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Search: id:A084712
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| A084712 |
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Smallest prime of the form (2n)^k +1, or 0 if no such number exists. |
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+0
4
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| 3, 5, 7, 0, 11, 13, 197, 17, 19, 401, 23, 577, 677, 29, 31, 0, 1336337, 37, 0, 41, 43, 197352587024076973231046657, 47, 5308417, 0, 53, 2917, 3137, 59, 61, 0, 0, 67, 0, 71, 73, 5477, 1238846438084943599707227160577, 79, 40960001, 83, 7057, 0, 89
(list; graph; listen)
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OFFSET
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1,1
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COMMENT
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It has not been proved that a(19), a(25), a(31), a(34), a(43) and a(46) are 0; if these values do exist, they have > 4000 digits. The other zeros are definite. - David Wasserman (wasserma(AT)spawar.navy.mil), Jan 03 2005
a((p-1)/2) = p for primes p>2, or a(n) = 2n+1 for n = (p-1)/2. All other positive a(n) belong to A002496 = primes of form n^2 + 1. Corresponding positive exponents k are powers of 2. They are listed in A079706. - Alexander Adamchuk (alex(AT)kolmogorov.com), Sep 17 2006
Because k must be a power of 2, numbers of the form (2n)^k+1 are called generalized Fermat numbers with base 2n. These numbers, like the regular Fermat numbers, are seldom prime. I checked n=19, 25, 31, 34, 43, 46 with k up to 2^16 without finding any primes. - T. D. Noe (noe(AT)sspectra.com), May 13 2008
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EXAMPLE
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a(7) = 197 = 14^2 +1 as 14 +1 =15 is not a prime.
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MATHEMATICA
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Table[k=1; While[p=1+(2n)^k; k<1024 && !PrimeQ[p], k=2k]; If[k==1024, 0, p], {n, 44}] - T. D. Noe (noe(AT)sspectra.com), May 13 2008
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CROSSREFS
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Cf. A084713.
Cf. A005097.
Sequence in context: A085090 A084713 A162538 this_sequence A031100 A031057 A133069
Adjacent sequences: A084709 A084710 A084711 this_sequence A084713 A084714 A084715
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KEYWORD
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nonn
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AUTHOR
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Amarnath Murthy (amarnath_murthy(AT)yahoo.com), Jun 10 2003
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EXTENSIONS
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More terms from David Wasserman (wasserma(AT)spawar.navy.mil), Jan 03 2005
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