Integer Points on A^4+B^4+132098*C^4=4*D^4
[2026.05.11]A^4+B^4+132098*C^4=4*D^4の整点
■Diophantine Equation
A^4+B^4+2*n^2*C^4=4*D^4 ----------(1)
を満たす自明でない整数の組(A,B,C,D) (ただし A*B*C*D!=0かつgcd(A,B,C,D)=1)を探す。
以下では、Elkiesの論文(参考文献[1])の方法によって、(1)を満たす整数の組(A,B,C,D)を探す。
■(1)およびD!=0より、A/D=x+y,B/D=x-y.C/D=tとすると、
2*(x^4+6*x^2*y^2+y^4)+2*n^2*t^4=4
x^4+6*x^2*y^2+y^4+n^2*t^4=2 ----------(2)
つまり、(2)を満たす有理数の組(r,s,t)を見つければ良い。
ここで、ある有理数uに対して、
(u^2+1)*y^2=--(u^2+4*u+5)*x^2-(u^2+2*u-1) ----------(5a)
±n*(u^2+1)*t^2=2*(u^2+2*u-1)*x^2+(u^2-2*u^1) ----------(5b±)
を満たす有理数の組(x,y,t)が存在すれば、(x,y,t)が(2)を満たすことが分かる。
[pari/gpによる計算]
gp > YY2(u,x)
%1 = ((-u^2 - 4*u - 5)/(u^2 + 1))*x^2 + ((-u^2 - 2*u + 1)/(u^2 + 1))
gp > TT2(n,u,x)
%2 = ((2*u^2 + 4*u - 2)/(n*u^2 + n))*x^2 + ((u^2 - 2*u - 1)/(n*u^2 + n))
gp > x^4+6*x^2*YY2(u,x)+YY2(u,x)^2+n^2*TT2(n,u,x)^2
%5 = 2
■2次曲線(5a),(5b±)は、常にnon-singularである。
2次曲線(5a)の右辺の判別式は
-4*(u^2+4*u+5)*(u^2*2+u-1)
となり、有理数の根を持たないので、任意の有理数uについて、non-singularである。
同様に、2次曲線(5b±)の右辺の判別式は
-4*2*(u^2+2*u-1)*(u^2-2*u-1)
となり、有理数の根を持たないので、任意の有理数uについて、non-singularである。
■以下では、n=257とする。
Pari/GPで簡単なプログラム(a221s.gp)を作成して、0 < x,y,z <= 10000, 0 < zの範囲で、整数解を調べると、
49^4+257^4+132098*7^4=4*185^4
が見つかった。
[Pari/GP(gp2c-run)による計算]
-bash-3.1$ gp2c-run -g a221s.gp
Reading GPRC: /home/his/.gprc
GPRC Done.
GP/PARI CALCULATOR Version 2.15.0 (released)
amd64 running netbsd (x86-64/GMP-6.1.2 kernel) 64-bit version
compiled: Oct 15 2022, gcc version 5.5.0 (nb2 20180327)
threading engine: single
(readline v7.0 enabled, extended help enabled)
Copyright (C) 2000-2022 The PARI Group
PARI/GP is free software, covered by the GNU General Public License, and
comes WITHOUT ANY WARRANTY WHATSOEVER.
Type ? for help, \q to quit.
Type ?18 for how to get moral (and possibly technical) support.
parisize = 6144000000, primelimit = 100000000
gp > sss(257,1000)
N=1000
2*n^2=132098
1:49^4+257^4+132098*7^4=4*185^4
time = 39,554 ms.
%1 = 1
gp > sss(257,10000)
N=10000
2*n^2=132098
1:49^4+257^4+132098*7^4=4*185^4
time = 10h, 26min, 36,858 ms.
%2 = 1
■有理数uの高さが小さいものから、順に調べる。
例えば、有理数uの高さが400以下の範囲で、uの分子が偶数、uの分母が奇数であり、2つの2次曲線(5a)と(5b±)が共に有理点を持つようなuを選択すると、
以下のように(重複を含む)2764個のuが抽出される。
[pari/gpによる計算]
> PP(257,1,400);
** u= -400/167 ; C1 -32245*x^2 - 187889*y^2 + 1489*z^2
(8/87 : 7/87 : 1) C2a (748088/41777 : -4991/41777 : 1)
** u= -400/173 ; C1 -32845*x^2 - 189929*y^2 + 8329*z^2
(5008/38409 : 7769/38409 : 1) C2a (17612/4337 : -49/4337 : 1)
** u= -400/221 ; C1 -50605*x^2 - 208841*y^2 + 65641*z^2
(54281/365259 : -203026/365259 : 1) C2a (53546/34865 : -701/34865 : 1)
** u= -400/259 ; C1 -81005*x^2 - 227081*y^2 + 114281*z^2
(15244/40739 : 27429/40739 : 1) C2a (-7948878/3988693 : 406991/3988693 : 1)
** u= -400/371 ; C1 -254605*x^2 - 297641*y^2 + 274441*z^2
(211711/738589 : 681654/738589 : 1) C2a (-3199364/2629 : 271013/2629 : 1)
** u= -399/167 ; C1 -32114*x^2 + 187090*y^2 + 1954*z^2
(1393/6243 : -272/6243 : 1) C2b (-4947516/980309 : -57433/980309 : 1)
** u= -399/383 ; C1 {+/-} -281378*x^2 + 305890*y^2 + 293122*z^2
(-237/259 : -1460/3367 : 1) C2a (-52907299/660587 : -4568643/660587 : 1) C2b (-240696/502163 : -315361/6528119 : 1)
** u= -398/195 ; C1 -38089*x^2 + 196429*y^2 + 34841*z^2
(105278/133169 : 31565/133169 : 1) C2b (5742053/3044007 : 71239/3044007 : 1)
** u= -398/201 ; C1 -40417*x^2 + 198805*y^2 + 41993*z^2
(-9373/10769 : -2576/10769 : 1) C2b (-5265149/3697827 : -24257/528261 : 1)
** u= -398/345 ; C1 -204289*x^2 + 277429*y^2 + 235241*z^2
(443965/454489 : 173228/454489 : 1) C2b (-609253/748167 : 3971/748167 : 1)
** u= -397/181 ; C1 -33986*x^2 - 190370*y^2 + 18866*z^2
(-74136/135029 : 28735/135029 : 1) C2a (-11495863/1279917 : 304841/1279917 : 1)
** u= -397/301 ; C1 {+/-} -132626*x^2 + 248210*y^2 + 171986*z^2
(572821/503141 : -9120/503141 : 1) C2a (-1141783/1005627 : -46675/1005627 : 1) C2b (374698/1025477 : -65479/1025477 :
1)
** u= -396/175 ; C1 -32741*x^2 - 187441*y^2 + 12409*z^2
(27540/232931 : -58817/232931 : 1) C2a (-12578132/93087 : 285413/93087 : 1)
** u= -395/291 ; C1 {+/-} -119650*x^2 + 240706*y^2 + 158546*z^2
(-78728/161575 : -23761/32315 : 1) C2a (5147081/1106371 : -360327/1106371 : 1) C2b (-1159714/1240255 : 24423/1240255
: 1)
** u= -395/299 ; C1 -130610*x^2 - 245426*y^2 + 169586*z^2
(3/11 : 364/451 : 1) C2a (134779/118191 : -226847/4845831 : 1)
** u= -395/323 ; C1 -167330*x^2 + 260354*y^2 + 203474*z^2
(284083/258671 : -20604/258671 : 1) C2b (131086/4470401 : 302569/4470401 : 1)
** u= -394/165 ; C1 -31321*x^2 + 182461*y^2 + 2009*z^2
(11494/51503 : 2555/51503 : 1) C2b (40655431/8127875 : -67293/1161125 : 1)
** u= -394/213 ; C1 -46393*x^2 + 200605*y^2 + 57977*z^2
(253597/260989 : -69376/260989 : 1) C2b (682331/639777 : 34025/639777 : 1)
** u= -394/275 ; C1 -99961*x^2 + 230861*y^2 + 137089*z^2
(87590/512217 : 390481/512217 : 1) C2b (13039521/14470681 : -509957/14470681 : 1)
** u= -394/285 ; C1 -112201*x^2 + 236461*y^2 + 150569*z^2
(-112387/144205 : 85136/144205 : 1) C2b (17307073/19733345 : 38529/1160785 : 1)
** u= -394/289 ; C1 -117377*x^2 + 238757*y^2 + 156017*z^2
(-2217/1945 : 236/1945 : 1) C2b (9094837/9961261 : -252203/9961261 : 1)
** u= -394/301 ; C1 -133865*x^2 + 245837*y^2 + 172553*z^2
(834714/882319 : -408683/882319 : 1) C2b (-1498919/5744155 : 381251/5744155 : 1)
** u= -394/399 ; C1 -322417*x^2 + 314437*y^2 + 318377*z^2
(-1158950/2482213 : 2204843/2482213 : 1) C2b (-501671/1489757 : -80889/1489757 : 1)
** u= -393/185 ; C1 {+/-} -34754*x^2 + 188674*y^2 + 25186*z^2
(13636/46437 : 15925/46437 : 1) C2a (75089/31611 : -619/31611 : 1) C2b (-19492/77357 : -813/11051 : 1)
** u= -393/305 ; C1 -140114*x^2 - 247474*y^2 + 178306*z^2
(-3135/2933 : -796/2933 : 1) C2a (6274471/1994675 : -449337/1994675 : 1)
** u= -392/185 ; C1 -34709*x^2 - 187889*y^2 + 25601*z^2
(-22940/26929 : 1263/26929 : 1) C2a (-60342792/2911193 : 1953103/2911193 : 1)
** u= -392/191 ; C1 -36581*x^2 - 190145*y^2 + 32561*z^2
(79399/90349 : 13602/90349 : 1) C2a (507524/182559 : -12697/182559 : 1)
** u= -392/215 ; C1 -47669*x^2 - 199889*y^2 + 61121*z^2
(23655/101389 : 54862/101389 : 1) C2a (-7892558/1245627 : -374023/1245627 : 1)
** u= -392/239 ; C1 -64517*x^2 - 210785*y^2 + 90833*z^2
(28944/26803 : -7291/26803 : 1) C2a (18330126/5254217 : -990995/5254217 : 1)
** u= -392/249 ; C1 -73237*x^2 - 215665*y^2 + 103553*z^2
(-236803/213919 : 54130/213919 : 1) C2a (-9503418/4262729 : -493379/4262729 : 1)
** u= -392/253 ; C1 -77005*x^2 - 217673*y^2 + 108697*z^2
(-76535/234787 : -159546/234787 : 1) C2a (-91928/65069 : -3323/65069 : 1)
** u= -392/281 ; C1 -107861*x^2 - 232625*y^2 + 145601*z^2
(-677/2183 : -8322/10915 : 1) C2a (97512/87203 : 2965/87203 : 1)
** u= -392/307 ; C1 -143533*x^2 - 247913*y^2 + 181273*z^2
(-4879/4581 : 1250/4581 : 1) C2a (-919066/631583 : 54107/631583 : 1)
** u= -392/337 ; C1 -193093*x^2 - 267233*y^2 + 224113*z^2
(96547/253855 : -217506/253855 : 1) C2a (77829484/7563953 : -6267353/7563953 : 1)
** u= -392/341 ; C1 -200381*x^2 - 269945*y^2 + 229961*z^2
(1819/45959 : 42390/45959 : 1) C2a (119436/77851 : -8243/77851 : 1)
** u= -392/361 ; C1 -239221*x^2 - 283985*y^2 + 259681*z^2
(-27668/45957 : 35867/45957 : 1) C2a (21958/11173 : 1705/11173 : 1)
** u= -392/373 ; C1 -264445*x^2 - 292793*y^2 + 277897*z^2
(-460364/466957 : -124659/466957 : 1) C2a (1035298/1158469 : -49417/1158469 : 1)
** u= -391/191 ; C1 -36562*x^2 + 189362*y^2 + 32962*z^2
(-19880/65539 : -25911/65539 : 1) C2b (-377144/225207 : 9181/225207 : 1)
** u= -391/311 ; C1 -150082*x^2 - 249602*y^2 + 187042*z^2
(40007/36375 : -5396/36375 : 1) C2a (-3206149/3045443 : 129083/3045443 : 1)
** u= -391/351 ; C1 {+/-} -219922*x^2 + 276082*y^2 + 244802*z^2
(426599/409555 : 61348/409555 : 1) C2a (-47431/45913 : -2547/45913 : 1) C2b (823862/1046229 : -2947/1046229 : 1)
** u= -391/367 ; C1 -252338*x^2 - 287570*y^2 + 268802*z^2
(133157/250439 : -207528/250439 : 1) C2a (-557553/589219 : -28769/589219 : 1)
** u= -390/173 ; C1 -31865*x^2 + 182029*y^2 + 12769*z^2
(26442/110983 : -27233/110983 : 1) C2b (-1677827/667265 : 267/5905 : 1)
** u= -390/229 ; C1 -57065*x^2 + 204541*y^2 + 78961*z^2
(57043/63897 : -25852/63897 : 1) C2b (3431599/4415915 : 927/15715 : 1)
** u= -389/237 ; C1 -63394*x^2 + 207490*y^2 + 89234*z^2
(-96019/82681 : -11096/82681 : 1) C2b (625834/528299 : 12339/528299 : 1)
** u= -389/261 ; C1 -85810*x^2 - 219442*y^2 + 119858*z^2
(-15388/18097 : 9289/18097 : 1) C2a (-10748043/310925 : 700381/310925 : 1)
** u= -389/277 ; C1 -103954*x^2 - 228050*y^2 + 140914*z^2
(-74293/63909 : -13948/319545 : 1) C2a (-2010673/388181 : -683639/1940905 : 1)
** u= -388/161 ; C1 -30277*x^2 - 176465*y^2 + 313*z^2
(403/55371 : 2326/55371 : 1) C2a (7195694/290843 : 15787/290843 : 1)
** u= -388/165 ; C1 -30589*x^2 - 177769*y^2 + 4721*z^2
(4616/12077 : 35/929 : 1) C2a (-15238544/923545 : 208083/923545 : 1)
** u= -388/171 ; C1 -31357*x^2 - 179785*y^2 + 11393*z^2
(-23356/38803 : -521/38803 : 1) C2a (24183912/3346589 : -476297/3346589 : 1)
** u= -388/227 ; C1 -55885*x^2 - 202073*y^2 + 77137*z^2
(-17699/15181 : 1158/15181 : 1) C2a (-6616396/4648883 : 124631/4648883 : 1)
** u= -388/255 ; C1 -79909*x^2 - 215569*y^2 + 112361*z^2
(-12383/15521 : 8290/15521 : 1) C2a (5524386/3517909 : -245939/3517909 : 1)
** u= -388/263 ; C1 -88213*x^2 - 219713*y^2 + 122713*z^2
(-73595/62997 : -6478/62997 : 1) C2a (-926564/53587 : 1487/1307 : 1)
** u= -388/289 ; C1 -119621*x^2 - 234065*y^2 + 157241*z^2
(-3556/3349 : 13461/43537 : 1) C2a (189972/83657 : 23105/155363 : 1)
** u= -388/357 ; C1 -233725*x^2 - 277993*y^2 + 253937*z^2
(-42467/273115 : 51622/54623 : 1) C2a (-167258/216205 : 1581/216205 : 1)
** u= -388/371 ; C1 -262957*x^2 - 288185*y^2 + 274993*z^2
(-378031/456513 : -261662/456513 : 1) C2a (10883246/2161777 : 927673/2161777 : 1)
** u= -387/163 ; C1 {+/-} -30290*x^2 + 176338*y^2 + 2962*z^2
(-106065/347519 : -9808/347519 : 1) C2a (1382626867/371649 : -15807833/371649 : 1) C2b (-2722/20509 : 1521/20509 : 1)
** u= -387/259 ; C1 -84242*x^2 - 216850*y^2 + 117778*z^2
(-1097/1551 : 916/1551 : 1) C2a (-13328441/3100071 : 4189373/15500355 : 1)
** u= -387/299 ; C1 {+/-} -133922*x^2 + 239170*y^2 + 171058*z^2
(321036/284107 : 4433/284107 : 1) C2a (5557679/2845893 : 11785/91803 : 1) C2b (-5399768/6056749 : -3513/195379 : 1)
** u= -386/189 ; C1 -35785*x^2 + 184717*y^2 + 32633*z^2
(-790/871 : -1489/11323 : 1) C2b (85873/84465 : -69781/1098045 : 1)
** u= -386/197 ; C1 -38873*x^2 + 187805*y^2 + 41897*z^2
(-28561/29417 : 4920/29417 : 1) C2b (-11195881/7783783 : -334079/7783783 : 1)
** u= -386/211 ; C1 -45817*x^2 + 193517*y^2 + 58417*z^2
(27958/101145 : 53881/101145 : 1) C2b (1122181/1099473 : 59501/1099473 : 1)
** u= -386/223 ; C1 -53329*x^2 + 198725*y^2 + 72889*z^2
(5330/18953 : 55707/94765 : 1) C2b (4739/101691 : -7409/101691 : 1)
** u= -386/251 ; C1 -76457*x^2 + 211997*y^2 + 107777*z^2
(3921/10555 : -7148/10555 : 1) C2b (988883/3504895 : 243331/3504895 : 1)
** u= -386/265 ; C1 -90961*x^2 + 219221*y^2 + 125809*z^2
(459065/394281 : 42112/394281 : 1) C2b (-11187/12917 : 136043/3319669 : 1)
** u= -386/311 ; C1 -152417*x^2 + 245717*y^2 + 187817*z^2
(15099/75095 : 64568/75095 : 1) C2b (1390363/1580089 : 1109/225727 : 1)
** u= -386/335 ; C1 -192881*x^2 + 261221*y^2 + 221849*z^2
(18141/22255 : -13328/22255 : 1) C2b (27574697/43429205 : 1809287/43429205 : 1)
** u= -386/351 ; C1 -223057*x^2 + 272197*y^2 + 245177*z^2
(77686/82969 : -35425/82969 : 1) C2b (-24882887/42115681 : -1784547/42115681 : 1)
** u= -386/385 ; C1 -295681*x^2 + 297221*y^2 + 296449*z^2
(-83602/99699 : 54415/99699 : 1) C2b (157093849/238600401 : 5526337/238600401 : 1)
** u= -384/175 ; C1 -31781*x^2 - 178081*y^2 + 17569*z^2
(14193/35965 : -9574/35965 : 1) C2a (-1371448/114545 : 37041/114545 : 1)
** u= -384/259 ; C1 -85037*x^2 - 214537*y^2 + 118537*z^2
(-165057/140957 : 13390/140957 : 1) C2a (5456324/3641225 : 246681/3641225 : 1)
** u= -384/281 ; C1 -110645*x^2 - 226417*y^2 + 147313*z^2
(-411372/365701 : 65693/365701 : 1) C2a (-228412/30759 : 4140311/7905063 : 1)
** u= -384/367 ; C1 -257189*x^2 - 282145*y^2 + 269089*z^2
(14432/343287 : 334967/343287 : 1) C2a (1332686/129081 : -114517/129081 : 1)
** u= -383/207 ; C1 -43810*x^2 + 189538*y^2 + 54722*z^2
(29564/27107 : 3181/27107 : 1) C2b (-89876/485515 : -35379/485515 : 1)
** u= -383/279 ; C1 -108466*x^2 - 224530*y^2 + 144866*z^2
(-75728/65527 : -53/65527 : 1) C2a (2670117/141857 : 188941/141857 : 1)
** u= -383/287 ; C1 -118850*x^2 - 229058*y^2 + 155522*z^2
(-44549/50755 : 5364/10151 : 1) C2a (31134757/124761 : -2263153/124761 : 1)
** u= -383/303 ; C1 {+/-} -141538*x^2 + 238498*y^2 + 177218*z^2
(-3748/309935 : -267151/309935 : 1) C2a (6531069/2305297 : -470927/2305297 : 1) C2b (-4385302/5334699 :
148463/5334699 : 1)
** u= -383/343 ; C1 -209458*x^2 + 264338*y^2 + 233698*z^2
(-38389/54479 : 38160/54479 : 1) C2b (-656496/1919077 : 113369/1919077 : 1)
** u= -383/375 ; C1 {+/-} -275314*x^2 + 287314*y^2 + 281186*z^2
(-192415/196699 : 48868/196699 : 1) C2a (371/391 : -21/391 : 1) C2b (1285718/1879275 : -37933/1879275 : 1)
** u= -383/399 ; C1 {+/-} -331426*x^2 + 305890*y^2 + 318146*z^2
(-6052/12983 : 151397/168779 : 1) C2a (-134631/198259 : 4967/2577367 : 1) C2b (-62186/107221 : -44211/1393873 : 1)
** u= -382/161 ; C1 -29521*x^2 + 171845*y^2 + 3001*z^2
(22871/217941 : 27196/217941 : 1) C2b (334811/80499 : 4519/80499 : 1)
** u= -382/179 ; C1 -32617*x^2 + 177965*y^2 + 22873*z^2
(4559/19487 : 516/1499 : 1) C2b (-15625179/6833887 : 108319/6833887 : 1)
** u= -382/259 ; C1 -85577*x^2 + 213005*y^2 + 119033*z^2
(-150582/128461 : 10583/128461 : 1) C2b (2226257/2157899 : 44549/2157899 : 1)
** u= -382/343 ; C1 -210065*x^2 + 263573*y^2 + 233777*z^2
(161662/240581 : 174663/240581 : 1) C2b (1673039/6464413 : 399733/6464413 : 1)
** u= -382/357 ; C1 -237673*x^2 + 273373*y^2 + 254273*z^2
(-36565/93361 : -83336/93361 : 1) C2b (6523367/8622975 : 13739/8622975 : 1)
** u= -382/395 ; C1 -322489*x^2 + 301949*y^2 + 311881*z^2
(1022545/1074767 : -276396/1074767 : 1) C2b (622643/7628373 : -464339/7628373 : 1)
** u= -381/245 ; C1 {+/-} -71906*x^2 + 205186*y^2 + 101554*z^2
(-3048/97585 : 68629/97585 : 1) C2a (5644553/4165875 : 182369/4165875 : 1) C2b (141766/284359 : -18423/284359 : 1)
** u= -381/269 ; C1 {+/-} -97010*x^2 + 217522*y^2 + 132178*z^2
(358672/309849 : -31073/309849 : 1) C2a (-267499/206013 : 11291/206013 : 1) C2b (-1577004/2797475 : -164699/2797475 :
1)
** u= -381/277 ; C1 {+/-} -106658*x^2 + 221890*y^2 + 142642*z^2
(430308/496981 : -264145/496981 : 1) C2a (17963/12561 : -917/12561 : 1) C2b (-1852/3499 : 207/3499 : 1)
** u= -380/289 ; C1 -122725*x^2 - 227921*y^2 + 158761*z^2
(-194548/323825 : -45897/64765 : 1) C2a (115696984/2350921 : -8516693/2350921 : 1)
** u= -380/299 ; C1 -136925*x^2 - 233801*y^2 + 172241*z^2
(-27/2141 : -31238/36397 : 1) C2a (12008044/4129521 : -14688709/70201857 : 1)
** u= -380/373 ; C1 -273085*x^2 - 283529*y^2 + 278209*z^2
(437188/433897 : -25323/433897 : 1) C2a (7511434/587081 : 655343/587081 : 1)
** u= -380/377 ; C1 -282005*x^2 - 286529*y^2 + 284249*z^2
(-112560/148829 : -97489/148829 : 1) C2a (75988/3525 : -6673/3525 : 1)
** u= -380/379 ; C1 -286525*x^2 - 288041*y^2 + 287281*z^2
(256628/276675 : -20819/55335 : 1) C2a (-140557286/10581499 : -12365413/10581499 : 1)
** u= -379/243 ; C1 -70498*x^2 + 202690*y^2 + 99602*z^2
(-13192/12719 : 4355/12719 : 1) C2b (12482884/11478433 : -289749/11478433 : 1)
** u= -378/179 ; C1 -32441*x^2 + 174925*y^2 + 24481*z^2
(4214/5193 : 3467/25965 : 1) C2b (1171521/1587457 : 554623/7937285 : 1)
** u= -378/185 ; C1 -34289*x^2 + 177109*y^2 + 31201*z^2
(-4270/19479 : -7957/19479 : 1) C2b (21698253/11238395 : -210067/11238395 : 1)
** u= -378/187 ; C1 -34985*x^2 + 177853*y^2 + 33457*z^2
(-5094/8917 : 3139/8917 : 1) C2b (477591/267155 : 7439/267155 : 1)
** u= -378/257 ; C1 -84545*x^2 + 208933*y^2 + 117457*z^2
(47370/66311 : -39547/66311 : 1) C2b (-6870689/8171185 : 361401/8171185 : 1)
** u= -378/263 ; C1 -91073*x^2 + 212053*y^2 + 125113*z^2
(47502/42145 : -8881/42145 : 1) C2b (1928923/4024925 : -252849/4024925 : 1)
** u= -378/311 ; C1 -156257*x^2 + 239605*y^2 + 188953*z^2
(114061/194847 : -146476/194847 : 1) C2b (-611323/737261 : 13761/737261 : 1)
** u= -378/347 ; C1 -220265*x^2 + 263293*y^2 + 239857*z^2
(210690/203497 : 24271/203497 : 1) C2b (4983693/17129389 : 1029031/17129389 : 1)
** u= -378/359 ; C1 -244481*x^2 + 271765*y^2 + 257401*z^2
(3318/12973 : 12227/12973 : 1) C2b (-14433/46487 : 2701/46487 : 1)
** u= -378/367 ; C1 -261425*x^2 + 277573*y^2 + 269257*z^2
(-11935/12459 : -4052/12459 : 1) C2b (11448453/17408965 : 473447/17408965 : 1)
** u= -377/161 ; C1 {+/-} -28946*x^2 + 168050*y^2 + 5186*z^2
(436/1273 : -657/6365 : 1) C2a (-422781/78737 : -14849/393685 : 1) C2b (30682/7331 : -1319/36655 : 1)
** u= -376/195 ; C1 -38221*x^2 - 179401*y^2 + 43289*z^2
(53087/62965 : 18874/62965 : 1) C2a (728234/145 : -31557/145 : 1)
** u= -376/199 ; C1 -40085*x^2 - 180977*y^2 + 47873*z^2
(89040/91019 : -20867/91019 : 1) C2a (-29144144/17139003 : -57253/2448429 : 1)
** u= -376/225 ; C1 -56101*x^2 - 192001*y^2 + 78449*z^2
(157045/144439 : 36302/144439 : 1) C2a (231835776/28008911 : 1844833/4001273 : 1)
** u= -376/257 ; C1 -85093*x^2 - 207425*y^2 + 117937*z^2
(-218200/195753 : 237467/978765 : 1) C2a (-13027876/9060655 : 2904109/45303275 : 1)
** u= -376/259 ; C1 -87245*x^2 - 208457*y^2 + 120473*z^2
(22201/44701 : 30798/44701 : 1) C2a (4127282/3556239 : -114437/3556239 : 1)
** u= -376/261 ; C1 -89437*x^2 - 209497*y^2 + 123017*z^2
(-22243/242575 : 185314/242575 : 1) C2a (1390026/343517 : 90767/343517 : 1)
** u= -376/289 ; C1 -124325*x^2 - 224897*y^2 + 159473*z^2
(23396/34201 : -22953/34201 : 1) C2a (-7472028/2149745 : -534871/2149745 : 1)
** u= -376/341 ; C1 -209917*x^2 - 257657*y^2 + 231337*z^2
(-92128/103905 : -52711/103905 : 1) C2a (-3816262/2715145 : 265363/2715145 : 1)
** u= -376/359 ; C1 -245845*x^2 - 270257*y^2 + 257473*z^2
(-113045/229689 : 196562/229689 : 1) C2a (10832176/6643973 : -830909/6643973 : 1)
** u= -376/395 ; C1 -327421*x^2 - 297401*y^2 + 311689*z^2
(-117215/125253 : 36274/125253 : 1) C2a (-32288/41363 : -211/5909 : 1)
** u= -376/397 ; C1 -332333*x^2 - 298985*y^2 + 314777*z^2
(-28604/37813 : -24411/37813 : 1) C2a (10180324/9856683 : 701555/9856683 : 1)
** u= -375/247 ; C1 -75170*x^2 - 201634*y^2 + 105634*z^2
(-83373/72307 : 12152/72307 : 1) C2a (3028199/1864911 : 140033/1864911 : 1)
** u= -375/343 ; C1 -214370*x^2 + 258274*y^2 + 234274*z^2
(46124/69087 : -50633/69087 : 1) C2b (-891804/1302115 : -39293/1302115 : 1)
** u= -375/383 ; C1 {+/-} -299570*x^2 + 287314*y^2 + 293314*z^2
(-75285/88967 : 46592/88967 : 1) C2a (2629051/1358775 : -218819/1358775 : 1) C2b (-754/1141 : -3/163 : 1)
** u= -374/155 ; C1 -28121*x^2 + 163901*y^2 + 89*z^2
(-98/13885 : -321/13885 : 1) C2b (71527/2567 : 121/2567 : 1)
** u= -374/203 ; C1 -42233*x^2 + 181085*y^2 + 53177*z^2
(-6486/6133 : -1111/6133 : 1) C2b (1055503/903391 : 42977/903391 : 1)
** u= -374/245 ; C1 -73481*x^2 + 199901*y^2 + 103409*z^2
(-68310/66023 : 23231/66023 : 1) C2b (-785627/1635815 : 105923/1635815 : 1)
** u= -374/249 ; C1 -77377*x^2 + 201877*y^2 + 108377*z^2
(-61049/53005 : 8932/53005 : 1) C2b (-11856937/10741215 : 3179/10741215 : 1)
** u= -374/269 ; C1 -99257*x^2 + 212237*y^2 + 133697*z^2
(260265/247141 : 82444/247141 : 1) C2b (-1553249/1549913 : 2821/1549913 : 1)
** u= -374/279 ; C1 -111697*x^2 + 217717*y^2 + 146657*z^2
(133210/258197 : -189217/258197 : 1) C2b (-6331319/7703087 : -39633/1100441 : 1)
** u= -374/287 ; C1 -122369*x^2 + 222245*y^2 + 157169*z^2
(28303/25183 : 2724/25183 : 1) C2b (2034583/4583623 : -278095/4583623 : 1)
** u= -374/295 ; C1 -133681*x^2 + 226901*y^2 + 167809*z^2
(74521/101487 : 65920/101487 : 1) C2b (5420623/16794747 : 1074181/16794747 : 1)
** u= -374/339 ; C1 -207337*x^2 + 254797*y^2 + 228617*z^2
(-75583/110023 : -78820/110023 : 1) C2b (1143349/5281547 : 330939/5281547 : 1)
** u= -374/361 ; C1 -251425*x^2 + 270197*y^2 + 260473*z^2
(16703621/19165185 : -1943800/3833037 : 1) C2b (-18465499/26057505 : 419251/26057505 : 1)
** u= -374/377 ; C1 -286529*x^2 + 282005*y^2 + 284249*z^2
(102921/113621 : 47432/113621 : 1) C2b (-10943467/16033157 : -32833/2290451 : 1)
** u= -374/389 ; C1 -314537*x^2 + 291197*y^2 + 302417*z^2
(-34777/36637 : -9360/36637 : 1) C2b (18506581/68405207 : -3835309/68405207 : 1)
** u= -373/173 ; C1 {+/-} -30658*x^2 + 169058*y^2 + 19858*z^2
(48431/63925 : 7392/63925 : 1) C2a (716353/86345 : -20693/86345 : 1) C2b (558872/293745 : 13699/293745 : 1)
** u= -373/221 ; C1 {+/-} -53602*x^2 + 187970*y^2 + 74578*z^2
(335909/324337 : 97776/324337 : 1) C2a (-6602711/2944823 : -42571/420689 : 1) C2b (-1227124/3301977 : 32869/471711 :
1)
** u= -373/341 ; C1 {+/-} -211762*x^2 + 255410*y^2 + 231538*z^2
(36832/35289 : -2039/35289 : 1) C2a (433481/533897 : 11033/533897 : 1) C2b (74606/96507 : 263/96507 : 1)
** u= -372/179 ; C1 -32237*x^2 - 170425*y^2 + 26833*z^2
(1740/3787 : 6491/18935 : 1) C2a (-12299144/3744755 : -1648173/18723775 : 1)
** u= -372/181 ; C1 -32861*x^2 - 171145*y^2 + 29041*z^2
(-15441/67991 : -27178/67991 : 1) C2a (-20555564/3686151 : 695507/3686151 : 1)
** u= -372/239 ; C1 -68357*x^2 - 195505*y^2 + 96553*z^2
(11389/20493 : 12730/20493 : 1) C2a (-22538728/1837469 : -1391031/1837469 : 1)
** u= -372/349 ; C1 -228077*x^2 - 260185*y^2 + 243073*z^2
(44832/710449 : -685405/710449 : 1) C2a (-13165696/790593 : -1121435/790593 : 1)
** u= -371/243 ; C1 {+/-} -72274*x^2 + 196690*y^2 + 101714*z^2
(916/959 : -409/959 : 1) C2a (-19822461/7106279 : -1150063/7106279 : 1) C2b (857914/1607259 : 101335/1607259 : 1)
** u= -371/267 ; C1 {+/-} -97858*x^2 + 208930*y^2 + 131762*z^2
(-50953/54779 : -26008/54779 : 1) C2a (2103141/1444907 : 106889/1444907 : 1) C2b (264658/293511 : -8975/293511 : 1)
** u= -371/323 ; C1 {+/-} -179954*x^2 + 241970*y^2 + 206354*z^2
(79024/310159 : -278199/310159 : 1) C2a (-5841209/6612621 : 185725/6612621 : 1) C2b (-554/5551 : 365/5551 : 1)
** u= -371/331 ; C1 {+/-} -194242*x^2 + 247202*y^2 + 217522*z^2
(22484/21555 : -3407/21555 : 1) C2a (-2271079/2670667 : -67777/2670667 : 1) C2b (471994/882105 : 42737/882105 : 1)
** u= -370/247 ; C1 -76385*x^2 + 197909*y^2 + 106889*z^2
(54287/57899 : 25944/57899 : 1) C2b (-98219/305311 : -20821/305311 : 1)
** u= -370/273 ; C1 -105505*x^2 + 211429*y^2 + 139649*z^2
(22019/93197 : -74128/93197 : 1) C2b (3177059/3420351 : 70999/3420351 : 1)
** u= -368/167 ; C1 -29045*x^2 - 163313*y^2 + 15377*z^2
(4732/30587 : 9171/30587 : 1) C2a (-296091012/2116921 : -8013383/2116921 : 1)
** u= -368/189 ; C1 -35821*x^2 - 171145*y^2 + 39401*z^2
(-38161/88579 : 38750/88579 : 1) C2a (619654/121799 : -795/3929 : 1)
** u= -368/203 ; C1 -42653*x^2 - 176633*y^2 + 55193*z^2
(13885/25097 : 12258/25097 : 1) C2a (9265046/2202033 : 427453/2202033 : 1)
** u= -368/233 ; C1 -63893*x^2 - 189713*y^2 + 90353*z^2
(-232553/296795 : -154074/296795 : 1) C2a (150955612/102346659 : 5494019/102346659 : 1)
** u= -368/261 ; C1 -91837*x^2 - 203545*y^2 + 124793*z^2
(65092/121049 : -84095/121049 : 1) C2a (-2066112/1841171 : -59645/1841171 : 1)
** u= -368/275 ; C1 -108749*x^2 - 211049*y^2 + 142601*z^2
(-287764/495923 : 351435/495923 : 1) C2a (-367134/382789 : 641/382789 : 1)
** u= -368/277 ; C1 -111325*x^2 - 212153*y^2 + 145177*z^2
(100688/278125 : -43641/55625 : 1) C2a (4359524/360707 : 317149/360707 : 1)
** u= -368/301 ; C1 -145357*x^2 - 226025*y^2 + 176713*z^2
(324644/315589 : -502209/1577945 : 1) C2a (39718/40169 : 1483/40169 : 1)
** u= -368/325 ; C1 -185149*x^2 - 241049*y^2 + 209401*z^2
(15520/65097 : -59129/65097 : 1) C2a (-3147946/2436781 : -202999/2436781 : 1)
** u= -368/357 ; C1 -247165*x^2 - 262873*y^2 + 254777*z^2
(68611/111383 : -87166/111383 : 1) C2a (4308336/632387 : -372019/632387 : 1)
** u= -367/311 ; C1 {+/-} -161746*x^2 + 231410*y^2 + 190306*z^2
(-3736/32439 : -29251/32439 : 1) C2a (-4579859/2006941 : 340889/2006941 : 1) C2b (-583528/887907 : 36745/887907 : 1)
** u= -367/383 ; C1 -305890*x^2 - 281378*y^2 + 293122*z^2
(368231/555087 : -32048/42699 : 1) C2a (64687039/6524443 : -5810699/6524443 : 1)
** u= -366/253 ; C1 -83609*x^2 + 197965*y^2 + 115249*z^2
(-7757/7593 : 48536/129081 : 1) C2b (-1893031/1803839 : -154245/30665263 : 1)
** u= -366/259 ; C1 -90185*x^2 + 201037*y^2 + 122713*z^2
(56498/256869 : 197087/256869 : 1) C2b (716277/1256855 : 1793/30655 : 1)
** u= -366/325 ; C1 -186281*x^2 + 239581*y^2 + 209569*z^2
(2861/3705 : 40384/62985 : 1) C2b (12627/106325 : 117529/1807525 : 1)
** u= -365/237 ; C1 {+/-} -68050*x^2 + 189394*y^2 + 95954*z^2
(-2017/4105 : 532/821 : 1) C2a (-27247/23863 : -39/23863 : 1) C2b (1616456/1446399 : 21121/1446399 : 1)
** u= -364/179 ; C1 -32077*x^2 - 164537*y^2 + 29857*z^2
(131896/137451 : 6065/137451 : 1) C2a (769912/376919 : 7859/376919 : 1)
** u= -364/249 ; C1 -79957*x^2 - 194497*y^2 + 110777*z^2
(166085/162731 : -1040042/2766427 : 1) C2a (-3620248/585421 : -4036023/9952157 : 1)
** u= -364/265 ; C1 -97781*x^2 - 202721*y^2 + 130649*z^2
(58120/548201 : 438237/548201 : 1) C2a (2984264/2940309 : -48161/2940309 : 1)
** u= -364/267 ; C1 -100189*x^2 - 203785*y^2 + 133169*z^2
(53521/54841 : -23602/54841 : 1) C2a (482241468/25549673 : 34343357/25549673 : 1)
** u= -364/279 ; C1 -115477*x^2 - 210337*y^2 + 148457*z^2
(-17896/57575 : -46517/57575 : 1) C2a (21600414/21921413 : -520837/21921413 : 1)
** u= -364/281 ; C1 -118165*x^2 - 211457*y^2 + 151033*z^2
(15920/35181 : -27247/35181 : 1) C2a (-93106/1163 : -6941/1163 : 1)
** u= -364/293 ; C1 -135133*x^2 - 218345*y^2 + 166657*z^2
(-26663/93799 : -79218/93799 : 1) C2a (28609184/24294013 : 1458631/24294013 : 1)
** u= -364/363 ; C1 -262813*x^2 - 264265*y^2 + 263537*z^2
(214208/237191 : 102331/237191 : 1) C2a (-41596932/3875591 : 3656461/3875591 : 1)
** u= -364/391 ; C1 -327605*x^2 - 285377*y^2 + 305033*z^2
(-10748/46699 : 46887/46699 : 1) C2a (13870076/14123805 : -938863/14123805 : 1)
** u= -363/163 ; C1 {+/-} -27938*x^2 + 158338*y^2 + 13138*z^2
(24836/61095 : 14173/61095 : 1) C2a (12163907/1412431 : -290829/1412431 : 1) C2b (-2990092/1642001 : -95067/1642001 :
1)
** u= -363/203 ; C1 -43058*x^2 + 172978*y^2 + 56818*z^2
(-11607/11335 : -2944/11335 : 1) C2b (5853476/5234207 : 243009/5234207 : 1)
** u= -363/211 ; C1 -48002*x^2 - 176290*y^2 + 65938*z^2
(-517/2031 : -20612/34527 : 1) C2a (188803/7111 : 10173/7111 : 1)
** u= -363/227 ; C1 -59810*x^2 - 183298*y^2 + 84562*z^2
(3880/4539 : 2143/4539 : 1) C2a (1295813/206761 : -76197/206761 : 1)
** u= -362/179 ; C1 -32057*x^2 + 163085*y^2 + 30593*z^2
(4509/19543 : 106924/254059 : 1) C2b (-4913/33121 : 31705/430573 : 1)
** u= -362/201 ; C1 -42001*x^2 + 171445*y^2 + 54881*z^2
(-49819/44581 : 5308/44581 : 1) C2b (-540689/2537051 : -183771/2537051 : 1)
** u= -362/257 ; C1 -89153*x^2 + 197093*y^2 + 121073*z^2
(36330/53411 : 33991/53411 : 1) C2b (11930413/12043495 : -196199/12043495 : 1)
** u= -362/287 ; C1 -127313*x^2 + 213413*y^2 + 159113*z^2
(-128025/185707 : -126232/185707 : 1) C2b (36671851/93855257 : -5778139/93855257 : 1)
** u= -362/301 ; C1 -148201*x^2 + 221645*y^2 + 177481*z^2
(240329/555929 : 457008/555929 : 1) C2b (538947/4679237 : 312251/4679237 : 1)
** u= -362/345 ; C1 -226609*x^2 + 250069*y^2 + 237761*z^2
(-58621/69685 : -38768/69685 : 1) C2b (-248293/1312435 : 80997/1312435 : 1)
** u= -362/357 ; C1 -251353*x^2 + 258493*y^2 + 254873*z^2
(5431285/5420221 : -532276/5420221 : 1) C2b (-13729/160095 : -9983/160095 : 1)
** u= -362/359 ; C1 -255617*x^2 + 259925*y^2 + 257753*z^2
(-7071/69643 : -68996/69643 : 1) C2b (951065/1790549 : -374101/8952745 : 1)
** u= -361/153 ; C1 -26434*x^2 + 153730*y^2 + 3554*z^2
(-3367/17137 : -2200/17137 : 1) C2b (1283318/2015313 : 148493/2015313 : 1)
** u= -361/289 ; C1 -130610*x^2 - 213842*y^2 + 161858*z^2
(21069/29297 : 19456/29297 : 1) C2a (1749399/571615 : 128483/571615 : 1)
** u= -361/305 ; C1 -155026*x^2 + 223346*y^2 + 182914*z^2
(16928/47325 : -40439/47325 : 1) C2b (3096416/4239861 : -139783/4239861 : 1)
** u= -360/161 ; C1 -27365*x^2 - 155521*y^2 + 12241*z^2
(69661/109023 : 9038/109023 : 1) C2a (-1022746/34461 : -25183/34461 : 1)
** u= -360/173 ; C1 -30125*x^2 - 159529*y^2 + 24889*z^2
(10308/24529 : -8591/24529 : 1) C2a (11297294/887945 : 388131/887945 : 1)
** u= -360/199 ; C1 -41045*x^2 - 169201*y^2 + 53281*z^2
(5733/16969 : 9094/16969 : 1) C2a (5140022/188907 : -254071/188907 : 1)
** u= -360/299 ; C1 -146045*x^2 - 219001*y^2 + 175081*z^2
(200157/182929 : 5954/182929 : 1) C2a (212329304/13122981 : 16724333/13122981 : 1)
** u= -360/311 ; C1 -165365*x^2 - 226321*y^2 + 191041*z^2
(-299799/326813 : 156478/326813 : 1) C2a (4202048/4142745 : -200543/4142745 : 1)
** u= -359/191 ; C1 {+/-} -37010*x^2 + 165362*y^2 + 44738*z^2
(-22989/59863 : -29176/59863 : 1) C2a (2545737/1052645 : -87521/1052645 : 1) C2b (1746182/3756175 : -264167/3756175 :
1)
** u= -359/271 ; C1 {+/-} -106930*x^2 + 202322*y^2 + 139138*z^2
(-9592/22899 : -1039/1347 : 1) C2a (5057357/4127965 : -234409/4127965 : 1) C2b (498/535 : -7/535 : 1)
** u= -359/287 ; C1 -128594*x^2 + 211250*y^2 + 159554*z^2
(72/71 : -8297/23075 : 1) C2b (2152/3587 : 11743/233155 : 1)
** u= -359/295 ; C1 -140386*x^2 - 215906*y^2 + 169954*z^2
(-394157/390579 : -138080/390579 : 1) C2a (6983621/522289 : -545449/522289 : 1)
** u= -358/159 ; C1 -26881*x^2 + 153445*y^2 + 10961*z^2
(13154/29009 : 5459/29009 : 1) C2b (-79943/75587 : 5277/75587 : 1)
** u= -358/161 ; C1 -27217*x^2 + 154085*y^2 + 13033*z^2
(3581/5913 : 832/5913 : 1) C2b (-401711/193713 : 9995/193713 : 1)
** u= -358/195 ; C1 -39049*x^2 + 166189*y^2 + 49481*z^2
(-131/1595 : 868/1595 : 1) C2b (-4618027/3072015 : 36793/3072015 : 1)
** u= -358/217 ; C1 -52865*x^2 + 175253*y^2 + 74297*z^2
(-24270/53959 : -422581/701467 : 1) C2b (5026151/4016485 : 476803/52214305 : 1)
** u= -358/227 ; C1 -60745*x^2 + 179693*y^2 + 85897*z^2
(-27286/32541 : -15953/32541 : 1) C2b (-1055993/1913961 : 17393/273423 : 1)
** u= -358/315 ; C1 -173209*x^2 + 227389*y^2 + 196601*z^2
(-270250/327653 : 192841/327653 : 1) C2b (2141693/3583985 : 3369/76255 : 1)
** u= -358/323 ; C1 -187273*x^2 + 232493*y^2 + 207433*z^2
(-810194/811229 : 241695/811229 : 1) C2b (802241/5622135 : -361223/5622135 : 1)
** u= -358/327 ; C1 -194545*x^2 + 235093*y^2 + 212897*z^2
(5686/12761 : -10987/12761 : 1) C2b (5363471/7007323 : -69333/7007323 : 1)
** u= -358/331 ; C1 -201977*x^2 + 237725*y^2 + 218393*z^2
(18886/31937 : -231/293 : 1) C2b (8713/11417 : -9323/2095835 : 1)
** u= -358/397 ; C1 -347705*x^2 + 285773*y^2 + 313697*z^2
(2222766/2344019 : -141013/2344019 : 1) C2b (-1352849/3513227 : -7169/152749 : 1)
** u= -357/269 ; C1 -105122*x^2 - 199810*y^2 + 136978*z^2
(-38031/69613 : -50608/69613 : 1) C2a (83113/55611 : -4687/55611 : 1)
** u= -356/195 ; C1 -39181*x^2 - 164761*y^2 + 50129*z^2
(25480/33883 : -13961/33883 : 1) C2a (-14753466/4305491 : -644789/4305491 : 1)
** u= -356/203 ; C1 -43709*x^2 - 167945*y^2 + 59009*z^2
(-20413/19693 : -5274/19693 : 1) C2a (948822/547177 : -29423/547177 : 1)
** u= -356/215 ; C1 -51701*x^2 - 172961*y^2 + 72569*z^2
(42504/39635 : 10913/39635 : 1) C2a (-152694/13811 : 318221/507061 : 1)
** u= -356/259 ; C1 -93325*x^2 - 193817*y^2 + 124753*z^2
(-38401/39825 : -3526/7965 : 1) C2a (-251336/91283 : -16601/91283 : 1)
** u= -356/293 ; C1 -138749*x^2 - 212585*y^2 + 167729*z^2
(-14567/78143 : -5262/6011 : 1) C2a (-24425472/2187383 : 1908227/2187383 : 1)
** u= -356/315 ; C1 -174301*x^2 - 225961*y^2 + 196769*z^2
(13109/20357 : -15110/20357 : 1) C2a (-2346174/604925 : -188987/604925 : 1)
** u= -356/321 ; C1 -184837*x^2 - 229777*y^2 + 204857*z^2
(-45196/256345 : -238627/256345 : 1) C2a (1183476/418945 : 94699/418945 : 1)
** u= -356/329 ; C1 -199445*x^2 - 234977*y^2 + 215753*z^2
(243241/261439 : -111978/261439 : 1) C2a (69874/80727 : 2759/80727 : 1)
** u= -356/365 ; C1 -273101*x^2 - 259961*y^2 + 266369*z^2
(37236/87097 : 79475/87097 : 1) C2a (11696052/86837 : -1044407/86837 : 1)
** u= -355/243 ; C1 -76210*x^2 + 185074*y^2 + 105554*z^2
(41411/36131 : 6196/36131 : 1) C2b (-1732/9817 : 687/9817 : 1)
** u= -355/251 ; C1 -84610*x^2 - 189026*y^2 + 115186*z^2
(14132/63467 : -48633/63467 : 1) C2a (31441/30725 : 1/30725 : 1)
** u= -355/259 ; C1 -93650*x^2 - 193106*y^2 + 124946*z^2
(41704/227975 : 36213/45595 : 1) C2a (555213/310523 : 32869/310523 : 1)
** u= -354/175 ; C1 -30641*x^2 + 155941*y^2 + 29209*z^2
(-203138/255009 : 63815/255009 : 1) C2b (2142639/1966219 : -119977/1966219 : 1)
** u= -354/227 ; C1 -61529*x^2 + 176845*y^2 + 86929*z^2
(-2118/7073 : -4799/7073 : 1) C2b (-11379731/10295749 : 227079/10295749 : 1)
** u= -354/283 ; C1 -125033*x^2 + 205405*y^2 + 155137*z^2
(7422/103621 : -89867/103621 : 1) C2b (-1618183/2437759 : 110709/2437759 : 1)
** u= -354/343 ; C1 -227873*x^2 + 242965*y^2 + 235177*z^2
(357661/371607 : 117004/371607 : 1) C2b (-4855677/8401231 : -324901/8401231 : 1)
** u= -353/161 ; C1 {+/-} -26882*x^2 + 150530*y^2 + 14978*z^2
(10307/14629 : -1524/14629 : 1) C2a (-2957/681 : 65/681 : 1) C2b (979304/569953 : -32257/569953 : 1)
** u= -353/169 ; C1 -28786*x^2 + 153170*y^2 + 23266*z^2
(-463/813 : 4168/13821 : 1) C2b (22338/13373 : -10597/227341 : 1)
** u= -353/185 ; C1 -34514*x^2 - 158834*y^2 + 40226*z^2
(-41420/38501 : 1617/38501 : 1) C2a (703265011/312055599 : -21155861/312055599 : 1)
** u= -353/257 ; C1 -91970*x^2 + 190658*y^2 + 122882*z^2
(-18784/20741 : -10347/20741 : 1) C2b (203854/237217 : 8197/237217 : 1)
** u= -352/155 ; C1 -25789*x^2 - 147929*y^2 + 9241*z^2
(1681/20637 : 5110/20637 : 1) C2a (-3865784/509215 : -76417/509215 : 1)
** u= -352/163 ; C1 -27245*x^2 - 150473*y^2 + 17417*z^2
(8208/76907 : 25931/76907 : 1) C2a (2614984/1013175 : -23017/1013175 : 1)
** u= -352/175 ; C1 -30629*x^2 - 154529*y^2 + 29921*z^2
(62912/113791 : 41505/113791 : 1) C2a (47058/23065 : 661/23065 : 1)
** u= -352/191 ; C1 -37381*x^2 - 160385*y^2 + 47041*z^2
(-4807/16437 : 8594/16437 : 1) C2a (8414954/1069979 : 394289/1069979 : 1)
** u= -352/281 ; C1 -123061*x^2 - 202865*y^2 + 152881*z^2
(1564/193229 : -167739/193229 : 1) C2a (-7531606/3061139 : -1375/7829 : 1)
** u= -352/337 ; C1 -217253*x^2 - 237473*y^2 + 226913*z^2
(39541/67519 : -54090/67519 : 1) C2a (5648908/2993301 : -448261/2993301 : 1)
** u= -351/167 ; C1 {+/-} -28178*x^2 + 151090*y^2 + 21922*z^2
(761/7443 : 2816/7443 : 1) C2a (235339/75183 : -5621/75183 : 1) C2b (1150248/732191 : -37955/732191 : 1)
** u= -351/223 ; C1 -58754*x^2 + 172930*y^2 + 83074*z^2
(26143/30903 : -15052/30903 : 1) C2b (37004/109411 : 7539/109411 : 1)
** u= -351/239 ; C1 {+/-} -73250*x^2 + 180322*y^2 + 101698*z^2
(1872/2035 : 191/407 : 1) C2a (561011/72393 : 36809/72393 : 1) C2b (1486262/1403821 : -15801/1403821 : 1)
** u= -351/391 ; C1 {+/-} -338642*x^2 + 276082*y^2 + 304162*z^2
(12232/131847 : 137725/131847 : 1) C2a (-942883/797255 : 73683/797255 : 1) C2b (379534/1594717 : -86829/1594717 : 1)
** u= -350/157 ; C1 -25945*x^2 + 147149*y^2 + 12049*z^2
(-45895/83029 : -13896/83029 : 1) C2b (3326693/3260547 : -226607/3260547 : 1)
** u= -350/201 ; C1 -43105*x^2 + 162901*y^2 + 58601*z^2
(-93778/284287 : -163543/284287 : 1) C2b (-3926377/2977055 : -63309/2977055 : 1)
** u= -350/303 ; C1 -157345*x^2 + 214309*y^2 + 181409*z^2
(66626/115721 : -89869/115721 : 1) C2b (-893569/1101981 : -9659/1101981 : 1)
** u= -350/313 ; C1 -174145*x^2 + 220469*y^2 + 194569*z^2
(8090/27923 : 25227/27923 : 1) C2b (6305423/10135797 : -410713/10135797 : 1)
** u= -350/317 ; C1 -181145*x^2 + 222989*y^2 + 199889*z^2
(-870/6587 : 6187/6587 : 1) C2b (1377913/2943977 : 153763/2943977 : 1)
** u= -350/367 ; C1 -282145*x^2 + 257189*y^2 + 269089*z^2
(-101867/207947 : -184008/207947 : 1) C2b (-768059/3427389 : 196691/3427389 : 1)
** u= -350/373 ; C1 -295945*x^2 + 261629*y^2 + 277729*z^2
(89590/98987 : -36363/98987 : 1) C2b (-2968873/4637073 : 139/8799 : 1)
** u= -350/379 ; C1 -310105*x^2 + 266141*y^2 + 286441*z^2
(18845/21067 : 7992/21067 : 1) C2b (-2892183/16452847 : -946697/16452847 : 1)
** u= -350/381 ; C1 -314905*x^2 + 267661*y^2 + 289361*z^2
(-150182/429667 : 415987/429667 : 1) C2b (969593/2825753 : -142893/2825753 : 1)
** u= -349/189 ; C1 {+/-} -36562*x^2 + 157522*y^2 + 45842*z^2
(99116/97729 : 22345/97729 : 1) C2a (-5729403/187519 : 272311/187519 : 1) C2b (943378/1261045 : 80919/1261045 : 1)
** u= -349/325 ; C1 -196226*x^2 - 227426*y^2 + 210674*z^2
(63093/63049 : -15740/63049 : 1) C2a (7609667/2188977 : -630493/2188977 : 1)
** u= -348/167 ; C1 -28085*x^2 - 148993*y^2 + 23017*z^2
(5444/25839 : 9877/25839 : 1) C2a (-44413874/1096237 : 1537821/1096237 : 1)
** u= -348/205 ; C1 -45869*x^2 - 163129*y^2 + 63601*z^2
(-29115/28267 : -8554/28267 : 1) C2a (42890048/1060967 : 2361237/1060967 : 1)
** u= -348/217 ; C1 -54485*x^2 - 168193*y^2 + 77017*z^2
(2043/1867 : -494/1867 : 1) C2a (-868316/218033 : -49389/218033 : 1)
** u= -348/251 ; C1 -86717*x^2 - 184105*y^2 + 116593*z^2
(237817/269409 : 139018/269409 : 1) C2a (3590216/2791493 : -158697/2791493 : 1)
** u= -348/259 ; C1 -95981*x^2 - 188185*y^2 + 126241*z^2
(39588/103283 : 79729/103283 : 1) C2a (-8626028/8747397 : 133337/8747397 : 1)
** u= -348/287 ; C1 -133445*x^2 - 203473*y^2 + 161017*z^2
(-23469/29093 : -17566/29093 : 1) C2a (4649984/596213 : 362679/596213 : 1)
** u= -348/331 ; C1 -208157*x^2 - 230665*y^2 + 218833*z^2
(7899/70093 : 67858/70093 : 1) C2a (1155592/1543551 : 11669/1543551 : 1)
** u= -348/343 ; C1 -231893*x^2 - 238753*y^2 + 235273*z^2
(66380/71271 : -26941/71271 : 1) C2a (-134174/76397 : -2756259/19634029 : 1)
** u= -347/235 ; C1 -70354*x^2 - 175634*y^2 + 97906*z^2
(26347/23691 : 5900/23691 : 1) C2a (7235647/5660947 : 255053/5660947 : 1)
** u= -347/299 ; C1 -152402*x^2 + 209810*y^2 + 176498*z^2
(-113799/105863 : 4564/105863 : 1) C2b (99268/120841 : -41/17263 : 1)
** u= -347/315 ; C1 -179314*x^2 - 219634*y^2 + 197426*z^2
(78200/100771 : 64307/100771 : 1) C2a (-1100473/885383 : 71703/885383 : 1)
** u= -347/395 ; C1 -352274*x^2 - 276434*y^2 + 309746*z^2
(138035/148139 : 17568/148139 : 1) C2a (11110937/1471737 : 1034033/1471737 : 1)
** u= -346/147 ; C1 -24313*x^2 + 141325*y^2 + 3617*z^2
(-33526/88033 : -2231/88033 : 1) C2b (579515/152577 : 39113/762885 : 1)
** u= -346/151 ; C1 -24737*x^2 + 142517*y^2 + 7577*z^2
(16726/58625 : 11583/58625 : 1) C2b (7097759/2144773 : -66721/2144773 : 1)
** u= -346/175 ; C1 -30641*x^2 + 150341*y^2 + 32009*z^2
(98250/127273 : 38489/127273 : 1) C2b (-4459313/2716625 : 84853/2716625 : 1)
** u= -346/189 ; C1 -36745*x^2 + 155437*y^2 + 46793*z^2
(4345/5921 : -2468/5921 : 1) C2b (-1261829/833373 : 2003/833373 : 1)
** u= -346/199 ; C1 -42305*x^2 + 159317*y^2 + 57593*z^2
(-8661/7999 : -1792/7999 : 1) C2b (-1368463/2051639 : -130861/2051639 : 1)
** u= -346/235 ; C1 -70601*x^2 + 174941*y^2 + 98129*z^2
(953/1939 : -1320/1939 : 1) C2b (124919/128179 : 3857/128179 : 1)
** u= -346/287 ; C1 -134353*x^2 + 202085*y^2 + 161257*z^2
(146687/134611 : -12408/134611 : 1) C2b (132567/157121 : 37/3343 : 1)
** u= -346/305 ; C1 -162721*x^2 + 212741*y^2 + 184369*z^2
(1536755/1775981 : 962868/1775981 : 1) C2b (-8071651/11230221 : 330187/11230221 : 1)
** u= -346/323 ; C1 -194329*x^2 + 224045*y^2 + 208129*z^2
(660971/696311 : 267336/696311 : 1) C2b (1233117/3178657 : -175867/3178657 : 1)
** u= -346/325 ; C1 -198041*x^2 + 225341*y^2 + 210809*z^2
(-678978/1608779 : -1419895/1608779 : 1) C2b (2477963/4920805 : -234997/4920805 : 1)
** u= -346/375 ; C1 -303841*x^2 + 260341*y^2 + 280409*z^2
(706465/1479643 : 1332524/1479643 : 1) C2b (-3901/8249 : -87189/2119993 : 1)
** u= -345/233 ; C1 -68930*x^2 - 173314*y^2 + 96034*z^2
(-33804/28753 : 1903/28753 : 1) C2a (-2269099/1533159 : 101497/1533159 : 1)
** u= -345/257 ; C1 {+/-} -94610*x^2 + 185074*y^2 + 124354*z^2
(-89967/227077 : -174668/227077 : 1) C2a (-1839007/1007057 : 113019/1007057 : 1) C2b (535178/824837 : -42387/824837 :
1)
** u= -345/289 ; C1 {+/-} -137810*x^2 + 202546*y^2 + 163906*z^2
(19920/29441 : 20771/29441 : 1) C2a (39338327/3152973 : -3114569/3152973 : 1) C2b (-1143924/1363315 : -12127/1363315
: 1)
** u= -345/337 ; C1 -221810*x^2 - 232594*y^2 + 227074*z^2
(324/581 : -479/581 : 1) C2a (-5468717/7372735 : -103947/7372735 : 1)
** u= -345/353 ; C1 -254930*x^2 + 243634*y^2 + 249154*z^2
(32088/34201 : 10901/34201 : 1) C2b (-10058886/14555375 : 1033/14555375 : 1)
** u= -344/169 ; C1 -28597*x^2 - 146897*y^2 + 26497*z^2
(-7159/23059 : 9270/23059 : 1) C2a (16291396/1756577 : 596423/1756577 : 1)
** u= -344/187 ; C1 -35869*x^2 - 153305*y^2 + 45289*z^2
(7448/45723 : 24589/45723 : 1) C2a (-29719718/2617637 : -1411991/2617637 : 1)
** u= -344/195 ; C1 -40141*x^2 - 156361*y^2 + 53849*z^2
(-10940/11687 : 4039/11687 : 1) C2a (10467644/1887445 : 524067/1887445 : 1)
** u= -344/365 ; C1 -282221*x^2 - 251561*y^2 + 266009*z^2
(130044/159797 : -89605/159797 : 1) C2a (-10488492/14329627 : -393667/14329627 : 1)
** u= -344/379 ; C1 -315037*x^2 - 261977*y^2 + 286057*z^2
(-6728/294395 : 307539/294395 : 1) C2a (30463516/8860967 : -2758847/8860967 : 1)
** u= -343/167 ; C1 {+/-} -27970*x^2 + 145538*y^2 + 24802*z^2
(12848/55643 : 22269/55643 : 1) C2a (-1717369/626627 : -42029/626627 : 1) C2b (-825432/2262949 : 164531/2262949 : 1)
** u= -343/207 ; C1 {+/-} -47890*x^2 + 160498*y^2 + 67202*z^2
(-13399/13843 : 5164/13843 : 1) C2a (-4171143/3097511 : -79133/3097511 : 1) C2b (10108/159195 : 11527/159195 : 1)
** u= -341/181 ; C1 -33202*x^2 - 149042*y^2 + 39922*z^2
(-4264/4181 : -795/4181 : 1) C2a (5197511/458533 : 234893/458533 : 1)
** u= -341/373 ; C1 {+/-} -303154*x^2 + 255410*y^2 + 277234*z^2
(-15829/53741 : 53268/53741 : 1) C2a (-163753/253367 : 263/253367 : 1) C2b (4417994/6920019 : 63551/6920019 : 1)
** u= -340/169 ; C1 -28565*x^2 - 144161*y^2 + 27881*z^2
(-95151/193751 : -73934/193751 : 1) C2a (-4184282/600285 : -22309/85755 : 1)
** u= -340/227 ; C1 -64525*x^2 - 167129*y^2 + 90289*z^2
(7247/21425 : 3018/4285 : 1) C2a (-6021242/2654125 : -341467/2654125 : 1)
** u= -340/247 ; C1 -84725*x^2 - 176609*y^2 + 113369*z^2
(-34844/39575 : 4113/7915 : 1) C2a (52571628/8150137 : -3671611/8150137 : 1)
** u= -340/297 ; C1 -152725*x^2 - 203809*y^2 + 174569*z^2
(536572/970465 : -153745/194093 : 1) C2a (-2746806/523265 : -221569/523265 : 1)
** u= -340/339 ; C1 -229165*x^2 - 230521*y^2 + 229841*z^2
(-312392/312527 : -19243/312527 : 1) C2a (-5724568/356255 : 503763/356255 : 1)
** u= -340/347 ; C1 -245725*x^2 - 236009*y^2 + 240769*z^2
(-813403/826565 : -18030/165313 : 1) C2a (-7999292/1784515 : 704183/1784515 : 1)
** u= -339/307 ; C1 -169874*x^2 + 209170*y^2 + 187474*z^2
(-11424/11959 : 4711/11959 : 1) C2b (-8600266/11460211 : -29673/1637173 : 1)
** u= -338/147 ; C1 -23545*x^2 + 135853*y^2 + 6737*z^2
(-23915/55343 : 7264/55343 : 1) C2b (-2042311/1141635 : 74551/1141635 : 1)
** u= -338/153 ; C1 -24433*x^2 + 137653*y^2 + 12593*z^2
(-100009/139985 : -4172/139985 : 1) C2b (7471/170905 : 1809/24415 : 1)
** u= -338/217 ; C1 -56305*x^2 + 161333*y^2 + 79537*z^2
(-170675/269141 : 159828/269141 : 1) C2b (3208953/2777069 : -16411/2777069 : 1)
** u= -338/297 ; C1 -153745*x^2 + 202453*y^2 + 174737*z^2
(82078/142891 : 111833/142891 : 1) C2b (-881651/2334993 : 136183/2334993 : 1)
** u= -338/339 ; C1 -230521*x^2 + 229165*y^2 + 229841*z^2
(-16093/16447 : -3284/16447 : 1) C2b (31399/96711 : 5347/96711 : 1)
** u= -338/349 ; C1 -251401*x^2 + 236045*y^2 + 243481*z^2
(-9373/18517 : 16128/18517 : 1) C2b (-291971/10223661 : 89533/1460523 : 1)
** u= -338/359 ; C1 -273281*x^2 + 243125*y^2 + 257321*z^2
(-15090/20677 : 350491/516925 : 1) C2b (138625/544229 : 759407/13605725 : 1)
** u= -337/169 ; C1 -28562*x^2 - 142130*y^2 + 28898*z^2
(-66024/91297 : -28613/91297 : 1) C2a (-852193/458139 : -2471/458139 : 1)
** u= -337/193 ; C1 -39650*x^2 - 150818*y^2 + 53762*z^2
(-173541/198365 : 15632/39673 : 1) C2a (-37683941/17420913 : 1524241/17420913 : 1)
** u= -336/157 ; C1 -25133*x^2 - 137545*y^2 + 17257*z^2
(-527/23379 : 8278/23379 : 1) C2a (171544/30973 : 4845/30973 : 1)
** u= -336/163 ; C1 -26669*x^2 - 139465*y^2 + 23209*z^2
(90699/119009 : 27998/119009 : 1) C2a (-2581736/998609 : 56415/998609 : 1)
** u= -336/205 ; C1 -47501*x^2 - 154921*y^2 + 66889*z^2
(12085/30063 : 18586/30063 : 1) C2a (165523846/2860609 : 9592461/2860609 : 1)
** u= -336/209 ; C1 -50405*x^2 - 156577*y^2 + 71233*z^2
(-177816/165397 : 47611/165397 : 1) C2a (-2085321302/2671269 : 124078783/2671269 : 1)
** u= -336/305 ; C1 -168101*x^2 - 205921*y^2 + 185089*z^2
(-92164/104733 : -54085/104733 : 1) C2a (3535202/4013907 : -137737/4013907 : 1)
** u= -336/323 ; C1 -200429*x^2 - 217225*y^2 + 208489*z^2
(-34383/40205 : -107314/201025 : 1) C2a (5884454/2012001 : -492211/2012001 : 1)
** u= -336/331 ; C1 -215837*x^2 - 222457*y^2 + 219097*z^2
(59468/149427 : 136235/149427 : 1) C2a (11053942/7793019 : -834689/7793019 : 1)
** u= -336/361 ; C1 -279317*x^2 - 243217*y^2 + 260017*z^2
(28280/71181 : 67069/71181 : 1) C2a (2267632/886861 : 199869/886861 : 1)
** u= -335/143 ; C1 -22850*x^2 - 132674*y^2 + 4034*z^2
(16887/152215 : 5120/30443 : 1) C2a (-2441751/208841 : -34217/208841 : 1)
** u= -335/191 ; C1 -38690*x^2 + 148706*y^2 + 52226*z^2
(-95859/120931 : 52396/120931 : 1) C2b (-640966/1034855 : 67717/1034855 : 1)
** u= -335/223 ; C1 {+/-} -62050*x^2 + 161954*y^2 + 86914*z^2
(-26972/23295 : -707/4659 : 1) C2a (-13471649/3775691 : 827867/3775691 : 1) C2b (-598386/4318519 : -305701/4318519 :
1)
** u= -335/279 ; C1 -127570*x^2 - 190066*y^2 + 152546*z^2
(-7360/7331 : 75491/212599 : 1) C2a (10435581/6601391 : -20149073/191440339 : 1)
** u= -334/165 ; C1 -27241*x^2 + 138781*y^2 + 25889*z^2
(-100490/119719 : 26297/119719 : 1) C2b (1287583/672233 : 7629/672233 : 1)
** u= -334/173 ; C1 -30073*x^2 + 141485*y^2 + 33937*z^2
(108094/139683 : 46867/139683 : 1) C2b (-10033449/5901937 : -31397/5901937 : 1)
** u= -334/201 ; C1 -45025*x^2 + 151957*y^2 + 63113*z^2
(-11998/11719 : -3793/11719 : 1) C2b (-51403/114731 : -7791/114731 : 1)
** u= -334/233 ; C1 -71713*x^2 + 165845*y^2 + 98377*z^2
(287509/1073393 : -804804/1073393 : 1) C2b (1207947/2428921 : -150781/2428921 : 1)
** u= -334/235 ; C1 -73721*x^2 + 166781*y^2 + 100649*z^2
(158718/147061 : -43775/147061 : 1) C2b (9695363/11854295 : -507817/11854295 : 1)
** u= -334/277 ; C1 -125129*x^2 + 188285*y^2 + 150209*z^2
(-25614/191171 : 169469/191171 : 1) C2b (11681929/14884099 : 399175/14884099 : 1)
** u= -334/313 ; C1 -183233*x^2 + 209525*y^2 + 195497*z^2
(281/829 : -64296/70465 : 1) C2b (-1697/2677 : -467/13385 : 1)
** u= -334/341 ; C1 -237385*x^2 + 227837*y^2 + 232513*z^2
(1921147/1944689 : -118128/1944689 : 1) C2b (890903/6105819 : 368401/6105819 : 1)
** u= -334/345 ; C1 -245761*x^2 + 230581*y^2 + 237929*z^2
(-118694/120643 : -1675/120643 : 1) C2b (-1901033/2898327 : -50891/2898327 : 1)
** u= -334/357 ; C1 -271849*x^2 + 239005*y^2 + 254369*z^2
(-657782/726743 : 264521/726743 : 1) C2b (-39583/523407 : 31301/523407 : 1)
** u= -334/369 ; C1 -299377*x^2 + 247717*y^2 + 271097*z^2
(-4737865/7351901 : 5658904/7351901 : 1) C2b (-453563/2646399 : -150523/2646399 : 1)
** u= -333/157 ; C1 {+/-} -25010*x^2 + 135538*y^2 + 18322*z^2
(-397/477 : 532/6201 : 1) C2a (-98983/28885 : 31137/375505 : 1) C2b (-8456/4147 : -1791/53911 : 1)
** u= -333/269 ; C1 -114386*x^2 - 183250*y^2 + 140626*z^2
(27087/24497 : -1592/24497 : 1) C2a (732553/799613 : 78969/3998065 : 1)
** u= -333/317 ; C1 -191090*x^2 - 211378*y^2 + 200722*z^2
(-368/3333 : -3229/3333 : 1) C2a (3397271/3261117 : 204749/3261117 : 1)
** u= -332/145 ; C1 -22789*x^2 - 131249*y^2 + 7081*z^2
(-32365/59843 : 3366/59843 : 1) C2a (753862/187295 : -6761/187295 : 1)
** u= -332/197 ; C1 -42653*x^2 - 149033*y^2 + 59393*z^2
(550760/862349 : -457761/862349 : 1) C2a (-5956776/4092065 : 147091/4092065 : 1)
** u= -332/213 ; C1 -54205*x^2 - 155593*y^2 + 76577*z^2
(-196/44669 : 31337/44669 : 1) C2a (4334694/3492995 : 94987/3492995 : 1)
** u= -332/357 ; C1 -273373*x^2 - 237673*y^2 + 254273*z^2
(523156/679085 : 422567/679085 : 1) C2a (-21787928/4669045 : 1968207/4669045 : 1)
** u= -332/381 ; C1 -330061*x^2 - 255385*y^2 + 287921*z^2
(498919/547319 : -126554/547319 : 1) C2a (23155716/7875391 : -2120899/7875391 : 1)
** u= -331/259 ; C1 {+/-} -102050*x^2 + 176642*y^2 + 128978*z^2
(3576/3439 : 1117/3439 : 1) C2a (-22283301/5269753 : 1640309/5269753 : 1) C2b (1183982/1925395 : 97493/1925395 : 1)
