Small Mersenne Prime Factors (page 5539/5745)

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
142731854981	856391129887	12	~2019
142734640259	285469280519	12	~2018
142750450631	285500901263	12	~2018
142753518839	285507037679	12	~2018
142753659311	285507318623	12	~2018
142756126979	285512253959	12	~2018
142766211239	285532422479	12	~2018
142775043899	285550087799	12	~2018
142783884359	285567768719	12	~2018
142787705603	285575411207	12	~2018
142793135279	285586270559	12	~2018
142805548019	285611096039	12	~2018
142808015543	285616031087	12	~2018
142828036441	3656...328897	14	2024
142829646131	285659292263	12	~2018
142836817031	285673634063	12	~2018
142837326419	285674652839	12	~2018
142850597231	285701194463	12	~2018
142853946503	285707893007	12	~2018
142854963791	285709927583	12	~2018
142863481823	285726963647	12	~2018
142875962423	285751924847	12	~2018
142883581331	285767162663	12	~2018
142885745593	857314473559	12	~2019
142894753583	285789507167	12	~2018

Exponent	Prime Factor	Dig.	Year
142905218411	285810436823	12	~2018
142906137197	857436823183	12	~2019
142914755051	285829510103	12	~2018
142920272123	285840544247	12	~2018
142927301173	2629...415833	14	2024
142933055123	285866110247	12	~2018
142934724173	857608345039	12	~2019
142942065971	285884131943	12	~2018
142943096039	285886192079	12	~2018
142965977243	285931954487	12	~2018
142967183081	857803098487	12	~2019
142973127383	285946254767	12	~2018
142973615303	285947230607	12	~2018
142982394959	285964789919	12	~2018
142982502541	857895015247	12	~2019
142991667431	285983334863	12	~2018
142992341039	285984682079	12	~2018
143010659591	286021319183	12	~2018
143029416599	286058833199	12	~2018
143029829381	858178976287	12	~2019
143031523763	286063047527	12	~2018
143032323251	286064646503	12	~2018
143037494111	286074988223	12	~2018
143066522171	286133044343	12	~2018
143067559259	286135118519	12	~2018

Exponent	Prime Factor	Dig.	Year
143068475783	286136951567	12	~2018
143074632731	286149265463	12	~2018
143076548999	286153097999	12	~2018
143083523039	286167046079	12	~2018
143083997159	2395...433647	17	2023
143085752879	286171505759	12	~2018
143120872523	286241745047	12	~2018
143124364451	286248728903	12	~2018
143133084551	286266169103	12	~2018
143137204943	286274409887	12	~2018
143137783331	286275566663	12	~2018
143163332903	2519...590929	14	2024
143168996111	286337992223	12	~2018
143173661723	286347323447	12	~2018
143175978277	6958...442623	14	2026
143180234591	286360469183	12	~2018
143184808883	286369617767	12	~2018
143189625503	286379251007	12	~2018
143190539003	286381078007	12	~2018
143196572063	286393144127	12	~2018
143196733859	286393467719	12	~2018
143197943831	286395887663	12	~2018
143198663963	286397327927	12	~2018
143203150319	286406300639	12	~2018
143207446331	286414892663	12	~2018

Exponent	Prime Factor	Dig.	Year
143222576153	859335456919	12	~2019
143225683319	286451366639	12	~2018
143226743963	286453487927	12	~2018
143229685019	286459370039	12	~2018
143254622039	286509244079	12	~2018
143260486043	1103...253111	15	2025
143264714233	1461...851767	14	2024
143276610913	859659665479	12	~2019
143283386621	859700319727	12	~2019
143299551203	286599102407	12	~2018
143300900161	859805400967	12	~2019
143300983103	286601966207	12	~2018
143301485423	286602970847	12	~2018
143302015433	859812092599	12	~2019
143304608483	286609216967	12	~2018
143322010703	286644021407	12	~2018
143332657943	286665315887	12	~2018
143365705823	286731411647	12	~2018
143366739371	286733478743	12	~2018
143370974963	286741949927	12	~2018
143376519791	286753039583	12	~2018
143381364683	286762729367	12	~2018
143381542163	286763084327	12	~2018
143393534159	286787068319	12	~2018
143395051979	286790103959	12	~2018

5.441.361 digits

26-03-15