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2016-05-17, 18:52
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#34 |
Jul 2003
13×47 Posts |
hi,
here are the results for carol / kynea b=136, 138, 140, 142, 146, 148, 150, 152 n=1 to 10000 Code:
-- (136^1-1)^2-2 (136^6-1)^2-2 (136^12+1)^2-2 (136^47+1)^2-2 -- (138^1+1)^2-2 (138^2+1)^2-2 (138^6-1)^2-2 (138^10-1)^2-2 (138^69+1)^2-2 (138^105-1)^2-2 (138^1716+1)^2-2 (138^4534-1)^2-2 (138^5407+1)^2-2 (138^6300+1)^2-2 (138^9489-1)^2-2 -- (140^1-1)^2-2 (140^4-1)^2-2 (140^5-1)^2-2 (140^29-1)^2-2 (140^41+1)^2-2 (140^155-1)^2-2 (140^382-1)^2-2 (140^395+1)^2-2 (140^485-1)^2-2 (140^1375-1)^2-2 (140^1528-1)^2-2 (140^4267+1)^2-2 (140^4456+1)^2-2 (140^5120+1)^2-2 (140^5396+1)^2-2 (140^5757-1)^2-2 -- (142^3+1)^2-2 (142^15-1)^2-2 (142^48+1)^2-2 (142^4869+1)^2-2 -- (146^1-1)^2-2 (146^3+1)^2-2 (146^20+1)^2-2 (146^35-1)^2-2 (146^37-1)^2-2 (146^403+1)^2-2 (146^2475+1)^2-2 (146^6965-1)^2-2 -- (148^2-1)^2-2 (148^4+1)^2-2 (148^20+1)^2-2 (148^30+1)^2-2 (148^43+1)^2-2 (148^60-1)^2-2 (148^112+1)^2-2 (148^255-1)^2-2 (148^422-1)^2-2 (148^528-1)^2-2 (148^1300-1)^2-2 -- (150^4+1)^2-2 (150^8-1)^2-2 (150^20-1)^2-2 (150^30-1)^2-2 (150^34+1)^2-2 (150^260-1)^2-2 -- (152^2+1)^2-2 (152^3-1)^2-2 (152^5-1)^2-2 (152^51+1)^2-2 (152^156+1)^2-2 (152^444+1)^2-2 (152^1263-1)^2-2 (152^1317-1)^2-2 -- |
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2016-05-17, 19:40
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#35 |
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Jul 2003
13×47 Posts |
hi,
here are the results for carol / kynea b=154, 156, 158, 160, 162, 164, 166, 168 n=1 to 10000 Code:
-- (154^1+1)^2-2 (154^24-1)^2-2 (154^49+1)^2-2 (154^68-1)^2-2 (154^75+1)^2-2 (154^82+1)^2-2 (154^371+1)^2-2 (154^612+1)^2-2 (154^1495-1)^2-2 -- (156^1-1)^2-2 (156^136-1)^2-2 (156^152+1)^2-2 (156^461+1)^2-2 (156^1663-1)^2-2 -- (158^14-1)^2-2 (158^1893+1)^2-2 (158^8227+1)^2-2 -- (160^1+1)^2-2 (160^4-1)^2-2 (160^5+1)^2-2 (160^11-1)^2-2 (160^24+1)^2-2 (160^30+1)^2-2 (160^85-1)^2-2 (160^104+1)^2-2 (160^127-1)^2-2 (160^135+1)^2-2 (160^148+1)^2-2 (160^1104-1)^2-2 -- (162^1-1)^2-2 (162^12+1)^2-2 (162^82-1)^2-2 (162^386-1)^2-2 (162^447+1)^2-2 (162^3198-1)^2-2 (162^8342+1)^2-2 -- (164^2-1)^2-2 (164^6+1)^2-2 (164^15+1)^2-2 (164^1358-1)^2-2 (164^4967+1)^2-2 -- (166^2+1)^2-2 (166^3+1)^2-2 (166^78+1)^2-2 (166^321-1)^2-2 (166^9492-1)^2-2 -- (168^1+1)^2-2 (168^11-1)^2-2 (168^16+1)^2-2 (168^24-1)^2-2 (168^44+1)^2-2 (168^230+1)^2-2 (168^380-1)^2-2 (168^1140-1)^2-2 (168^6988+1)^2-2 -- |
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2016-05-17, 20:28
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#36 |
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Jul 2003
13×47 Posts |
hi,
here are the results for carol / kynea b=170, 172, 174, 176, 178, 180, 182, 184 n=1 to 10000 Code:
