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I've got it running. I'll let you know what PFGW gives in probably 15 minutes or so.
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PFGW says it's prime:
[CODE]$ pfgw64.exe -tp -f0 -q"13126*39^85217-1" PFGW Version 3.7.10.64BIT.20150809.Win_Dev [GWNUM 28.6] No factoring at all, not even trivial division Primality testing 13126*39^85217-1 [N+1, Brillhart-Lehmer-Selfridge] Running N+1 test using discriminant 3, base 3+sqrt(3) 13126*39^85217-1 is prime! (3442.6892s+0.0158s)[/CODE] |
[QUOTE=wombatman;414216]PFGW says it's prime:
[CODE]$ pfgw64.exe -tp -f0 -q"13126*39^85217-1" PFGW Version 3.7.10.64BIT.20150809.Win_Dev [GWNUM 28.6] No factoring at all, not even trivial division Primality testing 13126*39^85217-1 [N+1, Brillhart-Lehmer-Selfridge] Running N+1 test using discriminant 3, base 3+sqrt(3) 13126*39^85217-1 is prime! (3442.6892s+0.0158s)[/CODE][/QUOTE] Yes, I double checked and got this: [CODE]Primality testing 13126*39^85217-1 [N+1, Brillhart-Lehmer-Selfridge] Running N+1 test using discriminant 3, base 3+sqrt(3) Calling Brillhart-Lehmer-Selfridge with factored part 70.01% 13126*39^85217-1 is prime! (496.0713s+0.0039s)[/CODE] |
Cllr version 3.8.13 says it's prime:
13126*39^85217-1 is prime! (135590 decimal digits, P = 4) Time : 1837.529 sec. |
[QUOTE=gd_barnes;414224]Cllr version 3.8.13 says it's prime:
13126*39^85217-1 is prime! (135590 decimal digits, P = 4) Time : 1837.529 sec.[/QUOTE] I have sent a mail to Jean to check. |
R39 tested to n=100k (50-100k) (0-200k)
109 primes found, 290 remain in this range Results emailed, Base released |
S97 tested to n=100k (50-100k)
11 primes found, 82 remain 1252*97^54959+1 10128*97^55229+1 12888*97^57402+1 6756*97^61420+1 7972*97^64231+1 5088*97^66905+1 13714*97^71410+1 12018*97^75277+1 15436*97^76224+1 11668*97^78153+1 14230*97^89409+1 Results emailed, Base released |
R66 status update
R66 done to n=3k, and on the way to n=4k (about 10% done, i.e. n=3100 reached today).
76659 primes found between n=2k to n=3k, some not unique (more primes for the same k may be found). 217997 k's left (from 283846, as it turns out, 65849 primes were unique there) Files sent, only ~1.5MB zip this time, :smile: so no need file sharing, they went by email. Edit: to clarify, continuing to 10k. |
r61
reserving r61 to n=300e3
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R63 tested to n=25k (15-25k) (59.2153-74.8169M)
5085 primes found, 14915k left in this range Results emailed, Base released |
Reserving R63 to n=25k (15-25k) (168.633.356M-176.185.434M)
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