Small Mersenne Prime Factors (page 5088/5190)

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
207504744983	415009489967	12	~2019
207530961779	415061923559	12	~2019
207547112219	415094224439	12	~2019
207551572619	415103145239	12	~2019
207561891983	415123783967	12	~2019
207577354571	415154709143	12	~2019
207603824723	415207649447	12	~2019
207610933219	1494...191769	14	2024
207632916143	415265832287	12	~2019
207634779083	415269558167	12	~2019
207649264583	415298529167	12	~2019
207668406119	415336812239	12	~2019
207723642779	415447285559	12	~2019
207741856979	415483713959	12	~2019
207742700999	415485401999	12	~2019
207755012291	415510024583	12	~2019
207767883419	415535766839	12	~2019
207795268403	415590536807	12	~2019
207807107723	415614215447	12	~2019
207837072119	415674144239	12	~2019
207862859531	415725719063	12	~2019
207878070259	4199...192319	14	2023
207884116031	415768232063	12	~2019
207892169591	415784339183	12	~2019
207901179071	415802358143	12	~2019

Exponent	Prime Factor	Dig.	Year
207907096979	415814193959	12	~2019
207924445763	415848891527	12	~2019
207936864983	415873729967	12	~2019
207946640483	415893280967	12	~2019
207950950583	415901901167	12	~2019
207956324531	415912649063	12	~2019
207956523707	2370...702599	14	2024
207972760199	415945520399	12	~2019
207982900739	415965801479	12	~2019
207998948291	415997896583	12	~2019
208006273043	416012546087	12	~2019
208033218251	416066436503	12	~2019
208044057839	416088115679	12	~2019
208072540199	416145080399	12	~2019
208081548611	416163097223	12	~2019
208142153123	416284306247	12	~2019
208146469451	416292938903	12	~2019
208150269179	2539...839839	14	2024
208228583483	416457166967	12	~2019
208265669039	416531338079	12	~2019
208274406583	1882...551033	15	2023
208284222539	416568445079	12	~2019
208291304411	416582608823	12	~2019
208316851643	416633703287	12	~2019
208323264091	1499...014553	14	2024

Exponent	Prime Factor	Dig.	Year
208338410051	416676820103	12	~2019
208346791117	6850...192697	15	2025
208352725079	416705450159	12	~2019
208362181931	7042...492679	14	2023
208373980883	416747961767	12	~2019
208427236631	416854473263	12	~2019
208432246391	416864492783	12	~2019
208441658591	416883317183	12	~2019
208442613419	416885226839	12	~2019
208497255623	416994511247	12	~2019
208508439563	417016879127	12	~2019
208524361319	417048722639	12	~2019
208530177743	417060355487	12	~2019
208539604391	417079208783	12	~2019
208542695303	417085390607	12	~2019
208597125179	417194250359	12	~2019
208605371759	417210743519	12	~2019
208616241419	417232482839	12	~2019
208621247699	417242495399	12	~2019
208644870251	417289740503	12	~2019
208703977799	417407955599	12	~2019
208713627071	417427254143	12	~2019
208759778471	417519556943	12	~2019
208764534323	417529068647	12	~2019
208768873199	417537746399	12	~2019

Exponent	Prime Factor	Dig.	Year
208775422117	3507...915657	14	2024
208781672279	417563344559	12	~2019
208798061519	417596123039	12	~2019
208804990337	2630...782463	14	2024
208807976231	417615952463	12	~2019
208819432543	2380...309903	14	2024
208840502303	417681004607	12	~2019
208840750259	417681500519	12	~2019
208848461411	417696922823	12	~2019
208857264251	417714528503	12	~2019
208858645837	1750...211407	15	2023
208883149619	417766299239	12	~2019
208895122259	417790244519	12	~2019
208909210403	417818420807	12	~2019
208915271423	417830542847	12	~2019
208928050871	417856101743	12	~2019
208952033219	417904066439	12	~2019
208972991879	417945983759	12	~2019
208975694891	417951389783	12	~2019
208982929643	417965859287	12	~2019
208992104039	417984208079	12	~2019
208998286811	417996573623	12	~2019
209013135143	418026270287	12	~2019
209048348231	418096696463	12	~2019
209096155139	418192310279	12	~2019

4.888.230 digits

25-06-29