Small Mersenne Prime Factors (page 4586/5235)

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
18450964507	184509645071	12	~2013
18451137311	36902274623	11	~2011
18452013959	774984586279	12	~2014
18452073131	36904146263	11	~2011
18452250863	36904501727	11	~2011
18452282351	36904564703	11	~2011
18452724299	36905448599	11	~2011
18453659963	36907319927	11	~2011
18453968999	36907937999	11	~2011
18454603411	184546034111	12	~2013
18455281963	184552819631	12	~2013
18455730539	36911461079	11	~2011
18456386401	110738318407	12	~2012
18456510203	36913020407	11	~2011
18456728519	36913457039	11	~2011
18457958297	147663666377	12	~2013
18458634011	36917268023	11	~2011
18458679059	36917358119	11	~2011
18459024119	36918048239	11	~2011
18459223283	36918446567	11	~2011
18459471851	36918943703	11	~2011
18459637369	553789121071	12	~2014
18461798279	36923596559	11	~2011
18465479771	36930959543	11	~2011
18467062561	110802375367	12	~2012

Exponent	Prime Factor	Dig.	Year
18467454251	36934908503	11	~2011
18468070403	36936140807	11	~2011
18468119783	36936239567	11	~2011
18469769291	36939538583	11	~2011
18471129959	36942259919	11	~2011
18471296183	36942592367	11	~2011
18471453941	110828723647	12	~2012
18473088923	36946177847	11	~2011
18474176113	443380226713	12	~2014
18475221203	36950442407	11	~2011
18475259051	36950518103	11	~2011
18476042951	36952085903	11	~2011
18477579863	36955159727	11	~2011
18477780719	36955561439	11	~2011
18478042553	110868255319	12	~2012
18478709917	110872259503	12	~2012
18479828519	36959657039	11	~2011
18479864633	110879187799	12	~2012
18480004619	36960009239	11	~2011
18480176651	36960353303	11	~2011
18481347121	110888082727	12	~2012
18481883279	36963766559	11	~2011
18482203867	295715261873	12	~2013
18483510293	110901061759	12	~2012
18484217729	258779048207	12	~2013

Exponent	Prime Factor	Dig.	Year
18484573379	36969146759	11	~2011
18485369723	36970739447	11	~2011
18485550637	295768810193	12	~2013
18486833363	36973666727	11	~2011
18486856919	36973713839	11	~2011
18486863123	36973726247	11	~2011
18486917011	184869170111	12	~2013
18487145903	36974291807	11	~2011
18488034197	147904273577	12	~2013
18489314999	36978629999	11	~2011
18489374041	110936244247	12	~2012
18489397637	147915181097	12	~2013
18489607943	36979215887	11	~2011
18489845219	36979690439	11	~2011
18491886779	36983773559	11	~2011
18492261503	36984523007	11	~2011
18492538739	332865697303	12	~2014
18493269191	36986538383	11	~2011
18493329611	147946636889	12	~2013
18496202171	36992404343	11	~2011
18496600091	591891202913	12	~2014
18498108851	36996217703	11	~2011
18499073783	36998147567	11	~2011
18501668831	148013350649	12	~2013
18502260841	407049738503	12	~2014

Exponent	Prime Factor	Dig.	Year
18502721383	296043542129	12	~2013
18503762099	37007524199	11	~2011
18505202879	37010405759	11	~2011
18505416731	37010833463	11	~2011
18508553753	111051322519	12	~2012
18509028539	148072228313	12	~2013
18509816657	111058899943	12	~2012
18510895297	111065371783	12	~2012
18510925157	148087401257	12	~2013
18511662809	148093302473	12	~2013
18511897223	37023794447	11	~2011
18512384027	148099072217	12	~2013
18512410013	444297840313	12	~2014
18512732717	148101861737	12	~2013
18512864423	37025728847	11	~2011
18512875103	37025750207	11	~2011
18513981803	37027963607	11	~2011
18514053667	185140536671	12	~2013
18514595573	111087573439	12	~2012
18516260291	37032520583	11	~2011
18516628451	37033256903	11	~2011
18516808139	148134465113	12	~2013
18516992771	37033985543	11	~2011
18518912717	148151301737	12	~2013
18519718541	148157748329	12	~2013

4.933.056 digits

25-07-20