Small Mersenne Prime Factors (page 3057/5070)

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
367001231	734002463	9	~1998
367006583	734013167	9	~1998
367013639	734027279	9	~1998
367017457	2202104743	10	~1999
367025723	734051447	9	~1998
367028591	734057183	9	~1998
367030283	734060567	9	~1998
367042283	734084567	9	~1998
367048303	3670483031	10	~2000
367048597	76346108177	11	~2003
367051799	734103599	9	~1998
367056961	2202341767	10	~1999
367058519	734117039	9	~1998
367060049	8809441177	10	~2001
367064279	2936514233	10	~1999
367067881	5873086097	10	~2000
367074143	734148287	9	~1998
367086563	734173127	9	~1998
367087991	734175983	9	~1998
367092779	734185559	9	~1998
367100483	734200967	9	~1998
367111931	2936895449	10	~1999
367120931	734241863	9	~1998
367124759	734249519	9	~1998
367126811	734253623	9	~1998

Exponent	Prime Factor	Digits	Year
367134791	734269583	9	~1998
367146863	734293727	9	~1998
367154351	734308703	9	~1998
367160153	2202960919	10	~1999
367177523	734355047	9	~1998
367195151	734390303	9	~1998
367196663	734393327	9	~1998
367197431	734394863	9	~1998
367202051	734404103	9	~1998
367223651	734447303	9	~1998
367230341	2937842729	10	~1999
367230427	5875686833	10	~2000
367240319	734480639	9	~1998
367264687	5876234993	10	~2000
367268543	734537087	9	~1998
367286099	734572199	9	~1998
367286303	734572607	9	~1998
367287797	2203726783	10	~1999
367294211	734588423	9	~1998
367296263	734592527	9	~1998
367304761	2203828567	10	~1999
367308131	734616263	9	~1998
367319171	734638343	9	~1998
367324631	734649263	9	~1998
367325963	734651927	9	~1998

Exponent	Prime Factor	Digits	Year
367326983	734653967	9	~1998
367340339	734680679	9	~1998
367340783	734681567	9	~1998
367350299	734700599	9	~1998
367350679	33061561111	11	~2002
367355909	5142982727	10	~2000
367356191	734712383	9	~1998
367357439	734714879	9	~1998
367365263	734730527	9	~1998
367403033	5143642463	10	~2000
367408571	734817143	9	~1998
367409459	734818919	9	~1998
367413743	734827487	9	~1998
367421471	734842943	9	~1998
367423559	734847119	9	~1998
367427699	734855399	9	~1998
367433377	2204600263	10	~1999
367435021	2204610127	10	~1999
367435163	734870327	9	~1998
367437659	734875319	9	~1998
367473713	2204842279	10	~1999
367477619	734955239	9	~1998
367494251	734988503	9	~1998
367501367	2940010937	10	~1999
367501679	735003359	9	~1998

Exponent	Prime Factor	Digits	Year
367507213	2205043279	10	~1999
367514783	735029567	9	~1998
367533059	735066119	9	~1998
367539251	735078503	9	~1998
367546357	28668615847	11	~2002
367551083	735102167	9	~1998
367553111	735106223	9	~1998
367555943	735111887	9	~1998
367564181	2205385087	10	~1999
367564661	2205387967	10	~1999
367583609	2940668873	10	~1999
367602239	735204479	9	~1998
367614371	735228743	9	~1998
367625383	3676253831	10	~2000
367627163	735254327	9	~1998
367627619	735255239	9	~1998
367641161	11764517153	11	~2001
367649767	14705990681	11	~2001
367672703	735345407	9	~1998
367681681	2206090087	10	~1999
367701923	735403847	9	~1998
367736309	2941890473	10	~1999
367757303	735514607	9	~1998
367758179	2942065433	10	~1999
367761983	735523967	9	~1998

4.768.925 digits

25-05-04