-- (170^1-1)^2-2 (170^11+1)^2-2 (170^18-1)^2-2 (170^19-1)^2-2 (170^53+1)^2-2 (170^135-1)^2-2 (170^460-1)^2-2 (170^692+1)^2-2 (170^1059-1)^2-2 (170^1528-1)^2-2 (170^1653-1)^2-2 (170^2921+1)^2-2 (170^5141+1)^2-2 (170^9373-1)^2-2 -- (172^1+1)^2-2 (172^3+1)^2-2 (172^24+1)^2-2 (172^126+1)^2-2 (172^174-1)^2-2 (172^246-1)^2-2 (172^302-1)^2-2 (172^492+1)^2-2 (172^745+1)^2-2 (172^778+1)^2-2 (172^1191-1)^2-2 (172^1302-1)^2-2 (172^3680-1)^2-2 -- (174^1-1)^2-2 (174^2+1)^2-2 (174^10+1)^2-2 (174^15-1)^2-2 (174^20-1)^2-2 (174^96-1)^2-2 (174^354-1)^2-2 (174^396+1)^2-2 (174^1100+1)^2-2 (174^3894+1)^2-2 -- (176^1+1)^2-2 (176^6-1)^2-2 (176^7+1)^2-2 (176^29-1)^2-2 (176^2001-1)^2-2 (176^3385+1)^2-2 (176^7360-1)^2-2 (176^7566+1)^2-2 (176^8866+1)^2-2 -- (178^1-1)^2-2 (178^3+1)^2-2 (178^4+1)^2-2 (178^6+1)^2-2 (178^9-1)^2-2 (178^174-1)^2-2 (178^313-1)^2-2 (178^609-1)^2-2 (178^839+1)^2-2 -- (180^14+1)^2-2 (180^42-1)^2-2 (180^189+1)^2-2 (180^218+1)^2-2 (180^251-1)^2-2 (180^360+1)^2-2 -- (182^1+1)^2-2 (182^5+1)^2-2 (182^6+1)^2-2 (182^227+1)^2-2 (182^310-1)^2-2 (182^1258-1)^2-2 (182^1348+1)^2-2 -- (184^1-1)^2-2 (184^2+1)^2-2 (184^12+1)^2-2 (184^51+1)^2-2 (184^160-1)^2-2 (184^671+1)^2-2 (184^2907-1)^2-2 (184^3417-1)^2-2 -- |
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2016-05-17, 21:15
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#37 |
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Jul 2003
13×47 Posts |
hi,
here are the results for carol / kynea b=186, 188, 190, 192, 194, 198, 200 n=1 to 10000 Code:
-- (186^2-1)^2-2 (186^6+1)^2-2 (186^12-1)^2-2 (186^206-1)^2-2 (186^293-1)^2-2 (186^459+1)^2-2 (186^811+1)^2-2 (186^1968+1)^2-2 -- (188^2+1)^2-2 (188^5+1)^2-2 (188^27-1)^2-2 (188^39-1)^2-2 (188^55-1)^2-2 (188^77-1)^2-2 (188^926+1)^2-2 (188^1406-1)^2-2 (188^2225+1)^2-2 (188^2544-1)^2-2 (188^3863+1)^2-2 (188^5495+1)^2-2 (188^6052-1)^2-2 (188^6292-1)^2-2 -- (190^2-1)^2-2 (190^1+1)^2-2 (190^4+1)^2-2 (190^6-1)^2-2 (190^18-1)^2-2 (190^40-1)^2-2 (190^71+1)^2-2 (190^262+1)^2-2 (190^431-1)^2-2 (190^2841+1)^2-2 -- (192^1-1)^2-2 (192^2-1)^2-2 (192^7-1)^2-2 (192^26-1)^2-2 (192^39-1)^2-2 (192^1017+1)^2-2 (192^7989+1)^2-2 -- (194^3+1)^2-2 (194^29-1)^2-2 (194^180-1)^2-2 (194^5007-1)^2-2 -- (198^6+1)^2-2 (198^12+1)^2-2 (198^103-1)^2-2 (198^118-1)^2-2 -- (200^3+1)^2-2 (200^20-1)^2-2 (200^33+1)^2-2 (200^36-1)^2-2 (200^37+1)^2-2 (200^5448+1)^2-2 -- |
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2016-05-17, 22:22
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#38 |
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Jul 2003
13·47 Posts |
hi,
here are the results for carol / kynea b=80, 82, 84, 86, 88, 90 n=1000 to 30000 -- (80^1445+1)^2-2 (80^22631+1)^2-2 -- (82^1074-1)^2-2 (82^1212-1)^2-2 (82^1866+1)^2-2 (82^20148-1)^2-2 -- (84^1253-1)^2-2 (84^1922-1)^2-2 (84^2613-1)^2-2 (84^4162+1)^2-2 (84^5582-1)^2-2 (84^14493+1)^2-2 -- (86^1120-1)^2-2 (86^2053-1)^2-2 (86^11270+1)^2-2 -- (88^1072+1)^2-2 (88^5100+1)^2-2 (88^28032+1)^2-2 -- (90^1105-1)^2-2 (90^2186-1)^2-2 (90^3120+1)^2-2 (90^6957-1)^2-2 -- |
