17, 19, 23 ; n^2 - n + 17 ; FD:2; Complex Roots: 0.5+/-4.0926763859i ; 366 Primes = 36.60% ; 17, 19, 23, 29, 37, 47, 59, 73, 89, 107 ; Perf.Sqs = 289
31, 37, 41 ; -1n^2 + 9n + 23 ; FD:-2; Real Roots: -2.076473219 | +11.076473219 ; 371 Primes = 37.10% ; 31, 37, 41, 43, 43, 41, 37, 31, 23, 13 ; Perf.Sqs = 1, -1849
41, 43, 47 ; n^2 - n + 41 ; FD:2; Complex Roots: 0.5+/-6.3835726674i ; 582 Primes = 58.20% ; 41, 43, 47, 53, 61, 71, 83, 97, 113, 131 ; Perf.Sqs = 1681
61, 67, 71 ; -1n^2 + 9n + 53 ; FD:-2; Real Roots: -4.0586213843 | +13.0586213843 ; 434 Primes = 43.40% ; 61, 67, 71, 73, 73, 71, 67, 61, 53, 43 ; Perf.Sqs = 1, -5329
79, 83, 89 ; n^2 + n + 77 ; FD:2; Complex Roots: -0.5+/-8.760707734i ; 246 Primes = 24.60% ; 79, 83, 89, 97, 107, 119, 133, 149, 167, 187 ; Perf.Sqs = 5929
227, 229, 233 ; n^2 - n + 227 ; FD:2; Complex Roots: 0.5+/-15.0582203464i ; 445 Primes = 44.50% ; 227, 229, 233, 239, 247, 257, 269, 283, 299, 317 ; Perf.Sqs = 51529
271, 277, 281 ; -1n^2 + 9n + 263 ; FD:-2; Real Roots: -12.3300326797 | +21.3300326797 ; 510 Primes = 51.00% ; 271, 277, 281, 283, 283, 281, 277, 271, 263, 253 ; Perf.Sqs = -529, -80089
347, 349, 353 ; n^2 - n + 347 ; FD:2; Complex Roots: 0.5+/-18.6212244495i ; 412 Primes = 41.20% ; 347, 349, 353, 359, 367, 377, 389, 403, 419, 437 ; Perf.Sqs = 529, 120409
349, 353, 359 ; n^2 + n + 347 ; FD:2; Complex Roots: -0.5+/-18.6212244495i ; 411 Primes = 41.10% ; 349, 353, 359, 367, 377, 389, 403, 419, 437, 457 ; Perf.Sqs = 529, 120409
379, 383, 389 ; n^2 + n + 377 ; FD:2; Complex Roots: -0.5+/-19.4100489438i ; 418 Primes = 41.80% ; 379, 383, 389, 397, 407, 419, 433, 449, 467, 487 ; Perf.Sqs = 1369, 142129
439, 443, 449 ; n^2 + n + 437 ; FD:2; Complex Roots: -0.5+/-20.898564544i ; 360 Primes = 36.00% ; 439, 443, 449, 457, 467, 479, 493, 509, 527, 547 ; Perf.Sqs = 190969
467, 479, 487 ; -2n^2 + 18n + 451 ; FD:-4; Real Roots: -11.1764154066 | +20.1764154066 ; 474 Primes = 47.40% ; 467, 479, 487, 491, 491, 487, 479, 467, 451, 431 ; Perf.Sqs = -121, -1369, -10609, -54289, -368449, -1852321
569, 571, 577 ; 2n^2 - 4n + 571 ; FD:4; Complex Roots: 1+/-16.8671277934i ; 347 Primes = 34.70% ; 569, 571, 577, 587, 601, 619, 641, 667, 697, 731 ; Perf.Sqs = 961, 1369, 22201, 36481, 744769, 1229881
607, 613, 617 ; -1n^2 + 9n + 599 ; FD:-2; Real Roots: -20.3847342763 | +29.3847342763 ; 547 Primes = 54.70% ; 607, 613, 617, 619, 619, 617, 613, 607, 599, 589 ; Perf.Sqs = 529, -383161
641, 643, 647 ; n^2 - n + 641 ; FD:2; Complex Roots: 0.5+/-25.3130401177i ; 368 Primes = 36.80% ; 641, 643, 647, 653, 661, 671, 683, 697, 713, 731 ; Perf.Sqs = 3721, 410881
673, 677, 683 ; n^2 + n + 671 ; FD:2; Complex Roots: -0.5+/-25.8988416729i ; 453 Primes = 45.30% ; 673, 677, 683, 691, 701, 713, 727, 743, 761, 781 ; Perf.Sqs = 450241
677, 683, 691 ; n^2 + 3n + 673 ; FD:2; Complex Roots: -1.5+/-25.8988416729i ; 453 Primes = 45.30% ; 677, 683, 691, 701, 713, 727, 743, 761, 781, 803 ; Perf.Sqs = 450241
709, 719, 727 ; -1n^2 + 13n + 697 ; FD:-2; Real Roots: -20.6891522486 | +33.6891522486 ; 342 Primes = 34.20% ; 709, 719, 727, 733, 737, 739, 739, 737, 733, 727 ; Perf.Sqs = 529, -546121
743, 751, 757 ; -1n^2 + 11n + 733 ; FD:-2; Real Roots: -22.1269795671 | +33.1269795671 ; 458 Primes = 45.80% ; 743, 751, 757, 761, 763, 763, 761, 757, 751, 743 ; Perf.Sqs = -49, -582169
1031, 1033, 1039 ; 2n^2 - 4n + 1033 ; FD:4; Complex Roots: 1+/-22.7046250795i ; 471 Primes = 47.10% ; 1031, 1033, 1039, 1049, 1063, 1081, 1103, 1129, 1159, 1193 ; Perf.Sqs = 1369, 3481, 26569, 100489, 885481
1091, 1093, 1097 ; n^2 - n + 1091 ; FD:2; Complex Roots: 0.5+/-33.0265045077i ; 314 Primes = 31.40% ; 1091, 1093, 1097, 1103, 1111, 1121, 1133, 1147, 1163, 1181 ; Perf.Sqs = none
1277, 1279, 1283 ; n^2 - n + 1277 ; FD:2; Complex Roots: 0.5+/-35.7316386414i ; 456 Primes = 45.60% ; 1277, 1279, 1283, 1289, 1297, 1307, 1319, 1333, 1349, 1367 ; Perf.Sqs = none
1291, 1297, 1301 ; -1n^2 + 9n + 1283 ; FD:-2; Real Roots: -31.6005540124 | +40.6005540124 ; 439 Primes = 43.90% ; 1291, 1297, 1301, 1303, 1303, 1301, 1297, 1291, 1283, 1273 ; Perf.Sqs = 961, 841, -9409
1427, 1429, 1433 ; n^2 - n + 1427 ; FD:2; Complex Roots: 0.5+/-37.7723443805i ; 426 Primes = 42.60% ; 1427, 1429, 1433, 1439, 1447, 1457, 1469, 1483, 1499, 1517 ; Perf.Sqs = 12769
1429, 1433, 1439 ; n^2 + n + 1427 ; FD:2; Complex Roots: -0.5+/-37.7723443805i ; 426 Primes = 42.60% ; 1429, 1433, 1439, 1447, 1457, 1469, 1483, 1499, 1517, 1537 ; Perf.Sqs = 12769
1487, 1489, 1493 ; n^2 - n + 1487 ; FD:2; Complex Roots: 0.5+/-38.5583972696i ; 416 Primes = 41.60% ; 1487, 1489, 1493, 1499, 1507, 1517, 1529, 1543, 1559, 1577 ; Perf.Sqs = 6889
1549, 1553, 1559 ; n^2 + n + 1547 ; FD:2; Complex Roots: -0.5+/-39.32874267i ; 265 Primes = 26.50% ; 1549, 1553, 1559, 1567, 1577, 1589, 1603, 1619, 1637, 1657 ; Perf.Sqs = 5329
1607, 1609, 1613 ; n^2 - n + 1607 ; FD:2; Complex Roots: 0.5+/-40.084286198i ; 386 Primes = 38.60% ; 1607, 1609, 1613, 1619, 1627, 1637, 1649, 1663, 1679, 1697 ; Perf.Sqs = none
1619, 1621, 1627 ; 2n^2 - 4n + 1621 ; FD:4; Complex Roots: 1+/-28.4517134809i ; 402 Primes = 40.20% ; 1619, 1621, 1627, 1637, 1651, 1669, 1691, 1717, 1747, 1781 ; Perf.Sqs = none
1657, 1663, 1667 ; -1n^2 + 9n + 1649 ; FD:-2; Real Roots: -36.3564560382 | +45.3564560382 ; 486 Primes = 48.60% ; 1657, 1663, 1667, 1669, 1669, 1667, 1663, 1657, 1649, 1639 ; Perf.Sqs = -22201
1723, 1733, 1741 ; -1n^2 + 13n + 1711 ; FD:-2; Real Roots: -35.3718282381 | +48.3718282381 ; 475 Primes = 47.50% ; 1723, 1733, 1741, 1747, 1751, 1753, 1753, 1751, 1747, 1741 ; Perf.Sqs = 1681
1777, 1783, 1787 ; -1n^2 + 9n + 1769 ; FD:-2; Real Roots: -37.7995271841 | +46.7995271841 ; 489 Primes = 48.90% ; 1777, 1783, 1787, 1789, 1789, 1787, 1783, 1777, 1769, 1759 ; Perf.Sqs = 1369, 529, -10201
1861, 1867, 1871 ; -1n^2 + 9n + 1853 ; FD:-2; Real Roots: -38.7810582126 | +47.7810582126 ; 412 Primes = 41.20% ; 1861, 1867, 1871, 1873, 1873, 1871, 1867, 1861, 1853, 1843 ; Perf.Sqs = -289
1979, 1987, 1993 ; -1n^2 + 11n + 1969 ; FD:-2; Real Roots: -39.2129735088 | +50.2129735088 ; 402 Primes = 40.20% ; 1979, 1987, 1993, 1997, 1999, 1999, 1997, 1993, 1987, 1979 ; Perf.Sqs = -32041
1987, 1993, 1997 ; -1n^2 + 9n + 1979 ; FD:-2; Real Roots: -40.2129735088 | +49.2129735088 ; 402 Primes = 40.20% ; 1987, 1993, 1997, 1999, 1999, 1997, 1993, 1987, 1979, 1969 ; Perf.Sqs = -32041
2039, 2053, 2063 ; -2n^2 + 20n + 2021 ; FD:-4; Real Roots: -27.1791858194 | +37.1791858194 ; 396 Primes = 39.60% ; 2039, 2053, 2063, 2069, 2071, 2069, 2063, 2053, 2039, 2021 ; Perf.Sqs = none
2131, 2137, 2141 ; -1n^2 + 9n + 2123 ; FD:-2; Real Roots: -41.7952481363 | +50.7952481363 ; 415 Primes = 41.50% ; 2131, 2137, 2141, 2143, 2143, 2141, 2137, 2131, 2123, 2113 ; Perf.Sqs = 1681
2203, 2207, 2213 ; n^2 + n + 2201 ; FD:2; Complex Roots: -0.5+/-46.9121519438i ; 457 Primes = 45.70% ; 2203, 2207, 2213, 2221, 2231, 2243, 2257, 2273, 2291, 2311 ; Perf.Sqs = none
2371, 2377, 2381 ; -1n^2 + 9n + 2363 ; FD:-2; Real Roots: -44.3185415595 | +53.3185415595 ; 438 Primes = 43.80% ; 2371, 2377, 2381, 2383, 2383, 2381, 2377, 2371, 2363, 2353 ; Perf.Sqs = 1681
2459, 2467, 2473 ; -1n^2 + 11n + 2449 ; FD:-2; Real Roots: -44.2920676413 | +55.2920676413 ; 444 Primes = 44.40% ; 2459, 2467, 2473, 2477, 2479, 2479, 2477, 2473, 2467, 2459 ; Perf.Sqs = -1681
2477, 2503, 2521 ; -4n^2 + 38n + 2443 ; FD:-8; Real Roots: -20.4157008645 | +29.9157008645 ; 277 Primes = 27.70% ; 2477, 2503, 2521, 2531, 2533, 2527, 2513, 2491, 2461, 2423 ; Perf.Sqs = none
2557, 2579, 2591 ; -5n^2 + 37n + 2525 ; FD:-10; Real Roots: -19.0747667387 | +26.4747667387 ; 192 Primes = 19.20% ; 2557, 2579, 2591, 2593, 2585, 2567, 2539, 2501, 2453, 2395 ; Perf.Sqs = -121
2677, 2683, 2687 ; -1n^2 + 9n + 2669 ; FD:-2; Real Roots: -47.3579791353 | +56.3579791353 ; 500 Primes = 50.00% ; 2677, 2683, 2687, 2689, 2689, 2687, 2683, 2677, 2669, 2659 ; Perf.Sqs = -6241
2687, 2689, 2693 ; n^2 - n + 2687 ; FD:2; Complex Roots: 0.5+/-51.8338692362i ; 355 Primes = 35.50% ; 2687, 2689, 2693, 2699, 2707, 2717, 2729, 2743, 2759, 2777 ; Perf.Sqs = 61009
2689, 2693, 2699 ; n^2 + n + 2687 ; FD:2; Complex Roots: -0.5+/-51.8338692362i ; 355 Primes = 35.50% ; 2689, 2693, 2699, 2707, 2717, 2729, 2743, 2759, 2777, 2797 ; Perf.Sqs = 61009
2711, 2713, 2719 ; 2n^2 - 4n + 2713 ; FD:4; Complex Roots: 1+/-36.817115585i ; 326 Primes = 32.60% ; 2711, 2713, 2719, 2729, 2743, 2761, 2783, 2809, 2839, 2873 ; Perf.Sqs = 2809, 17161, 34969, 537289, 1142761
2791, 2797, 2801 ; -1n^2 + 9n + 2783 ; FD:-2; Real Roots: -48.4457269286 | +57.4457269286 ; 486 Primes = 48.60% ; 2791, 2797, 2801, 2803, 2803, 2801, 2797, 2791, 2783, 2773 ; Perf.Sqs = 1681
2833, 2837, 2843 ; n^2 + n + 2831 ; FD:2; Complex Roots: -0.5+/-53.2047930172i ; 333 Primes = 33.30% ; 2833, 2837, 2843, 2851, 2861, 2873, 2887, 2903, 2921, 2941 ; Perf.Sqs = 3481, 48841
2843, 2851, 2857 ; -1n^2 + 11n + 2833 ; FD:-2; Real Roots: -48.0093449782 | +59.0093449782 ; 377 Primes = 37.70% ; 2843, 2851, 2857, 2861, 2863, 2863, 2861, 2857, 2851, 2843 ; Perf.Sqs = 2401, 1, -47089
2903, 2909, 2917 ; n^2 + 3n + 2899 ; FD:2; Complex Roots: -1.5+/-53.8214641198i ; 352 Primes = 35.20% ; 2903, 2909, 2917, 2927, 2939, 2953, 2969, 2987, 3007, 3029 ; Perf.Sqs = none
2909, 2917, 2927 ; n^2 + 5n + 2903 ; FD:2; Complex Roots: -2.5+/-53.8214641198i ; 352 Primes = 35.20% ; 2909, 2917, 2927, 2939, 2953, 2969, 2987, 3007, 3029, 3053 ; Perf.Sqs = none
2917, 2927, 2939 ; n^2 + 7n + 2909 ; FD:2; Complex Roots: -3.5+/-53.8214641198i ; 351 Primes = 35.10% ; 2917, 2927, 2939, 2953, 2969, 2987, 3007, 3029, 3053, 3079 ; Perf.Sqs = none
3037, 3041, 3049 ; 2n^2 - 2n + 3037 ; FD:4; Complex Roots: 0.5+/-38.9647276392i ; 403 Primes = 40.30% ; 3037, 3041, 3049, 3061, 3077, 3097, 3121, 3149, 3181, 3217 ; Perf.Sqs = 3721, 11881, 66049, 351649
3527, 3529, 3533 ; n^2 - n + 3527 ; FD:2; Complex Roots: 0.5+/-59.3864462651i ; 475 Primes = 47.50% ; 3527, 3529, 3533, 3539, 3547, 3557, 3569, 3583, 3599, 3617 ; Perf.Sqs = none
3539, 3541, 3547 ; 2n^2 - 4n + 3541 ; FD:4; Complex Roots: 1+/-42.0654252326i ; 409 Primes = 40.90% ; 3539, 3541, 3547, 3557, 3571, 3589, 3611, 3637, 3667, 3701 ; Perf.Sqs = none
3613, 3617, 3623 ; n^2 + n + 3611 ; FD:2; Complex Roots: -0.5+/-60.0895165566i ; 429 Primes = 42.90% ; 3613, 3617, 3623, 3631, 3641, 3653, 3667, 3683, 3701, 3721 ; Perf.Sqs = 3721, 78961, 109561
3709, 3719, 3727 ; -1n^2 + 13n + 3697 ; FD:-2; Real Roots: -54.6494071925 | +67.6494071925 ; 443 Primes = 44.30% ; 3709, 3719, 3727, 3733, 3737, 3739, 3739, 3737, 3733, 3727 ; Perf.Sqs = 2809
3917, 3919, 3923 ; n^2 - n + 3917 ; FD:2; Complex Roots: 0.5+/-62.5839436277i ; 489 Primes = 48.90% ; 3917, 3919, 3923, 3929, 3937, 3947, 3959, 3973, 3989, 4007 ; Perf.Sqs = none
3967, 3989, 4001 ; -5n^2 + 37n + 3935 ; FD:-10; Real Roots: -24.5964662105 | +31.9964662105 ; 265 Primes = 26.50% ; 3967, 3989, 4001, 4003, 3995, 3977, 3949, 3911, 3863, 3805 ; Perf.Sqs = -1, -289, -10201, -19321, -4879681
4001, 4003, 4007 ; n^2 - n + 4001 ; FD:2; Complex Roots: 0.5+/-63.2514821961i ; 451 Primes = 45.10% ; 4001, 4003, 4007, 4013, 4021, 4031, 4043, 4057, 4073, 4091 ; Perf.Sqs = 96721
4127, 4129, 4133 ; n^2 - n + 4127 ; FD:2; Complex Roots: 0.5+/-64.2397851802i ; 275 Primes = 27.50% ; 4127, 4129, 4133, 4139, 4147, 4157, 4169, 4183, 4199, 4217 ; Perf.Sqs = 61009
4201, 4211, 4217 ; -2n^2 + 16n + 4187 ; FD:-4; Real Roots: -41.9292934847 | +49.9292934847 ; 308 Primes = 30.80% ; 4201, 4211, 4217, 4219, 4217, 4211, 4201, 4187, 4169, 4147 ; Perf.Sqs = 169
4243, 4253, 4259 ; -2n^2 + 16n + 4229 ; FD:-4; Real Roots: -42.1573396114 | +50.1573396114 ; 446 Primes = 44.60% ; 4243, 4253, 4259, 4261, 4259, 4253, 4243, 4229, 4211, 4189 ; Perf.Sqs = none
4339, 4349, 4357 ; -1n^2 + 13n + 4327 ; FD:-2; Real Roots: -59.6003025712 | +72.6003025712 ; 458 Primes = 45.80% ; 4339, 4349, 4357, 4363, 4367, 4369, 4369, 4367, 4363, 4357 ; Perf.Sqs = 2809
4507, 4513, 4517 ; -1n^2 + 9n + 4499 ; FD:-2; Real Roots: -62.7253672359 | +71.7253672359 ; 415 Primes = 41.50% ; 4507, 4513, 4517, 4519, 4519, 4517, 4513, 4507, 4499, 4489 ; Perf.Sqs = 4489
4637, 4639, 4643 ; n^2 - n + 4637 ; FD:2; Complex Roots: 0.5+/-68.0936854635i ; 409 Primes = 40.90% ; 4637, 4639, 4643, 4649, 4657, 4667, 4679, 4693, 4709, 4727 ; Perf.Sqs = 76729
4787, 4789, 4793 ; n^2 - n + 4787 ; FD:2; Complex Roots: 0.5+/-69.1863425829i ; 371 Primes = 37.10% ; 4787, 4789, 4793, 4799, 4807, 4817, 4829, 4843, 4859, 4877 ; Perf.Sqs = 16129
4931, 4933, 4937 ; n^2 - n + 4931 ; FD:2; Complex Roots: 0.5+/-70.2192993414i ; 503 Primes = 50.30% ; 4931, 4933, 4937, 4943, 4951, 4961, 4973, 4987, 5003, 5021 ; Perf.Sqs = 5041, 203401
4933, 4937, 4943 ; n^2 + n + 4931 ; FD:2; Complex Roots: -0.5+/-70.2192993414i ; 503 Primes = 50.30% ; 4933, 4937, 4943, 4951, 4961, 4973, 4987, 5003, 5021, 5041 ; Perf.Sqs = 5041, 203401
5023, 5039, 5051 ; -2n^2 + 22n + 5003 ; FD:-4; Real Roots: -44.8164982883 | +55.8164982883 ; 454 Primes = 45.40% ; 5023, 5039, 5051, 5059, 5063, 5063, 5059, 5051, 5039, 5023 ; Perf.Sqs = none
5399, 5407, 5413 ; -1n^2 + 11n + 5389 ; FD:-2; Real Roots: -68.1155554214 | +79.1155554214 ; 492 Primes = 49.20% ; 5399, 5407, 5413, 5417, 5419, 5419, 5417, 5413, 5407, 5399 ; Perf.Sqs = 5329, 4489, -7921
5407, 5413, 5417 ; -1n^2 + 9n + 5399 ; FD:-2; Real Roots: -69.1155554214 | +78.1155554214 ; 492 Primes = 49.20% ; 5407, 5413, 5417, 5419, 5419, 5417, 5413, 5407, 5399, 5389 ; Perf.Sqs = 5329, 4489, -7921
5431, 5437, 5441 ; -1n^2 + 9n + 5423 ; FD:-2; Real Roots: -69.2783843683 | +78.2783843683 ; 347 Primes = 34.70% ; 5431, 5437, 5441, 5443, 5443, 5441, 5437, 5431, 5423, 5413 ; Perf.Sqs = 3721
5641, 5647, 5651 ; -1n^2 + 9n + 5633 ; FD:-2; Real Roots: -70.6880974623 | +79.6880974623 ; 482 Primes = 48.20% ; 5641, 5647, 5651, 5653, 5653, 5651, 5647, 5641, 5633, 5623 ; Perf.Sqs = 961
6029, 6037, 6043 ; -1n^2 + 11n + 6019 ; FD:-2; Real Roots: -72.2769245985 | +83.2769245985 ; 400 Primes = 40.00% ; 6029, 6037, 6043, 6047, 6049, 6049, 6047, 6043, 6037, 6029 ; Perf.Sqs = 4489
6203, 6211, 6217 ; -1n^2 + 11n + 6193 ; FD:-2; Real Roots: -73.3875782364 | +84.3875782364 ; 406 Primes = 40.60% ; 6203, 6211, 6217, 6221, 6223, 6223, 6221, 6217, 6211, 6203 ; Perf.Sqs = -4489, -37249, -316969
6269, 6271, 6277 ; 2n^2 - 4n + 6271 ; FD:4; Complex Roots: 1+/-55.986605541i ; 466 Primes = 46.60% ; 6269, 6271, 6277, 6287, 6301, 6319, 6341, 6367, 6397, 6431 ; Perf.Sqs = none
6343, 6353, 6359 ; -2n^2 + 16n + 6329 ; FD:-4; Real Roots: -52.3959218384 | +60.3959218384 ; 454 Primes = 45.40% ; 6343, 6353, 6359, 6361, 6359, 6353, 6343, 6329, 6311, 6289 ; Perf.Sqs = 529, -3721, -10201, -218089, -444889
6553, 6563, 6569 ; -2n^2 + 16n + 6539 ; FD:-4; Real Roots: -53.3192812237 | +61.3192812237 ; 367 Primes = 36.70% ; 6553, 6563, 6569, 6571, 6569, 6563, 6553, 6539, 6521, 6499 ; Perf.Sqs = 1369
6701, 6703, 6709 ; 2n^2 - 4n + 6703 ; FD:4; Complex Roots: 1+/-57.8835036949i ; 420 Primes = 42.00% ; 6701, 6703, 6709, 6719, 6733, 6751, 6773, 6799, 6829, 6863 ; Perf.Sqs = none
6703, 6709, 6719 ; 2n^2 + 6701 ; FD:4; Complex Roots: 0+/-57.8835036949i ; 419 Primes = 41.90% ; 6703, 6709, 6719, 6733, 6751, 6773, 6799, 6829, 6863, 6901 ; Perf.Sqs = none
6983, 6991, 6997 ; -1n^2 + 11n + 6973 ; FD:-2; Real Roots: -78.1854228644 | +89.1854228644 ; 388 Primes = 38.80% ; 6983, 6991, 6997, 7001, 7003, 7003, 7001, 6997, 6991, 6983 ; Perf.Sqs = 841, 361, -1369
7043, 7057, 7069 ; -1n^2 + 17n + 7027 ; FD:-2; Real Roots: -75.757047183 | +92.757047183 ; 390 Primes = 39.00% ; 7043, 7057, 7069, 7079, 7087, 7093, 7097, 7099, 7099, 7097 ; Perf.Sqs = 6889, 2809, -6241
7211, 7213, 7219 ; 2n^2 - 4n + 7213 ; FD:4; Complex Roots: 1+/-60.0458158409i ; 490 Primes = 49.00% ; 7211, 7213, 7219, 7229, 7243, 7261, 7283, 7309, 7339, 7373 ; Perf.Sqs = none
7219, 7229, 7237 ; -1n^2 + 13n + 7207 ; FD:-2; Real Roots: -78.6425275641 | +91.6425275641 ; 404 Primes = 40.40% ; 7219, 7229, 7237, 7243, 7247, 7249, 7249, 7247, 7243, 7237 ; Perf.Sqs = -1681
7229, 7237, 7243 ; -1n^2 + 11n + 7219 ; FD:-2; Real Roots: -79.6425275641 | +90.6425275641 ; 403 Primes = 40.30% ; 7229, 7237, 7243, 7247, 7249, 7249, 7247, 7243, 7237, 7229 ; Perf.Sqs = -1681
7673, 7681, 7687 ; -1n^2 + 11n + 7663 ; FD:-2; Real Roots: -82.2111737466 | +93.2111737466 ; 426 Primes = 42.60% ; 7673, 7681, 7687, 7691, 7693, 7693, 7691, 7687, 7681, 7673 ; Perf.Sqs = 5041
7867, 7873, 7877 ; -1n^2 + 9n + 7859 ; FD:-2; Real Roots: -84.2651395538 | +93.2651395538 ; 448 Primes = 44.80% ; 7867, 7873, 7877, 7879, 7879, 7877, 7873, 7867, 7859, 7849 ; Perf.Sqs = 5329
7919, 7927, 7933 ; -1n^2 + 11n + 7909 ; FD:-2; Real Roots: -83.6024691016 | +94.6024691016 ; 369 Primes = 36.90% ; 7919, 7927, 7933, 7937, 7939, 7939, 7937, 7933, 7927, 7919 ; Perf.Sqs = -516961