** u= -331/371 ; C1 {+/-} -306562*x^2 + 247202*y^2 + 273682*z^2
(54505/179451 : -178796/179451 : 1) C2a (-2605669091/224505797 : -241503407/224505797 : 1) C2b (2003784/3942395 :
136463/3942395 : 1)
** u= -330/167 ; C1 -27905*x^2 + 136789*y^2 + 29209*z^2
(354395/365919 : -54496/365919 : 1) C2b (-497973/975797 : 69047/975797 : 1)
** u= -330/299 ; C1 -161225*x^2 + 198301*y^2 + 177841*z^2
(113355/116911 : -42556/116911 : 1) C2b (-6443/9953 : -363/9953 : 1)
** u= -330/301 ; C1 -164585*x^2 + 199501*y^2 + 180361*z^2
(-449790/461051 : -158969/461051 : 1) C2b (-5277669/8453821 : -326269/8453821 : 1)
** u= -330/337 ; C1 -231905*x^2 + 222469*y^2 + 227089*z^2
(-11277/20309 : -16984/20309 : 1) C2b (-40627313/77118203 : -3088437/77118203 : 1)
** u= -330/379 ; C1 -326825*x^2 + 252541*y^2 + 284881*z^2
(-54039/83635 : -12824/16727 : 1) C2b (-2840393/8948137 : -441483/8948137 : 1)
** u= -329/185 ; C1 {+/-} -35906*x^2 + 142466*y^2 + 47714*z^2
(-23080/168781 : -96987/168781 : 1) C2a (-357943/140697 : -15103/140697 : 1) C2b (-2368772/1725935 : 36073/1725935 :
1)
** u= -329/393 ; C1 -363298*x^2 - 262690*y^2 + 304802*z^2
(22621/24733 : -1448/24733 : 1) C2a (-292791/426877 : 14171/426877 : 1)
** u= -328/165 ; C1 -27229*x^2 - 134809*y^2 + 27881*z^2
(35140/34733 : 301/34733 : 1) C2a (-27389008/420973 : 156909/60139 : 1)
** u= -328/211 ; C1 -53357*x^2 - 152105*y^2 + 75353*z^2
(61392/80899 : 43819/80899 : 1) C2a (-23771508/9590419 : 1305563/9590419 : 1)
** u= -328/241 ; C1 -81797*x^2 - 165665*y^2 + 108593*z^2
(-517204/634097 : -362607/634097 : 1) C2a (871380828/159831691 : 1975069/5155861 : 1)
** u= -328/255 ; C1 -98149*x^2 - 172609*y^2 + 124721*z^2
(1220848/1494655 : 875609/1494655 : 1) C2a (-67321826/22494881 : -4805349/22494881 : 1)
** u= -328/257 ; C1 -100645*x^2 - 173633*y^2 + 127057*z^2
(154672/143397 : 34349/143397 : 1) C2a (10669292/3103961 : -110921/443423 : 1)
** u= -328/293 ; C1 -152413*x^2 - 193433*y^2 + 170473*z^2
(147893/279415 : 227094/279415 : 1) C2a (-9418318/9285551 : -487141/9285551 : 1)
** u= -328/349 ; C1 -258701*x^2 - 229385*y^2 + 243161*z^2
(8421/33671 : 33494/33671 : 1) C2a (-57845322/1072703 : -5253493/1072703 : 1)
** u= -328/361 ; C1 -285557*x^2 - 237905*y^2 + 259553*z^2
(-88543/109211 : 60018/109211 : 1) C2a (753686/556437 : 8735/79491 : 1)
** u= -328/367 ; C1 -299525*x^2 - 242273*y^2 + 267857*z^2
(-20285/99857 : 102546/99857 : 1) C2a (220488/111899 : 19373/111899 : 1)
** u= -328/371 ; C1 -309037*x^2 - 245225*y^2 + 273433*z^2
(3421/18593 : -19254/18593 : 1) C2a (34247938/87971 : -3190255/87971 : 1)
** u= -328/377 ; C1 -323605*x^2 - 249713*y^2 + 281857*z^2
(396292/528181 : -333717/528181 : 1) C2a (5807858/6144625 : -413659/6144625 : 1)
** u= -328/391 ; C1 -358997*x^2 - 260465*y^2 + 301793*z^2
(51943/90221 : 75582/90221 : 1) C2a (16412684/6290583 : -1517921/6290583 : 1)
** u= -326/141 ; C1 -21817*x^2 + 126157*y^2 + 5537*z^2
(38885/82177 : 5908/82177 : 1) C2b (-539501/613053 : 6337/87579 : 1)
** u= -326/167 ; C1 -27953*x^2 + 134165*y^2 + 30497*z^2
(-28967/31871 : -7488/31871 : 1) C2b (908309/528983 : 7769/528983 : 1)
** u= -326/181 ; C1 -34057*x^2 + 139037*y^2 + 44497*z^2
(-44837/83025 : -41396/83025 : 1) C2b (-933/4651 : -86689/1195307 : 1)
** u= -326/199 ; C1 -44785*x^2 + 145877*y^2 + 63073*z^2
(32587/1229787 : -62188/94599 : 1) C2b (4755823/3814485 : -11387/3814485 : 1)
** u= -326/209 ; C1 -52145*x^2 + 149957*y^2 + 73673*z^2
(-14139/65737 : 45316/65737 : 1) C2b (963551/1903633 : 123083/1903633 : 1)
** u= -326/227 ; C1 -67913*x^2 + 157805*y^2 + 93257*z^2
(-2959/19087 : 14544/19087 : 1) C2b (-111781/264533 : -17099/264533 : 1)
** u= -326/255 ; C1 -98881*x^2 + 171301*y^2 + 125009*z^2
(526922/966409 : 722005/966409 : 1) C2b (1746367/3565865 : -206433/3565865 : 1)
** u= -326/265 ; C1 -111841*x^2 + 176501*y^2 + 136729*z^2
(-102041/92757 : 8200/92757 : 1) C2b (6491697/8071373 : 214169/8071373 : 1)
** u= -326/305 ; C1 -173681*x^2 + 199301*y^2 + 185609*z^2
(-407886/425395 : -153443/425395 : 1) C2b (-2462387/6904943 : -391789/6904943 : 1)
** u= -326/333 ; C1 -226489*x^2 + 217165*y^2 + 221729*z^2
(-142/2983 : -39139/38779 : 1) C2b (-1007/2443 : -404619/8162063 : 1)
** u= -326/349 ; C1 -260185*x^2 + 228077*y^2 + 243073*z^2
(-906179/1115801 : 624588/1115801 : 1) C2b (3535399/5378775 : -31381/5378775 : 1)
** u= -325/213 ; C1 {+/-} -55570*x^2 + 150994*y^2 + 78194*z^2
(-88657/136793 : 82448/136793 : 1) C2a (-33461337/7831937 : 2048951/7831937 : 1) C2b (1057972/1284417 : 62743/1284417
: 1)
** u= -325/253 ; C1 -96770*x^2 + 169634*y^2 + 122834*z^2
(283692/273749 : -91391/273749 : 1) C2b (87422/104317 : -2893/104317 : 1)
** u= -325/277 ; C1 {+/-} -129170*x^2 + 182354*y^2 + 151154*z^2
(25959/24577 : 4832/24577 : 1) C2a (-98351/13569 : 7847/13569 : 1) C2b (89752/851287 : 56383/851287 : 1)
** u= -325/301 ; C1 {+/-} -167330*x^2 + 196226*y^2 + 180626*z^2
(-33781/33281 : -6816/33281 : 1) C2a (269097/352207 : -709/352207 : 1) C2b (1573688/2234473 : -55837/2234473 : 1)
** u= -324/155 ; C1 -24221*x^2 - 129001*y^2 + 19489*z^2
(-130919/146073 : 2330/146073 : 1) C2a (879112/383927 : 10107/383927 : 1)
** u= -324/221 ; C1 -62765*x^2 - 153817*y^2 + 87073*z^2
(41279/76311 : -51002/76311 : 1) C2a (3945118/3684121 : -1569/526303 : 1)
** u= -324/259 ; C1 -104717*x^2 - 172057*y^2 + 129937*z^2
(27295/24513 : -598/24513 : 1) C2a (-22939382/10556931 : -1604389/10556931 : 1)
** u= -323/307 ; C1 -178930*x^2 - 198578*y^2 + 188242*z^2
(-21277/22131 : -7508/22131 : 1) C2a (-9067019/10832563 : 356779/10832563 : 1)
** u= -323/371 ; C1 {+/-} -313202*x^2 + 241970*y^2 + 272978*z^2
(-62592/140671 : 131351/140671 : 1) C2a (6971889/988963 : -650765/988963 : 1) C2b (-605036/984497 : 1543/984497 : 1)
** u= -322/155 ; C1 -24169*x^2 + 127709*y^2 + 20161*z^2
(50603/166575 : -62416/166575 : 1) C2b (14693001/7246831 : 148187/7246831 : 1)
** u= -322/159 ; C1 -25297*x^2 + 128965*y^2 + 23993*z^2
(176542/242249 : -69313/242249 : 1) C2b (-12808739/7111307 : 195777/7111307 : 1)
** u= -322/257 ; C1 -102913*x^2 + 169733*y^2 + 127873*z^2
(172190/213283 : 127647/213283 : 1) C2b (2264899/2646615 : 50447/2646615 : 1)
** u= -322/261 ; C1 -108121*x^2 + 171805*y^2 + 132521*z^2
(25426/35791 : -24109/35791 : 1) C2b (52163/523103 : -35295/523103 : 1)
** u= -322/293 ; C1 -155545*x^2 + 189533*y^2 + 170857*z^2
(-3506/4799 : -3267/4799 : 1) C2b (-631551/11244613 : 730277/11244613 : 1)
** u= -322/331 ; C1 -225161*x^2 + 213245*y^2 + 219041*z^2
(-28306/96769 : -93663/96769 : 1) C2b (-1158397/3283013 : -173321/3283013 : 1)
** u= -322/389 ; C1 -359257*x^2 + 255005*y^2 + 298153*z^2
(-101354/521567 : -550989/521567 : 1) C2b (-58547/123099 : -3965/123099 : 1)
** u= -321/145 ; C1 {+/-} -21986*x^2 + 124066*y^2 + 11074*z^2
(-203/549 : -140/549 : 1) C2a (-1519169/527415 : 1241/75345 : 1) C2b (5154/22085 : 233/3155 : 1)
** u= -321/193 ; C1 {+/-} -41474*x^2 + 140290*y^2 + 58114*z^2
(3633/20633 : 13132/20633 : 1) C2a (235931/171719 : -4929/171719 : 1) C2b (2681208/2359763 : 11179/337109 : 1)
** u= -321/209 ; C1 {+/-} -53090*x^2 + 146722*y^2 + 74818*z^2
(624/14057 : 10031/14057 : 1) C2a (-1446109/981693 : -57899/981693 : 1) C2b (795768/830525 : 32053/830525 : 1)
** u= -320/317 ; C1 -199085*x^2 - 202889*y^2 + 200969*z^2
(195213/352583 : -292822/352583 : 1) C2a (505338642/16332977 : 44355821/16332977 : 1)
** u= -320/399 ; C1 -387685*x^2 - 261601*y^2 + 312161*z^2
(58217/84197 : 58622/84197 : 1) C2a (-62940504/13254575 : -6022319/13254575 : 1)
** u= -319/263 ; C1 {+/-} -112018*x^2 + 170930*y^2 + 135202*z^2
(68624/71243 : -30471/71243 : 1) C2a (1760297/906379 : -123799/906379 : 1) C2b (223826/1826007 : 122071/1826007 : 1)
** u= -318/143 ; C1 -21473*x^2 + 121573*y^2 + 10273*z^2
(-20213/48963 : -11420/48963 : 1) C2b (-329899/320057 : -22161/320057 : 1)
** u= -318/221 ; C1 -64217*x^2 + 149965*y^2 + 88273*z^2
(-53642/87591 : 57305/87591 : 1) C2b (-3770067/3672551 : -48757/3672551 : 1)
** u= -318/245 ; C1 -89609*x^2 + 161149*y^2 + 114721*z^2
(49159/94893 : 71180/94893 : 1) C2b (30278607/70242623 : -4287301/70242623 : 1)
** u= -318/275 ; C1 -129449*x^2 + 176749*y^2 + 149401*z^2
(-32270/65853 : -53879/65853 : 1) C2b (-30671/58709 : -429/8387 : 1)
** u= -318/329 ; C1 -223841*x^2 + 209365*y^2 + 216361*z^2
(66746/124659 : 106283/124659 : 1) C2b (-388247/811693 : -1545/35291 : 1)
** u= -318/337 ; C1 -240305*x^2 + 214693*y^2 + 226777*z^2
(434966/728487 : 590591/728487 : 1) C2b (1359843/2199389 : 49991/2199389 : 1)
** u= -318/347 ; C1 -261785*x^2 + 221533*y^2 + 239977*z^2
(-80198/85869 : -19673/85869 : 1) C2b (-26667/42461 : -619/42461 : 1)
** u= -317/253 ; C1 {+/-} -99730*x^2 + 164498*y^2 + 123922*z^2
(141937/138297 : -46844/138297 : 1) C2a (-67061057/5154991 : 5122607/5154991 : 1) C2b (4500552/5248009 :
97559/5248009 : 1)
** u= -317/261 ; C1 -110146*x^2 + 168610*y^2 + 133106*z^2
(-469523/461417 : -155120/461417 : 1) C2b (-1255792/1791173 : -70425/1791173 : 1)
** u= -316/145 ; C1 -21701*x^2 - 120881*y^2 + 12809*z^2
(44508/66661 : -10735/66661 : 1) C2a (-1454278644/57494441 : -41543621/57494441 : 1)
** u= -316/153 ; C1 -23509*x^2 - 123265*y^2 + 20249*z^2
(2504/3229 : 719/3229 : 1) C2a (-2329456/23069 : 83271/23069 : 1)
** u= -316/207 ; C1 -52453*x^2 - 142705*y^2 + 73817*z^2
(-51832/47851 : 14033/47851 : 1) C2a (1572944/899273 : -76275/899273 : 1)
** u= -316/267 ; C1 -118813*x^2 - 171145*y^2 + 140177*z^2
(140828/137131 : -40423/137131 : 1) C2a (4306204/4792447 : 123141/4792447 : 1)
** u= -316/277 ; C1 -133373*x^2 - 176585*y^2 + 151937*z^2
(97479/164263 : 126646/164263 : 1) C2a (-29078356/1908873 : -2376085/1908873 : 1)
** u= -316/347 ; C1 -263293*x^2 - 220265*y^2 + 239857*z^2
(-213077/224701 : -26658/224701 : 1) C2a (-19990018/4477909 : -1820971/4477909 : 1)
** u= -316/357 ; C1 -285853*x^2 - 227305*y^2 + 253217*z^2
(-10642733/11308019 : -965866/147004247 : 1) C2a (817236/21703 : 989057/282139 : 1)
** u= -316/363 ; C1 -299869*x^2 - 231625*y^2 + 261329*z^2
(-19988/26047 : 15755/26047 : 1) C2a (-609732/627743 : 221177/3138715 : 1)
** u= -316/371 ; C1 -319117*x^2 - 237497*y^2 + 272257*z^2
(143197/170325 : 75526/170325 : 1) C2a (-35190482/503959 : -3323671/503959 : 1)
** u= -315/163 ; C1 {+/-} -26690*x^2 + 125794*y^2 + 30034*z^2
(-7680/8659 : -2321/8659 : 1) C2a (-530109103/39265143 : 22666501/39265143 : 1) C2b (-1062054/768805 : -33317/768805
: 1)
** u= -315/251 ; C1 {+/-} -97970*x^2 + 162226*y^2 + 121906*z^2
(16149/14659 : 1996/14659 : 1) C2a (10478171/3680641 : -760857/3680641 : 1) C2b (-3216018/4806637 : -217297/4806637 :
1)
** u= -314/169 ; C1 -29137*x^2 + 127157*y^2 + 36097*z^2
(-9011/22365 : 11108/22365 : 1) C2b (-55617/36551 : 607/36551 : 1)
** u= -314/189 ; C1 -39817*x^2 + 134317*y^2 + 55817*z^2
(49607/48793 : -16120/48793 : 1) C2b (-23237/29331 : 1667/29331 : 1)
** u= -314/205 ; C1 -51241*x^2 + 140621*y^2 + 72169*z^2
(-50086/52863 : 22805/52863 : 1) C2b (-4140847/5425665 : 287167/5425665 : 1)
** u= -314/223 ; C1 -67153*x^2 + 148325*y^2 + 91177*z^2
(-1271/5707 : -4392/5707 : 1) C2b (14499/124417 : 8701/124417 : 1)
** u= -314/275 ; C1 -131321*x^2 + 174221*y^2 + 149729*z^2
(57550/87353 : 63729/87353 : 1) C2b (-86147/176575 : -9307/176575 : 1)
** u= -314/345 ; C1 -260401*x^2 + 217621*y^2 + 237089*z^2
(308590/338443 : 104129/338443 : 1) C2b (-10018151/15606315 : 60299/15606315 : 1)
** u= -314/399 ; C1 -393457*x^2 + 257797*y^2 + 311177*z^2
(-716518/1026505 : -698809/1026505 : 1) C2b (-199403/966741 : 48023/966741 : 1)
** u= -313/201 ; C1 -48322*x^2 + 138370*y^2 + 68258*z^2
(202292/281669 : -157627/281669 : 1) C2b (-15476/13383 : 65/13383 : 1)
** u= -313/265 ; C1 -117314*x^2 - 168194*y^2 + 138146*z^2
(-23280/38381 : 28843/38381 : 1) C2a (46749/52579 : 1259/52579 : 1)
** u= -312/289 ; C1 -154277*x^2 - 180865*y^2 + 166513*z^2
(244137/455459 : -374354/455459 : 1) C2a (2271856/1940507 : 145773/1940507 : 1)
** u= -312/311 ; C1 -192821*x^2 - 194065*y^2 + 193441*z^2
(157944/169579 : 62275/169579 : 1) C2a (-380878508/60473527 : -33332145/60473527 : 1)
** u= -312/341 ; C1 -253181*x^2 - 213625*y^2 + 231721*z^2
(-27279/32251 : 15694/32251 : 1) C2a (1631428/381787 : 105831/272705 : 1)
** u= -312/343 ; C1 -257525*x^2 - 214993*y^2 + 234337*z^2
(-61917/78305 : 9146/15661 : 1) C2a (269265776/16121737 : 24780831/16121737 : 1)
** u= -311/159 ; C1 -25330*x^2 - 122002*y^2 + 27458*z^2
(-5024/10927 : 4651/10927 : 1) C2a (-7659/1567 : 299/1567 : 1)
** u= -311/343 ; C1 -258274*x^2 - 214370*y^2 + 234274*z^2
(1828/1983 : -521/1983 : 1) C2a (-4167611/2789291 : -347195/2789291 : 1)
** u= -311/367 ; C1 {+/-} -313618*x^2 + 231410*y^2 + 266242*z^2
(7905629/8582103 : 192608/8582103 : 1) C2a (-4536859/7395623 : -96283/7395623 : 1) C2b (448284/1116283 :
-46777/1116283 : 1)
** u= -310/149 ; C1 -22345*x^2 + 118301*y^2 + 18481*z^2
(-21938/27903 : 5543/27903 : 1) C2b (-94833/523175 : 38549/523175 : 1)
** u= -310/157 ; C1 -24665*x^2 + 120749*y^2 + 25889*z^2
(-53742/59147 : -12653/59147 : 1) C2b (-26353/129677 : 9503/129677 : 1)
** u= -310/231 ; C1 -76465*x^2 + 149461*y^2 + 100481*z^2
(-22651/28451 : 16784/28451 : 1) C2b (-383087/1905333 : -129643/1905333 : 1)
** u= -310/247 ; C1 -94865*x^2 + 157109*y^2 + 118049*z^2
(-92687/196439 : -154296/196439 : 1) C2b (5443513/6791195 : -204299/6791195 : 1)
** u= -310/259 ; C1 -110345*x^2 + 163181*y^2 + 131561*z^2
(-101898/96493 : 22033/96493 : 1) C2b (-4339267/5157415 : 46001/5157415 : 1)
** u= -310/287 ; C1 -152065*x^2 + 178469*y^2 + 164209*z^2
(12035/239067 : -229048/239067 : 1) C2b (118319/264129 : -13831/264129 : 1)
** u= -310/311 ; C1 -194065*x^2 + 192821*y^2 + 193441*z^2
(562651/1358051 : -1237584/1358051 : 1) C2b (-2216049/3344735 : -71063/3344735 : 1)
** u= -310/323 ; C1 -217225*x^2 + 200429*y^2 + 208489*z^2
(-36391/37455 : 980/7491 : 1) C2b (-310233/472763 : -7357/472763 : 1)
** u= -309/301 ; C1 -176450*x^2 - 186082*y^2 + 181138*z^2
(-96303/95125 : 752/19025 : 1) C2a (10199077/6404079 : -16811/136257 : 1)
** u= -308/131 ; C1 -19277*x^2 - 112025*y^2 + 2993*z^2
(-581/1541 : 366/7705 : 1) C2a (195196/36849 : -3359/184245 : 1)
** u= -308/157 ; C1 -24685*x^2 - 119513*y^2 + 26497*z^2
(111016/128849 : -33693/128849 : 1) C2a (-31661704/11678533 : 994169/11678533 : 1)
** u= -308/181 ; C1 -35677*x^2 - 127625*y^2 + 49393*z^2
(-232/249 : 473/1245 : 1) C2a (-10283636/81373 : 2821669/406865 : 1)
** u= -308/239 ; C1 -86021*x^2 - 151985*y^2 + 109481*z^2
(20416/23231 : -951/1787 : 1) C2a (-38658/13163 : 2749/13163 : 1)
** u= -308/251 ; C1 -100637*x^2 - 157865*y^2 + 122753*z^2
(-87148/125579 : -86145/125579 : 1) C2a (-5015106/2471873 : 352295/2471873 : 1)
** u= -308/321 ; C1 -214597*x^2 - 197905*y^2 + 205913*z^2
(13837/31499 : 28718/31499 : 1) C2a (-23575278/21990029 : 1642573/21990029 : 1)
** u= -308/323 ; C1 -218573*x^2 - 199193*y^2 + 208433*z^2
(-83060/108079 : -68211/108079 : 1) C2a (-2503572/1284905 : 211963/1284905 : 1)
** u= -308/325 ; C1 -222589*x^2 - 200489*y^2 + 210961*z^2
(235264/314877 : 207065/314877 : 1) C2a (4629644/5869945 : -220973/5869945 : 1)
** u= -308/379 ; C1 -346141*x^2 - 238505*y^2 + 282241*z^2
(-933776/1038959 : -109269/1038959 : 1) C2a (385926682/81038953 : 36767071/81038953 : 1)
** u= -308/393 ; C1 -382933*x^2 - 249313*y^2 + 301673*z^2
(677740/995941 : -703351/995941 : 1) C2a (-16238226/7320293 : -1526533/7320293 : 1)
** u= -307/155 ; C1 {+/-} -24034*x^2 + 118274*y^2 + 24946*z^2
(-9253/13495 : -4584/13495 : 1) C2a (-266081/39391 : 10381/39391 : 1) C2b (135492/337105 : -24253/337105 : 1)
** u= -306/151 ; C1 -22817*x^2 + 116437*y^2 + 21577*z^2
(-57834/146501 : -57635/146501 : 1) C2b (-199671/166405 : 9673/166405 : 1)
** u= -306/161 ; C1 -26177*x^2 + 119557*y^2 + 30817*z^2
(19959/55105 : -26372/55105 : 1) C2b (-364101/983497 : 70481/983497 : 1)
** u= -306/193 ; C1 -43649*x^2 + 130885*y^2 + 61729*z^2
(-99759/115201 : 54224/115201 : 1) C2b (-8481/284639 : -20495/284639 : 1)
** u= -306/217 ; C1 -63473*x^2 + 140725*y^2 + 86257*z^2
(-28809/25097 : -3424/25097 : 1) C2b (-466517/488143 : -59901/2440715 : 1)
** u= -306/277 ; C1 -138233*x^2 + 170365*y^2 + 152617*z^2
(154962/156499 : -49561/156499 : 1) C2b (-775227/3831131 : 241469/3831131 : 1)
** u= -306/299 ; C1 -174665*x^2 + 183037*y^2 + 178753*z^2
(-44863/78531 : 64048/78531 : 1) C2b (-46841033/104593481 : 5183229/104593481 : 1)
** u= -306/343 ; C1 -262049*x^2 + 211285*y^2 + 233929*z^2
(-18518/42477 : 39653/42477 : 1) C2b (-2952981/4911469 : 86329/4911469 : 1)
** u= -306/347 ; C1 -270953*x^2 + 214045*y^2 + 239137*z^2
(-209839/2883507 : -3038680/2883507 : 1) C2b (9977103/17697131 : 437233/17697131 : 1)
** u= -306/353 ; C1 -284609*x^2 + 218245*y^2 + 247009*z^2
(474138/784883 : -635663/784883 : 1) C2b (63099/152579 : 13/307 : 1)
** u= -306/371 ; C1 -327737*x^2 + 231277*y^2 + 271057*z^2
(-58833/80707 : -52240/80707 : 1) C2b (1848743/9467761 : 494853/9467761 : 1)
** u= -306/383 ; C1 -358289*x^2 + 240325*y^2 + 287449*z^2
(-26098/60237 : -57659/60237 : 1) C2b (-616957/1403101 : 236499/7015505 : 1)
** u= -305/193 ; C1 {+/-} -43810*x^2 + 130274*y^2 + 61954*z^2
(108475/103437 : 33632/103437 : 1) C2a (-677717/529973 : -15629/529973 : 1) C2b (592734/7148135 : 513317/7148135 : 1)
** u= -304/137 ; C1 -19669*x^2 - 111185*y^2 + 9649*z^2
(3716/14461 : -3963/14461 : 1) C2a (88658/7333 : -2239/7333 : 1)
** u= -304/165 ; C1 -27901*x^2 - 119641*y^2 + 35129*z^2
(-29908/88645 : 45811/88645 : 1) C2a (-31118/7865 : -1371/7865 : 1)
** u= -304/185 ; C1 -38581*x^2 - 126641*y^2 + 54289*z^2
(-29824/25345 : -2097/25345 : 1) C2a (-1324964/276571 : 317/1187 : 1)
** u= -304/207 ; C1 -54949*x^2 - 135265*y^2 + 76289*z^2
(-8569/70981 : 53026/70981 : 1) C2a (-5477468/50767 : -362865/50767 : 1)
** u= -304/229 ; C1 -76157*x^2 - 144857*y^2 + 99257*z^2
(-134492/176717 : 109035/176717 : 1) C2a (738672/275449 : -50441/275449 : 1)
** u= -304/255 ; C1 -107461*x^2 - 157441*y^2 + 127649*z^2
(57575/111781 : -88702/111781 : 1) C2a (-747102/779137 : 28013/779137 : 1)
** u= -304/277 ; C1 -139229*x^2 - 169145*y^2 + 152729*z^2
(19024/141689 : -133527/141689 : 1) C2a (7297092/5107207 : 513511/5107207 : 1)
** u= -304/297 ; C1 -172309*x^2 - 180625*y^2 + 176369*z^2
(-304/565 : -200941/240125 : 1) C2a (61680/11633 : -133159/290825 : 1)
** u= -304/355 ; C1 -290861*x^2 - 218441*y^2 + 249449*z^2
(-81351/108917 : -68810/108917 : 1) C2a (59438694/86021641 : -2716021/86021641 : 1)
** u= -303/295 ; C1 {+/-} -169394*x^2 + 178834*y^2 + 173986*z^2
(76253/75831 : 9320/75831 : 1) C2a (-3493889/1709049 : -284179/1709049 : 1) C2b (-602/893 : -21/893 : 1)
** u= -303/383 ; C1 {+/-} -361058*x^2 + 238498*y^2 + 286978*z^2
(61311/182495 : -185428/182495 : 1) C2a (1063477/1063729 : -85551/1063729 : 1) C2b (999026/1799387 : 3951/1799387 :
1)
** u= -303/391 ; C1 -382322*x^2 - 244690*y^2 + 298018*z^2
(-45031/51507 : 7924/51507 : 1) C2a (-38474311/17227833 : -519029/2461119 : 1)
** u= -302/137 ; C1 -19553*x^2 + 109973*y^2 + 10313*z^2
(846/1255 : -143/1255 : 1) C2b (-842303/428465 : 22141/428465 : 1)
** u= -302/197 ; C1 -47273*x^2 + 130013*y^2 + 66593*z^2
(-35842/30323 : -1965/30323 : 1) C2b (5123947/4647365 : 78281/4647365 : 1)
** u= -302/217 ; C1 -64513*x^2 + 138293*y^2 + 86953*z^2
(-325463/281005 : 15336/281005 : 1) C2b (-284913/484129 : 27533/484129 : 1)
** u= -302/279 ; C1 -143377*x^2 + 169045*y^2 + 155153*z^2
(-982/2141 : 1841/2141 : 1) C2b (73397/576579 : 36787/576579 : 1)
** u= -302/293 ; C1 -166505*x^2 + 177053*y^2 + 171617*z^2
(21459/36473 : 29264/36473 : 1) C2b (3358457/4695949 : 57271/4695949 : 1)
** u= -302/315 ; C1 -206809*x^2 + 190429*y^2 + 198281*z^2
(7213/99371 : -101120/99371 : 1) C2b (113629/1002879 : 60337/1002879 : 1)
** u= -302/349 ; C1 -278617*x^2 + 213005*y^2 + 241393*z^2
(33106/39163 : 17451/39163 : 1) C2b (-31063/204609 : 11371/204609 : 1)
** u= -302/369 ; C1 -326257*x^2 + 227365*y^2 + 267833*z^2
(-243979/390713 : 307264/390713 : 1) C2b (-312409/542183 : 597/542183 : 1)
** u= -301/277 ; C1 {+/-} -140738*x^2 + 167330*y^2 + 152882*z^2
(37571/53297 : 37524/53297 : 1) C2a (-1201297/580071 : 94061/580071 : 1) C2b (441196/887617 : -43877/887617 : 1)
** u= -301/325 ; C1 {+/-} -227426*x^2 + 196226*y^2 + 210674*z^2
(-8928/266621 : -276095/266621 : 1) C2a (6334577/1576287 : 571283/1576287 : 1) C2b (150638/230083 : -131/230083 : 1)
** u= -301/397 ; C1 {+/-} -400658*x^2 + 248210*y^2 + 306002*z^2
(263888/463261 : 390093/463261 : 1) C2a (2703067/1757829 : 248533/1757829 : 1) C2b (5134726/9966697 : -121939/9966697
: 1)
** u= -300/143 ; C1 -20645*x^2 - 110449*y^2 + 16249*z^2
(1308/14651 : -5591/14651 : 1) C2a (1332194/24785 : -45039/24785 : 1)
** u= -300/217 ; C1 -65045*x^2 - 137089*y^2 + 87289*z^2
(99089/111183 : 56678/111183 : 1) C2a (25534034/4389679 : -1770873/4389679 : 1)
** u= -300/301 ; C1 -181805*x^2 - 180601*y^2 + 181201*z^2
(-12972/17357 : 11527/17357 : 1) C2a (-202756484/107430789 : -16620113/107430789 : 1)
** u= -300/311 ; C1 -200405*x^2 - 186721*y^2 + 193321*z^2
(487667/594597 : -332858/594597 : 1) C2a (1095296/11899 : -98313/11899 : 1)
** u= -300/323 ; C1 -224045*x^2 - 194329*y^2 + 208129*z^2
(-72664/106851 : 78361/106851 : 1) C2a (568842628/45655325 : -51860193/45655325 : 1)
** u= -299/147 ; C1 {+/-} -21634*x^2 + 111010*y^2 + 20114*z^2
(42848/44683 : -1991/44683 : 1) C2a (2011353/277553 : -72691/277553 : 1) C2b (-8782/18483 : -1325/18483 : 1)
** u= -299/371 ; C1 -333890*x^2 + 227042*y^2 + 270098*z^2
(920/1231 : -747/1231 : 1) C2b (2306972/4368629 : 86689/4368629 : 1)
** u= -299/387 ; C1 {+/-} -375394*x^2 + 239170*y^2 + 291794*z^2
(50908/84563 : 68239/84563 : 1) C2a (1080133/1534843 : 67239/1534843 : 1) C2b (1219912/3075067 : -110391/3075067 : 1)
** u= -298/129 ; C1 -18241*x^2 + 105445*y^2 + 4721*z^2
(-853/3133 : -560/3133 : 1) C2b (1998103/608493 : 25405/608493 : 1)
** u= -298/137 ; C1 -19345*x^2 + 107573*y^2 + 11617*z^2
(2990/4299 : 623/4299 : 1) C2b (180223/227499 : 16021/227499 : 1)
** u= -298/167 ; C1 -29185*x^2 + 116693*y^2 + 38617*z^2
(219926/297749 : 131307/297749 : 1) C2b (-1118631/2022367 : -5939/87929 : 1)
** u= -298/179 ; C1 -35641*x^2 + 120845*y^2 + 49921*z^2
(79679/101579 : 48888/101579 : 1) C2b (940923/946883 : -43271/946883 : 1)
** u= -298/189 ; C1 -42121*x^2 + 124525*y^2 + 59561*z^2
(-18427/21085 : -49444/105425 : 1) C2b (531047/683643 : 37021/683643 : 1)
** u= -298/207 ; C1 -56305*x^2 + 131653*y^2 + 77417*z^2
(44743/63011 : -38452/63011 : 1) C2b (-817619/1232035 : -67359/1232035 : 1)
** u= -298/255 ; C1 -109969*x^2 + 153829*y^2 + 128201*z^2
(27095/28699 : -12712/28699 : 1) C2b (-159053/192113 : -99/192113 : 1)
** u= -298/281 ; C1 -148657*x^2 + 167765*y^2 + 157633*z^2
(-281449/318753 : -158984/318753 : 1) C2b (1194741/2765777 : -20713/395111 : 1)
** u= -298/287 ; C1 -158545*x^2 + 171173*y^2 + 164617*z^2
(-676118/870061 : -551907/870061 : 1) C2b (7441909/10141623 : -22027/10141623 : 1)
** u= -298/299 ; C1 -179401*x^2 + 178205*y^2 + 178801*z^2
(-4886/117429 : 117523/117429 : 1) C2b (-3337/113967 : -1013/16281 : 1)
** u= -298/377 ; C1 -350065*x^2 + 230933*y^2 + 278017*z^2
(361490/4367107 : 4770951/4367107 : 1) C2b (648701/1178607 : 8273/1178607 : 1)
** u= -297/161 ; C1 {+/-} -26546*x^2 + 114130*y^2 + 33346*z^2
(2412/41417 : 22357/41417 : 1) C2a (340291/67371 : 15455/67371 : 1) C2b (-751956/492979 : -4777/492979 : 1)
** u= -297/185 ; C1 {+/-} -39554*x^2 + 122434*y^2 + 55906*z^2
(-55180/61533 : -27299/61533 : 1) C2a (-9418361/466715 : 560427/466715 : 1) C2b (-148488/165205 : -7987/165205 : 1)
** u= -297/217 ; C1 {+/-} -65858*x^2 + 135298*y^2 + 87778*z^2
(-7760/7713 : 3047/7713 : 1) C2a (-16102583/258259 : -1144029/258259 : 1) C2b (-2364/2803 : 101/2803 : 1)
** u= -297/353 ; C1 -291890*x^2 - 212818*y^2 + 246082*z^2
(25456/40749 : 1889/2397 : 1) C2a (659692117/79187585 : -62419611/79187585 : 1)
** u= -296/145 ; C1 -21061*x^2 - 108641*y^2 + 19249*z^2
(43265/52347 : 11074/52347 : 1) C2a (-41902012/878537 : 1554577/878537 : 1)
** u= -296/163 ; C1 -27469*x^2 - 114185*y^2 + 35449*z^2
(12424/11859 : 2555/11859 : 1) C2a (-16851212/640063 : 826951/640063 : 1)
** u= -296/303 ; C1 -187909*x^2 - 179425*y^2 + 183569*z^2
(-15268/67267 : -66221/67267 : 1) C2a (-741888/1039471 : -83261/5197355 : 1)
** u= -296/371 ; C1 -336557*x^2 - 225257*y^2 + 269657*z^2
(68945/108709 : -83934/108709 : 1) C2a (28424712/7226989 : 2715509/7226989 : 1)
** u= -295/207 ; C1 {+/-} -57010*x^2 + 129874*y^2 + 77954*z^2
(69080/121283 : 82063/121283 : 1) C2a (-853587/136855 : -57533/136855 : 1) C2b (7294/7179 : 91/7179 : 1)
** u= -295/231 ; C1 {+/-} -81250*x^2 + 140386*y^2 + 102626*z^2
(-159344/240575 : 6647/9623 : 1) C2a (-32260829/7816711 : -103191/339857 : 1) C2b (-1376174/1513285 : -159/65795 : 1)
** u= -295/303 ; C1 {+/-} -188530*x^2 + 178834*y^2 + 183554*z^2
(-6580/51227 : 51457/51227 : 1) C2a (307/287 : -3/41 : 1) C2b (5794538/12228755 : 77973/1746965 : 1)
** u= -294/193 ; C1 -45713*x^2 + 123685*y^2 + 64297*z^2
(-39038/72639 : 46687/72639 : 1) C2b (-1137213/1032839 : 15077/1032839 : 1)
** u= -294/251 ; C1 -106265*x^2 + 149437*y^2 + 124153*z^2
(-92563/85659 : 1828/85659 : 1) C2b (7446789/10059295 : -303431/10059295 : 1)
** u= -294/317 ; C1 -216089*x^2 + 186925*y^2 + 200449*z^2
(9786/13843 : 48679/69215 : 1) C2b (-129513/1451821 : -430747/7259105 : 1)
** u= -293/141 ; C1 {+/-} -20002*x^2 + 105730*y^2 + 16658*z^2
(2908/3349 : 409/3349 : 1) C2a (68986181/512167 : 2415291/512167 : 1) C2b (-53516/167193 : -12221/167193 : 1)
** u= -293/373 ; C1 -344338*x^2 + 224978*y^2 + 271858*z^2
(119531/493989 : -522500/493989 : 1) C2b (-16051404/29418905 : 226783/29418905 : 1)
** u= -292/147 ; C1 -21613*x^2 - 106873*y^2 + 22193*z^2
(-14855/17561 : -4406/17561 : 1) C2a (-578322/258559 : 13289/258559 : 1)
** u= -292/163 ; C1 -27725*x^2 - 111833*y^2 + 36497*z^2
(130797/154285 : 11878/30857 : 1) C2a (16053704/3597207 : -765019/3597207 : 1)
** u= -292/167 ; C1 -29653*x^2 - 113153*y^2 + 40153*z^2
(-312184/393075 : -171137/393075 : 1) C2a (-868226/161173 : -44083/161173 : 1)
** u= -292/169 ; C1 -30677*x^2 - 113825*y^2 + 41993*z^2
(5740/12757 : 35763/63785 : 1) C2a (-50536/36687 : -61/5241 : 1)
** u= -292/227 ; C1 -77773*x^2 - 136793*y^2 + 98833*z^2
(-67459/60269 : -6090/60269 : 1) C2a (602074/561085 : -3347/80155 : 1)
** u= -292/237 ; C1 -89293*x^2 - 141433*y^2 + 109313*z^2
(-40568/57917 : 39415/57917 : 1) C2a (754158/744515 : 29437/744515 : 1)
** u= -292/247 ; C1 -101813*x^2 - 146273*y^2 + 119993*z^2
(606392/1105307 : -863865/1105307 : 1) C2a (337544/132153 : -25477/132153 : 1)
** u= -292/275 ; C1 -142189*x^2 - 160889*y^2 + 150961*z^2
(129068/137275 : -54399/137275 : 1) C2a (-549796/441659 : -37471/441659 : 1)
** u= -292/313 ; C1 -209525*x^2 - 183233*y^2 + 195497*z^2
(-86807/823055 : -9942/9683 : 1) C2a (-751882/745125 : -51851/745125 : 1)
** u= -292/399 ; C1 -415237*x^2 - 244465*y^2 + 306953*z^2
(-591196/935447 : 710683/935447 : 1) C2a (162928/260251 : 9375/260251 : 1)
** u= -291/131 ; C1 {+/-} -18002*x^2 + 101842*y^2 + 8722*z^2
(22540/32583 : -1057/32583 : 1) C2a (250997/11949 : -917/1707 : 1) C2b (-53094/18725 : -31/2675 : 1)
** u= -291/203 ; C1 {+/-} -54434*x^2 + 125890*y^2 + 74674*z^2
(77844/66551 : 2645/66551 : 1) C2a (1700227/664797 : -105529/664797 : 1) C2b (-2782524/3822251 : -192977/3822251 : 1)
** u= -291/227 ; C1 {+/-} -78098*x^2 + 136210*y^2 + 98962*z^2
(7239/9383 : 5824/9383 : 1) C2a (31307/27759 : -354601/7134063 : 1) C2b (1386/1517 : 463/389869 : 1)
** u= -291/307 ; C1 -198578*x^2 + 178930*y^2 + 188242*z^2
(-16681/17247 : -2032/17247 : 1) C2b (-1792318/2821649 : -54573/2821649 : 1)
** u= -291/331 ; C1 -247202*x^2 - 194242*y^2 + 217522*z^2
(3788/12327 : 12325/12327 : 1) C2a (-683411/18985 : 63789/18985 : 1)
** u= -291/395 ; C1 {+/-} -405026*x^2 + 240706*y^2 + 301234*z^2
(-3669/4927 : -2780/4927 : 1) C2a (9472853/1313517 : -932473/1313517 : 1) C2b (2688828/5835917 : -129911/5835917 : 1)
** u= -290/133 ; C1 -18265*x^2 + 101789*y^2 + 10729*z^2
(-31750/67371 : -17249/67371 : 1) C2b (-567153/328495 : -18119/328495 : 1)
** u= -290/193 ; C1 -46465*x^2 + 121349*y^2 + 65089*z^2
(6301/88677 : -64828/88677 : 1) C2b (-2163841/1973235 : 16757/1973235 : 1)
** u= -290/249 ; C1 -105265*x^2 + 146101*y^2 + 122321*z^2
(9014/11459 : -7169/11459 : 1) C2b (-4425829/5968425 : -174223/5968425 : 1)
** u= -290/287 ; C1 -163025*x^2 + 166469*y^2 + 164729*z^2
(-19122/355645 : 70655/71129 : 1) C2b (-10751/307529 : 19259/307529 : 1)
** u= -290/297 ; C1 -180625*x^2 + 172309*y^2 + 176369*z^2
(-200941/240125 : 304/565 : 1) C2b (-1979101/4842985 : 240543/4842985 : 1)
** u= -290/351 ; C1 -292945*x^2 + 207301*y^2 + 242681*z^2
(-67390/1021049 : -1101841/1021049 : 1) C2b (3140789/14030201 : -719619/14030201 : 1)
** u= -290/371 ; C1 -341945*x^2 + 221741*y^2 + 268721*z^2
(4333330/7187849 : -5801241/7187849 : 1) C2b (-8137709/15328265 : 204677/15328265 : 1)
** u= -290/393 ; C1 -400465*x^2 + 238549*y^2 + 298289*z^2
(-896045/1464613 : -1155172/1464613 : 1) C2b (-4235683/14754147 : -620467/14754147 : 1)
** u= -289/145 ; C1 -21026*x^2 - 104546*y^2 + 21314*z^2
(-9063/9361 : 1160/9361 : 1) C2a (-4488243/264995 : 177701/264995 : 1)
** u= -289/169 ; C1 -30962*x^2 - 112082*y^2 + 42722*z^2
(-64660/62161 : -17829/62161 : 1) C2a (-1351211/1000227 : 10687/1000227 : 1)
** u= -289/201 ; C1 -53170*x^2 - 123922*y^2 + 73058*z^2
(1991/2413 : -1316/2413 : 1) C2a (-324927/23281 : 21947/23281 : 1)
** u= -289/217 ; C1 {+/-} -68114*x^2 + 130610*y^2 + 88994*z^2
(42484/140989 : 112263/140989 : 1) C2a (-22783211/547629 : -1658599/547629 : 1) C2b (-111572/128567 : -3701/128567 :
1)
** u= -289/233 ; C1 {+/-} -85618*x^2 + 137810*y^2 + 105442*z^2
(-10717/9969 : -2164/9969 : 1) C2a (-1271141/490223 : 92243/490223 : 1) C2b (1594674/2549363 : 122213/2549363 : 1)
** u= -289/257 ; C1 {+/-} -116674*x^2 + 149570*y^2 + 131074*z^2
(4367/66017 : -61680/66017 : 1) C2a (2829479/1798249 : -201575/1798249 : 1) C2b (-326312/427227 : 7883/427227 : 1)
** u= -289/281 ; C1 -153490*x^2 - 162482*y^2 + 157858*z^2
(-1076/25557 : -25169/25557 : 1) C2a (27593/9115 : -2329/9115 : 1)
** u= -289/297 ; C1 -181234*x^2 + 171730*y^2 + 176354*z^2
(-41032/45997 : 19897/45997 : 1) C2b (-2356/160029 : 9841/160029 : 1)
** u= -289/345 ; C1 {+/-} -279826*x^2 + 202546*y^2 + 234914*z^2
(151799/167045 : -22988/167045 : 1) C2a (66131751/10399925 : 6255607/10399925 : 1) C2b (-2113432/4502875 :
-153393/4502875 : 1)
** u= -289/369 ; C1 -337762*x^2 - 219682*y^2 + 265922*z^2
(92453/202517 : -191060/202517 : 1) C2a (-39369331/7701763 : 3798933/7701763 : 1)
** u= -288/137 ; C1 -18965*x^2 - 101713*y^2 + 14737*z^2
(-2595/2999 : -218/2999 : 1) C2a (1664098/373269 : -48577/373269 : 1)
** u= -288/151 ; C1 -22997*x^2 - 105745*y^2 + 26833*z^2
(-1048/20139 : -10133/20139 : 1) C2a (-328826/2673 : 14611/2673 : 1)
** u= -288/179 ; C1 -36941*x^2 - 114985*y^2 + 52201*z^2
(-8244/7151 : -1175/7151 : 1) C2a (-2948554/1430181 : -141617/1430181 : 1)
** u= -288/235 ; C1 -88349*x^2 - 138169*y^2 + 107641*z^2
(14897/60765 : -52294/60765 : 1) C2a (3231106/71835 : -251537/71835 : 1)
** u= -288/263 ; C1 -125813*x^2 - 152113*y^2 + 137713*z^2
(186777/179077 : -13370/179077 : 1) C2a (5668718/2429831 : -448821/2429831 : 1)
** u= -287/127 ; C1 {+/-} -17218*x^2 + 98498*y^2 + 6658*z^2
(7535/12983 : 1212/12983 : 1) C2a (26090429/6269555 : 376861/6269555 : 1) C2b (-241092/128645 : 7771/128645 : 1)
** u= -287/191 ; C1 {+/-} -45506*x^2 + 118850*y^2 + 63746*z^2
(-1800/2443 : -7001/12215 : 1) C2a (994293/473005 : 273281/2365025 : 1) C2b (-118694/107815 : 3089/539075 : 1)
** u= -287/199 ; C1 {+/-} -51922*x^2 + 121970*y^2 + 71458*z^2
(83071/171227 : -119328/171227 : 1) C2a (229259/72503 : 14605/72503 : 1) C2b (-1122282/1437661 : 67891/1437661 : 1)
** u= -287/255 ; C1 -114754*x^2 - 147394*y^2 + 129026*z^2
(-24967/35791 : -25220/35791 : 1) C2a (9699/12055 : -113/12055 : 1)
** u= -286/127 ; C1 -17153*x^2 + 97925*y^2 + 6977*z^2
(-8861/14363 : 972/14363 : 1) C2b (69737/120385 : 43861/601925 : 1)
** u= -286/135 ; C1 -18481*x^2 + 100021*y^2 + 13649*z^2
(3905/11983 : 4096/11983 : 1) C2b (84509/49209 : 2383/49209 : 1)
** u= -286/137 ; C1 -18913*x^2 + 100565*y^2 + 15337*z^2
(11774/20227 : 6027/20227 : 1) C2b (18025211/8878107 : 30503/1268301 : 1)
** u= -286/161 ; C1 -27217*x^2 + 107717*y^2 + 36217*z^2
(11413/62385 : 35716/62385 : 1) C2b (-1427243/1004751 : 8123/1004751 : 1)
** u= -286/173 ; C1 -33529*x^2 + 111725*y^2 + 47089*z^2
(-18662/24615 : -61411/123075 : 1) C2b (7431/72695 : -121/1675 : 1)
** u= -286/237 ; C1 -91513*x^2 + 137965*y^2 + 109937*z^2
(10663/35741 : -30700/35741 : 1) C2b (2215747/2623061 : 28887/2623061 : 1)
** u= -286/261 ; C1 -123817*x^2 + 149917*y^2 + 135617*z^2
(25450/30571 : 17621/30571 : 1) C2b (334223/486895 : 14709/486895 : 1)
** u= -286/271 ; C1 -138977*x^2 + 155237*y^2 + 146657*z^2
(-12866/355265 : -345093/355265 : 1) C2b (-1422733/2269855 : -11263/324265 : 1)
** u= -286/307 ; C1 -201833*x^2 + 176045*y^2 + 188057*z^2
(183117/287779 : -223660/287779 : 1) C2b (-4091/6613 : -35021/1699541 : 1)
** u= -284/155 ; C1 -24701*x^2 - 104681*y^2 + 31409*z^2
(-414309/1354397 : -714070/1354397 : 1) C2a (10480648/4692723 : -53081/670389 : 1)
** u= -284/175 ; C1 -34981*x^2 - 111281*y^2 + 49369*z^2
(254012/242955 : -76841/242955 : 1) C2a (602/323 : -6829/83011 : 1)
** u= -284/189 ; C1 -44557*x^2 - 116377*y^2 + 62417*z^2
(-24316/24049 : 9155/24049 : 1) C2a (-2453362/644959 : 151671/644959 : 1)
** u= -284/233 ; C1 -87413*x^2 - 134945*y^2 + 105977*z^2
(-1987452/2399821 : 1401497/2399821 : 1) C2a (1484112/422851 : -112441/422851 : 1)
** u= -284/249 ; C1 -107797*x^2 - 142657*y^2 + 122777*z^2
(5081/5015 : -86/295 : 1) C2a (-802594/714953 : 45633/714953 : 1)
** u= -284/253 ; C1 -113293*x^2 - 144665*y^2 + 127057*z^2
(-142156/134637 : -9737/134637 : 1) C2a (3734722/2118109 : 39379/302587 : 1)
** u= -284/289 ; C1 -169957*x^2 - 164177*y^2 + 167017*z^2
(452/5985 : -6019/5985 : 1) C2a (59662/40915 : 4667/40915 : 1)
** u= -284/325 ; C1 -239581*x^2 - 186281*y^2 + 209569*z^2
(61195/110891 : -5586/6523 : 1) C2a (-91472902/49685995 : 8063741/49685995 : 1)
** u= -284/329 ; C1 -248117*x^2 - 188897*y^2 + 214457*z^2
(250701/423715 : -348242/423715 : 1) C2a (-306498/345959 : -20911/345959 : 1)
** u= -284/367 ; C1 -337189*x^2 - 215345*y^2 + 262489*z^2
(418832/1312507 : 1350975/1312507 : 1) C2a (80396366/4976531 : -7825789/4976531 : 1)
** u= -283/355 ; C1 -308354*x^2 - 206114*y^2 + 246866*z^2
(90549/222295 : 216608/222295 : 1) C2a (-2621/2331 : -56383/599067 : 1)
** u= -282/143 ; C1 -20465*x^2 + 99973*y^2 + 21577*z^2
(20538/39461 : 15803/39461 : 1) C2b (463/415 : 6171/106655 : 1)
** u= -282/233 ; C1 -88145*x^2 + 133813*y^2 + 106177*z^2
(258673/389793 : -16268/22929 : 1) C2b (3887423/5522231 : 213519/5522231 : 1)
** u= -282/245 ; C1 -103289*x^2 + 139549*y^2 + 118681*z^2
(-58230/64339 : -31793/64339 : 1) C2b (2178727/2675003 : 6621/2675003 : 1)
** u= -282/289 ; C1 -171137*x^2 + 163045*y^2 + 166993*z^2
(22757/25149 : -10208/25149 : 1) C2b (2179409/3811963 : -131451/3811963 : 1)
** u= -282/367 ; C1 -338993*x^2 + 214213*y^2 + 262153*z^2
(-78482/89805 : 11069/89805 : 1) C2b (-51129/9431377 : -495259/9431377 : 1)
** u= -281/257 ; C1 -120338*x^2 + 145010*y^2 + 131522*z^2
(40653/56521 : 39064/56521 : 1) C2b (27196/153473 : -9707/153473 : 1)
** u= -280/151 ; C1 -23285*x^2 - 101201*y^2 + 28961*z^2
(117667/109921 : -16494/109921 : 1) C2a (-429708/273943 : -2609/273943 : 1)
** u= -280/171 ; C1 -33085*x^2 - 107641*y^2 + 46601*z^2
(332263/284813 : 34438/284813 : 1) C2a (6737272/4845313 : -173031/4845313 : 1)
** u= -280/197 ; C1 -51805*x^2 - 117209*y^2 + 70729*z^2
(-22612/26781 : 14381/26781 : 1) C2a (-7546766/404069 : -516377/404069 : 1)
** u= -280/213 ; C1 -66685*x^2 - 123769*y^2 + 86249*z^2
(-75080/79981 : 37691/79981 : 1) C2a (6957624/2858089 : 472657/2858089 : 1)
** u= -280/257 ; C1 -120805*x^2 - 144449*y^2 + 131569*z^2
(389128/442317 : 227077/442317 : 1) C2a (1408072/1687153 : 45511/1687153 : 1)
** u= -280/271 ; C1 -142085*x^2 - 151841*y^2 + 146801*z^2
(-12971/14137 : -5982/14137 : 1) C2a (-55982782/2553147 : -4853239/2553147 : 1)
** u= -280/297 ; C1 -186805*x^2 - 166609*y^2 + 176129*z^2
(54371/56351 : 6506/56351 : 1) C2a (1008866/1430515 : 29889/1430515 : 1)
** u= -280/333 ; C1 -259885*x^2 - 189289*y^2 + 218969*z^2
(-90244/199937 : 187247/199937 : 1) C2a (4684256/1174711 : -439503/1174711 : 1)
** u= -280/353 ; C1 -306085*x^2 - 203009*y^2 + 243889*z^2
(-626767/895643 : 609438/895643 : 1) C2a (-209674/39955 : -20159/39955 : 1)
** u= -280/359 ; C1 -320725*x^2 - 207281*y^2 + 251521*z^2
(-17359/26565 : -3950/5313 : 1) C2a (-351992/535147 : -18989/535147 : 1)
** u= -280/387 ; C1 -393805*x^2 - 228169*y^2 + 288089*z^2
(-653/881 : -494/881 : 1) C2a (119298462/3265993 : 11824349/3265993 : 1)
** u= -280/391 ; C1 -404885*x^2 - 231281*y^2 + 293441*z^2
(12129/14581 : -3494/14581 : 1) C2a (15078402/18303475 : -1196047/18303475 : 1)
** u= -279/247 ; C1 -107234*x^2 + 138850*y^2 + 120994*z^2
(-3700/4119 : 10261/20595 : 1) C2b (131210/323447 : 91743/1617235 : 1)
** u= -278/159 ; C1 -26881*x^2 + 102565*y^2 + 36401*z^2
(13142/11513 : 1333/11513 : 1) C2b (704363/509103 : -3215/509103 : 1)
** u= -278/167 ; C1 -31025*x^2 + 105173*y^2 + 43457*z^2
(50723/53867 : 20976/53867 : 1) C2b (-3021599/3332153 : 170513/3332153 : 1)
** u= -278/189 ; C1 -45721*x^2 + 113005*y^2 + 63521*z^2
(-117406/132619 : -65645/132619 : 1) C2b (-771061/1588401 : -100693/1588401 : 1)
** u= -278/201 ; C1 -55777*x^2 + 117685*y^2 + 74873*z^2
(96794/222683 : -9685/13099 : 1) C2b (439073/1367301 : -90737/1367301 : 1)
** u= -278/203 ; C1 -57593*x^2 + 118493*y^2 + 76793*z^2
(-38946/38321 : -14645/38321 : 1) C2b (3457901/3962993 : -128489/3962993 : 1)
** u= -278/207 ; C1 -61345*x^2 + 120133*y^2 + 80657*z^2
(-1822/1741 : 583/1741 : 1) C2b (2084191/2461983 : 81607/2461983 : 1)
** u= -278/217 ; C1 -71425*x^2 + 124373*y^2 + 90457*z^2
(34/67 : 51/67 : 1) C2b (16941/31127 : -101/1831 : 1)
** u= -278/219 ; C1 -73561*x^2 + 125245*y^2 + 92441*z^2
(109951/163679 : 112576/163679 : 1) C2b (3372473/4066463 : -110865/4066463 : 1)
** u= -278/261 ; C1 -127657*x^2 + 145405*y^2 + 135953*z^2
(31487/447269 : -431480/447269 : 1) C2b (4261229/25730583 : 70123/1118721 : 1)
** u= -278/273 ; C1 -146353*x^2 + 151813*y^2 + 149033*z^2
(167470/253291 : 189589/253291 : 1) C2b (-9741577/24637549 : -1295913/24637549 : 1)
** u= -278/313 ; C1 -219073*x^2 + 175253*y^2 + 194713*z^2
(4498/5847 : -46315/76011 : 1) C2b (-6651/32977 : 23687/428701 : 1)
** u= -278/371 ; C1 -352937*x^2 + 214925*y^2 + 266633*z^2
(-20211/24763 : -9484/24763 : 1) C2b (277691/1162565 : 265801/5812825 : 1)
** u= -277/125 ; C1 -16354*x^2 + 92354*y^2 + 8146*z^2
(-95/157 : 24/157 : 1) C2b (1602/755 : -37/755 : 1)
** u= -277/133 ; C1 {+/-} -17810*x^2 + 94418*y^2 + 14642*z^2
(5136/9577 : 3041/9577 : 1) C2a (-3706549/1116987 : 98771/1116987 : 1) C2b (1000886/1259767 : 86437/1259767 : 1)
** u= -277/149 ; C1 -22642*x^2 - 98930*y^2 + 28018*z^2
(-2524/3297 : -1273/3297 : 1) C2a (-1004467/619291 : 12491/619291 : 1)
** u= -277/189 ; C1 {+/-} -45922*x^2 + 112450*y^2 + 63698*z^2
(-97/101 : 44/101 : 1) C2a (266559/248615 : 6271/1243075 : 1) C2b (-73600/121599 : -35593/607995 : 1)
** u= -277/301 ; C1 {+/-} -196226*x^2 + 167330*y^2 + 180626*z^2
(127564/163889 : -99555/163889 : 1) C2a (-17122297/159663 : -1569299/159663 : 1) C2b (-93724/272441 : 13787/272441 :
1)
** u= -277/325 ; C1 {+/-} -244754*x^2 + 182354*y^2 + 208946*z^2
(15076/114725 : -121557/114725 : 1) C2a (-57464583/3104185 : 5423489/3104185 : 1) C2b (817612/5896327 :
325841/5896327 : 1)
** u= -277/381 ; C1 {+/-} -380386*x^2 + 221890*y^2 + 279506*z^2
(196387/305257 : -226408/305257 : 1) C2a (-849399/573761 : 79051/573761 : 1) C2b (-141592/373623 : 12355/373623 : 1)
** u= -276/245 ; C1 -105821*x^2 - 136201*y^2 + 119089*z^2
(-96640/91473 : 7741/91473 : 1) C2a (3249026/4052265 : 28423/4052265 : 1)
** u= -276/319 ; C1 -232805*x^2 - 177937*y^2 + 201673*z^2
(12076/31191 : -30197/31191 : 1) C2a (-6161888/159489 : 578627/159489 : 1)
** u= -276/325 ; C1 -245501*x^2 - 181801*y^2 + 208849*z^2
(-140756/168765 : -77233/168765 : 1) C2a (994658/923597 : -171/2021 : 1)
** u= -276/341 ; C1 -281117*x^2 - 192457*y^2 + 228337*z^2
(15384/74389 : -78865/74389 : 1) C2a (-25960592/8741909 : 2448201/8741909 : 1)
** u= -276/389 ; C1 -403325*x^2 - 227497*y^2 + 289873*z^2
(18908/86325 : 18827/17265 : 1) C2a (2534648/3807221 : 170583/3807221 : 1)
** u= -275/131 ; C1 {+/-} -17330*x^2 + 92786*y^2 + 13586*z^2
(16021/30907 : -9588/30907 : 1) C2a (-473073/50777 : 15521/50777 : 1) C2b (74878/68203 : -4367/68203 : 1)
** u= -275/267 ; C1 -138370*x^2 - 146914*y^2 + 142514*z^2
(163789/167471 : -44044/167471 : 1) C2a (20021/26801 : 387/26801 : 1)
** u= -275/323 ; C1 -241970*x^2 - 179954*y^2 + 206354*z^2
(-57585/431143 : -456832/431143 : 1) C2a (3887587/1022643 : 362629/1022643 : 1)
** u= -274/119 ; C1 -15457*x^2 + 89237*y^2 + 4297*z^2
(-15142/155453 : -33525/155453 : 1) C2b (2698869/1175983 : 69829/1175983 : 1)
** u= -274/131 ; C1 -17305*x^2 + 92237*y^2 + 13873*z^2
(-13993/16683 : 2264/16683 : 1) C2b (5287289/4680267 : 295183/4680267 : 1)
** u= -274/145 ; C1 -21281*x^2 + 96101*y^2 + 25409*z^2
(-14338/23711 : 10155/23711 : 1) C2b (207301/976115 : -71149/976115 : 1)
** u= -274/175 ; C1 -36401*x^2 + 105701*y^2 + 51449*z^2
(10681/70067 : 48480/70067 : 1) C2b (-1005479/999185 : 36451/999185 : 1)
** u= -274/203 ; C1 -58633*x^2 + 116285*y^2 + 77377*z^2
(-5353/5979 : -3056/5979 : 1) C2b (34751/529287 : -36797/529287 : 1)
** u= -274/221 ; C1 -77065*x^2 + 123917*y^2 + 94873*z^2
(-14323/12909 : -28/12909 : 1) C2b (-28147/51375 : -2737/51375 : 1)
** u= -274/237 ; C1 -96169*x^2 + 131245*y^2 + 110969*z^2
(128042/199967 : -147635/199967 : 1) C2b (1346287/5873097 : 374465/5873097 : 1)
** u= -274/243 ; C1 -103993*x^2 + 134125*y^2 + 117137*z^2
(22754/28273 : 86123/141365 : 1) C2b (-35489/45207 : -2671/226035 : 1)
** u= -274/257 ; C1 -123649*x^2 + 141125*y^2 + 131809*z^2
(29506/51351 : 206159/256755 : 1) C2b (42733/224673 : -13975/224673 : 1)
** u= -274/315 ; C1 -225961*x^2 + 174301*y^2 + 196769*z^2
(186650/288341 : -220667/288341 : 1) C2b (5872861/12563259 : 469177/12563259 : 1)
** u= -274/319 ; C1 -234257*x^2 + 176837*y^2 + 201497*z^2
(-274107/791887 : -784220/791887 : 1) C2b (-2318113/11579279 : 623987/11579279 : 1)
** u= -274/349 ; C1 -301577*x^2 + 196877*y^2 + 237977*z^2
(64630/974887 : -1068837/974887 : 1) C2b (-88127/407419 : -20027/407419 : 1)
** u= -274/351 ; C1 -306385*x^2 + 198277*y^2 + 240473*z^2
(4690/15353 : 15871/15353 : 1) C2b (-1599551/5222525 : -230319/5222525 : 1)
** u= -274/385 ; C1 -394241*x^2 + 223301*y^2 + 284129*z^2
(-65022/1264715 : -1423991/1264715 : 1) C2b (463993/1973633 : 84991/1973633 : 1)
** u= -274/391 ; C1 -410945*x^2 + 227957*y^2 + 292073*z^2
(-98349/326207 : -344824/326207 : 1) C2b (-84679343/207321895 : 5349973/207321895 : 1)
** u= -273/145 ; C1 {+/-} -21314*x^2 + 95554*y^2 + 25666*z^2
(27085/25557 : 3436/25557 : 1) C2a (2508109/717811 : 101811/717811 : 1) C2b (162868/108517 : 2859/108517 : 1)
** u= -273/257 ; C1 -124130*x^2 + 140578*y^2 + 131842*z^2
(-20244/23081 : 11737/23081 : 1) C2b (-2616146/4419587 : -174633/4419587 : 1)
** u= -272/113 ; C1 -14885*x^2 - 86753*y^2 + 257*z^2
(-405/19391 : -1042/19391 : 1) C2a (-600648/35209 : -1223/35209 : 1)
** u= -272/145 ; C1 -21349*x^2 - 95009*y^2 + 25921*z^2
(-20608/18705 : 161/18705 : 1) C2a (-1347476/767809 : -161/4769 : 1)
** u= -272/157 ; C1 -26413*x^2 - 98633*y^2 + 36073*z^2
(51152/63605 : -27909/63605 : 1) C2a (-187052/571 : 9979/571 : 1)
** u= -272/161 ; C1 -28421*x^2 - 99905*y^2 + 39521*z^2
(-8383/7363 : -1206/7363 : 1) C2a (1708202/269157 : -92737/269157 : 1)
** u= -272/171 ; C1 -34141*x^2 - 103225*y^2 + 48281*z^2
(-1244/1435 : 3359/7175 : 1) C2a (2131020/116719 : -641461/583595 : 1)
** u= -272/265 ; C1 -136789*x^2 - 144209*y^2 + 140401*z^2
(39032/438765 : -431261/438765 : 1) C2a (-20287834/3079199 : -1755181/3079199 : 1)
** u= -272/315 ; C1 -227389*x^2 - 173209*y^2 + 196601*z^2
(-55460/61163 : 14429/61163 : 1) C2a (6484332/3441763 : 12269/73229 : 1)
** u= -272/339 ; C1 -279757*x^2 - 188905*y^2 + 225353*z^2
(-39287/329701 : 356918/329701 : 1) C2a (4280246/4986367 : 310803/4986367 : 1)
** u= -272/345 ; C1 -293749*x^2 - 193009*y^2 + 232721*z^2
(7880/250621 : -275027/250621 : 1) C2a (-63504/105725 : 2387/105725 : 1)
** u= -272/379 ; C1 -379837*x^2 - 217625*y^2 + 275833*z^2
(-38992/47391 : -69461/236955 : 1) C2a (-51358/102809 : 2329/514045 : 1)
** u= -272/389 ; C1 -407357*x^2 - 225305*y^2 + 288953*z^2
(-203112/268469 : -133595/268469 : 1) C2a (-3377208/387611 : -48125/55373 : 1)
** u= -271/119 ; C1 -15250*x^2 - 87602*y^2 + 5218*z^2
(-268/3655 : 177/731 : 1) C2a (1265983/366701 : 1903/366701 : 1)
** u= -271/151 ; C1 -23762*x^2 + 96242*y^2 + 31202*z^2
(2205/2071 : -4/19 : 1) C2b (-48136/36023 : -1051/36023 : 1)
** u= -271/359 ; C1 {+/-} -328690*x^2 + 202322*y^2 + 250018*z^2
(1835/27783 : -30796/27783 : 1) C2a (178396781/26311565 : 17441393/26311565 : 1) C2b (2251632/4405349 :
-56359/4405349 : 1)
** u= -271/391 ; C1 -414002*x^2 - 226322*y^2 + 291362*z^2
(-22108/66115 : 68799/66115 : 1) C2a (2201711/3869535 : -120251/3869535 : 1)
** u= -270/199 ; C1 -55985*x^2 + 112501*y^2 + 74161*z^2
(225601/208959 : 58784/208959 : 1) C2b (-1785987/2586475 : -127301/2586475 : 1)
** u= -270/227 ; C1 -85385*x^2 + 124429*y^2 + 101209*z^2
(-58914/90641 : 65581/90641 : 1) C2b (4998887/6491407 : 177513/6491407 : 1)
** u= -269/309 ; C1 -217282*x^2 + 167842*y^2 + 189362*z^2
(20800/27997 : -18007/27997 : 1) C2b (2499508/4111759 : 35253/4111759 : 1)
** u= -269/381 ; C1 {+/-} -388210*x^2 + 217522*y^2 + 277778*z^2
(-101696/162221 : -123077/162221 : 1) C2a (-186340383/37497491 : -18486323/37497491 : 1) C2b (472532/1358115 :
-46283/1358115 : 1)
** u= -268/135 ; C1 -18229*x^2 - 90049*y^2 + 18761*z^2
(37745/42073 : -8966/42073 : 1) C2a (3842966/2093779 : 9171/2093779 : 1)
** u= -268/183 ; C1 -43093*x^2 - 105313*y^2 + 59753*z^2
(26725/100381 : 73654/100381 : 1) C2a (-7049064/4715735 : -327581/4715735 : 1)
** u= -268/187 ; C1 -46205*x^2 - 106793*y^2 + 63377*z^2
(-169892/310751 : -211707/310751 : 1) C2a (6085524/956413 : -408001/956413 : 1)
** u= -268/211 ; C1 -68237*x^2 - 116345*y^2 + 85793*z^2
(-97388/365639 : -304995/365639 : 1) C2a (1144658/223761 : 85345/223761 : 1)
** u= -268/247 ; C1 -112085*x^2 - 132833*y^2 + 121577*z^2
(26613/128957 : 120926/128957 : 1) C2a (-8710176/595877 : -734089/595877 : 1)
** u= -268/273 ; C1 -151813*x^2 - 146353*y^2 + 149033*z^2
(-16532/45265 : -42461/45265 : 1) C2a (-1555898/1762901 : -85539/1762901 : 1)
** u= -268/355 ; C1 -321389*x^2 - 197849*y^2 + 244481*z^2
(-95208/152179 : 117865/152179 : 1) C2a (981798/1219435 : 72731/1219435 : 1)
** u= -268/357 ; C1 -326365*x^2 - 199273*y^2 + 246977*z^2
(16244/40213 : 39649/40213 : 1) C2a (-5317878/55769 : -16847/1799 : 1)
** u= -268/383 ; C1 -394693*x^2 - 218513*y^2 + 280153*z^2
(-47143/179825 : 193506/179825 : 1) C2a (-5028316/374653 : -501937/374653 : 1)
** u= -267/371 ; C1 {+/-} -363266*x^2 + 208930*y^2 + 264466*z^2
(27649/32811 : 5792/32811 : 1) C2a (513149/1016229 : 7727/1016229 : 1) C2b (-1798/3607 : -9/3607 : 1)
** u= -266/113 ; C1 -14369*x^2 + 83525*y^2 + 2129*z^2
(1390/3631 : -303/18155 : 1) C2b (-385/97 : -6077/124645 : 1)
** u= -266/159 ; C1 -27985*x^2 + 96037*y^2 + 39113*z^2
(63823/59731 : -16312/59731 : 1) C2b (-9373/7401 : 101/7401 : 1)
** u= -266/173 ; C1 -36329*x^2 + 100685*y^2 + 51209*z^2
(150234/137719 : -38765/137719 : 1) C2b (284381/336931 : -16211/336931 : 1)
** u= -266/197 ; C1 -55193*x^2 + 109565*y^2 + 72857*z^2
(45241/49337 : 24240/49337 : 1) C2b (-918671/2985143 : -197255/2985143 : 1)
** u= -266/205 ; C1 -62761*x^2 + 112781*y^2 + 80329*z^2
(-11306/30195 : -24047/30195 : 1) C2b (-962809/1421175 : -66809/1421175 : 1)
** u= -266/207 ; C1 -64753*x^2 + 113605*y^2 + 82217*z^2
(18713/16619 : 536/16619 : 1) C2b (548849/1216923 : 72833/1216923 : 1)
** u= -266/291 ; C1 -184537*x^2 + 155437*y^2 + 168737*z^2
(301445/371191 : -204184/371191 : 1) C2b (-703549/1268367 : -38629/1268367 : 1)
** u= -266/295 ; C1 -192001*x^2 + 157781*y^2 + 173209*z^2
(-51065/129627 : -123584/129627 : 1) C2b (855797/1519113 : 41819/1519113 : 1)
