\\ an_s2g0new_201-300.gp
\\ This is a PARI readable nonnormalized basis for S_k(Gamma_0(N)) for N 
\\ in the range:  201 <= N <= 300.
\\ The number of a_n computed is sufficient to satisfy Sturm's bound.
\\ William Stein (was@math.berkeley.edu)

E[201,1] = [x, [1,-1,1,-1,-1,-1,-5,3,1,1,-4,-1,-4,5,-1,-1,6,-1,-2,1,-5,4,-3,3,-4,4,1,5,4,1,-7,-5,-4,-6,5,-1,5,2,-4,-3,-3,5,7,4,-1]];
E[201,2] = [x, [1,-2,-1,2,0,2,0,0,1,0,-6,-2,4,0,0,-4,-7,-2,-5,0,0,12,-1,0,-5,-8,-1,0,1,0,-4,8,6,14,0,2,3,10,-4,0,0,0,-6,-12,0]];
E[201,3] = [x, [1,1,-1,-1,-3,-1,-3,-3,1,-3,0,1,4,-3,3,-1,2,1,-2,3,3,0,-7,3,4,4,-1,3,-8,3,-1,5,0,2,9,-1,-3,-2,-4,9,-9,3,9,0,-3]];
E[201,4] = [x^3-3*x^2-x+5, [1,x,-1,x^2-2,-x^2+x+3,-x,-x^2+2*x+2,3*x^2-3*x-5,1,-2*x^2+2*x+5,-x^2+7,-x^2+2,-x^2+1,-x^2+x+5,x^2-x-3,4*x^2-2*x-11,3*x^2-4*x-7,x,-x^2-2*x+5,-2*x^2+x+4,x^2-2*x-2,-3*x^2+6*x+5,3*x^2-5*x-5,-3*x^2+3*x+5,-x^2+2*x-1,-3*x^2+5,-1,1,-4*x^2+4*x+12,2*x^2-2*x-5,4*x^2-6*x-5,4*x^2-x-10,x^2-7,5*x^2-4*x-15,-2*x^2+3*x+6,x^2-2,3*x^2-2*x-12,-5*x^2+4*x+5,x^2-1,-x^2-2*x,2*x^2+x-8,x^2-x-5,-1,-x^2+2*x+1,-x^2+x+3]];
E[201,5] = [x^5-8*x^3+13*x+2, [2,2*x,2,2*x^2-4,x^4-x^3-7*x^2+5*x+6,2*x,-x^4-x^3+5*x^2+3*x+2,2*x^3-8*x,2,-x^4+x^3+5*x^2-7*x-2,2*x^3-10*x,2*x^2-4,2*x^3-10*x+4,-x^4-3*x^3+3*x^2+15*x+2,x^4-x^3-7*x^2+5*x+6,2*x^4-12*x^2+8,-2*x^4-2*x^3+12*x^2+6*x-10,2*x,2*x^4-2*x^3-12*x^2+10*x+10,-x^4-x^3+7*x^2+x-10,-x^4-x^3+5*x^2+3*x+2,2*x^4-10*x^2,x^4+x^3-5*x^2-5*x,2*x^3-8*x,-x^4+3*x^3+5*x^2-17*x,2*x^4-10*x^2+4*x,2,-x^4-3*x^3+5*x^2+9*x-2,2*x^3+6*x^2-10*x-18,-x^4+x^3+5*x^2-7*x-2,-x^4+x^3+9*x^2-7*x-10,-2*x-4,2*x^3-10*x,-2*x^4-4*x^3+6*x^2+16*x+4,3*x^4-x^3-17*x^2+9*x+6,2*x^2-4,-x^4+x^3+7*x^2+x-4,-2*x^4+4*x^3+10*x^2-16*x-4,2*x^3-10*x+4,x^4-3*x^3-9*x^2+17*x+6,-x^4-x^3+7*x^2+x-10,-x^4-3*x^3+3*x^2+15*x+2,x^4-x^3-9*x^2+11*x+14,2*x^3-6*x-4,x^4-x^3-7*x^2+5*x+6]];

E[202,1] = [x^4+x^3-8*x^2+x+8, [1,1,x,1,x^3+2*x^2-5*x-2,x,-x^3-2*x^2+4*x+3,1,x^2-3,x^3+2*x^2-5*x-2,-3*x^3-8*x^2+11*x+16,x,-x^2-2*x+4,-x^3-2*x^2+4*x+3,x^3+3*x^2-3*x-8,1,3*x^3+9*x^2-11*x-19,x^2-3,3*x^3+7*x^2-12*x-15,x^3+2*x^2-5*x-2,-x^3-4*x^2+4*x+8,-3*x^3-8*x^2+11*x+16,-2*x^3-4*x^2+10*x+6,x,-2*x^2-3*x+7,-x^2-2*x+4,x^3-6*x,-x^3-2*x^2+4*x+3,-x^3-x^2+6*x+1,x^3+3*x^2-3*x-8,4*x^3+12*x^2-12*x-28,1,-5*x^3-13*x^2+19*x+24,3*x^3+9*x^2-11*x-19,x^2+x-6,x^2-3,x,3*x^3+7*x^2-12*x-15,-x^3-2*x^2+4*x,x^3+2*x^2-5*x-2,2*x,-x^3-4*x^2+4*x+8,-3*x^3-7*x^2+12*x+11,-3*x^3-8*x^2+11*x+16,-x^3-x^2+6*x-2,-2*x^3-4*x^2+10*x+6,-4*x^3-10*x^2+18*x+18,x,x^2-x-6,-2*x^2-3*x+7,6*x^3+13*x^2-22*x-24]];
E[202,2] = [x^3+3*x^2-1, [1,-1,x,1,x^2+x-3,-x,-3*x^2-8*x,-1,x^2-3,-x^2-x+3,x^2+3*x-3,x,3*x^2+10*x,3*x^2+8*x,-2*x^2-3*x+1,1,-2*x^2-5*x-2,-x^2+3,-2,x^2+x-3,x^2-3,-x^2-3*x+3,2*x^2+6*x-4,-x,-2*x^2-5*x+3,-3*x^2-10*x,-3*x^2-6*x+1,-3*x^2-8*x,-4*x^2-6*x+6,2*x^2+3*x-1,4*x^2+8*x,-1,-3*x+1,2*x^2+5*x+2,7*x^2+21*x-2,x^2-3,4*x^2+7*x-4,2,x^2+3,-x^2-x+3,-4*x^2-10*x+4,-x^2+3,-2,x^2+3*x-3,-2*x+7,-2*x^2-6*x+4,-6*x^2-18*x-2,x,x^2+9*x+14,2*x^2+5*x-3,x^2-2*x-2]];
E[202,3] = [x, [1,-1,0,1,2,0,1,-1,-3,-2,4,0,0,-1,0,1,5,3,1,2,0,-4,6,0,-1,0,0,1,-5,0,0,-1,0,-5,2,-3,-8,-1,0,-2,-4,0,-5,4,-6,-6,6,0,-6,1,0]];

E[203,1] = [x, [1,-2,-1,2,-4,2,1,0,-2,8,2,-2,4,-2,4,-4,-2,4,5,-8,-1,-4,9,0,11,-8,5,2,-1,-8,-8,8,-2,4,-4,-4,8,-10,-4,0]];
E[203,2] = [x, [1,1,2,-1,2,2,1,-3,1,2,-4,-2,-2,1,4,-1,4,1,2,-2,2,-4,0,-6,-1,-2,-4,-1,-1,4,-2,5,-8,4,2,-1,2,2,-4,-6]];
E[203,3] = [x^5-2*x^4-8*x^3+14*x^2+9*x-6, [2,2*x,-x^4+x^3+7*x^2-7*x-4,2*x^2-4,x^4-x^3-7*x^2+5*x+6,-x^4-x^3+7*x^2+5*x-6,2,2*x^3-8*x,x^4+x^3-9*x^2-5*x+14,x^4+x^3-9*x^2-3*x+6,-x^4-x^3+5*x^2+7*x+6,-x^4-3*x^3+5*x^2+17*x+2,x^4+x^3-7*x^2-9*x+10,2*x,-x^4+x^3+9*x^2-7*x-18,2*x^4-12*x^2+8,-2*x^3+10*x,3*x^4-x^3-19*x^2+5*x+6,2*x^2-14,x^4+x^3-3*x^2-13*x-6,-x^4+x^3+7*x^2-7*x-4,-3*x^4-3*x^3+21*x^2+15*x-6,-2*x^3-2*x^2+14*x+6,-3*x^4-x^3+17*x^2+x+6,x^4-3*x^3-7*x^2+15*x+8,3*x^4+x^3-23*x^2+x+6,-x^4+3*x^3+7*x^2-21*x-4,2*x^2-4,-2,-x^4+x^3+7*x^2-9*x-6,-3*x^4+3*x^3+23*x^2-21*x-14,4*x^4-28*x^2+6*x+12,-x^4+5*x^3+11*x^2-29*x-18,-2*x^4+10*x^2,x^4-x^3-7*x^2+5*x+6,3*x^4+3*x^3-19*x^2-11*x-10,-2*x^3+18*x+4,2*x^3-14*x,-3*x^4+5*x^3+19*x^2-35*x-2,x^4+3*x^3-9*x^2-9*x-6]];
E[203,4] = [x^3+x^2-3*x-1, [1,x,-x^2-x+1,x^2-2,x^2-4,-2*x-1,-1,-x^2-x+1,x^2+2*x-1,-x^2-x+1,x^2-x-1,x-2,-5,-x,2*x^2+3*x-4,-2*x^2-2*x+3,-3*x^2-2*x+7,x^2+2*x+1,x^2+4*x-3,-2*x^2-2*x+7,x^2+x-1,-2*x^2+2*x+1,4*x+2,x^2+2*x+2,-4*x^2-2*x+10,-5*x,2*x^2-x-6,-x^2+2,-1,x^2+2*x+2,2*x^2+x-6,2*x^2-x-4,-x^2+2*x,x^2-2*x-3,-x^2+4,-x^2+3,x^2-2*x-7,3*x^2+1,5*x^2+5*x-5,2*x^2+3*x-4]];
E[203,5] = [x^2-2*x-1, [1,2,x,2,-2*x+2,2*x,-1,0,2*x-2,-4*x+4,-2*x,2*x,2*x+2,-2,-2*x-2,-4,-2*x+2,4*x-4,3*x-2,-4*x+4,-x,-4*x,2*x-3,0,3,4*x+4,-x+2,-2,1,-4*x-4,2,-8,-4*x-2,-4*x+4,2*x-2,4*x-4,6*x-6,6*x-4,6*x+2,0]];
E[203,6] = [x, [1,-1,-1,-1,1,1,1,3,-2,-1,-5,1,-5,-1,-1,-1,-4,2,-4,-1,-1,5,6,-3,-4,5,5,-1,1,1,7,-5,5,4,1,2,-10,4,5,3]];
E[203,7] = [x^2+x-4, [1,-1,x,-1,x+2,-x,-1,3,-x+1,-x-2,x,-x,-x+2,1,x+4,-1,-2*x+2,x-1,4,-x-2,-x,-x,2*x,3*x,3*x+3,x-2,-x-4,1,1,-x-4,-3*x-4,-5,-x+4,2*x-2,-x-2,x-1,6,-4,3*x-4,3*x+6]];

E[204,1] = [x, [1,0,1,0,1,0,0,0,1,0,5,0,-5,0,1,0,1,0,1,0,0,0,-3,0,-4,0,1,0,2,0,2,0,5,0,0,0,-8,0,-5,0,-5,0,-9,0,1,0,6,0,-7,0,1,0,-6,0,5,0,1,0,6,0,-4,0,0,0,-5,0,12,0,-3,0,-12,0]];
E[204,2] = [x, [1,0,-1,0,-1,0,4,0,1,0,3,0,3,0,1,0,-1,0,1,0,-4,0,3,0,-4,0,-1,0,-10,0,6,0,-3,0,-4,0,-4,0,-3,0,5,0,-1,0,-1,0,-2,0,9,0,1,0,-14,0,-3,0,-1,0,-6,0,8,0,4,0,-3,0,-12,0,-3,0,12,0]];

E[205,1] = [x, [1,1,2,-1,1,2,2,-3,1,1,0,-2,-4,2,2,-1,4,1,0,-1,4,0,-8,-6,1,-4,-4,-2,2,2,0,5,0,4,2,-1,-6,0,-8,-3,-1,4]];
E[205,2] = [x^2+x-1, [1,x,-1,-x-1,-1,-x,-3*x,-2*x-1,-2,-x,2*x-3,x+1,3*x,3*x-3,1,3*x,2*x+1,-2*x,-3*x-4,x+1,3*x,-5*x+2,-3,2*x+1,1,-3*x+3,5,3,-x-2,x,5*x-1,x+5,-2*x+3,-x+2,3*x,2*x+2,-x,-x-3,-3*x,2*x+1,-1,-3*x+3]];
E[205,3] = [x^3-2*x^2-4*x+7, [1,x,-x^2+x+4,x^2-2,-1,-x^2+7,x^2-7,2*x^2-7,-3*x^2+x+13,-x,-x^2-x+6,x-1,-x^2+3,2*x^2-3*x-7,x^2-x-4,2*x^2+x-10,3*x^2-x-10,-5*x^2+x+21,x^2+1,-x^2+2,5*x^2-4*x-21,-3*x^2+2*x+7,x^2-3*x,3*x^2-x-14,1,-2*x^2-x+7,-5*x^2+x+26,-x^2+x,x^2+2*x-5,x^2-7,-2*x^2-x+9,x^2-2*x,-3*x^2+3*x+10,5*x^2+2*x-21,-x^2+7,-3*x^2-x+9,-x^2+2*x-3,2*x^2+5*x-7,-x^2+5,-2*x^2+7,1,6*x^2-x-35]];
E[205,4] = [x^3-4*x-1, [1,x,x^2-x-2,x^2-2,1,-x^2+2*x+1,-x^2+3,1,x^2-3*x-1,x,-x^2+x+4,-x+3,-x^2+2*x+3,-x-1,x^2-x-2,-2*x^2+x+4,-x^2-x+2,-3*x^2+3*x+1,-x^2+1,x^2-2,x^2-5,x^2-1,x^2-x+4,x^2-x-2,1,2*x^2-x-1,x^2-5*x+4,x^2-x-6,x^2-7,-x^2+2*x+1,2*x^2+3*x-9,x^2-4*x-4,x^2+x-6,-x^2-2*x-1,-x^2+3,x^2-5*x-1,x^2+1,-3*x-1,-x^2+4*x-3,1,-1,-x+1]];
E[205,5] = [x^2+x-3, [1,x,-3,-x+1,1,-3*x,-x-2,-3,6,x,-3,3*x-3,-3*x-2,-x-3,-3,-x-2,2*x-1,6*x,3*x,-x+1,3*x+6,-3*x,2*x+3,9,1,x-9,-9,1,x-2,-3*x,-3*x-3,-x+3,9,-3*x+6,-x-2,-6*x+6,3*x,-3*x+9,9*x+6,-3,1,3*x+9]];
E[205,6] = [x, [1,-1,2,-1,-1,-2,2,3,1,1,6,-2,2,-2,-2,-1,2,-1,-6,1,4,-6,-4,6,1,-2,-4,-2,10,2,0,-5,12,-2,-2,-1,-6,6,4,-3,1,-4]];
E[205,7] = [x, [1,-1,0,-1,1,0,-4,3,-3,-1,0,0,-2,4,0,-1,-6,3,0,-1,0,0,-8,0,1,2,0,4,6,0,0,-5,0,6,-4,3,6,0,0,3,1,0]];

E[206,1] = [x^4-2*x^3-5*x^2+12*x-5, [1,1,x,1,-x^3+5*x-2,x,2*x^3-x^2-12*x+9,1,x^2-3,-x^3+5*x-2,-2*x^3+2*x^2+10*x-10,x,2*x^3-10*x+4,2*x^3-x^2-12*x+9,-2*x^3+10*x-5,1,2*x^3-3*x^2-12*x+12,x^2-3,-2*x^2-2*x+8,-x^3+5*x-2,3*x^3-2*x^2-15*x+10,-2*x^3+2*x^2+10*x-10,-4*x^3+3*x^2+24*x-20,x,x^2+2*x-6,2*x^3-10*x+4,x^3-6*x,2*x^3-x^2-12*x+9,-4*x^3+2*x^2+22*x-16,-2*x^3+10*x-5,-4*x^3+2*x^2+22*x-14,1,-2*x^3+14*x-10,2*x^3-3*x^2-12*x+12,3*x^3-2*x^2-18*x+12,x^2-3,2*x^3+2*x^2-11*x,-2*x^2-2*x+8,4*x^3-20*x+10,-x^3+5*x-2,2*x^3+x^2-8*x-5,3*x^3-2*x^2-15*x+10,5*x^3-4*x^2-27*x+26,-2*x^3+2*x^2+10*x-10,-x^3+4*x-4,-4*x^3+3*x^2+24*x-20,2*x^3-2*x^2-8*x+10,x,-6*x^3+3*x^2+32*x-21,x^2+2*x-6,x^3-2*x^2-12*x+10,2*x^3-10*x+4]];
E[206,2] = [x, [1,-1,2,1,4,-2,0,-1,1,-4,-6,2,-2,0,8,1,2,-1,-4,4,0,6,0,-2,11,2,-4,0,-6,-8,8,-1,-12,-2,0,1,8,4,-4,-4,2,0,2,-6,4,0,-8,2,-7,-11,4,-2]];
E[206,3] = [x^2+3*x-1, [1,-1,x,1,x-1,-x,x+4,-1,-3*x-2,-x+1,0,x,2*x+6,-x-4,-4*x+1,1,-x+1,3*x+2,2,x-1,x+1,0,3*x+3,-x,-5*x-3,-2*x-6,4*x-3,x+4,6,4*x-1,-4,-1,0,x-1,-3,-3*x-2,-3*x-4,-2,2,-x+1,-x+4,-x-1,-3*x-7,0,10*x-1,-3*x-3,-2*x-10,x,5*x+10,5*x+3,4*x-1,2*x+6]];
E[206,4] = [x^2-x-7, [1,-1,x,1,-x+1,-x,x-2,-1,x+4,x-1,4,x,-2*x+2,-x+2,-7,1,-x-1,-x-4,6,-x+1,-x+7,-4,-x-3,-x,-x+3,2*x-2,2*x+7,x-2,-6,7,8,-1,4*x,x+1,2*x-9,x+4,x-4,-6,-14,x-1,-x-6,x-7,-x-1,4,-4*x-3,x+3,2*x-2,x,-3*x+4,x-3,-2*x-7,-2*x+2]];

E[207,1] = [x, [1,-1,0,-1,0,0,-2,3,0,0,-4,0,-6,2,0,-1,-4,0,2,0,0,4,1,0,-5,6,0,2,-2,0,4,-5,0,4,0,0,2,-2,0,0,-2,0,10,4,0,-1,0,0]];
E[207,2] = [x^2-5, [1,x,0,3,-x+1,0,x+1,x,0,x-5,-4,0,-2*x,x+5,0,-1,-x+5,0,x+5,-3*x+3,0,-4*x,-1,0,-2*x+1,-10,0,3*x+3,-2*x,0,-2*x-2,-3*x,0,5*x-5,-4,0,2*x,5*x+5,0,x-5,4*x+2,0,-3*x+1,-12,0,-x,4,0]];
E[207,3] = [x^2-x-1, [1,x,0,x-1,2*x,0,-2*x+2,-2*x+1,0,2*x+2,-2*x+4,0,3,-2,0,-3*x,-2*x-2,0,-2,2,0,2*x-2,-1,0,4*x-1,3*x,0,2*x-4,3,0,-6*x+3,x-5,0,-4*x-2,-4,0,2*x,-2*x,0,-2*x-4,-4*x+1,0,0,4*x-6,0,-x,-2*x+1,0]];
E[207,4] = [x^2+2*x-1, [1,x,0,-2*x-1,-x-3,0,x-1,x-2,0,-x-1,-2*x-2,0,0,-3*x+1,0,3,x-5,0,3*x+1,3*x+5,0,2*x-2,-1,0,4*x+5,0,0,5*x-1,6*x+6,0,-6*x-6,x+4,0,-7*x+1,2,0,2*x,-5*x+3,0,x+5,-4*x-8,0,-3*x-9,-2*x+6,0,-x,4*x+10,0]];
E[207,5] = [x^2-2*x-1, [1,x,0,2*x-1,-x+3,0,-x-1,x+2,0,x-1,-2*x+2,0,0,-3*x-1,0,3,x+5,0,-3*x+1,3*x-5,0,-2*x-2,1,0,-4*x+5,0,0,-5*x-1,6*x-6,0,6*x-6,x-4,0,7*x+1,-2,0,-2*x,-5*x-3,0,-x+5,-4*x+8,0,3*x-9,-2*x-6,0,x,4*x-10,0]];

E[208,1] = [x, [1,0,3,0,-1,0,-1,0,6,0,2,0,-1,0,-3,0,-3,0,-6,0,-3,0,4,0,-4,0,9,0,2,0,-4,0,6,0,1,0,3,0,-3,0,0,0,5,0,-6,0,-13,0,-6,0,-9,0,12,0,-2,0]];
E[208,2] = [x^2+x-4, [1,0,x,0,x+2,0,-x,0,-x+1,0,-2*x,0,1,0,x+4,0,-3*x-2,0,2*x,0,x-4,0,8,0,3*x+3,0,-x-4,0,-2,0,-4,0,2*x-8,0,-x-4,0,-3*x+2,0,x,0,2*x+2,0,-x-8,0,-2,0,3*x+8,0,-x-3,0,x-12,0,-2*x-2,0,-2*x-8,0]];
E[208,3] = [x, [1,0,0,0,2,0,2,0,-3,0,2,0,-1,0,0,0,6,0,6,0,0,0,-8,0,-1,0,0,0,2,0,-10,0,0,0,4,0,-6,0,0,0,-6,0,-4,0,-6,0,2,0,-3,0,0,0,6,0,4,0]];
E[208,4] = [x, [1,0,-1,0,-3,0,1,0,-2,0,-6,0,1,0,3,0,-3,0,-2,0,-1,0,0,0,4,0,5,0,6,0,4,0,6,0,-3,0,-7,0,-1,0,0,0,1,0,6,0,-3,0,-6,0,3,0,0,0,18,0]];
E[208,5] = [x, [1,0,-1,0,-1,0,-5,0,-2,0,2,0,-1,0,1,0,-3,0,2,0,5,0,-4,0,-4,0,5,0,-6,0,4,0,-2,0,5,0,11,0,1,0,8,0,1,0,2,0,-9,0,18,0,3,0,-12,0,-2,0]];

E[209,1] = [x^2-2, [1,x,-x-1,0,-1,-x-2,-x-2,-2*x,2*x,-x,-1,0,3*x-2,-2*x-2,x+1,-4,x+2,4,-1,0,3*x+4,-x,-3,2*x+4,-4,-2*x+6,x-1,0,-3*x-2,x+2,-x-5,0,x+1,2*x+2,x+2,0,5*x+3,-x,-x-4,2*x]];
E[209,2] = [x^5-2*x^4-6*x^3+10*x^2+5*x-4, [2,2*x,x^4-2*x^3-5*x^2+8*x+2,2*x^2-4,-x^3+7*x-2,x^3-2*x^2-3*x+4,-x^3+3*x+4,2*x^3-8*x,x^3-2*x^2-7*x+8,-x^4+7*x^2-2*x,2,-x^4+2*x^3+7*x^2-12*x-4,-x^4+7*x^2-4,-x^4+3*x^2+4*x,-x^4+4*x^3+x^2-16*x+10,2*x^4-12*x^2+8,2*x^4-2*x^3-10*x^2+6*x,x^4-2*x^3-7*x^2+8*x,-2,-2*x^4+3*x^3+8*x^2-9*x,2*x^4-4*x^3-10*x^2+14*x+8,2*x,-2*x^4+2*x^3+16*x^2-10*x-18,-x^3+2*x^2+7*x-12,-2*x^4+3*x^3+12*x^2-17*x-4,-2*x^4+x^3+10*x^2+x-4,-2*x^3+2*x^2+12*x-10,-2*x^4-x^3+14*x^2-x-12,3*x^4-2*x^3-17*x^2+4*x+12,2*x^4-5*x^3-6*x^2+15*x-4,-x^4+4*x^3+5*x^2-20*x+2,4*x^4-4*x^3-20*x^2+14*x+8,x^4-2*x^3-5*x^2+8*x+2,2*x^4+2*x^3-14*x^2-10*x+8,-2*x^2+8*x,-3*x^3+2*x^2+9*x-12,2*x^4-16*x^2+18,-2*x,2*x^2-4*x-4,x^4-4*x^3-3*x^2+14*x-8]];
E[209,3] = [x^7+x^6-14*x^5-10*x^4+59*x^3+27*x^2-66*x-30, [4,4*x,-2*x^4+14*x^2-4*x-8,4*x^2-8,2*x^5-18*x^3+28*x+12,-2*x^5+14*x^3-4*x^2-8*x,-x^6+12*x^4-37*x^2+26,4*x^3-16*x,x^6-12*x^4+4*x^3+41*x^2-20*x-26,2*x^6-18*x^4+28*x^2+12*x,-4,-2*x^6+18*x^4-4*x^3-36*x^2+8*x+16,-x^6-2*x^5+10*x^4+18*x^3-27*x^2-36*x+14,x^6-2*x^5-10*x^4+22*x^3+27*x^2-40*x-30,x^6+2*x^5-10*x^4-18*x^3+23*x^2+28*x+6,4*x^4-24*x^2+16,4*x^4-4*x^3-36*x^2+28*x+48,-x^6+2*x^5+14*x^4-18*x^3-47*x^2+40*x+30,4,-2*x^6+6*x^5+20*x^4-54*x^3-42*x^2+76*x+36,-x^6-2*x^5+8*x^4+14*x^3-9*x^2-20*x-22,-4*x,2*x^6-20*x^4+42*x^2+8*x,2*x^6-6*x^5-24*x^4+54*x^3+70*x^2-100*x-60,-x^6+8*x^4-4*x^3-5*x^2+12*x-14,-x^6-4*x^5+8*x^4+32*x^3-9*x^2-52*x-30,x^6-2*x^5-12*x^4+22*x^3+33*x^2-60*x-14,-x^6+4*x^5+8*x^4-32*x^3+7*x^2+36*x-22,-2*x^4+18*x^2-4*x-36,x^6+4*x^5-8*x^4-36*x^3+x^2+72*x+30,x^6+2*x^5-10*x^4-18*x^3+23*x^2+36*x+14,4*x^5-32*x^3+48*x,2*x^4-14*x^2+4*x+8,4*x^5-4*x^4-36*x^3+28*x^2+48*x,-x^6+2*x^5+12*x^4-18*x^3-33*x^2+20*x+18,x^6-4*x^4+4*x^3-15*x^2+4*x+22,-4*x^5-4*x^4+40*x^3+32*x^2-84*x-52,4*x,x^6-2*x^5-12*x^4+26*x^3+49*x^2-68*x-58,4*x^6-8*x^5-38*x^4+76*x^3+74*x^2-120*x-60]];
E[209,4] = [x, [1,0,1,-2,-3,0,-4,0,-2,0,1,-2,2,0,-3,4,0,0,1,6,-4,0,3,0,4,0,-5,8,-6,0,-7,0,1,0,12,4,-7,0,2,0]];

