Small Mersenne Prime Factors (page 3691/5025)

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	Digits	Year
1824292031	14594336249	11	~2005
1824332771	3648665543	10	~2003
1824356903	3648713807	10	~2003
1824413771	3648827543	10	~2003
1824470519	3648941039	10	~2003
1824533471	3649066943	10	~2003
1824566759	3649133519	10	~2003
1824569723	3649139447	10	~2003
1824788939	3649577879	10	~2003
1824898003	18248980031	11	~2005
1824915899	3649831799	10	~2003
1824943583	3649887167	10	~2003
1825112291	3650224583	10	~2003
1825130663	3650261327	10	~2003
1825146671	3650293343	10	~2003
1825168283	3650336567	10	~2003
1825168391	3650336783	10	~2003
1825172087	14601376697	11	~2005
1825189099	73007563961	11	~2007
1825195399	32853517183	11	~2006
1825311629	58409972129	11	~2006
1825317911	3650635823	10	~2003
1825375763	3650751527	10	~2003
1825400039	3650800079	10	~2003
1825445939	3650891879	10	~2003

Exponent	Prime Factor	Digits	Year
1825494971	3650989943	10	~2003
1825571831	3651143663	10	~2003
1825605629	131443605289	12	~2007
1825616423	3651232847	10	~2003
1825626359	3651252719	10	~2003
1825672031	3651344063	10	~2003
1825712723	3651425447	10	~2003
1825780571	3651561143	10	~2003
1825919897	10955519383	11	~2004
1825920059	3651840119	10	~2003
1825941941	14607535529	11	~2005
1825986359	3651972719	10	~2003
1826010299	3652020599	10	~2003
1826022431	3652044863	10	~2003
1826035031	3652070063	10	~2003
1826036423	3652072847	10	~2003
1826100791	3652201583	10	~2003
1826162951	3652325903	10	~2003
1826175077	69394652927	11	~2006
1826222711	222799170743	12	~2008
1826255339	3652510679	10	~2003
1826325911	3652651823	10	~2003
1826407753	10958446519	11	~2004
1826468543	3652937087	10	~2003
1826533463	3653066927	10	~2003

Exponent	Prime Factor	Digits	Year
1826585699	3653171399	10	~2003
1826618603	3653237207	10	~2003
1826724899	3653449799	10	~2003
1826784539	3653569079	10	~2003
1826797859	3653595719	10	~2003
1826842463	3653684927	10	~2003
1826851811	3653703623	10	~2003
1826879111	3653758223	10	~2003
1826956583	3653913167	10	~2003
1826964791	3653929583	10	~2003
1826972159	3653944319	10	~2003
1826987453	10961924719	11	~2004
1827015881	87696762289	11	~2007
1827048731	3654097463	10	~2003
1827061919	3654123839	10	~2003
1827175169	14617401353	11	~2005
1827288839	3654577679	10	~2003
1827375793	10964254759	11	~2004
1827451777	10964710663	11	~2004
1827452531	3654905063	10	~2003
1827485279	3654970559	10	~2003
1827636659	3655273319	10	~2003
1827706619	3655413239	10	~2003
1827765431	3655530863	10	~2003
1827813917	10966883503	11	~2004

Exponent	Prime Factor	Digits	Year
1827829463	3655658927	10	~2003
1827877823	3655755647	10	~2003
1827977297	10967863783	11	~2004
1828111937	14624895497	11	~2005
1828198499	3656396999	10	~2003
1828231583	76785726487	11	~2007
1828270217	10969621303	11	~2004
1828308661	29252938577	11	~2006
1828315283	3656630567	10	~2003
1828422503	3656845007	10	~2003
1828452763	18284527631	11	~2005
1828453321	10970719927	11	~2004
1828498547	14627988377	11	~2005
1828557149	25599800087	11	~2005
1828603391	3657206783	10	~2003
1828714031	3657428063	10	~2003
1828718999	3657437999	10	~2003
1828764023	3657528047	10	~2003
1828787171	3657574343	10	~2003
1828830209	25603622927	11	~2005
1828915859	3657831719	10	~2003
1828960739	3657921479	10	~2003
1828997917	73159916681	11	~2007
1829028191	3658056383	10	~2003
1829053883	3658107767	10	~2003

4.724.182 digits

25-04-13