# List of all primitive integral solutions of the Thue-Mahler equations
# f(x,y) = z, where
# f is any reduced binary cubic with non-zero discriminant bounded by |D(f)| <= 16,
# such that only primes dividing z are among S, where
# S is the set of the first 5 primes.
# Note that some GL_2(Z)-equivalence classes of forms may have several reduced representatives.
# It contains 10068 pairs in total.
# Format: "(x,y)".
# Computing this list took 255 seconds.
# Authors: Rafael von Känel and Benjamin Matschke, 2015.
# License: Creative commons 3.0 by-nc.
#
# (a,b,c,d) = (-4,0,1,0) and D = -16:
#
(-18225,-22114)
(-18225,22114)
(-10935,-16546)
(-10935,16546)
(-9801,-19598)
(-9801,19598)
(-9317,-14134)
(-9317,14134)
(-4375,-8746)
(-4375,8746)
(-4235,-278)
(-4235,278)
(-4096,-8143)
(-4096,8143)
(-3773,-7034)
(-3773,-4954)
(-3773,4954)
(-3773,7034)
(-3025,-6046)
(-3025,6046)
(-2673,-2846)
(-2673,2846)
(-2401,-4798)
(-2401,-4702)
(-2401,4702)
(-2401,4798)
(-1715,-1894)
(-1715,1894)
(-1408,-2809)
(-1408,2809)
(-1375,-2738)
(-1375,2738)
(-1331,-2630)
(-1331,-2522)
(-1331,-2338)
(-1331,2338)
(-1331,2522)
(-1331,2630)
(-1029,-2038)
(-1029,2038)
(-1000,-1993)
(-1000,1993)
(-891,-1718)
(-891,1718)
(-875,-1706)
(-875,-298)
(-875,298)
(-875,1706)
(-784,-1557)
(-784,1557)
(-729,-1358)
(-729,-478)
(-729,478)
(-729,1358)
(-625,-1214)
(-625,-1151)
(-625,-1054)
(-625,-766)
(-625,766)
(-625,1054)
(-625,1151)
(-625,1214)
(-567,-914)
(-567,914)
(-539,-970)
(-539,970)
(-441,-878)
(-441,-398)
(-441,398)
(-441,878)
(-385,-766)
(-385,766)
(-375,-622)
(-375,622)
(-363,-646)
(-363,646)
(-343,-664)
(-343,-524)
(-343,-466)
(-343,-286)
(-343,286)
(-343,466)
(-343,524)
(-343,664)
(-275,-422)
(-275,-38)
(-275,38)
(-275,422)
(-245,-482)
(-245,-478)
(-245,478)
(-245,482)
(-243,-482)
(-243,-361)
(-243,361)
(-243,482)
(-242,-141)
(-242,141)
(-225,-446)
(-225,-254)
(-225,254)
(-225,446)
(-224,-443)
(-224,443)
(-196,-337)
(-196,337)
(-189,-122)
(-189,122)
(-175,-134)
(-175,134)
(-160,-23)
(-160,23)
(-147,-206)
(-147,206)
(-135,-269)
(-135,-242)
(-135,-214)
(-135,214)
(-135,242)
(-135,269)
(-125,-236)
(-125,-234)
(-125,-142)
(-125,-74)
(-125,-58)
(-125,58)
(-125,74)
(-125,142)
(-125,234)
(-125,236)
(-121,-238)
(-121,-206)
(-121,-178)
(-121,-158)
(-121,-142)
(-121,-82)
(-121,-46)
(-121,46)
(-121,82)
(-121,142)
(-121,158)
(-121,178)
(-121,206)
(-121,238)
(-99,-194)
(-99,-58)
(-99,-2)
(-99,2)
(-99,58)
(-99,194)
(-88,-167)
(-88,167)
(-81,-158)
(-81,-146)
(-81,-118)
(-81,-113)
(-81,-62)
(-81,-34)
(-81,34)
(-81,62)
(-81,113)
(-81,118)
(-81,146)
(-81,158)
(-80,-83)
(-80,83)
(-77,-146)
(-77,-134)
(-77,-46)
(-77,-26)
(-77,26)
(-77,46)
(-77,134)
(-77,146)
(-75,-106)
(-75,106)
(-64,-117)
(-64,-103)
(-64,-47)
(-64,-7)
(-64,7)
(-64,47)
(-64,103)
(-64,117)
(-63,-124)
(-63,-116)
(-63,-94)
(-63,94)
(-63,116)
(-63,124)
(-56,-13)
(-56,13)
(-55,-106)
(-55,-86)
(-55,-82)
(-55,-2)
(-55,2)
(-55,82)
(-55,86)
(-55,106)
(-50,-89)
(-50,89)
(-49,-94)
(-49,-82)
(-49,-78)
(-49,-62)
(-49,-34)
(-49,-23)
(-49,-10)
(-49,-2)
(-49,2)
(-49,10)
(-49,23)
(-49,34)
(-49,62)
(-49,78)
(-49,82)
(-49,94)
(-45,-86)
(-45,86)
(-44,-87)
(-44,87)
(-35,-62)
(-35,-58)
(-35,-38)
(-35,-26)
(-35,26)
(-35,38)
(-35,58)
(-35,62)
(-33,-62)
(-33,-59)
(-33,-46)
(-33,-34)
(-33,34)
(-33,46)
(-33,59)
(-33,62)
(-32,-61)
(-32,-57)
(-32,57)
(-32,61)
(-27,-46)
(-27,-44)
(-27,-34)
(-27,-26)
(-27,-10)
(-27,10)
(-27,26)
(-27,34)
(-27,44)
(-27,46)
(-25,-49)
(-25,-48)
(-25,-46)
(-25,-38)
(-25,-34)
(-25,-22)
(-25,-14)
(-25,-6)
(-25,6)
(-25,14)
(-25,22)
(-25,34)
(-25,38)
(-25,46)
(-25,48)
(-25,49)
(-22,-37)
(-22,-19)
(-22,19)
(-22,37)
(-21,-38)
(-21,-22)
(-21,-2)
(-21,2)
(-21,22)
(-21,38)
(-20,-37)
(-20,37)
(-16,-31)
(-16,-23)
(-16,-17)
(-16,17)
(-16,23)
(-16,31)
(-15,-26)
(-15,-19)
(-15,-14)
(-15,-2)
(-15,2)
(-15,14)
(-15,19)
(-15,26)
(-14,-27)
(-14,-17)
(-14,17)
(-14,27)
(-11,-20)
(-11,-18)
(-11,-14)
(-11,-13)
(-11,-10)
(-11,-8)
(-11,-6)
(-11,-2)
(-11,2)
(-11,6)
(-11,8)
(-11,10)
(-11,13)
(-11,14)
(-11,18)
(-11,20)
(-10,-13)
(-10,13)
(-9,-17)
(-9,-14)
(-9,-10)
(-9,-7)
(-9,-4)
(-9,-2)
(-9,2)
(-9,4)
(-9,7)
(-9,10)
(-9,14)
(-9,17)
(-8,-11)
(-8,-9)
(-8,-5)
(-8,5)
(-8,9)
(-8,11)
(-7,-13)
(-7,-11)
(-7,-10)
(-7,-8)
(-7,-6)
(-7,-4)
(-7,-2)
(-7,2)
(-7,4)
(-7,6)
(-7,8)
(-7,10)
(-7,11)
(-7,13)
(-5,-8)
(-5,-6)
(-5,-4)
(-5,-2)
(-5,-1)
(-5,1)
(-5,2)
(-5,4)
(-5,6)
(-5,8)
(-4,-7)
(-4,-3)
(-4,-1)
(-4,1)
(-4,3)
(-4,7)
(-3,-5)
(-3,-4)
(-3,-2)
(-3,-1)
(-3,1)
(-3,2)
(-3,4)
(-3,5)
(-2,-3)
(-2,-1)
(-2,1)
(-2,3)
(-1,-1)
(-1,0)
(-1,1)
(1,-39202)
(1,-17498)
(1,-12098)
(1,-9602)
(1,-2158)
(1,-1762)
(1,-1538)
(1,-970)
(1,-898)
(1,-702)
(1,-502)
(1,-488)
(1,-482)
(1,-398)
(1,-394)
(1,-322)
(1,-254)
(1,-222)
(1,-218)
(1,-198)
(1,-194)
(1,-178)
(1,-152)
(1,-142)
(1,-130)
(1,-123)
(1,-110)
(1,-98)
(1,-86)
(1,-82)
(1,-79)
(1,-68)
(1,-62)
(1,-58)
(1,-52)
(1,-47)
(1,-46)
(1,-42)
(1,-38)
(1,-34)
(1,-30)
(1,-26)
(1,-23)
(1,-22)
(1,-20)
(1,-18)
(1,-16)
(1,-14)
(1,-13)
(1,-12)
(1,-10)
(1,-9)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,3)
(1,4)
(1,5)
(1,6)
(1,7)
(1,8)
(1,9)
(1,10)
(1,12)
(1,13)
(1,14)
(1,16)
(1,18)
(1,20)
(1,22)
(1,23)
(1,26)
(1,30)
(1,34)
(1,38)
(1,42)
(1,46)
(1,47)
(1,52)
(1,58)
(1,62)
(1,68)
(1,79)
(1,82)
(1,86)
(1,98)
(1,110)
(1,123)
(1,130)
(1,142)
(1,152)
(1,178)
(1,194)
(1,198)
(1,218)
(1,222)
(1,254)
(1,322)
(1,394)
(1,398)
(1,482)
(1,488)
(1,502)
(1,702)
(1,898)
(1,970)
(1,1538)
(1,1762)
(1,2158)
(1,9602)
(1,12098)
(1,17498)
(1,39202)
(2,-1327)
(2,-59)
(2,-31)
(2,-29)
(2,-11)
(2,-7)
(2,-5)
(2,5)
(2,7)
(2,11)
(2,29)
(2,31)
(2,59)
(2,1327)
(3,-5494)
(3,-974)
(3,-506)
(3,-314)
(3,-134)
(3,-106)
(3,-104)
(3,-94)
(3,-50)
(3,-38)
(3,-34)
(3,-26)
(3,-22)
(3,-16)
(3,-14)
(3,-10)
(3,-8)
(3,8)
(3,10)
(3,14)
(3,16)
(3,22)
(3,26)
(3,34)
(3,38)
(3,50)
(3,94)
(3,104)
(3,106)
(3,134)
(3,314)
(3,506)
(3,974)
(3,5494)
(4,-883)
(4,-113)
(4,-41)
(4,-19)
(4,-17)
(4,-13)
(4,13)
(4,17)
(4,19)
(4,41)
(4,113)
(4,883)
(5,-4106)
(5,-3574)
(5,-494)
(5,-353)
(5,-298)
(5,-206)
(5,-186)
(5,-122)
(5,-118)
(5,-98)
(5,-74)
(5,-54)
(5,-46)
(5,-38)
(5,-34)
(5,-32)
(5,-26)
(5,-22)
(5,-18)
(5,-17)
(5,-14)
(5,-12)
(5,-11)
(5,11)
(5,12)
(5,14)
(5,17)
(5,18)
(5,22)
(5,26)
(5,32)
(5,34)
(5,38)
(5,46)
(5,54)
(5,74)
(5,98)
(5,118)
(5,122)
(5,186)
(5,206)
(5,298)
(5,353)
(5,494)
(5,3574)
(5,4106)
(6,-37)
(6,-23)
(6,-13)
(6,13)
(6,23)
(6,37)
(7,-22514)
(7,-15986)
(7,-986)
(7,-526)
(7,-514)
(7,-498)
(7,-338)
(7,-256)
(7,-206)
(7,-146)
(7,-114)
(7,-94)
(7,-86)
(7,-74)
(7,-58)
(7,-50)
(7,-46)
(7,-41)
(7,-36)
(7,-34)
(7,-30)
(7,-26)
(7,-22)
(7,-19)
(7,-18)
(7,-16)
(7,16)
(7,18)
(7,19)
(7,22)
(7,26)
(7,30)
(7,34)
(7,36)
(7,41)
(7,46)
(7,50)
(7,58)
(7,74)
(7,86)
(7,94)
(7,114)
(7,146)
(7,206)
(7,256)
(7,338)
(7,498)
(7,514)
(7,526)
(7,986)
(7,15986)
(7,22514)
(8,-359)
(8,-259)
(8,-65)
(8,-61)
(8,-19)
(8,-17)
(8,17)
(8,19)
(8,61)
(8,65)
(8,259)
(8,359)
(9,-2482)
(9,-1390)
(9,-466)
(9,-238)
(9,-178)
(9,-158)
(9,-82)
(9,-62)
(9,-46)
(9,-38)
(9,-32)
(9,-26)
(9,-22)
(9,22)
(9,26)
(9,32)
(9,38)
(9,46)
(9,62)
(9,82)
(9,158)
(9,178)
(9,238)
(9,466)
(9,1390)
(9,2482)
(10,-101)
(10,-29)
(10,29)
(10,101)
(11,-12522)
(11,-3478)
(11,-2722)
(11,-1002)
(11,-778)
(11,-302)
(11,-278)
(11,-272)
(11,-218)
(11,-202)
(11,-122)
(11,-118)
(11,-106)
(11,-103)
(11,-86)
(11,-78)
(11,-76)
(11,-62)
(11,-58)
(11,-50)
(11,-42)
(11,-38)
(11,-34)
(11,-32)
(11,-28)
(11,-27)
(11,-26)
(11,-23)
(11,23)
(11,26)
(11,27)
(11,28)
(11,32)
(11,34)
(11,38)
(11,42)
(11,50)
(11,58)
(11,62)
(11,76)
(11,78)
(11,86)
(11,103)
(11,106)
(11,118)
(11,122)
(11,202)
(11,218)
(11,272)
(11,278)
(11,302)
(11,778)
(11,1002)
(11,2722)
(11,3478)
(11,12522)
(12,-101)
(12,-31)
(12,-25)
(12,25)
(12,31)
(12,101)
(14,-53)
(14,53)
(15,-226)
(15,-58)
(15,-34)
(15,34)
(15,58)
(15,226)
(16,-157)
(16,-67)
(16,-43)
(16,43)
(16,67)
(16,157)
(18,-85)
(18,-41)
(18,41)
(18,85)
(20,-41)
(20,41)
(21,-442)
(21,-86)
(21,-58)
(21,-46)
(21,46)
(21,58)
(21,86)
(21,442)
(24,-73)
(24,73)
(25,-9554)
(25,-2866)
(25,-974)
(25,-434)
(25,-302)
(25,-293)
(25,-274)
(25,-148)
(25,-146)
(25,-104)
(25,-94)
(25,-82)
(25,-78)
(25,-71)
(25,-62)
(25,-58)
(25,58)
(25,62)
(25,71)
(25,78)
(25,82)
(25,94)
(25,104)
(25,146)
(25,148)
(25,274)
(25,293)
(25,302)
(25,434)
(25,974)
(25,2866)
(25,9554)
(27,-2102)
(27,-446)
(27,-296)
(27,-254)
(27,-166)
(27,-142)
(27,-86)
(27,-74)
(27,-58)
(27,-56)
(27,56)
(27,58)
(27,74)
(27,86)
(27,142)
(27,166)
(27,254)
(27,296)
(27,446)
(27,2102)
(28,-65)
(28,65)
(30,-61)
(30,61)
(32,-3709)
(32,-211)
(32,-71)
(32,71)
(32,211)
(32,3709)
(33,-130)
(33,-94)
(33,-74)
(33,74)
(33,94)
(33,130)
(35,-5254)
(35,-326)
(35,-106)
(35,-92)
(35,-74)
(35,74)
(35,92)
(35,106)
(35,326)
(35,5254)
(44,-137)
(44,137)
(45,-218)
(45,-134)
(45,-106)
(45,106)
(45,134)
(45,218)
(49,-65438)
(49,-2402)
(49,-1198)
(49,-802)
(49,-386)
(49,-298)
(49,-226)
(49,-158)
(49,-152)
(49,-142)
(49,-122)
(49,-118)
(49,-102)
(49,-100)
(49,100)
(49,102)
(49,118)
(49,122)
(49,142)
(49,152)
(49,158)
(49,226)
(49,298)
(49,386)
(49,802)
(49,1198)
(49,2402)
(49,65438)
(55,-3026)
(55,-2158)
(55,-1262)
(55,-146)
(55,-142)
(55,-114)
(55,114)
(55,142)
(55,146)
(55,1262)
(55,2158)
(55,3026)
(56,-113)
(56,113)
(63,-226)
(63,-130)
(63,130)
(63,226)
(72,-199)
(72,199)
(75,-634)
(75,-158)
(75,158)
(75,634)
(77,-1126)
(77,-346)
(77,-170)
(77,-166)
(77,166)
(77,170)
(77,346)
(77,1126)
(80,-281)
(80,281)
(81,-5162)
(81,-2582)
(81,-862)
(81,-338)
(81,-322)
(81,-190)
(81,190)
(81,322)
(81,338)
(81,862)
(81,2582)
(81,5162)
(96,-1523)
(96,-193)
(96,193)
(96,1523)
(99,-9802)
(99,-698)
(99,-202)
(99,202)
(99,698)
(99,9802)
(105,-274)
(105,274)
(110,-221)
(110,221)
(121,-2258)
(121,-1522)
(121,-782)
(121,-542)
(121,-487)
(121,-458)
(121,-298)
(121,-270)
(121,-262)
(121,-258)
(121,-248)
(121,-244)
(121,244)
(121,248)
(121,258)
(121,262)
(121,270)
(121,298)
(121,458)
(121,487)
(121,542)
(121,782)
(121,1522)
(121,2258)
(125,-3638)
(125,-646)
(125,-506)
(125,-338)
(125,-278)
(125,-262)
(125,-254)
(125,254)
(125,262)
(125,278)
(125,338)
(125,506)
(125,646)
(125,3638)
(126,-373)
(126,373)
(128,-619)
(128,-311)
(128,-283)
(128,283)
(128,311)
(128,619)
(135,-754)
(135,754)
(144,-337)
(144,337)
(147,-806)
(147,806)
(154,-317)
(154,317)
(162,-3449)
(162,3449)
(175,-674)
(175,-354)
(175,354)
(175,674)
(176,-377)
(176,377)
(189,-422)
(189,422)
(216,-443)
(216,443)
(231,-562)
(231,562)
(243,-886)
(243,-794)
(243,-614)
(243,-514)
(243,-494)
(243,494)
(243,514)
(243,614)
(243,794)
(243,886)
(245,-2426)
(245,-534)
(245,534)
(245,2426)
(256,-517)
(256,517)
(275,-746)
(275,746)
(297,-1966)
(297,1966)
(324,-683)
(324,683)
(343,-3186)
(343,-1874)
(343,-814)
(343,-766)
(343,-722)
(343,-689)
(343,689)
(343,722)
(343,766)
(343,814)
(343,1874)
(343,3186)
(363,-2774)
(363,2774)
(512,-3211)
(512,-1649)
(512,1649)
(512,3211)
(539,-1082)
(539,1082)
(594,-1213)
(594,1213)
(600,-1201)
(600,1201)
(605,-1534)
(605,1534)
(625,-9442)
(625,-2622)
(625,-1412)
(625,1412)
(625,2622)
(625,9442)
(675,-1394)
(675,1394)
(729,-1678)
(729,1678)
(756,-1513)
(756,1513)
(847,-2194)
(847,2194)
(875,-1814)
(875,1814)
(891,-1802)
(891,1802)
(896,-16433)
(896,16433)
(1125,-35018)
(1125,35018)
(1323,-2678)
(1323,2678)
(1331,-41078)
(1331,-4198)
(1331,4198)
(1331,41078)
(2048,-5221)
(2048,5221)
(2187,-12566)
(2187,-4376)
(2187,4376)
(2187,12566)
(2401,-6133)
(2401,-5198)
(2401,5198)
(2401,6133)
(2450,-4901)
(2450,4901)
(3125,-8842)
(3125,-6294)
(3125,6294)
(3125,8842)
(3645,-7802)
(3645,7802)
(3993,-8014)
(3993,8014)
(5625,-11278)
(5625,11278)
(14641,-43618)
(14641,43618)
(16335,-32866)
(16335,32866)
#
# (a,b,c,d) = (0,1,4,0) and D = -16:
#
(-72900,14641)
(-65536,49)
(-65536,16335)
(-43740,1331)
(-39204,1)
(-37268,1125)
(-22528,7)
(-22528,5625)
(-18225,896)
(-17500,1)
(-16940,2187)
(-16000,7)
(-16000,3993)
(-15092,3125)
(-15092,3645)
