Small Mersenne Prime Factors (page 5490/5490)

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
432539258159	865078516319	12	~2022
432559129091	865118258183	12	~2022
432580204691	865160409383	12	~2022
432612825839	865225651679	12	~2022
432702721631	865405443263	12	~2022
432706611383	865413222767	12	~2022
432765821639	865531643279	12	~2022
432786249911	865572499823	12	~2022
432786713483	865573426967	12	~2022
432897092759	865794185519	12	~2022
432900301331	865800602663	12	~2022
432967565183	865935130367	12	~2022
432990155219	865980310439	12	~2022
432995026511	865990053023	12	~2022
433002943259	866005886519	12	~2022
433020489983	866040979967	12	~2022
433021033817	2243...517207	15	2025
433021844231	866043688463	12	~2022
433029982439	866059964879	12	~2022
433045157063	866090314127	12	~2022
433075131803	866150263607	12	~2022
433092718511	866185437023	12	~2022
433097627519	866195255039	12	~2022
433121088551	866242177103	12	~2022
433129823531	866259647063	12	~2022

Exponent	Prime Factor	Dig.	Year
433135796419	8749...876639	14	2025
433145849459	2529...084057	15	2025
433204216979	866408433959	12	~2022
433280372111	866560744223	12	~2022
433320673319	866641346639	12	~2022
433364727563	866729455127	12	~2022
433424364071	866848728143	12	~2022
433428796259	866857592519	12	~2022
433443204539	866886409079	12	~2022
433445931851	866891863703	12	~2022
433481306243	866962612487	12	~2022
433511310539	867022621079	12	~2022
433556926091	867113852183	12	~2022
433572583991	867145167983	12	~2022
433604292119	867208584239	12	~2022
433632488903	867264977807	12	~2022
433645664951	867291329903	12	~2022
433674576971	867349153943	12	~2022
433734915983	867469831967	12	~2022
433771636643	867543273287	12	~2022
433797964343	867595928687	12	~2022
433806165239	867612330479	12	~2022
433907429723	867814859447	12	~2022
433916889839	867833779679	12	~2022
433934279099	867868558199	12	~2022

Exponent	Prime Factor	Dig.	Year
433941287231	867882574463	12	~2022
433973200883	867946401767	12	~2022
434008348751	868016697503	12	~2022
434063845643	868127691287	12	~2022
434078010419	868156020839	12	~2022
434098050719	868196101439	12	~2022
434100374423	868200748847	12	~2022
434125471859	868250943719	12	~2022
434150751323	868301502647	12	~2022
434156975471	868313950943	12	~2022
434162875931	868325751863	12	~2022
434225148299	868450296599	12	~2022
434226979139	868453958279	12	~2022
434249447279	868498894559	12	~2022
434352873371	868705746743	12	~2022
434374438523	868748877047	12	~2022
434429854031	868859708063	12	~2022
434496452759	868992905519	12	~2022
434513185079	869026370159	12	~2022
434515506263	869031012527	12	~2022
434537618351	869075236703	12	~2022
434546647091	869093294183	12	~2022
434549407343	869098814687	12	~2022
434570915699	869141831399	12	~2022
434573998223	869147996447	12	~2022

Exponent	Prime Factor	Dig.	Year
434576643251	869153286503	12	~2022
434589385871	869178771743	12	~2022
434605907531	869211815063	12	~2022
434607294239	869214588479	12	~2022
434612077979	869224155959	12	~2022
434667842039	869335684079	12	~2022
434705830283	869411660567	12	~2022
434770328099	869540656199	12	~2022
434772735599	869545471199	12	~2022
434810326523	869620653047	12	~2022
434879293571	869758587143	12	~2022
434912311763	869824623527	12	~2022
434914759619	869829519239	12	~2022
434935855043	869871710087	12	~2022
434940382091	869880764183	12	~2022
434945723279	869891446559	12	~2022
434948321123	869896642247	12	~2022
434997769763	869995539527	12	~2022
435018392531	870036785063	12	~2022
435026966711	870053933423	12	~2022
435028649351	870057298703	12	~2022
435081627251	870163254503	12	~2022
435081923351	870163846703	12	~2022
435095779259	870191558519	12	~2022
435104908739	870209817479	12	~2022

5.187.277 digits

25-11-17