  ***   Warning: new stack size = 160000000 (152.588 Mbytes).
[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]
[Mod(-1/5*t - 2/5, t^2 + 1), 1, Mod(4*t + 1, t^2 + 1), Mod(-9*t + 1, t^2 + 1
), Mod(4*t - 15, t^2 + 1), 1, Mod(-5*t + 37, t^2 + 1), Mod(49*t + 1, t^2 + 1
), Mod(-60*t - 15, t^2 + 1), Mod(-9*t - 80, t^2 + 1), Mod(4*t + 1, t^2 + 1),
 122, Mod(139*t + 21, t^2 + 1), Mod(-169*t + 1, t^2 + 1), Mod(53*t - 195, t^
2 + 1), Mod(-9*t + 1, t^2 + 1)]
[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]
[0, 1, 0, 8, 0, -26, 0, -48, 0, 73, 0, 120, 0, -170, 0, -208]
40000
20000
0
[0, 8]~
[16, -4]~
[16, -32, 256]~
[64/5, 4/5, 32/5]~
[[43/64, 129/8, 1376, 21/64]~, [0, 1, 0; 768, 24, 0; 18432, 2048, 768; 0, -1
, 0]]
[[43/64, -63/8, 800, 21/64]~, [1, 0; 24, 0; 2048, 768; -1, 0]]
[[1, 0, 1472, 0]~, [0; 0; 768; 0]]
[1, 0, 0, 0]~
[]
[1]
0
1
0
0
0
1
[]
[[1, Mod(0, 1), 0, 0]]
0
1
0
0
[[0, 0], [0, 0], [0, 0], [0, 0]]
[[1, 0], [0, 0], [0, 0], [1, 0]]
[y, y, y]
[y, y, y]
[y, y, y]
[y, y, y, y^4 - y^3 - 5*y^2 + 3*y + 4, y^4 - y^3 - 8*y^2 + 4*y + 12]
6
[0, 3, -1, 0, 3, 1, -8, -1, -9, 1, -1, -2, 4, 10, 1, -2, 7, -2, 7, -4]
[0, -1, 9, -8, -11, -1, 4, 1, 13, 7, 9, 8, -20, 6, -9, -8, -27, -6, 5, 20]
[0, 2, 8, -8, -8, 0, -4, 0, 4, 8, 8, 6, -16, 16, -8, -10]
[0, 0, -3, 28, -33, -28, 34, 6, -113, 88, 33, 128, 108, -62, -17, 6]
[0, 1, 17, -16, -19, -1, 0, 1, 17, 15, 17, 14, -36, 22, -17, -18]
[0, 3, -1, 0, 3, 1, -8, -1, -9, 1, -1, -2, 4, 10, 1, -2, 7, -2, 7, -4, 7, 2,
 8, -8, -4, 3, 6, -12, -7, 4, -8, -4, -9, -12, -6, -3, 3, 14, 20, -6, -9, -1
0, 8, 0, 0, 5, -16, 4, 28, 3]
[0, -8, 4, 4, -20, -8, 32, 8, 36, -12, 4, -4, -24, -20, -4, 4]
[0, 0, 3, 0, -1, 0, 0, 0, 3, 0, 1, 0, -8, 0, -1, 0]
[0, 3, -1, 0, 3, -1, 8, 0, -9, 1, 1, -2, -4, -10, 0, -2]
[0, 1/2, 1/3, 1/4, 3/4, 1/6, 1/8, 3/8, 1/12, 7/12, 1/16, 1/24, 7/24, 1/32, 1
/48, 1/96]
16
6442450944
15917322219892801768783872
97
10
88
[-2, -4]
[0, 72, -2, -4, -12, -16, -90, -8, 424, -8, -300, -8, -396, -16, 944, -976]
[0, 0]
[0, 10, 0, 0, 0, -76, 0, 0, 0, 810, 0, 0, 0, 12, 0, 0]
72
62
78
10
[[[2717/14336, -103/4608, 225/57344, 5/1024, 1/2048, 31/57344, -7/9216, -5/2
8672, 1/2048, -11/57344]~, [3993/28672, 65/3072, -95/114688, -49/18432, -5/1
2288, -33/114688, 1/18432, -1/57344, -1/36864, -115/1032192]~, [185/14336, -
7/4608, -123/57344, 13/9216, -1/6144, -5/57344, -1/3072, -1/28672, 1/18432, 
9/57344]~, [2717/14336, 103/4608, 225/57344, -5/1024, -1/2048, 31/57344, 7/9
216, -5/28672, -1/2048, -11/57344]~, [3993/28672, -65/3072, -95/114688, 49/1
8432, 5/12288, -33/114688, -1/18432, -1/57344, 1/36864, -115/1032192]~, [185
/14336, 7/4608, -123/57344, -13/9216, 1/6144, -5/57344, 1/3072, -1/28672, -1
/18432, 9/57344]~, [Mod(-4227/888832*y + 4539/57344, y^2 - 31), Mod(-29/9523
2*y + 179/6144, y^2 - 31), Mod(785/3555328*y - 109/229376, y^2 - 31), Mod(13
/571392*y - 67/36864, y^2 - 31), Mod(-13/380928*y + 1/24576, y^2 - 31), Mod(
-81/3555328*y - 19/229376, y^2 - 31), Mod(17/571392*y + 19/36864, y^2 - 31),
 Mod(-5/1777664*y + 13/114688, y^2 - 31), Mod(1/1142784*y - 19/73728, y^2 - 
31), Mod(461/31997952*y + 151/2064384, y^2 - 31)]~, [Mod(-4227/888832*y + 45
39/57344, y^2 - 31), Mod(29/95232*y - 179/6144, y^2 - 31), Mod(785/3555328*y
 - 109/229376, y^2 - 31), Mod(-13/571392*y + 67/36864, y^2 - 31), Mod(13/380
928*y - 1/24576, y^2 - 31), Mod(-81/3555328*y - 19/229376, y^2 - 31), Mod(-1
7/571392*y - 19/36864, y^2 - 31), Mod(-5/1777664*y + 13/114688, y^2 - 31), M
od(-1/1142784*y + 19/73728, y^2 - 31), Mod(461/31997952*y + 151/2064384, y^2
 - 31)]~], [y, y, y, y, y, y, y^2 - 31, y^2 - 31]]
[y, y, y, y, y, y, y^2 - 31, y^2 - 31]
[1, 1, 1, 1, 1, 1, 2, 2]
[0, 1, 0, 9, 0, 26, 0, 36, 0, 81]
[0, 1, 0, 9, 0, -14, 0, -100, 0, 81]
[0, 1, 0, 9, 0, -86, 0, 180, 0, 81]
[0, 1, 0, -9, 0, 26, 0, -36, 0, 81]
[0, 1, 0, -9, 0, -14, 0, 100, 0, 81]
[0, 1, 0, -9, 0, -86, 0, -180, 0, 81]
[Mod(0, y^2 - 31), Mod(1, y^2 - 31), Mod(0, y^2 - 31), Mod(9, y^2 - 31), Mod
(0, y^2 - 31), Mod(16*y + 18, y^2 - 31), Mod(0, y^2 - 31), Mod(16*y + 60, y^
2 - 31), Mod(0, y^2 - 31), Mod(81, y^2 - 31)]
[Mod(0, y^2 - 31), Mod(1, y^2 - 31), Mod(0, y^2 - 31), Mod(-9, y^2 - 31), Mo
d(0, y^2 - 31), Mod(16*y + 18, y^2 - 31), Mod(0, y^2 - 31), Mod(-16*y - 60, 
y^2 - 31), Mod(0, y^2 - 31), Mod(81, y^2 - 31)]
22
[4, -7, 11, 0, 0, 0, 0, 0, 0, 0]~

[0 0 0 0 0 0 0 0 0 0]

[0 0 0 0 0 0 0 0 0 0]

[0 0 0 0 0 0 0 0 0 0]

[0 0 0 0 0 0 0 0 0 0]

[0 0 0 0 0 0 0 0 0 0]

[0 0 0 0 0 0 0 0 0 0]

[0 0 0 0 0 0 0 0 0 0]

[0 0 0 0 0 0 0 0 0 0]

[0 0 0 0 0 0 0 0 0 0]

[0 0 0 0 0 0 0 0 0 0]


[0 81 0 0 4887/7    0  0    0 45522/7  0]

[1  0 0 0      0 -264  0 1422       0  0]

[0  0 0 0 477/28    0 81    0  1269/7  0]

[0  0 0 0      0   61  0 -152       0 81]

[0  0 0 0      0   12  0   12       0  0]

[0  0 0 0 171/28    0  0    0    27/7  0]

[0  0 1 0      0   -7  0   40       0  0]

[0  0 0 0   9/14    0  0    0   -27/7  0]

[0  0 0 0      0    2  0  -19       0  0]

[0  0 0 1 -95/28    0  0    0   -71/7  0]

[[81, 0, 0, 0, 0, 0, 0, 0, 0, 0; 0, 81, 0, 0, 0, 0, 0, 0, 0, 0; 0, 0, 81, 0,
 0, 0, 0, 0, 0, 0; 0, 0, 0, 81, 0, 0, 0, 0, 0, 0; 0, 0, 0, 0, 81, 0, 0, 0, 0
, 0; 0, 0, 0, 0, 0, 81, 0, 0, 0, 0; 0, 0, 0, 0, 0, 0, 81, 0, 0, 0; 0, 0, 0, 
0, 0, 0, 0, 81, 0, 0; 0, 0, 0, 0, 0, 0, 0, 0, 81, 0; 0, 0, 0, 0, 0, 0, 0, 0,
 0, 81], [0, 0, 0, 155223/7, -647676/7, 0, 1574721/7, 0, 2180790/7, 0; 0, 0,
 8068, 0, 0, -45888, 0, -25888, 0, 86508; 0, 81, 0, 22293/28, -8640/7, 0, -6
0507/28, 0, -63009/14, 0; 0, 0, -288, 0, 0, 2656, 0, 4468, 0, -8424; 0, 0, -
27, 0, 0, -42, 0, -1482, 0, 81; 0, 0, 0, -909/28, 540/7, 0, -11421/28, 0, -1
791/14, 0; 1, 0, 120, 0, 0, -808, 0, -550, 0, 2592; 0, 0, 0, 549/14, -1674/7
, 0, 3159/14, 0, 801/7, 0; 0, 0, -63, 0, 0, 467, 0, 266, 0, -810; 0, 0, 0, -
167/28, 148/7, 0, 12393/28, 0, 8891/14, 0], [-2434/7, 0, 300738/7, 0, 0, 229
0482/7, 0, 16881306/7, 0, 11792304/7; 0, 4943, 0, 78792, -67632, 0, 416424, 
0, 265872, 0; -747/28, 0, 39517/14, 0, 0, -329463/14, 0, 567081/14, 0, -1517
13/7; 0, -288, 0, -4237, -8472, 0, -39276, 0, -47928, 0; 0, -27, 0, -972, 16
43, 0, -2754, 0, 108, 0; -141/28, 0, -5811/14, 0, 0, -12575/14, 0, -11937/14
, 0, -58239/7; 0, 120, 0, 1320, -1440, 0, 13151, 0, 18000, 0; 39/14, 0, 1299
/7, 0, 0, -1269/7, 0, 15800/7, 0, 12312/7; 0, -63, 0, -618, 408, 0, -4356, 0
, -6337, 0; 153/28, 0, 2463/14, 0, 0, -13443/14, 0, -22899/14, 0, 37304/7]]
0.43212772973212385449512289817170941385
0.065367804723930579823031060437204674227
-3.2767866024378219074845099715117890907
0.34284913090478965797177570867964351435
-0.76125796339716986841247525017762663821
0.49159382167950494101715310718716918357
-0.49676146954567727676850448728844180079
-52.340285691058552832964253754168105742
1.0398936863409539900708802050121051862
183.58598430613706225199581706089347024
[[1], [-1], [-1], [1], [1], [-1], [1, 1], [-1, -1]]

