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The web pages are now finally fully up to date as of this posting.
As usual, please check them for problems or omissions. |
For my prime Riesel conjecture project I found:
287933*36^90996-1 just short of the top 5000. Willem. |
If no one objects, I'll be attacking the following bases from n=100K to n=200K.
Riesel 93, 94, and 100 Sierp 86 and 87 |
Taking these bases from n=100K to n=200K. These bases all have more than 1 k remaining.
Riesel base 80 Sierp bases 37, 43, 68, and 73 Also seeing as Gary has increased my allotment of algebraic factor bases to 10, reserving Riesel 394, 414, 424, 429, 439, 444 and 459. |
Riesel Base 40
Riesel Base 40 complete n=10K-15K
521 primes found Results emailed |
Reserving Riesel base 70. from 25k to 100k.
Willem. |
[quote=MyDogBuster;201835]If no one objects, I'll be attacking the following bases from n=100K to n=200K.
Riesel 93, 94, and 100 Sierp 86 and 87[/quote] I now have these officially reserved for you. |
I'm filling in some holes in Batalov's reservations from November. Some of these had higher primes reported but no lower primes. Some had only k's remaining reported with no primes. Details are now shown on the web pages.
R88: Previously reported at n=10K with few primes posted. Filled in primes for n<7008; found 15 more primes for n=10K-23K so far, 41 k's remaining at n=23K, continuing to n=25K. S93: Previously reported as ~260 k's remaining at n=~2500 with no primes/remaining k's posted. Started from scratch and found actual of 258 k's remaining at n=2500. Will be at n=10K on Tues; will report there and continue to n=25K. Whew...nice to clean up some things here before splitting up this thread. :smile: Serge, if you see this, are you planning any more work on all of your November reservations? If so, I need all primes so I don't have to do double work. Thanks. Gary |
S93 is at n=10K; 162 k's remaining; continuing to n=25K. Details on the pages.
Batalov had this reserved to n=10K and this now completes the fill-in of his range. I'm now reserving it to n=25K. |
R88 is complete to n=25K; 41 k's remaining. Details on the pages.
Batalov had this reserved to n=25K and this now completes the fill-in of his range. The base is now released. |
R61 is done to 54.3K, 3 primes n > 25K
R67 is done to 50K, 1 prime n > 25K Results emailed, bases released. |
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