(-12544,11)
(-12544,3125)
(-12100,1)
(-10935,2401)
(-10692,625)
(-10000,99)
(-10000,2401)
(-9801,2450)
(-9604,1)
(-9604,25)
(-9317,2048)
(-8750,2187)
(-6860,1331)
(-5500,3)
(-5324,35)
(-5324,81)
(-5324,1323)
(-4235,512)
(-4116,5)
(-3888,125)
(-3888,847)
(-3872,343)
(-3872,625)
(-3773,32)
(-3773,162)
(-3584,5)
(-3584,891)
(-3564,875)
(-3500,11)
(-3500,363)
(-3136,55)
(-3136,729)
(-3025,756)
(-2916,25)
(-2916,245)
(-2744,11)
(-2744,81)
(-2744,605)
(-2744,675)
(-2673,512)
(-2662,625)
(-2560,297)
(-2560,343)
(-2500,9)
(-2500,49)
(-2500,121)
(-2401,594)
(-2401,600)
(-2268,55)
(-2160,1)
(-2160,539)
(-2156,27)
(-1764,1)
(-1764,121)
(-1715,96)
(-1540,1)
(-1500,343)
(-1452,343)
(-1408,9)
(-1408,343)
(-1375,343)
(-1372,55)
(-1372,243)
(-1331,2)
(-1331,324)
(-1296,49)
(-1296,275)
(-1280,77)
(-1280,243)
(-1100,147)
(-1100,243)
(-1029,256)
(-1024,11)
(-1024,25)
(-1024,81)
(-1024,121)
(-1024,135)
(-1024,175)
(-1024,231)
(-1024,245)
(-1000,7)
(-1000,243)
(-980,3)
(-980,243)
(-972,1)
(-900,1)
(-900,49)
(-896,99)
(-896,125)
(-891,4)
(-875,128)
(-875,216)
(-800,11)
(-800,189)
(-784,75)
(-784,121)
(-756,125)
(-729,121)
(-729,176)
(-704,1)
(-704,175)
(-700,121)
(-625,126)
(-625,144)
(-625,154)
(-588,125)
(-567,128)
(-540,7)
(-540,121)
(-539,128)
(-528,7)
(-528,125)
(-512,3)
(-512,7)
(-512,121)
(-512,125)
(-504,1)
(-504,5)
(-504,121)
(-504,125)
(-500,27)
(-500,77)
(-500,81)
(-500,121)
(-490,1)
(-490,121)
(-486,121)
(-484,1)
(-484,9)
(-484,21)
(-484,25)
(-484,49)
(-484,81)
(-484,105)
(-441,80)
(-441,110)
(-400,1)
(-400,99)
(-396,1)
(-396,35)
(-396,49)
(-385,96)
(-375,8)
(-363,5)
(-352,7)
(-352,25)
(-352,63)
(-352,81)
(-350,27)
(-343,25)
(-343,72)
(-324,1)
(-324,11)
(-324,25)
(-324,49)
(-324,77)
(-320,3)
(-320,77)
(-308,5)
(-308,27)
(-308,45)
(-308,75)
(-300,11)
(-294,11)
(-275,8)
(-275,32)
(-270,7)
(-256,1)
(-256,9)
(-256,15)
(-256,49)
(-256,55)
(-256,63)
(-252,55)
(-250,49)
(-240,11)
(-240,49)
(-225,44)
(-225,56)
(-224,1)
(-224,11)
(-224,45)
(-224,55)
(-220,1)
(-220,7)
(-220,27)
(-220,49)
(-216,5)
(-216,49)
(-200,1)
(-200,49)
(-198,25)
(-198,49)
(-196,1)
(-196,5)
(-196,9)
(-196,25)
(-196,27)
(-196,33)
(-196,45)
(-189,16)
(-180,1)
(-176,9)
(-176,35)
(-162,35)
(-160,7)
(-160,33)
(-154,1)
(-154,25)
(-144,1)
(-144,11)
(-144,25)
(-144,35)
(-140,3)
(-140,11)
(-140,27)
(-140,33)
(-135,32)
(-132,1)
(-132,5)
(-132,25)
(-128,5)
(-128,7)
(-128,11)
(-128,21)
(-128,25)
(-128,27)
(-125,1)
(-125,11)
(-125,12)
(-121,4)
(-121,10)
(-121,18)
(-121,24)
(-121,25)
(-121,28)
(-121,30)
(-112,1)
(-112,3)
(-112,25)
(-112,27)
(-110,3)
(-110,27)
(-108,5)
(-108,7)
(-108,11)
(-108,25)
(-100,1)
(-100,3)
(-100,7)
(-100,9)
(-100,11)
(-100,21)
(-99,16)
(-98,11)
(-88,1)
(-88,7)
(-88,15)
(-88,21)
(-84,1)
(-84,5)
(-84,11)
(-81,1)
(-81,8)
(-81,14)
(-81,20)
(-80,9)
(-80,11)
(-77,8)
(-77,18)
(-75,16)
(-72,7)
(-72,11)
(-70,1)
(-64,1)
(-64,5)
(-64,7)
(-64,9)
(-64,11)
(-64,15)
(-63,2)
(-60,1)
(-60,7)
(-60,11)
(-56,3)
(-56,5)
(-56,9)
(-56,11)
(-55,7)
(-55,12)
(-54,1)
(-54,11)
(-50,7)
(-50,9)
(-50,11)
(-49,1)
(-49,4)
(-49,6)
(-49,10)
(-49,11)
(-49,12)
(-48,1)
(-48,5)
(-48,7)
(-48,11)
(-45,11)
(-44,1)
(-44,3)
(-44,5)
(-44,7)
(-44,9)
(-42,5)
(-40,1)
(-40,3)
(-40,7)
(-40,9)
(-36,1)
(-36,5)
(-36,7)
(-35,2)
(-35,6)
(-35,8)
(-33,2)
(-33,7)
(-33,8)
(-32,1)
(-32,3)
(-32,5)
(-32,7)
(-30,7)
(-28,1)
(-28,3)
(-28,5)
(-27,4)
(-27,5)
(-25,1)
(-25,4)
(-25,6)
(-24,1)
(-24,5)
(-22,1)
(-22,3)
(-22,5)
(-21,4)
(-21,5)
(-20,1)
(-20,3)
(-18,1)
(-16,1)
(-16,3)
(-15,1)
(-15,2)
(-14,1)
(-14,3)
(-12,1)
(-11,1)
(-11,2)
(-10,1)
(-9,1)
(-9,2)
(-8,1)
(-7,1)
(-6,1)
(-5,1)
(1,-135)
(1,-44)
(1,-25)
(1,-16)
(1,-14)
(1,-9)
(1,-7)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,5)
(1,6)
(1,8)
(1,11)
(1,12)
(1,20)
(1,30)
(1,56)
(1,96)
(1,110)
(1,600)
(1,756)
(1,2450)
(2,-63)
(2,-25)
(2,-11)
(2,-5)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,5)
(2,7)
(2,27)
(2,49)
(2,121)
(2,2187)
(3,-32)
(3,-20)
(3,-7)
(3,-2)
(3,-1)
(3,1)
(3,2)
(3,8)
(3,343)
(4,-9801)
(4,-4375)
(4,-3025)
(4,-2401)
(4,-441)
(4,-385)
(4,-243)
(4,-225)
(4,-121)
(4,-99)
(4,-81)
(4,-55)
(4,-49)
(4,-45)
(4,-33)
(4,-25)
(4,-21)
(4,-15)
(4,-11)
(4,-9)
(4,-7)
(4,-5)
(4,-3)
(4,1)
(4,3)
(4,5)
(4,7)
(4,9)
(4,11)
(4,15)
(4,21)
(4,27)
(4,35)
(4,49)
(4,55)
(4,63)
(4,99)
(4,125)
(4,175)
(4,539)
(5,-224)
(5,-8)
(5,-4)
(5,-3)
(5,-2)
(5,1)
(5,4)
(5,7)
(5,11)
(5,18)
(5,256)
(6,-7)
(6,-5)
(6,1)
(6,11)
(6,121)
(7,-1408)
(7,-1000)
(7,-33)
(7,-32)
(7,-22)
(7,-10)
(7,-8)
(7,-4)
(7,-3)
(7,-2)
(7,1)
(7,2)
(7,5)
(7,12)
(7,32)
(8,-245)
(8,-77)
(8,-35)
(8,-27)
(8,-11)
(8,-9)
(8,-7)
(8,-5)
(8,-3)
(8,1)
(8,3)
(8,5)
(8,7)
(8,9)
(8,25)
(8,33)
(8,75)
(8,243)
(9,-88)
(9,-16)
(9,-11)
(9,-5)
(9,-4)
(9,4)
(9,10)
(9,28)
(9,154)
(10,-63)
(10,-27)
(10,-7)
(10,-3)
(10,1)
(10,3)
(10,11)
(11,-784)
(11,-64)
(11,-50)
(11,-15)
(11,-14)
(11,-9)
(11,-8)
(11,-5)
(11,-4)
(11,-3)
(11,1)
(11,4)
(11,6)
(11,16)
(11,216)
(12,-1375)
(12,-245)
(12,-35)
(12,-25)
(12,-11)
(12,-7)
(12,-5)
(12,1)
(12,5)
(12,7)
(12,11)
(12,25)
(12,77)
(12,125)
(14,-125)
(14,-11)
(14,-9)
(14,-5)
(14,1)
(14,9)
(15,-16)
(15,-4)
(16,-125)
(16,-81)
(16,-49)
(16,-25)
(16,-15)
(16,-11)
(16,-9)
(16,-7)
(16,-5)
(16,1)
(16,3)
(16,5)
(16,7)
(16,11)
(16,21)
(16,45)
(16,77)
(16,121)
(18,-7)
(18,-5)
(18,1)
(20,-1029)
(20,-77)
(20,-49)
(20,-33)
(20,-27)
(20,-21)
(20,-11)
(20,-9)
(20,-7)
(20,1)
(20,3)
(20,7)
(20,9)
(20,11)
(20,27)
(20,49)
(20,121)
(20,891)
(21,-8)
(21,1)
(21,25)
(22,-343)
(22,-9)
(22,-7)
(22,5)
(22,7)
(22,35)
(24,-55)
(24,-11)
(24,-7)
(24,1)
(24,5)
(24,49)
(25,-64)
(25,-22)
(25,-9)
(25,-8)
(25,-7)
(25,2)
(25,6)
(25,14)
(25,24)
(25,176)
(25,594)
(27,-8)
(27,-7)
(27,2)
(27,7)
(27,128)
(28,-135)
(28,-55)
(28,-27)
(28,-25)
(28,-15)
(28,-11)
(28,-9)
(28,1)
(28,3)
(28,5)
(28,9)
(28,11)
(28,15)
(28,25)
(28,33)
(28,81)
(28,121)
(28,125)
(28,243)
(28,3993)
(28,5625)
(30,-11)
(32,-1331)
(32,-63)
(32,-35)
(32,-33)
(32,-15)
(32,-11)
(32,-9)
(32,1)
(32,3)
(32,7)
(32,25)
(32,27)
(32,55)
(32,1323)
(33,-10)
(33,4)
(35,-11)
(35,-9)
(35,16)
(35,324)
(36,-625)
(36,-121)
(36,-49)
(36,-25)
(36,-11)
(36,1)
(36,5)
(36,7)
(36,11)
(36,35)
(36,55)
(36,343)
(40,-21)
(40,-11)
(40,1)
(40,11)
(42,-11)
(44,-875)
(44,-81)
(44,-75)
(44,-35)
(44,-27)
(44,-25)
(44,-21)
(44,-15)
(44,1)
(44,3)
(44,5)
(44,7)
(44,9)
(44,21)
(44,25)
(44,45)
(44,49)
(44,189)
(44,245)
(44,675)
(44,3125)
(45,-14)
(45,1)
(45,8)
(49,-4096)
(49,-81)
(49,-16)
(49,-15)
(49,8)
(49,18)
(49,44)
(49,144)
(50,1)
(54,11)
(54,25)
(54,49)
(55,-196)
(55,-16)
(55,-14)
(55,2)
(55,72)
(55,128)
(56,-135)
(56,-25)
(56,-15)
(56,1)
(56,11)
(56,121)
(60,1)
(60,7)
(60,49)
(63,-22)
(63,-16)
(64,-891)
(64,-121)
(64,-49)
(64,-27)
(64,-25)
(64,-21)
(64,5)
(64,9)
(64,11)
(64,33)
(64,105)
(64,875)
(66,1)
(72,-25)
(72,7)
(75,-49)
(77,-80)
(77,-20)
(77,1)
(77,12)
(80,-363)
(80,-27)
(80,-21)
(80,1)
(80,7)
(80,343)
(81,-64)
(81,-22)
(81,10)
(81,11)
(84,-121)
(84,-25)
(84,1)
(84,11)
(88,-147)
(88,-49)
(88,-27)
(88,-25)
(88,3)
(88,5)
(88,27)
(88,125)
(96,-49)
(96,-35)
(96,-25)
(96,1)
(96,11)
(96,25)
(98,-27)
(98,-25)
(98,3)
(98,25)
(99,-625)
(99,-56)
(99,-25)
(100,-2401)
(100,-729)
(100,-121)
(100,-81)
(100,-49)
(100,-33)
(100,-27)
(100,3)
(100,7)
(100,11)
(100,63)
(100,231)
(105,4)
(108,-539)
(108,-125)
(108,-77)
(108,-55)
(108,-49)
(108,-35)
(108,1)
(108,5)
(112,-55)
(112,-33)
(112,5)
(112,27)
(121,-64)
(121,-49)
(121,-32)
(121,1)
(121,80)
(121,126)
(125,-243)
(125,-56)
(125,-33)
(125,-32)
(125,16)
(128,-375)
(128,-275)
(128,-81)
(128,-77)
(128,-35)
(128,-33)
(128,1)
(128,3)
(128,45)
(128,49)
(128,243)
(128,343)
(132,-49)
(132,-35)
(132,7)
(135,-64)
(140,-1331)
(140,-99)
(140,1)
(140,9)
(147,32)
(150,1)
(160,-121)
(160,-49)
(160,9)
(160,81)
(162,-343)
(162,625)
(175,-64)
(175,-44)
(176,-125)
(176,-49)
(176,-45)
(176,1)
(176,5)
(176,81)
(180,-77)
(180,-49)
(180,11)
(189,-50)
(192,-125)
(192,-55)
(192,-49)
(192,1)
(192,7)
(192,77)
(196,-625)
(196,-225)
(196,-121)
(196,-99)
(196,-81)
(196,-55)
(196,1)
(196,5)
(196,11)
(196,15)
(196,275)
(196,16335)
(200,-99)
(200,-77)
(200,27)
(200,49)
(216,-175)
(216,-55)
(216,1)
(216,121)
(220,-567)
(220,-343)
(220,-63)
(220,1)
(220,9)
(220,729)
(224,-81)
(224,25)
(231,-64)
(242,-63)
(242,7)
(242,27)
(243,-80)
(243,8)
(243,25)
(245,-64)
(245,121)
(250,-63)
(250,11)
(252,1)
(252,25)
(256,-189)
(256,-99)
(256,-75)
(256,11)
(256,35)
(256,125)
(275,-81)
(280,-81)
(280,11)
(288,-121)
(288,-77)
(288,5)
(288,49)
(297,-160)
(300,-77)
(300,121)
(308,-125)
(308,-81)
(308,3)
(308,243)
(320,-81)
(320,1)
(324,-1331)
(324,-125)
(324,-121)
(324,7)
(324,175)
(324,605)
(343,-242)
(343,-160)
(343,-88)
(343,5)
(343,8)
(363,128)
(384,-121)
(384,25)
(392,-125)
(392,-99)
(392,1)
(392,27)
(396,1)
(396,125)
(396,2401)
(400,-343)
(400,-121)
(400,21)
(400,243)
(420,-121)
(448,-121)
(448,9)
(480,-121)
(480,1)
(484,-625)
(484,-441)
(484,-175)
(484,-135)
(484,-125)
(484,5)
(484,7)
(484,75)
(484,135)
(486,-125)
(486,1)
(500,-189)
(500,-147)
(500,1)
(500,3)
(500,7)
(500,99)
(500,847)
(512,-3773)
(512,-275)
(512,-135)
(512,7)
(512,147)
(512,3645)
(539,-135)
(540,121)
(588,-275)
(625,-242)
(625,512)
(700,1)
(700,81)
(704,-225)
(704,49)
(729,-196)
(756,11)
(847,-243)
(875,4)
(891,-224)
(896,-225)
(896,1)
(924,25)
(968,-245)
(968,-243)
(968,1)
(968,3)
(972,-343)
(972,-275)
(972,-245)
(972,7)
(972,77)
(980,-729)
(980,11)
(1100,49)
(1125,2048)
(1152,-343)
(1152,55)
(1188,343)
(1210,-343)
(1280,-441)
(1280,121)
(1323,2)
(1331,96)
(1331,2401)
(1350,-343)
(1372,-375)
(1372,-363)
(1372,9)
(1372,297)
(1372,625)
(1452,-875)
(1536,-1715)
(1536,-385)
(1536,1)
(1536,1331)
(1760,-441)
(1760,1)
(1936,-729)
(1936,245)
(2016,-625)
(2016,121)
(2048,-875)
(2048,-567)
(2048,-539)
(2048,27)
(2048,55)
(2048,363)
(2156,1)
(2187,512)
(2304,-625)
(2304,49)
(2401,-625)
(2420,81)
(2464,-625)
(2464,9)
(2500,-2673)
(2500,343)
(2592,-3773)
(2592,3125)
(2700,11)
(2816,-729)
(2816,25)
(2916,55)
(3125,-784)
(3125,162)
(3388,125)
(3456,-875)
(3456,11)
(3500,-891)
(3564,5)
(3645,32)
(3993,-1000)
(4096,-1029)
(4096,5)
(4500,-9317)
(5000,-1331)
(5000,81)
(5184,-1331)
(5184,35)
(5292,-1331)
(5324,-10935)
(5324,-1715)
(5488,-1375)
(5488,3)
(5625,-1408)
(8192,-4235)
(8192,-2673)
(8192,625)
(8192,2187)
(8748,-4235)
(9504,-2401)
(9504,25)
(9600,-2401)
(9600,1)
(9604,99)
(12096,-3025)
(12096,1)
(12500,-3773)
(12500,11)
(14336,-18225)
(14336,14641)
(14580,-3773)
(14641,896)
(15972,7)
(16335,-4096)
(17496,-4375)
(17496,1)
(22500,7)
(32768,-9317)
(32768,1125)
(38416,-10935)
(38416,1331)
(39200,-9801)
(39200,1)
(58564,-18225)
(65340,49)
#
# (a,b,c,d) = (0,2,2,0) and D = -16:
#
(-18225,3584)
(-18225,14641)
(-16384,49)
(-16384,16335)
(-10935,1331)
(-10935,9604)
(-9801,1)
(-9801,9800)
(-9317,1125)
(-9317,8192)
(-5632,7)
(-5632,5625)
(-4375,1)
(-4375,4374)
(-4235,2048)
(-4235,2187)
(-4000,7)
(-4000,3993)
(-3773,128)
(-3773,648)
(-3773,3125)
(-3773,3645)
(-3136,11)
(-3136,3125)
(-3025,1)
(-3025,3024)
(-2673,625)
(-2673,2048)
(-2500,99)
(-2500,2401)
(-2401,1)
(-2401,25)
(-2401,2376)
(-2401,2400)
(-1715,384)
(-1715,1331)
(-1375,3)
(-1375,1372)
(-1331,8)
(-1331,35)
(-1331,81)
(-1331,1250)
(-1331,1296)
(-1331,1323)
(-1029,5)
(-1029,1024)
(-972,125)
(-972,847)
(-968,343)
(-968,625)
(-896,5)
(-896,891)
(-891,16)
(-891,875)
(-875,11)
(-875,363)
(-875,512)
(-875,864)
(-784,55)
(-784,729)
(-729,25)
(-729,245)
(-729,484)
(-729,704)
(-686,11)
(-686,81)
(-686,605)
(-686,675)
(-640,297)
(-640,343)
(-625,9)
(-625,49)
(-625,121)
(-625,504)
(-625,576)
(-625,616)
(-567,55)
(-567,512)
(-540,1)
(-540,539)
(-539,27)
(-539,512)
(-441,1)
(-441,121)
(-441,320)
(-441,440)
(-385,1)
(-385,384)
(-375,32)
(-375,343)
(-363,20)
(-363,343)
(-352,9)
(-352,343)
(-343,55)
(-343,100)
(-343,243)
(-343,288)
(-324,49)
(-324,275)
(-320,77)
(-320,243)
(-275,32)
(-275,128)
(-275,147)
(-275,243)
(-256,11)
(-256,25)
(-256,81)
(-256,121)
(-256,135)
(-256,175)