[633/1792 351/1024 10819/896 67047/1792 267993/1792 102867/896 5265/3584 -14
7319/896 -906249/1792 81]

[19/256 -3/8 267/128 -17/16 -81/8 7013/128 -205/16 24615/128 -497/8 6117/64]

[87/7168 -9/4096 -591/3584 1135/7168 -22815/7168 12357/3584 49113/14336 -457
77/3584 48943/7168 1215/128]

[-1/512 1/16 -41/256 -5/32 59/16 -1447/256 143/32 -3613/256 283/16 -1063/128
]

[1/1024 3/256 -39/512 3/32 -3/64 -121/512 -3/128 -3/512 39/64 -321/256]

[9/7168 9/4096 47/3584 -879/7168 799/7168 1371/3584 -7641/14336 -3407/3584 2
769/7168 81/128]

[1/512 -1/128 25/256 1/16 -23/32 7/256 -55/64 637/256 -101/32 223/128]

[-1/3584 9/2048 -27/1792 65/3584 255/3584 -171/1792 135/7168 111/1792 -79/35
84 0]

[-1/1024 1/128 -9/512 1/64 1/4 -103/512 5/16 -733/512 23/16 -151/256]

[-5/7168 19/4096 61/3584 171/7168 -1371/7168 -687/3584 3965/14336 2963/3584 
4267/7168 -81/128]


[1 0 0]

[0 1 0]

[0 0 1]