** u= -266/337 ; C1 -280033*x^2 + 184325*y^2 + 222097*z^2
(-14666/27703 : 1881/2131 : 1) C2b (6985/35829 : 9001/179145 : 1)
** u= -266/341 ; C1 -289337*x^2 + 187037*y^2 + 226937*z^2
(5206/12319 : -11925/12319 : 1) C2b (8297153/24969061 : 1054723/24969061 : 1)
** u= -266/367 ; C1 -353713*x^2 + 205445*y^2 + 259177*z^2
(-817798/1058729 : 512457/1058729 : 1) C2b (491677/1037559 : 17435/1037559 : 1)
** u= -264/119 ; C1 -14837*x^2 - 83857*y^2 + 7297*z^2
(3257/10125 : -2654/10125 : 1) C2a (-2478766/498293 : 52887/498293 : 1)
** u= -264/145 ; C1 -21701*x^2 - 90721*y^2 + 27889*z^2
(-48096/66265 : -28223/66265 : 1) C2a (10934/2505 : -773/3855 : 1)
** u= -264/149 ; C1 -23357*x^2 - 91897*y^2 + 31177*z^2
(14880/48341 : 27139/48341 : 1) C2a (-2258054/1036605 : -87871/1036605 : 1)
** u= -264/161 ; C1 -29285*x^2 - 95617*y^2 + 41233*z^2
(13632/13253 : 4339/13253 : 1) C2a (-9691318/1232109 : 554287/1232109 : 1)
** u= -264/173 ; C1 -36653*x^2 - 99625*y^2 + 51577*z^2
(-1503/18859 : -67694/94295 : 1) C2a (-374092/321961 : -5745/321961 : 1)
** u= -264/257 ; C1 -128549*x^2 - 135745*y^2 + 132049*z^2
(25928/32553 : 19855/32553 : 1) C2a (2462278/108793 : -214125/108793 : 1)
** u= -264/287 ; C1 -178469*x^2 - 152065*y^2 + 164209*z^2
(227979/392489 : 324578/392489 : 1) C2a (-29941406/22274309 : -2402247/22274309 : 1)
** u= -264/293 ; C1 -189533*x^2 - 155545*y^2 + 170857*z^2
(-487707/952711 : 840938/952711 : 1) C2a (-5414618/851949 : -498097/851949 : 1)
** u= -264/349 ; C1 -310157*x^2 - 191497*y^2 + 236377*z^2
(7320/191909 : 213011/191909 : 1) C2a (-4699238/8133331 : 185679/8133331 : 1)
** u= -263/207 ; C1 {+/-} -65650*x^2 + 112018*y^2 + 82562*z^2
(16372/38251 : -30353/38251 : 1) C2a (-783881/660407 : 38421/660407 : 1) C2b (-3119192/4891369 : -237819/4891369 : 1)
** u= -263/231 ; C1 -92962*x^2 - 122530*y^2 + 105698*z^2
(35137043/48265411 : -32754448/48265411 : 1) C2a (1653579/2036783 : 16313/2036783 : 1)
** u= -263/319 ; C1 {+/-} -242386*x^2 + 170930*y^2 + 200386*z^2
(78589/240399 : -242884/240399 : 1) C2a (28091981/27710261 : -2199175/27710261 : 1) C2b (1311188/2955573 :
105833/2955573 : 1)
** u= -262/119 ; C1 -14737*x^2 + 82805*y^2 + 7873*z^2
(-88289/120847 : -1116/120847 : 1) C2b (-341531/158517 : 7187/158517 : 1)
** u= -262/123 ; C1 -15385*x^2 + 83773*y^2 + 10937*z^2
(103949/165859 : -40088/165859 : 1) C2b (-620839/1107523 : -79557/1107523 : 1)
** u= -262/179 ; C1 -41257*x^2 + 100685*y^2 + 57193*z^2
(16474/21273 : -12077/21273 : 1) C2b (-1539237/4878821 : -330875/4878821 : 1)
** u= -262/193 ; C1 -52625*x^2 + 105893*y^2 + 69737*z^2
(-10986/13255 : 1493/2651 : 1) C2b (265457/273349 : -1649/273349 : 1)
** u= -262/221 ; C1 -81241*x^2 + 117485*y^2 + 96001*z^2
(-13159/12869 : -3948/12869 : 1) C2b (-5905827/7209103 : -107797/7209103 : 1)
** u= -262/235 ; C1 -98489*x^2 + 123869*y^2 + 109721*z^2
(-17778/20525 : 11039/20525 : 1) C2b (-571501/998465 : -45001/998465 : 1)
** u= -262/249 ; C1 -117697*x^2 + 130645*y^2 + 123833*z^2
(-594214/672727 : -332969/672727 : 1) C2b (1090331/1470527 : 7875/1470527 : 1)
** u= -262/285 ; C1 -176089*x^2 + 149869*y^2 + 161921*z^2
(207115/227057 : 72796/227057 : 1) C2b (-221249/3722735 : -220899/3722735 : 1)
** u= -262/311 ; C1 -226321*x^2 + 165365*y^2 + 191041*z^2
(47341/57411 : 27212/57411 : 1) C2b (-15411269/81759741 : -4368197/81759741 : 1)
** u= -261/133 ; C1 {+/-} -17714*x^2 + 85810*y^2 + 18994*z^2
(-18404/18741 : -2797/18741 : 1) C2a (-254539/24009 : -10415/24009 : 1) C2b (124294/103169 : -5589/103169 : 1)
** u= -261/197 ; C1 -56498*x^2 - 106930*y^2 + 73522*z^2
(212/189 : -485/3213 : 1) C2a (-12371/12933 : -2053/219861 : 1)
** u= -261/325 ; C1 -256946*x^2 + 173746*y^2 + 207154*z^2
(534783/863881 : -683260/863881 : 1) C2b (566676/1289099 : -44027/1289099 : 1)
** u= -260/113 ; C1 -13925*x^2 - 80369*y^2 + 3929*z^2
(-1096/2137 : -123/2137 : 1) C2a (-5278/465 : -97/465 : 1)
** u= -260/123 ; C1 -15325*x^2 - 82729*y^2 + 11489*z^2
(-5569/7249 : 1246/7249 : 1) C2a (1444350172/6178735 : -47480253/6178735 : 1)
** u= -260/141 ; C1 -20365*x^2 - 87481*y^2 + 25601*z^2
(12148/10873 : 493/10873 : 1) C2a (-4475848/2896505 : 21357/2896505 : 1)
** u= -260/183 ; C1 -44725*x^2 - 101089*y^2 + 61049*z^2
(14069/22805 : 3010/4561 : 1) C2a (-1282944/1230869 : -14033/1230869 : 1)
** u= -260/193 ; C1 -53125*x^2 - 104849*y^2 + 70009*z^2
(16768/49825 : -1557/1993 : 1) C2a (17314/17419 : 293/17419 : 1)
** u= -260/207 ; C1 -66565*x^2 - 110449*y^2 + 82889*z^2
(-45113/76457 : -56218/76457 : 1) C2a (-75248/48497 : 4701/48497 : 1)
** u= -260/253 ; C1 -124525*x^2 - 131609*y^2 + 127969*z^2
(-1897/9311 : -8994/9311 : 1) C2a (7327216/81721 : 637357/81721 : 1)
** u= -260/321 ; C1 -248965*x^2 - 170641*y^2 + 202361*z^2
(-1374208/1646741 : 678671/1646741 : 1) C2a (-827748/1279595 : 37607/1279595 : 1)
** u= -260/343 ; C1 -299125*x^2 - 185249*y^2 + 228409*z^2
(29276/47995 : 129747/163183 : 1) C2a (-718718/982957 : 824533/16710269 : 1)
** u= -259/115 ; C1 {+/-} -14066*x^2 + 80306*y^2 + 5714*z^2
(-3084/22367 : -5825/22367 : 1) C2a (-2813427/3053 : 66203/3053 : 1) C2b (577796/782411 : -56387/782411 : 1)
** u= -259/123 ; C1 -15298*x^2 + 82210*y^2 + 11762*z^2
(-3404/10247 : -3587/10247 : 1) C2b (-33986/171587 : 12645/171587 : 1)
** u= -259/131 ; C1 {+/-} -17170*x^2 + 84242*y^2 + 17938*z^2
(-5968/7439 : 2127/7439 : 1) C2a (1307947/74701 : -52957/74701 : 1) C2b (356448/199931 : -2629/199931 : 1)
** u= -259/163 ; C1 {+/-} -31058*x^2 + 93650*y^2 + 43922*z^2
(-2088/34679 : -23719/34679 : 1) C2a (7276881/542149 : -2189423/2710745 : 1) C2b (52772/85949 : 5309/85949 : 1)
** u= -259/243 ; C1 -110578*x^2 + 126130*y^2 + 117842*z^2
(-13537/14231 : 5344/14231 : 1) C2b (82142/120981 : -3377/120981 : 1)
** u= -259/299 ; C1 -204322*x^2 - 156482*y^2 + 177202*z^2
(25345/43427 : -36012/43427 : 1) C2a (-3970873/1947109 : -355609/1947109 : 1)
** u= -259/331 ; C1 {+/-} -271970*x^2 + 176642*y^2 + 213938*z^2
(21088/34739 : -27873/34739 : 1) C2a (-596889/960167 : 27179/960167 : 1) C2b (-204116/624545 : -26749/624545 : 1)
** u= -259/347 ; C1 -309634*x^2 - 187490*y^2 + 233074*z^2
(30256/152531 : 165561/152531 : 1) C2a (-1029971/322529 : 99949/322529 : 1)
** u= -259/395 ; C1 -437986*x^2 - 223106*y^2 + 293554*z^2
(-573167/906699 : -660880/906699 : 1) C2a (5455487/1478173 : -548033/1478173 : 1)
** u= -258/107 ; C1 -13385*x^2 + 78013*y^2 + 97*z^2
(363/4999 : -92/4999 : 1) C2b (55281/3085 : 151/3085 : 1)
** u= -258/139 ; C1 -19721*x^2 + 85885*y^2 + 24481*z^2
(-6687/15283 : -7504/15283 : 1) C2b (6524691/4431691 : -106873/4431691 : 1)
** u= -258/175 ; C1 -39089*x^2 + 97189*y^2 + 54361*z^2
(22214/19977 : -4975/19977 : 1) C2b (-152791/983839 : 69213/983839 : 1)
** u= -258/241 ; C1 -108257*x^2 + 124645*y^2 + 115873*z^2
(282/7571 : 7295/7571 : 1) C2b (1281/2263 : -24871/581591 : 1)
** u= -258/347 ; C1 -310505*x^2 + 186973*y^2 + 232897*z^2
(479906/765909 : -590107/765909 : 1) C2b (86973/8611211 : 8969/175739 : 1)
** u= -257/113 ; C1 {+/-} -13730*x^2 + 78818*y^2 + 4802*z^2
(17395/29797 : -1176/29797 : 1) C2a (-338557/75999 : -97/1551 : 1) C2b (2422264/776993 : -473/15857 : 1)
** u= -257/121 ; C1 -14866*x^2 - 80690*y^2 + 10786*z^2
(652/1333 : 399/1333 : 1) C2a (-2201299/113561 : 70499/113561 : 1)
** u= -257/145 ; C1 {+/-} -22114*x^2 + 87074*y^2 + 29506*z^2
(2768/3085 : 1131/3085 : 1) C2a (8174131/347441 : -418991/347441 : 1) C2b (-248722/188307 : -5129/188307 : 1)
** u= -257/161 ; C1 {+/-} -30146*x^2 + 91970*y^2 + 42626*z^2
(-29027/28333 : 9792/28333 : 1) C2a (-177729/100891 : 7811/100891 : 1) C2b (343792/540877 : 33085/540877 : 1)
** u= -257/193 ; C1 -53890*x^2 + 103298*y^2 + 70402*z^2
(10708/16317 : 11029/16317 : 1) C2b (18222/70319 : -4699/70319 : 1)
** u= -257/217 ; C1 -78418*x^2 + 113138*y^2 + 92578*z^2
(-61960/60789 : -19049/60789 : 1) C2b (-1685904/2396465 : 87613/2396465 : 1)
** u= -257/233 ; C1 {+/-} -97970*x^2 + 120338*y^2 + 108002*z^2
(543/3413 : -3196/3413 : 1) C2a (2135727/484681 : 175667/484681 : 1) C2b (-3348892/4292711 : 5971/4292711 : 1)
** u= -257/289 ; C1 {+/-} -186562*x^2 + 149570*y^2 + 166018*z^2
(-108868/139629 : 82805/139629 : 1) C2a (-684667/32389 : -63605/32389 : 1) C2b (-211198/2057589 : -118537/2057589 :
1)
** u= -257/305 ; C1 -217634*x^2 + 159074*y^2 + 183746*z^2
(-72844/81613 : 20835/81613 : 1) C2b (694528/1365913 : 39841/1365913 : 1)
** u= -257/329 ; C1 -269042*x^2 - 174290*y^2 + 211298*z^2
(-26049/155357 : -167968/155357 : 1) C2a (223923/28499 : 21697/28499 : 1)
** u= -257/345 ; C1 {+/-} -306514*x^2 + 185074*y^2 + 230306*z^2
(-124163/155281 : 66880/155281 : 1) C2a (2065123/554383 : -201237/554383 : 1) C2b (-1296632/4267415 : -177003/4267415
: 1)
** u= -256/147 ; C1 -23053*x^2 - 87145*y^2 + 31337*z^2
(42653/63241 : -30934/63241 : 1) C2a (10009398/1081271 : 523589/1081271 : 1)
** u= -256/297 ; C1 -202453*x^2 - 153745*y^2 + 174737*z^2
(410252/561169 : -369161/561169 : 1) C2a (-11550328/6282829 : 1025037/6282829 : 1)
** u= -256/303 ; C1 -214309*x^2 - 157345*y^2 + 181409*z^2
(-235768/273887 : -103807/273887 : 1) C2a (609347184/1447229 : -57718595/1447229 : 1)
** u= -256/339 ; C1 -293005*x^2 - 180457*y^2 + 222953*z^2
(112060/274519 : -269663/274519 : 1) C2a (15836904/13891543 : -1376489/13891543 : 1)
** u= -256/375 ; C1 -384661*x^2 - 206161*y^2 + 267089*z^2
(200039/1648805 : 1856698/1648805 : 1) C2a (-224598/226225 : -19891/226225 : 1)
** u= -255/151 ; C1 {+/-} -25010*x^2 + 87826*y^2 + 34786*z^2
(8235/61799 : 38644/61799 : 1) C2a (3443809/808185 : 181949/808185 : 1) C2b (321022/248147 : 2763/248147 : 1)
** u= -255/319 ; C1 -248450*x^2 - 166786*y^2 + 199426*z^2
(-241893/272755 : 8468/54551 : 1) C2a (357331/188545 : 32919/188545 : 1)
** u= -254/159 ; C1 -29377*x^2 + 89797*y^2 + 41537*z^2
(-12265/51407 : 34252/51407 : 1) C2b (1612901/1734017 : 79191/1734017 : 1)
** u= -254/171 ; C1 -36985*x^2 + 93757*y^2 + 51593*z^2
(18883/80867 : -58804/80867 : 1) C2b (-1744109/2584057 : -144297/2584057 : 1)
** u= -254/195 ; C1 -56521*x^2 + 102541*y^2 + 72569*z^2
(-14021/12595 : 81032/516395 : 1) C2b (1573/93765 : -37901/549195 : 1)
** u= -254/213 ; C1 -74953*x^2 + 109885*y^2 + 89057*z^2
(5714/8083 : -5539/8083 : 1) C2b (4612517/5732071 : -118251/5732071 : 1)
** u= -254/261 ; C1 -139945*x^2 + 132637*y^2 + 136193*z^2
(178786/184759 : 36407/184759 : 1) C2b (-1791577/3320779 : -126801/3320779 : 1)
** u= -254/325 ; C1 -262441*x^2 + 170141*y^2 + 206209*z^2
(152506/365075 : 354483/365075 : 1) C2b (-2371109/4546935 : -74821/4546935 : 1)
** u= -254/327 ; C1 -266929*x^2 + 171445*y^2 + 208529*z^2
(-188933/214147 : -14228/214147 : 1) C2b (-532541/21487119 : -1137337/21487119 : 1)
** u= -254/331 ; C1 -276025*x^2 + 174077*y^2 + 213193*z^2
(169102/224985 : -25807/44997 : 1) C2b (9016331/16849065 : 79831/16849065 : 1)
** u= -254/391 ; C1 -431665*x^2 + 217397*y^2 + 286993*z^2
(550739/879003 : -646324/879003 : 1) C2b (-359277/3304651 : -20317/472093 : 1)
** u= -253/125 ; C1 {+/-} -15634*x^2 + 79634*y^2 + 14866*z^2
(11845/58317 : 24644/58317 : 1) C2a (-18189937/7758797 : -390277/7758797 : 1) C2b (1473404/772629 : -10117/772629 :
1)
** u= -253/317 ; C1 {+/-} -245650*x^2 + 164498*y^2 + 196882*z^2
(-545468/827305 : -7203/9733 : 1) C2a (3248537/399889 : 6383/8161 : 1) C2b (-2684624/5875737 : 3767/119913 : 1)
** u= -252/221 ; C1 -84941*x^2 - 112345*y^2 + 96721*z^2
(-37009/39759 : -622/1371 : 1) C2a (844868/181313 : -219/583 : 1)
** u= -252/233 ; C1 -100085*x^2 - 117793*y^2 + 108217*z^2
(-303/1471 : 1382/1471 : 1) C2a (-27926/36327 : 3043/472251 : 1)
** u= -252/265 ; C1 -147509*x^2 - 133729*y^2 + 140281*z^2
(-1920/2429 : 1457/2429 : 1) C2a (944614/811875 : -69653/811875 : 1)
** u= -252/269 ; C1 -154157*x^2 - 135865*y^2 + 144433*z^2
(-206703/257519 : -148390/257519 : 1) C2a (-4480862/343281 : 407033/343281 : 1)
** u= -252/281 ; C1 -175061*x^2 - 142465*y^2 + 157081*z^2
(-16137/27943 : 23258/27943 : 1) C2a (-3102506/174739 : -287205/174739 : 1)
** u= -252/335 ; C1 -286949*x^2 - 175729*y^2 + 217561*z^2
(-7452/117775 : 130699/117775 : 1) C2a (-7128614/13409945 : -106377/13409945 : 1)
** u= -252/391 ; C1 -433781*x^2 - 216385*y^2 + 286441*z^2
(73304/95679 : 36691/95679 : 1) C2a (-3885374/1733481 : 386905/1733481 : 1)
** u= -252/395 ; C1 -445469*x^2 - 219529*y^2 + 291601*z^2
(-79560/140707 : -115991/140707 : 1) C2a (29809198/19987393 : 170799/1175729 : 1)
** u= -251/203 ; C1 -65234*x^2 + 104210*y^2 + 80114*z^2
(-13869/12571 : 80/967 : 1) C2b (4123786/4786961 : -64019/4786961 : 1)
** u= -251/299 ; C1 -209810*x^2 - 152402*y^2 + 176498*z^2
(3360/100843 : 108451/100843 : 1) C2a (-309609/485233 : -1567/69319 : 1)
** u= -251/315 ; C1 {+/-} -242866*x^2 + 162226*y^2 + 194354*z^2
(292085/440491 : 323632/440491 : 1) C2a (-1782783/2396345 : -113321/2396345 : 1) C2b (3160762/6180877 :
136239/6180877 : 1)
** u= -251/395 ; C1 -446546*x^2 - 219026*y^2 + 291314*z^2
(-11937/145471 : -166900/145471 : 1) C2a (10375727/2311647 : 1050857/2311647 : 1)
** u= -250/117 ; C1 -13945*x^2 + 76189*y^2 + 9689*z^2
(-3445/4133 : -8/4133 : 1) C2b (239881/108351 : -2719/108351 : 1)
** u= -250/141 ; C1 -20905*x^2 + 82381*y^2 + 27881*z^2
(-10822/777467 : -452263/777467 : 1) C2b (-243169/248745 : 1889/35535 : 1)
** u= -250/193 ; C1 -55745*x^2 + 99749*y^2 + 71249*z^2
(65298/620039 : 521749/620039 : 1) C2b (-1826287/3290995 : -181379/3290995 : 1)
** u= -250/221 ; C1 -85705*x^2 + 111341*y^2 + 96841*z^2
(27646/26299 : -3639/26299 : 1) C2b (-1999239/4541945 : 249913/4541945 : 1)
** u= -250/251 ; C1 -126505*x^2 + 125501*y^2 + 126001*z^2
(-33770/308637 : 307387/308637 : 1) C2b (522459/1316929 : 67739/1316929 : 1)
** u= -250/257 ; C1 -135745*x^2 + 128549*y^2 + 132049*z^2
(-6002/6339 : -1799/6339 : 1) C2b (-82749/272851 : 15061/272851 : 1)
** u= -250/343 ; C1 -307745*x^2 + 180149*y^2 + 226649*z^2
(32685/135047 : -145328/135047 : 1) C2b (66503/289745 : -12949/289745 : 1)
** u= -250/349 ; C1 -322505*x^2 + 184301*y^2 + 233801*z^2
(-100810/1391579 : -1561671/1391579 : 1) C2b (4264547/12427255 : -26047/731015 : 1)
** u= -250/369 ; C1 -374305*x^2 + 198661*y^2 + 258161*z^2
(81226/1154911 : 1311821/1154911 : 1) C2b (3631/9785 : 273/9785 : 1)
** u= -250/387 ; C1 -424345*x^2 + 212269*y^2 + 280769*z^2
(262/20261 : -23299/20261 : 1) C2b (-503/27603 : -1217/27603 : 1)
** u= -249/385 ; C1 -419666*x^2 - 210226*y^2 + 277954*z^2
(51288/66425 : 24139/66425 : 1) C2a (55387/17703 : 1429819/4549671 : 1)
** u= -248/105 ; C1 -12469*x^2 - 72529*y^2 + 1601*z^2
(-5512/107645 : -15829/107645 : 1) C2a (-3863468/20893 : -50613/20893 : 1)
** u= -248/157 ; C1 -29005*x^2 - 86153*y^2 + 41017*z^2
(-33533/56751 : -33982/56751 : 1) C2a (-491402/68071 : 29507/68071 : 1)
** u= -248/175 ; C1 -41029*x^2 - 92129*y^2 + 55921*z^2
(121964/107155 : -18573/107155 : 1) C2a (-6804238/6372367 : 129883/6372367 : 1)
** u= -248/201 ; C1 -64117*x^2 - 101905*y^2 + 78593*z^2
(1529/26083 : -22874/26083 : 1) C2a (-19394/19583 : -699/19583 : 1)
** u= -248/357 ; C1 -344605*x^2 - 188953*y^2 + 243017*z^2
(-94736/335749 : 8747/8189 : 1) C2a (1387778/1872359 : -106083/1872359 : 1)
** u= -248/359 ; C1 -349781*x^2 - 190385*y^2 + 245441*z^2
(-6951/24749 : 26474/24749 : 1) C2a (75684/154549 : 1853/154549 : 1)
** u= -248/365 ; C1 -365549*x^2 - 194729*y^2 + 252761*z^2
(-57543/149075 : 150434/149075 : 1) C2a (-3831632/5297067 : 294973/5297067 : 1)
** u= -248/395 ; C1 -449789*x^2 - 217529*y^2 + 290441*z^2
(243811/322753 : -127170/322753 : 1) C2a (4405398/670405 : -448151/670405 : 1)
** u= -247/127 ; C1 -16178*x^2 - 77138*y^2 + 17858*z^2
(4680/19303 : 9037/19303 : 1) C2a (2945499/175945 : 124349/175945 : 1)
** u= -247/175 ; C1 {+/-} -41234*x^2 + 91634*y^2 + 56066*z^2
(-112727/332539 : -248880/332539 : 1) C2a (321737/219555 : -937/12915 : 1) C2b (2146/181271 : -751/10663 : 1)
** u= -247/191 ; C1 {+/-} -54706*x^2 + 97490*y^2 + 69826*z^2
(174061/194631 : -100652/194631 : 1) C2a (5027/823 : 371/823 : 1) C2b (-34794/86509 : -5363/86509 : 1)
** u= -247/223 ; C1 {+/-} -89330*x^2 + 110738*y^2 + 98882*z^2
(-6636/6311 : -203/6311 : 1) C2a (-4043/4779 : 127/4779 : 1) C2b (44182/78001 : 503/11143 : 1)
** u= -246/127 ; C1 -16193*x^2 + 76645*y^2 + 18097*z^2
(124951/139047 : -35588/139047 : 1) C2b (17259/109357 : 8021/109357 : 1)
** u= -246/131 ; C1 -17417*x^2 + 77677*y^2 + 21097*z^2
(20706/20365 : -4063/20365 : 1) C2b (311977/210341 : -339/12373 : 1)
** u= -246/245 ; C1 -119561*x^2 + 120541*y^2 + 120049*z^2
(-3005/52977 : -52784/52977 : 1) C2b (-6925403/25504727 : -1472979/25504727 : 1)
** u= -246/343 ; C1 -311249*x^2 + 178165*y^2 + 225889*z^2
(-839547/1039963 : 374020/1039963 : 1) C2b (-6194931/20855609 : -825641/20855609 : 1)
** u= -245/109 ; C1 {+/-} -12610*x^2 + 71906*y^2 + 5266*z^2
(12919/22029 : 2504/22029 : 1) C2a (-1036099/92419 : -23767/92419 : 1) C2b (-156776/183435 : -13073/183435 : 1)
** u= -245/181 ; C1 {+/-} -46450*x^2 + 92786*y^2 + 61426*z^2
(20299/17685 : -176/3537 : 1) C2a (830699/641125 : 39451/641125 : 1) C2b (1171286/1353249 : -42859/1353249 : 1)
** u= -245/381 ; C1 {+/-} -412450*x^2 + 205186*y^2 + 271826*z^2
(-4842544/17271277 : 18655817/17271277 : 1) C2a (-3734613/7565413 : -183209/7565413 : 1) C2b (2539978/6269735 :
-95871/6269735 : 1)
** u= -244/147 ; C1 -24109*x^2 - 81145*y^2 + 33809*z^2
(-6661/8149 : -3806/8149 : 1) C2a (-66494/44429 : -1989/44429 : 1)
** u= -244/155 ; C1 -28381*x^2 - 83561*y^2 + 40129*z^2
(17677/26509 : -15210/26509 : 1) C2a (24531572/800387 : -1498583/800387 : 1)
** u= -244/265 ; C1 -152021*x^2 - 129761*y^2 + 140009*z^2
(-2241/21367 : 375050/363239 : 1) C2a (347052/100273 : -530981/1704641 : 1)
** u= -244/287 ; C1 -191269*x^2 - 141905*y^2 + 162889*z^2
(163103/216753 : -134434/216753 : 1) C2a (945406/987871 : -69623/987871 : 1)
** u= -244/295 ; C1 -206741*x^2 - 146561*y^2 + 171449*z^2
(-155913/172025 : 18094/172025 : 1) C2a (-1890372/2628563 : 105673/2628563 : 1)
** u= -244/357 ; C1 -348349*x^2 - 186985*y^2 + 242129*z^2
(4502933/6552563 : -4221838/6552563 : 1) C2a (2815528/703157 : 280695/703157 : 1)
** u= -244/363 ; C1 -364093*x^2 - 191305*y^2 + 249377*z^2
(-26828/51179 : -45217/51179 : 1) C2a (-95648848/6944989 : 9628359/6944989 : 1)
** u= -244/391 ; C1 -442325*x^2 - 212417*y^2 + 284153*z^2
(-65004/91055 : 9575/18211 : 1) C2a (-5462268/1698631 : 552677/1698631 : 1)
** u= -243/131 ; C1 {+/-} -17522*x^2 + 76210*y^2 + 21778*z^2
(1416/3967 : -2009/3967 : 1) C2a (-71689/42617 : -1281/42617 : 1) C2b (74904/915113 : -67087/915113 : 1)
** u= -243/139 ; C1 -20546*x^2 - 78370*y^2 + 27826*z^2
(-5879/20691 : -11956/20691 : 1) C2a (-2921/1141 : 129/1141 : 1)
** u= -243/227 ; C1 {+/-} -96050*x^2 + 110578*y^2 + 102802*z^2
(-385/9039 : -8708/9039 : 1) C2a (-714151/355747 : -8037/50821 : 1) C2b (51936/169813 : 1429/24259 : 1)
** u= -243/347 ; C1 -323810*x^2 + 179458*y^2 + 230002*z^2
(-166405/248823 : 171424/248823 : 1) C2b (-330268/909659 : -28929/909659 : 1)
** u= -243/371 ; C1 {+/-} -386642*x^2 + 196690*y^2 + 258898*z^2
(122376/153047 : 37321/153047 : 1) C2a (-822521/863 : 83247/863 : 1) C2b (374704/873073 : 9777/873073 : 1)
** u= -242/123 ; C1 -15145*x^2 + 73693*y^2 + 16097*z^2
(-15143/20099 : 6412/20099 : 1) C2b (2171159/1339657 : -41763/1339657 : 1)
** u= -242/157 ; C1 -29833*x^2 + 83213*y^2 + 42073*z^2
(58718/51423 : -10045/51423 : 1) C2b (151563/511565 : -35419/511565 : 1)
** u= -242/161 ; C1 -32321*x^2 + 84485*y^2 + 45281*z^2
(-15963/16637 : -7132/16637 : 1) C2b (885583/2649233 : -180191/2649233 : 1)
** u= -242/195 ; C1 -59929*x^2 + 96589*y^2 + 73841*z^2
(-33194/34253 : 14605/34253 : 1) C2b (457301/572341 : 16503/572341 : 1)
** u= -242/259 ; C1 -143257*x^2 + 125645*y^2 + 133873*z^2
(33823/166451 : -167976/166451 : 1) C2b (499757/1214169 : 57125/1214169 : 1)
** u= -242/265 ; C1 -153169*x^2 + 128789*y^2 + 139921*z^2
(-112421/121093 : -30000/121093 : 1) C2b (-888667/3000165 : -158213/3000165 : 1)
** u= -242/335 ; C1 -295409*x^2 + 170789*y^2 + 215801*z^2
(-31533/61775 : -55696/61775 : 1) C2b (-2892497/7591727 : -245299/7591727 : 1)
** u= -241/145 ; C1 -23426*x^2 - 79106*y^2 + 32834*z^2
(1317/28861 : 18580/28861 : 1) C2a (3601959/16531 : 204709/16531 : 1)
** u= -241/201 ; C1 -66322*x^2 - 98482*y^2 + 79202*z^2
(-48556/45185 : 7363/45185 : 1) C2a (203567/150245 : -63/755 : 1)
** u= -241/273 ; C1 -167554*x^2 + 132610*y^2 + 148034*z^2
(49568/149873 : -148223/149873 : 1) C2b (-117164/1268671 : 72927/1268671 : 1)
** u= -241/369 ; C1 -383170*x^2 - 194242*y^2 + 255938*z^2
(-163360/490313 : 513929/490313 : 1) C2a (-435963/577381 : 35813/577381 : 1)
** u= -240/127 ; C1 -16325*x^2 - 73729*y^2 + 19489*z^2
(-2628/19415 : 1981/3883 : 1) C2a (631954/96455 : 27771/96455 : 1)
** u= -240/133 ; C1 -18365*x^2 - 75289*y^2 + 23929*z^2
(18209/25971 : -11554/25971 : 1) C2a (310726/61929 : 14773/61929 : 1)
** u= -240/257 ; C1 -141125*x^2 - 123649*y^2 + 131809*z^2
(37236/40357 : 12397/40357 : 1) C2a (2587738/2105775 : 198787/2105775 : 1)
** u= -240/349 ; C1 -331565*x^2 - 179401*y^2 + 231721*z^2
(-163156/281949 : -231259/281949 : 1) C2a (155984/310481 : 5343/310481 : 1)
** u= -239/103 ; C1 {+/-} -11698*x^2 + 67730*y^2 + 2722*z^2
(56356/124767 : 8779/124767 : 1) C2a (16157029/3370267 : 138439/3370267 : 1) C2b (-150528/80971 : -5383/80971 : 1)
** u= -239/127 ; C1 {+/-} -16354*x^2 + 73250*y^2 + 19714*z^2
(28/27 : -23/135 : 1) C2a (467851/276671 : -33509/1383355 : 1) C2b (-36884/27219 : -5369/136095 : 1)
** u= -239/351 ; C1 {+/-} -337570*x^2 + 180322*y^2 + 233858*z^2
(-51995/159667 : 167336/159667 : 1) C2a (-8143759/9153617 : 696759/9153617 : 1) C2b (-190238/414925 : -3543/414925 :
1)
** u= -238/103 ; C1 -11633*x^2 + 67253*y^2 + 2993*z^2
(8442/19553 : -2165/19553 : 1) C2b (-114209/47497 : -2809/47497 : 1)
** u= -238/115 ; C1 -13289*x^2 + 69869*y^2 + 11321*z^2
(-114082/123629 : 1065/123629 : 1) C2b (-753257/2489113 : 182081/2489113 : 1)
** u= -238/125 ; C1 -15769*x^2 + 72269*y^2 + 18481*z^2
(19970/19527 : -3239/19527 : 1) C2b (-1502957/916965 : 7433/916965 : 1)
** u= -238/131 ; C1 -17737*x^2 + 73805*y^2 + 22873*z^2
(-14506/13593 : 2587/13593 : 1) C2b (1522469/1205073 : 46975/1205073 : 1)
** u= -238/171 ; C1 -40057*x^2 + 85885*y^2 + 53993*z^2
(17729/24023 : -14704/24023 : 1) C2b (-7243963/8464389 : -310531/8464389 : 1)
** u= -238/173 ; C1 -41593*x^2 + 86573*y^2 + 55633*z^2
(-21550/48631 : -36009/48631 : 1) C2b (2376213/2975465 : -123131/2975465 : 1)
** u= -238/191 ; C1 -57217*x^2 + 93125*y^2 + 70753*z^2
(-74/201 : 4133/5025 : 1) C2b (45169/51309 : 9859/1282725 : 1)
** u= -238/195 ; C1 -61129*x^2 + 94669*y^2 + 74201*z^2
(23143/42095 : -32296/42095 : 1) C2b (489643/687697 : 26529/687697 : 1)
** u= -238/225 ; C1 -95569*x^2 + 107269*y^2 + 101081*z^2
(-12998/104611 : -100805/104611 : 1) C2b (712313/4391033 : -274581/4391033 : 1)
** u= -238/249 ; C1 -129601*x^2 + 118645*y^2 + 123881*z^2
(238/487 : -431/487 : 1) C2b (-1300993/5692187 : 326343/5692187 : 1)
** u= -238/261 ; C1 -148777*x^2 + 124765*y^2 + 135713*z^2
(19871/21637 : -6196/21637 : 1) C2b (-856747/1410591 : -27997/1410591 : 1)
** u= -238/263 ; C1 -152113*x^2 + 125813*y^2 + 137713*z^2
(509054/538725 : -66103/538725 : 1) C2b (-8443459/68451945 : -3964753/68451945 : 1)
** u= -238/265 ; C1 -155489*x^2 + 126869*y^2 + 139721*z^2
(29050/104339 : 104667/104339 : 1) C2b (-13756457/31785803 : 1366009/31785803 : 1)
** u= -238/283 ; C1 -187673*x^2 + 136733*y^2 + 158153*z^2
(1330/29261 : -31431/29261 : 1) C2b (243859/443413 : 9341/443413 : 1)
** u= -238/327 ; C1 -279985*x^2 + 163573*y^2 + 205937*z^2
(80182/124369 : -92027/124369 : 1) C2b (596729/1180867 : -2517/1180867 : 1)
** u= -238/341 ; C1 -313417*x^2 + 172925*y^2 + 221953*z^2
(-490/2063 : -11211/10315 : 1) C2b (-14497/177735 : 42097/888675 : 1)
** u= -238/379 ; C1 -414041*x^2 + 200285*y^2 + 267401*z^2
(203481/312031 : 210704/312031 : 1) C2b (4127387/159663707 : 6788483/159663707 : 1)
** u= -238/389 ; C1 -442921*x^2 + 207965*y^2 + 279841*z^2
(-1058/1407 : -529/1407 : 1) C2b (-44371/766521 : 59/1449 : 1)
** u= -237/101 ; C1 -11426*x^2 - 66370*y^2 + 1906*z^2
(-13403/33537 : -1172/33537 : 1) C2a (14477/2737 : -75/2737 : 1)
** u= -237/133 ; C1 -18530*x^2 - 73858*y^2 + 24562*z^2
(-183291/178033 : -45956/178033 : 1) C2a (-34381/11613 : -1529/11613 : 1)
** u= -237/173 ; C1 {+/-} -41810*x^2 + 86098*y^2 + 55762*z^2
(-15176/15537 : -6671/15537 : 1) C2a (73763/33509 : 669/4787 : 1) C2b (78312/506989 : -5003/72427 : 1)
** u= -237/365 ; C1 {+/-} -376274*x^2 + 189394*y^2 + 250066*z^2
(-864088/1133721 : -462265/1133721 : 1) C2a (-184391/373399 : -8631/373399 : 1) C2b (-30192/70775 : -713/70775 : 1)
** u= -236/135 ; C1 -19381*x^2 - 73921*y^2 + 26249*z^2
(3817/18065 : -10586/18065 : 1) C2a (-3418274/2462005 : 1653/2462005 : 1)
** u= -236/145 ; C1 -23941*x^2 - 76721*y^2 + 33769*z^2
(26509/23235 : 4282/23235 : 1) C2a (-14338678/1212793 : -834593/1212793 : 1)
** u= -236/153 ; C1 -28309*x^2 - 79105*y^2 + 39929*z^2
(-292/4813 : -3415/4813 : 1) C2a (-100536/50099 : 5177/50099 : 1)
** u= -236/163 ; C1 -34669*x^2 - 82265*y^2 + 47809*z^2
(61213/177813 : 129598/177813 : 1) C2a (-11966096/8324699 : -547655/8324699 : 1)
** u= -236/189 ; C1 -55885*x^2 - 91417*y^2 + 69233*z^2
(-9344/34277 : 28921/34277 : 1) C2a (-37262828/7183799 : 2818437/7183799 : 1)
** u= -236/259 ; C1 -146605*x^2 - 122777*y^2 + 133633*z^2
(-42628/68743 : -54531/68743 : 1) C2a (5422606/3013405 : 466003/3013405 : 1)
** u= -236/273 ; C1 -170629*x^2 - 130225*y^2 + 147689*z^2
(-49156/69145 : 237497/345725 : 1) C2a (485364/393491 : -39625/393491 : 1)
** u= -236/285 ; C1 -192781*x^2 - 136921*y^2 + 160049*z^2
(43732/50941 : 18455/50941 : 1) C2a (187959124/92009 : -17926821/92009 : 1)
** u= -236/311 ; C1 -245717*x^2 - 152417*y^2 + 187817*z^2
(-93912/866087 : 953995/866087 : 1) C2a (1140164/1893675 : -7537/270525 : 1)
** u= -236/315 ; C1 -254461*x^2 - 154921*y^2 + 192209*z^2
(-174716/206515 : 52673/206515 : 1) C2a (-279007152/529720067 : -3245167/529720067 : 1)
** u= -235/107 ; C1 -11890*x^2 - 66674*y^2 + 6514*z^2
(1004/1603 : 267/1603 : 1) C2a (-70837891/2392345 : 1945199/2392345 : 1)
** u= -234/127 ; C1 -16529*x^2 + 70885*y^2 + 20809*z^2
(-33453/72167 : 35608/72167 : 1) C2b (-560961/1500509 : -106775/1500509 : 1)
** u= -234/155 ; C1 -29801*x^2 + 78781*y^2 + 41809*z^2
(7514/47505 : 34297/47505 : 1) C2b (55259/51125 : -849/51125 : 1)
** u= -234/185 ; C1 -52721*x^2 + 88981*y^2 + 66049*z^2
(-28527/95345 : 79156/95345 : 1) C2b (376601/530705 : -87/2065 : 1)
** u= -234/197 ; C1 -64409*x^2 + 93565*y^2 + 76249*z^2
(330526/833871 : -701035/833871 : 1) C2b (-3993409/6528091 : -300867/6528091 : 1)
** u= -234/203 ; C1 -70793*x^2 + 95965*y^2 + 81457*z^2
(-23118/26441 : -14113/26441 : 1) C2b (-714753/998939 : -31897/998939 : 1)
** u= -234/245 ; C1 -125561*x^2 + 114781*y^2 + 119929*z^2
(31931/50157 : 38900/50157 : 1) C2b (-290327/3347003 : -202131/3347003 : 1)
** u= -234/301 ; C1 -226025*x^2 + 145357*y^2 + 176713*z^2
(34515/56101 : -44428/56101 : 1) C2b (3139233/8386751 : -323279/8386751 : 1)
** u= -234/353 ; C1 -347393*x^2 + 179365*y^2 + 235057*z^2
(191377/317529 : 247376/317529 : 1) C2b (-1276437/4293631 : -146687/4293631 : 1)
** u= -233/257 ; C1 {+/-} -145010*x^2 + 120338*y^2 + 131522*z^2
(7236/20161 : -19523/20161 : 1) C2a (-666807/1027081 : 9893/1027081 : 1) C2b (1099604/1775663 : -26957/1775663 : 1)
** u= -233/289 ; C1 {+/-} -202546*x^2 + 137810*y^2 + 163906*z^2
(59276/85541 : -59487/85541 : 1) C2a (9931853/1561103 : 951707/1561103 : 1) C2b (-292994/2135931 : 113083/2135931 :
1)
** u= -232/99 ; C1 -10957*x^2 - 63625*y^2 + 1913*z^2
(-917/5561 : 886/5561 : 1) C2a (879608/12331 : 67119/61655 : 1)
** u= -232/245 ; C1 -126589*x^2 - 113849*y^2 + 119881*z^2
(-73009/83675 : 38022/83675 : 1) C2a (147514774/102240379 : 11828681/102240379 : 1)
** u= -232/253 ; C1 -139085*x^2 - 117833*y^2 + 127577*z^2
(-344120/369953 : 91689/369953 : 1) C2a (408575064/330494755 : 31934933/330494755 : 1)
** u= -232/295 ; C1 -215189*x^2 - 140849*y^2 + 170081*z^2
(136040/270167 : 244671/270167 : 1) C2a (84/151 : 1/151 : 1)
** u= -232/309 ; C1 -244477*x^2 - 149305*y^2 + 185033*z^2
(-303421/435023 : -289450/435023 : 1) C2a (-45316222/61468681 : 3128739/61468681 : 1)
** u= -232/339 ; C1 -313837*x^2 - 168745*y^2 + 218393*z^2
(-32144/229283 : -257131/229283 : 1) C2a (-201764/255787 : 2325/36541 : 1)
** u= -232/371 ; C1 -397741*x^2 - 191465*y^2 + 255961*z^2
(-5188/9207 : -7577/9207 : 1) C2a (1934/3149 : -37343/809293 : 1)
** u= -232/375 ; C1 -408949*x^2 - 194449*y^2 + 260801*z^2
(-113236/168923 : -106325/168923 : 1) C2a (107746/173891 : 8271/173891 : 1)
** u= -231/295 ; C1 {+/-} -215906*x^2 + 140386*y^2 + 169954*z^2
(1354677/3285835 : -3201304/3285835 : 1) C2a (368483/262457 : -32913/262457 : 1) C2b (-389758/714923 : 4761/714923 :
1)
** u= -230/113 ; C1 -12785*x^2 + 65669*y^2 + 11849*z^2
(-6630/8239 : -1921/8239 : 1) C2b (331919/183481 : -317/10793 : 1)
** u= -230/139 ; C1 -21625*x^2 + 72221*y^2 + 30361*z^2
(30941/112755 : -14224/22551 : 1) C2b (1295957/1588377 : -88097/1588377 : 1)
** u= -230/189 ; C1 -57625*x^2 + 88621*y^2 + 69761*z^2
(6082/7415 : -877/1483 : 1) C2b (131707/171077 : -5247/171077 : 1)
** u= -230/219 ; C1 -91225*x^2 + 100861*y^2 + 95801*z^2
(614/15365 : -50875/52241 : 1) C2b (7969/74605 : 80139/1268285 : 1)
** u= -230/279 ; C1 -185425*x^2 + 130741*y^2 + 153281*z^2
(-578417/786335 : -100084/157267 : 1) C2b (-1318571/2270421 : -371/2270421 : 1)
** u= -230/289 ; C1 -204625*x^2 + 136421*y^2 + 163561*z^2
(-127199/194005 : -28884/38801 : 1) C2b (1137191/2151495 : 37987/2151495 : 1)
** u= -230/293 ; C1 -212585*x^2 + 138749*y^2 + 167729*z^2
(850/2147 : 27471/27911 : 1) C2b (-9589/76205 : -51541/990665 : 1)
** u= -230/309 ; C1 -246025*x^2 + 148381*y^2 + 184721*z^2
(-46358/53935 : 1525/10787 : 1) C2b (-1137413/2842013 : -92487/2842013 : 1)
** u= -230/357 ; C1 -361705*x^2 + 180349*y^2 + 238769*z^2
(2798/19687 : -22303/19687 : 1) C2b (-69071/2586195 : -113537/2586195 : 1)
** u= -230/371 ; C1 -399785*x^2 + 190541*y^2 + 255401*z^2
(-15427/29851 : 26364/29851 : 1) C2b (-3232921/8229545 : 99017/8229545 : 1)
** u= -230/377 ; C1 -416705*x^2 + 195029*y^2 + 262649*z^2
(36103/90421 : 90696/90421 : 1) C2b (-1160357/3248035 : 60079/3248035 : 1)
** u= -229/101 ; C1 {+/-} -10930*x^2 + 62642*y^2 + 4018*z^2
(2408/4701 : 637/4701 : 1) C2a (-1701799/219485 : 4909/31355 : 1) C2b (-12946/5553 : 293/5553 : 1)
** u= -228/161 ; C1 -34757*x^2 - 77905*y^2 + 47353*z^2
(2124/9497 : 7267/9497 : 1) C2a (-2687482/1669251 : 142547/1669251 : 1)
** u= -228/163 ; C1 -36173*x^2 - 78553*y^2 + 48913*z^2
(7657/6585 : -46/6585 : 1) C2a (-2890238/2142895 : 133383/2142895 : 1)
** u= -228/217 ; C1 -89525*x^2 - 99073*y^2 + 94057*z^2
(11685/40067 : 37426/40067 : 1) C2a (-189308/249289 : -3363/249289 : 1)
** u= -228/235 ; C1 -113789*x^2 - 107209*y^2 + 110401*z^2
(6464/7563 : 3815/7563 : 1) C2a (50399228/2293945 : -4509531/2293945 : 1)
** u= -228/277 ; C1 -183005*x^2 - 128713*y^2 + 151057*z^2
(12472/40293 : 41039/40293 : 1) C2a (1722022/2861665 : -44031/2861665 : 1)
** u= -228/329 ; C1 -293141*x^2 - 160225*y^2 + 206281*z^2
(-723/1163 : 886/1163 : 1) C2a (-54646/105835 : 10503/529175 : 1)
** u= -227/147 ; C1 -26098*x^2 + 73138*y^2 + 36818*z^2
(-43/67 : 40/67 : 1) C2b (-851896/2219545 : -149967/2219545 : 1)
** u= -227/243 ; C1 {+/-} -126130*x^2 + 110578*y^2 + 117842*z^2
(73009/160663 : 146384/160663 : 1) C2a (208251/247627 : -11741/247627 : 1) C2b (572194/1867953 : 99533/1867953 : 1)
** u= -227/291 ; C1 {+/-} -210706*x^2 + 136210*y^2 + 165266*z^2
(-65012/74683 : -15139/74683 : 1) C2a (-9703/6607 : 224865/1697999 : 1) C2b (-184/2299 : -31077/590843 : 1)
** u= -227/339 ; C1 -318322*x^2 - 166450*y^2 + 217298*z^2
(-22981/39475 : 160024/197375 : 1) C2a (57153/14375 : -28613/71875 : 1)
** u= -226/157 ; C1 -32393*x^2 + 75725*y^2 + 44537*z^2
(-31878/30467 : 52733/152335 : 1) C2b (-19/41 : -13/205 : 1)
** u= -226/171 ; C1 -42697*x^2 + 80317*y^2 + 55457*z^2
(-27595/29639 : 14204/29639 : 1) C2b (-187051/279893 : 13719/279893 : 1)
** u= -226/199 ; C1 -69185*x^2 + 90677*y^2 + 78473*z^2
(44001/41419 : -2728/41419 : 1) C2b (-4523/182879 : 12059/182879 : 1)
** u= -226/217 ; C1 -90353*x^2 + 98165*y^2 + 94097*z^2
(-66258/67531 : -18185/67531 : 1) C2b (123577/4602649 : 292567/4602649 : 1)
** u= -226/219 ; C1 -92905*x^2 + 99037*y^2 + 95873*z^2
(-2009/2099 : 692/2099 : 1) C2b (4713587/11030709 : -566329/11030709 : 1)
** u= -226/243 ; C1 -126649*x^2 + 110125*y^2 + 117809*z^2
(367/28747 : -148652/143735 : 1) C2b (-295259/553611 : -97123/2768055 : 1)
** u= -226/297 ; C1 -223633*x^2 + 139285*y^2 + 171377*z^2
(706418/807779 : 40273/807779 : 1) C2b (-1926493/5864779 : 14139/344987 : 1)
** u= -226/317 ; C1 -266953*x^2 + 151565*y^2 + 192697*z^2
(-8447/94921 : 106440/94921 : 1) C2b (-2380257/5696591 : 148823/5696591 : 1)
** u= -226/357 ; C1 -365593*x^2 + 178525*y^2 + 237737*z^2
(17258/54539 : 57889/54539 : 1) C2b (-100279/995607 : -41617/995607 : 1)
** u= -226/367 ; C1 -392753*x^2 + 185765*y^2 + 249497*z^2
(-517067/1182991 : -1146444/1182991 : 1) C2b (4568179/14005157 : -346255/14005157 : 1)
** u= -225/137 ; C1 -21170*x^2 - 69394*y^2 + 29794*z^2
(-1676/1449 : -211/1449 : 1) C2a (606973/161413 : 33081/161413 : 1)
** u= -225/169 ; C1 {+/-} -41330*x^2 + 79186*y^2 + 53986*z^2
(-868/4533 : 62729/77061 : 1) C2a (321899/46635 : 394777/792795 : 1) C2b (6422/7873 : -4809/133841 : 1)
** u= -225/217 ; C1 {+/-} -90770*x^2 + 97714*y^2 + 94114*z^2
(83652/82561 : 8051/82561 : 1) C2a (-1143307/1395417 : -44179/1395417 : 1) C2b (13459518/18384845 : 63731/18384845 :
1)
** u= -225/257 ; C1 -149570*x^2 + 116674*y^2 + 131074*z^2
(3855/57857 : -61168/57857 : 1) C2b (254956/449705 : -10377/449705 : 1)
** u= -225/313 ; C1 -258770*x^2 + 148594*y^2 + 188194*z^2
(-22519/29037 : 13592/29037 : 1) C2b (190642/804877 : -35043/804877 : 1)
** u= -224/103 ; C1 -10933*x^2 - 60785*y^2 + 6577*z^2
(13721/24853 : -198/857 : 1) C2a (-1604836/78857 : 46201/78857 : 1)
** u= -224/153 ; C1 -30133*x^2 - 73585*y^2 + 41777*z^2
(-7493/8479 : -4222/8479 : 1) C2a (18988506/658297 : -1261291/658297 : 1)
** u= -224/163 ; C1 -36973*x^2 - 76745*y^2 + 49417*z^2
(9868/17871 : -12599/17871 : 1) C2a (-11775832/1455661 : 827341/1455661 : 1)
** u= -224/167 ; C1 -39989*x^2 - 78065*y^2 + 52529*z^2
(-12817/11293 : -1290/11293 : 1) C2a (-24256/11019 : -1579/11019 : 1)
** u= -224/179 ; C1 -49997*x^2 - 82217*y^2 + 62057*z^2
(-230628/493867 : 22915/29051 : 1) C2a (-36210924/40198877 : 426893/40198877 : 1)
** u= -224/195 ; C1 -65581*x^2 - 88201*y^2 + 75209*z^2
(-40105/111637 : -97114/111637 : 1) C2a (-1038322/100235 : -84321/100235 : 1)
** u= -224/215 ; C1 -88661*x^2 - 96401*y^2 + 92369*z^2
(-96729/155573 : 120770/155573 : 1) C2a (12184954/6688251 : -962321/6688251 : 1)
** u= -224/227 ; C1 -104429*x^2 - 101705*y^2 + 103049*z^2
(81456/182891 : -164555/182891 : 1) C2a (-213788/37767 : 18839/37767 : 1)
** u= -224/239 ; C1 -121637*x^2 - 107297*y^2 + 114017*z^2
(-2429/2585 : 642/2585 : 1) C2a (43052194/2979105 : -3910909/2979105 : 1)
** u= -224/249 ; C1 -137077*x^2 - 112177*y^2 + 123377*z^2
(-383668/525245 : -351499/525245 : 1) C2a (246444/135257 : 21367/135257 : 1)
** u= -224/375 ; C1 -417301*x^2 - 190801*y^2 + 258449*z^2
(11047/16229 : -123230/210977 : 1) C2a (-1533108/214423 : 2043259/2787499 : 1)
** u= -224/397 ; C1 -482509*x^2 - 207785*y^2 + 285289*z^2
(168161/280531 : 205878/280531 : 1) C2a (16296314/43458379 : -588991/43458379 : 1)
** u= -223/247 ; C1 {+/-} -134450*x^2 + 110738*y^2 + 121442*z^2
(-73437/77375 : 844/15475 : 1) C2a (46319/48213 : -3199/48213 : 1) C2b (36939658/88085735 : -3913217/88085735 : 1)
** u= -223/255 ; C1 -147394*x^2 - 114754*y^2 + 129026*z^2
(84293/217355 : -209744/217355 : 1) C2a (876947/69283 : -81933/69283 : 1)
** u= -223/303 ; C1 -238498*x^2 + 141538*y^2 + 177218*z^2
(-7532/35855 : -38911/35855 : 1) C2b (-174182/344759 : -2907/344759 : 1)
** u= -223/335 ; C1 {+/-} -312034*x^2 + 161954*y^2 + 211906*z^2
(6889/8495 : 1728/8495 : 1) C2a (-689657/17677 : 69587/17677 : 1) C2b (-202378/653955 : 21817/653955 : 1)
** u= -222/119 ; C1 -14417*x^2 + 63445*y^2 + 17713*z^2
(4203/9371 : -4528/9371 : 1) C2b (680149/1236383 : 85095/1236383 : 1)
** u= -222/121 ; C1 -15041*x^2 + 63925*y^2 + 19081*z^2
(37/369 : 1004/1845 : 1) C2b (917071/1131457 : -351153/5657285 : 1)
** u= -222/149 ; C1 -27977*x^2 + 71485*y^2 + 39073*z^2
(843/761 : 196/761 : 1) C2b (-460671/426073 : 125209/12356117 : 1)
** u= -222/173 ; C1 -45305*x^2 + 79213*y^2 + 57457*z^2
(81762/76931 : -21667/76931 : 1) C2b (-2045097/4218985 : -245917/4218985 : 1)
** u= -222/191 ; C1 -62081*x^2 + 85765*y^2 + 72001*z^2
(-17547/23683 : -15748/23683 : 1) C2b (48279/80449 : -3665/80449 : 1)
** u= -222/217 ; C1 -92033*x^2 + 96373*y^2 + 94153*z^2
(17821/28065 : 21592/28065 : 1) C2b (-562269/4729877 : -294289/4729877 : 1)
** u= -222/319 ; C1 -274817*x^2 + 151045*y^2 + 194113*z^2
(-8506/74493 : -83665/74493 : 1) C2b (-4111/13523 : -501/13523 : 1)
** u= -222/341 ; C1 -327881*x^2 + 165565*y^2 + 218401*z^2
(-90686/123819 : 62747/123819 : 1) C2b (-4497111/13478689 : -390869/13478689 : 1)
** u= -221/101 ; C1 {+/-} -10562*x^2 + 59042*y^2 + 6002*z^2
(24888/38533 : 6335/38533 : 1) C2a (-286059/57815 : 6811/57815 : 1) C2b (693718/263381 : 157/263381 : 1)
** u= -221/373 ; C1 {+/-} -414754*x^2 + 187970*y^2 + 255154*z^2
(33512/43037 : -6015/43037 : 1) C2a (-3107041/8041879 : -46235/8041879 : 1) C2b (228004/623439 : 7133/623439 : 1)
** u= -220/137 ; C1 -21685*x^2 - 67169*y^2 + 30649*z^2
(8791/41607 : -27658/41607 : 1) C2a (-4314746/517405 : 254389/517405 : 1)
** u= -220/171 ; C1 -44125*x^2 - 77641*y^2 + 56081*z^2
(-11992/11155 : 571/2231 : 1) C2a (-14105792/1166293 : -1054521/1166293 : 1)
** u= -220/173 ; C1 -45805*x^2 - 78329*y^2 + 57649*z^2
(-176621/207171 : 115526/207171 : 1) C2a (-20885546/12294415 : -1337209/12294415 : 1)
** u= -220/207 ; C1 -80485*x^2 - 91249*y^2 + 85529*z^2
(23033/28529 : -17174/28529 : 1) C2a (-2049876/2727349 : -7/87979 : 1)
** u= -220/263 ; C1 -162805*x^2 - 117569*y^2 + 136489*z^2
(207160/513963 : 497233/513963 : 1) C2a (2412152/1149485 : -220033/1149485 : 1)
** u= -220/353 ; C1 -360805*x^2 - 173009*y^2 + 231529*z^2
(188036/249657 : 98357/249657 : 1) C2a (61154266/11099365 : -6223261/11099365 : 1)
** u= -218/139 ; C1 -22921*x^2 + 66845*y^2 + 32401*z^2
(20401/20251 : 7488/20251 : 1) C2b (-264901/488079 : -31093/488079 : 1)
** u= -218/145 ; C1 -26209*x^2 + 68549*y^2 + 36721*z^2
(4354/3683 : -135/3683 : 1) C2b (156751/157611 : 4907/157611 : 1)
** u= -218/181 ; C1 -53497*x^2 + 80285*y^2 + 64153*z^2
(-17263/596169 : -532732/596169 : 1) C2b (-9979977/13394131 : 441781/13394131 : 1)
** u= -218/199 ; C1 -72001*x^2 + 87125*y^2 + 78841*z^2
(154/269 : -1071/1345 : 1) C2b (-48827/73227 : 1733/52305 : 1)
** u= -218/203 ; C1 -76553*x^2 + 88733*y^2 + 82193*z^2
(56346/112181 : -94435/112181 : 1) C2b (227053/407041 : 17813/407041 : 1)
** u= -218/211 ; C1 -86137*x^2 + 92045*y^2 + 88993*z^2
(-74282/142801 : 120633/142801 : 1) C2b (26356049/68945793 : -3723341/68945793 : 1)
** u= -218/267 ; C1 -171145*x^2 + 118813*y^2 + 140177*z^2
(117809/143987 : -66844/143987 : 1) C2b (-22597/525645 : -28873/525645 : 1)
** u= -218/273 ; C1 -182113*x^2 + 122053*y^2 + 146033*z^2
(-65162/74947 : -19625/74947 : 1) C2b (-2449597/5329269 : 165677/5329269 : 1)
** u= -218/351 ; C1 -357457*x^2 + 170725*y^2 + 228713*z^2
(-6158/8737 : -23909/43685 : 1) C2b (-116623/360491 : -9345/360491 : 1)
** u= -218/365 ; C1 -395369*x^2 + 180749*y^2 + 244841*z^2
(-9366/101327 : -117115/101327 : 1) C2b (-391763/4003523 : 154019/4003523 : 1)
** u= -218/369 ; C1 -406561*x^2 + 183685*y^2 + 249521*z^2
(6302/19943 : 21269/19943 : 1) C2b (168697/470253 : -6131/470253 : 1)
** u= -218/377 ; C1 -429425*x^2 + 189653*y^2 + 258977*z^2
(-13862/20435 : 2325/4087 : 1) C2b (-2203187/6734489 : -115481/6734489 : 1)
** u= -218/383 ; C1 -446993*x^2 + 194213*y^2 + 266153*z^2
(-17838/78745 : -88121/78745 : 1) C2b (27547/423265 : 15341/423265 : 1)
** u= -218/391 ; C1 -470977*x^2 + 200405*y^2 + 275833*z^2
(-878078/1147589 : 25275/1147589 : 1) C2b (377881/1120317 : -7577/1120317 : 1)
** u= -217/185 ; C1 -57634*x^2 + 81314*y^2 + 67426*z^2
(-6080/29813 : 26661/29813 : 1) C2b (-199014/547045 : 32839/547045 : 1)
** u= -217/225 ; C1 {+/-} -104914*x^2 + 97714*y^2 + 101186*z^2
(22373/68761 : 66020/68761 : 1) C2a (518071/268351 : 43509/268351 : 1) C2b (-2639284/4134135 : -88979/4134135 : 1)
** u= -217/289 ; C1 {+/-} -213842*x^2 + 130610*y^2 + 161858*z^2
(-3944/39737 : -43947/39737 : 1) C2a (-827359/1565517 : 10183/1565517 : 1) C2b (-5067214/9767617 : 72953/9767617 : 1)
** u= -217/297 ; C1 {+/-} -230338*x^2 + 135298*y^2 + 170018*z^2
(39640/75313 : 1259/1421 : 1) C2a (1573091/69493 : -155523/69493 : 1) C2b (-507508/1060731 : -17933/1060731 : 1)
** u= -217/353 ; C1 -363730*x^2 - 171698*y^2 + 230722*z^2
(-1133/2433 : 670388/712869 : 1) C2a (-21811/19265 : -610271/5644645 : 1)
** u= -216/115 ; C1 -13421*x^2 - 59881*y^2 + 16249*z^2
(-27625/29469 : -8038/29469 : 1) C2a (10198/1723 : -115959/442811 : 1)
** u= -216/157 ; C1 -34253*x^2 - 71305*y^2 + 45817*z^2
(-3544/10833 : -8329/10833 : 1) C2a (2743564/1954073 : 137553/1954073 : 1)
** u= -216/211 ; C1 -86957*x^2 - 91177*y^2 + 89017*z^2
(-269725/323889 : -181754/323889 : 1) C2a (196708/237881 : 8289/237881 : 1)
** u= -216/259 ; C1 -158285*x^2 - 113737*y^2 + 132313*z^2
(-3099/3721 : 21526/48373 : 1) C2a (-77864/132095 : -537/132095 : 1)
** u= -216/359 ; C1 -380885*x^2 - 175537*y^2 + 237313*z^2
(118440/152807 : 33601/152807 : 1) C2a (3226594/1243717 : 327159/1243717 : 1)
** u= -216/377 ; C1 -431573*x^2 - 188785*y^2 + 258337*z^2
(-97564/133617 : 51679/133617 : 1) C2a (2541928/965711 : 259833/965711 : 1)
** u= -215/391 ; C1 -474370*x^2 - 199106*y^2 + 274786*z^2
(127184/186711 : 97841/186711 : 1) C2a (5975777/6030217 : 582959/6030217 : 1)
** u= -214/111 ; C1 -12385*x^2 + 58117*y^2 + 14033*z^2
(-49406/75301 : -29137/75301 : 1) C2b (-83863/56005 : 1947/56005 : 1)
** u= -214/113 ; C1 -12913*x^2 + 58565*y^2 + 15337*z^2
(-17633/80541 : 40376/80541 : 1) C2b (-286623/179851 : 391/25693 : 1)
** u= -214/125 ; C1 -16921*x^2 + 61421*y^2 + 23329*z^2
(-2005/40737 : 25084/40737 : 1) C2b (6651/11971 : 793/11971 : 1)
** u= -214/199 ; C1 -73457*x^2 + 85397*y^2 + 78977*z^2
(19934/19361 : -2205/19361 : 1) C2b (109781/711323 : -44941/711323 : 1)
** u= -214/209 ; C1 -85297*x^2 + 89477*y^2 + 87337*z^2
(-32413/35025 : -13996/35025 : 1) C2b (7331/108567 : 6821/108567 : 1)
** u= -214/217 ; C1 -95489*x^2 + 92885*y^2 + 94169*z^2
(-41889/50101 : -27220/50101 : 1) C2b (72977/926777 : -57037/926777 : 1)
** u= -214/241 ; C1 -129905*x^2 + 103877*y^2 + 115433*z^2
(-23361/42589 : 36512/42589 : 1) C2b (131593/210349 : -919/210349 : 1)
** u= -214/249 ; C1 -142657*x^2 + 107797*y^2 + 122777*z^2
(4493/7753 : 109840/131801 : 1) C2b (-50479/598327 : -575283/10171559 : 1)
** u= -214/265 ; C1 -170081*x^2 + 116021*y^2 + 137849*z^2
(97329/349405 : 362168/349405 : 1) C2b (634073/2463353 : 119971/2463353 : 1)
** u= -214/335 ; C1 -320161*x^2 + 158021*y^2 + 209809*z^2
(154451/215915 : 116472/215915 : 1) C2b (43509/127195 : -3331/127195 : 1)
** u= -214/371 ; C1 -416425*x^2 + 183437*y^2 + 250633*z^2
(339482/842305 : 168255/168461 : 1) C2b (2990873/11750931 : -317749/11750931 : 1)
** u= -213/101 ; C1 {+/-} -10322*x^2 + 55570*y^2 + 7858*z^2
(7216/8277 : 125/8277 : 1) C2a (-384353/38429 : -12429/38429 : 1) C2b (-1928/8921 : 657/8921 : 1)
** u= -213/109 ; C1 {+/-} -11906*x^2 + 57250*y^2 + 12946*z^2
(-524/561 : 593/2805 : 1) C2a (-588263/123337 : -114711/616685 : 1) C2b (120624/144199 : -46729/720995 : 1)
** u= -213/205 ; C1 {+/-} -80834*x^2 + 87394*y^2 + 83986*z^2
(54537/54605 : -10696/54605 : 1) C2a (-16766927/1190833 : 206859/170119 : 1) C2b (-1913266/2707355 : -6723/386765 :
1)
** u= -213/325 ; C1 {+/-} -296594*x^2 + 150994*y^2 + 198706*z^2
(-7436/109173 : -124805/109173 : 1) C2a (-356557/794007 : -5623/794007 : 1) C2b (-100706/2602115 : 116361/2602115 :
1)
** u= -212/149 ; C1 -29597*x^2 - 67145*y^2 + 40433*z^2
(-176324/182137 : 79197/182137 : 1) C2a (-3930018/3051949 : -161251/3051949 : 1)
** u= -212/163 ; C1 -39565*x^2 - 71513*y^2 + 50737*z^2
(-2311/16489 : 13782/16489 : 1) C2a (1906936/1210187 : -114481/1210187 : 1)
** u= -212/211 ; C1 -88621*x^2 - 89465*y^2 + 89041*z^2
(15367/15337 : -438/15337 : 1) C2a (6297644/2386889 : -533765/2386889 : 1)
** u= -212/217 ; C1 -96373*x^2 - 92033*y^2 + 94153*z^2
(21592/28065 : 17821/28065 : 1) C2a (1706338/1248469 : 131371/1248469 : 1)
** u= -212/369 ; C1 -412837*x^2 - 181105*y^2 + 247673*z^2
(723911/941983 : -137462/941983 : 1) C2a (-1503178172/2241638581 : 7670553/131861093 : 1)
** u= -211/195 ; C1 -70066*x^2 + 82546*y^2 + 75794*z^2
(40720/46043 : -23219/46043 : 1) C2b (27502/62435 : 3303/62435 : 1)
** u= -211/227 ; C1 -110578*x^2 - 96050*y^2 + 102802*z^2
(5488/6095 : 11277/30475 : 1) C2a (-370847/332255 : -19541/237325 : 1)
** u= -211/243 ; C1 -134674*x^2 + 103570*y^2 + 117074*z^2
(-24101/25891 : -92/1523 : 1) C2b (6472/44113 : 2463/44113 : 1)
** u= -211/259 ; C1 -161330*x^2 + 111602*y^2 + 131858*z^2
(15453/31571 : -28852/31571 : 1) C2b (-1350028/7794505 : 408623/7794505 : 1)
** u= -211/323 ; C1 -293554*x^2 + 148850*y^2 + 196114*z^2
(1376/1815 : 3893/9075 : 1) C2b (136928/573993 : -21601/573993 : 1)
** u= -211/347 ; C1 -353698*x^2 - 164930*y^2 + 222322*z^2
(13663/34491 : -34688/34491 : 1) C2a (1482569/1281613 : -142561/1281613 : 1)
** u= -210/121 ; C1 -15665*x^2 + 58741*y^2 + 21361*z^2
(-7686/81871 : 49211/81871 : 1) C2b (-789261/826175 : -43207/826175 : 1)
** u= -210/193 ; C1 -68225*x^2 + 81349*y^2 + 74209*z^2
(6611/52005 : -9860/10401 : 1) C2b (2260297/3211957 : 84333/3211957 : 1)
** u= -210/211 ; C1 -89465*x^2 + 88621*y^2 + 89041*z^2
(-511/3123 : -3088/3123 : 1) C2b (-3130547/11596055 : -666411/11596055 : 1)
** u= -210/269 ; C1 -179945*x^2 + 116461*y^2 + 141241*z^2
(-3467/149037 : 164072/149037 : 1) C2b (-1881487/4106365 : -119661/4106365 : 1)
** u= -210/307 ; C1 -257465*x^2 + 138349*y^2 + 179089*z^2
(-59978/118497 : -107153/118497 : 1) C2b (-266897/6702433 : -314373/6702433 : 1)
** u= -210/377 ; C1 -438065*x^2 + 186229*y^2 + 256369*z^2
(176778/792103 : -888947/792103 : 1) C2b (-5219813/23017883 : 612987/23017883 : 1)
** u= -210/391 ; C1 -480065*x^2 + 196981*y^2 + 273001*z^2
(-54103/86283 : 56428/86283 : 1) C2b (-1234727/4468067 : 73617/4468067 : 1)
** u= -209/153 ; C1 -32818*x^2 - 67090*y^2 + 43682*z^2
(-30704/26717 : -1897/26717 : 1) C2a (-862861/28033 : -61389/28033 : 1)
** u= -209/321 ; C1 {+/-} -290530*x^2 + 146722*y^2 + 193538*z^2
(-139303/191441 : -99592/191441 : 1) C2a (1179657/2682595 : 2509/2682595 : 1) C2b (152458/566375 : 19947/566375 : 1)
** u= -209/393 ; C1 -487378*x^2 - 198130*y^2 + 275042*z^2
(216599/567293 : -575624/567293 : 1) C2a (1402491/425687 : -145117/425687 : 1)
** u= -208/103 ; C1 -10613*x^2 - 53873*y^2 + 10193*z^2
(-67865/84997 : -21438/84997 : 1) C2a (-313144/94287 : -9793/94287 : 1)
** u= -208/131 ; C1 -20077*x^2 - 60425*y^2 + 28393*z^2
(-55/1333 : -4566/6665 : 1) C2a (585994/142795 : -169547/713975 : 1)
** u= -208/157 ; C1 -35885*x^2 - 67913*y^2 + 46697*z^2
(3801/106907 : -88606/106907 : 1) C2a (-39980572/41781999 : -56921/5968857 : 1)
** u= -208/161 ; C1 -38917*x^2 - 69185*y^2 + 49633*z^2
(29752/52249 : -38217/52249 : 1) C2a (1181882/81691 : 88129/81691 : 1)
** u= -208/237 ; C1 -126925*x^2 - 99433*y^2 + 111497*z^2
(-123992/136285 : -6935/27257 : 1) C2a (879072/1388941 : -16573/1388941 : 1)
** u= -208/243 ; C1 -136333*x^2 - 102313*y^2 + 116873*z^2
(9128/20767 : 19535/20767 : 1) C2a (-745272/538469 : 63221/538469 : 1)
** u= -208/315 ; C1 -277309*x^2 - 142489*y^2 + 187001*z^2
(4567/24085 : -26846/24085 : 1) C2a (11825692/17199415 : 906519/17199415 : 1)
** u= -208/335 ; C1 -325669*x^2 - 155489*y^2 + 208321*z^2
(-60304/105707 : 85755/105707 : 1) C2a (-10770658/4210625 : 1085491/4210625 : 1)
** u= -208/345 ; C1 -351349*x^2 - 162289*y^2 + 219281*z^2
(-1117000/1527841 : 672943/1527841 : 1) C2a (-504816/692975 : -43583/692975 : 1)
** u= -208/353 ; C1 -372613*x^2 - 167873*y^2 + 228193*z^2
(-35567/290435 : -334446/290435 : 1) C2a (-2678608/4604075 : 29869/657725 : 1)
** u= -207/95 ; C1 -9314*x^2 - 51874*y^2 + 5506*z^2
(-2760/4619 : -947/4619 : 1) C2a (7001009/242321 : -200409/242321 : 1)