E[210,1] = [x, [1,-1,1,1,1,-1,1,-1,1,-1,0,1,2,-1,1,1,-6,-1,8,1,1,0,0,-1,1,-2,1,1,6,-1,-4,-1,0,6,1,1,-10,-8,2,-1,-6,-1,-4,0,1,0,0,1,1,-1,-6,2,-6,-1,0,-1,8,-6,-12,1,-10,4,1,1,2,0,-4,-6,0,-1,12,-1,-10,10,1,8,0,-2,8,1,1,6,12,1,-6,4,6,0,-6,-1,2,0,-4,0,8,-1]];
E[210,2] = [x, [1,-1,-1,1,-1,1,-1,-1,1,1,-4,-1,-2,1,1,1,-6,-1,0,-1,1,4,-8,1,1,2,-1,-1,10,-1,-8,-1,4,6,1,1,2,0,2,1,-2,-1,8,-4,-1,8,4,-1,1,-1,6,-2,10,1,4,1,0,-10,4,1,-6,8,-1,1,2,-4,0,-6,8,-1,-12,-1,-6,-2,-1,0,4,-2,-8,-1,1,2,-4,1,6,-8,-10,4,14,1,2,-8,8,-4,0,1]];
E[210,3] = [x, [1,1,-1,1,1,-1,1,1,1,1,4,-1,-2,1,-1,1,2,1,-4,1,-1,4,-8,-1,1,-2,-1,1,6,-1,-8,1,-4,2,1,1,-2,-4,2,1,2,-1,-12,4,1,-8,-8,-1,1,1,-2,-2,6,-1,4,1,4,6,4,-1,-2,-8,1,1,-2,-4,12,2,8,1,8,1,-14,-2,-1,-4,4,2,0,1,1,2,12,-1,2,-12,-6,4,2,1,-2,-8,8,-8,-4,-1]];
E[210,4] = [x, [1,1,1,1,-1,1,1,1,1,-1,0,1,2,1,-1,1,-6,1,-4,-1,1,0,0,1,1,2,1,1,-6,-1,-4,1,0,-6,-1,1,2,-4,2,-1,6,1,8,0,-1,0,-12,1,1,1,-6,2,6,1,0,1,-4,-6,-12,-1,2,-4,1,1,-2,0,8,-6,0,-1,0,1,14,2,1,-4,0,2,-16,-1,1,6,12,1,6,8,-6,0,6,-1,2,0,-4,-12,4,1]];
E[210,5] = [x, [1,1,1,1,1,1,-1,1,1,1,-4,1,-2,-1,1,1,2,1,4,1,-1,-4,-8,1,1,-2,1,-1,-2,1,0,1,-4,2,-1,1,6,4,-2,1,-6,-1,-4,-4,1,-8,0,1,1,1,2,-2,-10,1,-4,-1,4,-2,12,1,14,0,-1,1,-2,-4,-12,2,-8,-1,-8,1,10,6,1,4,4,-2,16,1,1,-6,-12,-1,2,-4,-2,-4,10,1,2,-8,0,0,4,1]];

E[211,1] = [x^2-x-1, [1,x,x+1,x-1,-2*x+2,2*x+1,-x+1,-2*x+1,3*x-1,-2,-3,x,-2*x+5,-1,-2*x,-3*x,-x+6,2*x+3,-3*x-1,2*x-4,-x,-3*x,2*x+3,-3*x-1,-4*x+3,3*x-2,2*x-1,x-2,2*x-1,-2*x-2,5*x-8,x-5,-3*x-3,5*x-1,-2*x+4]];
E[211,2] = [x^3-4*x+1, [1,x,-x-1,x^2-2,-x^2-x+1,-x^2-x,x-1,-1,x^2+2*x-2,-x^2-3*x+1,-3,-x^2-2*x+3,2*x^2-5,x^2-x,2*x^2+4*x-2,-2*x^2-x+4,-x^2-3,2*x^2+2*x-1,x^2-2,-x^2-x-1,-x^2+1,-3*x,-x^2+x+8,x+1,3*x^2+5*x-6,3*x-2,-3*x^2-x+6,-x^2+2*x+1,-x^2+x-4,4*x^2+6*x-2,-3*x^2+9,-x^2-4*x+4,3*x+3,-7*x+1,-2*x]];
E[211,3] = [x^3+2*x^2-x-1, [1,x,-x^2-x+1,x^2-2,x^2+x-4,x^2-1,-x^2-4*x,-2*x^2-3*x+1,-x-2,-x^2-3*x+1,3*x^2+7*x-2,2*x-1,2*x^2+3*x-3,-2*x^2-x-1,3*x^2+4*x-4,-x^2-x+2,x^2+3*x+2,-x^2-2*x,-2*x^2-x+1,-3*x^2-2*x+7,-2*x^2+3,x^2+x+3,-x-7,-x+2,-6*x^2-7*x+11,-x^2-x+2,4*x^2+5*x-4,5*x^2+5*x-2,-7*x^2-12*x+4,-2*x^2-x+3,-x^2-5*x-3,5*x^2+7*x-3,3*x^2+2*x-6,x^2+3*x+1,5*x^2+12*x-3]];
E[211,4] = [x^9+x^8-14*x^7-11*x^6+66*x^5+36*x^4-123*x^3-38*x^2+72*x+8, [116,116*x,18*x^8+30*x^7-232*x^6-314*x^5+940*x^4+888*x^3-1274*x^2-644*x+248,116*x^2-232,7*x^8+31*x^7-58*x^6-309*x^5+82*x^4+732*x^3+91*x^2-186*x+32,12*x^8+20*x^7-116*x^6-248*x^5+240*x^4+940*x^3+40*x^2-1048*x-144,-26*x^8-82*x^7+232*x^6+866*x^5-404*x^4-2520*x^3-222*x^2+2000*x+312,116*x^3-464*x,-28*x^8-8*x^7+348*x^6+76*x^5-1256*x^4-260*x^3+1144*x^2+280*x+452,24*x^8+40*x^7-232*x^6-380*x^5+480*x^4+952*x^3+80*x^2-472*x-56,12*x^8-38*x^7-174*x^6+448*x^5+762*x^4-1496*x^3-1120*x^2+1330*x+668,-28*x^8-8*x^7+348*x^6+76*x^5-1372*x^4-260*x^3+1956*x^2+280*x-592,3*x^8+5*x^7-33*x^5-172*x^4+32*x^3+271*x^2+28*x+196,-56*x^8-132*x^7+580*x^6+1312*x^5-1584*x^4-3420*x^3+1012*x^2+2184*x+208,22*x^8+114*x^7-232*x^6-1286*x^5+672*x^4+4140*x^3-410*x^2-3816*x-264,116*x^4-696*x^2+464,-20*x^8-72*x^7+232*x^6+800*x^5-864*x^4-2456*x^3+1364*x^2+1824*x-688,20*x^8-44*x^7-232*x^6+592*x^5+748*x^4-2300*x^3-784*x^2+2468*x+224,33*x^8+55*x^7-348*x^6-595*x^5+892*x^4+1860*x^3-151*x^2-1664*x-396,2*x^8+42*x^7-486*x^5-76*x^4+1568*x^3+258*x^2-1412*x-256,-12*x^8-20*x^7+116*x^6+132*x^5-240*x^4+104*x^3-40*x^2-1040*x+144,-50*x^8-6*x^7+580*x^6-30*x^5-1928*x^4+356*x^3+1786*x^2-196*x-96,28*x^8+8*x^7-348*x^6-76*x^5+1256*x^4+260*x^3-1144*x^2-512*x-336,-4*x^8-84*x^7+972*x^5+268*x^4-3368*x^3-864*x^2+3520*x+512,26*x^8+140*x^7-174*x^6-1446*x^5-118*x^4+3796*x^3+1382*x^2-1942*x-776,2*x^8+42*x^7-370*x^5-76*x^4+640*x^3+142*x^2-20*x-24,-4*x^8+32*x^7-420*x^5+384*x^4+1620*x^3-1212*x^2-1816*x+48,-24*x^8-40*x^7+232*x^6+380*x^5-596*x^4-836*x^3+500*x^2+240*x-176,-16*x^8+12*x^7+232*x^6-172*x^5-1132*x^4+680*x^3+1996*x^2-768*x-272,92*x^8+76*x^7-1044*x^6-780*x^5+3348*x^4+2296*x^3-2980*x^2-1848*x-176,34*x^8+18*x^7-348*x^6-26*x^5+912*x^4-720*x^3-602*x^2+1400*x+288,116*x^5-928*x^3+1392*x,74*x^8+46*x^7-928*x^6-466*x^5+3568*x^4+1524*x^3-4606*x^2-1784*x+1200,-52*x^8-48*x^7+580*x^6+456*x^5-1736*x^4-1096*x^3+1064*x^2+752*x+160,-98*x^8-202*x^7+1044*x^6+2122*x^5-3004*x^4-6072*x^3+1974*x^2+4344*x+480]];

E[212,1] = [x, [1,0,-1,0,-2,0,-2,0,-2,0,2,0,-7,0,2,0,-3,0,5,0,2,0,-3,0,-1,0,5,0,9,0,-8,0,-2,0,4,0,-3,0,7,0,2,0,4,0,4,0,10,0,-3,0,3,0,1,0]];
E[212,2] = [x, [1,0,2,0,2,0,0,0,1,0,-4,0,-2,0,4,0,2,0,2,0,0,0,-2,0,-1,0,-4,0,2,0,2,0,-8,0,0,0,10,0,-4,0,2,0,-4,0,2,0,-12,0,-7,0,4,0,-1,0]];
E[212,3] = [x^3+3*x^2-3*x-7, [1,0,x,0,-x^2-2*x+3,0,x^2+2*x-1,0,x^2-3,0,-x^2+7,0,5,0,x^2-7,0,-2*x-1,0,x^2-x-7,0,-x^2+2*x+7,0,-x^2-3*x+1,0,-2*x^2-2*x+11,0,-3*x^2-3*x+7,0,x^2+2*x-6,0,x^2+4*x-3,0,3*x^2+4*x-7,0,-2*x-10,0,x^2-8,0,5*x,0,2*x^2+2*x-10,0,-x^2-4*x+1,0,2*x-2,0,2*x^2+4*x,0,2*x^2+6*x+1,0,-2*x^2-x,0,-1,0]];

E[213,1] = [x, [1,1,1,-1,2,1,2,-3,1,2,0,-1,-2,2,2,-1,0,1,0,-2,2,0,0,-3,-1,-2,1,-2,-2,2,-10,5,0,0,4,-1,-6,0,-2,-6,0,2,-4,0,2,0,12,-1]];
E[213,2] = [x^2+x-1, [1,x,-1,-x-1,-x,-x,-3,-2*x-1,1,x-1,-2*x-3,x+1,3*x-1,-3*x,x,3*x,2*x+1,x,-2*x-5,1,3,-x-2,5*x+1,2*x+1,-x-4,-4*x+3,-1,3*x+3,3*x+3,-x+1,-2,x+5,2*x+3,-x+2,3*x,-x-1,-9*x-3,-3*x-2,-3*x+1,-x+2,x+8,3*x,9*x+3,3*x+5,-x,-4*x+5,-7*x-6,-3*x]];
E[213,3] = [x^2-x-3, [1,x,1,x+1,-x,x,-1,3,1,-x-3,3,x+1,-x-1,-x,-x,x-2,3,x,-2*x-1,-2*x-3,-1,3*x,-3*x+3,3,x-2,-2*x-3,1,-x-1,x+3,-x-3,2,-x-3,3,3*x,x,x+1,x-1,-3*x-6,-x-1,-3*x,3*x,-x,3*x+5,3*x+3,-x,-9,3*x-6,x-2]];
E[213,4] = [x^2+3*x+1, [1,x,1,-3*x-3,-x-4,x,2*x+1,4*x+3,1,-x+1,-2*x-7,-3*x-3,-3*x-5,-5*x-2,-x-4,-3*x+2,2*x+1,x,2*x-1,6*x+9,2*x+1,-x+2,3*x+3,4*x+3,5*x+10,4*x+3,1,9*x+3,-7*x-9,-x+1,4*x+10,3*x-3,-2*x-7,-5*x-2,-3*x-2,-3*x-3,5*x+7,-7*x-2,-3*x-5,-7*x-8,-x-10,-5*x-2,3*x-3,9*x+15,-x-4,-6*x-3,3*x+12,-3*x+2]];
E[213,5] = [x^4-3*x^3-2*x^2+7*x+1, [1,x,-1,x^2-2,-x^2+2*x+1,-x,-x^2+x+4,x^3-4*x,1,-x^3+2*x^2+x,-x^3+x^2+3*x+1,-x^2+2,-x^3+2*x^2+x,-x^3+x^2+4*x,x^2-2*x-1,3*x^3-4*x^2-7*x+3,2*x^3-5*x^2-5*x+6,x,3*x^3-5*x^2-9*x+7,-x^3+x^2+3*x-1,x^2-x-4,-2*x^3+x^2+8*x+1,-x^3+4*x^2+x-8,-x^3+4*x,-x^3+4*x^2-3*x-5,-x^3-x^2+7*x+1,-1,-2*x^3+4*x^2+5*x-7,-x^3+4*x^2-3*x-6,x^3-2*x^2-x,-x^3-2*x^2+8*x+7,3*x^3-x^2-10*x-3,x^3-x^2-3*x-1,x^3-x^2-8*x-2,-x^2+2*x+3,x^2-2,-x^3+2*x^2+3*x+2,4*x^3-3*x^2-14*x-3,x^3-2*x^2-x,-3*x^2+4*x+1,-x^3+3*x^2+2*x-10,x^3-x^2-4*x,x^3-5*x+4,-3*x^3+2*x^2+9*x,-x^2+2*x+1,x^3-x^2-x+1,-2*x^3+7*x^2-9,-3*x^3+4*x^2+7*x-3]];

E[214,1] = [x, [1,-1,1,1,-4,-1,-2,-1,-2,4,-3,1,-1,2,-4,1,6,2,1,-4,-2,3,-7,-1,11,1,-5,-2,-6,4,4,-1,-3,-6,8,-2,-9,-1,-1,4,-5,2,12,-3,8,7,8,1,-3,-11,6,-1,7,5]];
E[214,2] = [x, [1,-1,-2,1,-1,2,4,-1,1,1,-6,-2,-4,-4,2,1,-6,-1,-2,-1,-8,6,5,2,-4,4,4,4,0,-2,-2,-1,12,6,-4,1,0,2,8,1,-11,8,-9,-6,-1,-5,11,-2,9,4,12,-4,10,-4]];
E[214,3] = [x^2+2*x-2, [1,-1,x,1,x+3,-x,x,-1,-2*x-1,-x-3,-x,x,-x,-x,x+2,1,-x+4,2*x+1,2,x+3,-2*x+2,x,-x-1,-x,4*x+6,x,-4,x,-x+4,-x-2,-4*x-6,-1,2*x-2,x-4,x+2,-2*x-1,-4,-2,2*x-2,-x-3,4*x+7,2*x-2,-9,-x,-3*x-7,x+1,x+1,x,-2*x-5,-4*x-6,6*x-2,-x,-2*x+2,4]];
E[214,4] = [x, [1,1,1,1,0,1,2,1,-2,0,-3,1,-1,2,0,1,6,-2,-7,0,2,-3,9,1,-5,-1,-5,2,-6,0,-4,1,-3,6,0,-2,-1,-7,-1,0,3,2,8,-3,0,9,0,1,-3,-5,6,-1,-9,-5]];
E[214,5] = [x, [1,1,-2,1,-3,-2,-4,1,1,-3,-2,-2,4,-4,6,1,-2,1,-2,-3,8,-2,1,-2,4,4,4,-4,-4,6,-10,1,4,-2,12,1,12,-2,-8,-3,-11,8,1,-2,-3,1,-1,-2,9,4,4,4,6,4]];
E[214,6] = [x^2-2*x-2, [1,1,x,1,-x+1,x,-x,1,2*x-1,-x+1,-x+4,x,-x,-x,-x-2,1,x-4,2*x-1,2,-x+1,-2*x-2,-x+4,-x-5,x,-2,-x,4,-x,3*x,-x-2,2,1,2*x-2,x-4,x+2,2*x-1,4*x-8,2,-2*x-2,-x+1,4*x-1,-2*x-2,-7,-x+4,-x-5,-x-5,x+5,x,2*x-5,-2,-2*x+2,-x,-6*x+6,4]];

E[215,1] = [x^5-2*x^4-7*x^3+13*x^2+5*x-4, [1,x,-x^3+5*x,x^2-2,1,-x^4+5*x^2,x^4-x^3-6*x^2+6*x+2,x^3-4*x,x^4+x^3-6*x^2-6*x+5,x,x^3-6*x-1,-2*x^4+13*x^2-5*x-4,-x^4+5*x^2+x+3,x^4+x^3-7*x^2-3*x+4,-x^3+5*x,x^4-6*x^2+4,x^4-7*x^2+x+1,3*x^4+x^3-19*x^2+4,-2*x^4+14*x^2-2*x-10,x^2-2,-x^4+5*x^2-4*x+8,x^4-6*x^2-x,-x^4+5*x^2-x+3,-2*x^4-x^3+11*x^2+6*x-8,1,-2*x^4-2*x^3+14*x^2+8*x-4,-x^4-2*x^3+7*x^2+8*x-8,x^4+2*x^3-4*x^2-13*x,-2*x^4+2*x^3+14*x^2-12*x-8,-x^4+5*x^2,2*x^4+x^3-13*x^2-5*x+7,2*x^4-x^3-13*x^2+7*x+4,x^2+x-8,2*x^4-12*x^2-4*x+4,x^4-x^3-6*x^2+6*x+2,5*x^4-27*x^2+x+2,-x^4+x^3+7*x^2-5*x-4,-4*x^4+24*x^2-8,2*x^4-2*x^3-14*x^2+18*x+4,x^3-4*x,x^4-x^3-5*x^2+8*x-3,-2*x^4-2*x^3+9*x^2+13*x-4,-1,2*x^4-x^3-14*x^2+7*x+6]];
E[215,2] = [x^6-3*x^5-5*x^4+17*x^3+3*x^2-17*x-3, [1,x,x^5-2*x^4-6*x^3+9*x^2+6*x-2,x^2-2,-1,x^5-x^4-8*x^3+3*x^2+15*x+3,-2*x^5+3*x^4+13*x^3-12*x^2-16*x+2,x^3-4*x,2*x^5-3*x^4-13*x^3+10*x^2+16*x+7,-x,-3*x^5+3*x^4+23*x^3-9*x^2-38*x-9,x^4-2*x^3-6*x^2+8*x+7,-2*x+2,-3*x^5+3*x^4+22*x^3-10*x^2-32*x-6,-x^5+2*x^4+6*x^3-9*x^2-6*x+2,x^4-6*x^2+4,4*x^5-4*x^4-30*x^3+12*x^2+48*x+12,3*x^5-3*x^4-24*x^3+10*x^2+41*x+6,2*x^5-2*x^4-16*x^3+6*x^2+28*x+8,-x^2+2,-x^4+x^3+8*x^2-4*x-13,-6*x^5+8*x^4+42*x^3-29*x^2-60*x-9,-2*x^5+4*x^4+12*x^3-16*x^2-14*x,-x^5+10*x^3+2*x^2-23*x-6,1,-2*x^2+2*x,2*x^5-5*x^4-9*x^3+22*x^2-5,-2*x^5+x^4+15*x^3+x^2-25*x-13,2*x^5-2*x^4-16*x^3+8*x^2+26*x,-x^5+x^4+8*x^3-3*x^2-15*x-3,2*x^5-3*x^4-15*x^3+14*x^2+24*x-4,x^5-8*x^3+12*x,-5*x^5+6*x^4+38*x^3-23*x^2-64*x-3,8*x^5-10*x^4-56*x^3+36*x^2+80*x+12,2*x^5-3*x^4-13*x^3+12*x^2+16*x-2,2*x^5-3*x^4-15*x^3+12*x^2+25*x-5,-x^5+x^4+9*x^3-5*x^2-16*x+5,4*x^5-6*x^4-28*x^3+22*x^2+42*x+6,-2*x^4+4*x^3+12*x^2-18*x-10,-x^3+4*x,3*x^5-2*x^4-24*x^3+x^2+44*x+18,-x^5+x^4+8*x^3-4*x^2-13*x,1,-4*x^5+6*x^4+27*x^3-24*x^2-35*x]];
E[215,3] = [x^3+2*x^2-3*x-3, [1,x,x+1,x^2-2,1,x^2+x,-x^2-2*x+1,-2*x^2-x+3,x^2+2*x-2,x,-x^2+x+7,-x^2+x+1,-2*x-2,-2*x-3,x+1,x^2-3*x-2,-2*x+2,x+3,-2*x^2-4*x+6,x^2-2,-x^2-4*x-2,3*x^2+4*x-3,2*x^2+4*x-6,x^2-4*x-3,1,-2*x^2-2*x,x^2-2,x-2,2*x+2,x^2+x,x^2+1,-x^2+3*x-3,2*x^2+5*x+4,-2*x^2+2*x,-x^2-2*x+1,-x^2-x+4,x^2-x-1,-6,-2*x^2-4*x-2,-2*x^2-x+3,2*x^2+x-1,-2*x^2-5*x-3,-1,4*x-5]];
E[215,4] = [x, [1,0,0,-2,-1,0,-2,0,-3,0,-1,0,-1,0,0,4,-3,0,-2,2,0,0,-1,0,1,0,0,4,4,0,3,0,0,0,2,6,-8,0,0,0,5,0,-1,2]];

E[216,1] = [x, [1,0,0,0,-1,0,3,0,0,0,5,0,4,0,0,0,-8,0,2,0,0,0,2,0,-4,0,0,0,6,0,-7,0,0,0,-3,0,-6,0,0,0,-6,0,-2,0,0,0,6,0,2,0,0,0,5,0,-5,0,0,0,-4,0,-8,0,0,0,-4,0,-10,0,0,0,-8,0]];
E[216,2] = [x, [1,0,0,0,1,0,3,0,0,0,-5,0,4,0,0,0,8,0,2,0,0,0,-2,0,-4,0,0,0,-6,0,-7,0,0,0,3,0,-6,0,0,0,6,0,-2,0,0,0,-6,0,2,0,0,0,-5,0,-5,0,0,0,4,0,-8,0,0,0,4,0,-10,0,0,0,8,0]];
E[216,3] = [x, [1,0,0,0,4,0,-3,0,0,0,4,0,1,0,0,0,-4,0,-1,0,0,0,4,0,11,0,0,0,0,0,-4,0,0,0,-12,0,-9,0,0,0,0,0,-8,0,0,0,-12,0,2,0,0,0,-8,0,16,0,0,0,4,0,-5,0,0,0,4,0,11,0,0,0,8,0]];
E[216,4] = [x, [1,0,0,0,-4,0,-3,0,0,0,-4,0,1,0,0,0,4,0,-1,0,0,0,-4,0,11,0,0,0,0,0,-4,0,0,0,12,0,-9,0,0,0,0,0,-8,0,0,0,12,0,2,0,0,0,8,0,16,0,0,0,-4,0,-5,0,0,0,-4,0,11,0,0,0,-8,0]];

E[217,1] = [x^4-5*x^2+x+1, [1,x,-x^3+5*x,x^2-2,-x+1,x+1,1,x^3-4*x,-x^3-x^2+5*x+2,-x^2+x,-x^2-2*x+3,2*x^3+x^2-9*x,x^3-x^2-5*x+3,x,-x^3+4*x-1,-x^2-x+3,2*x^2+x-3,-x^3+3*x+1,3*x^3+x^2-13*x+1,-x^3+x^2+2*x-2,-x^3+5*x,-x^3-2*x^2+3*x,2*x^3+x^2-9*x+4,x^3+x^2-4*x-4,x^2-2*x-4,-x^3+2*x-1,-2*x^2-x+5,x^2-2,x^3+2*x^2-3*x-6,-x^2+1,-1,-3*x^3-x^2+11*x,-3*x^3-x^2+12*x-2,2*x^3+x^2-3*x,-x+1,2*x^3-8*x-3,-6*x^3-x^2+25*x-2,x^3+2*x^2-2*x-3,-2*x^3+9*x-5,x^3-x^2-3*x+1,x^3-x+2,x+1]];
E[217,2] = [x^5-3*x^4-5*x^3+16*x^2+6*x-19, [1,x,-x^3+2*x^2+3*x-4,x^2-2,x^4-2*x^3-5*x^2+6*x+6,-x^4+2*x^3+3*x^2-4*x,-1,x^3-4*x,-x^3+3*x^2+x-6,x^4-10*x^2+19,-x^4+2*x^3+4*x^2-5*x-2,-x^4+8*x^2-11,-x^4+x^3+6*x^2-2*x-8,-x,x^4-x^3-7*x^2+x+14,x^4-6*x^2+4,2*x^3-4*x^2-7*x+9,-x^4+3*x^3+x^2-6*x,2*x^4-3*x^3-11*x^2+9*x+11,x^4-x^3-6*x^2+x+7,x^3-2*x^2-3*x+4,-x^4-x^3+11*x^2+4*x-19,-x^2-x+8,-x^4-x^3+10*x^2+3*x-19,-3*x^2+2*x+12,-2*x^4+x^3+14*x^2-2*x-19,x^4-2*x^3-x^2-2,-x^2+2,-2*x^4+x^3+16*x^2-3*x-26,2*x^4-2*x^3-15*x^2+8*x+19,1,3*x^4-3*x^3-16*x^2+6*x+19,-x^4+x^3+6*x^2+x-11,2*x^4-4*x^3-7*x^2+9*x,-x^4+2*x^3+5*x^2-6*x-6,-2*x^3+4*x^2+4*x-7,-x^4+4*x^3+2*x^2-12*x-3,3*x^4-x^3-23*x^2-x+38,-x^4+2*x^3+5*x^2-4*x-6,-x^3+5*x^2+x-19,-2*x^4+x^3+16*x^2-3*x-30,x^4-2*x^3-3*x^2+4*x]];
E[217,3] = [x^3+3*x^2-3, [1,-x^2-2*x,x,x^2+3*x+1,x^2-3,x^2-3,-1,x^2-x-6,x^2-3,3*x+3,x^2+3*x-2,x+3,-3*x^2-4*x+4,x^2+2*x,-3*x^2-3*x+3,3*x+4,-x^2-2*x-1,3*x+3,x^2+2*x,-2*x^2-6*x-3,-x,2*x^2+x-6,-2*x^2-3*x-3,-4*x^2-6*x+3,3*x^2+3*x-5,x^2+x+3,-3*x^2-6*x+3,-x^2-3*x-1,-2*x^2-5*x-4,3*x^2+3*x,-1,-3*x^2-6*x+3,-2*x+3,2*x^2+5*x+3,-x^2+3,-2*x^2-6*x-3,-2*x^2-5*x+1,-x^2-3*x-3,5*x^2+4*x-9,3*x^2+6*x+6,3*x+8,-x^2+3]];
E[217,4] = [x^3+3*x^2-1, [1,-x^2-2*x,x,x^2+x-1,x^2+2*x-3,x^2-1,1,x^2+5*x,x^2-3,2*x^2+5*x-1,-3*x^2-9*x,-2*x^2-x+1,3*x^2+6*x-4,-x^2-2*x,-x^2-3*x+1,-3*x-2,-x^2-2*x-3,5*x+1,-3*x^2-6*x+2,-2*x^2-4*x+3,x,3*x+6,2*x^2+7*x-3,2*x^2+1,-5*x^2-11*x+5,x^2+5*x-3,-3*x^2-6*x+1,x^2+x-1,-3*x,-x^2-x+2,1,-3*x^2-6*x+3,-3,4*x^2+7*x+1,x^2+2*x-3,2*x^2-2*x+1,2*x^2+5*x+1,x^2-x+3,-3*x^2-4*x+3,-5*x^2-14*x+4,2*x^2+7*x-6,x^2-1]];

