n=75 done to 250k new primes are:
75*2^54510-1 is prime! Time : 11.0 sec.
75*2^70828-1 is prime! Time : 22.0 sec.
75*2^79292-1 is prime! Time : 24.0 sec.
75*2^80938-1 is prime! Time : 31.0 sec.
75*2^84432-1 is prime! Time : 35.0 sec.
75*2^92235-1 is prime! Time : 37.0 sec.
75*2^113429-1 is prime! Time : 133.0 sec.
75*2^170933-1 is prime! Time : 172.0 sec.
75*2^182433-1 is prime! Time : 523.0 sec.
75*2^196071-1 is prime! Time : 190.0 sec.
75*2^199819-1 is prime! Time : 181.0 sec.
75*2^231580-1 is prime! Time : 142.0 sec.

Should I give someone the residuals ?
Best Regards, Keller

In reply to Kosmaj's post in the "Low weight 15k's" tree I present here a list of the Nash weights for all (odd) k < 300:
(note that w is the weight for n=100001-110000, and w' the weight for n=1-10000)
[CODE] k w w'
1 925 1176
3 2976 2933
5 2180 2176
7 912 917
9 1674 1678
11 795 791
13 1066 1070
15 2221 2222
17 2416 2426
19 1292 1294
21 2103 2116
23 1332 1343
25 1571 1568
27 2376 2385
29 495 485
31 2188 2199
33 2675 2674
35 1264 1261
37 630 629
39 1213 1225
41 1174 1173
43 633 640
45 3747 3767
47 922 922
49 1839 1844
51 1550 1532
53 1368 1370
55 2113 2124
57 2672 2668
59 639 642
61 2170 2192
63 2807 2815
65 2034 2035
67 829 839
69 3438 3437
71 593 604
73 800 818
75 3181 3184
77 1700 1699
79 1150 1152
81 1698 1673
83 2056 2072
85 921 928
87 2839 2849
89 1238 1243
91 2374 2376
93 2149 2151
95 1490 1508
97 829 837
99 2773 2776
101 531 527
103 1373 1373
105 2897 2905
107 1447 1453
109 594 599
111 2954 2965
113 1108 1109
115 1954 1932
117 3581 3571
119 656 656
121 965 956
123 2133 2128
125 1429 1427
127 325 332
129 2753 2751
131 1065 1065
133 1442 1449
135 2322 2314
137 1109 1113
139 2586 2592
141 1901 1887
143 2243 2241
145 1098 1105
147 2806 2800
149 1022 1028
151 692 680
153 3189 3182
155 1317 1309
157 917 920
159 2237 2238
161 1273 1275
163 737 735
165 3669 3675
167 2263 2265
169 1594 1602
171 2674 2692
173 1999 2006
175 1792 1803
177 1622 1639
179 779 780
181 2940 2942
183 1685 1665
185 2161 2168
187 1158 1163
189 2793 2799
191 314 319
193 760 756
195 4106 4106
197 1573 1572
199 2655 2654
201 3211 3206
203 1687 1688
205 1351 1344
207 1798 1823
209 998 997
211 1039 1049
213 2538 2563
215 2245 2241
217 806 803
219 1069 1053
221 418 429
223 341 342
225 1430 1408
227 2550 2564
229 2195 2208
231 3340 3354
233 1241 1243
235 1563 1563
237 2404 2425
239 388 388
241 1600 1599
243 2877 2836
245 1419 1432
247 363 350
249 1592 1599
251 417 422
253 185 181
255 3297 3322
257 1867 1873
259 1561 1559
261 2394 2401
263 1215 1221
265 2008 2005
267 2205 2221
269 473 477
271 1510 1514
273 3029 3029
275 1581 1571
277 865 870
279 2345 2348
281 937 939
283 597 589
285 3331 3316
287 1307 1291
289 1642 1653
291 1969 1975
293 1483 1493
295 1266 1272
297 2974 2951
299 1199 1200[/CODE]
-- Thomas11

253 seems a good candidate!
So i started sieving to n=10 Millions for futur projects.
I'll stop sieving when all k's below 300 are done to n=200,000
Then, it will be available for LLRnet or other projects.

