Small Mersenne Prime Factors (page 4073/5745)

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
1546499183	3092998367	10	~2003
1546547591	3093095183	10	~2003
1546548853	9279293119	10	~2004
1546566779	3093133559	10	~2003
1546592543	3093185087	10	~2003
1546605503	3093211007	10	~2003
1546621799	3093243599	10	~2003
1546622663	3093245327	10	~2003
1546735067	12373880537	11	~2004
1546738813	9280432879	10	~2004
1546743959	3093487919	10	~2003
1546751399	3093502799	10	~2003
1546761659	3093523319	10	~2003
1546861091	3093722183	10	~2003
1546888919	3093777839	10	~2003
1546893043	15468930431	11	~2005
1546906643	3093813287	10	~2003
1546967161	9281802967	10	~2004
1546973843	3093947687	10	~2003
1546985593	37127654233	11	~2005
1547083981	9282503887	10	~2004
1547122751	3094245503	10	~2003
1547152679	3094305359	10	~2003
1547162699	74263809553	11	~2006
1547245151	3094490303	10	~2003

Exponent	Prime Factor	Digits	Year
1547289839	3094579679	10	~2003
1547355119	3094710239	10	~2003
1547405663	3094811327	10	~2003
1547456803	52613531303	11	~2006
1547471951	3094943903	10	~2003
1547492339	3094984679	10	~2003
1547500319	3095000639	10	~2003
1547550923	3095101847	10	~2003
1547611679	3095223359	10	~2003
1547739997	9286439983	10	~2004
1547749811	3095499623	10	~2003
1547772773	21668818823	11	~2005
1547795783	3095591567	10	~2003
1547837939	3095675879	10	~2003
1547881619	3095763239	10	~2003
1548059921	12384479369	11	~2004
1548091403	3096182807	10	~2003
1548169391	3096338783	10	~2003
1548182159	3096364319	10	~2003
1548235379	3096470759	10	~2003
1548239879	3096479759	10	~2003
1548248357	9289490143	10	~2004
1548353771	3096707543	10	~2003
1548496273	9290977639	10	~2004
1548513539	3097027079	10	~2003

Exponent	Prime Factor	Digits	Year
1548525037	61941001481	11	~2006
1548558503	3097117007	10	~2003
1548563363	3097126727	10	~2003
1548571019	3097142039	10	~2003
1548637471	102210073087	12	~2007
1548651683	3097303367	10	~2003
1548753131	3097506263	10	~2003
1548835759	27879043663	11	~2005
1548837743	3097675487	10	~2003
1548837761	12390702089	11	~2004
1548856871	3097713743	10	~2003
1548887831	3097775663	10	~2003
1548996899	3097993799	10	~2003
1549015001	12392120009	11	~2004
1549015621	24784249937	11	~2005
1549072331	3098144663	10	~2003
1549131733	9294790399	10	~2004
1549164983	3098329967	10	~2003
1549170251	3098340503	10	~2003
1549173539	3098347079	10	~2003
1549193939	3098387879	10	~2003
1549200371	3098400743	10	~2003
1549212911	3098425823	10	~2003
1549372283	3098744567	10	~2003
1549408957	37185814969	11	~2005

Exponent	Prime Factor	Digits	Year
1549542803	3099085607	10	~2003
1549572653	9297435919	10	~2004
1549580699	3099161399	10	~2003
1549589927	12396719417	11	~2004
1549622663	3099245327	10	~2003
1549636163	3099272327	10	~2003
1549640531	3099281063	10	~2003
1549658003	3099316007	10	~2003
1549772123	3099544247	10	~2003
1549798571	3099597143	10	~2003
1549852043	3099704087	10	~2003
1549933439	3099866879	10	~2003
1549972199	3099944399	10	~2003
1549973459	27899522263	11	~2005
1549991951	3099983903	10	~2003
1550009063	3100018127	10	~2003
1550018801	12400150409	11	~2004
1550180903	3100361807	10	~2003
1550185739	3100371479	10	~2003
1550220257	9301321543	10	~2004
1550301017	9301806103	10	~2004
1550466493	62018659721	11	~2006
1550660339	3101320679	10	~2003
1550665331	3101330663	10	~2003
1550673203	3101346407	10	~2003

5.441.361 digits

26-03-15