E[218,1] = [x^2+4*x+2, [1,-1,x,1,-x-1,-x,-x-4,-1,-4*x-5,x+1,2*x+3,x,2*x,x+4,3*x+2,1,x,4*x+5,-2*x-9,-x-1,2,-2*x-3,-5*x-11,-x,-2*x-6,-2*x,8*x+8,-x-4,3*x+9,-3*x-2,3*x+4,-1,-5*x-4,-x,x+2,-4*x-5,3*x+4,2*x+9,-8*x-4,x+1,5*x+14,-2,-3*x-8,2*x+3,-7*x-3,5*x+11,x+5,x,4*x+7,2*x+6,-4*x-2,2*x,2*x+8,-8*x-8,3*x+1]];
E[218,2] = [x^3-3*x^2-3*x+8, [1,-1,x,1,-x^2+x+3,-x,2,-1,x^2-3,x^2-x-3,x^2-x-3,x,x^2-2*x,-2,-2*x^2+8,1,0,-x^2+3,-x^2-x+7,-x^2+x+3,2*x,-x^2+x+3,-3*x+3,-x,x^2+x-4,-x^2+2*x,3*x^2-3*x-8,2,-x^2+x+3,2*x^2-8,-2*x^2+4*x+6,-1,2*x^2-8,0,-2*x^2+2*x+6,x^2-3,-3*x+2,x^2+x-7,x^2+3*x-8,x^2-x-3,-6,-2*x,-x^2+2*x+4,x^2-x-3,-3*x^2-x+7,3*x-3,x^2-4*x-3,x,-3,-x^2-x+4,0,x^2-2*x,2*x^2+x-12,-3*x^2+3*x+8,-x^2-x-1]];
E[218,3] = [x, [1,1,-2,1,-3,-2,-4,1,1,-3,3,-2,-4,-4,6,1,-6,1,5,-3,8,3,3,-2,4,-4,4,-4,-3,6,-4,1,-6,-6,12,1,-4,5,8,-3,0,8,-10,3,-3,3,-3,-2,9,4,12,-4,12,4,-9]];
E[218,4] = [x^2+2*x-2, [1,1,x,1,-x-1,x,x+4,1,-2*x-1,-x-1,1,x,-2*x,x+4,x-2,1,-x,-2*x-1,2*x+1,-x-1,2*x+2,1,-x-5,x,-2,-2*x,-4,x+4,x-7,x-2,-3*x,1,x,-x,-3*x-6,-2*x-1,3*x+4,2*x+1,4*x-4,-x-1,-x+2,2*x+2,x-4,1,-x+5,-x-5,3*x+3,x,6*x+11,-2,2*x-2,-2*x,-2*x-4,-4,-x-1]];
E[218,5] = [x^2-3*x+1, [1,1,x,1,-2*x+4,x,-2,1,3*x-4,-2*x+4,-2*x,x,3*x-3,-2,-2*x+2,1,-4*x+4,3*x-4,0,-2*x+4,-2*x,-2*x,3*x-3,x,-4*x+7,3*x-3,2*x-3,-2,-2*x+8,-2*x+2,6*x-12,1,-6*x+2,-4*x+4,4*x-8,3*x-4,-x+2,0,6*x-3,-2*x+4,8*x-10,-2*x,3*x-3,-2*x,2*x-10,3*x-3,-3*x,x,-3,-4*x+7,-8*x+4,3*x-3,5*x-6,2*x-3,4*x-4]];

E[219,1] = [x, [1,1,-1,-1,-4,-1,2,-3,1,-4,-4,1,-2,2,4,-1,0,1,-4,4,-2,-4,0,3,11,-2,-1,-2,8,4,6,5,4,0,-8,-1,-2,-4,2,12,-10,-2,-6,4,-4,0,-8,1,-3]];
E[219,2] = [x, [1,-2,-1,2,-1,2,2,0,1,2,-4,-2,-2,-4,1,-4,-3,-2,-1,-2,-2,8,0,0,-4,4,-1,4,-10,-2,-6,8,4,6,-2,2,1,2,2,0,2,4,6,-8,-1,0,7,4,-3]];
E[219,3] = [x^4-x^3-6*x^2+4*x+4, [2,2*x,-2,2*x^2-4,-x^3+x^2+4*x+2,-2*x,-2*x^2+2*x+4,2*x^3-8*x,2,-2*x^2+6*x+4,-2*x^2-2*x+8,-2*x^2+4,-2*x^3+10*x+4,-2*x^3+2*x^2+4*x,x^3-x^2-4*x-2,2*x^3-8*x,3*x^3-x^2-14*x+6,2*x,2*x^3+2*x^2-14*x-6,4*x^2-4*x-4,2*x^2-2*x-4,-2*x^3-2*x^2+8*x,-2*x^3+6*x+4,-2*x^3+8*x,-4*x^3+4*x^2+14*x-4,-2*x^3-2*x^2+12*x+8,-2,-4*x^2+4*x,2*x^3-10*x+4,2*x^2-6*x-4,2*x^3+2*x^2-12*x-12,-2*x^3+4*x^2+8*x-8,2*x^2+2*x-8,2*x^3+4*x^2-6*x-12,-6*x^2+10*x+8,2*x^2-4,4*x^3-4*x^2-22*x+6,4*x^3-2*x^2-14*x-8,2*x^3-10*x-4,4*x^3-16*x-8,-2*x^3-4*x^2+10*x+16,2*x^3-2*x^2-4*x,-2*x^3+2*x^2+16*x-12,-4*x^3+12*x-8,-x^3+x^2+4*x+2,-2*x^3-6*x^2+12*x+8,x^3+3*x^2-8*x-6,-2*x^3+8*x,-2*x^3+6*x^2-14]];
E[219,4] = [x^6+x^5-9*x^4-5*x^3+20*x^2+4*x-4, [2,2*x,2,2*x^2-4,-x^5-x^4+7*x^3+3*x^2-10*x+2,2*x,x^5+2*x^4-7*x^3-10*x^2+10*x+8,2*x^3-8*x,2,-2*x^4-2*x^3+10*x^2+6*x-4,x^5-11*x^3+26*x,2*x^2-4,2*x^3-10*x+4,x^5+2*x^4-5*x^3-10*x^2+4*x+4,-x^5-x^4+7*x^3+3*x^2-10*x+2,2*x^4-12*x^2+8,-x^5-x^4+9*x^3+3*x^2-20*x+2,2*x,2*x^3+2*x^2-10*x-2,-4*x^3+16*x-4,x^5+2*x^4-7*x^3-10*x^2+10*x+8,-x^5-2*x^4+5*x^3+6*x^2-4*x+4,2*x^3+4*x^2-10*x-12,2*x^3-8*x,-2*x^5-2*x^4+16*x^3+8*x^2-30*x,2*x^4-10*x^2+4*x,2,-x^5+9*x^3+4*x^2-20*x-12,-2*x^4-2*x^3+14*x^2+6*x-16,-2*x^4-2*x^3+10*x^2+6*x-4,x^5-2*x^4-13*x^3+10*x^2+32*x,2*x^5-16*x^3+24*x,x^5-11*x^3+26*x,-2*x^3+6*x-4,2*x^4+2*x^3-10*x^2-10*x,2*x^2-4,-2*x^5-2*x^4+16*x^3+8*x^2-26*x+2,2*x^4+2*x^3-10*x^2-2*x,2*x^3-10*x+4,4*x^3-4*x^2-16*x+8,2*x^3+8*x^2-6*x-24,x^5+2*x^4-5*x^3-10*x^2+4*x+4,3*x^5+6*x^4-19*x^3-30*x^2+28*x+16,-3*x^5-4*x^4+23*x^3+16*x^2-44*x-4,-x^5-x^4+7*x^3+3*x^2-10*x+2,2*x^4+4*x^3-10*x^2-12*x,2*x^5+5*x^4-12*x^3-27*x^2+18*x+14,2*x^4-12*x^2+8,2*x^5+2*x^4-22*x^3-14*x^2+56*x+18]];
E[219,5] = [x, [1,0,1,-2,-3,0,-4,0,1,0,0,-2,-4,0,-3,4,3,0,-1,6,-4,0,6,0,4,0,1,8,-6,0,-10,0,0,0,12,-2,-7,0,-4,0,0,0,2,0,-3,0,-3,4,9]];

E[220,1] = [x, [1,0,2,0,1,0,0,0,1,0,1,0,0,0,2,0,-4,0,-4,0,0,0,6,0,1,0,-4,0,2,0,0,0,2,0,0,0,-6,0,0,0,-10,0,4,0,1,0,10,0,-7,0,-8,0,2,0,1,0,-8,0,-4,0,-14,0,0,0,0,0,2,0,12,0,4,0]];
E[220,2] = [x, [1,0,-2,0,1,0,-4,0,1,0,-1,0,-4,0,-2,0,0,0,-4,0,8,0,-6,0,1,0,4,0,-6,0,8,0,2,0,-4,0,2,0,8,0,6,0,8,0,1,0,6,0,9,0,0,0,-6,0,-1,0,8,0,-12,0,2,0,-4,0,-4,0,-10,0,12,0,-12,0]];

E[221,1] = [x, [1,1,2,-1,2,2,2,-3,1,2,-6,-2,-1,2,4,-1,1,1,4,-2,4,-6,6,-6,-1,-1,-4,-2,-6,4,-2,5,-12,1,4,-1,2,4,-2,-6,-6,4]];
E[221,2] = [x, [1,-1,0,-1,4,0,-2,3,-3,-4,6,0,-1,2,0,-1,1,3,8,-4,0,-6,4,0,11,1,0,2,-6,0,-2,-5,0,-1,-8,3,-8,-8,0,12,0,0]];
E[221,3] = [x^2+x-1, [1,x,x-1,-x-1,-2*x-1,-2*x+1,-x-1,-2*x-1,-3*x-1,x-2,3*x,x,-1,-1,3*x-1,3*x,-1,2*x-3,3*x-2,x+3,x,-3*x+3,-2*x+2,3*x-1,0,-x,2*x+1,x+2,2*x-3,-4*x+3,-7,x+5,-6*x+3,-x,x+3,x+4,4*x+7,-5*x+3,-x+1,5,-4*x,-x+1]];
E[221,4] = [x^2-5, [1,x,-x+1,3,x-1,x-5,2,x,-2*x+3,-x+5,2,-3*x+3,-1,2*x,2*x-6,-1,1,3*x-10,-2*x+2,3*x-3,-2*x+2,2*x,-x-3,x-5,-2*x+1,-x,-2*x+10,6,-6,-6*x+10,2*x,-3*x,-2*x+2,x,2*x-2,-6*x+9,-x+5,2*x-10,x-1,-x+5,-x+5,2*x-10]];
E[221,5] = [x^3-4*x+1, [1,x,-x-1,x^2-2,-x^2-x+2,-x^2-x,x-3,-1,x^2+2*x-2,-x^2-2*x+1,x^2-5,-x^2-2*x+3,1,x^2-3*x,2*x^2+3*x-3,-2*x^2-x+4,1,2*x^2+2*x-1,-x^2-3,-x-3,-x^2+2*x+3,-x-1,4*x^2+2*x-10,x+1,x^2+3*x-3,x,-3*x^2-x+6,-3*x^2+2*x+5,-x^2+x+4,3*x^2+5*x-2,-3*x^2-x+6,-x^2-4*x+4,-x^2+x+6,x,2*x^2+x-5,3*x+2,x^2-5*x-4,-7*x+1,-x-1,x^2+x-2,-2*x^2+2*x+6,2*x^2-x+1]];
E[221,6] = [x^6-x^5-9*x^4+6*x^3+19*x^2-5*x-3, [2,2*x,-x^5+x^4+8*x^3-5*x^2-13*x+2,2*x^2-4,x^4-x^3-6*x^2+3*x+3,-x^4+x^3+6*x^2-3*x-3,-2*x^3+10*x+4,2*x^3-8*x,-2*x^2+8,x^5-x^4-6*x^3+3*x^2+3*x,-2*x^2+6,x^5-x^4-10*x^3+7*x^2+23*x-4,2,-2*x^4+10*x^2+4*x,2*x^3-14*x,2*x^4-12*x^2+8,-2,-2*x^3+8*x,2*x^5-2*x^4-16*x^3+12*x^2+26*x-2,x^4-x^3-4*x^2-x-3,-2*x^5+18*x^3+4*x^2-36*x-8,-2*x^3+6*x,x^5+x^4-8*x^3-7*x^2+13*x,x^4-x^3-8*x^2+7*x+9,-2*x^4+14*x^2-10,2*x,2*x^3-2*x^2-10*x+2,-2*x^5+14*x^3+4*x^2-20*x-8,-2*x^3+2*x^2+10*x-6,2*x^4-14*x^2,2*x^3+2*x^2-14*x-2,2*x^5-16*x^3+24*x,-2*x^5+2*x^4+18*x^3-12*x^2-36*x+6,-2*x,2*x^5-16*x^3-2*x^2+18*x+6,-2*x^4+12*x^2-16,-2*x^5+x^4+17*x^3-4*x^2-29*x+1,2*x^4-12*x^2+8*x+6,-x^5+x^4+8*x^3-5*x^2-13*x+2,-x^5+x^4+8*x^3-7*x^2-9*x,-2*x^5+x^4+19*x^3-6*x^2-39*x+3,-2*x^5+16*x^3+2*x^2-18*x-6]];
E[221,7] = [x^2+x-5, [1,x,x+1,-x+3,-1,5,-x-3,2*x-5,x+3,-x,x+2,3*x-2,-1,-2*x-5,-x-1,-5*x+4,1,2*x+5,-x+2,x-3,-3*x-8,x+5,-2*x+2,-5*x+5,-4,-x,5,-x-4,9,-5,2*x+5,5*x-15,2*x+7,x,x+3,x+4,-2*x-5,3*x-5,-x-1,-2*x+5,0,-5*x-15]];

E[222,1] = [x, [1,1,-1,1,0,-1,3,1,1,0,1,-1,1,3,0,1,-3,1,3,0,-3,1,-1,-1,-5,1,-1,3,-4,0,-6,1,-1,-3,0,1,-1,3,-1,0,-10,-3,12,1,0,-1,-6,-1,2,-5,3,1,-1,-1,0,3,-3,-4,0,0,2,-6,3,1,0,-1,2,-3,1,0,0,1,-3,-1,5,3]];
E[222,2] = [x, [1,1,1,1,0,1,-1,1,1,0,3,1,-1,-1,0,1,-3,1,-7,0,-1,3,3,1,-5,-1,1,-1,0,0,2,1,3,-3,0,1,1,-7,-1,0,-6,-1,-4,3,0,3,6,1,-6,-5,-3,-1,9,1,0,-1,-7,0,0,0,-10,2,-1,1,0,3,2,-3,3,0,12,1,5,1,-5,-7]];
E[222,3] = [x, [1,-1,1,1,4,-1,-1,-1,1,-4,-1,1,-3,1,4,1,3,-1,-5,4,-1,1,5,-1,11,3,1,-1,4,-4,-10,-1,-1,-3,-4,1,-1,5,-3,-4,-6,1,4,-1,4,-5,2,1,-6,-11,3,-3,-11,-1,-4,1,-5,-4,-12,4,10,10,-1,1,-12,1,14,3,5,4,0,-1,-11,1,11,-5]];
E[222,4] = [x, [1,-1,-1,1,-4,1,3,-1,1,4,5,-1,3,-3,4,1,3,-1,-7,-4,-3,-5,9,1,11,-3,-1,3,0,-4,-2,-1,-5,-3,-12,1,1,7,-3,4,6,3,4,5,-4,-9,-10,-1,2,-11,-3,3,3,1,-20,-3,7,0,-4,4,-2,2,3,1,-12,5,6,3,-9,12,-12,-1,13,-1,-11,-7]];
E[222,5] = [x, [1,-1,-1,1,2,1,0,-1,1,-2,-4,-1,6,0,-2,1,6,-1,8,2,0,4,0,1,-1,-6,-1,0,-6,2,4,-1,4,-6,0,1,1,-8,-6,-2,-6,0,-8,-4,2,0,8,-1,-7,1,-6,6,6,1,-8,0,-8,6,-4,-2,-2,-4,0,1,12,-4,-12,6,0,0,0,-1,10,-1,1,8]];

E[223,1] = [x^2+2*x-1, [1,x,x,-2*x-1,-x-3,-2*x+1,-x-1,x-2,-2*x-2,-x-1,-x,3*x-2,x+3,x-1,-x-1,3,2*x-1,2*x-2,-x-3,3*x+5,x-1,2*x-1,3*x,-4*x+1,4*x+5,x+1,-x-2,-x+3,-7,x-1,-2*x+2,x+4,2*x-1,-5*x+2,2*x+4,-2*x+6,2*x+3]];
E[223,2] = [x^4+4*x^3+2*x^2-5*x-3, [1,x,-x-1,x^2-2,-x^3-3*x^2+x+3,-x^2-x,2*x^3+5*x^2-2*x-6,x^3-4*x,x^2+2*x-2,x^3+3*x^2-2*x-3,-2*x^3-6*x^2+x+4,-x^3-x^2+2*x+2,x^3+4*x^2-8,-3*x^3-6*x^2+4*x+6,x,-4*x^3-8*x^2+5*x+7,x^3+x^2-4*x-5,x^3+2*x^2-2*x,x^3+4*x^2+3*x-1,x^3+2*x^2-3,x^3+x^2-2*x,2*x^3+5*x^2-6*x-6,-2*x^3-2*x^2+8*x+1,3*x^3+6*x^2-x-3,x^3+2*x^2-3*x-5,-2*x^2-3*x+3,-x^3-3*x^2+3*x+5,2*x^3-5*x+3,x^3+4*x^2+x-3,x^2,-4*x^3-12*x^2+3*x+14,6*x^3+13*x^2-5*x-12,x^2+5*x+2,-3*x^3-6*x^2+3,-x^3+4*x-3,-2*x^3-6*x^2+x+7,-2*x^3-7*x^2-2*x+6]];
E[223,3] = [x^12-7*x^11+6*x^10+57*x^9-122*x^8-105*x^7+430*x^6-73*x^5-499*x^4+242*x^3+143*x^2-52*x-19, [1,x,2*x^11-11*x^10-2*x^9+98*x^8-103*x^7-245*x^6+397*x^5+123*x^4-412*x^3+129*x^2+41*x-18,x^2-2,4*x^11-21*x^10-10*x^9+196*x^8-152*x^7-550*x^6+654*x^5+468*x^4-731*x^3+20*x^2+114*x+4,3*x^11-14*x^10-16*x^9+141*x^8-35*x^7-463*x^6+269*x^5+586*x^4-355*x^3-245*x^2+86*x+38,-9*x^11+45*x^10+34*x^9-435*x^8+235*x^7+1320*x^6-1172*x^5-1412*x^4+1388*x^3+350*x^2-263*x-61,x^3-4*x,-x^9+3*x^8+9*x^7-29*x^6-23*x^5+87*x^4+13*x^3-88*x^2+10*x+17,7*x^11-34*x^10-32*x^9+336*x^8-130*x^7-1066*x^6+760*x^5+1265*x^4-948*x^3-458*x^2+212*x+76,-12*x^11+60*x^10+45*x^9-578*x^8+315*x^7+1739*x^6-1559*x^5-1813*x^4+1827*x^3+390*x^2-327*x-68,3*x^11-12*x^10-26*x^9+135*x^8+58*x^7-531*x^6+11*x^5+896*x^4-147*x^3-601*x^2+112*x+93,x^11-7*x^10+6*x^9+56*x^8-119*x^7-96*x^6+400*x^5-95*x^4-403*x^3+248*x^2+36*x-31,-18*x^11+88*x^10+78*x^9-863*x^8+375*x^7+2698*x^6-2069*x^5-3103*x^4+2528*x^3+1024*x^2-529*x-171,2*x^11-9*x^10-12*x^9+91*x^8-9*x^7-300*x^6+128*x^5+380*x^4-165*x^3-158*x^2+25*x+23,x^4-6*x^2+4,14*x^11-66*x^10-73*x^9+663*x^8-176*x^7-2169*x^6+1282*x^5+2737*x^4-1683*x^3-1153*x^2+418*x+185,-x^10+3*x^9+9*x^8-29*x^7-23*x^6+87*x^5+13*x^4-88*x^3+10*x^2+17*x,10*x^11-50*x^10-37*x^9+481*x^8-268*x^7-1444*x^6+1319*x^5+1500*x^4-1550*x^3-318*x^2+285*x+56,7*x^11-32*x^10-43*x^9+332*x^8-27*x^7-1150*x^6+468*x^5+1609*x^4-690*x^3-829*x^2+212*x+125,-x^11+3*x^10+15*x^9-46*x^8-78*x^7+250*x^6+158*x^5-573*x^4-79*x^3+503*x^2-60*x-80,-24*x^11+117*x^10+106*x^9-1149*x^8+479*x^7+3601*x^6-2689*x^5-4161*x^4+3294*x^3+1389*x^2-692*x-228,x^11-4*x^10-8*x^9+42*x^8+15*x^7-147*x^6+5*x^5+204*x^4-23*x^3-97*x^2+x+10,3*x^11-16*x^10-4*x^9+142*x^8-146*x^7-353*x^6+577*x^5+178*x^4-617*x^3+173*x^2+77*x-19,13*x^11-64*x^10-54*x^9+625*x^8-294*x^7-1938*x^6+1568*x^5+2191*x^4-1912*x^3-692*x^2+407*x+125,-x^9+3*x^8+9*x^7-30*x^6-22*x^5+96*x^4+6*x^3-107*x^2+21*x+19,-6*x^11+28*x^10+33*x^9-283*x^8+58*x^7+935*x^6-493*x^5-1199*x^4+657*x^3+522*x^2-164*x-81,-20*x^11+96*x^10+95*x^9-951*x^8+338*x^7+3031*x^6-2073*x^5-3630*x^4+2604*x^3+1345*x^2-581*x-220,3*x^11-14*x^10-17*x^9+144*x^8-26*x^7-492*x^6+245*x^5+674*x^4-335*x^3-336*x^2+86*x+53,5*x^11-24*x^10-23*x^9+235*x^8-90*x^7-732*x^6+526*x^5+833*x^4-642*x^3-261*x^2+127*x+38,13*x^11-63*x^10-59*x^9+620*x^8-244*x^7-1951*x^6+1410*x^5+2273*x^4-1739*x^3-773*x^2+371*x+120,x^5-8*x^3+12*x,-x^11+4*x^10+8*x^9-43*x^8-13*x^7+157*x^6-21*x^5-238*x^4+59*x^3+147*x^2-30*x-30,32*x^11-157*x^10-135*x^9+1532*x^8-699*x^7-4738*x^6+3759*x^5+5303*x^4-4541*x^3-1584*x^2+913*x+266,-16*x^11+76*x^10+81*x^9-761*x^8+224*x^7+2476*x^6-1530*x^5-3096*x^4+1978*x^3+1283*x^2-473*x-206,-x^11+3*x^10+11*x^9-35*x^8-41*x^7+145*x^6+59*x^5-262*x^4-16*x^3+193*x^2-20*x-34,-2*x^11+12*x^10-3*x^9-101*x^8+150*x^7+211*x^6-533*x^5+32*x^4+544*x^3-306*x^2-56*x+43]];

E[224,1] = [x, [1,0,-2,0,0,0,-1,0,1,0,-4,0,-4,0,0,0,-2,0,-6,0,2,0,8,0,-5,0,4,0,2,0,-4,0,8,0,0,0,10,0,8,0,-10,0,4,0,0,0,4,0,1,0,4,0,-2,0,0,0,12,0,10,0,-8,0,-1,0]];
E[224,2] = [x, [1,0,2,0,0,0,1,0,1,0,4,0,-4,0,0,0,-2,0,6,0,2,0,-8,0,-5,0,-4,0,2,0,4,0,8,0,0,0,10,0,-8,0,-10,0,-4,0,0,0,-4,0,1,0,-4,0,-2,0,0,0,12,0,-10,0,-8,0,1,0]];
E[224,3] = [x^2+2*x-4, [1,0,x,0,x+2,0,1,0,-2*x+1,0,-2*x-4,0,-x+2,0,4,0,2*x+2,0,-x,0,x,0,4,0,2*x+3,0,2*x-8,0,-2*x-2,0,-2*x,0,-8,0,x+2,0,-2*x-2,0,4*x-4,0,-2*x-6,0,2*x+4,0,x-6,0,2*x+8,0,1,0,-2*x+8,0,-10,0,-4*x-16,0,2*x-4,0,-x-8,0,x+10,0,-2*x+1,0]];
E[224,4] = [x^2-2*x-4, [1,0,x,0,-x+2,0,-1,0,2*x+1,0,-2*x+4,0,x+2,0,-4,0,-2*x+2,0,-x,0,-x,0,-4,0,-2*x+3,0,2*x+8,0,2*x-2,0,-2*x,0,-8,0,x-2,0,2*x-2,0,4*x+4,0,2*x-6,0,2*x-4,0,-x-6,0,2*x-8,0,1,0,-2*x-8,0,-10,0,-4*x+16,0,-2*x-4,0,-x+8,0,-x+10,0,-2*x-1,0]];

E[225,1] = [x, [1,-1,0,-1,0,0,0,3,0,0,4,0,2,0,0,-1,2,0,4,0,0,-4,0,0,0,-2,0,0,2,0,0,-5,0,-2,0,0,10,-4,0,0,-10,0,-4,-4,0,0,8,0,-7,0,0,-2,-10,0,0,0,0,-2,4,0]];
E[225,2] = [x, [1,-2,0,2,0,0,-3,0,0,0,-2,0,1,6,0,-4,-2,0,-5,0,0,4,-6,0,0,-2,0,-6,-10,0,-3,8,0,4,0,0,2,10,0,0,8,0,1,-4,0,12,-2,0,2,0,0,2,4,0,0,0,0,20,10,0]];
E[225,3] = [x, [1,2,0,2,0,0,3,0,0,0,-2,0,-1,6,0,-4,2,0,-5,0,0,-4,6,0,0,-2,0,6,-10,0,-3,-8,0,4,0,0,-2,-10,0,0,8,0,-1,-4,0,12,2,0,2,0,0,-2,-4,0,0,0,0,-20,10,0]];
E[225,4] = [x^2-5, [1,x,0,3,0,0,0,x,0,0,0,0,0,0,0,-1,-2*x,0,4,0,0,0,-4*x,0,0,0,0,0,0,0,8,-3*x,0,-10,0,0,0,4*x,0,0,0,0,0,0,0,-20,4*x,0,-7,0,0,0,2*x,0,0,0,0,0,0,0]];
E[225,5] = [x, [1,0,0,-2,0,0,-5,0,0,0,0,0,-5,0,0,4,0,0,-1,0,0,0,0,0,0,0,0,10,0,0,-7,0,0,0,0,0,10,0,0,0,0,0,-5,0,0,0,0,0,18,0,0,10,0,0,0,0,0,0,0,0]];
E[225,6] = [x, [1,0,0,-2,0,0,5,0,0,0,0,0,5,0,0,4,0,0,-1,0,0,0,0,0,0,0,0,-10,0,0,-7,0,0,0,0,0,-10,0,0,0,0,0,5,0,0,0,0,0,18,0,0,-10,0,0,0,0,0,0,0,0]];

