Small Mersenne Prime Factors (page 2972/5070)

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	Digits	Year
304263299	608526599	9	~1997
304271663	9736693217	10	~2000
304286023	3042860231	10	~1999
304288273	6694342007	10	~2000
304292363	12780279247	11	~2000
304304303	608608607	9	~1997
304325123	608650247	9	~1997
304325521	1825953127	10	~1998
304358897	1826153383	10	~1998
304359533	1826157199	10	~1998
304385957	2435087657	10	~1999
304397459	608794919	9	~1997
304401959	608803919	9	~1997
304404791	608809583	9	~1997
304405319	608810639	9	~1997
304410311	2435282489	10	~1999
304412819	15220640951	11	~2001
304433693	1826602159	10	~1998
304441223	608882447	9	~1997
304450327	3044503271	10	~1999
304457773	1826746639	10	~1998
304460171	608920343	9	~1997
304469351	608938703	9	~1997
304472639	608945279	9	~1997
304477163	608954327	9	~1997

Exponent	Prime Factor	Digits	Year
304481693	4262743703	10	~1999
304483031	608966063	9	~1997
304484111	608968223	9	~1997
304485911	608971823	9	~1997
304490471	608980943	9	~1997
304492777	16442609959	11	~2001
304501507	193053955439	12	~2003
304528439	2436227513	10	~1999
304531679	609063359	9	~1997
304532377	4872518033	10	~1999
304538711	609077423	9	~1997
304547339	609094679	9	~1997
304549621	1827297727	10	~1998
304552799	609105599	9	~1997
304566079	3045660791	10	~1999
304579739	609159479	9	~1997
304583063	609166127	9	~1997
304586411	2436691289	10	~1999
304598603	609197207	9	~1997
304600301	2436802409	10	~1999
304605863	609211727	9	~1997
304612211	609224423	9	~1997
304617779	609235559	9	~1997
304618673	1827712039	10	~1998
304620731	609241463	9	~1997

Exponent	Prime Factor	Digits	Year
304621643	609243287	9	~1997
304624559	2436996473	10	~1999
304627451	609254903	9	~1997
304636511	609273023	9	~1997
304647437	1827884623	10	~1998
304647617	2437180937	10	~1999
304648391	609296783	9	~1997
304653143	609306287	9	~1997
304655381	1827932287	10	~1998
304656743	609313487	9	~1997
304670699	609341399	9	~1997
304673543	609347087	9	~1997
304679939	609359879	9	~1997
304681033	1828086199	10	~1998
304686143	609372287	9	~1997
304686341	2437490729	10	~1999
304691903	20109665599	11	~2001
304696079	9750274529	10	~2000
304701377	2437611017	10	~1999
304705811	609411623	9	~1997
304706797	1828240783	10	~1998
304714079	609428159	9	~1997
304723841	23768459599	11	~2001
304725131	609450263	9	~1997
304727821	1828366927	10	~1998

Exponent	Prime Factor	Digits	Year
304728191	609456383	9	~1997
304735031	609470063	9	~1997
304763171	609526343	9	~1997
304766687	7923933863	10	~2000
304779539	609559079	9	~1997
304783691	609567383	9	~1997
304796951	609593903	9	~1997
304803467	17068994153	11	~2001
304808711	609617423	9	~1997
304828619	609657239	9	~1997
304830191	609660383	9	~1997
304837103	609674207	9	~1997
304837133	1829022799	10	~1998
304838201	2438705609	10	~1999
304843709	104866235897	12	~2003
304850387	68286486689	11	~2002
304865303	609730607	9	~1997
304865423	7926500999	10	~2000
304893073	1829358439	10	~1998
304897451	609794903	9	~1997
304901393	1829408359	10	~1998
304905239	609810479	9	~1997
304915883	609831767	9	~1997
304917611	609835223	9	~1997
304925017	1829550103	10	~1998

4.768.925 digits

25-05-04