7963, 7993, 8009 ; -7n^2 + 51n + 7919 ; FD:-14; Real Roots: -30.1884319613 | +37.474146247 ; 358 Primes = 35.80% ; 7963, 7993, 8009, 8011, 7999, 7973, 7933, 7879, 7811, 7729 ; Perf.Sqs = -466489, -546121
8017, 8039, 8053 ; -4n^2 + 34n + 7987 ; FD:-8; Real Roots: -40.6366628298 | +49.1366628298 ; 289 Primes = 28.90% ; 8017, 8039, 8053, 8059, 8057, 8047, 8029, 8003, 7969, 7927 ; Perf.Sqs = 49
8167, 8171, 8179 ; 2n^2 - 2n + 8167 ; FD:4; Complex Roots: 0.5+/-63.9003129883i ; 378 Primes = 37.80% ; 8167, 8171, 8179, 8191, 8207, 8227, 8251, 8279, 8311, 8347 ; Perf.Sqs = none
8191, 8209, 8219 ; -4n^2 + 30n + 8165 ; FD:-8; Real Roots: -41.5855544799 | +49.0855544799 ; 301 Primes = 30.10% ; 8191, 8209, 8219, 8221, 8215, 8201, 8179, 8149, 8111, 8065 ; Perf.Sqs = 6889, 6241
8231, 8233, 8237 ; n^2 - n + 8231 ; FD:2; Complex Roots: 0.5+/-90.7234809738i ; 381 Primes = 38.10% ; 8231, 8233, 8237, 8243, 8251, 8261, 8273, 8287, 8303, 8321 ; Perf.Sqs = 17161, 44521, 564001
8363, 8369, 8377 ; n^2 + 3n + 8359 ; FD:2; Complex Roots: -1.5+/-91.4152613079i ; 464 Primes = 46.40% ; 8363, 8369, 8377, 8387, 8399, 8413, 8429, 8447, 8467, 8489 ; Perf.Sqs = none
8689, 8693, 8699 ; n^2 + n + 8687 ; FD:2; Complex Roots: -0.5+/-93.2027360113i ; 227 Primes = 22.70% ; 8689, 8693, 8699, 8707, 8717, 8729, 8743, 8759, 8777, 8797 ; Perf.Sqs = none
8821, 8831, 8837 ; -2n^2 + 16n + 8807 ; FD:-4; Real Roots: -62.4793200928 | +70.4793200928 ; 409 Primes = 40.90% ; 8821, 8831, 8837, 8839, 8837, 8831, 8821, 8807, 8789, 8767 ; Perf.Sqs = -961, -34969, -139129, -1329409
8933, 8941, 8951 ; n^2 + 5n + 8927 ; FD:2; Complex Roots: -2.5+/-94.4497220748i ; 406 Primes = 40.60% ; 8933, 8941, 8951, 8963, 8977, 8993, 9011, 9031, 9053, 9077 ; Perf.Sqs = 279841
9001, 9007, 9011 ; -1n^2 + 9n + 8993 ; FD:-2; Real Roots: -90.438137753 | +99.438137753 ; 335 Primes = 33.50% ; 9001, 9007, 9011, 9013, 9013, 9011, 9007, 9001, 8993, 8983 ; Perf.Sqs = -80089
9041, 9043, 9049 ; 2n^2 - 4n + 9043 ; FD:4; Complex Roots: 1+/-67.2346636788i ; 387 Primes = 38.70% ; 9041, 9043, 9049, 9059, 9073, 9091, 9113, 9139, 9169, 9203 ; Perf.Sqs = 10609, 38809, 177241, 1164241
9281, 9283, 9293 ; 4n^2 - 10n + 9287 ; FD:8; Complex Roots: 1.25+/-48.1683246543i ; 450 Primes = 45.00% ; 9281, 9283, 9293, 9311, 9337, 9371, 9413, 9463, 9521, 9587 ; Perf.Sqs = none
9403, 9413, 9419 ; -2n^2 + 16n + 9389 ; FD:-4; Real Roots: -64.633082402 | +72.633082402 ; 431 Primes = 43.10% ; 9403, 9413, 9419, 9421, 9419, 9413, 9403, 9389, 9371, 9349 ; Perf.Sqs = none
9461, 9463, 9467 ; n^2 - n + 9461 ; FD:2; Complex Roots: 0.5+/-97.2663867942i ; 412 Primes = 41.20% ; 9461, 9463, 9467, 9473, 9481, 9491, 9503, 9517, 9533, 9551 ; Perf.Sqs = 22801, 58081, 534361
10159, 10163, 10169 ; n^2 + n + 10157 ; FD:2; Complex Roots: -0.5+/-100.7807025179i ; 356 Primes = 35.60% ; 10159, 10163, 10169, 10177, 10187, 10199, 10213, 10229, 10247, 10267 ; Perf.Sqs = none
10331, 10333, 10337 ; n^2 - n + 10331 ; FD:2; Complex Roots: 0.5+/-101.6402971267i ; 284 Primes = 28.40% ; 10331, 10333, 10337, 10343, 10351, 10361, 10373, 10387, 10403, 10421 ; Perf.Sqs = 63001, 116281
10627, 10631, 10639 ; 2n^2 - 2n + 10627 ; FD:4; Complex Roots: 0.5+/-72.8920434615i ; 493 Primes = 49.30% ; 10627, 10631, 10639, 10651, 10667, 10687, 10711, 10739, 10771, 10807 ; Perf.Sqs = none
11131, 11149, 11159 ; -4n^2 + 30n + 11105 ; FD:-8; Real Roots: -49.0734086367 | +56.5734086367 ; 282 Primes = 28.20% ; 11131, 11149, 11159, 11161, 11155, 11141, 11119, 11089, 11051, 11005 ; Perf.Sqs = 1849
11243, 11251, 11257 ; -1n^2 + 11n + 11233 ; FD:-2; Real Roots: -100.6284598965 | +111.6284598965 ; 363 Primes = 36.30% ; 11243, 11251, 11257, 11261, 11263, 11263, 11261, 11257, 11251, 11243 ; Perf.Sqs = 961
11369, 11383, 11393 ; -2n^2 + 20n + 11351 ; FD:-4; Real Roots: -70.501655611 | +80.501655611 ; 443 Primes = 44.30% ; 11369, 11383, 11393, 11399, 11401, 11399, 11393, 11383, 11369, 11351 ; Perf.Sqs = none
11579, 11587, 11593 ; -1n^2 + 11n + 11569 ; FD:-2; Real Roots: -102.1998142988 | +113.1998142988 ; 339 Primes = 33.90% ; 11579, 11587, 11593, 11597, 11599, 11599, 11597, 11593, 11587, 11579 ; Perf.Sqs = -14161, -67081, -790321
11777, 11779, 11783 ; n^2 - n + 11777 ; FD:2; Complex Roots: 0.5+/-108.5207353458i ; 525 Primes = 52.50% ; 11777, 11779, 11783, 11789, 11797, 11807, 11819, 11833, 11849, 11867 ; Perf.Sqs = 12769, 485809
11813, 11821, 11827 ; -1n^2 + 11n + 11803 ; FD:-2; Real Roots: -103.2807427811 | +114.2807427811 ; 377 Primes = 37.70% ; 11813, 11821, 11827, 11831, 11833, 11833, 11831, 11827, 11821, 11813 ; Perf.Sqs = -2209, -822649
11821, 11827, 11831 ; -1n^2 + 9n + 11813 ; FD:-2; Real Roots: -104.2807427811 | +113.2807427811 ; 377 Primes = 37.70% ; 11821, 11827, 11831, 11833, 11833, 11831, 11827, 11821, 11813, 11803 ; Perf.Sqs = -2209, -822649
12107, 12109, 12113 ; n^2 - n + 12107 ; FD:2; Complex Roots: 0.5+/-110.0306775404i ; 519 Primes = 51.90% ; 12107, 12109, 12113, 12119, 12127, 12137, 12149, 12163, 12179, 12197 ; Perf.Sqs = 29929
12277, 12281, 12289 ; 2n^2 - 2n + 12277 ; FD:4; Complex Roots: 0.5+/-78.3469846261i ; 445 Primes = 44.50% ; 12277, 12281, 12289, 12301, 12317, 12337, 12361, 12389, 12421, 12457 ; Perf.Sqs = none
12379, 12391, 12401 ; -1n^2 + 15n + 12365 ; FD:-2; Real Roots: -103.9506617298 | +118.9506617298 ; 334 Primes = 33.40% ; 12379, 12391, 12401, 12409, 12415, 12419, 12421, 12421, 12419, 12415 ; Perf.Sqs = -11449, -421201
12409, 12413, 12421 ; 2n^2 - 2n + 12409 ; FD:4; Complex Roots: 0.5+/-78.7670616438i ; 401 Primes = 40.10% ; 12409, 12413, 12421, 12433, 12449, 12469, 12493, 12521, 12553, 12589 ; Perf.Sqs = none
12653, 12659, 12671 ; 3n^2 - 3n + 12653 ; FD:6; Complex Roots: 0.5+/-64.9416404679i ; 428 Primes = 42.80% ; 12653, 12659, 12671, 12689, 12713, 12743, 12779, 12821, 12869, 12923 ; Perf.Sqs = none
12791, 12799, 12809 ; n^2 + 5n + 12785 ; FD:2; Complex Roots: -2.5+/-113.0431333607i ; 348 Primes = 34.80% ; 12791, 12799, 12809, 12821, 12835, 12851, 12869, 12889, 12911, 12935 ; Perf.Sqs = none
12889, 12893, 12899 ; n^2 + n + 12887 ; FD:2; Complex Roots: -0.5+/-113.5198220576i ; 360 Primes = 36.00% ; 12889, 12893, 12899, 12907, 12917, 12929, 12943, 12959, 12977, 12997 ; Perf.Sqs = 466489
12923, 12941, 12953 ; -3n^2 + 27n + 12899 ; FD:-6; Real Roots: -61.2260729594 | +70.2260729594 ; 469 Primes = 46.90% ; 12923, 12941, 12953, 12959, 12959, 12953, 12941, 12923, 12899, 12869 ; Perf.Sqs = -2809, -249001, -1540081
13463, 13469, 13477 ; n^2 + 3n + 13459 ; FD:2; Complex Roots: -1.5+/-116.0032327136i ; 462 Primes = 46.20% ; 13463, 13469, 13477, 13487, 13499, 13513, 13529, 13547, 13567, 13589 ; Perf.Sqs = 508369
13469, 13477, 13487 ; n^2 + 5n + 13463 ; FD:2; Complex Roots: -2.5+/-116.0032327136i ; 462 Primes = 46.20% ; 13469, 13477, 13487, 13499, 13513, 13529, 13547, 13567, 13589, 13613 ; Perf.Sqs = 508369
13477, 13487, 13499 ; n^2 + 7n + 13469 ; FD:2; Complex Roots: -3.5+/-116.0032327136i ; 461 Primes = 46.10% ; 13477, 13487, 13499, 13513, 13529, 13547, 13567, 13589, 13613, 13639 ; Perf.Sqs = 508369
13681, 13687, 13691 ; -1n^2 + 9n + 13673 ; FD:-2; Real Roots: -112.5181609837 | +121.5181609837 ; 357 Primes = 35.70% ; 13681, 13687, 13691, 13693, 13693, 13691, 13687, 13681, 13673, 13663 ; Perf.Sqs = 121
13829, 13831, 13841 ; 4n^2 - 10n + 13835 ; FD:8; Complex Roots: 1.25+/-58.797852852i ; 283 Primes = 28.30% ; 13829, 13831, 13841, 13859, 13885, 13919, 13961, 14011, 14069, 14135 ; Perf.Sqs = 22201, 368449
13901, 13903, 13907 ; n^2 - n + 13901 ; FD:2; Complex Roots: 0.5+/-117.9014418911i ; 494 Primes = 49.40% ; 13901, 13903, 13907, 13913, 13921, 13931, 13943, 13957, 13973, 13991 ; Perf.Sqs = none
13903, 13907, 13913 ; n^2 + n + 13901 ; FD:2; Complex Roots: -0.5+/-117.9014418911i ; 493 Primes = 49.30% ; 13903, 13907, 13913, 13921, 13931, 13943, 13957, 13973, 13991, 14011 ; Perf.Sqs = none
13907, 13913, 13921 ; n^2 + 3n + 13903 ; FD:2; Complex Roots: -1.5+/-117.9014418911i ; 492 Primes = 49.20% ; 13907, 13913, 13921, 13931, 13943, 13957, 13973, 13991, 14011, 14033 ; Perf.Sqs = none
14083, 14087, 14107 ; 8n^2 - 20n + 14095 ; FD:16; Complex Roots: 1.25+/-41.9560782247i ; 332 Primes = 33.20% ; 14083, 14087, 14107, 14143, 14195, 14263, 14347, 14447, 14563, 14695 ; Perf.Sqs = none
14551, 14557, 14561 ; -1n^2 + 9n + 14543 ; FD:-2; Real Roots: -116.1782913369 | +125.1782913369 ; 469 Primes = 46.90% ; 14551, 14557, 14561, 14563, 14563, 14561, 14557, 14551, 14543, 14533 ; Perf.Sqs = 7921, 1681
14627, 14629, 14633 ; n^2 - n + 14627 ; FD:2; Complex Roots: 0.5+/-120.9411013676i ; 528 Primes = 52.80% ; 14627, 14629, 14633, 14639, 14647, 14657, 14669, 14683, 14699, 14717 ; Perf.Sqs = 134689
14657, 14669, 14683 ; n^2 + 9n + 14647 ; FD:2; Complex Roots: -4.5+/-120.9411013676i ; 525 Primes = 52.50% ; 14657, 14669, 14683, 14699, 14717, 14737, 14759, 14783, 14809, 14837 ; Perf.Sqs = 134689
14713, 14717, 14723 ; n^2 + n + 14711 ; FD:2; Complex Roots: -0.5+/-121.2878806806i ; 528 Primes = 52.80% ; 14713, 14717, 14723, 14731, 14741, 14753, 14767, 14783, 14801, 14821 ; Perf.Sqs = 17161, 606841
14723, 14731, 14737 ; -1n^2 + 11n + 14713 ; FD:-2; Real Roots: -115.9217855247 | +126.9217855247 ; 449 Primes = 44.90% ; 14723, 14731, 14737, 14741, 14743, 14743, 14741, 14737, 14731, 14723 ; Perf.Sqs = 11881, 5041, -744769
14813, 14821, 14827 ; -1n^2 + 11n + 14803 ; FD:-2; Real Roots: -116.2918305963 | +127.2918305963 ; 320 Primes = 32.00% ; 14813, 14821, 14827, 14831, 14833, 14833, 14831, 14827, 14821, 14813 ; Perf.Sqs = 2401
15073, 15077, 15083 ; n^2 + n + 15071 ; FD:2; Complex Roots: -0.5+/-122.7629830201i ; 331 Primes = 33.10% ; 15073, 15077, 15083, 15091, 15101, 15113, 15127, 15143, 15161, 15181 ; Perf.Sqs = 436921
15077, 15083, 15091 ; n^2 + 3n + 15073 ; FD:2; Complex Roots: -1.5+/-122.7629830201i ; 331 Primes = 33.10% ; 15077, 15083, 15091, 15101, 15113, 15127, 15143, 15161, 15181, 15203 ; Perf.Sqs = 436921
15107, 15121, 15131 ; -2n^2 + 20n + 15089 ; FD:-4; Real Roots: -82.0028735158 | +92.0028735158 ; 353 Primes = 35.30% ; 15107, 15121, 15131, 15137, 15139, 15137, 15131, 15121, 15107, 15089 ; Perf.Sqs = 1
15121, 15131, 15137 ; -2n^2 + 16n + 15107 ; FD:-4; Real Roots: -83.0028735158 | +91.0028735158 ; 353 Primes = 35.30% ; 15121, 15131, 15137, 15139, 15137, 15131, 15121, 15107, 15089, 15067 ; Perf.Sqs = 1
15269, 15271, 15277 ; 2n^2 - 4n + 15271 ; FD:4; Complex Roots: 1+/-87.3756258919i ; 315 Primes = 31.50% ; 15269, 15271, 15277, 15287, 15301, 15319, 15341, 15367, 15397, 15431 ; Perf.Sqs = none
15289, 15299, 15307 ; -1n^2 + 13n + 15277 ; FD:-2; Real Roots: -117.2709578213 | +130.2709578213 ; 421 Primes = 42.10% ; 15289, 15299, 15307, 15313, 15317, 15319, 15319, 15317, 15313, 15307 ; Perf.Sqs = 12769, 2209, -271441
15331, 15349, 15359 ; -4n^2 + 30n + 15305 ; FD:-8; Real Roots: -58.2202549616 | +65.7202549616 ; 309 Primes = 30.90% ; 15331, 15349, 15359, 15361, 15355, 15341, 15319, 15289, 15251, 15205 ; Perf.Sqs = 841
15373, 15377, 15383 ; n^2 + n + 15371 ; FD:2; Complex Roots: -0.5+/-123.9788288378i ; 513 Primes = 51.30% ; 15373, 15377, 15383, 15391, 15401, 15413, 15427, 15443, 15461, 15481 ; Perf.Sqs = none
15377, 15383, 15391 ; n^2 + 3n + 15373 ; FD:2; Complex Roots: -1.5+/-123.9788288378i ; 514 Primes = 51.40% ; 15377, 15383, 15391, 15401, 15413, 15427, 15443, 15461, 15481, 15503 ; Perf.Sqs = none
15383, 15391, 15401 ; n^2 + 5n + 15377 ; FD:2; Complex Roots: -2.5+/-123.9788288378i ; 513 Primes = 51.30% ; 15383, 15391, 15401, 15413, 15427, 15443, 15461, 15481, 15503, 15527 ; Perf.Sqs = none
15391, 15401, 15413 ; n^2 + 7n + 15383 ; FD:2; Complex Roots: -3.5+/-123.9788288378i ; 512 Primes = 51.20% ; 15391, 15401, 15413, 15427, 15443, 15461, 15481, 15503, 15527, 15553 ; Perf.Sqs = none
15551, 15559, 15569 ; n^2 + 5n + 15545 ; FD:2; Complex Roots: -2.5+/-124.6545225814i ; 421 Primes = 42.10% ; 15551, 15559, 15569, 15581, 15595, 15611, 15629, 15649, 15671, 15695 ; Perf.Sqs = 19321, 259081
15937, 15959, 15971 ; -5n^2 + 37n + 15905 ; FD:-10; Real Roots: -52.8215887958 | +60.2215887958 ; 338 Primes = 33.80% ; 15937, 15959, 15971, 15973, 15965, 15947, 15919, 15881, 15833, 15775 ; Perf.Sqs = -70225
17011, 17021, 17027 ; -2n^2 + 16n + 16997 ; FD:-4; Real Roots: -88.274048356 | +96.274048356 ; 462 Primes = 46.20% ; 17011, 17021, 17027, 17029, 17027, 17021, 17011, 16997, 16979, 16957 ; Perf.Sqs = none
17093, 17099, 17107 ; n^2 + 3n + 17089 ; FD:2; Complex Roots: -1.5+/-130.7162958472i ; 317 Primes = 31.70% ; 17093, 17099, 17107, 17117, 17129, 17143, 17159, 17177, 17197, 17219 ; Perf.Sqs = 182329
17117, 17123, 17137 ; 4n^2 - 6n + 17119 ; FD:8; Complex Roots: 0.75+/-65.415498928i ; 277 Primes = 27.70% ; 17117, 17123, 17137, 17159, 17189, 17227, 17273, 17327, 17389, 17459 ; Perf.Sqs = none
17327, 17333, 17341 ; n^2 + 3n + 17323 ; FD:2; Complex Roots: -1.5+/-131.6083204057i ; 395 Primes = 39.50% ; 17327, 17333, 17341, 17351, 17363, 17377, 17393, 17411, 17431, 17453 ; Perf.Sqs = 57121
17377, 17383, 17387 ; -1n^2 + 9n + 17369 ; FD:-2; Real Roots: -127.3683055173 | +136.3683055173 ; 443 Primes = 44.30% ; 17377, 17383, 17387, 17389, 17389, 17387, 17383, 17377, 17369, 17359 ; Perf.Sqs = 16129
17747, 17749, 17761 ; 5n^2 - 13n + 17755 ; FD:10; Complex Roots: 1.3+/-59.5760858063i ; 257 Primes = 25.70% ; 17747, 17749, 17761, 17783, 17815, 17857, 17909, 17971, 18043, 18125 ; Perf.Sqs = 2307361
17921, 17923, 17929 ; 2n^2 - 4n + 17923 ; FD:4; Complex Roots: 1+/-94.6599175998i ; 367 Primes = 36.70% ; 17921, 17923, 17929, 17939, 17953, 17971, 17993, 18019, 18049, 18083 ; Perf.Sqs = 24649, 57121, 494209, 1630729
18061, 18077, 18089 ; -2n^2 + 22n + 18041 ; FD:-4; Real Roots: -89.635429783 | +100.635429783 ; 432 Primes = 43.20% ; 18061, 18077, 18089, 18097, 18101, 18101, 18097, 18089, 18077, 18061 ; Perf.Sqs = 4489, 3481
18121, 18127, 18131 ; -1n^2 + 9n + 18113 ; FD:-2; Real Roots: -130.1597564234 | +139.1597564234 ; 449 Primes = 44.90% ; 18121, 18127, 18131, 18133, 18133, 18131, 18127, 18121, 18113, 18103 ; Perf.Sqs = 841
18169, 18181, 18191 ; -1n^2 + 15n + 18155 ; FD:-2; Real Roots: -127.4490644651 | +142.4490644651 ; 369 Primes = 36.90% ; 18169, 18181, 18191, 18199, 18205, 18209, 18211, 18211, 18209, 18205 ; Perf.Sqs = 10201, 5329, 2209, 121, -37249
18301, 18307, 18311 ; -1n^2 + 9n + 18293 ; FD:-2; Real Roots: -130.8264571324 | +139.8264571324 ; 402 Primes = 40.20% ; 18301, 18307, 18311, 18313, 18313, 18311, 18307, 18301, 18293, 18283 ; Perf.Sqs = -9409, -339889
18443, 18451, 18457 ; -1n^2 + 11n + 18433 ; FD:-2; Real Roots: -130.3795422424 | +141.3795422424 ; 444 Primes = 44.40% ; 18443, 18451, 18457, 18461, 18463, 18463, 18461, 18457, 18451, 18443 ; Perf.Sqs = -169, -4489, -635209, -935089
19087, 19121, 19139 ; -8n^2 + 58n + 19037 ; FD:-16; Real Roots: -45.2909036 | +52.5409036 ; 305 Primes = 30.50% ; 19087, 19121, 19139, 19141, 19127, 19097, 19051, 18989, 18911, 18817 ; Perf.Sqs = -361, -4190209, -7252249
19237, 19249, 19259 ; -1n^2 + 15n + 19223 ; FD:-2; Real Roots: -131.3497389267 | +146.3497389267 ; 372 Primes = 37.20% ; 19237, 19249, 19259, 19267, 19273, 19277, 19279, 19279, 19277, 19273 ; Perf.Sqs = -73441
19249, 19259, 19267 ; -1n^2 + 13n + 19237 ; FD:-2; Real Roots: -132.3497389267 | +145.3497389267 ; 373 Primes = 37.30% ; 19249, 19259, 19267, 19273, 19277, 19279, 19279, 19277, 19273, 19267 ; Perf.Sqs = -73441
19273, 19289, 19301 ; -2n^2 + 22n + 19253 ; FD:-4; Real Roots: -92.7687641115 | +103.7687641115 ; 237 Primes = 23.70% ; 19273, 19289, 19301, 19309, 19313, 19313, 19309, 19301, 19289, 19273 ; Perf.Sqs = 18769, 17689, 10201
19709, 19717, 19727 ; n^2 + 5n + 19703 ; FD:2; Complex Roots: -2.5+/-140.345110353i ; 442 Primes = 44.20% ; 19709, 19717, 19727, 19739, 19753, 19769, 19787, 19807, 19829, 19853 ; Perf.Sqs = none
19843, 19853, 19861 ; -1n^2 + 13n + 19831 ; FD:-2; Real Roots: -134.4725150517 | +147.4725150517 ; 287 Primes = 28.70% ; 19843, 19853, 19861, 19867, 19871, 19873, 19873, 19871, 19867, 19861 ; Perf.Sqs = 19321
19913, 19919, 19927 ; n^2 + 3n + 19909 ; FD:2; Complex Roots: -1.5+/-141.0912825089i ; 451 Primes = 45.10% ; 19913, 19919, 19927, 19937, 19949, 19963, 19979, 19997, 20017, 20039 ; Perf.Sqs = none
19919, 19927, 19937 ; n^2 + 5n + 19913 ; FD:2; Complex Roots: -2.5+/-141.0912825089i ; 451 Primes = 45.10% ; 19919, 19927, 19937, 19949, 19963, 19979, 19997, 20017, 20039, 20063 ; Perf.Sqs = none
20071, 20089, 20101 ; -3n^2 + 27n + 20047 ; FD:-6; Real Roots: -77.3693064178 | +86.3693064178 ; 408 Primes = 40.80% ; 20071, 20089, 20101, 20107, 20107, 20101, 20089, 20071, 20047, 20017 ; Perf.Sqs = none
20233, 20249, 20261 ; -2n^2 + 22n + 20213 ; FD:-4; Real Roots: -95.1814282775 | +106.1814282775 ; 322 Primes = 32.20% ; 20233, 20249, 20261, 20269, 20273, 20273, 20269, 20261, 20249, 20233 ; Perf.Sqs = none
