Small Mersenne Prime Factors (page 4747/5340)

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
24197248319	48394496639	11	~2012
24197285771	48394571543	11	~2012
24198519269	2105...764031	14	2024
24199805219	48399610439	11	~2012
24199841219	48399682439	11	~2012
24200738879	48401477759	11	~2012
24200851583	48401703167	11	~2012
24202011553	145212069319	12	~2013
24202169003	48404338007	11	~2012
24202493123	48404986247	11	~2012
24203803469	338853248567	12	~2014
24203884261	145223305567	12	~2013
24206195459	48412390919	11	~2012
24208802117	193670416937	12	~2014
24209522411	48419044823	11	~2012
24212226359	48424452719	11	~2012
24213426719	48426853439	11	~2012
24213492119	48426984239	11	~2012
24213753923	48427507847	11	~2012
24213764417	145282586503	12	~2013
24214550963	48429101927	11	~2012
24216512531	48433025063	11	~2012
24216782279	48433564559	11	~2012
24217316203	242173162031	12	~2014
24217785181	145306711087	12	~2013

Exponent	Prime Factor	Dig.	Year
24218798759	48437597519	11	~2012
24218908331	48437816663	11	~2012
24219436039	435949848703	12	~2014
24219444541	145316667247	12	~2013
24220718831	193765750649	12	~2014
24221644211	48443288423	11	~2012
24221729459	48443458919	11	~2012
24222314339	48444628679	11	~2012
24222517211	48445034423	11	~2012
24222758663	48445517327	11	~2012
24223068671	436015236079	12	~2014
24224124641	193792997129	12	~2014
24225178079	48450356159	11	~2012
24225926951	48451853903	11	~2012
24227222533	145363335199	12	~2013
24227266381	145363598287	12	~2013
24228345341	145370072047	12	~2013
24228654683	48457309367	11	~2012
24228944771	775326232673	12	~2015
24229975333	145379851999	12	~2013
24230009759	48460019519	11	~2012
24230297831	48460595663	11	~2012
24231893459	48463786919	11	~2012
24232150823	48464301647	11	~2012
24232347619	242323476191	12	~2014

Exponent	Prime Factor	Dig.	Year
24232457351	48464914703	11	~2012
24232674199	242326741991	12	~2014
24233151179	48466302359	11	~2012
24233968211	48467936423	11	~2012
24234345431	48468690863	11	~2012
24235240157	193881921257	12	~2014
24235911191	48471822383	11	~2012
24236748143	48473496287	11	~2012
24239136011	48478272023	11	~2012
24239283857	193914270857	12	~2014
24239340143	48478680287	11	~2012
24240243539	48480487079	11	~2012
24240757823	48481515647	11	~2012
24241579331	48483158663	11	~2012
24243222559	242432225591	12	~2014
24245232971	48490465943	11	~2012
24246199979	48492399959	11	~2012
24247695419	193981563353	12	~2014
24249186803	48498373607	11	~2012
24251766683	48503533367	11	~2012
24253538377	145521230263	12	~2013
24253955927	194031647417	12	~2014
24256357091	48512714183	11	~2012
24256561883	48513123767	11	~2012
24256614743	48513229487	11	~2012

Exponent	Prime Factor	Dig.	Year
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
24273293711	48546587423	11	~2012
24274757459	48549514919	11	~2012

5.037.460 digits

25-09-07