[0, 0, 0, 18, 0, 224, 0, 440, 0, 0, 0, 840, 0, 192, 0, 900]
[0, 0, 0, 18, 0, 224, 0, 440, 0, 0, 0, 840, 0, 192, 0, 900]
[[0.E-40 + 1.0000000000000000000000000000000000000*I]]
[3, 1, [0, 4, -24, 36, 16, 24, -216, -160, 672, 324]]
[3, 2, [0, 0, 7, 0, -42, 0, 63, 0, 28, 0]]
6
[0, 10, 0, 0, 0, -76, 0, 0, 0, 810, 0, 0, 0, 12, 0, 0]
[0, 0, 0, -90, 0, 0, 0, -472, 0, 0, 0, 1048, 0, 0, 0, 684]
[0, -2, 0, 0, 0, -100, 0, 288, 0, -162, 0, -1728, 0, -2204, 0, -2016]
[0, 0, 0, 18, 0, 224, 0, 440, 0, 0, 0, 840, 0, 192, 0, 900]
[0, 0, 0, 810, 0, 0, 0, 4248, 0, 0, 0, -9432, 0, 0, 0, -6156]
[0, -90, 0, 0, 0, 684, 0, 0, 0, -7290, 0, 0, 0, -108, 0, 0]
[0, 0, 0, -162, 0, -2016, 0, -3960, 0, 0, 0, -7560, 0, -1728, 0, -8100]
[0, 18, 0, 0, 0, 900, 0, -2592, 0, 1458, 0, 15552, 0, 19836, 0, 18144]
[0, -76, 0, 0, 0, 49576, 0, 0, 0, -6156, 0, 0, 0, -178984, 0, 0]
[0, 0, 0, 684, 0, 0, 0, -9776, 0, 0, 0, 50096, 0, 0, 0, -446184]
[0, -100, 0, -2016, 0, -32648, 0, -32832, 0, -8100, 0, 108288, 0, 203144, 0,
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[0, 224, 0, 900, 0, -13440, 0, 33264, 0, 18144, 0, -189424, 0, 54720, 0, 293
832]
[0, 0, 0, 4248, 0, 0, 0, 133536, 0, 0, 0, -355744, 0, 0, 0, 87984]
[0, -472, 0, 0, 0, -9776, 0, 0, 0, -38232, 0, 0, 0, -110032, 0, 0]
[0, 288, 0, -3960, 0, -32832, 0, -26144, 0, 23328, 0, 210464, 0, 57024, 0, -
299376]
[0, 440, 0, -2592, 0, 33264, 0, -62208, 0, 35640, 0, 259200, 0, -319984, 0, 
295488]
[0, 0, 0, -9432, 0, 0, 0, -355744, 0, 0, 0, 2280096, 0, 0, 0, -450864]
[0, 1048, 0, 0, 0, 50096, 0, 0, 0, 84888, 0, 0, 0, -1370288, 0, 0]
[0, -1728, 0, -7560, 0, 108288, 0, 210464, 0, -139968, 0, -1085984, 0, -4181
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[0, 840, 0, 15552, 0, -189424, 0, 259200, 0, 68040, 0, -870912, 0, 839664, 0
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[0, 12, 0, 0, 0, -178984, 0, 0, 0, 972, 0, 0, 0, 2862504, 0, 0]
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[0, -2204, 0, -1728, 0, 203144, 0, 57024, 0, -178524, 0, -418176, 0, 114808,
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[0, 192, 0, 19836, 0, 54720, 0, -319984, 0, 15552, 0, 839664, 0, 103680, 0, 
-1828296]
[0, 0, 0, -6156, 0, 0, 0, 87984, 0, 0, 0, -450864, 0, 0, 0, 4015656]
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[0, -2016, 0, -8100, 0, 120960, 0, -299376, 0, -163296, 0, 1704816, 0, -4924
80, 0, -2644488]
[0, 900, 0, 18144, 0, 293832, 0, 295488, 0, 72900, 0, -974592, 0, -1828296, 
0, -1088640]
[0, -1212, 0, 0, 0, 232136, 0, 0, 0, -98172, 0, 0, 0, 1946808, 0, 0]
[0, 0, 0, 10908, 0, 0, 0, 454416, 0, 0, 0, -4471440, 0, 0, 0, -2089224]
[0, -6900, 0, -24768, 0, 115800, 0, -658368, 0, -558900, 0, 2860416, 0, -636
504, 0, 3271104]
[0, 2752, 0, 62100, 0, -363456, 0, -24144, 0, 222912, 0, 1337424, 0, 502272,
 0, -1042200]
[0, 0, 0, 12888, 0, 0, 0, -574560, 0, 0, 0, 512864, 0, 0, 0, 6015024]
[0, -1432, 0, 0, 0, -668336, 0, 0, 0, -115992, 0, 0, 0, 4320176, 0, 0]
[0, -6336, 0, 27144, 0, 262656, 0, -596000, 0, -513216, 0, 1287200, 0, -1648
512, 0, -3195504]
[0, -3016, 0, 57024, 0, 355056, 0, 777600, 0, -244296, 0, -2156544, 0, 42420
8, 0, -2363904]
[0, 4248, 0, 0, 0, 87984, 0, 0, 0, 344088, 0, 0, 0, 990288, 0, 0]
[0, 0, 0, -38232, 0, 0, 0, -1201824, 0, 0, 0, 3201696, 0, 0, 0, -791856]
[0, -3960, 0, 23328, 0, -299376, 0, 559872, 0, -320760, 0, -2332800, 0, 2879
856, 0, -2659392]
[0, -2592, 0, 35640, 0, 295488, 0, 235296, 0, -209952, 0, -1894176, 0, -5132
16, 0, 2694384]
[17.981439237735731033658522362934698192, -14.465932470400861049133659073570
007347, -14.173043447523315720648161399342292854, -12.8444792338479425607250
88799397162586, -12.673296763439189428830632012708642221, 11.313822387102528
758430335085165159676, 15.809242390926312020182669681356476477, 19.952518856
726468490501784413242971475, 12.164217722077195145237910274949933293, 15.381
272600128290391693466194368971580]
[149.32003336233083380416740549931024313, -145.22528341237431879984196577788
550379, -144.05206065368915254369133157416377264, -137.368077052425797668068
45719565543525, -136.68537976117761802503641918389974975, 132.33498216866595
894851650979950974707, 144.81477270149742577794938046771306641, 153.37574451
331022295236625862817598070, 133.99393725109713614517615928616029184, 140.82
191407690427938490321804273819109]
[1750.8612976244284982995145051957076323, -1743.4610846371885006840699908522
210646, -1739.3285039438314041396755906212872382, -1706.54568655078571155570
67243660579136, -1704.1559309139961646459809162176700473, 1693.2006899626197
396492113391602468661, 1739.6937549158404780145317707347222603, 1760.8038249
508416117204235666645232767, 1696.9537629837898396249480554755379813, 1714.4
123077300799878900824934093074081]
[-25289.463103882493149683693231641947547, 25271.306252281313102094765195122
776006, 25256.284246728344311859481152424676239, 25079.367724015404662920284
476322170148, 25070.741444350281949178792195757223585, -25040.19987820531753
6042355830671301459, -25256.861209437637891371256419970666372, -25318.141977
898178949067363044347232866, -25050.025763197973566457964437905037423, -2510
2.674289656622081201236099263608944]
[1/4, -1/4]~
[0, 1, 0, -3, 0, -2, 0, -4, 0, 6, 0, 2, 0, -5, 0, 6]
[64/5, 4/5, 32/5]~
[1, 20, 180, 960, 3380, 8424, 16320, 28800, 52020, 88660, 129064, 175680, 26
2080, 386920, 489600, 600960]
[0, 4, -16, 0, 64, -56, 0, 0, -256, 324, 224, 0, 0, -952, 0, 0]
[1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]
23: [[22, [x - x^2 - x^3 + x^6 + x^8 - x^13 - x^16 + x^23 - x^24 + x^25 + x^
26 + x^27 - x^29 - x^31 + O(x^32)]]]
31: [[30, [x - x^2 - x^5 - x^7 + x^8 + x^9 + x^10 + x^14 - x^16 - x^18 - x^1
9 + x^31 + O(x^32)]]]
39: [[38, [x - x^3 - x^4 + x^9 + x^12 - x^13 + x^16 - x^25 - x^27 + O(x^32)]
]]
44: [[21, [x - x^3 - x^5 + x^11 + x^15 - x^23 + x^27 - x^31 + O(x^32)]]]
46: [[45, [x - x^3 - x^4 + x^8 + x^12 - x^13 + x^23 - x^24 + x^25 + x^27 - x
^29 - x^31 + O(x^32), x^2 - x^4 - x^6 + x^12 + x^16 - x^26 + O(x^32)]]]
47: [[46, [x - x^3 - x^6 - x^8 + x^9 + x^12 + x^14 - x^17 + x^18 - x^21 + x^
24 + x^25 - x^27 - x^28 + O(x^32), x^2 - x^3 - x^4 + x^7 + x^9 - x^14 - x^17
 + x^24 + x^28 + O(x^32)]]]
52: [[3, [Mod(1, t^2 + t + 1)*x + Mod(-t - 1, t^2 + t + 1)*x^2 + Mod(t, t^2 
+ t + 1)*x^4 + Mod(-1, t^2 + t + 1)*x^5 + Mod(1, t^2 + t + 1)*x^8 + Mod(t, t
^2 + t + 1)*x^9 + Mod(t + 1, t^2 + t + 1)*x^10 + Mod(-t - 1, t^2 + t + 1)*x^
13 + Mod(-t - 1, t^2 + t + 1)*x^16 + Mod(-t, t^2 + t + 1)*x^17 + Mod(1, t^2 
+ t + 1)*x^18 + Mod(-t, t^2 + t + 1)*x^20 + Mod(t, t^2 + t + 1)*x^26 + Mod(t
 + 1, t^2 + t + 1)*x^29 + O(x^32)]]]
