Small Mersenne Prime Factors (page 4813/5550)

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
17202359773	103214158639	12	~2012
17203382123	34406764247	11	~2011
17203647121	103221882727	12	~2012
17204677079	34409354159	11	~2011
17205203419	172052034191	12	~2013
17206649687	825919184977	12	~2014
17207128751	34414257503	11	~2011
17207202251	34414404503	11	~2011
17207397659	34414795319	11	~2011
17208353339	34416706679	11	~2011
17208624899	34417249799	11	~2011
17208710999	34417421999	11	~2011
17209792703	34419585407	11	~2011
17210326691	34420653383	11	~2011
17210425607	137683404857	12	~2012
17210459501	103262757007	12	~2012
17210891017	103265346103	12	~2012
17211760799	34423521599	11	~2011
17212125503	34424251007	11	~2011
17212283017	103273698103	12	~2012
17213479379	34426958759	11	~2011
17213628779	34427257559	11	~2011
17214226691	34428453383	11	~2011
17214949091	34429898183	11	~2011
17216183531	34432367063	11	~2011

Exponent	Prime Factor	Dig.	Year
17216910071	34433820143	11	~2011
17217134773	103302808639	12	~2012
17218287323	34436574647	11	~2011
17219056163	34438112327	11	~2011
17219436317	516583089511	12	~2014
17220727019	34441454039	11	~2011
17221804403	413323305673	12	~2014
17222503603	172225036031	12	~2013
17222745191	34445490383	11	~2011
17222832479	34445664959	11	~2011
17223148643	34446297287	11	~2011
17223927857	103343567143	12	~2012
17224146119	34448292239	11	~2011
17224296371	34448592743	11	~2011
17224620839	34449241679	11	~2011
17224922459	137799379673	12	~2012
17225470739	34450941479	11	~2011
17226030323	34452060647	11	~2011
17226595619	34453191239	11	~2011
17227649371	275642389937	12	~2013
17227733339	34455466679	11	~2011
17228813579	34457627159	11	~2011
17229538889	241213544447	12	~2013
17230209179	34460418359	11	~2011
17230699691	34461399383	11	~2011

Exponent	Prime Factor	Dig.	Year
17231950913	103391705479	12	~2012
17232064823	34464129647	11	~2011
17232988991	34465977983	11	~2011
17233060979	34466121959	11	~2011
17233389611	34466779223	11	~2011
17233995143	34467990287	11	~2011
17234894399	34469788799	11	~2011
17235149851	2757...761601	14	2024
17236308263	34472616527	11	~2011
17236750889	1003...017399	14	2023
17237027711	34474055423	11	~2011
17237047259	34474094519	11	~2011
17237067959	34474135919	11	~2011
17238138311	34476276623	11	~2011
17239023023	34478046047	11	~2011
17240114123	34480228247	11	~2011
17240581103	34481162207	11	~2011
17242310531	34484621063	11	~2011
17242559219	310366065943	12	~2013
17242767779	34485535559	11	~2011
17242813109	137942504873	12	~2012
17242817159	34485634319	11	~2011
17242982891	34485965783	11	~2011
17244559439	34489118879	11	~2011
17247168251	137977346009	12	~2012

Exponent	Prime Factor	Dig.	Year
17248010621	137984084969	12	~2012
17248936469	137991491753	12	~2012
17249184479	34498368959	11	~2011
17249258303	34498516607	11	~2011
17250072781	103500436687	12	~2012
17250280763	34500561527	11	~2011
17250497647	172504976471	12	~2013
17250514943	34501029887	11	~2011
17251254491	34502508983	11	~2011
17251531103	34503062207	11	~2011
17251758851	34503517703	11	~2011
17252909147	828139639057	12	~2014
17253224099	34506448199	11	~2011
17253854399	34507708799	11	~2011
17254129163	34508258327	11	~2011
17256435431	34512870863	11	~2011
17256471839	34512943679	11	~2011
17257443839	34514887679	11	~2011
17258326979	34516653959	11	~2011
17259371477	103556228863	12	~2012
17259814919	34519629839	11	~2011
17260196171	34520392343	11	~2011
17260430711	34520861423	11	~2011
17261013719	34522027439	11	~2011
17261816111	34523632223	11	~2011

5.247.179 digits

25-12-14