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A216328
Values for b in abc-triples with a = 2.
0
243, 70225, 265879, 953125, 1015623, 1071873, 1922373, 6436341, 6739605, 7263025
OFFSET
1,1
COMMENTS
The listed 10 b-values are the ones for all (2,b,2+b) triples
with b from the range {1, 2, ..., 10^7}. The best quality among these values appears for n=8: (2, 6436341, 6436343), b = 3^10*109, with rad(2*b*(2+b)) = 15042 =2*3*23*109 and q(2,6436341,6436343) = 1.629911684 (maple 10 digits). See Tabl. I of the (not updated) link: The ABC Conjecture Home Page.
See A216323 for the list of increasing b values for abc-triples if a=1. There one finds also a reference and a maple program which can be adapted to a=2 instead of a=1.
This sequence is infinite because it contains the infinite subsequence b(k) = 243^(84k+1), k >= 0. - William Hu, Aug 29 2024
LINKS
FORMULA
(2, b=a(n), 2+a(n)) is an abc-triple (which has quality q > 1) with increasingly ordered b values. See the comment above for abc-triples.
EXAMPLE
n: (a=2, b, c=2+a), rad(a*b*c), q(a*b*c) (maple 10 digits)
1: (2, 243, 245), 210, 1.028828797
2: (2, 70225, 70227), 27030, 1.093563284
3: (2, 255879, 255881), 252642, 1.001024059
4: (2, 953125, 953127), 525210, 1.045245231
5: (2, 1015623, 1015625), 128310, 1.175886268
6: (2, 1071873, 1071875), 926310, 1.010623492
7: (2, 1922373, 1922375), 799890, 1.064510569
8: (2, 6436341, 6436343), 15042, 1.629911684
9: (2, 6739605, 6739607), 3621030, 1.041135746
10: (2, 7263025, 7263027), 94710, 1.378732296
...
From Wolfdieter Lang, Oct 02 2012: (Start)
The prime number decomposition of the ten b-values is
3^5, 5^2*53^2, 3^9*13, 5^6*61, 3^2*7^4*47, 3^5*11*401, 3^8*293, 3^10*109, 3^6*5*43^2, 5^2*7^4*11^2.
The ten c = b+2 numbers have the prime number decomposition
5*7^2, 3^5*17^2, 41*79^2, 3^4*7*41^2, 5^7*13, 5^5*7^3, 5^3*7*13^3, 23^5, 7^5*401, 3^11*41. (End)
MAPLE
See the program given in A216323, adapted to a=2.
CROSSREFS
Sequence in context: A223978 A223573 A223329 * A086649 A184691 A017021
KEYWORD
nonn,more
AUTHOR
Wolfdieter Lang, Sep 28 2012
STATUS
approved