E[226,1] = [x^2-2*x-2, [1,-1,x,1,2,-x,0,-1,2*x-1,-2,-2*x+4,x,-2*x,0,2*x,1,-2,-2*x+1,-3*x+4,2,0,2*x-4,-x+8,-x,-1,2*x,4,0,2,-2*x,2*x,-1,-4,2,0,2*x-1,4*x-6,3*x-4,-4*x-4,-2,2*x+4,0,-x-8,-2*x+4,4*x-2,x-8,5*x-8,x,-7,1,-2*x,-2*x,-6*x+4,-4,-4*x+8,0,-2*x-6]];
E[226,2] = [x^2-2, [1,-1,x,1,-x-2,-x,-2*x-2,-1,-1,x+2,-4,x,2,2*x+2,-2*x-2,1,2*x-2,1,5*x,-x-2,-2*x-4,4,4*x,-x,4*x+1,-2,-4*x,-2*x-2,-5*x-2,2*x+2,-2*x-6,-1,-4*x,-2*x+2,6*x+8,-1,-3*x+6,-5*x,2*x,x+2,-2,2*x+4,-x,-4,x+2,-4*x,0,x,8*x+5,-4*x-1,-2*x+4,2,-2*x+2,4*x,4*x+8,2*x+2,10]];
E[226,3] = [x, [1,1,-2,1,-4,-2,0,1,1,-4,-4,-2,-2,0,8,1,-2,1,-2,-4,0,-4,4,-2,11,-2,4,0,-4,8,8,1,8,-2,0,1,-8,-2,4,-4,-6,0,6,-4,-4,4,-12,-2,-7,11,4,-2,10,4,16,0,4]];
E[226,4] = [x^4-2*x^3-6*x^2+12*x-4, [2,2,2*x,2,x^3-2*x^2-8*x+12,2*x,-2*x^3+2*x^2+12*x-12,2,2*x^2-6,x^3-2*x^2-8*x+12,2*x^2-8,2*x,4*x^3-4*x^2-28*x+24,-2*x^3+2*x^2+12*x-12,-2*x^2+4,2,-4*x^3+4*x^2+24*x-20,2*x^2-6,-4*x^3+4*x^2+26*x-24,x^3-2*x^2-8*x+12,-2*x^3+12*x-8,2*x^2-8,3*x^3-6*x^2-18*x+24,2*x,6*x^3-8*x^2-40*x+42,4*x^3-4*x^2-28*x+24,2*x^3-12*x,-2*x^3+2*x^2+12*x-12,-3*x^3+2*x^2+20*x-12,-2*x^2+4,4*x^3-2*x^2-24*x+12,2,2*x^3-8*x,-4*x^3+4*x^2+24*x-20,-4*x^3+8*x^2+28*x-40,2*x^2-6,-x^3-2*x^2+4*x+4,-4*x^3+4*x^2+26*x-24,4*x^3-4*x^2-24*x+16,x^3-2*x^2-8*x+12,-2*x^3+6*x^2+16*x-24,-2*x^3+12*x-8,-2*x^3+18*x-8,2*x^2-8,-5*x^3+6*x^2+28*x-36,3*x^3-6*x^2-18*x+24,3*x^3-2*x^2-18*x+8,2*x,4*x^3-4*x^2-24*x+18,6*x^3-8*x^2-40*x+42,-4*x^3+28*x-16,4*x^3-4*x^2-28*x+24,-6*x^3+8*x^2+44*x-40,2*x^3-12*x,-6*x^3+8*x^2+36*x-48,-2*x^3+2*x^2+12*x-12,-4*x^3+2*x^2+24*x-16]];

E[227,1] = [x^2-5, [2,2*x,-x+3,6,-4,3*x-5,x+7,2*x,-3*x+1,-4*x,-x+1,-3*x+9,-2*x-2,7*x+5,2*x-6,-2,-8,x-15,x+13,-12,-2*x+8,x-5,-x+11,3*x-5,-2,-2*x-10,-2*x,3*x+21,-3*x-3,-6*x+10,-4*x,-6*x,-2*x+4,-8*x,-2*x-14,-9*x+3,8,13*x+5]];
E[227,2] = [x^3+2*x^2-x-1, [1,x,-x^2-2*x+1,x^2-2,x^2+x-3,-1,x^2+3*x-2,-2*x^2-3*x+1,-x^2-x,-x^2-2*x+1,x^2-x-3,2*x^2+3*x-2,-3,x^2-x+1,3*x^2+5*x-4,-x^2-x+2,x+3,x^2-x-1,-4*x^2-7*x,-2*x^2-2*x+5,2*x^2+3*x-5,-3*x^2-2*x+1,-2*x^2+2*x+6,-x^2+4,-4*x^2-5*x+4,-3*x,3*x^2+7*x-2,-5*x^2-4*x+5,2*x^2+2*x-3,-x^2-x+3,4*x^2+8*x-2,5*x^2+7*x-3,3*x^2+5*x-2,x^2+3*x,-5*x^2-8*x+8,-x^2+2*x+1,x^2+4*x-4,x^2-4*x-4]];
E[227,3] = [x^10-17*x^8-3*x^7+98*x^6+40*x^5-218*x^4-148*x^3+136*x^2+144*x+32, [16,16*x,x^9-21*x^7-3*x^6+150*x^5+36*x^4-418*x^3-132*x^2+368*x+160,16*x^2-32,-12*x^9+12*x^8+196*x^7-152*x^6-1076*x^5+496*x^4+2312*x^3-168*x^2-1616*x-480,-4*x^8+52*x^6-4*x^5-200*x^4+16*x^3+232*x^2+16*x-32,13*x^9-8*x^8-213*x^7+97*x^6+1178*x^5-256*x^4-2562*x^3-212*x^2+1816*x+672,16*x^3-64*x,-5*x^9+4*x^8+81*x^7-45*x^6-434*x^5+100*x^4+882*x^3+124*x^2-560*x-224,12*x^9-8*x^8-188*x^7+100*x^6+976*x^5-304*x^4-1944*x^3+16*x^2+1248*x+384,2*x^9-4*x^8-30*x^7+54*x^6+140*x^5-204*x^4-212*x^3+176*x^2+56*x+16,-6*x^9+94*x^7+2*x^6-500*x^5-56*x^4+1068*x^3+280*x^2-768*x-320,-4*x^8+52*x^6-4*x^5-200*x^4+16*x^3+232*x^2+16*x,-8*x^9+8*x^8+136*x^7-96*x^6-776*x^5+272*x^4+1712*x^3+48*x^2-1200*x-416,20*x^9-12*x^8-332*x^7+144*x^6+1860*x^5-384*x^4-4056*x^3-248*x^2+2752*x+928,16*x^4-96*x^2+64,-18*x^9+16*x^8+298*x^7-202*x^6-1660*x^5+648*x^4+3604*x^3-152*x^2-2512*x-736,4*x^9-4*x^8-60*x^7+56*x^6+300*x^5-208*x^4-616*x^3+120*x^2+496*x+160,6*x^9-2*x^8-98*x^7+16*x^6+542*x^5+32*x^4-1188*x^3-340*x^2+848*x+368,16*x^9-8*x^8-256*x^7+104*x^6+1368*x^5-320*x^4-2832*x^3-48*x^2+1888*x+576,-13*x^9+10*x^8+217*x^7-123*x^6-1220*x^5+368*x^4+2658*x^3-1800*x-512,-4*x^9+4*x^8+60*x^7-56*x^6-284*x^5+224*x^4+472*x^3-216*x^2-272*x-64,-15*x^9+6*x^8+247*x^7-73*x^6-1384*x^5+172*x^4+3078*x^3+320*x^2-2240*x-816,-16*x^7-16*x^6+192*x^5+160*x^4-640*x^3-416*x^2+512*x+256,-4*x^9+68*x^7+12*x^6-408*x^5-160*x^4+1032*x^3+576*x^2-928*x-464,-4*x^9+52*x^7-4*x^6-200*x^5+16*x^4+232*x^3+16*x^2,-8*x^9+4*x^8+136*x^7-36*x^6-780*x^5-16*x^4+1736*x^3+536*x^2-1232*x-560,-18*x^9+16*x^8+306*x^7-186*x^6-1764*x^5+480*x^4+3988*x^3+312*x^2-2896*x-1088,12*x^9-6*x^8-200*x^7+66*x^6+1126*x^5-120*x^4-2464*x^3-340*x^2+1680*x+592,-12*x^9+8*x^8+204*x^7-100*x^6-1184*x^5+304*x^4+2712*x^3+32*x^2-1952*x-640,2*x^9-4*x^8-42*x^7+46*x^6+296*x^5-128*x^4-804*x^3-32*x^2+672*x+288,16*x^5-128*x^3+192*x,9*x^9-6*x^8-149*x^7+59*x^6+832*x^5-48*x^4-1826*x^3-504*x^2+1304*x+528,16*x^9-8*x^8-256*x^7+104*x^6+1368*x^5-320*x^4-2816*x^3-64*x^2+1856*x+576,18*x^9-12*x^8-306*x^7+134*x^6+1768*x^5-264*x^4-4036*x^3-624*x^2+2992*x+1120,6*x^9-94*x^7-2*x^6+500*x^5+56*x^4-1052*x^3-296*x^2+704*x+320,-6*x^9+102*x^7+18*x^6-588*x^5-224*x^4+1340*x^3+760*x^2-1056*x-608,-2*x^9+4*x^8+34*x^7-46*x^6-208*x^5+120*x^4+548*x^3+32*x^2-496*x-192]];
E[227,4] = [x^2-2, [1,x,-2,0,-x,-2*x,-2*x-1,-2*x,1,-2,2*x+1,0,2*x-4,-x-4,2*x,-4,x-4,x,2*x+5,0,4*x+2,x+4,-2*x-3,4*x,-3,-4*x+4,4,0,-4*x-3,4,3*x-2,0,-4*x-2,-4*x+2,x+4,0,-x-10,5*x+4]];
E[227,5] = [x^2+x-7, [1,1,x,-1,2,x,-x+1,-3,-x+4,2,x+3,-x,-2*x,-x+1,2*x,-1,-4,-x+4,-x,-2,2*x-7,x+3,x+4,-3*x,-1,-2*x,2*x-7,x-1,-x+2,2*x,-6,5,2*x+7,-4,-2*x+2,x-4,8,-x]];

E[228,1] = [x, [1,0,-1,0,-3,0,1,0,1,0,-5,0,-6,0,3,0,-5,0,1,0,-1,0,4,0,4,0,-1,0,6,0,6,0,5,0,-3,0,-8,0,6,0,-8,0,9,0,-3,0,1,0,-6,0,5,0,2,0,15,0,-1,0,-8,0,11,0,1,0,18,0,0,0,-4,0,-4,0,-11,0,-4,0,-5,0,-8,0]];
E[228,2] = [x, [1,0,-1,0,2,0,0,0,1,0,2,0,2,0,-2,0,6,0,-1,0,0,0,2,0,-1,0,-1,0,4,0,-8,0,-2,0,0,0,-2,0,-2,0,-8,0,-8,0,2,0,2,0,-7,0,-6,0,-4,0,4,0,1,0,0,0,2,0,0,0,4,0,12,0,-2,0,-4,0,6,0,1,0,0,0,-16,0]];
E[228,3] = [x^2-3*x-6, [1,0,1,0,x,0,-x+2,0,1,0,-x,0,2,0,x,0,-x,0,1,0,-x+2,0,2*x-6,0,3*x+1,0,1,0,-2*x,0,2*x-4,0,-x,0,-x-6,0,-2*x+2,0,2,0,0,0,-x+2,0,x,0,x-12,0,-x+3,0,-x,0,2*x,0,-3*x-6,0,1,0,0,0,-x-4,0,-x+2,0,2*x,0,4*x-4,0,2*x-6,0,-12,0,x-4,0,3*x+1,0,x+6,0,8,0]];

E[229,1] = [x, [1,-1,1,-1,-3,-1,2,3,-2,3,-3,-1,-6,-2,-3,-1,-7,2,3,3,2,3,4,3,4,6,-5,-2,-6,3,4,-5,-3,7,-6,2,2,-3]];
E[229,2] = [x^6+4*x^5-12*x^3-3*x^2+9*x-1, [1,x,x^4+2*x^3-3*x^2-4*x+1,x^2-2,-x^5-4*x^4-x^3+8*x^2+3*x-2,x^5+2*x^4-3*x^3-4*x^2+x,x^5+2*x^4-3*x^3-2*x^2+4*x-4,x^3-4*x,-2*x^4-5*x^3+5*x^2+10*x-4,-x^4-4*x^3+7*x-1,x^4+3*x^3-2*x^2-6*x-1,-2*x^5-5*x^4+4*x^3+10*x^2-x-1,x^5+5*x^4+4*x^3-11*x^2-12*x+5,-2*x^5-3*x^4+10*x^3+7*x^2-13*x+1,2*x^5+7*x^4+x^3-12*x^2-5*x,x^4-6*x^2+4,-x^4-4*x^3+x^2+10*x-1,-2*x^5-5*x^4+5*x^3+10*x^2-4*x,x^5+4*x^4+x^3-8*x^2-2*x-1,x^5+4*x^4+2*x^3-9*x^2-7*x+4,-3*x^5-9*x^4+4*x^3+18*x^2-2,x^5+3*x^4-2*x^3-6*x^2-x,-3*x^4-9*x^3+4*x^2+17*x-5,x^5-8*x^3+x^2+15*x-2,-x^5-3*x^4+2*x^3+9*x^2+2*x-3,x^5+4*x^4+x^3-9*x^2-4*x+1,-x^5-2*x^4+6*x^3+8*x^2-8*x-2,3*x^5+6*x^4-11*x^3-15*x^2+11*x+6,3*x^5+9*x^4-6*x^3-25*x^2+3*x+10,-x^5+x^4+12*x^3+x^2-18*x+2,-x^5-x^4+7*x^3+5*x^2-8*x-2,x^5-8*x^3+12*x,x^5-3*x^4-15*x^3+8*x^2+26*x-4,-x^5-4*x^4+x^3+10*x^2-x,x^5+6*x^4+4*x^3-17*x^2-11*x+7,3*x^5+9*x^4-4*x^3-20*x^2-2*x+6,-4*x^5-10*x^4+13*x^3+28*x^2-14*x-9,x^4+4*x^3+x^2-10*x+1]];
E[229,3] = [x^11-5*x^10-4*x^9+50*x^8-26*x^7-165*x^6+152*x^5+193*x^4-207*x^3-50*x^2+52*x+1, [4,4*x,x^9-x^8-13*x^7+11*x^6+55*x^5-40*x^4-83*x^3+53*x^2+32*x-11,4*x^2-8,-x^9+x^8+11*x^7-5*x^6-43*x^5+65*x^3+15*x^2-24*x-3,x^10-x^9-13*x^8+11*x^7+55*x^6-40*x^5-83*x^4+53*x^3+32*x^2-11*x,-x^10+3*x^9+9*x^8-31*x^7-21*x^6+106*x^5-3*x^4-131*x^3+26*x^2+41*x+6,4*x^3-16*x,-2*x^10+5*x^9+23*x^8-53*x^7-97*x^6+189*x^5+178*x^4-247*x^3-125*x^2+74*x+23,-x^10+x^9+11*x^8-5*x^7-43*x^6+65*x^4+15*x^3-24*x^2-3*x,2*x^10-7*x^9-17*x^8+71*x^7+39*x^6-235*x^5-2*x^4+265*x^3-49*x^2-54*x+23,4*x^10-11*x^9-37*x^8+107*x^7+103*x^6-345*x^5-60*x^4+405*x^3-67*x^2-116*x+21,2*x^10-6*x^9-18*x^8+58*x^7+50*x^6-184*x^5-38*x^4+210*x^3-12*x^2-62*x+8,-2*x^10+5*x^9+19*x^8-47*x^7-59*x^6+149*x^5+62*x^4-181*x^3-9*x^2+58*x+1,-x^9+x^8+13*x^7-11*x^6-55*x^5+40*x^4+79*x^3-49*x^2-20*x+7,4*x^4-24*x^2+16,-2*x^10+10*x^9+10*x^8-100*x^7+24*x^6+328*x^5-178*x^4-372*x^3+216*x^2+78*x-30,-5*x^10+15*x^9+47*x^8-149*x^7-141*x^6+482*x^5+139*x^4-539*x^3-26*x^2+127*x+2,-2*x^10+5*x^9+19*x^8-45*x^7-57*x^6+121*x^5+46*x^4-75*x^3+27*x^2-46*x-13,-4*x^10+9*x^9+43*x^8-91*x^7-155*x^6+303*x^5+208*x^4-361*x^3-83*x^2+100*x+7,2*x^9-6*x^8-18*x^7+54*x^6+58*x^5-152*x^4-90*x^3+134*x^2+64*x-14,3*x^10-9*x^9-29*x^8+91*x^7+95*x^6-306*x^5-121*x^4+365*x^3+46*x^2-81*x-2,2*x^8-2*x^7-24*x^6+12*x^5+98*x^4-8*x^3-136*x^2-22*x+28,7*x^10-19*x^9-67*x^8+185*x^7+205*x^6-588*x^5-201*x^4+655*x^3+20*x^2-165*x-4,6*x^10-18*x^9-58*x^8+184*x^7+184*x^6-624*x^5-210*x^4+752*x^3+72*x^2-190*x-22,4*x^10-10*x^9-42*x^8+102*x^7+146*x^6-342*x^5-176*x^4+402*x^3+38*x^2-96*x-2,-2*x^10+7*x^9+17*x^8-71*x^7-39*x^6+239*x^5-10*x^4-277*x^3+97*x^2+38*x-27,-3*x^10+5*x^9+35*x^8-49*x^7-139*x^6+154*x^5+211*x^4-161*x^3-94*x^2+23*x-10,-2*x^9+6*x^8+18*x^7-58*x^6-50*x^5+184*x^4+34*x^3-198*x^2+16*x+34,-x^10+x^9+13*x^8-11*x^7-55*x^6+40*x^5+79*x^4-49*x^3-20*x^2+7*x,2*x^10-8*x^9-14*x^8+82*x^7+8*x^6-282*x^5+104*x^4+352*x^3-170*x^2-92*x+30,4*x^5-32*x^3+48*x,2*x^10-3*x^9-25*x^8+23*x^7+127*x^6-43*x^5-318*x^4-11*x^3+343*x^2+34*x-69,2*x^9-28*x^7-2*x^6+126*x^5+14*x^4-198*x^3-22*x^2+74*x+2,x^10-x^9-13*x^8+11*x^7+55*x^6-40*x^5-83*x^4+57*x^3+36*x^2-35*x-4,-6*x^10+17*x^9+55*x^8-165*x^7-149*x^6+521*x^5+70*x^4-567*x^3+127*x^2+114*x-41,3*x^9-3*x^8-33*x^7+15*x^6+125*x^5+8*x^4-179*x^3-77*x^2+76*x+21,-5*x^10+11*x^9+55*x^8-109*x^7-209*x^6+350*x^5+311*x^4-387*x^3-146*x^2+91*x+2]];

E[230,1] = [x^2-3*x-1, [1,-1,x,1,1,-x,-x+3,-1,3*x-2,-1,-x-2,x,-x+3,x-3,x,1,-3*x+6,-3*x+2,-3*x+5,1,-1,x+2,-1,-x,1,x-3,4*x+3,-x+3,2*x-2,-x,3*x-7,-1,-5*x-1,3*x-6,-x+3,3*x-2,8,3*x-5,-1,-1,-3*x,1,4*x-8,-x-2,3*x-2,1,2*x-2,x,-3*x+3,-1,-3*x-3,-x+3,4*x-10,-4*x-3,-x-2,x-3,-4*x-3,-2*x+2,-2*x-4,x,-5*x+10,-3*x+7,2*x-9,1,-x+3,5*x+1,-4,-3*x+6,-x,x-3,x-16,-3*x+2]];
E[230,2] = [x^2+x-5, [1,-1,x,1,-1,-x,x+1,-1,-x+2,1,x+2,x,-x+3,-x-1,-x,1,-x-2,x-2,-x+3,-1,5,-x-2,1,-x,1,x-3,-5,x+1,-2*x+2,x,3*x+5,-1,x+5,x+2,-x-1,-x+2,-4,x-3,4*x-5,1,x-4,-5,-4*x,x+2,x-2,-1,-2*x-10,x,x-1,-1,-x-5,-x+3,6,5,-x-2,-x-1,4*x-5,2*x-2,2*x-8,-x,-3*x+2,-3*x-5,2*x-3,1,x-3,-x-5,-4*x,-x-2,x,x+1,-3*x,x-2]];
E[230,3] = [x^2-x-1, [1,1,x,1,1,x,-x+1,1,x-2,1,-3*x+2,x,-5*x+1,-x+1,x,1,5*x-2,x-2,3*x-3,1,-1,-3*x+2,1,x,1,-5*x+1,-4*x+1,-x+1,-2*x-6,x,5*x+1,1,-x-3,5*x-2,-x+1,x-2,4*x,3*x-3,-4*x-5,1,7*x-8,-1,0,-3*x+2,x-2,1,-6*x+6,x,-x-5,1,3*x+5,-5*x+1,4*x-6,-4*x+1,-3*x+2,-x+1,3,-2*x-6,6*x-8,x,-7*x+2,5*x+1,2*x-3,1,-5*x+1,-x-3,4*x+8,5*x-2,x,-x+1,-5*x+4,x-2]];
E[230,4] = [x^3-x^2-9*x+12, [1,1,x,1,-1,x,-x^2-2*x+8,1,x^2-3,-1,2*x^2+x-12,x,-x^2+6,-x^2-2*x+8,-x,1,-x-2,x^2-3,-x^2-2*x+8,-1,-3*x^2-x+12,2*x^2+x-12,-1,x,1,-x^2+6,x^2+3*x-12,-x^2-2*x+8,2*x-2,-x,x^2-8,1,3*x^2+6*x-24,-x-2,x^2+2*x-8,x^2-3,2*x^2+2*x-14,-x^2-2*x+8,-x^2-3*x+12,-1,-2*x^2-3*x+14,-3*x^2-x+12,8,2*x^2+x-12,-x^2+3,-1,-2*x^2+8,x,2*x^2+x-3,1,-x^2-2*x,-x^2+6,-6,x^2+3*x-12,-2*x^2-x+12,-x^2-2*x+8,-3*x^2-x+12,2*x-2,2*x+4,-x,4*x^2+3*x-26,x^2-8,-x^2-9*x+12,1,x^2-6,3*x^2+6*x-24,4*x^2+4*x-24,-x-2,-x,x^2+2*x-8,-x+4,x^2-3]];

E[231,1] = [x, [1,-1,-1,-1,-2,1,1,3,1,2,-1,1,6,-1,2,-1,2,-1,4,2,-1,1,0,-3,-1,-6,-1,-1,-2,-2,8,-5,1,-2,-2,-1,6,-4,-6,-6,10,1,-4,1,-2,0,-8,1,1,1,-2,-6,6,1,2,3,-4,2,4,-2,-10,-8,1,7]];
E[231,2] = [x^2+x-5, [1,x,-1,-x+3,3,-x,1,2*x-5,1,3*x,-1,x-3,1,x,-3,-5*x+4,2*x+4,x,-2*x-3,-3*x+9,-1,-x,-2*x-2,-2*x+5,4,x,-1,-x+3,-4*x-1,-3*x,2*x,5*x-15,1,2*x+10,3,-x+3,1,-x-10,-1,6*x-15,-4*x-4,-x,2*x-2,x-3,3,-10,-2*x+5,5*x-4,1,4*x,-2*x-4,-x+3,-2*x-6,-x,-3,2*x-5,2*x+3,3*x-20,2*x+1,3*x-9,10,-2*x+10,1,-10*x+17]];
E[231,3] = [x^3-2*x^2-4*x+7, [1,x,1,x^2-2,-x^2-x+6,x,-1,2*x^2-7,1,-3*x^2+2*x+7,-1,x^2-2,-3*x^2+x+10,-x,-x^2-x+6,2*x^2+x-10,4*x^2-2*x-12,x,x^2-x-6,-2*x^2-3*x+9,-1,-x,2*x+2,2*x^2-7,x^2-3*x+3,-5*x^2-2*x+21,1,-x^2+2,-3*x^2+x+10,-3*x^2+2*x+7,2*x^2-4*x-6,x^2-2*x,-1,6*x^2+4*x-28,x^2+x-6,x^2-2,-x^2+3*x+2,x^2-2*x-7,-3*x^2+x+10,-x^2-3*x,2*x^2-2*x-2,-x,4*x^2+2*x-22,-x^2+2,-x^2-x+6,2*x^2+2*x,x^2+3*x-6,2*x^2+x-10,1,-x^2+7*x-7,4*x^2-2*x-12,-6*x^2-x+15,-2*x^2+8,x,x^2+x-6,-2*x^2+7,x^2-x-6,-5*x^2-2*x+21,-3*x^2+3*x+10,-2*x^2-3*x+9,-2,2*x-14,-1,-4*x^2+2*x+13]];
E[231,4] = [x^3-6*x-1, [1,x,-1,x^2-2,-x^2+x+4,-x,-1,2*x+1,1,x^2-2*x-1,1,-x^2+2,-x^2+x+4,-x,x^2-x-4,x+4,-2*x,x,-x^2-x+8,3*x-7,1,x,-2*x-2,-2*x-1,-x^2-3*x+9,x^2-2*x-1,-1,-x^2+2,x^2-x,-x^2+2*x+1,2*x^2-10,x^2-2,-1,-2*x^2,x^2-x-4,x^2-2,x^2+3*x-4,-x^2+2*x-1,x^2-x-4,x^2-3*x+2,2*x^2+2*x-6,x,-2*x+2,x^2-2,-x^2+x+4,-2*x^2-2*x,x^2+x-12,-x-4,1,-3*x^2+3*x-1,2*x,3*x-7,-2*x^2+8,-x,-x^2+x+4,-2*x-1,x^2+x-8,-x^2+6*x+1,-3*x^2+x+4,-3*x+7,6,2*x+2,-1,2*x-7]];
E[231,5] = [x^2-x-1, [1,x,1,x-1,1,x,1,-2*x+1,1,x,1,x-1,-4*x+1,x,1,-3*x,-2*x+4,x,6*x-3,x-1,1,x,-6*x+2,-2*x+1,-4,-3*x-4,1,x-1,5,x,2*x-4,x-5,1,2*x-2,1,x-1,-7,3*x+6,-4*x+1,-2*x+1,4*x,x,-6*x+2,x-1,1,-4*x-6,-2*x-1,-3*x,1,-4*x,-2*x+4,x-5,10*x-6,x,1,-2*x+1,6*x-3,5*x,10*x-5,x-1,2,-2*x+2,1,2*x+1]];