** u= -207/263 ; C1 {+/-} -170930*x^2 + 112018*y^2 + 135202*z^2
(-12296/18891 : 14143/18891 : 1) C2a (-1850569/1737073 : 153339/1737073 : 1) C2b (14326/498187 : -26643/498187 : 1)
** u= -207/295 ; C1 {+/-} -233714*x^2 + 129874*y^2 + 166306*z^2
(35805/42599 : 4088/42599 : 1) C2a (-11129/22911 : 13/3273 : 1) C2b (235754/574861 : -2109/82123 : 1)
** u= -207/343 ; C1 {+/-} -347090*x^2 + 160498*y^2 + 216802*z^2
(-7825/48603 : 55304/48603 : 1) C2a (-299887/649 : 30747/649 : 1) C2b (274588/1278919 : 43269/1278919 : 1)
** u= -207/367 ; C1 -412418*x^2 - 177538*y^2 + 243778*z^2
(21171/40355 : 34568/40355 : 1) C2a (13151597/418485 : 1359413/418485 : 1)
** u= -206/135 ; C1 -22321*x^2 + 60661*y^2 + 31409*z^2
(3290/3977 : -2051/3977 : 1) C2b (-1669651/1540441 : -4329/220063 : 1)
** u= -206/189 ; C1 -65305*x^2 + 78157*y^2 + 71153*z^2
(2777/53509 : 50992/53509 : 1) C2b (-128707/710441 : -44811/710441 : 1)
** u= -206/263 ; C1 -171569*x^2 + 111605*y^2 + 135089*z^2
(-58809/87911 : 63544/87911 : 1) C2b (-749249/1370041 : 7319/1370041 : 1)
** u= -206/283 ; C1 -209689*x^2 + 122525*y^2 + 154249*z^2
(70/393 : -28037/25545 : 1) C2b (23715/53399 : 83209/3470935 : 1)
** u= -206/325 ; C1 -302761*x^2 + 148061*y^2 + 197089*z^2
(-26359/221037 : -252220/221037 : 1) C2b (-157431/889519 : -34837/889519 : 1)
** u= -206/353 ; C1 -374609*x^2 + 167045*y^2 + 227609*z^2
(-40061/75689 : 64860/75689 : 1) C2b (41711/274231 : 9611/274231 : 1)
** u= -206/393 ; C1 -490849*x^2 + 196885*y^2 + 273929*z^2
(37886/54271 : 296293/705523 : 1) C2b (19501/93299 : -27477/1212887 : 1)
** u= -206/399 ; C1 -509665*x^2 + 201637*y^2 + 281153*z^2
(3635/12667 : 13796/12667 : 1) C2b (126491/1083363 : -30083/1083363 : 1)
** u= -205/157 ; C1 -36530*x^2 + 66674*y^2 + 46994*z^2
(-48277/55741 : 30216/55741 : 1) C2b (-1402/3173 : -193/3173 : 1)
** u= -205/189 ; C1 {+/-} -65650*x^2 + 77746*y^2 + 71186*z^2
(97768/172925 : -27791/34585 : 1) C2a (1189901/262189 : -98997/262189 : 1) C2b (374684/913869 : 50021/913869 : 1)
** u= -205/213 ; C1 {+/-} -94210*x^2 + 87394*y^2 + 90674*z^2
(155468/340837 : 307367/340837 : 1) C2a (-2116149/29455 : -190141/29455 : 1) C2b (915866/1368901 : -15309/1368901 :
1)
** u= -205/261 ; C1 -168610*x^2 - 110146*y^2 + 133106*z^2
(-111508/159181 : 107641/159181 : 1) C2a (-2498143/149645 : 242127/149645 : 1)
** u= -205/269 ; C1 -183250*x^2 + 114386*y^2 + 140626*z^2
(-15311/21233 : 13368/21233 : 1) C2b (-6004986/14787965 : 499777/14787965 : 1)
** u= -204/157 ; C1 -36749*x^2 - 66265*y^2 + 47089*z^2
(15624/15229 : 5425/15229 : 1) C2a (905126/281449 : -297/1297 : 1)
** u= -204/173 ; C1 -50093*x^2 - 71545*y^2 + 58897*z^2
(6168/18061 : -15553/18061 : 1) C2a (311276/128977 : 23373/128977 : 1)
** u= -204/203 ; C1 -82013*x^2 - 82825*y^2 + 82417*z^2
(-4372/4695 : -8671/23475 : 1) C2a (-137978/70101 : -11323/70101 : 1)
** u= -204/263 ; C1 -172853*x^2 - 110785*y^2 + 134857*z^2
(62312/72699 : -19375/72699 : 1) C2a (-1771064/1192517 : -160407/1192517 : 1)
** u= -204/301 ; C1 -249005*x^2 - 132217*y^2 + 171793*z^2
(21723/31067 : -19114/31067 : 1) C2a (-541334/205735 : -53583/205735 : 1)
** u= -204/307 ; C1 -262349*x^2 - 135865*y^2 + 177889*z^2
(112096/329271 : -343061/329271 : 1) C2a (292498/600663 : 11015/600663 : 1)
** u= -204/349 ; C1 -365837*x^2 - 163417*y^2 + 222577*z^2
(-179412/321125 : 261521/321125 : 1) C2a (85426/175497 : 5633/175497 : 1)
** u= -203/155 ; C1 {+/-} -35474*x^2 + 65234*y^2 + 45746*z^2
(7155/6331 : -6736/82303 : 1) C2a (1347/1285 : -583/16705 : 1) C2b (18586/55769 : 46831/724997 : 1)
** u= -203/227 ; C1 -114530*x^2 + 92738*y^2 + 102482*z^2
(62116/69007 : -22299/69007 : 1) C2b (-895946/1475915 : 24019/1475915 : 1)
** u= -203/291 ; C1 {+/-} -228322*x^2 + 125890*y^2 + 161618*z^2
(12001/27043 : 26032/27043 : 1) C2a (347007/706859 : 7057/706859 : 1) C2b (1371562/12321969 : 575881/12321969 : 1)
** u= -202/85 ; C1 -8249*x^2 + 48029*y^2 + 761*z^2
(-3154/11687 : -675/11687 : 1) C2b (-340663/161527 : -11369/161527 : 1)
** u= -202/93 ; C1 -8905*x^2 + 49453*y^2 + 5417*z^2
(-6797/108061 : 35648/108061 : 1) C2b (3294767/1308091 : -11571/1308091 : 1)
** u= -202/107 ; C1 -11593*x^2 + 52253*y^2 + 13873*z^2
(-12757/12303 : 2020/12303 : 1) C2b (47751/195917 : 14239/195917 : 1)
** u= -202/127 ; C1 -18833*x^2 + 56933*y^2 + 26633*z^2
(-48642/53017 : 392185/901289 : 1) C2b (6943/17369 : 20051/295273 : 1)
** u= -202/195 ; C1 -73369*x^2 + 78829*y^2 + 76001*z^2
(-70471/69427 : 5000/69427 : 1) C2b (-31259/63891 : -3017/63891 : 1)
** u= -202/289 ; C1 -224897*x^2 + 124325*y^2 + 159473*z^2
(-96650/161267 : -641517/806335 : 1) C2b (-45367/768211 : -36701/768211 : 1)
** u= -202/315 ; C1 -282409*x^2 + 140029*y^2 + 185681*z^2
(359285/468623 : 175684/468623 : 1) C2b (-1527511/4194105 : 97829/4194105 : 1)
** u= -202/397 ; C1 -508073*x^2 + 198413*y^2 + 277193*z^2
(29757/101333 : -109900/101333 : 1) C2b (-813583/3436699 : 7691/490957 : 1)
** u= -201/377 ; C1 -447938*x^2 - 182530*y^2 + 253282*z^2
(-55491/77173 : -26600/77173 : 1) C2a (88871/282167 : -849/282167 : 1)
** u= -200/107 ; C1 -11645*x^2 - 51449*y^2 + 14249*z^2
(23461/21353 : -1302/21353 : 1) C2a (-423138/254903 : 5939/254903 : 1)
** u= -200/121 ; C1 -16405*x^2 - 54641*y^2 + 23041*z^2
(-1415/1827 : 898/1827 : 1) C2a (36459562/1602985 : 2085347/1602985 : 1)
** u= -200/183 ; C1 -61045*x^2 - 73489*y^2 + 66689*z^2
(1288/3371 : -2989/3371 : 1) C2a (-802236/996149 : 2699/142307 : 1)
** u= -200/189 ; C1 -67405*x^2 - 75721*y^2 + 71321*z^2
(-7040/28837 : -27187/28837 : 1) C2a (-4443232/1339553 : 370599/1339553 : 1)
** u= -200/213 ; C1 -96445*x^2 - 85369*y^2 + 90569*z^2
(68573/80783 : 40138/80783 : 1) C2a (-13312968/5775313 : -24647/122879 : 1)
** u= -200/247 ; C1 -147445*x^2 - 101009*y^2 + 119809*z^2
(-1187/7953 : -8542/7953 : 1) C2a (592496/431309 : 51797/431309 : 1)
** u= -200/287 ; C1 -222245*x^2 - 122369*y^2 + 157169*z^2
(299379/538049 : 457214/538049 : 1) C2a (-146202/139597 : -12991/139597 : 1)
** u= -200/319 ; C1 -293605*x^2 - 141761*y^2 + 189361*z^2
(296245/375369 : -80306/375369 : 1) C2a (-4521058/3707045 : -433177/3707045 : 1)
** u= -200/389 ; C1 -485405*x^2 - 191321*y^2 + 266921*z^2
(56861/311903 : -357102/311903 : 1) C2a (316291722/40020835 : 32935007/40020835 : 1)
** u= -199/95 ; C1 -9106*x^2 + 48626*y^2 + 7234*z^2
(-5416/7635 : -1783/7635 : 1) C2b (217796/572925 : 41729/572925 : 1)
** u= -199/119 ; C1 {+/-} -15682*x^2 + 53762*y^2 + 21922*z^2
(-16420/14487 : -2633/14487 : 1) C2a (-175543/136115 : 403/136115 : 1) C2b (-44/2907 : -211/2907 : 1)
** u= -199/287 ; C1 {+/-} -222994*x^2 + 121970*y^2 + 156994*z^2
(19847/30267 : 21424/30267 : 1) C2a (-2305771/695999 : -228365/695999 : 1) C2b (1978478/4164213 : 17917/4164213 : 1)
** u= -199/295 ; C1 -239906*x^2 + 126626*y^2 + 164834*z^2
(-26712/47539 : -39875/47539 : 1) C2b (-48092/333503 : 14689/333503 : 1)
** u= -198/101 ; C1 -10217*x^2 + 49405*y^2 + 10993*z^2
(9057/12629 : 4304/12629 : 1) C2b (-58841/36553 : 1125/36553 : 1)
** u= -198/173 ; C1 -51833*x^2 + 69133*y^2 + 59233*z^2
(-10886/14811 : -9955/14811 : 1) C2b (-409/1303 : 20427/334871 : 1)
** u= -198/203 ; C1 -84473*x^2 + 80413*y^2 + 82393*z^2
(49535/466383 : -469352/466383 : 1) C2b (17985171/27778357 : -589451/27778357 : 1)
** u= -198/247 ; C1 -148625*x^2 + 100213*y^2 + 119617*z^2
(-418242/605945 : 84577/121189 : 1) C2b (426003/813185 : -16303/813185 : 1)
** u= -198/287 ; C1 -223745*x^2 + 121573*y^2 + 156817*z^2
(206298/246941 : -18217/246941 : 1) C2b (-4877161/12762755 : -358749/12762755 : 1)
** u= -197/85 ; C1 {+/-} -7954*x^2 + 46034*y^2 + 1906*z^2
(5849/24225 : 4288/24225 : 1) C2a (234101/2201 : 4199/2201 : 1) C2b (-451574/119595 : 3601/119595 : 1)
** u= -197/125 ; C1 {+/-} -18434*x^2 + 54434*y^2 + 26066*z^2
(1128/15245 : -10529/15245 : 1) C2a (254383/213393 : -2317/213393 : 1) C2b (-30956/840655 : -60461/840655 : 1)
** u= -197/141 ; C1 -27106*x^2 + 58690*y^2 + 36626*z^2
(-15176/51689 : 39509/51689 : 1) C2b (1382678/1641903 : 63463/1641903 : 1)
** u= -197/181 ; C1 -59986*x^2 - 71570*y^2 + 65266*z^2
(-41077/40853 : -10380/40853 : 1) C2a (-27107/27853 : 1397/27853 : 1)
** u= -197/333 ; C1 -330850*x^2 - 149698*y^2 + 203282*z^2
(5548/7465 : 553/1493 : 1) C2a (-196557/595 : -585971/17255 : 1)
** u= -196/87 ; C1 -8053*x^2 - 45985*y^2 + 3257*z^2
(112/239 : -43/239 : 1) C2a (-230562/33569 : -4807/33569 : 1)
** u= -196/177 ; C1 -56293*x^2 - 69745*y^2 + 62297*z^2
(118901/115987 : 24610/115987 : 1) C2a (772256/162263 : -63507/162263 : 1)
** u= -196/185 ; C1 -64501*x^2 - 72641*y^2 + 68329*z^2
(39299/58363 : -42810/58363 : 1) C2a (1556488/883105 : 120539/883105 : 1)
** u= -196/235 ; C1 -130301*x^2 - 93641*y^2 + 108929*z^2
(99840/160751 : -127237/160751 : 1) C2a (2922624/1276615 : 268747/1276615 : 1)
** u= -196/247 ; C1 -149813*x^2 - 99425*y^2 + 119417*z^2
(-5425/10817 : 49038/54085 : 1) C2a (-8103330/517381 : 3914641/2586905 : 1)
** u= -196/253 ; C1 -160109*x^2 - 102425*y^2 + 124769*z^2
(-624/1277 : -5869/6385 : 1) C2a (44274/76127 : 7717/380635 : 1)
** u= -196/269 ; C1 -189325*x^2 - 110777*y^2 + 139393*z^2
(-105064/147525 : 18461/29505 : 1) C2a (-7264864/3307007 : 699541/3307007 : 1)
** u= -196/309 ; C1 -273565*x^2 - 133897*y^2 + 178193*z^2
(-513736/641077 : 87841/641077 : 1) C2a (3246/5785 : 55609/1486745 : 1)
** u= -196/321 ; C1 -301957*x^2 - 141457*y^2 + 190457*z^2
(-1279/8471 : -9650/8471 : 1) C2a (-5120096/1091003 : 522183/1091003 : 1)
** u= -196/337 ; C1 -342053*x^2 - 151985*y^2 + 207257*z^2
(-2436/93473 : -109093/93473 : 1) C2a (-1837736/1557693 : -179729/1557693 : 1)
** u= -196/367 ; C1 -424133*x^2 - 173105*y^2 + 240137*z^2
(115952/295619 : -297135/295619 : 1) C2a (200054/32367 : 20759/32367 : 1)
** u= -194/95 ; C1 -9041*x^2 + 46661*y^2 + 8249*z^2
(-43307/108271 : -41340/108271 : 1) C2b (-1673317/1034593 : -44629/1034593 : 1)
** u= -194/107 ; C1 -11849*x^2 + 49085*y^2 + 15329*z^2
(-87358/76993 : -177/4529 : 1) C2b (-145999/784981 : -57055/784981 : 1)
** u= -194/163 ; C1 -43993*x^2 + 64205*y^2 + 52177*z^2
(2398/3089 : 1953/3089 : 1) C2b (-1015083/1230889 : -17515/1230889 : 1)
** u= -194/207 ; C1 -91249*x^2 + 80485*y^2 + 85529*z^2
(26009/27139 : -3968/27139 : 1) C2b (169061/433411 : -681/13981 : 1)
** u= -194/249 ; C1 -154417*x^2 + 99637*y^2 + 120977*z^2
(-37169/43009 : -10240/43009 : 1) C2b (-152009/278775 : -967/278775 : 1)
** u= -194/319 ; C1 -298897*x^2 + 139397*y^2 + 187897*z^2
(-2747/173247 : 201100/173247 : 1) C2b (2190191/5639685 : -51353/5639685 : 1)
** u= -194/343 ; C1 -359713*x^2 + 155285*y^2 + 213097*z^2
(166942/390549 : 380467/390549 : 1) C2b (354831/2122097 : 68147/2122097 : 1)
** u= -194/361 ; C1 -409105*x^2 + 167957*y^2 + 232753*z^2
(-12071/51177 : -57224/51177 : 1) C2b (-7039/87723 : 2813/87723 : 1)
** u= -193/81 ; C1 {+/-} -7522*x^2 + 43810*y^2 + 578*z^2
(-272/1229 : -85/1229 : 1) C2a (-89021/6443 : 45/379 : 1) C2b (149134/20383 : -3/1199 : 1)
** u= -193/177 ; C1 -57250*x^2 - 68578*y^2 + 62402*z^2
(9164/9865 : 859/1973 : 1) C2a (-91603/48959 : -7023/48959 : 1)
** u= -193/209 ; C1 -94306*x^2 + 80930*y^2 + 87106*z^2
(-40648/71457 : 59753/71457 : 1) C2b (-18294/34121 : 1163/34121 : 1)
** u= -193/305 ; C1 {+/-} -266914*x^2 + 130274*y^2 + 173506*z^2
(-53725/160733 : -168804/160733 : 1) C2a (350681/579181 : -25571/579181 : 1) C2b (-2046304/4884309 : 27293/4884309 :
1)
** u= -193/321 ; C1 {+/-} -304642*x^2 + 140290*y^2 + 189698*z^2
(-159304/229817 : -127705/229817 : 1) C2a (-48587/64319 : -4263/64319 : 1) C2b (18386/48457 : -477/48457 : 1)
** u= -193/377 ; C1 -456850*x^2 + 179378*y^2 + 250402*z^2
(95372/135285 : -9763/27057 : 1) C2b (-149838/1154681 : 30521/1154681 : 1)
** u= -192/85 ; C1 -7709*x^2 - 44089*y^2 + 3001*z^2
(9480/24901 : -5147/24901 : 1) C2a (799022/211707 : 9583/211707 : 1)
** u= -192/95 ; C1 -9029*x^2 - 45889*y^2 + 8641*z^2
(-1845/7777 : 3274/7777 : 1) C2a (-135942032/19668137 : 4997097/19668137 : 1)
** u= -192/199 ; C1 -82037*x^2 - 76465*y^2 + 79153*z^2
(5259/5377 : -506/5377 : 1) C2a (1816196/1381073 : -139359/1381073 : 1)
** u= -192/221 ; C1 -111341*x^2 - 85705*y^2 + 96841*z^2
(-19216/74469 : 76069/74469 : 1) C2a (-73244/118849 : -657/118849 : 1)
** u= -192/227 ; C1 -120173*x^2 - 88393*y^2 + 101833*z^2
(1493/5937 : 6130/5937 : 1) C2a (-3932362/1397365 : 363873/1397365 : 1)
** u= -192/257 ; C1 -169733*x^2 - 102913*y^2 + 127873*z^2
(29388/62293 : 58285/62293 : 1) C2a (12274/1903 : 1203/1903 : 1)
** u= -191/127 ; C1 -20098*x^2 - 52610*y^2 + 28162*z^2
(-1837/21651 : 15800/21651 : 1) C2a (-890011/152363 : 56405/152363 : 1)
** u= -191/135 ; C1 {+/-} -24466*x^2 + 54706*y^2 + 33314*z^2
(3308/6935 : -4939/6935 : 1) C2a (-221963/10825 : -15261/10825 : 1) C2b (-107624/1012535 : 70971/1012535 : 1)
** u= -191/183 ; C1 -64114*x^2 - 69970*y^2 + 66914*z^2
(-8753/41867 : -40076/41867 : 1) C2a (33531/44939 : -425/44939 : 1)
** u= -191/247 ; C1 {+/-} -152818*x^2 + 97490*y^2 + 118882*z^2
(-23164/63307 : -63609/63307 : 1) C2a (-64091/115127 : -1429/115127 : 1) C2b (-384312/714931 : 4783/714931 : 1)
** u= -191/287 ; C1 {+/-} -229058*x^2 + 118850*y^2 + 155522*z^2
(-203353/481199 : -472548/481199 : 1) C2a (-6813/2003 : 3407/10015 : 1) C2b (307702/842503 : 113711/4212515 : 1)
** u= -191/359 ; C1 {+/-} -406610*x^2 + 165362*y^2 + 229538*z^2
(1621051/2213087 : -580524/2213087 : 1) C2a (3737537/908661 : 387337/908661 : 1) C2b (131774/643735 : -15769/643735 :
1)
** u= -190/127 ; C1 -20225*x^2 + 52229*y^2 + 28289*z^2
(-5211/5875 : -572/1175 : 1) C2b (-299119/280805 : -4867/280805 : 1)
** u= -190/131 ; C1 -22345*x^2 + 53261*y^2 + 30841*z^2
(23051/55483 : -39492/55483 : 1) C2b (-7139/7281 : -191/7281 : 1)
** u= -190/147 ; C1 -32425*x^2 + 57709*y^2 + 41369*z^2
(-3863/26255 : -4408/5251 : 1) C2b (500981/754029 : 36011/754029 : 1)
** u= -190/161 ; C1 -43345*x^2 + 62021*y^2 + 51001*z^2
(8773/29273 : -25512/29273 : 1) C2b (196489/946539 : -61351/946539 : 1)
** u= -190/187 ; C1 -68825*x^2 + 71069*y^2 + 69929*z^2
(2718/11065 : 2129/2213 : 1) C2b (10128047/24191405 : -1235971/24191405 : 1)
** u= -190/337 ; C1 -347825*x^2 + 149669*y^2 + 205529*z^2
(5202/24851 : 28021/24851 : 1) C2b (4004999/11653871 : -84941/11653871 : 1)
** u= -190/363 ; C1 -419065*x^2 + 167869*y^2 + 233609*z^2
(-114749/316451 : -326324/316451 : 1) C2b (-1383151/5234345 : 78273/5234345 : 1)
** u= -190/379 ; C1 -466265*x^2 + 179741*y^2 + 251561*z^2
(-11137/17159 : 9504/17159 : 1) C2b (-3211577/11961083 : -25333/11961083 : 1)
** u= -189/101 ; C1 {+/-} -10370*x^2 + 45922*y^2 + 12658*z^2
(126912/630041 : -325237/630041 : 1) C2a (4159/2487 : -61/2487 : 1) C2b (23202/713365 : 52397/713365 : 1)
** u= -189/205 ; C1 {+/-} -90866*x^2 + 77746*y^2 + 83794*z^2
(32268/34565 : 8411/34565 : 1) C2a (-1201973/1102907 : 88227/1102907 : 1) C2b (-86124/538069 : 31133/538069 : 1)
** u= -189/253 ; C1 -164498*x^2 + 99730*y^2 + 123922*z^2
(-46844/138297 : 141937/138297 : 1) C2b (55148/765079 : -38841/765079 : 1)
** u= -189/277 ; C1 {+/-} -209954*x^2 + 112450*y^2 + 145714*z^2
(13141/15777 : 1772/78885 : 1) C2a (292003/94041 : 144943/470205 : 1) C2b (165374/525469 : -18243/525469 : 1)
** u= -189/349 ; C1 {+/-} -380882*x^2 + 157522*y^2 + 218002*z^2
(-13512/19865 : 10231/19865 : 1) C2a (-15085687/45586519 : -312729/45586519 : 1) C2b (154956/485863 : 2951/485863 :
1)
** u= -188/83 ; C1 -7373*x^2 - 42233*y^2 + 2753*z^2
(-7872/13963 : -1375/13963 : 1) C2a (12307548/2329211 : 216839/2329211 : 1)
** u= -188/133 ; C1 -23773*x^2 - 53033*y^2 + 32353*z^2
(-34075/44923 : 26658/44923 : 1) C2a (-812074/100805 : 55501/100805 : 1)
** u= -188/259 ; C1 -175981*x^2 - 102425*y^2 + 129121*z^2
(8791/11553 : -29782/57765 : 1) C2a (1043876284/105840121 : 103258237/105840121 : 1)
** u= -188/287 ; C1 -231365*x^2 - 117713*y^2 + 154937*z^2
(8256/93491 : 106633/93491 : 1) C2a (989898/631439 : 96097/631439 : 1)
** u= -188/339 ; C1 -355021*x^2 - 150265*y^2 + 207041*z^2
(-1796/3319 : 2749/3319 : 1) C2a (-3284374/1646731 : -335115/1646731 : 1)
** u= -188/349 ; C1 -381901*x^2 - 157145*y^2 + 217681*z^2
(31576/54461 : -41055/54461 : 1) C2a (-3279334/2685911 : -328529/2685911 : 1)
** u= -187/107 ; C1 {+/-} -12178*x^2 + 46418*y^2 + 16498*z^2
(-176/3819 : 2275/3819 : 1) C2a (117091/64073 : -4007/64073 : 1) C2b (-133992/311231 : -21593/311231 : 1)
** u= -187/179 ; C1 -61282*x^2 + 67010*y^2 + 64018*z^2
(-176/1527 : 1483/1527 : 1) C2b (10228/22491 : 1129/22491 : 1)
** u= -187/251 ; C1 -162226*x^2 - 97970*y^2 + 121906*z^2
(-66131/98259 : -69080/98259 : 1) C2a (-1333559/2031311 : -80191/2031311 : 1)
** u= -186/119 ; C1 -16865*x^2 + 48757*y^2 + 23833*z^2
(-15667/14943 : 4924/14943 : 1) C2b (1173657/1020535 : 11747/1020535 : 1)
** u= -186/137 ; C1 -26513*x^2 + 53365*y^2 + 35137*z^2
(-21886/33147 : -22033/33147 : 1) C2b (883741/2079967 : -130641/2079967 : 1)
** u= -186/179 ; C1 -61625*x^2 + 66637*y^2 + 64033*z^2
(-5866/7041 : -3977/7041 : 1) C2b (555633/788339 : 14159/788339 : 1)
** u= -186/221 ; C1 -114377*x^2 + 83437*y^2 + 96457*z^2
(20258/65127 : 65885/65127 : 1) C2b (-1173397/6807181 : 366723/6807181 : 1)
** u= -186/227 ; C1 -123353*x^2 + 86125*y^2 + 101377*z^2
(3358/3981 : -7913/19905 : 1) C2b (-63143/408169 : -21717/408169 : 1)
** u= -186/257 ; C1 -173633*x^2 + 100645*y^2 + 127057*z^2
(-180474/406463 : 390355/406463 : 1) C2b (-493443/10692689 : -75751/1527527 : 1)
** u= -186/259 ; C1 -177305*x^2 + 101677*y^2 + 128833*z^2
(209463/258163 : 89104/258163 : 1) C2b (672583/9267569 : 453261/9267569 : 1)
** u= -186/349 ; C1 -383945*x^2 + 156397*y^2 + 217033*z^2
(3166/4347 : 1271/4347 : 1) C2b (1730329/12520103 : -365913/12520103 : 1)
** u= -186/361 ; C1 -417617*x^2 + 164917*y^2 + 230017*z^2
(-34030/309327 : -361277/309327 : 1) C2b (85161/1310945 : -38537/1310945 : 1)
** u= -185/121 ; C1 -17890*x^2 + 48866*y^2 + 25186*z^2
(-8183/8401 : -3444/8401 : 1) C2b (368016/325619 : -43/46517 : 1)
** u= -185/161 ; C1 {+/-} -44690*x^2 + 60146*y^2 + 51266*z^2
(46265/47981 : -19284/47981 : 1) C2a (298599/328201 : 10883/328201 : 1) C2b (-534214/785501 : -28571/785501 : 1)
** u= -185/297 ; C1 {+/-} -255490*x^2 + 122434*y^2 + 163874*z^2
(38908/86753 : -83153/86753 : 1) C2a (-689473/894875 : -59403/894875 : 1) C2b (-1605062/5040207 : -135283/5040207 :
1)
** u= -185/329 ; C1 {+/-} -331970*x^2 + 142466*y^2 + 195746*z^2
(134760/536213 : -593917/536213 : 1) C2a (800751/48121 : 82783/48121 : 1) C2b (-116722/343165 : 2791/343165 : 1)
** u= -185/393 ; C1 {+/-} -515650*x^2 + 188674*y^2 + 265634*z^2
(-21656/30541 : -5611/30541 : 1) C2a (-52550589/37906381 : 5432357/37906381 : 1) C2b (-34438/389375 : 8109/389375 :
1)
** u= -184/77 ; C1 -6829*x^2 - 39785*y^2 + 409*z^2
(3992/23957 : -1779/23957 : 1) C2a (2499496/266581 : -10429/266581 : 1)
** u= -184/83 ; C1 -7213*x^2 - 40745*y^2 + 3577*z^2
(7756/11163 : -539/11163 : 1) C2a (-1377476/398573 : 2941/56939 : 1)
** u= -184/131 ; C1 -23245*x^2 - 51017*y^2 + 31513*z^2
(49009/61109 : -34818/61109 : 1) C2a (-78364/2177 : 5431/2177 : 1)
** u= -184/133 ; C1 -24413*x^2 - 51545*y^2 + 32777*z^2
(1459/1343 : 4842/17459 : 1) C2a (238114/111453 : 192611/1448889 : 1)
** u= -184/175 ; C1 -58181*x^2 - 64481*y^2 + 61169*z^2
(-3207/19325 : -18574/19325 : 1) C2a (1468366/237309 : -125249/237309 : 1)
** u= -184/247 ; C1 -157109*x^2 - 94865*y^2 + 118049*z^2
(-8361/13501 : 10538/13501 : 1) C2a (-20782/13827 : -1919/13827 : 1)
** u= -184/255 ; C1 -171301*x^2 - 98881*y^2 + 125009*z^2
(-13864/330355 : -370997/330355 : 1) C2a (9282462/1296317 : -918463/1296317 : 1)
** u= -184/279 ; C1 -217717*x^2 - 111697*y^2 + 146657*z^2
(-43372/82427 : -72485/82427 : 1) C2a (1196196/790133 : -115517/790133 : 1)
** u= -184/337 ; C1 -353669*x^2 - 147425*y^2 + 203729*z^2
(-396/3557 : 20681/17785 : 1) C2a (-30320774/1639707 : 15719203/8198535 : 1)
** u= -184/351 ; C1 -391525*x^2 - 157057*y^2 + 218513*z^2
(-40375/54173 : -4394/54173 : 1) C2a (-2238038/3505045 : 205209/3505045 : 1)
** u= -184/377 ; C1 -467029*x^2 - 175985*y^2 + 247009*z^2
(-44233/174547 : 193830/174547 : 1) C2a (-68614/71 : 101 : 1)
** u= -183/175 ; C1 {+/-} -58514*x^2 + 64114*y^2 + 61186*z^2
(6756/11483 : -9175/11483 : 1) C2a (-2398979/46221 : -206719/46221 : 1) C2b (-1129742/4385593 : -261969/4385593 : 1)
** u= -183/263 ; C1 -186818*x^2 - 102658*y^2 + 131938*z^2
(117064/141975 : 31103/141975 : 1) C2a (-6911/9803 : 507/9803 : 1)
** u= -182/79 ; C1 -6817*x^2 + 39365*y^2 + 1873*z^2
(5053/11571 : -1396/11571 : 1) C2b (19539/8533 : -509/8533 : 1)
** u= -182/85 ; C1 -7369*x^2 + 40349*y^2 + 5041*z^2
(11999/20485 : 5112/20485 : 1) C2b (-287/213 : 47/771 : 1)
** u= -182/97 ; C1 -9553*x^2 + 42533*y^2 + 11593*z^2
(5474/14935 : -7353/14935 : 1) C2b (-132309833/115466289 : -5904053/115466289 : 1)
** u= -182/99 ; C1 -10057*x^2 + 42925*y^2 + 12713*z^2
(-7615/8743 : 15044/43715 : 1) C2b (-881341/576845 : 2001/2884225 : 1)
** u= -182/115 ; C1 -15529*x^2 + 46349*y^2 + 21961*z^2
(14165/12283 : -2064/12283 : 1) C2b (-152503/775257 : -55049/775257 : 1)
** u= -182/163 ; C1 -47305*x^2 + 59693*y^2 + 52777*z^2
(-165589/159411 : -27172/159411 : 1) C2b (2821009/3804207 : 86017/3804207 : 1)
** u= -182/173 ; C1 -56825*x^2 + 63053*y^2 + 59777*z^2
(12558/12595 : -575/2519 : 1) C2b (-423367/736069 : 1297/32003 : 1)
** u= -182/205 ; C1 -94009*x^2 + 75149*y^2 + 83521*z^2
(14161/24805 : 20808/24805 : 1) C2b (-13933607/22893135 : 1117/79215 : 1)
** u= -182/255 ; C1 -172609*x^2 + 98149*y^2 + 124721*z^2
(-40937/62951 : -45700/62951 : 1) C2b (288139/602869 : -7533/602869 : 1)
** u= -182/277 ; C1 -215113*x^2 + 109853*y^2 + 144433*z^2
(-33901/45481 : 21660/45481 : 1) C2b (-4423797/10623751 : -168893/10623751 : 1)
** u= -182/379 ; C1 -475417*x^2 + 176765*y^2 + 248473*z^2
(-213358/300369 : 66251/300369 : 1) C2b (-6571/28113 : -71/28113 : 1)
** u= -182/381 ; C1 -481561*x^2 + 178285*y^2 + 250721*z^2
(692363/964513 : -115972/964513 : 1) C2b (-194177/851247 : 2963/851247 : 1)
** u= -181/125 ; C1 {+/-} -20386*x^2 + 48386*y^2 + 28114*z^2
(57533/74265 : -42544/74265 : 1) C2a (1257161/414611 : -79271/414611 : 1) C2b (-90282/141887 : 8009/141887 : 1)
** u= -181/141 ; C1 -30082*x^2 - 52642*y^2 + 38162*z^2
(21607/28405 : -1372/2185 : 1) C2a (46849/43645 : 1839/43645 : 1)
** u= -181/205 ; C1 -94466*x^2 + 74786*y^2 + 83474*z^2
(-38140/59381 : -45807/59381 : 1) C2b (-1216/2705 : -109/2705 : 1)
** u= -181/245 ; C1 {+/-} -155506*x^2 + 92786*y^2 + 115954*z^2
(15125/30517 : -27936/30517 : 1) C2a (162451/264755 : 8723/264755 : 1) C2b (4387902/11357065 : 380797/11357065 : 1)
** u= -181/269 ; C1 -199810*x^2 - 105122*y^2 + 136978*z^2
(2231/8741 : 9492/8741 : 1) C2a (3424123/252805 : 344609/252805 : 1)
** u= -181/309 ; C1 -286450*x^2 - 128242*y^2 + 174578*z^2
(32789/68573 : 63244/68573 : 1) C2a (3233339/1867493 : 324891/1867493 : 1)
** u= -180/133 ; C1 -25085*x^2 - 50089*y^2 + 33169*z^2
(-18181/62163 : -48922/62163 : 1) C2a (-106867588/1205917 : -7671201/1205917 : 1)
** u= -180/173 ; C1 -57485*x^2 - 62329*y^2 + 59809*z^2
(-8820/12533 : 8887/12533 : 1) C2a (2208328/369377 : -189381/369377 : 1)
** u= -180/199 ; C1 -87125*x^2 - 72001*y^2 + 78841*z^2
(3192/3431 : 749/3431 : 1) C2a (2187218/572453 : 28437/81779 : 1)
** u= -180/233 ; C1 -136085*x^2 - 86689*y^2 + 105769*z^2
(45112/140109 : -144071/140109 : 1) C2a (3536138/6241953 : -101569/6241953 : 1)
** u= -180/301 ; C1 -268685*x^2 - 123001*y^2 + 166561*z^2
(214180/299001 : -144419/299001 : 1) C2a (471236/564975 : 42821/564975 : 1)
** u= -180/313 ; C1 -296885*x^2 - 130369*y^2 + 178249*z^2
(394137/551503 : -249202/551503 : 1) C2a (-92576/247641 : -2227/247641 : 1)
** u= -179/139 ; C1 -29122*x^2 + 51362*y^2 + 37042*z^2
(-14336/22131 : -15385/22131 : 1) C2b (-180716/257073 : 11381/257073 : 1)
** u= -179/171 ; C1 {+/-} -55810*x^2 + 61282*y^2 + 58418*z^2
(-50021/56447 : -27544/56447 : 1) C2a (-9144103/1821211 : -778977/1821211 : 1) C2b (111118/433249 : 25911/433249 : 1)
** u= -179/339 ; C1 -363922*x^2 + 146962*y^2 + 204242*z^2
(-26947/52363 : 44860/52363 : 1) C2b (-526052/1895085 : 25811/1895085 : 1)
** u= -178/155 ; C1 -41449*x^2 + 55709*y^2 + 47521*z^2
(-46331/80103 : -62260/80103 : 1) C2b (-3390967/5935347 : 279799/5935347 : 1)
** u= -178/157 ; C1 -43145*x^2 + 56333*y^2 + 48857*z^2
(13119/21209 : 16072/21209 : 1) C2b (-338021/15142457 : -997927/15142457 : 1)
** u= -178/213 ; C1 -106873*x^2 + 77053*y^2 + 89513*z^2
(4022/4715 : 1841/4715 : 1) C2b (-2785319/5018383 : -94311/5018383 : 1)
** u= -178/357 ; C1 -414745*x^2 + 159133*y^2 + 222857*z^2
(-27589/75317 : -77204/75317 : 1) C2b (-88451/516405 : 10909/516405 : 1)
** u= -178/361 ; C1 -426257*x^2 + 162005*y^2 + 227153*z^2
(-29434/116927 : 129963/116927 : 1) C2b (-1898179/13042357 : -287675/13042357 : 1)
** u= -178/399 ; C1 -543601*x^2 + 190885*y^2 + 269561*z^2
(152002/532477 : 578443/532477 : 1) C2b (-21379/203779 : 2697/203779 : 1)
** u= -177/337 ; C1 -360578*x^2 - 144898*y^2 + 201538*z^2
(334207/447825 : 31456/447825 : 1) C2a (-51967847/16673719 : 5381031/16673719 : 1)
** u= -176/73 ; C1 -6229*x^2 - 36305*y^2 + 49*z^2
(-8519/173451 : -5306/173451 : 1) C2a (625042/7903 : -277/1129 : 1)
** u= -176/97 ; C1 -9733*x^2 - 40385*y^2 + 12577*z^2
(-2071/19963 : 11094/19963 : 1) C2a (89542526/3919247 : 4398787/3919247 : 1)
** u= -176/153 ; C1 -40309*x^2 - 54385*y^2 + 46289*z^2
(-18992/29813 : 22117/29813 : 1) C2a (-11047916/6661529 : 783225/6661529 : 1)
** u= -176/155 ; C1 -41981*x^2 - 55001*y^2 + 47609*z^2
(15533/22025 : -15354/22025 : 1) C2a (-2522906/1494705 : -182083/1494705 : 1)
** u= -176/181 ; C1 -67357*x^2 - 63737*y^2 + 65497*z^2
(-156005/211199 : 141834/211199 : 1) C2a (3022256/382453 : -269243/382453 : 1)
** u= -176/193 ; C1 -81349*x^2 - 68225*y^2 + 74209*z^2
(-1685/2623 : 10122/13115 : 1) C2a (166526/35581 : -15175/35581 : 1)
** u= -176/261 ; C1 -187837*x^2 - 99097*y^2 + 129017*z^2
(6580/104833 : -119273/104833 : 1) C2a (-713738/230545 : -10149/32935 : 1)
** u= -176/277 ; C1 -219613*x^2 - 107705*y^2 + 143257*z^2
(-47507/81751 : -65478/81751 : 1) C2a (-2063714/1313363 : 202135/1313363 : 1)
** u= -176/305 ; C1 -281381*x^2 - 124001*y^2 + 169409*z^2
(46071/59387 : -1370/59387 : 1) C2a (258492/91105 : 26431/91105 : 1)
** u= -176/321 ; C1 -320197*x^2 - 134017*y^2 + 185057*z^2
(3403/126095 : -1925042/1639235 : 1) C2a (980142/135541 : 1319453/1762033 : 1)
** u= -176/367 ; C1 -446053*x^2 - 165665*y^2 + 232897*z^2
(66836/729803 : 858333/729803 : 1) C2a (-107248/458101 : 11/9349 : 1)
** u= -175/159 ; C1 {+/-} -45730*x^2 + 55906*y^2 + 50306*z^2
(-27901/43067 : -32128/43067 : 1) C2a (-23660993/2813285 : 1971483/2813285 : 1) C2b (-170666/1458951 : 93979/1458951
: 1)
** u= -175/167 ; C1 {+/-} -53170*x^2 + 58514*y^2 + 55714*z^2
(-67432/66763 : 10593/66763 : 1) C2a (-1558691/2000405 : -41479/2000405 : 1) C2b (429492/602747 : 10553/602747 : 1)
** u= -175/183 ; C1 {+/-} -69970*x^2 + 64114*y^2 + 66914*z^2
(-5008/5299 : 1391/5299 : 1) C2a (-1004419/175115 : 89889/175115 : 1) C2b (290528/496883 : -15207/496883 : 1)
** u= -175/247 ; C1 {+/-} -162770*x^2 + 91634*y^2 + 116834*z^2
(-1209/2059 : -1676/2059 : 1) C2a (648790873/1260967347 : 19776559/1260967347 : 1) C2b (1510246/3128855 :
25993/3128855 : 1)
** u= -174/169 ; C1 -55457*x^2 + 58837*y^2 + 57097*z^2
(30442/76203 : -69005/76203 : 1) C2b (-1529979/3288517 : 160031/3288517 : 1)
** u= -174/211 ; C1 -106025*x^2 + 74797*y^2 + 87673*z^2
(-22371/30155 : -3776/6031 : 1) C2b (-41071/141683 : -6813/141683 : 1)
** u= -174/289 ; C1 -246737*x^2 + 113797*y^2 + 153817*z^2
(-27578/91695 : 98569/91695 : 1) C2b (58617/540541 : 20897/540541 : 1)
** u= -174/379 ; C1 -484697*x^2 + 173917*y^2 + 245257*z^2
(-78270/176789 : -164321/176789 : 1) C2b (142947/766109 : -4363/766109 : 1)
** u= -173/237 ; C1 {+/-} -146770*x^2 + 86098*y^2 + 108242*z^2
(71315/85549 : -23048/85549 : 1) C2a (8092749/3972803 : -775229/3972803 : 1) C2b (-511742/2514969 : -115661/2514969 :
1)
** u= -173/277 ; C1 -221890*x^2 + 106658*y^2 + 142642*z^2
(844/1053 : -31/1053 : 1) C2b (69732/439325 : 17167/439325 : 1)
** u= -173/373 ; C1 {+/-} -467458*x^2 + 169058*y^2 + 238258*z^2
(-20176/55449 : 56635/55449 : 1) C2a (-8695793/2816065 : 908683/2816065 : 1) C2b (143824/1370793 : -25139/1370793 :
1)
** u= -172/101 ; C1 -11101*x^2 - 39785*y^2 + 15361*z^2
(-7151/21759 : 12982/21759 : 1) C2a (598936/55091 : 32585/55091 : 1)
** u= -172/121 ; C1 -19541*x^2 - 44225*y^2 + 26681*z^2
(-3037/3347 : 1638/3347 : 1) C2a (43416/29135 : 10753/145675 : 1)
** u= -172/189 ; C1 -78157*x^2 - 65305*y^2 + 71153*z^2
(2168/3109 : 2215/3109 : 1) C2a (-6257034/20947 : 576155/20947 : 1)
** u= -172/199 ; C1 -90677*x^2 - 69185*y^2 + 78473*z^2
(18947/26629 : -18270/26629 : 1) C2a (-25332/30331 : -1625/30331 : 1)
** u= -172/203 ; C1 -95965*x^2 - 70793*y^2 + 81457*z^2
(-21796/24919 : 8397/24919 : 1) C2a (2823248/4681855 : 35291/4681855 : 1)
** u= -172/213 ; C1 -109885*x^2 - 74953*y^2 + 89057*z^2
(1216/7541 : -8087/7541 : 1) C2a (742656/278017 : -69779/278017 : 1)
** u= -172/225 ; C1 -127909*x^2 - 80209*y^2 + 98441*z^2
(-10388/12785 : -5341/12785 : 1) C2a (-249528/440657 : 163/8993 : 1)
** u= -172/289 ; C1 -248357*x^2 - 113105*y^2 + 153353*z^2
(-5928/9889 : -7445/9889 : 1) C2a (-105274/85827 : 10267/85827 : 1)
** u= -172/331 ; C1 -349661*x^2 - 139145*y^2 + 193841*z^2
(-60591/89609 : 3406/6893 : 1) C2a (-291012/192223 : -29717/192223 : 1)
** u= -171/91 ; C1 {+/-} -8402*x^2 + 37522*y^2 + 10162*z^2
(-16080/20683 : 7613/20683 : 1) C2a (421/35 : -4923/8995 : 1) C2b (-118674/74183 : -51013/19065031 : 1)
** u= -171/179 ; C1 {+/-} -67010*x^2 + 61282*y^2 + 64018*z^2
(-309/343 : 136/343 : 1) C2a (-3082103/1917941 : -252153/1917941 : 1) C2b (18066762/29501921 : 758161/29501921 : 1)
** u= -171/187 ; C1 -76178*x^2 - 64210*y^2 + 69682*z^2
(3163/31491 : 32624/31491 : 1) C2a (-298283/273949 : 22059/273949 : 1)
** u= -171/235 ; C1 -144626*x^2 + 84466*y^2 + 106354*z^2
(891447/1522615 : -1248376/1522615 : 1) C2b (-1502376/3034505 : -30871/3034505 : 1)
** u= -171/355 ; C1 -416546*x^2 - 155266*y^2 + 218194*z^2
(371244/843775 : -794203/843775 : 1) C2a (96689/3339 : -10111/3339 : 1)
** u= -170/87 ; C1 -7585*x^2 + 36469*y^2 + 8249*z^2
(25094/46157 : -18733/46157 : 1) C2b (3281999/2649041 : 138411/2649041 : 1)
** u= -170/109 ; C1 -14185*x^2 + 40781*y^2 + 20041*z^2
(5677/8933 : -5292/8933 : 1) C2b (-381223/705537 : 6409/100791 : 1)
** u= -170/121 ; C1 -19825*x^2 + 43541*y^2 + 26881*z^2
(2633/3945 : 508/789 : 1) C2b (250443/1119055 : -76801/1119055 : 1)
** u= -170/147 ; C1 -36985*x^2 + 50509*y^2 + 42689*z^2
(6394/16981 : 14621/16981 : 1) C2b (33361/510595 : 33807/510595 : 1)
** u= -170/149 ; C1 -38585*x^2 + 51101*y^2 + 43961*z^2
(29049/54209 : 43484/54209 : 1) C2b (-670457/1294853 : -65677/1294853 : 1)
** u= -170/163 ; C1 -50905*x^2 + 55469*y^2 + 53089*z^2
(-58030/211557 : -199363/211557 : 1) C2b (-325393/17476797 : 1112017/17476797 : 1)
** u= -170/257 ; C1 -184385*x^2 + 94949*y^2 + 124529*z^2
(-417986/551963 : 245553/551963 : 1) C2b (-206941/15517099 : 703709/15517099 : 1)
** u= -170/283 ; C1 -236905*x^2 + 108989*y^2 + 147409*z^2
(104419/152871 : -88924/152871 : 1) C2b (930657/2737013 : 54103/2737013 : 1)
** u= -170/301 ; C1 -277225*x^2 + 119501*y^2 + 164041*z^2
(1682/2195 : -45/439 : 1) C2b (1415457/4535225 : -76249/4535225 : 1)
** u= -170/387 ; C1 -514585*x^2 + 178669*y^2 + 252449*z^2
(19001/27211 : -2524/27211 : 1) C2b (833993/5730025 : -3291/5730025 : 1)
** u= -169/161 ; C1 -49330*x^2 - 54482*y^2 + 51778*z^2
(-12109/14457 : 8116/14457 : 1) C2a (142657/163259 : 6473/163259 : 1)
** u= -169/225 ; C1 {+/-} -129586*x^2 + 79186*y^2 + 98114*z^2
(640/893 : 9583/15181 : 1) C2a (-13739/24685 : 7671/419645 : 1) C2b (-9466/26769 : 17311/455073 : 1)
** u= -169/257 ; C1 -185074*x^2 + 94610*y^2 + 124354*z^2
(-13024/21641 : 16845/21641 : 1) C2b (423522/2029967 : 80831/2029967 : 1)
** u= -169/281 ; C1 -233410*x^2 - 107522*y^2 + 145378*z^2
(-37204/257097 : 293881/257097 : 1) C2a (305029/169307 : -30541/169307 : 1)
** u= -168/83 ; C1 -6893*x^2 - 35113*y^2 + 6553*z^2
(13665/14773 : 2018/14773 : 1) C2a (-234658/43595 : -8343/43595 : 1)
** u= -168/89 ; C1 -8021*x^2 - 36145*y^2 + 9601*z^2
(2248/13773 : -7019/13773 : 1) C2a (127804/5009 : 5799/5009 : 1)
** u= -168/187 ; C1 -77405*x^2 - 63193*y^2 + 69577*z^2
(-12940/19299 : 14317/19299 : 1) C2a (-69379802/41163595 : 5949129/41163595 : 1)
** u= -168/221 ; C1 -123917*x^2 - 77065*y^2 + 94873*z^2
(-2544/60937 : -67535/60937 : 1) C2a (1771892/1789029 : 146323/1789029 : 1)
** u= -168/227 ; C1 -133325*x^2 - 79753*y^2 + 99577*z^2
(34881/67525 : -12098/13505 : 1) C2a (89456/146903 : 4689/146903 : 1)
** u= -168/239 ; C1 -153221*x^2 - 85345*y^2 + 109201*z^2
(1173/8633 : -9638/8633 : 1) C2a (-144688/295727 : -24261/3844451 : 1)
** u= -168/271 ; C1 -213317*x^2 - 101665*y^2 + 136273*z^2
(-64512/217751 : -234145/217751 : 1) C2a (-40048598/5357749 : -4084137/5357749 : 1)
** u= -168/289 ; C1 -251621*x^2 - 111745*y^2 + 152401*z^2
(-510713/751587 : 427886/751587 : 1) C2a (-200824/420709 : 13053/420709 : 1)
** u= -168/293 ; C1 -260573*x^2 - 114073*y^2 + 156073*z^2
(10699/192999 : 225170/192999 : 1) C2a (-4624246/8326083 : -362143/8326083 : 1)
** u= -168/305 ; C1 -288389*x^2 - 121249*y^2 + 167281*z^2
(44172/93605 : -86299/93605 : 1) C2a (-488462/1420457 : -27/3473 : 1)
** u= -168/325 ; C1 -337949*x^2 - 133849*y^2 + 186601*z^2
(180405/557911 : 593098/557911 : 1) C2a (1448774/4183805 : 81183/4183805 : 1)
** u= -168/331 ; C1 -353597*x^2 - 137785*y^2 + 192553*z^2
(-48252/94111 : 80015/94111 : 1) C2a (-579962/1809561 : 29917/1809561 : 1)
** u= -168/353 ; C1 -414053*x^2 - 152833*y^2 + 214993*z^2
(-25371/164215 : 190238/164215 : 1) C2a (525226/1670673 : -37957/1670673 : 1)
** u= -168/389 ; C1 -523421*x^2 - 179545*y^2 + 253801*z^2
(526516/866301 : 502685/866301 : 1) C2a (383858/2764953 : -18989/2764953 : 1)
** u= -167/111 ; C1 {+/-} -15346*x^2 + 40210*y^2 + 21506*z^2
(4256/5279 : 2827/5279 : 1) C2a (186349/64399 : -11109/64399 : 1) C2b (-135194/1064291 : -75459/1064291 : 1)
** u= -167/143 ; C1 -34610*x^2 - 48338*y^2 + 40322*z^2
(7501/9727 : 6216/9727 : 1) C2a (406141/46935 : -32573/46935 : 1)
** u= -167/175 ; C1 {+/-} -64114*x^2 + 58514*y^2 + 61186*z^2
(4183/10715 : -10044/10715 : 1) C2a (-280427/67685 : -24959/67685 : 1) C2b (-267198/2615065 : 157337/2615065 : 1)
** u= -167/343 ; C1 {+/-} -387010*x^2 + 145538*y^2 + 204322*z^2
(204572/309699 : 11759/23823 : 1) C2a (14092813/4742131 : -1467973/4742131 : 1) C2b (-983074/6063063 : 117547/6063063
: 1)
** u= -167/351 ; C1 {+/-} -409426*x^2 + 151090*y^2 + 212546*z^2
(-903607/2433947 : -2474096/2433947 : 1) C2a (200367/756967 : -10771/756967 : 1) C2b (850832/6333007 : 121317/6333007
: 1)
** u= -166/73 ; C1 -5729*x^2 + 32885*y^2 + 2009*z^2
(-5558/9587 : -483/9587 : 1) C2b (-333889/490189 : 5087/70027 : 1)
** u= -166/81 ; C1 -6577*x^2 + 34117*y^2 + 5897*z^2
(-51599/199325 : 79712/199325 : 1) C2b (-2791/19143 : 1411/19143 : 1)
** u= -166/119 ; C1 -19345*x^2 + 41717*y^2 + 26113*z^2
(48574/95149 : -67623/95149 : 1) C2b (27459/31825 : 1151/31825 : 1)
** u= -166/123 ; C1 -21529*x^2 + 42685*y^2 + 28409*z^2
(39641/50551 : 30136/50551 : 1) C2b (-329917/352463 : -6279/352463 : 1)
** u= -166/165 ; C1 -54121*x^2 + 54781*y^2 + 54449*z^2
(-54334/55843 : -13525/55843 : 1) C2b (-157907/2928243 : -182681/2928243 : 1)
** u= -166/171 ; C1 -60217*x^2 + 56797*y^2 + 58457*z^2
(-250054/292361 : 147245/292361 : 1) C2b (-233/399 : -473/14649 : 1)
** u= -166/175 ; C1 -64481*x^2 + 58181*y^2 + 61169*z^2
(62243/102275 : 81876/102275 : 1) C2b (-342821/512315 : 2099/512315 : 1)
** u= -166/183 ; C1 -73489*x^2 + 61045*y^2 + 66689*z^2
(304598/403453 : 257159/403453 : 1) C2b (-13967/198597 : 1667/28371 : 1)
** u= -166/205 ; C1 -101561*x^2 + 69581*y^2 + 82529*z^2
(41231/54005 : -31272/54005 : 1) C2b (16673/29447 : 181/29447 : 1)
** u= -166/217 ; C1 -118913*x^2 + 74645*y^2 + 91577*z^2
(-12058/54199 : -58071/54199 : 1) C2b (416867/783469 : -4591/783469 : 1)
** u= -166/229 ; C1 -137705*x^2 + 79997*y^2 + 100913*z^2
(78267/94193 : 25444/94193 : 1) C2b (1503193/3416399 : -82781/3416399 : 1)
** u= -166/277 ; C1 -227273*x^2 + 104285*y^2 + 141137*z^2
(94423/226981 : -224268/226981 : 1) C2b (-3551333/9347849 : -81757/9347849 : 1)
** u= -166/307 ; C1 -294953*x^2 + 121805*y^2 + 168617*z^2
(13194/63233 : 71509/63233 : 1) C2b (-564557/2294249 : -49903/2294249 : 1)
** u= -166/313 ; C1 -309569*x^2 + 125525*y^2 + 174329*z^2
(8075/13289 : -45948/66445 : 1) C2b (83981/1261261 : -39697/1261261 : 1)
** u= -166/359 ; C1 -433585*x^2 + 156437*y^2 + 220513*z^2
(457502/1595121 : -1733917/1595121 : 1) C2b (142903/1105821 : 17869/1105821 : 1)
** u= -166/383 ; C1 -506689*x^2 + 174245*y^2 + 246289*z^2
(-27862/227793 : 266621/227793 : 1) C2b (-19067/215943 : 2087/215943 : 1)
** u= -165/109 ; C1 {+/-} -14690*x^2 + 39106*y^2 + 20626*z^2
(17664/27193 : -16517/27193 : 1) C2a (-421919/6569 : 27027/6569 : 1) C2b (-399514/394789 : -11859/394789 : 1)
** u= -165/181 ; C1 -71570*x^2 + 59986*y^2 + 65266*z^2
(7612/22029 : -21421/22029 : 1) C2b (422142/831073 : -30317/831073 : 1)
** u= -164/75 ; C1 -5821*x^2 - 32521*y^2 + 3329*z^2
(-7024/9443 : 545/9443 : 1) C2a (658026/126535 : 16033/126535 : 1)
** u= -164/101 ; C1 -11645*x^2 - 37097*y^2 + 16433*z^2
(-2367/17623 : 11654/17623 : 1) C2a (88608/35069 : 4543/35069 : 1)
** u= -164/103 ; C1 -12373*x^2 - 37505*y^2 + 17497*z^2
(7016/20387 : -13329/20387 : 1) C2a (-48992/27631 : 2179/27631 : 1)
** u= -164/141 ; C1 -33805*x^2 - 46777*y^2 + 39233*z^2
(-19045/21443 : 11114/21443 : 1) C2a (19138/9631 : 1407/9631 : 1)
** u= -164/147 ; C1 -38509*x^2 - 48505*y^2 + 42929*z^2
(-34408/33307 : 6473/33307 : 1) C2a (-418826/100379 : 34131/100379 : 1)
** u= -164/173 ; C1 -63053*x^2 - 56825*y^2 + 59777*z^2
(10695/14063 : -45034/70315 : 1) C2a (-175346/210657 : 409/9159 : 1)
** u= -164/201 ; C1 -97045*x^2 - 67297*y^2 + 79433*z^2
(-41177/79471 : 70778/79471 : 1) C2a (967898/1301461 : -58917/1301461 : 1)
** u= -164/329 ; C1 -352277*x^2 - 135137*y^2 + 189257*z^2
(13915/72707 : -83058/72707 : 1) C2a (1670792/1566189 : -168961/1566189 : 1)
** u= -164/341 ; C1 -384605*x^2 - 143177*y^2 + 201233*z^2
(-74355/314939 : 352922/314939 : 1) C2a (175118/530505 : -12791/530505 : 1)
** u= -164/381 ; C1 -502765*x^2 - 172057*y^2 + 243233*z^2
(-7952/11521 : 1693/11521 : 1) C2a (-17357362/143837971 : 422163/143837971 : 1)
** u= -163/75 ; C1 {+/-} -5794*x^2 + 32194*y^2 + 3506*z^2
(3128/4271 : 475/4271 : 1) C2a (279591/34451 : 7729/34451 : 1) C2b (-329084/147675 : -5279/147675 : 1)
** u= -163/259 ; C1 {+/-} -193106*x^2 + 93650*y^2 + 124946*z^2
(1865/4031 : 19044/20155 : 1) C2a (281/525 : 89/2625 : 1) C2b (652/112565 : -24041/562825 : 1)
** u= -163/315 ; C1 {+/-} -317314*x^2 + 125794*y^2 + 175346*z^2
(-1676/82475 : 97337/82475 : 1) C2a (1572319/1683095 : -155517/1683095 : 1) C2b (185866/635325 : 491/635325 : 1)
** u= -163/363 ; C1 {+/-} -448738*x^2 + 158338*y^2 + 223538*z^2
(-45668/125107 : -127225/125107 : 1) C2a (-137433/473305 : -1661/67615 : 1) C2b (29198/305501 : -651/43643 : 1)
** u= -163/387 ; C1 {+/-} -523090*x^2 + 176338*y^2 + 249362*z^2
(-137920/214931 : 5549/12643 : 1) C2a (14719/32897 : -1521/32897 : 1) C2b (302854/7458237 : -51247/7458237 : 1)
** u= -162/127 ; C1 -24593*x^2 + 42373*y^2 + 31033*z^2
(-23429/38919 : 28120/38919 : 1) C2b (-420379/602153 : 26451/602153 : 1)
** u= -162/227 ; C1 -136793*x^2 + 77773*y^2 + 98833*z^2
(-6510/134153 : 150983/134153 : 1) C2b (-2651167/5388691 : -3519/769813 : 1)
** u= -162/239 ; C1 -156977*x^2 + 83365*y^2 + 108313*z^2
(-21206/50433 : 49577/50433 : 1) C2b (-235743/535679 : 7853/535679 : 1)
** u= -162/259 ; C1 -193817*x^2 + 93325*y^2 + 124753*z^2
(-3526/7965 : -38401/39825 : 1) C2b (158385/638681 : 108593/3193405 : 1)
** u= -162/323 ; C1 -338585*x^2 + 130573*y^2 + 182737*z^2
(-295398/469517 : 286781/469517 : 1) C2b (-1046051/4567585 : 67821/4567585 : 1)
** u= -162/325 ; C1 -343769*x^2 + 131869*y^2 + 184681*z^2
(293790/441827 : -219961/441827 : 1) C2b (-2210829/8348221 : -781/1192603 : 1)
** u= -162/337 ; C1 -375713*x^2 + 139813*y^2 + 196513*z^2
(42462/117763 : 121025/117763 : 1) C2b (-2229/9455 : 7/9455 : 1)
** u= -161/89 ; C1 {+/-} -8210*x^2 + 33842*y^2 + 10658*z^2
(-2044/5381 : -2847/5381 : 1) C2a (-1356141/685105 : 611/9385 : 1) C2b (-293696/222577 : 101/3049 : 1)
** u= -161/129 ; C1 {+/-} -26050*x^2 + 42562*y^2 + 32258*z^2
(-11684/10525 : -127/2105 : 1) C2a (6793/7459 : -117/7459 : 1) C2b (-352/1905 : -1/15 : 1)
** u= -161/137 ; C1 {+/-} -31538*x^2 + 44690*y^2 + 36962*z^2
(-81/133 : -100/133 : 1) C2a (1248531/1248727 : 55435/1248727 : 1) C2b (71368/103231 : -3845/103231 : 1)
** u= -161/185 ; C1 {+/-} -77906*x^2 + 60146*y^2 + 67874*z^2
(16467/21985 : -13936/21985 : 1) C2a (-764579/262545 : -70037/262545 : 1) C2b (608734/1185349 : -37493/1185349 : 1)
** u= -161/257 ; C1 {+/-} -190658*x^2 + 91970*y^2 + 122882*z^2
(-2752/4001 : -2385/4001 : 1) C2a (-3443717/3442011 : -319285/3442011 : 1) C2b (109496/830957 : 33475/830957 : 1)
** u= -161/297 ; C1 {+/-} -275698*x^2 + 114130*y^2 + 157922*z^2
(-8149/101857 : 119144/101857 : 1) C2a (19903/55919 : -3/199 : 1) C2b (48724/675243 : -79/2403 : 1)
** u= -161/353 ; C1 {+/-} -421634*x^2 + 150530*y^2 + 212354*z^2
(-164/2861 : -3387/2861 : 1) C2a (-2198033/1997007 : -226927/1997007 : 1) C2b (44/701 : -13/701 : 1)
** u= -161/377 ; C1 {+/-} -493778*x^2 + 168050*y^2 + 237602*z^2
(11711/96037 : 112416/96037 : 1) C2a (59413/486879 : 3221/486879 : 1) C2b (43868/2867225 : -155401/14336125 : 1)
** u= -160/71 ; C1 -5365*x^2 - 30641*y^2 + 2161*z^2
(-18968/30567 : -1703/30567 : 1) C2a (441512/6853 : -10331/6853 : 1)
** u= -160/77 ; C1 -5965*x^2 - 31529*y^2 + 4969*z^2
(35872/60369 : -18191/60369 : 1) C2a (753614/291085 : -15271/291085 : 1)
** u= -160/119 ; C1 -20245*x^2 - 39761*y^2 + 26641*z^2
(-36773/47473 : -28662/47473 : 1) C2a (-3014018/1999765 : -167297/1999765 : 1)
** u= -160/129 ; C1 -26245*x^2 - 42241*y^2 + 32321*z^2
(-12779/22063 : -16462/22063 : 1) C2a (2885866/1391369 : 201573/1391369 : 1)
** u= -160/141 ; C1 -34765*x^2 - 45481*y^2 + 39401*z^2
(2356/5801 : 4991/5801 : 1) C2a (-348536/3031 : 28617/3031 : 1)
** u= -160/197 ; C1 -93565*x^2 - 64409*y^2 + 76249*z^2
(32819/42647 : 24258/42647 : 1) C2a (-1760554/2624519 : 88427/2624519 : 1)
** u= -160/211 ; C1 -113165*x^2 - 70121*y^2 + 86441*z^2
(-22216/26971 : 10011/26971 : 1) C2a (-4157176/1586055 : -398759/1586055 : 1)
** u= -160/231 ; C1 -144565*x^2 - 78961*y^2 + 101681*z^2
(467/713 : 141998/200353 : 1) C2a (-1626/3205 : -15721/900605 : 1)
** u= -160/267 ; C1 -211165*x^2 - 96889*y^2 + 131129*z^2
(136541/178697 : 50842/178697 : 1) C2a (-2196/5609 : 6119/1441513 : 1)
** u= -160/377 ; C1 -494965*x^2 - 167729*y^2 + 237169*z^2
(249344/467857 : -355023/467857 : 1) C2a (9368482/3111443 : 2017/6389 : 1)
** u= -160/391 ; C1 -539765*x^2 - 178481*y^2 + 252401*z^2
(12365/41081 : -43866/41081 : 1) C2a (-2235126/2849225 : 235291/2849225 : 1)
** u= -159/95 ; C1 -9986*x^2 + 34306*y^2 + 13954*z^2
(25700/22887 : -4561/22887 : 1) C2b (-28027946/41648519 : -2579763/41648519 : 1)
** u= -159/167 ; C1 -58514*x^2 - 53170*y^2 + 55714*z^2
(33609/34499 : 2008/34499 : 1) C2a (86089/75219 : -6287/75219 : 1)
** u= -159/175 ; C1 {+/-} -67106*x^2 + 55906*y^2 + 60994*z^2
(-821/5835 : -6028/5835 : 1) C2a (65849/29501 : 5811/29501 : 1) C2b (-115698/321823 : 15779/321823 : 1)
** u= -159/287 ; C1 -254594*x^2 + 107650*y^2 + 148354*z^2
(-60784/131571 : -122957/131571 : 1) C2b (206156/1008839 : -28311/1008839 : 1)
** u= -159/335 ; C1 -373346*x^2 - 137506*y^2 + 193474*z^2
(-26884/54555 : 47173/54555 : 1) C2a (264679/602451 : 23789/602451 : 1)
** u= -158/109 ; C1 -15481*x^2 + 36845*y^2 + 21361*z^2
(-11533/10593 : 3028/10593 : 1) C2b (-448653/454127 : -11267/454127 : 1)
** u= -158/125 ; C1 -24089*x^2 + 40589*y^2 + 30161*z^2
(-53255/67733 : 41544/67733 : 1) C2b (52463/58327 : -109/58327 : 1)
** u= -158/153 ; C1 -45313*x^2 + 48373*y^2 + 46793*z^2
(-24506/31051 : 1173545/1894111 : 1) C2b (-61333/93619 : -159813/5710759 : 1)
** u= -158/199 ; C1 -97201*x^2 + 64565*y^2 + 77521*z^2
(-150523/234467 : 178596/234467 : 1) C2b (397731/1417861 : -66085/1417861 : 1)
** u= -158/255 ; C1 -188929*x^2 + 89989*y^2 + 120641*z^2
(-54835/165547 : 174436/165547 : 1) C2b (2646581/6470465 : -16599/6470465 : 1)
** u= -158/319 ; C1 -332161*x^2 + 126725*y^2 + 177601*z^2
(15805/22723 : 41496/113615 : 1) C2b (-86805/398543 : 29539/1992715 : 1)
** u= -158/347 ; C1 -407705*x^2 + 145373*y^2 + 205097*z^2
(-15939/75107 : -85124/75107 : 1) C2b (-317273/2606455 : 38447/2606455 : 1)
** u= -158/361 ; C1 -448417*x^2 + 155285*y^2 + 219433*z^2
(29189/54793 : -42216/54793 : 1) C2b (288823/8853051 : -127303/8853051 : 1)
** u= -157/109 ; C1 {+/-} -15602*x^2 + 36530*y^2 + 21458*z^2
(4848/6221 : -3563/6221 : 1) C2a (-18300721/9619953 : 1033321/9619953 : 1) C2b (21694/25163 : 1009/25163 : 1)
** u= -157/333 ; C1 {+/-} -369970*x^2 + 135538*y^2 + 190802*z^2
(152/2021 : 31001/26273 : 1) C2a (584547/1689739 : -615479/21966607 : 1) C2b (-15386/82105 : -12687/1067365 : 1)
** u= -156/71 ; C1 -5237*x^2 - 29377*y^2 + 2857*z^2
(5184/8275 : 1367/8275 : 1) C2a (203024/21695 : -5349/21695 : 1)
** u= -156/79 ; C1 -6245*x^2 - 30577*y^2 + 6553*z^2
(-27433/30609 : 6862/30609 : 1) C2a (847772/377031 : 20627/377031 : 1)
** u= -156/97 ; C1 -10853*x^2 - 33745*y^2 + 15337*z^2
(-13048/17181 : 8911/17181 : 1) C2a (-515924/54593 : 4347/7799 : 1)
** u= -156/103 ; C1 -13109*x^2 - 34945*y^2 + 18409*z^2
(-24561/21289 : 3530/21289 : 1) C2a (-34442/2973 : -2195/2973 : 1)
** u= -156/119 ; C1 -20885*x^2 - 38497*y^2 + 26953*z^2
(-14844/68447 : -56219/68447 : 1) C2a (-4992832/730491 : 365063/730491 : 1)
** u= -156/161 ; C1 -53477*x^2 - 50257*y^2 + 51817*z^2
(92364/135965 : -99913/135965 : 1) C2a (-239392/255045 : -14657/255045 : 1)
** u= -156/217 ; C1 -124373*x^2 - 71425*y^2 + 90457*z^2
(14076/55633 : 59789/55633 : 1) C2a (1052212/414579 : 6025/24387 : 1)
** u= -155/147 ; C1 {+/-} -40930*x^2 + 45634*y^2 + 43154*z^2
(6553/14171 : -12304/14171 : 1) C2a (-16039803/3264413 : -1360049/3264413 : 1) C2b (-63956/1109275 : -70743/1109275 :
1)
** u= -155/203 ; C1 {+/-} -104210*x^2 + 65234*y^2 + 80114*z^2
(-37/139 : -1908/1807 : 1) C2a (7967/10797 : -6983/140361 : 1) C2b (-56026/111401 : -25553/1448213 : 1)
** u= -155/307 ; C1 {+/-} -304930*x^2 + 118274*y^2 + 165394*z^2
(-36199/97419 : -99464/97419 : 1) C2a (-561781/314671 : -57907/314671 : 1) C2b (8456/1498065 : -42907/1498065 : 1)
** u= -154/65 ; C1 -4801*x^2 + 27941*y^2 + 529*z^2
(-2254/6955 : -207/6955 : 1) C2b (-828519/192119 : 439/8353 : 1)
** u= -154/89 ; C1 -8497*x^2 + 31637*y^2 + 11617*z^2
(84275/80661 : -21944/80661 : 1) C2b (2585569/2169327 : -76841/2169327 : 1)
** u= -154/169 ; C1 -62417*x^2 + 52277*y^2 + 56897*z^2
(79418/101395 : 60489/101395 : 1) C2b (-1281859/2269933 : -64709/2269933 : 1)
** u= -154/193 ; C1 -91073*x^2 + 60965*y^2 + 72977*z^2
(39549/45013 : -9424/45013 : 1) C2b (-133/829 : 43/829 : 1)
** u= -154/201 ; C1 -101905*x^2 + 64117*y^2 + 78593*z^2
(-90658/105731 : 25303/105731 : 1) C2b (61333/1442805 : -75347/1442805 : 1)
** u= -154/207 ; C1 -110449*x^2 + 66565*y^2 + 82889*z^2
(-1146539/1660231 : -1118540/1660231 : 1) C2b (-548821/1295599 : 38205/1295599 : 1)
** u= -154/215 ; C1 -122401*x^2 + 69941*y^2 + 88729*z^2
(-37397/117311 : -122520/117311 : 1) C2b (-4072137/8760377 : -151379/8760377 : 1)
** u= -154/227 ; C1 -141529*x^2 + 75245*y^2 + 97729*z^2
(-86758/1180297 : 1339857/1180297 : 1) C2b (1130889/3020519 : 83291/3020519 : 1)
** u= -154/261 ; C1 -203545*x^2 + 91837*y^2 + 124793*z^2
(-34202/58111 : -44677/58111 : 1) C2b (78619/236313 : -4447/236313 : 1)
** u= -154/321 ; C1 -341185*x^2 + 126757*y^2 + 178193*z^2
(-18091/114581 : -132572/114581 : 1) C2b (-358337/2530361 : 49359/2530361 : 1)
** u= -154/325 ; C1 -351641*x^2 + 129341*y^2 + 182009*z^2
(-50601/75257 : 31760/75257 : 1) C2b (1270097/5948563 : -41221/5948563 : 1)
** u= -154/353 ; C1 -429313*x^2 + 148325*y^2 + 209617*z^2
(-24655/53161 : 236352/265805 : 1) C2b (-51679/378525 : -1249/1892625 : 1)
** u= -153/385 ; C1 -528914*x^2 - 171634*y^2 + 242626*z^2
(-33228/49745 : 9781/49745 : 1) C2a (4468747/6462785 : 475731/6462785 : 1)
** u= -152/105 ; C1 -14389*x^2 - 34129*y^2 + 19841*z^2
(30697/33715 : -16234/33715 : 1) C2a (-3007574/856415 : 192987/856415 : 1)