(-256,231)
(-256,245)
(-250,7)
(-250,243)
(-245,2)
(-245,3)
(-245,242)
(-245,243)
(-243,1)
(-243,242)
(-225,1)
(-225,49)
(-225,176)
(-225,224)
(-224,99)
(-224,125)
(-200,11)
(-200,189)
(-196,75)
(-196,121)
(-189,64)
(-189,125)
(-176,1)
(-176,175)
(-175,54)
(-175,121)
(-147,22)
(-147,125)
(-135,7)
(-135,14)
(-135,121)
(-135,128)
(-132,7)
(-132,125)
(-128,3)
(-128,7)
(-128,121)
(-128,125)
(-126,1)
(-126,5)
(-126,121)
(-126,125)
(-125,4)
(-125,27)
(-125,44)
(-125,48)
(-125,77)
(-125,81)
(-125,98)
(-125,121)
(-121,1)
(-121,9)
(-121,16)
(-121,21)
(-121,25)
(-121,40)
(-121,49)
(-121,72)
(-121,81)
(-121,96)
(-121,100)
(-121,105)
(-121,112)
(-121,120)
(-100,1)
(-100,99)
(-99,1)
(-99,35)
(-99,49)
(-99,50)
(-99,64)
(-99,98)
(-88,7)
(-88,25)
(-88,63)
(-88,81)
(-81,1)
(-81,4)
(-81,11)
(-81,25)
(-81,32)
(-81,49)
(-81,56)
(-81,70)
(-81,77)
(-81,80)
(-80,3)
(-80,77)
(-77,2)
(-77,5)
(-77,27)
(-77,32)
(-77,45)
(-77,50)
(-77,72)
(-77,75)
(-75,11)
(-75,64)
(-64,1)
(-64,9)
(-64,15)
(-64,49)
(-64,55)
(-64,63)
(-63,8)
(-63,55)
(-60,11)
(-60,49)
(-56,1)
(-56,11)
(-56,45)
(-56,55)
(-55,1)
(-55,6)
(-55,7)
(-55,27)
(-55,28)
(-55,48)
(-55,49)
(-55,54)
(-54,5)
(-54,49)
(-50,1)
(-50,49)
(-49,1)
(-49,4)
(-49,5)
(-49,9)
(-49,16)
(-49,22)
(-49,24)
(-49,25)
(-49,27)
(-49,33)
(-49,40)
(-49,44)
(-49,45)
(-49,48)
(-45,1)
(-45,44)
(-44,9)
(-44,35)
(-40,7)
(-40,33)
(-36,1)
(-36,11)
(-36,25)
(-36,35)
(-35,2)
(-35,3)
(-35,8)
(-35,11)
(-35,24)
(-35,27)
(-35,32)
(-35,33)
(-33,1)
(-33,5)
(-33,8)
(-33,25)
(-33,28)
(-33,32)
(-32,5)
(-32,7)
(-32,11)
(-32,21)
(-32,25)
(-32,27)
(-28,1)
(-28,3)
(-28,25)
(-28,27)
(-27,2)
(-27,5)
(-27,7)
(-27,11)
(-27,16)
(-27,20)
(-27,22)
(-27,25)
(-25,1)
(-25,3)
(-25,4)
(-25,7)
(-25,9)
(-25,11)
(-25,14)
(-25,16)
(-25,18)
(-25,21)
(-25,22)
(-25,24)
(-22,1)
(-22,7)
(-22,15)
(-22,21)
(-21,1)
(-21,5)
(-21,10)
(-21,11)
(-21,16)
(-21,20)
(-20,9)
(-20,11)
(-18,7)
(-18,11)
(-16,1)
(-16,5)
(-16,7)
(-16,9)
(-16,11)
(-16,15)
(-15,1)
(-15,4)
(-15,7)
(-15,8)
(-15,11)
(-15,14)
(-14,3)
(-14,5)
(-14,9)
(-14,11)
(-12,1)
(-12,5)
(-12,7)
(-12,11)
(-11,1)
(-11,2)
(-11,3)
(-11,4)
(-11,5)
(-11,6)
(-11,7)
(-11,8)
(-11,9)
(-11,10)
(-10,1)
(-10,3)
(-10,7)
(-10,9)
(-9,1)
(-9,2)
(-9,4)
(-9,5)
(-9,7)
(-9,8)
(-8,1)
(-8,3)
(-8,5)
(-8,7)
(-7,1)
(-7,2)
(-7,3)
(-7,4)
(-7,5)
(-7,6)
(-6,1)
(-6,5)
(-5,1)
(-5,2)
(-5,3)
(-5,4)
(-4,1)
(-4,3)
(-3,1)
(-3,2)
(-2,1)
(1,-9801)
(1,-4375)
(1,-3025)
(1,-2401)
(1,-540)
(1,-441)
(1,-385)
(1,-243)
(1,-225)
(1,-176)
(1,-126)
(1,-121)
(1,-100)
(1,-99)
(1,-81)
(1,-64)
(1,-56)
(1,-55)
(1,-50)
(1,-49)
(1,-45)
(1,-36)
(1,-33)
(1,-28)
(1,-25)
(1,-22)
(1,-21)
(1,-16)
(1,-15)
(1,-12)
(1,-11)
(1,-10)
(1,-9)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,1)
(1,2)
(1,3)
(1,4)
(1,5)
(1,6)
(1,7)
(1,8)
(1,9)
(1,10)
(1,11)
(1,14)
(1,15)
(1,20)
(1,21)
(1,24)
(1,27)
(1,32)
(1,35)
(1,44)
(1,48)
(1,49)
(1,54)
(1,55)
(1,63)
(1,80)
(1,98)
(1,99)
(1,120)
(1,125)
(1,175)
(1,224)
(1,242)
(1,384)
(1,440)
(1,539)
(1,2400)
(1,3024)
(1,4374)
(1,9800)
(2,-245)
(2,-77)
(2,-35)
(2,-27)
(2,-11)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,5)
(2,7)
(2,9)
(2,25)
(2,33)
(2,75)
(2,243)
(3,-1375)
(3,-245)
(3,-128)
(3,-80)
(3,-35)
(3,-28)
(3,-25)
(3,-14)
(3,-11)
(3,-10)
(3,-8)
(3,-7)
(3,-5)
(3,-4)
(3,1)
(3,2)
(3,4)
(3,5)
(3,7)
(3,8)
(3,11)
(3,22)
(3,25)
(3,32)
(3,77)
(3,125)
(3,242)
(3,1372)
(4,-125)
(4,-81)
(4,-49)
(4,-25)
(4,-15)
(4,-11)
(4,-9)
(4,-7)
(4,-5)
(4,1)
(4,3)
(4,5)
(4,7)
(4,11)
(4,21)
(4,45)
(4,77)
(4,121)
(5,-1029)
(5,-896)
(5,-126)
(5,-77)
(5,-54)
(5,-49)
(5,-33)
(5,-32)
(5,-27)
(5,-21)
(5,-16)
(5,-14)
(5,-12)
(5,-11)
(5,-9)
(5,-8)
(5,-7)
(5,-6)
(5,1)
(5,2)
(5,3)
(5,4)
(5,6)
(5,7)
(5,9)
(5,11)
(5,16)
(5,22)
(5,27)
(5,28)
(5,44)
(5,49)
(5,72)
(5,121)
(5,891)
(5,1024)
(6,-55)
(6,-11)
(6,-7)
(6,1)
(6,5)
(6,49)
(7,-5632)
(7,-4000)
(7,-250)
(7,-135)
(7,-132)
(7,-128)
(7,-88)
(7,-55)
(7,-40)
(7,-32)
(7,-27)
(7,-25)
(7,-22)
(7,-18)
(7,-16)
(7,-15)
(7,-12)
(7,-11)
(7,-10)
(7,-9)
(7,-8)
(7,1)
(7,2)
(7,3)
(7,4)
(7,5)
(7,8)
(7,9)
(7,11)
(7,15)
(7,18)
(7,20)
(7,25)
(7,33)
(7,48)
(7,81)
(7,121)
(7,125)
(7,128)
(7,243)
(7,3993)
(7,5625)
(8,-1331)
(8,-63)
(8,-35)
(8,-33)
(8,-15)
(8,-11)
(8,-9)
(8,1)
(8,3)
(8,7)
(8,25)
(8,27)
(8,55)
(8,1323)
(9,-625)
(9,-352)
(9,-121)
(9,-64)
(9,-49)
(9,-44)
(9,-25)
(9,-20)
(9,-16)
(9,-14)
(9,-11)
(9,-10)
(9,1)
(9,2)
(9,5)
(9,7)
(9,11)
(9,16)
(9,35)
(9,40)
(9,55)
(9,112)
(9,343)
(9,616)
(10,-21)
(10,-11)
(10,1)
(10,11)
(11,-3136)
(11,-875)
(11,-686)
(11,-256)
(11,-200)
(11,-81)
(11,-75)
(11,-60)
(11,-56)
(11,-36)
(11,-35)
(11,-32)
(11,-27)
(11,-25)
(11,-21)
(11,-20)
(11,-18)
(11,-16)
(11,-15)
(11,-14)
(11,-12)
(11,1)
(11,3)
(11,4)
(11,5)
(11,7)
(11,9)
(11,10)
(11,14)
(11,16)
(11,21)
(11,24)
(11,25)
(11,45)
(11,49)
(11,64)
(11,70)
(11,189)
(11,245)
(11,675)
(11,864)
(11,3125)
(14,-135)
(14,-25)
(14,-15)
(14,1)
(14,11)
(14,121)
(15,-64)
(15,-22)
(15,-16)
(15,1)
(15,7)
(15,49)
(16,-891)
(16,-121)
(16,-49)
(16,-27)
(16,-25)
(16,-21)
(16,5)
(16,9)
(16,11)
(16,33)
(16,105)
(16,875)
(18,-25)
(18,7)
(20,-363)
(20,-27)
(20,-21)
(20,1)
(20,7)
(20,343)
(21,-121)
(21,-32)
(21,-25)
(21,-22)
(21,1)
(21,4)
(21,11)
(21,100)
(22,-147)
(22,-49)
(22,-27)
(22,-25)
(22,3)
(22,5)
(22,27)
(22,125)
(24,-49)
(24,-35)
(24,-25)
(24,1)
(24,11)
(24,25)
(25,-2401)
(25,-729)
(25,-256)
(25,-121)
(25,-88)
(25,-81)
(25,-49)
(25,-36)
(25,-33)
(25,-32)
(25,-28)
(25,-27)
(25,2)
(25,3)
(25,7)
(25,8)
(25,11)
(25,24)
(25,56)
(25,63)
(25,96)
(25,231)
(25,704)
(25,2376)
(27,-539)
(27,-125)
(27,-77)
(27,-55)
(27,-49)
(27,-35)
(27,-32)
(27,-28)
(27,1)
(27,5)
(27,8)
(27,22)
(27,28)
(27,50)
(27,98)
(27,512)
(28,-55)
(28,-33)
(28,5)
(28,27)
(32,-375)
(32,-275)
(32,-81)
(32,-77)
(32,-35)
(32,-33)
(32,1)
(32,3)
(32,45)
(32,49)
(32,243)
(32,343)
(33,-49)
(33,-40)
(33,-35)
(33,2)
(33,7)
(33,16)
(35,-1331)
(35,-99)
(35,-44)
(35,-36)
(35,1)
(35,9)
(35,64)
(35,1296)
(40,-121)
(40,-49)
(40,9)
(40,81)
(44,-125)
(44,-49)
(44,-45)
(44,1)
(44,5)
(44,81)
(45,-77)
(45,-56)
(45,-49)
(45,4)
(45,11)
(45,32)
(48,-125)
(48,-55)
(48,-49)
(48,1)
(48,7)
(48,77)
(49,-16384)
(49,-625)
(49,-324)
(49,-225)
(49,-121)
(49,-99)
(49,-81)
(49,-64)
(49,-60)
(49,-55)
(49,-54)
(49,-50)
(49,1)
(49,5)
(49,6)
(49,11)
(49,15)
(49,32)
(49,50)
(49,72)
(49,176)
(49,275)
(49,576)
(49,16335)
(50,-99)
(50,-77)
(50,27)
(50,49)
(54,-175)
(54,-55)
(54,1)
(54,121)
(55,-784)
(55,-567)
(55,-343)
(55,-64)
(55,-63)
(55,-56)
(55,1)
(55,8)
(55,9)
(55,288)
(55,512)
(55,729)
(56,-81)
(56,25)
(63,-88)
(63,-64)
(63,1)
(63,25)
(64,-189)
(64,-99)
(64,-75)
(64,11)
(64,35)
(64,125)
(70,-81)
(70,11)
(72,-121)
(72,-77)
(72,5)
(72,49)
(75,-196)
(75,-77)
(75,2)
(75,121)
(77,-320)
(77,-125)
(77,-81)
(77,-80)
(77,3)
(77,4)
(77,48)
(77,243)
(80,-81)
(80,1)
(81,-1331)
(81,-686)
(81,-256)
(81,-125)
(81,-121)
(81,-88)
(81,7)
(81,40)
(81,44)
(81,175)
(81,605)
(81,1250)
(96,-121)
(96,25)
(98,-125)
(98,-99)
(98,1)
(98,27)
(99,-2500)
(99,-224)
(99,-100)
(99,1)
(99,125)
(99,2401)
(100,-343)
(100,-121)
(100,21)
(100,243)
(105,-121)
(105,16)
(112,-121)
(112,9)
(120,-121)
(120,1)
(121,-625)
(121,-441)
(121,-256)
(121,-196)
(121,-175)
(121,-135)
(121,-128)
(121,-126)
(121,-125)
(121,4)
(121,5)
(121,7)
(121,14)
(121,54)
(121,75)
(121,135)
(121,320)
(121,504)
(125,-972)
(125,-224)
(125,-189)
(125,-147)
(125,-132)
(125,-128)
(125,-126)
(125,1)
(125,3)
(125,7)
(125,22)
(125,64)
(125,99)
(125,847)
(128,-3773)
(128,-275)
(128,-135)
(128,7)
(128,147)
(128,3645)
(135,-256)
(135,121)
(147,-275)
(147,128)
(175,-256)
(175,-176)
(175,1)
(175,81)
(176,-225)
(176,49)
(189,-200)
(189,11)
(224,-225)
(224,1)
(231,-256)
(231,25)
(242,-245)
(242,-243)
(242,1)
(242,3)
(243,-343)
(243,-320)
(243,-275)
(243,-250)
(243,-245)
(243,2)
(243,7)
(243,32)
(243,77)
(243,100)
(245,-729)
(245,-256)
(245,11)
(245,484)
(275,-324)
(275,49)
(288,-343)
(288,55)
(297,-640)
(297,343)
(320,-441)
(320,121)
(343,-968)
(343,-640)
(343,-375)
(343,-363)
(343,-352)
(343,9)
(343,20)
(343,32)
(343,297)
(343,625)
(363,-875)
(363,512)
(384,-1715)
(384,-385)
(384,1)
(384,1331)
(440,-441)
(440,1)
(484,-729)
(484,245)
(504,-625)
(504,121)
(512,-875)
(512,-567)
(512,-539)
(512,27)
(512,55)
(512,363)
(539,-540)
(539,1)
(576,-625)
(576,49)
(605,-686)
(605,81)
(616,-625)
(616,9)
(625,-2673)
(625,-968)
(625,343)
(625,2048)
(648,-3773)
(648,3125)
(675,-686)
(675,11)
(704,-729)
(704,25)
(729,-784)
(729,55)
(847,-972)
(847,125)
(864,-875)
(864,11)
(875,-891)
(875,16)
(891,-896)
(891,5)
(1024,-1029)
(1024,5)
(1125,-9317)
(1125,8192)
(1250,-1331)
(1250,81)
(1296,-1331)
(1296,35)
(1323,-1331)
(1323,8)
(1331,-10935)
(1331,-1715)
(1331,384)
(1331,9604)
(1372,-1375)
(1372,3)
(2048,-4235)
(2048,-2673)
(2048,625)
(2048,2187)
(2187,-4235)
(2187,2048)
(2376,-2401)
(2376,25)
(2400,-2401)
(2400,1)
(2401,-2500)
(2401,99)
(3024,-3025)
(3024,1)
(3125,-3773)
(3125,-3136)
(3125,11)
(3125,648)
(3584,-18225)
(3584,14641)
(3645,-3773)
(3645,128)
(3993,-4000)
(3993,7)
(4374,-4375)
(4374,1)
(5625,-5632)
(5625,7)
(8192,-9317)
(8192,1125)
(9604,-10935)
(9604,1331)
(9800,-9801)
(9800,1)
(14641,-18225)
(14641,3584)
(16335,-16384)
(16335,49)
#
# (a,b,c,d) = (-3,1,1,0) and D = -13:
#
(-196,-255)
(-196,451)
(-50,-61)
(-50,111)
(-28,-5)
(-28,33)
(-10,-13)
(-10,23)
(-7,-9)
(-7,-8)
(-7,15)
(-7,16)
(-5,-6)
(-5,2)
(-5,3)
(-5,11)
(-4,-5)
(-4,-3)
(-4,7)
(-4,9)
(-2,-1)
(-2,3)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(1,-6)
(1,-4)
(1,-3)
(1,2)
(1,3)
(1,5)
(2,-17)
(2,-5)
(2,3)
(2,15)
(3,-7)
(3,4)
(5,-84)
(5,-12)
(5,7)
(5,79)
(7,-19)
(7,12)
(8,-21)
(8,13)
(11,-39)
(11,-26)
(11,15)
(11,28)
(16,-37)
(16,21)
(22,-51)
(22,29)
(33,-76)
(33,43)
(40,-97)
(40,57)
(56,-129)
(56,73)
(64,-301)
(64,237)
(175,-403)
(175,228)
(360,-829)
(360,469)
(1331,-3065)
(1331,1734)
(1760,-4053)
(1760,2293)
(6160,-14209)
(6160,8049)
#
# (a,b,c,d) = (-3,0,1,0) and D = -12:
#
(-250,-433)
(-250,433)
(-225,-388)
(-225,388)
(-175,-303)
(-175,303)
(-30,-37)
(-30,37)
(-18,-31)
(-18,31)
(-14,-15)
(-14,15)
(-11,-19)
(-11,19)
(-10,-17)
(-10,17)
(-9,-1)
(-9,1)
(-7,-12)
(-7,-9)
(-7,9)
(-7,12)
(-5,-8)
(-5,-3)
(-5,3)
(-5,8)
(-3,-5)
(-3,-4)
(-3,4)
(-3,5)
(-2,-3)
(-2,-1)
(-2,1)
(-2,3)
(-1,-1)
(-1,0)
(-1,1)
(1,-27)
(1,-6)
(1,-5)
(1,-3)
(1,-2)
(1,2)
(1,3)
(1,5)
(1,6)
(1,27)
(3,-7)
(3,7)
(4,-13)
(4,-9)
(4,-7)
(4,7)
(4,9)
(4,13)
(5,-14)
(5,-9)
(5,9)
(5,14)
(7,-53)
(7,-13)
(7,13)
(7,53)
(8,-15)
(8,15)
(9,-122)
(9,122)
(15,-26)
(15,26)
(16,-69)
(16,69)
(21,-38)
(21,38)
(24,-43)
(24,43)
(25,-51)
(25,51)
(27,-47)
(27,47)
(49,-85)
(49,85)
(56,-97)
(56,97)
(64,-111)
(64,111)
(80,-139)
(80,139)
(140,-271)
(140,271)
#
# (a,b,c,d) = (0,1,3,0) and D = -9:
#
(-54675,3584)
(-54675,14641)
(-49152,49)
(-32805,1331)
(-32805,9604)
(-29403,1)
(-29403,9800)
(-27951,8192)
(-16896,7)
(-16384,5445)
(-13125,1)
(-12705,2048)
(-12000,7)
(-11319,128)
(-11319,3125)
(-9408,11)
(-9408,3125)
(-9317,375)
(-9075,1)
(-8019,625)
(-8019,2048)
(-7500,2401)
(-7203,1)
(-7203,25)
(-5632,1875)
(-5145,1331)
(-4375,1458)
(-4235,729)
(-4125,1372)
(-4000,1331)
(-3993,8)
(-3993,35)
(-3993,1250)
(-3773,216)
(-3773,1215)
(-3087,5)
(-3087,1024)
(-3025,1008)
(-2916,125)
(-2916,847)
(-2904,343)
(-2904,625)
(-2688,5)
(-2673,16)
(-2673,875)
(-2625,11)
(-2625,512)
(-2500,33)
(-2401,792)
(-2401,800)
(-2352,55)
(-2187,25)
(-2187,245)
(-2187,484)
(-2187,704)
(-2058,11)
(-2058,605)
(-1920,343)
(-1875,49)
(-1875,121)
(-1875,616)
(-1715,128)
(-1701,55)
(-1701,512)
(-1620,1)
(-1620,539)
(-1617,512)
(-1375,1)
(-1331,27)
(-1331,432)
(-1331,441)
(-1323,1)
(-1323,121)
(-1323,320)
(-1323,440)
(-1155,1)
(-1125,32)
(-1125,343)
(-1089,20)
(-1089,343)
(-1056,343)
(-1029,55)
(-1029,100)
(-972,49)
(-972,275)
(-960,77)
(-896,297)
(-875,121)
(-875,288)
(-825,32)
(-825,128)
(-784,243)
(-768,11)
(-768,25)
(-768,121)
(-768,175)
(-768,245)
(-750,7)
(-735,2)
(-735,242)
(-729,1)
(-729,242)
(-686,27)
(-686,225)
(-675,1)
