Small Mersenne Prime Factors (page 3954/5460)

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
1776051917	42625246009	11	~2006
1776082391	3552164783	10	~2003
1776111803	3552223607	10	~2003
1776213563	3552427127	10	~2003
1776217643	42629223433	11	~2006
1776244333	10657465999	11	~2004
1776250571	3552501143	10	~2003
1776262991	3552525983	10	~2003
1776420011	3552840023	10	~2003
1776463163	3552926327	10	~2003
1776523211	3553046423	10	~2003
1776564359	14212514873	11	~2005
1776631253	10659787519	11	~2004
1776730391	3553460783	10	~2003
1776797579	3553595159	10	~2003
1776834071	3553668143	10	~2003
1776840761	56858904353	11	~2006
1776842219	3553684439	10	~2003
1776938129	24877133807	11	~2005
1776960551	3553921103	10	~2003
1776963959	3553927919	10	~2003
1776993551	3553987103	10	~2003
1776998183	3553996367	10	~2003
1777025111	3554050223	10	~2003
1777077959	3554155919	10	~2003

Exponent	Prime Factor	Digits	Year
1777093649	24879311087	11	~2005
1777140671	3554281343	10	~2003
1777143143	3554286287	10	~2003
1777219517	10663317103	11	~2004
1777231931	3554463863	10	~2003
1777312811	3554625623	10	~2003
1777340699	3554681399	10	~2003
1777436873	10664621239	11	~2004
1777500917	14220007337	11	~2005
1777781891	3555563783	10	~2003
1777782607	17777826071	11	~2005
1777790159	3555580319	10	~2003
1777816451	3555632903	10	~2003
1777854863	3555709727	10	~2003
1777863907	17778639071	11	~2005
1778015243	3556030487	10	~2003
1778039867	14224318937	11	~2005
1778047283	3556094567	10	~2003
1778048179	341385250369	12	~2008
1778103853	28449661649	11	~2005
1778158463	3556316927	10	~2003
1778166011	3556332023	10	~2003
1778245439	3556490879	10	~2003
1778328899	3556657799	10	~2003
1778469839	3556939679	10	~2003

Exponent	Prime Factor	Digits	Year
1778475623	3556951247	10	~2003
1778524211	3557048423	10	~2003
1778593871	3557187743	10	~2003
1778609099	3557218199	10	~2003
1778640173	24900962423	11	~2005
1778642111	3557284223	10	~2003
1778679913	10672079479	11	~2004
1778713037	24901982519	11	~2005
1778732537	14229860297	11	~2005
1778738303	3557476607	10	~2003
1778763851	3557527703	10	~2003
1778766179	3557532359	10	~2003
1778791559	3557583119	10	~2003
1778803991	3557607983	10	~2003
1778847359	3557694719	10	~2003
1778866031	3557732063	10	~2003
1778867339	3557734679	10	~2003
1778953199	3557906399	10	~2003
1779045839	3558091679	10	~2003
1779069899	3558139799	10	~2003
1779122357	14232978857	11	~2005
1779145559	3558291119	10	~2003
1779164879	3558329759	10	~2003
1779180149	42700323577	11	~2006
1779193919	3558387839	10	~2003

Exponent	Prime Factor	Digits	Year
1779246779	3558493559	10	~2003
1779270743	3558541487	10	~2003
1779298739	3558597479	10	~2003
1779323831	3558647663	10	~2003
1779335879	3558671759	10	~2003
1779363863	3558727727	10	~2003
1779404411	3558808823	10	~2003
1779436031	3558872063	10	~2003
1779443903	3558887807	10	~2003
1779498419	32030971543	11	~2006
1779537659	3559075319	10	~2003
1779543497	10677260983	11	~2004
1779557303	3559114607	10	~2003
1779595379	3559190759	10	~2003
1779649559	3559299119	10	~2003
1779649691	3559299383	10	~2003
1779662581	10677975487	11	~2004
1779690707	14237525657	11	~2005
1779697091	3559394183	10	~2003
1779756383	3559512767	10	~2003
1779787319	3559574639	10	~2003
1779791771	14238334169	11	~2005
1779869011	17798690111	11	~2005
1779935471	3559870943	10	~2003
1779959003	3559918007	10	~2003

5.157.210 digits

25-11-02