E[232,1] = [x, [1,0,-1,0,-3,0,2,0,-2,0,-3,0,-5,0,3,0,-4,0,0,0,-2,0,0,0,4,0,5,0,-1,0,9,0,3,0,-6,0,8,0,5,0,-2,0,-11,0,6,0,-7,0,-3,0,4,0,9,0,9,0,0,0,4,0]];
E[232,2] = [x, [1,0,1,0,1,0,2,0,-2,0,3,0,-1,0,1,0,0,0,0,0,2,0,4,0,-4,0,-5,0,-1,0,3,0,3,0,2,0,-8,0,-1,0,-6,0,-5,0,-2,0,3,0,-3,0,0,0,5,0,3,0,0,0,-8,0]];
E[232,3] = [x^2+2*x-1, [1,0,x,0,-2*x-3,0,-4,0,-2*x-2,0,-x-2,0,4*x+3,0,x-2,0,4*x+2,0,2,0,-4*x,0,-2*x-4,0,4*x+8,0,-x-2,0,1,0,-x-8,0,-1,0,8*x+12,0,-4*x,0,-5*x+4,0,-4*x-8,0,-x+2,0,2*x+10,0,-5*x-10,0,9,0,-6*x+4,0,-7,0,3*x+8,0,2*x,0,6*x+8,0]];
E[232,4] = [x^3-2*x^2-5*x+8, [1,0,x,0,-x^2+6,0,0,0,x^2-3,0,2*x^2-x-8,0,x^2-2*x-2,0,-2*x^2+x+8,0,2,0,-2*x^2+8,0,0,0,-2*x,0,-3*x^2+2*x+15,0,2*x^2-x-8,0,1,0,-x-4,0,3*x^2+2*x-16,0,0,0,2*x^2-10,0,3*x-8,0,-2*x^2+4*x+10,0,-2*x^2-x+8,0,-2*x-2,0,2*x^2+3*x-12,0,-7,0,2*x,0,-x^2-2*x+6,0,4*x^2-5*x-24,0,-4*x^2-2*x+16,0,-2*x+4,0]];

E[233,1] = [x, [1,1,-2,-1,2,-2,4,-3,1,2,6,2,6,4,-4,-1,-6,1,-4,-2,-8,6,0,6,-1,6,4,-4,-2,-4,4,5,-12,-6,8,-1,-6,-4,-12]];
E[233,2] = [x^7+2*x^6-6*x^5-10*x^4+10*x^3+8*x^2-7*x+1, [1,x,x^5+x^4-5*x^3-4*x^2+3*x,x^2-2,-x^5-2*x^4+4*x^3+8*x^2-x-3,x^6+x^5-5*x^4-4*x^3+3*x^2,-x^6-3*x^5+5*x^4+16*x^3-6*x^2-16*x+3,x^3-4*x,-x^6-4*x^5+3*x^4+19*x^3+4*x^2-11*x-1,-x^6-2*x^5+4*x^4+8*x^3-x^2-3*x,-x^6-2*x^5+7*x^4+11*x^3-13*x^2-11*x+5,-x^6-x^5+4*x^4+3*x^3+x-1,6*x^6+14*x^5-29*x^4-68*x^3+25*x^2+52*x-16,-x^6-x^5+6*x^4+4*x^3-8*x^2-4*x+1,2*x^6+6*x^5-7*x^4-27*x^3-x^2+16*x-4,x^4-6*x^2+4,5*x^6+13*x^5-24*x^4-65*x^3+22*x^2+53*x-17,-2*x^6-3*x^5+9*x^4+14*x^3-3*x^2-8*x+1,-5*x^6-10*x^5+24*x^4+46*x^3-18*x^2-28*x+6,2*x^4+x^3-11*x^2-5*x+7,-x^6-5*x^5+2*x^4+24*x^3+7*x^2-13*x+2,x^5+x^4-3*x^3-3*x^2-2*x+1,-3*x^6-7*x^5+17*x^4+35*x^3-26*x^2-29*x+14,-x^6-4*x^5+3*x^4+18*x^3+3*x^2-8*x+1,-4*x^6-10*x^5+19*x^4+49*x^3-15*x^2-34*x+10,2*x^6+7*x^5-8*x^4-35*x^3+4*x^2+26*x-6,2*x^6+5*x^5-10*x^4-23*x^3+9*x^2+13*x-5,3*x^6+6*x^5-16*x^4-30*x^3+16*x^2+26*x-5,-4*x^6-11*x^5+19*x^4+57*x^3-16*x^2-51*x+13,2*x^6+5*x^5-7*x^4-21*x^3+10*x-2,x^6+x^5-7*x^4-5*x^3+11*x^2+4*x-4,x^5-8*x^3+12*x,-3*x^6-7*x^5+11*x^4+31*x^3+x^2-17*x+4,3*x^6+6*x^5-15*x^4-28*x^3+13*x^2+18*x-5,4*x^6+12*x^5-15*x^4-56*x^3+x^2+36*x-6,3*x^6+5*x^5-12*x^4-21*x^3+9*x+4,3*x^6+7*x^5-13*x^4-34*x^3+6*x^2+24*x-8,-6*x^5-4*x^4+32*x^3+12*x^2-29*x+5,-x^6-6*x^5+28*x^3+14*x^2-15*x]];
E[233,3] = [x^11+2*x^10-16*x^9-30*x^8+91*x^7+158*x^6-213*x^5-349*x^4+152*x^3+290*x^2+41*x-19, [4,4*x,7*x^10-2*x^9-107*x^8+32*x^7+556*x^6-130*x^5-1147*x^4+31*x^3+883*x^2+203*x-64,4*x^2-8,54*x^10-18*x^9-818*x^8+290*x^7+4184*x^6-1240*x^5-8386*x^4+732*x^3+6200*x^2+1176*x-438,-16*x^10+5*x^9+242*x^8-81*x^7-1236*x^6+344*x^5+2474*x^4-181*x^3-1827*x^2-351*x+133,4*x^10-2*x^9-60*x^8+30*x^7+300*x^6-124*x^5-572*x^4+86*x^3+390*x^2+82*x-10,4*x^3-16*x,-8*x^10+2*x^9+120*x^8-34*x^7-604*x^6+144*x^5+1176*x^4-46*x^3-834*x^2-190*x+62,-126*x^10+46*x^9+1910*x^8-730*x^7-9772*x^6+3116*x^5+19578*x^4-2008*x^3-14484*x^2-2652*x+1026,9*x^10-3*x^9-135*x^8+49*x^7+680*x^6-214*x^5-1331*x^4+150*x^3+968*x^2+148*x-81,23*x^10-10*x^9-347*x^8+156*x^7+1760*x^6-674*x^5-3471*x^4+543*x^3+2523*x^2+383*x-176,-4*x^10+60*x^8-4*x^7-304*x^6+24*x^5+600*x^4+12*x^3-416*x^2-80*x+28,-10*x^10+4*x^9+150*x^8-64*x^7-756*x^6+280*x^5+1482*x^4-218*x^3-1078*x^2-174*x+76,-34*x^10+14*x^9+514*x^8-218*x^7-2616*x^6+924*x^5+5194*x^4-632*x^3-3824*x^2-700*x+282,4*x^4-24*x^2+16,-42*x^10+16*x^9+638*x^8-252*x^7-3276*x^6+1072*x^5+6610*x^4-698*x^3-4954*x^2-910*x+368,18*x^10-8*x^9-274*x^8+124*x^7+1408*x^6-528*x^5-2838*x^4+382*x^3+2130*x^2+390*x-152,66*x^10-26*x^9-998*x^8+410*x^7+5084*x^6-1756*x^5-10110*x^4+1224*x^3+7420*x^2+1328*x-498,190*x^10-70*x^9-2874*x^8+1114*x^7+14656*x^6-4780*x^5-29210*x^4+3204*x^3+21488*x^2+3840*x-1518,6*x^10-2*x^9-90*x^8+30*x^7+452*x^6-112*x^5-874*x^4-4*x^3+612*x^2+196*x-30,-21*x^10+9*x^9+319*x^8-139*x^7-1636*x^6+586*x^5+3291*x^4-400*x^3-2462*x^2-450*x+171,-18*x^10+8*x^9+270*x^8-124*x^7-1356*x^6+528*x^5+2630*x^4-394*x^3-1882*x^2-326*x+124,-24*x^10+11*x^9+362*x^8-171*x^7-1836*x^6+740*x^5+3622*x^4-611*x^3-2633*x^2-417*x+171,-40*x^10+16*x^9+604*x^8-252*x^7-3072*x^6+1080*x^5+6100*x^4-764*x^3-4480*x^2-800*x+308,8*x^10-4*x^9-124*x^8+60*x^7+656*x^6-252*x^5-1384*x^4+192*x^3+1080*x^2+192*x-76,-30*x^10+11*x^9+452*x^8-175*x^7-2288*x^6+748*x^5+4496*x^4-489*x^3-3239*x^2-595*x+207,16*x^10-6*x^9-244*x^8+94*x^7+1260*x^6-400*x^5-2564*x^4+270*x^3+1946*x^2+322*x-170,-132*x^10+48*x^9+2000*x^8-764*x^7-10224*x^6+3276*x^5+20448*x^4-2176*x^3-15072*x^2-2680*x+1056,82*x^10-30*x^9-1238*x^8+478*x^7+6296*x^6-2048*x^5-12498*x^4+1344*x^3+9160*x^2+1676*x-646,56*x^10-20*x^9-848*x^8+320*x^7+4332*x^6-1380*x^5-8660*x^4+944*x^3+6400*x^2+1072*x-472,4*x^5-32*x^3+48*x,-16*x^10+6*x^9+244*x^8-94*x^7-1260*x^6+396*x^5+2560*x^4-234*x^3-1910*x^2-398*x+118,100*x^10-34*x^9-1512*x^8+546*x^7+7708*x^6-2336*x^5-15356*x^4+1430*x^3+11270*x^2+2090*x-798,68*x^10-24*x^9-1028*x^8+384*x^7+5240*x^6-1640*x^5-10440*x^4+1004*x^3+7664*x^2+1484*x-520,-28*x^10+10*x^9+424*x^8-162*x^7-2164*x^6+708*x^5+4312*x^4-514*x^3-3162*x^2-510*x+218,116*x^10-46*x^9-1752*x^8+726*x^7+8908*x^6-3124*x^5-17660*x^4+2274*x^3+12934*x^2+2182*x-910,-158*x^10+58*x^9+2390*x^8-922*x^7-12184*x^6+3948*x^5+24258*x^4-2612*x^3-17812*x^2-3204*x+1254,19*x^10-10*x^9-287*x^8+152*x^7+1456*x^6-646*x^5-2875*x^4+527*x^3+2127*x^2+335*x-144]];

E[234,1] = [x, [1,-1,0,1,-2,0,-2,-1,0,2,-4,0,-1,2,0,1,0,0,-6,-2,0,4,4,0,-1,1,0,-2,-8,0,-2,-1,0,0,4,0,6,6,0,2,6,0,-8,-4,0,-4,8,0,-3,1,0,-1,12,0,8,2,0,8,4,0,10,2,0,1,2,0,-2,0,0,-4,-16,0,14,-6,0,-6,8,0,-4,-2,0,-6,-12,0]];
E[234,2] = [x, [1,-1,0,1,1,0,1,-1,0,-1,2,0,-1,-1,0,1,3,0,6,1,0,-2,4,0,-4,1,0,1,-2,0,4,-1,0,-3,1,0,3,-6,0,-1,0,0,-5,2,0,-4,-13,0,-6,4,0,-1,-12,0,2,-1,0,2,10,0,-8,-4,0,1,-1,0,-2,3,0,-1,5,0,-10,-3,0,6,2,0,-4,1,0,0,0,0]];
E[234,3] = [x, [1,1,0,1,2,0,-2,1,0,2,4,0,-1,-2,0,1,0,0,-6,2,0,4,-4,0,-1,-1,0,-2,8,0,-2,1,0,0,-4,0,6,-6,0,2,-6,0,-8,4,0,-4,-8,0,-3,-1,0,-1,-12,0,8,-2,0,8,-4,0,10,-2,0,1,-2,0,-2,0,0,-4,16,0,14,6,0,-6,-8,0,-4,2,0,-6,12,0]];
E[234,4] = [x, [1,1,0,1,-2,0,4,1,0,-2,4,0,1,4,0,1,-2,0,-8,-2,0,4,0,0,-1,1,0,4,-6,0,-4,1,0,-2,-8,0,-2,-8,0,-2,10,0,4,4,0,0,-8,0,9,-1,0,1,10,0,-8,4,0,-6,-4,0,-2,-4,0,1,-2,0,-16,-2,0,-8,8,0,2,-2,0,-8,16,0,8,-2,0,10,-12,0]];
E[234,5] = [x, [1,1,0,1,3,0,-1,1,0,3,-6,0,1,-1,0,1,3,0,2,3,0,-6,0,0,4,1,0,-1,-6,0,-4,1,0,3,-3,0,-7,2,0,3,0,0,-1,-6,0,0,-3,0,-6,4,0,1,0,0,-18,-1,0,-6,6,0,8,-4,0,1,3,0,14,3,0,-3,3,0,2,-7,0,2,6,0,8,3,0,0,-12,0]];

E[235,1] = [x, [1,2,2,2,-1,4,-2,0,1,-2,0,4,3,-4,-2,-4,0,2,-4,-2,-4,0,1,0,1,6,-4,-4,8,-4,6,-8,0,0,2,2,-6,-8,6,0,-2,-8,9,0,-1,2,1,-8]];
E[235,2] = [x^5+4*x^4-12*x^2-4*x+7, [1,x,x^4+2*x^3-4*x^2-5*x+3,x^2-2,-1,-2*x^4-4*x^3+7*x^2+7*x-7,-2*x^4-5*x^3+5*x^2+10*x-5,x^3-4*x,-2*x^4-3*x^3+9*x^2+6*x-8,-x,x^4+3*x^3+x^2-3*x-5,2*x^4+3*x^3-9*x^2-5*x+8,x^4+x^3-5*x^2-3*x+1,3*x^4+5*x^3-14*x^2-13*x+14,-x^4-2*x^3+4*x^2+5*x-3,x^4-6*x^2+4,x^3+x^2-2*x-2,5*x^4+9*x^3-18*x^2-16*x+14,-x^4-x^3+3*x^2-x+1,-x^2+2,2*x^4+4*x^3-4*x^2-2*x-1,-x^4+x^3+9*x^2-x-7,-2*x^4-2*x^3+12*x^2+6*x-14,-x^4-x^3+5*x^2+2*x,1,-3*x^4-5*x^3+9*x^2+5*x-7,2*x^4+2*x^3-10*x^2+9,-3*x^4-4*x^3+13*x^2+6*x-11,-4*x^3-8*x^2+10*x+8,2*x^4+4*x^3-7*x^2-7*x+7,x^4+x^3-9*x^2-5*x+15,-4*x^4-8*x^3+12*x^2+16*x-7,-3*x^4-9*x^3+3*x^2+15*x-1,x^4+x^3-2*x^2-2*x,2*x^4+5*x^3-5*x^2-10*x+5,-7*x^4-12*x^3+26*x^2+22*x-19,2*x^4+5*x^3-3*x^2-8*x-4,3*x^4+3*x^3-13*x^2-3*x+7,-3*x^4-5*x^3+15*x^2+15*x-11,-x^3+4*x,-2*x^2-2*x,-4*x^4-4*x^3+22*x^2+7*x-14,0,3*x^4+3*x^3-15*x^2-5*x+17,2*x^4+3*x^3-9*x^2-6*x+8,6*x^4+12*x^3-18*x^2-22*x+14,-1,-x^4-x^3+8*x^2+6*x-9]];
E[235,3] = [x^7-x^6-10*x^5+8*x^4+28*x^3-17*x^2-19*x+2, [2,2*x,x^6-10*x^4+24*x^2-3*x-6,2*x^2-4,2,x^6-8*x^4-4*x^3+14*x^2+13*x-2,-x^6+8*x^4+2*x^3-14*x^2-3*x+2,2*x^3-8*x,x^6-8*x^4-2*x^3+10*x^2+3*x+12,2*x,-3*x^6+26*x^4+6*x^3-50*x^2-15*x+6,-x^6+2*x^5+8*x^4-14*x^3-18*x^2+23*x+10,-x^6-2*x^5+10*x^4+18*x^3-22*x^2-33*x+4,-x^6-2*x^5+10*x^4+14*x^3-20*x^2-17*x+2,x^6-10*x^4+24*x^2-3*x-6,2*x^4-12*x^2+8,2*x^6-16*x^4-6*x^3+26*x^2+18*x+4,x^6+2*x^5-10*x^4-18*x^3+20*x^2+31*x-2,x^6+4*x^5-10*x^4-34*x^3+18*x^2+57*x+6,2*x^2-4,x^6-8*x^4-4*x^3+16*x^2+11*x-6,-3*x^6-4*x^5+30*x^4+34*x^3-66*x^2-51*x+6,2*x^6+2*x^5-20*x^4-20*x^3+48*x^2+34*x-14,-x^6-2*x^5+10*x^4+18*x^3-22*x^2-35*x+6,2,-3*x^6+26*x^4+6*x^3-50*x^2-15*x+2,x^6-4*x^5-8*x^4+32*x^3+20*x^2-57*x-14,-x^6+6*x^4+4*x^3-6*x^2-11*x-2,-4*x+8,x^6-8*x^4-4*x^3+14*x^2+13*x-2,-x^6+10*x^4+2*x^3-22*x^2-5*x-2,2*x^5-16*x^3+24*x,-3*x^6+26*x^4+6*x^3-46*x^2-19*x-10,2*x^6+4*x^5-22*x^4-30*x^3+52*x^2+42*x-4,-x^6+8*x^4+2*x^3-14*x^2-3*x+2,x^6-10*x^4-4*x^3+28*x^2+11*x-26,4*x^6+4*x^5-36*x^4-38*x^3+66*x^2+68*x+4,5*x^6-42*x^4-10*x^3+74*x^2+25*x-2,-x^6-4*x^5+10*x^4+38*x^3-22*x^2-77*x+6,2*x^3-8*x,-2*x^6+16*x^4+8*x^3-28*x^2-26*x+8,x^6+2*x^5-12*x^4-12*x^3+28*x^2+13*x-2,2*x^6-2*x^5-16*x^4+8*x^3+32*x^2-2*x-22,-x^6+6*x^4+6*x^3-2*x^2-21*x-6,x^6-8*x^4-2*x^3+10*x^2+3*x+12,4*x^6-36*x^4-8*x^3+68*x^2+24*x-4,-2,-x^6-4*x^5+10*x^4+34*x^3-16*x^2-59*x-18]];
E[235,4] = [x, [1,-1,-1,-1,1,1,1,3,-2,-1,-3,1,-3,-1,-1,-1,-6,2,-7,-1,-1,3,4,-3,1,3,5,-1,-10,1,3,-5,3,6,1,2,12,7,3,3,-8,1,0,3,-2,-4,1,1]];
E[235,5] = [x, [1,-1,-1,-1,-1,1,1,3,-2,1,3,1,3,-1,1,-1,6,2,-1,1,-1,-3,4,-3,1,-3,5,-1,2,-1,-3,-5,-3,-6,-1,2,0,1,-3,-3,4,1,0,-3,2,-4,1,1]];

E[236,1] = [x, [1,0,-1,0,-1,0,-3,0,-2,0,-2,0,0,0,1,0,2,0,-5,0,3,0,-4,0,-4,0,5,0,5,0,-4,0,2,0,3,0,8,0,0,0,-1,0,0,0,2,0,8,0,2,0,-2,0,3,0,2,0,5,0,1,0]];
E[236,2] = [x, [1,0,1,0,3,0,-1,0,-2,0,6,0,-4,0,3,0,-6,0,5,0,-1,0,0,0,4,0,-5,0,9,0,-4,0,6,0,-3,0,-4,0,-4,0,-9,0,8,0,-6,0,-12,0,-6,0,-6,0,-9,0,18,0,5,0,-1,0]];
E[236,3] = [x^3-9*x+1, [3,0,3*x,0,-x^2+x+2,0,-x^2-2*x+14,0,3*x^2-9,0,2*x^2-2*x-10,0,-2*x^2+2*x+16,0,x^2-7*x+1,0,3,0,-x^2-5*x+14,0,-2*x^2+5*x+1,0,-4*x^2-2*x+20,0,2*x^2-5*x-13,0,9*x-3,0,x^2-4*x-26,0,2*x^2+4*x-4,0,-2*x^2+8*x-2,0,-3*x^2+6*x+9,0,4*x^2-4*x-26,0,2*x^2-2*x+2,0,6*x^2+3*x-36,0,6*x^2-24,0,-4*x^2+7*x-7,0,-4*x^2-8*x+32,0,-5*x^2-7*x+43,0,3*x,0,-2*x^2-x+4,0,-2*x^2+8*x-8,0,-5*x^2+5*x+1,0,-3,0]];

E[237,1] = [x^2-2*x-1, [1,x,-1,2*x-1,0,-x,1,x+2,1,0,-x+4,-2*x+1,-2*x+1,x,0,3,-x+2,x,-2,0,-1,2*x-1,-3*x+6,-x-2,-5,-3*x-2,-1,2*x-1,-x+4,0,-2*x,x-4,x-4,-1,0,2*x-1,6*x-6,-2*x,2*x-1,0,-2*x+2,-x,-2*x+9,5*x-6,0,-3,4*x-2,-3,-6,-5*x,x-2,-4*x-5,-2*x+6]];
E[237,2] = [x^7-2*x^6-11*x^5+22*x^4+30*x^3-65*x^2-2*x+23, [2,2*x,2,2*x^2-4,-2*x^6+24*x^4-2*x^3-74*x^2+18*x+32,2*x,3*x^6-x^5-34*x^4+8*x^3+98*x^2-25*x-37,2*x^3-8*x,2,-4*x^6+2*x^5+42*x^4-14*x^3-112*x^2+28*x+46,x^6+x^5-12*x^4-8*x^3+34*x^2+7*x-7,2*x^2-4,5*x^6-x^5-56*x^4+8*x^3+158*x^2-33*x-57,5*x^6-x^5-58*x^4+8*x^3+170*x^2-31*x-69,-2*x^6+24*x^4-2*x^3-74*x^2+18*x+32,2*x^4-12*x^2+8,-5*x^6+x^5+54*x^4-4*x^3-146*x^2+11*x+53,2*x,-6*x^6+68*x^4+2*x^3-194*x^2+14*x+76,-2*x^6-2*x^5+26*x^4+12*x^3-84*x^2+2*x+28,3*x^6-x^5-34*x^4+8*x^3+98*x^2-25*x-37,3*x^6-x^5-30*x^4+4*x^3+72*x^2-5*x-23,-3*x^6+x^5+34*x^4-10*x^3-96*x^2+33*x+33,2*x^3-8*x,2*x^5-2*x^4-16*x^3+12*x^2+22*x-4,9*x^6-x^5-102*x^4+8*x^3+292*x^2-47*x-115,2,3*x^6-x^5-34*x^4+4*x^3+98*x^2-9*x-41,5*x^6-x^5-58*x^4+8*x^3+174*x^2-35*x-81,-4*x^6+2*x^5+42*x^4-14*x^3-112*x^2+28*x+46,-6*x^6+70*x^4-208*x^2+24*x+88,2*x^5-16*x^3+24*x,x^6+x^5-12*x^4-8*x^3+34*x^2+7*x-7,-9*x^6-x^5+106*x^4+4*x^3-314*x^2+43*x+115,-4*x^6+48*x^4-144*x^2+16*x+52,2*x^2-4,-2*x^6+2*x^5+20*x^4-12*x^3-52*x^2+10*x+30,-12*x^6+2*x^5+134*x^4-14*x^3-376*x^2+64*x+138,5*x^6-x^5-56*x^4+8*x^3+158*x^2-33*x-57,2*x^6-28*x^4+4*x^3+96*x^2-32*x-46,6*x^6-2*x^5-68*x^4+20*x^3+196*x^2-66*x-82,5*x^6-x^5-58*x^4+8*x^3+170*x^2-31*x-69,x^6+x^5-14*x^4-8*x^3+50*x^2+13*x-23,3*x^6+x^5-38*x^4-2*x^3+122*x^2-31*x-55,-2*x^6+24*x^4-2*x^3-74*x^2+18*x+32,-5*x^6+x^5+56*x^4-6*x^3-162*x^2+27*x+69,6*x^6-2*x^5-64*x^4+12*x^3+172*x^2-30*x-70,2*x^4-12*x^2+8,13*x^6-3*x^5-146*x^4+24*x^3+418*x^2-83*x-169,2*x^6-2*x^5-16*x^4+12*x^3+22*x^2-4*x,-5*x^6+x^5+54*x^4-4*x^3-146*x^2+11*x+53,7*x^6-x^5-78*x^4+6*x^3+222*x^2-31*x-93,2*x^6-2*x^5-20*x^4+12*x^3+56*x^2-10*x-42]];
E[237,3] = [x^4+3*x^3-x^2-5*x+1, [1,x,-1,x^2-2,-x^3-3*x^2+2,-x,2*x^3+4*x^2-4*x-4,x^3-4*x,1,-x^2-3*x+1,-x^3-x^2+2*x-3,-x^2+2,-x^3+x^2+6*x-5,-2*x^3-2*x^2+6*x-2,x^3+3*x^2-2,-3*x^3-5*x^2+5*x+3,2*x^3+4*x^2-2*x-4,x,-x^3-5*x^2-2*x+6,x^3+3*x^2+x-4,-2*x^3-4*x^2+4*x+4,2*x^3+x^2-8*x+1,x^3+5*x^2+4*x-10,-x^3+4*x,x^3+3*x^2+2*x-2,4*x^3+5*x^2-10*x+1,-1,-4*x^2-4*x+10,-2*x^3-8*x^2-4*x+8,x^2+3*x-1,3*x^3+5*x^2-4*x-1,2*x^3+2*x^2-4*x+3,x^3+x^2-2*x+3,-2*x^3+6*x-2,4*x^2+6*x-10,x^2-2,-2*x^3-4*x^2+6*x+6,-2*x^3-3*x^2+x+1,x^3-x^2-6*x+5,4*x^2+7*x-3,-2*x^3+8*x-4,2*x^3+2*x^2-6*x+2,-2*x^3-6*x^2+2,-3*x^3-4*x^2+7*x+4,-x^3-3*x^2+2,2*x^3+5*x^2-5*x-1,-4*x^3-10*x^2+4*x+8,3*x^3+5*x^2-5*x-3,-8*x^2-12*x+17,3*x^2+3*x-1,-2*x^3-4*x^2+2*x+4,-5*x^3-8*x^2+9*x+6,2*x^3-2*x^2-14*x+4]];