55: [[54, [x - x^4 - x^5 + x^9 - x^11 + x^16 + x^20 + x^25 - 2*x^31 + O(x^32
)]]]
56: [[13, [x - x^2 + x^4 - x^7 - x^8 - x^9 + x^14 + x^16 + x^18 + 2*x^23 - x
^25 - x^28 + O(x^32)]]]
57: [[26, [Mod(1, t^2 + t + 1)*x + Mod(-t - 1, t^2 + t + 1)*x^3 + Mod(t, t^2
 + t + 1)*x^4 + Mod(-1, t^2 + t + 1)*x^7 + Mod(t, t^2 + t + 1)*x^9 + Mod(1, 
t^2 + t + 1)*x^12 + Mod(-t, t^2 + t + 1)*x^13 + Mod(-t - 1, t^2 + t + 1)*x^1
6 + Mod(1, t^2 + t + 1)*x^19 + Mod(t + 1, t^2 + t + 1)*x^21 + Mod(t, t^2 + t
 + 1)*x^25 + Mod(1, t^2 + t + 1)*x^27 + Mod(-t, t^2 + t + 1)*x^28 + Mod(-1, 
t^2 + t + 1)*x^31 + O(x^32)]]]
59: [[58, [x - x^3 + x^4 - x^5 - x^7 - x^12 + x^15 + x^16 + 2*x^17 - x^19 - 
x^20 + x^21 + x^27 - x^28 - x^29 + O(x^32)]]]
62: [[61, [x - x^4 - x^5 - x^7 + x^8 + x^9 - x^19 + x^20 + x^28 + x^31 + O(x
^32), x^2 - x^4 - x^10 - x^14 + x^16 + x^18 + x^20 + x^28 + O(x^32)]]]
63: [[55, [x - x^4 - x^7 + x^16 + x^25 + x^28 + O(x^32)]]]
68: [[67, [x - x^2 + x^4 - x^8 - x^9 - 2*x^13 + x^16 + x^17 + x^18 + x^25 + 
2*x^26 + O(x^32)]], [47, [Mod(1, t^2 + 1)*x + Mod(t, t^2 + 1)*x^2 + Mod(-1, 
t^2 + 1)*x^4 + Mod(-t - 1, t^2 + 1)*x^5 + Mod(-t, t^2 + 1)*x^8 + Mod(t, t^2 
+ 1)*x^9 + Mod(-t + 1, t^2 + 1)*x^10 + Mod(1, t^2 + 1)*x^16 + Mod(-1, t^2 + 
1)*x^17 + Mod(-1, t^2 + 1)*x^18 + Mod(t + 1, t^2 + 1)*x^20 + Mod(t, t^2 + 1)
*x^25 + Mod(t + 1, t^2 + 1)*x^29 + O(x^32)]]]
69: [[22, [x - x^2 + x^8 - x^9 - x^13 - x^16 + x^18 + x^23 + x^25 + x^26 + x
^27 - x^29 - x^31 + O(x^32), x^3 - x^6 - x^9 + x^18 + x^24 + O(x^32)]]]
71: [[70, [x - x^5 - x^6 + x^9 - x^12 - x^15 + x^18 + x^20 + x^24 + x^25 - x
^27 + x^30 + O(x^32), x^2 - x^4 - x^5 - x^6 + x^8 + x^9 + x^10 - x^16 + x^19
 - x^20 - x^27 + O(x^32), x^3 - x^4 - x^5 + x^8 + x^10 - x^15 - x^18 + x^25 
+ x^29 + O(x^32)]]]
72: [[67, [Mod(1, t^2 + t + 1)*x + Mod(-t - 1, t^2 + t + 1)*x^2 + Mod(-t - 1
, t^2 + t + 1)*x^3 + Mod(t, t^2 + t + 1)*x^4 + Mod(t, t^2 + t + 1)*x^6 + Mod
(1, t^2 + t + 1)*x^8 + Mod(t, t^2 + t + 1)*x^9 + Mod(t + 1, t^2 + t + 1)*x^1
1 + Mod(1, t^2 + t + 1)*x^12 + Mod(-t - 1, t^2 + t + 1)*x^16 + Mod(-1, t^2 +
 t + 1)*x^17 + Mod(1, t^2 + t + 1)*x^18 + Mod(-1, t^2 + t + 1)*x^19 + Mod(-t
, t^2 + t + 1)*x^22 + Mod(-t - 1, t^2 + t + 1)*x^24 + Mod(-t - 1, t^2 + t + 
1)*x^25 + Mod(1, t^2 + t + 1)*x^27 + O(x^32)]]]
76: [[37, [x - x^5 - x^7 + x^9 - x^11 - x^17 + x^19 + 2*x^23 + O(x^32)]]]
77: [[69, [Mod(1, t^4 + t^3 + t^2 + t + 1)*x + Mod(t^3 + t, t^4 + t^3 + t^2 
+ t + 1)*x^2 + Mod(-t^3 - 1, t^4 + t^3 + t^2 + t + 1)*x^4 + Mod(-t^3 - t^2 -
 t - 1, t^4 + t^3 + t^2 + t + 1)*x^7 + Mod(-t, t^4 + t^3 + t^2 + t + 1)*x^8 
+ Mod(t^2, t^4 + t^3 + t^2 + t + 1)*x^9 + Mod(t^3, t^4 + t^3 + t^2 + t + 1)*
x^11 + Mod(t^2 + 1, t^4 + t^3 + t^2 + t + 1)*x^14 + Mod(t^3 + 1, t^4 + t^3 +
 t^2 + t + 1)*x^18 + Mod(-t^3 - t^2 - 1, t^4 + t^3 + t^2 + t + 1)*x^22 + Mod
(-t^3 - t^2 - 1, t^4 + t^3 + t^2 + t + 1)*x^23 + Mod(t, t^4 + t^3 + t^2 + t 
+ 1)*x^25 + Mod(t^3 + t + 1, t^4 + t^3 + t^2 + t + 1)*x^28 + Mod(t^2 + t, t^
4 + t^3 + t^2 + t + 1)*x^29 + O(x^32)]]]
78: [[77, [x - x^3 - x^4 + x^9 + x^12 - x^13 + x^16 - x^25 - x^27 + O(x^32),
 x^2 - x^6 - x^8 + x^18 + x^24 - x^26 + O(x^32)]]]
79: [[78, [x - x^5 - x^8 + x^9 - x^10 - x^19 + x^20 + x^22 - x^23 + x^25 + x
^26 + O(x^32), x^2 - x^4 - x^5 + x^11 + x^13 + x^18 - x^19 - x^22 - x^23 + x
^25 - x^26 + x^31 + O(x^32)]]]
80: [[79, [x - x^5 - x^9 + x^25 + 2*x^29 + O(x^32)]]]
83: [[82, [x - x^3 + x^4 - x^7 - x^11 - x^12 + x^16 - x^17 + x^21 + 2*x^23 +
 x^25 + x^27 - x^28 - x^29 - x^31 + O(x^32)]]]
84: [[65, [Mod(1, t^2 + t + 1)*x + Mod(-t - 1, t^2 + t + 1)*x^3 + Mod(t, t^2
 + t + 1)*x^7 + Mod(t, t^2 + t + 1)*x^9 + Mod(-1, t^2 + t + 1)*x^13 + Mod(-t
, t^2 + t + 1)*x^19 + Mod(1, t^2 + t + 1)*x^21 + Mod(-t - 1, t^2 + t + 1)*x^
25 + Mod(1, t^2 + t + 1)*x^27 + Mod(t + 1, t^2 + t + 1)*x^31 + O(x^32)]]]
87: [[86, [x - x^6 - x^7 + x^9 - x^13 - x^16 + x^22 + x^24 + x^25 + O(x^32),
 x^2 - x^3 - x^8 + x^11 - x^14 + x^17 + x^18 + x^21 - x^26 - x^27 - x^29 + O
(x^32)]]]
88: [[65, [x - x^3 - x^5 + x^11 + x^15 - x^23 + x^27 - x^31 + O(x^32), x^2 -
 x^6 - x^10 + x^22 + x^30 + O(x^32)]], [59, [Mod(1, t^4 + t^3 + t^2 + t + 1)
*x + Mod(t^3, t^4 + t^3 + t^2 + t + 1)*x^2 + Mod(t^2 + t, t^4 + t^3 + t^2 + 
t + 1)*x^3 + Mod(t, t^4 + t^3 + t^2 + t + 1)*x^4 + Mod(-t^3 - t^2 - t, t^4 +
 t^3 + t^2 + t + 1)*x^6 + Mod(-t^3 - t^2 - t - 1, t^4 + t^3 + t^2 + t + 1)*x
^8 + Mod(-t - 1, t^4 + t^3 + t^2 + t + 1)*x^9 + Mod(-t^3 - t^2 - t - 1, t^4 
+ t^3 + t^2 + t + 1)*x^11 + Mod(t^3 + t^2, t^4 + t^3 + t^2 + t + 1)*x^12 + M
od(t^2, t^4 + t^3 + t^2 + t + 1)*x^16 + Mod(t^3 + t, t^4 + t^3 + t^2 + t + 1
)*x^17 + Mod(t^2 + t + 1, t^4 + t^3 + t^2 + t + 1)*x^18 + Mod(t^3 + 1, t^4 +
 t^3 + t^2 + t + 1)*x^19 + Mod(t^2, t^4 + t^3 + t^2 + t + 1)*x^22 + Mod(t + 
1, t^4 + t^3 + t^2 + t + 1)*x^24 + Mod(-t^3 - t^2 - t - 1, t^4 + t^3 + t^2 +
 t + 1)*x^25 + Mod(-t^2, t^4 + t^3 + t^2 + t + 1)*x^27 + O(x^32)]]]
92: [[45, [x - x^3 - x^13 + x^23 + x^25 + x^27 - x^29 - x^31 + O(x^32), x^2 
- x^6 - x^8 + x^16 + x^24 - x^26 + O(x^32), x^4 - x^8 - x^12 + x^24 + O(x^32
)]]]
93: [[61, [x - x^2 - x^5 - x^7 + x^8 + x^9 + x^10 + x^14 - x^16 - x^18 - x^1
9 + x^31 + O(x^32), x^3 - x^6 - x^15 - x^21 + x^24 + x^27 + x^30 + O(x^32)]]
, [47, [Mod(1, t^4 + t^3 + t^2 + t + 1)*x + Mod(t^3, t^4 + t^3 + t^2 + t + 1
)*x^3 + Mod(-t^3 - t^2 - t - 1, t^4 + t^3 + t^2 + t + 1)*x^4 + Mod(t^2 + t, 
t^4 + t^3 + t^2 + t + 1)*x^7 + Mod(t, t^4 + t^3 + t^2 + t + 1)*x^9 + Mod(t^2
, t^4 + t^3 + t^2 + t + 1)*x^12 + Mod(-t^3 - t - 1, t^4 + t^3 + t^2 + t + 1)
*x^13 + Mod(t^3, t^4 + t^3 + t^2 + t + 1)*x^16 + Mod(t^3 + t, t^4 + t^3 + t^
2 + t + 1)*x^19 + Mod(-t^3 - t^2 - t, t^4 + t^3 + t^2 + t + 1)*x^21 + Mod(1,
 t^4 + t^3 + t^2 + t + 1)*x^25 + Mod(-t^3 - t^2 - t - 1, t^4 + t^3 + t^2 + t
 + 1)*x^27 + Mod(t + 1, t^4 + t^3 + t^2 + t + 1)*x^28 + Mod(t^3, t^4 + t^3 +
 t^2 + t + 1)*x^31 + O(x^32)]]]
94: [[93, [x - x^6 - x^7 + x^14 - x^16 + x^18 - x^21 + x^24 + x^25 - x^27 + 
O(x^32), x^2 - x^6 - x^12 - x^16 + x^18 + x^24 + x^28 + O(x^32), x^3 - x^7 +
 x^8 - x^9 - x^12 - x^16 + x^17 + x^28 + O(x^32), x^4 - x^6 - x^8 + x^14 + x
^18 - x^28 + O(x^32)]]]
95: [[94, [x - x^6 - x^11 - x^20 + x^25 + x^26 + x^30 + O(x^32), x^2 - x^3 -
 x^10 - x^12 + x^13 + x^15 + x^18 + O(x^32), x^4 - x^5 - x^6 + x^9 + x^11 - 
x^16 - x^19 + x^26 + x^30 + O(x^32)]]]
99: [[76, [Mod(1, t^2 + t + 1)*x + Mod(t, t^2 + t + 1)*x^3 + Mod(t, t^2 + t 
+ 1)*x^4 + Mod(-t, t^2 + t + 1)*x^5 + Mod(-t - 1, t^2 + t + 1)*x^9 + Mod(-t 
- 1, t^2 + t + 1)*x^11 + Mod(-t - 1, t^2 + t + 1)*x^12 + Mod(t + 1, t^2 + t 
+ 1)*x^15 + Mod(-t - 1, t^2 + t + 1)*x^16 + Mod(t + 1, t^2 + t + 1)*x^20 + M
