Small Mersenne Prime Factors (page 4750/5025)

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
72886432447	728864324471	12	~2018
72890943623	145781887247	12	~2016
72891734471	583133875769	12	~2017
72895007351	145790014703	12	~2016
72896415407	583171323257	12	~2017
72898373771	145796747543	12	~2016
72909104459	145818208919	12	~2016
72913718257	437482309543	12	~2017
72914045003	145828090007	12	~2016
72917445539	145834891079	12	~2016
72925916291	145851832583	12	~2016
72928446581	437570679487	12	~2017
72928830133	437572980799	12	~2017
72931152071	145862304143	12	~2016
72932558261	583460466089	12	~2017
72945703619	145891407239	12	~2016
72953914031	145907828063	12	~2016
72956428469	583651427753	12	~2017
72958494341	583667954729	12	~2017
72959872103	145919744207	12	~2016
72965162051	145930324103	12	~2016
72968804231	145937608463	12	~2016
72971366791	729713667911	12	~2018
72972024899	145944049799	12	~2016
72972990743	145945981487	12	~2016

Exponent	Prime Factor	Dig.	Year
72973388783	145946777567	12	~2016
72981136199	145962272399	12	~2016
72985808711	145971617423	12	~2016
72986037959	145972075919	12	~2016
72992671679	145985343359	12	~2016
72993855589	5240...312903	14	2024
72994649243	145989298487	12	~2016
73000877069	584007016553	12	~2017
73002982763	146005965527	12	~2016
73003675681	438022054087	12	~2017
73003945463	146007890927	12	~2016
73015456463	146030912927	12	~2016
73015851539	146031703079	12	~2016
73017879923	146035759847	12	~2016
73018234277	2453...717073	14	2023
73020348119	146040696239	12	~2016
73023101471	146046202943	12	~2016
73041404783	146082809567	12	~2016
73044042173	438264253039	12	~2017
73044836939	146089673879	12	~2016
73049130137	438294780823	12	~2017
73051919471	146103838943	12	~2016
73054061711	146108123423	12	~2016
73054293857	438325763143	12	~2017
73057326323	146114652647	12	~2016

Exponent	Prime Factor	Dig.	Year
73058729699	146117459399	12	~2016
73058959621	438353757727	12	~2017
73067026223	146134052447	12	~2016
73071038591	146142077183	12	~2016
73072142519	146144285039	12	~2016
73072625233	438435751399	12	~2017
73076875691	146153751383	12	~2016
73079963653	4852...865593	14	2024
73093483741	438560902447	12	~2017
73098203351	146196406703	12	~2016
73102992967	731029929671	12	~2018
73105710239	146211420479	12	~2016
73112126183	146224252367	12	~2016
73117015877	438702095263	12	~2017
73122240011	146244480023	12	~2016
73129422917	585035383337	12	~2017
73133262971	146266525943	12	~2016
73138666717	438832000303	12	~2017
73139325491	146278650983	12	~2016
73139579783	146279159567	12	~2016
73143717539	146287435079	12	~2016
73145066723	146290133447	12	~2016
73150444513	438902667079	12	~2017
73152717899	146305435799	12	~2016
73153374719	146306749439	12	~2016

Exponent	Prime Factor	Dig.	Year
73155274931	585242199449	12	~2017
73161673031	146323346063	12	~2016
73172011079	146344022159	12	~2016
73176382837	439058297023	12	~2017
73177888559	146355777119	12	~2016
73181179451	146362358903	12	~2016
73189209697	439135258183	12	~2017
73201262003	146402524007	12	~2016
73203431183	146406862367	12	~2016
73204789571	146409579143	12	~2016
73205276351	146410552703	12	~2016
73206297383	146412594767	12	~2016
73216805099	146433610199	12	~2016
73221215141	439327290847	12	~2017
73221244559	146442489119	12	~2016
73221814619	146443629239	12	~2016
73224912361	439349474167	12	~2017
73225440479	146450880959	12	~2016
73225737799	732257377991	12	~2018
73228128119	146456256239	12	~2016
73230565619	146461131239	12	~2016
73230970511	146461941023	12	~2016
73238164877	585905319017	12	~2017
73238873171	146477746343	12	~2016
73243321643	146486643287	12	~2016

4.724.182 digits

25-04-13