E[238,1] = [x, [1,1,-2,1,-4,-2,1,1,1,-4,-6,-2,-2,1,8,1,-1,1,0,-4,-2,-6,-4,-2,11,-2,4,1,8,8,0,1,12,-1,-4,1,4,0,4,-4,-2,-2,-8,-6,-4,-4,-8,-2,1,11,2,-2,-6,4,24,1,0,8,-4,8,-8,0,1,1,8,12,-16,-1,8,-4,4,1]];
E[238,2] = [x, [1,1,2,1,0,2,-1,1,1,0,-2,2,-2,-1,0,1,-1,1,0,0,-2,-2,4,2,-5,-2,-4,-1,4,0,0,1,-4,-1,0,1,8,0,-4,0,-2,-2,0,-2,0,4,0,2,1,-5,-2,-2,2,-4,0,-1,0,4,4,0,-12,0,-1,1,0,-4,-8,-1,8,0,12,1]];
E[238,3] = [x, [1,1,0,1,2,0,1,1,-3,2,0,0,-2,1,0,1,1,-3,4,2,0,0,0,0,-1,-2,0,1,-6,0,0,1,0,1,2,-3,-6,4,0,2,-6,0,-12,0,-6,0,8,0,1,-1,0,-2,-2,0,0,1,0,-6,4,0,2,0,-3,1,-4,0,12,1,0,2,0,-3]];
E[238,4] = [x, [1,-1,2,1,4,-2,1,-1,1,-4,-4,2,-4,-1,8,1,-1,-1,-6,4,2,4,0,-2,11,4,-4,1,6,-8,4,-1,-8,1,4,1,-10,6,-8,-4,6,-2,0,-4,4,0,4,2,1,-11,-2,-4,14,4,-16,-1,-12,-6,-6,8,-12,-4,1,1,-16,8,4,-1,0,-4,-8,-1]];
E[238,5] = [x^2-2*x-4, [1,-1,x,1,-x+2,-x,-1,-1,2*x+1,x-2,x+2,x,-2*x+4,1,-4,1,1,-2*x-1,-2*x-2,-x+2,-x,-x-2,8,-x,-2*x+3,2*x-4,2*x+8,-1,-3*x+4,4,2*x-8,-1,4*x+4,-1,x-2,2*x+1,-x,2*x+2,-8,x-2,2*x-10,x,2*x-4,x+2,-x-6,-8,-2*x+4,x,1,2*x-3,x,-2*x+4,-2*x+2,-2*x-8,-2*x,1,-6*x-8,3*x-4,-6,-4,x-2,-2*x+8,-2*x-1,1,-4*x+16,-4*x-4,2*x-8,1,8*x,-x+2,-2*x+4,-2*x-1]];
E[238,6] = [x, [1,-1,0,1,-2,0,-1,-1,-3,2,-2,0,0,1,0,1,-1,3,-2,-2,0,2,-8,0,-1,0,0,-1,0,0,8,-1,0,1,2,-3,-4,2,0,2,-6,0,4,-2,6,8,8,0,1,1,0,0,-6,0,4,1,0,0,10,0,10,-8,3,1,0,0,8,-1,0,-2,4,3]];

E[239,1] = [x^3+x^2-2*x-1, [1,x,-x^2-x+1,x^2-2,x^2-3,-x-1,-1,-x^2-2*x+1,x-1,-x^2-x+1,x^2-2,x^2+x-2,x^2-4,-x,2*x^2+2*x-3,-3*x^2-x+3,-x^2+1,x^2-x,x^2+3*x-4,-2*x^2-x+5,x^2+x-1,-x^2+1,-x^2+x+3,2*x+3,-3*x^2-x+3,-x^2-2*x+1,4*x^2+3*x-5,-x^2+2,-6*x^2-x+11,x+2,-2*x^2-2*x,4*x^2+x-5,x^2+x-2,x^2-x-1,-x^2+3,-2*x^2+3,3*x,2*x^2-2*x+1,3*x^2+3*x-4,3*x^2+3*x-4]];
E[239,2] = [x^17-28*x^15+x^14+319*x^13-17*x^12-1903*x^11+91*x^10+6377*x^9-125*x^8-11967*x^7-233*x^6+11733*x^5+503*x^4-5015*x^3-94*x^2+609*x+49, [11107271,11107271*x,16771351*x^16-20065815*x^15-442373694*x^14+548454202*x^13+4613893796*x^12-5855599700*x^11-24126751696*x^10+30789210039*x^9+66289587616*x^8-82906055202*x^7-91822850183*x^6+108744026520*x^5+54627655140*x^4-59185678764*x^3-7102994828*x^2+7384450585*x+608340411,11107271*x^2-22214542,22511799*x^16-28856065*x^15-595209258*x^14+783888478*x^13+6223382488*x^12-8326382581*x^11-32632212856*x^10+43603144382*x^9+89969920460*x^8-117052738164*x^7-125297104388*x^6+153180936380*x^5+75340597103*x^4-83236570496*x^3-10250253852*x^2+10451957825*x+928678597,-20065815*x^16+27224134*x^15+531682851*x^14-736167173*x^13-5570486733*x^12+7789129257*x^11+29263017098*x^10-40661317711*x^9-80809636327*x^8+108879907234*x^7+112651751303*x^6-142150606143*x^5-67621668317*x^4+77005330437*x^3+8960957579*x^2-9605412348*x-821796199,25677032*x^16-33662356*x^15-678381095*x^14+913041769*x^13+7082868525*x^12-9683160111*x^11-37044681867*x^10+50622978623*x^9+101679821355*x^8-135617406635*x^7-140464578889*x^6+176959976663*x^5+83052116143*x^4-95724702685*x^3-10472865097*x^2+11880604573*x+996582489,11107271*x^3-44429084*x,-40326507*x^16+49086639*x^15+1062414857*x^14-1340855037*x^13-11062061824*x^12+14306805063*x^11+57702618949*x^10-75176687453*x^9-157967980023*x^8+202279847143*x^7+217699265401*x^6-265111857765*x^5-128705356679*x^4+144216800690*x^3+16680675317*x^2-17999251300*x-1513124109,-28856065*x^16+35121114*x^15+761376679*x^14-957881393*x^13-7943681998*x^12+10207740641*x^11+41554570673*x^10-53587821763*x^9-114238763289*x^8+144101594245*x^7+158426185547*x^6-188790340564*x^5-94560005393*x^4+102646418133*x^3+12568066931*x^2-12781006994*x-1103078151,11795867*x^16-13526758*x^15-310257157*x^14+372521827*x^13+3225743447*x^12-4005866463*x^11-16804920021*x^10+21217950985*x^9+45950313234*x^8-57627409134*x^7-63241803565*x^6+76509429271*x^5+37396414775*x^4-42451276279*x^3-5056555641*x^2+5464612926*x+531361649,-6318568*x^16+9971661*x^15+168646030*x^14-266400152*x^13-1779777190*x^12+2788970553*x^11+9418174846*x^10-14428354150*x^9-26207494873*x^8+38336253602*x^7+36819759328*x^6-49677513962*x^5-22156874898*x^4+26702252882*x^3+2714390698*x^2-3370616034*x-233455887,12932667*x^16-15955359*x^15-341270909*x^14+433764071*x^13+3560780261*x^12-4604482467*x^11-18627365653*x^10+24045707357*x^9+51216405527*x^8-64145365971*x^7-71086180147*x^6+82910826763*x^5+42558283977*x^4-44016310883*x^3-5687517959*x^2+5215960508*x+473705456,-33662356*x^16+40575801*x^15+887364737*x^14-1108104683*x^13-9246650567*x^12+11818710029*x^11+48286368711*x^10-62062611709*x^9-132407777635*x^8+166812463055*x^7+182942725119*x^6-218216500313*x^5-108640249781*x^4+118297450383*x^3+14294245581*x^2-14640729999*x-1258174568,-36280233*x^16+47293925*x^15+959572236*x^14-1281596277*x^13-10034246150*x^12+13578645544*x^11+52603913191*x^10-70908674270*x^9-144950764154*x^8+189684933246*x^7+201718786246*x^6-247013229219*x^5-121377536570*x^4+133344739412*x^3+16781354739*x^2-16683671513*x-1507459723,11107271*x^4-66643626*x^2+44429084,21279582*x^16-28251293*x^15-563055080*x^14+764328658*x^13+5888803376*x^12-8085603784*x^11-30866495077*x^10+42159265316*x^9+85012631900*x^8-112598812800*x^7-118266415576*x^6+146376439975*x^5+71289580280*x^4-78898734658*x^3-10026490116*x^2+9892317506*x+921516169,49086639*x^16-66727339*x^15-1300528530*x^14+1802093909*x^13+13621254444*x^12-19038723872*x^11-71506975316*x^10+99194155116*x^9+197239033768*x^8-264888043868*x^7-274507933896*x^6+344445549952*x^5+164501033711*x^4-185556757288*x^3-21789942958*x^2+23045718654*x+1975998843,17310495*x^16-23902242*x^15-458063816*x^14+645668596*x^13+4788816728*x^12-6824305772*x^11-25069140146*x^10+35583948778*x^9+68838041958*x^8-95167008616*x^7-95086769046*x^6+124129226300*x^5+56185475128*x^4-67333009400*x^3-7048228324*x^2+8503642143*x+685410642,-9902484*x^16+11118989*x^15+261393188*x^14-306374219*x^13-2729577440*x^12+3294244140*x^11+14302505864*x^10-17429925548*x^9-39445254800*x^8+47211132020*x^7+55080405067*x^6-62353667508*x^5-33520175378*x^4+34328041948*x^3+5007030600*x^2-4433650216*x-443410009,-60389393*x^16+78163162*x^15+1597328285*x^14-2121785233*x^13-16704515587*x^12+22522996135*x^11+87572121447*x^10-117879586811*x^9-241201700677*x^8+316253630139*x^7+334942204895*x^6-413450505207*x^5-199657525257*x^4+224025771901*x^3+25793598659*x^2-27640305732*x-2326431541,-13526758*x^16+20027119*x^15+360725960*x^14-537138126*x^13-3805336724*x^12+5642614880*x^11+20144527088*x^10-29271930625*x^9-56152925759*x^8+77919336824*x^7+79257866282*x^6-101004492736*x^5-48384597380*x^4+54099717364*x^3+6573424424*x^2-6652321354*x-577997483,31722361*x^16-40951078*x^15-838128865*x^14+1112154343*x^13+8752755413*x^12-11810292925*x^11-45803042055*x^10+61832000139*x^9+125852790581*x^8-165930762117*x^7-174209659179*x^6+216989136849*x^5+103470227181*x^4-117637416119*x^3-13353180733*x^2+14550510082*x+1235810933,50103291*x^16-62722142*x^15-1323447286*x^14+1708180348*x^13+13822528363*x^12-18184318572*x^11-72379398658*x^10+95408648685*x^9+199165705256*x^8-256554358396*x^7-276453242912*x^6+336280095732*x^5+165123829220*x^4-182983888696*x^3-21886476584*x^2+22825376721*x+1953202230,-25462033*x^16+30769291*x^15+670629302*x^14-839651038*x^13-6980479892*x^12+8946254792*x^11+36397594000*x^10-46910965164*x^9-99596426573*x^8+125828529167*x^7+137208083944*x^6-164162253174*x^5-81202433244*x^4+88842208296*x^3+10692881072*x^2-11137228887*x-941468332,-15955359*x^16+20843767*x^15+420831404*x^14-564740512*x^13-4384627128*x^12+5983499648*x^11+22868834660*x^10-31255211932*x^9-62528782596*x^8+83679045842*x^7+85924138174*x^6-109180697934*x^5-50521442384*x^4+59169807046*x^3+6431631206*x^2-7402288747*x-633700683,42256325*x^16-47500964*x^15-1113381605*x^14+1305111919*x^13+11603698718*x^12-13991580215*x^11-60661871593*x^10+73780957166*x^9+166745758963*x^8-198956641101*x^7-231309666626*x^6+260869534865*x^5+138106652683*x^4-141473618446*x^3-18317061865*x^2+17298885530*x+1504605039,-10778263*x^16+12143481*x^15+282319863*x^14-334442541*x^13-2919287073*x^12+3593225465*x^11+15090026421*x^10-18988890669*x^9-40754974155*x^8+51340124137*x^7+54869328517*x^6-67599780159*x^5-30874616835*x^4+36926935611*x^3+3140738731*x^2-4519008910*x-343709534,37599616*x^16-42038528*x^15-990103303*x^14+1156074400*x^13+10313257723*x^12-12402758789*x^11-53893343681*x^10+65440462073*x^9+148137695559*x^8-176565199519*x^7-205761663785*x^6+231733252097*x^5+123644621259*x^4-126013913667*x^3-17196071544*x^2+15589598961*x+1424182235,47293925*x^16-56274288*x^15-1245316044*x^14+1539148177*x^13+12961881583*x^12-16437370208*x^11-67607173067*x^10+86408281687*x^9+185149904121*x^8-232446762065*x^7-255466523508*x^6+304298437219*x^5+151593696611*x^4-165164013756*x^3-20094013415*x^2+20587202174*x+1777731417,-24153904*x^16+30247035*x^15+638787891*x^14-822194252*x^13-6682216498*x^12+8733648358*x^11+35066854706*x^10-45696579782*x^9-96810598402*x^8+122383812294*x^7+135081794294*x^6-159364496414*x^5-81358052074*x^4+85759333630*x^3+10925236722*x^2-10535502669*x-902341741,11107271*x^5-88858168*x^3+133287252*x,-67423899*x^16+82112240*x^15+1780509570*x^14-2238101394*x^13-18596294425*x^12+23828089507*x^11+97422150367*x^10-124903440907*x^9-268441409677*x^8+335017240785*x^7+373830398447*x^6-436921975895*x^5-225166281001*x^4+235699120185*x^3+31079452962*x^2-29079193803*x-2668415141,-28251293*x^16+32773216*x^15+743049076*x^14-899383282*x^13-7723850890*x^12+9628549469*x^11+40222823354*x^10-50687262514*x^9-109938865050*x^8+136386342218*x^7+151334582581*x^6-178383755326*x^5-89602364404*x^4+96690613614*x^3+11892598214*x^2-12037749269*x-1042699518,-53415365*x^16+65356907*x^15+1410417008*x^14-1783241386*x^13-14727403738*x^12+19012774104*x^11+77112264086*x^10-99874634706*x^9-212202110316*x^8+268767500488*x^7+294505713500*x^6-352301417140*x^5-175561828396*x^4+191294580606*x^3+22872039584*x^2-23488614189*x-2065473389,13925675*x^16-24275916*x^15-371822444*x^14+644326677*x^13+3919872639*x^12-6708711425*x^11-20677966931*x^10+34566911771*x^9+57183746053*x^8-91647819269*x^7-79515793963*x^6+118791213854*x^5+47163376653*x^4-64054049753*x^3-5701487914*x^2+8080738292*x+621002907,58834648*x^16-73283497*x^15-1553089223*x^14+1994193703*x^13+16206951361*x^12-21201818723*x^11-84762261663*x^10+111012810671*x^9+232835046661*x^8-297518575153*x^7-322391208789*x^6+387851937953*x^5+191863930809*x^4-209242126735*x^3-25038696915*x^2+25744954717*x+2150365616,-23902242*x^16+26630044*x^15+628358101*x^14-733231177*x^13-6530027357*x^12+7872731839*x^11+34008693733*x^10-41550984657*x^9-93003196741*x^8+112067924619*x^7+128162571635*x^6-146918562707*x^5-76040188385*x^4+79763904101*x^3+10130828673*x^2-9856680813*x-848214255,1145927*x^16+1884148*x^15-28554652*x^14-45060898*x^13+282847750*x^12+432703932*x^11-1422532532*x^10-2155043758*x^9+3858122814*x^8+5950472996*x^7-5593197144*x^6-8797997276*x^5+4080131810*x^4+5805087982*x^3-1124705376*x^2-844865347*x-112531426,68831119*x^16-86118592*x^15-1819225093*x^14+2345077742*x^13+19013265908*x^12-24957402470*x^11-99637940850*x^10+130878529194*x^9+274450848098*x^8-351625809451*x^7-381513317374*x^6+460246350522*x^5+228429002186*x^4-249946762926*x^3-30500617574*x^2+31149216735*x+2691378018]];

E[240,1] = [x, [1,0,1,0,1,0,0,0,1,0,4,0,-2,0,1,0,2,0,-4,0,0,0,0,0,1,0,1,0,-2,0,0,0,4,0,0,0,-10,0,-2,0,10,0,-4,0,1,0,-8,0,-7,0,2,0,-10,0,4,0,-4,0,4,0,-2,0,0,0,-2,0,-12,0,0,0,8,0,10,0,1,0,0,0,0,0,1,0,-12,0,2,0,-2,0,-6,0,0,0,0,0,-4,0,2,0,4,0,6,0,16,0,0,0,12,0,14,0,-10,0,2,0,0,0,-2]];
E[240,2] = [x, [1,0,-1,0,1,0,0,0,1,0,4,0,6,0,-1,0,-6,0,4,0,0,0,0,0,1,0,-1,0,-2,0,8,0,-4,0,0,0,-2,0,-6,0,-6,0,-12,0,1,0,-8,0,-7,0,6,0,6,0,4,0,-4,0,-12,0,14,0,0,0,6,0,-4,0,0,0,-8,0,-6,0,-1,0,0,0,8,0,1,0,12,0,-6,0,2,0,10,0,0,0,-8,0,4,0,2,0,4,0,6,0,0,0,0,0,4,0,-18,0,2,0,-6,0,0,0,6]];
E[240,3] = [x, [1,0,-1,0,-1,0,-4,0,1,0,0,0,-6,0,1,0,-2,0,-4,0,4,0,8,0,1,0,-1,0,-6,0,0,0,0,0,4,0,-6,0,6,0,10,0,4,0,-1,0,-8,0,9,0,2,0,10,0,0,0,4,0,0,0,6,0,-4,0,6,0,4,0,-8,0,0,0,-14,0,-1,0,0,0,-16,0,1,0,-12,0,2,0,6,0,2,0,24,0,0,0,4,0,2,0,0,0,-14,0,-4,0,-4,0,-4,0,-10,0,6,0,6,0,-8,0,-6]];
E[240,4] = [x, [1,0,-1,0,-1,0,4,0,1,0,0,0,2,0,1,0,6,0,4,0,-4,0,0,0,1,0,-1,0,-6,0,-8,0,0,0,-4,0,2,0,-2,0,-6,0,4,0,-1,0,0,0,9,0,-6,0,-6,0,0,0,-4,0,0,0,-10,0,4,0,-2,0,4,0,0,0,0,0,2,0,-1,0,0,0,-8,0,1,0,-12,0,-6,0,6,0,18,0,8,0,8,0,-4,0,2,0,0,0,18,0,4,0,4,0,12,0,-10,0,-2,0,-18,0,0,0,2]];

E[241,1] = [x^7+4*x^6-14*x^4-10*x^3+6*x^2+3*x-1, [1,x,-x^6-3*x^5+3*x^4+11*x^3-x^2-6*x+1,x^2-2,x^6+2*x^5-6*x^4-9*x^3+10*x^2+8*x-4,x^6+3*x^5-3*x^4-11*x^3+4*x-1,2*x^6+9*x^5+3*x^4-29*x^3-28*x^2+4*x+3,x^3-4*x,-x^5-2*x^4+5*x^3+7*x^2-5*x-2,-2*x^6-6*x^5+5*x^4+20*x^3+2*x^2-7*x+1,-2*x^6-8*x^5-2*x^4+23*x^3+26*x^2+3*x-8,x^6+3*x^5-3*x^4-12*x^3+8*x-1,2*x^6+7*x^5-x^4-21*x^3-15*x^2+2*x+1,x^6+3*x^5-x^4-8*x^3-8*x^2-3*x+2,x^6+5*x^5+2*x^4-18*x^3-14*x^2+11*x-1,x^4-6*x^2+4,-5*x^6-21*x^5-4*x^4+68*x^3+60*x^2-12*x-10,-x^6-2*x^5+5*x^4+7*x^3-5*x^2-2*x,-2*x^6-4*x^5+11*x^4+17*x^3-16*x^2-14*x+4,x^5+4*x^4-15*x^2-9*x+6,x^6+2*x^5-7*x^4-11*x^3+15*x^2+16*x-6,-2*x^5-5*x^4+6*x^3+15*x^2-2*x-2,x^6+4*x^5+x^4-13*x^3-15*x^2+3*x+2,-3*x^6-9*x^5+8*x^4+32*x^3+2*x^2-12*x+3,-2*x^6-7*x^5+4*x^4+28*x^3+6*x^2-20*x+1,-x^6-x^5+7*x^4+5*x^3-10*x^2-5*x+2,-x^4-2*x^3+3*x^2+6*x+1,-5*x^6-19*x^5+60*x^3+47*x^2-9*x-5,5*x^6+20*x^5+3*x^4-63*x^3-60*x^2+8*x+12,x^6+2*x^5-4*x^4-4*x^3+5*x^2-4*x+1,3*x^6+13*x^5+5*x^4-39*x^3-46*x^2-x+8,x^5-8*x^3+12*x,6*x^6+20*x^5-11*x^4-69*x^3-18*x^2+26*x-2,-x^6-4*x^5-2*x^4+10*x^3+18*x^2+5*x-5,-2*x^6-7*x^5+6*x^4+31*x^3-2*x^2-26*x+5,2*x^6+7*x^5-3*x^4-25*x^3-10*x^2+13*x+3,x^5+x^4-6*x^3-5*x^2+6*x+6,4*x^6+11*x^5-11*x^4-36*x^3-2*x^2+10*x-2,-x^5-4*x^4-x^3+11*x^2+8*x-3,5*x^6+16*x^5-10*x^4-55*x^3-13*x^2+20*x-2]];
E[241,2] = [x^12-3*x^11-14*x^10+44*x^9+65*x^8-219*x^7-123*x^6+444*x^5+105*x^4-328*x^3-45*x^2+18*x-1, [16,16*x,22*x^11-60*x^10-316*x^9+864*x^8+1546*x^7-4172*x^6-3262*x^5+8050*x^4+3308*x^3-5500*x^2-1482*x+186,16*x^2-32,22*x^11-68*x^10-300*x^9+984*x^8+1338*x^7-4796*x^6-2446*x^5+9434*x^4+2356*x^3-6708*x^2-1474*x+234,6*x^11-8*x^10-104*x^9+116*x^8+646*x^7-556*x^6-1718*x^5+998*x^4+1716*x^3-492*x^2-210*x+22,-15*x^11+28*x^10+244*x^9-410*x^8-1415*x^7+2022*x^6+3567*x^5-3951*x^4-3618*x^3+2566*x^2+813*x-71,16*x^3-64*x,-24*x^11+80*x^10+320*x^9-1168*x^8-1368*x^7+5776*x^6+2344*x^5-11624*x^4-2384*x^3+8512*x^2+2008*x-216,-2*x^11+8*x^10+16*x^9-92*x^8+22*x^7+260*x^6-334*x^5+46*x^4+508*x^3-484*x^2-162*x+22,-20*x^11+62*x^10+270*x^9-890*x^8-1178*x^7+4280*x^6+2040*x^5-8238*x^4-1772*x^3+5688*x^2+1040*x-170,-34*x^11+100*x^10+484*x^9-1472*x^8-2334*x^7+7364*x^6+4858*x^5-15014*x^4-5140*x^3+11060*x^2+2878*x-366,14*x^11-40*x^10-200*x^9+580*x^8+974*x^7-2828*x^6-2078*x^5+5518*x^4+2276*x^3-3788*x^2-1226*x+94,-17*x^11+34*x^10+250*x^9-440*x^8-1263*x^7+1722*x^6+2709*x^5-2043*x^4-2354*x^3+138*x^2+199*x-15,14*x^11-32*x^10-224*x^9+492*x^8+1270*x^7-2620*x^6-3118*x^5+5766*x^4+3140*x^3-4508*x^2-922*x+230,16*x^4-96*x^2+64,-26*x^11+56*x^10+424*x^9-860*x^8-2474*x^7+4564*x^6+6346*x^5-9962*x^4-6860*x^3+7636*x^2+2254*x-266,8*x^11-16*x^10-112*x^9+192*x^8+520*x^7-608*x^6-968*x^5+136*x^4+640*x^3+928*x^2+216*x-24,5*x^11-14*x^10-54*x^9+164*x^8+111*x^7-498*x^6+287*x^5+99*x^4-846*x^3+622*x^2+501*x+15,-42*x^11+124*x^10+596*x^9-1816*x^8-2854*x^7+9012*x^6+5826*x^5-18150*x^4-5852*x^3+13164*x^2+3006*x-470,32*x^11-92*x^10-476*x^9+1396*x^8+2460*x^7-7312*x^6-5608*x^5+15876*x^4+6232*x^3-12480*x^2-3400*x+380,2*x^11-10*x^10-10*x^9+122*x^8-100*x^7-420*x^6+642*x^5+328*x^4-872*x^3+140*x^2+190*x-20,9*x^11-30*x^10-118*x^9+428*x^8+483*x^7-2026*x^6-709*x^5+3751*x^4+410*x^3-2378*x^2-167*x+99,-14*x^11+24*x^10+232*x^9-356*x^8-1374*x^7+1788*x^6+3518*x^5-3566*x^4-3524*x^3+2332*x^2+666*x-78,56*x^11-160*x^10-824*x^9+2400*x^8+4176*x^7-12352*x^6-9176*x^5+26168*x^4+9496*x^3-20024*x^2-4528*x+720,2*x^11-4*x^10-36*x^9+64*x^8+238*x^7-356*x^6-698*x^5+806*x^4+804*x^3-596*x^2-158*x+14,36*x^11-104*x^10-520*x^9+1536*x^8+2572*x^7-7720*x^6-5556*x^5+15804*x^4+5960*x^3-11544*x^2-3116*x+252,13*x^11-44*x^10-180*x^9+662*x^8+829*x^7-3426*x^6-1629*x^5+7333*x^4+1798*x^3-5698*x^2-1335*x+125,-44*x^11+136*x^10+608*x^9-1984*x^8-2780*x^7+9784*x^6+5292*x^5-19524*x^4-5136*x^3+14016*x^2+2908*x-460,10*x^11-28*x^10-124*x^9+360*x^8+446*x^7-1396*x^6-450*x^5+1670*x^4+84*x^3-292*x^2-22*x+14,8*x^11+2*x^10-142*x^9-78*x^8+894*x^7+784*x^6-2300*x^5-2878*x^4+1700*x^3+3504*x^2+932*x-146,16*x^5-128*x^3+192*x,16*x^9-48*x^8-192*x^7+608*x^6+640*x^5-2288*x^4-480*x^3+2496*x^2-80*x-96,-22*x^11+60*x^10+284*x^9-784*x^8-1130*x^7+3148*x^6+1582*x^5-4130*x^4-892*x^3+1084*x^2+202*x-26,11*x^11-38*x^10-174*x^9+632*x^8+981*x^7-3726*x^6-2487*x^5+9241*x^4+3062*x^3-8142*x^2-1949*x+261,56*x^11-160*x^10-800*x^9+2336*x^8+3880*x^7-11536*x^6-8104*x^5+23048*x^4+8320*x^3-16448*x^2-4184*x+440,-16*x^11+52*x^10+228*x^9-796*x^8-1092*x^7+4224*x^6+2200*x^5-9340*x^4-2216*x^3+7536*x^2+1448*x-324,x^11+16*x^10-56*x^9-214*x^8+597*x^7+902*x^6-2121*x^5-1371*x^4+2262*x^3+726*x^2-75*x+5,-68*x^11+216*x^10+952*x^9-3216*x^8-4460*x^7+16392*x^6+8900*x^5-34396*x^4-9400*x^3+26232*x^2+6140*x-732,2*x^11-8*x^10+60*x^8-230*x^7+140*x^6+1166*x^5-1534*x^4-1628*x^3+2084*x^2+610*x-86]];