od(2*t, t^2 + t + 1)*x^23 + Mod(1, t^2 + t + 1)*x^27 + Mod(-t, t^2 + t + 1)*
x^31 + O(x^32)]]]
100: [[91, [Mod(1, t^4 + t^3 + t^2 + t + 1)*x + Mod(t^3, t^4 + t^3 + t^2 + t
 + 1)*x^2 + Mod(t, t^4 + t^3 + t^2 + t + 1)*x^4 + Mod(-t^3 - t^2 - t - 1, t^
4 + t^3 + t^2 + t + 1)*x^5 + Mod(-t^3 - t^2 - t - 1, t^4 + t^3 + t^2 + t + 1
)*x^8 + Mod(t^2, t^4 + t^3 + t^2 + t + 1)*x^9 + Mod(t^2, t^4 + t^3 + t^2 + t
 + 1)*x^10 + Mod(t^3 + t, t^4 + t^3 + t^2 + t + 1)*x^13 + Mod(t^2, t^4 + t^3
 + t^2 + t + 1)*x^16 + Mod(t^2 + t, t^4 + t^3 + t^2 + t + 1)*x^17 + Mod(1, t
^4 + t^3 + t^2 + t + 1)*x^18 + Mod(1, t^4 + t^3 + t^2 + t + 1)*x^20 + Mod(t^
3, t^4 + t^3 + t^2 + t + 1)*x^25 + Mod(-t^3 - t^2 - 1, t^4 + t^3 + t^2 + t +
 1)*x^26 + Mod(-t^2 - t - 1, t^4 + t^3 + t^2 + t + 1)*x^29 + O(x^32)]]]
103: [[102, [x - x^7 - x^8 + x^9 - x^14 - x^17 + x^25 + x^26 + x^28 - x^29 +
 O(x^32), x^2 - x^4 - x^7 + x^13 - x^17 + x^18 + x^19 + x^23 - x^26 - x^29 +
 O(x^32)]]]
104: [[51, [x - x^3 + x^4 - x^10 - x^12 - x^14 + x^16 - x^17 + x^26 + x^27 +
 x^30 + O(x^32), x^2 - x^5 - x^6 - x^7 + x^8 + x^13 + x^15 - x^20 + x^21 - x
^24 - x^28 + 2*x^31 + O(x^32)]], [55, [Mod(1, t^2 + t + 1)*x + Mod(-1, t^2 +
 t + 1)*x^5 + Mod(t, t^2 + t + 1)*x^9 + Mod(-t - 1, t^2 + t + 1)*x^13 + Mod(
-t, t^2 + t + 1)*x^17 + Mod(t + 1, t^2 + t + 1)*x^29 + O(x^32), Mod(1, t^2 +
 t + 1)*x^2 + Mod(-t - 1, t^2 + t + 1)*x^4 + Mod(t, t^2 + t + 1)*x^8 + Mod(-
1, t^2 + t + 1)*x^10 + Mod(1, t^2 + t + 1)*x^16 + Mod(t, t^2 + t + 1)*x^18 +
 Mod(t + 1, t^2 + t + 1)*x^20 + Mod(-t - 1, t^2 + t + 1)*x^26 + O(x^32)]]]
107: [[106, [x - x^3 + x^4 - x^11 - x^12 - x^13 + x^16 - x^19 - x^23 + x^25 
+ x^27 + 2*x^29 + O(x^32)]]]
108: [[53, [x - x^7 - x^13 - x^19 + x^25 + 2*x^31 + O(x^32)]]]
110: [[109, [x - x^4 - x^5 + x^9 - x^11 + x^16 + x^20 + x^25 - 2*x^31 + O(x^
32), x^2 - x^8 - x^10 + x^18 - x^22 + O(x^32)]]]
111: [[110, [x - x^7 + x^9 - x^10 - x^12 - x^21 + x^28 + x^30 + O(x^32), x^2
 - x^5 - x^6 + x^15 + x^17 + x^18 - x^20 - x^23 + x^29 + O(x^32), x^3 - x^4 
- x^7 + x^10 + x^16 - x^21 - x^25 + x^27 + x^28 - x^30 + O(x^32)]], [101, [M
od(1, t^2 + t + 1)*x + Mod(-t - 1, t^2 + t + 1)*x^3 + Mod(t + 1, t^2 + t + 1
)*x^4 + Mod(-t - 1, t^2 + t + 1)*x^7 + Mod(t, t^2 + t + 1)*x^9 + Mod(-t, t^2
 + t + 1)*x^12 + Mod(t - 1, t^2 + t + 1)*x^13 + Mod(t, t^2 + t + 1)*x^16 + M
od(t, t^2 + t + 1)*x^21 + Mod(-t, t^2 + t + 1)*x^25 + Mod(1, t^2 + t + 1)*x^
27 + Mod(-t, t^2 + t + 1)*x^28 + Mod(-2*t - 1, t^2 + t + 1)*x^31 + O(x^32)]]
, [26, [Mod(1, t^2 + t + 1)*x + Mod(t, t^2 + t + 1)*x^3 + Mod(t, t^2 + t + 1
)*x^4 + Mod(-t, t^2 + t + 1)*x^7 + Mod(-t - 1, t^2 + t + 1)*x^9 + Mod(-t - 1
, t^2 + t + 1)*x^12 + Mod(-t, t^2 + t + 1)*x^13 + Mod(-t - 1, t^2 + t + 1)*x
^16 + Mod(2*t, t^2 + t + 1)*x^19 + Mod(t + 1, t^2 + t + 1)*x^21 + Mod(-t - 1
, t^2 + t + 1)*x^25 + Mod(1, t^2 + t + 1)*x^27 + Mod(t + 1, t^2 + t + 1)*x^2
8 + Mod(-1, t^2 + t + 1)*x^31 + O(x^32)]]]
112: [[41, [x - x^7 - x^9 + 2*x^23 - x^25 + O(x^32), x^2 - x^4 + x^8 - x^14 
- x^16 - x^18 + x^28 + O(x^32)]], [69, [Mod(1, t^2 + 1)*x + Mod(t, t^2 + 1)*
x^2 + Mod(-1, t^2 + 1)*x^4 + Mod(t, t^2 + 1)*x^7 + Mod(-t, t^2 + 1)*x^8 + Mo
d(-t, t^2 + 1)*x^9 + Mod(-t - 1, t^2 + 1)*x^11 + Mod(-1, t^2 + 1)*x^14 + Mod
(1, t^2 + 1)*x^16 + Mod(1, t^2 + 1)*x^18 + Mod(-t + 1, t^2 + 1)*x^22 + Mod(t
, t^2 + 1)*x^25 + Mod(-t, t^2 + 1)*x^28 + Mod(t - 1, t^2 + 1)*x^29 + O(x^32)
]]]
114: [[83, [Mod(1, t^2 + t + 1)*x + Mod(-t - 1, t^2 + t + 1)*x^3 + Mod(t, t^
2 + t + 1)*x^4 + Mod(-1, t^2 + t + 1)*x^7 + Mod(t, t^2 + t + 1)*x^9 + Mod(1,
 t^2 + t + 1)*x^12 + Mod(-t, t^2 + t + 1)*x^13 + Mod(-t - 1, t^2 + t + 1)*x^
16 + Mod(1, t^2 + t + 1)*x^19 + Mod(t + 1, t^2 + t + 1)*x^21 + Mod(t, t^2 + 
t + 1)*x^25 + Mod(1, t^2 + t + 1)*x^27 + Mod(-t, t^2 + t + 1)*x^28 + Mod(-1,
 t^2 + t + 1)*x^31 + O(x^32), Mod(1, t^2 + t + 1)*x^2 + Mod(-t - 1, t^2 + t 
+ 1)*x^6 + Mod(t, t^2 + t + 1)*x^8 + Mod(-1, t^2 + t + 1)*x^14 + Mod(t, t^2 
+ t + 1)*x^18 + Mod(1, t^2 + t + 1)*x^24 + Mod(-t, t^2 + t + 1)*x^26 + O(x^3
2)]]]
115: [[91, [x - x^2 - x^3 + x^6 + x^8 - x^13 - x^16 + x^23 - x^24 + x^25 + x
^26 + x^27 - x^29 - x^31 + O(x^32), x^5 - x^10 - x^15 + x^30 + O(x^32)]]]
116: [[115, [x + x^4 - x^5 - x^6 - x^13 + x^16 - x^20 - x^22 - x^24 + x^29 +
 x^30 + O(x^32), x^2 - x^3 + x^8 - x^10 - x^11 - x^12 + x^15 + 2*x^19 - x^26
 + x^27 - x^31 + O(x^32)]], [103, [Mod(1, t^6 + t^5 + t^4 + t^3 + t^2 + t + 
1)*x + Mod(t^4, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^2 + Mod(t, t^6 + t^5 
+ t^4 + t^3 + t^2 + t + 1)*x^4 + Mod(-t^5 - t^4 - t^3 - t - 1, t^6 + t^5 + t
^4 + t^3 + t^2 + t + 1)*x^5 + Mod(t^5, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*
x^8 + Mod(t^5, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^9 + Mod(-t^5 - t^4 - t
^2 - t - 1, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^10 + Mod(t^3 + t, t^6 + t
^5 + t^4 + t^3 + t^2 + t + 1)*x^13 + Mod(t^2, t^6 + t^5 + t^4 + t^3 + t^2 + 
t + 1)*x^16 + Mod(t^4 + t^3, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^17 + Mod
(t^2, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^18 + Mod(t^3 + 1, t^6 + t^5 + t
^4 + t^3 + t^2 + t + 1)*x^20 + Mod(t^5 + t^4 + t, t^6 + t^5 + t^4 + t^3 + t^
2 + t + 1)*x^25 + Mod(t^5 + 1, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^26 + M
od(t^2, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^29 + O(x^32)]]]
117: [[116, [x - x^4 - x^13 + x^16 - x^25 + O(x^32), x^3 - x^9 - x^12 + x^27
 + O(x^32)]], [73, [Mod(1, t^2 + 1)*x + Mod(-t, t^2 + 1)*x^4 + Mod(t - 1, t^
2 + 1)*x^7 + Mod(t, t^2 + 1)*x^13 + Mod(-1, t^2 + 1)*x^16 + Mod(-t - 1, t^2 
+ 1)*x^19 + Mod(-t, t^2 + 1)*x^25 + Mod(t + 1, t^2 + 1)*x^28 + Mod(t + 1, t^
2 + 1)*x^31 + O(x^32)]]]
118: [[117, [x - x^3 + x^4 - x^5 - x^7 - x^12 + x^15 + x^16 + 2*x^17 - x^19 
- x^20 + x^21 + x^27 - x^28 - x^29 + O(x^32), x^2 - x^6 + x^8 - x^10 - x^14 
- x^24 + x^30 + O(x^32)]]]
119: [[118, [x - x^8 - x^15 - x^18 + x^25 + O(x^32), x^2 - x^4 - x^9 + x^18 
+ x^21 + x^25 - x^30 + O(x^32), x^3 - 2*x^6 - x^7 + x^10 + 2*x^12 + x^14 - x
^17 - x^20 - x^24 + x^27 - x^28 + O(x^32), x^5 - x^6 - x^7 + x^10 + x^12 - x
^17 - x^20 + x^27 + x^31 + O(x^32)]]]
120: [[29, [x - x^4 - x^6 - x^9 + x^10 + x^15 + x^16 + x^24 - x^25 - 2*x^31 
+ O(x^32), x^2 + x^3 - x^5 - x^8 - x^12 - x^18 + x^20 - x^27 + x^30 + O(x^32
)]]]
124: [[61, [x - x^5 - x^7 + x^9 - x^19 + x^31 + O(x^32), x^2 - x^8 - x^10 - 
x^14 + x^16 + x^18 + O(x^32), x^4 - x^8 - x^20 - x^28 + O(x^32)]], [87, [Mod
(1, t^2 + t + 1)*x + Mod(-1, t^2 + t + 1)*x^4 + Mod(t, t^2 + t + 1)*x^5 + Mo