20323, 20327, 20333 ; n^2 + n + 20321 ; FD:2; Complex Roots: -0.5+/-142.5508681138i ; 372 Primes = 37.20% ; 20323, 20327, 20333, 20341, 20351, 20363, 20377, 20393, 20411, 20431 ; Perf.Sqs = none
20347, 20353, 20357 ; -1n^2 + 9n + 20339 ; FD:-2; Real Roots: -138.1858437267 | +147.1858437267 ; 406 Primes = 40.60% ; 20347, 20353, 20357, 20359, 20359, 20357, 20353, 20347, 20339, 20329 ; Perf.Sqs = -72361, -292681, -421201
20389, 20393, 20399 ; n^2 + n + 20387 ; FD:2; Complex Roots: -0.5+/-142.7821767589i ; 392 Primes = 39.20% ; 20389, 20393, 20399, 20407, 20417, 20429, 20443, 20459, 20477, 20497 ; Perf.Sqs = none
20533, 20543, 20549 ; -2n^2 + 16n + 20519 ; FD:-4; Real Roots: -97.3681409517 | +105.3681409517 ; 288 Primes = 28.80% ; 20533, 20543, 20549, 20551, 20549, 20543, 20533, 20519, 20501, 20479 ; Perf.Sqs = -10201, -37249, -638401, -1585081
20747, 20749, 20753 ; n^2 - n + 20747 ; FD:2; Complex Roots: 0.5+/-144.0373215524i ; 486 Primes = 48.60% ; 20747, 20749, 20753, 20759, 20767, 20777, 20789, 20803, 20819, 20837 ; Perf.Sqs = 458329
20873, 20879, 20887 ; n^2 + 3n + 20869 ; FD:2; Complex Roots: -1.5+/-144.4532796443i ; 229 Primes = 22.90% ; 20873, 20879, 20887, 20897, 20909, 20923, 20939, 20957, 20977, 20999 ; Perf.Sqs = 24649, 833569
20983, 21001, 21011 ; -4n^2 + 30n + 20957 ; FD:-8; Real Roots: -68.7297385481 | +76.2297385481 ; 348 Primes = 34.80% ; 20983, 21001, 21011, 21013, 21007, 20993, 20971, 20941, 20903, 20857 ; Perf.Sqs = none
21139, 21143, 21149 ; n^2 + n + 21137 ; FD:2; Complex Roots: -0.5+/-145.3848341472i ; 521 Primes = 52.10% ; 21139, 21143, 21149, 21157, 21167, 21179, 21193, 21209, 21227, 21247 ; Perf.Sqs = 139129
21383, 21391, 21397 ; -1n^2 + 11n + 21373 ; FD:-2; Real Roots: -140.7984962329 | +151.7984962329 ; 419 Primes = 41.90% ; 21383, 21391, 21397, 21401, 21403, 21403, 21401, 21397, 21391, 21383 ; Perf.Sqs = -5329, -237169
21481, 21487, 21491 ; -1n^2 + 9n + 21473 ; FD:-2; Real Roots: -142.1057638703 | +151.1057638703 ; 359 Primes = 35.90% ; 21481, 21487, 21491, 21493, 21493, 21491, 21487, 21481, 21473, 21463 ; Perf.Sqs = 7921, 6241, -11449
21557, 21559, 21563 ; n^2 - n + 21557 ; FD:2; Complex Roots: 0.5+/-146.8221713502i ; 534 Primes = 53.40% ; 21557, 21559, 21563, 21569, 21577, 21587, 21599, 21613, 21629, 21647 ; Perf.Sqs = 29929, 889249
21559, 21563, 21569 ; n^2 + n + 21557 ; FD:2; Complex Roots: -0.5+/-146.8221713502i ; 534 Primes = 53.40% ; 21559, 21563, 21569, 21577, 21587, 21599, 21613, 21629, 21647, 21667 ; Perf.Sqs = 29929, 889249
21563, 21569, 21577 ; n^2 + 3n + 21559 ; FD:2; Complex Roots: -1.5+/-146.8221713502i ; 533 Primes = 53.30% ; 21563, 21569, 21577, 21587, 21599, 21613, 21629, 21647, 21667, 21689 ; Perf.Sqs = 29929, 889249
21863, 21871, 21881 ; n^2 + 5n + 21857 ; FD:2; Complex Roots: -2.5+/-147.819991882i ; 293 Primes = 29.30% ; 21863, 21871, 21881, 21893, 21907, 21923, 21941, 21961, 21983, 22007 ; Perf.Sqs = none
21943, 21961, 21977 ; -1n^2 + 21n + 21923 ; FD:-2; Real Roots: -137.9360131504 | +158.9360131504 ; 409 Primes = 40.90% ; 21943, 21961, 21977, 21991, 22003, 22013, 22021, 22027, 22031, 22033 ; Perf.Sqs = -494209
21997, 22003, 22013 ; 2n^2 + 21995 ; FD:4; Complex Roots: 0+/-104.8689658574i ; 385 Primes = 38.50% ; 21997, 22003, 22013, 22027, 22045, 22067, 22093, 22123, 22157, 22195 ; Perf.Sqs = none
22147, 22153, 22157 ; -1n^2 + 9n + 22139 ; FD:-2; Real Roots: -144.3598334004 | +153.3598334004 ; 335 Primes = 33.50% ; 22147, 22153, 22157, 22159, 22159, 22157, 22153, 22147, 22139, 22129 ; Perf.Sqs = -11881
22279, 22283, 22291 ; 2n^2 - 2n + 22279 ; FD:4; Complex Roots: 0.5+/-105.5426454093i ; 320 Primes = 32.00% ; 22279, 22283, 22291, 22303, 22319, 22339, 22363, 22391, 22423, 22459 ; Perf.Sqs = none
22739, 22741, 22751 ; 4n^2 - 10n + 22745 ; FD:8; Complex Roots: 1.25+/-75.3968666458i ; 299 Primes = 29.90% ; 22739, 22741, 22751, 22769, 22795, 22829, 22871, 22921, 22979, 23045 ; Perf.Sqs = none
22769, 22777, 22783 ; -1n^2 + 11n + 22759 ; FD:-2; Real Roots: -145.4610877014 | +156.4610877014 ; 384 Primes = 38.40% ; 22769, 22777, 22783, 22787, 22789, 22789, 22787, 22783, 22777, 22769 ; Perf.Sqs = none
22993, 23003, 23011 ; -1n^2 + 13n + 22981 ; FD:-2; Real Roots: -145.2341424993 | +158.2341424993 ; 229 Primes = 22.90% ; 22993, 23003, 23011, 23017, 23021, 23023, 23023, 23021, 23017, 23011 ; Perf.Sqs = -20449, -375769
23003, 23011, 23017 ; -1n^2 + 11n + 22993 ; FD:-2; Real Roots: -146.2341424993 | +157.2341424993 ; 229 Primes = 22.90% ; 23003, 23011, 23017, 23021, 23023, 23023, 23021, 23017, 23011, 23003 ; Perf.Sqs = -20449, -375769
23081, 23087, 23099 ; 3n^2 - 3n + 23081 ; FD:6; Complex Roots: 0.5+/-87.7121238294i ; 359 Primes = 35.90% ; 23081, 23087, 23099, 23117, 23141, 23171, 23207, 23249, 23297, 23351 ; Perf.Sqs = none
23297, 23311, 23321 ; -2n^2 + 20n + 23279 ; FD:-4; Real Roots: -103.00231479 | +113.00231479 ; 462 Primes = 46.20% ; 23297, 23311, 23321, 23327, 23329, 23327, 23321, 23311, 23297, 23279 ; Perf.Sqs = 16129, 1, -2209, -7921, -54289, -96721, -351649, -588289
23669, 23671, 23677 ; 2n^2 - 4n + 23671 ; FD:4; Complex Roots: 1+/-108.7864881316i ; 586 Primes = 58.60% ; 23669, 23671, 23677, 23687, 23701, 23719, 23741, 23767, 23797, 23831 ; Perf.Sqs = none
23741, 23743, 23747 ; n^2 - n + 23741 ; FD:2; Complex Roots: 0.5+/-154.0803361886i ; 401 Primes = 40.10% ; 23741, 23743, 23747, 23753, 23761, 23771, 23783, 23797, 23813, 23831 ; Perf.Sqs = 72361, 83521
23743, 23747, 23753 ; n^2 + n + 23741 ; FD:2; Complex Roots: -0.5+/-154.0803361886i ; 400 Primes = 40.00% ; 23743, 23747, 23753, 23761, 23771, 23783, 23797, 23813, 23831, 23851 ; Perf.Sqs = 72361, 83521
23869, 23873, 23879 ; n^2 + n + 23867 ; FD:2; Complex Roots: -0.5+/-154.4886727239i ; 459 Primes = 45.90% ; 23869, 23873, 23879, 23887, 23897, 23909, 23923, 23939, 23957, 23977 ; Perf.Sqs = none
24097, 24103, 24107 ; -1n^2 + 9n + 24089 ; FD:-2; Real Roots: -150.7715363484 | +159.7715363484 ; 361 Primes = 36.10% ; 24097, 24103, 24107, 24109, 24109, 24107, 24103, 24097, 24089, 24079 ; Perf.Sqs = 20449, -28561
24109, 24113, 24121 ; 2n^2 - 2n + 24109 ; FD:4; Complex Roots: 0.5+/-109.7918485134i ; 411 Primes = 41.10% ; 24109, 24113, 24121, 24133, 24149, 24169, 24193, 24221, 24253, 24289 ; Perf.Sqs = none
24151, 24169, 24179 ; -4n^2 + 30n + 24125 ; FD:-8; Real Roots: -74.0016077004 | +81.5016077004 ; 409 Primes = 40.90% ; 24151, 24169, 24179, 24181, 24175, 24161, 24139, 24109, 24071, 24025 ; Perf.Sqs = 24025, 22201, 15625, 10609
24337, 24359, 24371 ; -5n^2 + 37n + 24305 ; FD:-10; Real Roots: -66.1189802274 | +73.5189802274 ; 252 Primes = 25.20% ; 24337, 24359, 24371, 24373, 24365, 24347, 24319, 24281, 24233, 24175 ; Perf.Sqs = 361, -801025, -4721929
24889, 24907, 24917 ; -4n^2 + 30n + 24863 ; FD:-8; Real Roots: -75.1791612777 | +82.6791612777 ; 295 Primes = 29.50% ; 24889, 24907, 24917, 24919, 24913, 24899, 24877, 24847, 24809, 24763 ; Perf.Sqs = -841
25153, 25163, 25169 ; -2n^2 + 16n + 25139 ; FD:-4; Real Roots: -108.1851148772 | +116.1851148772 ; 418 Primes = 41.80% ; 25153, 25163, 25169, 25171, 25169, 25163, 25153, 25139, 25121, 25099 ; Perf.Sqs = 529
25219, 25229, 25237 ; -1n^2 + 13n + 25207 ; FD:-2; Real Roots: -152.4001258653 | +165.4001258653 ; 351 Primes = 35.10% ; 25219, 25229, 25237, 25243, 25247, 25249, 25249, 25247, 25243, 25237 ; Perf.Sqs = 24649, 18769, 16129, 6889, -3481
25229, 25237, 25243 ; -1n^2 + 11n + 25219 ; FD:-2; Real Roots: -153.4001258653 | +164.4001258653 ; 351 Primes = 35.10% ; 25229, 25237, 25243, 25247, 25249, 25249, 25247, 25243, 25237, 25229 ; Perf.Sqs = 24649, 18769, 16129, 6889, -3481
25243, 25247, 25253 ; n^2 + n + 25241 ; FD:2; Complex Roots: -0.5+/-158.8733772537i ; 459 Primes = 45.90% ; 25243, 25247, 25253, 25261, 25271, 25283, 25297, 25313, 25331, 25351 ; Perf.Sqs = none
25339, 25343, 25349 ; n^2 + n + 25337 ; FD:2; Complex Roots: -0.5+/-159.1752179204i ; 382 Primes = 38.20% ; 25339, 25343, 25349, 25357, 25367, 25379, 25393, 25409, 25427, 25447 ; Perf.Sqs = none
25343, 25349, 25357 ; n^2 + 3n + 25339 ; FD:2; Complex Roots: -1.5+/-159.1752179204i ; 382 Primes = 38.20% ; 25343, 25349, 25357, 25367, 25379, 25393, 25409, 25427, 25447, 25469 ; Perf.Sqs = none
25439, 25447, 25453 ; -1n^2 + 11n + 25429 ; FD:-2; Real Roots: -154.0595500119 | +165.0595500119 ; 352 Primes = 35.20% ; 25439, 25447, 25453, 25457, 25459, 25459, 25457, 25453, 25447, 25439 ; Perf.Sqs = 2809
25577, 25579, 25583 ; n^2 - n + 25577 ; FD:2; Complex Roots: 0.5+/-159.9273272458i ; 335 Primes = 33.50% ; 25577, 25579, 25583, 25589, 25597, 25607, 25619, 25633, 25649, 25667 ; Perf.Sqs = 26569
25643, 25657, 25667 ; -2n^2 + 20n + 25625 ; FD:-4; Real Roots: -108.3026919362 | +118.3026919362 ; 355 Primes = 35.50% ; 25643, 25657, 25667, 25673, 25675, 25673, 25667, 25657, 25643, 25625 ; Perf.Sqs = none
25889, 25903, 25913 ; -2n^2 + 20n + 25871 ; FD:-4; Real Roots: -108.844191771 | +118.844191771 ; 366 Primes = 36.60% ; 25889, 25903, 25913, 25919, 25921, 25919, 25913, 25903, 25889, 25871 ; Perf.Sqs = 25921, -529, -2401, -5329, -16129, -25921, -39601, -78961, -108241
26017, 26021, 26029 ; 2n^2 - 2n + 26017 ; FD:4; Complex Roots: 0.5+/-114.0537154152i ; 335 Primes = 33.50% ; 26017, 26021, 26029, 26041, 26057, 26077, 26101, 26129, 26161, 26197 ; Perf.Sqs = none
26297, 26309, 26317 ; -2n^2 + 18n + 26281 ; FD:-4; Real Roots: -110.2203120637 | +119.2203120637 ; 464 Primes = 46.40% ; 26297, 26309, 26317, 26321, 26321, 26317, 26309, 26297, 26281, 26261 ; Perf.Sqs = none
26393, 26399, 26407 ; n^2 + 3n + 26389 ; FD:2; Complex Roots: -1.5+/-162.439988919i ; 331 Primes = 33.10% ; 26393, 26399, 26407, 26417, 26429, 26443, 26459, 26477, 26497, 26519 ; Perf.Sqs = 26569
26647, 26669, 26681 ; -5n^2 + 37n + 26615 ; FD:-10; Real Roots: -69.3526522448 | +76.7526522448 ; 303 Primes = 30.30% ; 26647, 26669, 26681, 26683, 26675, 26657, 26629, 26591, 26543, 26485 ; Perf.Sqs = none
26681, 26683, 26687 ; n^2 - n + 26681 ; FD:2; Complex Roots: 0.5+/-163.3424317194i ; 504 Primes = 50.40% ; 26681, 26683, 26687, 26693, 26701, 26711, 26723, 26737, 26753, 26771 ; Perf.Sqs = 52441, 436921
26711, 26713, 26717 ; n^2 - n + 26711 ; FD:2; Complex Roots: 0.5+/-163.4342375391i ; 370 Primes = 37.00% ; 26711, 26713, 26717, 26723, 26731, 26741, 26753, 26767, 26783, 26801 ; Perf.Sqs = 63001
26891, 26893, 26903 ; 4n^2 - 10n + 26897 ; FD:8; Complex Roots: 1.25+/-81.9919965606i ; 313 Primes = 31.30% ; 26891, 26893, 26903, 26921, 26947, 26981, 27023, 27073, 27131, 27197 ; Perf.Sqs = none
27271, 27277, 27281 ; -1n^2 + 9n + 27263 ; FD:-2; Real Roots: -160.6764208354 | +169.6764208354 ; 519 Primes = 51.90% ; 27271, 27277, 27281, 27283, 27283, 27281, 27277, 27271, 27263, 27253 ; Perf.Sqs = 3721
27281, 27283, 27299 ; 7n^2 - 19n + 27293 ; FD:14; Complex Roots: 1.3571428571428571428571428571+/-62.4272229341i ; 329 Primes = 32.90% ; 27281, 27283, 27299, 27329, 27373, 27431, 27503, 27589, 27689, 27803 ; Perf.Sqs = none
27737, 27739, 27743 ; n^2 - n + 27737 ; FD:2; Complex Roots: 0.5+/-166.5435378512i ; 488 Primes = 48.80% ; 27737, 27739, 27743, 27749, 27757, 27767, 27779, 27793, 27809, 27827 ; Perf.Sqs = none
27799, 27803, 27809 ; n^2 + n + 27797 ; FD:2; Complex Roots: -0.5+/-166.7235736181i ; 210 Primes = 21.00% ; 27799, 27803, 27809, 27817, 27827, 27839, 27853, 27869, 27887, 27907 ; Perf.Sqs = none
27809, 27817, 27823 ; -1n^2 + 11n + 27799 ; FD:-2; Real Roots: -161.321011866 | +172.321011866 ; 504 Primes = 50.40% ; 27809, 27817, 27823, 27827, 27829, 27829, 27827, 27823, 27817, 27809 ; Perf.Sqs = 26569
27941, 27943, 27947 ; n^2 - n + 27941 ; FD:2; Complex Roots: 0.5+/-167.1548683108i ; 599 Primes = 59.90% ; 27941, 27943, 27947, 27953, 27961, 27971, 27983, 27997, 28013, 28031 ; Perf.Sqs = 160801
27943, 27947, 27953 ; n^2 + n + 27941 ; FD:2; Complex Roots: -0.5+/-167.1548683108i ; 599 Primes = 59.90% ; 27943, 27947, 27953, 27961, 27971, 27983, 27997, 28013, 28031, 28051 ; Perf.Sqs = 160801
28277, 28279, 28283 ; n^2 - n + 28277 ; FD:2; Complex Roots: 0.5+/-168.1569207615i ; 518 Primes = 51.80% ; 28277, 28279, 28283, 28289, 28297, 28307, 28319, 28333, 28349, 28367 ; Perf.Sqs = none
28279, 28283, 28289 ; n^2 + n + 28277 ; FD:2; Complex Roots: -0.5+/-168.1569207615i ; 518 Primes = 51.80% ; 28279, 28283, 28289, 28297, 28307, 28319, 28333, 28349, 28367, 28387 ; Perf.Sqs = none
28283, 28289, 28297 ; n^2 + 3n + 28279 ; FD:2; Complex Roots: -1.5+/-168.1569207615i ; 518 Primes = 51.80% ; 28283, 28289, 28297, 28307, 28319, 28333, 28349, 28367, 28387, 28409 ; Perf.Sqs = none
28393, 28403, 28409 ; -2n^2 + 16n + 28379 ; FD:-4; Real Roots: -115.1868281313 | +123.1868281313 ; 401 Primes = 40.10% ; 28393, 28403, 28409, 28411, 28409, 28403, 28393, 28379, 28361, 28339 ; Perf.Sqs = 17161
28429, 28433, 28439 ; n^2 + n + 28427 ; FD:2; Complex Roots: -0.5+/-168.602342807i ; 306 Primes = 30.60% ; 28429, 28433, 28439, 28447, 28457, 28469, 28483, 28499, 28517, 28537 ; Perf.Sqs = none
28753, 28759, 28771 ; 3n^2 - 3n + 28753 ; FD:6; Complex Roots: 0.5+/-97.8983316167i ; 560 Primes = 56.00% ; 28753, 28759, 28771, 28789, 28813, 28843, 28879, 28921, 28969, 29023 ; Perf.Sqs = 44521, 66049, 212521, 368449
29021, 29023, 29027 ; n^2 - n + 29021 ; FD:2; Complex Roots: 0.5+/-170.3547768629i ; 400 Primes = 40.00% ; 29021, 29023, 29027, 29033, 29041, 29051, 29063, 29077, 29093, 29111 ; Perf.Sqs = 44521, 241081
29059, 29063, 29077 ; 5n^2 - 11n + 29065 ; FD:10; Complex Roots: 1.1+/-76.2350969042i ; 262 Primes = 26.20% ; 29059, 29063, 29077, 29101, 29135, 29179, 29233, 29297, 29371, 29455 ; Perf.Sqs = 48841, 534361
29129, 29131, 29137 ; 2n^2 - 4n + 29131 ; FD:4; Complex Roots: 1+/-120.6834702849i ; 348 Primes = 34.80% ; 29129, 29131, 29137, 29147, 29161, 29179, 29201, 29227, 29257, 29291 ; Perf.Sqs = 29929, 192721, 358801
29191, 29201, 29207 ; -2n^2 + 16n + 29177 ; FD:-4; Real Roots: -116.8490794338 | +124.8490794338 ; 463 Primes = 46.30% ; 29191, 29201, 29207, 29209, 29207, 29201, 29191, 29177, 29159, 29137 ; Perf.Sqs = 28561, -26569, -32041, -1338649, -1530169
29473, 29483, 29501 ; 4n^2 - 2n + 29471 ; FD:8; Complex Roots: 0.25+/-85.8352346068i ; 228 Primes = 22.80% ; 29473, 29483, 29501, 29527, 29561, 29603, 29653, 29711, 29777, 29851 ; Perf.Sqs = none
29723, 29741, 29753 ; -3n^2 + 27n + 29699 ; FD:-6; Real Roots: -95.0987784396 | +104.0987784396 ; 409 Primes = 40.90% ; 29723, 29741, 29753, 29759, 29759, 29753, 29741, 29723, 29699, 29669 ; Perf.Sqs = -72361, -109561
30223, 30241, 30253 ; -3n^2 + 27n + 30199 ; FD:-6; Real Roots: -95.9319836174 | +104.9319836174 ; 419 Primes = 41.90% ; 30223, 30241, 30253, 30259, 30259, 30253, 30241, 30223, 30199, 30169 ; Perf.Sqs = 29929
30271, 30293, 30307 ; -4n^2 + 34n + 30241 ; FD:-8; Real Roots: -82.803503663 | +91.303503663 ; 354 Primes = 35.40% ; 30271, 30293, 30307, 30313, 30311, 30301, 30283, 30257, 30223, 30181 ; Perf.Sqs = -157609
30689, 30697, 30703 ; -1n^2 + 11n + 30679 ; FD:-2; Real Roots: -169.7405489606 | +180.7405489606 ; 336 Primes = 33.60% ; 30689, 30697, 30703, 30707, 30709, 30709, 30707, 30703, 30697, 30689 ; Perf.Sqs = -32041
30851, 30853, 30859 ; 2n^2 - 4n + 30853 ; FD:4; Complex Roots: 1+/-124.1994363916i ; 406 Primes = 40.60% ; 30851, 30853, 30859, 30869, 30883, 30901, 30923, 30949, 30979, 31013 ; Perf.Sqs = none
31247, 31249, 31253 ; n^2 - n + 31247 ; FD:2; Complex Roots: 0.5+/-176.7675026695i ; 487 Primes = 48.70% ; 31247, 31249, 31253, 31259, 31267, 31277, 31289, 31303, 31319, 31337 ; Perf.Sqs = none
31249, 31253, 31259 ; n^2 + n + 31247 ; FD:2; Complex Roots: -0.5+/-176.7675026695i ; 487 Primes = 48.70% ; 31249, 31253, 31259, 31267, 31277, 31289, 31303, 31319, 31337, 31357 ; Perf.Sqs = none
31649, 31657, 31663 ; -1n^2 + 11n + 31639 ; FD:-2; Real Roots: -172.4585625925 | +183.4585625925 ; 361 Primes = 36.10% ; 31649, 31657, 31663, 31667, 31669, 31669, 31667, 31663, 31657, 31649 ; Perf.Sqs = -43681
31793, 31799, 31817 ; 6n^2 - 12n + 31799 ; FD:12; Complex Roots: 1+/-72.7930857522i ; 249 Primes = 24.90% ; 31793, 31799, 31817, 31847, 31889, 31943, 32009, 32087, 32177, 32279 ; Perf.Sqs = none
31973, 31981, 31991 ; n^2 + 5n + 31967 ; FD:2; Complex Roots: -2.5+/-178.7756974535i ; 428 Primes = 42.80% ; 31973, 31981, 31991, 32003, 32017, 32033, 32051, 32071, 32093, 32117 ; Perf.Sqs = none
32057, 32059, 32063 ; n^2 - n + 32057 ; FD:2; Complex Roots: 0.5+/-179.0439890083i ; 395 Primes = 39.50% ; 32057, 32059, 32063, 32069, 32077, 32087, 32099, 32113, 32129, 32147 ; Perf.Sqs = none
32059, 32063, 32069 ; n^2 + n + 32057 ; FD:2; Complex Roots: -0.5+/-179.0439890083i ; 395 Primes = 39.50% ; 32059, 32063, 32069, 32077, 32087, 32099, 32113, 32129, 32147, 32167 ; Perf.Sqs = none
32159, 32173, 32183 ; -2n^2 + 20n + 32141 ; FD:-4; Real Roots: -121.8680416811 | +131.8680416811 ; 502 Primes = 50.20% ; 32159, 32173, 32183, 32189, 32191, 32189, 32183, 32173, 32159, 32141 ; Perf.Sqs = -3721, -124609, -516961
