Small Mersenne Prime Factors (page 2622/5070)

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	Digits	Year
147564149	1180513193	10	~1996
147570383	295140767	9	~1995
147572233	885433399	9	~1996
147579011	295158023	9	~1995
147588017	885528103	9	~1996
147590561	885543367	9	~1996
147590699	295181399	9	~1995
147591551	295183103	9	~1995
147592811	295185623	9	~1995
147594581	1180756649	10	~1996
147611089	7085332273	10	~1998
147613943	295227887	9	~1995
147614017	885684103	9	~1996
147614303	295228607	9	~1995
147616211	295232423	9	~1995
147620281	885721687	9	~1996
147624019	1476240191	10	~1996
147635473	885812839	9	~1996
147638423	295276847	9	~1995
147638551	1476385511	10	~1996
147646403	295292807	9	~1995
147651011	295302023	9	~1995
147652061	1181216489	10	~1996
147652679	295305359	9	~1995
147664799	295329599	9	~1995

Exponent	Prime Factor	Digits	Year
147668231	295336463	9	~1995
147674951	295349903	9	~1995
147675431	295350863	9	~1995
147675959	295351919	9	~1995
147679211	295358423	9	~1995
147680399	295360799	9	~1995
147685897	886115383	9	~1996
147694579	2658502423	10	~1997
147695519	295391039	9	~1995
147697993	886187959	9	~1996
147699119	1181592953	10	~1996
147700529	1181604233	10	~1996
147701531	295403063	9	~1995
147708839	295417679	9	~1995
147714283	1477142831	10	~1996
147717007	2363472113	10	~1997
147719347	3545264329	10	~1997
147721163	295442327	9	~1995
147723083	295446167	9	~1995
147724691	54362686289	11	~2000
147726959	295453919	9	~1995
147728891	295457783	9	~1995
147729971	295459943	9	~1995
147730417	886382503	9	~1996
147732671	295465343	9	~1995

Exponent	Prime Factor	Digits	Year
147733571	295467143	9	~1995
147734117	2068277639	10	~1997
147744119	295488239	9	~1995
147755953	886535719	9	~1996
147759229	4432776871	10	~1998
147766427	2659795687	10	~1997
147771059	295542119	9	~1995
147771479	295542959	9	~1995
147772643	295545287	9	~1995
147775703	295551407	9	~1995
147784691	295569383	9	~1995
147795887	1182367097	10	~1996
147796393	886778359	9	~1996
147798743	295597487	9	~1995
147801541	886809247	9	~1996
147803759	295607519	9	~1995
147804203	295608407	9	~1995
147811043	295622087	9	~1995
147815957	886895743	9	~1996
147819041	9164780543	10	~1998
147819887	1182559097	10	~1996
147824407	2660839327	10	~1997
147824597	886947583	9	~1996
147826391	295652783	9	~1995
147828641	886971847	9	~1996

Exponent	Prime Factor	Digits	Year
147833453	2069668343	10	~1997
147836543	295673087	9	~1995
147836963	295673927	9	~1995
147841621	887049727	9	~1996
147842399	295684799	9	~1995
147847751	295695503	9	~1995
147850823	295701647	9	~1995
147855023	295710047	9	~1995
147857771	295715543	9	~1995
147859223	295718447	9	~1995
147862993	887177959	9	~1996
147863591	295727183	9	~1995
147869363	295738727	9	~1995
147870419	295740839	9	~1995
147871343	295742687	9	~1995
147871403	295742807	9	~1995
147876551	295753103	9	~1995
147880549	3253372079	10	~1997
147888959	295777919	9	~1995
147889991	295779983	9	~1995
147894431	295788863	9	~1995
147900383	295800767	9	~1995
147903659	295807319	9	~1995
147904061	887424367	9	~1996
147908063	295816127	9	~1995

4.768.925 digits

25-05-04