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Search: id:A069781
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| A069781 |
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n is such that GCD[d(n^3),d(n)] is not a power of 2. |
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+0
3
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| 432, 576, 648, 1600, 2000, 2160, 2880, 2916, 3024, 3136, 3240, 4032, 4536, 4752, 4800, 5000, 5488, 5616, 6000, 6336, 7128, 7344, 7488, 7744, 8208, 8424, 9408, 9792, 9936, 10125, 10800, 10816, 10944, 11016, 11200, 12312, 12528, 13248, 13392
(list; graph; listen)
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OFFSET
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1,1
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FORMULA
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Log [2, GCD[A000005(n^3), A000005(n)]] is nonintegral.
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EXAMPLE
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For n<100000,GCD[d(n^3),d[n]]={5,7,10,14,20,28,40,80} which is obtained for n={20736,576,432,2880,54000,20160,2160,15120} respectively.
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MATHEMATICA
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f[x_] := GCD[DivisorSigma[0, x^3], DivisorSigma[0, x]] Do[s=f[n]; If[ !IntegerQ[Log[2, s]], Print[n]], {n, 1, 100000}]
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CROSSREFS
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Cf. A000005, A061701, A037992, A069780, A069782.
Sequence in context: A063463 A175026 A066419 this_sequence A006910 A015229 A109123
Adjacent sequences: A069778 A069779 A069780 this_sequence A069782 A069783 A069784
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KEYWORD
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easy,nonn
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AUTHOR
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Labos E. (labos(AT)ana.sote.hu), Apr 08 2002
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