Small Mersenne Prime Factors (page 3214/5070)

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
523378319	1046756639	10	~1999
523392521	4187140169	10	~2001
523393751	1046787503	10	~1999
523399781	3140398687	10	~2000
523418681	3140512087	10	~2000
523419983	1046839967	10	~1999
523435043	1046870087	10	~1999
523445107	5234451071	10	~2001
523453033	3140718199	10	~2000
523458073	3140748439	10	~2000
523462153	3140772919	10	~2000
523468103	1046936207	10	~1999
523479083	1046958167	10	~1999
523483283	1046966567	10	~1999
523485779	1046971559	10	~1999
523499519	1046999039	10	~1999
523502477	4188019817	10	~2001
523507403	1047014807	10	~1999
523519091	1047038183	10	~1999
523529423	1047058847	10	~1999
523575791	1047151583	10	~1999
523577843	1047155687	10	~1999
523582427	4188659417	10	~2001
523589711	1047179423	10	~1999
523605359	1047210719	10	~1999

Exponent	Prime Factor	Digits	Year
523609139	1047218279	10	~1999
523609253	3141655519	10	~2000
523618993	3141713959	10	~2000
523639163	1047278327	10	~1999
523670783	1047341567	10	~1999
523680851	1047361703	10	~1999
523686323	1047372647	10	~1999
523689431	1047378863	10	~1999
523692551	1047385103	10	~1999
523696847	4189574777	10	~2001
523727111	1047454223	10	~1999
523737443	1047474887	10	~1999
523747151	1047494303	10	~1999
523748567	34567405423	11	~2003
523758659	1047517319	10	~1999
523758923	1047517847	10	~1999
523784879	1047569759	10	~1999
523790471	1047580943	10	~1999
523794923	1047589847	10	~1999
523796699	1047593399	10	~1999
523847531	1047695063	10	~1999
523848359	1047696719	10	~1999
523861391	1047722783	10	~1999
523864619	1047729239	10	~1999
523864871	1047729743	10	~1999

Exponent	Prime Factor	Digits	Year
523866851	1047733703	10	~1999
523879439	1047758879	10	~1999
523881791	1047763583	10	~1999
523895591	4191164729	10	~2001
523896491	1047792983	10	~1999
523906511	1047813023	10	~1999
523922519	1047845039	10	~1999
523934711	1047869423	10	~1999
523950923	1047901847	10	~1999
523956239	1047912479	10	~1999
523979063	1047958127	10	~1999
523997711	1047995423	10	~1999
524008547	9432153847	10	~2001
524030291	1048060583	10	~1999
524037191	1048074383	10	~1999
524044583	1048089167	10	~1999
524045999	1048091999	10	~1999
524049893	7336698503	10	~2001
524052839	1048105679	10	~1999
524056139	1048112279	10	~1999
524079401	3144476407	10	~2000
524083139	1048166279	10	~1999
524086991	1048173983	10	~1999
524100887	4192807097	10	~2001
524123783	1048247567	10	~1999

Exponent	Prime Factor	Digits	Year
524126891	1048253783	10	~1999
524140607	9434530927	10	~2001
524140943	1048281887	10	~1999
524150773	3144904639	10	~2000
524155739	1048311479	10	~1999
524174663	1048349327	10	~1999
524191511	1048383023	10	~1999
524194681	3145168087	10	~2000
524195939	1048391879	10	~1999
524217119	1048434239	10	~1999
524225111	1048450223	10	~1999
524228951	1048457903	10	~1999
524254079	1048508159	10	~1999
524254319	1048508639	10	~1999
524289383	1048578767	10	~1999
524289599	1048579199	10	~1999
524304923	1048609847	10	~1999
524305871	1048611743	10	~1999
524311211	1048622423	10	~1999
524354921	3146129527	10	~2000
524364517	3146187103	10	~2000
524381917	3146291503	10	~2000
524386451	1048772903	10	~1999
524388911	1048777823	10	~1999
524400599	1048801199	10	~1999

4.768.925 digits

25-05-04