(-675,49)
(-675,176)
(-675,224)
(-672,125)
(-640,99)
(-625,3)
(-625,168)
(-625,192)
(-600,11)
(-588,121)
(-567,64)
(-567,125)
(-539,9)
(-528,1)
(-528,175)
(-525,121)
(-441,22)
(-441,125)
(-405,7)
(-405,14)
(-405,121)
(-405,128)
(-396,7)
(-396,125)
(-385,128)
(-384,7)
(-384,121)
(-384,125)
(-378,1)
(-378,5)
(-378,121)
(-378,125)
(-375,4)
(-375,44)
(-375,77)
(-375,98)
(-375,121)
(-363,1)
(-363,16)
(-363,25)
(-363,40)
(-363,49)
(-363,100)
(-363,112)
(-352,3)
(-343,81)
(-343,96)
(-320,81)
(-300,1)
(-297,1)
(-297,35)
(-297,49)
(-297,50)
(-297,64)
(-297,98)
(-275,49)
(-275,81)
(-264,7)
(-264,25)
(-256,27)
(-256,45)
(-256,77)
(-250,81)
(-245,1)
(-245,81)
(-243,1)
(-243,4)
(-243,11)
(-243,25)
(-243,32)
(-243,49)
(-243,56)
(-243,70)
(-243,77)
(-243,80)
(-240,77)
(-231,2)
(-231,5)
(-231,32)
(-231,50)
(-225,11)
(-225,64)
(-224,33)
(-200,63)
(-196,25)
(-192,1)
(-192,49)
(-192,55)
(-189,8)
(-189,55)
(-180,11)
(-180,49)
(-175,18)
(-168,1)
(-168,11)
(-168,55)
(-165,1)
(-165,7)
(-165,28)
(-165,49)
(-162,5)
(-162,49)
(-150,1)
(-150,49)
(-147,1)
(-147,4)
(-147,5)
(-147,16)
(-147,22)
(-147,25)
(-147,40)
(-147,44)
(-135,1)
(-135,44)
(-132,35)
(-128,1)
(-125,9)
(-125,16)
(-125,27)
(-121,3)
(-121,7)
(-121,24)
(-121,27)
(-121,32)
(-121,35)
(-121,40)
(-120,7)
(-108,1)
(-108,11)
(-108,25)
(-108,35)
(-105,2)
(-105,8)
(-105,11)
(-105,32)
(-100,33)
(-99,1)
(-99,5)
(-99,8)
(-99,25)
(-99,28)
(-99,32)
(-96,5)
(-96,7)
(-96,11)
(-96,25)
(-88,21)
(-88,27)
(-84,1)
(-84,25)
(-81,2)
(-81,5)
(-81,7)
(-81,11)
(-81,16)
(-81,20)
(-81,22)
(-81,25)
(-80,1)
(-77,9)
(-77,15)
(-77,24)
(-77,25)
(-75,1)
(-75,4)
(-75,7)
(-75,11)
(-75,14)
(-75,16)
(-75,22)
(-66,1)
(-66,7)
(-64,3)
(-64,5)
(-64,21)
(-63,1)
(-63,5)
(-63,10)
(-63,11)
(-63,16)
(-63,20)
(-60,11)
(-56,15)
(-55,2)
(-55,9)
(-55,16)
(-55,18)
(-54,7)
(-54,11)
(-49,3)
(-49,8)
(-49,9)
(-49,11)
(-49,15)
(-49,16)
(-48,1)
(-48,5)
(-48,7)
(-48,11)
(-45,1)
(-45,4)
(-45,7)
(-45,8)
(-45,11)
(-45,14)
(-44,3)
(-42,5)
(-42,11)
(-40,11)
(-36,1)
(-36,5)
(-36,7)
(-36,11)
(-35,1)
(-35,8)
(-35,9)
(-35,11)
(-33,1)
(-33,2)
(-33,4)
(-33,5)
(-33,7)
(-33,8)
(-33,10)
(-32,7)
(-32,9)
(-30,1)
(-30,7)
(-28,1)
(-28,9)
(-27,1)
(-27,2)
(-27,4)
(-27,5)
(-27,7)
(-27,8)
(-25,1)
(-25,3)
(-25,6)
(-25,7)
(-25,8)
(-24,1)
(-24,5)
(-24,7)
(-22,5)
(-22,7)
(-21,1)
(-21,2)
(-21,4)
(-21,5)
(-20,3)
(-18,1)
(-18,5)
(-16,3)
(-16,5)
(-15,1)
(-15,2)
(-15,4)
(-14,1)
(-14,3)
(-12,1)
(-11,1)
(-11,2)
(-11,3)
(-10,1)
(-10,3)
(-9,1)
(-9,2)
(-8,1)
(-7,1)
(-7,2)
(-6,1)
(-5,1)
(-4,1)
(1,-3267)
(1,-180)
(1,-147)
(1,-81)
(1,-75)
(1,-42)
(1,-33)
(1,-27)
(1,-15)
(1,-12)
(1,-11)
(1,-7)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,3)
(1,5)
(1,7)
(1,8)
(1,9)
(1,16)
(1,18)
(1,21)
(1,33)
(1,40)
(1,128)
(1,800)
(1,1008)
(1,1458)
(2,-9)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,11)
(2,25)
(2,81)
(3,-4375)
(3,-3025)
(3,-2401)
(3,-385)
(3,-176)
(3,-121)
(3,-100)
(3,-64)
(3,-56)
(3,-55)
(3,-50)
(3,-49)
(3,-28)
(3,-25)
(3,-22)
(3,-16)
(3,-11)
(3,-10)
(3,-8)
(3,-7)
(3,-5)
(3,-4)
(3,-2)
(3,1)
(3,2)
(3,4)
(3,5)
(3,7)
(3,8)
(3,10)
(3,11)
(3,14)
(3,20)
(3,32)
(3,35)
(3,44)
(3,49)
(3,55)
(3,80)
(3,98)
(3,125)
(3,175)
(3,224)
(3,242)
(3,440)
(3,539)
(3,9800)
(4,-27)
(4,-5)
(4,-3)
(4,1)
(4,7)
(4,15)
(5,-343)
(5,-42)
(5,-18)
(5,-11)
(5,-9)
(5,-7)
(5,-4)
(5,-3)
(5,-2)
(5,1)
(5,2)
(5,3)
(5,9)
(5,24)
(5,297)
(6,-245)
(6,-77)
(6,-35)
(6,-11)
(6,-7)
(6,-5)
(6,1)
(6,5)
(6,7)
(6,25)
(7,-45)
(7,-44)
(7,-9)
(7,-6)
(7,-5)
(7,-4)
(7,-3)
(7,1)
(7,3)
(7,5)
(7,6)
(7,11)
(7,16)
(7,27)
(7,81)
(7,1331)
(7,1875)
(8,-21)
(8,-11)
(8,-5)
(8,-3)
(8,1)
(8,9)
(8,441)
(9,-1375)
(9,-245)
(9,-128)
(9,-80)
(9,-35)
(9,-28)
(9,-25)
(9,-14)
(9,-11)
(9,-10)
(9,-8)
(9,-7)
(9,-5)
(9,-4)
(9,1)
(9,2)
(9,4)
(9,5)
(9,7)
(9,8)
(9,11)
(9,22)
(9,25)
(9,32)
(9,77)
(9,125)
(9,242)
(9,1372)
(10,-7)
(11,-27)
(11,-25)
(11,-20)
(11,-12)
(11,-9)
(11,-7)
(11,-6)
(11,-5)
(11,-4)
(11,1)
(11,3)
(11,7)
(11,8)
(11,15)
(11,63)
(11,225)
(11,288)
(12,-125)
(12,-49)
(12,-25)
(12,-11)
(12,-7)
(12,-5)
(12,1)
(12,5)
(12,7)
(12,11)
(12,77)
(12,121)
(14,-45)
(14,-5)
(15,-896)
(15,-77)
(15,-49)
(15,-32)
(15,-16)
(15,-14)
(15,-11)
(15,-8)
(15,-7)
(15,1)
(15,2)
(15,4)
(15,7)
(15,11)
(15,16)
(15,22)
(15,28)
(15,44)
(15,49)
(15,121)
(15,1024)
(16,-297)
(16,-9)
(16,-7)
(16,3)
(16,11)
(16,35)
(18,-55)
(18,-11)
(18,-7)
(18,1)
(18,5)
(18,49)
(20,-121)
(20,-9)
(20,-7)
(21,-5632)
(21,-4000)
(21,-250)
(21,-128)
(21,-88)
(21,-55)
(21,-40)
(21,-32)
(21,-25)
(21,-22)
(21,-16)
(21,-11)
(21,-10)
(21,-8)
(21,1)
(21,2)
(21,4)
(21,5)
(21,8)
(21,11)
(21,20)
(21,25)
(21,121)
(21,125)
(21,128)
(22,-49)
(22,-9)
(22,1)
(22,9)
(24,-1331)
(24,-35)
(24,-11)
(24,1)
(24,7)
(24,25)
(24,55)
(25,-243)
(25,-27)
(25,-12)
(25,-11)
(25,-9)
(25,1)
(25,8)
(25,21)
(25,32)
(25,77)
(25,792)
(27,-625)
(27,-352)
(27,-121)
(27,-64)
(27,-49)
(27,-44)
(27,-25)
(27,-20)
(27,-16)
(27,-14)
(27,-11)
(27,-10)
(27,1)
(27,2)
(27,5)
(27,7)
(27,11)
(27,16)
(27,35)
(27,40)
(27,55)
(27,112)
(27,343)
(27,616)
(28,-11)
(28,9)
(30,-11)
(30,1)
(30,11)
(32,-125)
(32,-27)
(32,-11)
(32,1)
(32,15)
(32,81)
(33,-3136)
(33,-875)
(33,-686)
(33,-256)
(33,-200)
(33,-56)
(33,-35)
(33,-32)
(33,-25)
(33,-20)
(33,-16)
(33,-14)
(33,1)
(33,4)
(33,5)
(33,7)
(33,10)
(33,14)
(33,16)
(33,25)
(33,49)
(33,64)
(33,70)
(33,245)
(33,3125)
(35,-33)
(35,-12)
(35,3)
(35,432)
(40,3)
(40,27)
(42,-25)
(42,1)
(42,11)
(42,121)
(44,-15)
(44,27)
(45,-64)
(45,-22)
(45,-16)
(45,1)
(45,7)
(45,49)
(48,-121)
(48,-49)
(48,-25)
(48,5)
(48,11)
(48,875)
(49,-108)
(49,-75)
(49,-33)
(49,-27)
(49,-20)
(49,-18)
(49,2)
(49,5)
(49,24)
(49,192)
(49,5445)
(50,-33)
(50,9)
(54,-25)
(54,7)
(55,-189)
(55,-21)
(55,3)
(55,96)
(55,243)
(56,-27)
(60,1)
(60,7)
(60,343)
(63,-121)
(63,-32)
(63,-25)
(63,-22)
(63,1)
(63,4)
(63,11)
(63,100)
(64,-63)
(64,-33)
(64,-25)
(66,-49)
(66,-25)
(66,5)
(66,125)
(70,-27)
(72,-49)
(72,-35)
(72,-25)
(72,1)
(72,11)
(72,25)
(75,-2401)
(75,-256)
(75,-121)
(75,-88)
(75,-49)
(75,-32)
(75,-28)
(75,2)
(75,7)
(75,8)
(75,11)
(75,56)
(75,704)
(77,-27)
(77,1)
(77,16)
(77,81)
(80,-27)
(81,-539)
(81,-125)
(81,-77)
(81,-55)
(81,-49)
(81,-35)
(81,-32)
(81,-28)
(81,1)
(81,5)
(81,8)
(81,22)
(81,28)
(81,50)
(81,98)
(81,512)
(84,-55)
(84,5)
(96,-275)
(96,-77)
(96,-35)
(96,1)
(96,49)
(96,343)
(98,-33)
(98,9)
(99,-49)
(99,-40)
(99,-35)
(99,2)
(99,7)
(99,16)
(100,7)
(100,81)
(105,-1331)
(105,-44)
(105,1)
(105,64)
(112,3)
(120,-121)
(120,-49)
(121,-147)
(121,-45)
(121,-42)
(121,18)
(121,25)
(121,45)
(121,168)
(125,-324)
(125,-63)
(125,-49)
(125,-44)
(125,-42)
(125,1)
(125,33)
(128,-45)
(128,49)
(128,1215)
(132,-125)
(132,-49)
(132,1)
(132,5)
(135,-77)
(135,-56)
(135,-49)
(135,4)
(135,11)
(135,32)
(144,-125)
(144,-55)
(144,-49)
(144,1)
(144,7)
(144,77)
(147,-16384)
(147,-625)
(147,-121)
(147,-64)
(147,-55)
(147,-50)
(147,1)
(147,5)
(147,11)
(147,32)
(147,50)
(147,176)
(147,275)
(150,-77)
(150,49)
(162,-175)
(162,-55)
(162,1)
(162,121)
(165,-784)
(165,-343)
(165,-64)
(165,-56)
(165,1)
(165,8)
(165,512)
(168,25)
(175,27)
(176,-75)
(189,-88)
(189,-64)
(189,1)
(189,25)
(192,11)
(192,35)
(192,125)
(210,11)
(216,-121)
(216,-77)
(216,5)
(216,49)
(224,-75)
(225,-196)
(225,-77)
(225,2)
(225,121)
(231,-320)
(231,-125)
(231,-80)
(231,4)
(240,1)
(242,-81)
(242,1)
(243,-1331)
(243,-686)
(243,-256)
(243,-125)
(243,-121)
(243,-88)
(243,7)
(243,40)
(243,44)
(243,175)
(243,605)
(243,1250)
(245,-243)
(275,-108)
(288,-121)
(288,25)
(294,-125)
(294,1)
(297,-2500)
(297,-224)
(297,-100)
(297,1)
(297,125)
(297,2401)
(300,-343)
(300,-121)
(315,-121)
(315,16)
(320,-147)
(336,-121)
(343,-125)
(343,-121)
(343,3)
(343,99)
(360,-121)
(360,1)
(363,-625)
(363,-256)
(363,-196)
(363,-175)
(363,-128)
(363,-125)
(363,4)
(363,5)
(363,7)
(363,14)
(363,320)
(375,-224)
(375,-128)
(375,1)
(375,7)
(375,22)
(375,64)
(375,847)
(384,-3773)
(384,-275)
(384,7)
(405,-256)
(405,121)
(440,-147)
(441,-275)
(441,128)
(484,-243)
(512,-189)
(512,9)
(512,121)
(525,-256)
(525,-176)
(525,1)
(528,49)
(539,-180)
(567,-200)
(567,11)
(605,27)
(616,3)
(625,-891)
(672,1)
(693,-256)
(693,25)
(704,-243)
(726,-245)
(726,1)
(729,-343)
(729,-320)
(729,-275)
(729,-250)
(729,-245)
(729,2)
(729,7)
(729,32)
(729,77)
(729,100)
(735,-256)
(735,11)
(735,484)
(825,49)
(847,-324)
(864,-343)
(864,55)
(875,-297)
(891,-640)
(891,343)
(960,121)
(1024,-343)
(1029,-968)
(1029,-640)
(1029,-352)
(1029,20)
(1029,32)
(1029,625)
(1089,-875)
(1089,512)
(1152,-1715)
(1152,-385)
(1152,1)
(1152,1331)
(1250,27)
(1320,1)
(1331,-3645)
(1331,128)
(1372,1)
(1452,245)
(1512,-625)
(1512,121)
(1536,-875)
(1536,-539)
(1536,55)
(1617,1)
(1728,-625)
(1728,49)
(1815,-686)
(1848,-625)
(1875,-968)
(1875,343)
(1875,2048)
(1944,-3773)
(1944,3125)
(2025,-686)
(2025,11)
(2048,-891)
(2048,729)
(2112,25)
(2187,-784)
(2187,55)
(2401,33)
(2541,125)
(2592,-875)
(2592,11)
(2625,16)
(2673,-896)
(2673,5)
(3072,5)
(3125,216)
(3375,-9317)
(3375,8192)
(3584,-6075)
(3750,-1331)
(3888,-1331)
(3888,35)
(3969,-1331)
(3969,8)
(3993,-1715)
(3993,9604)
(4116,-1375)
(6144,-4235)
(6144,625)
(6561,-4235)
(6561,2048)
(7128,-2401)
(7128,25)
(7200,-2401)
(7200,1)
(7203,-2500)
(8192,375)
(9072,-3025)
(9072,1)
(9375,-3773)
(9375,-3136)
(9375,11)
(9604,-3645)
(9800,-3267)
(10752,14641)
(10935,-3773)
(10935,128)
(11979,-4000)
(11979,7)
(13122,-4375)
(13122,1)
(14641,-6075)
(16875,-5632)
(16875,7)
(24576,-9317)
(28812,1331)
(29400,1)
(43923,3584)
(49005,-16384)
(49005,49)
#
# (a,b,c,d) = (-2,1,1,0) and D = -9:
#
(-16384,-16237)
(-16384,32621)
(-9317,-5942)
(-9317,15259)
(-6075,-2491)
(-6075,8566)
(-5632,-5611)
(-5632,11243)
(-4375,-4372)
(-4375,8747)
(-4235,1909)
(-4235,2326)
(-4000,-3979)
(-4000,7979)
(-3773,-3389)
(-3773,-1829)
(-3773,5602)
(-3773,7162)
(-3645,-2314)
(-3645,5959)
(-3267,-3266)
(-3267,6533)
(-3136,-3103)
(-3136,6239)
(-3025,-3022)
(-3025,6047)
(-2500,-2203)
(-2500,4703)
(-2401,-2398)
(-2401,-2326)
(-2401,4727)
(-2401,4799)
(-1715,-563)
(-1715,2278)
(-1375,-1366)
(-1375,2741)
(-1331,-1307)
(-1331,-1226)
(-1331,-1088)
(-1331,2419)
(-1331,2557)
(-1331,2638)
(-968,61)
(-968,907)
(-896,-881)
(-896,1777)
(-891,-266)
(-891,1157)
(-875,-842)
(-875,214)
(-875,661)
(-875,1717)
(-784,-619)
(-784,1403)
(-686,-653)
(-686,-443)
(-686,1129)
(-686,1339)
(-640,251)
(-640,389)
(-625,-598)
(-625,-478)
(-625,-262)
(-625,887)
(-625,1103)
(-625,1223)
(-539,-458)
(-539,997)
(-385,-382)
(-385,767)
(-352,-325)
(-352,677)
(-343,-338)
(-343,-178)
(-343,-43)
(-343,386)
(-343,521)
(-343,681)
(-324,-199)
(-324,523)
(-320,-89)
(-320,409)
(-297,-281)
(-297,578)
(-275,-179)
(-275,109)
(-275,166)
(-275,454)
(-256,-223)
(-256,-181)
(-256,-13)
(-256,107)
(-256,149)
(-256,269)
(-256,437)
(-256,479)
(-250,-229)
(-250,479)
(-245,-239)
(-245,-236)
(-245,481)
(-245,484)
(-243,-218)
(-243,2)
(-243,241)
(-243,461)
(-224,73)
(-224,151)
(-200,-167)
(-200,367)
(-196,29)
(-196,167)
(-189,-134)
(-189,323)
(-180,-179)
(-180,359)
(-176,-173)
(-176,349)
(-175,-13)
(-175,188)
(-147,-146)
(-147,-26)
(-147,173)
(-147,293)
(-128,-119)
(-128,-107)
(-128,235)
(-128,247)
(-125,-113)
(-125,-93)
(-125,-44)
(-125,7)
(-125,19)
(-125,106)
(-125,118)
(-125,169)
(-125,218)
(-125,238)
(-121,-118)
(-121,-101)
(-121,-94)
(-121,-73)
(-121,-58)
(-121,-46)
(-121,-1)
(-121,26)
(-121,95)
(-121,122)
(-121,167)
(-121,179)
(-121,194)
(-121,215)
(-121,222)
(-121,239)
(-108,-59)
(-108,167)
(-100,-97)
(-100,197)
(-88,-67)
(-88,-13)
(-88,101)
(-88,155)
(-81,-80)
(-81,161)
(-80,-71)
(-80,151)
(-77,-71)
(-77,-62)
(-77,4)
(-77,19)
(-77,58)
(-77,73)
(-77,139)
(-77,148)
(-75,-74)
(-75,-26)
(-75,101)
(-75,149)
(-64,-61)
(-64,-37)
(-64,-19)
(-64,83)
(-64,101)
(-64,125)
(-63,1)
(-63,62)
(-56,-53)
(-56,-23)
(-56,79)
(-56,109)
(-55,-52)
(-55,-37)
(-55,-34)
(-55,26)
(-55,29)
(-55,89)
(-55,92)
(-55,107)
(-50,-47)
(-50,97)
(-49,-46)
(-49,-37)
(-49,-34)
(-49,-27)
(-49,-22)
(-49,-1)
(-49,17)
(-49,23)
(-49,26)
(-49,32)