d(-t - 1, t^2 + t + 1)*x^6 + Mod(-t, t^2 + t + 1)*x^13 + Mod(t + 1, t^2 + t 
+ 1)*x^14 + Mod(1, t^2 + t + 1)*x^16 + Mod(-t - 1, t^2 + t + 1)*x^17 + Mod(-
t, t^2 + t + 1)*x^20 + Mod(t, t^2 + t + 1)*x^21 + Mod(t, t^2 + t + 1)*x^22 +
 Mod(t + 1, t^2 + t + 1)*x^24 + Mod(1, t^2 + t + 1)*x^30 + O(x^32), Mod(1, t
^2 + t + 1)*x^2 + Mod(t + 1, t^2 + t + 1)*x^3 + Mod(-t - 1, t^2 + t + 1)*x^7
 + Mod(-1, t^2 + t + 1)*x^8 + Mod(t, t^2 + t + 1)*x^10 + Mod(-t, t^2 + t + 1
)*x^11 + Mod(-t - 1, t^2 + t + 1)*x^12 + Mod(-1, t^2 + t + 1)*x^15 + Mod(t +
 1, t^2 + t + 1)*x^19 + Mod(-t, t^2 + t + 1)*x^26 + Mod(-1, t^2 + t + 1)*x^2
7 + Mod(t + 1, t^2 + t + 1)*x^28 + Mod(-1, t^2 + t + 1)*x^31 + O(x^32)]]]
126: [[55, [x - x^4 - x^7 + x^16 + x^25 + x^28 + O(x^32), x^2 - x^8 - x^14 +
 O(x^32)]]]
127: [[126, [x - x^8 + x^9 - x^11 - x^13 - x^22 + x^25 - x^26 + O(x^32), x^2
 - x^4 - x^11 - x^13 + x^17 + x^18 + x^19 + x^31 + O(x^32)]]]
128: [[63, [x - x^9 - 2*x^17 + x^25 + O(x^32)]]]
129: [[41, [Mod(1, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x + Mod(t^4, t^6 + t
^5 + t^4 + t^3 + t^2 + t + 1)*x^3 + Mod(-t^5 - t^4 - t^3 - t^2 - t - 1, t^6 
+ t^5 + t^4 + t^3 + t^2 + t + 1)*x^4 + Mod(t^5 + t^2, t^6 + t^5 + t^4 + t^3 
+ t^2 + t + 1)*x^7 + Mod(t, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^9 + Mod(t
^3, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^12 + Mod(t^3 + t, t^6 + t^5 + t^4
 + t^3 + t^2 + t + 1)*x^13 + Mod(t^5, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x
^16 + Mod(t^3 + t^2, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^19 + Mod(-t^5 - 
t^4 - t^3 - t - 1, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^21 + Mod(t^4, t^6 
+ t^5 + t^4 + t^3 + t^2 + t + 1)*x^25 + Mod(t^5, t^6 + t^5 + t^4 + t^3 + t^2
 + t + 1)*x^27 + Mod(t^4 + t, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^28 + Mo
d(-t^5 - t^4 - t^3 - t^2 - t, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^31 + O(
x^32)]]]
131: [[130, [x + x^4 - x^5 - x^7 - x^15 + x^16 - x^20 - x^21 + x^25 - x^27 -
 x^28 + O(x^32), x^3 - x^5 - x^7 - x^9 + x^11 + x^12 + x^13 - x^20 + x^25 - 
x^28 + O(x^32)]]]
132: [[109, [x - x^5 - x^9 + x^11 - x^23 + x^27 - x^31 + O(x^32), x^3 - x^9 
- x^15 + O(x^32)]]]
133: [[83, [Mod(1, t^2 + t + 1)*x + Mod(-t - 1, t^2 + t + 1)*x^2 + Mod(-1, t
^2 + t + 1)*x^8 + Mod(t, t^2 + t + 1)*x^15 + Mod(t + 1, t^2 + t + 1)*x^16 + 
Mod(t + 1, t^2 + t + 1)*x^21 + Mod(t, t^2 + t + 1)*x^23 + Mod(-t, t^2 + t + 
1)*x^29 + Mod(1, t^2 + t + 1)*x^30 + O(x^32), Mod(1, t^2 + t + 1)*x^3 + Mod(
-1, t^2 + t + 1)*x^5 + Mod(-t - 1, t^2 + t + 1)*x^6 + Mod(t, t^2 + t + 1)*x^
7 + Mod(t + 1, t^2 + t + 1)*x^10 + Mod(-t - 1, t^2 + t + 1)*x^13 + Mod(1, t^
2 + t + 1)*x^14 + Mod(1, t^2 + t + 1)*x^17 + Mod(-t, t^2 + t + 1)*x^19 + Mod
(-1, t^2 + t + 1)*x^24 + Mod(t, t^2 + t + 1)*x^26 + Mod(t, t^2 + t + 1)*x^27
 + O(x^32)]], [37, [Mod(1, t^2 + t + 1)*x + Mod(-t - 1, t^2 + t + 1)*x^4 + M
od(-t, t^2 + t + 1)*x^5 + Mod(t, t^2 + t + 1)*x^7 + Mod(t, t^2 + t + 1)*x^9 
+ Mod(t + 1, t^2 + t + 1)*x^11 + Mod(t, t^2 + t + 1)*x^16 + Mod(-2*t - 2, t^
2 + t + 1)*x^17 + Mod(t, t^2 + t + 1)*x^19 + Mod(-1, t^2 + t + 1)*x^20 + Mod
(-t, t^2 + t + 1)*x^23 + Mod(1, t^2 + t + 1)*x^28 + O(x^32)]]]
135: [[134, [x - x^10 - x^16 - x^19 + x^25 - x^31 + O(x^32), x^2 - x^5 - x^8
 + x^17 + x^23 + O(x^32)]]]
136: [[135, [x - x^9 - 2*x^13 + x^17 + x^25 + O(x^32), x^2 - x^4 + x^8 - x^1
6 - x^18 - 2*x^26 + O(x^32)]], [67, [x - x^2 + x^4 - x^8 + x^9 + x^16 - x^17
 - x^18 - 2*x^19 - x^25 + O(x^32)]], [47, [Mod(1, t^2 + 1)*x + Mod(-t - 1, t
^2 + 1)*x^5 + Mod(t, t^2 + 1)*x^9 + Mod(-1, t^2 + 1)*x^17 + Mod(t, t^2 + 1)*
x^25 + Mod(t + 1, t^2 + 1)*x^29 + O(x^32), Mod(1, t^2 + 1)*x^2 + Mod(t, t^2 
+ 1)*x^4 + Mod(-1, t^2 + 1)*x^8 + Mod(-t - 1, t^2 + 1)*x^10 + Mod(-t, t^2 + 
1)*x^16 + Mod(t, t^2 + 1)*x^18 + Mod(-t + 1, t^2 + 1)*x^20 + O(x^32)]], [115
, [Mod(1, t^2 + 1)*x + Mod(-t, t^2 + 1)*x^2 + Mod(-t - 1, t^2 + 1)*x^3 + Mod
(-1, t^2 + 1)*x^4 + Mod(t - 1, t^2 + 1)*x^6 + Mod(t, t^2 + 1)*x^8 + Mod(t, t
^2 + 1)*x^9 + Mod(-t + 1, t^2 + 1)*x^11 + Mod(t + 1, t^2 + 1)*x^12 + Mod(1, 
t^2 + 1)*x^16 + Mod(-t, t^2 + 1)*x^17 + Mod(1, t^2 + 1)*x^18 + Mod(2*t, t^2 
+ 1)*x^19 + Mod(-t - 1, t^2 + 1)*x^22 + Mod(-t + 1, t^2 + 1)*x^24 + Mod(t, t
^2 + 1)*x^25 + O(x^32)]], [43, [Mod(1, t^4 + 1)*x + Mod(t^3, t^4 + 1)*x^2 + 
Mod(-t^3 + t^2, t^4 + 1)*x^3 + Mod(-t^2, t^4 + 1)*x^4 + Mod(t^2 - t, t^4 + 1
)*x^6 + Mod(t, t^4 + 1)*x^8 + Mod(-t^2 + t - 1, t^4 + 1)*x^9 + Mod(t^3 - 1, 
t^4 + 1)*x^11 + Mod(-t + 1, t^4 + 1)*x^12 + Mod(-1, t^4 + 1)*x^16 + Mod(-t^3
, t^4 + 1)*x^17 + Mod(-t^3 + t - 1, t^4 + 1)*x^18 + Mod(-t^3 - t^2, t^4 + 1)
*x^22 + Mod(t^3 + 1, t^4 + 1)*x^24 + Mod(-t, t^4 + 1)*x^25 + Mod(t^3 - t^2 -
 t + 1, t^4 + 1)*x^27 + O(x^32)]]]
138: [[91, [x - x^4 + x^8 - x^9 - x^13 + x^23 + x^25 + x^27 - x^29 - x^31 + 
O(x^32), x^2 - x^4 + x^16 - x^18 - x^26 + O(x^32), x^3 - x^9 - x^12 + x^24 +
 O(x^32), x^6 - x^12 - x^18 + O(x^32)]]]
139: [[138, [x + x^4 - x^5 - x^7 + x^9 - x^11 - x^13 + x^16 - x^20 - x^28 - 
x^29 - x^31 + O(x^32)]]]
140: [[69, [x - x^11 - x^15 - x^21 + x^25 - x^29 + O(x^32), x^3 - x^5 - x^7 
+ x^13 + x^17 - x^27 + O(x^32)]], [79, [Mod(1, t^2 + t + 1)*x + Mod(-t - 1, 
t^2 + t + 1)*x^4 + Mod(t, t^2 + t + 1)*x^5 + Mod(-1, t^2 + t + 1)*x^6 + Mod(
1, t^2 + t + 1)*x^14 + Mod(t, t^2 + t + 1)*x^16 + Mod(1, t^2 + t + 1)*x^20 +
 Mod(-t, t^2 + t + 1)*x^21 + Mod(t + 1, t^2 + t + 1)*x^24 + Mod(-t - 1, t^2 
+ t + 1)*x^25 + Mod(-1, t^2 + t + 1)*x^29 + Mod(-t, t^2 + t + 1)*x^30 + O(x^
32), Mod(1, t^2 + t + 1)*x^2 + Mod(-t, t^2 + t + 1)*x^3 + Mod(t, t^2 + t + 1
)*x^7 + Mod(-t - 1, t^2 + t + 1)*x^8 + Mod(t, t^2 + t + 1)*x^10 + Mod(-1, t^
2 + t + 1)*x^12 + Mod(t + 1, t^2 + t + 1)*x^15 + Mod(-1, t^2 + t + 1)*x^23 +
 Mod(-t - 1, t^2 + t + 1)*x^27 + Mod(1, t^2 + t + 1)*x^28 + O(x^32)]]]
141: [[46, [x - x^8 - x^9 + x^14 - x^17 + x^25 + x^27 - x^28 + O(x^32), x^2 
- x^4 + x^7 - x^14 - x^17 - x^18 + x^27 + x^28 + O(x^32), x^3 - x^9 - x^18 -
 x^24 + x^27 + O(x^32), x^6 - x^9 - x^12 + x^21 + x^27 + O(x^32)]]]
142: [[141, [x - x^10 - x^12 - x^15 + x^18 - x^19 + x^20 + x^25 + O(x^32), x
^2 - x^10 - x^12 + x^18 - x^24 - x^30 + O(x^32), x^3 + x^8 - x^9 - x^12 - x^
15 - x^19 - x^24 + x^25 + x^27 + x^29 + O(x^32), x^4 - x^8 - x^10 - x^12 + x
^16 + x^18 + x^20 + O(x^32), x^5 + x^8 - x^9 - x^16 - x^19 - x^20 - x^24 + x
^27 + O(x^32), x^6 - x^8 - x^10 + x^16 + x^20 - x^30 + O(x^32)]]]
143: [[142, [x - x^12 - x^14 - x^23 + x^25 - x^27 + O(x^32), x^2 - 2*x^7 - x
^8 + x^11 + x^13 + x^19 - x^21 - x^24 + x^28 + O(x^32), x^3 - x^4 - x^9 + x^
12 + x^22 - x^23 + x^26 + O(x^32), x^6 - x^7 - x^8 + x^11 + x^13 - x^18 - x^
