Small Mersenne Prime Factors (page 4586/5025)

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
35276740871	70553481743	11	~2013
35276875031	70553750063	11	~2013
35278884071	70557768143	11	~2013
35278967879	70557935759	11	~2013
35279631503	70559263007	11	~2013
35280984659	70561969319	11	~2013
35281455779	282251646233	12	~2015
35283319921	776233038263	12	~2016
35284656083	70569312167	11	~2013
35284851923	70569703847	11	~2013
35285344693	211712068159	12	~2015
35286402719	282291221753	12	~2015
35288191121	282305528969	12	~2015
35288315477	282306523817	12	~2015
35288350379	70576700759	11	~2013
35288938703	70577877407	11	~2013
35289696913	2682...653881	14	2024
35292330877	211753985263	12	~2015
35292579323	70585158647	11	~2013
35294056823	70588113647	11	~2013
35295499979	70590999959	11	~2013
35296802063	70593604127	11	~2013
35298367319	70596734639	11	~2013
35299429877	211796579263	12	~2015
35299732639	352997326391	12	~2015

Exponent	Prime Factor	Dig.	Year
35300838731	70601677463	11	~2013
35301979477	211811876863	12	~2015
35302851959	70605703919	11	~2013
35305064183	70610128367	11	~2013
35307776533	9236...410329	14	2023
35310334259	70620668519	11	~2013
35311222559	70622445119	11	~2013
35311230191	70622460383	11	~2013
35313866153	211883196919	12	~2015
35314326317	211885957903	12	~2015
35316019769	282528158153	12	~2015
35316087263	70632174527	11	~2013
35318114231	70636228463	11	~2013
35318873111	282550984889	12	~2015
35321194043	70642388087	11	~2013
35321204771	70642409543	11	~2013
35323082183	70646164367	11	~2013
35327253491	70654506983	11	~2013
35328933389	282631467113	12	~2015
35332904063	70665808127	11	~2013
35334717193	212008303159	12	~2015
35335988423	70671976847	11	~2013
35337800831	70675601663	11	~2013
35337853319	70675706639	11	~2013
35341768043	70683536087	11	~2013

Exponent	Prime Factor	Dig.	Year
35343172619	70686345239	11	~2013
35344420031	70688840063	11	~2013
35346722783	70693445567	11	~2013
35347635863	70695271727	11	~2013
35348307097	212089842583	12	~2015
35349795059	282798360473	12	~2015
35353281307	353532813071	12	~2015
35353507919	70707015839	11	~2013
35355267023	70710534047	11	~2013
35356343327	282850746617	12	~2015
35358698003	70717396007	11	~2013
35361072959	70722145919	11	~2013
35362066319	70724132639	11	~2013
35363129603	70726259207	11	~2013
35364280943	70728561887	11	~2013
35365430291	70730860583	11	~2013
35366793491	70733586983	11	~2013
35367902483	70735804967	11	~2013
35368392599	70736785199	11	~2013
35372226863	70744453727	11	~2013
35372440823	2440...167871	14	2024
35372654903	70745309807	11	~2013
35372837459	70745674919	11	~2013
35374479131	70748958263	11	~2013
35377310237	283018481897	12	~2015

Exponent	Prime Factor	Dig.	Year
35378238179	70756476359	11	~2013
35378591711	70757183423	11	~2013
35380329683	70760659367	11	~2013
35380655903	70761311807	11	~2013
35383787171	70767574343	11	~2013
35384407139	70768814279	11	~2013
35385684539	70771369079	11	~2013
35385820903	353858209031	12	~2015
35386129139	70772258279	11	~2013
35386914007	353869140071	12	~2015
35389954703	70779909407	11	~2013
35391091523	70782183047	11	~2013
35391940907	1613...053593	14	2023
35396865697	212381194183	12	~2015
35398636523	70797273047	11	~2013
35399374649	495591245087	12	~2015
35400590257	212403541543	12	~2015
35410663103	70821326207	11	~2013
35411866271	70823732543	11	~2013
35413076999	70826153999	11	~2013
35418554819	70837109639	11	~2013
35419023119	70838046239	11	~2013
35419227367	354192273671	12	~2015
35419750727	283358005817	12	~2015
35421125783	70842251567	11	~2013

4.724.182 digits

25-04-13