(-49,50)
(-49,71)
(-49,76)
(-49,83)
(-49,86)
(-49,95)
(-45,-38)
(-45,-31)
(-45,76)
(-45,83)
(-44,-37)
(-44,-17)
(-44,61)
(-44,81)
(-42,-41)
(-42,-37)
(-42,79)
(-42,83)
(-40,-19)
(-40,59)
(-35,-29)
(-35,-26)
(-35,-11)
(-35,-2)
(-35,37)
(-35,46)
(-35,61)
(-35,64)
(-33,-32)
(-33,2)
(-33,16)
(-33,17)
(-33,31)
(-33,65)
(-32,-17)
(-32,-11)
(-32,1)
(-32,31)
(-32,43)
(-32,49)
(-28,-25)
(-28,-19)
(-28,47)
(-28,53)
(-27,-26)
(-27,-23)
(-27,-16)
(-27,-2)
(-27,5)
(-27,22)
(-27,29)
(-27,43)
(-27,50)
(-27,53)
(-25,-22)
(-25,-16)
(-25,-14)
(-25,-13)
(-25,-4)
(-25,2)
(-25,8)
(-25,17)
(-25,23)
(-25,29)
(-25,38)
(-25,39)
(-25,41)
(-25,47)
(-22,-19)
(-22,-1)
(-22,23)
(-22,41)
(-21,-13)
(-21,34)
(-20,-9)
(-20,7)
(-20,13)
(-20,29)
(-18,-13)
(-18,31)
(-16,-13)
(-16,-1)
(-16,5)
(-16,11)
(-16,17)
(-16,29)
(-15,-14)
(-15,29)
(-14,-5)
(-14,1)
(-14,13)
(-14,19)
(-12,-11)
(-12,-1)
(-12,13)
(-12,23)
(-11,-10)
(-11,-8)
(-11,-6)
(-11,-5)
(-11,-3)
(-11,-2)
(-11,1)
(-11,4)
(-11,7)
(-11,10)
(-11,13)
(-11,14)
(-11,16)
(-11,17)
(-11,19)
(-11,21)
(-10,-7)
(-10,-1)
(-10,11)
(-10,17)
(-9,-7)
(-9,-4)
(-9,-2)
(-9,2)
(-9,7)
(-9,11)
(-9,13)
(-9,16)
(-8,-5)
(-8,1)
(-8,7)
(-8,13)
(-7,-6)
(-7,-4)
(-7,-2)
(-7,-1)
(-7,2)
(-7,3)
(-7,4)
(-7,5)
(-7,8)
(-7,9)
(-7,11)
(-7,13)
(-6,1)
(-6,5)
(-5,-4)
(-5,-2)
(-5,-1)
(-5,1)
(-5,2)
(-5,3)
(-5,4)
(-5,6)
(-5,7)
(-5,9)
(-4,-3)
(-4,-1)
(-4,1)
(-4,3)
(-4,5)
(-4,7)
(-3,-2)
(-3,-1)
(-3,1)
(-3,2)
(-3,4)
(-3,5)
(-2,-1)
(-2,1)
(-2,3)
(-1,0)
(-1,1)
(1,-29402)
(1,-13124)
(1,-9074)
(1,-7202)
(1,-1619)
(1,-1374)
(1,-1322)
(1,-1154)
(1,-728)
(1,-674)
(1,-527)
(1,-377)
(1,-362)
(1,-299)
(1,-296)
(1,-244)
(1,-242)
(1,-191)
(1,-167)
(1,-164)
(1,-149)
(1,-146)
(1,-134)
(1,-127)
(1,-107)
(1,-98)
(1,-83)
(1,-79)
(1,-74)
(1,-65)
(1,-62)
(1,-47)
(1,-44)
(1,-35)
(1,-34)
(1,-32)
(1,-29)
(1,-27)
(1,-26)
(1,-24)
(1,-23)
(1,-20)
(1,-17)
(1,-14)
(1,-13)
(1,-11)
(1,-10)
(1,-9)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,2)
(1,3)
(1,4)
(1,5)
(1,6)
(1,7)
(1,8)
(1,9)
(1,10)
(1,12)
(1,13)
(1,16)
(1,19)
(1,22)
(1,23)
(1,25)
(1,26)
(1,28)
(1,31)
(1,33)
(1,34)
(1,43)
(1,46)
(1,61)
(1,64)
(1,73)
(1,78)
(1,82)
(1,97)
(1,106)
(1,126)
(1,133)
(1,145)
(1,148)
(1,163)
(1,166)
(1,190)
(1,241)
(1,243)
(1,295)
(1,298)
(1,361)
(1,376)
(1,526)
(1,673)
(1,727)
(1,1153)
(1,1321)
(1,1373)
(1,1618)
(1,7201)
(1,9073)
(1,13123)
(1,29401)
(2,-733)
(2,-229)
(2,-103)
(2,-79)
(2,-53)
(2,-31)
(2,-25)
(2,-19)
(2,-13)
(2,-9)
(2,-7)
(2,-5)
(2,3)
(2,5)
(2,7)
(2,11)
(2,17)
(2,23)
(2,29)
(2,51)
(2,77)
(2,101)
(2,227)
(2,731)
(3,-622)
(3,-349)
(3,-118)
(3,-61)
(3,-46)
(3,-41)
(3,-22)
(3,-17)
(3,-13)
(3,-11)
(3,-8)
(3,-7)
(3,4)
(3,5)
(3,8)
(3,10)
(3,14)
(3,19)
(3,38)
(3,43)
(3,58)
(3,115)
(3,346)
(3,619)
(4,-371)
(4,-239)
(4,-143)
(4,-71)
(4,-41)
(4,-29)
(4,-23)
(4,-17)
(4,-11)
(4,7)
(4,13)
(4,19)
(4,25)
(4,37)
(4,67)
(4,139)
(4,235)
(4,367)
(5,-3082)
(5,-2683)
(5,-373)
(5,-226)
(5,-157)
(5,-142)
(5,-94)
(5,-91)
(5,-76)
(5,-59)
(5,-58)
(5,-43)
(5,-37)
(5,-31)
(5,-28)
(5,-22)
(5,-19)
(5,-17)
(5,-16)
(5,-13)
(5,-11)
(5,6)
(5,8)
(5,11)
(5,12)
(5,14)
(5,17)
(5,23)
(5,26)
(5,32)
(5,38)
(5,53)
(5,54)
(5,71)
(5,86)
(5,89)
(5,137)
(5,152)
(5,221)
(5,368)
(5,2678)
(5,3077)
(6,-19)
(6,13)
(7,-16889)
(7,-11993)
(7,-743)
(7,-398)
(7,-389)
(7,-377)
(7,-257)
(7,-158)
(7,-114)
(7,-113)
(7,-89)
(7,-74)
(7,-68)
(7,-59)
(7,-47)
(7,-41)
(7,-38)
(7,-29)
(7,-26)
(7,-25)
(7,-23)
(7,-20)
(7,-18)
(7,-17)
(7,-15)
(7,8)
(7,10)
(7,11)
(7,13)
(7,16)
(7,18)
(7,19)
(7,22)
(7,31)
(7,34)
(7,40)
(7,52)
(7,61)
(7,67)
(7,82)
(7,106)
(7,107)
(7,151)
(7,250)
(7,370)
(7,382)
(7,391)
(7,736)
(7,11986)
(7,16882)
(8,-3985)
(8,-181)
(8,-97)
(8,-91)
(8,-41)
(8,-37)
(8,-27)
(8,-25)
(8,-19)
(8,-17)
(8,9)
(8,11)
(8,17)
(8,19)
(8,29)
(8,33)
(8,83)
(8,89)
(8,173)
(8,3977)
(9,-530)
(9,-116)
(9,-68)
(9,-46)
(9,-40)
(9,-26)
(9,-23)
(9,-19)
(9,10)
(9,14)
(9,17)
(9,31)
(9,37)
(9,59)
(9,107)
(9,521)
(10,-53)
(10,-23)
(10,13)
(10,43)
(11,-9397)
(11,-2614)
(11,-2047)
(11,-757)
(11,-589)
(11,-232)
(11,-214)
(11,-169)
(11,-157)
(11,-97)
(11,-94)
(11,-85)
(11,-70)
(11,-64)
(11,-52)
(11,-49)
(11,-43)
(11,-38)
(11,-37)
(11,-34)
(11,-31)
(11,-29)
(11,-25)
(11,-24)
(11,13)
(11,14)
(11,18)
(11,20)
(11,23)
(11,26)
(11,27)
(11,32)
(11,38)
(11,41)
(11,53)
(11,59)
(11,74)
(11,83)
(11,86)
(11,146)
(11,158)
(11,203)
(11,221)
(11,578)
(11,746)
(11,2036)
(11,2603)
(11,9386)
(14,-391)
(14,-61)
(14,-31)
(14,17)
(14,47)
(14,377)
(15,-62)
(15,-41)
(15,-34)
(15,19)
(15,26)
(15,47)
(16,-2657)
(16,-347)
(16,-131)
(16,-109)
(16,-65)
(16,-59)
(16,-47)
(16,-39)
(16,-33)
(16,17)
(16,23)
(16,31)
(16,43)
(16,49)
(16,93)
(16,115)
(16,331)
(16,2641)
(18,-157)
(18,-37)
(18,19)
(18,139)
(20,-1069)
(20,-61)
(20,-43)
(20,23)
(20,41)
(20,1049)
(21,-67)
(21,-43)
(21,22)
(21,46)
(22,-419)
(22,-125)
(22,-59)
(22,-53)
(22,31)
(22,37)
(22,103)
(22,397)
(24,-97)
(24,-53)
(24,29)
(24,73)
(25,-7178)
(25,-2162)
(25,-743)
(25,-338)
(25,-239)
(25,-218)
(25,-171)
(25,-122)
(25,-83)
(25,-74)
(25,-71)
(25,-59)
(25,-56)
(25,-52)
(25,27)
(25,31)
(25,34)
(25,46)
(25,49)
(25,58)
(25,97)
(25,146)
(25,193)
(25,214)
(25,313)
(25,718)
(25,2137)
(25,7153)
(27,-1304)
(27,-659)
(27,-229)
(27,-98)
(27,-94)
(27,-61)
(27,34)
(27,67)
(27,71)
(27,202)
(27,632)
(27,1277)
(28,-137)
(28,-71)
(28,43)
(28,109)
(32,-1093)
(32,-793)
(32,-211)
(32,-199)
(32,-89)
(32,-73)
(32,-67)
(32,35)
(32,41)
(32,57)
(32,167)
(32,179)
(32,761)
(32,1061)
(33,-2467)
(33,-191)
(33,-67)
(33,34)
(33,158)
(33,2434)
(35,-3958)
(35,-262)
(35,-97)
(35,-86)
(35,-73)
(35,38)
(35,51)
(35,62)
(35,227)
(35,3923)
(40,-323)
(40,-107)
(40,-81)
(40,41)
(40,67)
(40,283)
(44,-331)
(44,-103)
(44,-91)
(44,47)
(44,59)
(44,287)
(45,-211)
(45,166)
(49,-49103)
(49,-1826)
(49,-923)
(49,-626)
(49,-314)
(49,-248)
(49,-226)
(49,-194)
(49,-143)
(49,-131)
(49,-116)
(49,-113)
(49,-101)
(49,52)
(49,64)
(49,67)
(49,82)
(49,94)
(49,145)
(49,177)
(49,199)
(49,265)
(49,577)
(49,874)
(49,1777)
(49,49054)
(50,-247)
(50,-181)
(50,131)
(50,197)
(55,-2297)
(55,-1646)
(55,-974)
(55,-137)
(55,-134)
(55,-113)
(55,58)
(55,79)
(55,82)
(55,919)
(55,1591)
(55,2242)
(56,-187)
(56,131)
(63,-137)
(63,74)
(64,-503)
(64,-233)
(64,-161)
(64,97)
(64,169)
(64,439)
(70,-173)
(70,103)
(77,-883)
(77,-298)
(77,-179)
(77,-166)
(77,-163)
(77,86)
(77,89)
(77,102)
(77,221)
(77,806)
(80,-163)
(80,83)
(81,-262)
(81,-239)
(81,-194)
(81,-169)
(81,-164)
(81,83)
(81,88)
(81,113)
(81,158)
(81,181)
(96,-247)
(96,151)
(98,-277)
(98,-199)
(98,101)
(98,179)
(99,-541)
(99,442)
(100,-929)
(100,-263)
(100,163)
(100,829)
(112,-251)
(112,139)
(121,-1754)
(121,-1202)
(121,-754)
(121,-647)
(121,-467)
(121,-404)
(121,-284)
(121,-263)
(121,-257)
(121,-254)
(121,133)
(121,136)
(121,142)
(121,163)
(121,283)
(121,346)
(121,526)
(121,633)
(121,1081)
(121,1633)
(125,-2791)
(125,-547)
(125,-442)
(125,-316)
(125,-271)
(125,-259)
(125,-253)
(125,128)
(125,134)
(125,146)
(125,191)
(125,317)
(125,422)
(125,2666)
(128,-11191)
(128,-1587)
(128,-697)
(128,-277)
(128,-257)
(128,129)
(128,149)
(128,569)
(128,1459)
(128,11063)
(168,-457)
(168,289)
(175,-593)
(175,-353)
(175,178)
(175,418)
(176,-499)
(176,323)
(192,-433)
(192,241)
(216,-3557)
(216,3341)
(224,-451)
(224,227)
(225,-461)
(225,236)
(242,-493)
(242,-487)
(242,245)
(242,251)
(243,-541)
(243,298)
(245,-1942)
(245,-523)
(245,278)
(245,1697)
(275,-697)
(275,422)
(288,-587)
(288,299)
(297,-599)
(297,302)
(320,-1003)
(320,683)
(343,-2561)
(343,-1577)
(343,-782)
(343,-746)
(343,-713)
(343,370)
(343,403)
(343,439)
(343,1234)
(343,2218)
(375,-8942)
(375,8567)
(432,-899)
(432,467)
(440,-883)
(440,443)
(441,-890)
(441,449)
(484,-1703)
(484,1219)
(512,-2113)
(512,-1189)
(512,-1105)
(512,593)
(512,677)
(512,1601)
(539,-1081)
(539,542)
(605,-1453)
(605,848)
(616,-1259)
(616,643)
(625,-7394)
(625,-2279)
(625,1654)
(625,6769)
(704,-1483)
(704,779)
(729,-3506)
(729,2777)
(792,-1609)
(792,817)
(800,-1601)
(800,801)
(847,-2069)
(847,1222)
(875,-1798)
(875,923)
(1008,-2017)
(1008,1009)
(1024,-2063)
(1024,1039)
(1215,-2558)
(1215,1343)
(1250,-2743)
(1250,1493)
(1331,-31474)
(1331,-3814)
(1331,-2669)
(1331,1338)
(1331,2483)
(1331,30143)
(1372,-2753)
(1372,1381)
(1458,-2917)
(1458,1459)
(1875,-3757)
(1875,1882)
(2048,-10657)
(2048,-5971)
(2048,3923)
(2048,8609)
(2401,-5099)
(2401,2698)
(3125,-8194)
(3125,-6283)
(3125,3158)
(3125,5069)
(3584,-51091)
(3584,47507)
(5445,-10939)
(5445,5494)
(8192,-19759)
(8192,11567)
(9604,-23201)
(9604,13597)
(9800,-19603)
(9800,9803)
(14641,-40034)
(14641,25393)
#
# (a,b,c,d) = (-2,0,1,0) and D = -8:
#
(-128,-181)
(-128,181)
(-99,-140)
(-99,140)
(-75,-106)
(-75,106)
(-45,-58)
(-45,58)
(-27,-38)
(-27,38)
(-22,-31)
(-22,-25)
(-22,25)
(-22,31)
(-16,-13)
(-16,13)
(-11,-12)
(-11,12)
(-9,-8)
(-9,8)
(-8,-11)
(-8,11)
(-5,-7)
(-5,-6)
(-5,-1)
(-5,1)
(-5,6)
(-5,7)
(-4,-5)
(-4,5)
(-3,-4)
(-3,-2)
(-3,2)
(-3,4)
(-2,-1)
(-2,1)
(-1,-1)
(-1,0)
(-1,1)
(1,-10)
(1,-4)
(1,-3)
(1,-2)
(1,2)
(1,3)
(1,4)
(1,10)
(2,-3)
(2,3)
(3,-19)
(3,-5)
(3,5)
(3,19)
(4,-9)
(4,9)
(5,-8)
(5,8)
(6,-11)
(6,11)
(7,-10)
(7,10)
(9,-13)
(9,13)
(10,-51)
(10,51)
(11,-184)
(11,-16)
(11,16)
(11,184)
(12,-17)
(12,17)
(25,-44)
(25,44)
(30,-43)
(30,43)
(40,-57)
(40,57)
(70,-99)
(70,99)
(72,-113)
(72,113)
(81,-173)
(81,173)
(132,-193)
(132,193)
(176,-249)
(176,249)
(605,-856)
(605,856)
(1100,-1593)
(1100,1593)
(13860,-19601)
(13860,19601)
#
# (a,b,c,d) = (-1,1,1,0) and D = -5:
#
(-147,-89)
(-147,236)
(-112,-69)
(-112,-39)
(-112,151)
(-112,181)
(-81,-50)
(-81,131)
(-75,-38)
(-75,113)
(-60,-37)
(-60,97)
(-42,-19)
(-42,61)
(-36,1)
(-36,35)
(-32,-19)
(-32,51)
(-27,-4)
(-27,31)
(-18,-11)
(-18,29)
(-12,-7)
(-12,19)
(-10,3)
(-10,7)
(-9,-5)
(-9,14)
(-8,-1)
(-8,9)
(-7,-4)
(-7,1)
(-7,6)
(-7,11)
(-5,-3)
(-5,-2)
(-5,7)
(-5,8)
(-4,-1)
(-4,5)
(-3,-1)
(-3,1)
(-3,2)
(-3,4)
(-2,-1)
(-2,1)
(-2,3)
(-1,0)
(-1,1)
(1,-37)
(1,-8)
(1,-4)
(1,-3)
(1,-2)
(1,1)
(1,2)
(1,3)
(1,7)
(1,36)
(2,-5)
(2,3)
(3,-13)
(3,-5)
(3,2)
(3,10)
(4,-27)
(4,-7)
(4,3)
(4,23)
(5,-9)
(5,4)
(6,-13)
(6,7)
(7,-17)
(7,-12)
(7,5)
(7,10)
(8,-13)
(8,5)
(9,-17)
(9,8)
(11,-18)
(11,7)
(14,-23)
(14,9)
(16,-29)
(16,13)
(21,-34)
(21,13)
(24,-41)
(24,17)
(35,-71)
(35,36)
(40,-149)
(40,109)
(45,-74)
(45,29)
(50,-81)
(50,31)
(55,-89)
(55,34)
(98,-465)
(98,367)
(144,-233)
(144,89)
(189,-338)
(189,149)
(343,-555)
(343,212)
(448,-725)
(448,277)
(672,-1097)
(672,425)
(5600,-9061)
(5600,3461)
#
# (a,b,c,d) = (-1,0,1,0) and D = -4:
#
(-18225,-11057)
(-18225,11057)
(-10935,-8273)
(-10935,8273)
(-9801,-9799)
(-9801,9799)
(-9317,-7067)
(-9317,7067)
(-8192,-8143)
(-8192,8143)
(-4375,-4373)
(-4375,4373)
(-4235,-139)
(-4235,139)
(-3773,-3517)
(-3773,-2477)
(-3773,2477)
(-3773,3517)
(-3025,-3023)
(-3025,3023)
(-2816,-2809)
(-2816,2809)
(-2673,-1423)
(-2673,1423)
(-2401,-2399)
(-2401,-2351)
(-2401,2351)
(-2401,2399)
(-2000,-1993)
(-2000,1993)
(-1715,-947)
(-1715,947)
(-1568,-1557)
(-1568,1557)
(-1375,-1369)
(-1375,1369)
(-1331,-1315)
(-1331,-1261)
(-1331,-1169)
(-1331,1169)
(-1331,1261)
(-1331,1315)
(-1250,-1151)
(-1250,1151)
(-1029,-1019)
(-1029,1019)
(-891,-859)
(-891,859)
(-875,-853)
(-875,-149)
(-875,149)
(-875,853)
(-729,-679)
(-729,-239)
(-729,239)
(-729,679)
(-625,-607)
(-625,-527)
(-625,-383)
(-625,383)
(-625,527)
(-625,607)
(-567,-457)
(-567,457)
(-539,-485)
(-539,485)
(-486,-361)
(-486,361)
(-484,-141)
(-484,141)
(-448,-443)
(-448,443)
(-441,-439)
(-441,-199)
(-441,199)
(-441,439)
(-392,-337)
(-392,337)
(-385,-383)
(-385,383)
(-375,-311)
(-375,311)
(-363,-323)
(-363,323)
(-343,-332)
(-343,-262)
(-343,-233)
(-343,-143)
(-343,143)
(-343,233)
(-343,262)
(-343,332)
(-320,-23)
(-320,23)
(-275,-211)
(-275,-19)
(-275,19)
(-275,211)
(-270,-269)
(-270,269)
(-245,-241)
(-245,-239)
(-245,239)
(-245,241)
(-243,-241)
(-243,241)
(-225,-223)
(-225,-127)
(-225,127)
(-225,223)
(-189,-61)
(-189,61)
(-176,-167)
(-176,167)
(-175,-67)
(-175,67)
(-162,-113)
