Bases 251-500 reservations/statuses/primes - Page 30

Batalov · 2010-04-19, 04:26

Done with R361 to 25K.
For a CK of 8870, very few (15) k's remain (of which three are tested to higher limits for R19).
Results emailed to Gary. Base released.

unconnected · 2010-04-19, 09:53

Riesel base 443, k=28

Primes:
2*443^12-1
4*443^3-1
6*443^1-1
8*443^416-1
10*443^3-1
12*443^3-1
16*443^165-1
20*443^6-1
22*443^7-1
24*443^1-1
26*443^2-1

Trivially factors: k=14, 18
Base proven.

MyDogBuster · 2010-04-19, 11:49

Riesel Base 253
Conjectured k = 1904
Covering Set = 5, 13, 43
Trivial Factors k == 1 mod 2(2) and k == 1 mod 3(3) and k == 1 mod 7(7)

Found Primes: 537k's - File attached

Remaining k's: 4's - Tested to n=25K
408*253^n-1
1650*253^n-1
1652*253^n-1
1854*253^n-1

Trivial Factor Eliminations: 408k's

MOB Eliminations: 2k's
506
1518

Base Released

KEP · 2010-04-21, 14:53

S383 is at n=25K, 50 k's remaining. Continuing to n=100K, is going to e-mail residuals and remaining k's aswell as other script created files in a short while to Gary.

KEP

MyDogBuster · 2010-04-22, 00:26

Sierp Base 343
Conjectured k = 1936
Covering Set = 5, 13, 43
Trivial Factors k == 1 mod 2(2) and k == 2 mod 3(3) and k == 18 mod 19(19)

Found Primes: 598k's - File attached

Remaining k's: 11k's - File attached - Tested to n=25K

k=216 proven composite by full algebraic factors

Trivial Factor Eliminations: 357k's

Base Released

Batalov · 2010-04-22, 00:43

Quote:

Originally Posted by MyDogBuster

Sierp Base 343
Remaining k's: 11k's - File attached - Tested to n=25K

...k=216 proven composite by full algebraic factors

And so do k=64 and k=1000.

Batalov · 2010-04-22, 08:58

I would like to advance S343 to 50K.

unconnected · 2010-04-22, 12:12

Riesel base 447, k=148.
Primes attached.

Remaining k's:
78*447^n-1
118*447^n-1
146*447^n-1

Base completed to 25K and released.

rogue · 2010-04-22, 12:31

I haven't posted any in a few days, so in keeping with an average of one per day...

Primes found:

2*455^2-1
4*455^3-1
6*455^1-1
8*455^2-1
10*455^1-1
12*455^8-1
14*455^20-1
16*455^5-1
18*455^198-1

With a conjectured k of 20, this conjecture is proven.

2*413^6-1
4*413^23-1
6*413^1-1
8*413^4-1
10*413^1-1
12*413^2-1
14*413^20-1
16*413^1-1
18*413^1-1
20*413^4-1

With a conjectured k of 22, this conjecture is proven.

2*340^60-1
3*340^1-1
5*340^1-1
6*340^1-1
8*340^1-1
9*340^3-1
11*340^1-1
12*340^1-1
14*340^1-1
15*340^1-1
17*340^1-1
18*340^22-1
20*340^12-1
21*340^2-1
23*340^3-1
24*340^4-1
26*340^1-1
27*340^2-1
29*340^1-1
30*340^2-1

The other k have trivial factors. With a conjectured k of 32, this conjecture is proven.

unconnected · 2010-04-22, 14:01

Riesel base 353, k=58.
Primes attached.

1k's remain: 52*353^n-1
Trivially factors: k=12,34,56.

Base completed to 25K and released.

unconnected · 2010-04-23, 05:43

Riesel base 373, k=74.
Primes:
2*373^3-1
6*373^1-1
8*373^4-1
12*373^3-1
14*373^8-1
20*373^1-1
24*373^1-1
26*373^1-1
30*373^15-1
36*373^5-1
38*373^1-1
42*373^3-1
44*373^1-1
48*373^1-1
50*373^10-1
54*373^4-1
56*373^1-1
60*373^11-1
62*373^2-1
66*373^31-1
68*373^14-1
72*373^3-1

1k's remain: 18*373^n-1
Trivially factors: 13 k's.

