Small Mersenne Prime Factors (page 4798/4980)

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
114601926539	229203853079	12	~2017
114610227923	229220455847	12	~2017
114615571331	229231142663	12	~2017
114635356441	687812138647	12	~2019
114636353939	229272707879	12	~2017
114640772863	2866...215751	14	2024
114643248683	229286497367	12	~2017
114658083521	687948501127	12	~2019
114670814243	229341628487	12	~2017
114671799491	229343598983	12	~2017
114677065403	229354130807	12	~2017
114685259543	229370519087	12	~2017
114686138993	688116833959	12	~2019
114690216419	229380432839	12	~2017
114697828997	688186973983	12	~2019
114697931113	688187586679	12	~2019
114699673139	229399346279	12	~2017
114710894999	229421789999	12	~2017
114715964171	229431928343	12	~2017
114722685911	229445371823	12	~2017
114736106363	229472212727	12	~2017
114748337939	229496675879	12	~2017
114759650413	688557902479	12	~2019
114766381643	229532763287	12	~2017
114766881373	688601288239	12	~2019

Exponent	Prime Factor	Dig.	Year
114786247571	229572495143	12	~2017
114795397763	229590795527	12	~2017
114810576971	229621153943	12	~2017
114812332391	229624664783	12	~2017
114818190983	229636381967	12	~2017
114821032517	5327...087889	14	2024
114823980899	229647961799	12	~2017
114833914277	689003485663	12	~2019
114839983991	229679967983	12	~2017
114845582399	229691164799	12	~2017
114856159991	229712319983	12	~2017
114856745483	229713490967	12	~2017
114857570819	229715141639	12	~2017
114869112731	229738225463	12	~2017
114869768243	229739536487	12	~2017
114870741179	229741482359	12	~2017
114870775031	229741550063	12	~2017
114872304779	229744609559	12	~2017
114876594251	229753188503	12	~2017
114878221343	229756442687	12	~2017
114878904719	229757809439	12	~2017
114883246757	689299480543	12	~2019
114883458479	229766916959	12	~2017
114884053283	229768106567	12	~2017
114884375279	229768750559	12	~2017

Exponent	Prime Factor	Dig.	Year
114885381113	689312286679	12	~2019
114894737423	229789474847	12	~2017
114899378411	229798756823	12	~2017
114904382497	689426294983	12	~2019
114905748803	229811497607	12	~2017
114909658163	229819316327	12	~2017
114909663299	229819326599	12	~2017
114932867723	229865735447	12	~2017
114938682191	229877364383	12	~2017
114940887683	229881775367	12	~2017
114943763663	229887527327	12	~2017
114949678673	689698072039	12	~2019
114953186123	229906372247	12	~2017
114972295237	689833771423	12	~2019
114975416411	229950832823	12	~2017
114985178333	689911069999	12	~2019
114990346979	229980693959	12	~2017
114995779867	1011...282961	15	2024
115016478743	230032957487	12	~2017
115017663311	230035326623	12	~2017
115019023919	230038047839	12	~2017
115027852223	230055704447	12	~2017
115042635563	230085271127	12	~2017
115042825211	230085650423	12	~2017
115043746439	230087492879	12	~2017

Exponent	Prime Factor	Dig.	Year
115051742339	230103484679	12	~2017
115055176391	230110352783	12	~2017
115055920823	230111841647	12	~2017
115058390171	230116780343	12	~2017
115065375179	230130750359	12	~2017
115065583943	230131167887	12	~2017
115086427199	230172854399	12	~2017
115102713023	230205426047	12	~2017
115105170143	230210340287	12	~2017
115107295993	690643775959	12	~2019
115108360859	230216721719	12	~2017
115110397163	230220794327	12	~2017
115115078341	690690470047	12	~2019
115123999513	690743997079	12	~2019
115131138071	230262276143	12	~2017
115138909631	230277819263	12	~2017
115140465983	230280931967	12	~2017
115148679203	230297358407	12	~2017
115149692351	230299384703	12	~2017
115159156631	230318313263	12	~2017
115174663511	230349327023	12	~2017
115177499819	230354999639	12	~2017
115179021059	230358042119	12	~2017
115182076631	230364153263	12	~2017
115203396323	230406792647	12	~2017

4.679.597 digits

25-03-23