Small Mersenne Prime Factors (page 4182/5130)

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	Dig.	Year
6238224983	12476449967	11	~2008
6238873847	49910990777	11	~2009
6239350751	12478701503	11	~2008
6239500721	37437004327	11	~2009
6239646137	499171690961	12	~2011
6239671019	12479342039	11	~2008
6239801999	12479603999	11	~2008
6239815601	49918524809	11	~2009
6240303827	49922430617	11	~2009
6240423743	12480847487	11	~2008
6240561023	12481122047	11	~2008
6240660337	99850565393	11	~2010
6240798983	12481597967	11	~2008
6240972719	12481945439	11	~2008
6241065707	112339182727	12	~2010
6241403351	12482806703	11	~2008
6241622339	12483244679	11	~2008
6241775341	37450652047	11	~2009
6241932821	49935462569	11	~2009
6242120303	12484240607	11	~2008
6242171651	12484343303	11	~2008
6242430203	12484860407	11	~2008
6242443841	49939550729	11	~2009
6242650499	12485300999	11	~2008
6242773417	37456640503	11	~2009

Exponent	Prime Factor	Dig.	Year
6242971043	12485942087	11	~2008
6243210037	149837040889	12	~2010
6243242903	12486485807	11	~2008
6243930851	12487861703	11	~2008
6244068599	12488137199	11	~2008
6244108499	12488216999	11	~2008
6244145057	37464870343	11	~2009
6244349099	12488698199	11	~2008
6244362869	49954902953	11	~2009
6244391399	312219569951	12	~2011
6245220139	62452201391	11	~2009
6245924339	12491848679	11	~2008
6246052691	12492105383	11	~2008
6246342731	12492685463	11	~2008
6246439631	12492879263	11	~2008
6247338983	12494677967	11	~2008
6247390739	12494781479	11	~2008
6247788817	37486732903	11	~2009
6247857683	12495715367	11	~2008
6248328071	12496656143	11	~2008
6248409731	12496819463	11	~2008
6248533079	12497066159	11	~2008
6248808079	62488080791	11	~2009
6249006341	37494038047	11	~2009
6249283679	12498567359	11	~2008

Exponent	Prime Factor	Dig.	Year
6249315179	12498630359	11	~2008
6249740219	12499480439	11	~2008
6249750491	12499500983	11	~2008
6250069103	12500138207	11	~2008
6250370941	37502225647	11	~2009
6251002991	12502005983	11	~2008
6251260979	50010087833	11	~2009
6251343803	12502687607	11	~2008
6251420111	12502840223	11	~2008
6251645401	137536198823	12	~2010
6252117419	12504234839	11	~2008
6252161821	37512970927	11	~2009
6252222071	12504444143	11	~2008
6252226751	12504453503	11	~2008
6252237623	162558178199	12	~2010
6252272879	12504545759	11	~2008
6252666071	12505332143	11	~2008
6252948239	12505896479	11	~2008
6253291277	50026330217	11	~2009
6253336139	12506672279	11	~2008
6253378331	12506756663	11	~2008
6253656131	12507312263	11	~2008
6254277119	12508554239	11	~2008
6254312411	12508624823	11	~2008
6254465531	12508931063	11	~2008

Exponent	Prime Factor	Dig.	Year
6254560339	62545603391	11	~2009
6254725241	37528351447	11	~2009
6255418769	50043350153	11	~2009
6255503759	12511007519	11	~2008
6255624161	50044993289	11	~2009
6255708839	12511417679	11	~2008
6255849157	37535094943	11	~2009
6255852569	87581935967	11	~2010
6256022543	12512045087	11	~2008
6256786229	87595007207	11	~2010
6256847351	12513694703	11	~2008
6257039311	563133537991	12	~2012
6257477483	150179459593	12	~2010
6257812853	37546877119	11	~2009
6258010859	12516021719	11	~2008
6258049439	12516098879	11	~2008
6258531143	12517062287	11	~2008
6258939733	37553638399	11	~2009
6259322857	37555937143	11	~2009
6259432331	50075458649	11	~2009
6259470383	12518940767	11	~2008
6259617131	12519234263	11	~2008
6259634519	12519269039	11	~2008
6259796723	12519593447	11	~2008
6259935131	12519870263	11	~2008

4.828.532 digits

25-06-01