Base completed to 25K and released.

2010-04-19, 04:26	#320
Batalov "Serge" Mar 2008 Phi(4,2^7658614+1)/2 2⁴·593 Posts	R361 Done with R361 to 25K. For a CK of 8870, very few (15) k's remain (of which three are tested to higher limits for R19). Results emailed to Gary. Base released.

2010-04-19, 11:49	#322
MyDogBuster May 2008 Wilmington, DE B24₁₆ Posts	Riesel Base 253 Riesel Base 253 Conjectured k = 1904 Covering Set = 5, 13, 43 Trivial Factors k == 1 mod 2(2) and k == 1 mod 3(3) and k == 1 mod 7(7) Found Primes: 537k's - File attached Remaining k's: 4's - Tested to n=25K 408253^n-1 1650253^n-1 1652253^n-1 1854253^n-1 Trivial Factor Eliminations: 408k's MOB Eliminations: 2k's 506 1518 Base Released Last fiddled with by MyDogBuster on 2014-09-02 at 09:15

2010-04-22, 00:26	#324
MyDogBuster May 2008 Wilmington, DE 2²·23·31 Posts	Sierp Base 343 Sierp Base 343 Conjectured k = 1936 Covering Set = 5, 13, 43 Trivial Factors k == 1 mod 2(2) and k == 2 mod 3(3) and k == 18 mod 19(19) Found Primes: 598k's - File attached Remaining k's: 11k's - File attached - Tested to n=25K k=216 proven composite by full algebraic factors Trivial Factor Eliminations: 357k's Base Released Last fiddled with by MyDogBuster on 2014-09-02 at 09:15

2010-04-22, 12:31	#328
rogue "Mark" Apr 2003 Between here and the 2⁴·397 Posts	Riesel bases 455, 413, and 340 I haven't posted any in a few days, so in keeping with an average of one per day... Primes found: 2455^2-1 4455^3-1 6455^1-1 8455^2-1 10455^1-1 12455^8-1 14455^20-1 16455^5-1 18455^198-1 With a conjectured k of 20, this conjecture is proven. 2413^6-1 4413^23-1 6413^1-1 8413^4-1 10413^1-1 12413^2-1 14413^20-1 16413^1-1 18413^1-1 20413^4-1 With a conjectured k of 22, this conjecture is proven. 2340^60-1 3340^1-1 5340^1-1 6340^1-1 8340^1-1 9340^3-1 11340^1-1 12340^1-1 14340^1-1 15340^1-1 17340^1-1 18340^22-1 20340^12-1 21340^2-1 23340^3-1 24340^4-1 26340^1-1 27340^2-1 29340^1-1 30*340^2-1 The other k have trivial factors. With a conjectured k of 32, this conjecture is proven.

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2010-04-19, 09:53	#321
unconnected May 2009 Russia, Moscow 2,593 Posts	Riesel base 443, k=28 Primes: 2443^12-1 4443^3-1 6443^1-1 8443^416-1 10443^3-1 12443^3-1 16443^165-1 20443^6-1 22443^7-1 24443^1-1 26*443^2-1 Trivially factors: k=14, 18 Base proven.

2010-04-21, 14:53	#323
KEP Quasi Admin Thing May 2005 2·3·7·23 Posts	S383 is at n=25K, 50 k's remaining. Continuing to n=100K, is going to e-mail residuals and remaining k's aswell as other script created files in a short while to Gary. KEP

2010-04-22, 08:58	#326
Batalov "Serge" Mar 2008 Phi(4,2^7658614+1)/2 2⁴×593 Posts	I would like to advance S343 to 50K.

2010-04-23, 05:43	#330
unconnected May 2009 Russia, Moscow 2,593 Posts	Riesel base 373, k=74. Primes: 2373^3-1 6373^1-1 8373^4-1 12373^3-1 14373^8-1 20373^1-1 24373^1-1 26373^1-1 30373^15-1 36373^5-1 38373^1-1 42373^3-1 44373^1-1 48373^1-1 50373^10-1 54373^4-1 56373^1-1 60373^11-1 62373^2-1 66373^31-1 68373^14-1 72373^3-1 1k's remain: 18*373^n-1 Trivially factors: 13 k's. Base completed to 25K and released.