Riesel base 95 is at n=14K; 21 k's remain; continuing to n=25K

Sierp base 61 is complete to n=25K; 18 k's remain; now unreserved

I will start on new Sierp base 88 is the next couple of days; going to n=25K.

After that, only Riesel and Sierp base 46 to go.

I may reserve new Sierp base base 60 up to n=25K after all of that is done. I haven't decided yet. Besides Sierp base 88, it is the last remaining base <= 100 that is likely to have < 50 k's remaining at n=10K.


Gary

Riesel base 95 is at n=21K; 20 k's remain; continuing to n=25K.

Sierp base 88 is at n=10K; 25 k's remain; continuing to n=25K.

Next is Riesel and Sierp bases 46 to n=25K to complete current reservations.

New reservation: Sierp base 60 to n=25K.

Riesel Base 58
 

84977*58^23007-1
92229*58^23283-1
79011*58^23299-1
40808*58^23805-1
63177*58^24402-1
58086*58^24630-1
17876*58^24838-1
27861*58^24850-1
24320*58^24879-1

Completed to 25000 and continuing

Sierp base 88 is at n=15K; 20 k's remain; continuing to n=25K.

Riesel base 95 is complete to n=25K; 19 k's remain; now unreserved.

Sierp base 60 and both sides of base 46 to go for my reservations for bases > 32.

Sierp base 88 is complete to n=25K; 18 k's remain; now unreserved

Sierp base 60 is at n=5K; 65 k's remain; continuing to n=25K; status to be shown on web pages at n>=10K when fewer k's remain.

Riesel and Sierp base 46 have just completed sieving n=10K-25K. I'll test them concurrently.

Reserving Riesel base 94 up to n=60K. :smile:

Riesel Base 58
 

11484*58^25101-1
97164*58^25107-1
92712*58^25155-1
30612*58^25160-1
67547*58^25190-1
56841*58^25370-1
35774*58^25389-1
13682*58^25551-1
51894*58^25995-1

81114*58^26065-1
85617*58^26280-1
49146*58^26334-1
33266*58^26463-1
11538*58^26541-1
80579*58^26592-1
80180*58^26646-1
58314*58^26877-1
91766*58^26879-1
28008*58^26894-1

39684*58^27023-1
53636*58^27438-1
41469*58^27517-1
48156*58^27521-1
14396*58^27614-1
32118*58^27826-1

19854*58^28071-1
90279*58^28112-1
104724*58^28404-1
71598*58^28680-1
101715*58^28702-1

Completed to 29000 and continuing. If I have counted correctly, there are 360 remaining k.

[quote=mdettweiler;181145]Reserving Riesel base 94 up to n=60K. :smile:[/quote]
This finished to 60K quickly enough, so I've decided to take this up to 70K. I'll post results when that's completed.

Riesel base 94 is complete to n=70K; releasing this base. Results are attached for 51K-70K.

[quote=mdettweiler;181493]Riesel base 94 is complete to n=70K; releasing this base. Results are attached for 51K-70K.[/quote]
I've decided to not release this base quite yet. Continuing to 80K. :smile:

For Riesel base 58, after adjusting for one k that already had a prime, there were 408 k's remaining at n=21K per my note in a prior post. k's found prime for:

n=21K-22K; 8
n=22K-23K; 3
n=23K-24K; 4
n=24K-25K; 5
n=25K-26K; 9
n=26K-27K; 10
n=27K-28K; 6
n=28K-29K; 4 (k=19854 already had a prime at n=13287)

Total k's with primes for n=21K-29K: 49

Total k's remaining at n=29K: 408 - 49 = 359.


This also balances with the k's I show remaining on the web page. So somewhere you are off by 1. If you erroneously subtracted off k=19854 (or some other k) twice as a result of finding 2 primes for it and now have to add it back, you would be off by 2 so the error must be somewhere else.

You might check your k's remaining against my web page as well as remove k's with former primes like k=19854 from your sieve file to avoid any possible future confusion in that regard. I do a balancing every time I remove k's from the Riesel base 58 reservations web page.