Small Mersenne Prime Factors (page 4879/5070)

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
114043298483	228086596967	12	~2017
114046131383	228092262767	12	~2017
114048061643	228096123287	12	~2017
114066105383	228132210767	12	~2017
114067924583	228135849167	12	~2017
114068453141	684410718847	12	~2019
114078684959	228157369919	12	~2017
114096967343	228193934687	12	~2017
114107690857	684646145143	12	~2019
114112054103	228224108207	12	~2017
114122477663	228244955327	12	~2017
114129001331	228258002663	12	~2017
114132144803	228264289607	12	~2017
114151993199	228303986399	12	~2017
114154355041	684926130247	12	~2019
114163225859	228326451719	12	~2017
114167400251	228334800503	12	~2017
114170735699	228341471399	12	~2017
114174722219	228349444439	12	~2017
114179857931	228359715863	12	~2017
114180048721	685080292327	12	~2019
114181485191	228362970383	12	~2017
114185093677	685110562063	12	~2019
114199214567	7126...889809	14	2024
114200321513	685201929079	12	~2019

Exponent	Prime Factor	Dig.	Year
114206782979	228413565959	12	~2017
114212310143	228424620287	12	~2017
114212861771	228425723543	12	~2017
114215846243	228431692487	12	~2017
114222290579	228444581159	12	~2017
114223630583	228447261167	12	~2017
114235600691	228471201383	12	~2017
114258024299	228516048599	12	~2017
114267905099	228535810199	12	~2017
114270505991	228541011983	12	~2017
114271278431	228542556863	12	~2017
114282140051	228564280103	12	~2017
114284971679	228569943359	12	~2017
114303689183	228607378367	12	~2017
114308028743	228616057487	12	~2017
114320351279	228640702559	12	~2017
114335061959	228670123919	12	~2017
114336393263	228672786527	12	~2017
114340163471	228680326943	12	~2017
114343491959	228686983919	12	~2017
114345243253	686071459519	12	~2019
114352929023	1045...127023	15	2025
114354805739	228709611479	12	~2017
114356434859	228712869719	12	~2017
114358004303	228716008607	12	~2017

Exponent	Prime Factor	Dig.	Year
114359887259	228719774519	12	~2017
114366592979	228733185959	12	~2017
114366604619	228733209239	12	~2017
114370430903	228740861807	12	~2017
114377331539	228754663079	12	~2017
114384316883	228768633767	12	~2017
114384459779	228768919559	12	~2017
114386585123	228773170247	12	~2017
114393000481	8487...356903	14	2025
114418631423	228837262847	12	~2017
114440340439	2655...981849	14	2024
114441361031	228882722063	12	~2017
114448235591	228896471183	12	~2017
114448620623	228897241247	12	~2017
114451682021	686710092127	12	~2019
114452579519	228905159039	12	~2017
114455340971	228910681943	12	~2017
114457216739	228914433479	12	~2017
114457236683	228914473367	12	~2017
114488046899	228976093799	12	~2017
114488276471	228976552943	12	~2017
114494741099	228989482199	12	~2017
114498522371	228997044743	12	~2017
114499306391	228998612783	12	~2017
114503927003	229007854007	12	~2017

Exponent	Prime Factor	Dig.	Year
114512032021	687072192127	12	~2019
114519827399	2496...372983	14	2024
114524080403	229048160807	12	~2017
114525938063	229051876127	12	~2017
114529930477	687179582863	12	~2019
114532476983	229064953967	12	~2017
114533772863	229067545727	12	~2017
114541208279	229082416559	12	~2017
114551851691	229103703383	12	~2017
114552238343	229104476687	12	~2017
114570107297	687420643783	12	~2019
114574299173	687445795039	12	~2019
114576790439	229153580879	12	~2017
114601926539	229203853079	12	~2017
114610227923	229220455847	12	~2017
114615571331	229231142663	12	~2017
114635356441	687812138647	12	~2019
114636353939	229272707879	12	~2017
114640772863	2866...215751	14	2024
114643248683	229286497367	12	~2017
114648781223	229297562447	12	~2017
114650036629	8048...713559	14	2025
114658083521	687948501127	12	~2019
114670814243	229341628487	12	~2017
114671799491	229343598983	12	~2017

4.768.925 digits

25-05-04