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S412
S412 tested n=25K-50K
21*412^45032+1 is prime Results emailed - Base released S412 is now a 3ker |
R291 is done to n<=25K, 50 k remain.
R351 is done to n<=25K, 33 k remain. S421 is done to n<=25K, 38 k remain. S430 is done to n<=25K, 21 k remain. Bases released. S461 is at 248K, will finish it to 250K soon. |
R361
Although not complete (I'm about 55% done), I have a number of primes to report:
1640*361^88683-1 1842*361^38353-1 2258*361^41883-1 2520*361^36912-1 2622*361^28050-1 3314*361^60756-1 k=3314 is common with R19, so it helps two conjectures. This has been a fruitful range. |
[QUOTE=rogue;274864]Although not complete (I'm about 55% done), I have a number of primes to report:
1640*361^88683-1 1842*361^38353-1 2258*361^41883-1 2520*361^36912-1 2622*361^28050-1 3314*361^60756-1 k=3314 is common with R19, so it helps two conjectures. This has been a fruitful range.[/QUOTE] That is a plentiful range. Specifically what k and n-range have you completed? It appears to be k<3500 to n=100K. Thanks. |
[QUOTE=gd_barnes;274896]That is a plentiful range. Specifically what k and n-range have you completed? It appears to be k<3500 to n=100K. Thanks.[/QUOTE]
Not quite. I just reported it because I submitted the Top 5000 prime from the range. Only k=438 is tested to n=100000. My resources are still working on the other k. Unless I find another Top 5000 prime, I won't have another report on R361 until the range I have reserved is completed. |
R366 down to 5 ks remaining
[FONT=Arial][FONT="]907*366^124278-1[/FONT][/FONT]
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R366 results for 100k<n<150 k have been sent to Gary.
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[QUOTE=Puzzle-Peter;278283]R366 results for 100k<n<150 k have been sent to Gary.[/QUOTE]
Thanks. Are you continuing with this base? |
[QUOTE=gd_barnes;278337]Thanks. Are you continuing with this base?[/QUOTE]
Sorry, forgot to mention that. Yes, I'll take this base a bit higher. Next goal n=200k. |
R256
Reserving R256 from n=75K-125K (including the 2 at 90K). - 26k's
My ultimate goal here is to get R256 (all of it) to n=500K. 38k's remain minus the 3 for Base 16 and Peter's 9519 |
Reserving S256 from n=125K to 200K.
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