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2016-05-18, 12:43
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#39 |
"Mark"
Apr 2003
Between here and the
11000110010112 Posts |
lalera, thanks for your work on this. I have made all of the updates. Please double-check to verify that I didn't make any mistakes.
It is curious that all bases for both Carol and Kynea have at least one prime. I was expecting one or more to have no primes for n < 1000. |
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2016-05-18, 17:25
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#40 |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
22×23×103 Posts |
There are b=640 and 688 without "easy" primes (and then a bit above them, b=1656,
Some of the larger "but still small" first primes: Code:
(926^699-1)^2-2 (368^969+1)^2-2 (970^1008-1)^2-2 (1318^1013+1)^2-2 (982^1053-1)^2-2 (1432^1578-1)^2-2 (1038^2107-1)^2-2 (1388^7458-1)^2-2 (1452^574+1)^2-2 (1466^4249-1)^2-2 (1468^4351+1)^2-2 (1484^581-1)^2-2 (1614^2907+1)^2-2 (1852^6341-1)^2-2 (1950^8442+1)^2-2 (1992^472+1)^2-2 Last fiddled with by Batalov on 2016-05-19 at 14:30 Reason: upped to b<=2000 |
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2016-05-18, 18:04
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#41 | |
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"Mark"
Apr 2003
Between here and the
11·577 Posts |
Quote:
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2016-05-18, 18:14
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#42 |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
22·23·103 Posts |
I'd quickly searched them just now. A list generated with GP was
Code:
? forstep(b=2,2000,2,if(ispower(b)>1,next);q=0;for(n=1,400,if(ispseudoprime((b^n-1)^2-2),q=1;break);if(ispseudoprime((b^n+1)^2-2),q=1;break));if(!q,print1(" "b)))
368 640 688 926 970 982 1038 1270 1318 1388 1432 1452 1466 1468 1484 1614 1656 1852 1950 1992
I guess, I will reserve b=640, 688 to n <= 30000 for starters, now. |
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2016-05-18, 21:06
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#43 |
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"Mark"
Apr 2003
Between here and the
11·577 Posts |
Did you generate a list of primes for the bases? If so, I will likely need to offload the list elsewhere. Anyone know of a good place that I can host some web pages for free and not have to deal with ads?
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2016-05-18, 21:25
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#44 |
"Serge"
Mar 2008
Phi(4,2^7658614+1)/2
22·23·103 Posts |
No lists, because the GP scripts simply quits after very small primes (and that saves all the time; in particular, many bases have very small primes: n=1, 2, 3).
I will generate a proper list (most likely, just one (k,c) pair, of course) for b=640, 688. |
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