32173, 32183, 32189 ; -2n^2 + 16n + 32159 ; FD:-4; Real Roots: -122.8680416811 | +130.8680416811 ; 501 Primes = 50.10% ; 32173, 32183, 32189, 32191, 32189, 32183, 32173, 32159, 32141, 32119 ; Perf.Sqs = -3721, -124609, -516961
32297, 32299, 32303 ; n^2 - n + 32297 ; FD:2; Complex Roots: 0.5+/-179.7129655868i ; 460 Primes = 46.00% ; 32297, 32299, 32303, 32309, 32317, 32327, 32339, 32353, 32369, 32387 ; Perf.Sqs = none
32569, 32573, 32579 ; n^2 + n + 32567 ; FD:2; Complex Roots: -0.5+/-180.4626000034i ; 369 Primes = 36.90% ; 32569, 32573, 32579, 32587, 32597, 32609, 32623, 32639, 32657, 32677 ; Perf.Sqs = none
32611, 32621, 32633 ; n^2 + 7n + 32603 ; FD:2; Complex Roots: -3.5+/-180.5290835295i ; 367 Primes = 36.70% ; 32611, 32621, 32633, 32647, 32663, 32681, 32701, 32723, 32747, 32773 ; Perf.Sqs = none
32707, 32713, 32717 ; -1n^2 + 9n + 32699 ; FD:-2; Real Roots: -176.3846317408 | +185.3846317408 ; 503 Primes = 50.30% ; 32707, 32713, 32717, 32719, 32719, 32717, 32713, 32707, 32699, 32689 ; Perf.Sqs = 27889, 5329
32779, 32783, 32789 ; n^2 + n + 32777 ; FD:2; Complex Roots: -0.5+/-181.0435030593i ; 512 Primes = 51.20% ; 32779, 32783, 32789, 32797, 32807, 32819, 32833, 32849, 32867, 32887 ; Perf.Sqs = 597529
32999, 33013, 33023 ; -2n^2 + 20n + 32981 ; FD:-4; Real Roots: -123.5126452922 | +133.5126452922 ; 316 Primes = 31.60% ; 32999, 33013, 33023, 33029, 33031, 33029, 33023, 33013, 32999, 32981 ; Perf.Sqs = none
33149, 33151, 33161 ; 4n^2 - 10n + 33155 ; FD:8; Complex Roots: 1.25+/-91.0339909045i ; 310 Primes = 31.00% ; 33149, 33151, 33161, 33179, 33205, 33239, 33281, 33331, 33389, 33455 ; Perf.Sqs = 100489, 2093809
33199, 33203, 33211 ; 2n^2 - 2n + 33199 ; FD:4; Complex Roots: 0.5+/-128.8380766699i ; 439 Primes = 43.90% ; 33199, 33203, 33211, 33223, 33239, 33259, 33283, 33311, 33343, 33379 ; Perf.Sqs = none
33347, 33349, 33353 ; n^2 - n + 33347 ; FD:2; Complex Roots: 0.5+/-182.6109251934i ; 502 Primes = 50.20% ; 33347, 33349, 33353, 33359, 33367, 33377, 33389, 33403, 33419, 33437 ; Perf.Sqs = none
33469, 33479, 33487 ; -1n^2 + 13n + 33457 ; FD:-2; Real Roots: -176.5280033219 | +189.5280033219 ; 451 Primes = 45.10% ; 33469, 33479, 33487, 33493, 33497, 33499, 33499, 33497, 33493, 33487 ; Perf.Sqs = -491401
33617, 33619, 33623 ; n^2 - n + 33617 ; FD:2; Complex Roots: 0.5+/-183.3487114762i ; 528 Primes = 52.80% ; 33617, 33619, 33623, 33629, 33637, 33647, 33659, 33673, 33689, 33707 ; Perf.Sqs = 528529
33619, 33623, 33629 ; n^2 + n + 33617 ; FD:2; Complex Roots: -0.5+/-183.3487114762i ; 528 Primes = 52.80% ; 33619, 33623, 33629, 33637, 33647, 33659, 33673, 33689, 33707, 33727 ; Perf.Sqs = 528529
33721, 33739, 33749 ; -4n^2 + 30n + 33695 ; FD:-8; Real Roots: -88.1075663732 | +95.6075663732 ; 315 Primes = 31.50% ; 33721, 33739, 33749, 33751, 33745, 33731, 33709, 33679, 33641, 33595 ; Perf.Sqs = -289, -32041, -237169, -1168561
33749, 33751, 33757 ; 2n^2 - 4n + 33751 ; FD:4; Complex Roots: 1+/-129.9018860525i ; 349 Primes = 34.90% ; 33749, 33751, 33757, 33767, 33781, 33799, 33821, 33847, 33877, 33911 ; Perf.Sqs = none
33923, 33931, 33937 ; -1n^2 + 11n + 33913 ; FD:-2; Real Roots: -178.7369398356 | +189.7369398356 ; 308 Primes = 30.80% ; 33923, 33931, 33937, 33941, 33943, 33943, 33941, 33937, 33931, 33923 ; Perf.Sqs = none
33997, 34019, 34031 ; -5n^2 + 37n + 33965 ; FD:-10; Real Roots: -78.8026666236 | +86.2026666236 ; 355 Primes = 35.50% ; 33997, 34019, 34031, 34033, 34025, 34007, 33979, 33941, 33893, 33835 ; Perf.Sqs = -19321, -410881
34267, 34273, 34283 ; 2n^2 + 34265 ; FD:4; Complex Roots: 0+/-130.8911761732i ; 301 Primes = 30.10% ; 34267, 34273, 34283, 34297, 34315, 34337, 34363, 34393, 34427, 34465 ; Perf.Sqs = none
34313, 34319, 34327 ; n^2 + 3n + 34309 ; FD:2; Complex Roots: -1.5+/-185.2208141651i ; 221 Primes = 22.10% ; 34313, 34319, 34327, 34337, 34349, 34363, 34379, 34397, 34417, 34439 ; Perf.Sqs = 717409
34337, 34351, 34361 ; -2n^2 + 20n + 34319 ; FD:-4; Real Roots: -126.0896639709 | +136.0896639709 ; 519 Primes = 51.90% ; 34337, 34351, 34361, 34367, 34369, 34367, 34361, 34351, 34337, 34319 ; Perf.Sqs = 22201, -18769, -58081, -1129969
34351, 34361, 34367 ; -2n^2 + 16n + 34337 ; FD:-4; Real Roots: -127.0896639709 | +135.0896639709 ; 519 Primes = 51.90% ; 34351, 34361, 34367, 34369, 34367, 34361, 34351, 34337, 34319, 34297 ; Perf.Sqs = 22201, -18769, -58081, -1129969
34367, 34369, 34381 ; 5n^2 - 13n + 34375 ; FD:10; Complex Roots: 1.3+/-82.9054280491i ; 241 Primes = 24.10% ; 34367, 34369, 34381, 34403, 34435, 34477, 34529, 34591, 34663, 34745 ; Perf.Sqs = 46225, 923521
35051, 35053, 35059 ; 2n^2 - 4n + 35053 ; FD:4; Complex Roots: 1+/-132.3839114092i ; 295 Primes = 29.50% ; 35051, 35053, 35059, 35069, 35083, 35101, 35123, 35149, 35179, 35213 ; Perf.Sqs = none
35081, 35083, 35089 ; 2n^2 - 4n + 35083 ; FD:4; Complex Roots: 1+/-132.440552702i ; 322 Primes = 32.20% ; 35081, 35083, 35089, 35099, 35113, 35131, 35153, 35179, 35209, 35243 ; Perf.Sqs = 54289, 94249, 1190281
35129, 35141, 35149 ; -2n^2 + 18n + 35113 ; FD:-4; Real Roots: -128.0773359213 | +137.0773359213 ; 387 Primes = 38.70% ; 35129, 35141, 35149, 35153, 35153, 35149, 35141, 35129, 35113, 35093 ; Perf.Sqs = none
35461, 35491, 35507 ; -7n^2 + 51n + 35417 ; FD:-14; Real Roots: -67.5810281537 | +74.8667424394 ; 277 Primes = 27.70% ; 35461, 35491, 35507, 35509, 35497, 35471, 35431, 35377, 35309, 35227 ; Perf.Sqs = none
35521, 35527, 35531 ; -1n^2 + 9n + 35513 ; FD:-2; Real Roots: -184.0026525012 | +193.0026525012 ; 367 Primes = 36.70% ; 35521, 35527, 35531, 35533, 35533, 35531, 35527, 35521, 35513, 35503 ; Perf.Sqs = 28561, 1, -142129
35531, 35533, 35537 ; n^2 - n + 35531 ; FD:2; Complex Roots: 0.5+/-188.4960211782i ; 488 Primes = 48.80% ; 35531, 35533, 35537, 35543, 35551, 35561, 35573, 35587, 35603, 35621 ; Perf.Sqs = none
35591, 35593, 35597 ; n^2 - n + 35591 ; FD:2; Complex Roots: 0.5+/-188.6551085977i ; 434 Primes = 43.40% ; 35591, 35593, 35597, 35603, 35611, 35621, 35633, 35647, 35663, 35681 ; Perf.Sqs = 44521, 591361
35933, 35951, 35963 ; -3n^2 + 27n + 35909 ; FD:-6; Real Roots: -104.9984779194 | +113.9984779194 ; 524 Primes = 52.40% ; 35933, 35951, 35963, 35969, 35969, 35963, 35951, 35933, 35909, 35879 ; Perf.Sqs = -1, -1708249, -1745041
36067, 36073, 36083 ; 2n^2 + 36065 ; FD:4; Complex Roots: 0+/-134.2851443757i ; 337 Primes = 33.70% ; 36067, 36073, 36083, 36097, 36115, 36137, 36163, 36193, 36227, 36265 ; Perf.Sqs = none
36467, 36469, 36473 ; n^2 - n + 36467 ; FD:2; Complex Roots: 0.5+/-190.9626926915i ; 403 Primes = 40.30% ; 36467, 36469, 36473, 36479, 36487, 36497, 36509, 36523, 36539, 36557 ; Perf.Sqs = 54289
36529, 36541, 36551 ; -1n^2 + 15n + 36515 ; FD:-2; Real Roots: -183.7361106068 | +198.7361106068 ; 304 Primes = 30.40% ; 36529, 36541, 36551, 36559, 36565, 36569, 36571, 36571, 36569, 36565 ; Perf.Sqs = 36481, 29929, 28561, 11449, -167281
36559, 36563, 36571 ; 2n^2 - 2n + 36559 ; FD:4; Complex Roots: 0.5+/-135.200776625i ; 519 Primes = 51.90% ; 36559, 36563, 36571, 36583, 36599, 36619, 36643, 36671, 36703, 36739 ; Perf.Sqs = none
36781, 36787, 36791 ; -1n^2 + 9n + 36773 ; FD:-2; Real Roots: -187.315666722 | +196.315666722 ; 410 Primes = 41.00% ; 36781, 36787, 36791, 36793, 36793, 36791, 36787, 36781, 36773, 36763 ; Perf.Sqs = 32761, 121
37003, 37013, 37019 ; -2n^2 + 16n + 36989 ; FD:-4; Real Roots: -132.0532983797 | +140.0532983797 ; 384 Primes = 38.40% ; 37003, 37013, 37019, 37021, 37019, 37013, 37003, 36989, 36971, 36949 ; Perf.Sqs = none
37159, 37171, 37181 ; -1n^2 + 15n + 37145 ; FD:-2; Real Roots: -185.3762556667 | +200.3762556667 ; 259 Primes = 25.90% ; 37159, 37171, 37181, 37189, 37195, 37199, 37201, 37201, 37199, 37195 ; Perf.Sqs = 27889, 529
37361, 37363, 37369 ; 2n^2 - 4n + 37363 ; FD:4; Complex Roots: 1+/-136.6766256534i ; 363 Primes = 36.30% ; 37361, 37363, 37369, 37379, 37393, 37411, 37433, 37459, 37489, 37523 ; Perf.Sqs = 54289, 109561, 1138489
37493, 37501, 37507 ; -1n^2 + 11n + 37483 ; FD:-2; Real Roots: -188.1833756418 | +199.1833756418 ; 328 Primes = 32.80% ; 37493, 37501, 37507, 37511, 37513, 37513, 37511, 37507, 37501, 37493 ; Perf.Sqs = 841
37561, 37567, 37571 ; -1n^2 + 9n + 37553 ; FD:-2; Real Roots: -189.3382057284 | +198.3382057284 ; 407 Primes = 40.70% ; 37561, 37567, 37571, 37573, 37573, 37571, 37567, 37561, 37553, 37543 ; Perf.Sqs = -51529
37571, 37573, 37579 ; 2n^2 - 4n + 37573 ; FD:4; Complex Roots: 1+/-137.0602057492i ; 510 Primes = 51.00% ; 37571, 37573, 37579, 37589, 37603, 37621, 37643, 37669, 37699, 37733 ; Perf.Sqs = none
37619, 37633, 37643 ; -2n^2 + 20n + 37601 ; FD:-4; Real Roots: -132.2060494293 | +142.2060494293 ; 431 Primes = 43.10% ; 37619, 37633, 37643, 37649, 37651, 37649, 37643, 37633, 37619, 37601 ; Perf.Sqs = none
37693, 37699, 37717 ; 6n^2 - 12n + 37699 ; FD:12; Complex Roots: 1+/-79.2601202792i ; 321 Primes = 32.10% ; 37693, 37699, 37717, 37747, 37789, 37843, 37909, 37987, 38077, 38179 ; Perf.Sqs = none
37847, 37853, 37861 ; n^2 + 3n + 37843 ; FD:2; Complex Roots: -1.5+/-194.5269904152i ; 368 Primes = 36.80% ; 37847, 37853, 37861, 37871, 37883, 37897, 37913, 37931, 37951, 37973 ; Perf.Sqs = none
38153, 38167, 38177 ; -2n^2 + 20n + 38135 ; FD:-4; Real Roots: -133.1756128989 | +143.1756128989 ; 346 Primes = 34.60% ; 38153, 38167, 38177, 38183, 38185, 38183, 38177, 38167, 38153, 38135 ; Perf.Sqs = none
38201, 38219, 38231 ; -3n^2 + 27n + 38177 ; FD:-6; Real Roots: -108.3978151545 | +117.3978151545 ; 475 Primes = 47.50% ; 38201, 38219, 38231, 38237, 38237, 38231, 38219, 38201, 38177, 38147 ; Perf.Sqs = none
38447, 38449, 38453 ; n^2 - n + 38447 ; FD:2; Complex Roots: 0.5+/-196.0784281863i ; 316 Primes = 31.60% ; 38447, 38449, 38453, 38459, 38467, 38477, 38489, 38503, 38519, 38537 ; Perf.Sqs = none
38593, 38603, 38609 ; -2n^2 + 16n + 38579 ; FD:-4; Real Roots: -134.9442334176 | +142.9442334176 ; 393 Primes = 39.30% ; 38593, 38603, 38609, 38611, 38609, 38603, 38593, 38579, 38561, 38539 ; Perf.Sqs = 5329
38723, 38729, 38737 ; n^2 + 3n + 38719 ; FD:2; Complex Roots: -1.5+/-196.7657236411i ; 349 Primes = 34.90% ; 38723, 38729, 38737, 38747, 38759, 38773, 38789, 38807, 38827, 38849 ; Perf.Sqs = 47089
38803, 38821, 38833 ; -3n^2 + 27n + 38779 ; FD:-6; Real Roots: -109.2830538056 | +118.2830538056 ; 389 Primes = 38.90% ; 38803, 38821, 38833, 38839, 38839, 38833, 38821, 38803, 38779, 38749 ; Perf.Sqs = 29929, 2209
38971, 38977, 38993 ; 5n^2 - 9n + 38975 ; FD:10; Complex Roots: 0.9+/-88.284709888i ; 315 Primes = 31.50% ; 38971, 38977, 38993, 39019, 39055, 39101, 39157, 39223, 39299, 39385 ; Perf.Sqs = none
39079, 39089, 39097 ; -1n^2 + 13n + 39067 ; FD:-2; Real Roots: -191.26058758 | +204.26058758 ; 402 Primes = 40.20% ; 39079, 39089, 39097, 39103, 39107, 39109, 39109, 39107, 39103, 39097 ; Perf.Sqs = 6889
39089, 39097, 39103 ; -1n^2 + 11n + 39079 ; FD:-2; Real Roots: -192.26058758 | +203.26058758 ; 402 Primes = 40.20% ; 39089, 39097, 39103, 39107, 39109, 39109, 39107, 39103, 39097, 39089 ; Perf.Sqs = 6889
39227, 39229, 39233 ; n^2 - n + 39227 ; FD:2; Complex Roots: 0.5+/-198.0574411629i ; 461 Primes = 46.10% ; 39227, 39229, 39233, 39239, 39247, 39257, 39269, 39283, 39299, 39317 ; Perf.Sqs = 214369, 851929, 935089
39383, 39397, 39409 ; -1n^2 + 17n + 39367 ; FD:-2; Real Roots: -190.0931771235 | +207.0931771235 ; 486 Primes = 48.60% ; 39383, 39397, 39409, 39419, 39427, 39433, 39437, 39439, 39439, 39437 ; Perf.Sqs = -361
39709, 39719, 39727 ; -1n^2 + 13n + 39697 ; FD:-2; Real Roots: -192.8470591707 | +205.8470591707 ; 323 Primes = 32.30% ; 39709, 39719, 39727, 39733, 39737, 39739, 39739, 39737, 39733, 39727 ; Perf.Sqs = 38809, 5329, -919681
39733, 39749, 39761 ; -2n^2 + 22n + 39713 ; FD:-4; Real Roots: -135.5203885968 | +146.5203885968 ; 348 Primes = 34.80% ; 39733, 39749, 39761, 39769, 39773, 39773, 39769, 39761, 39749, 39733 ; Perf.Sqs = none
39761, 39769, 39779 ; n^2 + 5n + 39755 ; FD:2; Complex Roots: -2.5+/-199.3708855375i ; 338 Primes = 33.80% ; 39761, 39769, 39779, 39791, 39805, 39821, 39839, 39859, 39881, 39905 ; Perf.Sqs = none
39839, 39841, 39847 ; 2n^2 - 4n + 39841 ; FD:4; Complex Roots: 1+/-141.1364587908i ; 382 Primes = 38.20% ; 39839, 39841, 39847, 39857, 39871, 39889, 39911, 39937, 39967, 40001 ; Perf.Sqs = 54289, 128881, 1079521
39869, 39877, 39883 ; -1n^2 + 11n + 39859 ; FD:-2; Real Roots: -194.2229330848 | +205.2229330848 ; 503 Primes = 50.30% ; 39869, 39877, 39883, 39887, 39889, 39889, 39887, 39883, 39877, 39869 ; Perf.Sqs = none
40343, 40351, 40357 ; -1n^2 + 11n + 40333 ; FD:-2; Real Roots: -195.4060725812 | +206.4060725812 ; 419 Primes = 41.90% ; 40343, 40351, 40357, 40361, 40363, 40363, 40361, 40357, 40351, 40343 ; Perf.Sqs = 961
40591, 40597, 40609 ; 3n^2 - 3n + 40591 ; FD:6; Complex Roots: 0.5+/-116.3188864i ; 290 Primes = 29.00% ; 40591, 40597, 40609, 40627, 40651, 40681, 40717, 40759, 40807, 40861 ; Perf.Sqs = 61009, 157609, 167281, 546121
40609, 40627, 40637 ; -4n^2 + 30n + 40583 ; FD:-8; Real Roots: -97.0458952537 | +104.5458952537 ; 404 Primes = 40.40% ; 40609, 40627, 40637, 40639, 40633, 40619, 40597, 40567, 40529, 40483 ; Perf.Sqs = 2809
40739, 40751, 40759 ; -2n^2 + 18n + 40723 ; FD:-4; Real Roots: -138.264666497 | +147.264666497 ; 360 Primes = 36.00% ; 40739, 40751, 40759, 40763, 40763, 40759, 40751, 40739, 40723, 40703 ; Perf.Sqs = -37249, -44521, -1874161
40771, 40787, 40801 ; -1n^2 + 19n + 40753 ; FD:-2; Real Roots: -192.5971301132 | +211.5971301132 ; 264 Primes = 26.40% ; 40771, 40787, 40801, 40813, 40823, 40831, 40837, 40841, 40843, 40843 ; Perf.Sqs = none
41177, 41179, 41183 ; n^2 - n + 41177 ; FD:2; Complex Roots: 0.5+/-202.9205509553i ; 376 Primes = 37.60% ; 41177, 41179, 41183, 41189, 41197, 41207, 41219, 41233, 41249, 41267 ; Perf.Sqs = none
41203, 41213, 41221 ; -1n^2 + 13n + 41191 ; FD:-2; Real Roots: -196.5597202795 | +209.5597202795 ; 501 Primes = 50.10% ; 41203, 41213, 41221, 41227, 41231, 41233, 41233, 41231, 41227, 41221 ; Perf.Sqs = -146689, -316969
41213, 41221, 41227 ; -1n^2 + 11n + 41203 ; FD:-2; Real Roots: -197.5597202795 | +208.5597202795 ; 502 Primes = 50.20% ; 41213, 41221, 41227, 41231, 41233, 41233, 41231, 41227, 41221, 41213 ; Perf.Sqs = -146689, -316969
41221, 41227, 41231 ; -1n^2 + 9n + 41213 ; FD:-2; Real Roots: -198.5597202795 | +207.5597202795 ; 501 Primes = 50.10% ; 41221, 41227, 41231, 41233, 41233, 41231, 41227, 41221, 41213, 41203 ; Perf.Sqs = -146689, -316969
41263, 41269, 41281 ; 3n^2 - 3n + 41263 ; FD:6; Complex Roots: 0.5+/-117.2778040949i ; 373 Primes = 37.30% ; 41263, 41269, 41281, 41299, 41323, 41353, 41389, 41431, 41479, 41533 ; Perf.Sqs = 51529, 786769
41651, 41659, 41669 ; n^2 + 5n + 41645 ; FD:2; Complex Roots: -2.5+/-204.0557521855i ; 373 Primes = 37.30% ; 41651, 41659, 41669, 41681, 41695, 41711, 41729, 41749, 41771, 41795 ; Perf.Sqs = none
41879, 41887, 41893 ; -1n^2 + 11n + 41869 ; FD:-2; Real Roots: -199.1930629015 | +210.1930629015 ; 330 Primes = 33.00% ; 41879, 41887, 41893, 41897, 41899, 41899, 41897, 41893, 41887, 41879 ; Perf.Sqs = 11449
41893, 41897, 41903 ; n^2 + n + 41891 ; FD:2; Complex Roots: -0.5+/-204.6722990539i ; 423 Primes = 42.30% ; 41893, 41897, 41903, 41911, 41921, 41933, 41947, 41963, 41981, 42001 ; Perf.Sqs = none
41947, 41953, 41957 ; -1n^2 + 9n + 41939 ; FD:-2; Real Roots: -200.3395713723 | +209.3395713723 ; 471 Primes = 47.10% ; 41947, 41953, 41957, 41959, 41959, 41957, 41953, 41947, 41939, 41929 ; Perf.Sqs = -776161
42043, 42061, 42071 ; -4n^2 + 30n + 42017 ; FD:-8; Real Roots: -98.8088245837 | +106.3088245837 ; 393 Primes = 39.30% ; 42043, 42061, 42071, 42073, 42067, 42053, 42031, 42001, 41963, 41917 ; Perf.Sqs = 32761
42227, 42239, 42257 ; 3n^2 + 3n + 42221 ; FD:6; Complex Roots: -0.5+/-118.631432035i ; 351 Primes = 35.10% ; 42227, 42239, 42257, 42281, 42311, 42347, 42389, 42437, 42491, 42551 ; Perf.Sqs = none
42397, 42403, 42407 ; -1n^2 + 9n + 42389 ; FD:-2; Real Roots: -201.4350625804 | +210.4350625804 ; 344 Primes = 34.40% ; 42397, 42403, 42407, 42409, 42409, 42407, 42403, 42397, 42389, 42379 ; Perf.Sqs = 27889, 2209
42433, 42437, 42443 ; n^2 + n + 42431 ; FD:2; Complex Roots: -0.5+/-205.9872568874i ; 403 Primes = 40.30% ; 42433, 42437, 42443, 42451, 42461, 42473, 42487, 42503, 42521, 42541 ; Perf.Sqs = 249001
42443, 42451, 42457 ; -1n^2 + 11n + 42433 ; FD:-2; Real Roots: -200.5661301621 | +211.5661301621 ; 545 Primes = 54.50% ; 42443, 42451, 42457, 42461, 42463, 42463, 42461, 42457, 42451, 42443 ; Perf.Sqs = 39601, 32761
42451, 42457, 42461 ; -1n^2 + 9n + 42443 ; FD:-2; Real Roots: -201.5661301621 | +210.5661301621 ; 544 Primes = 54.40% ; 42451, 42457, 42461, 42463, 42463, 42461, 42457, 42451, 42443, 42433 ; Perf.Sqs = 39601, 32761