** u= -152/167 ; C1 -61013*x^2 - 50993*y^2 + 55553*z^2
(155609/172285 : 58002/172285 : 1) C2a (2183848/2142501 : 155971/2142501 : 1)
** u= -152/259 ; C1 -201037*x^2 - 90185*y^2 + 122713*z^2
(-28372/156431 : 177489/156431 : 1) C2a (-1927276/4482653 : -2339/109333 : 1)
** u= -152/271 ; C1 -225541*x^2 - 96545*y^2 + 132721*z^2
(95764/150139 : 97797/150139 : 1) C2a (92056/166751 : -7399/166751 : 1)
** u= -152/303 ; C1 -297925*x^2 - 114913*y^2 + 160817*z^2
(43223/58861 : 2242/58861 : 1) C2a (-284588/1000069 : -9453/1000069 : 1)
** u= -152/345 ; C1 -408469*x^2 - 142129*y^2 + 200801*z^2
(199/515 : -192566/194155 : 1) C2a (5338/9235 : 203847/3481595 : 1)
** u= -152/357 ; C1 -443293*x^2 - 150553*y^2 + 212873*z^2
(137713/353195 : -347194/353195 : 1) C2a (115016/448543 : -11127/448543 : 1)
** u= -152/385 ; C1 -530149*x^2 - 171329*y^2 + 242161*z^2
(297380/1001017 : -1068951/1001017 : 1) C2a (-9380944/5226791 : -986401/5226791 : 1)
** u= -151/79 ; C1 -6290*x^2 - 29042*y^2 + 7298*z^2
(2329/31147 : 15576/31147 : 1) C2a (50209/28683 : -689/28683 : 1)
** u= -151/223 ; C1 -136754*x^2 + 72530*y^2 + 94274*z^2
(11801/14771 : 4584/14771 : 1) C2b (710426/5706431 : -255935/5706431 : 1)
** u= -151/255 ; C1 {+/-} -193906*x^2 + 87826*y^2 + 119234*z^2
(-75632/101279 : 36005/101279 : 1) C2a (1382553/620753 : -140003/620753 : 1) C2b (319754/2176659 : -78877/2176659 :
1)
** u= -150/73 ; C1 -5345*x^2 + 27829*y^2 + 4729*z^2
(30537/32597 : -1208/32597 : 1) C2b (-1137891/1029455 : 63853/1029455 : 1)
** u= -150/143 ; C1 -38945*x^2 + 42949*y^2 + 40849*z^2
(-29757/29779 : 6364/29779 : 1) C2b (-158117/217517 : 2763/217517 : 1)
** u= -150/221 ; C1 -134105*x^2 + 71341*y^2 + 92641*z^2
(82371/105889 : -42496/105889 : 1) C2b (-328997/1167095 : 43299/1167095 : 1)
** u= -150/239 ; C1 -164705*x^2 + 79621*y^2 + 106321*z^2
(882/8657 : -9923/8657 : 1) C2b (872531/2141209 : -19911/2141209 : 1)
** u= -150/281 ; C1 -248705*x^2 + 101461*y^2 + 140761*z^2
(-30067/57801 : -49184/57801 : 1) C2b (-4651849/29711809 : 841941/29711809 : 1)
** u= -150/329 ; C1 -366305*x^2 + 130741*y^2 + 184441*z^2
(-233033/804693 : 872552/804693 : 1) C2b (2811/17291 : 169/17291 : 1)
** u= -149/213 ; C1 -122098*x^2 + 67570*y^2 + 86642*z^2
(10816/16577 : -11873/16577 : 1) C2b (-1226/10383 : -485/10383 : 1)
** u= -148/91 ; C1 -9437*x^2 - 30185*y^2 + 13313*z^2
(11987/10669 : -2298/10669 : 1) C2a (2832182/1869 : 165925/1869 : 1)
** u= -148/123 ; C1 -24733*x^2 - 37033*y^2 + 29633*z^2
(6632/8875 : 5801/8875 : 1) C2a (11602/1621 : 909/1621 : 1)
** u= -148/153 ; C1 -48373*x^2 - 45313*y^2 + 46793*z^2
(-785/1159 : -14/19 : 1) C2a (-1191964/1601215 : 42171/1601215 : 1)
** u= -148/189 ; C1 -88621*x^2 - 57625*y^2 + 69761*z^2
(809/15679 : 17222/15679 : 1) C2a (-127404/141461 : 48989/707305 : 1)
** u= -148/207 ; C1 -113605*x^2 - 64753*y^2 + 82217*z^2
(-151904/192991 : -82507/192991 : 1) C2a (210978/158671 : -19463/158671 : 1)
** u= -148/231 ; C1 -151957*x^2 - 75265*y^2 + 99833*z^2
(-142748/369619 : -374263/369619 : 1) C2a (-404598/312131 : 38779/312131 : 1)
** u= -148/253 ; C1 -192173*x^2 - 85913*y^2 + 116993*z^2
(1832244/2376461 : 425825/2376461 : 1) C2a (-1250628/68455 : 128717/68455 : 1)
** u= -148/361 ; C1 -459797*x^2 - 152225*y^2 + 215273*z^2
(-8696/25793 : -26691/25793 : 1) C2a (-6606/83527 : 871/83527 : 1)
** u= -147/67 ; C1 {+/-} -4658*x^2 + 26098*y^2 + 2578*z^2
(-1531/5139 : 1480/5139 : 1) C2a (-147089/3265 : -4071/3265 : 1) C2b (-78338/29851 : 417/29851 : 1)
** u= -147/115 ; C1 {+/-} -20114*x^2 + 34834*y^2 + 25426*z^2
(8684/11655 : -7457/11655 : 1) C2a (1401191/1538241 : -289/1538241 : 1) C2b (-19992/86287 : 5729/86287 : 1)
** u= -147/155 ; C1 {+/-} -50594*x^2 + 45634*y^2 + 47986*z^2
(6615/9227 : -6404/9227 : 1) C2a (90479/125019 : -3079/125019 : 1) C2b (218376/2115715 : -126809/2115715 : 1)
** u= -147/211 ; C1 -120146*x^2 + 66130*y^2 + 84946*z^2
(47301/125651 : 127340/125651 : 1) C2b (-13412/1211933 : 58131/1211933 : 1)
** u= -147/299 ; C1 {+/-} -292802*x^2 + 111010*y^2 + 155698*z^2
(-14313/56819 : -63148/56819 : 1) C2a (-142349/529017 : 4885/529017 : 1) C2b (57382/650659 : 16203/650659 : 1)
** u= -146/69 ; C1 -4825*x^2 + 26077*y^2 + 3593*z^2
(-1109/4261 : 1508/4261 : 1) C2b (-395131/183393 : 4097/183393 : 1)
** u= -146/71 ; C1 -5057*x^2 + 26357*y^2 + 4457*z^2
(3867/5567 : -1540/5567 : 1) C2b (33433/16655 : -211/16655 : 1)
** u= -146/89 ; C1 -8945*x^2 + 29237*y^2 + 12593*z^2
(1995/1717 : 2968/22321 : 1) C2b (-460051/624253 : -67807/1159327 : 1)
** u= -146/93 ; C1 -10249*x^2 + 29965*y^2 + 14489*z^2
(-3829/3221 : 44/3221 : 1) C2b (895667/875417 : 30729/875417 : 1)
** u= -146/97 ; C1 -11713*x^2 + 30725*y^2 + 16417*z^2
(9106/8691 : 14789/43455 : 1) C2b (-69229/82839 : -19387/414195 : 1)
** u= -146/99 ; C1 -12505*x^2 + 31117*y^2 + 17393*z^2
(505/1019 : -20048/29551 : 1) C2b (24251/22497 : -263/652413 : 1)
** u= -146/233 ; C1 -156689*x^2 + 75605*y^2 + 101009*z^2
(-72598/219527 : 231219/219527 : 1) C2b (365389/2395199 : 94681/2395199 : 1)
** u= -146/261 ; C1 -209497*x^2 + 89437*y^2 + 123017*z^2
(185314/242575 : -22243/242575 : 1) C2b (2573/26159 : -897/26159 : 1)
** u= -146/281 ; C1 -252017*x^2 + 100277*y^2 + 139697*z^2
(-36002/83315 : 80079/83315 : 1) C2b (-535439/2800207 : 65711/2800207 : 1)
** u= -146/301 ; C1 -298537*x^2 + 111917*y^2 + 157177*z^2
(-190/5079 : 6011/5079 : 1) C2b (628447/2814051 : -28397/2814051 : 1)
** u= -145/257 ; C1 {+/-} -202210*x^2 + 87074*y^2 + 119554*z^2
(-115/3301 : 3864/3301 : 1) C2a (406337/68287 : -1823/2969 : 1) C2b (-133724/755895 : 1031/32865 : 1)
** u= -145/273 ; C1 {+/-} -235330*x^2 + 95554*y^2 + 132674*z^2
(10508/14849 : 5849/14849 : 1) C2a (258769/776635 : 9651/776635 : 1) C2b (-250636/874421 : -10971/874421 : 1)
** u= -145/321 ; C1 {+/-} -350050*x^2 + 124066*y^2 + 175106*z^2
(-316/905 : 187/181 : 1) C2a (17031/38905 : 1631/38905 : 1) C2b (-545804/3975609 : -47089/3975609 : 1)
** u= -144/65 ; C1 -4421*x^2 - 24961*y^2 + 2209*z^2
(5499/11087 : 2350/11087 : 1) C2a (-15883826/4463449 : -5397/94967 : 1)
** u= -144/95 ; C1 -11141*x^2 - 29761*y^2 + 15649*z^2
(8184/8623 : -3745/8623 : 1) C2a (-1417892/479775 : 83969/479775 : 1)
** u= -144/163 ; C1 -59693*x^2 - 47305*y^2 + 52777*z^2
(2851/12057 : 12326/12057 : 1) C2a (-1141112/140079 : -106015/140079 : 1)
** u= -144/205 ; C1 -112781*x^2 - 62761*y^2 + 80329*z^2
(104376/137905 : -69023/137905 : 1) C2a (-282026/488889 : -15259/488889 : 1)
** u= -144/229 ; C1 -151037*x^2 - 73177*y^2 + 97657*z^2
(-14700/22453 : -195769/291889 : 1) C2a (-362932/62601 : -68509/116259 : 1)
** u= -144/241 ; C1 -172325*x^2 - 78817*y^2 + 106753*z^2
(-30963/238775 : 54818/47755 : 1) C2a (-3235804/3355217 : 304209/3355217 : 1)
** u= -144/245 ; C1 -179741*x^2 - 80761*y^2 + 109849*z^2
(55719/106907 : -92930/106907 : 1) C2a (1301956/1474389 : -121109/1474389 : 1)
** u= -144/269 ; C1 -227597*x^2 - 93097*y^2 + 129097*z^2
(-36661/78639 : 72730/78639 : 1) C2a (837538/159355 : 86847/159355 : 1)
** u= -144/287 ; C1 -267269*x^2 - 103105*y^2 + 144289*z^2
(-211916/289659 : -31693/289659 : 1) C2a (4427164/6321519 : -426319/6321519 : 1)
** u= -144/311 ; C1 -325205*x^2 - 117457*y^2 + 165553*z^2
(-380489/551589 : -167338/551589 : 1) C2a (-681292/2723665 : 41871/2723665 : 1)
** u= -144/367 ; C1 -482789*x^2 - 155425*y^2 + 219649*z^2
(-25348/37671 : 15547/188355 : 1) C2a (-38488/157347 : 4627/157347 : 1)
** u= -143/119 ; C1 {+/-} -23186*x^2 + 34610*y^2 + 27746*z^2
(-2452/17683 : -15705/17683 : 1) C2a (-171367/200583 : 907/200583 : 1) C2b (-226726/466589 : 25811/466589 : 1)
** u= -143/327 ; C1 -368050*x^2 - 127378*y^2 + 180002*z^2
(-59576/92927 : -44131/92927 : 1) C2a (-37831/204953 : -2589/204953 : 1)
** u= -143/383 ; C1 -534818*x^2 - 167138*y^2 + 235778*z^2
(106308/166847 : -55745/166847 : 1) C2a (183179/2248473 : 48313/2248473 : 1)
** u= -142/63 ; C1 -4225*x^2 + 24133*y^2 + 1697*z^2
(-866/1469 : 11/113 : 1) C2b (-3486839/5874563 : 427803/5874563 : 1)
** u= -142/73 ; C1 -5345*x^2 + 25493*y^2 + 5897*z^2
(1323/4337 : -1996/4337 : 1) C2b (128033/77339 : -1721/77339 : 1)
** u= -142/75 ; C1 -5689*x^2 + 25789*y^2 + 6761*z^2
(-13250/15401 : -4843/15401 : 1) C2b (-844897/911555 : -55107/911555 : 1)
** u= -142/115 ; C1 -20969*x^2 + 33389*y^2 + 25721*z^2
(-10710/9773 : -1241/9773 : 1) C2b (1176089/2469335 : 8287/145255 : 1)
** u= -142/153 ; C1 -50305*x^2 + 43573*y^2 + 46697*z^2
(3094/4619 : -3437/4619 : 1) C2b (-568999/2715867 : 22031/387981 : 1)
** u= -142/173 ; C1 -71545*x^2 + 50093*y^2 + 58897*z^2
(183725/202601 : -7152/202601 : 1) C2b (-2783287/5883051 : 186959/5883051 : 1)
** u= -142/185 ; C1 -86209*x^2 + 54389*y^2 + 66601*z^2
(-32731/37857 : -7540/37857 : 1) C2b (-15417/152173 : -7841/152173 : 1)
** u= -142/273 ; C1 -237745*x^2 + 94693*y^2 + 131897*z^2
(125018/173447 : 51601/173447 : 1) C2b (2360929/8593077 : -99367/8593077 : 1)
** u= -142/341 ; C1 -407881*x^2 + 136445*y^2 + 192961*z^2
(-253558/439667 : -284931/439667 : 1) C2b (-31681/1263699 : 4697/1263699 : 1)
** u= -141/61 ; C1 -4082*x^2 + 23602*y^2 + 1042*z^2
(-1143/14945 : 3104/14945 : 1) C2b (-49516/45913 : -3279/45913 : 1)
** u= -141/85 ; C1 {+/-} -8066*x^2 + 27106*y^2 + 11314*z^2
(-21573/21025 : 6784/21025 : 1) C2a (-78589/60315 : 967/60315 : 1) C2b (710188/609637 : 17769/609637 : 1)
** u= -141/221 ; C1 -139442*x^2 - 68722*y^2 + 91282*z^2
(-37300/79941 : -75269/79941 : 1) C2a (301277/567569 : 18159/567569 : 1)
** u= -141/277 ; C1 -247298*x^2 - 96610*y^2 + 134962*z^2
(-20472/41881 : -37115/41881 : 1) C2a (957173/563849 : -98427/563849 : 1)
** u= -141/293 ; C1 {+/-} -283874*x^2 + 105730*y^2 + 148594*z^2
(-56453/126897 : 118636/126897 : 1) C2a (-989/3869 : 39/3869 : 1) C2b (1485682/9741467 : -184485/9741467 : 1)
** u= -140/67 ; C1 -4525*x^2 - 24089*y^2 + 3649*z^2
(3049/7425 : 514/1485 : 1) C2a (-304064/33191 : -10147/33191 : 1)
** u= -140/117 ; C1 -22525*x^2 - 33289*y^2 + 26849*z^2
(23968/24025 : -1753/4805 : 1) C2a (-729586/407695 : 50889/407695 : 1)
** u= -140/137 ; C1 -36725*x^2 - 38369*y^2 + 37529*z^2
(77796/93505 : -10505/18701 : 1) C2a (-9407248/2518863 : -805229/2518863 : 1)
** u= -140/151 ; C1 -49045*x^2 - 42401*y^2 + 45481*z^2
(-316/4967 : -5133/4967 : 1) C2a (1069784/44789 : -97703/44789 : 1)
** u= -140/153 ; C1 -50965*x^2 - 43009*y^2 + 46649*z^2
(-15680/17081 : 5011/17081 : 1) C2a (-10039458/2508245 : -910237/2508245 : 1)
** u= -140/171 ; C1 -70045*x^2 - 48841*y^2 + 57521*z^2
(-7/113 : 27038/24973 : 1) C2a (-2258566/537535 : -47333331/118795235 : 1)
** u= -140/237 ; C1 -167725*x^2 - 75769*y^2 + 102929*z^2
(-27671/35351 : -1646/35351 : 1) C2a (1615968/4227157 : -16399/4227157 : 1)
** u= -140/277 ; C1 -248125*x^2 - 96329*y^2 + 134689*z^2
(-86612/138345 : -17249/27669 : 1) C2a (-556534/1986571 : -29/5413 : 1)
** u= -140/331 ; C1 -382045*x^2 - 129161*y^2 + 182641*z^2
(255344/375619 : -81561/375619 : 1) C2a (-276376/395015 : -28771/395015 : 1)
** u= -140/359 ; C1 -462965*x^2 - 148481*y^2 + 209801*z^2
(9793/27481 : 27714/27481 : 1) C2a (61486/1222461 : 19613/1222461 : 1)
** u= -140/361 ; C1 -469045*x^2 - 149921*y^2 + 211801*z^2
(-145972/1053941 : -1225809/1053941 : 1) C2a (4224698/10451557 : 472819/10451557 : 1)
** u= -140/389 ; C1 -558365*x^2 - 170921*y^2 + 240641*z^2
(30159/192479 : -221786/192479 : 1) C2a (-122914/359445 : -15251/359445 : 1)
** u= -139/163 ; C1 -61538*x^2 + 45890*y^2 + 52562*z^2
(11097/15139 : 9868/15139 : 1) C2b (-56464/94907 : -809/94907 : 1)
** u= -139/363 ; C1 -476338*x^2 - 151090*y^2 + 213362*z^2
(-93584/142867 : -34819/142867 : 1) C2a (-26725399/6388447 : 2803809/6388447 : 1)
** u= -138/119 ; C1 -24161*x^2 + 33205*y^2 + 27961*z^2
(282/8137 : 7463/8137 : 1) C2b (116523/769763 : -50305/769763 : 1)
** u= -138/149 ; C1 -47801*x^2 + 41245*y^2 + 44281*z^2
(3473/14097 : 14120/14097 : 1) C2b (804877/1230557 : 3357/1230557 : 1)
** u= -138/191 ; C1 -96017*x^2 + 55525*y^2 + 70153*z^2
(-7006/13677 : -12307/13677 : 1) C2b (-757977/1857613 : 8659/299615 : 1)
** u= -138/263 ; C1 -219713*x^2 + 88213*y^2 + 122713*z^2
(106559/147915 : 46412/147915 : 1) C2b (49129/695237 : -519/16957 : 1)
** u= -138/289 ; C1 -277121*x^2 + 102565*y^2 + 144241*z^2
(125514/262699 : 233425/262699 : 1) C2b (421731/2576941 : 43643/2576941 : 1)
** u= -138/319 ; C1 -351761*x^2 + 120805*y^2 + 170761*z^2
(-2298/18853 : -22069/18853 : 1) C2b (-31711/305149 : 2217/305149 : 1)
** u= -137/161 ; C1 {+/-} -60146*x^2 + 44690*y^2 + 51266*z^2
(-3664/4349 : -1905/4349 : 1) C2a (394087/635337 : -9349/635337 : 1) C2b (-151898/630677 : 32773/630677 : 1)
** u= -137/257 ; C1 -208178*x^2 - 84818*y^2 + 117698*z^2
(44184/92405 : -84007/92405 : 1) C2a (1003209/2695 : 14893/385 : 1)
** u= -137/321 ; C1 -358066*x^2 + 121810*y^2 + 172226*z^2
(-13237/57377 : 64340/57377 : 1) C2b (-344576/3651439 : -16179/3651439 : 1)
** u= -137/353 ; C1 -448370*x^2 - 143378*y^2 + 202562*z^2
(11659/79177 : -91824/79177 : 1) C2a (1657/142161 : 2243/142161 : 1)
** u= -136/121 ; C1 -25877*x^2 - 33137*y^2 + 29057*z^2
(-2513/4955 : -4074/4955 : 1) C2a (-1020648/76951 : -12023/10993 : 1)
** u= -136/137 ; C1 -37813*x^2 - 37265*y^2 + 37537*z^2
(-37964/145257 : -140681/145257 : 1) C2a (-262/11 : 5959/2827 : 1)
** u= -136/143 ; C1 -42949*x^2 - 38945*y^2 + 40849*z^2
(11393/19077 : 15446/19077 : 1) C2a (-245956/153599 : 20167/153599 : 1)
** u= -136/175 ; C1 -76421*x^2 - 49121*y^2 + 59729*z^2
(-42120/50087 : -17041/50087 : 1) C2a (-718474/794199 : -55789/794199 : 1)
** u= -136/185 ; C1 -88981*x^2 - 52721*y^2 + 66049*z^2
(79156/95345 : -28527/95345 : 1) C2a (-391936/765089 : -7/2977 : 1)
** u= -136/201 ; C1 -111157*x^2 - 58897*y^2 + 76577*z^2
(1280/28009 : 31889/28009 : 1) C2a (-15986016/1235815 : -1606991/1235815 : 1)
** u= -136/203 ; C1 -114109*x^2 - 59705*y^2 + 77929*z^2
(116/15391 : 17583/15391 : 1) C2a (-312616/650869 : 9763/650869 : 1)
** u= -136/207 ; C1 -120133*x^2 - 61345*y^2 + 80657*z^2
(-73144/314947 : -346325/314947 : 1) C2a (7246506/618317 : -732479/618317 : 1)
** u= -136/259 ; C1 -213005*x^2 - 85577*y^2 + 119033*z^2
(5172/17699 : -19213/17699 : 1) C2a (-72507258/81426295 : 7093421/81426295 : 1)
** u= -136/269 ; C1 -233965*x^2 - 90857*y^2 + 127033*z^2
(-28583/183427 : 211986/183427 : 1) C2a (2338322/530981 : 243433/530981 : 1)
** u= -136/293 ; C1 -288349*x^2 - 104345*y^2 + 147049*z^2
(203777/722107 : 787458/722107 : 1) C2a (-2053094/1652189 : -30295/236027 : 1)
** u= -136/305 ; C1 -317701*x^2 - 111521*y^2 + 157489*z^2
(-60796/357185 : 411873/357185 : 1) C2a (-3300338/261667 : 345953/261667 : 1)
** u= -136/313 ; C1 -338069*x^2 - 116465*y^2 + 164609*z^2
(70172/100597 : -3093/100597 : 1) C2a (-3039684/5366551 : 310127/5366551 : 1)
** u= -136/327 ; C1 -375253*x^2 - 125425*y^2 + 177377*z^2
(-16396/43295 : -214859/216475 : 1) C2a (-25660/275551 : -12291/1377755 : 1)
** u= -136/329 ; C1 -380725*x^2 - 126737*y^2 + 179233*z^2
(-135388/341045 : 66159/68209 : 1) C2a (-19018/63161 : 2003/63161 : 1)
** u= -135/71 ; C1 -5090*x^2 - 23266*y^2 + 5986*z^2
(-10561/12927 : 4312/12927 : 1) C2a (-4031/2101 : 93/2101 : 1)
** u= -135/79 ; C1 {+/-} -6770*x^2 + 24466*y^2 + 9346*z^2
(683/639 : 164/639 : 1) C2a (-530443/225527 : 23811/225527 : 1) C2b (364458/789205 : -53899/789205 : 1)
** u= -135/119 ; C1 {+/-} -24770*x^2 + 32386*y^2 + 28066*z^2
(9508/9579 : -3221/9579 : 1) C2a (-190163/203175 : 8023/203175 : 1) C2b (-141524/534119 : -33249/534119 : 1)
** u= -135/127 ; C1 -30290*x^2 - 34354*y^2 + 32194*z^2
(22425/34987 : -26528/34987 : 1) C2a (26317/3027 : 2239/3027 : 1)
** u= -135/191 ; C1 {+/-} -97490*x^2 + 54706*y^2 + 69826*z^2
(-27099/34439 : 14324/34439 : 1) C2a (2885827/845913 : -284651/845913 : 1) C2b (-112396/294311 : -8931/294311 : 1)
** u= -135/239 ; C1 -174770*x^2 - 75346*y^2 + 103426*z^2
(-7288/10227 : -4513/10227 : 1) C2a (-10994533/30827787 : 182209/30827787 : 1)
** u= -135/343 ; C1 -421250*x^2 - 135874*y^2 + 192034*z^2
(33297/71095 : 12176/14219 : 1) C2a (-576739331/156611775 : -60524719/156611775 : 1)
** u= -134/57 ; C1 -3649*x^2 + 21205*y^2 + 569*z^2
(-134/8291 : -1357/8291 : 1) C2b (238411/46531 : 207/46531 : 1)
** u= -134/91 ; C1 -10585*x^2 + 26237*y^2 + 14713*z^2
(4303/5463 : -3044/5463 : 1) C2b (67699/1227963 : -87163/1227963 : 1)
** u= -134/97 ; C1 -13009*x^2 + 27365*y^2 + 17449*z^2
(30323/26193 : -596/26193 : 1) C2b (304347/332407 : 9115/332407 : 1)
** u= -134/111 ; C1 -20065*x^2 + 30277*y^2 + 24113*z^2
(-21185/70399 : 60412/70399 : 1) C2b (-849049/1913447 : 110367/1913447 : 1)
** u= -134/187 ; C1 -92569*x^2 + 52925*y^2 + 67129*z^2
(20342/23901 : 4517/119505 : 1) C2b (96801/207769 : -3545/207769 : 1)
** u= -134/215 ; C1 -133841*x^2 + 64181*y^2 + 85889*z^2
(-27795/37291 : -15808/37291 : 1) C2b (-318311/2460565 : 98581/2460565 : 1)
** u= -134/229 ; C1 -157417*x^2 + 70397*y^2 + 95857*z^2
(2804710/3621099 : 514109/3621099 : 1) C2b (-12161/43383 : -1109/43383 : 1)
** u= -134/249 ; C1 -194497*x^2 + 79957*y^2 + 110777*z^2
(-141335/347021 : -20228/20413 : 1) C2b (-733817/2324775 : -12691/2324775 : 1)
** u= -134/259 ; C1 -214537*x^2 + 85037*y^2 + 118537*z^2
(20005/80307 : 89332/80307 : 1) C2b (-1056499/5293635 : -117917/5293635 : 1)
** u= -134/271 ; C1 -239905*x^2 + 91397*y^2 + 128113*z^2
(-120889/187783 : 105204/187783 : 1) C2b (210573/1384661 : 30259/1384661 : 1)
** u= -134/285 ; C1 -271321*x^2 + 99181*y^2 + 139649*z^2
(-37037/206849 : -237680/206849 : 1) C2b (-578299/2883711 : 24757/2883711 : 1)
** u= -133/61 ; C1 -3842*x^2 + 21410*y^2 + 2258*z^2
(-1632/2461 : 401/2461 : 1) C2b (2369032/1126079 : 48499/1126079 : 1)
** u= -133/109 ; C1 {+/-} -19106*x^2 + 29570*y^2 + 23186*z^2
(-27723/27617 : 10072/27617 : 1) C2a (229947/155627 : -14551/155627 : 1) C2b (1001764/1218619 : -26023/1218619 : 1)
** u= -133/261 ; C1 {+/-} -219442*x^2 + 85810*y^2 + 119858*z^2
(9289/18097 : -15388/18097 : 1) C2a (150919/424243 : -9621/424243 : 1) C2b (-121748/479059 : -6045/479059 : 1)
** u= -133/269 ; C1 -236386*x^2 + 90050*y^2 + 126226*z^2
(-230587/408897 : -307880/408897 : 1) C2b (46396/317883 : 35437/1589415 : 1)
** u= -133/277 ; C1 {+/-} -253970*x^2 + 94418*y^2 + 132722*z^2
(-80843/111973 : 6684/111973 : 1) C2a (62603089/2288187 : -6547451/2288187 : 1) C2b (105056/453557 : -1843/453557 :
1)
** u= -132/67 ; C1 -4493*x^2 - 21913*y^2 + 4753*z^2
(3045/14053 : 6398/14053 : 1) C2a (3295828/19341 : 19343/2763 : 1)
** u= -132/155 ; C1 -55709*x^2 - 41449*y^2 + 47521*z^2
(-41800/77067 : -66791/77067 : 1) C2a (-1568356/958215 : 137797/958215 : 1)
** u= -132/157 ; C1 -57773*x^2 - 42073*y^2 + 48673*z^2
(6875/53619 : 57106/53619 : 1) C2a (-2011658/2783159 : -109161/2783159 : 1)
** u= -132/185 ; C1 -90869*x^2 - 51649*y^2 + 65641*z^2
(55716/72925 : 36017/72925 : 1) C2a (27038/54543 : 223/54543 : 1)
** u= -132/203 ; C1 -116285*x^2 - 58633*y^2 + 77377*z^2
(811/5493 : -6206/5493 : 1) C2a (1679194/536543 : -168489/536543 : 1)
** u= -132/293 ; C1 -291965*x^2 - 103273*y^2 + 145777*z^2
(-6636/49993 : 58339/49993 : 1) C2a (-4481812/132435 : -469729/132435 : 1)
** u= -132/349 ; C1 -442157*x^2 - 139225*y^2 + 196513*z^2
(-2544/10789 : 59947/53945 : 1) C2a (18256/89577 : 2531/89577 : 1)
** u= -131/243 ; C1 {+/-} -185074*x^2 + 76210*y^2 + 105554*z^2
(23836/32971 : -11221/32971 : 1) C2a (-257409/321401 : 24481/321401 : 1) C2b (-19126/59711 : 147/59711 : 1)
** u= -131/251 ; C1 -200642*x^2 - 80162*y^2 + 111602*z^2
(356716/500935 : -175677/500935 : 1) C2a (-286833/858749 : -13351/858749 : 1)
** u= -131/259 ; C1 {+/-} -216850*x^2 + 84242*y^2 + 117778*z^2
(-86987/127555 : -11436/25511 : 1) C2a (2819831/4059995 : 269917/4059995 : 1) C2b (114868/461571 : -5741/461571 : 1)
** u= -131/275 ; C1 {+/-} -251186*x^2 + 92786*y^2 + 130514*z^2
(-49977/112039 : 104380/112039 : 1) C2a (800937/1161505 : -79079/1161505 : 1) C2b (57116/611665 : 13321/611665 : 1)
** u= -131/291 ; C1 {+/-} -288082*x^2 + 101842*y^2 + 143762*z^2
(281039/449375 : -248272/449375 : 1) C2a (3031/17057 : -63/17057 : 1) C2b (97678/737999 : -8757/737999 : 1)
** u= -130/67 ; C1 -4505*x^2 + 21389*y^2 + 5009*z^2
(2275/7247 : -3348/7247 : 1) C2b (244943/160087 : 5453/160087 : 1)
** u= -130/69 ; C1 -4825*x^2 + 21661*y^2 + 5801*z^2
(-22087/53305 : -5108/10661 : 1) C2b (642707/426295 : 11001/426295 : 1)
** u= -130/97 ; C1 -13505*x^2 + 26309*y^2 + 17729*z^2
(-94599/82817 : -5308/82817 : 1) C2b (119857/147097 : -5417/147097 : 1)
** u= -130/109 ; C1 -19625*x^2 + 28781*y^2 + 23321*z^2
(-7014/10655 : -1529/2131 : 1) C2b (738077/917437 : 18997/917437 : 1)
** u= -130/141 ; C1 -42985*x^2 + 36781*y^2 + 39641*z^2
(-7847/8257 : -1232/8257 : 1) C2b (7923679/18746385 : 121681/2678055 : 1)
** u= -130/153 ; C1 -54385*x^2 + 40309*y^2 + 46289*z^2
(263/329 : -176/329 : 1) C2b (-263429/459171 : -7549/459171 : 1)
** u= -130/199 ; C1 -111425*x^2 + 56501*y^2 + 74441*z^2
(-34281/43195 : 2372/8639 : 1) C2b (238127/570917 : 8393/570917 : 1)
** u= -130/279 ; C1 -261025*x^2 + 94741*y^2 + 133481*z^2
(91/271 : 284/271 : 1) C2b (33869/596681 : -12531/596681 : 1)
** u= -129/161 ; C1 {+/-} -63170*x^2 + 42562*y^2 + 50818*z^2
(1067/27309 : 29812/27309 : 1) C2a (443357/705621 : 18923/705621 : 1) C2b (-169418/371129 : 11811/371129 : 1)
** u= -129/361 ; C1 -481970*x^2 - 146962*y^2 + 206818*z^2
(-1139196/2848153 : 2675779/2848153 : 1) C2a (429343/1871949 : -62647/1871949 : 1)
** u= -128/99 ; C1 -14701*x^2 - 26185*y^2 + 18761*z^2
(15467/19697 : 11986/19697 : 1) C2a (-80946/21331 : 5863/21331 : 1)
** u= -128/105 ; C1 -17749*x^2 - 27409*y^2 + 21521*z^2
(-4804/28445 : 24907/28445 : 1) C2a (-981282/891593 : -47387/891593 : 1)
** u= -128/135 ; C1 -38389*x^2 - 34609*y^2 + 36401*z^2
(-8809/12085 : -8218/12085 : 1) C2a (577536/259739 : -49819/259739 : 1)
** u= -128/149 ; C1 -51101*x^2 - 38585*y^2 + 43961*z^2
(8436/31181 : 31835/31181 : 1) C2a (1556512/113907 : 146419/113907 : 1)
** u= -128/163 ; C1 -65773*x^2 - 42953*y^2 + 51913*z^2
(21113/30885 : -21686/30885 : 1) C2a (-10686452/2935879 : -1024439/2935879 : 1)
** u= -128/197 ; C1 -109565*x^2 - 55193*y^2 + 72857*z^2
(-26220/35297 : 16729/35297 : 1) C2a (389884/276423 : -37559/276423 : 1)
** u= -128/203 ; C1 -118493*x^2 - 57593*y^2 + 76793*z^2
(-100684/157775 : -111063/157775 : 1) C2a (24171406/3658713 : -2457227/3658713 : 1)
** u= -128/219 ; C1 -144061*x^2 - 64345*y^2 + 87641*z^2
(-632/2423 : -2665/2423 : 1) C2a (-152174/391421 : 4311/391421 : 1)
** u= -128/247 ; C1 -194965*x^2 - 77393*y^2 + 107857*z^2
(-20932/83091 : 92293/83091 : 1) C2a (-739702/1667669 : -57727/1667669 : 1)
** u= -128/303 ; C1 -320293*x^2 - 108193*y^2 + 152993*z^2
(100076/166799 : 98455/166799 : 1) C2a (-23436/143153 : -2113/143153 : 1)
** u= -128/323 ; C1 -372653*x^2 - 120713*y^2 + 170633*z^2
(-55908/125315 : 112021/125315 : 1) C2a (5836064/65595897 : -1050617/65595897 : 1)
** u= -127/103 ; C1 -16850*x^2 + 26738*y^2 + 20642*z^2
(5584/6211 : 3183/6211 : 1) C2b (-460286/1486775 : -94439/1486775 : 1)
** u= -127/239 ; C1 {+/-} -180322*x^2 + 73250*y^2 + 101698*z^2
(-2789/4427 : -14196/22135 : 1) C2a (5807/3851 : 2953/19255 : 1) C2b (14898/47861 : 139/239305 : 1)
** u= -127/271 ; C1 -245666*x^2 + 89570*y^2 + 126146*z^2
(-256/11399 : 13521/11399 : 1) C2b (788/21827 : -6257/283751 : 1)
** u= -127/287 ; C1 {+/-} -282178*x^2 + 98498*y^2 + 139138*z^2
(29929/55295 : -41868/55295 : 1) C2a (4619861/2295997 : -482947/2295997 : 1) C2b (125436/1073957 : -11419/1073957 :
1)
** u= -127/367 ; C1 -503138*x^2 - 150818*y^2 + 211778*z^2
(-23331/41659 : -24920/41659 : 1) C2a (-32297/85845 : 4027/85845 : 1)
** u= -126/79 ; C1 -7265*x^2 + 22117*y^2 + 10273*z^2
(39334/68541 : 40913/68541 : 1) C2b (-309359/941563 : -65283/941563 : 1)
** u= -126/85 ; C1 -9161*x^2 + 23101*y^2 + 12769*z^2
(18306/24055 : 13673/24055 : 1) C2b (-781949/737551 : 99/6527 : 1)
** u= -126/131 ; C1 -35657*x^2 + 33037*y^2 + 34297*z^2
(30618/128525 : -127031/128525 : 1) C2b (-51947/127139 : 6213/127139 : 1)
** u= -126/143 ; C1 -46049*x^2 + 36325*y^2 + 40609*z^2
(1902/13237 : 13831/13237 : 1) C2b (-72417/146959 : 26059/734795 : 1)
** u= -126/157 ; C1 -59993*x^2 + 40525*y^2 + 48337*z^2
(-2926/18099 : 97217/90495 : 1) C2b (-9369/36211 : 8749/181055 : 1)
** u= -126/181 ; C1 -88457*x^2 + 48637*y^2 + 62497*z^2
(-818/1095 : -569/1095 : 1) C2b (3379/10163 : -351/10163 : 1)
** u= -126/221 ; C1 -148697*x^2 + 64717*y^2 + 88657*z^2
(69090/147127 : -136697/147127 : 1) C2b (413751/1852885 : -53537/1852885 : 1)
** u= -126/275 ; C1 -255401*x^2 + 91501*y^2 + 129049*z^2
(386734/545265 : 43037/545265 : 1) C2b (-335241/2325155 : 31021/2325155 : 1)
** u= -126/289 ; C1 -287825*x^2 + 99397*y^2 + 140473*z^2
(-601554/892675 : -55969/178535 : 1) C2b (136539/1048343 : 4237/1048343 : 1)
** u= -126/295 ; C1 -302321*x^2 + 102901*y^2 + 145489*z^2
(-61471/253575 : -282508/253575 : 1) C2b (5603/63763 : -381/63763 : 1)
** u= -125/181 ; C1 {+/-} -88930*x^2 + 48386*y^2 + 62386*z^2
(193/1061 : -1176/1061 : 1) C2a (-492769/554219 : 41737/554219 : 1) C2b (619926/1358351 : -17761/1358351 : 1)
** u= -125/197 ; C1 {+/-} -111170*x^2 + 54434*y^2 + 72434*z^2
(6788/11473 : 9003/11473 : 1) C2a (162849567/73790657 : 16262869/73790657 : 1) C2b (724978/2089373 : -51877/2089373 :
1)
** u= -125/237 ; C1 -177970*x^2 - 71794*y^2 + 99794*z^2
(668/1073 : 19/29 : 1) C2a (15958997/20001797 : 1532781/20001797 : 1)
** u= -125/253 ; C1 {+/-} -209170*x^2 + 79634*y^2 + 111634*z^2
(-4969/8337 : -5708/8337 : 1) C2a (-1315037/1593067 : -130469/1593067 : 1) C2b (-23694/96815 : -827/96815 : 1)
** u= -125/261 ; C1 -225730*x^2 + 83746*y^2 + 117746*z^2
(-3772/5797 : -2983/5797 : 1) C2b (-30496/206309 : -3879/206309 : 1)
** u= -124/55 ; C1 -3221*x^2 - 18401*y^2 + 1289*z^2
(2859/4925 : 518/4925 : 1) C2a (40636/7821 : -751/7821 : 1)
** u= -124/91 ; C1 -11645*x^2 - 23657*y^2 + 15473*z^2
(-14955/23101 : 15458/23101 : 1) C2a (495964/371535 : -24053/371535 : 1)
** u= -124/105 ; C1 -18421*x^2 - 26401*y^2 + 21689*z^2
(23/55 : -46/55 : 1) C2a (-390662/166267 : -1269/7229 : 1)
** u= -124/147 ; C1 -50509*x^2 - 36985*y^2 + 42689*z^2
(9872/16087 : -12869/16087 : 1) C2a (-1087534/876341 : -90453/876341 : 1)
** u= -124/173 ; C1 -79213*x^2 - 45305*y^2 + 57457*z^2
(65347/77379 : 11282/77379 : 1) C2a (-331618/657089 : -5833/657089 : 1)
** u= -124/181 ; C1 -89405*x^2 - 48137*y^2 + 62273*z^2
(-12185/63367 : -70134/63367 : 1) C2a (-3121126/5263797 : 190979/5263797 : 1)
** u= -124/187 ; C1 -97469*x^2 - 50345*y^2 + 65969*z^2
(72392/100687 : -56019/100687 : 1) C2a (-1556838/2758267 : 94693/2758267 : 1)
** u= -124/191 ; C1 -103045*x^2 - 51857*y^2 + 68473*z^2
(-25124/31139 : -5103/31139 : 1) C2a (19522/40289 : 847/40289 : 1)
** u= -124/223 ; C1 -153413*x^2 - 65105*y^2 + 89657*z^2
(-9648/29099 : -30769/29099 : 1) C2a (93388/87291 : -9161/87291 : 1)
** u= -124/233 ; C1 -171253*x^2 - 69665*y^2 + 96697*z^2
(-39953/69519 : 52766/69519 : 1) C2a (-61906/179353 : -2737/179353 : 1)
** u= -124/283 ; C1 -275453*x^2 - 95465*y^2 + 134897*z^2
(-88368/160091 : 116977/160091 : 1) C2a (48894/298753 : -361/42679 : 1)
** u= -124/313 ; C1 -349973*x^2 - 113345*y^2 + 160217*z^2
(-470004/698437 : -86383/698437 : 1) C2a (533284/526443 : -56353/526443 : 1)
** u= -124/355 ; C1 -469421*x^2 - 141401*y^2 + 198689*z^2
(-3628/12515 : 13281/12515 : 1) C2a (-1323306/3099695 : 158513/3099695 : 1)
** u= -124/371 ; C1 -519565*x^2 - 153017*y^2 + 214273*z^2
(-145700/275591 : -185133/275591 : 1) C2a (-369364/5909827 : -3583/125741 : 1)
** u= -123/107 ; C1 -19730*x^2 - 26578*y^2 + 22642*z^2
(-4793/5271 : -2572/5271 : 1) C2a (-220837/91949 : 16917/91949 : 1)
** u= -123/395 ; C1 -600914*x^2 - 171154*y^2 + 238066*z^2
(-69360/148307 : -117061/148307 : 1) C2a (1269019/1978991 : -146031/1978991 : 1)
** u= -122/63 ; C1 -3985*x^2 + 18853*y^2 + 4457*z^2
(121/571 : 272/571 : 1) C2b (-505343/342579 : -12919/342579 : 1)
** u= -122/141 ; C1 -45481*x^2 + 34765*y^2 + 39401*z^2
(-1922/7483 : 7657/7483 : 1) C2b (-3079/10631 : 537/10631 : 1)
** u= -122/171 ; C1 -77641*x^2 + 44125*y^2 + 56081*z^2
(-326/401 : -659/2005 : 1) C2b (-181679/1153771 : 268611/5768855 : 1)
** u= -122/177 ; C1 -85153*x^2 + 46213*y^2 + 59633*z^2
(255731/315149 : -87500/315149 : 1) C2b (515611/1320235 : 5061/188605 : 1)
** u= -122/207 ; C1 -128113*x^2 + 57733*y^2 + 78473*z^2
(14263/39883 : 41360/39883 : 1) C2b (1149103/5231619 : 166183/5231619 : 1)
** u= -122/213 ; C1 -137785*x^2 + 60253*y^2 + 82457*z^2
(109733/144757 : 33776/144757 : 1) C2b (405527/1443941 : 33789/1443941 : 1)
** u= -122/249 ; C1 -203377*x^2 + 76885*y^2 + 107873*z^2
(132694/362683 : -371455/362683 : 1) C2b (-241721/1591773 : 33331/1591773 : 1)
** u= -122/269 ; C1 -245417*x^2 + 87245*y^2 + 123113*z^2
(21934/44123 : -37335/44123 : 1) C2b (-89501/651127 : -8143/651127 : 1)
** u= -122/275 ; C1 -258809*x^2 + 90509*y^2 + 127841*z^2
(10794/50933 : 57715/50933 : 1) C2b (-1507/13643 : -23/1949 : 1)
** u= -121/57 ; C1 {+/-} -3298*x^2 + 17890*y^2 + 2402*z^2
(331/413 : 52/413 : 1) C2a (257257/37721 : 7833/37721 : 1) C2b (-384986/210837 : 9415/210837 : 1)
** u= -121/305 ; C1 -332146*x^2 - 107666*y^2 + 152194*z^2
(-43120/63769 : 3507/63769 : 1) C2a (311/5425 : 11/775 : 1)
** u= -120/83 ; C1 -9005*x^2 - 21289*y^2 + 12409*z^2
(-15000/12811 : 701/12811 : 1) C2a (-80842/70407 : 2189/70407 : 1)
** u= -120/137 ; C1 -42485*x^2 - 33169*y^2 + 37249*z^2
(6948/7529 : -1351/7529 : 1) C2a (8332918/9508145 : 2859/49265 : 1)
** u= -120/151 ; C1 -55925*x^2 - 37201*y^2 + 44641*z^2
(4140/9251 : -8771/9251 : 1) C2a (-65824/91611 : -4003/91611 : 1)
** u= -120/193 ; C1 -108005*x^2 - 51649*y^2 + 69169*z^2
(282988/363321 : -96521/363321 : 1) C2a (370538/759807 : 77/2889 : 1)
** u= -120/239 ; C1 -185285*x^2 - 71521*y^2 + 100081*z^2
(6321/10133 : 6338/10133 : 1) C2a (1909426/5520909 : 124207/5520909 : 1)
** u= -120/247 ; C1 -200885*x^2 - 75409*y^2 + 105889*z^2
(-32781/221297 : -256718/221297 : 1) C2a (832/2345 : 9/335 : 1)
** u= -120/263 ; C1 -234005*x^2 - 83569*y^2 + 117889*z^2
(1760/22239 : 26249/22239 : 1) C2a (-53344/164685 : 4549/164685 : 1)
** u= -119/111 ; C1 -22930*x^2 - 26482*y^2 + 24578*z^2
(-6947/44471 : -42352/44471 : 1) C2a (17457/20225 : 709/20225 : 1)
** u= -119/127 ; C1 -34354*x^2 + 30290*y^2 + 32194*z^2
(3464/9019 : 8535/9019 : 1) C2b (-98802/914473 : -54359/914473 : 1)
** u= -119/135 ; C1 {+/-} -41026*x^2 + 32386*y^2 + 36194*z^2
(-4240/14491 : 14557/14491 : 1) C2a (159819/256079 : 1009/256079 : 1) C2b (-313888/2256327 : 127711/2256327 : 1)
** u= -119/143 ; C1 {+/-} -48338*x^2 + 34610*y^2 + 40322*z^2
(-1817/2459 : -1560/2459 : 1) C2a (-277063/97689 : -25811/97689 : 1) C2b (5044/246143 : 13739/246143 : 1)
** u= -119/159 ; C1 -64882*x^2 + 39442*y^2 + 48962*z^2
(12068/39595 : 41311/39595 : 1) C2b (-13916/49515 : -2143/49515 : 1)
** u= -119/199 ; C1 {+/-} -117442*x^2 + 53762*y^2 + 72802*z^2
(-16940/151211 : 174171/151211 : 1) C2a (-2543/3859 : 211/3859 : 1) C2b (-1481034/4119233 : -61699/4119233 : 1)
** u= -119/359 ; C1 -487682*x^2 - 143042*y^2 + 200162*z^2
(15360/44227 : -43963/44227 : 1) C2a (-1804317/2465 : -188287/2465 : 1)
** u= -119/375 ; C1 -538786*x^2 - 154786*y^2 + 215714*z^2
(17008/83531 : -93365/83531 : 1) C2a (-26121/749041 : -23071/749041 : 1)
** u= -118/49 ; C1 -2801*x^2 + 16325*y^2 + 41*z^2
(-62/619 : -87/3095 : 1) C2b (61457/3917 : -103/3917 : 1)
** u= -118/139 ; C1 -44921*x^2 + 33245*y^2 + 38201*z^2
(-22463/51487 : -48624/51487 : 1) C2b (4622813/9720523 : 334661/9720523 : 1)
** u= -118/251 ; C1 -210457*x^2 + 76925*y^2 + 108313*z^2
(3325/22371 : -129848/111855 : 1) C2b (10767/87835 : 8207/439175 : 1)
** u= -118/259 ; C1 -227081*x^2 + 81005*y^2 + 114281*z^2
(-27479/70631 : 70152/70631 : 1) C2b (257/8647 : 167/8647 : 1)
** u= -117/53 ; C1 -2930*x^2 + 16498*y^2 + 1522*z^2
(1969/4401 : 1048/4401 : 1) C2b (60408/24541 : 829/24541 : 1)
** u= -117/181 ; C1 -92786*x^2 - 46450*y^2 + 61426*z^2
(-11532/14389 : -14273/71945 : 1) C2a (4282549/2187773 : -2117823/10938865 : 1)
** u= -117/301 ; C1 -325826*x^2 - 104290*y^2 + 147346*z^2
(164916/435961 : 428437/435961 : 1) C2a (-15792161/3009309 : -1656575/3009309 : 1)
** u= -116/51 ; C1 -2797*x^2 - 16057*y^2 + 977*z^2
(-1360/3619 : -689/3619 : 1) C2a (456358/17119 : -9849/17119 : 1)
** u= -116/77 ; C1 -7373*x^2 - 19385*y^2 + 10337*z^2
(-21689/31327 : 18558/31327 : 1) C2a (-790992/419111 : 41245/419111 : 1)
** u= -116/79 ; C1 -8005*x^2 - 19697*y^2 + 11113*z^2
(5993/6169 : 2622/6169 : 1) C2a (61888/19135 : -3869/19135 : 1)
** u= -116/93 ; C1 -13549*x^2 - 22105*y^2 + 16769*z^2
(20861/32731 : 23366/32731 : 1) C2a (-91062/29533 : 6701/29533 : 1)
** u= -116/107 ; C1 -21053*x^2 - 24905*y^2 + 22817*z^2
(16684/16423 : 3435/16423 : 1) C2a (-39024/34657 : -2413/34657 : 1)
** u= -116/113 ; C1 -24869*x^2 - 26225*y^2 + 25529*z^2
(-12215/14863 : -42882/74315 : 1) C2a (-1630638/1500835 : -75431/1072025 : 1)
** u= -116/147 ; C1 -53293*x^2 - 35065*y^2 + 42257*z^2
(-2248/15979 : -17321/15979 : 1) C2a (2645364/3537583 : 172019/3537583 : 1)
** u= -116/171 ; C1 -80317*x^2 - 42697*y^2 + 55457*z^2
(33757/51565 : 36194/51565 : 1) C2a (126662/257141 : 4269/257141 : 1)
** u= -116/245 ; C1 -199901*x^2 - 73481*y^2 + 103409*z^2
(23231/66023 : -68310/66023 : 1) C2a (-37148396/43463139 : -3753121/43463139 : 1)
** u= -116/269 ; C1 -250445*x^2 - 85817*y^2 + 121313*z^2
(-111288/160337 : 14051/160337 : 1) C2a (74212/45081 : 7763/45081 : 1)
** u= -116/311 ; C1 -352757*x^2 - 110177*y^2 + 155417*z^2
(17403/484645 : -574766/484645 : 1) C2a (-6804628/58636635 : -1362977/58636635 : 1)
** u= -116/345 ; C1 -448501*x^2 - 132481*y^2 + 185609*z^2
(-7816/634885 : -751343/634885 : 1) C2a (431348/279787 : -45687/279787 : 1)
** u= -116/373 ; C1 -536029*x^2 - 152585*y^2 + 212209*z^2
(-15559/26751 : -12034/26751 : 1) C2a (44116/7079 : -4595/7079 : 1)
** u= -115/59 ; C1 {+/-} -3490*x^2 + 16706*y^2 + 3826*z^2
(104/4007 : 1917/4007 : 1) C2a (-222629/110365 : -4711/110365 : 1) C2b (-267478/153783 : 953/153783 : 1)
** u= -115/147 ; C1 {+/-} -53650*x^2 + 34834*y^2 + 42194*z^2
(-527/1655 : -340/331 : 1) C2a (-345939/447559 : -1391/26327 : 1) C2b (-857254/1787669 : -2727/105157 : 1)
** u= -115/259 ; C1 {+/-} -229490*x^2 + 80306*y^2 + 113426*z^2
(-17271/37663 : 33928/37663 : 1) C2a (134151/175789 : 13757/175789 : 1) C2b (70024/504451 : 4069/504451 : 1)
** u= -115/291 ; C1 -302770*x^2 - 97906*y^2 + 138386*z^2
(12253/21019 : 12656/21019 : 1) C2a (40189/1766431 : -24063/1766431 : 1)
** u= -114/61 ; C1 -3785*x^2 + 16717*y^2 + 4633*z^2
(1382/2571 : 1183/2571 : 1) C2b (769439/490397 : 4563/490397 : 1)
** u= -114/107 ; C1 -21449*x^2 + 24445*y^2 + 22849*z^2
(-3026/12489 : 11737/12489 : 1) C2b (-122841/209719 : 8477/209719 : 1)
** u= -114/131 ; C1 -39065*x^2 + 30157*y^2 + 34033*z^2
(562/609 : 97/609 : 1) C2b (277783/1408291 : 76809/1408291 : 1)
** u= -114/143 ; C1 -50033*x^2 + 33445*y^2 + 40057*z^2
(-3978/16009 : -16831/16009 : 1) C2b (234119/437123 : 6945/437123 : 1)
** u= -114/163 ; C1 -71513*x^2 + 39565*y^2 + 50737*z^2
(-7734/22957 : -23827/22957 : 1) C2b (236319/1737007 : -80267/1737007 : 1)
** u= -114/173 ; C1 -83753*x^2 + 42925*y^2 + 56377*z^2
(2022/5335 : 27113/26675 : 1) C2b (-228827/529495 : 30381/2647475 : 1)
** u= -114/185 ; C1 -99761*x^2 + 47221*y^2 + 63409*z^2
(30859/46557 : -29980/46557 : 1) C2b (89239/219559 : -57/219559 : 1)
** u= -114/187 ; C1 -102569*x^2 + 47965*y^2 + 64609*z^2
(-307/447 : -260/447 : 1) C2b (-341041/1015649 : -22581/1015649 : 1)
** u= -114/191 ; C1 -108305*x^2 + 49477*y^2 + 67033*z^2
(-85786/121881 : -63377/121881 : 1) C2b (1321329/6538643 : -221473/6538643 : 1)
** u= -114/275 ; C1 -265721*x^2 + 88621*y^2 + 125329*z^2
(335979/508103 : 163220/508103 : 1) C2b (23199/2405635 : -3481/2405635 : 1)
** u= -113/105 ; C1 -20434*x^2 + 23794*y^2 + 21986*z^2
(20744/50653 : -44735/50653 : 1) C2b (538802/831735 : 28183/831735 : 1)
** u= -113/201 ; C1 -123922*x^2 + 53170*y^2 + 73058*z^2
(23864/99673 : -111011/99673 : 1) C2b (63424/390567 : 12475/390567 : 1)
** u= -113/257 ; C1 {+/-} -226850*x^2 + 78818*y^2 + 111362*z^2
(11396/23713 : -20511/23713 : 1) C2a (-38269/241233 : 1519/241233 : 1) C2b (-35378/391595 : 4753/391595 : 1)
** u= -113/273 ; C1 -262018*x^2 - 87298*y^2 + 123458*z^2
(11023/42305 : -46544/42305 : 1) C2a (2885421/1414705 : 302711/1414705 : 1)
** u= -112/95 ; C1 -15109*x^2 - 21569*y^2 + 17761*z^2
(63763/59881 : -10230/59881 : 1) C2a (11071546/1976801 : -876371/1976801 : 1)
** u= -112/109 ; C1 -23117*x^2 - 24425*y^2 + 23753*z^2
(-2759/2747 : -366/2747 : 1) C2a (-36909452/7090959 : 3179473/7090959 : 1)
** u= -112/163 ; C1 -72365*x^2 - 39113*y^2 + 50537*z^2
(-2660/3247 : -729/3247 : 1) C2a (-2367948/1199641 : -230567/1199641 : 1)
** u= -112/181 ; C1 -95261*x^2 - 45305*y^2 + 60761*z^2
(16569/41819 : -42050/41819 : 1) C2a (5492758/1056843 : 559409/1056843 : 1)
** u= -112/193 ; C1 -112325*x^2 - 49793*y^2 + 67937*z^2
(6312/106105 : -24715/21221 : 1) C2a (59205206/42015957 : -5887471/42015957 : 1)
** u= -112/213 ; C1 -143965*x^2 - 57913*y^2 + 80537*z^2
(8219/39487 : 44726/39487 : 1) C2a (-451566/839815 : 38747/839815 : 1)
** u= -112/251 ; C1 -215101*x^2 - 75545*y^2 + 106681*z^2
(37933/61433 : -35106/61433 : 1) C2a (1459624/2008409 : -149047/2008409 : 1)
** u= -112/275 ; C1 -267469*x^2 - 88169*y^2 + 124681*z^2
(41549/169545 : -188182/169545 : 1) C2a (-159592/437305 : -17111/437305 : 1)
** u= -112/289 ; C1 -300677*x^2 - 96065*y^2 + 135713*z^2
(-70184/148357 : -125205/148357 : 1) C2a (2311698/16240799 : 354157/16240799 : 1)
** u= -112/331 ; C1 -412061*x^2 - 122105*y^2 + 171161*z^2
(62611/337801 : 383046/337801 : 1) C2a (-4477454/403911 : -467771/403911 : 1)
** u= -112/367 ; C1 -521573*x^2 - 147233*y^2 + 204353*z^2
(177423/462445 : -430474/462445 : 1) C2a (-7205494/15343743 : 899597/15343743 : 1)
** u= -112/369 ; C1 -528037*x^2 - 148705*y^2 + 206273*z^2
(-40052/64729 : 10753/64729 : 1) C2a (2151512/4111609 : 260937/4111609 : 1)
** u= -112/383 ; C1 -574405*x^2 - 159233*y^2 + 219937*z^2
(164920/306127 : 176991/306127 : 1) C2a (1352282/605975 : 141739/605975 : 1)
** u= -111/167 ; C1 {+/-} -77618*x^2 + 40210*y^2 + 52642*z^2
(-21104/33687 : 127/171 : 1) C2a (443669/44157 : -44737/44157 : 1) C2b (-23487494/94117823 : 3579705/94117823 : 1)
** u= -111/223 ; C1 -161954*x^2 - 62050*y^2 + 86914*z^2
(576/1163 : -5071/5815 : 1) C2a (-188503/703901 : -16911/3519505 : 1)
** u= -110/59 ; C1 -3545*x^2 + 15581*y^2 + 4361*z^2
(-1666/1993 : 693/1993 : 1) C2b (91831/139811 : -1333/19973 : 1)
** u= -110/61 ; C1 -3865*x^2 + 15821*y^2 + 5041*z^2
(20377/20997 : -6248/20997 : 1) C2b (-248767/175725 : -49/2475 : 1)
** u= -110/67 ; C1 -5065*x^2 + 16589*y^2 + 7129*z^2
(7186/6261 : -1039/6261 : 1) C2b (-206109/182515 : -5707/182515 : 1)
** u= -110/81 ; C1 -9265*x^2 + 18661*y^2 + 12281*z^2
(671/701 : 316/701 : 1) C2b (-5473/71763 : 4993/71763 : 1)
** u= -110/83 ; C1 -10025*x^2 + 18989*y^2 + 13049*z^2
(46547/45395 : -3300/9079 : 1) C2b (-2059463/2597185 : 98791/2597185 : 1)
** u= -110/147 ; C1 -55465*x^2 + 33709*y^2 + 41849*z^2
(-7799/134647 : 149692/134647 : 1) C2b (-140029/294369 : -6239/294369 : 1)
** u= -110/157 ; C1 -66265*x^2 + 36749*y^2 + 47089*z^2
(5425/15229 : 15624/15229 : 1) C2b (1081173/2547797 : -271/11741 : 1)
** u= -110/173 ; C1 -85625*x^2 + 42029*y^2 + 55889*z^2
(-82293/103225 : 772/4129 : 1) C2b (222011/530291 : -4079/530291 : 1)
** u= -110/177 ; C1 -90865*x^2 + 43429*y^2 + 58169*z^2
(-8041/19997 : -20008/19997 : 1) C2b (-740857/1899197 : -25473/1899197 : 1)
** u= -110/207 ; C1 -135265*x^2 + 54949*y^2 + 76289*z^2
(-188617/428167 : 408592/428167 : 1) C2b (307/29587 : -957/29587 : 1)
** u= -110/211 ; C1 -141865*x^2 + 56621*y^2 + 78841*z^2
(-5390/21253 : 23583/21253 : 1) C2b (-2346903/18773587 : 75509/2681941 : 1)
** u= -109/93 ; C1 -14578*x^2 - 20530*y^2 + 17042*z^2
(-433/2569 : -2312/2569 : 1) C2a (12212789/2121013 : -971325/2121013 : 1)
** u= -109/125 ; C1 -35506*x^2 + 27506*y^2 + 30994*z^2
(5572/14285 : -13779/14285 : 1) C2b (-34521434/155168745 : 8343371/155168745 : 1)
** u= -109/133 ; C1 {+/-} -42338*x^2 + 29570*y^2 + 34802*z^2
(33619/37393 : -5232/37393 : 1) C2a (306023/134661 : -28327/134661 : 1) C2b (-81946/800033 : -43489/800033 : 1)
** u= -109/157 ; C1 {+/-} -66674*x^2 + 36530*y^2 + 46994*z^2
(-34392/105133 : -109819/105133 : 1) C2a (178697/344127 : 7001/344127 : 1) C2b (-114004/239761 : -1129/239761 : 1)
** u= -109/165 ; C1 {+/-} -76066*x^2 + 39106*y^2 + 51314*z^2
(-1432/19541 : 22295/19541 : 1) C2a (-405311/824329 : 16821/824329 : 1) C2b (156796/361679 : 4173/361679 : 1)
** u= -109/213 ; C1 {+/-} -145858*x^2 + 57250*y^2 + 79922*z^2
(-1793/2429 : -1072/12145 : 1) C2a (-89147/4151 : -9291/4151 : 1) C2b (-28358/116121 : -8843/580605 : 1)
** u= -109/221 ; C1 -159730*x^2 - 60722*y^2 + 85138*z^2
(-14645/22061 : -10872/22061 : 1) C2a (-4021759/15158957 : 106291/15158957 : 1)
** u= -109/245 ; C1 {+/-} -205186*x^2 + 71906*y^2 + 101554*z^2
(265/381 : 68/381 : 1) C2a (-227191/1407515 : -1663/1407515 : 1) C2b (56664/660379 : 9433/660379 : 1)
** u= -109/269 ; C1 -256402*x^2 - 84242*y^2 + 119122*z^2
(86729/133209 : -46880/133209 : 1) C2a (-79297/89369 : -8359/89369 : 1)
** u= -109/277 ; C1 -274754*x^2 - 88610*y^2 + 125234*z^2
(-155121/246509 : 106168/246509 : 1) C2a (140433/253433 : -15149/253433 : 1)
** u= -109/293 ; C1 -313378*x^2 - 97730*y^2 + 137842*z^2
(35137/57509 : -26568/57509 : 1) C2a (34769/202417 : 133/4937 : 1)
** u= -109/301 ; C1 -333650*x^2 - 102482*y^2 + 144338*z^2
(18297/28865 : 1828/5773 : 1) C2a (-177109/1016415 : -29287/1016415 : 1)
** u= -109/357 ; C1 -493474*x^2 - 139330*y^2 + 193394*z^2
(-3949/6529 : 1984/6529 : 1) C2a (-670401/4368709 : 158023/4368709 : 1)
** u= -108/53 ; C1 -2813*x^2 - 14473*y^2 + 2593*z^2
(-1200/3397 : 1337/3397 : 1) C2a (-199946/58665 : 6079/58665 : 1)
** u= -108/91 ; C1 -13757*x^2 - 19945*y^2 + 16273*z^2
(-5184/5563 : -2591/5563 : 1) C2a (417868/203651 : 30369/203651 : 1)
** u= -108/109 ; C1 -23981*x^2 - 23545*y^2 + 23761*z^2
(6053/6363 : 1882/6363 : 1) C2a (3735146/15561 : -331007/15561 : 1)
** u= -108/143 ; C1 -52133*x^2 - 32113*y^2 + 39673*z^2
(548751/858761 : -649790/858761 : 1) C2a (2414342/3109409 : 173631/3109409 : 1)
** u= -108/161 ; C1 -71717*x^2 - 37585*y^2 + 49033*z^2
(-8208/17141 : 15961/17141 : 1) C2a (5423306/2224893 : 536741/2224893 : 1)
** u= -108/187 ; C1 -105725*x^2 - 46633*y^2 + 63697*z^2
(17271/27745 : 3874/5549 : 1) C2a (1343138/3388095 : 53009/3388095 : 1)
** u= -108/199 ; C1 -123701*x^2 - 51265*y^2 + 70921*z^2
(19103/33513 : 25946/33513 : 1) C2a (4988366/1297391 : 515727/1297391 : 1)
** u= -108/215 ; C1 -149909*x^2 - 57889*y^2 + 81001*z^2
(-66708/109235 : 71921/109235 : 1) C2a (4677254/3273629 : 479229/3273629 : 1)
** u= -108/245 ; C1 -205949*x^2 - 71689*y^2 + 101281*z^2
(10452/46429 : -52265/46429 : 1) C2a (394156/1060719 : -37811/1060719 : 1)
** u= -108/269 ; C1 -257261*x^2 - 84025*y^2 + 118801*z^2
(-1604/6849 : 7645/6849 : 1) C2a (12298/495855 : 27923/2479275 : 1)
** u= -108/343 ; C1 -451733*x^2 - 129313*y^2 + 180073*z^2
(20425/220593 : 257498/220593 : 1) C2a (1286938/2344881 : -152399/2344881 : 1)
** u= -108/385 ; C1 -586469*x^2 - 159889*y^2 + 219721*z^2
(111044/278073 : -247045/278073 : 1) C2a (-2430356/3142845 : 275687/3142845 : 1)
** u= -107/155 ; C1 -65234*x^2 - 35474*y^2 + 45746*z^2
(-5216/6307 : -1125/6307 : 1) C2a (-8971203/2135413 : 892963/2135413 : 1)
** u= -107/187 ; C1 {+/-} -106258*x^2 + 46418*y^2 + 63538*z^2
(8420/10919 : 951/10919 : 1) C2a (239867/617855 : 9217/617855 : 1) C2b (18972/53071 : -247/53071 : 1)
** u= -107/323 ; C1 -394850*x^2 - 115778*y^2 + 162002*z^2
(-744/5695 : 1319/1139 : 1) C2a (313099/5918235 : 170393/5918235 : 1)
** u= -106/49 ; C1 -2465*x^2 + 13637*y^2 + 1553*z^2
(2050/2663 : 219/2663 : 1) C2b (130171/53845 : 941/53845 : 1)
** u= -106/85 ; C1 -11321*x^2 + 18461*y^2 + 14009*z^2
(-17502/15835 : -1559/15835 : 1) C2b (69403/277795 : 18163/277795 : 1)
** u= -106/157 ; C1 -67913*x^2 + 35885*y^2 + 46697*z^2
(7966/34943 : -38325/34943 : 1) C2b (-473239/1030967 : -673/147281 : 1)
** u= -106/219 ; C1 -158185*x^2 + 59197*y^2 + 83153*z^2
(235270/2256001 : -2645993/2256001 : 1) C2b (39019/2215297 : -7971/316471 : 1)
** u= -106/237 ; C1 -191593*x^2 + 67405*y^2 + 95177*z^2
(-268601/392593 : -112084/392593 : 1) C2b (1673/11391 : 95/11391 : 1)
** u= -106/239 ; C1 -195505*x^2 + 68357*y^2 + 96553*z^2
(-24887/40123 : -22416/40123 : 1) C2b (-53079/337265 : 11/337265 : 1)
** u= -105/169 ; C1 -82850*x^2 - 39586*y^2 + 53026*z^2
(3963/8645 : -1640/1729 : 1) C2a (-267391/631221 : -6493/631221 : 1)
** u= -105/289 ; C1 -307250*x^2 - 94546*y^2 + 133186*z^2
(-65343/153845 : 27904/30769 : 1) C2a (15877/1162163 : 25671/1162163 : 1)
** u= -104/45 ; C1 -2221*x^2 - 12841*y^2 + 569*z^2
(2216/14605 : 2933/14605 : 1) C2a (-24312/3223 : 383/3223 : 1)
** u= -104/81 ; C1 -9925*x^2 - 17377*y^2 + 12593*z^2
(-1148/3973 : -3269/3973 : 1) C2a (154632/160111 : 529/22873 : 1)
** u= -104/129 ; C1 -40357*x^2 - 27457*y^2 + 32657*z^2
(7276/15245 : 14093/15245 : 1) C2a (-573632/700111 : -2343/41183 : 1)
** u= -104/153 ; C1 -64213*x^2 - 34225*y^2 + 44417*z^2
(64/101 : 13787/18685 : 1) C2a (-2478/5017 : 15461/928145 : 1)
** u= -104/179 ; C1 -96557*x^2 - 42857*y^2 + 58457*z^2
(-49777/73477 : 42210/73477 : 1) C2a (-142824/380065 : -367/54295 : 1)
** u= -104/203 ; C1 -132413*x^2 - 52025*y^2 + 72617*z^2
(1821/3889 : 17798/19445 : 1) C2a (-128264/223671 : 57973/1118355 : 1)
** u= -104/239 ; C1 -196997*x^2 - 67937*y^2 + 96017*z^2
(121964/174919 : 10455/174919 : 1) C2a (-4955358/72779 : -519689/72779 : 1)
** u= -104/289 ; C1 -308197*x^2 - 94337*y^2 + 132817*z^2
(-245327/619467 : -586210/619467 : 1) C2a (-28784/493375 : -11641/493375 : 1)
** u= -104/379 ; C1 -571357*x^2 - 154457*y^2 + 211657*z^2
(6947/18897 : 17630/18897 : 1) C2a (-74/893 : 8689/229501 : 1)
** u= -104/385 ; C1 -591781*x^2 - 159041*y^2 + 217489*z^2
(42544/284565 : -322493/284565 : 1) C2a (96448226/9269501 : 9955681/9269501 : 1)
** u= -103/111 ; C1 -26482*x^2 - 22930*y^2 + 24578*z^2
(1591/3707 : 3436/3707 : 1) C2a (-7913/11209 : -267/11209 : 1)
** u= -103/119 ; C1 -32386*x^2 + 24770*y^2 + 28066*z^2
(20473/64303 : 64320/64303 : 1) C2b (-576134/1336071 : 54325/1336071 : 1)
** u= -103/135 ; C1 -46114*x^2 + 28834*y^2 + 35426*z^2
(-4811/11795 : 11572/11795 : 1) C2b (200438/407417 : 8259/407417 : 1)
** u= -103/239 ; C1 {+/-} -197746*x^2 + 67730*y^2 + 95746*z^2
(32809/84059 : -82740/84059 : 1) C2a (1841339/801101 : -27553/114443 : 1) C2b (-1477272/19996837 : -28039/2856691 :
1)
** u= -102/115 ; C1 -29609*x^2 + 23629*y^2 + 26281*z^2
(-8810/30789 : 30937/30789 : 1) C2b (-393091/627559 : -1023/627559 : 1)
** u= -102/137 ; C1 -48353*x^2 + 29173*y^2 + 36313*z^2
(32806/38679 : -8855/38679 : 1) C2b (-449349/895867 : -11849/895867 : 1)
** u= -102/157 ; C1 -69593*x^2 + 35053*y^2 + 46273*z^2
(36278/71463 : 64255/71463 : 1) C2b (-104333/428161 : 15813/428161 : 1)
** u= -102/185 ; C1 -106049*x^2 + 44629*y^2 + 61561*z^2
(2630/4851 : 4003/4851 : 1) C2b (-259581/1175569 : -30883/1175569 : 1)
** u= -102/235 ; C1 -190649*x^2 + 65629*y^2 + 92761*z^2
(99078/203809 : 173765/203809 : 1) C2b (207943/1875427 : -13221/1875427 : 1)
** u= -102/241 ; C1 -202481*x^2 + 68485*y^2 + 96841*z^2
(71383/159453 : 144524/159453 : 1) C2b (-337827/4171523 : 14639/4171523 : 1)
** u= -101/53 ; C1 {+/-} -2834*x^2 + 13010*y^2 + 3314*z^2
(-4113/11617 : -5540/11617 : 1) C2a (-145793/70107 : 3941/70107 : 1) C2b (43022/26567 : 389/26567 : 1)
** u= -101/125 ; C1 -37826*x^2 - 25826*y^2 + 30674*z^2
(-89404/188653 : 174825/188653 : 1) C2a (37539/48839 : -347/6977 : 1)
** u= -101/189 ; C1 {+/-} -112450*x^2 + 45922*y^2 + 63698*z^2
(44/101 : -97/101 : 1) C2a (1059431/1476385 : -98883/1476385 : 1) C2b (220928/701255 : 747/701255 : 1)
** u= -101/213 ; C1 {+/-} -150994*x^2 + 55570*y^2 + 78194*z^2
(1613/2413 : -1060/2413 : 1) C2a (-634053/2520587 : 30109/2520587 : 1) C2b (48766/279471 : 4115/279471 : 1)
** u= -101/221 ; C1 {+/-} -165122*x^2 + 59042*y^2 + 83282*z^2
(-27120/75173 : -76903/75173 : 1) C2a (-450851/537033 : 46013/537033 : 1) C2b (72794/514133 : 6811/514133 : 1)
** u= -101/229 ; C1 {+/-} -179890*x^2 + 62642*y^2 + 88498*z^2
(-21305/93817 : -105504/93817 : 1) C2a (1045121/3318643 : 96229/3318643 : 1) C2b (68096/451995 : -91/451995 : 1)
** u= -101/285 ; C1 -301186*x^2 - 91426*y^2 + 128594*z^2
(-41789/75193 : -46900/75193 : 1) C2a (333839/363019 : -35991/363019 : 1)
