# 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)| <= 100,
# such that only primes dividing z are among S, where
# S is the set of the first 4 primes.
# Note that some GL_2(Z)-equivalence classes of forms may have several reduced representatives.
# It contains 17221 pairs in total.
# Format: "(x,y)".
# Computing this list took 462 seconds.
# Authors: Rafael von Känel and Benjamin Matschke, 2015.
# License: Creative commons 3.0 by-nc.
#
# (a,b,c,d) = (0,1,10,0) and D = -100:
#
(-43750,1)
(-24010,1)
(-21875,2187)
(-6250,49)
(-5145,512)
(-3750,343)
(-3430,243)
(-3125,288)
(-2560,81)
(-2500,7)
(-2500,243)
(-2450,243)
(-2401,240)
(-2250,1)
(-2058,1)
(-1875,16)
(-1350,7)
(-1280,3)
(-1260,1)
(-1250,27)
(-1225,1)
(-1125,112)
(-945,32)
(-810,1)
(-810,49)
(-675,64)
(-640,1)
(-640,49)
(-640,63)
(-625,49)
(-540,49)
(-512,35)
(-500,1)
(-500,49)
(-490,1)
(-490,9)
(-405,16)
(-405,28)
(-378,25)
(-360,1)
(-350,3)
(-350,27)
(-343,10)
(-320,7)
(-320,27)
(-280,1)
(-280,3)
(-280,27)
(-270,7)
(-256,25)
(-252,25)
(-250,1)
(-250,7)
(-250,9)
(-250,21)
(-245,2)
(-245,12)
(-245,24)
(-210,1)
(-175,4)
(-175,16)
(-162,5)
(-160,1)
(-160,7)
(-160,9)
(-150,1)
(-150,7)
(-140,9)
(-135,1)
(-128,3)
(-125,2)
(-125,8)
(-125,9)
(-125,12)
(-120,7)
(-108,1)
(-105,8)
(-100,1)
(-100,3)
(-100,7)
(-100,9)
(-98,5)
(-98,9)
(-90,1)
(-90,7)
(-81,8)
(-80,1)
(-80,3)
(-80,7)
(-75,4)
(-75,7)
(-72,7)
(-70,1)
(-70,3)
(-64,1)
(-64,5)
(-60,1)
(-56,5)
(-54,5)
(-50,1)
(-50,3)
(-49,4)
(-45,1)
(-45,2)
(-45,4)
(-42,1)
(-40,1)
(-40,3)
(-35,1)
(-35,2)
(-35,3)
(-32,3)
(-30,1)
(-28,1)
(-27,2)
(-25,1)
(-25,2)
(-24,1)
(-21,2)
(-20,1)
(-18,1)
(-16,1)
(-15,1)
(-14,1)
(-12,1)
(1,-5)
(1,-1)
(1,2)
(1,8)
(1,240)
(2,-875)
(2,-45)
(2,-5)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,7)
(2,25)
(3,-1)
(4,-49)
(4,-1)
(4,1)
(4,5)
(5,-63)
(5,-32)
(5,-18)
(5,-14)
(5,-8)
(5,-4)
(5,-3)
(5,-2)
(5,-1)
(5,1)
(5,2)
(5,3)
(5,4)
(5,7)
(5,12)
(5,24)
(5,112)
(5,2187)
(6,-7)
(6,-1)
(6,1)
(6,5)
(6,25)
(7,-25)
(7,-1)
(7,2)
(8,-5)
(8,-1)
(8,1)
(8,9)
(9,-1)
(9,4)
(10,-2401)
(10,-81)
(10,-49)
(10,-21)
(10,-9)
(10,-7)
(10,-3)
(10,1)
(10,3)
(10,7)
(10,9)
(10,27)
(10,49)
(10,63)
(14,-27)
(14,-5)
(14,-3)
(14,1)
(14,5)
(15,-64)
(15,-14)
(15,-4)
(15,-2)
(15,1)
(15,2)
(15,16)
(16,-7)
(16,-3)
(18,-5)
(18,1)
(20,-27)
(20,-9)
(20,-7)
(20,-3)
(20,1)
(20,3)
(20,7)
(20,243)
(25,-27)
(25,-16)
(25,-7)
(25,-6)
(25,-4)
(25,-3)
(25,1)
(25,2)
(25,8)
(25,512)
(28,-3)
(30,-7)
(30,1)
(30,7)
(32,-5)
(32,1)
(35,-16)
(35,-8)
(35,-6)
(35,-4)
(35,1)
(35,4)
(35,9)
(35,64)
(36,-5)
(40,-49)
(40,-9)
(40,-7)
(40,1)
(40,3)
(40,21)
(42,-5)
(45,-8)
(45,-7)
(45,8)
(48,-5)
(48,5)
(49,-5)
(50,-1029)
(50,-21)
(50,-9)
(50,-7)
(50,1)
(50,3)
(50,7)
(50,9)
(50,27)
(50,49)
(54,-25)
(54,-7)
(54,1)
(60,-7)
(60,1)
(64,-75)
(64,-7)
(70,-27)
(70,-9)
(70,1)
(70,3)
(70,9)
(70,243)
(75,-32)
(75,-8)
(80,-9)
(80,1)
(80,7)
(80,27)
(90,-49)
(90,1)
(90,7)
(98,-125)
(98,1)
(98,3)
(105,2)
(112,5)
(125,-16)
(125,-14)
(125,1)
(125,12)
(125,28)
(128,25)
(135,-16)
(135,-14)
(135,4)
(135,49)
(140,1)
(150,1)
(150,49)
(160,-21)
(160,9)
(162,35)
(175,-18)
(180,7)
(196,-25)
(200,-27)
(200,-21)
(200,1)
(200,7)
(225,2)
(240,-49)
(240,1)
(243,-25)
(243,10)
(245,-32)
(245,-27)
(245,16)
(245,288)
(250,-81)
(250,-49)
(250,-27)
(250,3)
(250,7)
(256,-27)
(270,1)
(315,-32)
(320,-81)
(320,3)
(320,49)
(320,343)
(350,1)
(400,-49)
(400,9)
(405,-128)
(448,-45)
(450,-49)
(480,-49)
(480,1)
(486,-49)
(490,-81)
(490,1)
(560,-81)
(625,-64)
(625,-63)
(625,32)
(630,1)
(640,-189)
(686,-75)
(800,-81)
(800,1)
(875,-128)
(980,27)
(1000,-343)
(1000,243)
(1152,-125)
(1215,1)
(1250,-189)
(1250,1)
(1250,3)
(1280,7)
(1715,16)
(1750,81)
(2048,1)
(2240,1)
(2430,-343)
(2430,7)
(5760,49)
(8748,-875)
(10240,-1029)
(24000,-2401)
(24000,1)
(43740,1)
#
# (a,b,c,d) = (0,2,5,0) and D = -100:
#
(-21875,2)
(-21875,8748)
(-12005,2)
(-5145,2048)
(-3125,98)
(-3125,1152)
(-2401,960)
(-1875,64)
(-1875,686)
(-1715,486)
(-1225,4)
(-1225,486)
(-1125,2)
(-1125,448)
(-1029,2)
(-945,128)
(-675,14)
(-675,256)
(-640,81)
(-625,7)
(-625,54)
(-625,196)
(-625,243)
(-405,2)
(-405,64)
(-405,98)
(-405,112)
(-343,40)
(-320,3)
(-315,1)
(-245,2)
(-245,8)
(-245,18)
(-245,48)
(-245,96)
(-189,50)
(-175,6)
(-175,16)
(-175,54)
(-175,64)
(-160,1)
(-160,49)
(-160,63)
(-135,4)
(-135,14)
(-135,49)
(-128,35)
(-125,1)
(-125,2)
(-125,8)
(-125,14)
(-125,18)
(-125,32)
(-125,36)
(-125,42)
(-125,48)
(-125,49)
(-105,2)
(-105,32)
(-90,1)
(-81,10)
(-81,32)
(-80,7)
(-80,27)
(-75,2)
(-75,14)
(-75,16)
(-75,28)
(-70,1)
(-70,3)
(-70,27)
(-64,25)
(-63,25)
(-49,10)
(-49,16)
(-49,18)
(-45,2)
(-45,4)
(-45,8)
(-45,14)
(-45,16)
(-40,1)
(-40,7)
(-40,9)
(-35,2)
(-35,4)
(-35,6)
(-35,8)
(-35,9)
(-35,12)
(-32,3)
(-30,7)
(-27,1)
(-27,8)
(-27,10)
(-25,1)
(-25,2)
(-25,3)
(-25,4)
(-25,6)
(-25,7)
(-25,8)
(-25,9)
(-21,2)
(-21,8)
(-20,1)
(-20,3)
(-20,7)
(-18,7)
(-16,1)
(-16,5)
(-15,1)
(-15,2)
(-15,4)
(-14,5)
(-10,1)
(-10,3)
(-9,2)
(-8,3)
(-7,1)
(-7,2)
(-6,1)
(-5,1)
(-4,1)
(-3,1)
(1,-1750)
(1,-90)
(1,-49)
(1,-20)
(1,-10)
(1,-6)
(1,-4)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,5)
(1,6)
(1,8)
(1,14)
(1,32)
(1,50)
(1,960)
(2,-5)
(2,-1)
(2,1)
(2,9)
(3,-14)
(3,-4)
(3,-2)
(3,2)
(3,10)
(3,50)
(4,-7)
(4,-3)
(5,-4802)
(5,-252)
(5,-162)
(5,-128)
(5,-98)
(5,-72)
(5,-56)
(5,-42)
(5,-32)
(5,-27)
(5,-18)
(5,-16)
(5,-14)
(5,-12)
(5,-9)
(5,-8)
(5,-7)
(5,-6)
(5,-4)
(5,-3)
(5,1)
(5,2)
(5,3)
(5,4)
(5,6)
(5,7)
(5,8)
(5,12)
(5,14)
(5,16)
(5,18)
(5,28)
(5,48)
(5,54)
(5,96)
(5,98)
(5,126)
(5,243)
(5,448)
(5,8748)
(7,-100)
(7,-54)
(7,-10)
(7,-6)
(7,-4)
(7,-3)
(7,2)
(7,8)
(7,10)
(8,-5)
(8,1)
(9,-10)
(9,-5)
(9,-4)
(9,2)
(9,16)
(10,-49)
(10,-9)
(10,-7)
(10,1)
(10,3)
(10,21)
(12,-5)
(12,5)
(15,-256)
(15,-56)
(15,-16)
(15,-14)
(15,-8)
(15,-7)
(15,1)
(15,2)
(15,4)
(15,8)
(15,14)
(15,64)
(16,-75)
(16,-7)
(20,-9)
(20,1)
(20,7)
(20,27)
(21,-10)
(25,-2058)
(25,-108)
(25,-64)
(25,-42)
(25,-28)
(25,-24)
(25,-18)
(25,-16)
(25,-14)
(25,-12)
(25,2)
(25,4)
(25,6)
(25,8)
(25,14)
(25,18)
(25,32)
(25,54)
(25,98)
(25,2048)
(27,-50)
(27,-14)
(27,2)
(28,5)
(32,25)
(35,-64)
(35,-54)
(35,-32)
(35,-24)
(35,-18)
(35,-16)
(35,1)
(35,2)
(35,4)
(35,6)
(35,16)
(35,18)
(35,36)
(35,256)
(35,486)
(40,-21)
(40,9)
(45,-98)
(45,-32)
(45,-28)
(45,2)
(45,7)
(45,14)
(45,32)
(49,-250)
(49,-25)
(49,-20)
(49,2)
(49,6)
(50,-27)
(50,-21)
(50,1)
(50,7)
(60,-49)
(60,1)
(64,-27)
(75,-128)
(75,-32)
(75,2)
(75,98)
(80,-81)
(80,3)
(80,49)
(80,343)
(81,70)
(100,-49)
(100,9)
(105,8)
(112,-45)
(120,-49)
(120,1)
(125,-162)
(125,-98)
(125,-64)
(125,-56)
(125,-54)
(125,4)
(125,6)
(125,14)
(125,48)
(125,112)
(135,-64)
(135,-56)
(135,2)
(135,16)
(135,196)
(140,-81)
(160,-189)
(175,-72)
(175,2)
(200,-81)
(200,1)
(225,-98)
(225,8)
(243,-100)
(243,-98)
(243,40)
(245,-162)
(245,-128)
(245,-108)
(245,2)
(245,27)
(245,64)
(245,1152)
(250,-343)
(250,243)
(288,-125)
(315,-128)
(315,2)
(320,7)
(343,-150)
(405,-512)
(512,1)
(560,1)
(625,-378)
(625,-256)
(625,-252)
(625,2)
(625,6)
(625,128)
(875,-512)
(875,162)
(1215,-686)
(1215,4)
(1215,14)
(1440,49)
(1715,64)
(2187,-875)
(2560,-1029)
(6000,-2401)
(6000,1)
(10935,1)
#
# (a,b,c,d) = (2,9,10,0) and D = -100:
#
(-43750,17501)
(-21875,10937)
(-12005,6002)
(-10290,4121)
(-6250,2549)
(-4802,1921)
(-3750,1843)
(-3125,1538)
(-2560,1199)
(-2500,1007)
(-2500,1243)
(-2450,1223)
(-2250,901)
(-1890,881)
(-1875,766)
(-1715,736)
(-1350,547)
(-1280,637)
(-1260,629)
(-1250,527)
(-1225,491)
(-1125,562)
(-1029,514)
(-810,349)
(-810,373)
(-686,323)
(-675,334)
(-640,257)
(-640,271)
(-640,319)
(-625,299)
(-540,221)
(-512,221)
(-500,201)
(-500,249)
(-490,197)
(-490,221)
(-490,241)
(-405,178)
(-405,202)
(-360,179)
(-350,143)
(-350,167)
(-320,133)
(-320,153)
(-280,113)
(-280,137)
(-280,139)
(-270,133)
(-256,103)
(-252,101)
(-250,101)
(-250,107)
(-250,109)
(-250,121)
(-245,118)
(-245,122)
(-210,89)
(-189,82)
(-175,74)
(-175,86)
(-162,65)
(-160,71)
(-160,73)
(-160,79)
(-150,61)
(-150,67)
(-140,61)
(-135,64)
(-128,61)
(-125,52)
(-125,58)
(-125,59)
(-125,62)
(-120,53)
(-108,53)
(-105,52)
(-100,41)
(-100,43)
(-100,47)
(-100,49)
(-98,41)
(-90,37)
(-90,41)
(-90,43)
(-81,38)
(-80,33)
(-80,37)
(-80,39)
(-75,34)
(-75,37)
(-72,29)
(-70,29)
(-70,31)
(-70,33)
(-64,27)
(-64,31)
(-60,29)
(-56,23)
(-54,23)
(-50,21)
(-50,23)
(-49,20)
(-49,22)
(-45,19)
(-45,22)
(-42,17)
(-40,17)
(-40,19)
(-35,16)
(-35,17)
(-32,13)
(-30,13)
(-28,13)
(-27,11)
(-25,11)
(-25,12)
(-24,11)
(-21,10)
(-20,9)
(-16,7)
(-15,7)
(-12,5)
(-9,4)
(-7,3)
(1,-13)
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,22)
(1,437)
(2,-481)
(2,-17)
(2,-5)
(2,1)
(2,9)
(3,-14)
(3,-4)
(3,-2)
(3,-1)
(3,2)
(4,-7)
(4,-3)
(4,-1)
(4,47)
(5,-34)
(5,-27)
(5,-16)
(5,-7)
(5,-6)
(5,-4)
(5,-3)
(5,-1)
(5,1)
(5,2)
(5,8)
(5,22)
(5,38)
(5,1198)
(6,-1)
(7,-6)
(7,-4)
(7,-2)
(7,-1)
(7,10)
(8,-13)
(8,-5)
(8,-3)
(8,1)
(9,-5)
(9,-2)
(10,-4379)
(10,-229)
(10,-53)
(10,-29)
(10,-19)
(10,-13)
(10,-11)
(10,-9)
(10,-7)
(10,-3)
(10,-1)
(10,1)
(10,3)
(10,11)
(10,23)
(10,31)
(10,59)
(10,121)
(14,-11)
(14,-5)
(14,43)
(15,-11)
(15,-8)
(15,-4)
(16,-5)
(16,-1)
(18,-17)
(18,-7)
(20,-253)
(20,-17)
(20,-13)
(20,-11)
(20,-7)
(20,-3)
(20,-1)
(20,17)
(21,-8)
(25,-37)
(25,-26)
(25,-17)
(25,-16)
(25,-14)
(25,-13)
(25,-9)
(25,-8)
(25,-2)
(25,502)
(27,-14)
(27,-10)
(27,-1)
(28,-11)
(30,-47)
(30,-19)
(30,-17)
(30,-11)
(30,-7)
(30,13)
(30,113)
(32,-17)
(32,-11)
(35,-139)
(35,-22)
(35,-19)
(35,-18)
(35,-13)
(35,-4)
(36,-13)
(40,-41)
(40,-23)
(40,-21)
(40,-13)
(40,-11)
(40,29)
(45,-26)
(45,-23)
(45,2)
(48,-29)
(48,-19)
(49,-26)
(49,-25)
(49,38)
(50,-1049)
(50,-41)
(50,-29)
(50,-27)
(50,-19)
(50,-17)
(50,-13)
(50,-11)
(50,7)
(50,29)
(60,-31)
(60,-23)
(64,-25)
(64,43)
(70,-163)
(70,-53)
(70,-43)
(70,-37)
(70,-27)
(70,-23)
(70,-19)
(70,-3)
(75,-62)
(75,-38)
(80,-67)
(80,-47)
(80,-41)
(80,-31)
(81,-58)
(90,-61)
(90,-31)
(90,-29)
(98,-39)
(112,-61)
(125,-66)
(125,-64)
(125,-49)
(125,-38)
(125,-22)
(128,-89)
(135,-68)
(140,-71)
(150,-59)
(150,-11)
(160,-89)
(160,-59)
(175,-88)
(180,-97)
(196,-73)
(200,-107)
(200,-101)
(200,-79)
(200,-73)
(210,-109)
(225,-88)
(240,-121)
(240,-71)
(243,-97)
(245,-123)
(245,-82)
(250,-181)
(250,-149)
(250,-127)
(250,-97)
(250,-93)
(256,-101)
(270,-233)
(270,-143)
(270,-107)
(270,-103)
(315,-158)
(320,-503)
(320,-209)
(320,-163)
(320,-79)
(343,-134)
(350,-139)
(400,-209)
(400,-151)
(448,-179)
(450,-229)
(480,-241)
(480,-191)
(486,-263)
(486,-193)
(490,-821)
(490,-277)
(490,-191)
(490,-181)
(560,-199)
(625,-314)
(625,-313)
(625,-218)
(630,-251)
(640,-131)
(800,-401)
(800,-319)
(810,-149)
(875,-478)
(980,-517)
(1000,-743)
(1000,-157)
(1152,-451)
(1215,-611)
(1215,-436)
(1250,-689)
(1250,-499)
(1250,-497)
(1280,-647)
(1750,-619)
(2048,-1025)
(2240,-1121)
(2430,-1217)
(3430,-1747)
(5760,-2929)
(8748,-3499)
(10240,-4091)
(24000,-12001)
(24000,-9599)
(43740,-21871)
#
# (a,b,c,d) = (-3,1,2,0) and D = -100:
#
(-4802,-4797)
(-2401,3599)
(-2058,-2033)
(-1750,-1749)
(-1029,1531)
(-875,1312)
(-686,529)
(-512,-107)
(-512,363)
(-378,247)
(-343,-93)
(-256,-241)
(-256,369)
(-252,-247)
(-252,373)
(-250,-201)
(-189,-29)
(-162,-157)
(-162,-37)
(-162,83)
(-150,193)
(-128,-123)
(-128,-53)
(-128,117)
(-128,187)
(-125,163)
(-108,-83)
(-108,137)
(-100,-93)
(-100,143)
(-98,-93)
(-98,-53)
(-98,27)
(-98,127)
(-98,145)
(-90,-89)
(-81,-1)
(-81,59)
(-81,119)
(-75,-59)
(-72,-67)
(-72,103)
(-64,-39)
(-64,-29)
(-64,61)
(-64,71)
(-56,-51)
(-56,-41)
(-56,69)
(-56,79)
(-54,-47)
(-54,-19)
(-54,71)
(-50,-23)
(-49,-48)
(-49,-39)
(-49,11)
(-49,51)
(-49,71)
(-45,67)
(-42,-37)
(-42,-17)
(-32,-27)
(-32,3)
(-32,13)
(-32,43)
(-28,-3)
(-28,17)
(-27,-22)
(-27,23)
(-27,37)
(-25,24)
(-24,1)
(-24,11)
(-21,19)
(-21,29)
(-20,-19)
(-20,29)
(-18,-13)
(-18,7)
(-18,17)
(-16,-11)
(-16,-1)
(-16,9)
(-16,19)
(-14,-11)
(-14,-9)
(-14,1)
(-14,11)
(-14,13)
(-12,-7)
(-12,13)
(-10,-9)
(-10,-3)
(-10,-1)
(-10,11)
(-9,-4)
(-9,1)
(-9,11)
(-8,-3)
(-8,7)
(-7,-3)
(-7,-2)
(-7,3)
(-7,8)
(-7,9)
(-6,-5)
(-6,-1)
(-6,1)
(-5,-3)
(-5,3)
(-5,4)
(-5,7)
(-4,-3)
(-4,-1)
(-4,1)
(-4,3)
(-4,5)
(-3,1)
(-3,2)
(-3,4)
(-2,-1)
(-2,1)
(-1,0)
(-1,1)
(1,-314)
(1,-159)
(1,-124)
(1,-89)
(1,-69)
(1,-39)
(1,-26)
(1,-24)
(1,-19)
(1,-15)
(1,-14)
(1,-9)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,2)
(1,3)
(1,6)
(1,9)
(1,11)
(1,16)
(1,21)
(1,36)
(1,51)
(1,61)
(1,121)
(1,201)
(1,513)
(1,561)
(1,6001)
(1,10936)
(2,-21873)
(2,-12003)
(2,-1123)
(2,-1027)
(2,-403)
(2,-243)
(2,-123)
(2,-103)
(2,-73)
(2,-43)
(2,-33)
(2,-23)
(2,-19)
(2,-13)
(2,-7)
(2,-5)
(2,3)
(2,5)
(2,7)
(2,9)
(2,11)
(2,17)
(2,27)
(2,29)
(2,37)
(2,47)
(2,51)
(2,77)
(2,137)
(2,177)
(2,247)
(2,317)
(2,627)
(3,-317)
(3,-67)
(3,-29)
(3,-22)
(3,-17)
(3,-7)
(3,-5)
(3,8)
(3,13)
(3,83)
(4,-1221)
(4,-131)
(4,-41)
(4,-31)
(4,-21)
(4,-11)
(4,9)
(4,19)
(4,29)
(4,39)
(4,129)
(4,1219)
(5,-11)
(5,-9)
(5,6)
(5,17)
(5,33)
(6,-169)
(6,-29)
(6,-19)
(6,7)
(6,11)
(6,31)
(6,41)
(6,55)
(6,131)
(6,631)
(7,-618)
(7,-73)
(7,-33)
(7,-23)
(7,-18)
(7,-13)
(7,-11)
(7,12)
(7,27)
(7,52)
(7,57)
(7,327)
(8,-237)
(8,-117)
(8,-37)
(8,-27)
(8,-19)
(8,-17)
(8,-13)
(8,9)
(8,13)
(8,15)
(8,23)
(8,33)
(8,113)
(8,233)
(9,-31)
(9,-26)
(9,-16)
(9,11)
(9,49)
(9,109)
(10,-71)
(10,-39)
(10,-17)
(10,13)
(10,17)
(12,-23)
(12,17)
(14,-661)
(14,-121)
(14,-111)
(14,-61)
(14,-31)
(14,15)
(14,19)
(14,29)
(14,39)
(14,59)
(14,139)
(14,1229)
(16,-159)
(16,-59)
(16,-33)
(16,-29)
(16,21)
(16,25)
(16,51)
(16,151)
(18,-227)
(18,-107)
(18,-31)
(18,23)
(18,43)
(18,53)
(21,31)
(25,-39)
(25,-38)
(25,57)
(27,-53)
(27,-43)
(27,47)
(27,272)
(28,-47)
(28,33)
(32,-93)
(32,-73)
(32,-49)
(32,33)
(32,57)
(32,77)
(35,-93)
(36,-89)
(36,71)
(40,-303)
(40,283)
(42,-83)
(48,-197)
(48,-77)
(48,53)
(48,173)
(49,-111)
(49,-86)
(49,-76)
(49,129)
(49,1489)
(50,-139)
(50,51)
(50,53)
(54,-571)
(54,-121)
(54,59)
(54,79)
(63,-97)
(64,-1811)
(64,-341)
(64,-111)
(64,79)
(64,309)
(64,1779)
(70,151)
(81,-559)
(96,-149)
(96,101)
(98,-3027)
(98,-307)
(98,103)
(98,123)
(98,173)
(112,-293)
(112,237)
(126,131)
(128,-817)
(128,753)
(162,1037)
(196,-429)
(196,331)
(243,-382)
(243,248)
(243,493)
(256,-419)
(256,291)
(343,423)
(448,-677)
(448,453)
(486,-1229)
(486,-739)
(486,521)
(686,-1189)
(960,-1441)
(960,961)
(1152,-1973)
(1152,1397)
(2048,-3097)
(2048,2073)
(8748,-13127)
(8748,8753)
#
# (a,b,c,d) = (-25,0,1,0) and D = -100:
#
(-2401,-11995)
(-2401,11995)
(-1029,-5095)
(-1029,5095)
(-875,-4373)
(-875,4373)
(-343,-715)
(-343,715)
(-189,-305)
(-189,305)
(-128,-235)
(-128,235)
(-125,-527)
(-125,527)
(-81,-395)
(-81,-155)
(-81,-85)
(-81,85)
(-81,155)
(-81,395)
(-75,-311)
(-75,311)
(-64,-305)
(-64,305)
(-63,-310)
(-63,310)
(-49,-241)
(-49,-235)
(-49,-205)
(-49,-155)
(-49,-5)
(-49,5)
(-49,155)
(-49,205)
(-49,235)
(-49,241)
(-45,-223)
(-45,223)
(-32,-155)
(-32,-85)
(-32,85)
(-32,155)
(-27,-121)
(-27,-115)
(-27,-110)
(-27,-65)
(-27,65)
(-27,110)
(-27,115)
(-27,121)
(-25,-118)
(-25,-71)
(-25,71)
(-25,118)
(-21,-95)
(-21,-55)
(-21,55)
(-21,95)
(-18,-85)
(-18,85)
(-16,-55)
(-16,-45)
(-16,45)
(-16,55)
(-14,-65)
(-14,-55)
(-14,55)
(-14,65)
(-9,-35)
(-9,-25)
(-9,-5)
(-9,5)
(-9,25)
(-9,35)
(-8,-35)
(-8,-5)
(-8,5)
(-8,35)
(-7,-29)
(-7,-25)
(-7,-19)
(-7,-15)
(-7,-10)
(-7,-5)
(-7,5)
(-7,10)
(-7,15)
(-7,19)
(-7,25)
(-7,29)
(-6,-5)
(-6,5)
(-5,-24)
(-5,-23)
(-5,-17)
(-5,-11)
(-5,-7)
(-5,7)
(-5,11)
(-5,17)
(-5,23)
(-5,24)
(-4,-15)
(-4,-5)
(-4,5)
(-4,15)
(-3,-13)
(-3,-10)
(-3,-5)
(-3,-1)
(-3,1)
(-3,5)
(-3,10)
(-3,13)
(-2,-5)
(-2,5)
(-1,-4)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(-1,4)
(1,-43745)
(1,-24005)
(1,-2245)
(1,-2053)
(1,-1255)
(1,-1220)
(1,-805)
(1,-635)
(1,-495)
(1,-485)
(1,-355)
(1,-275)
(1,-245)
(1,-205)
(1,-155)
(1,-145)
(1,-130)
(1,-103)
(1,-95)
(1,-85)
(1,-75)
(1,-65)
(1,-59)
(1,-55)
(1,-45)
(1,-40)
(1,-37)
(1,-35)
(1,-30)
(1,-25)
(1,-23)
(1,-20)
(1,-19)
(1,-15)
(1,-13)
(1,-11)
(1,-10)
(1,-9)
(1,-7)
(1,7)
(1,9)
(1,10)
(1,11)
(1,13)
(1,15)
(1,19)
(1,20)
(1,23)
(1,25)
(1,30)
(1,35)
(1,37)
(1,40)
(1,45)
(1,55)
(1,59)
(1,65)
(1,75)
(1,85)
(1,95)
(1,103)
(1,130)
(1,145)
(1,155)
(1,205)
(1,245)
(1,275)
(1,355)
(1,485)
(1,495)
(1,635)
(1,805)
(1,1220)
(1,1255)
(1,2053)
(1,2245)
(1,24005)
(1,43745)
(2,-235)
(2,-115)
(2,-35)
(2,-25)
(2,-17)
(2,-15)
(2,-11)
(2,11)
(2,15)
(2,17)
(2,25)
(2,35)
(2,115)
(2,235)
(3,-1265)
(3,-335)
(3,-265)
(3,-113)
(3,-85)
(3,-65)
(3,-55)
(3,-35)
(3,-25)
(3,-20)
(3,-17)
(3,17)
(3,20)
(3,25)
(3,35)
(3,55)
(3,65)
(3,85)
(3,113)
(3,265)
(3,335)
(3,1265)
(4,-155)
(4,-55)
(4,-29)
(4,-25)
(4,25)
(4,29)
(4,55)
(4,155)
(5,-137)
(5,-73)
(5,-39)
(5,-31)
(5,-29)
(5,29)
(5,31)
(5,39)
(5,73)
(5,137)
(7,-2465)
(7,-1315)
(7,-285)
(7,-235)
(7,-215)
(7,-125)
(7,-115)
(7,-85)
(7,-65)
(7,-55)
(7,-45)
(7,-40)
(7,-37)
(7,37)
(7,40)
(7,45)
(7,55)
(7,65)
(7,85)
(7,115)
(7,125)
(7,215)
(7,235)
(7,285)
(7,1315)
(7,2465)
(8,-85)
(8,-65)
(8,-41)
(8,41)
(8,65)
(8,85)
(9,-445)
(9,-205)
(9,-115)
(9,-95)
(9,-80)
(9,-55)
(9,-53)
(9,53)
(9,55)
(9,80)
(9,95)
(9,115)
(9,205)
(9,445)
(10,-293)
(10,293)
(12,-185)
(12,-65)
(12,65)
(12,185)
(16,-1795)
(16,-325)
(16,-95)
(16,95)
(16,325)
(16,1795)
(21,-145)
(21,145)
(24,-125)
(24,125)
(25,-253)
(25,-131)
(25,-127)
(25,127)
(25,131)
(25,253)
(27,-1115)
(27,-215)
(27,-185)
(27,-145)
(27,145)
(27,185)
(27,215)
(27,1115)
(28,-265)
(28,265)
(32,-785)
(32,785)
(35,-337)
(35,337)
(49,-6005)
(49,-565)
(49,-395)
(49,-380)
(49,-295)
(49,-255)
(49,255)
(49,295)
(49,380)
(49,395)
(49,565)
(49,6005)
(63,-325)
(63,325)
(64,-355)
(64,355)
(81,-2155)
(81,2155)
(112,-565)
(112,565)
(240,-1201)
(240,1201)
(243,-2215)
(243,-1285)
(243,-1235)
(243,1235)
(243,1285)
(243,2215)
(288,-1685)
(288,1685)
(343,-2035)
(343,2035)
(512,-2585)
(512,2585)
(2187,-10940)
(2187,10940)
#
# (a,b,c,d) = (-24,1,1,0) and D = -97:
#
(-125,-552)
(-125,-376)
(-125,501)
(-125,677)
(-49,-216)
(-49,-215)
(-49,264)
(-49,265)
(-35,-136)
(-35,-93)
(-35,128)
(-35,171)
(-28,-123)
(-28,151)
(-25,-24)
(-25,49)
(-7,-24)
(-7,-23)
(-7,-17)
(-7,24)
(-7,30)
(-7,31)
(-5,-22)
(-5,-21)
(-5,-19)
(-5,-3)
(-5,8)
(-5,24)
(-5,26)
(-5,27)
(-4,-17)
(-4,21)
(-3,-13)
(-3,-8)
(-3,11)
(-3,16)
(-2,-3)
(-2,5)
(-1,-4)
(-1,-3)
(-1,-2)
(-1,0)
(-1,1)
(-1,3)
(-1,4)
(-1,5)
(1,-1497)
(1,-40)
(1,-39)
(1,-25)
(1,-16)
(1,-12)
(1,-9)
(1,-8)
(1,-7)
(1,-6)
(1,5)
(1,6)
(1,7)
(1,8)
(1,11)
(1,15)
(1,24)
(1,38)
(1,39)
(1,1496)
(2,-11)
(2,9)
(5,-317)
(5,-53)
(5,-33)
(5,-29)
(5,24)
(5,28)
(5,48)
(5,312)
(7,-463)
(7,-111)
(7,-40)
(7,-39)
(7,-38)
(7,31)
(7,32)
(7,33)
(7,104)
(7,456)
(9,-49)
(9,40)
(15,-88)
(15,73)
(16,-121)
(16,105)
(25,-246)
(25,-136)
(25,111)
(25,221)
(40,-217)
(40,177)
(49,-649)
(49,600)
(245,-1329)
(245,1084)
#
# (a,b,c,d) = (-24,0,1,0) and D = -96:
#
(-147,-454)
(-147,454)
(-49,-240)
(-49,240)
(-9,-44)
(-9,-38)
(-9,38)
(-9,44)
(-8,-39)
(-8,39)
(-7,-34)
(-7,-26)
(-7,-24)
(-7,24)
(-7,26)
(-7,34)
(-5,-24)
(-5,24)
(-4,-3)
(-4,3)
(-3,-14)
(-3,-4)
(-3,4)
(-3,14)
(-2,-9)
(-2,9)
