Small Mersenne Prime Factors (page 5740/5745)

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
435618531443	871237062887	12	~2022
435638116211	871276232423	12	~2022
435663911363	871327822727	12	~2022
435665894903	871331789807	12	~2022
435674858351	871349716703	12	~2022
435686241251	871372482503	12	~2022
435711058691	871422117383	12	~2022
435730758191	871461516383	12	~2022
435734688611	871469377223	12	~2022
435759127283	871518254567	12	~2022
435804642659	871609285319	12	~2022
435821117603	871642235207	12	~2022
435834661523	871669323047	12	~2022
435836575583	6363...035119	14	2025
435865873463	871731746927	12	~2022
435887524043	871775048087	12	~2022
435887535179	871775070359	12	~2022
435891855803	871783711607	12	~2022
435923807051	5231...846121	14	2025
435958992899	5205...521407	15	2025
435995934323	871991868647	12	~2022
436024201427	1569...513721	15	2025
436028798291	872057596583	12	~2022
436089826751	872179653503	12	~2022
436093617383	872187234767	12	~2022

Exponent	Prime Factor	Dig.	Year
436100129483	872200258967	12	~2022
436132349111	872264698223	12	~2022
436132472291	872264944583	12	~2022
436141473083	872282946167	12	~2022
436191241883	872382483767	12	~2022
436193174951	872386349903	12	~2022
436203755411	2835...017151	15	2025
436205761919	872411523839	12	~2022
436229634419	872459268839	12	~2022
436237099451	872474198903	12	~2022
436242967859	872485935719	12	~2022
436246554539	872493109079	12	~2022
436338414899	872676829799	12	~2022
436365297383	872730594767	12	~2022
436399331639	872798663279	12	~2022
436437369143	872874738287	12	~2022
436438058939	872876117879	12	~2022
436478362031	872956724063	12	~2022
436512551977	6547...796551	14	2025
436525099163	873050198327	12	~2022
436536227279	873072454559	12	~2022
436557885497	1466...526993	15	2025
436573042523	873146085047	12	~2022
436574026151	873148052303	12	~2022
436580223071	873160446143	12	~2022

Exponent	Prime Factor	Dig.	Year
436591037159	873182074319	12	~2022
436639780403	873279560807	12	~2022
436640706421	9431...586937	14	2025
436651857203	873303714407	12	~2022
436653704783	873307409567	12	~2022
436655104199	873310208399	12	~2022
436881241309	1459...597207	15	2025
436896135251	873792270503	12	~2022
436901633951	873803267903	12	~2022
436926679571	873853359143	12	~2022
436933540619	873867081239	12	~2022
436941817283	873883634567	12	~2022
436945131383	873890262767	12	~2022
436956768323	873913536647	12	~2022
436967254631	873934509263	12	~2022
436989443063	873978886127	12	~2022
437019509603	874039019207	12	~2022
437062914803	874125829607	12	~2022
437085705299	874171410599	12	~2022
437113005443	874226010887	12	~2022
437126212283	874252424567	12	~2022
437190999431	874381998863	12	~2022
437208111589	1259...137633	15	2026
437235404531	874470809063	12	~2022
437245658711	874491317423	12	~2022

Exponent	Prime Factor	Dig.	Year
437265738131	874531476263	12	~2022
437289897659	874579795319	12	~2022
437301466379	874602932759	12	~2022
437303247611	874606495223	12	~2022
437331956137	6997...981921	14	2025
437367803303	874735606607	12	~2022
437372599511	874745199023	12	~2022
437373655231	3507...495263	15	2025
437379069191	874758138383	12	~2022
437380489811	874760979623	12	~2022
437399633063	874799266127	12	~2022
437424523751	874849047503	12	~2022
437461500779	874923001559	12	~2022
437466110351	874932220703	12	~2022
437507935451	875015870903	12	~2022
437513642963	875027285927	12	~2022
437606844491	875213688983	12	~2022
437620995299	875241990599	12	~2022
437626447463	875252894927	12	~2022
437645594591	875291189183	12	~2022
437687266259	875374532519	12	~2022
437699103311	875398206623	12	~2022
437750090231	875500180463	12	~2022
437753354183	875506708367	12	~2022
437766860519	875533721039	12	~2022

5.441.361 digits

26-03-15