** u= -101/325 ; C1 -407026*x^2 - 115826*y^2 + 161074*z^2
(-607/1849 : 1860/1849 : 1) C2a (-117337/876637 : 30293/876637 : 1)
** u= -101/389 ; C1 -609650*x^2 - 161522*y^2 + 219698*z^2
(-1303/21665 : 5028/4333 : 1) C2a (6150847/3379215 : 646271/3379215 : 1)
** u= -100/77 ; C1 -8845*x^2 - 15929*y^2 + 11329*z^2
(13633/23591 : 17106/23591 : 1) C2a (-621586/326189 : -40403/326189 : 1)
** u= -100/91 ; C1 -15005*x^2 - 18281*y^2 + 16481*z^2
(-10800/13207 : 7843/13207 : 1) C2a (172796/111339 : 12527/111339 : 1)
** u= -100/183 ; C1 -104245*x^2 - 43489*y^2 + 60089*z^2
(14669/22813 : 14258/22813 : 1) C2a (-2842716/197149 : -294697/197149 : 1)
** u= -100/263 ; C1 -250645*x^2 - 79169*y^2 + 111769*z^2
(-16912/36779 : 31689/36779 : 1) C2a (-347878/4479377 : -12623/639911 : 1)
** u= -100/273 ; C1 -273445*x^2 - 84529*y^2 + 119129*z^2
(-34063/53959 : 18706/53959 : 1) C2a (5116/24749 : -753/24749 : 1)
** u= -100/313 ; C1 -374645*x^2 - 107969*y^2 + 150569*z^2
(-22159483/59573699 : 56968734/59573699 : 1) C2a (-131493864/780202981 : 1604681/45894293 : 1)
** u= -100/383 ; C1 -590245*x^2 - 156689*y^2 + 213289*z^2
(71849/185641 : 165726/185641 : 1) C2a (-3076118/14985337 : -659791/14985337 : 1)
** u= -99/307 ; C1 -359474*x^2 - 104050*y^2 + 145234*z^2
(43016/88971 : 68237/88971 : 1) C2a (59741/73857 : -33013/369285 : 1)
** u= -99/347 ; C1 -474434*x^2 - 130210*y^2 + 179314*z^2
(-84348/379267 : 414929/379267 : 1) C2a (70657/1414277 : -50577/1414277 : 1)
** u= -98/41 ; C1 -1937*x^2 + 11285*y^2 + 113*z^2
(-903/5329 : -380/5329 : 1) C2b (118013/14071 : -65/14071 : 1)
** u= -98/51 ; C1 -2617*x^2 + 12205*y^2 + 2993*z^2
(2186/5117 : 2323/5117 : 1) C2b (41951/63957 : -4337/63957 : 1)
** u= -98/55 ; C1 -3169*x^2 + 12629*y^2 + 4201*z^2
(-7087/6195 : -404/6195 : 1) C2b (-117543/235525 : -16153/235525 : 1)
** u= -98/81 ; C1 -10657*x^2 + 16165*y^2 + 12833*z^2
(-847/7921 : 7024/7921 : 1) C2b (205847/362559 : 18353/362559 : 1)
** u= -98/101 ; C1 -21017*x^2 + 19805*y^2 + 20393*z^2
(-77853/82709 : 24736/82709 : 1) C2b (-1561499/2915557 : 111917/2915557 : 1)
** u= -98/163 ; C1 -78553*x^2 + 36173*y^2 + 48913*z^2
(227822/367125 : 263701/367125 : 1) C2b (-137983/948111 : -35333/948111 : 1)
** u= -98/177 ; C1 -96865*x^2 + 40933*y^2 + 56417*z^2
(-14474/20567 : -9341/20567 : 1) C2b (-313957/1164609 : -24791/1164609 : 1)
** u= -98/179 ; C1 -99641*x^2 + 41645*y^2 + 57521*z^2
(23849/33499 : -13752/33499 : 1) C2b (222859/894661 : -20297/894661 : 1)
** u= -97/129 ; C1 -42562*x^2 - 26050*y^2 + 32258*z^2
(-127/2105 : -11684/10525 : 1) C2a (19629/23495 : -59/925 : 1)
** u= -97/377 ; C1 -573778*x^2 - 151538*y^2 + 205858*z^2
(27671/60845 : 46152/60845 : 1) C2a (18059453/1520339 : 1857799/1520339 : 1)
** u= -97/385 ; C1 -601154*x^2 - 157634*y^2 + 213506*z^2
(67356/143893 : 103645/143893 : 1) C2a (2789903/1879857 : 296033/1879857 : 1)
** u= -96/49 ; C1 -2405*x^2 - 11617*y^2 + 2593*z^2
(108/1289 : 607/1289 : 1) C2a (174406/93555 : 2297/93555 : 1)
** u= -96/119 ; C1 -34325*x^2 - 23377*y^2 + 27793*z^2
(-11061/12353 : -1334/12353 : 1) C2a (333724/367875 : -25043/367875 : 1)
** u= -96/167 ; C1 -84533*x^2 - 37105*y^2 + 50737*z^2
(-149313/281309 : 239618/281309 : 1) C2a (-18238/38241 : 1219/38241 : 1)
** u= -96/187 ; C1 -112253*x^2 - 44185*y^2 + 61657*z^2
(8333/21369 : 21466/21369 : 1) C2a (1574674/95913 : -164069/95913 : 1)
** u= -96/205 ; C1 -140621*x^2 - 51241*y^2 + 72169*z^2
(240/76109 : 90323/76109 : 1) C2a (-758068/3553267 : 4227/3553267 : 1)
** u= -96/257 ; C1 -240773*x^2 - 75265*y^2 + 106177*z^2
(13803/83311 : 95822/83311 : 1) C2a (-380864/1726617 : 52409/1726617 : 1)
** u= -96/343 ; C1 -465749*x^2 - 126865*y^2 + 174289*z^2
(-99177/390917 : -416930/390917 : 1) C2a (-18562834/32055221 : 2241825/32055221 : 1)
** u= -96/371 ; C1 -554957*x^2 - 146857*y^2 + 199657*z^2
(-27661/136089 : -149290/136089 : 1) C2a (-2348974/4191013 : -291537/4191013 : 1)
** u= -96/377 ; C1 -575093*x^2 - 151345*y^2 + 205297*z^2
(-7867/31551 : -33394/31551 : 1) C2a (2321272/966549 : -241525/966549 : 1)
** u= -95/191 ; C1 -118850*x^2 - 45506*y^2 + 63746*z^2
(-28048/96175 : -20883/19235 : 1) C2a (-4257/1315 : -443/1315 : 1)
** u= -94/81 ; C1 -11185*x^2 + 15397*y^2 + 12953*z^2
(20317/21553 : -9536/21553 : 1) C2b (-26639/107157 : 6793/107157 : 1)
** u= -94/161 ; C1 -77905*x^2 + 34757*y^2 + 47353*z^2
(13474/19651 : -10917/19651 : 1) C2b (-82037/401139 : 12889/401139 : 1)
** u= -94/191 ; C1 -119425*x^2 + 45317*y^2 + 63553*z^2
(203/1795 : 420/359 : 1) C2b (1014651/4811233 : -10289/687319 : 1)
** u= -94/197 ; C1 -128809*x^2 + 47645*y^2 + 67009*z^2
(-5017/27813 : -31936/27813 : 1) C2b (-55899/621029 : -13721/621029 : 1)
** u= -94/211 ; C1 -152105*x^2 + 53357*y^2 + 75353*z^2
(9734/16097 : 9789/16097 : 1) C2b (-296533/1907255 : -9497/1907255 : 1)
** u= -94/221 ; C1 -169945*x^2 + 57677*y^2 + 81553*z^2
(193526/433667 : -394419/433667 : 1) C2b (-506353/14651775 : -139733/14651775 : 1)
** u= -93/61 ; C1 -4562*x^2 - 12370*y^2 + 6418*z^2
(-3561/6593 : -4228/6593 : 1) C2a (-28471/24933 : -301/24933 : 1)
** u= -93/77 ; C1 {+/-} -9650*x^2 + 14578*y^2 + 11602*z^2
(-3999/10265 : 1712/2053 : 1) C2a (-171797/34109 : 13323/34109 : 1) C2b (-689406/1404847 : 77677/1404847 : 1)
** u= -93/253 ; C1 -234578*x^2 - 72658*y^2 + 102418*z^2
(-38935/65697 : 34492/65697 : 1) C2a (238613/177179 : -25269/177179 : 1)
** u= -92/41 ; C1 -1781*x^2 - 10145*y^2 + 761*z^2
(5088/7973 : 473/7973 : 1) C2a (-69028/11187 : -1447/11187 : 1)
** u= -92/77 ; C1 -9773*x^2 - 14393*y^2 + 11633*z^2
(-24740/37157 : 26463/37157 : 1) C2a (250878/132629 : -17789/132629 : 1)
** u= -92/81 ; C1 -11461*x^2 - 15025*y^2 + 13001*z^2
(220/1877 : -8677/9385 : 1) C2a (-32830/9719 : 13083/48595 : 1)
** u= -92/127 ; C1 -42373*x^2 - 24593*y^2 + 31033*z^2
(7601/30825 : 33158/30825 : 1) C2a (9281132/1755665 : -915547/1755665 : 1)
** u= -92/165 ; C1 -83869*x^2 - 35689*y^2 + 49121*z^2
(118409/195047 : -139330/195047 : 1) C2a (657124/485431 : -65781/485431 : 1)
** u= -92/175 ; C1 -97189*x^2 - 39089*y^2 + 54361*z^2
(-33268/100595 : -106401/100595 : 1) C2a (-1894364/2381209 : 182131/2381209 : 1)
** u= -92/193 ; C1 -123685*x^2 - 45713*y^2 + 64297*z^2
(-716/1757 : -1719/1757 : 1) C2a (365924/1232945 : -24397/1232945 : 1)
** u= -92/197 ; C1 -130013*x^2 - 47273*y^2 + 66593*z^2
(9067/24443 : -24810/24443 : 1) C2a (266628/868379 : 20321/868379 : 1)
** u= -92/201 ; C1 -136501*x^2 - 48865*y^2 + 68921*z^2
(-1148/18953 : -22427/18953 : 1) C2a (492744/1562059 : 1001/38099 : 1)
** u= -92/209 ; C1 -149957*x^2 - 52145*y^2 + 73673*z^2
(-2259/102227 : 121450/102227 : 1) C2a (-444484/1224657 : -42541/1224657 : 1)
** u= -92/213 ; C1 -156925*x^2 - 53833*y^2 + 76097*z^2
(-65072/204025 : 43127/40805 : 1) C2a (-58554/72097 : 6071/72097 : 1)
** u= -92/235 ; C1 -198109*x^2 - 63689*y^2 + 90001*z^2
(-23155/34693 : -5754/34693 : 1) C2a (96556/1533901 : 24671/1533901 : 1)
** u= -92/259 ; C1 -248557*x^2 - 75545*y^2 + 106273*z^2
(-761/52993 : -62838/52993 : 1) C2a (26152/175471 : 4987/175471 : 1)
** u= -92/263 ; C1 -257525*x^2 - 77633*y^2 + 109097*z^2
(-207063/351905 : 35666/70381 : 1) C2a (-222582/241429 : -24037/241429 : 1)
** u= -92/301 ; C1 -350701*x^2 - 99065*y^2 + 137521*z^2
(-38428/68433 : 35683/68433 : 1) C2a (-893446/2437879 : 121937/2437879 : 1)
** u= -92/329 ; C1 -428597*x^2 - 116705*y^2 + 160313*z^2
(-17216/276673 : -322587/276673 : 1) C2a (-73764/31073 : -7709/31073 : 1)
** u= -92/349 ; C1 -489037*x^2 - 130265*y^2 + 177553*z^2
(44827/78219 : -28202/78219 : 1) C2a (-11156834/4355977 : -1161103/4355977 : 1)
** u= -92/363 ; C1 -533725*x^2 - 140233*y^2 + 190097*z^2
(-39428348/75223415 : 8375833/15044683 : 1) C2a (1329942/525379 : 138173/525379 : 1)
** u= -91/67 ; C1 {+/-} -6338*x^2 + 12770*y^2 + 8402*z^2
(1911/3067 : 2092/3067 : 1) C2a (-77013/46079 : 4475/46079 : 1) C2b (10564/68873 : -4747/68873 : 1)
** u= -91/171 ; C1 {+/-} -92242*x^2 + 37522*y^2 + 52082*z^2
(-8980/14647 : -9977/14647 : 1) C2a (713/1675 : -12939/430475 : 1) C2b (-2518/19431 : 147499/4993767 : 1)
** u= -91/227 ; C1 -183298*x^2 - 59810*y^2 + 84562*z^2
(-12817/56291 : 63060/56291 : 1) C2a (-116581/2424173 : 29815/2424173 : 1)
** u= -91/267 ; C1 -267538*x^2 - 79570*y^2 + 111602*z^2
(-40292/74791 : 48857/74791 : 1) C2a (22201437/19119479 : 2374375/19119479 : 1)
** u= -91/283 ; C1 -305714*x^2 - 88370*y^2 + 123314*z^2
(8333/14987 : 8556/14987 : 1) C2a (-597873/848567 : -67271/848567 : 1)
** u= -91/307 ; C1 -367778*x^2 - 102530*y^2 + 141842*z^2
(308/1019 : 1047/1019 : 1) C2a (42243/269419 : -10105/269419 : 1)
** u= -91/347 ; C1 -484018*x^2 - 128690*y^2 + 175282*z^2
(-34069/193387 : -215808/193387 : 1) C2a (14184757/1688429 : -1461827/1688429 : 1)
** u= -90/41 ; C1 -1745*x^2 + 9781*y^2 + 961*z^2
(2511/4633 : -992/4633 : 1) C2b (32561/40765 : 93/1315 : 1)
** u= -90/83 ; C1 -12665*x^2 + 14989*y^2 + 13729*z^2
(-3291/3167 : 188/3167 : 1) C2b (1/139 : 9/139 : 1)
** u= -90/119 ; C1 -36065*x^2 + 22261*y^2 + 27481*z^2
(1686/2021 : 661/2021 : 1) C2b (1207879/6940655 : -339573/6940655 : 1)
** u= -90/133 ; C1 -48665*x^2 + 25789*y^2 + 33529*z^2
(75923/203493 : 207268/203493 : 1) C2b (651171/1424371 : -10141/1424371 : 1)
** u= -90/163 ; C1 -82265*x^2 + 34669*y^2 + 47809*z^2
(-36117/61519 : 46084/61519 : 1) C2b (11197607/38708507 : 694647/38708507 : 1)
** u= -89/161 ; C1 {+/-} -80210*x^2 + 33842*y^2 + 46658*z^2
(-10727/16253 : 9564/16253 : 1) C2a (5906649/3399985 : -600133/3399985 : 1) C2b (305432/3725209 : -126509/3725209 :
1)
** u= -89/209 ; C1 -151922*x^2 - 51602*y^2 + 72962*z^2
(-4584/8681 : 6685/8681 : 1) C2a (1847977/12780765 : -737/66915 : 1)
** u= -88/39 ; C1 -1621*x^2 - 9265*y^2 + 641*z^2
(623/1733 : 374/1733 : 1) C2a (747018/232283 : -1975/232283 : 1)
** u= -88/51 ; C1 -2797*x^2 - 10345*y^2 + 3833*z^2
(8657/8309 : 2306/8309 : 1) C2a (-434148/8159 : -23305/8159 : 1)
** u= -88/57 ; C1 -3925*x^2 - 10993*y^2 + 5537*z^2
(-6944/6445 : 385/1289 : 1) C2a (-1131234/183785 : -9941/26255 : 1)
** u= -88/73 ; C1 -8693*x^2 - 13073*y^2 + 10433*z^2
(4516/5405 : -3123/5405 : 1) C2a (6718492/330195 : -528997/330195 : 1)
** u= -88/171 ; C1 -93757*x^2 - 36985*y^2 + 51593*z^2
(-1027961/1404893 : 273026/1404893 : 1) C2a (348694/844253 : 25983/844253 : 1)
** u= -88/179 ; C1 -104941*x^2 - 39785*y^2 + 55801*z^2
(-38357/91513 : 88686/91513 : 1) C2a (334136/259321 : -34223/259321 : 1)
** u= -88/203 ; C1 -142333*x^2 - 48953*y^2 + 69193*z^2
(38936/75351 : 60145/75351 : 1) C2a (-348964/2248273 : -20743/2248273 : 1)
** u= -88/233 ; C1 -197173*x^2 - 62033*y^2 + 87553*z^2
(3940/5913 : 1/81 : 1) C2a (-9672628/813151 : 1013831/813151 : 1)
** u= -88/245 ; C1 -221629*x^2 - 67769*y^2 + 95401*z^2
(-145/2859 : 3382/2859 : 1) C2a (-746/3871 : -1537/50323 : 1)
** u= -88/247 ; C1 -225845*x^2 - 68753*y^2 + 96737*z^2
(172563/322033 : 219314/322033 : 1) C2a (257526/558775 : 29987/558775 : 1)
** u= -88/255 ; C1 -243109*x^2 - 72769*y^2 + 102161*z^2
(141931/359353 : -337630/359353 : 1) C2a (-1038774/116929 : 108619/116929 : 1)
** u= -88/289 ; C1 -323621*x^2 - 91265*y^2 + 126641*z^2
(8357/14023 : -5022/14023 : 1) C2a (-2242/269583 : -8789/269583 : 1)
** u= -88/303 ; C1 -360133*x^2 - 99553*y^2 + 137393*z^2
(-24344/50179 : -36485/50179 : 1) C2a (573598/1482155 : -78567/1482155 : 1)
** u= -88/373 ; C1 -572093*x^2 - 146873*y^2 + 197033*z^2
(73093/142423 : 80010/142423 : 1) C2a (4623076/5571243 : 526483/5571243 : 1)
** u= -87/127 ; C1 -44018*x^2 + 23698*y^2 + 30658*z^2
(-40/51 : 337/867 : 1) C2b (-102/251 : 101/4267 : 1)
** u= -87/215 ; C1 -163874*x^2 - 53794*y^2 + 76066*z^2
(1797/3251 : -2260/3251 : 1) C2a (168991/1356131 : -21909/1356131 : 1)
** u= -86/79 ; C1 -11425*x^2 + 13637*y^2 + 12433*z^2
(-62/125 : -21/25 : 1) C2b (-28297/100215 : -6047/100215 : 1)
** u= -86/105 ; C1 -26401*x^2 + 18421*y^2 + 21689*z^2
(-2806/17743 : -246445/230659 : 1) C2b (1009/7981 : 243/4511 : 1)
** u= -86/145 ; C1 -62641*x^2 + 28421*y^2 + 38569*z^2
(-1382/19575 : -22711/19575 : 1) C2b (149379/644059 : -20167/644059 : 1)
** u= -86/161 ; C1 -81617*x^2 + 33317*y^2 + 46217*z^2
(17667/24785 : -9356/24785 : 1) C2b (-24271/383945 : -12307/383945 : 1)
** u= -86/171 ; C1 -94777*x^2 + 36637*y^2 + 51257*z^2
(-14210/22289 : 13141/22289 : 1) C2b (3697/47259 : -1283/47259 : 1)
** u= -85/77 ; C1 {+/-} -10690*x^2 + 13154*y^2 + 11794*z^2
(-2348/2721 : 1469/2721 : 1) C2a (183529/123149 : -13057/123149 : 1) C2b (-210366/399991 : -19289/399991 : 1)
** u= -85/141 ; C1 {+/-} -58690*x^2 + 27106*y^2 + 36626*z^2
(-3136/4033 : -827/4033 : 1) C2a (196341/430979 : 10183/430979 : 1) C2b (279964/880869 : -20881/880869 : 1)
** u= -85/197 ; C1 {+/-} -134290*x^2 + 46034*y^2 + 65074*z^2
(11768/54477 : -61573/54477 : 1) C2a (15697/17687 : -1631/17687 : 1) C2b (-593532/5233025 : -23161/5233025 : 1)
** u= -85/373 ; C1 -576050*x^2 - 146354*y^2 + 195314*z^2
(-56/857 : -12789/11141 : 1) C2a (73389/77875 : 15199/144625 : 1)
** u= -84/37 ; C1 -1469*x^2 - 8425*y^2 + 529*z^2
(-92/381 : 437/1905 : 1) C2a (-19454/5773 : -9/1255 : 1)
** u= -84/53 ; C1 -3293*x^2 - 9865*y^2 + 4657*z^2
(-264/7477 : 5135/7477 : 1) C2a (128188/28631 : 7491/28631 : 1)
** u= -84/107 ; C1 -28349*x^2 - 18505*y^2 + 22369*z^2
(27457/77457 : 78086/77457 : 1) C2a (-4332688/177117 : -420121/177117 : 1)
** u= -84/193 ; C1 -128453*x^2 - 44305*y^2 + 62617*z^2
(-58632/149041 : 146381/149041 : 1) C2a (-308068/1209989 : 27513/1209989 : 1)
** u= -84/275 ; C1 -292781*x^2 - 82681*y^2 + 114769*z^2
(-421680/1058051 : -961393/1058051 : 1) C2a (-51554/706575 : -23543/706575 : 1)
** u= -84/323 ; C1 -420173*x^2 - 111385*y^2 + 151537*z^2
(-22043/41829 : 23398/41829 : 1) C2a (44747834/52846523 : 5039427/52846523 : 1)
** u= -84/337 ; C1 -461669*x^2 - 120625*y^2 + 163129*z^2
(156/1093 : 30847/27325 : 1) C2a (70982/4167 : 36419/20835 : 1)
** u= -84/341 ; C1 -473885*x^2 - 123337*y^2 + 166513*z^2
(232192/456429 : -272233/456429 : 1) C2a (114692/19701 : 11783/19701 : 1)
** u= -84/353 ; C1 -511493*x^2 - 131665*y^2 + 176857*z^2
(-26376/47113 : 16699/47113 : 1) C2a (-15016/28467 : 1937/28467 : 1)
** u= -84/395 ; C1 -654461*x^2 - 163081*y^2 + 215329*z^2
(-1464285/3192749 : -2203378/3192749 : 1) C2a (-83962/29175 : 8609/29175 : 1)
** u= -83/43 ; C1 {+/-} -1858*x^2 + 8738*y^2 + 2098*z^2
(2104/2615 : -837/2615 : 1) C2a (-61/35 : 143/8995 : 1) C2b (394/423 : 6703/108711 : 1)
** u= -83/67 ; C1 {+/-} -7090*x^2 + 11378*y^2 + 8722*z^2
(2128/5011 : -4053/5011 : 1) C2a (258529/289553 : 3319/289553 : 1) C2b (-26038/46851 : -353/6693 : 1)
** u= -83/259 ; C1 -256306*x^2 - 73970*y^2 + 103186*z^2
(8947/23587 : -22332/23587 : 1) C2a (-850477/1915487 : -105695/1915487 : 1)
** u= -83/267 ; C1 -274690*x^2 - 78178*y^2 + 108722*z^2
(5792/13723 : -12001/13723 : 1) C2a (-6143/8479 : 693/8479 : 1)
** u= -83/283 ; C1 -313378*x^2 - 86978*y^2 + 120178*z^2
(-49313/79635 : 916/79635 : 1) C2a (-6013757/303739 : 623681/303739 : 1)
** u= -83/379 ; C1 -599266*x^2 - 150530*y^2 + 199666*z^2
(22328/47103 : 30955/47103 : 1) C2a (78307/10453 : 7969/10453 : 1)
** u= -82/39 ; C1 -1537*x^2 + 8245*y^2 + 1193*z^2
(713/811 : -20/811 : 1) C2b (643/699 : -47/699 : 1)
** u= -82/91 ; C1 -18281*x^2 + 15005*y^2 + 16481*z^2
(-19903/109147 : -112260/109147 : 1) C2b (378787/668597 : -17975/668597 : 1)
** u= -82/101 ; C1 -24601*x^2 + 16925*y^2 + 20041*z^2
(-2926/8331 : 8351/8331 : 1) C2b (-429/751 : 1/751 : 1)
** u= -82/107 ; C1 -28873*x^2 + 18173*y^2 + 22273*z^2
(-2302/7105 : -7311/7105 : 1) C2b (-44919/173273 : 7949/173273 : 1)
** u= -82/133 ; C1 -51545*x^2 + 24413*y^2 + 32777*z^2
(9885/67301 : 5896/5177 : 1) C2b (-44077/203395 : -7157/203395 : 1)
** u= -82/173 ; C1 -99625*x^2 + 36653*y^2 + 51577*z^2
(8993/117305 : -27672/23461 : 1) C2b (8703/107969 : 2359/107969 : 1)
** u= -82/193 ; C1 -129665*x^2 + 43973*y^2 + 62177*z^2
(-67119/96929 : -848/96929 : 1) C2b (11543/271781 : 2429/271781 : 1)
** u= -81/73 ; C1 {+/-} -9554*x^2 + 11890*y^2 + 10594*z^2
(-1304/4221 : 3809/4221 : 1) C2a (230351/36169 : 19035/36169 : 1) C2b (1280244/1680739 : -26585/1680739 : 1)
** u= -81/97 ; C1 -22178*x^2 + 15970*y^2 + 18562*z^2
(2656/2937 : -479/2937 : 1) C2b (-6458/16459 : 687/16459 : 1)
** u= -81/193 ; C1 {+/-} -130274*x^2 + 43810*y^2 + 61954*z^2
(22796/33681 : 7679/33681 : 1) C2a (-15589/130239 : -1343/130239 : 1) C2b (58242/870163 : -1241/870163 : 1)
** u= -81/305 ; C1 -372866*x^2 - 99586*y^2 + 135874*z^2
(35648/159525 : -173099/159525 : 1) C2a (-52703/51315 : -5771/51315 : 1)
** u= -80/51 ; C1 -3085*x^2 - 9001*y^2 + 4361*z^2
(532/479 : 119/479 : 1) C2a (-450312/9205 : -3949/1315 : 1)
** u= -80/61 ; C1 -5485*x^2 - 10121*y^2 + 7081*z^2
(3379/4039 : -2286/4039 : 1) C2a (-42718/9757 : 3079/9757 : 1)
** u= -80/73 ; C1 -9685*x^2 - 11729*y^2 + 10609*z^2
(-721/947 : -618/947 : 1) C2a (23638/14317 : -17/139 : 1)
** u= -80/173 ; C1 -100685*x^2 - 36329*y^2 + 51209*z^2
(-56040/86693 : -43477/86693 : 1) C2a (-19776/73799 : -1367/73799 : 1)
** u= -80/189 ; C1 -124525*x^2 - 42121*y^2 + 59561*z^2
(-64/8209 : 9761/8209 : 1) C2a (-159978/642515 : -15703/642515 : 1)
** u= -80/193 ; C1 -130885*x^2 - 43649*y^2 + 61729*z^2
(-11023/22947 : 19502/22947 : 1) C2a (-20186/1088905 : -1099/1088905 : 1)
** u= -80/207 ; C1 -154405*x^2 - 49249*y^2 + 69569*z^2
(-26989/55577 : 45602/55577 : 1) C2a (10834/57241 : 1467/57241 : 1)
** u= -80/211 ; C1 -161485*x^2 - 50921*y^2 + 71881*z^2
(-58060/107063 : -74097/107063 : 1) C2a (273952/2842943 : -59311/2842943 : 1)
** u= -80/257 ; C1 -254405*x^2 - 72449*y^2 + 100769*z^2
(4444/7853 : 4053/7853 : 1) C2a (1015284/1838975 : -120511/1838975 : 1)
** u= -80/269 ; C1 -282125*x^2 - 78761*y^2 + 109001*z^2
(555216/893245 : -791/178649 : 1) C2a (-352794/345781 : -38417/345781 : 1)
** u= -80/287 ; C1 -326405*x^2 - 88769*y^2 + 121889*z^2
(91193/157541 : 59166/157541 : 1) C2a (1084356/4022255 : -184049/4022255 : 1)
** u= -80/341 ; C1 -478685*x^2 - 122681*y^2 + 164441*z^2
(-497148/855769 : 131359/855769 : 1) C2a (283974/368815 : -1933/21695 : 1)
** u= -80/367 ; C1 -562405*x^2 - 141089*y^2 + 187009*z^2
(-50956/117387 : -88963/117387 : 1) C2a (-1893244/7290421 : -372757/7290421 : 1)
** u= -79/71 ; C1 -9010*x^2 - 11282*y^2 + 10018*z^2
(25192/29339 : 16047/29339 : 1) C2a (-20477/22885 : 809/22885 : 1)
** u= -79/135 ; C1 {+/-} -54706*x^2 + 24466*y^2 + 33314*z^2
(-415/3971 : 4592/3971 : 1) C2a (-47943/13175 : 4909/13175 : 1) C2b (124156/347071 : -3963/347071 : 1)
** u= -79/231 ; C1 -200050*x^2 - 59602*y^2 + 83618*z^2
(-34553/60475 : -6704/12095 : 1) C2a (-9419/69025 : -2067/69025 : 1)
** u= -79/295 ; C1 -348146*x^2 - 93266*y^2 + 127394*z^2
(50745/88531 : 33068/88531 : 1) C2a (100077/523957 : -22313/523957 : 1)
** u= -78/41 ; C1 -1697*x^2 + 7765*y^2 + 1993*z^2
(3054/3703 : 1217/3703 : 1) C2b (-412891/272833 : 7893/272833 : 1)
** u= -78/187 ; C1 -122585*x^2 + 41053*y^2 + 58057*z^2
(-18087/33727 : 25136/33727 : 1) C2b (-837/43819 : -211/43819 : 1)
** u= -77/61 ; C1 {+/-} -5746*x^2 + 9650*y^2 + 7186*z^2
(-275/741 : -232/285 : 1) C2a (-11045/12293 : -1/61465 : 1) C2b (-17346/20999 : 565/20999 : 1)
** u= -77/69 ; C1 {+/-} -8482*x^2 + 10690*y^2 + 9458*z^2
(-152/281 : 227/281 : 1) C2a (3173421/112327 : 263219/112327 : 1) C2b (25028/41361 : -1741/41361 : 1)
** u= -77/85 ; C1 {+/-} -15874*x^2 + 13154*y^2 + 14386*z^2
(-2677/9305 : 9276/9305 : 1) C2a (-771853/53533 : -71137/53533 : 1) C2b (346784/552405 : 6409/552405 : 1)
** u= -77/93 ; C1 {+/-} -20530*x^2 + 14578*y^2 + 17042*z^2
(-1991/3073 : -2336/3073 : 1) C2a (187149/90635 : -17123/90635 : 1) C2b (-100858/213655 : -6987/213655 : 1)
** u= -76/43 ; C1 -1949*x^2 - 7625*y^2 + 2609*z^2
(16/131 : 381/655 : 1) C2a (135276/69581 : 4783/69581 : 1)
** u= -76/69 ; C1 -8605*x^2 - 10537*y^2 + 9473*z^2
(-1096/3349 : 3017/3349 : 1) C2a (5648/761 : -120741/195577 : 1)
** u= -76/87 ; C1 -17173*x^2 - 13345*y^2 + 15017*z^2
(24499/33173 : 21586/33173 : 1) C2a (442304/161783 : -40323/161783 : 1)
** u= -76/99 ; C1 -24685*x^2 - 15577*y^2 + 19073*z^2
(28780/48907 : 40201/48907 : 1) C2a (-435472/15265 : 42501/15265 : 1)
** u= -76/145 ; C1 -66821*x^2 - 26801*y^2 + 37289*z^2
(-35469/67523 : -56630/67523 : 1) C2a (-33738/101633 : -209/14519 : 1)
** u= -76/155 ; C1 -78781*x^2 - 29801*y^2 + 41809*z^2
(443/1629 : 1790/1629 : 1) C2a (40478/51853 : -4003/51853 : 1)
** u= -76/217 ; C1 -175253*x^2 - 52865*y^2 + 74297*z^2
(-412/649 : 171/649 : 1) C2a (23094/12523 : -2435/12523 : 1)
** u= -76/223 ; C1 -186629*x^2 - 55505*y^2 + 77849*z^2
(-4717/9493 : -7182/9493 : 1) C2a (-123438/10333 : -12899/10333 : 1)
** u= -76/231 ; C1 -202357*x^2 - 59137*y^2 + 82697*z^2
(-146968/232387 : 40105/232387 : 1) C2a (590198/1737185 : 79167/1737185 : 1)
** u= -76/239 ; C1 -218725*x^2 - 62897*y^2 + 87673*z^2
(-12632/22563 : 12439/22563 : 1) C2a (358892/829745 : -45131/829745 : 1)
** u= -76/297 ; C1 -356533*x^2 - 93985*y^2 + 127577*z^2
(33512/77909 : -63079/77909 : 1) C2a (5105142/2394551 : -533071/2394551 : 1)
** u= -76/381 ; C1 -615757*x^2 - 150937*y^2 + 197297*z^2
(-165343/305087 : -100690/305087 : 1) C2a (-7762988/13839359 : -1007619/13839359 : 1)
** u= -75/163 ; C1 {+/-} -89570*x^2 + 32194*y^2 + 45394*z^2
(42949/72111 : -3608/5547 : 1) C2a (-3067/11235 : -223/11235 : 1) C2b (17268/137723 : 2183/137723 : 1)
** u= -75/283 ; C1 -321170*x^2 - 85714*y^2 + 116914*z^2
(-14763/122603 : 140308/122603 : 1) C2a (-9467/860615 : -4689/122945 : 1)
** u= -75/331 ; C1 -454130*x^2 - 115186*y^2 + 153586*z^2
(20271/49223 : -40132/49223 : 1) C2a (1985597/346785 : -202807/346785 : 1)
** u= -74/67 ; C1 -8089*x^2 + 9965*y^2 + 8929*z^2
(-2578/2973 : 1589/2973 : 1) C2b (190839/302171 : 11609/302171 : 1)
** u= -74/79 ; C1 -13297*x^2 + 11717*y^2 + 12457*z^2
(11090/11529 : -1319/11529 : 1) C2b (57813/156425 : 7819/156425 : 1)
** u= -74/83 ; C1 -15353*x^2 + 12365*y^2 + 13697*z^2
(15266/17417 : 6831/17417 : 1) C2b (-25661/49657 : 1661/49657 : 1)
** u= -74/91 ; C1 -19945*x^2 + 13757*y^2 + 16273*z^2
(10634/11813 : -1059/11813 : 1) C2b (371787/1240765 : -58057/1240765 : 1)
** u= -74/97 ; C1 -23809*x^2 + 14885*y^2 + 18289*z^2
(9713/11673 : 4064/11673 : 1) C2b (1129/4029 : 179/4029 : 1)
** u= -74/105 ; C1 -29521*x^2 + 16501*y^2 + 21089*z^2
(-18091/21685 : -3932/21685 : 1) C2b (-329227/786785 : 19503/786785 : 1)
** u= -74/117 ; C1 -39289*x^2 + 19165*y^2 + 25529*z^2
(-1666/25019 : 28777/25019 : 1) C2b (-12983/78113 : -441/11159 : 1)
** u= -74/137 ; C1 -58769*x^2 + 24245*y^2 + 33569*z^2
(1494/16579 : -19369/16579 : 1) C2b (4013/58133 : -1901/58133 : 1)
** u= -74/143 ; C1 -65393*x^2 + 25925*y^2 + 36137*z^2
(-818/1469 : -1149/1469 : 1) C2b (40739/140863 : -659/140863 : 1)
** u= -74/151 ; C1 -74785*x^2 + 28277*y^2 + 39673*z^2
(9202/22461 : -21997/22461 : 1) C2b (-1602731/9335967 : -179437/9335967 : 1)
** u= -73/49 ; C1 {+/-} -3026*x^2 + 7730*y^2 + 4226*z^2
(14823/13453 : -3596/13453 : 1) C2a (-11999/10941 : 71/10941 : 1) C2b (3124/3029 : -71/3029 : 1)
** u= -73/81 ; C1 {+/-} -14482*x^2 + 11890*y^2 + 13058*z^2
(859/5273 : 5444/5273 : 1) C2a (48471/277 : 4481/277 : 1) C2b (-8044/649827 : 38255/649827 : 1)
** u= -73/177 ; C1 -110290*x^2 - 36658*y^2 + 51842*z^2
(-1771/2801 : -1288/2801 : 1) C2a (-13549/68747 : -9/427 : 1)
** u= -73/257 ; C1 -260530*x^2 - 71378*y^2 + 98242*z^2
(11279/32613 : -31616/32613 : 1) C2a (-3771569/2722625 : 402163/2722625 : 1)
** u= -73/313 ; C1 -403778*x^2 - 103298*y^2 + 138338*z^2
(-6575/66409 : -75744/66409 : 1) C2a (-10801/305343 : 49/1161 : 1)
** u= -72/43 ; C1 -2045*x^2 - 7033*y^2 + 2857*z^2
(8403/31297 : 19426/31297 : 1) C2a (7912/6025 : 81/6025 : 1)
** u= -72/61 ; C1 -6221*x^2 - 8905*y^2 + 7321*z^2
(6288/19333 : 16723/19333 : 1) C2a (-141178/97837 : 9201/97837 : 1)
** u= -72/119 ; C1 -41717*x^2 - 19345*y^2 + 26113*z^2
(21652/72699 : -78251/72699 : 1) C2a (-24608392/12770891 : -2468547/12770891 : 1)
** u= -72/121 ; C1 -43541*x^2 - 19825*y^2 + 26881*z^2
(-7628/11493 : -7163/11493 : 1) C2a (30326/29693 : -14427/148465 : 1)
** u= -72/131 ; C1 -53261*x^2 - 22345*y^2 + 30841*z^2
(-72/203 : 211/203 : 1) C2a (499714/1098069 : -35159/1098069 : 1)
** u= -72/185 ; C1 -123029*x^2 - 39409*y^2 + 55681*z^2
(34860/52181 : 7307/52181 : 1) C2a (-404054/1945831 : 51891/1945831 : 1)
** u= -72/187 ; C1 -126173*x^2 - 40153*y^2 + 56713*z^2
(-45033/67213 : 2870/67213 : 1) C2a (3543172/1206051 : 372011/1206051 : 1)
** u= -72/203 ; C1 -152765*x^2 - 46393*y^2 + 65257*z^2
(3056/16827 : 19171/16827 : 1) C2a (79198/1569279 : -38363/1569279 : 1)
** u= -72/205 ; C1 -156269*x^2 - 47209*y^2 + 66361*z^2
(-17220/36037 : 29051/36037 : 1) C2a (-7343362/4008015 : -774331/4008015 : 1)
** u= -72/257 ; C1 -261413*x^2 - 71233*y^2 + 97873*z^2
(21295/91659 : 99394/91659 : 1) C2a (-268438/25545 : 27773/25545 : 1)
** u= -72/323 ; C1 -433805*x^2 - 109513*y^2 + 145657*z^2
(-39223/76989 : 42302/76989 : 1) C2a (-16948/20409 : -1937/20409 : 1)
** u= -72/359 ; C1 -546197*x^2 - 134065*y^2 + 175393*z^2
(39212/85539 : 57517/85539 : 1) C2a (-172634/322117 : -22809/322117 : 1)
** u= -71/39 ; C1 -1570*x^2 - 6562*y^2 + 2018*z^2
(23/103 : -56/103 : 1) C2a (-269309/18205 : -13107/18205 : 1)
** u= -71/263 ; C1 -276194*x^2 - 74210*y^2 + 101474*z^2
(-195204/398291 : 274043/398291 : 1) C2a (9400701/523001 : -969937/523001 : 1)
** u= -71/335 ; C1 -471026*x^2 - 117266*y^2 + 154754*z^2
(-34388/117995 : 116721/117995 : 1) C2a (536553/160475 : 54841/160475 : 1)
** u= -71/343 ; C1 -495874*x^2 - 122690*y^2 + 161314*z^2
(1177/2543 : 1704/2543 : 1) C2a (171173/117677 : -18107/117677 : 1)
** u= -71/391 ; C1 -658402*x^2 - 157922*y^2 + 203362*z^2
(-2164/10671 : 3168095/2998551 : 1) C2a (-6749/3025 : 194129/850025 : 1)
** u= -70/53 ; C1 -4105*x^2 + 7709*y^2 + 5329*z^2
(73/357 : 292/357 : 1) C2b (10129/26499 : 23/363 : 1)
** u= -70/67 ; C1 -8585*x^2 + 9389*y^2 + 8969*z^2
(-207/271 : -176/271 : 1) C2b (-14387/73627 : 4523/73627 : 1)
** u= -70/79 ; C1 -13985*x^2 + 11141*y^2 + 12401*z^2
(99/683 : -712/683 : 1) C2b (541633/869995 : -5291/869995 : 1)
** u= -70/81 ; C1 -15025*x^2 + 11461*y^2 + 13001*z^2
(-2549/4025 : -628/805 : 1) C2b (4667/18745 : 981/18745 : 1)
** u= -70/99 ; C1 -26185*x^2 + 14701*y^2 + 18761*z^2
(4295/5119 : 764/5119 : 1) C2b (1853/5397 : 187/5397 : 1)
** u= -70/107 ; C1 -32185*x^2 + 16349*y^2 + 21529*z^2
(-7/4887 : -5608/4887 : 1) C2b (-27357/64187 : -773/64187 : 1)
** u= -70/121 ; C1 -44225*x^2 + 19541*y^2 + 26681*z^2
(1638/3347 : -3037/3347 : 1) C2b (34973/232025 : -8011/232025 : 1)
** u= -70/123 ; C1 -46105*x^2 + 20029*y^2 + 27449*z^2
(21754/29077 : 8327/29077 : 1) C2b (103601/295085 : -1947/295085 : 1)
** u= -70/141 ; C1 -64825*x^2 + 24781*y^2 + 34721*z^2
(287/1613 : -1852/1613 : 1) C2b (-115913/450997 : -2343/450997 : 1)
** u= -69/77 ; C1 {+/-} -13154*x^2 + 10690*y^2 + 11794*z^2
(-312/4313 : -4517/4313 : 1) C2a (151357/31927 : 13899/31927 : 1) C2b (3706/6091 : 99/6091 : 1)
** u= -69/125 ; C1 -48386*x^2 - 20386*y^2 + 28114*z^2
(-399/1565 : 1732/1565 : 1) C2a (608893/977367 : 53053/977367 : 1)
** u= -69/221 ; C1 -187970*x^2 - 53602*y^2 + 74578*z^2
(-2345/254949 : -300692/254949 : 1) C2a (250289/12915 : -3721/1845 : 1)
** u= -69/293 ; C1 -353138*x^2 - 90610*y^2 + 121522*z^2
(146011/250077 : -28028/250077 : 1) C2a (1396223/906641 : 147585/906641 : 1)
** u= -69/325 ; C1 -443186*x^2 - 110386*y^2 + 145714*z^2
(59128/132105 : -94871/132105 : 1) C2a (69851/227211 : -12331/227211 : 1)
** u= -68/33 ; C1 -1093*x^2 - 5713*y^2 + 953*z^2
(-2065/2311 : -274/2311 : 1) C2a (1372596/73757 : -49153/73757 : 1)
** u= -68/35 ; C1 -1229*x^2 - 5849*y^2 + 1361*z^2
(-1745/1697 : -174/1697 : 1) C2a (10122/1355 : -419/1355 : 1)
** u= -68/41 ; C1 -1877*x^2 - 6305*y^2 + 2633*z^2
(852/1069 : 511/1069 : 1) C2a (-1088916/370193 : 55973/370193 : 1)
** u= -68/55 ; C1 -4789*x^2 - 7649*y^2 + 5881*z^2
(-5480/4963 : 369/4963 : 1) C2a (47566/1925 : 3677/1925 : 1)
** u= -68/89 ; C1 -20021*x^2 - 12545*y^2 + 15401*z^2
(-1448/1697 : 435/1697 : 1) C2a (7708388/229233 : 753349/229233 : 1)
** u= -68/159 ; C1 -87781*x^2 - 29905*y^2 + 42281*z^2
(-7604/11311 : 3341/11311 : 1) C2a (768534/5296829 : 54485/5296829 : 1)
** u= -68/171 ; C1 -104317*x^2 - 33865*y^2 + 47873*z^2
(-12796/74947 : 86233/74947 : 1) C2a (-68706/838103 : 1817/119729 : 1)
** u= -68/177 ; C1 -113125*x^2 - 35953*y^2 + 50777*z^2
(200104/664285 : -141029/132857 : 1) C2a (-316/2297 : -51/2297 : 1)
** u= -68/209 ; C1 -166181*x^2 - 48305*y^2 + 67481*z^2
(-3348/7957 : 7063/7957 : 1) C2a (16783424/3529959 : -1752989/3529959 : 1)
** u= -68/229 ; C1 -204541*x^2 - 57065*y^2 + 78961*z^2
(-25852/63897 : 57043/63897 : 1) C2a (93896/264421 : 47/941 : 1)
** u= -68/265 ; C1 -283669*x^2 - 74849*y^2 + 101641*z^2
(-1805/6571 : -197298/190559 : 1) C2a (-5444/57841 : 67729/1677389 : 1)
** u= -68/275 ; C1 -307949*x^2 - 80249*y^2 + 108401*z^2
(-77732/146051 : -75015/146051 : 1) C2a (-18857394/14276995 : 2017477/14276995 : 1)
** u= -68/279 ; C1 -317941*x^2 - 82465*y^2 + 111161*z^2
(-31564/60131 : 32137/60131 : 1) C2a (17664342/1318987 : 1810003/1318987 : 1)
** u= -68/285 ; C1 -333229*x^2 - 85849*y^2 + 115361*z^2
(224/517 : -118805/151481 : 1) C2a (-20196/11615 : 621319/3403195 : 1)
** u= -68/313 ; C1 -409333*x^2 - 102593*y^2 + 135913*z^2
(27764/107281 : -110325/107281 : 1) C2a (16938916/74642615 : -3699709/74642615 : 1)
** u= -68/317 ; C1 -420845*x^2 - 105113*y^2 + 138977*z^2
(-7079/21007 : 19566/21007 : 1) C2a (176/423 : -6643/108711 : 1)
** u= -68/327 ; C1 -450325*x^2 - 111553*y^2 + 146777*z^2
(-8116/18475 : -2707/3695 : 1) C2a (-306174/58525 : -31093/58525 : 1)
** u= -67/83 ; C1 {+/-} -16690*x^2 + 11378*y^2 + 13522*z^2
(-272/7967 : -8679/7967 : 1) C2a (339437/473191 : 19943/473191 : 1) C2b (12666/23347 : 377/23347 : 1)
** u= -67/91 ; C1 {+/-} -21506*x^2 + 12770*y^2 + 15986*z^2
(527/6667 : -7428/6667 : 1) C2a (539453/17913 : -53237/17913 : 1) C2b (-1334/17879 : -895/17879 : 1)
** u= -67/147 ; C1 {+/-} -73138*x^2 + 26098*y^2 + 36818*z^2
(-3460/26827 : -31333/26827 : 1) C2a (106817/553751 : -2721/553751 : 1) C2b (-8896/144297 : 2671/144297 : 1)
** u= -67/315 ; C1 -416194*x^2 - 103714*y^2 + 136946*z^2
(-22436/39863 : 8845/39863 : 1) C2a (-27111/67351 : 4061/67351 : 1)
** u= -67/339 ; C1 -488242*x^2 - 119410*y^2 + 155858*z^2
(144688/258151 : -37231/258151 : 1) C2a (576857/342979 : 60243/342979 : 1)
** u= -66/29 ; C1 -905*x^2 + 5197*y^2 + 313*z^2
(46/2271 : -557/2271 : 1) C2b (7519/47753 : 3537/47753 : 1)
** u= -66/43 ; C1 -2249*x^2 + 6205*y^2 + 3169*z^2
(-20206/22509 : -10525/22509 : 1) C2b (61019/68489 : -3045/68489 : 1)
** u= -66/49 ; C1 -3425*x^2 + 6757*y^2 + 4513*z^2
(6033/5905 : -440/1181 : 1) C2b (-2931/3995 : 181/3995 : 1)
** u= -66/155 ; C1 -83561*x^2 + 28381*y^2 + 40129*z^2
(21273/33619 : -16300/33619 : 1) C2b (-62543/690475 : -2943/690475 : 1)
** u= -66/157 ; C1 -86153*x^2 + 29005*y^2 + 41017*z^2
(-223867/334101 : 94820/334101 : 1) C2b (-27927/788711 : 5233/788711 : 1)
** u= -65/57 ; C1 -5650*x^2 - 7474*y^2 + 6434*z^2
(8243/7825 : 232/1565 : 1) C2a (-140961/143105 : 6611/143105 : 1)
** u= -65/73 ; C1 -11890*x^2 + 9554*y^2 + 10594*z^2
(199/213 : -32/213 : 1) C2b (45194/84309 : -2579/84309 : 1)
** u= -65/113 ; C1 -38690*x^2 - 16994*y^2 + 23234*z^2
(-16/2789 : -3261/2789 : 1) C2a (-96119/73539 : 9523/73539 : 1)
** u= -65/177 ; C1 -114850*x^2 - 35554*y^2 + 50114*z^2
(-6632/83885 : 19775/16777 : 1) C2a (1299/3095 : 151/3095 : 1)
** u= -65/337 ; C1 -484450*x^2 - 117794*y^2 + 153154*z^2
(256/17445 : 3977/3489 : 1) C2a (-116311/69881 : -12143/69881 : 1)
** u= -64/27 ; C1 -829*x^2 - 4825*y^2 + 89*z^2
(109/1193 : -778/5965 : 1) C2a (2916/329 : -25/329 : 1)
** u= -64/61 ; C1 -7085*x^2 - 7817*y^2 + 7433*z^2
(195/503 : -454/503 : 1) C2a (156534/135955 : 10297/135955 : 1)
** u= -64/81 ; C1 -16165*x^2 - 10657*y^2 + 12833*z^2
(-12776/41657 : -42919/41657 : 1) C2a (-300088/320539 : -23397/320539 : 1)
** u= -64/151 ; C1 -79445*x^2 - 26897*y^2 + 38033*z^2
(99/217 : 194/217 : 1) C2a (9734/1503 : -1021/1503 : 1)
** u= -64/165 ; C1 -97981*x^2 - 31321*y^2 + 44249*z^2
(-21305/51499 : -48238/51499 : 1) C2a (-849086/3056735 : -101283/3056735 : 1)
** u= -64/189 ; C1 -134317*x^2 - 39817*y^2 + 55817*z^2
(-10964/20945 : 14473/20945 : 1) C2a (5602/183161 : 4971/183161 : 1)
** u= -64/195 ; C1 -144301*x^2 - 42121*y^2 + 58889*z^2
(58321/91885 : 12302/91885 : 1) C2a (1207554/1418419 : -132409/1418419 : 1)
** u= -64/197 ; C1 -147709*x^2 - 42905*y^2 + 59929*z^2
(15352/82197 : -92875/82197 : 1) C2a (21926/10069 : -2305/10069 : 1)
** u= -64/209 ; C1 -168997*x^2 - 47777*y^2 + 66337*z^2
(-182680/426889 : 367401/426889 : 1) C2a (95264/620845 : -22381/620845 : 1)
** u= -64/245 ; C1 -241501*x^2 - 64121*y^2 + 87289*z^2
(-66392/136201 : -7155/10477 : 1) C2a (-160621186/31393489 : -16576589/31393489 : 1)
** u= -64/257 ; C1 -268549*x^2 - 70145*y^2 + 94849*z^2
(272/86317 : -100371/86317 : 1) C2a (893746/2646211 : 140329/2646211 : 1)
** u= -64/301 ; C1 -380045*x^2 - 94697*y^2 + 125033*z^2
(-128952/226433 : 31009/226433 : 1) C2a (-187422/2740885 : -123169/2740885 : 1)
** u= -64/305 ; C1 -391141*x^2 - 97121*y^2 + 127969*z^2
(-116336/209425 : 57297/209425 : 1) C2a (421604/634571 : -51259/634571 : 1)
** u= -64/307 ; C1 -396749*x^2 - 98345*y^2 + 129449*z^2
(141291/326641 : 244750/326641 : 1) C2a (343762/5404053 : 244895/5404053 : 1)
** u= -63/55 ; C1 -5234*x^2 + 6994*y^2 + 5986*z^2
(485/2247 : -2036/2247 : 1) C2b (-34422/80677 : -4541/80677 : 1)
** u= -63/71 ; C1 -11282*x^2 - 9010*y^2 + 10018*z^2
(-24504/26227 : -3599/26227 : 1) C2a (-189727/273951 : 7501/273951 : 1)
** u= -63/79 ; C1 -15266*x^2 + 10210*y^2 + 12226*z^2
(4901/6051 : 2816/6051 : 1) C2b (-35322/67703 : -1339/67703 : 1)
** u= -63/311 ; C1 -409202*x^2 - 100690*y^2 + 131938*z^2
(11668/29151 : 23669/29151 : 1) C2a (777733/1676071 : 109467/1676071 : 1)
** u= -62/37 ; C1 -1513*x^2 + 5213*y^2 + 2113*z^2
(-142/175 : 81/175 : 1) C2b (4239/17647 : 1259/17647 : 1)
** u= -62/49 ; C1 -3697*x^2 + 6245*y^2 + 4633*z^2
(-11854/10747 : -1581/10747 : 1) C2b (9059/40893 : -2713/40893 : 1)
** u= -62/57 ; C1 -5953*x^2 + 7093*y^2 + 6473*z^2
(7718/14635 : -12061/14635 : 1) C2b (60319/80875 : 1287/80875 : 1)
** u= -62/141 ; C1 -68281*x^2 + 23725*y^2 + 33521*z^2
(-9605/15833 : -47084/79165 : 1) C2b (-53113/692397 : -9097/692397 : 1)
** u= -61/77 ; C1 {+/-} -14578*x^2 + 9650*y^2 + 11602*z^2
(752/909 : 373/909 : 1) C2a (-2881/5173 : -11/5173 : 1) C2b (11744/23349 : -2689/116745 : 1)
** u= -61/149 ; C1 -78370*x^2 - 25922*y^2 + 36658*z^2
(5300/82201 : -97317/82201 : 1) C2a (-260573/2065915 : -30671/2065915 : 1)
** u= -61/349 ; C1 -527570*x^2 - 125522*y^2 + 160658*z^2
(25153/130993 : 138936/130993 : 1) C2a (50145721/12884445 : -5043317/12884445 : 1)
** u= -61/373 ; C1 -608354*x^2 - 142850*y^2 + 180914*z^2
(-6800/17237 : -66963/86185 : 1) C2a (-400863/773585 : 16241/227525 : 1)
** u= -60/37 ; C1 -1565*x^2 - 4969*y^2 + 2209*z^2
(-188/1629 : -1081/1629 : 1) C2a (-2992/1457 : 3/31 : 1)
** u= -60/67 ; C1 -9965*x^2 - 8089*y^2 + 8929*z^2
(504/551 : 149/551 : 1) C2a (602042/395517 : 50749/395517 : 1)
** u= -60/109 ; C1 -36845*x^2 - 15481*y^2 + 21361*z^2
(-19236/44897 : 43597/44897 : 1) C2a (-272312/798633 : -5189/798633 : 1)
** u= -60/119 ; C1 -45845*x^2 - 17761*y^2 + 24841*z^2
(4021/5469 : 314/5469 : 1) C2a (89596/260799 : 5653/260799 : 1)
** u= -60/149 ; C1 -78845*x^2 - 25801*y^2 + 36481*z^2
(10123/15051 : -2674/15051 : 1) C2a (6008/153373 : 9/803 : 1)
** u= -60/161 ; C1 -94565*x^2 - 29521*y^2 + 41641*z^2
(-760/7041 : 8251/7041 : 1) C2a (64666/550125 : -12869/550125 : 1)
** u= -60/191 ; C1 -140165*x^2 - 40081*y^2 + 55801*z^2
(-42981/83453 : -3346/4909 : 1) C2a (1594988/3326507 : -195609/3326507 : 1)
** u= -60/197 ; C1 -150365*x^2 - 42409*y^2 + 58849*z^2
(-38185/75207 : 51758/75207 : 1) C2a (-472624/245889 : 7109/35127 : 1)
** u= -60/331 ; C1 -471965*x^2 - 113161*y^2 + 145681*z^2
(97763/254997 : -209398/254997 : 1) C2a (-440450828/102790725 : -44357927/102790725 : 1)
** u= -60/371 ; C1 -602765*x^2 - 141241*y^2 + 178561*z^2
(-105947/314733 : 278078/314733 : 1) C2a (603224/2346369 : -130987/2346369 : 1)
** u= -59/115 ; C1 {+/-} -42466*x^2 + 16706*y^2 + 23314*z^2
(4057/7859 : 6660/7859 : 1) C2a (72469/184699 : -5161/184699 : 1) C2b (-67688/692733 : -19439/692733 : 1)
** u= -59/179 ; C1 -121442*x^2 - 35522*y^2 + 49682*z^2
(13080/30623 : 26957/30623 : 1) C2a (609057/722345 : 66803/722345 : 1)
** u= -59/203 ; C1 -161618*x^2 - 44690*y^2 + 61682*z^2
(-3168219/5203747 : -1036664/5203747 : 1) C2a (-7541799/190397 : -781651/190397 : 1)
** u= -59/355 ; C1 -549826*x^2 - 129506*y^2 + 164434*z^2
(27641/95603 : 91440/95603 : 1) C2a (143129/55025 : 14483/55025 : 1)
** u= -59/395 ; C1 -690386*x^2 - 159506*y^2 + 199154*z^2
(5416/75223 : 83295/75223 : 1) C2a (3459/50089 : -2569/50089 : 1)
** u= -58/31 ; C1 -977*x^2 + 4325*y^2 + 1193*z^2
(-315/319 : 376/1595 : 1) C2b (-53177/42409 : 1907/42409 : 1)
** u= -58/49 ; C1 -4001*x^2 + 5765*y^2 + 4721*z^2
(-2234/2531 : 1335/2531 : 1) C2b (13141/2118071 : 141865/2118071 : 1)
** u= -58/61 ; C1 -7817*x^2 + 7085*y^2 + 7433*z^2
(-2131/51853 : 53064/51853 : 1) C2b (-82417/130261 : -2675/130261 : 1)
** u= -58/81 ; C1 -17377*x^2 + 9925*y^2 + 12593*z^2
(-1610/2959 : -12817/14795 : 1) C2b (5899/26985 : 853/19275 : 1)
** u= -58/99 ; C1 -29401*x^2 + 13165*y^2 + 17921*z^2
(-4373/7343 : 5540/7343 : 1) C2b (-22477/72873 : -1603/72873 : 1)
** u= -58/115 ; C1 -42809*x^2 + 16589*y^2 + 23201*z^2
(-8771/104687 : 123000/104687 : 1) C2b (25027/212213 : -5471/212213 : 1)
** u= -57/97 ; C1 -28178*x^2 + 12658*y^2 + 17218*z^2
(-7233/11437 : -7840/11437 : 1) C2b (26922/241621 : -8957/241621 : 1)
** u= -57/121 ; C1 {+/-} -48866*x^2 + 17890*y^2 + 25186*z^2
(1589/3669 : -3472/3669 : 1) C2a (-3911/16191 : 25/2313 : 1) C2b (-504/12079 : -271/12079 : 1)
** u= -57/305 ; C1 -398834*x^2 - 96274*y^2 + 124546*z^2
(-12185/46869 : -47188/46869 : 1) C2a (7221581/3741405 : -745753/3741405 : 1)
** u= -56/31 ; C1 -997*x^2 - 4097*y^2 + 1297*z^2
(4/471 : 265/471 : 1) C2a (10756388/1394699 : -524029/1394699 : 1)
** u= -56/75 ; C1 -14461*x^2 - 8761*y^2 + 10889*z^2
(-8533/10105 : 2594/10105 : 1) C2a (37008/2717 : 3637/2717 : 1)
** u= -56/121 ; C1 -49237*x^2 - 17777*y^2 + 25057*z^2
(-49273/69075 : -974/69075 : 1) C2a (-13946/28207 : 1333/28207 : 1)
** u= -56/137 ; C1 -66293*x^2 - 21905*y^2 + 30977*z^2
(11568/23921 : -20105/23921 : 1) C2a (1496/21717 : -221/21717 : 1)
** u= -56/141 ; C1 -70957*x^2 - 23017*y^2 + 32537*z^2
(-7300/40477 : 46387/40477 : 1) C2a (-932/241669 : -3069/241669 : 1)
** u= -56/157 ; C1 -91213*x^2 - 27785*y^2 + 39097*z^2
(2393/3699 : -674/3699 : 1) C2a (552968/1318271 : -65609/1318271 : 1)
** u= -56/165 ; C1 -102301*x^2 - 30361*y^2 + 42569*z^2
(-15001/86627 : -98810/86627 : 1) C2a (-18426/40735 : -2213/40735 : 1)
** u= -56/167 ; C1 -105173*x^2 - 31025*y^2 + 43457*z^2
(-7204/57319 : 332643/286595 : 1) C2a (502956/780809 : -283723/3904045 : 1)
** u= -56/181 ; C1 -126397*x^2 - 35897*y^2 + 49897*z^2
(43796/116121 : 109495/116121 : 1) C2a (-30922/131951 : 5291/131951 : 1)
** u= -56/183 ; C1 -129589*x^2 - 36625*y^2 + 50849*z^2
(-31289/107821 : -562946/539105 : 1) C2a (58078/83483 : -33069/417415 : 1)
** u= -56/187 ; C1 -136093*x^2 - 38105*y^2 + 52777*z^2
(26269/340033 : 397086/340033 : 1) C2a (455864/1327073 : -64793/1327073 : 1)
** u= -56/201 ; C1 -160117*x^2 - 43537*y^2 + 59777*z^2
(15203/25855 : 8234/25855 : 1) C2a (-33210764/3078665 : 149337/133855 : 1)
** u= -56/225 ; C1 -205861*x^2 - 53761*y^2 + 72689*z^2
(159568/410905 : 361649/410905 : 1) C2a (2382826/690491 : 245991/690491 : 1)
** u= -56/241 ; C1 -239557*x^2 - 61217*y^2 + 81937*z^2
(105005/192879 : 81526/192879 : 1) C2a (575984/1209517 : -77813/1209517 : 1)
** u= -56/249 ; C1 -257365*x^2 - 65137*y^2 + 86753*z^2
(106025/204083 : -105146/204083 : 1) C2a (-3425516/3773563 : -384669/3773563 : 1)
** u= -56/265 ; C1 -294901*x^2 - 73361*y^2 + 96769*z^2
(142975/516939 : -519922/516939 : 1) C2a (164858/20117 : 16727/20117 : 1)
** u= -56/269 ; C1 -304685*x^2 - 75497*y^2 + 99353*z^2
(-3879/20867 : 22634/20867 : 1) C2a (-2536358/1152675 : -261839/1152675 : 1)
** u= -56/279 ; C1 -329845*x^2 - 80977*y^2 + 105953*z^2
(-102991/183541 : 29518/183541 : 1) C2a (1072588/129089 : 108393/129089 : 1)
** u= -56/283 ; C1 -340189*x^2 - 83225*y^2 + 108649*z^2
(104111/262805 : 1070742/1314025 : 1) C2a (-3386018/1611695 : 1746247/8058475 : 1)
** u= -56/295 ; C1 -372181*x^2 - 90161*y^2 + 116929*z^2
(597044/1081427 : -212685/1081427 : 1) C2a (1785788/2067043 : -203867/2067043 : 1)
** u= -56/325 ; C1 -458461*x^2 - 108761*y^2 + 138889*z^2
(-172109/314463 : -37630/314463 : 1) C2a (-22444378/75287 : 2237453/75287 : 1)
** u= -56/355 ; C1 -553741*x^2 - 129161*y^2 + 162649*z^2
(64088/175135 : -144969/175135 : 1) C2a (310153936/58816949 : -30844109/58816949 : 1)
** u= -56/379 ; C1 -636445*x^2 - 146777*y^2 + 182953*z^2
(-128639/503877 : 494686/503877 : 1) C2a (45733178/5880289 : -4514197/5880289 : 1)
** u= -56/393 ; C1 -687349*x^2 - 157585*y^2 + 195329*z^2
(-579008/1107997 : -243755/1107997 : 1) C2a (4300148/467627 : 423021/467627 : 1)
** u= -55/111 ; C1 -40210*x^2 + 15346*y^2 + 21506*z^2
(10087/14059 : 3224/14059 : 1) C2b (-2824/10895 : -27/10895 : 1)
** u= -55/287 ; C1 -351730*x^2 - 85394*y^2 + 110914*z^2
(-85676/306843 : -303407/306843 : 1) C2a (-3230803/3815953 : -370411/3815953 : 1)
** u= -54/23 ; C1 -593*x^2 + 3445*y^2 + 97*z^2
(153/1711 : 280/1711 : 1) C2b (-1267/809 : 57/809 : 1)
** u= -54/25 ; C1 -641*x^2 + 3541*y^2 + 409*z^2
(-939/1177 : 20/1177 : 1) C2b (-57/1067 : -79/1067 : 1)
** u= -54/43 ; C1 -2873*x^2 + 4765*y^2 + 3577*z^2
(-882/949 : 35/73 : 1) C2b (-80599/120337 : -777/17191 : 1)
** u= -54/61 ; C1 -8345*x^2 + 6637*y^2 + 7393*z^2
(198/4003 : 4219/4003 : 1) C2b (-39323/88291 : 3609/88291 : 1)
** u= -53/101 ; C1 {+/-} -32402*x^2 + 13010*y^2 + 18098*z^2
(-12239/23657 : -20136/23657 : 1) C2a (64653/40159 : -6607/40159 : 1) C2b (-1645766/7117823 : -144547/7117823 : 1)
** u= -53/125 ; C1 -54434*x^2 + 18434*y^2 + 26066*z^2
(861/1273 : -320/1273 : 1) C2b (749176/9815095 : -51469/9815095 : 1)
** u= -53/269 ; C1 -307586*x^2 - 75170*y^2 + 98066*z^2
(-31676/56749 : 9783/56749 : 1) C2a (-185113/115527 : 19397/115527 : 1)
** u= -53/317 ; C1 -438050*x^2 - 103298*y^2 + 131282*z^2
(3903/7181 : 968/7181 : 1) C2a (4296667/11704629 : 716423/11704629 : 1)
** u= -53/389 ; C1 -676946*x^2 - 154130*y^2 + 189746*z^2
(-28956/161509 : -168613/161509 : 1) C2a (3403461/2324641 : -354415/2324641 : 1)
** u= -53/397 ; C1 -706690*x^2 - 160418*y^2 + 196882*z^2
(305564/579141 : -17983/579141 : 1) C2a (82499/154595 : -233/3155 : 1)
** u= -52/25 ; C1 -629*x^2 - 3329*y^2 + 521*z^2
(183/335 : 106/335 : 1) C2a (-1301298/400177 : 34447/400177 : 1)
** u= -52/31 ; C1 -1061*x^2 - 3665*y^2 + 1481*z^2
(39/121 : -74/121 : 1) C2a (10634/6849 : -329/6849 : 1)
** u= -52/125 ; C1 -54829*x^2 - 18329*y^2 + 25921*z^2
(-1288/11125 : 13041/11125 : 1) C2a (39286/674429 : 19/4189 : 1)
** u= -52/161 ; C1 -98821*x^2 - 28625*y^2 + 39961*z^2
(-18707/33403 : -93474/167015 : 1) C2a (1714/63749 : 9497/318745 : 1)
** u= -52/187 ; C1 -138653*x^2 - 37673*y^2 + 51713*z^2
(-14400/23651 : 2159/23651 : 1) C2a (-54162/19121 : 5641/19121 : 1)
** u= -52/203 ; C1 -166525*x^2 - 43913*y^2 + 59617*z^2
(7633/25905 : 5254/5181 : 1) C2a (-30464/578387 : -22921/578387 : 1)
** u= -52/319 ; C1 -445157*x^2 - 104465*y^2 + 132233*z^2
(-3392/39991 : -44445/39991 : 1) C2a (-336726/819413 : 52579/819413 : 1)
** u= -52/329 ; C1 -475477*x^2 - 110945*y^2 + 139753*z^2
(-4259/22987 : 24246/22987 : 1) C2a (-3475054/5194357 : 431125/5194357 : 1)
** u= -52/343 ; C1 -519605*x^2 - 120353*y^2 + 150617*z^2
(9399/23801 : 18098/23801 : 1) C2a (3256734/1623587 : -331739/1623587 : 1)
** u= -52/353 ; C1 -552325*x^2 - 127313*y^2 + 158617*z^2
(-11443/26475 : 3494/5295 : 1) C2a (943346/1288325 : -113797/1288325 : 1)
** u= -51/275 ; C1 -324626*x^2 - 78226*y^2 + 101074*z^2
(17079/31175 : -232/1075 : 1) C2a (83419/233361 : 13849/233361 : 1)
** u= -51/371 ; C1 -615122*x^2 - 140242*y^2 + 172882*z^2
(-149043/527923 : -496120/527923 : 1) C2a (-13543/36441 : 2311/36441 : 1)
** u= -50/21 ; C1 -505*x^2 + 2941*y^2 + 41*z^2
(-2/11 : 1/11 : 1) C2b (-42017/6107 : -117/6107 : 1)
** u= -50/83 ; C1 -20345*x^2 + 9389*y^2 + 12689*z^2
(38642/70721 : 59361/70721 : 1) C2b (34001/87385 : 467/87385 : 1)
** u= -50/103 ; C1 -34945*x^2 + 13109*y^2 + 18409*z^2
(-3661/11607 : -12388/11607 : 1) C2b (-140541/1234001 : -27829/1234001 : 1)
** u= -49/73 ; C1 {+/-} -14738*x^2 + 7730*y^2 + 10082*z^2
(-1491/6473 : 7100/6473 : 1) C2a (-50697/17821 : 71/251 : 1) C2b (24122/65249 : -25/919 : 1)
** u= -49/169 ; C1 -112082*x^2 - 30962*y^2 + 42722*z^2
(-1752/3157 : 1625/3157 : 1) C2a (893/4479 : 181/4479 : 1)
** u= -49/193 ; C1 -150818*x^2 - 39650*y^2 + 53762*z^2
(-492/833 : -709/4165 : 1) C2a (118477/296859 : -16909/296859 : 1)
** u= -49/257 ; C1 -282274*x^2 - 68450*y^2 + 88834*z^2
(-707/1261 : 9012/233285 : 1) C2a (-12463/1697 : 1255/1697 : 1)
** u= -49/297 ; C1 -385234*x^2 - 90610*y^2 + 114914*z^2
(-707/9473 : -10568/9473 : 1) C2a (1919083/5365433 : 326259/5365433 : 1)
** u= -49/321 ; C1 -454690*x^2 - 105442*y^2 + 132098*z^2
(-1666645/3119837 : -464656/3119837 : 1) C2a (4797501/1856825 : -1879/7225 : 1)
** u= -48/59 ; C1 -8381*x^2 - 5785*y^2 + 6841*z^2
(1548/2227 : 91/131 : 1) C2a (75364/68979 : 6157/68979 : 1)
** u= -48/89 ; C1 -24821*x^2 - 10225*y^2 + 14161*z^2
(2856/8765 : 46529/43825 : 1) C2a (-326630/226219 : -1389/9505 : 1)
** u= -48/91 ; C1 -26237*x^2 - 10585*y^2 + 14713*z^2
(1599/5293 : -5710/5293 : 1) C2a (-92152/14581 : -9573/14581 : 1)
** u= -48/143 ; C1 -77093*x^2 - 22753*y^2 + 31873*z^2
(32904/51295 : 4177/51295 : 1) C2a (3382/92145 : -2557/92145 : 1)
** u= -48/209 ; C1 -180581*x^2 - 45985*y^2 + 61441*z^2
(10068/92993 : 105623/92993 : 1) C2a (-286424/31461 : 29237/31461 : 1)
** u= -48/211 ; C1 -184397*x^2 - 46825*y^2 + 62473*z^2
(-38180/127503 : 631453/637515 : 1) C2a (-826268/612355 : 440817/3061775 : 1)
** u= -48/239 ; C1 -242021*x^2 - 59425*y^2 + 77761*z^2
(-2176/13803 : 75833/69015 : 1) C2a (-15074/137769 : 6475/137769 : 1)
** u= -48/349 ; C1 -544301*x^2 - 124105*y^2 + 153001*z^2
(-13944/70829 : -533/517 : 1) C2a (52762/75447 : -6485/75447 : 1)
** u= -47/111 ; C1 -42946*x^2 - 14530*y^2 + 20546*z^2
(-10268/14887 : 1327/14887 : 1) C2a (-1017/10993 : 31/10993 : 1)
** u= -47/191 ; C1 -148706*x^2 - 38690*y^2 + 52226*z^2
(-316121/1310639 : -1390920/1310639 : 1) C2a (349031/85659 : 35941/85659 : 1)
** u= -46/21 ; C1 -457*x^2 + 2557*y^2 + 257*z^2
(362/3475 : -1091/3475 : 1) C2b (10397/8481 : 557/8481 : 1)
** u= -46/31 ; C1 -1217*x^2 + 3077*y^2 + 1697*z^2
(75/1531 : 1136/1531 : 1) C2b (-125131/119285 : -2213/119285 : 1)
** u= -46/39 ; C1 -2545*x^2 + 3637*y^2 + 2993*z^2
(-1093/4859 : 4312/4859 : 1) C2b (8699/105497 : -7023/105497 : 1)
** u= -46/81 ; C1 -20017*x^2 + 8677*y^2 + 11897*z^2
(-6473/18437 : -19220/18437 : 1) C2b (2489779/14287173 : -457279/14287173 : 1)
** u= -46/83 ; C1 -21289*x^2 + 9005*y^2 + 12409*z^2
(-6022/8013 : 1657/8013 : 1) C2b (-1487/48333 : -1693/48333 : 1)
** u= -46/87 ; C1 -23953*x^2 + 9685*y^2 + 13457*z^2
(2566/4177 : -2821/4177 : 1) C2b (14111/48617 : 519/48617 : 1)
** u= -44/57 ; C1 -8149*x^2 - 5185*y^2 + 6329*z^2
(97/127 : -70/127 : 1) C2a (2622/683 : 253/683 : 1)
** u= -44/85 ; C1 -23101*x^2 - 9161*y^2 + 12769*z^2
(13673/24055 : 18306/24055 : 1) C2a (14116/1921 : -13/17 : 1)
** u= -44/105 ; C1 -38581*x^2 - 12961*y^2 + 18329*z^2
(14128/32525 : -30031/32525 : 1) C2a (55374/349529 : 5311/349529 : 1)
** u= -44/119 ; C1 -51797*x^2 - 16097*y^2 + 22697*z^2
(25185/38057 : 1082/38057 : 1) C2a (-35142/439795 : 9773/439795 : 1)
** u= -44/145 ; C1 -81541*x^2 - 22961*y^2 + 31849*z^2
(26573/42931 : 6990/42931 : 1) C2a (246004/550571 : -31279/550571 : 1)
** u= -44/225 ; C1 -215461*x^2 - 52561*y^2 + 68489*z^2
(88465/166943 : 65074/166943 : 1) C2a (-982346/60311 : -98961/60311 : 1)
** u= -44/233 ; C1 -232373*x^2 - 56225*y^2 + 72857*z^2
(13427/60659 : 63426/60659 : 1) C2a (-24536/3987 : 2471/3987 : 1)
** u= -44/243 ; C1 -254413*x^2 - 60985*y^2 + 78497*z^2
(-112468/357479 : 334243/357479 : 1) C2a (31138908/2381249 : 3118571/2381249 : 1)
** u= -44/247 ; C1 -263509*x^2 - 62945*y^2 + 80809*z^2
(9679/17529 : -1510/17529 : 1) C2a (-65272/425963 : 21479/425963 : 1)
** u= -44/251 ; C1 -272765*x^2 - 64937*y^2 + 83153*z^2
(-30800/141563 : 147231/141563 : 1) C2a (68404412/65657235 : 1075673/9379605 : 1)