(-1,-4)
(-1,-3)
(-1,-2)
(-1,0)
(-1,2)
(-1,3)
(-1,4)
(1,-32)
(1,-18)
(1,-12)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,5)
(1,6)
(1,7)
(1,8)
(1,12)
(1,18)
(1,32)
(2,-11)
(2,11)
(3,-29)
(3,-16)
(3,16)
(3,29)
(7,-276)
(7,-36)
(7,36)
(7,276)
(8,-131)
(8,131)
(10,-49)
(10,49)
(12,-59)
(12,59)
(14,-73)
(14,73)
(21,-103)
(21,103)
(27,-136)
(27,136)
(980,-4801)
(980,4801)
#
# (a,b,c,d) = (-3,0,2,0) and D = -96:
#
(-294,-227)
(-294,227)
(-49,-60)
(-49,60)
(-32,-39)
(-32,39)
(-18,-19)
(-18,19)
(-16,-3)
(-16,3)
(-14,-17)
(-14,-13)
(-14,13)
(-14,17)
(-9,-11)
(-9,11)
(-8,-9)
(-8,9)
(-7,-6)
(-7,6)
(-6,-7)
(-6,7)
(-5,-6)
(-5,6)
(-4,-3)
(-4,3)
(-3,-1)
(-3,1)
(-2,-1)
(-2,1)
(-1,-1)
(-1,0)
(-1,1)
(1,-8)
(1,-3)
(1,-2)
(1,2)
(1,3)
(1,8)
(2,-9)
(2,-3)
(2,3)
(2,9)
(3,-4)
(3,4)
(4,-7)
(4,-5)
(4,5)
(4,7)
(7,-69)
(7,-9)
(7,9)
(7,69)
(8,-11)
(8,11)
(12,-29)
(12,29)
(27,-34)
(27,34)
(32,-131)
(32,131)
(40,-49)
(40,49)
(48,-59)
(48,59)
(56,-73)
(56,73)
(84,-103)
(84,103)
(3920,-4801)
(3920,4801)
#
# (a,b,c,d) = (-23,1,1,0) and D = -93:
#
(-28,-121)
(-28,149)
(-10,-43)
(-10,-31)
(-10,41)
(-10,53)
(-4,-13)
(-4,17)
(-1,-4)
(-1,-1)
(-1,2)
(-1,5)
(1,-9)
(1,-6)
(1,5)
(1,8)
(2,-131)
(2,-11)
(2,9)
(2,129)
(3,-25)
(3,-16)
(3,13)
(3,22)
(27,-145)
(27,118)
(40,-219)
(40,-213)
(40,173)
(40,179)
(240,-1327)
(240,1087)
(320,-1703)
(320,1383)
(2520,-13411)
(2520,10891)
#
# (a,b,c,d) = (-23,0,1,0) and D = -92:
#
(-25,-117)
(-25,117)
(-15,-67)
(-15,67)
(-9,-43)
(-9,43)
(-4,-19)
(-4,-5)
(-4,5)
(-4,19)
(-1,-4)
(-1,-3)
(-1,3)
(-1,4)
(1,-11)
(1,-5)
(1,5)
(1,11)
(3,-16)
(3,16)
(5,-24)
(5,24)
(8,-39)
(8,39)
(40,-393)
(40,393)
(49,-235)
(49,235)
(96,-463)
(96,463)
(240,-1151)
(240,1151)
#
# (a,b,c,d) = (-22,1,1,0) and D = -89:
#
(-729,-3074)
(-729,3803)
(-189,-797)
(-189,986)
(-49,-157)
(-49,-34)
(-49,83)
(-49,206)
(-25,-101)
(-25,126)
(-21,-86)
(-21,-58)
(-21,79)
(-21,107)
(-14,-59)
(-14,73)
(-9,-37)
(-9,-34)
(-9,-19)
(-9,28)
(-9,43)
(-9,46)
(-7,-27)
(-7,-6)
(-7,13)
(-7,34)
(-6,-23)
(-6,29)
(-5,-21)
(-5,26)
(-3,-7)
(-3,1)
(-3,2)
(-3,10)
(-2,-7)
(-2,9)
(-1,-4)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,2)
(-1,3)
(-1,4)
(-1,5)
(1,-142)
(1,-46)
(1,-19)
(1,-17)
(1,-14)
(1,-9)
(1,-7)
(1,-6)
(1,5)
(1,6)
(1,8)
(1,13)
(1,16)
(1,18)
(1,45)
(1,141)
(3,-202)
(3,-26)
(3,-17)
(3,-16)
(3,13)
(3,14)
(3,23)
(3,199)
(4,-61)
(4,-21)
(4,17)
(4,57)
(5,-31)
(5,26)
(7,-888)
(7,-69)
(7,-38)
(7,-37)
(7,30)
(7,31)
(7,62)
(7,881)
(9,-47)
(9,38)
(27,-833)
(27,-218)
(27,-193)
(27,166)
(27,191)
(27,806)
(32,-169)
(32,137)
(81,-454)
(81,373)
(147,-874)
(147,727)
(2401,-12526)
(2401,10125)
#
# (a,b,c,d) = (-22,0,1,0) and D = -88:
#
(-512,-2099)
(-512,2099)
(-64,-295)
(-64,295)
(-49,-116)
(-49,116)
(-35,-164)
(-35,164)
(-27,-106)
(-27,106)
(-25,-116)
(-25,-67)
(-25,67)
(-25,116)
(-16,-75)
(-16,-23)
(-16,23)
(-16,75)
(-8,-29)
(-8,29)
(-7,-32)
(-7,32)
(-5,-23)
(-5,-19)
(-5,-16)
(-5,-8)
(-5,8)
(-5,16)
(-5,19)
(-5,23)
(-4,-17)
(-4,-3)
(-4,3)
(-4,17)
(-3,-14)
(-3,-10)
(-3,10)
(-3,14)
(-2,-9)
(-2,-5)
(-2,5)
(-2,9)
(-1,-4)
(-1,-2)
(-1,-1)
(-1,1)
(-1,2)
(-1,4)
(1,-85)
(1,-47)
(1,-34)
(1,-20)
(1,-13)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,5)
(1,6)
(1,7)
(1,8)
(1,13)
(1,20)
(1,34)
(1,47)
(1,85)
(2,-23)
(2,-13)
(2,13)
(2,23)
(4,-19)
(4,19)
(5,-82)
(5,-26)
(5,26)
(5,82)
(6,-29)
(6,29)
(8,-43)
(8,43)
(10,-47)
(10,47)
(14,-71)
(14,71)
(20,-211)
(20,-113)
(20,113)
(20,211)
(24,-361)
(24,361)
(25,-122)
(25,122)
(30,-149)
(30,149)
(36,-169)
(36,169)
(40,-307)
(40,307)
(42,-197)
(42,197)
(80,-403)
(80,403)
(224,-1051)
(224,1051)
(2400,-11257)
(2400,11257)
#
# (a,b,c,d) = (-21,1,1,0) and D = -85:
#
(-625,-2567)
(-625,3192)
(-512,-609)
(-512,1121)
(-128,-91)
(-128,219)
(-125,-508)
(-125,633)
(-64,-263)
(-64,327)
(-50,-27)
(-50,77)
(-32,-129)
(-32,161)
(-25,-84)
(-25,109)
(-16,-57)
(-16,73)
(-12,-49)
(-12,61)
(-10,-41)
(-10,-39)
(-10,49)
(-10,51)
(-9,2)
(-9,7)
(-8,-31)
(-8,-21)
(-8,29)
(-8,39)
(-5,-16)
(-5,-7)
(-5,12)
(-5,21)
(-4,-3)
(-4,7)
(-3,-11)
(-3,14)
(-2,-7)
(-2,-5)
(-2,-1)
(-2,3)
(-2,7)
(-2,9)
(-1,-4)
(-1,-3)
(-1,-2)
(-1,0)
(-1,1)
(-1,3)
(-1,4)
(-1,5)
(1,-42)
(1,-28)
(1,-22)
(1,-15)
(1,-13)
(1,-8)
(1,-7)
(1,-6)
(1,5)
(1,6)
(1,7)
(1,12)
(1,14)
(1,21)
(1,27)
(1,41)
(2,-191)
(2,-161)
(2,-21)
(2,-11)
(2,9)
(2,19)
(2,159)
(2,189)
(3,-17)
(3,14)
(4,-2023)
(4,-39)
(4,-25)
(4,-21)
(4,17)
(4,21)
(4,35)
(4,2019)
(5,-42)
(5,-38)
(5,-26)
(5,21)
(5,33)
(5,37)
(7,-51)
(7,-37)
(7,-36)
(7,29)
(7,30)
(7,44)
(8,-93)
(8,-77)
(8,-41)
(8,33)
(8,69)
(8,85)
(9,-350)
(9,-46)
(9,37)
(9,341)
(15,-77)
(15,62)
(16,-105)
(16,89)
(20,-881)
(20,-111)
(20,91)
(20,861)
(24,-133)
(24,109)
(25,-30079)
(25,30054)
(32,-165)
(32,133)
(80,-437)
(80,357)
(98,-599)
(98,501)
(100,-511)
(100,411)
(112,-573)
(112,461)
(125,-707)
(125,582)
(128,-5201)
(128,5073)
#
# (a,b,c,d) = (-21,0,1,0) and D = -84:
#
(-98,-447)
(-98,447)
(-81,-371)
(-81,371)
(-27,-53)
(-27,53)
(-18,-77)
(-18,77)
(-9,-41)
(-9,41)
(-7,-32)
(-7,-27)
(-7,-23)
(-7,23)
(-7,27)
(-7,32)
(-5,-21)
(-5,21)
(-3,-13)
(-3,-8)
(-3,-7)
(-3,7)
(-3,8)
(-3,13)
(-2,-9)
(-2,-7)
(-2,-3)
(-2,3)
(-2,7)
(-2,9)
(-1,-4)
(-1,-3)
(-1,-1)
(-1,0)
(-1,1)
(-1,3)
(-1,4)
(1,-39)
(1,-21)
(1,-14)
(1,-11)
(1,-9)
(1,-7)
(1,-6)
(1,-5)
(1,5)
(1,6)
(1,7)
(1,9)
(1,11)
(1,14)
(1,21)
(1,39)
(3,-133)
(3,-17)
(3,-14)
(3,14)
(3,17)
(3,133)
(4,-1281)
(4,-31)
(4,-21)
(4,-19)
(4,19)
(4,21)
(4,31)
(4,1281)
(5,-23)
(5,23)
(7,-102)
(7,-33)
(7,33)
(7,102)
(8,-63)
(8,-37)
(8,37)
(8,63)
(9,-49)
(9,49)
(12,-55)
(12,55)
(32,-147)
(32,147)
(48,-253)
(48,253)
(63,-293)
(63,293)
(448,-2053)
(448,2053)
#
# (a,b,c,d) = (0,1,9,0) and D = -81:
#
(-39375,1)
(-21609,1)
(-9261,5)
(-9261,1024)
(-7203,800)
(-5625,49)
(-4375,486)
(-3375,32)
(-3375,343)
(-3087,100)
(-2304,175)
(-2250,7)
(-2205,2)
(-2025,1)
(-2025,224)
(-1701,64)
(-1701,125)
(-1215,7)
(-1215,128)
(-1152,125)
(-1134,1)
(-1134,125)
(-1125,98)
(-729,1)
(-729,25)
(-729,32)
(-729,49)
(-729,56)
(-729,80)
(-625,64)
(-576,1)
(-576,49)
(-486,5)
(-486,49)
(-450,1)
(-450,49)
(-441,1)
(-441,4)
(-441,25)
(-441,40)
(-384,1)
(-343,27)
(-324,1)
(-324,35)
(-315,8)
(-315,32)
(-288,5)
(-288,7)
(-288,25)
(-256,9)
(-252,1)
(-252,25)
(-250,27)
(-245,27)
(-243,2)
(-243,7)
(-243,20)
(-243,25)
(-225,1)
(-225,4)
(-225,7)
(-225,16)
(-192,5)
(-189,1)
(-189,5)
(-189,16)
(-189,20)
(-147,8)
(-147,16)
(-144,1)
(-144,7)
(-135,1)
(-135,7)
(-135,8)
(-135,14)
(-126,5)
(-125,3)
(-108,5)
(-108,7)
(-105,1)
(-90,1)
(-90,7)
(-84,1)
(-81,1)
(-81,2)
(-81,4)
(-81,5)
(-81,7)
(-81,8)
(-75,7)
(-75,8)
(-72,1)
(-72,5)
(-72,7)
(-64,7)
(-63,1)
(-63,2)
(-63,4)
(-63,5)
(-54,1)
(-54,5)
(-49,1)
(-49,5)
(-48,5)
(-45,1)
(-45,2)
(-45,4)
(-36,1)
(-35,3)
(-32,3)
(-30,1)
(-28,3)
(-27,1)
(-27,2)
(-25,1)
(-25,2)
(-24,1)
(-21,1)
(-21,2)
(-18,1)
(-16,1)
(-15,1)
(-14,1)
(-12,1)
(-10,1)
(1,-25)
(1,-14)
(1,-9)
(1,-4)
(1,-1)
(1,1)
(1,3)
(1,7)
(1,486)
(2,-3)
(2,-1)
(2,27)
(3,-7)
(3,-5)
(3,-2)
(3,-1)
(3,1)
(3,2)
(3,5)
(3,8)
(3,16)
(3,800)
(4,-1)
(4,5)
(5,-6)
(5,-1)
(5,1)
(5,3)
(6,-1)
(6,1)
(7,-15)
(7,-3)
(7,-1)
(7,1)
(7,2)
(7,27)
(8,-1)
(8,3)
(9,-4375)
(9,-2401)
(9,-64)
(9,-50)
(9,-49)
(9,-28)
(9,-25)
(9,-16)
(9,-10)
(9,-8)
(9,-7)
(9,-5)
(9,-4)
(9,-2)
(9,1)
(9,2)
(9,4)
(9,5)
(9,7)
(9,8)
(9,14)
(9,20)
(9,35)
(9,49)
(9,80)
(9,125)
(9,224)
(12,1)
(12,7)
(15,-343)
(15,-7)
(15,-4)
(15,-2)
(15,1)
(16,1)
(18,-245)
(18,-7)
(18,-5)
(18,1)
(18,5)
(18,7)
(18,25)
(20,-3)
(21,-5)
(21,-4)
(21,1)
(24,-5)
(25,-9)
(25,-3)
(27,-128)
(27,-35)
(27,-28)
(27,-10)
(27,-8)
(27,-7)
(27,-5)
(27,-4)
(27,1)
(27,2)
(27,4)
(27,5)
(27,7)
(27,25)
(27,32)
(27,125)
(32,-9)
(35,-4)
(36,-49)
(36,-25)
(36,-7)
(36,-5)
(36,1)
(36,5)
(40,1)
(42,-5)
(45,-32)
(45,-14)
(45,-8)
(45,-7)
(45,1)
(45,2)
(45,4)
(45,7)
(45,16)
(45,49)
(45,1024)
(48,-7)
(49,-9)
(49,-6)
(49,64)
(54,-7)
(54,1)
(56,-9)
(60,-7)
(63,-250)
(63,-32)
(63,-25)
(63,-16)
(63,-10)
(63,-8)
(63,1)
(63,2)
(63,5)
(63,8)
(63,20)
(63,25)
(63,128)
(64,-21)
(72,-35)
(72,1)
(72,7)
(75,1)
(75,8)
(80,-9)
(81,-49)
(81,-25)
(81,-16)
(81,-14)
(81,-10)
(81,1)
(81,5)
(81,7)
(81,16)
(81,40)
(96,-125)
(96,1)
(98,3)
(100,27)
(125,-21)
(125,-14)
(126,1)
(128,-15)
(135,-64)
(135,-16)
(135,1)
(135,49)
(144,-25)
(144,5)
(147,5)
(162,-25)
(162,7)
(175,9)
(180,1)
(180,7)
(189,-25)
(189,4)
(216,-49)
(216,-25)
(216,1)
(216,25)
(224,-25)
(225,-49)
(225,-32)
(225,-28)
(225,2)
(225,7)
(225,56)
(243,-125)
(243,-35)
(243,-32)
(243,-28)
(243,1)
(243,5)
(243,8)
(243,98)
(288,-35)
(288,49)
(288,343)
(315,1)
(360,-49)
(375,1)
(405,-49)
(405,4)
(432,-49)
(432,1)
(441,-625)
(441,-64)
(441,-50)
(441,1)
(441,5)
(441,32)
(504,25)
(567,-64)
(567,1)
(576,125)
(720,1)
(729,-256)
(729,175)
(882,-125)
(900,-343)
(1029,-125)
(1125,-128)
(1125,1)
(1125,64)
(1152,7)
(1575,-256)
(2016,1)
(2187,-343)
(2187,-250)
(2187,-245)
(2187,2)
(2187,7)
(2187,100)
(3072,-343)
(3087,32)
(5184,-625)
(5184,49)
(9216,5)
(21600,-2401)
(21600,1)
(39366,-4375)
(39366,1)
#
# (a,b,c,d) = (1,0,-3,-1) and D = -81:
#
(-3,2)
(-1,-1)
(-1,1)
(-1,2)
(0,-1)
(1,-3)
(1,0)
(2,-1)
(2,1)
#
# (a,b,c,d) = (-20,1,1,0) and D = -81:
#
(-4375,-17491)
(-4375,21866)
(-2401,-9595)
(-2401,11996)
(-625,-2059)
(-625,2684)
(-343,-1357)
(-343,-472)
(-343,815)
(-343,1700)
(-256,-295)
(-256,551)
(-250,-937)
(-250,1187)
(-245,-962)
(-245,1207)
(-128,-485)
(-128,613)
(-125,-404)
(-125,-257)
(-125,382)
(-125,529)
(-64,-247)
(-64,-121)
(-64,185)
(-64,311)
(-50,-191)
(-50,241)
(-49,-187)
(-49,-160)
(-49,-115)
(-49,20)
(-49,29)
(-49,164)
(-49,209)
(-49,236)
(-35,-113)
(-35,-68)
(-35,103)
(-35,148)
(-32,-83)
(-32,-65)
(-32,97)
(-32,115)
(-28,-103)
(-28,-85)
(-28,113)
(-28,131)
(-25,-99)
(-25,-91)
(-25,-64)
(-25,-37)
(-25,-19)
(-25,44)
(-25,62)
(-25,89)
(-25,116)
(-25,124)
(-21,-20)
(-21,41)
(-16,-55)
(-16,-1)
(-16,17)
(-16,71)
(-15,-53)
(-15,68)
(-14,-55)
(-14,-11)
(-14,25)
(-14,69)
(-10,-31)
(-10,-13)
(-10,23)
(-10,41)
(-9,-35)
(-9,-11)
(-9,-4)
(-9,13)
(-9,20)
(-9,44)
(-8,-23)
(-8,-5)
(-8,13)
(-8,31)
(-7,-25)
(-7,-19)
(-7,-13)
(-7,-10)
(-7,-1)
(-7,8)
(-7,17)
(-7,20)
(-7,26)
(-7,32)
(-6,-19)
(-6,25)
(-5,-17)
(-5,-11)
(-5,-2)
(-5,1)
(-5,4)
(-5,7)
(-5,16)
(-5,22)
(-4,-15)
(-4,-7)
(-4,-1)
(-4,5)
(-4,11)
(-4,19)
(-3,-10)
(-3,-5)
(-3,8)
(-3,13)
(-2,-5)
(-2,1)
(-2,7)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(-1,4)
(1,-39371)
(1,-21605)
(1,-2021)
(1,-1130)
(1,-725)
(1,-572)
(1,-446)
(1,-437)
(1,-380)
(1,-320)
(1,-248)
(1,-221)
(1,-185)
(1,-140)
(1,-131)
(1,-101)
(1,-86)
(1,-80)
(1,-77)
(1,-68)
(1,-59)
(1,-50)
(1,-45)
(1,-41)
(1,-32)
(1,-26)
(1,-23)
(1,-21)
(1,-20)
(1,-17)
(1,-14)
(1,-12)
(1,-11)
(1,-10)
(1,-8)
(1,-6)
(1,5)
(1,7)
(1,9)
(1,10)
(1,11)
(1,13)
(1,16)
(1,19)
(1,20)
(1,22)
(1,25)
(1,31)
(1,40)
(1,44)
(1,49)
(1,58)
(1,67)
(1,76)
(1,79)
(1,85)
(1,100)
(1,130)
(1,139)
(1,184)
(1,220)
(1,247)
(1,319)
(1,379)
(1,436)
(1,445)
(1,571)
(1,724)
(1,1129)
(1,2020)
(1,21604)
(1,39370)
(2,-2197)
(2,-235)
(2,-73)
(2,-55)
(2,-37)
(2,-19)
(2,-17)
(2,-13)
(2,11)
(2,15)
(2,17)
(2,35)
(2,53)
(2,71)
(2,233)
(2,2195)
(3,-113)
(3,-23)
(3,-20)
(3,-16)
(3,13)
(3,17)
(3,20)
(3,110)
(4,-425)
(4,-209)
(4,-65)
(4,-47)
(4,-29)
(4,25)
(4,43)
(4,61)
(4,205)
(4,421)
(5,-9241)
(5,-466)
(5,-268)
(5,-172)
(5,-169)
(5,-106)
(5,-88)
(5,-61)
(5,-52)
(5,-43)
(5,-34)
(5,-29)
(5,-28)
(5,23)
(5,24)
(5,29)
(5,38)
(5,47)
(5,56)
(5,83)
(5,101)
(5,164)
(5,167)
(5,263)
(5,461)
(5,9236)
(7,-2222)
(7,-1187)
(7,-260)
(7,-215)
(7,-197)
(7,-116)
(7,-107)
(7,-80)
(7,-62)
(7,-53)
(7,-47)
(7,-44)
(7,-36)
(7,29)
(7,37)
(7,40)
(7,46)
(7,55)
(7,73)
(7,100)
(7,109)
(7,190)
(7,208)
(7,253)
(7,1180)
(7,2215)
(8,-283)
(8,-115)
(8,-103)
(8,-49)
(8,-43)
(8,35)
(8,41)
(8,95)
(8,107)
(8,275)
(9,-220)
(9,211)
(14,-79)
(14,65)
(16,-161)
(16,-125)
(16,-83)
(16,67)
(16,109)
(16,145)
(20,-163)
(20,-109)
(20,89)
(20,143)
(25,-629)
(25,-341)
(25,-188)
(25,-152)
(25,-143)
(25,118)
(25,127)
(25,163)
(25,316)
(25,604)
(27,-235)
(27,-142)
(27,-137)
(27,110)
(27,115)
(27,208)
(32,-3247)
(32,-601)
(32,-187)
(32,155)
(32,569)
(32,3215)
(35,-184)
(35,149)
(40,-281)
(40,241)
(49,-5429)
(49,-533)
(49,-380)
(49,-290)
(49,-254)
(49,205)
(49,241)
(49,331)
(49,484)
(49,5380)
(56,-505)
(56,449)
(64,-1445)
(64,-369)
(64,305)
(64,1381)
(80,-409)
(80,329)
(98,-733)
(98,635)
(100,-2687)
(100,2587)
(125,-1201)
(125,-652)
(125,-634)
(125,509)
(125,527)
(125,1076)
(128,-703)
(128,575)
(175,-1604)
(175,1429)
(224,-1129)
(224,905)
(343,-2003)
(343,1660)
(486,-2431)
(486,1945)
(800,-4003)
(800,3203)
(1024,-5165)
(1024,4141)
#
# (a,b,c,d) = (0,3,3,0) and D = -81:
#
(-4375,1)
(-4375,4374)
(-2401,1)
(-2401,2400)
(-1029,5)
(-1029,1024)
(-625,49)
(-625,576)
(-375,32)
(-375,343)
(-343,100)
(-343,243)
(-256,81)
(-256,175)
(-250,7)
(-250,243)
(-245,2)
(-245,243)
(-225,1)
(-225,224)
(-189,64)
(-189,125)
(-135,7)
(-135,128)
(-128,3)
(-128,125)
(-126,1)
(-126,125)
(-125,27)
(-125,98)
(-81,1)
(-81,25)
(-81,32)
(-81,49)
(-81,56)
(-81,80)
(-64,1)
(-64,15)
(-64,49)
(-64,63)
(-54,5)
(-54,49)
(-50,1)
(-50,49)
(-49,1)
(-49,4)
(-49,9)
(-49,24)
(-49,25)
(-49,40)
(-49,45)
(-49,48)
(-36,1)
(-36,35)
(-35,3)
(-35,8)
(-35,27)
(-35,32)
(-32,5)
(-32,7)
(-32,25)
(-32,27)
(-28,1)
(-28,3)
(-28,25)
(-28,27)
(-27,2)
(-27,7)
(-27,20)
(-27,25)
(-25,1)
(-25,4)
(-25,7)
(-25,9)
(-25,16)
(-25,18)
(-25,21)
(-25,24)
(-21,1)
(-21,5)
(-21,16)
(-21,20)
(-16,1)
(-16,7)
(-16,9)
(-16,15)
(-15,1)
(-15,7)
(-15,8)
(-15,14)
(-14,5)
(-14,9)
(-12,5)
(-12,7)
(-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,-4375)
(1,-2401)
(1,-225)
(1,-126)
(1,-81)
(1,-64)
(1,-50)
(1,-49)
(1,-36)
(1,-28)
(1,-25)
(1,-21)
(1,-16)
(1,-15)
(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)
(1,14)
(1,15)
(1,20)
(1,24)
(1,27)
(1,35)
(1,48)
(1,49)
(1,63)
(1,80)
(1,125)
(1,224)
(1,2400)
(1,4374)
(2,-245)
(2,-27)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,5)
(2,7)
(2,25)
(2,243)
(3,-128)
(3,-35)
(3,-28)
(3,-10)
(3,-8)
(3,-7)
(3,-5)
(3,-4)
(3,1)
(3,2)
(3,4)
(3,5)
(3,7)
(3,25)
(3,32)
(3,125)
(4,-49)
(4,-25)
(4,-9)
(4,-7)
(4,-5)
(4,1)
(4,3)
(4,5)
(4,21)
(4,45)
(5,-1029)
(5,-54)
(5,-32)
(5,-21)
(5,-14)
(5,-12)
(5,-9)
(5,-8)
(5,-7)
(5,-6)
(5,1)
(5,2)
(5,3)
(5,4)
(5,7)
(5,9)
(5,16)
(5,27)
(5,49)
(5,1024)
(6,-7)
(6,1)
(7,-250)
(7,-135)
(7,-32)
(7,-27)
(7,-25)
(7,-16)
(7,-15)
(7,-12)
(7,-10)
(7,-9)
(7,-8)
(7,1)
(7,2)
(7,3)
(7,5)
(7,8)
(7,9)
(7,18)
(7,20)
(7,25)
(7,128)
(7,243)
(8,-35)
(8,-15)
(8,-9)
(8,1)
(8,7)
(8,27)
(9,-49)
(9,-25)
(9,-16)
(9,-14)
(9,-10)
(9,1)
(9,5)
(9,7)
(9,16)
(9,40)
(14,-15)
(14,1)
(15,-64)
(15,-16)
(15,1)
(15,49)
(16,-25)
(16,-21)
(16,5)
(16,9)
(18,-25)
(18,7)
(20,-27)
(20,-21)
(20,1)
(20,7)
(21,-25)
(21,4)
(24,-49)
(24,-25)
(24,1)
(24,25)
(25,-81)
(25,-49)
(25,-32)
(25,-28)
(25,-27)
(25,2)
(25,3)
(25,7)
(25,24)
(25,56)
(27,-125)
(27,-35)
(27,-32)
(27,-28)
(27,1)
(27,5)
(27,8)
(27,98)
(32,-375)
(32,-81)
(32,-35)
(32,3)
(32,49)
(32,343)
(35,-36)
(35,1)
(40,-49)
(40,9)
(45,-49)
(45,4)
(48,-49)
(48,1)
(49,-625)
(49,-81)
(49,-64)
(49,-54)
(49,-50)
(49,1)
(49,5)
(49,15)
(49,32)
(49,576)
(56,-81)
(56,25)
(63,-64)
(63,1)
(64,-189)
(64,125)
(80,-81)
(80,1)
(81,-256)
(81,175)
(98,-125)
(98,27)
(100,-343)
(100,243)
(125,-189)
(125,-128)
(125,-126)
(125,1)
(125,3)
(125,64)
(128,-135)
(128,7)
(175,-256)
(175,81)
(224,-225)
(224,1)
(243,-343)
(243,-250)
(243,-245)
(243,2)
(243,7)
(243,100)
(343,-375)
(343,32)
(576,-625)
(576,49)
(1024,-1029)
(1024,5)
(2400,-2401)
(2400,1)
(4374,-4375)
(4374,1)
#
# (a,b,c,d) = (-2,2,2,0) and D = -80:
#
(-18,-11)
(-18,29)
(-7,-4)
(-7,11)
(-5,-3)
(-5,8)
(-3,-1)
(-3,4)
(-2,-1)
(-2,1)
(-2,3)
(-1,0)
(-1,1)
(1,-3)
(1,-2)
(1,1)
(1,2)
(3,-5)
(3,2)
(4,-7)
(4,3)
(8,-13)
(8,5)
(21,-34)
(21,13)
(144,-233)
(144,89)
#
# (a,b,c,d) = (-20,0,1,0) and D = -80:
#
(-9,-40)
(-9,40)
(-7,-30)
(-7,30)
(-5,-22)
(-5,22)
(-3,-10)
(-3,10)
(-1,-4)
(-1,-2)
(-1,0)
(-1,2)
(-1,4)
(1,-10)
(1,-6)
(1,-5)
(1,5)
(1,6)
(1,10)
(2,-9)
(2,9)
(3,-14)
(3,14)
(21,-94)
(21,94)
(36,-161)
(36,161)
#
# (a,b,c,d) = (-19,1,1,0) and D = -77:
#
(-8,-31)
(-8,39)
(-1,-3)
(-1,4)
(1,-5)
(1,4)
(9,-44)
(9,35)
(80,-391)
(80,311)
#
# (a,b,c,d) = (-19,0,1,0) and D = -76:
#
(-512,-2231)
(-512,2231)
(-256,-697)
(-256,697)
(-98,-73)
(-98,73)
(-81,-353)
(-81,353)
(-49,-213)
(-49,-212)
(-49,212)
(-49,213)
(-32,-139)
(-32,139)
(-16,-67)
(-16,67)
(-14,-61)
(-14,-59)
(-14,-43)
(-14,43)
(-14,59)
(-14,61)
(-9,-17)
(-9,17)
(-8,-29)
(-8,-1)
(-8,1)
(-8,29)
(-7,-29)
(-7,-16)
(-7,-11)
(-7,11)
(-7,16)
(-7,29)
(-4,-17)
(-4,-13)
(-4,13)
(-4,17)
(-3,-13)
(-3,-11)
(-3,11)
(-3,13)
(-2,-7)
(-2,-1)
(-2,1)
(-2,7)
(-1,-4)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,1)
(-1,2)
(-1,3)
(-1,4)
(1,-137)
(1,-37)
(1,-17)
(1,-13)
(1,-12)
(1,-10)
(1,-8)
(1,-7)
(1,-5)
(1,5)
(1,7)
(1,8)
(1,10)
(1,12)
(1,13)
(1,17)
(1,37)
(1,137)
(2,-101)
(2,-61)
(2,-11)
(2,-9)
(2,9)
(2,11)
(2,61)
(2,101)
(3,-14)
(3,14)
(4,-77)
(4,-23)
(4,23)
(4,77)
(5,-31)
(5,-23)
(5,-22)
(5,22)
(5,23)
(5,31)
(7,-151)
(7,-41)
(7,-34)
(7,-31)
(7,31)
(7,34)
(7,41)
(7,151)
(8,-35)
(8,35)
(16,-1217)
(16,-83)
(16,83)
(16,1217)
(20,-119)
(20,119)
(24,-163)
(24,163)
(25,-1789)
(25,-109)
(25,109)
(25,1789)
(28,-125)
(28,125)
(36,-157)
(36,157)
(49,-463)
(49,463)
(84,-367)
(84,367)
(224,-1187)
(224,1187)
(560,-2441)
(560,2441)
(7000,-30521)
(7000,30521)
#
# (a,b,c,d) = (-18,1,1,0) and D = -73:
#
(-6125,-23094)
(-6125,29219)
(-1372,-5175)
(-1372,6547)
(-250,-943)
(-250,1193)
(-245,-846)
(-245,1091)
(-175,-639)
(-175,814)
(-35,-132)
(-35,167)
(-27,-58)
(-27,85)
(-25,-94)
(-25,-92)
(-25,-73)
(-25,98)
(-25,117)
(-25,119)
(-7,-26)
(-7,-23)
(-7,-18)
(-7,-2)
(-7,9)
(-7,25)
(-7,30)
(-7,33)
(-5,-18)
(-5,-13)
(-5,-9)
(-5,-6)
(-5,11)
(-5,14)
(-5,18)
(-5,23)
(-4,-15)
(-4,-5)
(-4,9)
(-4,19)
(-3,-11)
(-3,-10)
(-3,13)
(-3,14)
(-2,-7)
(-2,9)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(-1,4)
(1,-306)
(1,-79)
(1,-63)
(1,-19)
(1,-18)
(1,-15)
(1,-10)
(1,-9)
(1,-7)
(1,-6)
(1,-5)
(1,4)
(1,5)
(1,6)
(1,8)
(1,9)
(1,14)
(1,17)
(1,18)
(1,62)
(1,78)
(1,305)
(2,-11)
(2,9)
(3,-22)
(3,19)
(5,-122)
(5,-72)
(5,-27)
(5,-26)
(5,-24)
(5,19)
(5,21)
(5,22)
(5,67)
(5,117)
(7,-52)
(7,-41)
(7,-36)
(7,-34)
(7,27)
(7,29)
(7,34)
(7,45)
(9,-43)
(9,34)
(25,-151)
(25,126)
(32,-153)
(32,121)
(35,-342)
(35,307)
(40,-193)
(40,153)
(49,-274)
(49,-234)
(49,185)
(49,225)
(56,-369)
(56,313)
(75,-358)
(75,283)
(125,-3987)
(125,3862)
(245,-1179)
(245,934)
(525,-2563)
(525,2038)
#
# (a,b,c,d) = (-18,0,1,0) and D = -72:
#
(-128,-543)
(-128,543)
(-25,-106)
(-25,106)
(-16,-39)
(-16,39)
(-15,-58)
(-15,58)
(-9,-38)
(-9,38)
(-8,-33)
(-8,33)
(-5,-21)
(-5,-18)
(-5,-3)
(-5,3)
(-5,18)
(-5,21)
(-4,-15)
(-4,15)
(-3,-8)
(-3,8)
(-2,-3)
(-2,3)
(-1,-4)
(-1,-3)
(-1,-2)
(-1,0)
(-1,2)
(-1,3)
(-1,4)
(1,-30)
(1,-19)
(1,-12)
(1,-9)
(1,-6)
(1,-5)
(1,5)
(1,6)
(1,9)
(1,12)
(1,19)
(1,30)
(2,-11)
(2,-9)
(2,9)
(2,11)
(3,-13)
(3,13)
(4,-27)
(4,-17)
(4,17)
(4,27)
(5,-24)
(5,24)
(7,-30)
(7,30)
(10,-153)
(10,-43)
