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A139913
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Primes of the form 17x^2+8xy+17y^2.
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2
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17, 101, 173, 257, 269, 521, 677, 797, 857, 881, 1013, 1049, 1109, 1193, 1277, 1301, 1361, 1433, 1613, 1637, 1889, 1949, 1973, 2141, 2357, 2393, 2441, 2609, 2729, 2861, 3041, 3449, 3461, 3533, 3617, 3701, 3797, 3821, 4073, 4133, 4157, 4241
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OFFSET
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1,1
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COMMENTS
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Discriminant=-1092. See A139827 for more information.
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LINKS
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FORMULA
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The primes are congruent to {17, 101, 173, 185, 209, 257, 269, 341, 425, 521, 545, 677, 797, 857, 881, 965, 1013, 1049} (mod 1092).
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MATHEMATICA
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Union[QuadPrimes2[17, 8, 17, 10000], QuadPrimes2[17, -8, 17, 10000]] (* see A106856 *)
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PROG
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(Magma) [ p: p in PrimesUpTo(5000) | p mod 1092 in [17, 101, 173, 185, 209, 257, 269, 341, 425, 521, 545, 677, 797, 857, 881, 965, 1013, 1049]]; // Vincenzo Librandi, Aug 01 2012
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CROSSREFS
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KEYWORD
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nonn,easy
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AUTHOR
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STATUS
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approved
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