E[242,1] = [x, [1,1,-2,1,-3,-2,-2,1,1,-3,0,-2,-5,-2,6,1,-3,1,-2,-3,4,0,6,-2,4,-5,4,-2,3,6,2,1,0,-3,6,1,-7,-2,10,-3,-3,4,-8,0,-3,6,6,-2,-3,4,6,-5,-3,4,0,-2,4,3,0,6,10,2,-2,1,15,0]];
E[242,2] = [x^2-3*x+1, [1,1,x,1,-2*x+4,x,-2,1,3*x-4,-2*x+4,0,x,-2*x+2,-2,-2*x+2,1,x-1,3*x-4,3*x-7,-2*x+4,-2*x,0,-2*x+2,x,-4*x+7,-2*x+2,2*x-3,-2,-4*x+6,-2*x+2,2,1,0,x-1,4*x-8,3*x-4,6*x-6,3*x-7,-4*x+2,-2*x+4,-x+6,-2*x,9*x-12,0,2*x-10,-2*x+2,4*x-8,x,-3,-4*x+7,2*x-1,-2*x+2,-4*x,2*x-3,0,-2,2*x-3,-4*x+6,x-9,-2*x+2,4*x-4,2,-6*x+8,1,4,0]];
E[242,3] = [x^2+2*x-2, [1,1,x,1,-x-1,x,x+4,1,-2*x-1,-x-1,0,x,3,x+4,x-2,1,-3*x-3,-2*x-1,-x+2,-x-1,2*x+2,0,x-2,x,-2,3,-4,x+4,-3,x-2,3*x-2,1,0,-3*x-3,-3*x-6,-2*x-1,-3*x-5,-x+2,3*x,-x-1,3*x-3,2*x+2,0,0,-x+5,x-2,-3*x-6,x,6*x+11,-2,3*x-6,3,3*x+9,-4,0,x+4,4*x-2,-3,2*x+8,x-2,-2*x+4,3*x-2,-5*x-8,1,-3*x-3,0]];
E[242,4] = [x, [1,-1,-2,1,-3,2,2,-1,1,3,0,-2,5,-2,6,1,3,-1,2,-3,-4,0,6,2,4,-5,4,2,-3,-6,2,-1,0,-3,-6,1,-7,-2,-10,3,3,4,8,0,-3,-6,6,-2,-3,-4,-6,5,-3,-4,0,-2,-4,3,0,6,-10,-2,2,1,-15,0]];
E[242,5] = [x^2+2*x-2, [1,-1,x,1,-x-1,-x,-x-4,-1,-2*x-1,x+1,0,x,-3,x+4,x-2,1,3*x+3,2*x+1,x-2,-x-1,-2*x-2,0,x-2,-x,-2,3,-4,-x-4,3,-x+2,3*x-2,-1,0,-3*x-3,3*x+6,-2*x-1,-3*x-5,-x+2,-3*x,x+1,-3*x+3,2*x+2,0,0,-x+5,-x+2,-3*x-6,x,6*x+11,2,-3*x+6,-3,3*x+9,4,0,x+4,-4*x+2,-3,2*x+8,x-2,2*x-4,-3*x+2,5*x+8,1,3*x+3,0]];
E[242,6] = [x^2-3*x+1, [1,-1,x,1,-2*x+4,-x,2,-1,3*x-4,2*x-4,0,x,2*x-2,-2,-2*x+2,1,-x+1,-3*x+4,-3*x+7,-2*x+4,2*x,0,-2*x+2,-x,-4*x+7,-2*x+2,2*x-3,2,4*x-6,2*x-2,2,-1,0,x-1,-4*x+8,3*x-4,6*x-6,3*x-7,4*x-2,2*x-4,x-6,-2*x,-9*x+12,0,2*x-10,2*x-2,4*x-8,x,-3,4*x-7,-2*x+1,2*x-2,-4*x,-2*x+3,0,-2,-2*x+3,-4*x+6,x-9,-2*x+2,-4*x+4,-2,6*x-8,1,-4,0]];

E[243,1] = [x^2-3, [1,x,0,1,2*x,0,-1,-x,0,6,-2*x,0,5,-x,0,-5,0,0,-1,2*x,0,-6,-4*x,0,7,5*x,0,-1,-2*x,0,5,-3*x,0,0,-2*x,0,-1,-x,0,-6,2*x,0,-1,-2*x,0,-12,-2*x,0,-6,7*x,0,5,-6*x,0]];
E[243,2] = [x^2-6, [1,x,0,4,-x,0,2,2*x,0,-6,x,0,-1,2*x,0,4,-3*x,0,-1,-4*x,0,6,-x,0,1,-x,0,8,-2*x,0,-1,0,0,-18,-2*x,0,8,-x,0,-12,2*x,0,11,4*x,0,-6,4*x,0,-3,x,0,-4,3*x,0]];
E[243,3] = [x^3-3*x^2+3, [1,x,0,x^2-2,-x+3,0,-2*x^2+3*x+2,3*x^2-4*x-3,0,-x^2+3*x,-3*x^2+4*x+6,0,x^2-3*x-1,-3*x^2+2*x+6,0,3*x^2-3*x-5,3,0,3*x^2-6*x-4,2*x-3,0,-5*x^2+6*x+9,3*x^2-4*x-3,0,x^2-6*x+4,-x-3,0,-3*x^2+5,3*x^2-5*x,0,-2*x^2+3*x-1,3*x-3,0,3*x,-3*x^2+7*x,0,3*x-4,3*x^2-4*x-9,0,4*x^2-9*x,3*x^2-x-9,0,x^2-7,-3*x^2+x+3,0,5*x^2-3*x-9,-5*x+3,0,x^2-3,-3*x^2+4*x-3,0,-3*x^2+3*x+2,-3*x^2+6*x+9,0]];
E[243,4] = [x^3+3*x^2-3, [1,x,0,x^2-2,-x-3,0,-2*x^2-3*x+2,-3*x^2-4*x+3,0,-x^2-3*x,3*x^2+4*x-6,0,x^2+3*x-1,3*x^2+2*x-6,0,3*x^2+3*x-5,-3,0,3*x^2+6*x-4,2*x+3,0,-5*x^2-6*x+9,-3*x^2-4*x+3,0,x^2+6*x+4,-x+3,0,-3*x^2+5,-3*x^2-5*x,0,-2*x^2-3*x-1,3*x+3,0,-3*x,3*x^2+7*x,0,-3*x-4,-3*x^2-4*x+9,0,4*x^2+9*x,-3*x^2-x+9,0,x^2-7,3*x^2+x-3,0,5*x^2+3*x-9,-5*x-3,0,x^2-3,3*x^2+4*x+3,0,-3*x^2-3*x+2,3*x^2+6*x-9,0]];
E[243,5] = [x, [1,0,0,-2,0,0,-4,0,0,0,0,0,-7,0,0,4,0,0,-1,0,0,0,0,0,-5,0,0,8,0,0,11,0,0,0,0,0,-10,0,0,0,0,0,5,0,0,0,0,0,9,0,0,14,0,0]];
E[243,6] = [x, [1,0,0,-2,0,0,5,0,0,0,0,0,2,0,0,4,0,0,8,0,0,0,0,0,-5,0,0,-10,0,0,-7,0,0,0,0,0,-1,0,0,0,0,0,-13,0,0,0,0,0,18,0,0,-4,0,0]];

E[244,1] = [x^4-12*x^2+4*x+16, [4,0,4*x,0,x^3-8*x+8,0,-x^3-2*x^2+8*x+8,0,4*x^2-12,0,-x^3-2*x^2+4*x+8,0,x^3-12*x+8,0,4*x^2+4*x-16,0,-2*x^3-4*x^2+12*x+24,0,2*x^3-20*x,0,-2*x^3-4*x^2+12*x+16,0,-x^3+2*x^2+12*x-8,0,3*x^3-28*x+12,0,4*x^3-24*x,0,4*x^2+4*x-8,0,4*x^2-4*x-24,0,-2*x^3-8*x^2+12*x+16,0,-x^3-2*x^2+4*x,0,-2*x^3+28*x-8,0,4*x-16,0,x^3+4*x^2-12*x-8,0,8*x^2+4*x-56,0,x^3+4*x^2+8*x-24,0,-4*x^2+16,0,-x^3+16*x-12,0,-4*x^3-12*x^2+32*x+32,0,4*x^2-24,0,-x^3-6*x^2+16,0,4*x^2-8*x-32,0,3*x^3+2*x^2-24*x-8,0,-4,0]];
E[244,2] = [x, [1,0,0,0,-3,0,-3,0,-3,0,-1,0,1,0,0,0,-2,0,2,0,0,0,3,0,4,0,0,0,-8,0,0,0,0,0,9,0,-2,0,0,0,-3,0,8,0,9,0,-4,0,2,0,0,0,-10,0,3,0,0,0,9,0,1,0]];

E[245,1] = [x^2+x-4, [1,x,x+1,-x+2,-1,4,0,x-4,x+2,-x,x+1,2*x-2,-x-3,0,-x-1,-3*x,x+3,x+4,-2*x+2,x-2,0,4,-2*x-2,-4*x,1,-2*x-4,-x+3,0,-3*x-1,-4,0,x-4,x+5,2*x+4,0,x,6,4*x-8,-3*x-7,-x+4,2*x,0,2*x+6,2*x-2,-x-2,-8,-3*x+1,-12,0,x,3*x+7,-2,2*x,4*x-4,-x-1,0]];
E[245,2] = [x, [1,0,-1,-2,1,0,0,0,-2,0,-3,2,-5,0,-1,4,-3,0,-2,-2,0,0,-6,0,1,0,5,0,3,0,4,0,3,0,0,4,2,0,5,0,12,0,-10,6,-2,0,-9,-4,0,0,3,10,12,0,-3,0]];
E[245,3] = [x, [1,-2,-3,2,1,6,0,0,6,-2,1,-6,-3,0,-3,-4,3,-12,-6,2,0,-2,-4,0,1,6,-9,0,-1,6,-6,8,-3,-6,0,12,0,12,9,0,-6,0,-6,2,6,8,9,12,0,-2,-9,-6,-10,18,1,0]];
E[245,4] = [x, [1,-2,3,2,-1,-6,0,0,6,2,1,6,3,0,-3,-4,-3,-12,6,-2,0,-2,-4,0,1,-6,9,0,-1,6,6,8,3,6,0,12,0,-12,9,0,6,0,-6,2,-6,8,-9,-12,0,-2,-9,6,-10,-18,-1,0]];
E[245,5] = [x^2+2*x-1, [1,x+2,x,2*x+3,-1,1,0,x+4,-2*x-2,-x-2,-2*x,-x+2,2*x+4,0,-x,3,-2*x-4,-2*x-6,-2*x-2,-2*x-3,0,-2,x,2*x+1,1,4*x+10,-x-2,0,-1,-1,6,x-2,4*x-2,-4*x-10,0,-2*x-10,0,-2*x-6,2,-x-4,2*x+7,0,-x+4,2*x-4,2*x+2,1,-2,3*x,0,x+2,-2,6*x+16,2*x-2,-2*x-5,2*x,0]];
E[245,6] = [x^2-2*x-1, [1,-x+2,x,-2*x+3,1,-1,0,-x+4,2*x-2,-x+2,2*x,-x-2,2*x-4,0,x,3,-2*x+4,2*x-6,-2*x+2,-2*x+3,0,-2,-x,2*x-1,1,4*x-10,-x+2,0,-1,-1,-6,-x-2,4*x+2,-4*x+10,0,2*x-10,0,-2*x+6,2,-x+4,2*x-7,0,x+4,-2*x-4,2*x-2,1,2,3*x,0,-x+2,-2,6*x-16,-2*x-2,-2*x+5,2*x,0]];
E[245,7] = [x^2+2*x-1, [1,-x-1,x,0,-1,x-1,0,2*x+2,-2*x-2,x+1,2*x-1,0,-x-4,0,-x,-4,-3*x-2,4,-6,0,0,3*x-1,x+7,-2*x+2,1,3*x+5,-x-2,0,-4*x-7,-x+1,-3*x-9,0,-5*x+2,-x+5,0,0,3*x+1,6*x+6,-2*x-1,-2*x-2,3*x+5,0,2,0,2*x+2,-6*x-8,3*x+6,-4*x,0,-x-1,4*x-3,0,3*x+3,x+3,-2*x+1,0]];
E[245,8] = [x^2-2*x-1, [1,x-1,x,0,1,x+1,0,-2*x+2,2*x-2,x-1,-2*x-1,0,-x+4,0,x,-4,-3*x+2,4,6,0,0,-3*x-1,-x+7,-2*x-2,1,3*x-5,-x+2,0,4*x-7,x+1,-3*x+9,0,-5*x-2,-x-5,0,0,-3*x+1,6*x-6,2*x-1,-2*x+2,3*x-5,0,2,0,2*x-2,6*x-8,3*x-6,-4*x,0,x-1,-4*x-3,0,-3*x+3,x-3,-2*x-1,0]];

E[246,1] = [x, [1,1,-1,1,1,-1,2,1,1,1,2,-1,-7,2,-1,1,7,1,7,1,-2,2,-2,-1,-4,-7,-1,2,-8,-1,-5,1,-2,7,2,1,-10,7,7,1,-1,-2,-8,2,1,-2,4,-1,-3,-4,-7,-7,-2,-1,2,2,-7,-8,9,-1,6,-5,2,1,-7,-2,1,7,2,2,15,1,1,-10,4,7,4,7,-8,1,1,-1,-11,-2]];
E[246,2] = [x, [1,1,1,1,-2,1,4,1,1,-2,-4,1,2,4,-2,1,2,1,-4,-2,4,-4,0,1,-1,2,1,4,-6,-2,-8,1,-4,2,-8,1,-2,-4,2,-2,1,4,4,-4,-2,0,12,1,9,-1,2,2,-6,1,8,4,-4,-6,-4,-2,-10,-8,4,1,-4,-4,12,2,0,-8,-12,1,-6,-2,-1,-4,-16,2,12,-2,1,1,12,4]];
E[246,3] = [x, [1,1,1,1,1,1,-2,1,1,1,2,1,-1,-2,1,1,-7,1,5,1,-2,2,-6,1,-4,-1,1,-2,0,1,7,1,2,-7,-2,1,-2,5,-1,1,1,-2,4,2,1,-6,-12,1,-3,-4,-7,-1,-6,1,2,-2,5,0,5,1,2,7,-2,1,-1,2,3,-7,-6,-2,-3,1,9,-2,-4,5,-4,-1,0,1,1,1,9,-2]];
E[246,4] = [x, [1,-1,1,1,3,-1,2,-1,1,-3,-6,1,-1,-2,3,1,3,-1,5,3,2,6,-6,-1,4,1,1,2,0,-3,-1,-1,-6,-3,6,1,2,-5,-1,-3,-1,-2,8,-6,3,6,-12,1,-3,-4,3,-1,6,-1,-18,-2,5,0,-9,3,-10,1,2,1,-3,6,-13,3,-6,-6,15,-1,-7,-2,4,5,-12,1,-4,3,1,1,3,2]];
E[246,5] = [x, [1,-1,1,1,-2,-1,2,-1,1,2,4,1,4,-2,-2,1,-2,-1,0,-2,2,-4,4,-1,-1,-4,1,2,0,2,4,-1,4,2,-4,1,2,0,4,2,-1,-2,-12,4,-2,-4,-2,1,-3,1,-2,4,-4,-1,-8,-2,0,0,-4,-2,10,-4,2,1,-8,-4,-8,-2,4,4,-10,-1,-2,-2,-1,0,8,-4,-14,-2,1,1,-12,2]];
E[246,6] = [x, [1,-1,-1,1,-2,1,2,-1,1,2,-4,-1,-4,-2,2,1,-2,-1,-8,-2,-2,4,4,1,-1,4,-1,2,-8,-2,4,-1,4,2,-4,1,2,8,4,2,-1,2,4,-4,-2,-4,-2,-1,-3,1,2,-4,4,1,8,-2,8,8,12,2,-6,-4,2,1,8,-4,16,-2,-4,4,6,-1,-2,-2,1,-8,-8,-4,-14,-2,1,1,4,-2]];
E[246,7] = [x, [1,-1,-1,1,3,1,-2,-1,1,-3,2,-1,1,2,-3,1,5,-1,-1,3,2,-2,6,1,4,-1,-1,-2,8,3,3,-1,-2,-5,-6,1,-6,1,-1,-3,1,-2,-4,2,3,-6,-12,-1,-3,-4,-5,1,-14,1,6,2,1,-8,3,-3,10,-3,-2,1,3,2,-7,5,-6,6,-3,-1,1,6,-4,-1,-4,1,12,3,1,-1,7,2]];

E[247,1] = [x^2-x-1, [1,x,2*x-2,x-1,2*x,2,-2,-2*x+1,-4*x+5,2*x+2,2*x-4,-2*x+4,1,-2*x,4,-3*x,-4*x+5,x-4,-1,2,-4*x+4,-2*x+2,-2*x+5,2*x-6,4*x-1,x,4*x-12,-2*x+2,4*x-2,4*x,2*x+1,x-5,-8*x+12,x-4,-4*x,5*x-9,4*x+1,-x,2*x-2,-2*x-4,-3,-4,-2*x+5,-4*x+6,2*x-8,3*x-2]];
E[247,2] = [x^3+3*x^2-3, [1,x,-x^2-x+1,x^2-2,-x^2-2*x,2*x^2+x-3,2*x^2+3*x-4,-3*x^2-4*x+3,2*x^2+x-5,x^2-3,x^2-3,-3*x^2-x+4,1,-3*x^2-4*x+6,x^2+x,3*x^2+3*x-5,x^2+4*x-3,-5*x^2-5*x+6,1,-x^2+x+3,x-1,-3*x^2-3*x+3,-x^2-4*x-3,4*x^2+2*x-3,x^2+3*x-2,x,3*x+1,x^2-1,2*x^2+5*x-6,-2*x^2+3,-4*x^2-3*x+8,3*x+3,-2*x^2+3,x^2-3*x+3,x^2+2*x-3,6*x^2+4*x-5,5*x^2+6*x-7,x,-x^2-x+1,2*x^2+3*x+3,-3*x^2-5*x+3,x^2-x,-3*x^2-6*x+8,4*x^2+3*x-3,4*x+3,-x^2-3*x-3]];
E[247,3] = [x^5-4*x^4+12*x^2-5*x-5, [1,x,-x^2+x+3,x^2-2,x^3-2*x^2-2*x+3,-x^3+x^2+3*x,-x^4+2*x^3+3*x^2-4*x-1,x^3-4*x,x^4-2*x^3-5*x^2+6*x+6,x^4-2*x^3-2*x^2+3*x,x^4-4*x^3+9*x-2,-x^4+x^3+5*x^2-2*x-6,-1,-2*x^4+3*x^3+8*x^2-6*x-5,-x^4+3*x^3+x^2-8*x+4,x^4-6*x^2+4,x^3-6*x+2,2*x^4-5*x^3-6*x^2+11*x+5,1,2*x^4-4*x^3-5*x^2+9*x-1,x^3-x^2-3*x+2,-3*x^2+3*x+5,-2*x^4+3*x^3+10*x^2-8*x-10,-3*x^4+7*x^3+8*x^2-17*x-5,2*x^3-3*x^2-7*x+4,-x,2*x^4-5*x^3-5*x^2+11*x+4,-3*x^4+4*x^3+12*x^2-7*x-8,-3*x^4+6*x^3+11*x^2-14*x-9,-x^4+x^3+4*x^2-x-5,x^3-x^2-5*x+1,4*x^4-8*x^3-12*x^2+17*x+5,3*x^4-9*x^3-6*x^2+25*x-1,x^4-6*x^2+2*x,-x^4+2*x^3+2*x^2-5*x+2,x^4-2*x^3-3*x^2+3*x-2,2*x^4-5*x^3-4*x^2+8*x+2,x,x^2-x-3,2*x^4-x^3-11*x^2+3*x+10,x^4-3*x^3-3*x^2+6*x+9,x^4-x^3-3*x^2+2*x,3*x^4-8*x^3-8*x^2+23*x-1,-2*x^4+5*x^3+3*x^2-13*x+4,-x^4+3*x^3+2*x^2-9*x+3,-5*x^4+10*x^3+16*x^2-20*x-10]];
E[247,4] = [x^5-9*x^3-x^2+19*x+4, [1,x,x^3-5*x,x^2-2,-x^3+4*x+1,x^4-5*x^2,-x^3-x^2+5*x+5,x^3-4*x,-x^4+x^3+6*x^2-4*x-3,-x^4+4*x^2+x,-x^2+5,2*x^3+x^2-9*x-4,1,-x^4-x^3+5*x^2+5*x,-x^2-x,x^4-6*x^2+4,x^2+1,x^4-3*x^3-5*x^2+16*x+4,-1,-3*x^3+11*x+2,x^4-7*x^2-2*x+4,-x^3+5*x,x^4-6*x^2-x+4,x^3+x^2-4*x,x^4-x^3-3*x^2+4*x-4,x,-x^4+2*x^3+7*x^2-12*x-8,-x^4-2*x^3+6*x^2+9*x-6,-x^4+x^3+6*x^2-6*x-4,-x^3-x^2,x^4+x^3-6*x^2-4*x+2,x^3+x^2-7*x-4,x^3-x^2-6*x+4,x^3+x,x^2+2*x+1,-x^4+2*x^3+5*x^2-7*x+2,-x^4+6*x^2-x-8,-x,x^3-5*x,-x^4+3*x^2,-x^3+2*x^2+7*x-2,2*x^3-x^2-15*x-4,x^3-6*x-1,-x^4+7*x^2-10,-x^4-x^3+4*x^2+7*x+1,3*x^3-15*x-4]];
E[247,5] = [x^4+3*x^3-2*x^2-9*x-4, [1,x,-x^3-2*x^2+3*x+4,x^2-2,x^3+2*x^2-4*x-7,x^3+x^2-5*x-4,x^3+x^2-5*x-3,x^3-4*x,x+1,-x^3-2*x^2+2*x+4,x^2+2*x-3,x^2-x-4,-1,-2*x^3-3*x^2+6*x+4,2*x^3+5*x^2-5*x-12,-3*x^3-4*x^2+9*x+8,x^2-7,x^2+x,-1,-x^3-4*x^2+3*x+10,-x^3-x^2+7*x+4,x^3+2*x^2-3*x,-3*x^3-6*x^2+14*x+16,-x^3-3*x^2+6*x+8,-4*x^3-9*x^2+15*x+24,-x,3*x^3+5*x^2-11*x-12,x^3-4*x-2,2*x^3+2*x^2-9*x-4,-x^3-x^2+6*x+8,2*x^3+6*x^2-7*x-14,3*x^3+3*x^2-11*x-12,3*x^3+5*x^2-14*x-16,x^3-7*x,x^2+2*x+1,x^3+x^2-2*x-2,-5*x^3-10*x^2+18*x+24,-x,x^3+2*x^2-3*x-4,x^3+5*x^2-3*x-12,-x^3-2*x^2+3*x-2,2*x^3+5*x^2-5*x-4,x^3-4*x-1,-x^3-3*x^2+5*x+10,-2*x-3,3*x^3+8*x^2-11*x-12]];

E[248,1] = [x^3-2*x^2-6*x+8, [2,0,2*x,0,-x^2+2*x+2,0,-x^2-2*x+10,0,2*x^2-6,0,2*x^2-2*x-4,0,2*x^2-2*x-8,0,-4*x+8,0,-2*x^2+8,0,-3*x^2+2*x+18,0,-4*x^2+4*x+8,0,0,0,x^2-6*x,0,4*x^2-16,0,-2*x-12,0,2,0,2*x^2+8*x-16,0,-3*x^2+10*x+2,0,-2*x+4,0,2*x^2+4*x-16,0,-x^2-6*x+6,0,2*x^2+2*x-4,0,-x^2+2*x-6,0,2*x^2-4*x-8,0,x^2-6*x+12,0,-4*x^2-4*x+16,0,6*x^2-2*x-32,0,-2*x^2+8*x-12,0,-4*x^2+24,0,-5*x^2+2*x+22,0,2*x^2+6*x-24,0,-x^2-10*x+2,0]];
E[248,2] = [x, [1,0,0,0,-3,0,-3,0,-3,0,2,0,-4,0,0,0,0,0,1,0,0,0,4,0,4,0,0,0,-6,0,1,0,0,0,9,0,-10,0,0,0,7,0,-10,0,9,0,12,0,2,0,0,0,-4,0,-6,0,0,0,3,0,12,0,9,0]];
E[248,3] = [x, [1,0,-2,0,1,0,-3,0,1,0,-2,0,-2,0,-2,0,-6,0,1,0,6,0,-6,0,-4,0,4,0,4,0,-1,0,4,0,-3,0,-2,0,4,0,7,0,4,0,1,0,8,0,2,0,12,0,8,0,-2,0,-2,0,3,0,-6,0,-3,0]];
E[248,4] = [x, [1,0,-2,0,2,0,0,0,1,0,2,0,4,0,-4,0,6,0,4,0,0,0,0,0,-1,0,4,0,-4,0,-1,0,-4,0,0,0,4,0,-8,0,-10,0,-2,0,2,0,-8,0,-7,0,-12,0,4,0,4,0,-8,0,0,0,0,0,0,0]];
E[248,5] = [x^2-3*x-6, [1,0,2,0,x,0,-x+2,0,1,0,-2,0,-2*x+4,0,2*x,0,-2,0,-x-2,0,-2*x+4,0,2*x-4,0,3*x+1,0,-4,0,8,0,-1,0,-4,0,-x-6,0,2*x-4,0,-4*x+8,0,-x,0,2*x-2,0,x,0,0,0,-x+3,0,-4,0,0,0,-2*x,0,-2*x-4,0,x-2,0,-2*x+8,0,-x+2,0]];