** u= -44/301 ; C1 -401965*x^2 - 92537*y^2 + 115153*z^2
(2008/6101 : -5367/6101 : 1) C2a (-1155152/367585 : 115219/367585 : 1)
** u= -44/303 ; C1 -407653*x^2 - 93745*y^2 + 116537*z^2
(87133/188501 : 105626/188501 : 1) C2a (1304568/543511 : -131299/543511 : 1)
** u= -44/315 ; C1 -442621*x^2 - 101161*y^2 + 125009*z^2
(34460/68303 : -23861/68303 : 1) C2a (3551626/2956649 : 380391/2956649 : 1)
** u= -44/343 ; C1 -529813*x^2 - 119585*y^2 + 145897*z^2
(1264/39383 : 43419/39383 : 1) C2a (-256928/64499 : 25265/64499 : 1)
** u= -44/347 ; C1 -542909*x^2 - 122345*y^2 + 149009*z^2
(-466452/891103 : -40229/891103 : 1) C2a (-706332/819287 : -11611/117041 : 1)
** u= -44/369 ; C1 -617797*x^2 - 138097*y^2 + 166697*z^2
(5183/290383 : -318850/290383 : 1) C2a (-600078/80759 : 58321/80759 : 1)
** u= -43/35 ; C1 -1954*x^2 - 3074*y^2 + 2386*z^2
(-1432/1619 : -855/1619 : 1) C2a (-1361/355 : 103/355 : 1)
** u= -43/83 ; C1 {+/-} -22018*x^2 + 8738*y^2 + 12178*z^2
(97/427 : 480/427 : 1) C2a (-13/29 : 263/7453 : 1) C2b (6/103 : -793/26471 : 1)
** u= -43/139 ; C1 -74546*x^2 - 21170*y^2 + 29426*z^2
(28184/48859 : -22827/48859 : 1) C2a (1611/14959 : -505/14959 : 1)
** u= -42/55 ; C1 -7649*x^2 + 4789*y^2 + 5881*z^2
(-206/6405 : 7093/6405 : 1) C2b (-19737/121865 : -6067/121865 : 1)
** u= -42/61 ; C1 -10121*x^2 + 5485*y^2 + 7081*z^2
(2106/2671 : -1013/2671 : 1) C2b (-37777/224153 : -9927/224153 : 1)
** u= -42/71 ; C1 -15041*x^2 + 6805*y^2 + 9241*z^2
(2089/3939 : -260/303 : 1) C2b (20679/60011 : 1007/60011 : 1)
** u= -42/101 ; C1 -35801*x^2 + 11965*y^2 + 16921*z^2
(3813/10093 : 10028/10093 : 1) C2b (-1019/59591 : 207/59591 : 1)
** u= -41/129 ; C1 -63730*x^2 - 18322*y^2 + 25538*z^2
(-13673/21613 : 904/21613 : 1) C2a (7774869/8580655 : -7531/75935 : 1)
** u= -41/137 ; C1 -73058*x^2 - 20450*y^2 + 28322*z^2
(-2023/3785 : 11424/18925 : 1) C2a (-1937/16779 : 5/141 : 1)
** u= -41/337 ; C1 -514258*x^2 - 115250*y^2 + 139522*z^2
(38833/124061 : -109104/124061 : 1) C2a (1118723/187331 : 545221/936655 : 1)
** u= -41/385 ; C1 -679666*x^2 - 149906*y^2 + 178114*z^2
(25181/53553 : 23080/53553 : 1) C2a (-5964583/22183 : 573547/22183 : 1)
** u= -40/49 ; C1 -5765*x^2 - 4001*y^2 + 4721*z^2
(-88/4997 : 5427/4997 : 1) C2a (-8898/7595 : -743/7595 : 1)
** u= -40/107 ; C1 -41725*x^2 - 13049*y^2 + 18409*z^2
(-7148/11915 : -1215/2383 : 1) C2a (5758/36167 : 931/36167 : 1)
** u= -40/131 ; C1 -66445*x^2 - 18761*y^2 + 26041*z^2
(-21931/102281 : -113214/102281 : 1) C2a (22/835 : -6991/214595 : 1)
** u= -40/147 ; C1 -86125*x^2 - 23209*y^2 + 31769*z^2
(36523/112985 : 22382/22597 : 1) C2a (2530284/78361 : 261167/78361 : 1)
** u= -40/159 ; C1 -102565*x^2 - 26881*y^2 + 36401*z^2
(-33796/57923 : 13613/57923 : 1) C2a (-22812/94673 : -4439/94673 : 1)
** u= -40/181 ; C1 -136445*x^2 - 34361*y^2 + 45641*z^2
(12072/29513 : -24047/29513 : 1) C2a (912834/139949 : 93007/139949 : 1)
** u= -40/223 ; C1 -214565*x^2 - 51329*y^2 + 65969*z^2
(-39696/242023 : -262097/242023 : 1) C2a (-844764/4028801 : 210727/4028801 : 1)
** u= -40/257 ; C1 -290725*x^2 - 67649*y^2 + 85009*z^2
(-7628/18885 : -2815/3777 : 1) C2a (-4388924/4998835 : -501451/4998835 : 1)
** u= -40/329 ; C1 -490165*x^2 - 109841*y^2 + 132961*z^2
(41779/84159 : 28006/84159 : 1) C2a (-2568718/789083 : 252841/789083 : 1)
** u= -40/343 ; C1 -534965*x^2 - 119249*y^2 + 143489*z^2
(-19728/216551 : -233839/216551 : 1) C2a (4052732/5045517 : 476869/5045517 : 1)
** u= -39/311 ; C1 -436610*x^2 - 98242*y^2 + 119458*z^2
(-22035/50387 : -30484/50387 : 1) C2a (605867/10125 : 58939/10125 : 1)
** u= -38/21 ; C1 -457*x^2 + 1885*y^2 + 593*z^2
(94/83 : 5/83 : 1) C2b (-112997/188611 : 12633/188611 : 1)
** u= -38/35 ; C1 -2249*x^2 + 2669*y^2 + 2441*z^2
(-46/457 : -435/457 : 1) C2b (22171/60155 : 3419/60155 : 1)
** u= -38/85 ; C1 -24649*x^2 + 8669*y^2 + 12241*z^2
(-8470/25591 : 171/163 : 1) C2b (830211/6153265 : -62971/6153265 : 1)
** u= -37/357 ; C1 -585778*x^2 - 128818*y^2 + 152498*z^2
(-102961/201809 : 2720/201809 : 1) C2a (-114477/114355 : 12653/114355 : 1)
** u= -37/365 ; C1 -613474*x^2 - 134594*y^2 + 158866*z^2
(9628/70049 : -73275/70049 : 1) C2a (25187459/21634711 : -2691851/21634711 : 1)
** u= -36/43 ; C1 -4349*x^2 - 3145*y^2 + 3649*z^2
(308/1383 : -1445/1383 : 1) C2a (-578492/53043 : -54889/53043 : 1)
** u= -36/49 ; C1 -6245*x^2 - 3697*y^2 + 4633*z^2
(-1367/1599 : -218/1599 : 1) C2a (345832/246799 : 31797/246799 : 1)
** u= -36/125 ; C1 -61421*x^2 - 16921*y^2 + 23329*z^2
(8941/20715 : -17362/20715 : 1) C2a (8094094/453239 : 838551/453239 : 1)
** u= -36/161 ; C1 -107717*x^2 - 27217*y^2 + 36217*z^2
(43005/74299 : -5126/74299 : 1) C2a (-585328/985349 : -73191/985349 : 1)
** u= -36/211 ; C1 -193517*x^2 - 45817*y^2 + 58417*z^2
(72900/133639 : -18011/133639 : 1) C2a (1711631026/576578335 : 172801719/576578335 : 1)
** u= -36/253 ; C1 -284909*x^2 - 65305*y^2 + 80929*z^2
(47341/412491 : -448418/412491 : 1) C2a (-3998/187317 : 9653/187317 : 1)
** u= -36/293 ; C1 -388349*x^2 - 87145*y^2 + 105649*z^2
(-19371/62419 : 55238/62419 : 1) C2a (-398806/1727929 : -99801/1727929 : 1)
** u= -36/295 ; C1 -393941*x^2 - 88321*y^2 + 106969*z^2
(1935/4289 : 2362/4289 : 1) C2a (196586236/44688279 : -19233349/44688279 : 1)
** u= -36/319 ; C1 -464165*x^2 - 103057*y^2 + 123433*z^2
(119681/299313 : 206854/299313 : 1) C2a (386/315 : -10531/80955 : 1)
** u= -35/67 ; C1 -14290*x^2 - 5714*y^2 + 7954*z^2
(-26464/36391 : 9591/36391 : 1) C2a (-439/1361 : 17/1361 : 1)
** u= -35/219 ; C1 -210370*x^2 - 49186*y^2 + 62066*z^2
(-8813/29527 : 27712/29527 : 1) C2a (-40291/86519 : 5877/86519 : 1)
** u= -35/251 ; C1 -281090*x^2 - 64226*y^2 + 79346*z^2
(-19101/41399 : -22816/41399 : 1) C2a (4504641/175055 : 441781/175055 : 1)
** u= -35/291 ; C1 -383890*x^2 - 85906*y^2 + 103826*z^2
(33644/88787 : -66853/88787 : 1) C2a (5562313/1282745 : -543783/1282745 : 1)
** u= -34/43 ; C1 -4553*x^2 + 3005*y^2 + 3617*z^2
(-10011/18143 : -15632/18143 : 1) C2b (5299/36023 : 1867/36023 : 1)
** u= -34/77 ; C1 -20329*x^2 + 7085*y^2 + 10009*z^2
(-1822/3063 : -1931/3063 : 1) C2b (-19683/185137 : 2111/185137 : 1)
** u= -33/25 ; C1 -914*x^2 + 1714*y^2 + 1186*z^2
(280/261 : -73/261 : 1) C2b (14244/48745 : 3211/48745 : 1)
** u= -33/89 ; C1 -28946*x^2 - 9010*y^2 + 12706*z^2
(827/1257 : -176/1257 : 1) C2a (142667/128087 : -15171/128087 : 1)
** u= -32/25 ; C1 -949*x^2 - 1649*y^2 + 1201*z^2
(253540/312993 : -185351/312993 : 1) C2a (34412/36137 : 743/36137 : 1)
** u= -32/35 ; C1 -2669*x^2 - 2249*y^2 + 2441*z^2
(3376/3695 : -1137/3695 : 1) C2a (-31338/36575 : -1891/36575 : 1)
** u= -32/43 ; C1 -4765*x^2 - 2873*y^2 + 3577*z^2
(35/73 : -882/949 : 1) C2a (120448/33985 : -21781/63115 : 1)
** u= -32/79 ; C1 -22117*x^2 - 7265*y^2 + 10273*z^2
(-2921/5637 : 4354/5637 : 1) C2a (-3644/18997 : -421/18997 : 1)
** u= -32/89 ; C1 -29237*x^2 - 8945*y^2 + 12593*z^2
(196/377 : 21/29 : 1) C2a (-1298/771 : 137/771 : 1)
** u= -32/137 ; C1 -77333*x^2 - 19793*y^2 + 26513*z^2
(7672/13913 : -5415/13913 : 1) C2a (16942/127011 : -5609/127011 : 1)
** u= -32/149 ; C1 -92957*x^2 - 23225*y^2 + 30713*z^2
(-176/2389 : 13623/11945 : 1) C2a (-166724/211329 : -96587/1056645 : 1)
** u= -32/205 ; C1 -184909*x^2 - 43049*y^2 + 54121*z^2
(10916/32157 : -28075/32157 : 1) C2a (-1471372/441823 : -147217/441823 : 1)
** u= -32/213 ; C1 -200605*x^2 - 46393*y^2 + 57977*z^2
(-7904/22309 : -18757/22309 : 1) C2a (-2041412/1720871 : 219447/1720871 : 1)
** u= -32/219 ; C1 -212797*x^2 - 48985*y^2 + 60953*z^2
(21859/113593 : -118238/113593 : 1) C2a (123516/56483 : 12493/56483 : 1)
** u= -32/259 ; C1 -303277*x^2 - 68105*y^2 + 82633*z^2
(-10312/20851 : 7347/20851 : 1) C2a (-902/241 : 22765/61937 : 1)
** u= -32/263 ; C1 -313205*x^2 - 70193*y^2 + 84977*z^2
(20019/84809 : 83182/84809 : 1) C2a (168636/612685 : 36547/612685 : 1)
** u= -32/283 ; C1 -365245*x^2 - 81113*y^2 + 97177*z^2
(-1756/13831 : 14673/13831 : 1) C2a (-59348/7009 : -5743/7009 : 1)
** u= -32/285 ; C1 -370669*x^2 - 82249*y^2 + 98441*z^2
(-301840/587729 : -53263/587729 : 1) C2a (-1640178/2818333 : 4487/57517 : 1)
** u= -32/287 ; C1 -376133*x^2 - 83393*y^2 + 99713*z^2
(-112344/265151 : -164735/265151 : 1) C2a (-611688/614675 : 67763/614675 : 1)
** u= -32/361 ; C1 -606421*x^2 - 131345*y^2 + 152401*z^2
(-19841/141059 : -145842/141059 : 1) C2a (-504028/1017463 : -74503/1017463 : 1)
** u= -32/395 ; C1 -730589*x^2 - 157049*y^2 + 180281*z^2
(10440/135527 : -143449/135527 : 1) C2a (6404124/3689909 : -640421/3689909 : 1)
** u= -31/263 ; C1 -314194*x^2 - 70130*y^2 + 84514*z^2
(11276/34451 : 29337/34451 : 1) C2a (42407/58187 : 5159/58187 : 1)
** u= -31/271 ; C1 -334562*x^2 - 74402*y^2 + 89282*z^2
(29787/83027 : 160/203 : 1) C2a (5709971/327735 : -552071/327735 : 1)
** u= -31/311 ; C1 -446002*x^2 - 97682*y^2 + 115042*z^2
(505/1467 : 258688/324207 : 1) C2a (5479/10987 : -177197/2428127 : 1)
** u= -31/375 ; C1 -657586*x^2 - 141586*y^2 + 162914*z^2
(-4307/35855 : 37324/35855 : 1) C2a (-10042191/31412155 : -2014897/31412155 : 1)
** u= -30/13 ; C1 -185*x^2 + 1069*y^2 + 49*z^2
(-266/759 : 119/759 : 1) C2b (2973/763 : -1/109 : 1)
** u= -29/21 ; C1 {+/-} -610*x^2 + 1282*y^2 + 818*z^2
(-232/241 : -107/241 : 1) C2a (-36821/31273 : 1389/31273 : 1) C2b (-1514/1523 : 3/1523 : 1)
** u= -28/19 ; C1 -461*x^2 - 1145*y^2 + 641*z^2
(-17/233 : 174/233 : 1) C2a (-15364/8451 : -817/8451 : 1)
** u= -28/29 ; C1 -1741*x^2 - 1625*y^2 + 1681*z^2
(164/189 : 451/945 : 1) C2a (4786/4961 : -37/605 : 1)
** u= -28/31 ; C1 -2117*x^2 - 1745*y^2 + 1913*z^2
(-2541/3173 : -1790/3173 : 1) C2a (-14232/22261 : 73/22261 : 1)
** u= -28/61 ; C1 -12557*x^2 - 4505*y^2 + 6353*z^2
(-128/1009 : 1179/1009 : 1) C2a (-40806/200383 : 1289/200383 : 1)
** u= -28/87 ; C1 -28885*x^2 - 8353*y^2 + 11657*z^2
(3304/21923 : 25159/21923 : 1) C2a (167568/772949 : 28937/772949 : 1)
** u= -28/97 ; C1 -36965*x^2 - 10193*y^2 + 14057*z^2
(1252/2677 : -2049/2677 : 1) C2a (-118504/354843 : 17441/354843 : 1)
** u= -28/107 ; C1 -46045*x^2 - 12233*y^2 + 16657*z^2
(-21677/50373 : -41066/50373 : 1) C2a (1727288/3644885 : -226631/3644885 : 1)
** u= -28/113 ; C1 -51973*x^2 - 13553*y^2 + 18313*z^2
(-2633/12775 : -13926/12775 : 1) C2a (-77491034/197174743 : 11237663/197174743 : 1)
** u= -28/137 ; C1 -79285*x^2 - 19553*y^2 + 25657*z^2
(24845/47027 : -19974/47027 : 1) C2a (-68126/193357 : -11141/193357 : 1)
** u= -28/139 ; C1 -81821*x^2 - 20105*y^2 + 26321*z^2
(-1357/2677 : 1374/2677 : 1) C2a (7632/52987 : 2537/52987 : 1)
** u= -28/153 ; C1 -100693*x^2 - 24193*y^2 + 31193*z^2
(7837/14275 : -2666/14275 : 1) C2a (-27498476/2143943 : -2756373/2143943 : 1)
** u= -28/163 ; C1 -115373*x^2 - 27353*y^2 + 34913*z^2
(-8407/17873 : 10470/17873 : 1) C2a (8635786/613293 : -861197/613293 : 1)
** u= -28/197 ; C1 -172765*x^2 - 39593*y^2 + 49057*z^2
(-3016/6237 : -49583/106029 : 1) C2a (11596/15875 : 23831/269875 : 1)
** u= -28/219 ; C1 -216061*x^2 - 48745*y^2 + 59441*z^2
(-74257/377993 : -387026/377993 : 1) C2a (-49207458/3433457 : 4796977/3433457 : 1)
** u= -28/233 ; C1 -246133*x^2 - 55073*y^2 + 66553*z^2
(22964/72441 : 63125/72441 : 1) C2a (245978/78145 : -24217/78145 : 1)
** u= -28/235 ; C1 -250589*x^2 - 56009*y^2 + 67601*z^2
(-36756/70823 : 3085/70823 : 1) C2a (1532/46395 : 2489/46395 : 1)
** u= -28/261 ; C1 -312157*x^2 - 68905*y^2 + 81953*z^2
(17213/222451 : 239818/222451 : 1) C2a (-156624/82417 : -15725/82417 : 1)
** u= -28/291 ; C1 -391597*x^2 - 85465*y^2 + 100193*z^2
(-25603/53221 : 17806/53221 : 1) C2a (215874/914947 : 54787/914947 : 1)
** u= -28/317 ; C1 -467725*x^2 - 101273*y^2 + 117457*z^2
(17752/85089 : 83317/85089 : 1) C2a (242246/668245 : 43997/668245 : 1)
** u= -28/325 ; C1 -492509*x^2 - 106409*y^2 + 123041*z^2
(6493/21299 : 18150/21299 : 1) C2a (1272384/911441 : 131149/911441 : 1)
** u= -28/339 ; C1 -537421*x^2 - 115705*y^2 + 133121*z^2
(-311/115649 : -124046/115649 : 1) C2a (3449536/4258591 : 405675/4258591 : 1)
** u= -28/377 ; C1 -669205*x^2 - 142913*y^2 + 162457*z^2
(36553/237783 : -240866/237783 : 1) C2a (60386612/7069771 : -5694047/7069771 : 1)
** u= -28/381 ; C1 -683917*x^2 - 145945*y^2 + 165713*z^2
(-666604/1365577 : -3182789/23214809 : 1) C2a (80628/268081 : 17123/268081 : 1)
** u= -28/391 ; C1 -721397*x^2 - 153665*y^2 + 173993*z^2
(2684/343427 : 365391/343427 : 1) C2a (1062216/2313247 : 166085/2313247 : 1)
** u= -27/371 ; C1 -648866*x^2 - 138370*y^2 + 156946*z^2
(5539/11439 : -52/279 : 1) C2a (846583/164843 : -80097/164843 : 1)
** u= -26/33 ; C1 -2689*x^2 + 1765*y^2 + 2129*z^2
(-262/383 : -269/383 : 1) C2b (-84617/155513 : -1503/155513 : 1)
** u= -26/37 ; C1 -3673*x^2 + 2045*y^2 + 2617*z^2
(181/2157 : 2428/2157 : 1) C2b (431/2967 : -137/2967 : 1)
** u= -26/47 ; C1 -6833*x^2 + 2885*y^2 + 3977*z^2
(371/6967 : 8160/6967 : 1) C2b (29627/159059 : 4655/159059 : 1)
** u= -26/53 ; C1 -9209*x^2 + 3485*y^2 + 4889*z^2
(13629/18709 : 452/18709 : 1) C2b (60409/262979 : 2875/262979 : 1)
** u= -25/17 ; C1 {+/-} -370*x^2 + 914*y^2 + 514*z^2
(116/189 : -121/189 : 1) C2a (6823/257 : -451/257 : 1) C2b (-10388/10023 : 187/10023 : 1)
** u= -25/41 ; C1 -4930*x^2 + 2306*y^2 + 3106*z^2
(460/861 : -739/861 : 1) C2b (-318/2177 : 83/2177 : 1)
** u= -25/233 ; C1 -248770*x^2 - 54914*y^2 + 65314*z^2
(-7276/54221 : -57069/54221 : 1) C2a (-13381/14569 : -89/857 : 1)
** u= -25/289 ; C1 -389330*x^2 - 84146*y^2 + 97346*z^2
(-64677/541393 : 565448/541393 : 1) C2a (-442767/460223 : -49349/460223 : 1)
** u= -24/25 ; C1 -1301*x^2 - 1201*y^2 + 1249*z^2
(-165/487 : 466/487 : 1) C2a (106606/33255 : -9373/33255 : 1)
** u= -24/31 ; C1 -2405*x^2 - 1537*y^2 + 1873*z^2
(51/97 : -86/97 : 1) C2a (38/41 : -3/41 : 1)
** u= -24/77 ; C1 -22829*x^2 - 6505*y^2 + 9049*z^2
(-8772/20653 : -17981/20653 : 1) C2a (31468/81153 : -4153/81153 : 1)
** u= -24/89 ; C1 -31637*x^2 - 8497*y^2 + 11617*z^2
(-25008/41273 : 625/41273 : 1) C2a (104614/294123 : 15433/294123 : 1)
** u= -24/131 ; C1 -73805*x^2 - 17737*y^2 + 22873*z^2
(-25799/50589 : -23038/50589 : 1) C2a (10916/280387 : -13371/280387 : 1)
** u= -24/133 ; C1 -76253*x^2 - 18265*y^2 + 23497*z^2
(116512/282669 : -214747/282669 : 1) C2a (147632/934269 : -47045/934269 : 1)
** u= -24/179 ; C1 -143597*x^2 - 32617*y^2 + 40057*z^2
(-264/34271 : -37975/34271 : 1) C2a (-109996/154555 : -174807/2009215 : 1)
** u= -24/275 ; C1 -352301*x^2 - 76201*y^2 + 88249*z^2
(-12579/100465 : 104678/100465 : 1) C2a (2572622/962083 : -250143/962083 : 1)
** u= -24/299 ; C1 -418877*x^2 - 89977*y^2 + 103177*z^2
(-2665/5373 : 202/5373 : 1) C2a (55768984/3088645 : 5271171/3088645 : 1)
** u= -24/301 ; C1 -424685*x^2 - 91177*y^2 + 104473*z^2
(-49135/502011 : -526802/502011 : 1) C2a (447034/2555043 : -151121/2555043 : 1)
** u= -24/347 ; C1 -569309*x^2 - 120985*y^2 + 136489*z^2
(103132/210987 : 13045/210987 : 1) C2a (-853928/479067 : 84637/479067 : 1)
** u= -24/371 ; C1 -653165*x^2 - 138217*y^2 + 154873*z^2
(-1722860/4420827 : 2805701/4420827 : 1) C2a (-2084/11263 : 681/11263 : 1)
** u= -23/63 ; C1 -14578*x^2 - 4498*y^2 + 6338*z^2
(-3856/16579 : -18415/16579 : 1) C2a (-3291/1873 : 347/1873 : 1)
** u= -23/175 ; C1 -137554*x^2 - 31154*y^2 + 38146*z^2
(-23360/62883 : 49319/62883 : 1) C2a (-27703/246083 : -13193/246083 : 1)
** u= -23/191 ; C1 -165362*x^2 - 37010*y^2 + 44738*z^2
(16557/38239 : 23296/38239 : 1) C2a (70771/99627 : -8687/99627 : 1)
** u= -23/215 ; C1 -211874*x^2 - 46754*y^2 + 55586*z^2
(4663/14711 : -12600/14711 : 1) C2a (16301/41631 : 2761/41631 : 1)
** u= -23/271 ; C1 -342802*x^2 - 73970*y^2 + 85378*z^2
(5087/19459 : 17808/19459 : 1) C2a (65708683/11216081 : 6259571/11216081 : 1)
** u= -23/287 ; C1 -385970*x^2 - 82898*y^2 + 95042*z^2
(10268/79663 : -82371/79663 : 1) C2a (-72061927/2939715 : -6808799/2939715 : 1)
** u= -22/13 ; C1 -185*x^2 + 653*y^2 + 257*z^2
(-162/139 : -13/139 : 1) C2b (14903/14135 : 613/14135 : 1)
** u= -22/41 ; C1 -5281*x^2 + 2165*y^2 + 3001*z^2
(2419/3209 : -24/3209 : 1) C2b (20877/108397 : -2849/108397 : 1)
** u= -21/29 ; C1 {+/-} -2210*x^2 + 1282*y^2 + 1618*z^2
(-435/521 : 128/521 : 1) C2a (1811897/2423121 : 132917/2423121 : 1) C2b (-10388/34025 : 1347/34025 : 1)
** u= -21/157 ; C1 -110498*x^2 - 25090*y^2 + 30802*z^2
(11529/22517 : -6088/22517 : 1) C2a (-83543/186429 : 12713/186429 : 1)
** u= -21/277 ; C1 -360818*x^2 - 77170*y^2 + 87922*z^2
(46304/94413 : -11443/94413 : 1) C2a (-103307/139019 : -12555/139019 : 1)
** u= -20/17 ; C1 -485*x^2 - 689*y^2 + 569*z^2
(32/197 : -177/197 : 1) C2a (-18842/8067 : 1411/8067 : 1)
** u= -20/29 ; C1 -2285*x^2 - 1241*y^2 + 1601*z^2
(456/869 : 769/869 : 1) C2a (5748/1877 : 569/1877 : 1)
** u= -20/31 ; C1 -2725*x^2 - 1361*y^2 + 1801*z^2
(-727/2025 : 418/405 : 1) C2a (52454/3295 : -5321/3295 : 1)
** u= -20/43 ; C1 -6205*x^2 - 2249*y^2 + 3169*z^2
(-895/2241 : 2206/2241 : 1) C2a (-10462/4603 : -1091/4603 : 1)
** u= -20/63 ; C1 -15205*x^2 - 4369*y^2 + 6089*z^2
(-2504/4463 : -2437/4463 : 1) C2a (78/203 : -2627/52171 : 1)
** u= -20/279 ; C1 -367285*x^2 - 78241*y^2 + 88601*z^2
(-62075/282533 : 268898/282533 : 1) C2a (-229272/31957 : -21601/31957 : 1)
** u= -20/311 ; C1 -459125*x^2 - 97121*y^2 + 108761*z^2
(116304/306115 : 40493/61223 : 1) C2a (-510722/170313 : -48689/170313 : 1)
** u= -20/351 ; C1 -588325*x^2 - 123601*y^2 + 136841*z^2
(689/18961 : -19894/18961 : 1) C2a (159056/1244795 : -74319/1244795 : 1)
** u= -20/371 ; C1 -658925*x^2 - 138041*y^2 + 152081*z^2
(12232/119771 : -122841/119771 : 1) C2a (-7602288/4794037 : -758159/4794037 : 1)
** u= -19/11 ; C1 -130*x^2 + 482*y^2 + 178*z^2
(40/51 : 23/51 : 1) C2b (-11022/10541 : -491/10541 : 1)
** u= -19/131 ; C1 -76210*x^2 - 17522*y^2 + 21778*z^2
(14320/48959 : 45687/48959 : 1) C2a (90721/573493 : 30709/573493 : 1)
** u= -19/307 ; C1 -448274*x^2 - 94610*y^2 + 105554*z^2
(22643/59363 : -38760/59363 : 1) C2a (-1094009/167541 : 102403/167541 : 1)
** u= -19/355 ; C1 -603506*x^2 - 126386*y^2 + 139154*z^2
(-59336/139115 : 67053/139115 : 1) C2a (273473/1029435 : 65579/1029435 : 1)
** u= -19/379 ; C1 -689762*x^2 - 144002*y^2 + 157682*z^2
(105616/230455 : 68733/230455 : 1) C2a (-8144833/13814955 : 158431/1973565 : 1)
** u= -18/13 ; C1 -233*x^2 + 493*y^2 + 313*z^2
(-89/345 : 268/345 : 1) C2b (286029/288553 : 2279/288553 : 1)
** u= -18/31 ; C1 -2897*x^2 + 1285*y^2 + 1753*z^2
(-314/573 : -475/573 : 1) C2b (-31/97 : -477/24929 : 1)
** u= -18/35 ; C1 -3929*x^2 + 1549*y^2 + 2161*z^2
(1627/2295 : -796/2295 : 1) C2b (175523/645815 : -6453/645815 : 1)
** u= -17/9 ; C1 {+/-} -82*x^2 + 370*y^2 + 98*z^2
(56/53 : -7/53 : 1) C2a (4883/2891 : -9/413 : 1) C2b (-4112/2541 : -1/363 : 1)
** u= -17/25 ; C1 {+/-} -1714*x^2 + 914*y^2 + 1186*z^2
(-520/989 : -873/989 : 1) C2a (2827/2495 : -259/2495 : 1) C2b (-10794/48845 : 2011/48845 : 1)
** u= -17/145 ; C1 -95554*x^2 - 21314*y^2 + 25666*z^2
(-13168/25809 : 4975/25809 : 1) C2a (2137213/549547 : 208987/549547 : 1)
** u= -17/257 ; C1 -313058*x^2 - 66338*y^2 + 74498*z^2
(-43425/89209 : 6176/89209 : 1) C2a (-1027/2895 : -1/15 : 1)
** u= -17/361 ; C1 -627346*x^2 - 130610*y^2 + 142306*z^2
(5093/41793 : 42172/41793 : 1) C2a (-54587/105403 : -8015/105403 : 1)
** u= -17/369 ; C1 -656002*x^2 - 136450*y^2 + 148418*z^2
(-10384/31745 : 120181/158725 : 1) C2a (86673/42965 : -41857/214825 : 1)
** u= -16/15 ; C1 -421*x^2 - 481*y^2 + 449*z^2
(-131/137 : 50/137 : 1) C2a (17414/12275 : -1257/12275 : 1)
** u= -16/21 ; C1 -1117*x^2 - 697*y^2 + 857*z^2
(-337/2083 : -2270/2083 : 1) C2a (10176/11437 : 797/11437 : 1)
** u= -16/23 ; C1 -1429*x^2 - 785*y^2 + 1009*z^2
(-196/739 : -795/739 : 1) C2a (3406/6791 : 101/6791 : 1)
** u= -16/51 ; C1 -9997*x^2 - 2857*y^2 + 3977*z^2
(1472/2407 : 695/2407 : 1) C2a (41552/374545 : -12447/374545 : 1)
** u= -16/113 ; C1 -56869*x^2 - 13025*y^2 + 16129*z^2
(127/275 : -762/1375 : 1) C2a (7160/51943 : -109/2045 : 1)
** u= -16/131 ; C1 -77677*x^2 - 17417*y^2 + 21097*z^2
(-1564/24819 : 27115/24819 : 1) C2a (-35194/412607 : -1309/24271 : 1)
** u= -16/145 ; C1 -96101*x^2 - 21281*y^2 + 25409*z^2
(-171420/546833 : -473639/546833 : 1) C2a (451104/334115 : 47117/334115 : 1)
** u= -16/239 ; C1 -270565*x^2 - 57377*y^2 + 64513*z^2
(-15191/37701 : 22582/37701 : 1) C2a (-894454/3375247 : 212189/3375247 : 1)
** u= -16/273 ; C1 -355429*x^2 - 74785*y^2 + 83009*z^2
(-23392/48593 : 4511/48593 : 1) C2a (-1149768/433643 : -109819/433643 : 1)
** u= -16/327 ; C1 -513973*x^2 - 107185*y^2 + 117137*z^2
(-7001/140293 : 145858/140293 : 1) C2a (-35284462/2614621 : 3257625/2614621 : 1)
** u= -16/357 ; C1 -614653*x^2 - 127705*y^2 + 138617*z^2
(-26024/95693 : 6287/7361 : 1) C2a (-647732/637661 : -70557/637661 : 1)
** u= -15/319 ; C1 -489890*x^2 - 101986*y^2 + 111106*z^2
(-3404/51999 : 53759/51999 : 1) C2a (100613/169953 : -13681/169953 : 1)
** u= -14/17 ; C1 -689*x^2 + 485*y^2 + 569*z^2
(122/187 : -141/187 : 1) C2b (-7909/19271 : 755/19271 : 1)
** u= -14/23 ; C1 -1553*x^2 + 725*y^2 + 977*z^2
(-6/49 : -281/245 : 1) C2b (-59/161 : 13/805 : 1)
** u= -14/25 ; C1 -1921*x^2 + 821*y^2 + 1129*z^2
(677/889 : 120/889 : 1) C2b (253/5103 : 181/5103 : 1)
** u= -14/27 ; C1 -2329*x^2 + 925*y^2 + 1289*z^2
(-1118/2149 : -9067/10745 : 1) C2b (653/2729 : 243/13645 : 1)
** u= -13/85 ; C1 -31874*x^2 - 7394*y^2 + 9266*z^2
(1367/3061 : -1920/3061 : 1) C2a (748737/55027 : 73993/55027 : 1)
** u= -13/101 ; C1 -45922*x^2 - 10370*y^2 + 12658*z^2
(439/3357 : 3592/3357 : 1) C2a (2047/6379 : 391/6379 : 1)
** u= -13/293 ; C1 -414178*x^2 - 86018*y^2 + 93298*z^2
(-41519/113805 : 75812/113805 : 1) C2a (645407/109391 : 59651/109391 : 1)
** u= -12/5 ; C1 -29*x^2 - 169*y^2 + z^2
(0 : 1/13 : 1) C2a (-308/15 : -23/195 : 1)
** u= -12/61 ; C1 -15821*x^2 - 3865*y^2 + 5041*z^2
(-6248/20997 : 20377/20997 : 1) C2a (146942/80727 : -215/1137 : 1)
** u= -12/79 ; C1 -27557*x^2 - 6385*y^2 + 7993*z^2
(-421/5853 : 6490/5853 : 1) C2a (-214246/67823 : 21423/67823 : 1)
** u= -12/113 ; C1 -58565*x^2 - 12913*y^2 + 15337*z^2
(50701/109539 : 50918/109539 : 1) C2a (-848842/269559 : 82927/269559 : 1)
** u= -12/121 ; C1 -67541*x^2 - 14785*y^2 + 17401*z^2
(-41889/1190911 : 1288874/1190911 : 1) C2a (7748/306663 : -16955/306663 : 1)
** u= -12/131 ; C1 -79661*x^2 - 17305*y^2 + 20161*z^2
(6216/12451 : -1657/12451 : 1) C2a (11242/145797 : 8213/145797 : 1)
** u= -12/149 ; C1 -103997*x^2 - 22345*y^2 + 25633*z^2
(-8503/19479 : -9938/19479 : 1) C2a (6094/2187 : -589/2187 : 1)
** u= -12/173 ; C1 -141485*x^2 - 30073*y^2 + 33937*z^2
(8140/81897 : -85189/81897 : 1) C2a (155486/160033 : 17241/160033 : 1)
** u= -12/235 ; C1 -264989*x^2 - 55369*y^2 + 60721*z^2
(-16189/118533 : 118970/118533 : 1) C2a (-3651676/1533751 : -349251/1533751 : 1)
** u= -12/245 ; C1 -288509*x^2 - 60169*y^2 + 65761*z^2
(15203/70515 : 65774/70515 : 1) C2a (-1014446/15071 : 93561/15071 : 1)
** u= -12/289 ; C1 -403877*x^2 - 83665*y^2 + 90313*z^2
(-352141/1059843 : -783530/1059843 : 1) C2a (4246892/2381939 : 414345/2381939 : 1)
** u= -12/313 ; C1 -474965*x^2 - 98113*y^2 + 105337*z^2
(128533/281691 : 72218/281691 : 1) C2a (45597202/24509 : 4167867/24509 : 1)
** u= -12/397 ; C1 -769133*x^2 - 157753*y^2 + 166993*z^2
(-156180/355973 : 123343/355973 : 1) C2a (562498/3422799 : -212969/3422799 : 1)
** u= -11/51 ; C1 -10882*x^2 - 2722*y^2 + 3602*z^2
(-1252/3955 : 3799/3955 : 1) C2a (1437/3769 : -221/3769 : 1)
** u= -11/75 ; C1 -24946*x^2 - 5746*y^2 + 7154*z^2
(77/211 : 2240/2743 : 1) C2a (297/2863 : -277/5317 : 1)
** u= -11/107 ; C1 -52658*x^2 - 11570*y^2 + 13682*z^2
(101/203 : 48/203 : 1) C2a (235971/96157 : -23245/96157 : 1)
** u= -11/163 ; C1 -125794*x^2 - 26690*y^2 + 30034*z^2
(35264/120339 : 102151/120339 : 1) C2a (-2106659/54271 : 197165/54271 : 1)
** u= -11/291 ; C1 -410722*x^2 - 84802*y^2 + 90962*z^2
(8596/51295 : -49643/51295 : 1) C2a (333921/87293 : 30953/87293 : 1)
** u= -9/17 ; C1 {+/-} -914*x^2 + 370*y^2 + 514*z^2
(-84/781 : -911/781 : 1) C2a (-217/257 : -21/257 : 1) C2b (-1844/13621 : 393/13621 : 1)
** u= -9/49 ; C1 -10322*x^2 - 2482*y^2 + 3202*z^2
(-12/53 : 55/53 : 1) C2a (-457/35349 : -1679/35349 : 1)
** u= -9/89 ; C1 -36482*x^2 - 8002*y^2 + 9442*z^2
(1793/6705 : 6196/6705 : 1) C2a (-133199/109165 : 14109/109165 : 1)
** u= -9/337 ; C1 -555794*x^2 - 113650*y^2 + 119554*z^2
(20907/48617 : -18676/48617 : 1) C2a (40951/51681 : -211/2247 : 1)
** u= -8/7 ; C1 -85*x^2 - 113*y^2 + 97*z^2
(548/519 : -73/519 : 1) C2a (-2162/2359 : -83/2359 : 1)
** u= -8/13 ; C1 -493*x^2 - 233*y^2 + 313*z^2
(52/213 : -235/213 : 1) C2a (-3034/7207 : 83/7207 : 1)
** u= -8/69 ; C1 -21661*x^2 - 4825*y^2 + 5801*z^2
(1888/4409 : 13573/22045 : 1) C2a (36396/30767 : 19453/153835 : 1)
** u= -8/75 ; C1 -25789*x^2 - 5689*y^2 + 6761*z^2
(1988/4975 : -3391/4975 : 1) C2a (852824/280415 : -83433/280415 : 1)
** u= -8/85 ; C1 -33469*x^2 - 7289*y^2 + 8521*z^2
(5407/15131 : -11550/15131 : 1) C2a (-274832/238937 : -29393/238937 : 1)
** u= -8/127 ; C1 -76645*x^2 - 16193*y^2 + 18097*z^2
(5507/95313 : -100046/95313 : 1) C2a (1582/25931 : -1513/25931 : 1)
** u= -8/167 ; C1 -134165*x^2 - 27953*y^2 + 30497*z^2
(-23984/62363 : 38499/62363 : 1) C2a (290718/230761 : -30067/230761 : 1)
** u= -8/179 ; C1 -154541*x^2 - 32105*y^2 + 34841*z^2
(-5301/31609 : -422/433 : 1) C2a (92408/3066657 : 182359/3066657 : 1)
** u= -8/197 ; C1 -187805*x^2 - 38873*y^2 + 41897*z^2
(-9629/47519 : 44562/47519 : 1) C2a (-35958/114809 : 7603/114809 : 1)
** u= -8/219 ; C1 -232861*x^2 - 48025*y^2 + 51401*z^2
(-5579/12905 : 26138/64525 : 1) C2a (40088/179935 : -8139/128525 : 1)
** u= -8/235 ; C1 -268669*x^2 - 55289*y^2 + 58921*z^2
(-605/30001 : 30942/30001 : 1) C2a (-3254174/3342359 : -358099/3342359 : 1)
** u= -8/375 ; C1 -691189*x^2 - 140689*y^2 + 146561*z^2
(28484/113563 : 97205/113563 : 1) C2a (254652/118823 : -24047/118823 : 1)
** u= -8/391 ; C1 -751957*x^2 - 152945*y^2 + 159073*z^2
(-356/49883 : -661263/648479 : 1) C2a (5476/22367 : -18875/290771 : 1)
** u= -7/39 ; C1 -6562*x^2 - 1570*y^2 + 2018*z^2
(-1027/1931 : -620/1931 : 1) C2a (-61647/49451 : -6605/49451 : 1)
** u= -7/55 ; C1 -13634*x^2 - 3074*y^2 + 3746*z^2
(3/19 : -20/19 : 1) C2a (6661/3249 : -671/3249 : 1)
** u= -7/79 ; C1 -29042*x^2 - 6290*y^2 + 7298*z^2
(-416/2527 : -2571/2527 : 1) C2a (-31201/633 : -2965/633 : 1)
** u= -7/127 ; C1 -77138*x^2 - 16178*y^2 + 17858*z^2
(-2520/8383 : -6877/8383 : 1) C2a (-1988019/2796553 : -246683/2796553 : 1)
** u= -7/263 ; C1 -338530*x^2 - 69218*y^2 + 72802*z^2
(74956/169451 : 52173/169451 : 1) C2a (6749/16087 : 1151/16087 : 1)
** u= -7/279 ; C1 -381442*x^2 - 77890*y^2 + 81698*z^2
(16363/35411 : 2008/35411 : 1) C2a (54871/903277 : -55101/903277 : 1)
** u= -7/391 ; C1 -753506*x^2 - 152930*y^2 + 158306*z^2
(-266217/3781103 : -3801332/3781103 : 1) C2a (-5457727/2953233 : 522161/2953233 : 1)
** u= -6/7 ; C1 -113*x^2 + 85*y^2 + 97*z^2
(-18/29 : 23/29 : 1) C2b (-1083/2201 : -73/2201 : 1)
** u= -6/13 ; C1 -569*x^2 + 205*y^2 + 289*z^2
(34/111 : 119/111 : 1) C2b (-467/12427 : -15/731 : 1)
** u= -5/21 ; C1 -1810*x^2 - 466*y^2 + 626*z^2
(1052/1789 : 29/1789 : 1) C2a (29/11 : -3/11 : 1)
** u= -5/37 ; C1 -6130*x^2 - 1394*y^2 + 1714*z^2
(-452/1837 : -1803/1837 : 1) C2a (-128069/33535 : -12649/33535 : 1)
** u= -5/301 ; C1 -447010*x^2 - 90626*y^2 + 93586*z^2
(7123/167417 : 169392/167417 : 1) C2a (2105399/5247109 : -373007/5247109 : 1)
** u= -5/317 ; C1 -496130*x^2 - 100514*y^2 + 103634*z^2
(54960/130613 : -51767/130613 : 1) C2a (-1472323/361185 : 133733/361185 : 1)
** u= -5/357 ; C1 -630130*x^2 - 127474*y^2 + 130994*z^2
(-66077/149269 : -36244/149269 : 1) C2a (-60747/407687 : 25649/407687 : 1)
** u= -4/5 ; C1 -61*x^2 - 41*y^2 + 49*z^2
(-175/199 : 42/199 : 1) C2a (944/49 : -13/7 : 1)
** u= -4/7 ; C1 -149*x^2 - 65*y^2 + 89*z^2
(-19/29 : 18/29 : 1) C2a (1056/31 : 109/31 : 1)
** u= -4/13 ; C1 -653*x^2 - 185*y^2 + 257*z^2
(168/1121 : -1283/1121 : 1) C2a (-5838/4369 : -623/4369 : 1)
** u= -4/21 ; C1 -1885*x^2 - 457*y^2 + 593*z^2
(5/83 : 94/83 : 1) C2a (2056/51695 : -2427/51695 : 1)
** u= -4/25 ; C1 -2741*x^2 - 641*y^2 + 809*z^2
(-340/1381 : -1383/1381 : 1) C2a (-3246/3709 : 371/3709 : 1)
** u= -4/67 ; C1 -21389*x^2 - 4505*y^2 + 5009*z^2
(56/331 : -327/331 : 1) C2a (-26286/51949 : 3893/51949 : 1)
** u= -4/73 ; C1 -25493*x^2 - 5345*y^2 + 5897*z^2
(-1196/2633 : 909/2633 : 1) C2a (749472/324019 : 72001/324019 : 1)
** u= -4/77 ; C1 -28429*x^2 - 5945*y^2 + 6529*z^2
(-1079/8111 : 8166/8111 : 1) C2a (431146/703501 : 57485/703501 : 1)
** u= -4/81 ; C1 -31525*x^2 - 6577*y^2 + 7193*z^2
(11116/38905 : 6521/7781 : 1) C2a (-2392902/191641 : -221047/191641 : 1)
** u= -4/107 ; C1 -55549*x^2 - 11465*y^2 + 12289*z^2
(1591/16041 : 16234/16041 : 1) C2a (34894/172459 : 10813/172459 : 1)
** u= -4/151 ; C1 -111605*x^2 - 22817*y^2 + 23993*z^2
(74671/169681 : 54798/169681 : 1) C2a (41034/201067 : -12749/201067 : 1)
** u= -4/163 ; C1 -130253*x^2 - 26585*y^2 + 27857*z^2
(-88/811 : 807/811 : 1) C2a (-403356/1363553 : 90541/1363553 : 1)
** u= -4/171 ; C1 -143485*x^2 - 29257*y^2 + 30593*z^2
(2512/11803 : -10711/11803 : 1) C2a (-39036/95783 : -6811/95783 : 1)
** u= -4/175 ; C1 -150341*x^2 - 30641*y^2 + 32009*z^2
(-129300/280223 : -989/280223 : 1) C2a (-2230062/425333 : 202733/425333 : 1)
** u= -4/179 ; C1 -157357*x^2 - 32057*y^2 + 33457*z^2
(-220819/541469 : 258150/541469 : 1) C2a (-1143914/385697 : 105737/385697 : 1)
** u= -4/209 ; C1 -215077*x^2 - 43697*y^2 + 45337*z^2
(-4648/10125 : -169/10125 : 1) C2a (14369558/6472855 : 1350503/6472855 : 1)
** u= -4/221 ; C1 -240685*x^2 - 48857*y^2 + 50593*z^2
(-1096/12793 : 12789/12793 : 1) C2a (-208654/1647817 : 102601/1647817 : 1)
** u= -4/299 ; C1 -442237*x^2 - 89417*y^2 + 91777*z^2
(-282611/640685 : 162162/640685 : 1) C2a (11908/7861 : 167/1123 : 1)
** u= -4/379 ; C1 -712157*x^2 - 143657*y^2 + 146657*z^2
(-691481/1716569 : 798630/1716569 : 1) C2a (12816498/4556909 : -168067/650987 : 1)
** u= -3/11 ; C1 -482*x^2 - 130*y^2 + 178*z^2
(-276/623 : -499/623 : 1) C2a (59/2663 : -99/2663 : 1)
** u= -3/59 ; C1 -16706*x^2 - 3490*y^2 + 3826*z^2
(-2541/5399 : 1024/5399 : 1) C2a (-309463/4797 : -28585/4797 : 1)
** u= -3/67 ; C1 -21650*x^2 - 4498*y^2 + 4882*z^2
(-1377/24095 : 4984/4819 : 1) C2a (-50621/79033 : -6609/79033 : 1)
** u= -1 ; C1 {+/-} -2*x^2 + 2*y^2 + 2*z^2
(1 : 0 : 1) C2a (-13/9 : -1/9 : 1) C2b (4/17 : 1/17 : 1)
** u= -1/9 ; C1 -370*x^2 - 82*y^2 + 98*z^2
(-7/53 : 56/53 : 1) C2a (101/343 : -3/49 : 1)
** u= -1/49 ; C1 -11810*x^2 - 2402*y^2 + 2498*z^2
(-1312/2857 : -159/2857 : 1) C2a (-4153/7329 : -583/7329 : 1)
** u= -1/57 ; C1 -16018*x^2 - 3250*y^2 + 3362*z^2
(-41/3613 : -18368/18065 : 1) C2a (-87/41 : 1/5 : 1)
** u= -1/217 ; C1 -234578*x^2 - 47090*y^2 + 47522*z^2
(-141384/1026917 : -982169/1026917 : 1) C2a (-1689023/1094649 : -164389/1094649 : 1)
** u= -1/273 ; C1 -371554*x^2 - 74530*y^2 + 75074*z^2
(7688/20957 : -12155/20957 : 1) C2a (-13613/127 : 309759/32639 : 1)
** u= 0 ; C1 -5*x^2 - y^2 + z^2
(0 : 1 : 1) C2a (-4/15 : -1/15 : 1)
** u= 1/15 ; C1 -1186*x^2 - 226*y^2 + 194*z^2
(109/283 : -80/283 : 1) C2a (-23679/6251 : 1979/6251 : 1)
** u= 1/31 ; C1 -4930*x^2 - 962*y^2 + 898*z^2
(400/987 : -299/987 : 1) C2a (-31679/6167 : 2729/6167 : 1)
** u= 3/37 ; C1 -7298*x^2 - 1378*y^2 + 1138*z^2
(-1728/12005 : 10159/12005 : 1) C2a (-14459/27217 : -2157/27217 : 1)
** u= 3/125 ; C1 -79634*x^2 - 15634*y^2 + 14866*z^2
(4076/19245 : -16357/19245 : 1) C2a (-61621/154465 : 11193/154465 : 1)
** u= 3/221 ; C1 -246866*x^2 - 48850*y^2 + 47506*z^2
(-2223/13345 : -60872/66725 : 1) C2a (-1795033/829027 : 164715/829027 : 1)
** u= 3/229 ; C1 -264962*x^2 - 52450*y^2 + 51058*z^2
(-13104/50293 : 39935/50293 : 1) C2a (-47959/49847 : 747/7121 : 1)
** u= 3/277 ; C1 -386978*x^2 - 76738*y^2 + 75058*z^2
(-79736/363345 : -311557/363345 : 1) C2a (6173543/493781 : -539511/493781 : 1)
** u= 4/13 ; C1 -1069*x^2 - 185*y^2 + 49*z^2
(119/759 : -266/759 : 1) C2a (1028/833 : 11/119 : 1)
** u= 4/21 ; C1 -2557*x^2 - 457*y^2 + 257*z^2
(-85/667 : 458/667 : 1) C2a (-16336/30583 : -2427/30583 : 1)
** u= 4/25 ; C1 -3541*x^2 - 641*y^2 + 409*z^2
(-211/627 : -70/627 : 1) C2a (-750334/149341 : -53899/149341 : 1)
** u= 4/39 ; C1 -8245*x^2 - 1537*y^2 + 1193*z^2
(-1291/11389 : -9578/11389 : 1) C2a (-2582/8945 : -639/8945 : 1)
** u= 4/61 ; C1 -19597*x^2 - 3737*y^2 + 3217*z^2
(3092/8257 : -2925/8257 : 1) C2a (-8338/8575 : 887/8575 : 1)
** u= 4/73 ; C1 -27829*x^2 - 5345*y^2 + 4729*z^2
(-3188/7957 : -1761/7957 : 1) C2a (20788/30523 : 2641/30523 : 1)
** u= 4/75 ; C1 -29341*x^2 - 5641*y^2 + 5009*z^2
(-1352/7075 : 5911/7075 : 1) C2a (2531128/296375 : -211299/296375 : 1)
** u= 4/77 ; C1 -30893*x^2 - 5945*y^2 + 5297*z^2
(5121/14687 : -7478/14687 : 1) C2a (541754/116403 : 45749/116403 : 1)
** u= 4/81 ; C1 -34117*x^2 - 6577*y^2 + 5897*z^2
(1636/5185 : 3197/5185 : 1) C2a (-948/47521 : 3101/47521 : 1)
** u= 4/115 ; C1 -67981*x^2 - 13241*y^2 + 12289*z^2
(-5933/35541 : -31490/35541 : 1) C2a (10989412/884435 : 935681/884435 : 1)
** u= 4/131 ; C1 -87917*x^2 - 17177*y^2 + 16097*z^2
(2644/15239 : 13485/15239 : 1) C2a (-72664/870663 : 56237/870663 : 1)
** u= 4/151 ; C1 -116437*x^2 - 22817*y^2 + 21577*z^2
(15212/57067 : -43575/57067 : 1) C2a (1706806/35413 : 146437/35413 : 1)
** u= 4/165 ; C1 -138781*x^2 - 27241*y^2 + 25889*z^2
(-181/475 : 218/475 : 1) C2a (7396938/3755 : 636131/3755 : 1)
** u= 4/171 ; C1 -148957*x^2 - 29257*y^2 + 27857*z^2
(-3484/19759 : -17605/19759 : 1) C2a (4029206/863287 : 351177/863287 : 1)
** u= 4/175 ; C1 -155941*x^2 - 30641*y^2 + 29209*z^2
(-195500/608403 : -397921/608403 : 1) C2a (858302/296795 : -76309/296795 : 1)
** u= 4/179 ; C1 -163085*x^2 - 32057*y^2 + 30593*z^2
(-9732/23023 : -377/1771 : 1) C2a (-194058/566065 : -39761/566065 : 1)
** u= 4/187 ; C1 -177853*x^2 - 34985*y^2 + 33457*z^2
(1756/10367 : -9333/10367 : 1) C2a (-362/931 : -67/931 : 1)
** u= 4/209 ; C1 -221765*x^2 - 43697*y^2 + 41993*z^2
(48153/164903 : 119854/164903 : 1) C2a (2179032/431095 : -27203/61585 : 1)
** u= 4/221 ; C1 -247757*x^2 - 48857*y^2 + 47057*z^2
(1412/21113 : -20475/21113 : 1) C2a (-72696/84055 : 8251/84055 : 1)
** u= 4/271 ; C1 -371557*x^2 - 73457*y^2 + 71257*z^2
(3212/67487 : -66075/67487 : 1) C2a (-901304/2038753 : 150917/2038753 : 1)
** u= 4/285 ; C1 -410701*x^2 - 81241*y^2 + 78929*z^2
(48229/206827 : 172630/206827 : 1) C2a (479446/155795 : 42837/155795 : 1)
** u= 4/299 ; C1 -451805*x^2 - 89417*y^2 + 86993*z^2
(-11479/377137 : -371094/377137 : 1) C2a (5849732/1321965 : 515809/1321965 : 1)
** u= 4/305 ; C1 -470021*x^2 - 93041*y^2 + 90569*z^2
(-99311/326783 : 232650/326783 : 1) C2a (812514/1981285 : -3059/42155 : 1)
** u= 4/341 ; C1 -586877*x^2 - 116297*y^2 + 113537*z^2
(-37967/87775 : -15726/87775 : 1) C2a (929274/3058417 : -209287/3058417 : 1)
** u= 4/379 ; C1 -724285*x^2 - 143657*y^2 + 140593*z^2
(84448/303179 : -232383/303179 : 1) C2a (-16604938/9794819 : -1575133/9794819 : 1)
** u= 7/17 ; C1 -1970*x^2 - 338*y^2 + 2*z^2
(0 : 1/13 : 1) C2a (-3 : -1/13 : 1)
** u= 7/57 ; C1 -17890*x^2 - 3298*y^2 + 2402*z^2
(-508/6113 : -5081/6113 : 1) C2a (571/545 : 57/545 : 1)
** u= 7/145 ; C1 -109234*x^2 - 21074*y^2 + 18946*z^2
(-808/1941 : 55/1941 : 1) C2a (-319/31 : -6877/7967 : 1)
** u= 7/153 ; C1 -121378*x^2 - 23458*y^2 + 21218*z^2
(7004/30469 : 24205/30469 : 1) C2a (10887/22969 : -17/223 : 1)
** u= 7/353 ; C1 -632978*x^2 - 124658*y^2 + 119618*z^2
(201837/464905 : 23264/464905 : 1) C2a (38723/212991 : 13949/212991 : 1)
** u= 8/69 ; C1 -26077*x^2 - 4825*y^2 + 3593*z^2
(280/2521 : 10379/12605 : 1) C2a (73730/46447 : 32247/232235 : 1)
** u= 8/75 ; C1 -30589*x^2 - 5689*y^2 + 4361*z^2
(-4564/12623 : 245/971 : 1) C2a (21633986/2853095 : 240309/407585 : 1)
** u= 8/85 ; C1 -38909*x^2 - 7289*y^2 + 5801*z^2
(695/7699 : 6678/7699 : 1) C2a (86004/328295 : 23153/328295 : 1)
** u= 8/101 ; C1 -54301*x^2 - 10265*y^2 + 8521*z^2
(841/4851 : 3974/4851 : 1) C2a (-1214/4361 : -307/4361 : 1)
** u= 8/115 ; C1 -69869*x^2 - 13289*y^2 + 11321*z^2
(645/3001 : -2342/3001 : 1) C2a (242464/252051 : 25861/252051 : 1)
** u= 8/127 ; C1 -84773*x^2 - 16193*y^2 + 14033*z^2
(18584/112195 : 95397/112195 : 1) C2a (1234/511965 : -33761/511965 : 1)
** u= 8/167 ; C1 -144853*x^2 - 27953*y^2 + 25153*z^2
(4760/17207 : -12207/17207 : 1) C2a (1826468/8493631 : 574121/8493631 : 1)
** u= 8/185 ; C1 -177109*x^2 - 34289*y^2 + 31201*z^2
(-1249/5195 : 4062/5195 : 1) C2a (-137762/112745 : 13709/112745 : 1)
** u= 8/189 ; C1 -184717*x^2 - 35785*y^2 + 32633*z^2
(199204/485017 : -7571/37309 : 1) C2a (-69416/349223 : 23391/349223 : 1)
** u= 8/197 ; C1 -200413*x^2 - 38873*y^2 + 35593*z^2
(-1660/19781 : 18549/19781 : 1) C2a (4098748/1612951 : -361409/1612951 : 1)
** u= 8/235 ; C1 -283709*x^2 - 55289*y^2 + 51401*z^2
(8421/75737 : 1330/1429 : 1) C2a (-20504/28911 : 2551/28911 : 1)
** u= 8/315 ; C1 -506269*x^2 - 99289*y^2 + 94121*z^2
(-11260/113987 : 108029/113987 : 1) C2a (2403698/2509477 : -261417/2509477 : 1)
** u= 8/325 ; C1 -538589*x^2 - 105689*y^2 + 100361*z^2
(-22144/137633 : -124455/137633 : 1) C2a (-5058/62095 : 3989/62095 : 1)
** u= 8/391 ; C1 -776981*x^2 - 152945*y^2 + 146561*z^2
(11328/27383 : 106115/355979 : 1) C2a (-137358/82297 : 168553/1069861 : 1)
** u= 9/47 ; C1 -12818*x^2 - 2290*y^2 + 1282*z^2
(168/1091 : -713/1091 : 1) C2a (3925033/534601 : 261843/534601 : 1)
** u= 9/191 ; C1 -189362*x^2 - 36562*y^2 + 32962*z^2
(5/1167 : 1108/1167 : 1) C2a (-480049/34306937 : 2234187/34306937 : 1)
** u= 9/223 ; C1 -256754*x^2 - 49810*y^2 + 45634*z^2
(12668/66003 : 56249/66003 : 1) C2a (12281/46839 : 3205/46839 : 1)
** u= 9/359 ; C1 -657410*x^2 - 128962*y^2 + 122338*z^2
(11553/45071 : 2716/3467 : 1) C2a (4611001/1950343 : 415311/1950343 : 1)
** u= 11/133 ; C1 -94418*x^2 - 17810*y^2 + 14642*z^2
(1836/4733 : 739/4733 : 1) C2a (-2583/5171 : 403/5171 : 1)
** u= 11/173 ; C1 -157378*x^2 - 30050*y^2 + 26002*z^2
(-220/2169 : -9769/10845 : 1) C2a (356573/115309 : -30233/115309 : 1)
** u= 11/381 ; C1 -742690*x^2 - 145282*y^2 + 136658*z^2
(-10103/1191709 : 1155572/1191709 : 1) C2a (-1008239/10635355 : -687183/10635355 : 1)
** u= 11/389 ; C1 -773842*x^2 - 151442*y^2 + 142642*z^2
(-17027/96365 : -85236/96365 : 1) C2a (2155721/1930067 : 222157/1930067 : 1)
** u= 12/61 ; C1 -21677*x^2 - 3865*y^2 + 2113*z^2
(-452/2361 : -1379/2361 : 1) C2a (-21016/8233 : 1491/8233 : 1)
** u= 12/79 ; C1 -35141*x^2 - 6385*y^2 + 4201*z^2
(-1372/13623 : 10571/13623 : 1) C2a (41174/13011 : -3083/13011 : 1)
** u= 12/121 ; C1 -79157*x^2 - 14785*y^2 + 11593*z^2
(744/2113 : 733/2113 : 1) C2a (-219946/72343 : -17865/72343 : 1)
** u= 12/131 ; C1 -92237*x^2 - 17305*y^2 + 13873*z^2
(-11421/46813 : 32582/46813 : 1) C2a (-432238/302349 : -39749/302349 : 1)
** u= 12/149 ; C1 -118301*x^2 - 22345*y^2 + 18481*z^2
(14493/59323 : 42410/59323 : 1) C2a (-1504846/29049 : 120745/29049 : 1)
** u= 12/155 ; C1 -127709*x^2 - 24169*y^2 + 20161*z^2
(19225/61929 : 35302/61929 : 1) C2a (67265276/26735845 : -5705103/26735845 : 1)
** u= 12/173 ; C1 -158093*x^2 - 30073*y^2 + 25633*z^2
(-10020/28661 : -13129/28661 : 1) C2a (2426432/27423031 : -1827891/27423031 : 1)
** u= 12/235 ; C1 -287549*x^2 - 55369*y^2 + 49441*z^2
(112287/446465 : -335426/446465 : 1) C2a (1154474/422751 : 14303/60393 : 1)
** u= 12/245 ; C1 -312029*x^2 - 60169*y^2 + 54001*z^2
(-73725/178027 : 16046/178027 : 1) C2a (-387358/1032825 : 74729/1032825 : 1)
** u= 12/289 ; C1 -431621*x^2 - 83665*y^2 + 76441*z^2
(776/6129 : -5587/6129 : 1) C2a (39604282/6784227 : -3368323/6784227 : 1)
** u= 12/313 ; C1 -505013*x^2 - 98113*y^2 + 90313*z^2
(-28596/67621 : -55/67621 : 1) C2a (-135568/164275 : -15633/164275 : 1)
** u= 12/337 ; C1 -584165*x^2 - 113713*y^2 + 105337*z^2
(30180/135097 : -110579/135097 : 1) C2a (1998224/5714733 : 405679/5714733 : 1)
** u= 12/379 ; C1 -736541*x^2 - 143785*y^2 + 134401*z^2
(133157/345957 : -145082/345957 : 1) C2a (9093632/3819727 : -813501/3819727 : 1)
** u= 12/397 ; C1 -807245*x^2 - 157753*y^2 + 147937*z^2
(57963/1031443 : 990194/1031443 : 1) C2a (3666484/1000977 : 319739/1000977 : 1)
** u= 13/123 ; C1 -82210*x^2 - 15298*y^2 + 11762*z^2
(-1096/4259 : 2737/4259 : 1) C2a (332793/1047845 : -75721/1047845 : 1)
** u= 15/161 ; C1 -139490*x^2 - 26146*y^2 + 20866*z^2
(1100/3273 : 1447/3273 : 1) C2a (-895637/55885 : 70683/55885 : 1)
** u= 15/169 ; C1 -153170*x^2 - 28786*y^2 + 23266*z^2
(15548/88893 : -4201/5229 : 1) C2a (-3847/144085 : 9687/144085 : 1)
** u= 15/257 ; C1 -345890*x^2 - 66274*y^2 + 58114*z^2
(-21511/52809 : -5516/52809 : 1) C2a (-45744253/19849333 : 571077/2835619 : 1)
** u= 16/55 ; C1 -18901*x^2 - 3281*y^2 + 1009*z^2
(-331/1473 : -190/1473 : 1) C2a (-3734/1441 : 211/1441 : 1)
** u= 16/77 ; C1 -34829*x^2 - 6185*y^2 + 3209*z^2
(1212/8677 : -5549/8677 : 1) C2a (-1092/148583 : -10631/148583 : 1)
** u= 16/131 ; C1 -94445*x^2 - 17417*y^2 + 12713*z^2
(-6921/23189 : 11522/23189 : 1) C2a (334288/173319 : 27863/173319 : 1)
** u= 16/145 ; C1 -114661*x^2 - 21281*y^2 + 16129*z^2
(127/23635 : -20574/23635 : 1) C2a (1000748/242443 : 619/1909 : 1)
** u= 16/247 ; C1 -321109*x^2 - 61265*y^2 + 52849*z^2
(27508/592283 : -546483/592283 : 1) C2a (97059586/13720021 : 8003857/13720021 : 1)
** u= 16/271 ; C1 -384805*x^2 - 73697*y^2 + 64513*z^2
(21188/159771 : -141427/159771 : 1) C2a (6648124/2177447 : 567079/2177447 : 1)
** u= 16/273 ; C1 -390373*x^2 - 74785*y^2 + 65537*z^2
(77548/217321 : -99985/217321 : 1) C2a (-957966/4795273 : 324917/4795273 : 1)
** u= 16/331 ; C1 -569245*x^2 - 109817*y^2 + 98713*z^2
(12952/90267 : 80341/90267 : 1) C2a (-336268/106015 : 28961/106015 : 1)
** u= 16/357 ; C1 -660349*x^2 - 127705*y^2 + 115769*z^2
(135397/323567 : 10750/323567 : 1) C2a (-6162656/1599299 : 527949/1599299 : 1)
** u= 17/199 ; C1 -211826*x^2 - 39890*y^2 + 32546*z^2
(2663/29683 : 26100/29683 : 1) C2a (-66433/195687 : -14147/195687 : 1)
** u= 17/207 ; C1 -228610*x^2 - 43138*y^2 + 35522*z^2
(-14308/57143 : 40049/57143 : 1) C2a (281223/121451 : 23933/121451 : 1)
** u= 17/311 ; C1 -505042*x^2 - 97010*y^2 + 85858*z^2
(16609/58883 : 40404/58883 : 1) C2a (-155909/532483 : 37207/532483 : 1)
** u= 17/383 ; C1 -759778*x^2 - 146978*y^2 + 133378*z^2
(4060/81183 : 76783/81183 : 1) C2a (77851/95963 : -1291/13709 : 1)
** u= 19/141 ; C1 -110482*x^2 - 20242*y^2 + 14162*z^2
(-164/545 : 247/545 : 1) C2a (-717/2321 : -169/2321 : 1)
** u= 19/229 ; C1 -279970*x^2 - 52802*y^2 + 43378*z^2
(667/81017 : 73416/81017 : 1) C2a (-3483601/365447 : 12157/15889 : 1)
** u= 19/301 ; C1 -476242*x^2 - 90962*y^2 + 78802*z^2
(-3937/10985 : -372/845 : 1) C2a (129709/1266877 : -2717/40867 : 1)
** u= 19/373 ; C1 -724354*x^2 - 139490*y^2 + 124594*z^2
(25507/62497 : 10500/62497 : 1) C2a (8914603/441703 : -743797/441703 : 1)
** u= 20/63 ; C1 -25285*x^2 - 4369*y^2 + 1049*z^2
(52/3607 : -1763/3607 : 1) C2a (-488/253 : 7233/65021 : 1)
** u= 20/161 ; C1 -142885*x^2 - 26321*y^2 + 19081*z^2
(-616592/1699081 : -4149/41441 : 1) C2a (-1276556/707465 : -107509/707465 : 1)
** u= 20/221 ; C1 -262285*x^2 - 49241*y^2 + 39601*z^2
(-17512/189829 : -165369/189829 : 1) C2a (3040394/976891 : -1253/4909 : 1)
** u= 20/351 ; C1 -644485*x^2 - 123601*y^2 + 108761*z^2
(-76036/665111 : 599261/665111 : 1) C2a (3609762/6273733 : -508709/6273733 : 1)
** u= 20/371 ; C1 -718285*x^2 - 138041*y^2 + 122401*z^2
(-139253/475677 : 315802/475677 : 1) C2a (-1536956/1297219 : 153343/1297219 : 1)
** u= 21/83 ; C1 -41858*x^2 - 7330*y^2 + 2962*z^2
(3084/11723 : 1105/11723 : 1) C2a (55973/3121 : 3147/3121 : 1)
** u= 21/331 ; C1 -576050*x^2 - 110002*y^2 + 95218*z^2
(41993/388455 : -69680/77691 : 1) C2a (-21890369/39162903 : -3146761/39162903 : 1)
** u= 23/97 ; C1 -56498*x^2 - 9938*y^2 + 4418*z^2
(5076/43769 : -26555/43769 : 1) C2a (80733/91321 : -173/1943 : 1)
** u= 23/177 ; C1 -173458*x^2 - 31858*y^2 + 22658*z^2
(14893/55457 : -31300/55457 : 1) C2a (-1114807/308165 : 85617/308165 : 1)
** u= 23/185 ; C1 -188674*x^2 - 34754*y^2 + 25186*z^2
(-18277/50325 : -4676/50325 : 1) C2a (446527/131327 : -4961/18761 : 1)
** u= 23/209 ; C1 -238162*x^2 - 44210*y^2 + 33538*z^2
(20861/58177 : 14940/58177 : 1) C2a (14153/31609 : -2413/31609 : 1)
** u= 23/233 ; C1 -293410*x^2 - 54818*y^2 + 43042*z^2
(-5693/15037 : 2016/15037 : 1) C2a (-104633/46081 : -8753/46081 : 1)
** u= 23/257 ; C1 -354418*x^2 - 66578*y^2 + 53698*z^2
(-3731/50985 : -44972/50985 : 1) C2a (-731167/1132735 : 95683/1132735 : 1)
** u= 23/305 ; C1 -493714*x^2 - 93554*y^2 + 78466*z^2
(-1465/8477 : 6996/8477 : 1) C2a (1820861/844985 : 157493/844985 : 1)
** u= 23/329 ; C1 -572002*x^2 - 108770*y^2 + 92578*z^2
(-41008/114129 : -47359/114129 : 1) C2a (-9321647/179021 : -758741/179021 : 1)
** u= 24/77 ; C1 -37613*x^2 - 6505*y^2 + 1657*z^2
(-304/1497 : 191/1497 : 1) C2a (-44948/51439 : -4281/51439 : 1)
** u= 24/133 ; C1 -101789*x^2 - 18265*y^2 + 10729*z^2
(4848/14993 : 1031/14993 : 1) C2a (-118102/213773 : 17103/213773 : 1)
** u= 24/179 ; C1 -177965*x^2 - 32617*y^2 + 22873*z^2
(-1740/5843 : -35417/75959 : 1) C2a (-5036/2827 : -5463/36751 : 1)
** u= 24/289 ; C1 -445925*x^2 - 84097*y^2 + 69073*z^2
(-20901/179191 : -155102/179191 : 1) C2a (-1158428/889881 : -110113/889881 : 1)
** u= 24/301 ; C1 -482477*x^2 - 91177*y^2 + 75577*z^2
(-109236/485761 : -363935/485761 : 1) C2a (4868632/945459 : 396091/945459 : 1)
** u= 24/347 ; C1 -635933*x^2 - 120985*y^2 + 103177*z^2
(-36892/661851 : 605323/661851 : 1) C2a (17761228/154851 : 1446965/154851 : 1)
** u= 25/87 ; C1 -47170*x^2 - 8194*y^2 + 2594*z^2
(4172/23563 : 8693/23563 : 1) C2a (186703/189527 : 16689/189527 : 1)
** u= 25/271 ; C1 -394930*x^2 - 74066*y^2 + 59266*z^2
(-7253/18991 : -2844/18991 : 1) C2a (-521729/10811 : -41177/10811 : 1)
** u= 27/77 ; C1 -38690*x^2 - 6658*y^2 + 1042*z^2
(-29/177 : 4/177 : 1) C2a (-27889/4917 : 1039/4917 : 1)
** u= 27/109 ; C1 -71906*x^2 - 12610*y^2 + 5266*z^2
(-68/2937 : -1891/2937 : 1) C2a (-67531/76619 : -6759/76619 : 1)
** u= 28/87 ; C1 -48373*x^2 - 8353*y^2 + 1913*z^2
(24916/133651 : -365/2191 : 1) C2a (103452/137611 : -11041/137611 : 1)
** u= 28/107 ; C1 -70013*x^2 - 12233*y^2 + 4673*z^2
(-28791/118025 : 24022/118025 : 1) C2a (31316/1515 : -1711/1515 : 1)
** u= 28/113 ; C1 -77285*x^2 - 13553*y^2 + 5657*z^2
(-973/7211 : 4038/7211 : 1) C2a (648/31 : 37/31 : 1)
** u= 28/137 ; C1 -109973*x^2 - 19553*y^2 + 10313*z^2
(91308/856837 : -583385/856837 : 1) C2a (-374964/264155 : 30551/264155 : 1)
** u= 28/139 ; C1 -112957*x^2 - 20105*y^2 + 10753*z^2
(-18439/120057 : 76150/120057 : 1) C2a (-6273094/6630517 : 622691/6630517 : 1)
** u= 28/153 ; C1 -134965*x^2 - 24193*y^2 + 14057*z^2
(-41123/132187 : 26806/132187 : 1) C2a (-1928/24625 : -1749/24625 : 1)
** u= 28/163 ; C1 -151885*x^2 - 27353*y^2 + 16657*z^2
(35609/192201 : 124318/192201 : 1) C2a (-317426/3275 : -21853/3275 : 1)
** u= 28/181 ; C1 -184861*x^2 - 33545*y^2 + 21841*z^2
(-9196/31081 : 12765/31081 : 1) C2a (-276502/231863 : -25495/231863 : 1)
** u= 28/197 ; C1 -216893*x^2 - 39593*y^2 + 26993*z^2
(280/2557 : -2007/2557 : 1) C2a (66566/60357 : 108949/1026069 : 1)
** u= 28/219 ; C1 -265117*x^2 - 48745*y^2 + 34913*z^2
(6916/303787 : -256591/303787 : 1) C2a (132596/1215217 : 84291/1215217 : 1)
** u= 28/235 ; C1 -303229*x^2 - 56009*y^2 + 41281*z^2
(-1780/61167 : 52349/61167 : 1) C2a (86312/602107 : 41777/602107 : 1)
** u= 28/261 ; C1 -370621*x^2 - 68905*y^2 + 52721*z^2
(33844/301109 : 251417/301109 : 1) C2a (278542/163697 : 24207/163697 : 1)
** u= 28/291 ; C1 -456781*x^2 - 85465*y^2 + 67601*z^2
(240217/624457 : -5506/624457 : 1) C2a (-685684/575191 : -66357/575191 : 1)
** u= 28/307 ; C1 -506413*x^2 - 95033*y^2 + 76273*z^2
(-2191/14865 : 357262/431085 : 1) C2a (-178238/6149 : 408679/178321 : 1)
** u= 28/317 ; C1 -538733*x^2 - 101273*y^2 + 81953*z^2
(-36133/93635 : 12234/93635 : 1) C2a (-787002/1939211 : 144469/1939211 : 1)
** u= 28/339 ; C1 -613357*x^2 - 115705*y^2 + 95153*z^2
(-18571/57077 : 29170/57077 : 1) C2a (241578/358069 : 30781/358069 : 1)
** u= 28/377 ; C1 -753653*x^2 - 142913*y^2 + 120233*z^2
(556279/1589695 : 703002/1589695 : 1) C2a (365242/316131 : -36269/316131 : 1)
** u= 28/381 ; C1 -769261*x^2 - 145945*y^2 + 123041*z^2
(2816/53941 : -834769/916997 : 1) C2a (-378564/177601 : -558571/3019217 : 1)
** u= 28/391 ; C1 -808981*x^2 - 153665*y^2 + 130201*z^2
(104993/400753 : 279366/400753 : 1) C2a (1656709042/245398967 : -135511039/245398967 : 1)
** u= 29/115 ; C1 -80306*x^2 - 14066*y^2 + 5714*z^2
(-2048/7771 : 765/7771 : 1) C2a (33913/27237 : 2747/27237 : 1)
