	12	~2014
27323265089	218586120713	12	~2014
27323640143	54647280287	11	~2013

Exponent	Prime Factor	Dig.	Year
27323865733	163943194399	12	~2014
27324031367	218592250937	12	~2014
27325303451	218602427609	12	~2014
27325996091	54651992183	11	~2013
27326649197	218613193577	12	~2014
27327408541	163964451247	12	~2014
27328078691	54656157383	11	~2013
27329188553	163975131319	12	~2014
27329797931	54659595863	11	~2013
27331321397	163987928383	12	~2014
27334188083	54668376167	11	~2013
27339007343	54678014687	11	~2013
27339457727	492110239087	12	~2015
27339671327	710831454503	12	~2015
27339815579	54679631159	11	~2013
27339843743	54679687487	11	~2013
27340215347	218721722777	12	~2014
27340683173	164044099039	12	~2014
27341263343	54682526687	11	~2013
27341525231	54683050463	11	~2013
27342447383	54684894767	11	~2013
27342461183	54684922367	11	~2013
27344171411	54688342823	11	~2013
27345307739	54690615479	11	~2013
27345536893	164073221359	12	~2014

4.724.182 digits

25-04-13