(10,43)
(10,153)
(24,-113)
(24,113)
(25,-132)
(25,132)
(27,-173)
(27,173)
(40,-171)
(40,171)
(70,-297)
(70,297)
#
# (a,b,c,d) = (-17,1,1,0) and D = -69:
#
(-54,-197)
(-54,251)
(-49,-179)
(-49,228)
(-21,-76)
(-21,97)
(-14,-9)
(-14,23)
(-8,-29)
(-8,-23)
(-8,31)
(-8,37)
(-3,-4)
(-3,7)
(-2,-7)
(-2,9)
(-1,-3)
(-1,-1)
(-1,2)
(-1,4)
(1,-44)
(1,-7)
(1,-5)
(1,4)
(1,6)
(1,43)
(2,-13)
(2,11)
(3,-14)
(3,11)
(7,-33)
(7,26)
(16,-79)
(16,63)
(32,-149)
(32,117)
(75,-349)
(75,274)
(144,-683)
(144,539)
(448,-3861)
(448,3413)
(24192,-112573)
(24192,88381)
#
# (a,b,c,d) = (-2,1,2,0) and D = -68:
#
(-250,33)
(-125,46)
(-54,-41)
(-50,-39)
(-27,34)
(-25,32)
(-18,23)
(-10,-7)
(-10,9)
(-9,-7)
(-6,-1)
(-6,7)
(-5,-2)
(-5,6)
(-4,-3)
(-4,5)
(-3,-2)
(-3,2)
(-2,-1)
(-2,1)
(-1,0)
(-1,1)
(1,-6)
(1,-2)
(1,1)
(1,2)
(2,-5)
(2,-3)
(2,3)
(2,11)
(3,-4)
(5,4)
(6,5)
(7,-10)
(7,-9)
(7,6)
(7,22)
(9,10)
(10,-13)
(14,-51)
(14,-19)
(14,11)
(14,13)
(15,-26)
(18,-29)
(30,37)
(32,-41)
(32,25)
(105,82)
(210,-269)
(441,362)
(882,-1165)
#
# (a,b,c,d) = (-17,0,1,0) and D = -68:
#
(-125,-59)
(-125,59)
(-27,-109)
(-27,109)
(-25,-103)
(-25,103)
(-9,-37)
(-9,37)
(-5,-19)
(-5,-13)
(-5,13)
(-5,19)
(-3,-11)
(-3,-5)
(-3,5)
(-3,11)
(-1,-4)
(-1,-3)
(-1,-1)
(-1,1)
(-1,3)
(-1,4)
(1,-23)
(1,-9)
(1,-7)
(1,-5)
(1,5)
(1,7)
(1,9)
(1,23)
(3,-13)
(3,13)
(5,-21)
(5,21)
(7,-95)
(7,-33)
(7,-31)
(7,-29)
(7,29)
(7,31)
(7,33)
(7,95)
(8,-33)
(8,33)
(9,-49)
(9,49)
(15,-89)
(15,89)
(105,-433)
(105,433)
(441,-1889)
(441,1889)
#
# (a,b,c,d) = (-16,1,1,0) and D = -65:
#
(-1125,-2896)
(-1125,4021)
(-243,-733)
(-243,976)
(-81,-286)
(-81,-272)
(-81,353)
(-81,367)
(-49,-173)
(-49,222)
(-45,-157)
(-45,202)
(-36,-127)
(-36,163)
(-27,-16)
(-27,43)
(-25,-88)
(-25,-87)
(-25,-11)
(-25,36)
(-25,112)
(-25,113)
(-15,-47)
(-15,-1)
(-15,16)
(-15,62)
(-12,-19)
(-12,31)
(-9,-31)
(-9,-23)
(-9,-16)
(-9,25)
(-9,32)
(-9,40)
(-7,-24)
(-7,-9)
(-7,16)
(-7,31)
(-5,-16)
(-5,-12)
(-5,-11)
(-5,16)
(-5,17)
(-5,21)
(-4,-13)
(-4,17)
(-3,-10)
(-3,-8)
(-3,-1)
(-3,4)
(-3,11)
(-3,13)
(-2,-7)
(-2,-3)
(-2,5)
(-2,9)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(-1,4)
(1,-240)
(1,-48)
(1,-27)
(1,-23)
(1,-17)
(1,-16)
(1,-13)
(1,-9)
(1,-8)
(1,-6)
(1,-5)
(1,4)
(1,5)
(1,7)
(1,8)
(1,12)
(1,15)
(1,16)
(1,22)
(1,26)
(1,47)
(1,239)
(2,-291)
(2,-11)
(2,9)
(2,289)
(3,-179)
(3,-32)
(3,-20)
(3,-19)
(3,-16)
(3,-14)
(3,11)
(3,13)
(3,16)
(3,17)
(3,29)
(3,176)
(5,-213)
(5,-37)
(5,-24)
(5,-23)
(5,18)
(5,19)
(5,32)
(5,208)
(7,-32)
(7,25)
(8,-37)
(8,29)
(9,-112)
(9,-109)
(9,-47)
(9,-41)
(9,32)
(9,38)
(9,100)
(9,103)
(15,-68)
(15,53)
(16,-89)
(16,73)
(21,-101)
(21,80)
(24,-109)
(24,85)
(25,-169)
(25,144)
(27,-9931)
(27,-131)
(27,104)
(27,9904)
(32,-145)
(32,113)
(35,-208)
(35,173)
(81,-368)
(81,287)
(120,-653)
(120,533)
(135,-656)
(135,521)
(625,-2832)
(625,2207)
(2592,-12017)
(2592,9425)
(10125,-45917)
(10125,35792)
#
# (a,b,c,d) = (0,2,4,0) and D = -64:
#
(-8750,1)
(-4802,1)
(-4375,2187)
(-2401,1200)
(-2058,5)
(-1250,49)
(-1029,512)
(-750,343)
(-686,243)
(-625,288)
(-512,81)
(-512,175)
(-500,7)
(-500,243)
(-490,243)
(-450,1)
(-378,125)
(-375,16)
(-343,50)
(-270,7)
(-256,3)
(-256,125)
(-252,1)
(-252,125)
(-250,27)
(-245,1)
(-225,112)
(-189,32)
(-162,1)
(-162,25)
(-162,49)
(-135,64)
(-128,1)
(-128,15)
(-128,49)
(-128,63)
(-125,49)
(-108,5)
(-108,49)
(-100,1)
(-100,49)
(-98,1)
(-98,9)
(-98,25)
(-98,45)
(-81,16)
(-81,28)
(-81,40)
(-72,1)
(-72,35)
(-70,3)
(-70,27)
(-64,5)
(-64,7)
(-64,25)
(-64,27)
(-56,1)
(-56,3)
(-56,25)
(-56,27)
(-54,7)
(-54,25)
(-50,1)
(-50,7)
(-50,9)
(-50,21)
(-49,2)
(-49,12)
(-49,20)
(-49,24)
(-42,1)
(-42,5)
(-35,4)
(-35,16)
(-32,1)
(-32,7)
(-32,9)
(-32,15)
(-30,1)
(-30,7)
(-28,5)
(-28,9)
(-27,1)
(-27,10)
(-25,2)
(-25,8)
(-25,9)
(-25,12)
(-24,5)
(-24,7)
(-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)
(-15,4)
(-15,7)
(-14,1)
(-14,3)
(-14,5)
(-12,1)
(-12,5)
(-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,-63)
(1,-32)
(1,-25)
(1,-18)
(1,-14)
(1,-8)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,3)
(1,4)
(1,7)
(1,10)
(1,12)
(1,24)
(1,40)
(1,112)
(1,1200)
(1,2187)
(2,-4375)
(2,-2401)
(2,-225)
(2,-81)
(2,-49)
(2,-25)
(2,-21)
(2,-15)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,5)
(2,7)
(2,9)
(2,15)
(2,27)
(2,35)
(2,49)
(2,63)
(2,125)
(3,-64)
(3,-14)
(3,-5)
(3,-4)
(3,-2)
(3,1)
(3,2)
(3,16)
(4,-245)
(4,-27)
(4,-9)
(4,-7)
(4,-5)
(4,-3)
(4,1)
(4,3)
(4,5)
(4,7)
(4,25)
(4,243)
(5,-27)
(5,-16)
(5,-7)
(5,-6)
(5,-4)
(5,-3)
(5,1)
(5,2)
(5,8)
(5,512)
(6,-35)
(6,-7)
(6,-5)
(6,1)
(6,5)
(6,7)
(6,25)
(6,125)
(7,-125)
(7,-16)
(7,-8)
(7,-6)
(7,-5)
(7,-4)
(7,1)
(7,4)
(7,9)
(7,10)
(7,64)
(8,-49)
(8,-25)
(8,-9)
(8,-7)
(8,-5)
(8,1)
(8,3)
(8,5)
(8,21)
(8,45)
(9,-8)
(9,-7)
(9,-5)
(9,8)
(9,20)
(10,-1029)
(10,-21)
(10,-9)
(10,-7)
(10,1)
(10,3)
(10,7)
(10,9)
(10,27)
(10,49)
(12,-7)
(12,1)
(14,-135)
(14,-27)
(14,-25)
(14,-15)
(14,-9)
(14,1)
(14,3)
(14,5)
(14,9)
(14,25)
(14,243)
(15,-32)
(15,-8)
(16,-35)
(16,-15)
(16,-9)
(16,1)
(16,7)
(16,27)
(18,-49)
(18,-25)
(18,1)
(18,5)
(18,7)
(21,2)
(25,-16)
(25,-14)
(25,1)
(25,12)
(25,28)
(27,-16)
(27,-14)
(27,4)
(27,49)
(28,-15)
(28,1)
(30,1)
(30,49)
(32,-25)
(32,-21)
(32,5)
(32,9)
(35,-18)
(36,-25)
(36,7)
(40,-27)
(40,-21)
(40,1)
(40,7)
(42,-25)
(45,2)
(48,-49)
(48,-25)
(48,1)
(48,25)
(49,-32)
(49,-27)
(49,-25)
(49,16)
(49,288)
(50,-81)
(50,-49)
(50,-27)
(50,3)
(50,7)
(54,-125)
(54,-35)
(54,1)
(54,5)
(63,-32)
(64,-375)
(64,-81)
(64,-35)
(64,3)
(64,49)
(64,343)
(70,1)
(80,-49)
(80,9)
(81,-128)
(90,-49)
(96,-49)
(96,1)
(98,-625)
(98,-81)
(98,1)
(98,5)
(98,15)
(112,-81)
(112,25)
(125,-64)
(125,-63)
(125,32)
(126,1)
(128,-189)
(128,125)
(160,-81)
(160,1)
(162,175)
(175,-128)
(196,-125)
(196,27)
(200,-343)
(200,243)
(243,-125)
(243,1)
(243,50)
(250,-189)
(250,1)
(250,3)
(256,-135)
(256,7)
(343,16)
(350,81)
(448,-225)
(448,1)
(486,-343)
(486,-245)
(486,7)
(686,-375)
(1152,-625)
(1152,49)
(2048,-1029)
(2048,5)
(4800,-2401)
(4800,1)
(8748,-4375)
(8748,1)
#
# (a,b,c,d) = (0,1,8,0) and D = -64:
#
(-35000,1)
(-19208,1)
(-17500,2187)
(-8232,5)
(-5000,49)
(-3000,343)
(-2744,243)
(-2401,300)
(-2048,81)
(-2048,175)
(-2000,7)
(-2000,243)
(-1960,243)
(-1800,1)
(-1512,125)
(-1080,7)
(-1029,128)
(-1024,3)
(-1024,125)
(-1008,1)
(-1008,125)
(-1000,27)
(-980,1)
(-686,25)
(-648,1)
(-648,25)
(-648,49)
(-625,72)
(-512,1)
(-512,15)
(-512,49)
(-512,63)
(-500,49)
(-432,5)
(-432,49)
(-400,1)
(-400,49)
(-392,1)
(-392,9)
(-392,25)
(-392,45)
(-375,4)
(-288,1)
(-288,35)
(-280,3)
(-280,27)
(-256,5)
(-256,7)
(-256,25)
(-256,27)
(-225,28)
(-224,1)
(-224,3)
(-224,25)
(-224,27)
(-216,7)
(-216,25)
(-200,1)
(-200,7)
(-200,9)
(-200,21)
(-189,8)
(-168,1)
(-168,5)
(-135,16)
(-128,1)
(-128,7)
(-128,9)
(-128,15)
(-120,1)
(-120,7)
(-112,5)
(-112,9)
(-108,1)
(-100,9)
(-98,1)
(-96,5)
(-96,7)
(-81,4)
(-81,7)
(-81,10)
(-80,1)
(-80,3)
(-80,7)
(-80,9)
(-72,1)
(-72,5)
(-72,7)
(-64,1)
(-64,3)
(-64,5)
(-64,7)
(-60,7)
(-56,1)
(-56,3)
(-56,5)
(-54,5)
(-50,1)
(-49,3)
(-49,5)
(-49,6)
(-48,1)
(-48,5)
(-42,5)
(-40,1)
(-40,3)
(-36,1)
(-35,1)
(-35,4)
(-32,1)
(-32,3)
(-28,1)
(-28,3)
(-25,2)
(-25,3)
(-24,1)
(-21,2)
(-20,1)
(-18,1)
(-16,1)
(-15,1)
(-14,1)
(-12,1)
(-10,1)
(-9,1)
(1,-8)
(1,-2)
(1,-1)
(1,1)
(1,3)
(1,6)
(1,10)
(1,28)
(1,300)
(2,-9)
(2,-7)
(2,-1)
(2,1)
(2,5)
(3,-16)
(3,-1)
(3,4)
(4,-63)
(4,-25)
(4,-5)
(4,-3)
(4,-1)
(4,1)
(4,3)
(4,7)
(4,2187)
(5,-4)
(5,-1)
(5,2)
(5,128)
(6,-7)
(6,-1)
(6,1)
(7,-4)
(7,-2)
(7,-1)
(7,1)
(7,16)
(8,-4375)
(8,-2401)
(8,-225)
(8,-81)
(8,-49)
(8,-25)
(8,-21)
(8,-15)
(8,-9)
(8,-7)
(8,-5)
(8,-3)
(8,1)
(8,3)
(8,5)
(8,7)
(8,9)
(8,15)
(8,27)
(8,35)
(8,49)
(8,63)
(8,125)
(9,-2)
(9,2)
(9,5)
(10,-3)
(10,1)
(12,-5)
(12,1)
(14,-3)
(14,5)
(15,-8)
(15,-2)
(16,-245)
(16,-27)
(16,-9)
(16,-7)
(16,-5)
(16,-3)
(16,1)
(16,3)
(16,5)
(16,7)
(16,25)
(16,243)
(20,-27)
(20,-7)
(20,-3)
(20,1)
(24,-35)
(24,-7)
(24,-5)
(24,1)
(24,5)
(24,7)
(24,25)
(24,125)
(25,-4)
(25,3)
(25,7)
(27,-4)
(27,1)
(28,-125)
(28,-5)
(28,1)
(28,9)
(32,-49)
(32,-25)
(32,-9)
(32,-7)
(32,-5)
(32,1)
(32,3)
(32,5)
(32,21)
(32,45)
(36,-7)
(36,-5)
(40,-1029)
(40,-21)
(40,-9)
(40,-7)
(40,1)
(40,3)
(40,7)
(40,9)
(40,27)
(40,49)
(42,1)
(48,-7)
(48,1)
(49,-8)
(49,4)
(49,72)
(50,-7)
(54,-7)
(56,-135)
(56,-27)
(56,-25)
(56,-15)
(56,-9)
(56,1)
(56,3)
(56,5)
(56,9)
(56,25)
(56,243)
(63,-8)
(64,-35)
(64,-15)
(64,-9)
(64,1)
(64,7)
(64,27)
(70,-9)
(72,-49)
(72,-25)
(72,1)
(72,5)
(72,7)
(81,-32)
(90,1)
(100,1)
(108,49)
(112,-15)
(112,1)
(120,1)
(120,49)
(125,-16)
(125,8)
(128,-25)
(128,-21)
(128,5)
(128,9)
(144,-25)
(144,7)
(160,-27)
(160,-21)
(160,1)
(160,7)
(168,-25)
(175,-32)
(192,-49)
(192,-25)
(192,1)
(192,25)
(196,-27)
(196,-25)
(200,-81)
(200,-49)
(200,-27)
(200,3)
(200,7)
(216,-125)
(216,-35)
(216,1)
(216,5)
(256,-375)
(256,-81)
(256,-35)
(256,3)
(256,49)
(256,343)
(280,1)
(320,-49)
(320,9)
(343,4)
(360,-49)
(384,-49)
(384,1)
(392,-625)
(392,-81)
(392,1)
(392,5)
(392,15)
(448,-81)
(448,25)
(486,25)
(500,-63)
(504,1)
(512,-189)
(512,125)
(640,-81)
(640,1)
(648,175)
(784,-125)
(784,27)
(800,-343)
(800,243)
(972,-125)
(972,1)
(1000,-189)
(1000,1)
(1000,3)
(1024,-135)
(1024,7)
(1400,81)
(1792,-225)
(1792,1)
(1944,-343)
(1944,-245)
(1944,7)
(2744,-375)
(4608,-625)
(4608,49)
(8192,-1029)
(8192,5)
(19200,-2401)
(19200,1)
(34992,-4375)
(34992,1)
#
# (a,b,c,d) = (-2,0,2,0) and D = -64:
#
(-4375,-4373)
(-4375,4373)
(-2401,-2399)
(-2401,2399)
(-1029,-1019)
(-1029,1019)
(-625,-527)
(-625,527)
(-375,-311)
(-375,311)
(-343,-143)
(-343,143)
(-245,-241)
(-245,241)
(-225,-223)
(-225,223)
(-189,-61)
(-189,61)
(-135,-121)
(-135,121)
(-128,-47)
(-128,47)
(-125,-118)
(-125,-71)
(-125,71)
(-125,118)
(-81,-79)
(-81,-31)
(-81,-17)
(-81,17)
(-81,31)
(-81,79)
(-64,-61)
(-64,61)
(-63,-62)
(-63,62)
(-49,-47)
(-49,-41)
(-49,-31)
(-49,-1)
(-49,1)
(-49,31)
(-49,41)
(-49,47)
(-35,-29)
(-35,-19)
(-35,19)
(-35,29)
(-32,-31)
(-32,-17)
(-32,17)
(-32,31)
(-27,-23)
(-27,-22)
(-27,-13)
(-27,13)
(-27,22)
(-27,23)
(-25,-24)
(-25,-23)
(-25,-17)
(-25,-11)
(-25,-7)
(-25,7)
(-25,11)
(-25,17)
(-25,23)
(-25,24)
(-21,-19)
(-21,-11)
(-21,11)
(-21,19)
(-18,-17)
(-18,17)
(-16,-11)
(-16,-9)
(-16,9)
(-16,11)
(-15,-13)
(-15,-1)
(-15,1)
(-15,13)
(-14,-13)
(-14,-11)
(-14,11)
(-14,13)
(-9,-7)
(-9,-5)
(-9,-1)
(-9,1)
(-9,5)
(-9,7)
(-8,-7)
(-8,-1)
(-8,1)
(-8,7)
(-7,-5)
(-7,-3)
(-7,-2)
(-7,-1)
(-7,1)
(-7,2)
(-7,3)
(-7,5)
(-6,-1)
(-6,1)
(-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,-8749)
(1,-4801)
(1,-449)
(1,-251)
(1,-244)
(1,-161)
(1,-127)
(1,-99)
(1,-97)
(1,-71)
(1,-55)
(1,-49)
(1,-41)
(1,-31)
(1,-29)
(1,-26)
(1,-19)
(1,-17)
(1,-15)
(1,-13)
(1,-11)
(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)
(1,11)
(1,13)
(1,15)
(1,17)
(1,19)
(1,26)
(1,29)
(1,31)
(1,41)
(1,49)
(1,55)
(1,71)
(1,97)
(1,99)
(1,127)
(1,161)
(1,244)
(1,251)
(1,449)
(1,4801)
(1,8749)
(2,-47)
(2,-23)
(2,-7)
(2,-5)
(2,-3)
(2,3)
(2,5)
(2,7)
(2,23)
(2,47)
(3,-253)
(3,-67)
(3,-53)
(3,-17)
(3,-13)
(3,-11)
(3,-7)
(3,-5)
(3,-4)
(3,4)
(3,5)
(3,7)
(3,11)
(3,13)
(3,17)
(3,53)
(3,67)
(3,253)
(4,-31)
(4,-11)
(4,-5)
(4,5)
(4,11)
(4,31)
(5,-2053)
(5,-103)
(5,-59)
(5,-37)
(5,-23)
(5,-19)
(5,-13)
(5,-11)
(5,-9)
(5,-7)
(5,7)
(5,9)
(5,11)
(5,13)
(5,19)
(5,23)
(5,37)
(5,59)
(5,103)
(5,2053)
(7,-493)
(7,-263)
(7,-57)
(7,-47)
(7,-43)
(7,-25)
(7,-23)
(7,-17)
(7,-13)
(7,-11)
(7,-9)
(7,-8)
(7,8)
(7,9)
(7,11)
(7,13)
(7,17)
(7,23)
(7,25)
(7,43)
(7,47)
(7,57)
(7,263)
(7,493)
(8,-17)
(8,-13)
(8,13)
(8,17)
(9,-89)
(9,-41)
(9,-23)
(9,-19)
(9,-16)
(9,-11)
(9,11)
(9,16)
(9,19)
(9,23)
(9,41)
(9,89)
(10,-17)
(10,-11)
(10,11)
(10,17)
(12,-37)
(12,-13)
(12,13)
(12,37)
(15,-113)
(15,-17)
(15,17)
(15,113)
(16,-359)
(16,-65)
(16,-19)
(16,19)
(16,65)
(16,359)
(20,-29)
(20,29)
(21,-29)
(21,29)
(24,-25)
(24,25)
(25,-137)
(25,-73)
(25,-39)
(25,-31)
(25,-29)
(25,29)
(25,31)
(25,39)
(25,73)
(25,137)
(27,-223)
(27,-43)
(27,-37)
(27,-29)
(27,29)
(27,37)
(27,43)
(27,223)
(28,-53)
(28,53)
(32,-157)
(32,157)
(35,-37)
(35,37)
(40,-41)
(40,41)
(45,-53)
(45,53)
(49,-1201)
(49,-113)
(49,-79)
(49,-76)
(49,-59)
(49,-51)
(49,51)
(49,59)
(49,76)
(49,79)
(49,113)
(49,1201)
(50,-293)
(50,293)
(63,-65)
(63,65)
(64,-71)
(64,71)
(81,-431)
(81,431)
(112,-113)
(112,113)
(125,-253)
(125,-131)
(125,-127)
(125,127)
(125,131)
(125,253)
(175,-337)
(175,337)
(243,-443)
(243,-257)
(243,-247)
(243,247)
(243,257)
(243,443)
(288,-337)
(288,337)
(343,-407)
(343,407)
(512,-517)
(512,517)
(1200,-1201)
(1200,1201)
(2187,-2188)
(2187,2188)
#
# (a,b,c,d) = (-16,0,1,0) and D = -64:
#
(-4375,-17492)
(-4375,17492)
(-2401,-9596)
(-2401,9596)
(-1029,-4076)
(-1029,4076)
(-625,-2108)
(-625,2108)
(-375,-1244)
(-375,1244)
(-343,-572)
(-343,572)
(-245,-964)
(-245,964)
(-225,-892)
(-225,892)
(-189,-244)
(-189,244)
(-135,-484)
(-135,484)
(-125,-472)
(-125,-284)
(-125,284)
(-125,472)
(-81,-316)
(-81,-124)
(-81,-68)
(-81,68)
(-81,124)
(-81,316)
(-63,-248)
(-63,248)
(-49,-188)
(-49,-164)
(-49,-124)
(-49,-4)
(-49,4)
(-49,124)
(-49,164)
(-49,188)
(-35,-116)
(-35,-76)
(-35,76)
(-35,116)
(-32,-47)
(-32,47)
(-27,-92)
(-27,-88)
(-27,-52)
(-27,52)
(-27,88)
(-27,92)
(-25,-96)
(-25,-92)
(-25,-68)
(-25,-44)
(-25,-28)
(-25,28)
(-25,44)
(-25,68)
(-25,92)
(-25,96)
(-21,-76)
(-21,-44)
(-21,44)
(-21,76)
(-16,-61)
(-16,61)
(-15,-52)
(-15,-4)
(-15,4)
(-15,52)
(-9,-34)
(-9,-28)
(-9,-20)
(-9,-4)
(-9,4)
(-9,20)
(-9,28)
(-9,34)
(-8,-31)
(-8,-17)
(-8,17)
(-8,31)
(-7,-26)
(-7,-22)
(-7,-20)
(-7,-12)
(-7,-8)
(-7,-4)
(-7,4)
(-7,8)
(-7,12)
(-7,20)
(-7,22)
(-7,26)
(-5,-16)
(-5,-12)
(-5,-8)
(-5,-4)
(-5,4)
(-5,8)
(-5,12)
(-5,16)
(-4,-11)
(-4,-9)
(-4,9)
(-4,11)
(-3,-8)
(-3,-4)
(-3,-2)
(-3,2)
(-3,4)
(-3,8)
(-2,-7)
(-2,-1)
(-2,1)
(-2,7)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(1,-34996)
(1,-19204)
(1,-1796)
(1,-1004)
(1,-976)
(1,-644)
(1,-508)
(1,-396)
(1,-388)
(1,-284)
(1,-220)
(1,-196)
(1,-164)
(1,-124)
(1,-116)
(1,-104)
(1,-94)
(1,-76)
(1,-68)
(1,-60)
(1,-52)
(1,-46)
(1,-44)
(1,-36)
(1,-32)
(1,-31)
(1,-28)
(1,-24)
(1,-20)
(1,-16)
(1,-14)
(1,-12)
(1,-11)
(1,-10)
(1,-8)
(1,-6)
(1,-5)
(1,5)
(1,6)
(1,8)
(1,10)
(1,11)
(1,12)
(1,14)
(1,16)
(1,20)
(1,24)
(1,28)
(1,31)
(1,32)
(1,36)
(1,44)
(1,46)
(1,52)
(1,60)
(1,68)
(1,76)
(1,94)
(1,104)
(1,116)
(1,124)
(1,164)
(1,196)
(1,220)
(1,284)
(1,388)
(1,396)
(1,508)
(1,644)
(1,976)
(1,1004)
(1,1796)
(1,19204)
(1,34996)
(2,-17)
(2,-13)
(2,13)
(2,17)
(3,-1012)
(3,-268)
(3,-212)
(3,-68)
(3,-52)
(3,-44)
(3,-37)
(3,-28)
(3,-20)
(3,-16)
(3,-13)
(3,13)
(3,16)
(3,20)
(3,28)
(3,37)
(3,44)
(3,52)
(3,68)
(3,212)
(3,268)
(3,1012)
(4,-359)
(4,-65)
(4,-19)
(4,19)
(4,65)
(4,359)
(5,-8212)
(5,-412)
(5,-236)
(5,-148)
(5,-92)
(5,-76)
(5,-52)
(5,-44)
(5,-36)
(5,-34)
(5,-29)
(5,-28)
(5,-22)
(5,22)
(5,28)
(5,29)
(5,34)
(5,36)
(5,44)
(5,52)
(5,76)
(5,92)
(5,148)
(5,236)
(5,412)
(5,8212)
(6,-25)
(6,25)
(7,-1972)
(7,-1052)
(7,-228)
(7,-188)
(7,-172)
(7,-100)
(7,-92)
(7,-68)
(7,-53)
(7,-52)
(7,-44)
(7,-36)
(7,-32)
(7,32)
(7,36)
(7,44)
(7,52)
(7,53)
(7,68)
(7,92)
(7,100)
(7,172)
(7,188)
(7,228)
(7,1052)
(7,1972)
(8,-157)
(8,157)
(9,-356)
(9,-164)
(9,-92)
(9,-76)
(9,-64)
(9,-44)
(9,44)
(9,64)
(9,76)
(9,92)
(9,164)
(9,356)
(10,-41)
(10,41)
(15,-452)
(15,-68)
(15,68)
(15,452)
(16,-71)
(16,71)
(21,-116)
(21,116)
(25,-586)
(25,-548)
(25,-292)
(25,-156)
(25,-124)
(25,-116)
(25,116)
(25,124)
(25,156)
(25,292)
(25,548)
(25,586)
(27,-892)
(27,-172)
(27,-148)
(27,-116)
(27,116)
(27,148)
(27,172)
(27,892)
(28,-113)
(28,113)
(35,-148)
(35,148)
(45,-212)
(45,212)
(49,-4804)
(49,-452)
(49,-316)
(49,-304)
(49,-236)
(49,-204)
(49,204)
(49,236)
(49,304)
(49,316)
(49,452)
(49,4804)
(63,-260)
(63,260)
(72,-337)
(72,337)
(81,-1724)
(81,1724)
(125,-1012)
(125,-524)
(125,-508)
(125,508)
(125,524)
(125,1012)
(128,-517)
(128,517)
(175,-1348)
(175,1348)
(243,-1772)
(243,-1028)
(243,-988)
(243,988)
(243,1028)
(243,1772)
(300,-1201)
(300,1201)
(343,-1628)
(343,1628)
(2187,-8752)
(2187,8752)
#
# (a,b,c,d) = (-15,1,1,0) and D = -61:
#
(-567,-1930)
(-567,2497)
(-98,-295)
(-98,393)
(-64,-195)
(-64,259)
(-49,-116)
(-49,165)
(-42,-143)
(-42,185)
(-32,-63)
(-32,95)
(-28,-95)
(-28,123)
(-25,-42)
(-25,67)
(-16,-15)
(-16,31)
(-10,-33)
(-10,43)
(-8,-27)
(-8,-25)
(-8,33)
(-8,35)
(-7,-23)
(-7,-15)
(-7,-5)
(-7,12)
(-7,22)
(-7,30)
(-5,-17)
(-5,22)
(-4,-11)
(-4,1)
(-4,3)
(-4,15)
(-3,-10)
(-3,-2)
(-3,5)
(-3,13)
(-2,-5)
(-2,-3)
(-2,5)
(-2,7)
(-1,-3)
(-1,-2)
(-1,0)
(-1,1)
(-1,3)
(-1,4)
(1,-291)
(1,-61)
(1,-21)
(1,-16)
(1,-10)
(1,-7)
(1,-6)
(1,-5)
(1,4)
(1,5)
(1,6)
(1,9)
(1,15)
(1,20)
(1,60)
(1,290)
(2,-45)
(2,-15)
(2,-9)
(2,7)
(2,13)
(2,43)
(4,-39)
(4,-19)
(4,15)
(4,35)
(5,-24)
(5,19)
(7,-37)
(7,-31)
(7,24)
(7,30)
(8,-249)
(8,241)
(9,-40)
(9,31)
(14,-125)
(14,-65)
(14,51)
(14,111)
(16,-85)
(16,69)
(21,-160)
(21,139)
(24,-109)
(24,85)
(32,-141)
(32,109)
(49,-219)
(49,170)
(56,-285)
(56,229)
(343,-2938)
(343,2595)
(3920,-62961)
(3920,59041)
(8000,-35241)
(8000,27241)
#
# (a,b,c,d) = (-15,0,1,0) and D = -60:
#
(-3645,-14117)
(-3645,14117)
(-128,-495)
(-128,495)
(-54,-205)
(-54,205)
(-9,-23)
(-9,23)
(-8,-15)
(-8,15)
(-7,-27)
(-7,27)
(-5,-19)
(-5,-9)
(-5,9)
(-5,19)
(-4,-15)
(-4,15)
(-3,-11)
(-3,-10)
(-3,10)
(-3,11)
(-2,-5)
(-2,5)
(-1,-3)
(-1,-1)
(-1,0)
(-1,1)
(-1,3)
(1,-155)
(1,-15)
(1,-8)
(1,-6)
(1,-5)
(1,-4)
(1,4)
(1,5)
(1,6)
(1,8)
(1,15)
(1,155)
(2,-33)
(2,-9)
(2,9)
(2,33)
(3,-25)
(3,25)
(4,-17)
(4,17)
(8,-31)
(8,31)
(9,-35)
(9,35)
(10,-39)
(10,39)
(12,-47)
(12,47)
(15,-76)
(15,76)
(16,-79)
(16,79)
(25,-102)
(25,102)
(63,-244)
(63,244)
#
# (a,b,c,d) = (-14,1,1,0) and D = -57:
#
(-3125,-10234)
(-3125,13359)
(-1215,-3979)
(-1215,5194)
(-343,-1123)
(-343,1466)
(-125,-386)
(-125,511)
(-50,-161)
(-50,211)
(-45,-98)
(-45,143)
(-27,-85)
(-27,112)
(-25,-77)
(-25,-66)
(-25,91)
(-25,102)
(-15,-49)
(-15,-14)
(-15,29)
(-15,64)
(-9,-29)
(-9,-28)
(-9,-26)
(-9,35)
(-9,37)
(-9,38)
(-7,-22)
(-7,-19)
(-7,26)
(-7,29)
(-5,-16)
(-5,-14)
(-5,-9)
(-5,-2)
(-5,7)
(-5,14)
(-5,19)
(-5,21)
(-4,-13)
(-4,-7)
(-4,11)
(-4,17)
(-3,-7)
(-3,-4)
(-3,1)
(-3,2)
(-3,7)
(-3,10)
(-2,-5)
(-2,7)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(-1,4)
(1,-5419)
(1,-182)
(1,-43)
(1,-35)
(1,-22)
(1,-15)
(1,-14)
(1,-11)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,4)
(1,5)
(1,6)
(1,7)
(1,10)
(1,13)
(1,14)
(1,21)
(1,34)
(1,42)
(1,181)
(1,5418)
(2,-21)
(2,-9)
(2,7)
(2,19)
(3,-130)
(3,-17)
(3,-14)
(3,-13)
(3,10)
(3,11)
(3,14)
(3,127)
(5,-124)
(5,-46)
(5,-28)
(5,-26)
(5,-23)
(5,-22)
(5,17)
(5,18)
(5,21)
(5,23)
(5,41)
(5,119)
(7,-45)
(7,-30)
(7,23)
(7,38)
(8,-35)
(8,27)
(9,-266)
(9,-86)
(9,-70)
(9,61)
(9,77)
(9,257)
(15,-133)
(15,118)
(18,-77)
(18,59)
(24,-115)
(24,91)
(25,-4403)
(25,-179)
(25,-107)
(25,82)
(25,154)
(25,4378)
(27,-146)
(27,119)
(32,-137)
(32,105)
(40,-171)
(40,131)
(75,-322)
(75,247)
(80,-497)
(80,417)
(81,-347)
(81,266)
(105,-454)
(105,349)
(405,-5242)
(405,4837)
(1575,-6733)
(1575,5158)
#
# (a,b,c,d) = (-14,0,1,0) and D = -56:
#
(-63,-229)
