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Search: id:A066510
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| A066510 |
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Conjectured list of positive numbers which are not of the form r^i-s^j, where r,s,i,j are integers with i>1, j>1. |
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+0
2
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| 6, 14, 34, 42, 58, 62, 66, 70, 78, 86, 90, 102, 110, 114, 130, 158, 178, 182, 202, 210, 230, 238, 254, 258, 266, 274, 278, 302, 306, 310, 314, 322, 326, 330, 358, 374, 378, 390, 394, 398, 402, 410, 418, 422, 426, 430, 434, 438, 446, 450, 454
(list; graph; listen)
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OFFSET
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1,1
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COMMENT
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This is a famous hard problem and the terms shown are only conjectured values.
The terms shown are not the difference of two powers below 10^19. - Don Reble.
One can immediately represent the odd numbers and the multiples of four as differences of two squares. - Don Reble.
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REFERENCES
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R. K. Guy, Unsolved Problems in Number Theory, Sections D9 and B19.
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LINKS
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Alf van der Poorten, Remarks on the sequence of 'perfect' powers
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EXAMPLE
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Examples showing that certain numbers are not in the sequence: 10 = 13^3-3^7, 22 = 7^2 - 3^3, 29 = 15^2 - 14^2, 31 = 2^5 - 1, 52 = 14^2 - 12^2, 54 = 3^4 - 3^3, 60 = 2^6 - 2^2, 68 = 10^2 - 2^5, 72 = 3^4 - 3^2, 76 = 5^3 - 7^2, 84 = 10^2 - 2^4, ...
50 = 7^2 - -1^3, 82 = 9^2 - -1^3, 226 = 15^2 - -1^3, 246 = 11^2 - -5^3, 290 = 17^2 - -1^3, ... [Typos corrected by Gerry Myerson (gerry(AT)math.mq.edu.au), May 14 2008]
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CROSSREFS
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Cf. A074980, A023057.
Adjacent sequences: A066507 A066508 A066509 this_sequence A066511 A066512 A066513
Sequence in context: A078836 A142875 A074981 this_sequence A036387 A053560 A119874
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KEYWORD
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nonn,hard
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AUTHOR
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Don Reble (djr(AT)nk.ca), Oct 12 2002
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