42461, 42463, 42467 ; n^2 - n + 42461 ; FD:2; Complex Roots: 0.5+/-206.060064059i ; 396 Primes = 39.60% ; 42461, 42463, 42467, 42473, 42481, 42491, 42503, 42517, 42533, 42551 ; Perf.Sqs = none
42701, 42703, 42709 ; 2n^2 - 4n + 42703 ; FD:4; Complex Roots: 1+/-146.1181029168i ; 593 Primes = 59.30% ; 42701, 42703, 42709, 42719, 42733, 42751, 42773, 42799, 42829, 42863 ; Perf.Sqs = none
42943, 42953, 42961 ; -1n^2 + 13n + 42931 ; FD:-2; Real Roots: -200.7999035214 | +213.7999035214 ; 363 Primes = 36.30% ; 42943, 42953, 42961, 42967, 42971, 42973, 42973, 42971, 42967, 42961 ; Perf.Sqs = -134689, -247009
42989, 43003, 43013 ; -2n^2 + 20n + 42971 ; FD:-4; Real Roots: -141.6645833185 | +151.6645833185 ; 500 Primes = 50.00% ; 42989, 43003, 43013, 43019, 43021, 43019, 43013, 43003, 42989, 42971 ; Perf.Sqs = none
43103, 43117, 43133 ; n^2 + 11n + 43091 ; FD:2; Complex Roots: -5.5+/-207.5108430902i ; 379 Primes = 37.90% ; 43103, 43117, 43133, 43151, 43171, 43193, 43217, 43243, 43271, 43301 ; Perf.Sqs = none
43427, 43441, 43451 ; -2n^2 + 20n + 43409 ; FD:-4; Real Roots: -142.4092941439 | +152.4092941439 ; 386 Primes = 38.60% ; 43427, 43441, 43451, 43457, 43459, 43457, 43451, 43441, 43427, 43409 ; Perf.Sqs = none
43481, 43487, 43499 ; 3n^2 - 3n + 43481 ; FD:6; Complex Roots: 0.5+/-120.3886068807i ; 394 Primes = 39.40% ; 43481, 43487, 43499, 43517, 43541, 43571, 43607, 43649, 43697, 43751 ; Perf.Sqs = none
43487, 43499, 43517 ; 3n^2 + 3n + 43481 ; FD:6; Complex Roots: -0.5+/-120.3886068807i ; 394 Primes = 39.40% ; 43487, 43499, 43517, 43541, 43571, 43607, 43649, 43697, 43751, 43811 ; Perf.Sqs = none
44089, 44101, 44111 ; -1n^2 + 15n + 44075 ; FD:-2; Real Roots: -202.5743915855 | +217.5743915855 ; 477 Primes = 47.70% ; 44089, 44101, 44111, 44119, 44125, 44129, 44131, 44131, 44129, 44125 ; Perf.Sqs = -4489, -126025
44171, 44179, 44189 ; n^2 + 5n + 44165 ; FD:2; Complex Roots: -2.5+/-210.1398343961i ; 290 Primes = 29.00% ; 44171, 44179, 44189, 44201, 44215, 44231, 44249, 44269, 44291, 44315 ; Perf.Sqs = none
44249, 44257, 44263 ; -1n^2 + 11n + 44239 ; FD:-2; Real Roots: -204.9025902882 | +215.9025902882 ; 389 Primes = 38.90% ; 44249, 44257, 44263, 44267, 44269, 44269, 44267, 44263, 44257, 44249 ; Perf.Sqs = none
44257, 44263, 44267 ; -1n^2 + 9n + 44249 ; FD:-2; Real Roots: -205.9025902882 | +214.9025902882 ; 389 Primes = 38.90% ; 44257, 44263, 44267, 44269, 44269, 44267, 44263, 44257, 44249, 44239 ; Perf.Sqs = none
44267, 44269, 44273 ; n^2 - n + 44267 ; FD:2; Complex Roots: 0.5+/-210.3966492129i ; 436 Primes = 43.60% ; 44267, 44269, 44273, 44279, 44287, 44297, 44309, 44323, 44339, 44357 ; Perf.Sqs = none
44483, 44491, 44497 ; -1n^2 + 11n + 44473 ; FD:-2; Real Roots: -205.4579341954 | +216.4579341954 ; 388 Primes = 38.80% ; 44483, 44491, 44497, 44501, 44503, 44503, 44501, 44497, 44491, 44483 ; Perf.Sqs = none
44531, 44533, 44537 ; n^2 - n + 44531 ; FD:2; Complex Roots: 0.5+/-211.0231030006i ; 359 Primes = 35.90% ; 44531, 44533, 44537, 44543, 44551, 44561, 44573, 44587, 44603, 44621 ; Perf.Sqs = none
44623, 44633, 44641 ; -1n^2 + 13n + 44611 ; FD:-2; Real Roots: -204.8131562397 | +217.8131562397 ; 404 Primes = 40.40% ; 44623, 44633, 44641, 44647, 44651, 44653, 44653, 44651, 44647, 44641 ; Perf.Sqs = 44521
44633, 44641, 44647 ; -1n^2 + 11n + 44623 ; FD:-2; Real Roots: -205.8131562397 | +216.8131562397 ; 404 Primes = 40.40% ; 44633, 44641, 44647, 44651, 44653, 44653, 44651, 44647, 44641, 44633 ; Perf.Sqs = 44521
44699, 44701, 44711 ; 4n^2 - 10n + 44705 ; FD:8; Complex Roots: 1.25+/-105.7103944747i ; 388 Primes = 38.80% ; 44699, 44701, 44711, 44729, 44755, 44789, 44831, 44881, 44939, 45005 ; Perf.Sqs = none
44851, 44867, 44879 ; -2n^2 + 22n + 44831 ; FD:-4; Real Roots: -144.3190575327 | +155.3190575327 ; 315 Primes = 31.50% ; 44851, 44867, 44879, 44887, 44891, 44891, 44887, 44879, 44867, 44851 ; Perf.Sqs = -7921, -146689, -840889
44909, 44917, 44927 ; n^2 + 5n + 44903 ; FD:2; Complex Roots: -2.5+/-211.8885320162i ; 391 Primes = 39.10% ; 44909, 44917, 44927, 44939, 44953, 44969, 44987, 45007, 45029, 45053 ; Perf.Sqs = 935089
44917, 44927, 44939 ; n^2 + 7n + 44909 ; FD:2; Complex Roots: -3.5+/-211.8885320162i ; 391 Primes = 39.10% ; 44917, 44927, 44939, 44953, 44969, 44987, 45007, 45029, 45053, 45079 ; Perf.Sqs = 935089
44959, 44963, 44971 ; 2n^2 - 2n + 44959 ; FD:4; Complex Roots: 0.5+/-149.9308173792i ; 318 Primes = 31.80% ; 44959, 44963, 44971, 44983, 44999, 45019, 45043, 45071, 45103, 45139 ; Perf.Sqs = none
45589, 45599, 45613 ; 2n^2 + 4n + 45583 ; FD:4; Complex Roots: -1+/-150.9652277844i ; 436 Primes = 43.60% ; 45589, 45599, 45613, 45631, 45653, 45679, 45709, 45743, 45781, 45823 ; Perf.Sqs = none
45659, 45667, 45673 ; -1n^2 + 11n + 45649 ; FD:-2; Real Roots: -208.2270455511 | +219.2270455511 ; 467 Primes = 46.70% ; 45659, 45667, 45673, 45677, 45679, 45679, 45677, 45673, 45667, 45659 ; Perf.Sqs = 29929, 1369, -241081
45821, 45823, 45827 ; n^2 - n + 45821 ; FD:2; Complex Roots: 0.5+/-214.0578192919i ; 414 Primes = 41.40% ; 45821, 45823, 45827, 45833, 45841, 45851, 45863, 45877, 45893, 45911 ; Perf.Sqs = none
45823, 45827, 45833 ; n^2 + n + 45821 ; FD:2; Complex Roots: -0.5+/-214.0578192919i ; 413 Primes = 41.30% ; 45823, 45827, 45833, 45841, 45851, 45863, 45877, 45893, 45911, 45931 ; Perf.Sqs = none
46153, 46171, 46181 ; -4n^2 + 30n + 46127 ; FD:-8; Real Roots: -103.7014425217 | +111.2014425217 ; 444 Primes = 44.40% ; 46153, 46171, 46181, 46183, 46177, 46163, 46141, 46111, 46073, 46027 ; Perf.Sqs = 36481
46183, 46187, 46199 ; 4n^2 - 8n + 46187 ; FD:8; Complex Roots: 1+/-107.4511516923i ; 376 Primes = 37.60% ; 46183, 46187, 46199, 46219, 46247, 46283, 46327, 46379, 46439, 46507 ; Perf.Sqs = none
46477, 46489, 46499 ; -1n^2 + 15n + 46463 ; FD:-2; Real Roots: -208.1832167787 | +223.1832167787 ; 396 Primes = 39.60% ; 46477, 46489, 46499, 46507, 46513, 46517, 46519, 46519, 46517, 46513 ; Perf.Sqs = 10609, 2209, -383161
46549, 46559, 46567 ; -1n^2 + 13n + 46537 ; FD:-2; Real Roots: -209.3222648385 | +222.3222648385 ; 473 Primes = 47.30% ; 46549, 46559, 46567, 46573, 46577, 46579, 46579, 46577, 46573, 46567 ; Perf.Sqs = 16129
46589, 46591, 46601 ; 4n^2 - 10n + 46595 ; FD:8; Complex Roots: 1.25+/-107.9221362835i ; 257 Primes = 25.70% ; 46589, 46591, 46601, 46619, 46645, 46679, 46721, 46771, 46829, 46895 ; Perf.Sqs = 66049, 1006009
46687, 46691, 46703 ; 4n^2 - 8n + 46691 ; FD:8; Complex Roots: 1+/-108.0358736717i ; 388 Primes = 38.80% ; 46687, 46691, 46703, 46723, 46751, 46787, 46831, 46883, 46943, 47011 ; Perf.Sqs = none
47041, 47051, 47057 ; -2n^2 + 16n + 47027 ; FD:-4; Real Roots: -149.3932853811 | +157.3932853811 ; 369 Primes = 36.90% ; 47041, 47051, 47057, 47059, 47057, 47051, 47041, 47027, 47009, 46987 ; Perf.Sqs = 10609
47119, 47123, 47129 ; n^2 + n + 47117 ; FD:2; Complex Roots: -0.5+/-217.0639306748i ; 322 Primes = 32.20% ; 47119, 47123, 47129, 47137, 47147, 47159, 47173, 47189, 47207, 47227 ; Perf.Sqs = 69169
47129, 47137, 47143 ; -1n^2 + 11n + 47119 ; FD:-2; Real Roots: -211.6387805068 | +222.6387805068 ; 543 Primes = 54.30% ; 47129, 47137, 47143, 47147, 47149, 47149, 47147, 47143, 47137, 47129 ; Perf.Sqs = 37249, 5329, -151321
47137, 47143, 47147 ; -1n^2 + 9n + 47129 ; FD:-2; Real Roots: -212.6387805068 | +221.6387805068 ; 542 Primes = 54.20% ; 47137, 47143, 47147, 47149, 47149, 47147, 47143, 47137, 47129, 47119 ; Perf.Sqs = 37249, 5329, -151321
47269, 47279, 47287 ; -1n^2 + 13n + 47257 ; FD:-2; Real Roots: -210.9839074506 | +223.9839074506 ; 264 Primes = 26.40% ; 47269, 47279, 47287, 47293, 47297, 47299, 47299, 47297, 47293, 47287 ; Perf.Sqs = 47089, 24649, -96721
47279, 47287, 47293 ; -1n^2 + 11n + 47269 ; FD:-2; Real Roots: -211.9839074506 | +222.9839074506 ; 264 Primes = 26.40% ; 47279, 47287, 47293, 47297, 47299, 47299, 47297, 47293, 47287, 47279 ; Perf.Sqs = 47089, 24649, -96721
47317, 47339, 47351 ; -5n^2 + 37n + 47285 ; FD:-10; Real Roots: -93.6174701685 | +101.0174701685 ; 230 Primes = 23.00% ; 47317, 47339, 47351, 47353, 47345, 47327, 47299, 47261, 47213, 47155 ; Perf.Sqs = -961, -687241
47351, 47353, 47363 ; 4n^2 - 10n + 47357 ; FD:8; Complex Roots: 1.25+/-108.8011374021i ; 392 Primes = 39.20% ; 47351, 47353, 47363, 47381, 47407, 47441, 47483, 47533, 47591, 47657 ; Perf.Sqs = none
47389, 47407, 47417 ; -4n^2 + 30n + 47363 ; FD:-8; Real Roots: -105.1298075862 | +112.6298075862 ; 315 Primes = 31.50% ; 47389, 47407, 47417, 47419, 47413, 47399, 47377, 47347, 47309, 47263 ; Perf.Sqs = -477481
47569, 47581, 47591 ; -1n^2 + 15n + 47555 ; FD:-2; Real Roots: -210.7000229148 | +225.7000229148 ; 434 Primes = 43.40% ; 47569, 47581, 47591, 47599, 47605, 47609, 47611, 47611, 47609, 47605 ; Perf.Sqs = 39601, 36481, 17161, 3721, -32761
47623, 47629, 47639 ; 2n^2 + 47621 ; FD:4; Complex Roots: 0+/-154.3065131483i ; 226 Primes = 22.60% ; 47623, 47629, 47639, 47653, 47671, 47693, 47719, 47749, 47783, 47821 ; Perf.Sqs = none
47807, 47809, 47819 ; 4n^2 - 10n + 47813 ; FD:8; Complex Roots: 1.25+/-109.3237737183i ; 358 Primes = 35.80% ; 47807, 47809, 47819, 47837, 47863, 47897, 47939, 47989, 48047, 48113 ; Perf.Sqs = none
48073, 48079, 48091 ; 3n^2 - 3n + 48073 ; FD:6; Complex Roots: 0.5+/-126.5862683443i ; 412 Primes = 41.20% ; 48073, 48079, 48091, 48109, 48133, 48163, 48199, 48241, 48289, 48343 ; Perf.Sqs = 49729, 177241, 208849, 1635841
48091, 48109, 48119 ; -4n^2 + 30n + 48065 ; FD:-8; Real Roots: -105.9327812375 | +113.4327812375 ; 364 Primes = 36.40% ; 48091, 48109, 48119, 48121, 48115, 48101, 48079, 48049, 48011, 47965 ; Perf.Sqs = 38809, 7921
48179, 48187, 48193 ; -1n^2 + 11n + 48169 ; FD:-2; Real Roots: -214.0432759162 | +225.0432759162 ; 414 Primes = 41.40% ; 48179, 48187, 48193, 48197, 48199, 48199, 48197, 48193, 48187, 48179 ; Perf.Sqs = -44521
48449, 48463, 48473 ; -2n^2 + 20n + 48431 ; FD:-4; Real Roots: -150.6936093743 | +160.6936093743 ; 463 Primes = 46.30% ; 48449, 48463, 48473, 48479, 48481, 48479, 48473, 48463, 48449, 48431 ; Perf.Sqs = 3481, -12769, -130321, -1079521
48463, 48473, 48479 ; -2n^2 + 16n + 48449 ; FD:-4; Real Roots: -151.6936093743 | +159.6936093743 ; 464 Primes = 46.40% ; 48463, 48473, 48479, 48481, 48479, 48473, 48463, 48449, 48431, 48409 ; Perf.Sqs = 3481, -12769, -130321, -1079521
48787, 48799, 48809 ; -1n^2 + 15n + 48773 ; FD:-2; Real Roots: -213.4734146905 | +228.4734146905 ; 354 Primes = 35.40% ; 48787, 48799, 48809, 48817, 48823, 48827, 48829, 48829, 48827, 48823 ; Perf.Sqs = 24649, 10609, -57121
49031, 49033, 49037 ; n^2 - n + 49031 ; FD:2; Complex Roots: 0.5+/-221.4288824883i ; 504 Primes = 50.40% ; 49031, 49033, 49037, 49043, 49051, 49061, 49073, 49087, 49103, 49121 ; Perf.Sqs = none
49529, 49531, 49537 ; 2n^2 - 4n + 49531 ; FD:4; Complex Roots: 1+/-157.367404503i ; 281 Primes = 28.10% ; 49529, 49531, 49537, 49547, 49561, 49579, 49601, 49627, 49657, 49691 ; Perf.Sqs = 49729, 395641, 502681
49597, 49603, 49613 ; 2n^2 + 49595 ; FD:4; Complex Roots: 0+/-157.4722197723i ; 226 Primes = 22.60% ; 49597, 49603, 49613, 49627, 49645, 49667, 49693, 49723, 49757, 49795 ; Perf.Sqs = none
49739, 49741, 49747 ; 2n^2 - 4n + 49741 ; FD:4; Complex Roots: 1+/-157.7006658198i ; 430 Primes = 43.00% ; 49739, 49741, 49747, 49757, 49771, 49789, 49811, 49837, 49867, 49901 ; Perf.Sqs = none
49919, 49921, 49927 ; 2n^2 - 4n + 49921 ; FD:4; Complex Roots: 1+/-157.9857588519i ; 342 Primes = 34.20% ; 49919, 49921, 49927, 49937, 49951, 49969, 49991, 50017, 50047, 50081 ; Perf.Sqs = 97969, 101761
50087, 50093, 50101 ; n^2 + 3n + 50083 ; FD:2; Complex Roots: -1.5+/-223.7872873959i ; 425 Primes = 42.50% ; 50087, 50093, 50101, 50111, 50123, 50137, 50153, 50171, 50191, 50213 ; Perf.Sqs = none
50153, 50159, 50177 ; 6n^2 - 12n + 50159 ; FD:12; Complex Roots: 1+/-91.4266554859i ; 273 Primes = 27.30% ; 50153, 50159, 50177, 50207, 50249, 50303, 50369, 50447, 50537, 50639 ; Perf.Sqs = none
50497, 50503, 50513 ; 2n^2 + 50495 ; FD:4; Complex Roots: 0+/-158.8946191663i ; 304 Primes = 30.40% ; 50497, 50503, 50513, 50527, 50545, 50567, 50593, 50623, 50657, 50695 ; Perf.Sqs = none
50581, 50587, 50591 ; -1n^2 + 9n + 50573 ; FD:-2; Real Roots: -220.4294333786 | +229.4294333786 ; 478 Primes = 47.80% ; 50581, 50587, 50591, 50593, 50593, 50591, 50587, 50581, 50573, 50563 ; Perf.Sqs = 22201, 3721, -80089
51203, 51217, 51229 ; -1n^2 + 17n + 51187 ; FD:-2; Real Roots: -217.905057364 | +234.905057364 ; 392 Primes = 39.20% ; 51203, 51217, 51229, 51239, 51247, 51253, 51257, 51259, 51259, 51257 ; Perf.Sqs = -160801
51307, 51329, 51341 ; -5n^2 + 37n + 51275 ; FD:-10; Real Roots: -97.6345449489 | +105.0345449489 ; 232 Primes = 23.20% ; 51307, 51329, 51341, 51343, 51335, 51317, 51289, 51251, 51203, 51145 ; Perf.Sqs = none
51347, 51349, 51361 ; 5n^2 - 13n + 51355 ; FD:10; Complex Roots: 1.3+/-101.3376040767i ; 220 Primes = 22.00% ; 51347, 51349, 51361, 51383, 51415, 51457, 51509, 51571, 51643, 51725 ; Perf.Sqs = 58081, 2059225
51503, 51511, 51517 ; -1n^2 + 11n + 51493 ; FD:-2; Real Roots: -221.4873344484 | +232.4873344484 ; 382 Primes = 38.20% ; 51503, 51511, 51517, 51521, 51523, 51523, 51521, 51517, 51511, 51503 ; Perf.Sqs = none
51637, 51647, 51659 ; n^2 + 7n + 51629 ; FD:2; Complex Roots: -3.5+/-227.1931997222i ; 240 Primes = 24.00% ; 51637, 51647, 51659, 51673, 51689, 51707, 51727, 51749, 51773, 51799 ; Perf.Sqs = none
51913, 51929, 51941 ; -2n^2 + 22n + 51893 ; FD:-4; Real Roots: -155.6730436518 | +166.6730436518 ; 390 Primes = 39.00% ; 51913, 51929, 51941, 51949, 51953, 51953, 51949, 51941, 51929, 51913 ; Perf.Sqs = none
51991, 52009, 52021 ; -3n^2 + 27n + 51967 ; FD:-6; Real Roots: -127.1912424322 | +136.1912424322 ; 447 Primes = 44.70% ; 51991, 52009, 52021, 52027, 52027, 52021, 52009, 51991, 51967, 51937 ; Perf.Sqs = 10609
52067, 52069, 52081 ; 5n^2 - 13n + 52075 ; FD:10; Complex Roots: 1.3+/-102.0456270499i ; 300 Primes = 30.00% ; 52067, 52069, 52081, 52103, 52135, 52177, 52229, 52291, 52363, 52445 ; Perf.Sqs = none
52147, 52153, 52163 ; 2n^2 + 52145 ; FD:4; Complex Roots: 0+/-161.46981142i ; 222 Primes = 22.20% ; 52147, 52153, 52163, 52177, 52195, 52217, 52243, 52273, 52307, 52345 ; Perf.Sqs = none
52249, 52253, 52259 ; n^2 + n + 52247 ; FD:2; Complex Roots: -0.5+/-228.5754798748i ; 396 Primes = 39.60% ; 52249, 52253, 52259, 52267, 52277, 52289, 52303, 52319, 52337, 52357 ; Perf.Sqs = 284089
52361, 52363, 52369 ; 2n^2 - 4n + 52363 ; FD:4; Complex Roots: 1+/-161.8038936491i ; 319 Primes = 31.90% ; 52361, 52363, 52369, 52379, 52393, 52411, 52433, 52459, 52489, 52523 ; Perf.Sqs = 72361, 165649, 1456849
52543, 52553, 52561 ; -1n^2 + 13n + 52531 ; FD:-2; Real Roots: -222.7885736359 | +235.7885736359 ; 465 Primes = 46.50% ; 52543, 52553, 52561, 52567, 52571, 52573, 52573, 52571, 52567, 52561 ; Perf.Sqs = 52441, 361, -190969
52553, 52561, 52567 ; -1n^2 + 11n + 52543 ; FD:-2; Real Roots: -223.7885736359 | +234.7885736359 ; 466 Primes = 46.60% ; 52553, 52561, 52567, 52571, 52573, 52573, 52571, 52567, 52561, 52553 ; Perf.Sqs = 52441, 361, -190969
52747, 52757, 52769 ; n^2 + 7n + 52739 ; FD:2; Complex Roots: -3.5+/-229.6230606886i ; 544 Primes = 54.40% ; 52747, 52757, 52769, 52783, 52799, 52817, 52837, 52859, 52883, 52909 ; Perf.Sqs = none
52963, 52967, 52973 ; n^2 + n + 52961 ; FD:2; Complex Roots: -0.5+/-230.1320273234i ; 535 Primes = 53.50% ; 52963, 52967, 52973, 52981, 52991, 53003, 53017, 53033, 53051, 53071 ; Perf.Sqs = 57121
53089, 53093, 53101 ; 2n^2 - 2n + 53089 ; FD:4; Complex Roots: 0.5+/-162.9240620657i ; 634 Primes = 63.40% ; 53089, 53093, 53101, 53113, 53129, 53149, 53173, 53201, 53233, 53269 ; Perf.Sqs = 54289, 66049, 201601, 361201, 635209, 1194649
53773, 53777, 53783 ; n^2 + n + 53771 ; FD:2; Complex Roots: -0.5+/-231.8852086702i ; 345 Primes = 34.50% ; 53773, 53777, 53783, 53791, 53801, 53813, 53827, 53843, 53861, 53881 ; Perf.Sqs = none
53813, 53819, 53831 ; 3n^2 - 3n + 53813 ; FD:6; Complex Roots: 0.5+/-133.9306412538i ; 350 Primes = 35.00% ; 53813, 53819, 53831, 53849, 53873, 53903, 53939, 53981, 54029, 54083 ; Perf.Sqs = none
53987, 53993, 54001 ; n^2 + 3n + 53983 ; FD:2; Complex Roots: -1.5+/-232.3375776752i ; 477 Primes = 47.70% ; 53987, 53993, 54001, 54011, 54023, 54037, 54053, 54071, 54091, 54113 ; Perf.Sqs = 73441
55103, 55109, 55117 ; n^2 + 3n + 55099 ; FD:2; Complex Roots: -1.5+/-234.7269690513i ; 282 Primes = 28.20% ; 55103, 55109, 55117, 55127, 55139, 55153, 55169, 55187, 55207, 55229 ; Perf.Sqs = 597529
55207, 55213, 55217 ; -1n^2 + 9n + 55199 ; FD:-2; Real Roots: -230.487765639 | +239.487765639 ; 458 Primes = 45.80% ; 55207, 55213, 55217, 55219, 55219, 55217, 55213, 55207, 55199, 55189 ; Perf.Sqs = 54289
55469, 55487, 55501 ; -2n^2 + 24n + 55447 ; FD:-4; Real Roots: -160.6118243103 | +172.6118243103 ; 312 Primes = 31.20% ; 55469, 55487, 55501, 55511, 55517, 55519, 55517, 55511, 55501, 55487 ; Perf.Sqs = none