(-63,229)
(-49,-183)
(-49,183)
(-32,-119)
(-32,119)
(-27,-101)
(-27,101)
(-15,-56)
(-15,56)
(-9,-28)
(-9,28)
(-7,-26)
(-7,26)
(-4,-7)
(-4,7)
(-3,-11)
(-3,-1)
(-3,1)
(-3,11)
(-2,-7)
(-2,7)
(-1,-3)
(-1,-2)
(-1,0)
(-1,2)
(-1,3)
(1,-42)
(1,-8)
(1,-7)
(1,-4)
(1,4)
(1,7)
(1,8)
(1,42)
(2,-9)
(2,9)
(3,-14)
(3,14)
(4,-15)
(4,15)
(6,-127)
(6,-23)
(6,23)
(6,127)
(7,-44)
(7,44)
(8,-39)
(8,39)
(36,-137)
(36,137)
(120,-449)
(120,449)
#
# (a,b,c,d) = (-13,1,1,0) and D = -53:
#
(-50,-157)
(-50,207)
(-32,-99)
(-32,131)
(-8,-25)
(-8,33)
(-2,-1)
(-2,3)
(-1,-3)
(-1,-2)
(-1,3)
(-1,4)
(1,-908)
(1,-5)
(1,4)
(1,907)
(3,-23)
(3,20)
(5,-22)
(5,17)
(6,-25)
(6,19)
(7,-29)
(7,22)
(8,-61)
(8,53)
(9,-38)
(9,29)
#
# (a,b,c,d) = (-13,0,1,0) and D = -52:
#
(-98,-353)
(-98,353)
(-25,-86)
(-25,86)
(-14,-19)
(-14,19)
(-7,-25)
(-7,-23)
(-7,23)
(-7,25)
(-5,-18)
(-5,-17)
(-5,-1)
(-5,1)
(-5,17)
(-5,18)
(-2,-7)
(-2,-5)
(-2,5)
(-2,7)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,1)
(-1,2)
(-1,3)
(1,-16)
(1,-11)
(1,-7)
(1,-5)
(1,-4)
(1,4)
(1,5)
(1,7)
(1,11)
(1,16)
(3,-11)
(3,11)
(4,-17)
(4,17)
(5,-163)
(5,-19)
(5,19)
(5,163)
(7,-31)
(7,31)
(8,-29)
(8,29)
(20,-77)
(20,77)
(28,-101)
(28,101)
(32,-269)
(32,269)
(175,-631)
(175,631)
(180,-649)
(180,649)
#
# (a,b,c,d) = (1,1,-2,-1) and D = -49:
#
(-9,5)
(-3,2)
(-1,-1)
(-1,1)
(-1,2)
(0,-1)
(1,-3)
(1,0)
(2,-1)
(2,1)
(4,-9)
(5,4)
#
# (a,b,c,d) = (-12,1,1,0) and D = -49:
#
(-625,-1874)
(-625,-1532)
(-625,2157)
(-625,2499)
(-375,-901)
(-375,1276)
(-343,-1028)
(-343,1371)
(-256,-201)
(-256,457)
(-250,-701)
(-250,951)
(-225,-668)
(-225,893)
(-147,-436)
(-147,583)
(-135,-356)
(-135,491)
(-128,-363)
(-128,491)
(-125,-186)
(-125,311)
(-81,-236)
(-81,-68)
(-81,-19)
(-81,100)
(-81,149)
(-81,317)
(-64,-185)
(-64,-87)
(-64,151)
(-64,249)
(-54,-127)
(-54,181)
(-50,-143)
(-50,193)
(-49,-47)
(-49,96)
(-36,-101)
(-36,137)
(-35,-103)
(-35,138)
(-32,-61)
(-32,-47)
(-32,79)
(-32,93)
(-27,-67)
(-27,-32)
(-27,-17)
(-27,44)
(-27,59)
(-27,94)
(-25,-68)
(-25,-47)
(-25,-26)
(-25,-12)
(-25,37)
(-25,51)
(-25,72)
(-25,93)
(-18,-53)
(-18,71)
(-16,-41)
(-16,1)
(-16,15)
(-16,57)
(-15,-38)
(-15,4)
(-15,11)
(-15,53)
(-12,-1)
(-12,13)
(-10,-23)
(-10,-9)
(-10,19)
(-10,33)
(-9,-20)
(-9,-13)
(-9,1)
(-9,8)
(-9,22)
(-9,29)
(-8,-17)
(-8,-3)
(-8,11)
(-8,25)
(-7,-20)
(-7,-17)
(-7,-12)
(-7,3)
(-7,4)
(-7,19)
(-7,24)
(-7,27)
(-6,-11)
(-6,17)
(-5,-12)
(-5,-8)
(-5,-7)
(-5,-1)
(-5,6)
(-5,12)
(-5,13)
(-5,17)
(-4,-11)
(-4,-9)
(-4,-5)
(-4,9)
(-4,13)
(-4,15)
(-3,-8)
(-3,-4)
(-3,-2)
(-3,5)
(-3,7)
(-3,11)
(-2,-1)
(-2,1)
(-2,3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(1,-30622)
(1,-16804)
(1,-1572)
(1,-879)
(1,-564)
(1,-445)
(1,-347)
(1,-340)
(1,-249)
(1,-247)
(1,-193)
(1,-172)
(1,-144)
(1,-132)
(1,-109)
(1,-102)
(1,-67)
(1,-60)
(1,-53)
(1,-46)
(1,-39)
(1,-32)
(1,-29)
(1,-25)
(1,-24)
(1,-22)
(1,-18)
(1,-13)
(1,-12)
(1,-11)
(1,-9)
(1,-7)
(1,-6)
(1,-5)
(1,4)
(1,5)
(1,6)
(1,8)
(1,10)
(1,11)
(1,12)
(1,17)
(1,21)
(1,23)
(1,24)
(1,28)
(1,31)
(1,38)
(1,45)
(1,52)
(1,59)
(1,66)
(1,101)
(1,108)
(1,131)
(1,143)
(1,171)
(1,192)
(1,246)
(1,248)
(1,339)
(1,346)
(1,444)
(1,563)
(1,878)
(1,1571)
(1,16803)
(1,30621)
(2,-1709)
(2,-183)
(2,-57)
(2,-43)
(2,-29)
(2,-15)
(2,-9)
(2,7)
(2,13)
(2,27)
(2,41)
(2,55)
(2,181)
(2,1707)
(3,-887)
(3,-236)
(3,-187)
(3,-61)
(3,-47)
(3,-40)
(3,-26)
(3,-19)
(3,-16)
(3,13)
(3,16)
(3,23)
(3,37)
(3,44)
(3,58)
(3,184)
(3,233)
(3,884)
(4,-331)
(4,-163)
(4,-51)
(4,-37)
(4,-23)
(4,19)
(4,33)
(4,47)
(4,159)
(4,327)
(5,-7188)
(5,-363)
(5,-209)
(5,-132)
(5,-83)
(5,-69)
(5,-48)
(5,-41)
(5,-34)
(5,-27)
(5,-21)
(5,16)
(5,22)
(5,29)
(5,36)
(5,43)
(5,64)
(5,78)
(5,127)
(5,204)
(5,358)
(5,7183)
(6,-31)
(6,25)
(7,-604)
(7,-60)
(7,-43)
(7,-33)
(7,-29)
(7,22)
(7,26)
(7,36)
(7,53)
(7,597)
(8,-221)
(8,-81)
(8,-57)
(8,-39)
(8,31)
(8,49)
(8,73)
(8,213)
(9,-316)
(9,-148)
(9,-85)
(9,-71)
(9,-43)
(9,-37)
(9,28)
(9,34)
(9,62)
(9,76)
(9,139)
(9,307)
(14,-83)
(14,69)
(15,-403)
(15,-67)
(15,52)
(15,388)
(16,-127)
(16,-99)
(16,83)
(16,111)
(18,-121)
(18,103)
(20,-129)
(20,-87)
(20,67)
(20,109)
(24,-271)
(24,-103)
(24,79)
(24,247)
(25,-492)
(25,-268)
(25,-181)
(25,-149)
(25,-121)
(25,-114)
(25,89)
(25,96)
(25,124)
(25,156)
(25,243)
(25,467)
(27,-794)
(27,-164)
(27,-143)
(27,-115)
(27,88)
(27,116)
(27,137)
(27,767)
(32,-2529)
(32,-471)
(32,-149)
(32,-129)
(32,97)
(32,117)
(32,439)
(32,2497)
(40,-223)
(40,183)
(45,-208)
(45,163)
(48,-199)
(48,151)
(49,-228)
(49,179)
(64,-1131)
(64,1067)
(80,-327)
(80,247)
(81,-1549)
(81,1468)
(100,-2101)
(100,2001)
(125,-948)
(125,-521)
(125,-507)
(125,382)
(125,396)
(125,823)
(128,-561)
(128,433)
(243,-1672)
(243,-1021)
(243,-986)
(243,743)
(243,778)
(243,1429)
(576,-2647)
(576,2071)
(1024,-4131)
(1024,3107)
(2400,-9607)
(2400,7207)
(4374,-17503)
(4374,13129)
#
# (a,b,c,d) = (0,1,7,0) and D = -49:
#
(-30625,1)
(-30625,4374)
(-16807,1)
(-16807,2400)
(-7203,5)
(-7203,1024)
(-4375,576)
(-2625,32)
(-2401,100)
(-2401,243)
(-1792,81)
(-1750,243)
(-1715,2)
(-1715,243)
(-1575,1)
(-1323,64)
(-1323,125)
(-945,128)
(-896,3)
(-896,125)
(-882,1)
(-882,125)
(-875,27)
(-625,7)
(-567,1)
(-567,25)
(-567,32)
(-567,80)
(-448,1)
(-448,15)
(-378,5)
(-375,49)
(-350,1)
(-343,1)
(-343,4)
(-343,9)
(-343,24)
(-343,25)
(-343,40)
(-343,45)
(-343,48)
(-256,25)
(-252,1)
(-250,1)
(-245,3)
(-245,8)
(-245,27)
(-245,32)
(-225,32)
(-224,5)
(-224,25)
(-224,27)
(-196,1)
(-196,3)
(-196,25)
(-196,27)
(-189,2)
(-189,20)
(-189,25)
(-175,1)
(-175,4)
(-175,9)
(-175,16)
(-175,18)
(-175,24)
(-147,1)
(-147,5)
(-147,16)
(-147,20)
(-135,1)
(-125,14)
(-112,1)
(-112,9)
(-112,15)
(-105,1)
(-105,8)
(-98,5)
(-98,9)
(-84,5)
(-81,7)
(-81,8)
(-70,1)
(-70,3)
(-70,9)
(-64,7)
(-64,9)
(-63,1)
(-63,2)
(-63,4)
(-63,5)
(-63,8)
(-56,1)
(-56,3)
(-56,5)
(-54,7)
(-50,7)
(-49,1)
(-49,2)
(-49,3)
(-49,4)
(-49,5)
(-49,6)
(-42,1)
(-42,5)
(-36,5)
(-35,1)
(-35,2)
(-35,3)
(-35,4)
(-32,1)
(-28,1)
(-28,3)
(-27,1)
(-25,1)
(-25,3)
(-21,1)
(-21,2)
(-16,1)
(-15,1)
(-15,2)
(-14,1)
(-12,1)
(-10,1)
(-9,1)
(-8,1)
(1,-625)
(1,-343)
(1,-18)
(1,-7)
(1,-4)
(1,-3)
(1,-1)
(1,1)
(1,2)
(1,5)
(1,7)
(1,9)
(1,32)
(2,-35)
(2,-1)
(2,1)
(3,-5)
(3,-4)
(3,-1)
(3,1)
(4,-7)
(4,-1)
(4,3)
(5,-147)
(5,-3)
(5,-2)
(5,-1)
(5,1)
(5,7)
(6,-1)
(7,-225)
(7,-81)
(7,-64)
(7,-50)
(7,-36)
(7,-25)
(7,-16)
(7,-15)
(7,-10)
(7,-9)
(7,-8)
(7,-6)
(7,-5)
(7,-4)
(7,-3)
(7,-2)
(7,1)
(7,2)
(7,3)
(7,4)
(7,5)
(7,6)
(7,8)
(7,9)
(7,15)
(7,20)
(7,24)
(7,27)
(7,48)
(7,80)
(7,125)
(7,2400)
(7,4374)
(8,-5)
(8,1)
(9,-7)
(9,-2)
(9,1)
(14,-27)
(14,-9)
(14,-5)
(14,-3)
(14,1)
(14,3)
(14,5)
(14,25)
(14,243)
(15,7)
(16,-3)
(18,1)
(20,-3)
(20,1)
(21,-128)
(21,-10)
(21,-8)
(21,-5)
(21,-4)
(21,1)
(21,2)
(21,4)
(21,5)
(21,25)
(21,32)
(21,125)
(24,-7)
(25,-7)
(25,-4)
(25,1)
(25,8)
(27,-5)
(27,-4)
(27,14)
(28,-25)
(28,-9)
(28,-5)
(28,1)
(28,3)
(28,5)
(28,45)
(32,-5)
(32,7)
(32,49)
(35,-54)
(35,-32)
(35,-12)
(35,-9)
(35,-8)
(35,-6)
(35,1)
(35,2)
(35,3)
(35,4)
(35,9)
(35,16)
(35,27)
(35,1024)
(40,-7)
(42,1)
(45,-7)
(48,-7)
(49,-250)
(49,-135)
(49,-32)
(49,-27)
(49,-25)
(49,-16)
(49,-15)
(49,-12)
(49,-10)
(49,-9)
(49,-8)
(49,1)
(49,2)
(49,3)
(49,5)
(49,8)
(49,9)
(49,18)
(49,20)
(49,25)
(49,128)
(49,243)
(56,-15)
(56,-9)
(56,1)
(56,27)
(63,-25)
(63,-16)
(63,-10)
(63,1)
(63,5)
(63,16)
(63,40)
(64,-27)
(81,25)
(98,-15)
(98,1)
(100,-49)
(105,-64)
(105,-16)
(105,1)
(112,-25)
(112,5)
(112,9)
(125,-27)
(125,-18)
(126,-25)
(128,1)
(140,-27)
(140,1)
(147,-25)
(147,4)
(168,-25)
(168,1)
(168,25)
(175,-81)
(175,-32)
(175,-27)
(175,2)
(175,3)
(175,24)
(189,-125)
(189,-32)
(189,1)
(189,5)
(189,8)
(224,-375)
(224,-81)
(224,3)
(243,-49)
(243,-35)
(243,1)
(245,-36)
(245,1)
(280,9)
(315,4)
(336,1)
(343,-625)
(343,-81)
(343,-64)
(343,-54)
(343,-50)
(343,1)
(343,5)
(343,15)
(343,32)
(343,576)
(392,-81)
(392,25)
(441,-64)
(441,1)
(448,125)
(560,-81)
(560,1)
(567,-256)
(576,7)
(686,-125)
(686,27)
(700,243)
(875,-128)
(875,1)
(875,3)
(875,64)
(896,-135)
(1024,-147)
(1225,-256)
(1225,81)
(1568,-225)
(1568,1)
(1701,-250)
(1701,2)
(1701,100)
(2400,-343)
(2401,-375)
(2401,32)
(4032,-625)
(4374,-625)
(7168,5)
(16800,1)
(30618,1)
#
# (a,b,c,d) = (-1,2,2,0) and D = -48:
#
(-14,-5)
(-14,19)
(-4,-1)
(-4,5)
(-3,-1)
(-3,4)
(-2,1)
(-1,0)
(-1,1)
(1,-2)
(1,1)
(2,-3)
(2,1)
(5,-7)
(5,2)
(8,-11)
(8,3)
(30,-41)
(30,11)
(112,-153)
(112,41)
#
# (a,b,c,d) = (-12,0,1,0) and D = -48:
#
(-7,-24)
(-7,24)
(-3,-10)
(-3,10)
(-1,-3)
(-1,-2)
(-1,0)
(-1,2)
(-1,3)
(1,-6)
(1,-4)
(1,4)
(1,6)
(2,-7)
(2,7)
(5,-18)
(5,18)
(15,-52)
(15,52)
(28,-97)
(28,97)
#
# (a,b,c,d) = (-11,1,1,0) and D = -45:
#
(-7,-19)
(-7,26)
(-6,-17)
(-6,23)
(-5,-14)
(-5,19)
(-2,-5)
(-2,1)
(-2,7)
(-1,-2)
(-1,-1)
(-1,2)
(-1,3)
(1,-8)
(1,-5)
(1,-4)
(1,3)
(1,4)
(1,7)
(4,-17)
(4,13)
(7,-27)
(7,20)
(8,-31)
(8,23)
(48,-185)
(48,137)
#
# (a,b,c,d) = (-11,0,1,0) and D = -44:
#
(-243,-767)
(-243,-752)
(-243,752)
(-243,767)
(-64,-191)
(-64,191)
(-54,-179)
(-54,-101)
(-54,101)
(-54,179)
(-32,-83)
(-32,83)
(-27,-89)
(-27,89)
(-18,-43)
(-18,43)
(-16,-53)
(-16,53)
(-9,-29)
(-9,-4)
(-9,4)
(-9,29)
(-8,-23)
(-8,-19)
(-8,19)
(-8,23)
(-7,-23)
(-7,-17)
(-7,17)
(-7,23)
(-6,-19)
(-6,19)
(-4,-13)
(-4,-1)
(-4,1)
(-4,13)
(-3,-8)
(-3,-7)
(-3,-1)
(-3,1)
(-3,7)
(-3,8)
(-2,-3)
(-2,3)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,1)
(-1,2)
(-1,3)
(1,-131)
(1,-56)
(1,-19)
(1,-16)
(1,-9)
(1,-6)
(1,-5)
(1,-4)
(1,4)
(1,5)
(1,6)
(1,9)
(1,16)
(1,19)
(1,56)
(1,131)
(2,-767)
(2,-17)
(2,-13)
(2,-7)
(2,7)
(2,13)
(2,17)
(2,767)
(3,-293)
(3,-50)
(3,-43)
(3,-13)
(3,-10)
(3,10)
(3,13)
(3,43)
(3,50)
(3,293)
(4,-15)
(4,15)
(5,-31)
(5,-18)
(5,-17)
(5,17)
(5,18)
(5,31)
(8,-177)
(8,-27)
(8,27)
(8,177)
(9,-46)
(9,-31)
(9,31)
(9,46)
(12,-53)
(12,-47)
(12,47)
(12,53)
(21,-74)
(21,74)
(25,-83)
(25,83)
(27,-107)
(27,107)
(28,-93)
(28,93)
(32,-267)
(32,267)
(48,-163)
(48,163)
(60,-199)
(60,199)
(72,-907)
(72,907)
(112,-3147)
(112,3147)
(120,-401)
(120,401)
(180,-599)
(180,599)
(300,-2599)
(300,2599)
(432,-1433)
(432,1433)
(729,-14551)
(729,14551)
#
# (a,b,c,d) = (-10,1,1,0) and D = -41:
#
(-7938,-21445)
(-7938,29383)
(-7203,-19442)
(-7203,26645)
(-729,-1969)
(-729,2698)
(-343,-255)
(-343,598)
(-147,-395)
(-147,542)
(-81,-209)
(-81,290)
(-63,-170)
(-63,-167)
(-63,230)
(-63,233)
(-49,-111)
(-49,160)
(-42,-113)
(-42,155)
(-27,-70)
(-27,-35)
(-27,62)
(-27,97)
(-18,-5)
(-18,23)
(-10,-27)
(-10,37)
(-9,-22)
(-9,-1)
(-9,10)
(-9,31)
(-7,-18)
(-7,-15)
(-7,-10)
(-7,2)
(-7,5)
(-7,17)
(-7,22)
(-7,25)
(-5,-13)
(-5,2)
(-5,3)
(-5,18)
(-3,-8)
(-3,-7)
(-3,-5)
(-3,-2)
(-3,5)
(-3,8)
(-3,10)
(-3,11)
(-2,-5)
(-2,-3)
(-2,5)
(-2,7)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(1,-90)
(1,-36)
(1,-26)
(1,-15)
(1,-11)
(1,-10)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,3)
(1,4)
(1,5)
(1,6)
(1,9)
(1,10)
(1,14)
(1,25)
(1,35)
(1,89)
(3,-53)
(3,-20)
(3,-14)
(3,-13)
(3,10)
(3,11)
(3,17)
(3,50)
(4,-19)
(4,-15)
(4,11)
(4,15)
(5,-259)
(5,-19)
(5,14)
(5,254)
(7,-54)
(7,-30)
(7,-27)
(7,-26)
(7,19)
(7,20)
(7,23)
(7,47)
(9,-74)
(9,-35)
(9,-34)
(9,25)
(9,26)
(9,65)
(16,-65)
(16,49)
(21,-515)
(21,-131)
(21,-115)
(21,94)
(21,110)
(21,494)
(24,-89)
(24,65)
(27,-1597)
(27,-100)
(27,73)
(27,1570)
(49,-183)
(49,134)
(75,-286)
(75,211)
(189,-779)
(189,590)
(315,-1166)
(315,851)
(343,-1270)
(343,927)
(504,-3769)
(504,3265)
(640,-2369)
(640,1729)
#
# (a,b,c,d) = (-10,0,1,0) and D = -40:
#
(-32,-95)
(-32,95)
(-25,-79)
(-25,79)
(-8,-25)
(-8,25)
(-7,-22)
(-7,-20)
(-7,-2)
(-7,2)
(-7,20)
(-7,22)
(-5,-14)
(-5,-13)
(-5,13)
(-5,14)
(-4,-5)
(-4,5)
(-2,-5)
(-2,5)
(-1,-3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(1,-35)
(1,-10)
(1,-8)
(1,-5)
(1,-4)
(1,4)
(1,5)
(1,8)
(1,10)
(1,35)
(2,-11)
(2,-7)
(2,7)
(2,11)
(3,-10)
(3,10)
(4,-13)
(4,13)
(5,-68)
(5,-16)
(5,16)
(5,68)
(6,-19)
(6,19)
(7,-25)
(7,25)
(8,-37)
(8,37)
(14,-247)
(14,247)
(28,-89)
(28,89)
(49,-155)
(49,155)
(70,-223)
(70,223)
(80,-253)
(80,253)
#
# (a,b,c,d) = (-9,1,1,0) and D = -37:
#
(-250,-621)
(-250,871)
(-128,-261)
(-128,47)
(-128,81)
(-128,389)
(-50,-127)
(-50,177)
(-49,-117)
(-49,166)
(-32,-81)
(-32,113)
(-28,-71)
(-28,99)
(-25,-63)
(-25,88)
(-16,-37)
(-16,53)
(-10,-17)
(-10,-9)
(-10,19)
(-10,27)
(-8,-19)
(-8,-1)
(-8,9)
(-8,27)
(-7,-11)
(-7,18)
(-5,-12)
(-5,-11)
(-5,-4)
(-5,9)
(-5,16)
(-5,17)
(-4,-9)
(-4,1)
(-4,3)
(-4,13)
(-2,-5)
(-2,-3)
(-2,5)
(-2,7)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(1,-72)
(1,-37)
(1,-13)
(1,-10)
(1,-9)
(1,-6)
(1,-4)
(1,3)
(1,5)
(1,8)
(1,9)
(1,12)
(1,36)
(1,71)
(2,-3789)
(2,-11)
(2,-9)
(2,7)
(2,9)
(2,3787)
(3,-13)
(3,-11)
(3,8)
(3,10)
(4,-99)
(4,-45)
(4,-15)
(4,11)
(4,41)
(4,95)
(5,-374)
(5,-38)
(5,-23)
(5,-18)
(5,13)
(5,18)
(5,33)
(5,369)
(6,-29)
(6,23)
(7,-25)
(7,18)
(8,-153)
(8,145)
(9,-137)
(9,-32)
(9,23)
(9,128)
(16,-61)
(16,45)
(20,-1583)
(20,-71)
(20,51)
(20,1563)
(24,-85)
(24,61)
(25,-178)
(25,-99)
(25,74)
(25,153)
(32,-117)
(32,85)
(40,-157)
(40,117)
(80,-657)
(80,577)
(100,-369)
(100,269)
(135,-481)
(135,346)
(280,-1261)
(280,981)
(1440,-5113)
(1440,3673)
#
# (a,b,c,d) = (-9,0,1,0) and D = -36:
#
(-4375,-13119)
(-4375,13119)
(-2401,-7197)
(-2401,7197)
(-625,-1581)
(-625,1581)
(-343,-1019)
(-343,-429)
(-343,429)
(-343,1019)
(-245,-723)
(-245,723)
(-128,-141)
(-128,141)
(-125,-354)
(-125,-311)
(-125,-213)
(-125,213)
(-125,311)
(-125,354)
(-75,-223)
(-75,223)
(-64,-183)
(-64,183)
(-63,-61)
(-63,61)
(-49,-141)
(-49,-123)
(-49,-93)
(-49,-3)
(-49,3)
(-49,93)
(-49,123)
(-49,141)
(-45,-121)
(-45,121)
(-35,-87)
(-35,-57)
(-35,57)
(-35,87)
(-32,-93)
(-32,-51)
(-32,51)
(-32,93)
(-27,-79)
(-27,-31)
(-27,-17)
(-27,17)
(-27,31)
(-27,79)
(-25,-72)
(-25,-69)
(-25,-51)
(-25,-33)
(-25,-21)
(-25,21)
(-25,33)
(-25,51)
(-25,69)
(-25,72)
(-21,-62)
(-21,62)
(-16,-33)
(-16,-27)
(-16,27)
(-16,33)
(-14,-39)
(-14,-33)
(-14,33)
(-14,39)
(-9,-23)
(-9,-22)
(-9,-13)
(-9,13)
(-9,22)
(-9,23)
(-8,-21)
(-8,-3)
(-8,3)
(-8,21)
(-7,-19)
(-7,-15)
(-7,-11)
(-7,-9)
(-7,-6)
(-7,-3)
(-7,3)
(-7,6)
(-7,9)
(-7,11)
(-7,15)
(-7,19)
(-6,-17)
(-6,17)
(-5,-13)
(-5,-12)
(-5,-9)
(-5,-6)
(-5,-3)
(-5,-1)
(-5,1)
(-5,3)
(-5,6)
(-5,9)
(-5,12)
(-5,13)
(-4,-9)
(-4,-3)
(-4,3)
(-4,9)
(-3,-7)
(-3,-5)
(-3,-1)
(-3,1)
(-3,5)
(-3,7)
(-2,-3)
(-2,-1)
(-2,1)
(-2,3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(1,-26247)
(1,-14403)
(1,-1347)
(1,-753)
(1,-732)
(1,-483)
(1,-381)
(1,-297)
(1,-291)
(1,-253)
(1,-213)
(1,-165)
(1,-147)
(1,-123)
(1,-93)
(1,-87)
(1,-78)
(1,-67)
(1,-57)
(1,-53)
(1,-51)
(1,-45)
(1,-39)
(1,-33)
(1,-27)
(1,-24)
(1,-21)
(1,-18)
(1,-17)
(1,-15)
(1,-13)
(1,-12)
(1,-11)
(1,-9)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,4)
(1,5)
(1,6)
(1,7)
(1,9)
(1,11)
(1,12)
(1,13)
(1,15)
(1,17)
(1,18)
(1,21)
(1,24)
(1,27)
(1,33)
(1,39)
(1,45)
(1,51)
(1,53)
(1,57)
(1,67)
(1,78)
(1,87)
(1,93)
(1,123)
(1,147)
(1,165)
(1,213)
(1,253)
(1,291)
(1,297)
(1,381)
(1,483)
(1,732)
(1,753)
(1,1347)
(1,14403)
(1,26247)
(2,-141)
(2,-69)
(2,-21)
(2,-15)
(2,-9)
(2,9)
(2,15)
(2,21)
(2,69)
(2,141)
(3,-89)
(3,-41)
(3,-23)
(3,-19)
(3,-16)
(3,-11)
(3,11)
(3,16)
(3,19)
(3,23)
(3,41)
(3,89)
(4,-93)
(4,-37)
(4,-33)
(4,-15)
(4,-13)
(4,13)
(4,15)
(4,33)
(4,37)
(4,93)
(5,-6159)
(5,-309)
(5,-177)
(5,-113)
(5,-111)
(5,-69)
(5,-57)
(5,-39)
(5,-33)
(5,-27)
(5,-21)
(5,-17)
(5,17)
(5,21)
(5,27)
(5,33)
(5,39)
(5,57)
(5,69)
(5,111)
(5,113)
(5,177)
(5,309)
(5,6159)
(7,-1479)
(7,-789)
(7,-171)
(7,-141)
(7,-129)
(7,-75)
(7,-69)
(7,-51)
(7,-39)
(7,-33)
(7,-29)
(7,-27)
(7,-24)
(7,24)
(7,27)
(7,29)
(7,33)
(7,39)
(7,51)
(7,69)
(7,75)
(7,129)
(7,141)
(7,171)
(7,789)
(7,1479)
(8,-51)
(8,-39)
(8,-25)
(8,25)
(8,39)
(8,51)
(9,-223)
(9,-43)
(9,-37)
(9,-29)
(9,29)
(9,37)
(9,43)
(9,223)
(10,-51)
(10,-33)
(10,33)
(10,51)
(15,-53)
(15,53)
(16,-1077)
(16,-195)
(16,-57)
(16,57)
(16,195)
(16,1077)
(20,-87)
(20,87)
(21,-65)
(21,65)
(25,-411)
(25,-219)
(25,-117)
(25,-93)
(25,-87)
(25,87)
(25,93)
(25,117)
(25,219)
(25,411)
(27,-431)
(27,431)
(28,-159)
(28,159)
(32,-471)
(32,471)
(35,-111)
(35,111)
(40,-123)
(40,123)
(49,-3603)
(49,-339)
(49,-237)
(49,-228)
(49,-177)
(49,-153)
(49,153)
(49,177)
(49,228)
(49,237)
(49,339)
(49,3603)
(50,-879)
(50,879)
(64,-213)
(64,213)
(81,-443)
(81,-257)
(81,-247)
(81,247)
(81,257)
(81,443)
(96,-337)
(96,337)
(112,-339)
(112,339)
(125,-759)
(125,-393)
(125,-381)
(125,381)
(125,393)
(125,759)
(175,-1011)
(175,1011)
(343,-1221)
(343,1221)
(400,-1201)
(400,1201)
(512,-1551)
(512,1551)
(729,-2188)
(729,2188)
#
# (a,b,c,d) = (0,1,6,0) and D = -36:
#
(-26250,1)
(-14406,1)
(-6174,5)
(-4375,729)
(-3750,49)
(-3087,512)
(-2401,400)
(-2250,343)
(-1536,175)
(-1500,7)
(-1350,1)
(-1134,125)
(-1125,16)
(-1029,50)
(-810,7)
(-768,125)
(-756,1)
(-756,125)
(-735,1)
(-686,81)
(-675,112)
(-625,96)
(-567,32)
(-512,27)
(-500,81)
(-490,81)
(-486,1)
(-486,25)
(-486,49)
(-405,64)
(-384,1)
(-384,49)
(-375,49)
(-324,5)
(-324,49)
(-300,1)
(-300,49)
(-294,1)
(-294,25)
(-256,1)
(-250,9)
(-243,16)
(-243,28)
(-243,40)
(-216,1)
(-216,35)
(-192,5)
(-192,7)
(-192,25)
(-168,1)
(-168,25)
(-162,7)
(-162,25)
(-150,1)
(-150,7)
(-147,2)
(-147,20)
(-128,5)
(-128,21)
(-126,1)
(-126,5)
(-105,4)
(-105,16)
(-98,3)
(-98,15)
(-96,1)
(-96,7)
(-90,1)
(-90,7)
(-84,5)
(-81,1)
(-81,10)
(-75,2)
(-75,8)
(-72,5)
(-72,7)
(-70,1)
(-70,9)
(-64,9)
(-63,8)
(-63,10)
(-60,1)
(-60,7)
(-56,1)
(-56,9)
(-54,1)
(-54,5)
(-54,7)
(-50,3)
(-50,7)
(-49,4)
(-49,8)
(-48,1)
(-48,5)
(-48,7)
(-45,4)
(-45,7)
(-42,1)
(-42,5)
(-36,1)
(-36,5)
(-32,3)
(-32,5)
(-30,1)
(-28,3)
(-27,1)
(-27,2)
(-27,4)
(-25,3)
(-25,4)
(-24,1)
(-21,1)
(-21,2)
(-20,1)
(-20,3)
(-18,1)
(-16,1)
(-15,1)
(-15,2)
(-14,1)
(-12,1)
(-10,1)
(-9,1)
(-8,1)
(-7,1)
(1,-21)
(1,-6)
(1,-1)
(1,1)
(1,4)
(1,8)
(1,400)
(1,729)
(2,-75)
(2,-27)
(2,-7)
(2,-5)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,5)
(2,9)
(2,21)
(3,-32)
(3,-25)
(3,-14)
(3,-8)
(3,-5)
(3,-4)
(3,-2)
(3,-1)
(3,1)
(3,2)
(3,4)
(3,7)
(3,10)
(3,40)
(3,112)
(4,-9)
(4,-3)
(4,-1)
(4,1)
(4,81)
(5,-9)
(5,-2)
(5,-1)
(6,-4375)
(6,-2401)
(6,-49)
(6,-25)
(6,-7)
(6,-5)
(6,1)
(6,5)
(6,7)
(6,35)
(6,49)
(6,125)
(7,-2)
(7,3)
(8,-3)
(8,1)
(8,7)
(8,15)
(9,-64)
(9,-14)
(9,-5)
(9,-4)
(9,-2)
(9,1)
(9,2)
(9,16)
(10,-343)
(10,-7)
(10,-3)
(10,1)
(10,3)
(10,9)
(12,-245)
(12,-7)
(12,-5)
(12,1)
(12,5)
(12,7)
(12,25)
(14,-45)
(14,-9)
(14,-5)
(14,-3)
(14,1)
(14,3)
(14,81)
(15,-16)
(15,-7)
(15,-4)
(15,1)
(15,2)
(15,8)
(15,512)
(16,-5)
(16,-3)
(16,9)
(18,-35)
(18,-7)
(18,-5)
(18,1)
(18,5)
(18,7)
(18,25)
(18,125)
(21,-125)
(21,-16)
(21,-8)
(21,-5)
(21,-4)
(21,1)
(21,4)
(21,10)
(21,64)
(24,-49)
(24,-25)
(24,-7)
(24,-5)
(24,1)
(24,5)
(25,4)
(27,-8)
(27,-7)
(27,-5)
(27,8)
(27,20)
(28,-5)
(30,-7)
(30,1)
(30,7)
(30,49)
(32,-7)
(32,3)
(35,-6)
(36,-7)
(36,1)
(40,-9)
(40,-7)
(42,-25)
(42,1)
(42,5)
(42,25)
(45,-32)
(45,-8)
(48,-35)
(48,1)
(48,7)
(49,-9)
(49,96)
(50,-27)
(50,-9)
(50,1)
(54,-49)
(54,-25)
(54,1)
(54,5)
(54,7)
(63,2)
(64,-125)
(64,-27)
(64,1)
(75,-16)
(75,-14)
(75,1)
(75,28)
