Small Mersenne Prime Factors (page 4437/5025)

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
19757833691	39515667383	11	~2011
19757931911	39515863823	11	~2011
19758544447	197585444471	12	~2013
19758557543	39517115087	11	~2011
19758613211	39517226423	11	~2011
19759637003	39519274007	11	~2011
19760111411	39520222823	11	~2011
19761594371	39523188743	11	~2011
19763879843	513860875919	12	~2014
19764191459	39528382919	11	~2011
19764927419	39529854839	11	~2011
19765371343	197653713431	12	~2013
19765506311	39531012623	11	~2011
19766270963	39532541927	11	~2011
19766324999	39532649999	11	~2011
19766460023	39532920047	11	~2011
19767133019	39534266039	11	~2011
19767141503	39534283007	11	~2011
19768210751	39536421503	11	~2011
19769546663	39539093327	11	~2011
19769767937	118618607623	12	~2013
19769866691	158158933529	12	~2013
19770093907	197700939071	12	~2013
19770388091	39540776183	11	~2011
19771869599	39543739199	11	~2011

Exponent	Prime Factor	Dig.	Year
19772219339	39544438679	11	~2011
19772545151	355905812719	12	~2014
19773898657	118643391943	12	~2013
19774537243	197745372431	12	~2013
19777758893	118666553359	12	~2013
19777901639	39555803279	11	~2011
19778388419	39556776839	11	~2011
19778574863	39557149727	11	~2011
19779399131	39558798263	11	~2011
19779650621	751626723599	12	~2015
19779654659	39559309319	11	~2011
19781074661	118686447967	12	~2013
19781940803	39563881607	11	~2011
19782970157	276961582199	12	~2013
19783352417	118700114503	12	~2013
19783706317	316539301073	12	~2014
19784089651	316545434417	12	~2014
19784122441	316545959057	12	~2014
19784466671	39568933343	11	~2011
19785448537	474850764889	12	~2014
19785503347	197855033471	12	~2013
19785718937	158285751497	12	~2013
19785766681	118714600087	12	~2013
19785873077	118715238463	12	~2013
19786831837	118720991023	12	~2013

Exponent	Prime Factor	Dig.	Year
19786868219	39573736439	11	~2011
19786957061	158295656489	12	~2013
19787313641	158298509129	12	~2013
19787786951	158302295609	12	~2013
19787986919	39575973839	11	~2011
19788463679	39576927359	11	~2011
19789249523	39578499047	11	~2011
19789386731	39578773463	11	~2011
19791310751	39582621503	11	~2011
19795740269	158365922153	12	~2013
19796300099	39592600199	11	~2011
19796779451	39593558903	11	~2011
19797645839	39595291679	11	~2011
19798027703	39596055407	11	~2011
19798041863	39596083727	11	~2011
19798326851	39596653703	11	~2011
19799138363	39598276727	11	~2011
19800712499	39601424999	11	~2011
19801585313	118809511879	12	~2013
19801846861	118811081167	12	~2013
19802107463	39604214927	11	~2011
19802814797	118816888783	12	~2013
19804058363	39608116727	11	~2011
19804472771	39608945543	11	~2011
19804601471	39609202943	11	~2011

Exponent	Prime Factor	Dig.	Year
19805259959	39610519919	11	~2011
19805952011	39611904023	11	~2011
19807009967	158456079737	12	~2013
19807426973	118844561839	12	~2013
19807732811	39615465623	11	~2011
19808298857	118849793143	12	~2013
19808375087	158467000697	12	~2013
19808853719	39617707439	11	~2011
19813229543	39626459087	11	~2011
19813529591	39627059183	11	~2011
19813784741	118882708447	12	~2013
19814239079	39628478159	11	~2011
19814446079	39628892159	11	~2011
19817995409	634175853089	12	~2014
19818560807	158548486457	12	~2013
19818578963	39637157927	11	~2011
19818646643	39637293287	11	~2011
19819153883	39638307767	11	~2011
19819162061	594574861831	12	~2014
19819325579	39638651159	11	~2011
19819363043	39638726087	11	~2011
19819527131	39639054263	11	~2011
19820711699	39641423399	11	~2011
19821022223	39642044447	11	~2011
19822192163	39644384327	11	~2011

4.724.182 digits

25-04-13