55511, 55529, 55541 ; -3n^2 + 27n + 55487 ; FD:-6; Real Roots: -131.573203338 | +140.573203338 ; 546 Primes = 54.60% ; 55511, 55529, 55541, 55547, 55547, 55541, 55529, 55511, 55487, 55457 ; Perf.Sqs = -10609, -24649, -744769, -1125721
55661, 55663, 55667 ; n^2 - n + 55661 ; FD:2; Complex Roots: 0.5+/-235.9253059763i ; 622 Primes = 62.20% ; 55661, 55663, 55667, 55673, 55681, 55691, 55703, 55717, 55733, 55751 ; Perf.Sqs = none
55663, 55667, 55673 ; n^2 + n + 55661 ; FD:2; Complex Roots: -0.5+/-235.9253059763i ; 621 Primes = 62.10% ; 55663, 55667, 55673, 55681, 55691, 55703, 55717, 55733, 55751, 55771 ; Perf.Sqs = none
55667, 55673, 55681 ; n^2 + 3n + 55663 ; FD:2; Complex Roots: -1.5+/-235.9253059763i ; 620 Primes = 62.00% ; 55667, 55673, 55681, 55691, 55703, 55717, 55733, 55751, 55771, 55793 ; Perf.Sqs = none
55799, 55807, 55813 ; -1n^2 + 11n + 55789 ; FD:-2; Real Roots: -230.7609785809 | +241.7609785809 ; 409 Primes = 40.90% ; 55799, 55807, 55813, 55817, 55819, 55819, 55817, 55813, 55807, 55799 ; Perf.Sqs = 51529
55807, 55813, 55817 ; -1n^2 + 9n + 55799 ; FD:-2; Real Roots: -231.7609785809 | +240.7609785809 ; 409 Primes = 40.90% ; 55807, 55813, 55817, 55819, 55819, 55817, 55813, 55807, 55799, 55789 ; Perf.Sqs = 51529
55817, 55819, 55823 ; n^2 - n + 55817 ; FD:2; Complex Roots: 0.5+/-236.2556877622i ; 478 Primes = 47.80% ; 55817, 55819, 55823, 55829, 55837, 55847, 55859, 55873, 55889, 55907 ; Perf.Sqs = none
55819, 55823, 55829 ; n^2 + n + 55817 ; FD:2; Complex Roots: -0.5+/-236.2556877622i ; 477 Primes = 47.70% ; 55819, 55823, 55829, 55837, 55847, 55859, 55873, 55889, 55907, 55927 ; Perf.Sqs = none
55921, 55927, 55931 ; -1n^2 + 9n + 55913 ; FD:-2; Real Roots: -232.0021141555 | +241.0021141555 ; 323 Primes = 32.30% ; 55921, 55927, 55931, 55933, 55933, 55931, 55927, 55921, 55913, 55903 ; Perf.Sqs = 3721, 1, -34969
55933, 55949, 55967 ; n^2 + 13n + 55919 ; FD:2; Complex Roots: -6.5+/-236.382634726i ; 329 Primes = 32.90% ; 55933, 55949, 55967, 55987, 56009, 56033, 56059, 56087, 56117, 56149 ; Perf.Sqs = none
56101, 56113, 56123 ; -1n^2 + 15n + 56087 ; FD:-2; Real Roots: -229.4456688779 | +244.4456688779 ; 448 Primes = 44.80% ; 56101, 56113, 56123, 56131, 56137, 56141, 56143, 56143, 56141, 56137 ; Perf.Sqs = -597529
56179, 56197, 56207 ; -4n^2 + 30n + 56153 ; FD:-8; Real Roots: -114.7924502024 | +122.2924502024 ; 296 Primes = 29.60% ; 56179, 56197, 56207, 56209, 56203, 56189, 56167, 56137, 56099, 56053 ; Perf.Sqs = 49729
56359, 56369, 56377 ; -1n^2 + 13n + 56347 ; FD:-2; Real Roots: -230.9642078293 | +243.9642078293 ; 431 Primes = 43.10% ; 56359, 56369, 56377, 56383, 56387, 56389, 56389, 56387, 56383, 56377 ; Perf.Sqs = -885481
56437, 56443, 56453 ; 2n^2 + 56435 ; FD:4; Complex Roots: 0+/-167.980653648i ; 246 Primes = 24.60% ; 56437, 56443, 56453, 56467, 56485, 56507, 56533, 56563, 56597, 56635 ; Perf.Sqs = none
56467, 56473, 56477 ; -1n^2 + 9n + 56459 ; FD:-2; Real Roots: -233.1536345188 | +242.1536345188 ; 336 Primes = 33.60% ; 56467, 56473, 56477, 56479, 56479, 56477, 56473, 56467, 56459, 56449 ; Perf.Sqs = -22201
56501, 56503, 56509 ; 2n^2 - 4n + 56503 ; FD:4; Complex Roots: 1+/-168.0788505434i ; 436 Primes = 43.60% ; 56501, 56503, 56509, 56519, 56533, 56551, 56573, 56599, 56629, 56663 ; Perf.Sqs = none
56843, 56857, 56873 ; n^2 + 11n + 56831 ; FD:2; Complex Roots: -5.5+/-238.3290792161i ; 491 Primes = 49.10% ; 56843, 56857, 56873, 56891, 56911, 56933, 56957, 56983, 57011, 57041 ; Perf.Sqs = 229441
57089, 57097, 57107 ; n^2 + 5n + 57083 ; FD:2; Complex Roots: -2.5+/-238.9074088428i ; 297 Primes = 29.70% ; 57089, 57097, 57107, 57119, 57133, 57149, 57167, 57187, 57209, 57233 ; Perf.Sqs = none
57119, 57131, 57139 ; -2n^2 + 18n + 57103 ; FD:-4; Real Roots: -164.5318017416 | +173.5318017416 ; 349 Primes = 34.90% ; 57119, 57131, 57139, 57143, 57143, 57139, 57131, 57119, 57103, 57083 ; Perf.Sqs = -1681, -10201, -185761, -316969, -654481, -1075369
57149, 57163, 57173 ; -2n^2 + 20n + 57131 ; FD:-4; Real Roots: -164.0872555813 | +174.0872555813 ; 399 Primes = 39.90% ; 57149, 57163, 57173, 57179, 57181, 57179, 57173, 57163, 57149, 57131 ; Perf.Sqs = none
57191, 57193, 57203 ; 4n^2 - 10n + 57197 ; FD:8; Complex Roots: 1.25+/-119.5729379918i ; 268 Primes = 26.80% ; 57191, 57193, 57203, 57221, 57247, 57281, 57323, 57373, 57431, 57497 ; Perf.Sqs = 337561
57653, 57667, 57679 ; -1n^2 + 17n + 57637 ; FD:-2; Real Roots: -231.7274963446 | +248.7274963446 ; 371 Primes = 37.10% ; 57653, 57667, 57679, 57689, 57697, 57703, 57707, 57709, 57709, 57707 ; Perf.Sqs = -5041
57667, 57679, 57689 ; -1n^2 + 15n + 57653 ; FD:-2; Real Roots: -232.7274963446 | +247.7274963446 ; 370 Primes = 37.00% ; 57667, 57679, 57689, 57697, 57703, 57707, 57709, 57709, 57707, 57703 ; Perf.Sqs = -5041
57709, 57713, 57719 ; n^2 + n + 57707 ; FD:2; Complex Roots: -0.5+/-240.2222928872i ; 267 Primes = 26.70% ; 57709, 57713, 57719, 57727, 57737, 57749, 57763, 57779, 57797, 57817 ; Perf.Sqs = none
57731, 57737, 57751 ; 4n^2 - 6n + 57733 ; FD:8; Complex Roots: 0.75+/-120.1361207131i ; 329 Primes = 32.90% ; 57731, 57737, 57751, 57773, 57803, 57841, 57887, 57941, 58003, 58073 ; Perf.Sqs = 591361
57773, 57781, 57787 ; -1n^2 + 11n + 57763 ; FD:-2; Real Roots: -234.9022670442 | +245.9022670442 ; 480 Primes = 48.00% ; 57773, 57781, 57787, 57791, 57793, 57793, 57791, 57787, 57781, 57773 ; Perf.Sqs = -529
57781, 57787, 57791 ; -1n^2 + 9n + 57773 ; FD:-2; Real Roots: -235.9022670442 | +244.9022670442 ; 481 Primes = 48.10% ; 57781, 57787, 57791, 57793, 57793, 57791, 57787, 57781, 57773, 57763 ; Perf.Sqs = -529
57829, 57839, 57847 ; -1n^2 + 13n + 57817 ; FD:-2; Real Roots: -234.0394977961 | +247.0394977961 ; 418 Primes = 41.80% ; 57829, 57839, 57847, 57853, 57857, 57859, 57859, 57857, 57853, 57847 ; Perf.Sqs = -58081
58189, 58193, 58199 ; n^2 + n + 58187 ; FD:2; Complex Roots: -0.5+/-241.2192985646i ; 422 Primes = 42.20% ; 58189, 58193, 58199, 58207, 58217, 58229, 58243, 58259, 58277, 58297 ; Perf.Sqs = none
58393, 58403, 58411 ; -1n^2 + 13n + 58381 ; FD:-2; Real Roots: -235.2090192773 | +248.2090192773 ; 380 Primes = 38.00% ; 58393, 58403, 58411, 58417, 58421, 58423, 58423, 58421, 58417, 58411 ; Perf.Sqs = 58081
58601, 58603, 58613 ; 4n^2 - 10n + 58607 ; FD:8; Complex Roots: 1.25+/-121.037958922i ; 386 Primes = 38.60% ; 58601, 58603, 58613, 58631, 58657, 58691, 58733, 58783, 58841, 58907 ; Perf.Sqs = 89401
58603, 58613, 58631 ; 4n^2 - 2n + 58601 ; FD:8; Complex Roots: 0.25+/-121.037958922i ; 386 Primes = 38.60% ; 58603, 58613, 58631, 58657, 58691, 58733, 58783, 58841, 58907, 58981 ; Perf.Sqs = 89401
59077, 59083, 59093 ; 2n^2 + 59075 ; FD:4; Complex Roots: 0+/-171.864772423i ; 222 Primes = 22.20% ; 59077, 59083, 59093, 59107, 59125, 59147, 59173, 59203, 59237, 59275 ; Perf.Sqs = none
59341, 59351, 59357 ; -2n^2 + 16n + 59327 ; FD:-4; Real Roots: -168.2773925969 | +176.2773925969 ; 467 Primes = 46.70% ; 59341, 59351, 59357, 59359, 59357, 59351, 59341, 59327, 59309, 59287 ; Perf.Sqs = -6889, -229441, -954529
59393, 59399, 59407 ; n^2 + 3n + 59389 ; FD:2; Complex Roots: -1.5+/-243.6939679188i ; 426 Primes = 42.60% ; 59393, 59399, 59407, 59417, 59429, 59443, 59459, 59477, 59497, 59519 ; Perf.Sqs = none
59441, 59443, 59447 ; n^2 - n + 59441 ; FD:2; Complex Roots: 0.5+/-243.8047374437i ; 419 Primes = 41.90% ; 59441, 59443, 59447, 59453, 59461, 59471, 59483, 59497, 59513, 59531 ; Perf.Sqs = none
60017, 60029, 60037 ; -2n^2 + 18n + 60001 ; FD:-4; Real Roots: -168.7649704932 | +177.7649704932 ; 470 Primes = 47.00% ; 60017, 60029, 60037, 60041, 60041, 60037, 60029, 60017, 60001, 59981 ; Perf.Sqs = 529
60719, 60727, 60733 ; -1n^2 + 11n + 60709 ; FD:-2; Real Roots: -240.9533424403 | +251.9533424403 ; 253 Primes = 25.30% ; 60719, 60727, 60733, 60737, 60739, 60739, 60737, 60733, 60727, 60719 ; Perf.Sqs = -151321
61879, 61909, 61927 ; -6n^2 + 48n + 61837 ; FD:-12; Real Roots: -97.598064286 | +105.598064286 ; 423 Primes = 42.30% ; 61879, 61909, 61927, 61933, 61927, 61909, 61879, 61837, 61783, 61717 ; Perf.Sqs = none
62039, 62047, 62053 ; -1n^2 + 11n + 62029 ; FD:-2; Real Roots: -243.6169404115 | +254.6169404115 ; 459 Primes = 45.90% ; 62039, 62047, 62053, 62057, 62059, 62059, 62057, 62053, 62047, 62039 ; Perf.Sqs = none
62131, 62137, 62141 ; -1n^2 + 9n + 62123 ; FD:-2; Real Roots: -244.7854789193 | +253.7854789193 ; 446 Primes = 44.60% ; 62131, 62137, 62141, 62143, 62143, 62141, 62137, 62131, 62123, 62113 ; Perf.Sqs = 52441, 32041
62299, 62303, 62311 ; 2n^2 - 2n + 62299 ; FD:4; Complex Roots: 0.5+/-176.4915012118i ; 348 Primes = 34.80% ; 62299, 62303, 62311, 62323, 62339, 62359, 62383, 62411, 62443, 62479 ; Perf.Sqs = none
62459, 62467, 62473 ; -1n^2 + 11n + 62449 ; FD:-2; Real Roots: -244.4584965549 | +255.4584965549 ; 501 Primes = 50.10% ; 62459, 62467, 62473, 62477, 62479, 62479, 62477, 62473, 62467, 62459 ; Perf.Sqs = 54289, 26569, 24649, 2209, -39601
62533, 62539, 62549 ; 2n^2 + 62531 ; FD:4; Complex Roots: 0+/-176.8205304822i ; 436 Primes = 43.60% ; 62533, 62539, 62549, 62563, 62581, 62603, 62629, 62659, 62693, 62731 ; Perf.Sqs = none
62539, 62549, 62563 ; 2n^2 + 4n + 62533 ; FD:4; Complex Roots: -1+/-176.8205304822i ; 437 Primes = 43.70% ; 62539, 62549, 62563, 62581, 62603, 62629, 62659, 62693, 62731, 62773 ; Perf.Sqs = none
62603, 62617, 62627 ; -2n^2 + 20n + 62585 ; FD:-4; Real Roots: -171.9675111426 | +181.9675111426 ; 408 Primes = 40.80% ; 62603, 62617, 62627, 62633, 62635, 62633, 62627, 62617, 62603, 62585 ; Perf.Sqs = none
62731, 62743, 62753 ; -1n^2 + 15n + 62717 ; FD:-2; Real Roots: -243.0459039777 | +258.0459039777 ; 521 Primes = 52.10% ; 62731, 62743, 62753, 62761, 62767, 62771, 62773, 62773, 62771, 62767 ; Perf.Sqs = 58081, 3481, -76729
63097, 63103, 63113 ; 2n^2 + 63095 ; FD:4; Complex Roots: 0+/-177.6161591748i ; 315 Primes = 31.50% ; 63097, 63103, 63113, 63127, 63145, 63167, 63193, 63223, 63257, 63295 ; Perf.Sqs = none
63559, 63577, 63587 ; -4n^2 + 30n + 63533 ; FD:-8; Real Roots: -122.3345450482 | +129.8345450482 ; 306 Primes = 30.60% ; 63559, 63577, 63587, 63589, 63583, 63569, 63547, 63517, 63479, 63433 ; Perf.Sqs = none
63611, 63617, 63629 ; 3n^2 - 3n + 63611 ; FD:6; Complex Roots: 0.5+/-145.6139301944i ; 392 Primes = 39.20% ; 63611, 63617, 63629, 63647, 63671, 63701, 63737, 63779, 63827, 63881 ; Perf.Sqs = none
64483, 64489, 64499 ; 2n^2 + 64481 ; FD:4; Complex Roots: 0+/-179.5563978253i ; 456 Primes = 45.60% ; 64483, 64489, 64499, 64513, 64531, 64553, 64579, 64609, 64643, 64681 ; Perf.Sqs = 66049, 94249, 187489, 434281, 779689, 1985281
64579, 64591, 64601 ; -1n^2 + 15n + 64565 ; FD:-2; Real Roots: -246.7071006089 | +261.7071006089 ; 349 Primes = 34.90% ; 64579, 64591, 64601, 64609, 64615, 64619, 64621, 64621, 64619, 64615 ; Perf.Sqs = 32041, 22801, 5329, 1369, -546121
64667, 64679, 64693 ; n^2 + 9n + 64657 ; FD:2; Complex Roots: -4.5+/-254.2375857343i ; 377 Primes = 37.70% ; 64667, 64679, 64693, 64709, 64727, 64747, 64769, 64793, 64819, 64847 ; Perf.Sqs = none
64781, 64783, 64793 ; 4n^2 - 10n + 64787 ; FD:8; Complex Roots: 1.25+/-127.2603139239i ; 286 Primes = 28.60% ; 64781, 64783, 64793, 64811, 64837, 64871, 64913, 64963, 65021, 65087 ; Perf.Sqs = none
64919, 64921, 64927 ; 2n^2 - 4n + 64921 ; FD:4; Complex Roots: 1+/-180.1652019675i ; 471 Primes = 47.10% ; 64919, 64921, 64927, 64937, 64951, 64969, 64991, 65017, 65047, 65081 ; Perf.Sqs = 72361, 316969, 1104601
64921, 64927, 64937 ; 2n^2 + 64919 ; FD:4; Complex Roots: 0+/-180.1652019675i ; 471 Primes = 47.10% ; 64921, 64927, 64937, 64951, 64969, 64991, 65017, 65047, 65081, 65119 ; Perf.Sqs = 72361, 316969, 1104601
64927, 64937, 64951 ; 2n^2 + 4n + 64921 ; FD:4; Complex Roots: -1+/-180.1652019675i ; 471 Primes = 47.10% ; 64927, 64937, 64951, 64969, 64991, 65017, 65047, 65081, 65119, 65161 ; Perf.Sqs = 72361, 316969, 1104601
65071, 65089, 65099 ; -4n^2 + 30n + 65045 ; FD:-8; Real Roots: -123.8247329999 | +131.3247329999 ; 286 Primes = 28.60% ; 65071, 65089, 65099, 65101, 65095, 65081, 65059, 65029, 64991, 64945 ; Perf.Sqs = 51529
65213, 65239, 65257 ; -4n^2 + 38n + 65179 ; FD:-8; Real Roots: -122.9892363372 | +132.4892363372 ; 328 Primes = 32.80% ; 65213, 65239, 65257, 65267, 65269, 65263, 65249, 65227, 65197, 65159 ; Perf.Sqs = none
65239, 65257, 65267 ; -4n^2 + 30n + 65213 ; FD:-8; Real Roots: -123.9892363372 | +131.4892363372 ; 327 Primes = 32.70% ; 65239, 65257, 65267, 65269, 65263, 65249, 65227, 65197, 65159, 65113 ; Perf.Sqs = none
65371, 65381, 65393 ; n^2 + 7n + 65363 ; FD:2; Complex Roots: -3.5+/-255.637927546i ; 377 Primes = 37.70% ; 65371, 65381, 65393, 65407, 65423, 65441, 65461, 65483, 65507, 65533 ; Perf.Sqs = 177241
65587, 65599, 65609 ; -1n^2 + 15n + 65573 ; FD:-2; Real Roots: -248.6820641653 | +263.6820641653 ; 507 Primes = 50.70% ; 65587, 65599, 65609, 65617, 65623, 65627, 65629, 65629, 65627, 65623 ; Perf.Sqs = -657721
65707, 65713, 65717 ; -1n^2 + 9n + 65699 ; FD:-2; Real Roots: -251.8576603107 | +260.8576603107 ; 483 Primes = 48.30% ; 65707, 65713, 65717, 65719, 65719, 65717, 65713, 65707, 65699, 65689 ; Perf.Sqs = 27889
65867, 65881, 65899 ; 2n^2 + 8n + 65857 ; FD:4; Complex Roots: -2+/-181.4510953398i ; 260 Primes = 26.00% ; 65867, 65881, 65899, 65921, 65947, 65977, 66011, 66049, 66091, 66137 ; Perf.Sqs = 66049, 83521, 85849, 101761, 177241, 229441, 241081, 534361, 657721
66449, 66457, 66463 ; -1n^2 + 11n + 66439 ; FD:-2; Real Roots: -252.3163105779 | +263.3163105779 ; 435 Primes = 43.50% ; 66449, 66457, 66463, 66467, 66469, 66469, 66467, 66463, 66457, 66449 ; Perf.Sqs = 66049, 24649, -436921
66529, 66533, 66541 ; 2n^2 - 2n + 66529 ; FD:4; Complex Roots: 0.5+/-182.3848952079i ; 453 Primes = 45.30% ; 66529, 66533, 66541, 66553, 66569, 66589, 66613, 66641, 66673, 66709 ; Perf.Sqs = none
66533, 66541, 66553 ; 2n^2 + 2n + 66529 ; FD:4; Complex Roots: -0.5+/-182.3848952079i ; 453 Primes = 45.30% ; 66533, 66541, 66553, 66569, 66589, 66613, 66641, 66673, 66709, 66749 ; Perf.Sqs = none
66919, 66923, 66931 ; 2n^2 - 2n + 66919 ; FD:4; Complex Roots: 0.5+/-182.9186977867i ; 478 Primes = 47.80% ; 66919, 66923, 66931, 66943, 66959, 66979, 67003, 67031, 67063, 67099 ; Perf.Sqs = none
67411, 67421, 67427 ; -2n^2 + 16n + 67397 ; FD:-4; Real Roots: -179.6150865261 | +187.6150865261 ; 289 Primes = 28.90% ; 67411, 67421, 67427, 67429, 67427, 67421, 67411, 67397, 67379, 67357 ; Perf.Sqs = none
67619, 67631, 67651 ; 4n^2 + 67615 ; FD:8; Complex Roots: 0+/-130.0144222769i ; 277 Primes = 27.70% ; 67619, 67631, 67651, 67679, 67715, 67759, 67811, 67871, 67939, 68015 ; Perf.Sqs = none
67741, 67751, 67757 ; -2n^2 + 16n + 67727 ; FD:-4; Real Roots: -180.0638476182 | +188.0638476182 ; 408 Primes = 40.80% ; 67741, 67751, 67757, 67759, 67757, 67751, 67741, 67727, 67709, 67687 ; Perf.Sqs = -18769, -177241, -1545049
68023, 68041, 68053 ; -3n^2 + 27n + 67999 ; FD:-6; Real Roots: -146.1206603801 | +155.1206603801 ; 449 Primes = 44.90% ; 68023, 68041, 68053, 68059, 68059, 68053, 68041, 68023, 67999, 67969 ; Perf.Sqs = none
68207, 68209, 68213 ; n^2 - n + 68207 ; FD:2; Complex Roots: 0.5+/-261.1642203672i ; 410 Primes = 41.00% ; 68207, 68209, 68213, 68219, 68227, 68237, 68249, 68263, 68279, 68297 ; Perf.Sqs = 426409
68209, 68213, 68219 ; n^2 + n + 68207 ; FD:2; Complex Roots: -0.5+/-261.1642203672i ; 410 Primes = 41.00% ; 68209, 68213, 68219, 68227, 68237, 68249, 68263, 68279, 68297, 68317 ; Perf.Sqs = 426409
68329, 68351, 68371 ; -1n^2 + 25n + 68305 ; FD:-2; Real Roots: -249.151008024 | +274.151008024 ; 312 Primes = 31.20% ; 68329, 68351, 68371, 68389, 68405, 68419, 68431, 68441, 68449, 68455 ; Perf.Sqs = -6889, -196249
68437, 68443, 68447 ; -1n^2 + 9n + 68429 ; FD:-2; Real Roots: -257.1280757105 | +266.1280757105 ; 380 Primes = 38.00% ; 68437, 68443, 68447, 68449, 68449, 68447, 68443, 68437, 68429, 68419 ; Perf.Sqs = 10609
68771, 68777, 68791 ; 4n^2 - 6n + 68773 ; FD:8; Complex Roots: 0.75+/-131.1208888774i ; 330 Primes = 33.00% ; 68771, 68777, 68791, 68813, 68843, 68881, 68927, 68981, 69043, 69113 ; Perf.Sqs = none
68881, 68891, 68897 ; -2n^2 + 16n + 68867 ; FD:-4; Real Roots: -181.6057649967 | +189.6057649967 ; 434 Primes = 43.40% ; 68881, 68891, 68897, 68899, 68897, 68891, 68881, 68867, 68849, 68827 ; Perf.Sqs = 6241
68897, 68899, 68903 ; n^2 - n + 68897 ; FD:2; Complex Roots: 0.5+/-262.4819041382i ; 460 Primes = 46.00% ; 68897, 68899, 68903, 68909, 68917, 68927, 68939, 68953, 68969, 68987 ; Perf.Sqs = 69169, 76729, 134689
68899, 68903, 68909 ; n^2 + n + 68897 ; FD:2; Complex Roots: -0.5+/-262.4819041382i ; 459 Primes = 45.90% ; 68899, 68903, 68909, 68917, 68927, 68939, 68953, 68969, 68987, 69007 ; Perf.Sqs = 69169, 76729, 134689
68903, 68909, 68917 ; n^2 + 3n + 68899 ; FD:2; Complex Roots: -1.5+/-262.4819041382i ; 458 Primes = 45.80% ; 68903, 68909, 68917, 68927, 68939, 68953, 68969, 68987, 69007, 69029 ; Perf.Sqs = 69169, 76729, 134689
