Small Mersenne Prime Factors (page 4528/5070)

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	Dig.	Year
24256561883	48513123767	11	~2012
24256614743	48513229487	11	~2012
24256977161	194055817289	12	~2014
24257331101	145543986607	12	~2013
24257539931	48515079863	11	~2012
24259901801	145559410807	12	~2013
24260224259	48520448519	11	~2012
24261348971	48522697943	11	~2012
24261382199	48522764399	11	~2012
24262400411	48524800823	11	~2012
24262409219	48524818439	11	~2012
24264121919	48528243839	11	~2012
24264397691	48528795383	11	~2012
24266039299	242660392991	12	~2014
24266564519	48533129039	11	~2012
24266569963	242665699631	12	~2014
24267124439	48534248879	11	~2012
24268129079	48536258159	11	~2012
24268435109	339758091527	12	~2014
24268641191	48537282383	11	~2012
24269073539	436843323703	12	~2014
24269578181	194156625449	12	~2014
24270551159	48541102319	11	~2012
24271493651	48542987303	11	~2012
24271808521	145630851127	12	~2013

Exponent	Prime Factor	Dig.	Year
24273293711	48546587423	11	~2012
24274757459	48549514919	11	~2012
24275399411	48550798823	11	~2012
24275443763	48550887527	11	~2012
24275850611	48551701223	11	~2012
24276960977	194215687817	12	~2014
24277383359	48554766719	11	~2012
24277875911	48555751823	11	~2012
24278816231	48557632463	11	~2012
24281144963	48562289927	11	~2012
24281945957	339947243399	12	~2014
24284201999	48568403999	11	~2012
24284400923	48568801847	11	~2012
24285076463	48570152927	11	~2012
24285476909	582851445817	12	~2015
24289670879	194317367033	12	~2014
24289967249	194319737993	12	~2014
24290404991	48580809983	11	~2012
24291007343	48582014687	11	~2012
24291525311	48583050623	11	~2012
24292103651	48584207303	11	~2012
24292148539	583011564937	12	~2015
24292861301	194342890409	12	~2014
24293265583	388692249329	12	~2014
24293847551	48587695103	11	~2012

Exponent	Prime Factor	Dig.	Year
24294085619	48588171239	11	~2012
24294279983	48588559967	11	~2012
24295151291	48590302583	11	~2012
24295941179	48591882359	11	~2012
24296073911	48592147823	11	~2012
24297259523	48594519047	11	~2012
24297346691	48594693383	11	~2012
24299683631	48599367263	11	~2012
24300299609	583207190617	12	~2015
24301032251	48602064503	11	~2012
24301062503	48602125007	11	~2012
24301130327	194409042617	12	~2014
24301362791	48602725583	11	~2012
24302527583	48605055167	11	~2012
24302741531	48605483063	11	~2012
24302893679	48605787359	11	~2012
24302969623	388847513969	12	~2014
24303409271	48606818543	11	~2012
24304264619	48608529239	11	~2012
24305227451	48610454903	11	~2012
24305232491	48610464983	11	~2012
24306072839	48612145679	11	~2012
24306733721	145840402327	12	~2013
24307042559	48614085119	11	~2012
24307463639	48614927279	11	~2012

Exponent	Prime Factor	Dig.	Year
24307661291	48615322583	11	~2012
24307692719	48615385439	11	~2012
24308532719	48617065439	11	~2012
24311263859	194490110873	12	~2014
24311386067	194491088537	12	~2014
24311831407	243118314071	12	~2014
24312402623	48624805247	11	~2012
24314371619	48628743239	11	~2012
24314951651	48629903303	11	~2012
24316225931	48632451863	11	~2012
24316561327	2845...752591	14	2023
24318161639	48636323279	11	~2012
24318734273	340462279823	12	~2014
24320048723	583681169353	12	~2015
24323652671	194589221369	12	~2014
24325198433	145951190599	12	~2013
24327871031	48655742063	11	~2012
24328476779	48656953559	11	~2012
24329278679	48658557359	11	~2012
24329557739	194636461913	12	~2014
24330466969	1649...604983	14	2023
24330886763	48661773527	11	~2012
24333692879	48667385759	11	~2012
24334208243	48668416487	11	~2012
24334340879	48668681759	11	~2012

4.768.925 digits

25-05-04