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Search: id:A128647
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| A128647 |
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Numerator of Sum[ (-1)^(k+1)*1/(Prime[k]-1), {k,1,n} ]. |
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+0
4
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| 1, 1, 3, 7, 41, 3, 53, 437, 5167, 34189, 36037, 3833, 3987, 11521, 274223, 3458639, 103063291, 100392623, 34273501, 33510453, 308270747, 302107667, 12626774467, 12402802537, 25216220279, 124110148411, 2142721739387, 111888942151111
(list; graph; listen)
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OFFSET
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1,3
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COMMENT
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A128648(n) = {1,2,4,12,60,5,80,720,7920,55440,55440,6160,6160,18480,...} = Denominator of Sum[ (-1)^(k+1)*1/(Prime[k]-1), {k,1,n} ]. A120271(n) = {1,3,7,23,121,21,173,1597,17927,127469,129317,43619,...} = Numerator of Sum[ 1/(Prime[k]-1), {k,1,n} ]. Numbers n such that A128648(n) equals A128646(n) are listed in A128649(n) = {1,2,3,4,5,7,8,9,10,11,14,15,16,17,21,22,23,24,25,26,27,28,29,30,31,32,33,34,35,65,66,71,...}.
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LINKS
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Eric Weisstein, Link to a section of The World of Mathematics. Prime Sums.
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FORMULA
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a(n) = Numerator[ Sum[ (-1)^(k+1)*1/(Prime[k]-1), {k,1,n} ] ].
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MATHEMATICA
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Table[Numerator[Sum[(-1)^(k+1)*1/(Prime[k]-1), {k, 1, n}]], {n, 1, 36}]
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CROSSREFS
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Cf. A128648 = Denominator of Sum[ (-1)^(k+1)*1/(Prime[k]-1), {k, 1, n} ]. Cf. A120271 = Numerator of Sum[ 1/(Prime[k]-1), {k, 1, n} ]. Cf. A128646, A128649, A119686, A006093, A000040.
Sequence in context: A019024 A135071 A096219 this_sequence A071730 A058815 A138901
Adjacent sequences: A128644 A128645 A128646 this_sequence A128648 A128649 A128650
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KEYWORD
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frac,nonn
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AUTHOR
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Alexander Adamchuk (alex(AT)kolmogorov.com), Mar 18 2007
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