(-162,113)
(-160,-83)
(-160,83)
(-147,-103)
(-147,103)
(-135,-121)
(-135,-107)
(-135,107)
(-135,121)
(-128,-117)
(-128,-103)
(-128,-47)
(-128,-7)
(-128,7)
(-128,47)
(-128,103)
(-128,117)
(-125,-118)
(-125,-117)
(-125,-71)
(-125,-37)
(-125,-29)
(-125,29)
(-125,37)
(-125,71)
(-125,117)
(-125,118)
(-121,-119)
(-121,-103)
(-121,-89)
(-121,-79)
(-121,-71)
(-121,-41)
(-121,-23)
(-121,23)
(-121,41)
(-121,71)
(-121,79)
(-121,89)
(-121,103)
(-121,119)
(-112,-13)
(-112,13)
(-100,-89)
(-100,89)
(-99,-97)
(-99,-29)
(-99,-1)
(-99,1)
(-99,29)
(-99,97)
(-98,-23)
(-98,23)
(-88,-87)
(-88,87)
(-81,-79)
(-81,-73)
(-81,-59)
(-81,-31)
(-81,-17)
(-81,17)
(-81,31)
(-81,59)
(-81,73)
(-81,79)
(-77,-73)
(-77,-67)
(-77,-23)
(-77,-13)
(-77,13)
(-77,23)
(-77,67)
(-77,73)
(-75,-53)
(-75,53)
(-66,-59)
(-66,59)
(-64,-61)
(-64,-57)
(-64,57)
(-64,61)
(-63,-62)
(-63,-58)
(-63,-47)
(-63,47)
(-63,58)
(-63,62)
(-55,-53)
(-55,-43)
(-55,-41)
(-55,-1)
(-55,1)
(-55,41)
(-55,43)
(-55,53)
(-50,-49)
(-50,49)
(-49,-47)
(-49,-41)
(-49,-39)
(-49,-31)
(-49,-17)
(-49,-5)
(-49,-1)
(-49,1)
(-49,5)
(-49,17)
(-49,31)
(-49,39)
(-49,41)
(-49,47)
(-45,-43)
(-45,43)
(-44,-37)
(-44,-19)
(-44,19)
(-44,37)
(-40,-37)
(-40,37)
(-35,-31)
(-35,-29)
(-35,-19)
(-35,-13)
(-35,13)
(-35,19)
(-35,29)
(-35,31)
(-33,-31)
(-33,-23)
(-33,-17)
(-33,17)
(-33,23)
(-33,31)
(-32,-31)
(-32,-23)
(-32,-17)
(-32,17)
(-32,23)
(-32,31)
(-30,-19)
(-30,19)
(-28,-27)
(-28,-17)
(-28,17)
(-28,27)
(-27,-23)
(-27,-22)
(-27,-17)
(-27,-13)
(-27,-5)
(-27,5)
(-27,13)
(-27,17)
(-27,22)
(-27,23)
(-25,-24)
(-25,-23)
(-25,-19)
(-25,-17)
(-25,-11)
(-25,-7)
(-25,-3)
(-25,3)
(-25,7)
(-25,11)
(-25,17)
(-25,19)
(-25,23)
(-25,24)
(-22,-13)
(-22,13)
(-21,-19)
(-21,-11)
(-21,-1)
(-21,1)
(-21,11)
(-21,19)
(-20,-13)
(-20,13)
(-18,-17)
(-18,-7)
(-18,7)
(-18,17)
(-16,-11)
(-16,-9)
(-16,-5)
(-16,5)
(-16,9)
(-16,11)
(-15,-13)
(-15,-7)
(-15,-1)
(-15,1)
(-15,7)
(-15,13)
(-14,-13)
(-14,-11)
(-14,11)
(-14,13)
(-11,-10)
(-11,-9)
(-11,-7)
(-11,-5)
(-11,-4)
(-11,-3)
(-11,-1)
(-11,1)
(-11,3)
(-11,4)
(-11,5)
(-11,7)
(-11,9)
(-11,10)
(-10,-1)
(-10,1)
(-9,-7)
(-9,-5)
(-9,-2)
(-9,-1)
(-9,1)
(-9,2)
(-9,5)
(-9,7)
(-8,-7)
(-8,-3)
(-8,-1)
(-8,1)
(-8,3)
(-8,7)
(-7,-5)
(-7,-4)
(-7,-3)
(-7,-2)
(-7,-1)
(-7,1)
(-7,2)
(-7,3)
(-7,4)
(-7,5)
(-6,-5)
(-6,-1)
(-6,1)
(-6,5)
(-5,-4)
(-5,-3)
(-5,-2)
(-5,-1)
(-5,1)
(-5,2)
(-5,3)
(-5,4)
(-4,-3)
(-4,-1)
(-4,1)
(-4,3)
(-3,-2)
(-3,-1)
(-3,1)
(-3,2)
(-2,-1)
(-2,1)
(-1,0)
(1,-19601)
(1,-8749)
(1,-6049)
(1,-4801)
(1,-1079)
(1,-881)
(1,-769)
(1,-485)
(1,-449)
(1,-351)
(1,-251)
(1,-244)
(1,-241)
(1,-199)
(1,-197)
(1,-161)
(1,-127)
(1,-111)
(1,-109)
(1,-99)
(1,-97)
(1,-89)
(1,-76)
(1,-71)
(1,-65)
(1,-55)
(1,-49)
(1,-43)
(1,-41)
(1,-34)
(1,-31)
(1,-29)
(1,-26)
(1,-23)
(1,-21)
(1,-19)
(1,-17)
(1,-15)
(1,-13)
(1,-11)
(1,-10)
(1,-9)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,2)
(1,3)
(1,4)
(1,5)
(1,6)
(1,7)
(1,8)
(1,9)
(1,10)
(1,11)
(1,13)
(1,15)
(1,17)
(1,19)
(1,21)
(1,23)
(1,26)
(1,29)
(1,31)
(1,34)
(1,41)
(1,43)
(1,49)
(1,55)
(1,65)
(1,71)
(1,76)
(1,89)
(1,97)
(1,99)
(1,109)
(1,111)
(1,127)
(1,161)
(1,197)
(1,199)
(1,241)
(1,244)
(1,251)
(1,351)
(1,449)
(1,485)
(1,769)
(1,881)
(1,1079)
(1,4801)
(1,6049)
(1,8749)
(1,19601)
(2,-123)
(2,-79)
(2,-47)
(2,-23)
(2,-13)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,3)
(2,5)
(2,7)
(2,9)
(2,13)
(2,23)
(2,47)
(2,79)
(2,123)
(3,-2747)
(3,-487)
(3,-253)
(3,-157)
(3,-67)
(3,-53)
(3,-52)
(3,-47)
(3,-25)
(3,-19)
(3,-17)
(3,-13)
(3,-11)
(3,-8)
(3,-7)
(3,-5)
(3,-4)
(3,4)
(3,5)
(3,7)
(3,8)
(3,11)
(3,13)
(3,17)
(3,19)
(3,25)
(3,47)
(3,52)
(3,53)
(3,67)
(3,157)
(3,253)
(3,487)
(3,2747)
(4,-1327)
(4,-59)
(4,-31)
(4,-29)
(4,-11)
(4,-7)
(4,-5)
(4,5)
(4,7)
(4,11)
(4,29)
(4,31)
(4,59)
(4,1327)
(5,-2053)
(5,-1787)
(5,-247)
(5,-149)
(5,-103)
(5,-93)
(5,-61)
(5,-59)
(5,-49)
(5,-37)
(5,-27)
(5,-23)
(5,-19)
(5,-17)
(5,-16)
(5,-13)
(5,-11)
(5,-9)
(5,-7)
(5,-6)
(5,6)
(5,7)
(5,9)
(5,11)
(5,13)
(5,16)
(5,17)
(5,19)
(5,23)
(5,27)
(5,37)
(5,49)
(5,59)
(5,61)
(5,93)
(5,103)
(5,149)
(5,247)
(5,1787)
(5,2053)
(7,-11257)
(7,-7993)
(7,-493)
(7,-263)
(7,-257)
(7,-249)
(7,-169)
(7,-128)
(7,-103)
(7,-73)
(7,-57)
(7,-47)
(7,-43)
(7,-37)
(7,-29)
(7,-25)
(7,-23)
(7,-18)
(7,-17)
(7,-15)
(7,-13)
(7,-11)
(7,-9)
(7,-8)
(7,8)
(7,9)
(7,11)
(7,13)
(7,15)
(7,17)
(7,18)
(7,23)
(7,25)
(7,29)
(7,37)
(7,43)
(7,47)
(7,57)
(7,73)
(7,103)
(7,128)
(7,169)
(7,249)
(7,257)
(7,263)
(7,493)
(7,7993)
(7,11257)
(8,-883)
(8,-113)
(8,-41)
(8,-19)
(8,-17)
(8,-13)
(8,13)
(8,17)
(8,19)
(8,41)
(8,113)
(8,883)
(9,-1241)
(9,-695)
(9,-233)
(9,-119)
(9,-89)
(9,-79)
(9,-41)
(9,-31)
(9,-23)
(9,-19)
(9,-16)
(9,-13)
(9,-11)
(9,11)
(9,13)
(9,16)
(9,19)
(9,23)
(9,31)
(9,41)
(9,79)
(9,89)
(9,119)
(9,233)
(9,695)
(9,1241)
(10,-353)
(10,-17)
(10,-11)
(10,11)
(10,17)
(10,353)
(11,-6261)
(11,-1739)
(11,-1361)
(11,-501)
(11,-389)
(11,-151)
(11,-139)
(11,-136)
(11,-109)
(11,-101)
(11,-61)
(11,-59)
(11,-53)
(11,-43)
(11,-39)
(11,-38)
(11,-31)
(11,-29)
(11,-25)
(11,-21)
(11,-19)
(11,-17)
(11,-16)
(11,-14)
(11,-13)
(11,13)
(11,14)
(11,16)
(11,17)
(11,19)
(11,21)
(11,25)
(11,29)
(11,31)
(11,38)
(11,39)
(11,43)
(11,53)
(11,59)
(11,61)
(11,101)
(11,109)
(11,136)
(11,139)
(11,151)
(11,389)
(11,501)
(11,1361)
(11,1739)
(11,6261)
(12,-37)
(12,-23)
(12,-13)
(12,13)
(12,23)
(12,37)
(14,-41)
(14,-19)
(14,19)
(14,41)
(15,-113)
(15,-29)
(15,-17)
(15,17)
(15,29)
(15,113)
(16,-359)
(16,-259)
(16,-65)
(16,-61)
(16,-19)
(16,-17)
(16,17)
(16,19)
(16,61)
(16,65)
(16,259)
(16,359)
(20,-101)
(20,-29)
(20,29)
(20,101)
(21,-221)
(21,-43)
(21,-29)
(21,-23)
(21,23)
(21,29)
(21,43)
(21,221)
(22,-103)
(22,-27)
(22,-23)
(22,23)
(22,27)
(22,103)
(24,-101)
(24,-31)
(24,-25)
(24,25)
(24,31)
(24,101)
(25,-4777)
(25,-1433)
(25,-487)
(25,-217)
(25,-151)
(25,-137)
(25,-74)
(25,-73)
(25,-52)
(25,-47)
(25,-41)
(25,-39)
(25,-31)
(25,-29)
(25,29)
(25,31)
(25,39)
(25,41)
(25,47)
(25,52)
(25,73)
(25,74)
(25,137)
(25,151)
(25,217)
(25,487)
(25,1433)
(25,4777)
(27,-1051)
(27,-223)
(27,-148)
(27,-127)
(27,-83)
(27,-71)
(27,-43)
(27,-37)
(27,-29)
(27,-28)
(27,28)
(27,29)
(27,37)
(27,43)
(27,71)
(27,83)
(27,127)
(27,148)
(27,223)
(27,1051)
(28,-53)
(28,53)
(32,-157)
(32,-67)
(32,-43)
(32,43)
(32,67)
(32,157)
(33,-65)
(33,-47)
(33,-37)
(33,37)
(33,47)
(33,65)
(35,-2627)
(35,-163)
(35,-53)
(35,-46)
(35,-37)
(35,37)
(35,46)
(35,53)
(35,163)
(35,2627)
(36,-85)
(36,-41)
(36,41)
(36,85)
(40,-41)
(40,41)
(45,-109)
(45,-67)
(45,-53)
(45,53)
(45,67)
(45,109)
(48,-73)
(48,73)
(49,-32719)
(49,-1201)
(49,-599)
(49,-401)
(49,-193)
(49,-149)
(49,-113)
(49,-79)
(49,-76)
(49,-71)
(49,-61)
(49,-59)
(49,-51)
(49,-50)
(49,50)
(49,51)
(49,59)
(49,61)
(49,71)
(49,76)
(49,79)
(49,113)
(49,149)
(49,193)
(49,401)
(49,599)
(49,1201)
(49,32719)
(50,-293)
(50,-71)
(50,71)
(50,293)
(55,-1513)
(55,-1079)
(55,-631)
(55,-73)
(55,-71)
(55,-57)
(55,57)
(55,71)
(55,73)
(55,631)
(55,1079)
(55,1513)
(56,-65)
(56,65)
(60,-61)
(60,61)
(63,-113)
(63,-65)
(63,65)
(63,113)
(64,-3709)
(64,-211)
(64,-71)
(64,71)
(64,211)
(64,3709)
(75,-317)
(75,-79)
(75,79)
(75,317)
(77,-563)
(77,-173)
(77,-85)
(77,-83)
(77,83)
(77,85)
(77,173)
(77,563)
(81,-2581)
(81,-1291)
(81,-431)
(81,-169)
(81,-161)
(81,-95)
(81,95)
(81,161)
(81,169)
(81,431)
(81,1291)
(81,2581)
(88,-137)
(88,137)
(99,-4901)
(99,-349)
(99,-101)
(99,101)
(99,349)
(99,4901)
(105,-137)
(105,137)
(112,-113)
(112,113)
(121,-1129)
(121,-761)
(121,-391)
(121,-271)
(121,-229)
(121,-149)
(121,-135)
(121,-131)
(121,-129)
(121,-124)
(121,-122)
(121,122)
(121,124)
(121,129)
(121,131)
(121,135)
(121,149)
(121,229)
(121,271)
(121,391)
(121,761)
(121,1129)
(125,-1819)
(125,-323)
(125,-253)
(125,-169)
(125,-139)
(125,-131)
(125,-127)
(125,127)
(125,131)
(125,139)
(125,169)
(125,253)
(125,323)
(125,1819)
(135,-377)
(135,377)
(144,-199)
(144,199)
(147,-403)
(147,403)
(160,-281)
(160,281)
(175,-337)
(175,-177)
(175,177)
(175,337)
(189,-211)
(189,211)
(192,-1523)
(192,-193)
(192,193)
(192,1523)
(220,-221)
(220,221)
(231,-281)
(231,281)
(242,-487)
(242,487)
(243,-443)
(243,-397)
(243,-307)
(243,-257)
(243,-247)
(243,247)
(243,257)
(243,307)
(243,397)
(243,443)
(245,-1213)
(245,-267)
(245,267)
(245,1213)
(252,-373)
(252,373)
(256,-619)
(256,-311)
(256,-283)
(256,283)
(256,311)
(256,619)
(275,-373)
(275,373)
(288,-337)
(288,337)
(297,-983)
(297,983)
(308,-317)
(308,317)
(324,-3449)
(324,3449)
(343,-1593)
(343,-937)
(343,-407)
(343,-383)
(343,-361)
(343,361)
(343,383)
(343,407)
(343,937)
(343,1593)
(352,-377)
(352,377)
(363,-1387)
(363,1387)
(432,-443)
(432,443)
(512,-517)
(512,517)
(539,-541)
(539,541)
(605,-767)
(605,767)
(625,-4721)
(625,-1311)
(625,-706)
(625,706)
(625,1311)
(625,4721)
(648,-683)
(648,683)
(675,-697)
(675,697)
(686,-689)
(686,689)
(729,-839)
(729,839)
(847,-1097)
(847,1097)
(875,-907)
(875,907)
(891,-901)
(891,901)
(1024,-3211)
(1024,-1649)
(1024,1649)
(1024,3211)
(1125,-17509)
(1125,17509)
(1188,-1213)
(1188,1213)
(1200,-1201)
(1200,1201)
(1323,-1339)
(1323,1339)
(1331,-20539)
(1331,-2099)
(1331,2099)
(1331,20539)
(1512,-1513)
(1512,1513)
(1792,-16433)
(1792,16433)
(2187,-6283)
(2187,-2188)
(2187,2188)
(2187,6283)
(2401,-2599)
(2401,2599)
(3125,-4421)
(3125,-3147)
(3125,3147)
(3125,4421)
(3645,-3901)
(3645,3901)
(3993,-4007)
(3993,4007)
(4096,-5221)
(4096,5221)
(4802,-6133)
(4802,6133)
(4900,-4901)
(4900,4901)
(5625,-5639)
(5625,5639)
(14641,-21809)
(14641,21809)
(16335,-16433)
(16335,16433)
#
# (a,b,c,d) = (0,1,2,0) and D = -4:
#
(-36450,14641)
(-32768,49)
(-32768,16335)
(-21870,1331)
(-19602,1)
(-18634,1125)
(-18225,1792)
(-11264,7)
(-11264,5625)
(-10935,4802)
(-9801,4900)
(-9317,4096)
(-8750,1)
(-8470,2187)
(-8000,7)
(-8000,3993)
(-7546,3125)
(-7546,3645)
(-6272,11)
(-6272,3125)
(-6050,1)
(-5346,625)
(-5000,99)
(-5000,2401)
(-4802,1)
(-4802,25)
(-4375,2187)
(-4235,1024)
(-3773,64)
(-3773,324)
(-3430,1331)
(-3025,1512)
(-2750,3)
(-2673,1024)
(-2662,35)
(-2662,81)
(-2662,1323)
(-2401,1188)
(-2401,1200)
(-2058,5)
(-1944,125)
(-1944,847)
(-1936,343)
(-1936,625)
(-1792,5)
(-1792,891)
(-1782,875)
(-1750,11)
(-1750,363)
(-1715,192)
(-1568,55)
(-1568,729)
(-1458,25)
(-1458,245)
(-1375,686)
(-1372,11)
(-1372,81)
(-1372,605)
(-1372,675)
(-1331,4)
(-1331,625)
(-1331,648)
(-1280,297)
(-1280,343)
(-1250,9)
(-1250,49)
(-1250,121)
(-1134,55)
(-1080,1)
(-1080,539)
(-1078,27)
(-1029,512)
(-891,8)
(-882,1)
(-882,121)
(-875,256)
(-875,432)
(-770,1)
(-750,343)
(-729,242)
(-729,352)
(-726,343)
(-704,9)
(-704,343)
(-686,55)
(-686,243)
(-648,49)
(-648,275)
(-640,77)
(-640,243)
(-625,252)
(-625,288)
(-625,308)
(-567,256)
(-550,147)
(-550,243)
(-539,256)
(-512,11)
(-512,25)
(-512,81)
(-512,121)
(-512,135)
(-512,175)
(-512,231)
(-512,245)
(-500,7)
(-500,243)
(-490,3)
(-490,243)
(-486,1)
(-450,1)
(-450,49)
(-448,99)
(-448,125)
(-441,160)
(-441,220)
(-400,11)
(-400,189)
(-392,75)
(-392,121)
(-385,192)
(-378,125)
(-375,16)
(-363,10)
(-352,1)
(-352,175)
(-350,121)
(-343,50)
(-343,144)
(-294,125)
(-275,16)
(-275,64)
(-270,7)
(-270,121)
(-264,7)
(-264,125)
(-256,3)
(-256,7)
(-256,121)
(-256,125)
(-252,1)
(-252,5)
(-252,121)
(-252,125)
(-250,27)
(-250,77)
(-250,81)
(-250,121)
(-245,1)
(-245,121)
(-243,121)
(-242,1)
(-242,9)
(-242,21)
(-242,25)
(-242,49)
(-242,81)
(-242,105)
(-225,88)
(-225,112)
(-200,1)
(-200,99)
(-198,1)
(-198,35)
(-198,49)
(-189,32)
(-176,7)
(-176,25)
(-176,63)
(-176,81)
(-175,27)
(-162,1)
(-162,11)
(-162,25)
(-162,49)
(-162,77)
(-160,3)
(-160,77)
(-154,5)
(-154,27)
(-154,45)
(-154,75)
(-150,11)
(-147,11)
(-135,7)
(-135,64)
(-128,1)
(-128,9)
(-128,15)
(-128,49)
(-128,55)
(-128,63)
(-126,55)
(-125,2)
(-125,22)
(-125,24)
(-125,49)
(-121,8)
(-121,20)
(-121,36)
(-121,48)
(-121,50)
(-121,56)
(-121,60)
(-120,11)
(-120,49)
(-112,1)
(-112,11)
(-112,45)
(-112,55)
(-110,1)
(-110,7)
(-110,27)
(-110,49)
(-108,5)
(-108,49)
(-100,1)
(-100,49)
(-99,25)
(-99,32)
(-99,49)