21 + x^28 + O(x^32)]]]
144: [[127, [x - 2*x^13 - x^25 + O(x^32)]], [103, [Mod(1, t^2 + t + 1)*x + M
od(-t - 1, t^2 + t + 1)*x^3 + Mod(t, t^2 + t + 1)*x^9 + Mod(t + 1, t^2 + t +
 1)*x^11 + Mod(-1, t^2 + t + 1)*x^17 + Mod(-1, t^2 + t + 1)*x^19 + Mod(-t - 
1, t^2 + t + 1)*x^25 + Mod(1, t^2 + t + 1)*x^27 + O(x^32), Mod(1, t^2 + t + 
1)*x^2 + Mod(-t - 1, t^2 + t + 1)*x^4 + Mod(-t - 1, t^2 + t + 1)*x^6 + Mod(t
, t^2 + t + 1)*x^8 + Mod(t, t^2 + t + 1)*x^12 + Mod(1, t^2 + t + 1)*x^16 + M
od(t, t^2 + t + 1)*x^18 + Mod(t + 1, t^2 + t + 1)*x^22 + Mod(1, t^2 + t + 1)
*x^24 + O(x^32)]]]
145: [[99, [Mod(1, t^2 + 1)*x + Mod(t, t^2 + 1)*x^4 + Mod(-t, t^2 + 1)*x^5 +
 Mod(t, t^2 + 1)*x^9 + Mod(-t - 1, t^2 + 1)*x^11 + Mod(-1, t^2 + 1)*x^16 + M
od(-t - 1, t^2 + 1)*x^19 + Mod(1, t^2 + 1)*x^20 + Mod(-1, t^2 + 1)*x^25 + Mo
d(t, t^2 + 1)*x^29 + Mod(t + 1, t^2 + 1)*x^31 + O(x^32)]], [57, [Mod(1, t^2 
+ 1)*x + Mod(t, t^2 + 1)*x^4 + Mod(t, t^2 + 1)*x^5 + Mod(-t - 1, t^2 + 1)*x^
7 + Mod(-t, t^2 + 1)*x^9 + Mod(-t + 1, t^2 + 1)*x^13 + Mod(-1, t^2 + 1)*x^16
 + Mod(-1, t^2 + 1)*x^20 + Mod(t - 1, t^2 + 1)*x^23 + Mod(-1, t^2 + 1)*x^25 
+ Mod(-t + 1, t^2 + 1)*x^28 + Mod(t, t^2 + 1)*x^29 + O(x^32)]]]
147: [[92, [Mod(1, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x + Mod(t^4, t^6 + t
^5 + t^4 + t^3 + t^2 + t + 1)*x^3 + Mod(t^5, t^6 + t^5 + t^4 + t^3 + t^2 + t
 + 1)*x^4 + Mod(-t^5 - t^4 - t^3 - t^2 - t - 1, t^6 + t^5 + t^4 + t^3 + t^2 
+ t + 1)*x^7 + Mod(t, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^9 + Mod(t^2, t^
6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^12 + Mod(t^3 + t^2, t^6 + t^5 + t^4 + t
^3 + t^2 + t + 1)*x^13 + Mod(t^3, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^16 
+ Mod(-t^5 - t^4 - t^3 - t^2 - 1, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^19 
+ Mod(t^3, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^21 + Mod(t, t^6 + t^5 + t^
4 + t^3 + t^2 + t + 1)*x^25 + Mod(t^5, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*
x^27 + Mod(t^4, t^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^28 + Mod(t^5 + t^2, t
^6 + t^5 + t^4 + t^3 + t^2 + t + 1)*x^31 + O(x^32)]]]
148: [[105, [Mod(1, t^2 + 1)*x + Mod(-t, t^2 + 1)*x^3 + Mod(-1, t^2 + 1)*x^7
 + Mod(t, t^2 + 1)*x^11 + Mod(t - 1, t^2 + 1)*x^17 + Mod(-t + 1, t^2 + 1)*x^
19 + Mod(t, t^2 + 1)*x^21 + Mod(t - 1, t^2 + 1)*x^23 + Mod(t, t^2 + 1)*x^25 
+ Mod(-t, t^2 + 1)*x^27 + Mod(-t - 1, t^2 + 1)*x^29 + O(x^32)]], [63, [Mod(1
, t^2 + t + 1)*x + Mod(-t - 1, t^2 + t + 1)*x^2 + Mod(t, t^2 + t + 1)*x^4 + 
Mod(-t, t^2 + t + 1)*x^5 + Mod(1, t^2 + t + 1)*x^8 + Mod(-t - 1, t^2 + t + 1
)*x^9 + Mod(-1, t^2 + t + 1)*x^10 + Mod(2*t, t^2 + t + 1)*x^13 + Mod(-t - 1,
 t^2 + t + 1)*x^16 + Mod(t + 1, t^2 + t + 1)*x^17 + Mod(t, t^2 + t + 1)*x^18
 + Mod(t + 1, t^2 + t + 1)*x^20 + Mod(2, t^2 + t + 1)*x^26 + Mod(-1, t^2 + t
 + 1)*x^29 + O(x^32)]], [127, [Mod(1, t^6 + t^3 + 1)*x + Mod(t^5, t^6 + t^3 
+ 1)*x^2 + Mod(t, t^6 + t^3 + 1)*x^4 + Mod(t^3 + t^2, t^6 + t^3 + 1)*x^5 + M
od(-t^3 - 1, t^6 + t^3 + 1)*x^8 + Mod(-t^5 - t^2, t^6 + t^3 + 1)*x^9 + Mod(-
t^5 - t^4 - t^2 - t, t^6 + t^3 + 1)*x^10 + Mod(-t, t^6 + t^3 + 1)*x^13 + Mod
(t^2, t^6 + t^3 + 1)*x^16 + Mod(-t^3 + t - 1, t^6 + t^3 + 1)*x^17 + Mod(t^4,
 t^6 + t^3 + 1)*x^18 + Mod(t^4 + t^3, t^6 + t^3 + 1)*x^20 + Mod(t^5 + t^4 - 
t^3 - 1, t^6 + t^3 + 1)*x^25 + Mod(t^3 + 1, t^6 + t^3 + 1)*x^26 + Mod(t^5 - 
t^4 - t, t^6 + t^3 + 1)*x^29 + O(x^32)]]]
[1, 0, 0] [2, 0, 0] [3, 0, 0] [4, 0, 0] [5, 0, 0] [6, 0, 0] [7, 0, 0] [8, 0,
 0] [9, 0, 0] [10, 0, 0] [11, 0, 0] [12, 0, 0] [13, 0, 0] [14, 0, 0] [15, 0,
 0] [16, 0, 0] [17, 0, 0] [18, 0, 0] [19, 0, 0] [20, 0, 0] [21, 0, 0] [22, 0
, 0] [23, 1, 1] [24, 0, 0] [25, 0, 0] [26, 0, 0] [27, 0, 0] [28, 0, 0] [29, 
0, 0] [30, 0, 0] [31, 1, 1] [32, 0, 0] [33, 0, 0] [34, 0, 0] [35, 0, 0] [36,
 0, 0] [37, 0, 0] [38, 0, 0] [39, 1, 1] [40, 0, 0] [41, 0, 0] [42, 0, 0] [43
, 0, 0] [44, 1, 1] [45, 0, 0] [46, 2, 0] [47, 2, 2] [48, 0, 0] [49, 0, 0] [5
0, 0, 0] [51, 0, 0] [52, 2, 2] [53, 0, 0] [54, 0, 0] [55, 1, 1] [56, 1, 1] [
57, 2, 2] [58, 0, 0] [59, 1, 1] [60, 0, 0] [61, 0, 0] [62, 2, 0] [63, 1, 1] 
[64, 0, 0] [65, 0, 0] [66, 0, 0] [67, 0, 0] [68, 3, 3] [69, 2, 0] [70, 0, 0]
 [71, 3, 3] [72, 2, 2] [73, 0, 0] [74, 0, 0] [75, 0, 0] [76, 1, 1] [77, 4, 4
] [78, 2, 0] [79, 2, 2] [80, 1, 1] [81, 0, 0] [82, 0, 0] [83, 1, 1] [84, 2, 
2] [85, 0, 0] [86, 0, 0] [87, 2, 2] [88, 6, 4] [89, 0, 0] [90, 0, 0] [91, 0,
 0] [92, 3, 0] [93, 6, 4] [94, 4, 0] [95, 3, 3] [96, 0, 0] [97, 0, 0] [98, 0
, 0] [99, 2, 2] [100, 4, 4] [101, 0, 0] [102, 0, 0] [103, 2, 2] [104, 6, 2] 
[105, 0, 0] [106, 0, 0] [107, 1, 1] [108, 1, 1] [109, 0, 0] [110, 2, 0] [111
, 7, 7] [112, 4, 2] [113, 0, 0] [114, 4, 0] [115, 2, 0] [116, 8, 8] [117, 4,
 2] [118, 2, 0] [119, 4, 4] [120, 2, 2] [121, 0, 0] [122, 0, 0] [123, 0, 0] 
[124, 7, 4] [125, 0, 0] [126, 2, 0] [127, 2, 2] [128, 1, 1] [129, 6, 6] [130
, 0, 0] [131, 2, 2] [132, 2, 0] [133, 6, 6] [134, 0, 0] [135, 2, 2] [136, 13
, 7] [137, 0, 0] [138, 4, 0] [139, 1, 1] [140, 6, 6] [141, 4, 0] [142, 6, 0]
 [143, 4, 4] [144, 5, 1] [145, 4, 4] [146, 0, 0] [147, 6, 6] [148, 10, 10] [
149, 0, 0] [150, 0, 0] 
[[2, Mod(22, 23), 1, 1]]
[[2, Mod(22, 23), 1, 1]]
[]
[[0, 0], [0, 0], [0, 0], [1, 1]]
[[0, 0], [0, 0], [0, 0], [1, 1]]
[[0, 0], [0, 0], [0, 0], [0, 0]]
32
85
53
87
172
[[1, Mod(1, 96), 2, 0], [2, Mod(95, 96), 4, 0], [2, Mod(49, 96), 2, 0], [2, 
Mod(47, 96), 2, 0], [8, Mod(37, 96), 8, 0], [8, Mod(59, 96), 14, 0]]
[[1, Mod(1, 96), 9, 0], [2, Mod(95, 96), 8, 0], [2, Mod(49, 96), 8, 0], [2, 
Mod(47, 96), 8, 0], [4, Mod(25, 96), 12, 0], [4, Mod(71, 96), 12, 0], [8, Mo
d(37, 96), 14, 0], [8, Mod(59, 96), 14, 0]]
[[1, Mod(1, 96), 7, 0], [2, Mod(95, 96), 4, 0], [2, Mod(49, 96), 6, 0], [2, 
Mod(47, 96), 6, 0], [4, Mod(25, 96), 12, 0], [4, Mod(71, 96), 12, 0], [8, Mo
d(37, 96), 6, 0]]
[[1, Mod(1, 96), 15, 0], [2, Mod(95, 96), 16, 0], [2, Mod(49, 96), 16, 0], [
2, Mod(47, 96), 16, 0], [4, Mod(25, 96), 8, 0], [4, Mod(71, 96), 8, 0], [8, 
Mod(37, 96), 4, 0], [8, Mod(59, 96), 4, 0]]
[[1, Mod(1, 96), 24, 0], [2, Mod(95, 96), 24, 0], [2, Mod(49, 96), 24, 0], [
2, Mod(47, 96), 24, 0], [4, Mod(25, 96), 20, 0], [4, Mod(71, 96), 20, 0], [8
, Mod(37, 96), 18, 0], [8, Mod(59, 96), 18, 0]]
[[2, 0], [0, 0], [0, 0], [4, 0], [8, 0], [0, 0], [0, 0], [14, 0], [0, 0], [0
, 0], [0, 0], [0, 0], [2, 0], [0, 0], [0, 0], [2, 0]]
[[9, 0], [0, 0], [0, 0], [8, 0], [14, 0], [0, 0], [0, 0], [14, 0], [12, 0], 
[0, 0], [0, 0], [12, 0], [8, 0], [0, 0], [0, 0], [8, 0]]
[[7, 0], [0, 0], [0, 0], [4, 0], [6, 0], [0, 0], [0, 0], [0, 0], [12, 0], [0
