Small Mersenne Prime Factors (page 4590/5490)

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
9829269311	19658538623	11	~2009
9829318931	19658637863	11	~2009
9829515431	19659030863	11	~2009
9830022569	137620315967	12	~2011
9830392163	19660784327	11	~2009
9830687063	19661374127	11	~2009
9831143237	58986859423	11	~2010
9831275873	58987655239	11	~2010
9831818723	19663637447	11	~2009
9832737683	412974982687	12	~2012
9832809257	58996855543	11	~2010
9832887563	19665775127	11	~2009
9833038001	78664304009	11	~2011
9834510299	19669020599	11	~2009
9834695747	78677565977	11	~2011
9834779291	19669558583	11	~2009
9834946151	19669892303	11	~2009
9834962591	19669925183	11	~2009
9834971099	78679768793	11	~2011
9835174799	19670349599	11	~2009
9835332761	59011996567	11	~2010
9835578299	19671156599	11	~2009
9836128391	19672256783	11	~2009
9836461571	19672923143	11	~2009
9836894051	19673788103	11	~2009

Exponent	Prime Factor	Dig.	Year
9837172343	19674344687	11	~2009
9837305519	19674611039	11	~2009
9837922379	19675844759	11	~2009
9837969983	19675939967	11	~2009
9838016819	19676033639	11	~2009
9838356491	19676712983	11	~2009
9839037431	19678074863	11	~2009
9839095081	59034570487	11	~2010
9839187073	59035122439	11	~2010
9839214571	98392145711	11	~2011
9839231243	19678462487	11	~2009
9839348063	19678696127	11	~2009
9839524631	19679049263	11	~2009
9839578559	19679157119	11	~2009
9839727479	19679454959	11	~2009
9840646223	19681292447	11	~2009
9841006157	59046036943	11	~2010
9841008239	19682016479	11	~2009
9841120253	59046721519	11	~2010
9841500491	19683000983	11	~2009
9841591477	59049548863	11	~2010
9842046163	334629569543	12	~2012
9842788051	157484608817	12	~2011
9843740051	19687480103	11	~2009
9843830159	19687660319	11	~2009

Exponent	Prime Factor	Dig.	Year
9844611323	19689222647	11	~2009
9845223299	19690446599	11	~2009
9845402711	19690805423	11	~2009
9846153503	19692307007	11	~2009
9846531011	19693062023	11	~2009
9846759971	19693519943	11	~2009
9847016027	78776128217	11	~2011
9847047233	59082283399	11	~2010
9847109641	59082657847	11	~2010
9847753753	59086522519	11	~2010
9847816523	19695633047	11	~2009
9848484323	19696968647	11	~2009
9848549759	19697099519	11	~2009
9848645483	19697290967	11	~2009
9848846519	78790772153	11	~2011
9849053647	98490536471	11	~2011
9849553391	19699106783	11	~2009
9849795239	19699590479	11	~2009
9849920471	19699840943	11	~2009
9849998369	137899977167	12	~2011
9850197251	19700394503	11	~2009
9850549391	19701098783	11	~2009
9851180411	19702360823	11	~2009
9851602199	19703204399	11	~2009
9851852141	59111112847	11	~2010

Exponent	Prime Factor	Dig.	Year
9852004769	78816038153	11	~2011
9852236657	59113419943	11	~2010
9852510637	59115063823	11	~2010
9852758029	394110321161	12	~2012
9852895823	19705791647	11	~2009
9852926651	19705853303	11	~2009
9852993131	19705986263	11	~2009
9853732403	19707464807	11	~2009
9853741343	19707482687	11	~2009
9854429293	59126575759	11	~2010
9854756123	19709512247	11	~2009
9854772359	78838178873	11	~2011
9855074951	19710149903	11	~2009
9856268537	59137611223	11	~2010
9856425167	78851401337	11	~2011
9856435331	19712870663	11	~2009
9856800599	19713601199	11	~2009
9856901777	137996624879	12	~2011
9857313419	19714626839	11	~2009
9857547923	19715095847	11	~2009
9857968019	19715936039	11	~2009
9858025897	59148155383	11	~2010
9858785837	59152715023	11	~2010
9858796679	19717593359	11	~2009
9859146197	78873169577	11	~2011

5.187.277 digits

25-11-17