** u= 29/131 ; C1 -101842*x^2 - 18002*y^2 + 8722*z^2
(-6965/27291 : 9296/27291 : 1) C2a (-31651/20587 : 349/2941 : 1)
** u= 29/227 ; C1 -284818*x^2 - 52370*y^2 + 37522*z^2
(764/6883 : -5547/6883 : 1) C2a (-1473929/393467 : 113347/393467 : 1)
** u= 31/137 ; C1 -111794*x^2 - 19730*y^2 + 9314*z^2
(139/2321 : 1560/2321 : 1) C2a (-99651/35719 : -6565/35719 : 1)
** u= 31/145 ; C1 -124066*x^2 - 21986*y^2 + 11074*z^2
(-140/549 : -203/549 : 1) C2a (-368147/372617 : -5041/53231 : 1)
** u= 31/289 ; C1 -454402*x^2 - 84482*y^2 + 64642*z^2
(2011/5605 : -1512/5605 : 1) C2a (-2731/5015 : -401/5015 : 1)
** u= 31/377 ; C1 -758354*x^2 - 143090*y^2 + 117794*z^2
(63968/167893 : -38967/167893 : 1) C2a (-379491/740059 : 58079/740059 : 1)
** u= 32/89 ; C1 -52021*x^2 - 8945*y^2 + 1201*z^2
(-347/2463 : 338/2463 : 1) C2a (1248506/229949 : 43799/229949 : 1)
** u= 32/103 ; C1 -67253*x^2 - 11633*y^2 + 2993*z^2
(2367/13613 : 3910/13613 : 1) C2a (109626/2575 : -4909/2575 : 1)
** u= 32/159 ; C1 -147781*x^2 - 26305*y^2 + 14081*z^2
(4528/31123 : 20083/31123 : 1) C2a (4021324/633679 : 263457/633679 : 1)
** u= 32/205 ; C1 -237389*x^2 - 43049*y^2 + 27881*z^2
(-106911/319315 : 54838/319315 : 1) C2a (-44516/213759 : -2183/30537 : 1)
** u= 32/213 ; C1 -255133*x^2 - 46393*y^2 + 30713*z^2
(-165515/793007 : 515422/793007 : 1) C2a (-200168/282799 : 24399/282799 : 1)
** u= 32/229 ; C1 -292541*x^2 - 53465*y^2 + 36761*z^2
(568/1637 : 4725/27829 : 1) C2a (3138/3143 : -5381/53431 : 1)
** u= 32/259 ; C1 -369581*x^2 - 68105*y^2 + 49481*z^2
(30636/90851 : 30059/90851 : 1) C2a (15382/1167 : -297965/299919 : 1)
** u= 32/263 ; C1 -380533*x^2 - 70193*y^2 + 51313*z^2
(106168/827303 : -662745/827303 : 1) C2a (-2481256/824803 : 8501/35861 : 1)
** u= 32/283 ; C1 -437693*x^2 - 81113*y^2 + 60953*z^2
(-11928/42515 : -24301/42515 : 1) C2a (-1404728/2221071 : 185839/2221071 : 1)
** u= 32/285 ; C1 -443629*x^2 - 82249*y^2 + 61961*z^2
(67985/254963 : 155054/254963 : 1) C2a (-761852/89683 : -58653/89683 : 1)
** u= 32/301 ; C1 -492557*x^2 - 91625*y^2 + 70313*z^2
(-159/13667 : -59834/68335 : 1) C2a (1927604/407313 : 757573/2036565 : 1)
** u= 32/327 ; C1 -577525*x^2 - 107953*y^2 + 84977*z^2
(24599/112309 : 81802/112309 : 1) C2a (-1377372/2647805 : 208979/2647805 : 1)
** u= 32/369 ; C1 -729061*x^2 - 137185*y^2 + 111521*z^2
(-373276/990449 : 238711/990449 : 1) C2a (2679234/3788179 : 331705/3788179 : 1)
** u= 32/395 ; C1 -831709*x^2 - 157049*y^2 + 129721*z^2
(41719/134613 : -75830/134613 : 1) C2a (29470034/15697355 : 2585183/15697355 : 1)
** u= 33/103 ; C1 -67730*x^2 - 11698*y^2 + 2722*z^2
(8276/43239 : -6203/43239 : 1) C2a (-202289/57775 : 9603/57775 : 1)
** u= 33/119 ; C1 -87602*x^2 - 15250*y^2 + 5218*z^2
(16/267 : -757/1335 : 1) C2a (36359/77623 : 29871/388115 : 1)
** u= 33/215 ; C1 -260594*x^2 - 47314*y^2 + 30946*z^2
(291/4847 : 3860/4847 : 1) C2a (-1786451/175611 : -128041/175611 : 1)
** u= 35/101 ; C1 -66370*x^2 - 11426*y^2 + 1906*z^2
(1112/7157 : 1167/7157 : 1) C2a (41899/27919 : 2557/27919 : 1)
** u= 36/115 ; C1 -83981*x^2 - 14521*y^2 + 3649*z^2
(-1388/232155 : -116329/232155 : 1) C2a (5282/8577 : 673/8577 : 1)
** u= 36/125 ; C1 -97421*x^2 - 16921*y^2 + 5329*z^2
(-7008/79369 : -41245/79369 : 1) C2a (-150226/15111 : 103/207 : 1)
** u= 36/161 ; C1 -154085*x^2 - 27217*y^2 + 13033*z^2
(-17193/74119 : -30938/74119 : 1) C2a (-739396/487005 : 57143/487005 : 1)
** u= 36/211 ; C1 -254285*x^2 - 45817*y^2 + 28033*z^2
(14943/45913 : 7106/45913 : 1) C2a (4904/1615 : -21/95 : 1)
** u= 36/253 ; C1 -357773*x^2 - 65305*y^2 + 44497*z^2
(30543/196079 : -11170/15083 : 1) C2a (29105386/4588397 : 2143221/4588397 : 1)
** u= 36/295 ; C1 -478901*x^2 - 88321*y^2 + 64489*z^2
(29220/201943 : 158579/201943 : 1) C2a (-423344/641431 : 54381/641431 : 1)
** u= 36/325 ; C1 -576221*x^2 - 106921*y^2 + 80929*z^2
(117316/317505 : -46163/317505 : 1) C2a (-207142/278857 : -24783/278857 : 1)
** u= 37/91 ; C1 -56242*x^2 - 9650*y^2 + 178*z^2
(-164/3991 : -1851/19955 : 1) C2a (10019/2359 : 1061/11795 : 1)
** u= 37/139 ; C1 -118546*x^2 - 20690*y^2 + 7666*z^2
(2528/11163 : -3091/11163 : 1) C2a (-1211927/458423 : 73151/458423 : 1)
** u= 37/195 ; C1 -220354*x^2 - 39394*y^2 + 22226*z^2
(15668/49339 : 545/49339 : 1) C2a (162279/204809 : 18091/204809 : 1)
** u= 37/203 ; C1 -237458*x^2 - 42578*y^2 + 24818*z^2
(76240/256507 : 77037/256507 : 1) C2a (-2018869/542805 : -141299/542805 : 1)
** u= 37/275 ; C1 -420194*x^2 - 76994*y^2 + 53906*z^2
(820/5267 : -3969/5267 : 1) C2a (1051691/93285 : -77897/93285 : 1)
** u= 39/193 ; C1 -217874*x^2 - 38770*y^2 + 20674*z^2
(1816/102081 : 74419/102081 : 1) C2a (-95633/310327 : 22995/310327 : 1)
** u= 40/107 ; C1 -75965*x^2 - 13049*y^2 + 1289*z^2
(-609/20837 : 6382/20837 : 1) C2a (-450424/38919 : -12817/38919 : 1)
** u= 40/131 ; C1 -108365*x^2 - 18761*y^2 + 5081*z^2
(4276/43651 : -20259/43651 : 1) C2a (1248/3467 : 67117/891019 : 1)
** u= 40/147 ; C1 -133165*x^2 - 23209*y^2 + 8249*z^2
(4712/49739 : -27421/49739 : 1) C2a (443728/801703 : 62991/801703 : 1)
** u= 40/159 ; C1 -153445*x^2 - 26881*y^2 + 10961*z^2
(21352/85027 : 18587/85027 : 1) C2a (69812/161993 : -12399/161993 : 1)
** u= 40/257 ; C1 -372965*x^2 - 67649*y^2 + 43889*z^2
(54651/356839 : -257186/356839 : 1) C2a (56362/112077 : -8801/112077 : 1)
** u= 40/343 ; C1 -644725*x^2 - 119249*y^2 + 88609*z^2
(-1100/5427 : 3917/5427 : 1) C2a (5507324/2010629 : 440813/2010629 : 1)
** u= 40/351 ; C1 -673765*x^2 - 124801*y^2 + 93521*z^2
(88096/557447 : -436993/557447 : 1) C2a (1391552/1710193 : 157929/1710193 : 1)
** u= 41/279 ; C1 -436642*x^2 - 79522*y^2 + 53282*z^2
(-8704/53435 : 38693/53435 : 1) C2a (3431651/81407 : 247863/81407 : 1)
** u= 44/119 ; C1 -93685*x^2 - 16097*y^2 + 1753*z^2
(-152/4131 : -1313/4131 : 1) C2a (2668/1621 : 143/1621 : 1)
** u= 44/145 ; C1 -132581*x^2 - 22961*y^2 + 6329*z^2
(-3740/37337 : 17421/37337 : 1) C2a (-1125046/215619 : 54461/215619 : 1)
** u= 44/181 ; C1 -197597*x^2 - 34697*y^2 + 14897*z^2
(8220/56417 : -31333/56417 : 1) C2a (-606854/146787 : -36653/146787 : 1)
** u= 44/233 ; C1 -314389*x^2 - 56225*y^2 + 31849*z^2
(-4307/14667 : 4258/14667 : 1) C2a (1242116/256379 : -84455/256379 : 1)
** u= 44/243 ; C1 -339949*x^2 - 60985*y^2 + 35729*z^2
(-1069/17309 : 13006/17309 : 1) C2a (-280248/55547 : 19327/55547 : 1)
** u= 44/245 ; C1 -345181*x^2 - 61961*y^2 + 36529*z^2
(46484/148153 : -30045/148153 : 1) C2a (10550518/1960745 : -727961/1960745 : 1)
** u= 44/247 ; C1 -350453*x^2 - 62945*y^2 + 37337*z^2
(20296/65027 : -14655/65027 : 1) C2a (63296/297747 : -21479/297747 : 1)
** u= 44/251 ; C1 -361117*x^2 - 64937*y^2 + 38977*z^2
(-8548/243147 : 187295/243147 : 1) C2a (-4312672/70141 : -294791/70141 : 1)
** u= 44/301 ; C1 -507917*x^2 - 92537*y^2 + 62177*z^2
(-1397/6467 : 4170/6467 : 1) C2a (17646/1667753 : -116057/1667753 : 1)
** u= 44/313 ; C1 -546869*x^2 - 99905*y^2 + 68489*z^2
(-38031/506119 : 409498/506119 : 1) C2a (-8376172/42477 : 611809/42477 : 1)
** u= 44/315 ; C1 -553501*x^2 - 101161*y^2 + 69569*z^2
(-86096/245183 : -27995/245183 : 1) C2a (-8805132/2933785 : 675509/2933785 : 1)
** u= 44/343 ; C1 -650549*x^2 - 119585*y^2 + 85529*z^2
(4464/32719 : -25637/32719 : 1) C2a (1648696/417849 : -4075/13479 : 1)
** u= 44/349 ; C1 -672365*x^2 - 123737*y^2 + 89153*z^2
(96053/281891 : 84378/281891 : 1) C2a (493248/3048965 : 213031/3048965 : 1)
** u= 44/369 ; C1 -747685*x^2 - 138097*y^2 + 101753*z^2
(-40453/245891 : 188918/245891 : 1) C2a (-9741588/4501505 : -799579/4501505 : 1)
** u= 44/383 ; C1 -802789*x^2 - 148625*y^2 + 111049*z^2
(-67708/198147 : 338141/990735 : 1) C2a (6691456/281401 : -2553047/1407005 : 1)
** u= 47/121 ; C1 -98162*x^2 - 16850*y^2 + 1058*z^2
(-92/1457 : 1449/7285 : 1) C2a (5559/1403 : 7/61 : 1)
** u= 47/145 ; C1 -134594*x^2 - 23234*y^2 + 5186*z^2
(395/15901 : -7452/15901 : 1) C2a (-557923/19875 : -23299/19875 : 1)
** u= 47/257 ; C1 -380770*x^2 - 68258*y^2 + 39682*z^2
(-79945/247681 : -3312/247681 : 1) C2a (-5050397/1893271 : 365207/1893271 : 1)
** u= 47/313 ; C1 -550898*x^2 - 100178*y^2 + 66338*z^2
(155/13633 : 11088/13633 : 1) C2a (-344973/154525 : -27007/154525 : 1)
** u= 47/361 ; C1 -721682*x^2 - 132530*y^2 + 94178*z^2
(119784/444677 : -249767/444677 : 1) C2a (-13033/38409 : -13/177 : 1)
** u= 47/369 ; C1 -752386*x^2 - 138370*y^2 + 99266*z^2
(-35632/347453 : 282317/347453 : 1) C2a (82919/10421 : 6237/10421 : 1)
** u= 47/393 ; C1 -848338*x^2 - 156658*y^2 + 115298*z^2
(52240/141841 : 5381/141841 : 1) C2a (-7282647/1062991 : -555949/1062991 : 1)
** u= 48/193 ; C1 -225605*x^2 - 39553*y^2 + 16417*z^2
(1317/52879 : 33922/52879 : 1) C2a (-25562548/4043851 : 1482123/4043851 : 1)
** u= 48/209 ; C1 -260837*x^2 - 45985*y^2 + 21313*z^2
(7263/77651 : 49954/77651 : 1) C2a (8789042/912499 : 531927/912499 : 1)
** u= 48/211 ; C1 -265421*x^2 - 46825*y^2 + 21961*z^2
(-17741/84873 : -199646/424365 : 1) C2a (-1012/36989 : 13329/184945 : 1)
** u= 48/239 ; C1 -333797*x^2 - 59425*y^2 + 31873*z^2
(-2796/9343 : 1705/9343 : 1) C2a (12206/7785 : 4823/38925 : 1)
** u= 48/307 ; C1 -532493*x^2 - 96553*y^2 + 62473*z^2
(-1865/36213 : -28798/36213 : 1) C2a (3620816/30755 : 256941/30755 : 1)
** u= 48/335 ; C1 -627749*x^2 - 114529*y^2 + 77761*z^2
(6765/19817 : -3974/19817 : 1) C2a (6770564/21626029 : -1581069/21626029 : 1)
** u= 48/347 ; C1 -670973*x^2 - 122713*y^2 + 84793*z^2
(7468/22983 : 317705/942303 : 1) C2a (-61568/22679 : -195999/929839 : 1)
** u= 48/349 ; C1 -678317*x^2 - 124105*y^2 + 85993*z^2
(-459/1327 : 262/1327 : 1) C2a (937544/719067 : 84971/719067 : 1)
** u= 49/127 ; C1 -107938*x^2 - 18530*y^2 + 1282*z^2
(56/603 : -83/603 : 1) C2a (11093/3139 : -347/3139 : 1)
** u= 49/239 ; C1 -334850*x^2 - 59522*y^2 + 31298*z^2
(-8701/30035 : 1392/6007 : 1) C2a (166513/32829 : -10907/32829 : 1)
** u= 49/375 ; C1 -779026*x^2 - 143026*y^2 + 101474*z^2
(53048/159335 : -51811/159335 : 1) C2a (632133/226727 : -49507/226727 : 1)
** u= 49/391 ; C1 -843442*x^2 - 155282*y^2 + 112162*z^2
(-18229/52759 : -14340/52759 : 1) C2a (1174391/3191105 : -236491/3191105 : 1)
** u= 51/133 ; C1 -118178*x^2 - 20290*y^2 + 1522*z^2
(45356/402537 : 13147/402537 : 1) C2a (28903/6561 : 851/6561 : 1)
** u= 51/293 ; C1 -491618*x^2 - 88450*y^2 + 53362*z^2
(4581/32585 : 114448/162925 : 1) C2a (93211/140763 : -11807/140763 : 1)
** u= 51/317 ; C1 -569714*x^2 - 103090*y^2 + 65554*z^2
(-18572/54753 : 5501/711789 : 1) C2a (-103/3043 : 2775/39559 : 1)
** u= 51/365 ; C1 -743186*x^2 - 135826*y^2 + 93394*z^2
(55895/399417 : -304304/399417 : 1) C2a (-6767/20923 : 219/2989 : 1)
** u= 52/161 ; C1 -165797*x^2 - 28625*y^2 + 6473*z^2
(14096/72617 : -32241/363085 : 1) C2a (-110736/148813 : -11911/148813 : 1)
** u= 52/185 ; C1 -212309*x^2 - 36929*y^2 + 12281*z^2
(-1047003/5005451 : -1424710/5005451 : 1) C2a (2363622/379657 : 123407/379657 : 1)
** u= 52/191 ; C1 -224837*x^2 - 39185*y^2 + 13913*z^2
(-106737/533801 : 189214/533801 : 1) C2a (-391656/619943 : 49709/619943 : 1)
** u= 52/203 ; C1 -250973*x^2 - 43913*y^2 + 17393*z^2
(12612/50135 : 9299/50135 : 1) C2a (-2667436/1705605 : 193129/1705605 : 1)
** u= 52/303 ; C1 -524773*x^2 - 94513*y^2 + 57593*z^2
(14132/97295 : -68261/97295 : 1) C2a (-6711048/3252229 : 515849/3252229 : 1)
** u= 52/319 ; C1 -577861*x^2 - 104465*y^2 + 65881*z^2
(10972/1364387 : -1083201/1364387 : 1) C2a (-10310254/5101451 : 806155/5101451 : 1)
** u= 52/329 ; C1 -612341*x^2 - 110945*y^2 + 71321*z^2
(-128076/726629 : 498881/726629 : 1) C2a (10968024/2680979 : 798151/2680979 : 1)
** u= 52/331 ; C1 -619357*x^2 - 112265*y^2 + 72433*z^2
(8768/72951 : 54859/72951 : 1) C2a (-1695104/907063 : 135853/907063 : 1)
** u= 52/343 ; C1 -662293*x^2 - 120353*y^2 + 79273*z^2
(153992/674935 : 411771/674935 : 1) C2a (2575388/159619 : -184721/159619 : 1)
** u= 52/353 ; C1 -699173*x^2 - 127313*y^2 + 85193*z^2
(-221755/867883 : 483702/867883 : 1) C2a (-905218/96669 : 65669/96669 : 1)
** u= 52/359 ; C1 -721781*x^2 - 131585*y^2 + 88841*z^2
(287772/990427 : 456119/990427 : 1) C2a (99804/244819 : 18497/244819 : 1)
** u= 53/259 ; C1 -393122*x^2 - 69890*y^2 + 36818*z^2
(-55212/233291 : -107351/233291 : 1) C2a (33303/46811 : -3967/46811 : 1)
** u= 53/315 ; C1 -565714*x^2 - 102034*y^2 + 63026*z^2
(31744/508223 : 392375/508223 : 1) C2a (-2716731/2497801 : 257609/2497801 : 1)
** u= 55/161 ; C1 -168050*x^2 - 28946*y^2 + 5186*z^2
(-3483/19865 : 104/3973 : 1) C2a (-2714691/9230689 : -689467/9230689 : 1)
** u= 55/321 ; C1 -588850*x^2 - 106066*y^2 + 64706*z^2
(65648/200825 : 5207/40165 : 1) C2a (25819/6269 : -1833/6269 : 1)
** u= 56/137 ; C1 -127669*x^2 - 21905*y^2 + 289*z^2
(4913/103723 : 1122/103723 : 1) C2a (15766/4811 : 23/283 : 1)
** u= 56/141 ; C1 -134125*x^2 - 23017*y^2 + 953*z^2
(29/367 : 26/367 : 1) C2a (27438/3565 : 559/3565 : 1)
** u= 56/151 ; C1 -150965*x^2 - 25937*y^2 + 2753*z^2
(2264/18391 : 2463/18391 : 1) C2a (20900522/1632741 : 612743/1632741 : 1)
** u= 56/157 ; C1 -161549*x^2 - 27785*y^2 + 3929*z^2
(5679/36539 : -1130/36539 : 1) C2a (-54256/26781 : 2677/26781 : 1)
** u= 56/183 ; C1 -211573*x^2 - 36625*y^2 + 9857*z^2
(-2303/10709 : -2378/53545 : 1) C2a (456/197 : 127/985 : 1)
** u= 56/187 ; C1 -219869*x^2 - 38105*y^2 + 10889*z^2
(23019/813449 : 33178/62573 : 1) C2a (-2326/5169 : 395/5169 : 1)
** u= 56/201 ; C1 -250165*x^2 - 43537*y^2 + 14753*z^2
(-9284/48049 : -16943/48049 : 1) C2a (17234666406/1460809153 : -891456149/1460809153 : 1)
** u= 56/241 ; C1 -347525*x^2 - 61217*y^2 + 27953*z^2
(-20336/192605 : -24159/38521 : 1) C2a (-8498398/404595 : -507439/404595 : 1)
** u= 56/249 ; C1 -368917*x^2 - 65137*y^2 + 30977*z^2
(-75755/462311 : -262946/462311 : 1) C2a (3258252/667475 : -203957/667475 : 1)
** u= 56/265 ; C1 -413621*x^2 - 73361*y^2 + 37409*z^2
(-57157/1480535 : 1048494/1480535 : 1) C2a (4210896/1305469 : 281269/1305469 : 1)
** u= 56/269 ; C1 -425197*x^2 - 75497*y^2 + 39097*z^2
(1796/95629 : -68685/95629 : 1) C2a (61034/104893 : -8447/104893 : 1)
** u= 56/279 ; C1 -454837*x^2 - 80977*y^2 + 43457*z^2
(-517/20857 : -15230/20857 : 1) C2a (2863436/1733015 : -222561/1733015 : 1)
** u= 56/289 ; C1 -485477*x^2 - 86657*y^2 + 48017*z^2
(31296/697165 : -513643/697165 : 1) C2a (-172398/316871 : -25229/316871 : 1)
** u= 56/291 ; C1 -491725*x^2 - 87817*y^2 + 48953*z^2
(-138413/446305 : 12266/89261 : 1) C2a (-115512/359285 : 26659/359285 : 1)
** u= 56/295 ; C1 -504341*x^2 - 90161*y^2 + 50849*z^2
(-33392/514375 : -378129/514375 : 1) C2a (-1688196/1302355 : -145147/1302355 : 1)
** u= 56/325 ; C1 -604061*x^2 - 108761*y^2 + 66089*z^2
(36763/194359 : 124290/194359 : 1) C2a (-1517448/1260703 : 137063/1260703 : 1)
** u= 56/333 ; C1 -632173*x^2 - 114025*y^2 + 70457*z^2
(22237/152671 : 107986/152671 : 1) C2a (235142/246073 : -118911/1230365 : 1)
** u= 56/355 ; C1 -712781*x^2 - 129161*y^2 + 83129*z^2
(-24315/182873 : 135134/182873 : 1) C2a (1386314/1099635 : -124703/1099635 : 1)
** u= 56/379 ; C1 -806237*x^2 - 146777*y^2 + 98057*z^2
(27000/305567 : 241607/305567 : 1) C2a (-376856/328455 : 35519/328455 : 1)
** u= 56/381 ; C1 -814285*x^2 - 148297*y^2 + 99353*z^2
(221227/795287 : -393706/795287 : 1) C2a (2433444/1098445 : 191627/1098445 : 1)
** u= 56/393 ; C1 -863413*x^2 - 157585*y^2 + 107297*z^2
(49279/3293483 : 2715190/3293483 : 1) C2a (2795124/127903 : 203657/127903 : 1)
** u= 57/239 ; C1 -343346*x^2 - 60370*y^2 + 26626*z^2
(-15976/87339 : 43735/87339 : 1) C2a (934921/533961 : -67013/533961 : 1)
** u= 57/391 ; C1 -856802*x^2 - 156130*y^2 + 105058*z^2
(228084/968923 : -588413/968923 : 1) C2a (3486203/22831 : 252279/22831 : 1)
** u= 59/149 ; C1 -149650*x^2 - 25682*y^2 + 1138*z^2
(-851/15445 : 504/3089 : 1) C2a (-2593699/168395 : 49757/168395 : 1)
** u= 59/253 ; C1 -383234*x^2 - 67490*y^2 + 30674*z^2
(15204/55589 : 9583/55589 : 1) C2a (-4189/19971 : -209/2853 : 1)
** u= 59/373 ; C1 -787154*x^2 - 142610*y^2 + 91634*z^2
(19917/59237 : -8072/59237 : 1) C2a (23733/18337 : 2113/18337 : 1)
** u= 60/161 ; C1 -171845*x^2 - 29521*y^2 + 3001*z^2
(-2500/23889 : -4651/23889 : 1) C2a (365092/286803 : 23599/286803 : 1)
** u= 60/187 ; C1 -223325*x^2 - 38569*y^2 + 8929*z^2
(-936/9695 : 817/1939 : 1) C2a (-110667866/18274725 : 4886509/18274725 : 1)
** u= 60/229 ; C1 -320765*x^2 - 56041*y^2 + 21361*z^2
(14013/125851 : -70094/125851 : 1) C2a (3814246/16300059 : 1204613/16300059 : 1)
** u= 60/371 ; C1 -780845*x^2 - 141241*y^2 + 89521*z^2
(-3061/151269 : 120214/151269 : 1) C2a (2015998/190785 : 142217/190785 : 1)
** u= 61/267 ; C1 -425314*x^2 - 75010*y^2 + 34994*z^2
(36956/129371 : 8015/129371 : 1) C2a (-10421811/196409 : 628115/196409 : 1)
** u= 61/387 ; C1 -846994*x^2 - 153490*y^2 + 98834*z^2
(97076/619291 : -441533/619291 : 1) C2a (14219/207589 : 14565/207589 : 1)
** u= 63/265 ; C1 -421874*x^2 - 74194*y^2 + 32866*z^2
(15460/124353 : -74101/124353 : 1) C2a (-311207/2603 : -18273/2603 : 1)
** u= 63/361 ; C1 -746546*x^2 - 134290*y^2 + 80866*z^2
(93237/290257 : -49048/290257 : 1) C2a (-80708101/166494669 : -12982495/166494669 : 1)
** u= 64/165 ; C1 -182461*x^2 - 31321*y^2 + 2009*z^2
(1393/144611 : -36470/144611 : 1) C2a (288318/190015 : -2213/27145 : 1)
** u= 64/171 ; C1 -194077*x^2 - 33337*y^2 + 3257*z^2
(17768/138695 : 6439/138695 : 1) C2a (6512848/294425 : -180903/294425 : 1)
** u= 64/189 ; C1 -231085*x^2 - 39817*y^2 + 7433*z^2
(-5296/258421 : 110923/258421 : 1) C2a (482730198/88390705 : -19523059/88390705 : 1)
** u= 64/195 ; C1 -244141*x^2 - 42121*y^2 + 8969*z^2
(2467/32825 : -13934/32825 : 1) C2a (1982316/179971 : -81779/179971 : 1)
** u= 64/197 ; C1 -248573*x^2 - 42905*y^2 + 9497*z^2
(7484/50413 : -15429/50413 : 1) C2a (78878/14019 : 3433/14019 : 1)
** u= 64/209 ; C1 -276005*x^2 - 47777*y^2 + 12833*z^2
(5417/41387 : 17046/41387 : 1) C2a (-110074/1203333 : -88591/1203333 : 1)
** u= 64/213 ; C1 -285469*x^2 - 49465*y^2 + 14009*z^2
(26629/124271 : 16774/124271 : 1) C2a (197178/803 : -9257/803 : 1)
** u= 64/257 ; C1 -400133*x^2 - 70145*y^2 + 29057*z^2
(-8176/112337 : 69615/112337 : 1) C2a (-5510584/1615593 : 47729/230799 : 1)
** u= 64/301 ; C1 -534157*x^2 - 94697*y^2 + 47977*z^2
(745/2491 : 114/2491 : 1) C2a (15982388/3290491 : 1030891/3290491 : 1)
** u= 64/307 ; C1 -553933*x^2 - 98345*y^2 + 50857*z^2
(10813/41001 : 14518/41001 : 1) C2a (-2074534/1570337 : 173059/1570337 : 1)
** u= 64/311 ; C1 -567317*x^2 - 100817*y^2 + 52817*z^2
(101488/637795 : 393891/637795 : 1) C2a (-299786/2228115 : -160441/2228115 : 1)
** u= 64/323 ; C1 -608429*x^2 - 108425*y^2 + 58889*z^2
(-4203/85249 : 310162/426245 : 1) C2a (8678/9471 : -4399/47355 : 1)
** u= 64/325 ; C1 -615421*x^2 - 109721*y^2 + 59929*z^2
(498455/2836811 : 1732602/2836811 : 1) C2a (-278888/245857 : -25247/245857 : 1)
** u= 64/339 ; C1 -665485*x^2 - 119017*y^2 + 67433*z^2
(156644/658423 : 329279/658423 : 1) C2a (-139888386/13157525 : -9335713/13157525 : 1)
** u= 65/167 ; C1 -187090*x^2 - 32114*y^2 + 1954*z^2
(-1976/19379 : -321/19379 : 1) C2a (597649/3091 : -13007/3091 : 1)
** u= 65/199 ; C1 -253970*x^2 - 43826*y^2 + 9506*z^2
(-2436/25339 : -10241/25339 : 1) C2a (-783619/210735 : -5107/30105 : 1)
** u= 65/391 ; C1 -870290*x^2 - 157106*y^2 + 97826*z^2
(-748/2543 : 963/2543 : 1) C2a (-12674673/180923 : 882391/180923 : 1)
** u= 67/389 ; C1 -865346*x^2 - 155810*y^2 + 94706*z^2
(-84451/553409 : 382812/553409 : 1) C2a (41521351/41069511 : 4066387/41069511 : 1)
** u= 68/169 ; C1 -193397*x^2 - 33185*y^2 + 953*z^2
(6201/164887 : 23594/164887 : 1) C2a (-111554/16827 : -2083/16827 : 1)
** u= 68/171 ; C1 -197341*x^2 - 33865*y^2 + 1361*z^2
(1231/45529 : -8630/45529 : 1) C2a (-524118/73657 : 10759/73657 : 1)
** u= 68/177 ; C1 -209413*x^2 - 35953*y^2 + 2633*z^2
(1568/82165 : -21911/82165 : 1) C2a (-156482/74719 : 6681/74719 : 1)
** u= 68/189 ; C1 -234637*x^2 - 40345*y^2 + 5393*z^2
(-11273/343639 : -122662/343639 : 1) C2a (19630604/428833 : -633939/428833 : 1)
** u= 68/229 ; C1 -329117*x^2 - 57065*y^2 + 16673*z^2
(-23993/156439 : 61890/156439 : 1) C2a (-1729836/112213 : -82895/112213 : 1)
** u= 68/275 ; C1 -457549*x^2 - 80249*y^2 + 33601*z^2
(57020/241831 : -77133/241831 : 1) C2a (384556/1671125 : -123127/1671125 : 1)
** u= 68/295 ; C1 -519989*x^2 - 91649*y^2 + 42281*z^2
(-72864/280975 : -79363/280975 : 1) C2a (-179034/271495 : 22327/271495 : 1)
** u= 68/313 ; C1 -579605*x^2 - 102593*y^2 + 50777*z^2
(-19181/71203 : 20754/71203 : 1) C2a (11452704/2730695 : 737317/2730695 : 1)
** u= 68/337 ; C1 -664133*x^2 - 118193*y^2 + 63113*z^2
(-20040/247493 : 174503/247493 : 1) C2a (-22174442/3535941 : 1451549/3535941 : 1)
** u= 68/365 ; C1 -770029*x^2 - 137849*y^2 + 78961*z^2
(81209/369015 : -202882/369015 : 1) C2a (18482876/4188305 : -4517/14905 : 1)
** u= 69/179 ; C1 -214370*x^2 - 36802*y^2 + 2578*z^2
(-3852/45343 : 7589/45343 : 1) C2a (-614251/76525 : -15423/76525 : 1)
** u= 71/273 ; C1 -455218*x^2 - 79570*y^2 + 30722*z^2
(-1669/9113 : 4016/9113 : 1) C2a (-1818459/3787 : 99679/3787 : 1)
** u= 71/377 ; C1 -822754*x^2 - 147170*y^2 + 83554*z^2
(-7493/64837 : -45528/64837 : 1) C2a (5473/395743 : -28097/395743 : 1)
** u= 72/185 ; C1 -229589*x^2 - 39409*y^2 + 2401*z^2
(-1568/59385 : -14161/59385 : 1) C2a (-14716/169785 : -257/3465 : 1)
** u= 72/187 ; C1 -233885*x^2 - 40153*y^2 + 2857*z^2
(-25340/251751 : -27737/251751 : 1) C2a (8289932/581515 : -199779/581515 : 1)
** u= 72/203 ; C1 -269693*x^2 - 46393*y^2 + 6793*z^2
(-856/80919 : 835/2187 : 1) C2a (-313702/342921 : -27491/342921 : 1)
** u= 72/205 ; C1 -274349*x^2 - 47209*y^2 + 7321*z^2
(16504/116265 : -22657/116265 : 1) C2a (2671706/352799 : -96411/352799 : 1)
** u= 72/217 ; C1 -303125*x^2 - 52273*y^2 + 10657*z^2
(29112/155825 : -239/6233 : 1) C2a (434302/117099 : -19337/117099 : 1)
** u= 72/257 ; C1 -409445*x^2 - 71233*y^2 + 23857*z^2
(-118920/501749 : 55027/501749 : 1) C2a (-14101418/1649295 : -729941/1649295 : 1)
** u= 72/265 ; C1 -432629*x^2 - 75409*y^2 + 26881*z^2
(-48936/220733 : 60245/220733 : 1) C2a (-198994/532785 : -40267/532785 : 1)
** u= 72/359 ; C1 -752981*x^2 - 134065*y^2 + 72001*z^2
(141516/1703651 : -1202621/1703651 : 1) C2a (-4672324/1433211 : 318899/1433211 : 1)
** u= 73/207 ; C1 -280018*x^2 - 48178*y^2 + 7298*z^2
(-9800/214499 : -80071/214499 : 1) C2a (-108159/7703 : -3757/7703 : 1)
** u= 73/399 ; C1 -917842*x^2 - 164530*y^2 + 95618*z^2
(-10028/111859 : 81919/111859 : 1) C2a (-374969/16823 : 25245/16823 : 1)
** u= 76/195 ; C1 -255181*x^2 - 43801*y^2 + 2609*z^2
(26752/264719 : -2155/264719 : 1) C2a (-1934544/2209 : 41651/2209 : 1)
** u= 76/217 ; C1 -307189*x^2 - 52865*y^2 + 8329*z^2
(10552/66877 : -7593/66877 : 1) C2a (-8309626/374789 : -292283/374789 : 1)
** u= 76/223 ; C1 -322213*x^2 - 55505*y^2 + 10057*z^2
(2152/12239 : -507/12239 : 1) C2a (41882/41399 : -3439/41399 : 1)
** u= 76/231 ; C1 -342805*x^2 - 59137*y^2 + 12473*z^2
(1808/51811 : -23393/51811 : 1) C2a (-868372/149135 : -36861/149135 : 1)
** u= 76/235 ; C1 -353341*x^2 - 61001*y^2 + 13729*z^2
(-72607/391489 : 62910/391489 : 1) C2a (57224/820981 : -60559/820981 : 1)
** u= 76/239 ; C1 -364037*x^2 - 62897*y^2 + 15017*z^2
(-10263/58265 : 14174/58265 : 1) C2a (-117618/14225 : -5177/14225 : 1)
** u= 76/287 ; C1 -504869*x^2 - 88145*y^2 + 32969*z^2
(-324/4399 : -43795/74783 : 1) C2a (-30610236/3201919 : 28353539/54432623 : 1)
** u= 76/297 ; C1 -537109*x^2 - 93985*y^2 + 37289*z^2
(-6076/130729 : 81053/130729 : 1) C2a (-28456878/703633 : -226009/100519 : 1)
** u= 76/333 ; C1 -661453*x^2 - 116665*y^2 + 54497*z^2
(764/9697 : 6373/9697 : 1) C2a (174918/155771 : -15403/155771 : 1)
** u= 77/235 ; C1 -354434*x^2 - 61154*y^2 + 13106*z^2
(-8560/183767 : 82539/183767 : 1) C2a (-103981/22119 : 4549/22119 : 1)
** u= 77/339 ; C1 -684946*x^2 - 120850*y^2 + 56786*z^2
(-3268/11575 : -7787/57875 : 1) C2a (-1106545/366907 : 359727/1834535 : 1)
** u= 79/209 ; C1 -290690*x^2 - 49922*y^2 + 4418*z^2
(9024/162601 : -43193/162601 : 1) C2a (76731/19787 : -53/421 : 1)
** u= 79/257 ; C1 -417698*x^2 - 72290*y^2 + 19202*z^2
(-4612/280141 : -315/613 : 1) C2a (-1453417/862671 : 91591/862671 : 1)
** u= 79/273 ; C1 -465154*x^2 - 80770*y^2 + 25154*z^2
(-8531/110629 : 58244/110629 : 1) C2a (-72623/34607 : 4383/34607 : 1)
** u= 79/321 ; C1 -622882*x^2 - 109282*y^2 + 46082*z^2
(-7075/85997 : 53228/85997 : 1) C2a (-7907119/183353 : -453153/183353 : 1)
** u= 80/207 ; C1 -286885*x^2 - 49249*y^2 + 3329*z^2
(29872/307171 : -34349/307171 : 1) C2a (50862/58385 : -4483/58385 : 1)
** u= 80/211 ; C1 -296525*x^2 - 50921*y^2 + 4361*z^2
(-567/45925 : -2674/9185 : 1) C2a (75834/21259 : 359/3037 : 1)
** u= 80/261 ; C1 -430525*x^2 - 74521*y^2 + 19961*z^2
(37201/176387 : 18398/176387 : 1) C2a (-7550432/136777 : -344871/136777 : 1)
** u= 80/269 ; C1 -454285*x^2 - 78761*y^2 + 22921*z^2
(4117/36831 : 17234/36831 : 1) C2a (53434/22925 : -3049/22925 : 1)
** u= 80/341 ; C1 -696925*x^2 - 122681*y^2 + 55321*z^2
(17213/434935 : -57834/86987 : 1) C2a (303823966/112789831 : 2822221/16112833 : 1)
** u= 80/367 ; C1 -797285*x^2 - 141089*y^2 + 69569*z^2
(186405/874433 : -425062/874433 : 1) C2a (8503046/2471349 : 555823/2471349 : 1)
** u= 83/237 ; C1 -366418*x^2 - 63058*y^2 + 9938*z^2
(-3221/19901 : 1460/19901 : 1) C2a (-4010621/275633 : 141927/275633 : 1)
** u= 83/357 ; C1 -762658*x^2 - 134338*y^2 + 61298*z^2
(-4805/94361 : -62704/94361 : 1) C2a (27254731/37057 : -1624107/37057 : 1)
** u= 83/389 ; C1 -892642*x^2 - 158210*y^2 + 79858*z^2
(36052/348089 : -232005/348089 : 1) C2a (8326709/3789353 : 588355/3789353 : 1)
** u= 84/253 ; C1 -412109*x^2 - 71065*y^2 + 14449*z^2
(12948/83593 : -21179/83593 : 1) C2a (-35516/84991 : 6429/84991 : 1)
** u= 84/269 ; C1 -459245*x^2 - 79417*y^2 + 20113*z^2
(127280/626517 : -75689/626517 : 1) C2a (-470164/525983 : -43971/525983 : 1)
** u= 84/275 ; C1 -477581*x^2 - 82681*y^2 + 22369*z^2
(-223167/1172425 : 290194/1172425 : 1) C2a (-1132304/790681 : 77949/790681 : 1)
** u= 84/323 ; C1 -637229*x^2 - 111385*y^2 + 43009*z^2
(12444/130879 : 75685/130879 : 1) C2a (-3691550054/12866421 : -202361627/12866421 : 1)
** u= 84/337 ; C1 -688133*x^2 - 120625*y^2 + 49897*z^2
(456/2173 : -4379/10865 : 1) C2a (97984/22097 : -28929/110485 : 1)
** u= 84/395 ; C1 -919901*x^2 - 163081*y^2 + 82609*z^2
(33044/128823 : 47405/128823 : 1) C2a (-1044880646/499776471 : 74746841/499776471 : 1)
** u= 85/227 ; C1 -342050*x^2 - 58754*y^2 + 5714*z^2
(-5216/91315 : -5109/18263 : 1) C2a (-1439317/117423 : 40541/117423 : 1)
** u= 85/251 ; C1 -407570*x^2 - 70226*y^2 + 13106*z^2
(-4185/165743 : 70888/165743 : 1) C2a (12563/7263 : -719/7263 : 1)
** u= 88/233 ; C1 -361205*x^2 - 62033*y^2 + 5537*z^2
(-1141/37831 : -10962/37831 : 1) C2a (-3859094/559545 : -15691/79935 : 1)
** u= 88/245 ; C1 -394109*x^2 - 67769*y^2 + 9161*z^2
(684/29345 : -138611/381485 : 1) C2a (40248/18145 : -24347/235885 : 1)
** u= 88/255 ; C1 -422629*x^2 - 72769*y^2 + 12401*z^2
(15068/133255 : 41321/133255 : 1) C2a (191674/4175 : -6987/4175 : 1)
** u= 89/231 ; C1 -356962*x^2 - 61282*y^2 + 4322*z^2
(-6232/73823 : 12575/73823 : 1) C2a (-9554199/171505 : 224191/171505 : 1)
** u= 89/239 ; C1 -378610*x^2 - 65042*y^2 + 6658*z^2
(25367/198779 : 17292/198779 : 1) C2a (36389/17963 : -1681/17963 : 1)
** u= 89/399 ; C1 -945970*x^2 - 167122*y^2 + 80258*z^2
(-76213/273911 : -56152/273911 : 1) C2a (279/67567 : -4861/67567 : 1)
** u= 91/381 ; C1 -872770*x^2 - 153442*y^2 + 67538*z^2
(42068/540953 : -344581/540953 : 1) C2a (-1737/229 : 103/229 : 1)
** u= 92/259 ; C1 -439181*x^2 - 75545*y^2 + 10961*z^2
(-4041/57289 : -19526/57289 : 1) C2a (1191216/70169 : -40363/70169 : 1)
** u= 92/329 ; C1 -670741*x^2 - 116705*y^2 + 39241*z^2
(40813/183563 : 41910/183563 : 1) C2a (-55552/4043 : -2857/4043 : 1)
** u= 92/349 ; C1 -745901*x^2 - 130265*y^2 + 49121*z^2
(-19539/79931 : -14938/79931 : 1) C2a (963928/885993 : -83005/885993 : 1)
** u= 92/381 ; C1 -874477*x^2 - 153625*y^2 + 66593*z^2
(9448/37061 : 46709/185305 : 1) C2a (257658/15731 : 75041/78655 : 1)
** u= 93/307 ; C1 -594098*x^2 - 102898*y^2 + 28498*z^2
(-11943/59015 : -11876/59015 : 1) C2a (269993/614055 : -46817/614055 : 1)
** u= 96/239 ; C1 -386597*x^2 - 66337*y^2 + 2017*z^2
(-5939/99369 : 9730/99369 : 1) C2a (-233836/2813 : 3603/2813 : 1)
** u= 96/257 ; C1 -438149*x^2 - 75265*y^2 + 7489*z^2
(-53343/486787 : -83746/486787 : 1) C2a (-219202/10273 : 6147/10273 : 1)
** u= 96/341 ; C1 -721565*x^2 - 125497*y^2 + 41593*z^2
(-266832/1138729 : -142793/1138729 : 1) C2a (77232212/7220851 : 3957693/7220851 : 1)
** u= 96/343 ; C1 -729173*x^2 - 126865*y^2 + 42577*z^2
(-76329/316117 : 7142/316117 : 1) C2a (-288346/2373 : -14737/2373 : 1)
** u= 96/359 ; C1 -791477*x^2 - 138097*y^2 + 50737*z^2
(-28396/124731 : -33085/124731 : 1) C2a (-878696/809273 : -75417/809273 : 1)
** u= 96/371 ; C1 -839885*x^2 - 146857*y^2 + 57193*z^2
(125485/507849 : -101918/507849 : 1) C2a (201104/551603 : 41619/551603 : 1)
** u= 97/287 ; C1 -532610*x^2 - 91778*y^2 + 17282*z^2
(99/667 : 164/667 : 1) C2a (2399021/228957 : -93379/228957 : 1)
** u= 97/391 ; C1 -925522*x^2 - 162290*y^2 + 67618*z^2
(-41344/183367 : -65277/183367 : 1) C2a (48983/7301 : 2839/7301 : 1)
** u= 100/263 ; C1 -461045*x^2 - 79169*y^2 + 6569*z^2
(-7968/301163 : 84593/301163 : 1) C2a (148344/65375 : -6139/65375 : 1)
** u= 100/273 ; C1 -491845*x^2 - 84529*y^2 + 9929*z^2
(-5836/103333 : 32497/103333 : 1) C2a (16968558/2801147 : 553379/2801147 : 1)
** u= 100/357 ; C1 -790045*x^2 - 137449*y^2 + 46049*z^2
(-134983/588487 : 106282/588487 : 1) C2a (-640196/5360789 : 393327/5360789 : 1)
** u= 100/363 ; C1 -814045*x^2 - 141769*y^2 + 49169*z^2
(289924/1857391 : 844901/1857391 : 1) C2a (-1199574/2590639 : 199217/2590639 : 1)
** u= 100/383 ; C1 -896645*x^2 - 156689*y^2 + 60089*z^2
(-34581/501661 : 299446/501661 : 1) C2a (-14638402/7443783 : -965911/7443783 : 1)
** u= 101/267 ; C1 -474514*x^2 - 81490*y^2 + 7154*z^2
(763/61363 : -18088/61363 : 1) C2a (-19533/4123 : 85/589 : 1)
** u= 101/331 ; C1 -691730*x^2 - 119762*y^2 + 32498*z^2
(-21480/356023 : 178129/356023 : 1) C2a (-6491/1923 : -84827/494211 : 1)
** u= 101/371 ; C1 -848290*x^2 - 147842*y^2 + 52498*z^2
(-6889/74267 : -41064/74267 : 1) C2a (179251/490267 : -37001/490267 : 1)
** u= 103/249 ; C1 -423202*x^2 - 72610*y^2 + 98*z^2
(-12859/1378493 : -40012/1378493 : 1) C2a (-229007/8771 : 141/1253 : 1)
** u= 104/289 ; C1 -548645*x^2 - 94337*y^2 + 12593*z^2
(-22589/363199 : -121002/363199 : 1) C2a (3758718/962465 : -20077/137495 : 1)
** u= 104/305 ; C1 -602821*x^2 - 103841*y^2 + 18769*z^2
(4384/144265 : 60417/144265 : 1) C2a (-346042/139603 : -121/1019 : 1)
** u= 104/361 ; C1 -812597*x^2 - 141137*y^2 + 44417*z^2
(10495/46219 : 6174/46219 : 1) C2a (-396152/222009 : -25471/222009 : 1)
** u= 104/379 ; C1 -886685*x^2 - 154457*y^2 + 53993*z^2
(-14845/66193 : 16326/66193 : 1) C2a (23328/15685 : 429443/4031045 : 1)
** u= 104/385 ; C1 -912101*x^2 - 159041*y^2 + 57329*z^2
(49320/212117 : -47629/212117 : 1) C2a (1742604/1764565 : 158387/1764565 : 1)
** u= 104/397 ; C1 -964013*x^2 - 168425*y^2 + 64217*z^2
(5768/22469 : -1437/22469 : 1) C2a (4945164/322013 : -270389/322013 : 1)
** u= 105/271 ; C1 -492050*x^2 - 84466*y^2 + 5506*z^2
(-239/4851 : -1096/4851 : 1) C2a (-1960877/16153 : 44181/16153 : 1)
** u= 105/311 ; C1 -625250*x^2 - 107746*y^2 + 20386*z^2
(-2348/14355 : 529/2871 : 1) C2a (-34163/76773 : 5819/76773 : 1)
** u= 107/261 ; C1 -463762*x^2 - 79570*y^2 + 818*z^2
(1832/43909 : -509/43909 : 1) C2a (-292671/13433 : -2801/13433 : 1)
** u= 107/277 ; C1 -513650*x^2 - 88178*y^2 + 6002*z^2
(17535/186817 : 24176/186817 : 1) C2a (-3602543/155679 : 83713/155679 : 1)
** u= 107/373 ; C1 -866738*x^2 - 150578*y^2 + 47858*z^2
(56428/252157 : 43365/252157 : 1) C2a (7659639/1440277 : 395267/1440277 : 1)
** u= 108/269 ; C1 -489677*x^2 - 84025*y^2 + 2593*z^2
(-104/16401 : -14351/82005 : 1) C2a (-21389722/101663 : -1657803/508315 : 1)
** u= 108/289 ; C1 -554117*x^2 - 95185*y^2 + 9433*z^2
(-42888/509809 : 122675/509809 : 1) C2a (-665204/80973 : 19423/80973 : 1)
** u= 108/317 ; C1 -651053*x^2 - 112153*y^2 + 20353*z^2
(24707/140235 : -5026/140235 : 1) C2a (231019864/67345237 : 10006167/67345237 : 1)
** u= 108/325 ; C1 -680189*x^2 - 117289*y^2 + 23761*z^2
(-536856/3033317 : -438815/3033317 : 1) C2a (-19568/107 : 777/107 : 1)
** u= 108/385 ; C1 -919109*x^2 - 159889*y^2 + 53401*z^2
(36159/177127 : 54430/177127 : 1) C2a (-1182326/1021035 : 95957/1021035 : 1)
** u= 109/283 ; C1 -535714*x^2 - 91970*y^2 + 6514*z^2
(-71776/679139 : 51567/679139 : 1) C2a (1252411/201581 : -32983/201581 : 1)
** u= 112/275 ; C1 -513869*x^2 - 88169*y^2 + 1481*z^2
(405011/7598473 : -117450/7598473 : 1) C2a (-197244/6809 : 2311/6809 : 1)
** u= 112/289 ; C1 -559621*x^2 - 96065*y^2 + 6241*z^2
(3871/144211 : -35550/144211 : 1) C2a (2074426/365849 : -683/4631 : 1)
** u= 112/331 ; C1 -708637*x^2 - 122105*y^2 + 22873*z^2
(221291/1234017 : -32530/1234017 : 1) C2a (11340514/1963223 : 456619/1963223 : 1)
** u= 112/333 ; C1 -716173*x^2 - 123433*y^2 + 23753*z^2
(-18356/155245 : 51797/155245 : 1) C2a (4114/2903 : 267/2903 : 1)
** u= 112/367 ; C1 -850405*x^2 - 147233*y^2 + 39937*z^2
(7232/37499 : 8907/37499 : 1) C2a (1308928/1612985 : -132919/1612985 : 1)
** u= 112/369 ; C1 -858661*x^2 - 148705*y^2 + 40961*z^2
(18809/96251 : 778/3319 : 1) C2a (6560682/540283 : -306335/540283 : 1)
** u= 112/383 ; C1 -917573*x^2 - 159233*y^2 + 48353*z^2
(-122673/593965 : -142874/593965 : 1) C2a (-485598/284975 : -31523/284975 : 1)
** u= 113/367 ; C1 -852098*x^2 - 147458*y^2 + 38978*z^2
(-43245/288379 : 8132/22183 : 1) C2a (1043261/597 : 47317/597 : 1)
** u= 116/299 ; C1 -599197*x^2 - 102857*y^2 + 6577*z^2
(1498576/15593331 : 1570135/15593331 : 1) C2a (7544896/28595 : 168319/28595 : 1)
** u= 116/311 ; C1 -641365*x^2 - 110177*y^2 + 11113*z^2
(-4261/41277 : -8134/41277 : 1) C2a (22594028/15520429 : 1312577/15520429 : 1)
** u= 116/313 ; C1 -648533*x^2 - 111425*y^2 + 11897*z^2
(67436/502745 : -113799/2513725 : 1) C2a (8072/19395 : -7277/96975 : 1)
** u= 116/345 ; C1 -768661*x^2 - 132481*y^2 + 25529*z^2
(50155/315403 : 67634/315403 : 1) C2a (23633388/744683 : 916847/744683 : 1)
** u= 120/377 ; C1 -906005*x^2 - 156529*y^2 + 37249*z^2
(6176/211497 : -102097/211497 : 1) C2a (-7415036/904591 : -1689/4687 : 1)
** u= 120/391 ; C1 -966485*x^2 - 167281*y^2 + 44641*z^2
(-32/411 : -80939/168099 : 1) C2a (-1796/405 : 35621/165645 : 1)
** u= 121/327 ; C1 -707554*x^2 - 121570*y^2 + 13154*z^2
(17732/130063 : 617/130063 : 1) C2a (-10201653/35537 : 296041/35537 : 1)
** u= 124/313 ; C1 -660469*x^2 - 113345*y^2 + 4969*z^2
(76/14741 : -3081/14741 : 1) C2a (2452748/367363 : 52865/367363 : 1)
** u= 132/349 ; C1 -810701*x^2 - 139225*y^2 + 12241*z^2
(13584/110929 : -2725/110929 : 1) C2a (7066/1575 : -1093/7875 : 1)
** u= 132/389 ; C1 -979421*x^2 - 168745*y^2 + 31201*z^2
(189419/1511691 : 27230/88923 : 1) C2a (-5822752/4121343 : -376099/4121343 : 1)
** u= 133/331 ; C1 -741586*x^2 - 127250*y^2 + 3826*z^2
(-137/12087 : -10348/60435 : 1) C2a (-882829/20581 : 67951/102905 : 1)
** u= 136/329 ; C1 -738677*x^2 - 126737*y^2 + 257*z^2
(5948/651337 : 25575/651337 : 1) C2a (17702/26985 : 2003/26985 : 1)
** u= 136/393 ; C1 -1004533*x^2 - 172945*y^2 + 29057*z^2
(-37583/224891 : 17122/224891 : 1) C2a (2873876/9990827 : 106539/1427261 : 1)
** u= 137/383 ; C1 -962098*x^2 - 165458*y^2 + 22978*z^2
(-18772/122475 : 5839/122475 : 1) C2a (-41339/31355 : -2689/31355 : 1)
** u= 140/359 ; C1 -865045*x^2 - 148481*y^2 + 8761*z^2
(-4016/44463 : -4763/44463 : 1) C2a (-740714/155381 : -19613/155381 : 1)
** u= 140/389 ; C1 -994045*x^2 - 170921*y^2 + 22801*z^2
(17365/146867 : 33522/146867 : 1) C2a (-317822/531067 : 269/3517 : 1)
** u= 143/353 ; C1 -845410*x^2 - 145058*y^2 + 3202*z^2
(-4807/89977 : 6636/89977 : 1) C2a (-3590833/335875 : -53251/335875 : 1)
** u= 144/383 ; C1 -974789*x^2 - 167425*y^2 + 15649*z^2
(23208/335027 : 85763/335027 : 1) C2a (524638/121803 : -16783/121803 : 1)
** u= 144/395 ; C1 -1028381*x^2 - 176761*y^2 + 21529*z^2
(-90489/1312165 : 402578/1312165 : 1) C2a (56005588/4101063 : 1750777/4101063 : 1)
** u= 145/383 ; C1 -976610*x^2 - 167714*y^2 + 14594*z^2
(-10267/106331 : 19236/106331 : 1) C2a (374889/94265 : -11999/94265 : 1)
** u= 147/373 ; C1 -936578*x^2 - 160738*y^2 + 7858*z^2
(-11520/161069 : -22249/161069 : 1) C2a (1251211/100293 : 25513/100293 : 1)
** u= 152/371 ; C1 -936877*x^2 - 160745*y^2 + 1753*z^2
(5701/134553 : 2830/134553 : 1) C2a (9592832/464749 : -94859/464749 : 1)
** u= 152/385 ; C1 -998309*x^2 - 171329*y^2 + 8081*z^2
(-496/8257 : -1335/8257 : 1) C2a (-17649906/1035745 : 346763/1035745 : 1)
** u= 159/385 ; C1 -1011266*x^2 - 173506*y^2 + 514*z^2
(-8520/426233 : 10729/426233 : 1) C2a (6019729/22359 : -28951/22359 : 1)
** u= 160/391 ; C1 -1040245*x^2 - 178481*y^2 + 2161*z^2
(-1937/173469 : 18506/173469 : 1) C2a (1922884/217855 : 24689/217855 : 1)
2764
>
■これらのuについて、(3),(5a),(5b)を満たす有理数解(x,y,t)を持たないものもあれば、有理数解(x,y,t)を持つものもある。
これらのuを順に調べれば良い。
ここからは、A^4+B^4+578*C^4=4*D^4(n=17のとき)と同様なので、最終的に得られた整点のみ記述する。
ここで、対応する整点が見つかった各有理数uについて、0 <= A <= B, 0 < C, 0 < Dを満たすように、A,B,C,Dの符号を変更したり、A,Bを交換して、Dの小さい順に並び替えると、以下のようになる。
- u=-1のとき
49^4+257^4+132098*7^4=4*185^4
5893512046673^4+304234492097761^4+132098*2641342693127^4=4*215166632713145^4
46248049195455814433^4+150773957871544648081^4+132098*5208867559188882617^4=4*111516071547189155705^4
24232519195516274270417^4+42808750963031899251169^4+132098*2009088183378333568583^4=4*34783646628666963718265^4
536294135155330981345921^4+677588628406068292376753^4+132098*37602612266555987375353^4=4*611039175809219826474425^4
414786679093302829035333836207420331350297405569^4+6479215253266560432841179011684346656342015949617^4+132098*102260295363894448126100258595910754259775010617^4=4*4590875640186483500336422086116342970213714742265^4
1376906175947337515786234770513911303831203508289^4+2127658378593171832681757172900728034475050423972977^4+132098*3376265268977259786341081139316579250545204366777^4=4*1504481982588748432810558177572537196328768599258745^4
6721929842266456509812091422403743365995681695864722913^4+64956104573135967343436450148920209178178603114124697041^4+132098*1303438102195509828737265702926052387974594597365767737^4=4*46176183591330540355819459024877347069900193266511000825^4
1798410356031882194623019442312328545579428788652916678961^4+73202762708104808475030648395336367976036409990654535513473^4+132098*715717393481740341855274802073669682477682264317784405177^4=4*51777788422777303642787863672078564345988121146828233064825^4
537828967267676062570727698948055309658069368962726416943249^4+1002840176997593627037465856652228634438961778943419804868257^4+132098*45811171251098436701218618182218731467088867879444788787193^4=4*804657821260931969928065067363371830812134814893997146795705^4
1313492213905578210413312575599054397742843146188048871919244106196073860993^4+1745482453952077750107592982514098527258043609861923655329594637720762430001^4+132098*94450646177388793113587348052469038002368109799501219805367246592006207943^4=4*1544663522105242253593229486971694664114489963781755983504440464146458221305^4
1040766395515412812405893637908251564069183690023928123467964585867183900204897^4+14211994894446674616969109487393786491776322573260716202850846330953099984024529^4+132098*239904055882144627923033970608550022357470793818115103590056814798073268592647^4=4*10076308688448674424179181048738255189896113364539919034984946330423439988257465^4
155789560520523088434143690043680294815077656578488993388728128925078015841591210123399018561^4+397136706626984362554867017457142437501873843149809612580510872448167175459157595085194201073^4+132098*15515744857731359731198957362977205725738259014734774277245546441890706249293475987239121273^4=4*301652076834973217638973799232116708882625483406558510383271628278512877947147162229599129145^4
1565616509262165301786125361401591352693323343028412403138600365686389032026174259755361426612769^4+1711268698011386336593894749876851383670390709213892984587040198975037810934019046172925274083217^4+132098*102102232382790756594243149958916251858979184292249779749424525313143760659066005146317741507783^4=4*1640060305425967118115919291659691811540401378292156377903410163718898413018291918420681879803385^4
5967440927759221254880653185385504932918299732032950898311446403664540097427048762503373158724557407957942769^4+13076487098210090908645765029273842303059603005462338758604295009127643344042485303075403909547208993257751617^4+132098*551027213029204875256487775133734230108201660360612689918473589397966211626485109492597302820261342845580167^4=4*10163780449614965955507164546881861230605237903465022403239939122957359890086612636298987551505181575237794105^4
103788362283047197297737384131933840360905449822273223226831978142166626918814071514237340246439009905588897^4+56149889517578727996154455388666972703343104086281295010128802188937652038367002469237810177061560780467760529^4+132098*150585176013554571452072405391329019815912535430852930951182130015391633750861496986519161449918866741408647^4=4*39704035467823940807992331531482428053805994853685233428994445533283042694466906996584910030393262644878531385^4
31251953940294585015545972949936983460913587473068201181502311017768335033012462641505987241990576353605009112693953^4+84669263017404996856394304953708247411260299676065617193049745688688027164058018494510404655881116233412175033703921^4+132098*3208742864478993845329059416264045988987926722819273126125432112229943393608847236429788557378005823660689641509703^4=4*63818370102176691955599254081336310896045597236570106818332957488415732052883409556072732355199613875942456707140985^4
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9896141127376652043291293839508419997590629518890028835928583555282319165556408075112891329869341124748612217966727973776966176789314364318862212273560469775325958416151660422952014478679910469770700791031648130063966771441575579861428112021017762570166855573904342784671260657^4+273901648049535717386742975556206392428545861449348794491563499423971958159945125819258514515317600965625364890544857812609999220187238466611524480329242038187860619988369406218172790694117973408312118095963656884613150750556185593839233697527674030789010976274918789121579866049^4+132098*3247608736640022730710451071892876016874044206144077262048222505990572178781289564591448724750143415886225638056290444173665690548769430180569604184254553486401381481874380620457994742423646981679616850290528781835422612888184065702160965383401017310226808132913092568566470457^4=4*193804084597648107580580040825963108660861831165787365010777642989918117600987301750604790476181779428625063355044984004320002720567079254362826581620945777528342149556268063290506768694385349418801891131024942266165529725953123378261861682357365494462587241068049817690356826105^4
103792794373297407112229322777919835361943168374591951526130783824298662772162307121950897299923101787055997136679479042523641103809843870587327402090613849489948140826864732486759808909870213539556156643884585758306968307059026896306293469017195940326603824056811457138775830260083447216577^4+119243285880834652085314975851196572249572646199475082330030840509395977058533096441984572915197877073464642103691748548890795480248843806552062460004435807524379928316991443661574556666727420161967235012119583239667579625127077629224830767118640026827644410999049219471265974788192412869489^4+132098*6939593124300562768456923079925579954183963882641737315848406464098195205346874590625284959853052593953012252636215738489493361203422076665199308204919228380648549738390184825964454893850737022877756428648292593718855374948137787415553524800480839487818208358105689407514713175454233466873^4=4*111785297314709635705431705341716969826184561603004278014790919354937813865159743051591501487344759262256756872040118668090340059060647306089653006756094506354762805677515055119756706469400477409678100900748953147163422402652656685352761370281979490396634045359766658187043882736754872796345^4
14585899580980528395564169301573096207473712262785572378488331241093721771717932627147300523801907567886010155716762927869131243444445091495463290390352714334282709630316386556456376073884311166909617040916751892442404884604393531599410562014657943887514008100794507289496045683812273471983998244520873712112150509064542394072353^4+35032048673719816241217132099491611210248608080139635993425653392447517296415424127509411600520863170677369032641685838627155413253874263736372768898038656096922442276380133312825952434088564477860448222898068690727343034147164035855513314260811162804731821834035226117277820996400486116148931261000007904453423819711838173695121^4+132098*1410044489833881938746710220113513917537918274495421481129140297396900883697901750453272405373444417105117590571512850807547720982625912438923695850669934698964889781127534209358175168200918058364855358185450899703754871955561862275959855377604978643343157741231349374957588965285984552502718792332498320097484944773321135509703^4=4*26832749587624469629885749857814019420512893276525142322728492333583296560751297314021192385627782718352031596312507630883760617087056703402985081504827890729568523238548737199620815864402083410423129555826305638996791006287175468431679274318552893688939964222801012634915371259017417590117630507176645674128101232843956720056825^4
...
- u=-240/257のとき
1919647^4+4430937^4+132098*198133^4=4*3503445^4
30936198547965059332485297627273068191338076565048016256863^4+932457437439453604250716038985343564601084330888763699547575^4+132098*10573146780545667233875129918656350117315266610848230647437^4=4*659706839690977684977304445811367498415189068894698943201389^4
23286485250785892221096292341238002502204162186350955811841694816407307804573203706955533898415612028549184221889171117345782138922259642120415027690517618045044552079^4+602209085812878945053257795341226567499423716755624665749689532468963526339407049273958573011772221270985277046092243385483368426198074848197225085108589831547962941769^4+132098*12185702598549002149134013161788504571594907003321904957998209369635681384453568776301042182079505478393881507420397217483636373529098112940655931153992654176637506251^4=4*428164693669642062457489723070505859162173887325409924643412046622773091299169505398514885953434905990443757181073875281253290831513937048150314836633628703968272212245^4
32262043540957209952604550054764990857115497787990476639418396074573983267546152378388352020635319100582991845937688584822543147613192060390555299853417852891652451005313516516377789494729141379063486174238605739049597117035900262826682759183486463551409308300267861649229305885345207170778712562579413842811536376943187454135929^4+45854357290311203106825841864438029209953627645170352436540413672651656114928502596014153963225783424516518909490424923440820704259924166636540298884201110803630716206563828943570178525045268044395036849948652312670093212520197176678937169662245996457558717849353366715083249949311345349338969588251439780632327146624117674262719^4+132098*2567555425618492734463677760118032542407578971385332688231396652394951709420503242982593031375390503169096491907283219179952988270384349663487626070496642799645233808164567768831882208273050880571445211276137773796193559959014537492331904603416291971051763048428358408319687530708082231513364797085854587892420757722266107091851^4=4*40947451177687784123346310390534347904615590614866205031441387245980876656892581652035567075500762899959214915109614679688600043547521880174845049350210189304597122631276773357241749067229891442298236725842557511124507596040553145440708788596073630121969664388602245430116071338576869138891665637760823726263534578939898378837205^4
...
[2026.05.12追記]u=-1のときの整数解を追加した。
[参考文献]
- [1]Noam Elkies, "On A^4+B^4+C^4=D^4", Math Comp. 51(184), p824-835, 1988.
- [2]StarkExchange MATHEMATICS, "Distribution of Primitive Pytagorean Triples (PPT) and of solutions of A^4+B^4+C^4=D^4", 2016/07/08.
- [3]StarkExchange MATHEMATICS, "More elliptic curves for x^4+y^4+z^4=1?", 2017/07/28.
- [4]Tom Womack, "The quartic surfaces x^4+y^4+z^4=N", 2013/05/17.
- [5]Tom Womack, "elk18.mag", 2013/06/07.
- [6]Tom Womack, "elk18.pts", 2013/06/07.
- [7]Tom Womack, "Integer points on x^4+y^4+z^4=Nt^4", 2013/06/07.
| Last Update: 2026.05.12 |
| H.Nakao |