(-98,1)
(-98,5)
(-98,9)
(-98,25)
(-98,27)
(-98,33)
(-98,45)
(-90,1)
(-88,9)
(-88,35)
(-81,2)
(-81,16)
(-81,28)
(-81,35)
(-81,40)
(-80,7)
(-80,33)
(-77,1)
(-77,16)
(-77,25)
(-77,36)
(-75,32)
(-72,1)
(-72,11)
(-72,25)
(-72,35)
(-70,3)
(-70,11)
(-70,27)
(-70,33)
(-66,1)
(-66,5)
(-66,25)
(-64,5)
(-64,7)
(-64,11)
(-64,21)
(-64,25)
(-64,27)
(-63,4)
(-56,1)
(-56,3)
(-56,25)
(-56,27)
(-55,3)
(-55,14)
(-55,24)
(-55,27)
(-54,5)
(-54,7)
(-54,11)
(-54,25)
(-50,1)
(-50,3)
(-50,7)
(-50,9)
(-50,11)
(-50,21)
(-49,2)
(-49,8)
(-49,11)
(-49,12)
(-49,20)
(-49,22)
(-49,24)
(-45,22)
(-44,1)
(-44,7)
(-44,15)
(-44,21)
(-42,1)
(-42,5)
(-42,11)
(-40,9)
(-40,11)
(-36,7)
(-36,11)
(-35,1)
(-35,4)
(-35,12)
(-35,16)
(-33,4)
(-33,14)
(-33,16)
(-32,1)
(-32,5)
(-32,7)
(-32,9)
(-32,11)
(-32,15)
(-30,1)
(-30,7)
(-30,11)
(-28,3)
(-28,5)
(-28,9)
(-28,11)
(-27,1)
(-27,8)
(-27,10)
(-27,11)
(-25,2)
(-25,7)
(-25,8)
(-25,9)
(-25,11)
(-25,12)
(-24,1)
(-24,5)
(-24,7)
(-24,11)
(-22,1)
(-22,3)
(-22,5)
(-22,7)
(-22,9)
(-21,5)
(-21,8)
(-21,10)
(-20,1)
(-20,3)
(-20,7)
(-20,9)
(-18,1)
(-18,5)
(-18,7)
(-16,1)
(-16,3)
(-16,5)
(-16,7)
(-15,2)
(-15,4)
(-15,7)
(-14,1)
(-14,3)
(-14,5)
(-12,1)
(-12,5)
(-11,1)
(-11,2)
(-11,3)
(-11,4)
(-11,5)
(-10,1)
(-10,3)
(-9,1)
(-9,2)
(-9,4)
(-8,1)
(-8,3)
(-7,1)
(-7,2)
(-7,3)
(-6,1)
(-5,1)
(-5,2)
(-4,1)
(-3,1)
(1,-270)
(1,-88)
(1,-63)
(1,-50)
(1,-32)
(1,-28)
(1,-25)
(1,-18)
(1,-14)
(1,-11)
(1,-8)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,3)
(1,4)
(1,5)
(1,7)
(1,10)
(1,12)
(1,16)
(1,22)
(1,24)
(1,27)
(1,40)
(1,49)
(1,60)
(1,112)
(1,121)
(1,192)
(1,220)
(1,1200)
(1,1512)
(1,2187)
(1,4900)
(2,-9801)
(2,-4375)
(2,-3025)
(2,-2401)
(2,-441)
(2,-385)
(2,-243)
(2,-225)
(2,-121)
(2,-99)
(2,-81)
(2,-55)
(2,-49)
(2,-45)
(2,-33)
(2,-25)
(2,-21)
(2,-15)
(2,-11)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,5)
(2,7)
(2,9)
(2,11)
(2,15)
(2,21)
(2,27)
(2,35)
(2,49)
(2,55)
(2,63)
(2,99)
(2,125)
(2,175)
(2,539)
(3,-64)
(3,-40)
(3,-14)
(3,-7)
(3,-5)
(3,-4)
(3,-2)
(3,1)
(3,2)
(3,4)
(3,11)
(3,16)
(3,121)
(3,686)
(4,-245)
(4,-77)
(4,-35)
(4,-27)
(4,-11)
(4,-9)
(4,-7)
(4,-5)
(4,-3)
(4,1)
(4,3)
(4,5)
(4,7)
(4,9)
(4,25)
(4,33)
(4,75)
(4,243)
(5,-448)
(5,-63)
(5,-27)
(5,-16)
(5,-8)
(5,-7)
(5,-6)
(5,-4)
(5,-3)
(5,1)
(5,2)
(5,3)
(5,8)
(5,11)
(5,14)
(5,22)
(5,36)
(5,512)
(6,-1375)
(6,-245)
(6,-35)
(6,-25)
(6,-11)
(6,-7)
(6,-5)
(6,1)
(6,5)
(6,7)
(6,11)
(6,25)
(6,77)
(6,125)
(7,-2816)
(7,-2000)
(7,-125)
(7,-66)
(7,-64)
(7,-44)
(7,-20)
(7,-16)
(7,-11)
(7,-9)
(7,-8)
(7,-6)
(7,-5)
(7,-4)
(7,1)
(7,2)
(7,4)
(7,9)
(7,10)
(7,24)
(7,64)
(8,-125)
(8,-81)
(8,-49)
(8,-25)
(8,-15)
(8,-11)
(8,-9)
(8,-7)
(8,-5)
(8,1)
(8,3)
(8,5)
(8,7)
(8,11)
(8,21)
(8,45)
(8,77)
(8,121)
(9,-176)
(9,-32)
(9,-22)
(9,-10)
(9,-8)
(9,-7)
(9,-5)
(9,1)
(9,8)
(9,20)
(9,56)
(9,308)
(10,-1029)
(10,-77)
(10,-49)
(10,-33)
(10,-27)
(10,-21)
(10,-11)
(10,-9)
(10,-7)
(10,1)
(10,3)
(10,7)
(10,9)
(10,11)
(10,27)
(10,49)
(10,121)
(10,891)
(11,-1568)
(11,-343)
(11,-128)
(11,-100)
(11,-30)
(11,-28)
(11,-18)
(11,-16)
(11,-10)
(11,-9)
(11,-8)
(11,-7)
(11,-6)
(11,2)
(11,5)
(11,7)
(11,8)
(11,12)
(11,32)
(11,35)
(11,432)
(12,-55)
(12,-11)
(12,-7)
(12,1)
(12,5)
(12,49)
(14,-135)
(14,-55)
(14,-27)
(14,-25)
(14,-15)
(14,-11)
(14,-9)
(14,1)
(14,3)
(14,5)
(14,9)
(14,11)
(14,15)
(14,25)
(14,33)
(14,81)
(14,121)
(14,125)
(14,243)
(14,3993)
(14,5625)
(15,-32)
(15,-11)
(15,-8)
(16,-1331)
(16,-63)
(16,-35)
(16,-33)
(16,-15)
(16,-11)
(16,-9)
(16,1)
(16,3)
(16,7)
(16,25)
(16,27)
(16,55)
(16,1323)
(18,-625)
(18,-121)
(18,-49)
(18,-25)
(18,-11)
(18,1)
(18,5)
(18,7)
(18,11)
(18,35)
(18,55)
(18,343)
(20,-21)
(20,-11)
(20,1)
(20,11)
(21,-16)
(21,-11)
(21,2)
(21,50)
(22,-875)
(22,-81)
(22,-75)
(22,-35)
(22,-27)
(22,-25)
(22,-21)
(22,-15)
(22,1)
(22,3)
(22,5)
(22,7)
(22,9)
(22,21)
(22,25)
(22,45)
(22,49)
(22,189)
(22,245)
(22,675)
(22,3125)
(25,-128)
(25,-44)
(25,-18)
(25,-16)
(25,-14)
(25,1)
(25,4)
(25,12)
(25,28)
(25,48)
(25,352)
(25,1188)
(27,-16)
(27,-14)
(27,4)
(27,11)
(27,14)
(27,25)
(27,49)
(27,256)
(28,-135)
(28,-25)
(28,-15)
(28,1)
(28,11)
(28,121)
(30,1)
(30,7)
(30,49)
(32,-891)
(32,-121)
(32,-49)
(32,-27)
(32,-25)
(32,-21)
(32,5)
(32,9)
(32,11)
(32,33)
(32,105)
(32,875)
(33,-20)
(33,1)
(33,8)
(35,-22)
(35,-18)
(35,32)
(35,648)
(36,-25)
(36,7)
(40,-363)
(40,-27)
(40,-21)
(40,1)
(40,7)
(40,343)
(42,-121)
(42,-25)
(42,1)
(42,11)
(44,-147)
(44,-49)
(44,-27)
(44,-25)
(44,3)
(44,5)
(44,27)
(44,125)
(45,-28)
(45,2)
(45,16)
(48,-49)
(48,-35)
(48,-25)
(48,1)
(48,11)
(48,25)
(49,-8192)
(49,-162)
(49,-32)
(49,-30)
(49,-27)
(49,-25)
(49,3)
(49,16)
(49,25)
(49,36)
(49,88)
(49,288)
(50,-2401)
(50,-729)
(50,-121)
(50,-81)
(50,-49)
(50,-33)
(50,-27)
(50,3)
(50,7)
(50,11)
(50,63)
(50,231)
(54,-539)
(54,-125)
(54,-77)
(54,-55)
(54,-49)
(54,-35)
(54,1)
(54,5)
(55,-392)
(55,-32)
(55,-28)
(55,4)
(55,144)
(55,256)
(56,-55)
(56,-33)
(56,5)
(56,27)
(63,-44)
(63,-32)
(64,-375)
(64,-275)
(64,-81)
(64,-77)
(64,-35)
(64,-33)
(64,1)
(64,3)
(64,45)
(64,49)
(64,243)
(64,343)
(66,-49)
(66,-35)
(66,7)
(70,-1331)
(70,-99)
(70,1)
(70,9)
(75,-98)
(75,1)
(77,-160)
(77,-40)
(77,2)
(77,24)
(80,-121)
(80,-49)
(80,9)
(80,81)
(81,-343)
(81,-128)
(81,-44)
(81,20)
(81,22)
(81,625)
(88,-125)
(88,-49)
(88,-45)
(88,1)
(88,5)
(88,81)
(90,-77)
(90,-49)
(90,11)
(96,-125)
(96,-55)
(96,-49)
(96,1)
(96,7)
(96,77)
(98,-625)
(98,-225)
(98,-121)
(98,-99)
(98,-81)
(98,-55)
(98,1)
(98,5)
(98,11)
(98,15)
(98,275)
(98,16335)
(99,-1250)
(99,-112)
(99,-50)
(100,-99)
(100,-77)
(100,27)
(100,49)
(105,8)
(108,-175)
(108,-55)
(108,1)
(108,121)
(110,-567)
(110,-343)
(110,-63)
(110,1)
(110,9)
(110,729)
(112,-81)
(112,25)
(121,-128)
(121,-98)
(121,-64)
(121,-63)
(121,2)
(121,7)
(121,27)
(121,160)
(121,252)
(125,-486)
(125,-112)
(125,-66)
(125,-64)
(125,-63)
(125,11)
(125,32)
(126,1)
(126,25)
(128,-189)
(128,-99)
(128,-75)
(128,11)
(128,35)
(128,125)
(135,-128)
(140,-81)
(140,11)
(144,-121)
(144,-77)
(144,5)
(144,49)
(147,64)
(150,-77)
(150,121)
(154,-125)
(154,-81)
(154,3)
(154,243)
(160,-81)
(160,1)
(162,-1331)
(162,-125)
(162,-121)
(162,7)
(162,175)
(162,605)
(175,-128)
(175,-88)
(189,-100)
(192,-121)
(192,25)
(196,-125)
(196,-99)
(196,1)
(196,27)
(198,1)
(198,125)
(198,2401)
(200,-343)
(200,-121)
(200,21)
(200,243)
(210,-121)
(224,-121)
(224,9)
(231,-128)
(240,-121)
(240,1)
(242,-625)
(242,-441)
(242,-175)
(242,-135)
(242,-125)
(242,5)
(242,7)
(242,75)
(242,135)
(243,-160)
(243,-125)
(243,1)
(243,16)
(243,50)
(245,-128)
(245,242)
(250,-189)
(250,-147)
(250,1)
(250,3)
(250,7)
(250,99)
(250,847)
(256,-3773)
(256,-275)
(256,-135)
(256,7)
(256,147)
(256,3645)
(270,121)
(275,-162)
(294,-275)
(297,-320)
(343,-484)
(343,-320)
(343,-176)
(343,10)
(343,16)
(350,1)
(350,81)
(352,-225)
(352,49)
(363,256)
(378,11)
(448,-225)
(448,1)
(462,25)
(484,-245)
(484,-243)
(484,1)
(484,3)
(486,-343)
(486,-275)
(486,-245)
(486,7)
(486,77)
(490,-729)
(490,11)
(539,-270)
(550,49)
(576,-343)
(576,55)
(594,343)
(605,-343)
(625,-484)
(625,1024)
(640,-441)
(640,121)
(675,-343)
(686,-375)
(686,-363)
(686,9)
(686,297)
(686,625)
(726,-875)
(729,-392)
(768,-1715)
(768,-385)
(768,1)
(768,1331)
(847,-486)
(875,8)
(880,-441)
(880,1)
(891,-448)
(968,-729)
(968,245)
(1008,-625)
(1008,121)
(1024,-875)
(1024,-567)
(1024,-539)
(1024,27)
(1024,55)
(1024,363)
(1078,1)
(1125,4096)
(1152,-625)
(1152,49)
(1210,81)
(1232,-625)
(1232,9)
(1250,-2673)
(1250,343)
(1296,-3773)
(1296,3125)
(1323,4)
(1331,192)
(1331,4802)
(1350,11)
(1408,-729)
(1408,25)
(1458,55)
(1694,125)
(1728,-875)
(1728,11)
(1750,-891)
(1782,5)
(2048,-1029)
(2048,5)
(2187,1024)
(2250,-9317)
(2401,-1250)
(2500,-1331)
(2500,81)
(2592,-1331)
(2592,35)
(2646,-1331)
(2662,-10935)
(2662,-1715)
(2744,-1375)
(2744,3)
(3125,-1568)
(3125,324)
(3645,64)
(3993,-2000)
(4096,-4235)
(4096,-2673)
(4096,625)
(4096,2187)
(4374,-4235)
(4752,-2401)
(4752,25)
(4800,-2401)
(4800,1)
(4802,99)
(5625,-2816)
(6048,-3025)
(6048,1)
(6250,-3773)
(6250,11)
(7168,-18225)
(7168,14641)
(7290,-3773)
(7986,7)
(8748,-4375)
(8748,1)
(11250,7)
(14641,1792)
(16335,-8192)
(16384,-9317)
(16384,1125)
(19208,-10935)
(19208,1331)
(19600,-9801)
(19600,1)
(29282,-18225)
(32670,49)
#
# (a,b,c,d) = (0,1,1,0) and D = -1:
#
(-18225,3584)
(-18225,14641)
(-16384,49)
(-16384,16335)
(-10935,1331)
(-10935,9604)
(-9801,1)
(-9801,9800)
(-9317,1125)
(-9317,8192)
(-5632,7)
(-5632,5625)
(-4375,1)
(-4375,4374)
(-4235,2048)
(-4235,2187)
(-4000,7)
(-4000,3993)
(-3773,128)
(-3773,648)
(-3773,3125)
(-3773,3645)
(-3136,11)
(-3136,3125)
(-3025,1)
(-3025,3024)
(-2673,625)
(-2673,2048)
(-2500,99)
(-2500,2401)
(-2401,1)
(-2401,25)
(-2401,2376)
(-2401,2400)
(-1715,384)
(-1715,1331)
(-1375,3)
(-1375,1372)
(-1331,8)
(-1331,35)
(-1331,81)
(-1331,1250)
(-1331,1296)
(-1331,1323)
(-1029,5)
(-1029,1024)
(-972,125)
(-972,847)
(-968,343)
(-968,625)
(-896,5)
(-896,891)
(-891,16)
(-891,875)
(-875,11)
(-875,363)
(-875,512)
(-875,864)
(-784,55)
(-784,729)
(-729,25)
(-729,245)
(-729,484)
(-729,704)
(-686,11)
(-686,81)
(-686,605)
(-686,675)
(-640,297)
(-640,343)
(-625,9)
(-625,49)
(-625,121)
(-625,504)
(-625,576)
(-625,616)
(-567,55)
(-567,512)
(-540,1)
(-540,539)
(-539,27)
(-539,512)
(-441,1)
(-441,121)
(-441,320)
(-441,440)
(-385,1)
(-385,384)
(-375,32)
(-375,343)
(-363,20)
(-363,343)
(-352,9)
(-352,343)
(-343,55)
(-343,100)
(-343,243)
(-343,288)
(-324,49)
(-324,275)
(-320,77)
(-320,243)
(-275,32)
(-275,128)
(-275,147)
(-275,243)
(-256,11)
(-256,25)
(-256,81)
(-256,121)
(-256,135)
(-256,175)
(-256,231)
(-256,245)
(-250,7)
(-250,243)
(-245,2)
(-245,3)
(-245,242)
(-245,243)
(-243,1)
(-243,242)
(-225,1)
(-225,49)
(-225,176)
(-225,224)
(-224,99)
(-224,125)
(-200,11)
(-200,189)
(-196,75)
(-196,121)
(-189,64)
(-189,125)
(-176,1)
(-176,175)
(-175,54)
(-175,121)
(-147,22)
(-147,125)
(-135,7)
(-135,14)
(-135,121)
(-135,128)
(-132,7)
(-132,125)
(-128,3)
(-128,7)
(-128,121)
(-128,125)
(-126,1)
(-126,5)
(-126,121)
(-126,125)
(-125,4)
(-125,27)
(-125,44)
(-125,48)
(-125,77)
(-125,81)
(-125,98)
(-125,121)
(-121,1)
(-121,9)
(-121,16)
(-121,21)
(-121,25)
(-121,40)
(-121,49)
(-121,72)
(-121,81)
(-121,96)
(-121,100)
(-121,105)
(-121,112)
(-121,120)
(-100,1)
(-100,99)
(-99,1)
(-99,35)
(-99,49)
(-99,50)
(-99,64)
(-99,98)
(-88,7)
(-88,25)
(-88,63)
(-88,81)
(-81,1)
(-81,4)
(-81,11)
(-81,25)
(-81,32)
(-81,49)
(-81,56)
(-81,70)
(-81,77)
(-81,80)
(-80,3)
(-80,77)
(-77,2)
(-77,5)
(-77,27)
(-77,32)
(-77,45)
(-77,50)
(-77,72)
(-77,75)
(-75,11)
(-75,64)
(-64,1)
(-64,9)
(-64,15)
(-64,49)
(-64,55)
(-64,63)
(-63,8)
(-63,55)
(-60,11)
(-60,49)
(-56,1)
(-56,11)
(-56,45)
(-56,55)
(-55,1)
(-55,6)
(-55,7)
(-55,27)
(-55,28)
(-55,48)
(-55,49)
(-55,54)
(-54,5)
(-54,49)
(-50,1)
(-50,49)
(-49,1)
(-49,4)
(-49,5)
(-49,9)
(-49,16)
(-49,22)
(-49,24)
(-49,25)
(-49,27)
(-49,33)
(-49,40)
(-49,44)
(-49,45)
(-49,48)
(-45,1)
(-45,44)
(-44,9)
(-44,35)
(-40,7)
(-40,33)
(-36,1)
(-36,11)
(-36,25)
(-36,35)
(-35,2)
(-35,3)
(-35,8)
(-35,11)
(-35,24)
(-35,27)
(-35,32)
(-35,33)
(-33,1)
(-33,5)
(-33,8)
(-33,25)
(-33,28)
(-33,32)
(-32,5)
(-32,7)
(-32,11)
(-32,21)
(-32,25)
(-32,27)
(-28,1)
(-28,3)
(-28,25)
(-28,27)
(-27,2)
(-27,5)
(-27,7)
(-27,11)
(-27,16)
(-27,20)
(-27,22)
(-27,25)
(-25,1)
(-25,3)
(-25,4)
(-25,7)
(-25,9)
(-25,11)
(-25,14)
(-25,16)
(-25,18)
(-25,21)
(-25,22)
(-25,24)
(-22,1)
(-22,7)
(-22,15)
(-22,21)
(-21,1)
(-21,5)
(-21,10)
(-21,11)
(-21,16)
(-21,20)
(-20,9)
(-20,11)
(-18,7)
(-18,11)
(-16,1)
(-16,5)
(-16,7)
(-16,9)
(-16,11)
(-16,15)
(-15,1)
(-15,4)
(-15,7)
(-15,8)
(-15,11)
(-15,14)
(-14,3)
(-14,5)
(-14,9)
(-14,11)
(-12,1)
(-12,5)
(-12,7)
(-12,11)
(-11,1)
(-11,2)
(-11,3)
(-11,4)
(-11,5)
(-11,6)
(-11,7)
(-11,8)
(-11,9)
(-11,10)
(-10,1)
(-10,3)
(-10,7)
(-10,9)
(-9,1)
(-9,2)
(-9,4)
(-9,5)
(-9,7)
(-9,8)
(-8,1)
(-8,3)
(-8,5)
(-8,7)
(-7,1)
(-7,2)
(-7,3)
(-7,4)
(-7,5)
(-7,6)
(-6,1)
(-6,5)
(-5,1)
(-5,2)
(-5,3)
(-5,4)
(-4,1)
(-4,3)
(-3,1)
(-3,2)
(-2,1)
