%I A139935
%S A139935 2,173,197,233,257,317,353,593,653,857,1013,1097,1277,1373,1553,1613,
%T A139935 1637,1697,1733,1913,1973,2237,2393,2417,2477,2657,2693,2753,2837,2957,
%U A139935 3137,3413,3617,3797,4073,4133,4217,4337,4373,4397,4457,4493
%N A139935 Primes of the form 2x^2+2xy+173y^2.
%C A139935 Discriminant=-1380. See A139827 for more information.
%F A139935 The primes are congruent to {2, 77, 173, 197, 233, 257, 317, 353, 377, 
               473, 533, 593, 653, 737, 857, 1013, 1037, 1097, 1133, 1277, 1313, 
               1337, 1373} (mod 1380).
%t A139935 QuadPrimes[2, -2, 173, 10000] (* see A106856 *)
%Y A139935 Sequence in context: A163970 A007760 A051030 this_sequence A103427 A139942 
               A094221
%Y A139935 Adjacent sequences: A139932 A139933 A139934 this_sequence A139936 A139937 
               A139938
%K A139935 nonn,easy
%O A139935 1,1
%A A139935 T. D. Noe (noe(AT)sspectra.com), May 02 2008