Small Mersenne Prime Factors (page 5275/5670)

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
62211437663	124422875327	12	~2015
62211709379	124423418759	12	~2015
62214059051	124428118103	12	~2015
62216491559	124432983119	12	~2015
62222593379	124445186759	12	~2015
62222742443	124445484887	12	~2015
62224534111	622245341111	12	~2017
62226728857	373360373143	12	~2017
62227655111	124455310223	12	~2015
62230418231	124460836463	12	~2015
62231729641	373390377847	12	~2017
62233241243	124466482487	12	~2015
62236035419	124472070839	12	~2015
62238258191	124476516383	12	~2015
62242330823	124484661647	12	~2015
62245529657	373473177943	12	~2017
62246567609	497972540873	12	~2017
62247875531	124495751063	12	~2015
62250769811	124501539623	12	~2015
62251633211	124503266423	12	~2015
62253250583	124506501167	12	~2015
62254736477	498037891817	12	~2017
62256205079	124512410159	12	~2015
62259417971	124518835943	12	~2015
62262506533	373575039199	12	~2017

Exponent	Prime Factor	Dig.	Year
62272074503	124544149007	12	~2015
62274190019	124548380039	12	~2015
62274664943	124549329887	12	~2015
62274995351	124549990703	12	~2015
62275192139	124550384279	12	~2015
62275779073	373654674439	12	~2017
62279377541	373676265247	12	~2017
62281969091	124563938183	12	~2015
62282695511	124565391023	12	~2015
62282921237	498263369897	12	~2017
62283125111	124566250223	12	~2015
62283753011	124567506023	12	~2015
62283811679	124567623359	12	~2015
62283897779	124567795559	12	~2015
62287523159	124575046319	12	~2015
62288174159	124576348319	12	~2015
62291181131	124582362263	12	~2015
62293916879	124587833759	12	~2015
62296964003	124593928007	12	~2015
62297582111	124595164223	12	~2015
62301925979	124603851959	12	~2015
62302153883	124604307767	12	~2015
62302203797	498417630377	12	~2017
62305361099	124610722199	12	~2015
62310139319	124620278639	12	~2015

Exponent	Prime Factor	Dig.	Year
62310141059	124620282119	12	~2015
62316456551	124632913103	12	~2015
62319043043	124638086087	12	~2015
62319545063	124639090127	12	~2015
62334697679	124669395359	12	~2015
62337357119	124674714239	12	~2015
62338040543	124676081087	12	~2015
62338989059	124677978119	12	~2015
62341219799	124682439599	12	~2015
62342582501	498740660009	12	~2017
62342869807	623428698071	12	~2017
62343323941	1783...647127	14	2024
62344571543	124689143087	12	~2015
62350173443	124700346887	12	~2015
62350905821	498807246569	12	~2017
62352878639	124705757279	12	~2015
62359719431	124719438863	12	~2015
62372346643	2806...989351	14	2023
62373426491	124746852983	12	~2015
62375792579	124751585159	12	~2015
62375973839	124751947679	12	~2015
62376026711	499008213689	12	~2017
62376379337	374258276023	12	~2017
62377040003	124754080007	12	~2015
62378302559	124756605119	12	~2015

Exponent	Prime Factor	Dig.	Year
62378706947	4453...760159	14	2024
62378856013	374273136079	12	~2017
62381617999	623816179991	12	~2017
62382191939	124764383879	12	~2015
62382483659	124764967319	12	~2015
62382815639	124765631279	12	~2015
62383478051	124766956103	12	~2015
62384114099	124768228199	12	~2015
62385736121	374314416727	12	~2017
62387584823	124775169647	12	~2015
62393657917	374361947503	12	~2017
62393959633	374363757799	12	~2017
62394318341	499154546729	12	~2017
62394993371	124789986743	12	~2015
62396407091	124792814183	12	~2015
62396660699	124793321399	12	~2015
62402141831	124804283663	12	~2015
62403381923	124806763847	12	~2015
62404470001	374426820007	12	~2017
62407816151	124815632303	12	~2015
62412147443	124824294887	12	~2015
62414071117	374484426703	12	~2017
62421252611	124842505223	12	~2015
62422780151	124845560303	12	~2015
62424813131	124849626263	12	~2015

5.366.787 digits

26-02-08