Small Mersenne Prime Factors (page 4432/5070)

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
17022046991	34044093983	11	~2011
17022450239	34044900479	11	~2011
17022581047	408541945129	12	~2014
17023596599	34047193199	11	~2011
17023770623	34047541247	11	~2011
17024187371	34048374743	11	~2011
17025459131	34050918263	11	~2011
17025841331	34051682663	11	~2011
17025968653	272415498449	12	~2013
17026025063	34052050127	11	~2011
17026842611	34053685223	11	~2011
17027106683	34054213367	11	~2011
17027121623	34054243247	11	~2011
17027237897	136217903177	12	~2012
17027342063	34054684127	11	~2011
17028018463	272448295409	12	~2013
17029031531	34058063063	11	~2011
17029077167	136232617337	12	~2012
17029319123	34058638247	11	~2011
17032784843	34065569687	11	~2011
17032804423	170328044231	12	~2013
17034499259	34068998519	11	~2011
17035480223	34070960447	11	~2011
17036786597	102220719583	12	~2012
17037478019	34074956039	11	~2011

Exponent	Prime Factor	Dig.	Year
17038100531	34076201063	11	~2011
17038438777	102230632663	12	~2012
17038452551	34076905103	11	~2011
17038454483	34076908967	11	~2011
17040041663	34080083327	11	~2011
17040098279	34080196559	11	~2011
17041177019	34082354039	11	~2011
17041846321	102251077927	12	~2012
17043367499	34086734999	11	~2011
17043528731	34087057463	11	~2011
17043565277	136348522217	12	~2012
17043603803	34087207607	11	~2011
17043764483	34087528967	11	~2011
17044941997	102269651983	12	~2012
17045816363	34091632727	11	~2011
17045892793	102275356759	12	~2012
17045986031	34091972063	11	~2011
17047563083	34095126167	11	~2011
17048224691	136385797529	12	~2012
17049463859	34098927719	11	~2011
17049898751	1053...428119	14	2023
17050164011	34100328023	11	~2011
17051123543	34102247087	11	~2011
17052813311	34105626623	11	~2011
17053026671	34106053343	11	~2011

Exponent	Prime Factor	Dig.	Year
17053340831	34106681663	11	~2011
17053768211	34107536423	11	~2011
17054709571	170547095711	12	~2013
17056472711	34112945423	11	~2011
17056958183	34113916367	11	~2011
17057176583	34114353167	11	~2011
17058133487	136465067897	12	~2012
17059033031	34118066063	11	~2011
17059371031	170593710311	12	~2013
17059427303	34118854607	11	~2011
17059478363	34118956727	11	~2011
17060968937	102365813623	12	~2012
17061071903	34122143807	11	~2011
17061883259	34123766519	11	~2011
17061924851	34123849703	11	~2011
17062622303	34125244607	11	~2011
17062717151	34125434303	11	~2011
17063801159	34127602319	11	~2011
17063863571	34127727143	11	~2011
17064223919	34128447839	11	~2011
17064471773	102386830639	12	~2012
17064588263	34129176527	11	~2011
17065344899	136522759193	12	~2012
17065748321	102394489927	12	~2012
17065820363	34131640727	11	~2011

Exponent	Prime Factor	Dig.	Year
17066570519	34133141039	11	~2011
17067824363	34135648727	11	~2011
17068704209	136549633673	12	~2012
17068868891	34137737783	11	~2011
17069746943	34139493887	11	~2011
17069777603	34139555207	11	~2011
17070245891	34140491783	11	~2011
17071122737	409706945689	12	~2014
17071687439	34143374879	11	~2011
17071738679	34143477359	11	~2011
17071921631	34143843263	11	~2011
17072991959	136583935673	12	~2012
17073121463	34146242927	11	~2011
17074858211	34149716423	11	~2011
17075045639	34150091279	11	~2011
17075746463	34151492927	11	~2011
17076301871	34152603743	11	~2011
17076460811	34152921623	11	~2011
17077064897	102462389383	12	~2012
17078403257	102470419543	12	~2012
17078500391	34157000783	11	~2011
17078802263	34157604527	11	~2011
17079042203	34158084407	11	~2011
17079060899	34158121799	11	~2011
17079334157	239110678199	12	~2013

4.768.925 digits

25-05-04