Small Mersenne Prime Factors (page 2781/5040)

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
209591441	1257548647	10	~1997
209594851	2095948511	10	~1998
209599619	419199239	9	~1996
209606051	419212103	9	~1996
209606321	1676850569	10	~1997
209610911	419221823	9	~1996
209611151	419222303	9	~1996
209613037	1257678223	10	~1997
209621843	419243687	9	~1996
209634203	419268407	9	~1996
209637119	419274239	9	~1996
209647861	1257887167	10	~1997
209648591	419297183	9	~1996
209650979	419301959	9	~1996
209653943	419307887	9	~1996
209659031	419318063	9	~1996
209660123	419320247	9	~1996
209665523	419331047	9	~1996
209665583	419331167	9	~1996
209667233	2935341263	10	~1998
209667599	419335199	9	~1996
209669051	419338103	9	~1996
209673419	419346839	9	~1996
209681603	419363207	9	~1996
209692139	419384279	9	~1996

Exponent	Prime Factor	Digits	Year
209694731	419389463	9	~1996
209698211	419396423	9	~1996
209698823	419397647	9	~1996
209699123	419398247	9	~1996
209707391	419414783	9	~1996
209714831	419429663	9	~1996
209726411	419452823	9	~1996
209727173	1258363039	10	~1997
209728979	419457959	9	~1996
209730421	1258382527	10	~1997
209732879	419465759	9	~1996
209734751	419469503	9	~1996
209740403	419480807	9	~1996
209745839	419491679	9	~1996
209764091	419528183	9	~1996
209764307	1678114457	10	~1997
209769743	419539487	9	~1996
209770523	419541047	9	~1996
209778539	419557079	9	~1996
209784493	20139311329	11	~2000
209787839	419575679	9	~1996
209796131	419592263	9	~1996
209797019	419594039	9	~1996
209798033	1258788199	10	~1997
209810813	1258864879	10	~1997

Exponent	Prime Factor	Digits	Year
209814973	1258889839	10	~1997
209817659	419635319	9	~1996
209823563	419647127	9	~1996
209832191	419664383	9	~1996
209834759	419669519	9	~1996
209836177	1259017063	10	~1997
209837483	419674967	9	~1996
209843831	419687663	9	~1996
209843911	2098439111	10	~1998
209844419	419688839	9	~1996
209845283	419690567	9	~1996
209853191	419706383	9	~1996
209865361	1259192167	10	~1997
209865361	6295960831	10
209866957	1259201743	10	~1997
209880683	419761367	9	~1996
209884019	419768039	9	~1996
209885759	419771519	9	~1996
209891897	1259351383	10	~1997
209894413	5037465913	10	~1999
209900699	419801399	9	~1996
209903159	419806319	9	~1996
209911283	419822567	9	~1996
209918603	419837207	9	~1996
209930459	419860919	9	~1996

Exponent	Prime Factor	Digits	Year
209934671	419869343	9	~1996
209934839	419869679	9	~1996
209936579	419873159	9	~1996
209938021	1259628127	10	~1997
209942651	419885303	9	~1996
209944139	419888279	9	~1996
209947601	1259685607	10	~1997
209951783	419903567	9	~1996
209952191	419904383	9	~1996
209960603	419921207	9	~1996
209965499	419930999	9	~1996
209976551	419953103	9	~1996
209977343	419954687	9	~1996
209977583	419955167	9	~1996
209991451	3359863217	10	~1998
209992319	1679938553	10	~1997
209997779	419995559	9	~1996
209999813	1259998879	10	~1997
210001439	420002879	9	~1996
210003743	420007487	9	~1996
210011363	420022727	9	~1996
210011603	420023207	9	~1996
210025499	420050999	9	~1996
210048253	36548396023	11	~2001
210061031	420122063	9	~1996

4.739.325 digits

25-04-20