Small Mersenne Prime Factors (page 4654/5025)

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
47213843459	94427686919	11	~2014
47216899643	94433799287	11	~2014
47218487531	94436975063	11	~2014
47219173679	94438347359	11	~2014
47221009883	94442019767	11	~2014
47221570313	661101984383	12	~2016
47223365639	94446731279	11	~2014
47225263181	283351579087	12	~2016
47227950383	94455900767	11	~2014
47230601003	94461202007	11	~2014
47231605139	94463210279	11	~2014
47232456059	94464912119	11	~2014
47234983297	283409899783	12	~2016
47236017299	94472034599	11	~2014
47239681031	94479362063	11	~2014
47240321543	94480643087	11	~2014
47240989513	283445937079	12	~2016
47248172473	283489034839	12	~2016
47249298359	94498596719	11	~2014
47249502323	94499004647	11	~2014
47250843187	756013490993	12	~2017
47250878303	94501756607	11	~2014
47251630319	94503260639	11	~2014
47253954479	94507908959	11	~2014
47264914721	283589488327	12	~2016

Exponent	Prime Factor	Dig.	Year
47265433561	283592601367	12	~2016
47266690703	94533381407	11	~2014
47266920023	94533840047	11	~2014
47270196247	756323139953	12	~2017
47276775523	472767755231	12	~2016
47282261969	378258095753	12	~2016
47284379783	94568759567	11	~2014
47285133359	94570266719	11	~2014
47287397711	94574795423	11	~2014
47288607059	94577214119	11	~2014
47291674439	94583348879	11	~2014
47297085239	94594170479	11	~2014
47299432643	94598865287	11	~2014
47304167639	94608335279	11	~2014
47305807463	94611614927	11	~2014
47307990077	283847940463	12	~2016
47308830119	94617660239	11	~2014
47309875919	94619751839	11	~2014
47318370191	94636740383	11	~2014
47319155341	283914932047	12	~2016
47319586423	757113382769	12	~2017
47322724343	94645448687	11	~2014
47326066631	94652133263	11	~2014
47329789693	283978738159	12	~2016
47330669279	94661338559	11	~2014

Exponent	Prime Factor	Dig.	Year
47332343963	94664687927	11	~2014
47333009903	94666019807	11	~2014
47336159471	94672318943	11	~2014
47338716959	94677433919	11	~2014
47341771091	94683542183	11	~2014
47342252459	94684504919	11	~2014
47343653711	94687307423	11	~2014
47347374673	284084248039	12	~2016
47351236981	284107421887	12	~2016
47352383411	94704766823	11	~2014
47353764119	94707528239	11	~2014
47355454961	284132729767	12	~2016
47356066463	94712132927	11	~2014
47357649257	378861194057	12	~2016
47358562703	94717125407	11	~2014
47360610043	473606100431	12	~2016
47362492403	94724984807	11	~2014
47363006819	94726013639	11	~2014
47366402819	94732805639	11	~2014
47367723251	94735446503	11	~2014
47368959779	94737919559	11	~2014
47369200451	94738400903	11	~2014
47374051859	4064...495023	14	2023
47374187177	1544...019703	14	2023
47376126353	284256758119	12	~2016

Exponent	Prime Factor	Dig.	Year
47380693141	758091090257	12	~2017
47383383053	284300298319	12	~2016
47385067319	94770134639	11	~2014
47385809423	94771618847	11	~2014
47394591259	473945912591	12	~2016
47395142891	94790285783	11	~2014
47398271111	94796542223	11	~2014
47398503359	94797006719	11	~2014
47406547823	94813095647	11	~2014
47407293121	284443758727	12	~2016
47411456831	94822913663	11	~2014
47412857543	94825715087	11	~2014
47414276593	284485659559	12	~2016
47418220001	379345760009	12	~2016
47421869471	94843738943	11	~2014
47422352693	284534116159	12	~2016
47422881911	94845763823	11	~2014
47424559321	284547355927	12	~2016
47428536983	94857073967	11	~2014
47429935081	284579610487	12	~2016
47431911673	284591470039	12	~2016
47433069683	94866139367	11	~2014
47434997101	284609982607	12	~2016
47435835851	94871671703	11	~2014
47438817697	284632906183	12	~2016

4.724.182 digits

25-04-13