(1,-9801)
(1,-4375)
(1,-3025)
(1,-2401)
(1,-540)
(1,-441)
(1,-385)
(1,-243)
(1,-225)
(1,-176)
(1,-126)
(1,-121)
(1,-100)
(1,-99)
(1,-81)
(1,-64)
(1,-56)
(1,-55)
(1,-50)
(1,-49)
(1,-45)
(1,-36)
(1,-33)
(1,-28)
(1,-25)
(1,-22)
(1,-21)
(1,-16)
(1,-15)
(1,-12)
(1,-11)
(1,-10)
(1,-9)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,1)
(1,2)
(1,3)
(1,4)
(1,5)
(1,6)
(1,7)
(1,8)
(1,9)
(1,10)
(1,11)
(1,14)
(1,15)
(1,20)
(1,21)
(1,24)
(1,27)
(1,32)
(1,35)
(1,44)
(1,48)
(1,49)
(1,54)
(1,55)
(1,63)
(1,80)
(1,98)
(1,99)
(1,120)
(1,125)
(1,175)
(1,224)
(1,242)
(1,384)
(1,440)
(1,539)
(1,2400)
(1,3024)
(1,4374)
(1,9800)
(2,-245)
(2,-77)
(2,-35)
(2,-27)
(2,-11)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,5)
(2,7)
(2,9)
(2,25)
(2,33)
(2,75)
(2,243)
(3,-1375)
(3,-245)
(3,-128)
(3,-80)
(3,-35)
(3,-28)
(3,-25)
(3,-14)
(3,-11)
(3,-10)
(3,-8)
(3,-7)
(3,-5)
(3,-4)
(3,1)
(3,2)
(3,4)
(3,5)
(3,7)
(3,8)
(3,11)
(3,22)
(3,25)
(3,32)
(3,77)
(3,125)
(3,242)
(3,1372)
(4,-125)
(4,-81)
(4,-49)
(4,-25)
(4,-15)
(4,-11)
(4,-9)
(4,-7)
(4,-5)
(4,1)
(4,3)
(4,5)
(4,7)
(4,11)
(4,21)
(4,45)
(4,77)
(4,121)
(5,-1029)
(5,-896)
(5,-126)
(5,-77)
(5,-54)
(5,-49)
(5,-33)
(5,-32)
(5,-27)
(5,-21)
(5,-16)
(5,-14)
(5,-12)
(5,-11)
(5,-9)
(5,-8)
(5,-7)
(5,-6)
(5,1)
(5,2)
(5,3)
(5,4)
(5,6)
(5,7)
(5,9)
(5,11)
(5,16)
(5,22)
(5,27)
(5,28)
(5,44)
(5,49)
(5,72)
(5,121)
(5,891)
(5,1024)
(6,-55)
(6,-11)
(6,-7)
(6,1)
(6,5)
(6,49)
(7,-5632)
(7,-4000)
(7,-250)
(7,-135)
(7,-132)
(7,-128)
(7,-88)
(7,-55)
(7,-40)
(7,-32)
(7,-27)
(7,-25)
(7,-22)
(7,-18)
(7,-16)
(7,-15)
(7,-12)
(7,-11)
(7,-10)
(7,-9)
(7,-8)
(7,1)
(7,2)
(7,3)
(7,4)
(7,5)
(7,8)
(7,9)
(7,11)
(7,15)
(7,18)
(7,20)
(7,25)
(7,33)
(7,48)
(7,81)
(7,121)
(7,125)
(7,128)
(7,243)
(7,3993)
(7,5625)
(8,-1331)
(8,-63)
(8,-35)
(8,-33)
(8,-15)
(8,-11)
(8,-9)
(8,1)
(8,3)
(8,7)
(8,25)
(8,27)
(8,55)
(8,1323)
(9,-625)
(9,-352)
(9,-121)
(9,-64)
(9,-49)
(9,-44)
(9,-25)
(9,-20)
(9,-16)
(9,-14)
(9,-11)
(9,-10)
(9,1)
(9,2)
(9,5)
(9,7)
(9,11)
(9,16)
(9,35)
(9,40)
(9,55)
(9,112)
(9,343)
(9,616)
(10,-21)
(10,-11)
(10,1)
(10,11)
(11,-3136)
(11,-875)
(11,-686)
(11,-256)
(11,-200)
(11,-81)
(11,-75)
(11,-60)
(11,-56)
(11,-36)
(11,-35)
(11,-32)
(11,-27)
(11,-25)
(11,-21)
(11,-20)
(11,-18)
(11,-16)
(11,-15)
(11,-14)
(11,-12)
(11,1)
(11,3)
(11,4)
(11,5)
(11,7)
(11,9)
(11,10)
(11,14)
(11,16)
(11,21)
(11,24)
(11,25)
(11,45)
(11,49)
(11,64)
(11,70)
(11,189)
(11,245)
(11,675)
(11,864)
(11,3125)
(14,-135)
(14,-25)
(14,-15)
(14,1)
(14,11)
(14,121)
(15,-64)
(15,-22)
(15,-16)
(15,1)
(15,7)
(15,49)
(16,-891)
(16,-121)
(16,-49)
(16,-27)
(16,-25)
(16,-21)
(16,5)
(16,9)
(16,11)
(16,33)
(16,105)
(16,875)
(18,-25)
(18,7)
(20,-363)
(20,-27)
(20,-21)
(20,1)
(20,7)
(20,343)
(21,-121)
(21,-32)
(21,-25)
(21,-22)
(21,1)
(21,4)
(21,11)
(21,100)
(22,-147)
(22,-49)
(22,-27)
(22,-25)
(22,3)
(22,5)
(22,27)
(22,125)
(24,-49)
(24,-35)
(24,-25)
(24,1)
(24,11)
(24,25)
(25,-2401)
(25,-729)
(25,-256)
(25,-121)
(25,-88)
(25,-81)
(25,-49)
(25,-36)
(25,-33)
(25,-32)
(25,-28)
(25,-27)
(25,2)
(25,3)
(25,7)
(25,8)
(25,11)
(25,24)
(25,56)
(25,63)
(25,96)
(25,231)
(25,704)
(25,2376)
(27,-539)
(27,-125)
(27,-77)
(27,-55)
(27,-49)
(27,-35)
(27,-32)
(27,-28)
(27,1)
(27,5)
(27,8)
(27,22)
(27,28)
(27,50)
(27,98)
(27,512)
(28,-55)
(28,-33)
(28,5)
(28,27)
(32,-375)
(32,-275)
(32,-81)
(32,-77)
(32,-35)
(32,-33)
(32,1)
(32,3)
(32,45)
(32,49)
(32,243)
(32,343)
(33,-49)
(33,-40)
(33,-35)
(33,2)
(33,7)
(33,16)
(35,-1331)
(35,-99)
(35,-44)
(35,-36)
(35,1)
(35,9)
(35,64)
(35,1296)
(40,-121)
(40,-49)
(40,9)
(40,81)
(44,-125)
(44,-49)
(44,-45)
(44,1)
(44,5)
(44,81)
(45,-77)
(45,-56)
(45,-49)
(45,4)
(45,11)
(45,32)
(48,-125)
(48,-55)
(48,-49)
(48,1)
(48,7)
(48,77)
(49,-16384)
(49,-625)
(49,-324)
(49,-225)
(49,-121)
(49,-99)
(49,-81)
(49,-64)
(49,-60)
(49,-55)
(49,-54)
(49,-50)
(49,1)
(49,5)
(49,6)
(49,11)
(49,15)
(49,32)
(49,50)
(49,72)
(49,176)
(49,275)
(49,576)
(49,16335)
(50,-99)
(50,-77)
(50,27)
(50,49)
(54,-175)
(54,-55)
(54,1)
(54,121)
(55,-784)
(55,-567)
(55,-343)
(55,-64)
(55,-63)
(55,-56)
(55,1)
(55,8)
(55,9)
(55,288)
(55,512)
(55,729)
(56,-81)
(56,25)
(63,-88)
(63,-64)
(63,1)
(63,25)
(64,-189)
(64,-99)
(64,-75)
(64,11)
(64,35)
(64,125)
(70,-81)
(70,11)
(72,-121)
(72,-77)
(72,5)
(72,49)
(75,-196)
(75,-77)
(75,2)
(75,121)
(77,-320)
(77,-125)
(77,-81)
(77,-80)
(77,3)
(77,4)
(77,48)
(77,243)
(80,-81)
(80,1)
(81,-1331)
(81,-686)
(81,-256)
(81,-125)
(81,-121)
(81,-88)
(81,7)
(81,40)
(81,44)
(81,175)
(81,605)
(81,1250)
(96,-121)
(96,25)
(98,-125)
(98,-99)
(98,1)
(98,27)
(99,-2500)
(99,-224)
(99,-100)
(99,1)
(99,125)
(99,2401)
(100,-343)
(100,-121)
(100,21)
(100,243)
(105,-121)
(105,16)
(112,-121)
(112,9)
(120,-121)
(120,1)
(121,-625)
(121,-441)
(121,-256)
(121,-196)
(121,-175)
(121,-135)
(121,-128)
(121,-126)
(121,-125)
(121,4)
(121,5)
(121,7)
(121,14)
(121,54)
(121,75)
(121,135)
(121,320)
(121,504)
(125,-972)
(125,-224)
(125,-189)
(125,-147)
(125,-132)
(125,-128)
(125,-126)
(125,1)
(125,3)
(125,7)
(125,22)
(125,64)
(125,99)
(125,847)
(128,-3773)
(128,-275)
(128,-135)
(128,7)
(128,147)
(128,3645)
(135,-256)
(135,121)
(147,-275)
(147,128)
(175,-256)
(175,-176)
(175,1)
(175,81)
(176,-225)
(176,49)
(189,-200)
(189,11)
(224,-225)
(224,1)
(231,-256)
(231,25)
(242,-245)
(242,-243)
(242,1)
(242,3)
(243,-343)
(243,-320)
(243,-275)
(243,-250)
(243,-245)
(243,2)
(243,7)
(243,32)
(243,77)
(243,100)
(245,-729)
(245,-256)
(245,11)
(245,484)
(275,-324)
(275,49)
(288,-343)
(288,55)
(297,-640)
(297,343)
(320,-441)
(320,121)
(343,-968)
(343,-640)
(343,-375)
(343,-363)
(343,-352)
(343,9)
(343,20)
(343,32)
(343,297)
(343,625)
(363,-875)
(363,512)
(384,-1715)
(384,-385)
(384,1)
(384,1331)
(440,-441)
(440,1)
(484,-729)
(484,245)
(504,-625)
(504,121)
(512,-875)
(512,-567)
(512,-539)
(512,27)
(512,55)
(512,363)
(539,-540)
(539,1)
(576,-625)
(576,49)
(605,-686)
(605,81)
(616,-625)
(616,9)
(625,-2673)
(625,-968)
(625,343)
(625,2048)
(648,-3773)
(648,3125)
(675,-686)
(675,11)
(704,-729)
(704,25)
(729,-784)
(729,55)
(847,-972)
(847,125)
(864,-875)
(864,11)
(875,-891)
(875,16)
(891,-896)
(891,5)
(1024,-1029)
(1024,5)
(1125,-9317)
(1125,8192)
(1250,-1331)
(1250,81)
(1296,-1331)
(1296,35)
(1323,-1331)
(1323,8)
(1331,-10935)
(1331,-1715)
(1331,384)
(1331,9604)
(1372,-1375)
(1372,3)
(2048,-4235)
(2048,-2673)
(2048,625)
(2048,2187)
(2187,-4235)
(2187,2048)
(2376,-2401)
(2376,25)
(2400,-2401)
(2400,1)
(2401,-2500)
(2401,99)
(3024,-3025)
(3024,1)
(3125,-3773)
(3125,-3136)
(3125,11)
(3125,648)
(3584,-18225)
(3584,14641)
(3645,-3773)
(3645,128)
(3993,-4000)
(3993,7)
(4374,-4375)
(4374,1)
(5625,-5632)
(5625,7)
(8192,-9317)
(8192,1125)
(9604,-10935)
(9604,1331)
(9800,-9801)
(9800,1)
(14641,-18225)
(14641,3584)
(16335,-16384)
(16335,49)
#
# (a,b,c,d) = (1,1,1,0) and D = 3:
#
(1,-19)
(1,-5)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,4)
(1,18)
(2,-13)
(2,-3)
(2,-1)
(2,1)
(2,11)
(3,-8)
(3,-2)
(3,-1)
(3,5)
(4,-5)
(4,1)
(5,-8)
(5,-4)
(5,-1)
(5,3)
(8,-5)
(8,-3)
(11,-13)
(11,2)
(16,-55)
(16,39)
(18,-19)
(18,1)
(20,-37)
(20,17)
(25,-236)
(25,211)
(55,-39)
(55,-16)
(360,-323)
(360,-37)
#
# (a,b,c,d) = (1,0,1,0) and D = 4:
#
(1,-7)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,7)
(2,-11)
(2,-1)
(2,1)
(2,11)
(3,-79)
(3,-4)
(3,-1)
(3,1)
(3,4)
(3,79)
(4,-3)
(4,3)
(7,-24)
(7,-1)
(7,1)
(7,24)
(9,-13)
(9,13)
(11,-2)
(11,2)
(24,-7)
(24,7)
(44,-117)
(44,117)
(336,-527)
(336,527)
#
# (a,b,c,d) = (2,1,1,0) and D = 7:
#
(1,-137)
(1,-91)
(1,-38)
(1,-27)
(1,-18)
(1,-16)
(1,-11)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,4)
(1,5)
(1,6)
(1,10)
(1,15)
(1,17)
(1,26)
(1,37)
(1,90)
(1,136)
(2,-3)
(2,-1)
(2,1)
(3,-26)
(3,-17)
(3,-10)
(3,-5)
(3,-4)
(3,-2)
(3,-1)
(3,1)
(3,2)
(3,7)
(3,14)
(3,23)
(4,-9)
(4,5)
(5,-167)
(5,-62)
(5,-46)
(5,-14)
(5,-13)
(5,-7)
(5,-6)
(5,-3)
(5,-2)
(5,1)
(5,2)
(5,8)
(5,9)
(5,41)
(5,57)
(5,162)
(6,-31)
(6,25)
(7,-16)
(7,-13)
(7,-10)
(7,-5)
(7,-2)
(7,3)
(7,6)
(7,9)
(8,-7)
(8,-1)
(9,-470)
(9,-107)
(9,-23)
(9,-22)
(9,-19)
(9,-8)
(9,-1)
(9,10)
(9,13)
(9,14)
(9,98)
(9,461)
(10,-39)
(10,29)
(11,-34)
(11,-9)
(11,-2)
(11,23)
(15,-53)
(15,-17)
(15,2)
(15,38)
(21,-215)
(21,-158)
(21,-94)
(21,73)
(21,137)
(21,194)
(25,-54)
(25,-37)
(25,12)
(25,29)
(27,-409)
(27,-25)
(27,-2)
(27,382)
(35,-113)
(35,78)
(45,-46)
(45,1)
(48,-127)
(48,79)
(49,-58)
(49,9)
(75,-1442)
(75,-41)
(75,-34)
(75,1367)
(81,-86)
(81,5)
(125,-303)
(125,178)
(135,-274)
(135,139)
(175,-158)
(175,-17)
(189,-604)
(189,415)
(275,-449)
(275,174)
(441,-1270)
(441,829)
#
# (a,b,c,d) = (2,0,1,0) and D = 8:
#
(1,-140)
(1,-22)
(1,-19)
(1,-14)
(1,-8)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,4)
(1,5)
(1,8)
(1,14)
(1,19)
(1,22)
(1,140)
(2,-17)
(2,-5)
(2,-1)
(2,1)
(2,5)
(2,17)
(3,-2)
(3,2)
(4,-155)
(4,-7)
(4,-1)
(4,1)
(4,7)
(4,155)
(5,-268)
(5,-29)
(5,-26)
(5,-7)
(5,-4)
(5,-2)
(5,2)
(5,4)
(5,7)
(5,26)
(5,29)
(5,268)
(6,-7)
(6,7)
(7,-109)
(7,-89)
(7,-12)
(7,-10)
(7,-8)
(7,-1)
(7,1)
(7,8)
(7,10)
(7,12)
(7,89)
(7,109)
(8,-695)
(8,-31)
(8,-13)
(8,13)
(8,31)
(8,695)
(9,-50)
(9,50)
(10,-23)
(10,23)
(11,-1)
(11,1)
(14,-97)
(14,97)
(16,-59)
(16,59)
(20,-17)
(20,17)
(22,-241)
(22,241)
(25,-64)
(25,-9)
(25,9)
(25,64)
(32,-25)
(32,25)
(49,-106)
(49,106)
(56,-17)
(56,17)
(70,-1)
(70,1)
(84,-23)
(84,23)
(125,-166)
(125,166)
(140,-9799)
(140,9799)
(175,-767)
(175,767)
(245,-1153)
(245,1153)
(450,-1169)
(450,1169)
(1600,-1423)
(1600,1423)
#
# (a,b,c,d) = (3,1,1,0) and D = 11:
#
(1,-259)
(1,-217)
(1,-39)
(1,-34)
(1,-17)
(1,-16)
(1,-12)
(1,-9)
(1,-7)
(1,-6)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,5)
(1,6)
(1,8)
(1,11)
(1,15)
(1,16)
(1,33)
(1,38)
(1,216)
(1,258)
(2,-59)
(2,-23)
(2,-9)
(2,-5)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,7)
(2,21)
(2,57)
(3,-26)
(3,-7)
(3,-2)
(3,-1)
(3,4)
(3,23)
(4,-183)
(4,-21)
(4,-13)
(4,-11)
(4,-3)
(4,-1)
(4,7)
(4,9)
(4,17)
(4,179)
(5,-8)
(5,-6)
(5,1)
(5,3)
(7,-138)
(7,-31)
(7,-19)
(7,-13)
(7,-9)
(7,-4)
(7,-3)
(7,2)
(7,6)
(7,12)
(7,24)
(7,131)
(8,-147)
(8,-47)
(8,-15)
(8,-11)
(8,3)
(8,7)
(8,39)
(8,139)
(10,-93)
(10,83)
(11,-24)
(11,-14)
(11,-12)
(11,1)
(11,3)
(11,13)
(14,-18663)
(14,-101)
(14,-51)
(14,-33)
(14,19)
(14,37)
(14,87)
(14,18649)
(16,-19)
(16,-13)
(16,-3)
(16,3)
(18,-31)
(18,13)
(22,-399)
(22,-109)
(22,87)
(22,377)
(28,-201)
(28,173)
(32,-269)
(32,-69)
(32,37)
(32,237)
(35,-74)
(35,39)
(44,-173)
(44,129)
(49,-541)
(49,-41)
(49,-8)
(49,492)
(72,-73)
(72,1)
(112,-183)
(112,71)
(147,-649)
(147,502)
(160,-759)
(160,599)
(196,-219)
(196,23)
(256,-777)
(256,521)
(847,-4548)
(847,3701)
(4312,-10429)
(4312,6117)
#
# (a,b,c,d) = (3,0,1,0) and D = 12:
#
(1,-37)
(1,-12)
(1,-9)
(1,-5)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,5)
(1,9)
(1,12)
(1,37)
(2,-3)
(2,3)
(3,-13)
(3,-1)
(3,1)
(3,13)
(4,-1)
(4,1)
(5,-11)
(5,-3)
(5,3)
(5,11)
(8,-47)
(8,47)
(9,-10)
(9,10)
(10,-27)
(10,27)
(11,-15)
(11,15)
(25,-447)
(25,447)
(55,-23)
(55,23)
(180,-143)
(180,143)
#
# (a,b,c,d) = (4,1,1,0) and D = 15:
#
(1,-20)
(1,-13)
(1,-8)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,4)
(1,7)
(1,12)
(1,19)
(2,-1)
(3,-7)
(3,-4)
(3,1)
(3,4)
(5,-33)
(5,-4)
(5,-1)
(5,28)
(7,-251)
(7,-12)
(7,-11)
(7,4)
(7,5)
(7,244)
(9,-52)
(9,43)
(11,-28)
(11,17)
(33,-20)
(33,-13)
(231,-4187)
(231,3956)
#
# (a,b,c,d) = (1,2,2,0) and D = 16:
#
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,3)
(2,-3)
(2,-1)
(2,1)
(3,-41)
(3,-2)
(3,-1)
(3,38)
(4,-13)
(4,-3)
(4,-1)
(4,9)
(6,-7)
(6,1)
(7,-4)
(7,-3)
(8,-7)
(8,-1)
(9,-11)
(9,2)
(14,-31)
(14,17)
(22,-13)
(22,-9)
(48,-31)
(48,-17)
(88,-161)
(88,73)
(672,-863)
(672,191)
#
# (a,b,c,d) = (4,0,1,0) and D = 16:
#
(1,-14)
(1,-11)
(1,-6)
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,4)
(1,6)
(1,11)
(1,14)
(2,-3)
(2,3)
(3,-158)
(3,-8)
(3,-2)
(3,2)
(3,8)
(3,158)
(7,-48)
(7,-2)
(7,2)
(7,48)
(9,-26)
(9,26)
(11,-4)
(11,4)
(12,-7)
(12,7)
(22,-117)
(22,117)
(168,-527)
(168,527)