Joss

Doesn't the new LLR speed up testing for all k<512? Could we see a list of the weights for all such k?

regards,
masser

[QUOTE=Thomas11]In reply to Kosmaj's post in the "Low weight 15k's" tree I present here a list of the Nash weights for all (odd) k < 300:
(note that w is the weight for n=100001-110000, and w' the weight for n=1-10000)
-- Thomas11[/QUOTE]

Thomas11,
What is the real weight of 9 and 81 after you remove all the even n values?

Citrix
:cool: :cool: :cool:

Citrix, the weights of 9 and 81 are:
[CODE] k w w'
9 1674 1678
81 1698 1673[/CODE]

and after removing the even values of n we get:
[CODE] k w w'
9 1447 1458
81 1538 1526[/CODE]

-- Thomas11.

Here are the weights between k=301 and k=511:
[CODE] k w w'
301 2158 2148
303 1488 1471
305 809 807
307 665 663
309 2060 2083
311 442 441
313 1437 1427
315 3794 3803
317 1398 1394
319 1792 1791
321 2615 2611
323 1258 1269
325 1667 1672
327 3160 3162
329 871 873
331 601 610
333 2427 2433
335 1464 1449
337 286 280
339 3025 3025
341 972 961
343 795 786
345 2447 2426
347 1446 1446
349 1463 1441
351 1851 1838
353 1416 1416
355 2135 2126
357 2941 2937
359 853 841
361 1627 1612
363 3194 3210
365 1335 1356
367 1290 1302
369 2644 2644
371 1435 1425
373 537 544
375 2873 2873
377 2175 2166
379 1349 1328
381 2491 2496
383 1926 1929
385 1665 1678
387 1853 1850
389 613 615
391 2555 2548
393 1827 1833
395 1838 1851
397 854 857
399 2695 2710
401 737 749
403 608 608
405 4100 4123
407 746 750
409 1205 1205
411 2930 2935
413 2070 2071
415 1393 1396
417 1761 1757
419 627 624
421 1823 1818
423 2348 2350
425 2305 2300
427 903 895
429 2178 2167
431 804 809
433 1522 1518
435 1957 1973
437 2780 2792
439 1651 1645
441 2899 2887
443 787 788
445 1245 1249
447 3418 3418
449 590 582
451 2005 2004
453 3162 3175
455 1416 1417
457 511 499
459 2260 2242
461 880 888
463 820 806
465 4852 4885
467 1203 1226
469 1554 1553
471 2376 2373
473 1299 1285
475 1676 1666
477 1767 1766
479 1359 1364
481 1850 1852
483 3844 3848
485 1180 1176
487 702 715
489 3058 3080
491 440 448
493 1394 1388
495 3715 3706
497 1209 1203
499 1293 1291
501 2005 2012
503 2610 2605
505 852 858
507 3502 3507
509 475 470
511 3080 3080[/CODE]

-- Thomas11.

K=83
 

reserve 83 for me please, to 200000. Thanks.

Harvey563

K=87
 

I'd also like to reserve k=87 to 200000. Thanks.

Harvey563

k=19 completed to 517700
 

I have completed k=19 up to 517700, with no new primes since 353661. I am quitting k=19. If anyone wants to go higher, it's up for grabs.

Harvey563

[QUOTE=Harvey563]I have completed k=19 up to 517700, with no new primes since 353661. I am quitting k=19. If anyone wants to go higher, it's up for grabs.

Harvey563[/QUOTE]

Have you a sieve-file for k=19? If so, could you send me this, please? My email-adress is christian(dot)hercher(at)t-online(dot)de.

Cyrix