(80,3)
(81,-16)
(81,-14)
(81,4)
(81,49)
(84,1)
(90,1)
(90,49)
(96,-25)
(96,5)
(98,-27)
(98,5)
(108,-25)
(108,7)
(112,-27)
(120,1)
(120,7)
(125,-21)
(126,-25)
(128,-63)
(135,2)
(144,-49)
(144,-25)
(144,1)
(144,25)
(147,-32)
(147,-25)
(147,16)
(150,-49)
(150,7)
(160,-27)
(162,-125)
(162,-35)
(162,1)
(162,5)
(189,-32)
(192,-35)
(192,49)
(192,343)
(196,9)
(200,81)
(210,1)
(240,-49)
(243,-128)
(250,-63)
(250,1)
(256,-45)
(270,-49)
(288,-49)
(288,1)
(294,-625)
(294,1)
(294,5)
(336,25)
(350,27)
(375,-64)
(375,32)
(378,1)
(384,125)
(448,-75)
(480,1)
(486,175)
(525,-128)
(588,-125)
(600,-343)
(686,-125)
(729,-125)
(729,1)
(729,50)
(750,1)
(768,7)
(1029,16)
(1344,1)
(1458,-343)
(1458,-245)
(1458,7)
(2048,-343)
(3456,-625)
(3456,49)
(6144,5)
(14400,-2401)
(14400,1)
(26244,-4375)
(26244,1)
#
# (a,b,c,d) = (1,5,6,0) and D = -36:
#
(-13125,6562)
(-8750,2917)
(-7203,3601)
(-6174,2063)
(-4802,1601)
(-3087,1541)
(-2250,1093)
(-2058,929)
(-1875,913)
(-1536,593)
(-1500,743)
(-1470,733)
(-1350,451)
(-1250,433)
(-1134,503)
(-1125,391)
(-810,277)
(-768,259)
(-756,253)
(-756,377)
(-750,277)
(-675,337)
(-567,221)
(-512,229)
(-500,169)
(-486,163)
(-486,187)
(-486,211)
(-405,199)
(-384,143)
(-384,191)
(-343,131)
(-324,113)
(-324,157)
(-300,101)
(-300,149)
(-294,107)
(-294,143)
(-256,127)
(-245,82)
(-243,97)
(-243,109)
(-243,121)
(-216,73)
(-216,107)
(-210,73)
(-210,97)
(-192,71)
(-192,89)
(-192,91)
(-168,59)
(-168,83)
(-162,61)
(-162,79)
(-150,59)
(-150,71)
(-147,61)
(-147,73)
(-128,43)
(-128,59)
(-126,43)
(-126,47)
(-125,58)
(-98,33)
(-98,41)
(-96,41)
(-96,47)
(-90,31)
(-90,37)
(-84,37)
(-81,28)
(-81,37)
(-75,34)
(-75,37)
(-72,29)
(-72,31)
(-64,23)
(-63,29)
(-63,31)
(-60,23)
(-60,29)
(-56,19)
(-56,27)
(-54,19)
(-54,23)
(-54,25)
(-50,17)
(-50,19)
(-49,17)
(-49,23)
(-48,17)
(-48,19)
(-48,23)
(-45,19)
(-45,22)
(-42,17)
(-42,19)
(-36,13)
(-36,17)
(-35,13)
(-35,17)
(-32,11)
(-32,13)
(-30,11)
(-30,13)
(-28,11)
(-27,10)
(-27,11)
(-27,13)
(-25,9)
(-25,11)
(-24,11)
(-21,8)
(-21,10)
(-20,7)
(-20,9)
(-18,7)
(-16,7)
(-15,7)
(-14,5)
(-12,5)
(-9,4)
(-8,3)
(-7,3)
(-5,2)
(1,-11)
(1,-5)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,13)
(1,37)
(2,-1459)
(2,-801)
(2,-17)
(2,-9)
(2,-3)
(2,1)
(2,11)
(2,41)
(3,-64)
(3,-26)
(3,-19)
(3,-5)
(3,-4)
(3,-2)
(3,1)
(3,2)
(3,11)
(3,23)
(3,1199)
(3,2186)
(4,-83)
(4,-3)
(4,-1)
(4,1)
(4,7)
(5,-7)
(5,-4)
(5,-3)
(5,-1)
(5,1)
(5,169)
(6,-227)
(6,-83)
(6,-23)
(6,-17)
(6,-11)
(6,-7)
(6,-5)
(6,-1)
(6,1)
(6,5)
(6,7)
(6,13)
(6,25)
(6,47)
(6,61)
(7,-44)
(7,-5)
(7,-4)
(7,-2)
(7,-1)
(7,1)
(7,19)
(8,-19)
(8,-11)
(8,-5)
(8,-1)
(9,-67)
(9,-17)
(9,-8)
(9,-7)
(9,-5)
(9,-2)
(9,-1)
(9,13)
(10,-3)
(10,-1)
(10,13)
(12,-31)
(12,-13)
(12,-11)
(12,-7)
(12,-1)
(12,1)
(12,239)
(14,-13)
(14,-3)
(15,-32)
(15,-11)
(15,-8)
(15,-4)
(16,-17)
(16,-5)
(16,-3)
(18,-41)
(18,-13)
(18,-11)
(18,-5)
(18,-1)
(18,1)
(18,19)
(18,119)
(21,-23)
(21,-13)
(21,-11)
(21,2)
(24,-17)
(24,-13)
(24,-7)
(24,-5)
(24,13)
(24,37)
(25,-13)
(25,-8)
(25,1)
(27,-17)
(27,-16)
(27,-14)
(27,-1)
(27,11)
(28,-9)
(30,-1039)
(30,-31)
(30,-19)
(30,-17)
(30,-7)
(30,-1)
(30,17)
(32,-19)
(32,-9)
(36,-19)
(36,-11)
(40,-13)
(40,-11)
(42,-149)
(42,-41)
(42,-29)
(42,-23)
(42,-13)
(42,-11)
(42,-5)
(42,11)
(42,229)
(45,-47)
(45,-23)
(48,-31)
(48,-25)
(48,11)
(49,-27)
(49,-11)
(50,-33)
(54,-67)
(54,-43)
(54,-17)
(54,-13)
(54,-11)
(63,-19)
(64,-33)
(64,-5)
(64,93)
(70,-23)
(75,-41)
(75,-13)
(80,-43)
(81,-43)
(81,-41)
(81,-23)
(81,22)
(84,-43)
(90,-29)
(90,19)
(96,-53)
(96,-23)
(98,-241)
(98,-31)
(105,-53)
(108,-61)
(108,-29)
(112,-29)
(120,-67)
(120,-61)
(125,-63)
(125,-31)
(126,-67)
(128,-1)
(135,-43)
(144,-97)
(144,-73)
(144,-47)
(144,-23)
(147,-76)
(147,-74)
(147,239)
(150,-131)
(150,-77)
(150,-47)
(150,-43)
(160,-53)
(162,-179)
(162,-89)
(162,-53)
(162,-49)
(175,-101)
(189,-95)
(192,-439)
(192,-145)
(192,-61)
(196,-107)
(200,-181)
(240,-71)
(243,-209)
(250,-83)
(256,-83)
(270,-139)
(288,-145)
(288,-95)
(294,-179)
(294,-97)
(294,-83)
(336,-193)
(343,-109)
(375,-188)
(378,-125)
(384,-317)
(448,-149)
(480,-241)
(486,13)
(588,-169)
(600,43)
(729,-368)
(729,-242)
(729,-193)
(750,-439)
(750,-247)
(768,-391)
(1050,-269)
(1344,-673)
(1458,-829)
(1458,-731)
(1458,-479)
(2048,-681)
(2058,-1061)
(3456,-1777)
(3456,-1103)
(6144,-3077)
(14400,-7201)
(14400,-4799)
(26244,-13123)
(26244,-8747)
#
# (a,b,c,d) = (-1,1,2,0) and D = -36:
#
(-8750,8747)
(-4802,4799)
(-4375,-2186)
(-2401,-1199)
(-1250,1103)
(-686,-43)
(-686,681)
(-625,-239)
(-512,-13)
(-512,269)
(-500,-229)
(-500,479)
(-490,-239)
(-343,-169)
(-343,193)
(-256,-119)
(-256,247)
(-250,-93)
(-250,169)
(-245,242)
(-150,149)
(-128,-61)
(-128,-19)
(-128,83)
(-128,125)
(-126,1)
(-125,-22)
(-125,109)
(-100,-47)
(-100,97)
(-98,-37)
(-98,23)
(-98,71)
(-98,95)
(-90,83)
(-84,-41)
(-84,83)
(-75,-37)
(-70,-11)
(-70,61)
(-64,-17)
(-64,-11)
(-64,43)
(-64,49)
(-63,31)
(-56,-25)
(-56,-19)
(-56,47)
(-56,53)
(-54,5)
(-54,29)
(-54,53)
(-50,-13)
(-50,23)
(-50,29)
(-50,47)
(-49,-23)
(-49,-11)
(-49,13)
(-49,43)
(-45,-19)
(-36,-13)
(-36,31)
(-35,-13)
(-35,23)
(-32,-13)
(-32,5)
(-32,11)
(-32,29)
(-28,1)
(-28,13)
(-27,-13)
(-27,-1)
(-27,11)
(-25,-11)
(-25,-2)
(-25,1)
(-25,19)
(-24,-11)
(-24,23)
(-20,-7)
(-20,-1)
(-20,11)
(-20,17)
(-18,-7)
(-18,11)
(-16,-5)
(-16,1)
(-16,7)
(-16,13)
(-14,-1)
(-14,5)
(-14,9)
(-14,11)
(-14,13)
(-10,1)
(-10,3)
(-10,7)
(-10,9)
(-9,-1)
(-9,8)
(-8,-1)
(-8,1)
(-8,3)
(-8,5)
(-7,-3)
(-7,-2)
(-7,-1)
(-7,1)
(-7,4)
(-6,-1)
(-6,1)
(-6,5)
(-5,-2)
(-5,-1)
(-5,1)
(-5,2)
(-4,-1)
(-4,1)
(-4,3)
(-3,-1)
(-3,1)
(-3,2)
(-2,1)
(-1,0)
(1,-6562)
(1,-3601)
(1,-337)
(1,-121)
(1,-73)
(1,-37)
(1,-31)
(1,-22)
(1,-17)
(1,-13)
(1,-10)
(1,-7)
(1,-4)
(1,-3)
(1,-2)
(1,1)
(1,2)
(1,3)
(1,4)
(1,5)
(1,8)
(1,11)
(1,13)
(1,14)
(1,23)
(1,41)
(1,53)
(1,63)
(1,74)
(1,95)
(1,188)
(2,-377)
(2,-191)
(2,-149)
(2,-127)
(2,-107)
(2,-83)
(2,-47)
(2,-29)
(2,-27)
(2,-23)
(2,-17)
(2,-11)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,3)
(2,5)
(2,7)
(2,13)
(2,19)
(2,25)
(2,33)
(2,43)
(2,61)
(2,73)
(2,145)
(2,241)
(2,673)
(2,7201)
(2,13123)
(3,-23)
(3,-11)
(3,2)
(3,4)
(3,5)
(4,-733)
(4,-79)
(4,-25)
(4,-19)
(4,-13)
(4,-7)
(4,-5)
(4,3)
(4,5)
(4,11)
(4,17)
(4,23)
(4,77)
(4,731)
(5,-1541)
(5,-29)
(5,-11)
(5,-8)
(5,3)
(5,4)
(5,7)
(5,13)
(5,16)
(5,27)
(5,43)
(5,76)
(6,-13)
(6,-11)
(6,-7)
(6,19)
(6,43)
(7,-199)
(7,-37)
(7,-34)
(7,-19)
(7,-10)
(7,-9)
(7,5)
(7,8)
(7,11)
(7,17)
(7,41)
(7,368)
(8,-143)
(8,-71)
(8,-23)
(8,-17)
(8,-11)
(8,7)
(8,13)
(8,19)
(8,67)
(8,139)
(9,-58)
(9,-13)
(9,5)
(9,7)
(10,-157)
(10,-91)
(10,-59)
(10,-37)
(10,-31)
(10,-19)
(10,-13)
(10,-11)
(10,11)
(10,17)
(10,53)
(10,3077)
(12,-19)
(12,13)
(14,-743)
(14,-89)
(14,-41)
(14,-29)
(14,-23)
(14,-17)
(14,11)
(14,13)
(14,31)
(14,61)
(14,67)
(14,391)
(15,-17)
(16,-97)
(16,-41)
(16,-37)
(16,-19)
(16,-17)
(16,9)
(16,11)
(16,29)
(16,33)
(16,89)
(18,-23)
(18,-19)
(18,17)
(18,107)
(21,11)
(25,-109)
(25,-61)
(25,-28)
(25,17)
(25,23)
(27,101)
(28,-31)
(28,17)
(30,19)
(32,-59)
(32,-47)
(32,-33)
(32,17)
(32,31)
(32,43)
(35,19)
(40,-61)
(40,-43)
(40,23)
(40,41)
(42,-43)
(49,-913)
(49,-97)
(49,26)
(49,32)
(49,47)
(50,-71)
(50,-59)
(50,31)
(50,97)
(50,193)
(54,-229)
(64,-1093)
(64,-211)
(64,-73)
(64,41)
(64,179)
(64,1061)
(70,-73)
(80,-107)
(80,67)
(81,-131)
(81,-82)
(81,44)
(98,-143)
(98,-113)
(98,-101)
(98,145)
(98,1777)
(112,-187)
(112,131)
(125,-221)
(125,64)
(125,67)
(128,-503)
(128,439)
(160,-163)
(160,83)
(162,-169)
(162,83)
(162,181)
(175,209)
(196,-277)
(196,179)
(200,-929)
(200,829)
(250,-259)
(250,-253)
(250,317)
(256,-277)
(256,149)
(343,-391)
(350,-593)
(384,-433)
(384,241)
(448,-451)
(448,227)
(686,439)
(1600,-1601)
(1600,801)
(2048,-2063)
(2048,1039)
(2916,-2917)
(2916,1459)
#
# (a,b,c,d) = (0,2,3,0) and D = -36:
#
(-13125,2)
(-7203,2)
(-4375,2916)
(-3087,10)
(-3087,2048)
(-2401,1600)
(-1875,98)
(-1125,64)
(-1125,686)
(-1029,200)
(-735,4)
(-675,2)
(-675,448)
(-625,384)
(-567,128)
(-567,250)
(-405,14)
(-405,256)
(-384,175)
(-375,7)
(-375,196)
(-343,162)
(-245,162)
(-243,2)
(-243,50)
(-243,64)
(-243,98)
(-243,112)
(-243,160)
(-192,125)
(-189,1)
(-189,125)
(-147,2)
(-147,8)
(-147,50)
(-147,80)
(-128,27)
(-125,18)
(-125,81)
(-105,16)
(-105,64)
(-96,1)
(-96,49)
(-81,4)
(-81,5)
(-81,14)
(-81,40)
(-81,49)
(-81,50)
(-75,1)
(-75,2)
(-75,8)
(-75,14)
(-75,32)
(-75,49)
(-64,1)
(-63,2)
(-63,10)
(-63,32)
(-63,40)
(-54,1)
(-54,35)
(-49,6)
(-49,16)
(-49,30)
(-49,32)
(-48,5)
(-48,7)
(-48,25)
(-45,2)
(-45,14)
(-45,16)
(-45,28)
(-42,1)
(-42,25)
(-35,2)
(-35,18)
(-32,5)
(-32,21)
(-27,2)
(-27,4)
(-27,8)
(-27,10)
(-27,14)
(-27,16)
(-25,6)
(-25,12)
(-25,14)
(-25,16)
(-24,1)
(-24,7)
(-21,2)
(-21,4)
(-21,5)
(-21,8)
(-21,10)
(-18,5)
(-18,7)
(-16,9)
(-15,1)
(-15,2)
(-15,4)
(-15,7)
(-15,8)
(-14,1)
(-14,9)
(-12,1)
(-12,5)
(-12,7)
(-9,1)
(-9,2)
(-9,4)
(-9,5)
(-8,3)
(-8,5)
(-7,2)
(-7,3)
(-7,4)
(-6,1)
(-5,1)
(-5,2)
(-5,3)
(-4,1)
(-3,1)
(-2,1)
(1,-150)
(1,-84)
(1,-54)
(1,-24)
(1,-14)
(1,-10)
(1,-9)
(1,-6)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,4)
(1,6)
(1,10)
(1,16)
(1,18)
(1,32)
(1,42)
(1,81)
(1,1600)
(1,2916)
(2,-3)
(2,1)
(2,7)
(2,15)
(3,-8750)
(3,-4802)
(3,-245)
(3,-128)
(3,-100)
(3,-98)
(3,-56)
(3,-50)
(3,-32)
(3,-20)
(3,-16)
(3,-14)
(3,-10)
(3,-8)
(3,-7)
(3,-5)
(3,-4)
(3,1)
(3,2)
(3,4)
(3,5)
(3,7)
(3,8)
(3,10)
(3,14)
(3,16)
(3,25)
(3,28)
(3,40)
(3,70)
(3,98)
(3,160)
(3,250)
(3,448)
(4,-5)
(4,-3)
(4,9)
(5,-686)
(5,-36)
(5,-14)
(5,-8)
(5,-6)
(5,-4)
(5,2)
(5,6)
(5,18)
(6,-49)
(6,-25)
(6,-7)
(6,-5)
(6,1)
(6,5)
(7,-90)
(7,-18)
(7,-10)
(7,-8)
(7,-6)
(7,-5)
(7,2)
(7,6)
(7,12)
(7,162)
(8,-7)
(8,3)
(9,-256)
(9,-70)
(9,-56)
(9,-20)
(9,-16)
(9,-14)
(9,-10)
(9,-8)
(9,-7)
(9,1)
(9,2)
(9,4)
(9,8)
(9,10)
(9,14)
(9,50)
(9,64)
(9,250)
(10,-9)
(10,-7)
(12,-35)
(12,1)
(12,7)
(15,-64)
(15,-28)
(15,-16)
(15,-14)
(15,2)
(15,4)
(15,8)
(15,14)
(15,32)
(15,98)
(15,2048)
(16,-125)
(16,-27)
(16,1)
(20,3)
(21,-500)
(21,-64)
(21,-50)
(21,-32)
(21,-20)
(21,-16)
(21,1)
(21,2)
(21,4)
(21,10)
(21,16)
(21,40)
(21,50)
(21,256)
(24,-25)
(24,5)
(25,-54)
(25,-18)
(25,2)
(25,16)
(27,-98)
(27,-50)
(27,-32)
(27,-28)
(27,-25)
(27,-20)
(27,2)
(27,7)
(27,10)
(27,14)
(27,32)
(27,80)
(28,-27)
(30,1)
(30,7)
(32,-63)
(35,-24)
(36,-49)
(36,-25)
(36,1)
(36,25)
(40,-27)
(45,-128)
(45,-32)
(45,2)
(45,98)
(48,-35)
(48,49)
(48,343)
(49,-54)
(49,-36)
(49,9)
(49,10)
(49,384)
(50,81)
(60,-49)
(63,-50)
(63,8)
(64,-45)
(72,-49)
(72,1)
(75,-98)
(75,-64)
(75,-56)
(75,4)
(75,14)
(75,112)
(81,-250)
(81,-70)
(81,-64)
(81,-56)
(81,2)
(81,10)
(81,16)
(81,196)
(84,25)
(96,125)
(105,2)
(112,-75)
(120,1)
(125,-126)
(125,-84)
(125,2)
(135,-98)
(135,8)
(147,-1250)
(147,-128)
(147,-125)
(147,-100)
(147,2)
(147,10)
(147,64)
(150,-343)
(175,54)
(189,-128)
(189,2)
(192,7)
(243,-512)
(243,350)
(336,1)
(343,-250)
(375,-256)
(375,2)
(375,128)
(512,-343)
(525,-512)
(729,-686)
(729,-500)
(729,-490)
(729,4)
(729,14)
(729,200)
(864,-625)
(864,49)
(1029,64)
(1536,5)
(3600,-2401)
(3600,1)
(6561,-4375)
(6561,1)
#
# (a,b,c,d) = (-8,1,1,0) and D = -33:
#
(-175,-409)
(-175,584)
(-125,-296)
(-125,421)
(-35,-83)
(-35,118)
(-27,-64)
(-27,91)
(-9,-8)
(-9,17)
(-7,-16)
(-7,-1)
(-7,8)
(-7,23)
(-5,-11)
(-5,-8)
(-5,13)
(-5,16)
(-3,-7)
(-3,-5)
(-3,8)
(-3,10)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(1,-56)
(1,-9)
(1,-8)
(1,-5)
(1,-4)
(1,3)
(1,4)
(1,7)
(1,8)
(1,55)
(2,-7)
(2,5)
(3,-11)
(3,8)
(5,-24)
(5,-17)
(5,12)
(5,19)
(7,-24)
(7,17)
(8,-27)
(8,19)
(21,-152)
(21,131)
(35,-123)
(35,88)
(45,-152)
(45,107)
(225,-937)
(225,712)
#
# (a,b,c,d) = (-1,0,2,0) and D = -32:
#
(-256,-181)
(-256,181)
(-75,-53)
(-75,53)
(-45,-29)
(-45,29)
(-32,-13)
(-32,13)
(-27,-19)
(-27,19)
(-16,-11)
(-16,11)
(-10,-7)
(-10,-1)
(-10,1)
(-10,7)
(-9,-4)
(-9,4)
(-8,-5)
(-8,5)
(-5,-3)
(-5,3)
(-4,-1)
(-4,1)
(-3,-2)
(-3,-1)
(-3,1)
(-3,2)
(-2,-1)
(-2,1)
(-1,0)
(1,-5)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,5)
(2,-3)
(2,3)
(4,-3)
(4,3)
(5,-4)
(5,4)
(6,-19)
(6,-5)
(6,5)
(6,19)
(7,-5)
(7,5)
(8,-9)
(8,9)
(12,-11)
(12,11)
(18,-13)
(18,13)
(20,-51)
(20,51)
(24,-17)
(24,17)
(25,-22)
(25,22)
(60,-43)
(60,43)
(80,-57)
(80,57)
(140,-99)
(140,99)
(144,-113)
(144,113)
(162,-173)
(162,173)
#
# (a,b,c,d) = (-8,0,1,0) and D = -32:
#
(-75,-212)
(-75,212)
(-64,-181)
(-64,181)
(-45,-116)
(-45,116)
(-27,-76)
(-27,76)
(-9,-16)
(-9,16)
(-8,-13)
(-8,13)
(-5,-14)
(-5,-12)
(-5,-2)
(-5,2)
(-5,12)
(-5,14)
(-4,-11)
(-4,11)
(-3,-8)
(-3,-4)
(-3,4)
(-3,8)
(-2,-5)
(-2,5)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(1,-20)
(1,-8)
(1,-6)
(1,-4)
(1,-3)
(1,3)
(1,4)
(1,6)
(1,8)
(1,20)
(2,-9)
(2,9)
(3,-38)
(3,-11)
(3,-10)
(3,10)
(3,11)
(3,38)
(5,-51)
(5,-16)
(5,16)
(5,51)
(6,-17)
(6,17)
(7,-20)
(7,20)
(9,-26)
(9,26)
(15,-43)
(15,43)
(20,-57)
(20,57)
(25,-88)
(25,88)
(35,-99)
(35,99)
(36,-113)
(36,113)
(81,-346)
(81,346)
#
# (a,b,c,d) = (-7,1,1,0) and D = -29:
#
(-6174,-13537)
(-6174,19711)
(-486,-1061)
(-486,1547)
(-256,-549)
(-256,805)
(-128,-33)
(-128,161)
(-125,-274)
(-125,399)
(-108,31)
(-108,77)
(-81,-28)
(-81,109)
(-21,-46)
(-21,2)
(-21,19)
(-21,67)
(-16,-35)
(-16,-33)
(-16,49)
(-16,51)
(-14,-29)
(-14,43)
(-12,-7)
(-12,19)
(-10,-21)
(-10,31)
(-9,-19)
(-9,-17)
(-9,-14)
(-9,23)
(-9,26)
(-9,28)
(-8,-13)
(-8,-7)
(-8,15)
(-8,21)
(-6,-13)
(-6,-1)
(-6,7)
(-6,19)
(-5,-9)
(-5,14)
(-4,-7)
(-4,11)
(-3,-4)
(-3,7)
(-2,-1)
(-2,3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(-1,3)
(1,-42)
(1,-14)
(1,-12)
(1,-8)
(1,-7)
(1,-4)
(1,3)
(1,6)
(1,7)
(1,11)
(1,13)
(1,41)
(2,-149)
(2,-9)
(2,-7)
(2,5)
(2,7)
(2,147)
(3,-17)
(3,-11)
(3,-10)
(3,7)
(3,8)
(3,14)
(4,-81)
(4,-21)
(4,-13)
(4,9)
(4,17)
(4,77)
(5,-16)
(5,11)
(6,-97)
(6,91)
(7,-23)
(7,16)
(8,-37)
(8,29)
(9,-35)
(9,26)
(15,-71)
(15,56)
(18,-91)
(18,73)
(24,-77)
(24,53)
(27,-203)
(27,176)
(32,-109)
(32,77)
(48,-301)
(48,253)
(54,-173)
(54,119)
(72,-233)
(72,161)
(81,-259)
(81,178)
(135,-431)
(135,296)
(192,-613)
(192,421)
(1008,-3221)
(1008,2213)
#
# (a,b,c,d) = (-7,0,1,0) and D = -28:
#
(-175,-463)
(-175,463)
(-125,-329)
(-125,329)
(-45,-119)
(-45,119)
(-25,-1)
(-25,1)
(-16,-35)
(-16,35)
(-14,-37)
(-14,37)
(-8,-21)
(-8,21)
(-7,-17)
(-7,-10)
(-7,10)
(-7,17)
(-5,-13)
(-5,-11)
(-5,-7)
(-5,7)
(-5,11)
(-5,13)
(-4,-7)
(-4,7)
(-3,-7)
(-3,7)
(-2,-5)
(-2,-1)
(-2,1)
(-2,5)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(1,-175)
(1,-14)
(1,-13)
(1,-7)
(1,-5)
(1,-4)
(1,-3)
(1,3)
(1,4)
(1,5)
(1,7)
(1,13)
(1,14)
(1,175)
(2,-7)
(2,7)
(3,-8)
(3,8)
(4,-29)
(4,-11)
(4,11)
(4,29)
(5,-16)
(5,-14)
(5,14)
(5,16)
(7,-19)
(7,19)
(8,-23)
(8,23)
(10,-49)
(10,49)
(20,-53)
(20,53)
(25,-2188)
(25,2188)
(48,-127)
(48,127)
(49,-173)
(49,173)
(50,-133)
(50,133)
(140,-443)
(140,443)
(160,-431)
(160,431)
#
# (a,b,c,d) = (0,1,5,0) and D = -25:
#
(-21875,1)
(-21875,4374)
(-12005,1)
(-5145,1024)
(-3125,49)
(-3125,576)
(-2401,480)
(-1875,32)
(-1875,343)
(-1715,243)
(-1280,81)
(-1250,7)
(-1250,243)
(-1225,2)
(-1225,243)
(-1125,1)
(-1125,224)
(-1029,1)
(-945,64)
(-675,7)
(-675,128)
(-640,3)
(-630,1)
(-625,27)
(-625,98)
(-405,1)
(-405,32)
(-405,49)
(-405,56)
(-343,20)
(-320,1)
(-320,49)
(-320,63)
(-270,49)
(-256,35)
(-250,1)
(-250,49)
(-245,1)
(-245,4)
(-245,9)
(-245,24)
(-245,48)
(-189,25)
(-180,1)
(-175,3)
(-175,8)
(-175,27)
(-175,32)
(-160,7)
(-160,27)
(-140,1)
(-140,3)
(-140,27)
(-135,2)
(-135,7)
(-128,25)
(-126,25)
(-125,1)
(-125,4)
(-125,7)
(-125,9)
(-125,16)
(-125,18)
(-125,21)
(-125,24)
(-105,1)
(-105,16)
(-81,5)
(-81,16)
(-80,1)
(-80,7)
(-80,9)
(-75,1)
(-75,7)
(-75,8)
(-75,14)
(-70,9)
(-64,3)
(-60,7)
(-54,1)
(-50,1)
(-50,3)
(-50,7)
(-50,9)
(-49,5)
(-49,8)
(-49,9)
(-45,1)
(-45,2)
(-45,4)
(-45,7)
(-45,8)
(-40,1)
(-40,3)
(-40,7)
(-36,7)
(-35,1)
(-35,2)
(-35,3)
(-35,4)
(-35,6)
(-32,1)
(-32,5)
(-30,1)
(-28,5)
(-27,4)
(-27,5)
(-25,1)
(-25,2)
(-25,3)
(-25,4)
(-21,1)
(-21,4)
(-20,1)
(-20,3)
(-16,3)
(-15,1)
(-15,2)
(-14,1)
(-12,1)
(-10,1)
(-9,1)
(-8,1)
(-7,1)
(-6,1)
(1,-875)
(1,-45)
(1,-10)
(1,-5)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,3)
(1,4)
(1,7)
(1,16)
(1,25)
(1,480)
(2,-49)
(2,-1)
(2,1)
(2,5)
(3,-7)
(3,-2)
(3,-1)
(3,1)
(3,5)
(3,25)
(4,-5)
(4,-1)
(4,1)
(4,9)
(5,-2401)
(5,-126)
(5,-81)
(5,-64)
(5,-49)
(5,-36)
(5,-28)
(5,-21)
(5,-16)
(5,-9)
(5,-8)
(5,-7)
(5,-6)
(5,-4)
(5,-3)
(5,-2)
(5,1)
(5,2)
(5,3)
(5,4)
(5,6)
(5,7)
(5,8)
(5,9)
(5,14)
(5,24)
(5,27)
(5,48)
(5,49)
(5,63)
(5,224)
(5,4374)
(7,-50)
(7,-27)
(7,-5)
(7,-3)
(7,-2)
(7,1)
(7,4)
(7,5)
(8,-7)
(8,-3)
(9,-5)
(9,-2)
(9,1)
(9,8)
(10,-27)
(10,-9)
(10,-7)
(10,-3)
(10,1)
(10,3)
(10,7)
(10,243)
(14,-3)
(15,-128)
(15,-28)
(15,-8)
(15,-7)
(15,-4)
(15,1)
(15,2)
(15,4)
(15,7)
(15,32)
(16,-5)
(16,1)
(18,-5)
(20,-49)
(20,-9)
(20,-7)
(20,1)
(20,3)
(20,21)
(21,-5)
(24,-5)
(24,5)
(25,-1029)
(25,-54)
(25,-32)
(25,-21)
(25,-14)
(25,-12)
(25,-9)
(25,-8)
(25,-7)
(25,-6)
(25,1)
(25,2)
(25,3)
(25,4)
(25,7)
(25,9)
(25,16)
(25,27)
(25,49)
(25,1024)
(27,-25)
(27,-7)
(27,1)
(30,-7)
(30,1)
(32,-75)
(32,-7)
(35,-32)
(35,-27)
(35,-16)
(35,-12)
(35,-9)
(35,-8)
(35,1)
(35,2)
(35,3)
(35,8)
(35,9)
(35,18)
(35,128)
(35,243)
(40,-9)
(40,1)
(40,7)
(40,27)
(45,-49)
(45,-16)
(45,-14)
(45,1)
(45,7)
(45,16)
(49,-125)
(49,-10)
(49,1)
(49,3)
(56,5)
(64,25)
(70,1)
(75,-64)
(75,-16)
(75,1)
(75,49)
(80,-21)
(80,9)
(81,35)
(90,7)
(98,-25)
(100,-27)
(100,-21)
(100,1)
(100,7)
(105,4)
(120,-49)
(120,1)
(125,-81)
(125,-49)
(125,-32)
(125,-28)
(125,-27)
(125,2)
(125,3)
(125,7)
(125,24)
(125,56)
(128,-27)
(135,-32)
(135,-28)
(135,1)
(135,8)
(135,98)
(160,-81)
(160,3)
(160,49)
(160,343)
(175,-36)
(175,1)
(200,-49)
(200,9)
(224,-45)
(225,-49)
(225,4)
(240,-49)
(240,1)
(243,-50)
(243,-49)
(243,20)
(245,-81)
(245,-64)
(245,-54)
(245,1)
(245,32)
(245,576)
(280,-81)
(315,-64)
(315,1)
(320,-189)
(343,-75)
(400,-81)
(400,1)
(405,-256)
(490,27)
(500,-343)
(500,243)
(576,-125)
(625,-189)
(625,-128)
(625,-126)
(625,1)
(625,3)
(625,64)
(640,7)
(875,-256)
(875,81)
(1024,1)
(1120,1)
(1215,-343)
(1215,2)
(1215,7)
(1715,32)
(2880,49)
(4374,-875)
(5120,-1029)
(12000,-2401)
(12000,1)
(21870,1)
#
# (a,b,c,d) = (-6,1,1,0) and D = -25:
#
(-2401,-4797)
(-2401,7198)
(-1029,-2033)
(-1029,3062)
(-875,-1749)
(-875,2624)
(-343,-186)
(-343,529)
(-256,-107)
(-256,363)
(-189,-58)
(-189,247)
(-128,-241)
(-128,369)
(-126,-247)
(-126,373)
(-125,-201)
(-125,326)
(-81,-157)
(-81,-37)
(-81,-2)
(-81,83)
(-81,118)
(-81,238)
(-75,-118)
(-75,193)
(-64,-123)
(-64,-53)
(-64,117)
(-64,187)
(-54,-83)
(-54,137)
(-50,-93)
(-50,143)
(-49,-96)
(-49,-93)
(-49,-78)
(-49,-53)
(-49,22)
(-49,27)
(-49,102)
(-49,127)
(-49,142)
(-49,145)
(-45,-89)
(-45,134)
(-36,-67)
(-36,103)
(-32,-39)
(-32,-29)
(-32,61)
(-32,71)
(-28,-51)
(-28,-41)
(-28,69)
(-28,79)
(-27,-47)
(-27,-44)
(-27,-19)
(-27,46)
(-27,71)
(-27,74)
(-25,-23)
(-25,48)
(-21,-37)
(-21,-17)
(-21,38)
(-21,58)
(-16,-27)
(-16,3)
(-16,13)
(-16,43)
(-14,-3)
(-14,17)
(-12,1)
(-12,11)
(-10,-19)
(-10,29)
(-9,-13)
(-9,-8)
(-9,2)
(-9,7)
(-9,17)
(-9,22)