69191, 69193, 69197 ; n^2 - n + 69191 ; FD:2; Complex Roots: 0.5+/-263.0413465598i ; 522 Primes = 52.20% ; 69191, 69193, 69197, 69203, 69211, 69221, 69233, 69247, 69263, 69281 ; Perf.Sqs = none
69203, 69221, 69233 ; -3n^2 + 27n + 69179 ; FD:-6; Real Roots: -147.4207578531 | +156.4207578531 ; 315 Primes = 31.50% ; 69203, 69221, 69233, 69239, 69239, 69233, 69221, 69203, 69179, 69149 ; Perf.Sqs = -529, -192721, -223729, -2785561
69233, 69239, 69247 ; n^2 + 3n + 69229 ; FD:2; Complex Roots: -1.5+/-263.1097679677i ; 417 Primes = 41.70% ; 69233, 69239, 69247, 69257, 69269, 69283, 69299, 69317, 69337, 69359 ; Perf.Sqs = none
69463, 69467, 69473 ; n^2 + n + 69461 ; FD:2; Complex Roots: -0.5+/-263.554074148i ; 320 Primes = 32.00% ; 69463, 69467, 69473, 69481, 69491, 69503, 69517, 69533, 69551, 69571 ; Perf.Sqs = 808201
69467, 69473, 69481 ; n^2 + 3n + 69463 ; FD:2; Complex Roots: -1.5+/-263.554074148i ; 320 Primes = 32.00% ; 69467, 69473, 69481, 69491, 69503, 69517, 69533, 69551, 69571, 69593 ; Perf.Sqs = 808201
69929, 69931, 69941 ; 4n^2 - 10n + 69935 ; FD:8; Complex Roots: 1.25+/-132.220223491i ; 339 Primes = 33.90% ; 69929, 69931, 69941, 69959, 69985, 70019, 70061, 70111, 70169, 70235 ; Perf.Sqs = 143641, 2679769
69991, 69997, 70001 ; -1n^2 + 9n + 69983 ; FD:-2; Real Roots: -260.0812729579 | +269.0812729579 ; 582 Primes = 58.20% ; 69991, 69997, 70001, 70003, 70003, 70001, 69997, 69991, 69983, 69973 ; Perf.Sqs = 57121
70001, 70003, 70009 ; 2n^2 - 4n + 70003 ; FD:4; Complex Roots: 1+/-187.0842056401i ; 434 Primes = 43.40% ; 70001, 70003, 70009, 70019, 70033, 70051, 70073, 70099, 70129, 70163 ; Perf.Sqs = 76729, 358801, 1129969
70111, 70117, 70121 ; -1n^2 + 9n + 70103 ; FD:-2; Real Roots: -260.3079492765 | +269.3079492765 ; 364 Primes = 36.40% ; 70111, 70117, 70121, 70123, 70123, 70121, 70117, 70111, 70103, 70093 ; Perf.Sqs = -120409
70621, 70627, 70639 ; 3n^2 - 3n + 70621 ; FD:6; Complex Roots: 0.5+/-153.4277788842i ; 392 Primes = 39.20% ; 70621, 70627, 70639, 70657, 70681, 70711, 70747, 70789, 70837, 70891 ; Perf.Sqs = 167281, 502681
70981, 70991, 70997 ; -2n^2 + 16n + 70967 ; FD:-4; Real Roots: -184.4131099473 | +192.4131099473 ; 405 Primes = 40.50% ; 70981, 70991, 70997, 70999, 70997, 70991, 70981, 70967, 70949, 70927 ; Perf.Sqs = -10609, -249001, -1247689
71011, 71023, 71039 ; 2n^2 + 6n + 71003 ; FD:4; Complex Roots: -1.5+/-188.4124465103i ; 315 Primes = 31.50% ; 71011, 71023, 71039, 71059, 71083, 71111, 71143, 71179, 71219, 71263 ; Perf.Sqs = none
71143, 71147, 71153 ; n^2 + n + 71141 ; FD:2; Complex Roots: -0.5+/-266.7222337939i ; 260 Primes = 26.00% ; 71143, 71147, 71153, 71161, 71171, 71183, 71197, 71213, 71231, 71251 ; Perf.Sqs = 90601
71153, 71161, 71167 ; -1n^2 + 11n + 71143 ; FD:-2; Real Roots: -261.2831516419 | +272.2831516419 ; 455 Primes = 45.50% ; 71153, 71161, 71167, 71171, 71173, 71173, 71171, 71167, 71161, 71153 ; Perf.Sqs = 11881, 7921
71237, 71249, 71257 ; -2n^2 + 18n + 71221 ; FD:-4; Real Roots: -184.2610923893 | +193.2610923893 ; 398 Primes = 39.80% ; 71237, 71249, 71257, 71261, 71261, 71257, 71249, 71237, 71221, 71201 ; Perf.Sqs = none
71327, 71329, 71333 ; n^2 - n + 71327 ; FD:2; Complex Roots: 0.5+/-267.0706835278i ; 317 Primes = 31.70% ; 71327, 71329, 71333, 71339, 71347, 71357, 71369, 71383, 71399, 71417 ; Perf.Sqs = 76729
71411, 71413, 71419 ; 2n^2 - 4n + 71413 ; FD:4; Complex Roots: 1+/-188.9589902598i ; 343 Primes = 34.30% ; 71411, 71413, 71419, 71429, 71443, 71461, 71483, 71509, 71539, 71573 ; Perf.Sqs = none
71419, 71429, 71437 ; -1n^2 + 13n + 71407 ; FD:-2; Real Roots: -260.7999251777 | +273.7999251777 ; 351 Primes = 35.10% ; 71419, 71429, 71437, 71443, 71447, 71449, 71449, 71447, 71443, 71437 ; Perf.Sqs = -410881
71741, 71761, 71777 ; -2n^2 + 26n + 71717 ; FD:-4; Real Roots: -182.9749323789 | +195.9749323789 ; 305 Primes = 30.50% ; 71741, 71761, 71777, 71789, 71797, 71801, 71801, 71797, 71789, 71777 ; Perf.Sqs = 10201, 3721
71887, 71899, 71909 ; -1n^2 + 15n + 71873 ; FD:-2; Real Roots: -260.6962900564 | +275.6962900564 ; 306 Primes = 30.60% ; 71887, 71899, 71909, 71917, 71923, 71927, 71929, 71929, 71927, 71923 ; Perf.Sqs = 61009, -11881
72269, 72271, 72277 ; 2n^2 - 4n + 72271 ; FD:4; Complex Roots: 1+/-190.0907677927i ; 369 Primes = 36.90% ; 72269, 72271, 72277, 72287, 72301, 72319, 72341, 72367, 72397, 72431 ; Perf.Sqs = none
72671, 72673, 72679 ; 2n^2 - 4n + 72673 ; FD:4; Complex Roots: 1+/-190.6187294051i ; 329 Primes = 32.90% ; 72671, 72673, 72679, 72689, 72703, 72721, 72743, 72769, 72799, 72833 ; Perf.Sqs = 113569, 192721
72893, 72901, 72907 ; -1n^2 + 11n + 72883 ; FD:-2; Real Roots: -264.5245359222 | +275.5245359222 ; 395 Primes = 39.50% ; 72893, 72901, 72907, 72911, 72913, 72913, 72911, 72907, 72901, 72893 ; Perf.Sqs = 72361, 44521, 19321, 3481, -380689, -635209
72977, 72997, 73009 ; -4n^2 + 32n + 72949 ; FD:-8; Real Roots: -131.1045891152 | +139.1045891152 ; 432 Primes = 43.20% ; 72977, 72997, 73009, 73013, 73009, 72997, 72977, 72949, 72913, 72869 ; Perf.Sqs = 69169
73361, 73363, 73369 ; 2n^2 - 4n + 73363 ; FD:4; Complex Roots: 1+/-191.5215392586i ; 431 Primes = 43.10% ; 73361, 73363, 73369, 73379, 73393, 73411, 73433, 73459, 73489, 73523 ; Perf.Sqs = 80089, 380689, 1168561
73417, 73421, 73433 ; 4n^2 - 8n + 73421 ; FD:8; Complex Roots: 1+/-135.4778579695i ; 521 Primes = 52.10% ; 73417, 73421, 73433, 73453, 73481, 73517, 73561, 73613, 73673, 73741 ; Perf.Sqs = none
73547, 73553, 73561 ; n^2 + 3n + 73543 ; FD:2; Complex Roots: -1.5+/-271.1839781403i ; 457 Primes = 45.70% ; 73547, 73553, 73561, 73571, 73583, 73597, 73613, 73631, 73651, 73673 ; Perf.Sqs = none
73553, 73561, 73571 ; n^2 + 5n + 73547 ; FD:2; Complex Roots: -2.5+/-271.1839781403i ; 457 Primes = 45.70% ; 73553, 73561, 73571, 73583, 73597, 73613, 73631, 73651, 73673, 73697 ; Perf.Sqs = none
73583, 73589, 73597 ; n^2 + 3n + 73579 ; FD:2; Complex Roots: -1.5+/-271.2503456219i ; 228 Primes = 22.80% ; 73583, 73589, 73597, 73607, 73619, 73633, 73649, 73667, 73687, 73709 ; Perf.Sqs = none
73943, 73951, 73961 ; n^2 + 5n + 73937 ; FD:2; Complex Roots: -2.5+/-271.9020963509i ; 293 Primes = 29.30% ; 73943, 73951, 73961, 73973, 73987, 74003, 74021, 74041, 74063, 74087 ; Perf.Sqs = 1062961
74159, 74161, 74167 ; 2n^2 - 4n + 74161 ; FD:4; Complex Roots: 1+/-192.5603801409i ; 369 Primes = 36.90% ; 74159, 74161, 74167, 74177, 74191, 74209, 74231, 74257, 74287, 74321 ; Perf.Sqs = 78961, 418609, 1079521
74177, 74189, 74197 ; -2n^2 + 18n + 74161 ; FD:-4; Real Roots: -188.1155497357 | +197.1155497357 ; 533 Primes = 53.30% ; 74177, 74189, 74197, 74201, 74201, 74197, 74189, 74177, 74161, 74141 ; Perf.Sqs = 73441
74201, 74203, 74209 ; 2n^2 - 4n + 74203 ; FD:4; Complex Roots: 1+/-192.6149007735i ; 406 Primes = 40.60% ; 74201, 74203, 74209, 74219, 74233, 74251, 74273, 74299, 74329, 74363 ; Perf.Sqs = 120409, 187489
74279, 74287, 74293 ; -1n^2 + 11n + 74269 ; FD:-2; Real Roots: -267.0788876637 | +278.0788876637 ; 465 Primes = 46.50% ; 74279, 74287, 74293, 74297, 74299, 74299, 74297, 74293, 74287, 74279 ; Perf.Sqs = none
74699, 74707, 74713 ; -1n^2 + 11n + 74689 ; FD:-2; Real Roots: -267.8482211393 | +278.8482211393 ; 500 Primes = 50.00% ; 74699, 74707, 74713, 74717, 74719, 74719, 74717, 74713, 74707, 74699 ; Perf.Sqs = 69169, 38809
74707, 74713, 74717 ; -1n^2 + 9n + 74699 ; FD:-2; Real Roots: -268.8482211393 | +277.8482211393 ; 500 Primes = 50.00% ; 74707, 74713, 74717, 74719, 74719, 74717, 74713, 74707, 74699, 74689 ; Perf.Sqs = 69169, 38809
75017, 75029, 75037 ; -2n^2 + 18n + 75001 ; FD:-4; Real Roots: -189.2027361707 | +198.2027361707 ; 460 Primes = 46.00% ; 75017, 75029, 75037, 75041, 75041, 75037, 75029, 75017, 75001, 74981 ; Perf.Sqs = 49729
75227, 75239, 75253 ; n^2 + 9n + 75217 ; FD:2; Complex Roots: -4.5+/-274.2202581867i ; 537 Primes = 53.70% ; 75227, 75239, 75253, 75269, 75287, 75307, 75329, 75353, 75379, 75407 ; Perf.Sqs = none
75323, 75329, 75337 ; n^2 + 3n + 75319 ; FD:2; Complex Roots: -1.5+/-274.4389731798i ; 354 Primes = 35.40% ; 75323, 75329, 75337, 75347, 75359, 75373, 75389, 75407, 75427, 75449 ; Perf.Sqs = none
75883, 75913, 75931 ; -6n^2 + 48n + 75841 ; FD:-12; Real Roots: -108.499629629 | +116.499629629 ; 514 Primes = 51.40% ; 75883, 75913, 75931, 75937, 75931, 75913, 75883, 75841, 75787, 75721 ; Perf.Sqs = 57121
75991, 75997, 76001 ; -1n^2 + 9n + 75983 ; FD:-2; Real Roots: -271.1868694733 | +280.1868694733 ; 436 Primes = 43.60% ; 75991, 75997, 76001, 76003, 76003, 76001, 75997, 75991, 75983, 75973 ; Perf.Sqs = 52441
76129, 76147, 76157 ; -4n^2 + 30n + 76103 ; FD:-8; Real Roots: -134.2348270644 | +141.7348270644 ; 239 Primes = 23.90% ; 76129, 76147, 76157, 76159, 76153, 76139, 76117, 76087, 76049, 76003 ; Perf.Sqs = 47089
76213, 76231, 76243 ; -3n^2 + 27n + 76189 ; FD:-6; Real Roots: -154.9257925598 | +163.9257925598 ; 488 Primes = 48.80% ; 76213, 76231, 76243, 76249, 76249, 76243, 76231, 76213, 76189, 76159 ; Perf.Sqs = none
76801, 76819, 76829 ; -4n^2 + 30n + 76775 ; FD:-8; Real Roots: -134.8422526695 | +142.3422526695 ; 262 Primes = 26.20% ; 76801, 76819, 76829, 76831, 76825, 76811, 76789, 76759, 76721, 76675 ; Perf.Sqs = -1849, -616225
76829, 76831, 76837 ; 2n^2 - 4n + 76831 ; FD:4; Complex Roots: 1+/-195.996173432i ; 297 Primes = 29.70% ; 76829, 76831, 76837, 76847, 76861, 76879, 76901, 76927, 76957, 76991 ; Perf.Sqs = none
77237, 77239, 77243 ; n^2 - n + 77237 ; FD:2; Complex Roots: 0.5+/-277.9150049925i ; 506 Primes = 50.60% ; 77237, 77239, 77243, 77249, 77257, 77267, 77279, 77293, 77309, 77327 ; Perf.Sqs = 157609
77359, 77369, 77377 ; -1n^2 + 13n + 77347 ; FD:-2; Real Roots: -271.6892341555 | +284.6892341555 ; 404 Primes = 40.40% ; 77359, 77369, 77377, 77383, 77387, 77389, 77389, 77387, 77383, 77377 ; Perf.Sqs = -28561
77719, 77723, 77731 ; 2n^2 - 2n + 77719 ; FD:4; Complex Roots: 0.5+/-197.1274968136i ; 359 Primes = 35.90% ; 77719, 77723, 77731, 77743, 77759, 77779, 77803, 77831, 77863, 77899 ; Perf.Sqs = none
77747, 77761, 77773 ; -1n^2 + 17n + 77731 ; FD:-2; Real Roots: -270.432339466 | +287.432339466 ; 382 Primes = 38.20% ; 77747, 77761, 77773, 77783, 77791, 77797, 77801, 77803, 77803, 77801 ; Perf.Sqs = -196249
78341, 78347, 78367 ; 7n^2 - 15n + 78349 ; FD:14; Complex Roots: 1.0714285714285714285714285714+/-105.7901995769i ; 363 Primes = 36.30% ; 78341, 78347, 78367, 78401, 78449, 78511, 78587, 78677, 78781, 78899 ; Perf.Sqs = none
78479, 78487, 78497 ; n^2 + 5n + 78473 ; FD:2; Complex Roots: -2.5+/-280.1191710683i ; 435 Primes = 43.50% ; 78479, 78487, 78497, 78509, 78523, 78539, 78557, 78577, 78599, 78623 ; Perf.Sqs = 368449, 1026169
78577, 78583, 78593 ; 2n^2 + 78575 ; FD:4; Complex Roots: 0+/-198.2107464291i ; 231 Primes = 23.10% ; 78577, 78583, 78593, 78607, 78625, 78647, 78673, 78703, 78737, 78775 ; Perf.Sqs = 87025, 93025, 330625, 390625, 1311025, 1575025
79063, 79087, 79103 ; -4n^2 + 36n + 79031 ; FD:-8; Real Roots: -136.1342774717 | +145.1342774717 ; 441 Primes = 44.10% ; 79063, 79087, 79103, 79111, 79111, 79103, 79087, 79063, 79031, 78991 ; Perf.Sqs = -66049, -80089, -368449, -426409, -769129, -3193369
79229, 79231, 79241 ; 4n^2 - 10n + 79235 ; FD:8; Complex Roots: 1.25+/-140.7380101465i ; 209 Primes = 20.90% ; 79229, 79231, 79241, 79259, 79285, 79319, 79361, 79411, 79469, 79535 ; Perf.Sqs = 134689
79349, 79357, 79367 ; n^2 + 5n + 79343 ; FD:2; Complex Roots: -2.5+/-281.6678007867i ; 325 Primes = 32.50% ; 79349, 79357, 79367, 79379, 79393, 79409, 79427, 79447, 79469, 79493 ; Perf.Sqs = 97969
79357, 79367, 79379 ; n^2 + 7n + 79349 ; FD:2; Complex Roots: -3.5+/-281.6678007867i ; 325 Primes = 32.50% ; 79357, 79367, 79379, 79393, 79409, 79427, 79447, 79469, 79493, 79519 ; Perf.Sqs = 97969
79427, 79433, 79451 ; 6n^2 - 12n + 79433 ; FD:12; Complex Roots: 1+/-115.0557835719i ; 399 Primes = 39.90% ; 79427, 79433, 79451, 79481, 79523, 79577, 79643, 79721, 79811, 79913 ; Perf.Sqs = none
79589, 79601, 79609 ; -2n^2 + 18n + 79573 ; FD:-4; Real Roots: -195.0162900617 | +204.0162900617 ; 386 Primes = 38.60% ; 79589, 79601, 79609, 79613, 79613, 79609, 79601, 79589, 79573, 79553 ; Perf.Sqs = 51529
79613, 79621, 79627 ; -1n^2 + 11n + 79603 ; FD:-2; Real Roots: -276.6936391912 | +287.6936391912 ; 347 Primes = 34.70% ; 79613, 79621, 79627, 79631, 79633, 79633, 79631, 79627, 79621, 79613 ; Perf.Sqs = 32761, 10201
79621, 79627, 79631 ; -1n^2 + 9n + 79613 ; FD:-2; Real Roots: -277.6936391912 | +286.6936391912 ; 347 Primes = 34.70% ; 79621, 79627, 79631, 79633, 79633, 79631, 79627, 79621, 79613, 79603 ; Perf.Sqs = 32761, 10201
79811, 79813, 79817 ; n^2 - n + 79811 ; FD:2; Complex Roots: 0.5+/-282.5079644895i ; 539 Primes = 53.90% ; 79811, 79813, 79817, 79823, 79831, 79841, 79853, 79867, 79883, 79901 ; Perf.Sqs = 185761, 844561
79973, 79979, 79987 ; n^2 + 3n + 79969 ; FD:2; Complex Roots: -1.5+/-282.7839281147i ; 532 Primes = 53.20% ; 79973, 79979, 79987, 79997, 80009, 80023, 80039, 80057, 80077, 80099 ; Perf.Sqs = 667489
80369, 80387, 80407 ; n^2 + 15n + 80353 ; FD:2; Complex Roots: -7.5+/-283.3668117476i ; 256 Primes = 25.60% ; 80369, 80387, 80407, 80429, 80453, 80479, 80507, 80537, 80569, 80603 ; Perf.Sqs = none
80611, 80621, 80627 ; -2n^2 + 16n + 80597 ; FD:-4; Real Roots: -196.7847105733 | +204.7847105733 ; 328 Primes = 32.80% ; 80611, 80621, 80627, 80629, 80627, 80621, 80611, 80597, 80579, 80557 ; Perf.Sqs = none
80671, 80677, 80681 ; -1n^2 + 9n + 80663 ; FD:-2; Real Roots: -279.5479713006 | +288.5479713006 ; 480 Primes = 48.00% ; 80671, 80677, 80681, 80683, 80683, 80681, 80677, 80671, 80663, 80653 ; Perf.Sqs = 78961, 57121
80777, 80779, 80783 ; n^2 - n + 80777 ; FD:2; Complex Roots: 0.5+/-284.2125085214i ; 498 Primes = 49.80% ; 80777, 80779, 80783, 80789, 80797, 80807, 80819, 80833, 80849, 80867 ; Perf.Sqs = 734449
81749, 81761, 81769 ; -2n^2 + 18n + 81733 ; FD:-4; Real Roots: -197.7047229913 | +206.7047229913 ; 491 Primes = 49.10% ; 81749, 81761, 81769, 81773, 81773, 81769, 81761, 81749, 81733, 81713 ; Perf.Sqs = 78961, 6889
81901, 81919, 81929 ; -4n^2 + 30n + 81875 ; FD:-8; Real Roots: -139.3681766932 | +146.8681766932 ; 376 Primes = 37.60% ; 81901, 81919, 81929, 81931, 81925, 81911, 81889, 81859, 81821, 81775 ; Perf.Sqs = 78961, 17161
81937, 81943, 81953 ; 2n^2 + 81935 ; FD:4; Complex Roots: 0+/-202.4042983733i ; 314 Primes = 31.40% ; 81937, 81943, 81953, 81967, 81985, 82007, 82033, 82063, 82097, 82135 ; Perf.Sqs = none
82021, 82031, 82037 ; -2n^2 + 16n + 82007 ; FD:-4; Real Roots: -198.532713407 | +206.532713407 ; 511 Primes = 51.10% ; 82021, 82031, 82037, 82039, 82037, 82031, 82021, 82007, 81989, 81967 ; Perf.Sqs = -4489, -398161, -1067089
82141, 82153, 82163 ; -1n^2 + 15n + 82127 ; FD:-2; Real Roots: -279.1762110814 | +294.1762110814 ; 362 Primes = 36.20% ; 82141, 82153, 82163, 82171, 82177, 82181, 82183, 82183, 82181, 82177 ; Perf.Sqs = 73441, 63001, -677329
82223, 82231, 82237 ; -1n^2 + 11n + 82213 ; FD:-2; Real Roots: -281.2808396668 | +292.2808396668 ; 313 Primes = 31.30% ; 82223, 82231, 82237, 82241, 82243, 82243, 82241, 82237, 82231, 82223 ; Perf.Sqs = 57121, 39601
82351, 82361, 82373 ; n^2 + 7n + 82343 ; FD:2; Complex Roots: -3.5+/-286.9333546314i ; 373 Primes = 37.30% ; 82351, 82361, 82373, 82387, 82403, 82421, 82441, 82463, 82487, 82513 ; Perf.Sqs = 83521
82531, 82549, 82559 ; -4n^2 + 30n + 82505 ; FD:-8; Real Roots: -139.9173675544 | +147.4173675544 ; 276 Primes = 27.60% ; 82531, 82549, 82559, 82561, 82555, 82541, 82519, 82489, 82451, 82405 ; Perf.Sqs = 66049
82657, 82699, 82721 ; -10n^2 + 72n + 82595 ; FD:-20; Real Roots: -87.3530648192 | +94.5530648192 ; 212 Primes = 21.20% ; 82657, 82699, 82721, 82723, 82705, 82667, 82609, 82531, 82433, 82315 ; Perf.Sqs = 78961
83221, 83227, 83231 ; -1n^2 + 9n + 83213 ; FD:-2; Real Roots: -284.001733097 | +293.001733097 ; 411 Primes = 41.10% ; 83221, 83227, 83231, 83233, 83233, 83231, 83227, 83221, 83213, 83203 ; Perf.Sqs = 1
83399, 83401, 83407 ; 2n^2 - 4n + 83401 ; FD:4; Complex Roots: 1+/-204.2045543077i ; 599 Primes = 59.90% ; 83399, 83401, 83407, 83417, 83431, 83449, 83471, 83497, 83527, 83561 ; Perf.Sqs = 85849, 546121, 1038361
83597, 83609, 83617 ; -2n^2 + 18n + 83581 ; FD:-4; Real Roots: -199.9767712969 | +208.9767712969 ; 447 Primes = 44.70% ; 83597, 83609, 83617, 83621, 83621, 83617, 83609, 83597, 83581, 83561 ; Perf.Sqs = none
83903, 83911, 83921 ; n^2 + 5n + 83897 ; FD:2; Complex Roots: -2.5+/-289.6389994459i ; 336 Primes = 33.60% ; 83903, 83911, 83921, 83933, 83947, 83963, 83981, 84001, 84023, 84047 ; Perf.Sqs = none
84221, 84223, 84229 ; 2n^2 - 4n + 84223 ; FD:4; Complex Roots: 1+/-205.208430626i ; 375 Primes = 37.50% ; 84221, 84223, 84229, 84239, 84253, 84271, 84293, 84319, 84349, 84383 ; Perf.Sqs = none