, 0], [0, 0], [12, 0], [6, 0], [0, 0], [0, 0], [6, 0]]
[[15, 0], [0, 0], [0, 0], [16, 0], [4, 0], [0, 0], [0, 0], [4, 0], [8, 0], [
0, 0], [0, 0], [8, 0], [16, 0], [0, 0], [0, 0], [16, 0]]
[[24, 0], [0, 0], [0, 0], [24, 0], [18, 0], [0, 0], [0, 0], [18, 0], [20, 0]
, [0, 0], [0, 0], [20, 0], [24, 0], [0, 0], [0, 0], [24, 0]]
10
2
[0, 3, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]
[0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]
100
[1, -264, -135432, -5196576, -69341448, -515625264, -2665843488, -1065335251
2, -35502821640, -102284205672, -264515760432, -622498190688, -1364917062432
, -2799587834736, -5465169838656, -10149567696576]
[0, 1, -24, 252, -1472, 4830, -6048, -16744, 84480, -113643, -115920, 534612
, -370944, -577738, 401856, 1217160]
1
[1, -24, 252, -1472, 4830, -6048, -16744, 84480, -113643, -115920, 534612, -
370944, -577738, 401856, 1217160, 987136]
[0, 1, -12, 84, -368, 966, -1008]
[1/1728, 0, -1/20736, 0, 1/165888, 0, 1/497664, 0, -11/3981312, 0, 7/1592524
8]
[1728, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0]
[0, 1728, -41472, 435456, -2543616, 8346240, -10450944, -28933632, 145981440
, -196375104, -200309760, 923809536, -640991232, -998331264, 694407168, 2103
252480]
[0, -504, -33264, -368928, -2130912, -7877520, -24349248]
[-1/2, -240, -30960, -525120, -3963120, -18750240, -67740480]
[0, 1, -24, 252, -1472, 4830, -6048, -16744, 84480, -113643, -115920, 534612
, -370944, -577738, 401856, 1217160]
[0, 1, -24, 252, -1472, 4830, -6048, -16744, 84480, -113643, -115920]
1
[0, 1, -4, 2, 8, -5, -8, 6, 0, -23]
[y, y^2 + Mod(-t, t^2 + 1)*y + 32]
[[Mod(0, t^2 + 1), Mod(1, t^2 + 1), Mod(-4*t - 4, t^2 + 1), Mod(23*t - 23, t
^2 + 1), Mod(32*t, t^2 + 1), Mod(100*t - 75, t^2 + 1)], [Mod(0, t^2 + 1), Mo
d(1, t^2 + 1), Mod(-4*t - 4, t^2 + 1), Mod(23*t - 23, t^2 + 1), Mod(32*t, t^
2 + 1), Mod(100*t - 75, t^2 + 1)]]
[[Mod(0, y^2 + Mod(-t, t^2 + 1)*y + 32), Mod(Mod(1, t^2 + 1), y^2 + Mod(-t, 
t^2 + 1)*y + 32), Mod(Mod(4*t + 4, t^2 + 1), y^2 + Mod(-t, t^2 + 1)*y + 32),
 Mod(Mod(5*t + 5, t^2 + 1)*y + Mod(2*t - 2, t^2 + 1), y^2 + Mod(-t, t^2 + 1)
*y + 32), Mod(Mod(32*t, t^2 + 1), y^2 + Mod(-t, t^2 + 1)*y + 32), Mod(Mod(-5
*t - 15, t^2 + 1)*y + Mod(35*t + 80, t^2 + 1), y^2 + Mod(-t, t^2 + 1)*y + 32
)], [Mod(0, y^4 + 65*y^2 + 1024), Mod(1, y^4 + 65*y^2 + 1024), Mod(-1/8*y^3 
- 33/8*y + 4, y^4 + 65*y^2 + 1024), Mod(-1/16*y^3 + 5*y^2 + 47/16*y + 158, y
^4 + 65*y^2 + 1024), Mod(-y^3 - 33*y, y^4 + 65*y^2 + 1024), Mod(-35/32*y^3 -
 5*y^2 - 1635/32*y - 80, y^4 + 65*y^2 + 1024)]]
[10, 7, Mod(2, 5)]
3
[0, 3, 4*t + 4, 32*t - 32, 96*t, 155*t + 90, 112, -348*t - 348, 128*t - 128,
 -2177*t]
2
[0, 1, -4*t - 4, 23*t - 23, 32*t, 100*t - 75, 184, -247*t - 247, -128*t + 12
8, -329*t]
[0, 1, 4*t + 4, (5*t + 5)*y + (2*t - 2), 32*t, (-5*t - 15)*y + (35*t + 80), 
40*t*y - 16, (-55*t + 55)*y + (-78*t - 78), 128*t - 128, -90*y - 879*t]
[0, 1, -2, -1, 2, 1, 2, -2, 0, -2, -2]
1
8
[0, 0, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0]~
13
x^12 + Mod(-4*t - 4, t^2 + t + 1)*x^11 + Mod(-4*t, t^2 + t + 1)*x^10 + Mod(-
40, t^2 + t + 1)*x^9 + Mod(27*t + 27, t^2 + t + 1)*x^8 + Mod(150*t, t^2 + t 
+ 1)*x^7 + Mod(216, t^2 + t + 1)*x^6 + Mod(270*t + 270, t^2 + t + 1)*x^5 + M
od(-675*t, t^2 + t + 1)*x^4 + Mod(54, t^2 + t + 1)*x^3 + Mod(-972*t - 972, t
^2 + t + 1)*x^2 + Mod(648*t, t^2 + t + 1)*x
1
[]
[-24]
[14]
[-12]
[[33, 2, 1], [0, 1, 1, -1, -1, -2, -1, 4, -3, 1, -2]]
[[38, 2, 1], [0, 1, 1, -1, 1, -4, -1, 3, 1, -2, -4]]
[[39, 2, 1], [0, 1, 1, -1, -1, 2, -1, -4, -3, 1, 2]]
[[34, 2, 1], [0, 1, 1, -2, 1, 0, -2, -4, 1, 1, 0]]
[[38, 2, 1], [0, 1, -1, 1, 1, 0, -1, -1, -1, -2, 0]]
[[11, 3, -11], [0, 1, 0, -5, 4, -1, 0, 0, 0, 16, 0]]
[[12, 3, -3], [0, 1, 0, -3, 0, 0, 0, 2, 0, 9, 0]]
[[16, 3, -4], [0, 1, 0, 0, 0, -6, 0, 0, 0, 9, 0]]
x^12 + 2*x^11 + 4*x^10 + 4*x^9 + 4*x^8 + 2*x^7 - 8*x^5 - 17*x^4 - 16*x^3 - 8
*x^2 + 16*x + 16
[2, 40, 20, 10, 8, 10, 4, 2]
[[0, 0], [0, 0], [0, 0], [1, 1], [0, 0], [1, 1], [0, 0], [3, 3]]
[[3, 3]]
[[5, 5]]
[[2, 2]]
[[6, 6]]
[[4, 4]]
[0, 1, t^2 + t, 0, -t - 1, 0, 0, t^3, -t^2, -t^3 - t^2 - t - 1, 0]
[10]
1
[0, 1, 0, 0, t, t, 0, 0, 0, 0, 0]
[6]
6
10
3
[-1.0000000000000000000000000000000000000, -3600.000000000000000000000000000
0000000, 240.00000000000000000000000000000000000*x^-1 + O(x^0)]
0.0050835121083932868604942901374387473226
[1620/691, 1, 9/14, 9/14, 1, 1620/691]
0.0074154209298961305890064277459002287248
[1, 25/48, 5/12, 25/48, 1]
[270000/43867, 1, 75/364, 15/308, 0, -15/308, -75/364, -1, -270000/43867]
-0.43965042620884602281482782769927016562
[1, 11/60, 1/24, 1/120, -1/120, -1/24, -11/60, -1]
0.074154209298961305890064277459002287248
x^9 - 25/4*x^7 + 21/2*x^5 - 25/4*x^3 + x
-0.011917929979156475707671128831621954649*I
-x^10 + 691/36*x^8 - 691/12*x^6 + 691/12*x^4 - 691/36*x^2 + 1
[x^8 - 3*x^6 + 3*x^4 - x^2, 4*x^9 - 25*x^7 + 42*x^5 - 25*x^3 + 4*x, x^10 - 1
]
[x^8 - 3*x^6 + 3*x^4 - x^2, x^10 - 1]
[4*x^9 - 25*x^7 + 42*x^5 - 25*x^3 + 4*x]
[]
[]
1
[1, 0, 1, 3]
[-1, -1, 0]
[1, 12, 1, 0]
[3, 7, -3, 3]
[15, 7, -15, 3]
[1, 4, 1, 3]
[11, 1, -11, 3]
[1, 12, 1, 0]
[11, 2, 1, 0]
[35, 2, 1, 0]
[385, 2, 1, 1]
[3, 21, -3, 4]
[15, 14, 5, 4]
[1, 12, 1, 0]
[385, 2, 1, 1]
[15, 0, 5, -1]
[1, 12, 1, 4]
[1, 6, 1, 0]
[1, 12, 1, 4]
[1, 10, 1, 0]
[1, 12, 1, 0]
[25, 4, 1, 3]
[1, 12, 1, 0]
[3, 4, 1, 3]
[23, 1, -23]
[]~
[4, 1, -4]
-3
[-3, -39]
  ***   at top-level: mftobasis(mf0,L[1])
  ***                 ^-------------------
  *** mftobasis: domain error in mftobasis: form does not belong to space
[-1, -1, 0]
[-1, -1, 0]
  ***   at top-level: mfinit([23,1,Mod(22,45)],0)
  ***                 ^---------------------------
  *** mfinit: incorrect type in checkNF [chi] (t_VEC).
  ***   at top-level: mfinit([23,2,Mod(22,45)],0)
  ***                 ^---------------------------
  *** mfinit: incorrect type in checkNF [chi] (t_VEC).
  ***   at top-level: mfdim([23,1,0])
  ***                 ^---------------
  *** mfdim: sorry, noncuspidal dimension of G_1(N) is not yet implemented.
  ***   at top-level: mfdim([23,1,0],3)
  ***                 ^-----------------
  *** mfdim: sorry, noncuspidal dimension of G_1(N) is not yet implemented.
  ***   at top-level: mfgaloistype([11,1,Mod(2,11)],mfeisen(1,1,Mod(
  ***                 ^----------------------------------------------
  *** mfgaloistype: domain error in mfgaloistype: form not a cuspidal eigenform
  ***   at top-level: mfspace(mfcreate(ramanujantau))
  ***                 ^-------------------------------
  *** mfspace: sorry, mfspace for this F is not yet implemented.
Total time spent: 4816