(-8,-11)
(-8,-1)
(-8,9)
(-8,19)
(-7,-11)
(-7,-9)
(-7,-6)
(-7,-4)
(-7,1)
(-7,6)
(-7,11)
(-7,13)
(-7,16)
(-7,18)
(-6,-7)
(-6,13)
(-5,-9)
(-5,-6)
(-5,-3)
(-5,-1)
(-5,6)
(-5,8)
(-5,11)
(-5,14)
(-4,-3)
(-4,7)
(-3,-5)
(-3,-1)
(-3,1)
(-3,2)
(-3,4)
(-3,8)
(-2,-3)
(-2,-1)
(-2,1)
(-2,3)
(-2,5)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(1,-21873)
(1,-12003)
(1,-1123)
(1,-1027)
(1,-628)
(1,-403)
(1,-318)
(1,-248)
(1,-243)
(1,-178)
(1,-138)
(1,-123)
(1,-103)
(1,-78)
(1,-73)
(1,-52)
(1,-48)
(1,-43)
(1,-38)
(1,-33)
(1,-30)
(1,-28)
(1,-23)
(1,-19)
(1,-18)
(1,-13)
(1,-12)
(1,-10)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,3)
(1,4)
(1,5)
(1,6)
(1,7)
(1,9)
(1,11)
(1,12)
(1,17)
(1,18)
(1,22)
(1,27)
(1,29)
(1,32)
(1,37)
(1,42)
(1,47)
(1,51)
(1,72)
(1,77)
(1,102)
(1,122)
(1,137)
(1,177)
(1,242)
(1,247)
(1,317)
(1,402)
(1,627)
(1,1026)
(1,1122)
(1,12002)
(1,21872)
(2,-1221)
(2,-131)
(2,-41)
(2,-31)
(2,-21)
(2,-11)
(2,9)
(2,19)
(2,29)
(2,39)
(2,129)
(2,1219)
(3,-634)
(3,-169)
(3,-134)
(3,-58)
(3,-44)
(3,-34)
(3,-29)
(3,-19)
(3,-14)
(3,-10)
(3,7)
(3,11)
(3,16)
(3,26)
(3,31)
(3,41)
(3,55)
(3,131)
(3,166)
(3,631)
(4,-237)
(4,-117)
(4,-37)
(4,-27)
(4,-19)
(4,-17)
(4,-13)
(4,9)
(4,13)
(4,15)
(4,23)
(4,33)
(4,113)
(4,233)
(5,-71)
(5,-39)
(5,-22)
(5,-18)
(5,-17)
(5,12)
(5,13)
(5,17)
(5,34)
(5,66)
(6,-23)
(6,17)
(7,-1236)
(7,-661)
(7,-146)
(7,-121)
(7,-111)
(7,-66)
(7,-61)
(7,-46)
(7,-36)
(7,-31)
(7,-26)
(7,-22)
(7,15)
(7,19)
(7,24)
(7,29)
(7,39)
(7,54)
(7,59)
(7,104)
(7,114)
(7,139)
(7,654)
(7,1229)
(8,-159)
(8,-59)
(8,-33)
(8,-29)
(8,21)
(8,25)
(8,51)
(8,151)
(9,-227)
(9,-107)
(9,-62)
(9,-52)
(9,-32)
(9,-31)
(9,22)
(9,23)
(9,43)
(9,53)
(9,98)
(9,218)
(14,-47)
(14,33)
(16,-93)
(16,-73)
(16,-49)
(16,33)
(16,57)
(16,77)
(18,-89)
(18,71)
(20,-303)
(20,283)
(21,-83)
(21,62)
(24,-197)
(24,-77)
(24,53)
(24,173)
(25,-139)
(25,-78)
(25,-76)
(25,51)
(25,53)
(25,114)
(27,-571)
(27,-121)
(27,-106)
(27,-86)
(27,59)
(27,79)
(27,94)
(27,544)
(32,-1811)
(32,-341)
(32,-111)
(32,79)
(32,309)
(32,1779)
(35,-186)
(35,151)
(48,-149)
(48,101)
(49,-3027)
(49,-307)
(49,-222)
(49,-172)
(49,-152)
(49,103)
(49,123)
(49,173)
(49,258)
(49,2978)
(56,-293)
(56,237)
(63,-194)
(63,131)
(64,-817)
(64,753)
(81,-1118)
(81,1037)
(98,-429)
(98,331)
(128,-419)
(128,291)
(224,-677)
(224,453)
(243,-1229)
(243,-764)
(243,-739)
(243,496)
(243,521)
(243,986)
(343,-1189)
(343,846)
(480,-1441)
(480,961)
(576,-1973)
(576,1397)
(1024,-3097)
(1024,2073)
(4374,-13127)
(4374,8753)
#
# (a,b,c,d) = (-6,0,1,0) and D = -24:
#
(-147,-227)
(-147,227)
(-49,-120)
(-49,120)
(-16,-39)
(-16,39)
(-9,-22)
(-9,-19)
(-9,19)
(-9,22)
(-8,-3)
(-8,3)
(-7,-17)
(-7,-13)
(-7,-12)
(-7,12)
(-7,13)
(-7,17)
(-5,-12)
(-5,12)
(-4,-9)
(-4,9)
(-3,-7)
(-3,-2)
(-3,2)
(-3,7)
(-2,-3)
(-2,3)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(1,-16)
(1,-9)
(1,-6)
(1,-4)
(1,-3)
(1,3)
(1,4)
(1,6)
(1,9)
(1,16)
(2,-7)
(2,-5)
(2,5)
(2,7)
(3,-8)
(3,8)
(4,-11)
(4,11)
(6,-29)
(6,29)
(7,-138)
(7,-18)
(7,18)
(7,138)
(16,-131)
(16,131)
(20,-49)
(20,49)
(24,-59)
(24,59)
(27,-68)
(27,68)
(28,-73)
(28,73)
(42,-103)
(42,103)
(1960,-4801)
(1960,4801)
#
# (a,b,c,d) = (-5,1,1,0) and D = -21:
#
(-196,-349)
(-196,545)
(-81,-145)
(-81,226)
(-36,-59)
(-36,95)
(-27,-13)
(-27,40)
(-14,-25)
(-14,39)
(-9,-16)
(-9,25)
(-7,-10)
(-7,-8)
(-7,15)
(-7,17)
(-6,-5)
(-6,11)
(-5,-8)
(-5,13)
(-4,-7)
(-4,-5)
(-4,-1)
(-4,5)
(-4,9)
(-4,11)
(-3,-5)
(-3,-2)
(-3,5)
(-3,8)
(-2,-3)
(-2,1)
(-2,5)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(1,-20)
(1,-11)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,2)
(1,3)
(1,4)
(1,5)
(1,10)
(1,19)
(2,-15)
(2,-7)
(2,5)
(2,13)
(3,-68)
(3,-10)
(3,7)
(3,65)
(5,-14)
(5,9)
(6,-17)
(6,11)
(7,-20)
(7,13)
(8,-1285)
(8,-35)
(8,-25)
(8,-23)
(8,15)
(8,17)
(8,27)
(8,1277)
(9,-29)
(9,20)
(14,-109)
(14,95)
(16,-71)
(16,-45)
(16,29)
(16,55)
(24,-67)
(24,43)
(63,-178)
(63,115)
(64,-179)
(64,115)
(96,-301)
(96,205)
(896,-2501)
(896,1605)
#
# (a,b,c,d) = (-5,0,1,0) and D = -20:
#
(-9,-20)
(-9,20)
(-7,-15)
(-7,15)
(-5,-11)
(-5,11)
(-3,-5)
(-3,5)
(-1,-2)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(1,-5)
(1,-3)
(1,3)
(1,5)
(2,-5)
(2,5)
(3,-7)
(3,7)
(4,-9)
(4,9)
(21,-47)
(21,47)
(72,-161)
(72,161)
#
# (a,b,c,d) = (-4,1,1,0) and D = -17:
#
(-125,33)
(-125,92)
(-27,-41)
(-27,68)
(-25,-39)
(-25,64)
(-9,-14)
(-9,23)
(-5,-7)
(-5,-4)
(-5,9)
(-5,12)
(-3,-4)
(-3,-1)
(-3,4)
(-3,7)
(-2,-3)
(-2,5)
(-1,-1)
(-1,0)
(-1,1)
(-1,2)
(1,-12)
(1,-5)
(1,-4)
(1,-3)
(1,2)
(1,3)
(1,4)
(1,11)
(3,-8)
(3,5)
(5,-13)
(5,8)
(7,-51)
(7,-20)
(7,-19)
(7,-18)
(7,11)
(7,12)
(7,13)
(7,44)
(9,-29)
(9,20)
(15,-52)
(15,37)
(16,-41)
(16,25)
(105,-269)
(105,164)
(441,-1165)
(441,724)
#
# (a,b,c,d) = (0,2,2,0) and D = -16:
#
(-4375,1)
(-4375,4374)
(-2401,1)
(-2401,2400)
(-1029,5)
(-1029,1024)
(-625,49)
(-625,576)
(-375,32)
(-375,343)
(-343,100)
(-343,243)
(-256,81)
(-256,175)
(-250,7)
(-250,243)
(-245,2)
(-245,243)
(-225,1)
(-225,224)
(-189,64)
(-189,125)
(-135,7)
(-135,128)
(-128,3)
(-128,125)
(-126,1)
(-126,125)
(-125,27)
(-125,98)
(-81,1)
(-81,25)
(-81,32)
(-81,49)
(-81,56)
(-81,80)
(-64,1)
(-64,15)
(-64,49)
(-64,63)
(-54,5)
(-54,49)
(-50,1)
(-50,49)
(-49,1)
(-49,4)
(-49,9)
(-49,24)
(-49,25)
(-49,40)
(-49,45)
(-49,48)
(-36,1)
(-36,35)
(-35,3)
(-35,8)
(-35,27)
(-35,32)
(-32,5)
(-32,7)
(-32,25)
(-32,27)
(-28,1)
(-28,3)
(-28,25)
(-28,27)
(-27,2)
(-27,7)
(-27,20)
(-27,25)
(-25,1)
(-25,4)
(-25,7)
(-25,9)
(-25,16)
(-25,18)
(-25,21)
(-25,24)
(-21,1)
(-21,5)
(-21,16)
(-21,20)
(-16,1)
(-16,7)
(-16,9)
(-16,15)
(-15,1)
(-15,7)
(-15,8)
(-15,14)
(-14,5)
(-14,9)
(-12,5)
(-12,7)
(-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,-4375)
(1,-2401)
(1,-225)
(1,-126)
(1,-81)
(1,-64)
(1,-50)
(1,-49)
(1,-36)
(1,-28)
(1,-25)
(1,-21)
(1,-16)
(1,-15)
(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)
(1,14)
(1,15)
(1,20)
(1,24)
(1,27)
(1,35)
(1,48)
(1,49)
(1,63)
(1,80)
(1,125)
(1,224)
(1,2400)
(1,4374)
(2,-245)
(2,-27)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,5)
(2,7)
(2,25)
(2,243)
(3,-128)
(3,-35)
(3,-28)
(3,-10)
(3,-8)
(3,-7)
(3,-5)
(3,-4)
(3,1)
(3,2)
(3,4)
(3,5)
(3,7)
(3,25)
(3,32)
(3,125)
(4,-49)
(4,-25)
(4,-9)
(4,-7)
(4,-5)
(4,1)
(4,3)
(4,5)
(4,21)
(4,45)
(5,-1029)
(5,-54)
(5,-32)
(5,-21)
(5,-14)
(5,-12)
(5,-9)
(5,-8)
(5,-7)
(5,-6)
(5,1)
(5,2)
(5,3)
(5,4)
(5,7)
(5,9)
(5,16)
(5,27)
(5,49)
(5,1024)
(6,-7)
(6,1)
(7,-250)
(7,-135)
(7,-32)
(7,-27)
(7,-25)
(7,-16)
(7,-15)
(7,-12)
(7,-10)
(7,-9)
(7,-8)
(7,1)
(7,2)
(7,3)
(7,5)
(7,8)
(7,9)
(7,18)
(7,20)
(7,25)
(7,128)
(7,243)
(8,-35)
(8,-15)
(8,-9)
(8,1)
(8,7)
(8,27)
(9,-49)
(9,-25)
(9,-16)
(9,-14)
(9,-10)
(9,1)
(9,5)
(9,7)
(9,16)
(9,40)
(14,-15)
(14,1)
(15,-64)
(15,-16)
(15,1)
(15,49)
(16,-25)
(16,-21)
(16,5)
(16,9)
(18,-25)
(18,7)
(20,-27)
(20,-21)
(20,1)
(20,7)
(21,-25)
(21,4)
(24,-49)
(24,-25)
(24,1)
(24,25)
(25,-81)
(25,-49)
(25,-32)
(25,-28)
(25,-27)
(25,2)
(25,3)
(25,7)
(25,24)
(25,56)
(27,-125)
(27,-35)
(27,-32)
(27,-28)
(27,1)
(27,5)
(27,8)
(27,98)
(32,-375)
(32,-81)
(32,-35)
(32,3)
(32,49)
(32,343)
(35,-36)
(35,1)
(40,-49)
(40,9)
(45,-49)
(45,4)
(48,-49)
(48,1)
(49,-625)
(49,-81)
(49,-64)
(49,-54)
(49,-50)
(49,1)
(49,5)
(49,15)
(49,32)
(49,576)
(56,-81)
(56,25)
(63,-64)
(63,1)
(64,-189)
(64,125)
(80,-81)
(80,1)
(81,-256)
(81,175)
(98,-125)
(98,27)
(100,-343)
(100,243)
(125,-189)
(125,-128)
(125,-126)
(125,1)
(125,3)
(125,64)
(128,-135)
(128,7)
(175,-256)
(175,81)
(224,-225)
(224,1)
(243,-343)
(243,-250)
(243,-245)
(243,2)
(243,7)
(243,100)
(343,-375)
(343,32)
(576,-625)
(576,49)
(1024,-1029)
(1024,5)
(2400,-2401)
(2400,1)
(4374,-4375)
(4374,1)
#
# (a,b,c,d) = (0,1,4,0) and D = -16:
#
(-17500,1)
(-9604,1)
(-8750,2187)
(-4116,5)
(-2500,49)
(-2401,600)
(-1500,343)
(-1372,243)
(-1029,256)
(-1024,81)
(-1024,175)
(-1000,7)
(-1000,243)
(-980,243)
(-900,1)
(-756,125)
(-625,144)
(-540,7)
(-512,3)
(-512,125)
(-504,1)
(-504,125)
(-500,27)
(-490,1)
(-375,8)
(-343,25)
(-324,1)
(-324,25)
(-324,49)
(-256,1)
(-256,15)
(-256,49)
(-256,63)
(-250,49)
(-225,56)
(-216,5)
(-216,49)
(-200,1)
(-200,49)
(-196,1)
(-196,9)
(-196,25)
(-196,45)
(-189,16)
(-144,1)
(-144,35)
(-140,3)
(-140,27)
(-135,32)
(-128,5)
(-128,7)
(-128,25)
(-128,27)
(-112,1)
(-112,3)
(-112,25)
(-112,27)
(-108,7)
(-108,25)
(-100,1)
(-100,7)
(-100,9)
(-100,21)
(-84,1)
(-84,5)
(-81,8)
(-81,14)
(-81,20)
(-64,1)
(-64,7)
(-64,9)
(-64,15)
(-60,1)
(-60,7)
(-56,5)
(-56,9)
(-54,1)
(-50,9)
(-49,1)
(-49,6)
(-49,10)
(-49,12)
(-48,5)
(-48,7)
(-40,1)
(-40,3)
(-40,7)
(-40,9)
(-36,1)
(-36,5)
(-36,7)
(-35,2)
(-35,8)
(-32,1)
(-32,3)
(-32,5)
(-32,7)
(-30,7)
(-28,1)
(-28,3)
(-28,5)
(-27,5)
(-25,1)
(-25,4)
(-25,6)
(-24,1)
(-24,5)
(-21,4)
(-21,5)
(-20,1)
(-20,3)
(-18,1)
(-16,1)
(-16,3)
(-15,2)
(-14,1)
(-14,3)
(-12,1)
(-10,1)
(-9,1)
(-9,2)
(-8,1)
(-7,1)
(-6,1)
(-5,1)
(1,-16)
(1,-9)
(1,-7)
(1,-4)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,5)
(1,6)
(1,12)
(1,20)
(1,56)
(1,600)
(2,-63)
(2,-25)
(2,-5)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,7)
(2,2187)
(3,-32)
(3,-7)
(3,-2)
(3,-1)
(3,1)
(3,8)
(4,-4375)
(4,-2401)
(4,-225)
(4,-81)
(4,-49)
(4,-25)
(4,-21)
(4,-15)
(4,-9)
(4,-7)
(4,-5)
(4,-3)
(4,1)
(4,3)
(4,5)
(4,7)
(4,9)
(4,15)
(4,27)
(4,35)
(4,49)
(4,63)
(4,125)
(5,-8)
(5,-3)
(5,-2)
(5,1)
(5,4)
(5,256)
(6,-5)
(6,1)
(7,-8)
(7,-4)
(7,-3)
(7,-2)
(7,2)
(7,5)
(7,32)
(8,-245)
(8,-27)
(8,-9)
(8,-7)
(8,-5)
(8,-3)
(8,1)
(8,3)
(8,5)
(8,7)
(8,25)
(8,243)
(9,-4)
(9,4)
(9,10)
(10,-27)
(10,-7)
(10,-3)
(10,1)
(12,-35)
(12,-7)
(12,-5)
(12,1)
(12,5)
(12,7)
(12,25)
(12,125)
(14,-125)
(14,-5)
(14,1)
(14,9)
(15,-16)
(15,-4)
(16,-49)
(16,-25)
(16,-9)
(16,-7)
(16,-5)
(16,1)
(16,3)
(16,5)
(16,21)
(16,45)
(18,-7)
(18,-5)
(20,-1029)
(20,-21)
(20,-9)
(20,-7)
(20,1)
(20,3)
(20,7)
(20,9)
(20,27)
(20,49)
(21,1)
(24,-7)
(24,1)
(25,-8)
(25,-7)
(25,6)
(25,14)
(27,-8)
(27,-7)
(27,2)
(28,-135)
(28,-27)
(28,-25)
(28,-15)
(28,-9)
(28,1)
(28,3)
(28,5)
(28,9)
(28,25)
(28,243)
(32,-35)
(32,-15)
(32,-9)
(32,1)
(32,7)
(32,27)
(35,-9)
(36,-49)
(36,-25)
(36,1)
(36,5)
(36,7)
(45,1)
(49,-16)
(49,8)
(49,144)
(50,1)
(54,49)
(56,-15)
(56,1)
(60,1)
(60,49)
(63,-16)
(64,-25)
(64,-21)
(64,5)
(64,9)
(72,-25)
(72,7)
(80,-27)
(80,-21)
(80,1)
(80,7)
(81,-64)
(84,-25)
(96,-49)
(96,-25)
(96,1)
(96,25)
(98,-27)
(98,-25)
(100,-81)
(100,-49)
(100,-27)
(100,3)
(100,7)
(108,-125)
(108,-35)
(108,1)
(108,5)
(125,-32)
(125,16)
(128,-375)
(128,-81)
(128,-35)
(128,3)
(128,49)
(128,343)
(140,1)
(160,-49)
(160,9)
(175,-64)
(180,-49)
(192,-49)
(192,1)
(196,-625)
(196,-81)
(196,1)
(196,5)
(196,15)
(224,-81)
(224,25)
(243,25)
(250,-63)
(252,1)
(256,-189)
(256,125)
(320,-81)
(320,1)
(324,175)
(343,8)
(392,-125)
(392,27)
(400,-343)
(400,243)
(486,-125)
(486,1)
(500,-189)
(500,1)
(500,3)
(512,-135)
(512,7)
(700,81)
(896,-225)
(896,1)
(972,-343)
(972,-245)
(972,7)
(1372,-375)
(2304,-625)
(2304,49)
(4096,-1029)
(4096,5)
(9600,-2401)
(9600,1)
(17496,-4375)
(17496,1)
#
# (a,b,c,d) = (-4,0,1,0) and D = -16:
#
(-4375,-8746)
(-4375,8746)
(-2401,-4798)
(-2401,4798)
(-1029,-2038)
(-1029,2038)
(-625,-1054)
(-625,1054)
(-375,-622)
(-375,622)
(-343,-286)
(-343,286)
(-245,-482)
(-245,482)
(-225,-446)
(-225,446)
(-189,-122)
(-189,122)
(-135,-242)
(-135,242)
(-125,-236)
(-125,-142)
(-125,142)
(-125,236)
(-81,-158)
(-81,-62)
(-81,-34)
(-81,34)
(-81,62)
(-81,158)
(-64,-47)
(-64,47)
(-63,-124)
(-63,124)
(-49,-94)
(-49,-82)
(-49,-62)
(-49,-2)
(-49,2)
(-49,62)
(-49,82)
(-49,94)
(-35,-58)
(-35,-38)
(-35,38)
(-35,58)
(-32,-61)
(-32,61)
(-27,-46)
(-27,-44)
(-27,-26)
(-27,26)
(-27,44)
(-27,46)
(-25,-48)
(-25,-46)
(-25,-34)
(-25,-22)
(-25,-14)
(-25,14)
(-25,22)
(-25,34)
(-25,46)
(-25,48)
(-21,-38)
(-21,-22)
(-21,22)
(-21,38)
(-16,-31)
(-16,-17)
(-16,17)
(-16,31)
(-15,-26)
(-15,-2)
(-15,2)
(-15,26)
(-9,-17)
(-9,-14)
(-9,-10)
(-9,-2)
(-9,2)
(-9,10)
(-9,14)
(-9,17)
(-8,-11)
(-8,-9)
(-8,9)
(-8,11)
(-7,-13)
(-7,-11)
(-7,-10)
(-7,-6)
(-7,-4)
(-7,-2)
(-7,2)
(-7,4)
(-7,6)
(-7,10)
(-7,11)
(-7,13)
(-5,-8)
(-5,-6)
(-5,-4)
(-5,-2)
(-5,2)
(-5,4)
(-5,6)
(-5,8)
(-4,-7)
(-4,-1)
(-4,1)
(-4,7)
(-3,-4)
(-3,-2)
(-3,-1)
(-3,1)
(-3,2)
(-3,4)
(-2,-3)
(-2,-1)
(-2,1)
(-2,3)
(-1,-1)
(-1,0)
(-1,1)
(1,-17498)
(1,-9602)
(1,-898)
(1,-502)
(1,-488)
(1,-322)
(1,-254)
(1,-198)
(1,-194)
(1,-142)
(1,-110)
(1,-98)
(1,-82)
(1,-62)
(1,-58)
(1,-52)
(1,-47)
(1,-38)
(1,-34)
(1,-30)
(1,-26)
(1,-23)
(1,-22)
(1,-18)
(1,-16)
(1,-14)
(1,-12)
(1,-10)
(1,-8)
(1,-7)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,3)
(1,4)
(1,5)
(1,6)
(1,7)
(1,8)
(1,10)
(1,12)
(1,14)
(1,16)
(1,18)
(1,22)
(1,23)
(1,26)
(1,30)
(1,34)
(1,38)
(1,47)
(1,52)
(1,58)
(1,62)
(1,82)
(1,98)
(1,110)
(1,142)
(1,194)
(1,198)
(1,254)
(1,322)
(1,488)
(1,502)
(1,898)
(1,9602)
(1,17498)
(2,-31)
(2,-11)
(2,-5)
(2,5)
(2,11)
(2,31)
(3,-506)
(3,-134)
(3,-106)
(3,-34)
(3,-26)
(3,-22)
(3,-14)
(3,-10)
(3,-8)
(3,8)
(3,10)
(3,14)
(3,22)
(3,26)
(3,34)
(3,106)
(3,134)
(3,506)
(4,-17)
(4,-13)
(4,13)
(4,17)
(5,-4106)
(5,-206)
(5,-118)
(5,-74)
(5,-46)
(5,-38)
(5,-26)
(5,-22)
(5,-18)
(5,-17)
(5,-14)
(5,-11)
(5,11)
(5,14)
(5,17)
(5,18)
(5,22)
(5,26)
(5,38)
(5,46)
(5,74)
(5,118)
(5,206)
(5,4106)
(6,-37)
(6,-13)
(6,13)
(6,37)
(7,-986)
(7,-526)
(7,-114)
(7,-94)
(7,-86)
(7,-50)
(7,-46)
(7,-34)
(7,-26)
(7,-22)
(7,-18)
(7,-16)
(7,16)
(7,18)
(7,22)
(7,26)
(7,34)
(7,46)
(7,50)
(7,86)
(7,94)
(7,114)
(7,526)
(7,986)
(8,-359)
(8,-65)
(8,-19)
(8,19)
(8,65)
(8,359)
(9,-178)
(9,-82)
(9,-46)
(9,-38)
(9,-32)
(9,-22)
(9,22)
(9,32)
(9,38)
(9,46)
(9,82)
(9,178)
(10,-29)
(10,29)
(12,-25)
(12,25)
(14,-53)
(14,53)
(15,-226)
(15,-34)
(15,34)
(15,226)
(16,-157)
(16,157)
(20,-41)
(20,41)
(21,-58)
(21,58)
(25,-293)
(25,-274)
(25,-146)
(25,-78)
(25,-62)
(25,-58)
(25,58)
(25,62)
(25,78)
(25,146)
(25,274)
(25,293)
(27,-446)
(27,-86)
(27,-74)
(27,-58)
(27,58)
(27,74)
(27,86)
(27,446)
(32,-71)
(32,71)
(35,-74)
(35,74)
(45,-106)
(45,106)
(49,-2402)
(49,-226)
(49,-158)
(49,-152)
(49,-118)
(49,-102)
(49,102)
(49,118)
(49,152)
(49,158)
(49,226)
(49,2402)
(56,-113)
(56,113)
(63,-130)
(63,130)
(81,-862)
(81,862)
(125,-506)
(125,-262)
(125,-254)
(125,254)
(125,262)
(125,506)
(144,-337)
(144,337)
(175,-674)
(175,674)
(243,-886)
(243,-514)
(243,-494)
(243,494)
(243,514)
(243,886)
(256,-517)
(256,517)
(343,-814)
(343,814)
(600,-1201)
(600,1201)
(2187,-4376)
(2187,4376)
#
# (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)
(16,-37)
(16,21)
(40,-97)
(40,57)
(56,-129)
(56,73)
(64,-301)
(64,237)
(175,-403)
(175,228)
(360,-829)
(360,469)
#
# (a,b,c,d) = (-3,0,1,0) and D = -12:
#
(-7,-12)
(-7,12)
(-3,-5)
(-3,5)
(-2,-3)
(-2,3)
(-1,-1)
(-1,0)
(-1,1)
(1,-3)
(1,-2)
(1,2)
(1,3)
(4,-7)
(4,7)
(5,-9)
(5,9)
(15,-26)
(15,26)
(56,-97)
(56,97)
#
# (a,b,c,d) = (0,1,3,0) and D = -9:
#
(-13125,1)
(-7203,1)
(-4375,1458)
(-3087,5)
(-3087,1024)
(-2401,800)
(-1875,49)
(-1125,32)
(-1125,343)
(-1029,100)
(-768,175)
(-750,7)
(-735,2)
(-675,1)
(-675,224)
(-625,192)
(-567,64)
(-567,125)
(-405,7)
(-405,128)
(-384,125)
(-378,1)
(-378,125)
(-375,98)
(-343,81)
(-256,27)
(-250,81)
(-245,81)
(-243,1)
(-243,25)
(-243,32)
(-243,49)
(-243,56)
(-243,80)
(-192,1)
(-192,49)
(-162,5)
(-162,49)
(-150,1)
(-150,49)
(-147,1)
(-147,4)
(-147,25)
(-147,40)
(-128,1)
(-125,9)
(-108,1)
(-108,35)
(-105,8)
(-105,32)
(-96,5)
(-96,7)
(-96,25)
(-84,1)
(-84,25)
(-81,2)
(-81,7)
(-81,20)
(-81,25)
(-75,1)
(-75,4)
(-75,7)
(-75,16)
(-64,5)
(-64,21)
(-63,1)
(-63,5)
(-63,16)
(-63,20)
(-49,3)
(-49,8)
(-49,15)
(-49,16)
(-48,1)
(-48,7)
(-45,1)
(-45,7)
(-45,8)
(-45,14)
(-42,5)
(-36,5)
(-36,7)
(-35,1)
(-35,9)
(-32,9)
(-30,1)
(-30,7)
(-28,1)
(-28,9)
(-27,1)
(-27,2)
(-27,4)
(-27,5)
(-27,7)
(-27,8)
(-25,3)
(-25,6)
(-25,7)
(-25,8)
(-24,1)
(-24,5)
(-24,7)
(-21,1)
(-21,2)
(-21,4)
(-21,5)
(-18,1)
(-18,5)
(-16,3)
(-16,5)
(-15,1)
(-15,2)
(-15,4)
(-14,3)
(-12,1)
(-10,1)
(-10,3)
(-9,1)
(-9,2)
(-8,1)
(-7,1)
(-7,2)
(-6,1)
(-5,1)
(-4,1)
(1,-75)
(1,-42)
(1,-27)
(1,-12)
(1,-7)
(1,-5)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,3)
(1,5)
(1,8)
(1,9)
(1,16)
(1,21)
(1,800)
(1,1458)
(2,-9)
(2,-3)
(2,-1)
(2,1)
(2,81)
(3,-4375)
(3,-2401)
(3,-64)
(3,-50)
(3,-49)
(3,-28)
(3,-25)
(3,-16)
(3,-10)
(3,-8)
(3,-7)
(3,-5)
(3,-4)
(3,-2)
(3,1)
(3,2)
(3,4)
(3,5)
(3,7)
(3,8)
(3,14)
(3,20)
(3,35)
(3,49)
(3,80)
(3,125)
(3,224)
(4,-3)
(4,1)
(4,7)
(4,15)
(5,-343)
(5,-18)
(5,-7)
(5,-4)
(5,-3)
(5,-2)
(5,1)
(5,3)
(5,9)
(6,-245)
(6,-7)
(6,-5)
(6,1)
(6,5)
(6,7)
(6,25)
(7,-45)
(7,-9)
(7,-5)
(7,-4)
(7,-3)
(7,1)
(7,3)
(7,6)
(7,81)
(8,-5)
(8,-3)
(8,9)
(9,-128)
(9,-35)
(9,-28)
(9,-10)
(9,-8)
(9,-7)
(9,-5)
(9,-4)
(9,1)
(9,2)
(9,4)
(9,5)
(9,7)
(9,25)
(9,32)
(9,125)
(12,-49)
(12,-25)
(12,-7)
(12,-5)
(12,1)
(12,5)
(14,-5)
(15,-32)
(15,-14)
(15,-8)
(15,-7)
(15,1)
(15,2)
(15,4)
(15,7)
(15,16)
(15,49)
(15,1024)
(16,-7)
(16,3)
(18,-7)
(18,1)
(20,-9)
(20,-7)
(21,-250)
(21,-32)
(21,-25)
(21,-16)
(21,-10)
(21,-8)
(21,1)
(21,2)
(21,5)
(21,8)
(21,20)
(21,25)
(21,128)
(24,-35)
(24,1)
(24,7)
(25,-27)
(25,-9)
(25,1)
(25,8)
(27,-49)
(27,-25)
(27,-16)
(27,-14)
(27,-10)
(27,1)
(27,5)
(27,7)
(27,16)
(27,40)
(32,-125)
(32,-27)
(32,1)
(35,-12)
(40,3)
(42,1)
(45,-64)
(45,-16)
(45,1)
(45,49)
(48,-25)
(48,5)
(49,-27)
(49,-18)
(49,5)
(49,192)
(54,-25)
(54,7)
(56,-27)
(60,1)
(60,7)
(63,-25)
(63,4)
(64,-63)
(72,-49)
(72,-25)
(72,1)
(72,25)
(75,-49)
(75,-32)
(75,-28)
(75,2)
(75,7)
(75,56)
(80,-27)
(81,-125)
(81,-35)
(81,-32)
(81,-28)
(81,1)
(81,5)
(81,8)
(81,98)
(96,-35)
(96,49)
(96,343)
(98,9)
(100,81)
(105,1)
(120,-49)
(125,-63)
(125,-42)
(125,1)
(128,-45)
(135,-49)
(135,4)
(144,-49)
(144,1)
(147,-625)
(147,-64)
(147,-50)
(147,1)
(147,5)
(147,32)
(168,25)
(175,27)
(189,-64)
(189,1)
(192,125)
(224,-75)
(240,1)
(243,-256)
(243,175)
(294,-125)
(300,-343)
(343,-125)
(375,-128)
(375,1)
(375,64)
(384,7)
(525,-256)
(672,1)
(729,-343)
(729,-250)
(729,-245)
(729,2)
(729,7)
(729,100)
(1024,-343)
(1029,32)
(1728,-625)
(1728,49)
(3072,5)
(7200,-2401)
(7200,1)
(13122,-4375)
(13122,1)
#
# (a,b,c,d) = (-2,1,1,0) and D = -9:
#
(-4375,-4372)
(-4375,8747)
(-2401,-2398)
(-2401,4799)
(-625,-478)
(-625,1103)
(-343,-338)
(-343,-43)
(-343,386)
(-343,681)
(-256,-13)
(-256,269)
(-250,-229)
(-250,479)
(-245,-239)
(-245,484)
(-128,-119)
(-128,247)
(-125,-93)
(-125,-44)
(-125,169)
(-125,218)
(-75,-74)
(-75,149)
(-64,-61)
(-64,-19)
(-64,83)
(-64,125)
(-63,1)
(-63,62)
(-50,-47)
(-50,97)
(-49,-46)
(-49,-37)
(-49,-22)
(-49,23)
(-49,26)
(-49,71)
(-49,86)
(-49,95)
(-45,-38)
(-45,83)
(-42,-41)
(-42,83)
(-35,-26)
(-35,-11)
(-35,46)
(-35,61)
(-32,-17)
(-32,-11)
(-32,43)
(-32,49)
(-28,-25)
(-28,-19)
(-28,47)
(-28,53)
(-27,-26)
(-27,-2)
(-27,5)
(-27,22)
(-27,29)
(-27,53)
(-25,-22)
(-25,-13)
(-25,-4)
(-25,2)
(-25,23)
(-25,29)
(-25,38)
(-25,47)
(-18,-13)
(-18,31)
(-16,-13)
(-16,5)
(-16,11)
(-16,29)
(-14,1)
(-14,13)
(-12,-11)
(-12,23)
(-10,-7)
(-10,-1)
(-10,11)
(-10,17)
(-9,-7)
(-9,-2)
(-9,11)
(-9,16)
(-8,-5)
(-8,1)
(-8,7)
(-8,13)
(-7,-6)
(-7,-4)
(-7,-2)
(-7,-1)
