Small Mersenne Prime Factors (page 4904/5025)

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
170799759359	341599518719	12	~2019
170801605379	341603210759	12	~2019
170805190043	341610380087	12	~2019
170806335611	341612671223	12	~2019
170835080159	341670160319	12	~2019
170845385351	341690770703	12	~2019
170845656203	341691312407	12	~2019
170852180951	341704361903	12	~2019
170874393551	341748787103	12	~2019
170888837831	341777675663	12	~2019
170908749551	341817499103	12	~2019
170911221779	341822443559	12	~2019
170918638811	341837277623	12	~2019
170935670291	341871340583	12	~2019
170961534539	341923069079	12	~2019
170962935623	341925871247	12	~2019
170972326991	341944653983	12	~2019
170996768303	341993536607	12	~2019
171004338551	342008677103	12	~2019
171011873531	342023747063	12	~2019
171017214899	342034429799	12	~2019
171019140251	342038280503	12	~2019
171024441851	342048883703	12	~2019
171037665299	342075330599	12	~2019
171047732039	342095464079	12	~2019

Exponent	Prime Factor	Dig.	Year
171050857403	342101714807	12	~2019
171051182651	342102365303	12	~2019
171054737531	342109475063	12	~2019
171069033599	342138067199	12	~2019
171070572383	342141144767	12	~2019
171084381563	342168763127	12	~2019
171085317719	342170635439	12	~2019
171101251511	342202503023	12	~2019
171113501249	3388...247303	14	2024
171133069607	2546...575217	15	2025
171145601591	342291203183	12	~2019
171152877323	342305754647	12	~2019
171167384123	342334768247	12	~2019
171174037571	342348075143	12	~2019
171174386039	342348772079	12	~2019
171179550203	342359100407	12	~2019
171185291723	342370583447	12	~2019
171185876483	342371752967	12	~2019
171198806819	342397613639	12	~2019
171204221351	342408442703	12	~2019
171212071451	342424142903	12	~2019
171213379691	342426759383	12	~2019
171214871783	342429743567	12	~2019
171218665679	342437331359	12	~2019
171287503451	342575006903	12	~2019

Exponent	Prime Factor	Dig.	Year
171287758403	342575516807	12	~2019
171288315563	342576631127	12	~2019
171291903071	342583806143	12	~2019
171300848363	342601696727	12	~2019
171303256259	342606512519	12	~2019
171333639143	342667278287	12	~2019
171334841939	342669683879	12	~2019
171334893959	342669787919	12	~2019
171337032851	342674065703	12	~2019
171347115239	342694230479	12	~2019
171349439603	342698879207	12	~2019
171361980743	342723961487	12	~2019
171362775491	342725550983	12	~2019
171367797431	342735594863	12	~2019
171376377899	342752755799	12	~2019
171380077811	342760155623	12	~2019
171380591423	342761182847	12	~2019
171386418299	342772836599	12	~2019
171390986423	342781972847	12	~2019
171401654219	342803308439	12	~2019
171425481131	342850962263	12	~2019
171443228699	342886457399	12	~2019
171458394251	342916788503	12	~2019
171459354119	342918708239	12	~2019
171466494191	342932988383	12	~2019

Exponent	Prime Factor	Dig.	Year
171473158799	342946317599	12	~2019
171477827159	2606...728169	14	2024
171484549451	342969098903	12	~2019
171489990299	342979980599	12	~2019
171490060517	1646...809633	14	2024
171502063919	343004127839	12	~2019
171519564731	343039129463	12	~2019
171520578059	343041156119	12	~2019
171522828731	343045657463	12	~2019
171553097351	343106194703	12	~2019
171559724183	343119448367	12	~2019
171571158611	343142317223	12	~2019
171574733861	3808...917143	14	2023
171577751003	343155502007	12	~2019
171581231303	343162462607	12	~2019
171602928961	3260...502591	14	2024
171603621389	2711...179463	14	2024
171636100283	343272200567	12	~2019
171637427723	343274855447	12	~2019
171643929371	343287858743	12	~2019
171650780339	3330...385767	14	2024
171667321883	343334643767	12	~2019
171674550427	2472...261489	14	2024
171679049831	343358099663	12	~2019
171679853483	343359706967	12	~2019

4.724.182 digits

25-04-13