84299, 84307, 84313 ; -1n^2 + 11n + 84289 ; FD:-2; Real Roots: -284.8777711878 | +295.8777711878 ; 523 Primes = 52.30% ; 84299, 84307, 84313, 84317, 84319, 84319, 84317, 84313, 84307, 84299 ; Perf.Sqs = 2809
84307, 84313, 84317 ; -1n^2 + 9n + 84299 ; FD:-2; Real Roots: -285.8777711878 | +294.8777711878 ; 523 Primes = 52.30% ; 84307, 84313, 84317, 84319, 84319, 84317, 84313, 84307, 84299, 84289 ; Perf.Sqs = 2809
84407, 84421, 84431 ; -2n^2 + 20n + 84389 ; FD:-4; Real Roots: -200.4738426175 | +210.4738426175 ; 363 Primes = 36.30% ; 84407, 84421, 84431, 84437, 84439, 84437, 84431, 84421, 84407, 84389 ; Perf.Sqs = -10609, -72361, -97969, -316969, -1394761
84449, 84457, 84463 ; -1n^2 + 11n + 84439 ; FD:-2; Real Roots: -285.1359406543 | +296.1359406543 ; 295 Primes = 29.50% ; 84449, 84457, 84463, 84467, 84469, 84469, 84467, 84463, 84457, 84449 ; Perf.Sqs = none
84521, 84523, 84533 ; 4n^2 - 10n + 84527 ; FD:8; Complex Roots: 1.25+/-145.3622629846i ; 436 Primes = 43.60% ; 84521, 84523, 84533, 84551, 84577, 84611, 84653, 84703, 84761, 84827 ; Perf.Sqs = none
84809, 84811, 84827 ; 7n^2 - 19n + 84821 ; FD:14; Complex Roots: 1.3571428571428571428571428571+/-110.0701770579i ; 227 Primes = 22.70% ; 84809, 84811, 84827, 84857, 84901, 84959, 85031, 85117, 85217, 85331 ; Perf.Sqs = none
84991, 85009, 85021 ; -3n^2 + 27n + 84967 ; FD:-6; Real Roots: -163.8525566581 | +172.8525566581 ; 540 Primes = 54.00% ; 84991, 85009, 85021, 85027, 85027, 85021, 85009, 84991, 84967, 84937 ; Perf.Sqs = 10609
85081, 85087, 85091 ; -1n^2 + 9n + 85073 ; FD:-2; Real Roots: -287.2074733359 | +296.2074733359 ; 426 Primes = 42.60% ; 85081, 85087, 85091, 85093, 85093, 85091, 85087, 85081, 85073, 85063 ; Perf.Sqs = 43681, 121, -34969, -452929, -727609
85229, 85237, 85243 ; -1n^2 + 11n + 85219 ; FD:-2; Real Roots: -286.4747420583 | +297.4747420583 ; 480 Primes = 48.00% ; 85229, 85237, 85243, 85247, 85249, 85249, 85247, 85243, 85237, 85229 ; Perf.Sqs = 38809, 27889
85381, 85411, 85427 ; -7n^2 + 51n + 85337 ; FD:-14; Real Roots: -106.8300825671 | +114.1157968528 ; 380 Primes = 38.00% ; 85381, 85411, 85427, 85429, 85417, 85391, 85351, 85297, 85229, 85147 ; Perf.Sqs = -83521
85513, 85517, 85523 ; n^2 + n + 85511 ; FD:2; Complex Roots: -0.5+/-292.4222118786i ; 462 Primes = 46.20% ; 85513, 85517, 85523, 85531, 85541, 85553, 85567, 85583, 85601, 85621 ; Perf.Sqs = 121801
86239, 86243, 86249 ; n^2 + n + 86237 ; FD:2; Complex Roots: -0.5+/-293.6609439473i ; 458 Primes = 45.80% ; 86239, 86243, 86249, 86257, 86267, 86279, 86293, 86309, 86327, 86347 ; Perf.Sqs = 237169, 744769
86323, 86341, 86351 ; -4n^2 + 30n + 86297 ; FD:-8; Real Roots: -143.1796175044 | +150.6796175044 ; 446 Primes = 44.60% ; 86323, 86341, 86351, 86353, 86347, 86333, 86311, 86281, 86243, 86197 ; Perf.Sqs = none
86461, 86467, 86477 ; 2n^2 + 86459 ; FD:4; Complex Roots: 0+/-207.9170507678i ; 398 Primes = 39.80% ; 86461, 86467, 86477, 86491, 86509, 86531, 86557, 86587, 86621, 86659 ; Perf.Sqs = none
86843, 86851, 86857 ; -1n^2 + 11n + 86833 ; FD:-2; Real Roots: -289.2257199499 | +300.2257199499 ; 327 Primes = 32.70% ; 86843, 86851, 86857, 86861, 86863, 86863, 86861, 86857, 86851, 86843 ; Perf.Sqs = none
86951, 86959, 86969 ; n^2 + 5n + 86945 ; FD:2; Complex Roots: -2.5+/-294.8537773202i ; 457 Primes = 45.70% ; 86951, 86959, 86969, 86981, 86995, 87011, 87029, 87049, 87071, 87095 ; Perf.Sqs = 94249, 351649
87317, 87323, 87337 ; 4n^2 - 6n + 87319 ; FD:8; Complex Roots: 0.75+/-147.7470388874i ; 279 Primes = 27.90% ; 87317, 87323, 87337, 87359, 87389, 87427, 87473, 87527, 87589, 87659 ; Perf.Sqs = 187489
87547, 87553, 87557 ; -1n^2 + 9n + 87539 ; FD:-2; Real Roots: -291.4041229858 | +300.4041229858 ; 411 Primes = 41.10% ; 87547, 87553, 87557, 87559, 87559, 87557, 87553, 87547, 87539, 87529 ; Perf.Sqs = 49729
87613, 87623, 87629 ; -2n^2 + 16n + 87599 ; FD:-4; Real Roots: -205.3215230214 | +213.3215230214 ; 335 Primes = 33.50% ; 87613, 87623, 87629, 87631, 87629, 87623, 87613, 87599, 87581, 87559 ; Perf.Sqs = -69169, -109561
87683, 87691, 87697 ; -1n^2 + 11n + 87673 ; FD:-2; Real Roots: -290.6473450835 | +301.6473450835 ; 260 Primes = 26.00% ; 87683, 87691, 87697, 87701, 87703, 87703, 87701, 87697, 87691, 87683 ; Perf.Sqs = 78961, 19321
87793, 87797, 87803 ; n^2 + n + 87791 ; FD:2; Complex Roots: -0.5+/-296.2950387705i ; 321 Primes = 32.10% ; 87793, 87797, 87803, 87811, 87821, 87833, 87847, 87863, 87881, 87901 ; Perf.Sqs = 96721
88643, 88651, 88657 ; -1n^2 + 11n + 88633 ; FD:-2; Real Roots: -292.263748633 | +303.263748633 ; 427 Primes = 42.70% ; 88643, 88651, 88657, 88661, 88663, 88663, 88661, 88657, 88651, 88643 ; Perf.Sqs = 78961, 39601
88651, 88657, 88661 ; -1n^2 + 9n + 88643 ; FD:-2; Real Roots: -293.263748633 | +302.263748633 ; 427 Primes = 42.70% ; 88651, 88657, 88661, 88663, 88663, 88661, 88657, 88651, 88643, 88633 ; Perf.Sqs = 78961, 39601
88801, 88807, 88811 ; -1n^2 + 9n + 88793 ; FD:-2; Real Roots: -293.5155197301 | +302.5155197301 ; 438 Primes = 43.80% ; 88801, 88807, 88811, 88813, 88813, 88811, 88807, 88801, 88793, 88783 ; Perf.Sqs = -289
88843, 88853, 88861 ; -1n^2 + 13n + 88831 ; FD:-2; Real Roots: -291.6161686323 | +304.6161686323 ; 528 Primes = 52.80% ; 88843, 88853, 88861, 88867, 88871, 88873, 88873, 88871, 88867, 88861 ; Perf.Sqs = 72361, 961, -9409
88867, 88873, 88883 ; 2n^2 + 88865 ; FD:4; Complex Roots: 0+/-210.7901800369i ; 343 Primes = 34.30% ; 88867, 88873, 88883, 88897, 88915, 88937, 88963, 88993, 89027, 89065 ; Perf.Sqs = none
89459, 89477, 89491 ; -2n^2 + 24n + 89437 ; FD:-4; Real Roots: -205.5525939335 | +217.5525939335 ; 234 Primes = 23.40% ; 89459, 89477, 89491, 89501, 89507, 89509, 89507, 89501, 89491, 89477 ; Perf.Sqs = none
89783, 89797, 89809 ; -1n^2 + 17n + 89767 ; FD:-2; Real Roots: -291.2319635941 | +308.2319635941 ; 392 Primes = 39.20% ; 89783, 89797, 89809, 89819, 89827, 89833, 89837, 89839, 89839, 89837 ; Perf.Sqs = 76729
89899, 89909, 89917 ; -1n^2 + 13n + 89887 ; FD:-2; Real Roots: -293.3820601503 | +306.3820601503 ; 329 Primes = 32.90% ; 89899, 89909, 89917, 89923, 89927, 89929, 89929, 89927, 89923, 89917 ; Perf.Sqs = 49729, 24649
90281, 90289, 90313 ; 8n^2 - 16n + 90289 ; FD:16; Complex Roots: 1+/-106.2314689722i ; 382 Primes = 38.20% ; 90281, 90289, 90313, 90353, 90409, 90481, 90569, 90673, 90793, 90929 ; Perf.Sqs = 97969, 477481, 1408969
90641, 90647, 90659 ; 3n^2 - 3n + 90641 ; FD:6; Complex Roots: 0.5+/-173.820069804i ; 401 Primes = 40.10% ; 90641, 90647, 90659, 90677, 90701, 90731, 90767, 90809, 90857, 90911 ; Perf.Sqs = none
90823, 90833, 90841 ; -1n^2 + 13n + 90811 ; FD:-2; Real Roots: -294.9187286815 | +307.9187286815 ; 315 Primes = 31.50% ; 90823, 90833, 90841, 90847, 90851, 90853, 90853, 90851, 90847, 90841 ; Perf.Sqs = -49
91397, 91411, 91423 ; -1n^2 + 17n + 91381 ; FD:-2; Real Roots: -293.9123840057 | +310.9123840057 ; 409 Primes = 40.90% ; 91397, 91411, 91423, 91433, 91441, 91447, 91451, 91453, 91453, 91451 ; Perf.Sqs = none
91571, 91573, 91577 ; n^2 - n + 91571 ; FD:2; Complex Roots: 0.5+/-302.60659279i ; 464 Primes = 46.40% ; 91571, 91573, 91577, 91583, 91591, 91601, 91613, 91627, 91643, 91661 ; Perf.Sqs = none
91573, 91577, 91583 ; n^2 + n + 91571 ; FD:2; Complex Roots: -0.5+/-302.60659279i ; 463 Primes = 46.30% ; 91573, 91577, 91583, 91591, 91601, 91613, 91627, 91643, 91661, 91681 ; Perf.Sqs = none
91801, 91807, 91811 ; -1n^2 + 9n + 91793 ; FD:-2; Real Roots: -298.5070131202 | +307.5070131202 ; 366 Primes = 36.60% ; 91801, 91807, 91811, 91813, 91813, 91811, 91807, 91801, 91793, 91783 ; Perf.Sqs = 39601, 28561, -85849
91943, 91951, 91957 ; -1n^2 + 11n + 91933 ; FD:-2; Real Roots: -297.75443113 | +308.75443113 ; 518 Primes = 51.80% ; 91943, 91951, 91957, 91961, 91963, 91963, 91961, 91957, 91951, 91943 ; Perf.Sqs = 17161
92233, 92237, 92243 ; n^2 + n + 92231 ; FD:2; Complex Roots: -0.5+/-303.6951596585i ; 321 Primes = 32.10% ; 92233, 92237, 92243, 92251, 92261, 92273, 92287, 92303, 92321, 92341 ; Perf.Sqs = none
92243, 92251, 92269 ; 5n^2 - 7n + 92245 ; FD:10; Complex Roots: 0.7+/-135.8252921955i ; 251 Primes = 25.10% ; 92243, 92251, 92269, 92297, 92335, 92383, 92441, 92509, 92587, 92675 ; Perf.Sqs = none
92639, 92641, 92647 ; 2n^2 - 4n + 92641 ; FD:4; Complex Roots: 1+/-215.2196552362i ; 460 Primes = 46.00% ; 92639, 92641, 92647, 92657, 92671, 92689, 92711, 92737, 92767, 92801 ; Perf.Sqs = 134689, 271441
92693, 92699, 92707 ; n^2 + 3n + 92689 ; FD:2; Complex Roots: -1.5+/-304.4449868203i ; 300 Primes = 30.00% ; 92693, 92699, 92707, 92717, 92729, 92743, 92759, 92777, 92797, 92819 ; Perf.Sqs = 120409, 190969
92927, 92941, 92951 ; -2n^2 + 20n + 92909 ; FD:-4; Real Roots: -210.5910480516 | +220.5910480516 ; 437 Primes = 43.70% ; 92927, 92941, 92951, 92957, 92959, 92957, 92951, 92941, 92927, 92909 ; Perf.Sqs = -32041, -214369
92941, 92951, 92957 ; -2n^2 + 16n + 92927 ; FD:-4; Real Roots: -211.5910480516 | +219.5910480516 ; 438 Primes = 43.80% ; 92941, 92951, 92957, 92959, 92957, 92951, 92941, 92927, 92909, 92887 ; Perf.Sqs = -32041, -214369
93133, 93139, 93151 ; 3n^2 - 3n + 93133 ; FD:6; Complex Roots: 0.5+/-176.1933123967i ; 393 Primes = 39.30% ; 93133, 93139, 93151, 93169, 93193, 93223, 93259, 93301, 93349, 93403 ; Perf.Sqs = none
93251, 93253, 93257 ; n^2 - n + 93251 ; FD:2; Complex Roots: 0.5+/-305.3698577136i ; 434 Primes = 43.40% ; 93251, 93253, 93257, 93263, 93271, 93281, 93293, 93307, 93323, 93341 ; Perf.Sqs = none
93287, 93307, 93319 ; -4n^2 + 32n + 93259 ; FD:-8; Real Roots: -148.7440669879 | +156.7440669879 ; 327 Primes = 32.70% ; 93287, 93307, 93319, 93323, 93319, 93307, 93287, 93259, 93223, 93179 ; Perf.Sqs = none
93319, 93323, 93329 ; n^2 + n + 93317 ; FD:2; Complex Roots: -0.5+/-305.4779042746i ; 275 Primes = 27.50% ; 93319, 93323, 93329, 93337, 93347, 93359, 93373, 93389, 93407, 93427 ; Perf.Sqs = none
93481, 93487, 93491 ; -1n^2 + 9n + 93473 ; FD:-2; Real Roots: -301.266659399 | +310.266659399 ; 523 Primes = 52.30% ; 93481, 93487, 93491, 93493, 93493, 93491, 93487, 93481, 93473, 93463 ; Perf.Sqs = -26569
93491, 93493, 93497 ; n^2 - n + 93491 ; FD:2; Complex Roots: 0.5+/-305.7625712869i ; 444 Primes = 44.40% ; 93491, 93493, 93497, 93503, 93511, 93521, 93533, 93547, 93563, 93581 ; Perf.Sqs = none
93827, 93851, 93871 ; -2n^2 + 30n + 93799 ; FD:-4; Real Roots: -209.1927548397 | +224.1927548397 ; 291 Primes = 29.10% ; 93827, 93851, 93871, 93887, 93899, 93907, 93911, 93911, 93907, 93899 ; Perf.Sqs = -6889, -421201, -1315609
94009, 94033, 94049 ; -4n^2 + 36n + 93977 ; FD:-8; Real Roots: -148.8443836598 | +157.8443836598 ; 373 Primes = 37.30% ; 94009, 94033, 94049, 94057, 94057, 94049, 94033, 94009, 93977, 93937 ; Perf.Sqs = none
94483, 94513, 94529 ; -7n^2 + 51n + 94439 ; FD:-14; Real Roots: -112.5662480187 | +119.8519623044 ; 386 Primes = 38.60% ; 94483, 94513, 94529, 94531, 94519, 94493, 94453, 94399, 94331, 94249 ; Perf.Sqs = 94249
95093, 95101, 95107 ; -1n^2 + 11n + 95083 ; FD:-2; Real Roots: -302.9043611884 | +313.9043611884 ; 536 Primes = 53.60% ; 95093, 95101, 95107, 95111, 95113, 95113, 95111, 95107, 95101, 95093 ; Perf.Sqs = 11881
95531, 95539, 95549 ; n^2 + 5n + 95525 ; FD:2; Complex Roots: -2.5+/-309.0610781059i ; 339 Primes = 33.90% ; 95531, 95539, 95549, 95561, 95575, 95591, 95609, 95629, 95651, 95675 ; Perf.Sqs = 97969, 100489, 109561, 429025, 483025
95561, 95569, 95581 ; 2n^2 + 2n + 95557 ; FD:4; Complex Roots: -0.5+/-218.5823643389i ; 222 Primes = 22.20% ; 95561, 95569, 95581, 95597, 95617, 95641, 95669, 95701, 95737, 95777 ; Perf.Sqs = none
95713, 95717, 95723 ; n^2 + n + 95711 ; FD:2; Complex Roots: -0.5+/-309.3715403847i ; 287 Primes = 28.70% ; 95713, 95717, 95723, 95731, 95741, 95753, 95767, 95783, 95801, 95821 ; Perf.Sqs = none
95773, 95783, 95789 ; -2n^2 + 16n + 95759 ; FD:-4; Real Roots: -214.8504055285 | +222.8504055285 ; 320 Primes = 32.00% ; 95773, 95783, 95789, 95791, 95789, 95783, 95773, 95759, 95741, 95719 ; Perf.Sqs = -61009, -143641
95929, 95947, 95957 ; -4n^2 + 30n + 95903 ; FD:-8; Real Roots: -151.1364503435 | +158.6364503435 ; 274 Primes = 27.40% ; 95929, 95947, 95957, 95959, 95953, 95939, 95917, 95887, 95849, 95803 ; Perf.Sqs = none
96149, 96157, 96167 ; n^2 + 5n + 96143 ; FD:2; Complex Roots: -2.5+/-310.0592685278i ; 397 Primes = 39.70% ; 96149, 96157, 96167, 96179, 96193, 96209, 96227, 96247, 96269, 96293 ; Perf.Sqs = none
96269, 96281, 96289 ; -2n^2 + 18n + 96253 ; FD:-4; Real Roots: -214.9236769357 | +223.9236769357 ; 515 Primes = 51.50% ; 96269, 96281, 96289, 96293, 96293, 96289, 96281, 96269, 96253, 96233 ; Perf.Sqs = 1681
96377, 96401, 96419 ; -3n^2 + 33n + 96347 ; FD:-6; Real Roots: -173.7928238014 | +184.7928238014 ; 362 Primes = 36.20% ; 96377, 96401, 96419, 96431, 96437, 96437, 96431, 96419, 96401, 96377 ; Perf.Sqs = -3481, -85849, -822649
96443, 96451, 96457 ; -1n^2 + 11n + 96433 ; FD:-2; Real Roots: -305.0853344896 | +316.0853344896 ; 430 Primes = 43.00% ; 96443, 96451, 96457, 96461, 96463, 96463, 96461, 96457, 96451, 96443 ; Perf.Sqs = -11449
96469, 96479, 96487 ; -1n^2 + 13n + 96457 ; FD:-2; Real Roots: -304.1432841701 | +317.1432841701 ; 446 Primes = 44.60% ; 96469, 96479, 96487, 96493, 96497, 96499, 96499, 96497, 96493, 96487 ; Perf.Sqs = 66049
96479, 96487, 96493 ; -1n^2 + 11n + 96469 ; FD:-2; Real Roots: -305.1432841701 | +316.1432841701 ; 446 Primes = 44.60% ; 96479, 96487, 96493, 96497, 96499, 96499, 96497, 96493, 96487, 96479 ; Perf.Sqs = 66049
96739, 96749, 96757 ; -1n^2 + 13n + 96727 ; FD:-2; Real Roots: -304.5775626753 | +317.5775626753 ; 394 Primes = 39.40% ; 96739, 96749, 96757, 96763, 96767, 96769, 96769, 96767, 96763, 96757 ; Perf.Sqs = 85849
97169, 97171, 97177 ; 2n^2 - 4n + 97171 ; FD:4; Complex Roots: 1+/-220.4189193332i ; 320 Primes = 32.00% ; 97169, 97171, 97177, 97187, 97201, 97219, 97241, 97267, 97297, 97331 ; Perf.Sqs = 97969, 737881, 1038361
97187, 97213, 97231 ; -4n^2 + 38n + 97153 ; FD:-8; Real Roots: -151.1692499341 | +160.6692499341 ; 245 Primes = 24.50% ; 97187, 97213, 97231, 97241, 97243, 97237, 97223, 97201, 97171, 97133 ; Perf.Sqs = 36481
97367, 97369, 97373 ; n^2 - n + 97367 ; FD:2; Complex Roots: 0.5+/-312.0364562034i ; 523 Primes = 52.30% ; 97367, 97369, 97373, 97379, 97387, 97397, 97409, 97423, 97439, 97457 ; Perf.Sqs = none
97379, 97381, 97387 ; 2n^2 - 4n + 97381 ; FD:4; Complex Roots: 1+/-220.6569736038i ; 362 Primes = 36.20% ; 97379, 97381, 97387, 97397, 97411, 97429, 97451, 97477, 97507, 97541 ; Perf.Sqs = none
97561, 97571, 97577 ; -2n^2 + 16n + 97547 ; FD:-4; Real Roots: -216.8834534319 | +224.8834534319 ; 385 Primes = 38.50% ; 97561, 97571, 97577, 97579, 97577, 97571, 97561, 97547, 97529, 97507 ; Perf.Sqs = 11881
97967, 97973, 97987 ; 4n^2 - 6n + 97969 ; FD:8; Complex Roots: 0.75+/-156.4982028651i ; 372 Primes = 37.20% ; 97967, 97973, 97987, 98009, 98039, 98077, 98123, 98177, 98239, 98309 ; Perf.Sqs = 97969, 1261129
98429, 98443, 98453 ; -2n^2 + 20n + 98411 ; FD:-4; Real Roots: -216.8794717859 | +226.8794717859 ; 419 Primes = 41.90% ; 98429, 98443, 98453, 98459, 98461, 98459, 98453, 98443, 98429, 98411 ; Perf.Sqs = none
98887, 98893, 98897 ; -1n^2 + 9n + 98879 ; FD:-2; Real Roots: -309.9825114374 | +318.9825114374 ; 411 Primes = 41.10% ; 98887, 98893, 98897, 98899, 98899, 98897, 98893, 98887, 98879, 98869 ; Perf.Sqs = 97969
98929, 98939, 98947 ; -1n^2 + 13n + 98917 ; FD:-2; Real Roots: -308.0778917852 | +321.0778917852 ; 302 Primes = 30.20% ; 98929, 98939, 98947, 98953, 98957, 98959, 98959, 98957, 98953, 98947 ; Perf.Sqs = 85849, 49
98963, 98981, 98993 ; -3n^2 + 27n + 98939 ; FD:-6; Real Roots: -177.1587918783 | +186.1587918783 ; 443 Primes = 44.30% ; 98963, 98981, 98993, 98999, 98999, 98993, 98981, 98963, 98939, 98909 ; Perf.Sqs = none
99241, 99251, 99257 ; -2n^2 + 16n + 99227 ; FD:-4; Real Roots: -218.7767941236 | +226.7767941236 ; 331 Primes = 33.10% ; 99241, 99251, 99257, 99259, 99257, 99251, 99241, 99227, 99209, 99187 ; Perf.Sqs = 52441
99563, 99571, 99577 ; -1n^2 + 11n + 99553 ; FD:-2; Real Roots: -310.0681384424 | +321.0681384424 ; 328 Primes = 32.80% ; 99563, 99571, 99577, 99581, 99583, 99583, 99581, 99577, 99571, 99563 ; Perf.Sqs = 96721, 32761, 28561, -299209
99607, 99611, 99623 ; 4n^2 - 8n + 99611 ; FD:8; Complex Roots: 1+/-157.8028833704i ; 261 Primes = 26.10% ; 99607, 99611, 99623, 99643, 99671, 99707, 99751, 99803, 99863, 99931 ; Perf.Sqs = none
99707, 99709, 99713 ; n^2 - n + 99707 ; FD:2; Complex Roots: 0.5+/-315.7637566283i ; 369 Primes = 36.90% ; 99707, 99709, 99713, 99719, 99727, 99737, 99749, 99763, 99779, 99797 ; Perf.Sqs = 537289
99971, 99989, 99991 ; -8n^2 + 42n + 99937 ; No FD; Real Roots: -109.1739965295 | +114.4239965295 ; 426 Primes = 42.60% ; 99971, 99989, 99991, 99977, 99947, 99901, 99839, 99761, 99667, 99557 ; Perf.Sqs = 83521