(-7,2)
(-7,5)
(-7,8)
(-7,9)
(-7,11)
(-7,13)
(-5,-4)
(-5,-2)
(-5,1)
(-5,2)
(-5,3)
(-5,4)
(-5,7)
(-5,9)
(-4,-1)
(-4,1)
(-4,3)
(-4,5)
(-3,-2)
(-3,-1)
(-3,1)
(-3,2)
(-3,4)
(-3,5)
(-2,-1)
(-2,1)
(-2,3)
(-1,0)
(-1,1)
(1,-13124)
(1,-7202)
(1,-674)
(1,-377)
(1,-242)
(1,-191)
(1,-149)
(1,-146)
(1,-127)
(1,-107)
(1,-83)
(1,-74)
(1,-62)
(1,-47)
(1,-44)
(1,-34)
(1,-29)
(1,-27)
(1,-26)
(1,-23)
(1,-20)
(1,-17)
(1,-14)
(1,-11)
(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)
(1,10)
(1,13)
(1,16)
(1,19)
(1,22)
(1,25)
(1,26)
(1,28)
(1,33)
(1,43)
(1,46)
(1,61)
(1,73)
(1,82)
(1,106)
(1,126)
(1,145)
(1,148)
(1,190)
(1,241)
(1,376)
(1,673)
(1,7201)
(1,13123)
(2,-733)
(2,-79)
(2,-25)
(2,-19)
(2,-13)
(2,-7)
(2,-5)
(2,3)
(2,5)
(2,11)
(2,17)
(2,23)
(2,77)
(2,731)
(3,-46)
(3,-22)
(3,-13)
(3,-11)
(3,-7)
(3,4)
(3,8)
(3,10)
(3,19)
(3,43)
(4,-143)
(4,-71)
(4,-23)
(4,-17)
(4,-11)
(4,7)
(4,13)
(4,19)
(4,67)
(4,139)
(5,-3082)
(5,-157)
(5,-91)
(5,-59)
(5,-58)
(5,-37)
(5,-31)
(5,-22)
(5,-19)
(5,-16)
(5,-13)
(5,-11)
(5,6)
(5,8)
(5,11)
(5,14)
(5,17)
(5,26)
(5,32)
(5,53)
(5,54)
(5,86)
(5,152)
(5,3077)
(6,-19)
(6,13)
(7,-743)
(7,-398)
(7,-89)
(7,-74)
(7,-68)
(7,-41)
(7,-38)
(7,-29)
(7,-23)
(7,-20)
(7,-18)
(7,-17)
(7,10)
(7,11)
(7,13)
(7,16)
(7,22)
(7,31)
(7,34)
(7,61)
(7,67)
(7,82)
(7,391)
(7,736)
(8,-97)
(8,-41)
(8,-37)
(8,-19)
(8,-17)
(8,9)
(8,11)
(8,29)
(8,33)
(8,89)
(9,-116)
(9,-26)
(9,-23)
(9,-19)
(9,10)
(9,14)
(9,17)
(9,107)
(14,-31)
(14,17)
(15,-34)
(15,19)
(16,-59)
(16,-47)
(16,-33)
(16,17)
(16,31)
(16,43)
(20,-61)
(20,-43)
(20,23)
(20,41)
(21,-43)
(21,22)
(25,-218)
(25,-122)
(25,-71)
(25,-59)
(25,-56)
(25,31)
(25,34)
(25,46)
(25,97)
(25,193)
(27,-229)
(27,202)
(32,-1093)
(32,-211)
(32,-73)
(32,41)
(32,179)
(32,1061)
(35,-73)
(35,38)
(40,-107)
(40,67)
(49,-1826)
(49,-194)
(49,-143)
(49,-113)
(49,-101)
(49,52)
(49,64)
(49,94)
(49,145)
(49,1777)
(56,-187)
(56,131)
(64,-503)
(64,439)
(80,-163)
(80,83)
(81,-262)
(81,-169)
(81,-164)
(81,83)
(81,88)
(81,181)
(98,-277)
(98,179)
(100,-929)
(100,829)
(125,-442)
(125,-259)
(125,-253)
(125,128)
(125,134)
(125,317)
(128,-277)
(128,149)
(175,-593)
(175,418)
(192,-433)
(192,241)
(224,-451)
(224,227)
(343,-782)
(343,439)
(800,-1601)
(800,801)
(1024,-2063)
(1024,1039)
(1458,-2917)
(1458,1459)
#
# (a,b,c,d) = (-2,0,1,0) and D = -8:
#
(-128,-181)
(-128,181)
(-75,-106)
(-75,106)
(-45,-58)
(-45,58)
(-27,-38)
(-27,38)
(-16,-13)
(-16,13)
(-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)
(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)
#
# (a,b,c,d) = (-1,1,1,0) and D = -5:
#
(-18,-11)
(-18,29)
(-7,-4)
(-7,11)
(-5,-3)
(-5,8)
(-3,-1)
(-3,4)
(-2,-1)
(-2,1)
(-2,3)
(-1,0)
(-1,1)
(1,-3)
(1,-2)
(1,1)
(1,2)
(3,-5)
(3,2)
(4,-7)
(4,3)
(8,-13)
(8,5)
(21,-34)
(21,13)
(144,-233)
(144,89)
#
# (a,b,c,d) = (-1,0,1,0) and D = -4:
#
(-4375,-4373)
(-4375,4373)
(-2401,-2399)
(-2401,2399)
(-1029,-1019)
(-1029,1019)
(-625,-527)
(-625,527)
(-375,-311)
(-375,311)
(-343,-143)
(-343,143)
(-245,-241)
(-245,241)
(-225,-223)
(-225,223)
(-189,-61)
(-189,61)
(-135,-121)
(-135,121)
(-128,-47)
(-128,47)
(-125,-118)
(-125,-71)
(-125,71)
(-125,118)
(-81,-79)
(-81,-31)
(-81,-17)
(-81,17)
(-81,31)
(-81,79)
(-64,-61)
(-64,61)
(-63,-62)
(-63,62)
(-49,-47)
(-49,-41)
(-49,-31)
(-49,-1)
(-49,1)
(-49,31)
(-49,41)
(-49,47)
(-35,-29)
(-35,-19)
(-35,19)
(-35,29)
(-32,-31)
(-32,-17)
(-32,17)
(-32,31)
(-27,-23)
(-27,-22)
(-27,-13)
(-27,13)
(-27,22)
(-27,23)
(-25,-24)
(-25,-23)
(-25,-17)
(-25,-11)
(-25,-7)
(-25,7)
(-25,11)
(-25,17)
(-25,23)
(-25,24)
(-21,-19)
(-21,-11)
(-21,11)
(-21,19)
(-18,-17)
(-18,17)
(-16,-11)
(-16,-9)
(-16,9)
(-16,11)
(-15,-13)
(-15,-1)
(-15,1)
(-15,13)
(-14,-13)
(-14,-11)
(-14,11)
(-14,13)
(-9,-7)
(-9,-5)
(-9,-1)
(-9,1)
(-9,5)
(-9,7)
(-8,-7)
(-8,-1)
(-8,1)
(-8,7)
(-7,-5)
(-7,-3)
(-7,-2)
(-7,-1)
(-7,1)
(-7,2)
(-7,3)
(-7,5)
(-6,-1)
(-6,1)
(-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,-8749)
(1,-4801)
(1,-449)
(1,-251)
(1,-244)
(1,-161)
(1,-127)
(1,-99)
(1,-97)
(1,-71)
(1,-55)
(1,-49)
(1,-41)
(1,-31)
(1,-29)
(1,-26)
(1,-19)
(1,-17)
(1,-15)
(1,-13)
(1,-11)
(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)
(1,11)
(1,13)
(1,15)
(1,17)
(1,19)
(1,26)
(1,29)
(1,31)
(1,41)
(1,49)
(1,55)
(1,71)
(1,97)
(1,99)
(1,127)
(1,161)
(1,244)
(1,251)
(1,449)
(1,4801)
(1,8749)
(2,-47)
(2,-23)
(2,-7)
(2,-5)
(2,-3)
(2,3)
(2,5)
(2,7)
(2,23)
(2,47)
(3,-253)
(3,-67)
(3,-53)
(3,-17)
(3,-13)
(3,-11)
(3,-7)
(3,-5)
(3,-4)
(3,4)
(3,5)
(3,7)
(3,11)
(3,13)
(3,17)
(3,53)
(3,67)
(3,253)
(4,-31)
(4,-11)
(4,-5)
(4,5)
(4,11)
(4,31)
(5,-2053)
(5,-103)
(5,-59)
(5,-37)
(5,-23)
(5,-19)
(5,-13)
(5,-11)
(5,-9)
(5,-7)
(5,7)
(5,9)
(5,11)
(5,13)
(5,19)
(5,23)
(5,37)
(5,59)
(5,103)
(5,2053)
(7,-493)
(7,-263)
(7,-57)
(7,-47)
(7,-43)
(7,-25)
(7,-23)
(7,-17)
(7,-13)
(7,-11)
(7,-9)
(7,-8)
(7,8)
(7,9)
(7,11)
(7,13)
(7,17)
(7,23)
(7,25)
(7,43)
(7,47)
(7,57)
(7,263)
(7,493)
(8,-17)
(8,-13)
(8,13)
(8,17)
(9,-89)
(9,-41)
(9,-23)
(9,-19)
(9,-16)
(9,-11)
(9,11)
(9,16)
(9,19)
(9,23)
(9,41)
(9,89)
(10,-17)
(10,-11)
(10,11)
(10,17)
(12,-37)
(12,-13)
(12,13)
(12,37)
(15,-113)
(15,-17)
(15,17)
(15,113)
(16,-359)
(16,-65)
(16,-19)
(16,19)
(16,65)
(16,359)
(20,-29)
(20,29)
(21,-29)
(21,29)
(24,-25)
(24,25)
(25,-137)
(25,-73)
(25,-39)
(25,-31)
(25,-29)
(25,29)
(25,31)
(25,39)
(25,73)
(25,137)
(27,-223)
(27,-43)
(27,-37)
(27,-29)
(27,29)
(27,37)
(27,43)
(27,223)
(28,-53)
(28,53)
(32,-157)
(32,157)
(35,-37)
(35,37)
(40,-41)
(40,41)
(45,-53)
(45,53)
(49,-1201)
(49,-113)
(49,-79)
(49,-76)
(49,-59)
(49,-51)
(49,51)
(49,59)
(49,76)
(49,79)
(49,113)
(49,1201)
(50,-293)
(50,293)
(63,-65)
(63,65)
(64,-71)
(64,71)
(81,-431)
(81,431)
(112,-113)
(112,113)
(125,-253)
(125,-131)
(125,-127)
(125,127)
(125,131)
(125,253)
(175,-337)
(175,337)
(243,-443)
(243,-257)
(243,-247)
(243,247)
(243,257)
(243,443)
(288,-337)
(288,337)
(343,-407)
(343,407)
(512,-517)
(512,517)
(1200,-1201)
(1200,1201)
(2187,-2188)
(2187,2188)
#
# (a,b,c,d) = (0,1,2,0) and D = -4:
#
(-8750,1)
(-4802,1)
(-4375,2187)
(-2401,1200)
(-2058,5)
(-1250,49)
(-1029,512)
(-750,343)
(-686,243)
(-625,288)
(-512,81)
(-512,175)
(-500,7)
(-500,243)
(-490,243)
(-450,1)
(-378,125)
(-375,16)
(-343,50)
(-270,7)
(-256,3)
(-256,125)
(-252,1)
(-252,125)
(-250,27)
(-245,1)
(-225,112)
(-189,32)
(-162,1)
(-162,25)
(-162,49)
(-135,64)
(-128,1)
(-128,15)
(-128,49)
(-128,63)
(-125,49)
(-108,5)
(-108,49)
(-100,1)
(-100,49)
(-98,1)
(-98,9)
(-98,25)
(-98,45)
(-81,16)
(-81,28)
(-81,40)
(-72,1)
(-72,35)
(-70,3)
(-70,27)
(-64,5)
(-64,7)
(-64,25)
(-64,27)
(-56,1)
(-56,3)
(-56,25)
(-56,27)
(-54,7)
(-54,25)
(-50,1)
(-50,7)
(-50,9)
(-50,21)
(-49,2)
(-49,12)
(-49,20)
(-49,24)
(-42,1)
(-42,5)
(-35,4)
(-35,16)
(-32,1)
(-32,7)
(-32,9)
(-32,15)
(-30,1)
(-30,7)
(-28,5)
(-28,9)
(-27,1)
(-27,10)
(-25,2)
(-25,8)
(-25,9)
(-25,12)
(-24,5)
(-24,7)
(-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)
(-15,4)
(-15,7)
(-14,1)
(-14,3)
(-14,5)
(-12,1)
(-12,5)
(-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,-63)
(1,-32)
(1,-25)
(1,-18)
(1,-14)
(1,-8)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,3)
(1,4)
(1,7)
(1,10)
(1,12)
(1,24)
(1,40)
(1,112)
(1,1200)
(1,2187)
(2,-4375)
(2,-2401)
(2,-225)
(2,-81)
(2,-49)
(2,-25)
(2,-21)
(2,-15)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,5)
(2,7)
(2,9)
(2,15)
(2,27)
(2,35)
(2,49)
(2,63)
(2,125)
(3,-64)
(3,-14)
(3,-5)
(3,-4)
(3,-2)
(3,1)
(3,2)
(3,16)
(4,-245)
(4,-27)
(4,-9)
(4,-7)
(4,-5)
(4,-3)
(4,1)
(4,3)
(4,5)
(4,7)
(4,25)
(4,243)
(5,-27)
(5,-16)
(5,-7)
(5,-6)
(5,-4)
(5,-3)
(5,1)
(5,2)
(5,8)
(5,512)
(6,-35)
(6,-7)
(6,-5)
(6,1)
(6,5)
(6,7)
(6,25)
(6,125)
(7,-125)
(7,-16)
(7,-8)
(7,-6)
(7,-5)
(7,-4)
(7,1)
(7,4)
(7,9)
(7,10)
(7,64)
(8,-49)
(8,-25)
(8,-9)
(8,-7)
(8,-5)
(8,1)
(8,3)
(8,5)
(8,21)
(8,45)
(9,-8)
(9,-7)
(9,-5)
(9,8)
(9,20)
(10,-1029)
(10,-21)
(10,-9)
(10,-7)
(10,1)
(10,3)
(10,7)
(10,9)
(10,27)
(10,49)
(12,-7)
(12,1)
(14,-135)
(14,-27)
(14,-25)
(14,-15)
(14,-9)
(14,1)
(14,3)
(14,5)
(14,9)
(14,25)
(14,243)
(15,-32)
(15,-8)
(16,-35)
(16,-15)
(16,-9)
(16,1)
(16,7)
(16,27)
(18,-49)
(18,-25)
(18,1)
(18,5)
(18,7)
(21,2)
(25,-16)
(25,-14)
(25,1)
(25,12)
(25,28)
(27,-16)
(27,-14)
(27,4)
(27,49)
(28,-15)
(28,1)
(30,1)
(30,49)
(32,-25)
(32,-21)
(32,5)
(32,9)
(35,-18)
(36,-25)
(36,7)
(40,-27)
(40,-21)
(40,1)
(40,7)
(42,-25)
(45,2)
(48,-49)
(48,-25)
(48,1)
(48,25)
(49,-32)
(49,-27)
(49,-25)
(49,16)
(49,288)
(50,-81)
(50,-49)
(50,-27)
(50,3)
(50,7)
(54,-125)
(54,-35)
(54,1)
(54,5)
(63,-32)
(64,-375)
(64,-81)
(64,-35)
(64,3)
(64,49)
(64,343)
(70,1)
(80,-49)
(80,9)
(81,-128)
(90,-49)
(96,-49)
(96,1)
(98,-625)
(98,-81)
(98,1)
(98,5)
(98,15)
(112,-81)
(112,25)
(125,-64)
(125,-63)
(125,32)
(126,1)
(128,-189)
(128,125)
(160,-81)
(160,1)
(162,175)
(175,-128)
(196,-125)
(196,27)
(200,-343)
(200,243)
(243,-125)
(243,1)
(243,50)
(250,-189)
(250,1)
(250,3)
(256,-135)
(256,7)
(343,16)
(350,81)
(448,-225)
(448,1)
(486,-343)
(486,-245)
(486,7)
(686,-375)
(1152,-625)
(1152,49)
(2048,-1029)
(2048,5)
(4800,-2401)
(4800,1)
(8748,-4375)
(8748,1)
#
# (a,b,c,d) = (0,1,1,0) and D = -1:
#
(-4375,1)
(-4375,4374)
(-2401,1)
(-2401,2400)
(-1029,5)
(-1029,1024)
(-625,49)
(-625,576)
(-375,32)
(-375,343)
(-343,100)
(-343,243)
(-256,81)
(-256,175)
(-250,7)
(-250,243)
(-245,2)
(-245,243)
(-225,1)
(-225,224)
(-189,64)
(-189,125)
(-135,7)
(-135,128)
(-128,3)
(-128,125)
(-126,1)
(-126,125)
(-125,27)
(-125,98)
(-81,1)
(-81,25)
(-81,32)
(-81,49)
(-81,56)
(-81,80)
(-64,1)
(-64,15)
(-64,49)
(-64,63)
(-54,5)
(-54,49)
(-50,1)
(-50,49)
(-49,1)
(-49,4)
(-49,9)
(-49,24)
(-49,25)
(-49,40)
(-49,45)
(-49,48)
(-36,1)
(-36,35)
(-35,3)
(-35,8)
(-35,27)
(-35,32)
(-32,5)
(-32,7)
(-32,25)
(-32,27)
(-28,1)
(-28,3)
(-28,25)
(-28,27)
(-27,2)
(-27,7)
(-27,20)
(-27,25)
(-25,1)
(-25,4)
(-25,7)
(-25,9)
(-25,16)
(-25,18)
(-25,21)
(-25,24)
(-21,1)
(-21,5)
(-21,16)
(-21,20)
(-16,1)
(-16,7)
(-16,9)
(-16,15)
(-15,1)
(-15,7)
(-15,8)
(-15,14)
(-14,5)
(-14,9)
(-12,5)
(-12,7)
(-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,-4375)
(1,-2401)
(1,-225)
(1,-126)
(1,-81)
(1,-64)
(1,-50)
(1,-49)
(1,-36)
(1,-28)
(1,-25)
(1,-21)
(1,-16)
(1,-15)
(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)
(1,14)
(1,15)
(1,20)
(1,24)
(1,27)
(1,35)
(1,48)
(1,49)
(1,63)
(1,80)
(1,125)
(1,224)
(1,2400)
(1,4374)
(2,-245)
(2,-27)
(2,-9)
(2,-7)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,5)
(2,7)
(2,25)
(2,243)
(3,-128)
(3,-35)
(3,-28)
(3,-10)
(3,-8)
(3,-7)
(3,-5)
(3,-4)
(3,1)
(3,2)
(3,4)
(3,5)
(3,7)
(3,25)
(3,32)
(3,125)
(4,-49)
(4,-25)
(4,-9)
(4,-7)
(4,-5)
(4,1)
(4,3)
(4,5)
(4,21)
(4,45)
(5,-1029)
(5,-54)
(5,-32)
(5,-21)
(5,-14)
(5,-12)
(5,-9)
(5,-8)
(5,-7)
(5,-6)
(5,1)
(5,2)
(5,3)
(5,4)
(5,7)
(5,9)
(5,16)
(5,27)
(5,49)
(5,1024)
(6,-7)
(6,1)
(7,-250)
(7,-135)
(7,-32)
(7,-27)
(7,-25)
(7,-16)
(7,-15)
(7,-12)
(7,-10)
(7,-9)
(7,-8)
(7,1)
(7,2)
(7,3)
(7,5)
(7,8)
(7,9)
(7,18)
(7,20)
(7,25)
(7,128)
(7,243)
(8,-35)
(8,-15)
(8,-9)
(8,1)
(8,7)
(8,27)
(9,-49)
(9,-25)
(9,-16)
(9,-14)
(9,-10)
(9,1)
(9,5)
(9,7)
(9,16)
(9,40)
(14,-15)
(14,1)
(15,-64)
(15,-16)
(15,1)
(15,49)
(16,-25)
(16,-21)
(16,5)
(16,9)
(18,-25)
(18,7)
(20,-27)
(20,-21)
(20,1)
(20,7)
(21,-25)
(21,4)
(24,-49)
(24,-25)
(24,1)
(24,25)
(25,-81)
(25,-49)
(25,-32)
(25,-28)
(25,-27)
(25,2)
(25,3)
(25,7)
(25,24)
(25,56)
(27,-125)
(27,-35)
(27,-32)
(27,-28)
(27,1)
(27,5)
(27,8)
(27,98)
(32,-375)
(32,-81)
(32,-35)
(32,3)
(32,49)
(32,343)
(35,-36)
(35,1)
(40,-49)
(40,9)
(45,-49)
(45,4)
(48,-49)
(48,1)
(49,-625)
(49,-81)
(49,-64)
(49,-54)
(49,-50)
(49,1)
(49,5)
(49,15)
(49,32)
(49,576)
(56,-81)
(56,25)
(63,-64)
(63,1)
(64,-189)
(64,125)
(80,-81)
(80,1)
(81,-256)
(81,175)
(98,-125)
(98,27)
(100,-343)
(100,243)
(125,-189)
(125,-128)
(125,-126)
(125,1)
(125,3)
(125,64)
(128,-135)
(128,7)
(175,-256)
(175,81)
(224,-225)
(224,1)
(243,-343)
(243,-250)
(243,-245)
(243,2)
(243,7)
(243,100)
(343,-375)
(343,32)
(576,-625)
(576,49)
(1024,-1029)
(1024,5)
(2400,-2401)
(2400,1)
(4374,-4375)
(4374,1)
#
# (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)
(16,-55)
(16,39)
(18,-19)
(18,1)
(20,-37)
(20,17)
(25,-236)
(25,211)
(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)
(24,-7)
(24,7)
(336,-527)
(336,527)
#
# (a,b,c,d) = (2,1,1,0) and D = 7:
#
(1,-91)
(1,-11)
(1,-6)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,5)
(1,10)
(1,90)
(2,-1)
(3,-17)
(3,-5)
(3,-2)
(3,-1)
(3,2)
(3,14)
(5,-62)
(5,-7)
(5,-6)
(5,1)
(5,2)
(5,57)
(7,-10)
(7,3)
(9,-22)
(9,13)
(45,-46)
(45,1)
#
# (a,b,c,d) = (2,0,1,0) and D = 8:
#
(1,-22)
(1,-5)
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,4)
(1,5)
(1,22)
(2,-1)
(2,1)
(4,-7)
(4,7)
(5,-2)
(5,2)
(7,-8)
(7,8)
(10,-23)
(10,23)
(56,-17)
(56,17)
#
# (a,b,c,d) = (3,1,1,0) and D = 11:
#
(1,-217)
(1,-34)
(1,-16)
(1,-12)
(1,-9)
(1,-7)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,6)
(1,8)
(1,11)
(1,15)
(1,33)
(1,216)
(2,-59)
(2,-9)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,7)
(2,57)
(3,-26)
(3,-2)
(3,-1)
(3,23)
(4,-183)
(4,-21)
(4,-11)
(4,-3)
(4,-1)
(4,7)
(4,17)
(4,179)
(5,-6)
(5,1)
(7,-138)
(7,-19)
(7,-13)
(7,-4)
(7,-3)
(7,6)
(7,12)
(7,131)
(8,-47)
(8,-11)
(8,3)
(8,39)
(14,-101)
(14,-33)
(14,19)
(14,87)
(16,-13)
(16,-3)
(32,-69)
(32,37)
(35,-74)
(35,39)
(49,-541)
(49,492)
(72,-73)
(72,1)
(112,-183)
(112,71)
(147,-649)
(147,502)
(160,-759)
(160,599)
#
# (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)
(25,-447)
(25,447)
(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)
#
# (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)
(12,-7)
(12,7)
(168,-527)
(168,527)
#
# (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)
(48,-31)
(48,-17)
(672,-863)
(672,191)
#
# (a,b,c,d) = (5,1,1,0) and D = 19:
#
(1,-280)
(1,-30)
(1,-16)
(1,-6)
(1,-5)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,4)
(1,5)
(1,15)
(1,29)
(1,279)
(2,-67)
(2,-19)
(2,-5)
(2,3)
(2,17)
(2,65)
(3,-13)
(3,-4)
(3,1)
(3,10)
(4,-15)
(4,-9)
(4,5)
(4,11)
(6,-5)
(6,-1)
(9,-95)
(9,-20)
(9,11)
(9,86)
(15,-44)
(15,29)
(16,-11)
(16,-5)
(24,-179)
(24,155)
(27,-85)
(27,58)
(56,-55)
(56,-1)
(72,-341)
(72,269)
(96,-1255)
(96,1159)
(3024,-15679)
(3024,12655)
#
# (a,b,c,d) = (5,0,1,0) and D = 20:
#
(1,-830)
(1,-115)
(1,-101)
(1,-32)
(1,-25)
(1,-20)
(1,-17)
(1,-11)
(1,-10)
(1,-7)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,4)
(1,5)
(1,7)
(1,10)
(1,11)
(1,17)
(1,20)
(1,25)
(1,32)
(1,101)
(1,115)
(1,830)
(2,-41)
(2,-15)
(2,-13)
(2,-5)
(2,-1)
(2,1)
(2,5)
(2,13)
(2,15)
(2,41)
(3,-5)
(3,-2)
(3,2)
(3,5)
(4,-215)
(4,-19)
(4,-5)
(4,-1)
(4,1)
(4,5)
(4,19)
(4,215)
(5,-183)
(5,-62)
(5,-19)
(5,-13)
(5,-8)
(5,-1)
(5,1)
(5,8)
(5,13)
(5,19)
(5,62)
(5,183)
(7,-22)
(7,-5)
(7,5)
(7,22)
(8,-79)
(8,-25)
(8,-11)
(8,11)
(8,25)
(8,79)
(9,-55)
(9,55)
(10,-23)
(10,23)
(12,-41)
(12,41)
(16,-85)
(16,85)
(25,-229)
(25,229)
(32,-5)
(32,5)
(50,-53)
(50,53)
(64,-1019)
(64,1019)
(80,-61)
(80,61)
(125,-227)
(125,227)
#
# (a,b,c,d) = (1,1,2,1) and D = 23:
#
(-7,13)
(-1,2)
(-1,4)
(0,1)
(1,-1)
(1,0)
(1,1)
(1,3)
(2,-3)
(2,-1)
(3,-5)
(3,-2)
(4,-7)
(8,3)
(9,19)
(12,-13)
(31,-54)
(67,299)
#
# (a,b,c,d) = (6,1,1,0) and D = 23:
#
(1,-94)
(1,-42)
(1,-23)
(1,-15)
(1,-13)
(1,-10)
(1,-7)
(1,-6)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,5)
(1,6)
(1,9)
(1,12)
(1,14)
(1,22)
(1,41)
(1,93)
(2,-3)
(2,1)
(3,-5)
(3,2)
(5,-146)
(5,-21)
(5,-18)
(5,-11)
(5,-3)
(5,-2)
(5,6)
(5,13)
(5,16)
(5,141)
(7,-78)
(7,-33)
(7,-10)
(7,-6)
(7,-1)
(7,3)
(7,26)
(7,71)
(8,-23)
(8,15)
(21,-50)
(21,29)
(25,-163)
(25,-63)
(25,38)
(25,138)
(35,-293)
(35,258)
(45,-523)
(45,478)
(343,-2182)
(343,1839)
(625,-3111)
(625,2486)
#
# (a,b,c,d) = (6,0,1,0) and D = 24:
#
(1,-463)
(1,-162)
(1,-120)
(1,-27)
(1,-22)
(1,-13)
(1,-12)
(1,-8)
(1,-6)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,6)
(1,8)
(1,12)
(1,13)
(1,22)
(1,27)
(1,120)
(1,162)
(1,463)
(2,-51)
(2,-9)
(2,-5)
(2,-1)
(2,1)
(2,5)
(2,9)
(2,51)
(3,-17)
(3,-14)
(3,-11)
(3,-4)
(3,4)
(3,11)
(3,14)
(3,17)
(4,-23)
(4,-3)
(4,3)
(4,23)
(5,-12)
(5,12)
(7,-9)
(7,9)
(8,-69)
(8,-29)
(8,29)
(8,69)
(9,-292)
(9,-208)
(9,-2)
(9,2)
(9,208)
(9,292)
(12,-19)
(12,19)
(16,-33)
(16,33)
(18,-241)
(18,241)
(20,-1)
(20,1)
(27,-1)
(27,1)
(40,-2399)
(40,2399)
(42,-71)
(42,71)
(54,-4373)
(54,4373)
(64,-477)
(64,477)
#
# (a,b,c,d) = (7,1,1,0) and D = 27:
#
(1,-56)
(1,-14)
(1,-8)
(1,-7)
(1,-5)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,4)
(1,6)
(1,7)
(1,13)
(1,55)
(2,-37)
(2,-7)
(2,-1)
(2,5)
(2,35)
(4,-11)
(4,7)
(5,-19)
(5,-7)
(5,2)
(5,14)
(6,-13)
(6,7)
(8,-7)
(8,-1)
(16,-149)
(16,133)
(20,-91)
(20,71)
(25,-683)
(25,658)
(120,-203)
(120,83)
#
# (a,b,c,d) = (1,3,3,0) and D = 27:
#
(1,-2)
(1,-1)
(1,0)
(1,1)
(2,-5)
(2,-1)
(2,3)
(3,-20)
(3,-4)
(3,-2)
(3,-1)
(3,1)
(3,17)
(4,-3)
(4,-1)
(5,-3)
(5,-2)
(6,-5)
(6,-1)
(9,-11)
(9,-5)
(9,-4)
(9,2)
(15,-13)
(15,-2)
(20,-19)
(20,-1)
(24,-13)
(24,-11)
(25,-87)
(25,62)
(48,-71)
(48,23)
(54,-37)
(54,-17)
(1080,-683)
(1080,-397)
#
# (a,b,c,d) = (7,0,1,0) and D = 28:
#
(1,-181)
(1,-21)
(1,-11)
(1,-7)
(1,-5)
(1,-3)
(1,-1)
(1,0)
(1,1)
(1,3)
(1,5)
(1,7)
(1,11)
(1,21)
(1,181)
(3,-31)
(3,-7)
(3,-1)
(3,1)
(3,7)
(3,31)
(5,-119)
(5,-9)
(5,-7)
(5,7)
(5,9)
(5,119)
(7,-13)
(7,13)
(9,-35)
(9,35)
(45,-47)
(45,47)
#
# (a,b,c,d) = (1,1,2,0) and D = 28:
#
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,5)
(1,45)
(2,-91)
(2,-11)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,5)
(3,-1)
(3,1)
(3,7)
(4,-1)
(5,-31)
(5,-3)
(5,1)
(6,-17)
(6,-5)
(6,-1)
(7,-5)
(9,-11)
(10,-7)
(10,1)
(10,57)
(14,3)
(18,13)
(45,-23)
(90,1)
#
# (a,b,c,d) = (8,1,1,0) and D = 31:
#
(1,-1657)
(1,-157)
(1,-94)
(1,-89)
(1,-72)
(1,-59)
(1,-57)
(1,-40)
(1,-32)
(1,-24)
(1,-19)
(1,-17)
(1,-12)
(1,-10)
(1,-9)
(1,-8)
(1,-7)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,4)
(1,6)
(1,7)
(1,8)
(1,9)
(1,11)
(1,16)
(1,18)
(1,23)
(1,31)
(1,39)
(1,56)
(1,58)
(1,71)
(1,88)
(1,93)
(1,156)
(1,1656)
(2,-13)
(2,-3)
(2,1)
(2,11)
(3,-811)
(3,-520)
(3,-107)
(3,-71)
(3,-43)
(3,-32)
(3,-22)
(3,-16)
(3,-11)
(3,-8)
(3,-7)
(3,-2)
(3,-1)
(3,4)
(3,5)
(3,8)
(3,13)
(3,19)
(3,29)
(3,40)
(3,68)
(3,104)
(3,517)
(3,808)
(4,-111)
(4,-13)
(4,-3)
(4,-1)
(4,9)
(4,107)
(5,-53)
(5,-29)
(5,-8)
(5,-4)
(5,-1)
(5,3)
(5,24)
(5,48)
(6,-67)
(6,-11)
(6,5)
(6,61)
(7,-33)
(7,-24)
(7,-15)
(7,-8)
(7,1)
(7,8)
(7,17)
(7,26)
(8,-127)
(8,-31)
(8,23)
(8,119)
(9,-2096)
(9,-188)
(9,-136)
(9,-41)
(9,-38)
(9,-17)
(9,-13)
(9,-8)
(9,-1)
(9,4)
(9,8)
(9,29)
(9,32)
(9,127)
(9,179)
(9,2087)
(15,-199)
(15,-56)
(15,41)
(15,184)
(25,-1294)
(25,1269)
(27,-1864)
(27,-163)
(27,-149)
(27,-88)
(27,-38)
(27,11)
(27,61)
(27,122)
(27,136)
(27,1837)
(48,-137)
(48,89)
(49,-456)
(49,407)
(63,-1016)
(63,-647)
(63,-391)
(63,328)
(63,584)
(63,953)
(81,-712)
(81,-104)
(81,23)
(81,631)
(96,-263)
(96,167)
(125,-296)
(125,171)
(225,-584)
(225,359)
(243,-155)
(243,-88)
(432,-449)
(432,17)
(768,-4201)
(768,3433)
(1323,-5711)
(1323,4388)
(6561,-43609)
(6561,37048)
#
# (a,b,c,d) = (1,0,1,1) and D = 31:
#
(-2,3)
(-1,2)
(0,1)
(1,-1)
(1,0)
(1,1)
(1,4)
(2,-1)
(5,-7)
(31,-38)
#
# (a,b,c,d) = (1,0,2,0) and D = 32:
#
(1,-11)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,11)
(2,-5)
(2,-1)
(2,1)
(2,5)
(4,-1)
(4,1)
(5,-1)
(5,1)
(7,-4)
(7,4)
(8,-7)
(8,7)
(20,-23)
(20,23)
(112,-17)
(112,17)
#
# (a,b,c,d) = (8,0,1,0) and D = 32:
#
(1,-44)
(1,-10)
(1,-8)
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,4)
(1,8)
(1,10)
(1,44)
(2,-7)
(2,7)
(5,-23)
(5,-4)
(5,4)
(5,23)
(7,-16)
(7,16)
(28,-17)
(28,17)
#
# (a,b,c,d) = (9,1,1,0) and D = 35:
#
(1,-18)
(1,-9)
(1,-4)
(1,-3)
(1,-1)
(1,0)
(1,2)
(1,3)
(1,8)
(1,17)
(2,-11)
(2,-1)
(2,9)
(4,-373)
(4,-9)
(4,5)
(4,369)
(5,-41)
(5,36)
(7,-106)
(7,99)
(8,-17)
(8,9)
#
# (a,b,c,d) = (9,0,1,0) and D = 36:
#
(1,-79)
(1,-21)
(1,-9)
(1,-6)
(1,-4)
(1,-3)
(1,-1)
(1,0)
(1,1)
(1,3)
(1,4)
(1,6)
(1,9)
(1,21)
(1,79)
(2,-33)
(2,-3)
(2,3)
(2,33)
(3,-13)
(3,13)
(4,-9)
(4,9)
(7,-72)
(7,-3)
(7,3)
(7,72)
(8,-7)
(8,7)
(112,-527)
(112,527)
#
# (a,b,c,d) = (10,1,1,0) and D = 39:
#
(1,-110)
(1,-51)
(1,-35)
(1,-16)
(1,-14)
(1,-11)
(1,-10)
(1,-6)
(1,-5)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,4)
(1,5)
(1,9)
(1,10)
(1,13)
(1,15)
(1,34)
(1,50)
(1,109)
(2,-7)
(2,5)
(3,-80)
(3,-25)
(3,-10)
(3,-5)
(3,2)
(3,7)
(3,22)
(3,77)
(5,-6)
(5,1)
(7,-162)
(7,-37)
(7,-20)
(7,-5)
(7,-2)
(7,13)
(7,30)
(7,155)
(8,-5)
(8,-3)
(9,-62)
(9,-19)
(9,10)
(9,53)
(16,-631)
(16,615)
(21,-86)
(21,65)
(35,-249)
(35,214)
(49,-110)
(49,61)
(81,-46)
(81,-35)
#
# (a,b,c,d) = (10,0,1,0) and D = 40:
#
(1,-26)
(1,-5)
(1,-2)
(1,0)
(1,2)
(1,5)
(1,26)
(2,-3)
(2,3)
(3,-20)
(3,20)
(12,-31)
(12,31)
#
# (a,b,c,d) = (11,1,1,0) and D = 43:
#
#
# (a,b,c,d) = (11,0,1,0) and D = 44:
#
(1,-433)
(1,-67)
(1,-58)
(1,-31)
(1,-23)
(1,-17)
(1,-13)
(1,-8)
(1,-7)
(1,-5)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,3)
(1,4)
(1,5)
(1,7)
(1,8)
(1,13)
(1,17)
(1,23)
(1,31)
(1,58)
(1,67)
(1,433)
(2,-181)
(2,-19)
(2,-9)
(2,-1)
(2,1)
(2,9)
(2,19)
(2,181)
(3,-49)
(3,-1)
(3,1)
(3,49)
(4,-43)
(4,-7)
(4,7)
(4,43)
(5,-7)
(5,7)
(7,-269)
(7,-94)
(7,-31)
(7,-26)
(7,-19)
(7,-1)
(7,1)
(7,19)
(7,26)
(7,31)
(7,94)
(7,269)
(8,-5)
(8,5)
(16,-53)
(16,53)
(35,-113)
(35,113)
(36,-37)
(36,37)
(49,-1033)
(49,1033)
(56,-127)
(56,127)
(80,-679)
(80,679)
(147,-1151)
(147,1151)
#
# (a,b,c,d) = (1,2,2,2) and D = 44:
#
(-4,3)
(-3,2)
(-1,1)
(0,1)
(1,0)
(1,1)
(2,-1)
(5,-2)
(17,-11)
(159,-103)
#
# (a,b,c,d) = (12,1,1,0) and D = 47:
#
(1,-412)
(1,-156)
(1,-115)
(1,-79)
(1,-69)
(1,-48)
(1,-37)
(1,-34)
(1,-30)
(1,-28)
(1,-21)
(1,-20)
(1,-16)
(1,-13)
(1,-12)
(1,-9)
(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)
(1,8)
(1,11)
(1,12)
(1,15)
(1,19)
(1,20)
(1,27)
(1,29)
(1,33)
(1,36)
(1,47)
(1,68)
(1,78)
(1,114)
(1,155)
(1,411)
(2,-501)
(2,-15)
(2,-11)
(2,-5)
(2,3)
(2,9)
(2,13)
(2,499)
(3,-340)
(3,-20)
(3,-11)
(3,-4)
(3,1)
(3,8)
(3,17)
(3,337)
(4,-31)
(4,-3)
(4,-1)
(4,27)
(5,-38796)
(5,-2697)
(5,-332)
(5,-296)
(5,-121)
(5,-89)
(5,-52)
(5,-51)
(5,-44)
(5,-24)
(5,-17)
(5,-12)
(5,-9)
(5,-8)
(5,-3)
(5,-2)
(5,3)
(5,4)
(5,7)
(5,12)
(5,19)
(5,39)
(5,46)
(5,47)
(5,84)
(5,116)
(5,291)
(5,327)
(5,2692)
(5,38791)
(6,-131)
(6,125)
(7,-579)
(7,-76)
(7,-67)
(7,-12)
(7,-4)
(7,-3)
(7,5)
(7,60)
(7,69)
(7,572)
(8,-191)
(8,183)
(9,-25)
(9,-13)
(9,4)
(9,16)
(15,-107)
(15,92)
(16,-39)
(16,23)
(20,-113)
(20,93)
(25,-444)
(25,-309)
(25,-157)
(25,-108)
(25,-93)
(25,-66)
(25,41)
(25,68)
(25,83)
(25,132)
(25,284)
(25,419)
(27,-295)
(27,268)
(40,-73)
(40,33)
(49,-92)
(49,43)
(56,-177)
(56,121)
(125,-5073)
(125,-197)
(125,72)
(125,4948)
(625,-921)
(625,-789)
(625,164)
(625,296)
(1536,-16729)
(1536,15193)
(2000,-250953)
(2000,248953)
(6615,-26963)
(6615,20348)
#
# (a,b,c,d) = (12,0,1,0) and D = 48:
#
(1,-74)
(1,-24)
(1,-18)
(1,-10)
(1,-6)
(1,-4)
(1,-3)
(1,-2)
(1,0)
(1,2)
(1,3)
(1,4)
(1,6)
(1,10)
(1,18)
(1,24)
(1,74)
(2,-1)
(2,1)
(3,-26)
(3,-2)
(3,2)
(3,26)
(4,-47)
(4,47)
(5,-27)
(5,-22)
(5,-6)
(5,6)
(5,22)
(5,27)
(9,-20)
(9,20)
(25,-894)
(25,894)
(90,-143)
(90,143)
#
# (a,b,c,d) = (2,2,2,0) and D = 48:
#
(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)
(16,-55)
(16,39)
(18,-19)
(18,1)
(20,-37)
(20,17)
(25,-236)
(25,211)
(360,-323)
(360,-37)
#
# (a,b,c,d) = (13,1,1,0) and D = 51:
#
(1,-4)
(1,-2)
(1,1)
(1,3)
(2,-19)
(2,17)
(7,-628)
(7,-4)
(7,-3)
(7,621)
(24,-103)
(24,79)
#
# (a,b,c,d) = (13,0,1,0) and D = 52:
#
(1,-6)
(1,-1)
(1,1)
(1,6)
(5,-19)
(5,19)
(12,-23)
(12,23)
#
# (a,b,c,d) = (14,1,1,0) and D = 55:
#
(1,-210)
(1,-63)
(1,-18)
(1,-15)
(1,-14)
(1,-8)
(1,-7)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,6)
(1,7)
(1,13)
(1,14)
(1,17)
(1,62)
(1,209)
(3,-269)
(3,-59)
(3,-14)
(3,-13)
(3,-10)
(3,7)
(3,10)
(3,11)
(3,56)
(3,266)
(4,-7)
(4,3)
(5,-26)
(5,-21)
(5,16)
(5,21)
(7,-62)
(7,55)
(8,-43)
(8,35)
(9,-226)
(9,-7)
(9,-2)
(9,217)
(15,-14)
(15,-1)
(25,-791)
(25,766)
(27,-182)
(27,155)
#
# (a,b,c,d) = (14,0,1,0) and D = 56:
#
(1,-119)
(1,-106)
(1,-56)
(1,-38)
(1,-19)
(1,-16)
(1,-14)
(1,-11)
(1,-7)
(1,-6)
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,4)
(1,6)
(1,7)
(1,11)
(1,14)
(1,16)
(1,19)
(1,38)
(1,56)
(1,106)
(1,119)
(2,-13)
(2,-7)
(2,-5)
(2,5)
(2,7)
(2,13)
(3,-7)
(3,7)
(4,-91)
(4,-49)
(4,-1)
(4,1)
(4,49)
(4,91)
(5,-28)
(5,28)
(6,-11)
(6,11)
(7,-14117)
(7,-58)
(7,-23)
(7,-8)
(7,8)
(7,23)
(7,58)
(7,14117)
(8,-223)
(8,-7)
(8,7)
(8,223)
(9,-329)
(9,329)
(16,-121)
(16,121)
(20,-31)
(20,31)
(49,-404)
(49,404)
(56,-311)
(56,311)
(64,-91)
(64,91)
#
# (a,b,c,d) = (1,0,2,1) and D = 59:
#
(-1,3)
(0,1)
(1,-2)
(1,-1)
(1,0)
(1,1)
(3,-1)
(5,-11)
(7,-13)
#
# (a,b,c,d) = (15,1,1,0) and D = 59:
#
(1,-2511)
(1,-2292)
(1,-740)
(1,-136)
(1,-115)
(1,-110)
(1,-105)
(1,-61)
(1,-40)
(1,-31)
(1,-24)
(1,-15)
(1,-12)
(1,-11)
(1,-10)
(1,-6)
(1,-5)
(1,-4)
(1,-3)
(1,-1)
(1,0)
(1,2)
(1,3)
(1,4)
(1,5)
(1,9)
(1,10)
(1,11)
(1,14)
(1,23)
(1,30)
(1,39)
(1,60)
(1,104)
(1,109)
(1,114)
(1,135)
(1,739)
(1,2291)
(1,2510)
(2,-2397)
(2,-125)
(2,-35)
(2,-27)
(2,-17)
(2,-5)
(2,-3)
(2,1)
(2,3)
(2,15)
(2,25)
(2,33)
(2,123)
(2,2395)
(3,-16)
(3,-8)
(3,5)
(3,13)
(4,-169)
(4,-97)
(4,-69)
(4,-19)
(4,-15)
(4,-5)
(4,1)
(4,11)
(4,15)
(4,65)
(4,93)
(4,165)
(5,-39)
(5,-11)
(5,6)
(5,34)
(6,-65)
(6,59)
(7,-55)
(7,-6)
(7,-1)
(7,48)
(8,-59)
(8,-45)
(8,-5)
(8,-3)
(8,37)
(8,51)
(9,-10)
(9,1)
(14,-29)
(14,15)
(16,-951)
(16,-465)
(16,-51)
(16,-45)
(16,29)
(16,35)
(16,449)
(16,935)
(18,-2323)
(18,2305)
(20,-221)
(20,-107)
(20,87)
(20,201)
(21,-106)
(21,85)
(24,-239)
(24,215)
(25,-19)
(25,-6)
(32,-1805)
(32,1773)
(35,-734)
(35,699)
(64,-229)
(64,-159)
(64,95)
(64,165)
(128,-2505)
(128,2377)
(256,-565)
(256,309)
(343,-1023)
(343,680)
(729,-8144)
(729,7415)
#
# (a,b,c,d) = (2,1,2,0) and D = 60:
#
(1,-10)
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,6)
(2,-13)
(2,-5)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,7)
(2,19)
(3,-2)
(3,2)
(4,-1)
(5,-2)
(5,14)
(6,-7)
(6,1)
(7,-6)
(7,2)
(7,122)
(9,-26)
(10,-33)
(10,-1)
(14,-251)
(14,-11)
(14,5)
(18,43)
#
# (a,b,c,d) = (15,0,1,0) and D = 60:
#
(1,-39)
(1,-25)
(1,-15)
(1,-9)
(1,-7)
(1,-5)
(1,-3)
(1,-1)
(1,0)
(1,1)
(1,3)
(1,5)
(1,7)
(1,9)
(1,15)
(1,25)
(1,39)
(3,-11)
(3,-5)
(3,5)
(3,11)
(5,-61)
(5,-3)
(5,3)
(5,61)
(7,-495)
(7,-17)
(7,-15)
(7,15)
(7,17)
(7,495)
(9,-95)
(9,95)
#
# (a,b,c,d) = (16,1,1,0) and D = 63:
#
(1,-272)
(1,-32)
(1,-17)
(1,-16)
(1,-11)
(1,-8)
(1,-5)
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,3)
(1,4)
(1,7)
(1,10)
(1,15)
(1,16)
(1,31)
(1,271)
(2,-1)
(3,-19)
(3,16)
(5,-181)
(5,-16)
(5,-13)
(5,8)
(5,11)
(5,176)
(7,-23)
(7,16)
(15,-31)
(15,16)
#
# (a,b,c,d) = (2,0,2,0) and D = 64:
#
(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)
(24,-7)
(24,7)
(336,-527)
(336,527)
#
# (a,b,c,d) = (16,0,1,0) and D = 64:
#
(1,-28)
(1,-22)
(1,-12)
(1,-8)
(1,-4)
(1,-3)
(1,-2)
(1,0)
(1,2)
(1,3)
(1,4)
(1,8)
(1,12)
(1,22)
(1,28)
(3,-316)
(3,-16)
(3,-4)
(3,4)
(3,16)
(3,316)
(6,-7)
(6,7)
(7,-96)
(7,-4)
(7,4)
(7,96)
(9,-52)
(9,52)
(84,-527)
(84,527)
#
# (a,b,c,d) = (17,1,1,0) and D = 67:
#
#
# (a,b,c,d) = (17,0,1,0) and D = 68:
#
(1,-1871)
(1,-89)
(1,-19)
(1,-9)
(1,-8)
(1,-5)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,5)
(1,8)
(1,9)
(1,19)
(1,89)
(1,1871)
(2,-31)
(2,-11)
(2,11)
(2,31)
(4,-13)
(4,13)
(5,-122)
(5,-94)
(5,-4)
(5,4)
(5,94)
(5,122)
(7,-25)
(7,25)
(9,-32)
(9,32)
(10,-1)
(10,1)
(16,-47)
(16,47)
(20,-1699)
(20,1699)
(40,-409)
(40,409)
(50,-89)
(50,89)
(175,-104)
(175,104)
(576,-353)
(576,353)
#
# (a,b,c,d) = (18,1,1,0) and D = 71:
#
(1,-8587)
(1,-712)
(1,-342)
(1,-139)
(1,-118)
(1,-99)
(1,-87)
(1,-64)
(1,-54)
(1,-39)
(1,-37)
(1,-27)
(1,-22)
(1,-19)
(1,-18)
(1,-14)
(1,-12)
(1,-11)
(1,-10)
(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)
(1,9)
(1,10)
(1,11)
(1,13)
(1,17)
(1,18)
(1,21)
(1,26)
(1,36)
(1,38)
(1,53)
(1,63)
(1,86)
(1,98)
(1,117)
(1,138)
(1,341)
(1,711)
(1,8586)
(2,-47)
(2,-9)
(2,-3)
(2,1)
(2,7)
(2,45)
(3,-161)
(3,-17)
(3,-11)
(3,-2)
(3,-1)
(3,8)
(3,14)
(3,158)
(4,-281)
(4,-31)
(4,-13)
(4,9)
(4,27)
(4,277)
(5,-78)
(5,-23)
(5,-14)
(5,-9)
(5,4)
(5,9)
(5,18)
(5,73)
(7,-5434)
(7,-1258)
(7,-234)
(7,-205)
(7,-109)
(7,-58)
(7,-45)
(7,-43)
(7,-34)
(7,-23)
(7,-18)
(7,-13)
(7,-9)
(7,2)
(7,6)
(7,11)
(7,16)
(7,27)
(7,36)
(7,38)
(7,51)
(7,102)
(7,198)
(7,227)
(7,1251)
(7,5427)
(8,-71)
(8,63)
(9,-158)
(9,-38)
(9,29)
(9,149)
(14,-171)
(14,157)
(21,-103)
(21,82)
(25,-531)
(25,506)
(27,-178)
(27,151)
(32,-23)
(32,-9)
(35,-306)
(35,271)
(49,-513)
(49,-411)
(49,-58)
(49,9)
(49,362)
(49,464)
(243,-207362)
(243,207119)
(343,-4122)
(343,-1341)
(343,-666)
(343,323)
(343,998)
(343,3779)
(448,-18351)
(448,17903)
#
# (a,b,c,d) = (1,2,3,0) and D = 72:
#
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,7)
(2,-1)
(3,-23)
(3,-5)
(3,-2)
(3,-1)
(3,1)
(3,4)
(4,1)
(5,-1)
(6,-1)
(7,-5)
(10,-11)
(12,-11)
(15,-7)
(21,1)
(30,13)
(56,-13)
(168,-73)
#
# (a,b,c,d) = (18,0,1,0) and D = 72:
#
(1,-66)
(1,-15)
(1,-12)
(1,-6)
(1,-3)
(1,0)
(1,3)
(1,6)
(1,12)
(1,15)
(1,66)
(2,-3)
(2,3)
(4,-21)
(4,21)
(5,-6)
(5,6)
(7,-24)
(7,24)
(10,-69)
(10,69)
(56,-51)
(56,51)
#
# (a,b,c,d) = (19,1,1,0) and D = 75:
#
(1,-93)
(1,-23)
(1,-13)
(1,-8)
(1,-6)
(1,-3)
(1,-2)
(1,1)
(1,2)
(1,5)
(1,7)
(1,12)
(1,22)
(1,92)
(2,-61)
(2,-11)
(2,-1)
(2,9)
(2,59)
(3,-34)
(3,-4)
(3,1)
(3,31)
(4,-29)
(4,-17)
(4,13)
(4,25)
(5,-226)
(5,221)
(8,-9)
(8,1)
(16,-243)
(16,227)
(18,-59)
(18,41)
(72,-179)
(72,107)
#
# (a,b,c,d) = (1,1,3,1) and D = 76:
#
(-1,3)
(-1,5)
(0,1)
(1,-2)
(1,-1)
(1,0)
(1,1)
(2,-1)
(4,-11)
(5,2)
(13,-36)
#
# (a,b,c,d) = (19,0,1,0) and D = 76:
#
(1,-559)
(1,-66)
(1,-59)
(1,-31)
(1,-18)
(1,-11)
(1,-9)
(1,-4)
(1,-3)
(1,-1)
(1,1)
(1,3)
(1,4)
(1,9)
(1,11)
(1,18)
(1,31)
(1,59)
(1,66)
(1,559)
(2,-13)
(2,-7)
(2,7)
(2,13)
(3,-23)
(3,-5)
(3,-2)
(3,2)
(3,5)
(3,23)
(8,-3)
(8,3)
(9,-181)
(9,-31)
(9,31)
(9,181)
(12,-167)
(12,167)
(15,-73)
(15,73)
(27,-143)
(27,143)
(28,-27)
(28,27)
(36,-305)
(36,305)
(48,-1207)
(48,1207)
(1512,-14167)
(1512,14167)
#
# (a,b,c,d) = (20,1,1,0) and D = 79:
#
(1,-45)
(1,-36)
(1,-20)
(1,-6)
(1,-5)
(1,-4)
(1,-1)
(1,0)
(1,3)
(1,4)
(1,5)
(1,19)
(1,35)
(1,44)
(3,-23)
(3,-10)
(3,7)
(3,20)
(4,-55)
(4,51)
(7,-67)
(7,-11)
(7,4)
(7,60)
(9,-1604)
(9,-5)
(9,-4)
(9,1595)
(49,-205)
(49,156)
(105,-964)
(105,859)
(243,-10183)
(243,9940)
#
# (a,b,c,d) = (20,0,1,0) and D = 80:
#
(1,-1660)
(1,-230)
(1,-202)
(1,-64)
(1,-50)
(1,-41)
(1,-40)
(1,-34)
(1,-22)
(1,-20)
(1,-15)
(1,-14)
(1,-13)
(1,-10)
(1,-8)
(1,-6)
(1,-5)
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,4)
(1,5)
(1,6)
(1,8)
(1,10)
(1,13)
(1,14)
(1,15)
(1,20)
(1,22)
(1,34)
(1,40)
(1,41)
(1,50)
(1,64)
(1,202)
(1,230)
(1,1660)
(2,-215)
(2,-19)
(2,-5)
(2,-1)
(2,1)
(2,5)
(2,19)
(2,215)
(3,-10)
(3,-4)
(3,4)
(3,10)
(4,-79)
(4,-25)
(4,-11)
(4,11)
(4,25)
(4,79)
(5,-366)
(5,-124)
(5,-38)
(5,-26)
(5,-23)
(5,-16)
(5,-2)
(5,2)
(5,16)
(5,23)
(5,26)
(5,38)
(5,124)
(5,366)
(6,-41)
(6,41)
(7,-44)
(7,-10)
(7,10)
(7,44)
(8,-85)
(8,85)
(9,-110)
(9,110)
(16,-5)
(16,5)
(25,-458)
(25,-53)
(25,53)
(25,458)
(32,-1019)
(32,1019)
(40,-61)
(40,61)
(125,-454)
(125,454)
#
# (a,b,c,d) = (3,2,2,0) and D = 80:
#
(1,-58)
(1,-51)
(1,-13)
(1,-9)
(1,-6)
(1,-4)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,3)
(1,5)
(1,8)
(1,12)
(1,50)
(1,57)
(2,-831)
(2,-33)
(2,-21)
(2,-11)
(2,-5)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,9)
(2,19)
(2,31)
(2,829)
(3,-4)
(3,1)
(4,-43)
(4,-17)
(4,-15)
(4,-7)
(4,-3)
(4,-1)
(4,3)
(4,11)
(4,13)
(4,39)
(5,-94)
(5,-12)
(5,-9)
(5,-3)
(5,-2)
(5,4)
(5,7)
(5,89)
(6,-5)
(6,-1)
(7,-6)
(7,-1)
(8,-219)
(8,-23)
(8,-9)
(8,-5)
(8,-3)
(8,1)
(8,15)
(8,211)
(9,-32)
(9,23)
(10,-67)
(10,-13)
(10,3)
(10,57)
(14,-29)
(14,15)
(16,-87)
(16,-33)
(16,-19)
(16,3)
(16,17)
(16,71)
(20,-33)
(20,13)
(24,-53)
(24,29)
(25,-127)
(25,102)
(32,-101)
(32,69)
(64,-37)
(64,-27)
(100,-103)
(100,3)
(125,-176)
(125,51)
(128,-1083)
(128,955)
(160,-141)
(160,-19)
#
# (a,b,c,d) = (21,1,1,0) and D = 83:
#
(1,-225)
(1,-21)
(1,-7)
(1,-3)
(1,-1)
(1,0)
(1,2)
(1,6)
(1,20)
(1,224)
(2,-141)
(2,-23)
(2,-9)
(2,7)
(2,21)
(2,139)
(3,-14)
(3,11)
(4,-39)
(4,35)
(5,-96)
(5,-17)
(5,12)
(5,91)
(20,-41)
(20,21)
(32,-35)
(32,3)
(75,-68)
(75,-7)
(560,-19797)
(560,19237)
#
# (a,b,c,d) = (1,1,1,2) and D = 83:
#
(-254,201)
(-23,17)
(-7,8)
(-6,5)
(-4,3)
(-2,3)
(-1,1)
(0,1)
(1,0)
(1,1)
(2,-1)
(2,1)
(3,-2)
(4,-1)
(6,11)
(14,-1)
(26,-19)
#
# (a,b,c,d) = (21,0,1,0) and D = 84:
#
(1,-27)
(1,-7)
(1,-3)
(1,-2)
(1,0)
(1,2)
(1,3)
(1,7)
(1,27)
(2,-21)
(2,21)
(4,-17)
(4,17)
(9,-118)
(9,-7)
(9,7)
(9,118)
#
# (a,b,c,d) = (22,1,1,0) and D = 87:
#
(1,-314)
(1,-26)
(1,-17)
(1,-10)
(1,-7)
(1,-5)
(1,-3)
(1,-2)
(1,1)
(1,2)
(1,4)
(1,6)
(1,9)
(1,16)
(1,25)
(1,313)
(2,-17)
(2,15)
(3,-197)
(3,-149)
(3,-85)
(3,-2)
(3,-1)
(3,82)
(3,146)
(3,194)
(5,-67)
(5,-34)
(5,-18)
(5,13)
(5,29)
(5,62)
(9,-1819)
(9,-10)
(9,1)
(9,1810)
(25,-41)
(25,16)
(64,-201)
(64,137)
(105,-202)
(105,97)
#
# (a,b,c,d) = (1,2,3,3) and D = 87:
#
(-82,59)
(-9,8)
(-7,11)
(-5,4)
(-4,3)
(-1,1)
(-1,2)
(0,1)
(1,0)
(1,1)
(2,-1)
(2,1)
(3,-2)
(3,-1)
(7,-5)
(8,-1)
(11,-7)
(29,2)
(39,-28)
(356,-247)
#
# (a,b,c,d) = (22,0,1,0) and D = 88:
#
#
# (a,b,c,d) = (23,1,1,0) and D = 91:
#
(1,-4)
(1,-2)
(1,1)
(1,3)
(2,-29)
(2,27)
(3,-22)
(3,19)
(16,-107)
(16,91)
#
# (a,b,c,d) = (3,1,2,0) and D = 92:
#
(1,-47)
(1,-21)
(1,-5)
(1,-3)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,3)
(1,6)
(1,7)
(1,11)
(2,-23)
(2,-15)
(2,-13)
(2,-7)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,5)
(2,9)
(2,41)
(2,93)
(3,1)
(4,-3)
(4,1)
(5,-73)
(5,-9)
(5,-1)
(5,3)
(5,8)
(6,-5)
(7,-39)
(7,-5)
(7,-3)
(7,13)
(10,-21)
(10,-11)
(10,-3)
(10,13)
(10,141)
(14,-33)
(14,-1)
(14,3)
(14,71)
(16,-23)
(16,15)
(21,-25)
(25,19)
(25,69)
(35,129)
(42,29)
(45,239)
(50,-163)
(50,-63)
(70,-293)
(90,-523)
(343,-1091)
(625,1243)
(686,1839)
(1250,-3111)
#
# (a,b,c,d) = (23,0,1,0) and D = 92:
#
(1,-187)
(1,-83)
(1,-45)
(1,-29)
(1,-25)
(1,-19)
(1,-13)
(1,-11)
(1,-7)
(1,-5)
(1,-3)
(1,-2)
(1,-1)
(1,1)
(1,2)
(1,3)
(1,5)
(1,7)
(1,11)
(1,13)
(1,19)
(1,25)
(1,29)
(1,45)
(1,83)
(1,187)
(3,-7)
(3,7)
(4,-19)
(4,19)
(5,-287)
(5,-37)
(5,-31)
(5,-17)
(5,-1)
(5,1)
(5,17)
(5,31)
(5,37)
(5,287)
(7,-149)
(7,-59)
(7,-13)
(7,-5)
(7,5)
(7,13)
(7,59)
(7,149)
(21,-79)
(21,79)
(25,-301)
(25,-101)
(25,101)
(25,301)
(35,-551)
(35,551)
(45,-1001)
(45,1001)
(343,-4021)
(343,4021)
(625,-5597)
(625,5597)
#
# (a,b,c,d) = (24,1,1,0) and D = 95:
#
(1,-265)
(1,-88)
(1,-33)
(1,-24)
(1,-22)
(1,-13)
(1,-9)
(1,-8)
(1,-6)
(1,-4)
(1,-3)
(1,-1)
(1,0)
(1,2)
(1,3)
(1,5)
(1,7)
(1,8)
(1,12)
(1,21)
(1,23)
(1,32)
(1,87)
(1,264)
(3,-8)
(3,5)
(4,-7)
(4,3)
(5,-77)
(5,-56)
(5,-29)
(5,24)
(5,51)
(5,72)
(7,-96)
(7,-31)
(7,-15)
(7,8)
(7,24)
(7,89)
(8,-75)
(8,67)
(25,-64)
(25,39)
(35,-1544)
(35,1509)
#
# (a,b,c,d) = (3,0,2,0) and D = 96:
#
(1,-81)
(1,-60)
(1,-11)
(1,-6)
(1,-4)
(1,-3)
(1,-1)
(1,0)
(1,1)
(1,3)
(1,4)
(1,6)
(1,11)
(1,60)
(1,81)
(2,-463)
(2,-27)
(2,-13)
(2,-3)
(2,-1)
(2,1)
(2,3)
(2,13)
(2,27)
(2,463)
(3,-7)
(3,-2)
(3,2)
(3,7)
(4,-51)
(4,-9)
(4,-5)
(4,-1)
(4,1)
(4,5)
(4,9)
(4,51)
(5,-6)
(5,6)
(6,-17)
(6,-11)
(6,11)
(6,17)
(8,-23)
(8,-3)
(8,3)
(8,23)
(9,-146)
(9,-104)
(9,-1)
(9,1)
(9,104)
(9,146)
(14,-9)
(14,9)
(16,-69)
(16,-29)
(16,29)
(16,69)
(24,-19)
(24,19)
(32,-33)
(32,33)
(36,-241)
(36,241)
(40,-1)
(40,1)
(54,-1)
(54,1)
(80,-2399)
(80,2399)
(84,-71)
(84,71)
(108,-4373)
(108,4373)
(128,-477)
(128,477)
#
# (a,b,c,d) = (24,0,1,0) and D = 96:
#
(1,-926)
(1,-324)
(1,-240)
(1,-54)
(1,-51)
(1,-44)
(1,-26)
(1,-24)
(1,-16)
(1,-12)
(1,-9)
(1,-6)
(1,-5)
(1,-4)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,4)
(1,5)
(1,6)
(1,9)
(1,12)
(1,16)
(1,24)
(1,26)
(1,44)
(1,51)
(1,54)
(1,240)
(1,324)
(1,926)
(2,-23)
(2,-3)
(2,3)
(2,23)
(3,-34)
(3,-28)
(3,-22)
(3,-8)
(3,8)
(3,22)
(3,28)
(3,34)
(4,-69)
(4,-29)
(4,29)
(4,69)
(5,-24)
(5,24)
(6,-19)
(6,19)
(7,-18)
(7,18)
(8,-33)
(8,33)
(9,-584)
(9,-416)
(9,-241)
(9,-4)
(9,4)
(9,241)
(9,416)
(9,584)
(10,-1)
(10,1)
(20,-2399)
(20,2399)
(21,-71)
(21,71)
(27,-4373)
(27,-2)
(27,2)
(27,4373)
(32,-477)
(32,477)
#
# (a,b,c,d) = (25,1,1,0) and D = 99:
#
(1,-650)
(1,-101)
(1,-47)
(1,-35)
(1,-26)
(1,-25)
(1,-20)
(1,-11)
(1,-8)
(1,-5)
(1,-2)
(1,-1)
(1,0)
(1,1)
(1,4)
(1,7)
(1,10)
(1,19)
(1,24)
(1,25)
(1,34)
(1,46)
(1,100)
(1,649)
(2,-175)
(2,-25)
(2,-13)
(2,-7)
(2,5)
(2,11)
(2,23)
(2,173)
(4,-545)
(4,-59)
(4,-29)
(4,-5)
(4,1)
(4,25)
(4,55)
(4,541)
(5,-13)
(5,8)
(7,-407)
(7,-50)
(7,-32)
(7,-5)
(7,-2)
(7,25)
(7,43)
(7,400)
(8,-133)
(8,-25)
(8,17)
(8,125)
(14,-289)
(14,-85)
(14,71)
(14,275)
(16,-23)
(16,7)
(24,-49)
(24,25)
(32,-175)
(32,143)
(35,-187)
(35,152)
(49,-1574)
(49,-600)
(49,551)
(49,1525)
(112,-437)
(112,325)
(160,-2117)
(160,1957)
#
# (a,b,c,d) = (1,1,3,0) and D = 99:
#
(1,-4)
(1,-3)
(1,-1)
(1,0)
(1,1)
(1,2)
(1,5)
(1,11)
(1,72)
(2,-3)
(2,-1)
(2,1)
(2,19)
(3,-217)
(3,-34)
(3,-16)
(3,-7)
(3,-4)
(3,-2)
(3,-1)
(3,1)
(3,2)
(3,8)
(3,11)
(4,-61)
(4,-7)
(4,-1)
(5,-2)
(6,-59)
(6,-5)
(6,1)
(6,7)
(7,-46)
(7,-1)
(7,2)
(7,4)
(8,1)
(8,13)
(9,-26)
(9,-2)
(9,-1)
(9,23)
(12,-11)
(12,-1)
(12,7)
(12,17)
(12,179)
(14,-11)
(14,29)
(15,1)
(16,-1)
(21,-19)
(21,-13)
(21,-4)
(21,131)
(24,-47)
(24,-11)
(32,-23)
(35,13)
(42,-101)
(42,19)
(48,-13)
(49,164)
(96,37)
(105,-74)
(112,-61)
(147,-541)
(160,-253)
(216,-73)
(216,1)
(336,71)
(441,-649)
(441,502)
(480,599)
#
# (a,b,c,d) = (1,4,5,0) and D = 100:
#
(1,-1)
(1,0)
(1,1)
(2,-3)
(2,-1)
(3,-17)
(3,-2)
(3,-1)
(4,-1)
(5,-9)
(5,-4)
(5,-3)
(5,-2)
(5,-1)
(5,1)
(7,-3)
(7,2)
(9,-1)
(10,-3)
(10,7)
(15,-7)
(15,-2)
(15,73)
(20,-11)
(24,-11)
(35,-38)
(35,-13)
(45,-31)
(120,-41)
(336,-29)
(1680,-1199)
#
# (a,b,c,d) = (25,0,1,0) and D = 100:
#
(1,-35)
(1,-15)
(1,-10)
(1,-5)
(1,0)
(1,5)
(1,10)
(1,15)
(1,35)
(2,-55)
(2,-5)
(2,5)
(2,55)
(3,-395)
(3,-20)
(3,-5)
(3,5)
(3,20)
(3,395)
(4,-15)
(4,15)
(7,-120)
(7,-5)
(7,5)
(7,120)
(9,-65)
(9,65)
(24,-35)
(24,35)
(336,-2635)
(336,2635)