E[249,1] = [x, [1,1,-1,-1,-1,-1,-4,-3,1,-1,-3,1,2,-4,1,-1,4,1,-1,1,4,-3,-3,3,-4,2,-1,4,4,1,-6,5,3,4,4,-1,-9,-1,-2,3,-2,4,4,3,-1,-3,8,1,9,-4,-4,-2,7,-1,3,12]];
E[249,2] = [x, [1,-1,-1,-1,1,1,0,3,1,-1,-3,1,-6,0,-1,-1,-4,-1,-7,-1,0,3,5,-3,-4,6,-1,0,8,1,-10,-5,3,4,0,-1,7,7,6,3,-2,0,4,3,1,-5,-12,1,-7,4,4,6,9,1,-3,0]];
E[249,3] = [x^2+2*x-1, [1,x,1,-2*x-1,-x-4,x,-2,x-2,1,-2*x-1,2*x-1,-2*x-1,0,-2*x,-x-4,3,-4*x-4,x,x,5*x+6,-2,-5*x+2,4*x+3,x-2,6*x+12,0,1,4*x+2,-6,-2*x-1,-8,x+4,2*x-1,4*x-4,2*x+8,-2*x-1,-1,-2*x+1,0,7,-2*x-6,-2*x,6,8*x-3,-x-4,-5*x+4,-2*x-6,3,-3,6,-4*x-4,0,-5*x-6,x,-3*x+2,-2*x+4]];
E[249,4] = [x^4-2*x^3-4*x^2+8*x-1, [1,x,1,x^2-2,-x+2,x,-x^2+3,x^3-4*x,1,-x^2+2*x,-2*x^3+x^2+8*x-2,x^2-2,-x^3+5*x-2,-x^3+3*x,-x+2,2*x^3-2*x^2-8*x+5,2*x^3-2*x^2-8*x+6,x,2*x^3-9*x,-x^3+2*x^2+2*x-4,-x^2+3,-3*x^3+14*x-2,4*x^3-2*x^2-18*x+9,x^3-4*x,x^2-4*x-1,-2*x^3+x^2+6*x-1,1,-2*x^3+x^2+8*x-7,-2*x^3+3*x^2+8*x-9,-x^2+2*x,-2*x^3+3*x^2+8*x-7,-3*x+2,-2*x^3+x^2+8*x-2,2*x^3-10*x+2,x^3-2*x^2-3*x+6,x^2-2,2*x^3-6*x-5,4*x^3-x^2-16*x+2,-x^3+5*x-2,-1,-2*x^3-x^2+12*x-1,-x^3+3*x,-3*x^3+4*x^2+11*x-14,-2*x^3+6*x+1,-x+2,6*x^3-2*x^2-23*x+4,2*x^3-8*x+4,2*x^3-2*x^2-8*x+5,2*x^3-2*x^2-8*x+3,x^3-4*x^2-x,2*x^3-2*x^2-8*x+6,-x^3-2*x^2+5*x+2,-3*x^3+14*x+2,x,-x^3+2*x^2+2*x-2,-x^3+3*x-2]];
E[249,5] = [x^5+3*x^4-4*x^3-14*x^2-3*x+1, [2,2*x,-2,2*x^2-4,-x^4-4*x^3+4*x^2+20*x+1,-2*x,2*x^4+4*x^3-10*x^2-16*x+4,2*x^3-8*x,2,-x^4+6*x^2-2*x+1,-x^4-4*x^3+2*x^2+18*x+9,-2*x^2+4,2*x^3-10*x+4,-2*x^4-2*x^3+12*x^2+10*x-2,x^4+4*x^3-4*x^2-20*x-1,2*x^4-12*x^2+8,4*x^4+8*x^3-20*x^2-36*x,2*x,-5*x^4-12*x^3+24*x^2+52*x+5,5*x^4+10*x^3-24*x^2-42*x-1,-2*x^4-4*x^3+10*x^2+16*x-4,-x^4-2*x^3+4*x^2+6*x+1,-x^4+8*x^2-2*x-5,-2*x^3+8*x,x^4+4*x^3-6*x^2-22*x+5,2*x^4-10*x^2+4*x,-2,-4*x^3+2*x^2+24*x-6,-2*x^4-4*x^3+10*x^2+12*x-4,x^4-6*x^2+2*x-1,2*x^4+4*x^3-10*x^2-20*x+8,-6*x^4-8*x^3+28*x^2+30*x-2,x^4+4*x^3-2*x^2-18*x-9,-4*x^4-4*x^3+20*x^2+12*x-4,-6*x^4-14*x^3+32*x^2+62*x-10,2*x^2-4,x^4-8*x^2-2*x+5,3*x^4+4*x^3-18*x^2-10*x+5,-2*x^3+10*x-4,-3*x^4-4*x^3+16*x^2+18*x-7,2*x^4+8*x^3-6*x^2-40*x-8,2*x^4+2*x^3-12*x^2-10*x+2,6*x^4+14*x^3-28*x^2-58*x+2,3*x^4+8*x^3-12*x^2-38*x-17,-x^4-4*x^3+4*x^2+20*x+1,3*x^4+4*x^3-16*x^2-8*x+1,2*x^4+4*x^3-12*x^2-20*x+10,-2*x^4+12*x^2-8,6*x^4+16*x^3-28*x^2-72*x,x^4-2*x^3-8*x^2+8*x-1,-4*x^4-8*x^3+20*x^2+36*x,-6*x^4-6*x^3+32*x^2+26*x-10,3*x^4+6*x^3-12*x^2-22*x-19,-2*x,-5*x^4-14*x^3+20*x^2+62*x+17,6*x^3-26*x+4]];

E[250,1] = [x^2+2*x-4, [2,2,2*x,2,0,2*x,-x,2,-4*x+2,0,x+10,2*x,-x+2,-x,0,2,-4*x-8,-4*x+2,x-4,0,2*x-4,x+10,-3*x-10,2*x,0,-x+2,4*x-16,-x,2*x+12,0,2*x-4,2,8*x+4,-4*x-8,0,-4*x+2,x+12,x-4,4*x-4,0,-7*x-8,2*x-4,-4*x-16,x+10,0,-3*x-10,-x+10,2*x,-x-12,0,-16,-x+2,9*x+12,4*x-16,0,-x,-6*x+4,2*x+12,9*x+4,0,4*x-12,2*x-4,-5*x+8,2,0,8*x+4,2*x-12,-4*x-8,-4*x-12,0,-6*x+8,-4*x+2,-6*x+12,x+12,0]];
E[250,2] = [x^2-3*x+1, [1,1,x,1,0,x,-3*x+5,1,3*x-4,0,-2*x,x,2*x-4,-3*x+5,0,1,-2*x+6,3*x-4,-2*x-2,0,-4*x+3,-2*x,x+5,x,0,2*x-4,2*x-3,-3*x+5,x-4,0,6*x-12,1,-6*x+2,-2*x+6,0,3*x-4,8*x-14,-2*x-2,2*x-2,0,-x+6,-4*x+3,3*x-8,-2*x,0,x+5,7*x-10,x,-3*x+9,0,2,2*x-4,-8*x+16,2*x-3,0,-3*x+5,-8*x+2,x-4,2*x-8,0,-3*x+9,6*x-12,-11,1,0,-6*x+2,-4*x+4,-2*x+6,8*x-1,0,2*x-6,3*x-4,2*x-4,8*x-14,0]];
E[250,3] = [x^2-2*x-4, [2,-2,2*x,2,0,-2*x,-x,-2,4*x+2,0,-x+10,2*x,-x-2,x,0,2,-4*x+8,-4*x-2,-x-4,0,-2*x-4,x-10,-3*x+10,-2*x,0,x+2,4*x+16,-x,-2*x+12,0,-2*x-4,-2,8*x-4,4*x-8,0,4*x+2,x-12,x+4,-4*x-4,0,7*x-8,2*x+4,-4*x+16,-x+10,0,3*x-10,-x-10,2*x,x-12,0,-16,-x-2,9*x-12,-4*x-16,0,x,-6*x-4,2*x-12,-9*x+4,0,-4*x-12,2*x+4,-5*x-8,2,0,-8*x+4,2*x+12,-4*x+8,4*x-12,0,6*x+8,-4*x-2,-6*x-12,-x+12,0]];
E[250,4] = [x^2+3*x+1, [1,-1,x,1,0,-x,-3*x-5,-1,-3*x-4,0,2*x,x,2*x+4,3*x+5,0,1,-2*x-6,3*x+4,2*x-2,0,4*x+3,-2*x,x-5,-x,0,-2*x-4,2*x+3,-3*x-5,-x-4,0,-6*x-12,-1,-6*x-2,2*x+6,0,-3*x-4,8*x+14,-2*x+2,-2*x-2,0,x+6,-4*x-3,3*x+8,2*x,0,-x+5,7*x+10,x,3*x+9,0,2,2*x+4,-8*x-16,-2*x-3,0,3*x+5,-8*x-2,x+4,-2*x-8,0,3*x+9,6*x+12,11,1,0,6*x+2,-4*x-4,-2*x-6,-8*x-1,0,-2*x-6,3*x+4,2*x+4,-8*x-14,0]];

E[251,1] = [x^17-2*x^16-28*x^15+54*x^14+317*x^13-582*x^12-1867*x^11+3178*x^10+6186*x^9-9216*x^8-11921*x^7+13680*x^6+13752*x^5-9400*x^4-8800*x^3+1920*x^2+2240*x+256, [1216,1216*x,69*x^16-212*x^15-1752*x^14+5638*x^13+17157*x^12-59424*x^11-79979*x^10+313888*x^9+174414*x^8-866052*x^7-146661*x^6+1198330*x^5+54216*x^4-779784*x^3-55216*x^2+183520*x+27776,1216*x^2-2432,-84*x^16-74*x^15+2612*x^14+2296*x^13-33136*x^12-28594*x^11+219544*x^10+183446*x^9-803772*x^8-647068*x^7+1566132*x^6+1239522*x^5-1389248*x^4-1175400*x^3+341824*x^2+380672*x+47552,-74*x^16+180*x^15+1912*x^14-4716*x^13-19266*x^12+48844*x^11+94606*x^10-252420*x^9-230148*x^8+675888*x^7+254410*x^6-894672*x^5-131184*x^4+551984*x^3+51040*x^2-126784*x-17664,448*x^16-340*x^15-12816*x^14+8072*x^13+147896*x^12-71572*x^11-879872*x^10+274228*x^9+2861024*x^8-290704*x^7-4969792*x^6-740316*x^5+4144616*x^4+1646328*x^3-1095792*x^2-693056*x-71616,1216*x^3-4864*x,-85*x^16+178*x^15+2264*x^14-4694*x^13-23617*x^12+48558*x^11+120979*x^10-246626*x^9-312422*x^8+626264*x^7+384541*x^6-723064*x^5-234500*x^4+335368*x^3+66416*x^2-42336*x-1984,-242*x^16+260*x^15+6832*x^14-6508*x^13-77482*x^12+62716*x^11+450398*x^10-284148*x^9-1421212*x^8+564768*x^7+2388642*x^6-234080*x^5-1965000*x^4-397376*x^3+541952*x^2+235712*x+21504,-256*x^16-88*x^15+7736*x^14+3248*x^13-95152*x^12-46632*x^11+609944*x^10+339448*x^9-2159944*x^8-1345632*x^7+4095184*x^6+2852888*x^5-3615816*x^4-2873504*x^3+933728*x^2+950528*x+103808,-106*x^16+264*x^15+2784*x^14-7084*x^13-28538*x^12+75296*x^11+142710*x^10-400160*x^9-354924*x^8+1104360*x^7+410970*x^6-1510196*x^5-252048*x^4+959408*x^3+125728*x^2-218944*x-36608,-277*x^16+188*x^15+8028*x^14-4462*x^13-94069*x^12+39424*x^11+569887*x^10-148752*x^9-1893354*x^8+138780*x^7+3370429*x^6+485374*x^5-2882636*x^4-1019480*x^3+801824*x^2+424320*x+38784,556*x^16-272*x^15-16120*x^14+5880*x^13+189164*x^12-43456*x^11-1149516*x^10+89696*x^9+3838064*x^8+370816*x^7-6868956*x^6-2016280*x^5+5857528*x^4+2846608*x^3-1553216*x^2-1075136*x-114688,-518*x^16+728*x^15+14296*x^14-18420*x^13-157814*x^12+181168*x^11+887506*x^10-858816*x^9-2687196*x^8+1939128*x^7+4299814*x^6-1658092*x^5-3389960*x^4+78784*x^3+919072*x^2+229408*x+24704,1216*x^4-7296*x^2+4864,323*x^16-418*x^15-8968*x^14+10450*x^13+99807*x^12-100966*x^11-567701*x^10+464322*x^9+1746746*x^8-981160*x^7-2855947*x^6+650332*x^5+2300900*x^4+260528*x^3-639008*x^2-230432*x-13376,8*x^16-116*x^15-104*x^14+3328*x^13-912*x^12-37716*x^11+23504*x^10+213388*x^9-157096*x^8-628744*x^7+439736*x^6+934420*x^5-463632*x^4-681584*x^3+120864*x^2+188416*x+21760,668*x^16-452*x^15-19248*x^14+10520*x^13+223972*x^12-89716*x^11-1345316*x^10+309436*x^9+4422600*x^8-110360*x^7-7770316*x^6-1676788*x^5+6527096*x^4+2956432*x^3-1700928*x^2-1187904*x-133504,-56*x^16+204*x^15+1336*x^14-5360*x^13-11856*x^12+55772*x^11+45840*x^10-291092*x^9-57960*x^8+797896*x^7-55784*x^6-1116060*x^5+106320*x^4+763152*x^3+16704*x^2-197760*x-33152,939*x^16-420*x^15-27388*x^14+8914*x^13+323627*x^12-63024*x^11-1982345*x^10+98704*x^9+6677774*x^8+767452*x^7-12059699*x^6-3608290*x^5+10358844*x^4+4984824*x^3-2775952*x^2-1883648*x-197120,-600*x^16+568*x^15+17072*x^14-14000*x^13-195624*x^12+131992*x^11+1153016*x^10-576328*x^9-3704928*x^8+1043408*x^7+6354968*x^6-95304*x^5-5279904*x^4-1319072*x^3+1442048*x^2+677248*x+65536,-301*x^16+118*x^15+8796*x^14-2438*x^13-104177*x^12+16266*x^11+639823*x^10-15502*x^9-2160786*x^8-267680*x^7+3905165*x^6+1131716*x^5-3336336*x^4-1532128*x^3+881248*x^2+568608*x+62272,200*x^16-544*x^15-5184*x^14+14496*x^13+52136*x^12-152880*x^11-252504*x^10+805632*x^9+587760*x^8-2204432*x^7-568936*x^6+2995008*x^5+225376*x^4-1911040*x^3-117504*x^2+454400*x+62464,-97*x^16+314*x^15+2420*x^14-8318*x^13-23085*x^12+87310*x^11+102595*x^10-459130*x^9-197922*x^8+1260136*x^7+84417*x^6-1729912*x^5+86192*x^4+1107856*x^3-11520*x^2-259296*x-28544,-366*x^16+272*x^15+10496*x^14-6260*x^13-121790*x^12+52728*x^11+731554*x^10-179832*x^9-2414052*x^8+68312*x^7+4274734*x^6+926668*x^5-3623280*x^4-1635776*x^3+956160*x^2+659264*x+70912,-12*x^16-92*x^15+612*x^14+2304*x^13-10564*x^12-22580*x^11+86344*x^10+109356*x^9-364148*x^8-274176*x^7+769956*x^6+354388*x^5-699228*x^4-248496*x^3+184720*x^2+62112*x+6272,-56*x^16+128*x^15+1488*x^14-3232*x^13-15656*x^12+31680*x^11+82472*x^10-149808*x^9-227136*x^8+340528*x^7+317224*x^6-307952*x^5-216224*x^4+46928*x^3+48928*x^2+25984*x+896,-910*x^16+1016*x^15+25624*x^14-25540*x^13-289902*x^12+248496*x^11+1681562*x^10-1152032*x^9-5295244*x^8+2449272*x^7+8872734*x^6-1579356*x^5-7251320*x^4-835168*x^3+2014272*x^2+691584*x+57728,-308*x^16-208*x^15+9552*x^14+6392*x^13-120308*x^12-79600*x^11+787388*x^10+517152*x^9-2834760*x^8-1875264*x^7+5428148*x^6+3733576*x^5-4790416*x^4-3639328*x^3+1223968*x^2+1185024*x+132608,886*x^16-1010*x^15-24932*x^14+25284*x^13+282074*x^12-244674*x^11-1637846*x^10+1125910*x^9+5170920*x^8-2364772*x^7-8702950*x^6+1463190*x^5+7142280*x^4+886744*x^3-1971024*x^2-686528*x-63424,1216*x^5-9728*x^3+14592*x,-730*x^16+116*x^15+21536*x^14-972*x^13-257906*x^12-18676*x^11+1605062*x^10+316332*x^9-5507260*x^8-1829552*x^7+10135626*x^6+4842112*x^5-8802744*x^4-5492048*x^3+2317824*x^2+1898240*x+197120,228*x^16+76*x^15-6992*x^14-2584*x^13+87020*x^12+35340*x^11-562172*x^10-251332*x^9+1995608*x^8+994536*x^7-3768308*x^6-2140996*x^5+3296728*x^4+2203392*x^3-850592*x^2-736896*x-82688,-245*x^16+636*x^15+6244*x^14-16534*x^13-61541*x^12+168848*x^11+290743*x^10-850616*x^9-655634*x^8+2171188*x^7+610717*x^6-2617554*x^5-243284*x^4+1388288*x^3+87520*x^2-257504*x-31040,70*x^16-236*x^15-1632*x^14+5940*x^13+14174*x^12-58676*x^11-53994*x^10+286668*x^9+69828*x^8-717424*x^7+55898*x^6+872480*x^5-137384*x^4-479472*x^3+40224*x^2+88512*x+1920,-284*x^16+128*x^15+8176*x^14-2472*x^13-95228*x^12+13136*x^11+574420*x^10+28336*x^9-1906584*x^8-505200*x^7+3407612*x^6+1710456*x^5-2924560*x^4-2097184*x^3+754208*x^2+747072*x+83584,884*x^16-544*x^15-25552*x^14+12216*x^13+299060*x^12-98160*x^11-1813468*x^10+290352*x^9+6045928*x^8+192912*x^7-10815028*x^6-2659240*x^5+9235632*x^4+4177472*x^3-2470464*x^2-1629824*x-171008,-480*x^16-146*x^15+14524*x^14+5368*x^13-178524*x^12-77498*x^11+1140852*x^10+571846*x^9-4016892*x^8-2312692*x^7+7556832*x^6+5011858*x^5-6624520*x^4-5117184*x^3+1693968*x^2+1699552*x+185216,576*x^16-752*x^15-16000*x^14+18912*x^13+178144*x^12-184144*x^11-1013920*x^10+856752*x^9+3124224*x^8-1852896*x^7-5127264*x^6+1344592*x^5+4166752*x^4+318656*x^3-1174144*x^2-379136*x-28672,-878*x^16+552*x^15+25360*x^14-12684*x^13-296286*x^12+106448*x^11+1790930*x^10-357304*x^9-5941108*x^8+81584*x^7+10555678*x^6+2092356*x^5-8955520*x^4-3647080*x^3+2402576*x^2+1474432*x+153280,1458*x^16-1096*x^15-41792*x^14+25964*x^13+483474*x^12-229232*x^11-2885438*x^10+869120*x^9+9421276*x^8-865880*x^7-16453810*x^6-2554284*x^5+13811424*x^4+5487248*x^3-3686528*x^2-2300480*x-240384]];
E[251,2] = [x^4+2*x^3-2*x^2-3*x+1, [1,-x^2-x+1,x,x^2+x-2,x^3+2*x^2-2*x-3,-x^3-x^2+x,-x^3-x^2+x-1,2*x^2+2*x-3,x^2-3,x^3+2*x^2-x-2,-x^3-2*x^2+x+1,x^3+x^2-2*x,-x^2-1,x^3+2*x^2+x-1,-1,-3*x^2-3*x+3,-3*x^3-4*x^2+6*x+3,x^3+2*x^2-2,3*x^3+4*x^2-4*x-4,-2*x^3-4*x^2+3*x+5,x^3-x^2-4*x+1,x^2+2*x,2*x^3+3*x^2-5*x-2,2*x^3+2*x^2-3*x,-3*x^3-7*x^2+4*x+6,-x^3+2*x^2+4*x-2,x^3-6*x,-x^2-2*x+2,-2*x^3-3*x^2+7*x+1,x^2+x-1,-2*x^3-3*x^2,-x^2-x+6,-x^2-2*x+1,-x^3-2*x^2+3*x+2,-x^3-x^2+3*x+2,-x^3-3*x^2+5,3*x^3+3*x^2-8*x-5,-x^3+x^2-3,-x^3-x,-3*x^3-6*x^2+4*x+7,x^3-x^2-2*x+4,3*x^2+2*x-1]];

E[252,1] = [x, [1,0,0,0,-4,0,-1,0,0,0,-2,0,-6,0,0,0,4,0,-4,0,0,0,-2,0,11,0,0,0,2,0,0,0,0,0,4,0,2,0,0,0,0,0,-4,0,0,0,-12,0,1,0,0,0,6,0,8,0,0,0,8,0,6,0,0,0,24,0,-8,0,0,0,-14,0,-2,0,0,0,2,0,12,0,0,0,4,0,-16,0,0,0,0,0,6,0,0,0,16,0]];
E[252,2] = [x, [1,0,0,0,0,0,1,0,0,0,6,0,2,0,0,0,0,0,-4,0,0,0,6,0,-5,0,0,0,-6,0,8,0,0,0,0,0,2,0,0,0,-12,0,-4,0,0,0,-12,0,1,0,0,0,6,0,0,0,0,0,0,0,-10,0,0,0,0,0,8,0,0,0,-6,0,-10,0,0,0,6,0,-4,0,0,0,12,0,0,0,0,0,-12,0,2,0,0,0,0,0]];

E[253,1] = [x^3+x^2-4*x+1, [1,x,-x^2-x+1,x^2-2,x^2+2*x-4,-3*x+1,-x^2-3*x+1,-x^2-1,2*x^2+x-3,x^2-1,1,-x^2+3*x-2,x^2+x-3,-2*x^2-3*x+1,x^2-x-2,-x^2-5*x+5,x^2-6,-x^2+5*x-2,2*x-1,-3*x^2-x+7,2*x^2+7*x-2,x,1,4*x^2-1,-3*x^2-5*x+8,x-1,5*x-5,x^2-x,x^2+3*x+2,-2*x^2+2*x-1,-5*x^2-8*x+11,-2*x^2+x+3,-x^2-x+1,-x^2-2*x-1,-x^2-x,2*x^2-8*x+7,x^2+2*x-7,2*x^2-x,x-2,-5*x+5,5*x^2+6*x-11,5*x^2+6*x-2,-3*x^2-6*x+9,x^2-2,-4*x^2+9,x,-2*x^2-2*x+2,-2*x^2+9*x]];
E[253,2] = [x^3-3*x^2+3, [1,x,-x^2+x+3,x^2-2,x^2-2*x,-2*x^2+3*x+3,-x^2+x+3,3*x^2-4*x-3,-2*x^2+3*x+3,x^2-3,-1,-x^2+x,x^2-3*x-1,-2*x^2+3*x+3,x^2-3*x,3*x^2-3*x-5,-x^2+2*x+2,-3*x^2+3*x+6,2*x^2-4*x+1,x^2+x-3,-2*x^2+3*x+6,-x,1,2*x^2-6*x-3,x^2-3*x-2,-x-3,3*x-3,-x^2+x,-x^2-3*x+6,-3,3*x^2-4*x-5,3*x-3,x^2-x-3,-x^2+2*x+3,x^2-3*x,-2*x^2+3,-3*x^2+6*x-3,2*x^2+x-6,4*x^2-7*x-6,2*x^2-3*x+3,-3*x^2+6*x+7,-3*x^2+6*x+6,x^2+2*x-5,-x^2+2,-3,x,2*x^2-6*x+2,2*x^2-5*x-6]];
E[253,3] = [x^5+4*x^4-14*x^2-13*x-1, [1,x,-x^4-3*x^3+3*x^2+10*x+1,x^2-2,2*x^4+5*x^3-8*x^2-18*x-1,x^4+3*x^3-4*x^2-12*x-1,-2*x^4-4*x^3+9*x^2+13*x-3,x^3-4*x,4*x^4+11*x^3-13*x^2-37*x-6,-3*x^4-8*x^3+10*x^2+25*x+2,-1,x^4+2*x^3-4*x^2-8*x-1,-x^4-3*x^3+3*x^2+10*x-1,4*x^4+9*x^3-15*x^2-29*x-2,-5*x^4-13*x^3+19*x^2+48*x+4,x^4-6*x^2+4,-x^3-2*x^2+6*x+5,-5*x^4-13*x^3+19*x^2+46*x+4,x^4+3*x^3-2*x^2-11*x-7,-x^2-x-1,3*x^4+8*x^3-11*x^2-28*x-3,-x,-1,-4*x^4-10*x^3+14*x^2+36*x+3,4*x^4+12*x^3-11*x^2-39*x-8,x^4+3*x^3-4*x^2-14*x-1,-7*x^4-18*x^3+25*x^2+62*x+4,-3*x^4-7*x^3+9*x^2+24*x+10,2*x^4+4*x^3-7*x^2-11*x-4,7*x^4+19*x^3-22*x^2-61*x-5,-2*x^4-5*x^3+6*x^2+18*x+6,-4*x^4-8*x^3+14*x^2+25*x+1,x^4+3*x^3-3*x^2-10*x-1,-x^4-2*x^3+6*x^2+5*x,x^4+x^3-5*x^2-2*x-2,-x^4-3*x^3+2*x^2+13*x+7,-x^4-4*x^3+2*x^2+17*x+8,-x^4-2*x^3+3*x^2+6*x+1,6*x^4+17*x^3-19*x^2-57*x-5,6*x^4+15*x^3-21*x^2-51*x-4,-6*x^4-15*x^3+20*x^2+48*x+8,-4*x^4-11*x^3+14*x^2+36*x+3,5*x^4+12*x^3-18*x^2-41*x-8,-x^2+2,9*x^4+25*x^3-32*x^2-93*x-9,-x,3*x^4+7*x^3-12*x^2-25*x-8,4*x^4+10*x^3-12*x^2-33*x-2]];
E[253,4] = [x^6-3*x^5-4*x^4+16*x^3-3*x^2-10*x+1, [1,x,x^4-x^3-5*x^2+4*x+3,x^2-2,-x^3+4*x+1,x^5-x^4-5*x^3+4*x^2+3*x,-x^5+6*x^3+x^2-6*x-2,x^3-4*x,2*x^4-x^3-11*x^2+3*x+8,-x^4+4*x^2+x,1,2*x^5-3*x^4-10*x^3+16*x^2+2*x-7,-2*x^5+3*x^4+11*x^3-15*x^2-6*x+5,-3*x^5+2*x^4+17*x^3-9*x^2-12*x+1,-x^5+x^4+5*x^3-5*x^2-3*x+5,x^4-6*x^2+4,2*x^5-4*x^4-9*x^3+20*x^2-2*x-7,2*x^5-x^4-11*x^3+3*x^2+8*x,4*x^5-5*x^4-21*x^3+22*x^2+11*x-3,-x^5+6*x^3+x^2-8*x-2,-x^5-x^4+6*x^3+7*x^2-7*x-8,x,-1,x^5-6*x^3+7*x-2,3*x^5-4*x^4-18*x^3+19*x^2+18*x-5,-3*x^5+3*x^4+17*x^3-12*x^2-15*x+2,-2*x^5+5*x^4+10*x^3-27*x^2-4*x+18,-5*x^5+5*x^4+27*x^3-23*x^2-17*x+7,-2*x^5+14*x^3+3*x^2-21*x-6,-2*x^5+x^4+11*x^3-6*x^2-5*x+1,x^5-7*x^3+2*x^2+9*x-7,x^5-8*x^3+12*x,x^4-x^3-5*x^2+4*x+3,2*x^5-x^4-12*x^3+4*x^2+13*x-2,3*x^5-3*x^4-17*x^3+15*x^2+13*x-5,5*x^5-7*x^4-27*x^3+36*x^2+14*x-18,4*x^5-5*x^4-22*x^3+24*x^2+15*x-8,7*x^5-5*x^4-42*x^3+23*x^2+37*x-4,-2*x^5+4*x^4+11*x^3-23*x^2-5*x+15,-3*x^5+4*x^4+17*x^3-19*x^2-14*x+1,-5*x^5+6*x^4+29*x^3-28*x^2-25*x+7,-4*x^5+2*x^4+23*x^3-10*x^2-18*x+1,-2*x^5+3*x^4+12*x^3-16*x^2-15*x+12,x^2-2,-4*x^5+7*x^4+21*x^3-34*x^2-13*x+13,-x,-x^5+x^4+7*x^3-6*x^2-6*x+5,-x^5+4*x^4+4*x^3-22*x^2+4*x+13]];

E[254,1] = [x, [1,1,0,1,2,0,0,1,-3,2,4,0,-2,0,0,1,2,-3,-4,2,0,4,0,0,-1,-2,0,0,-6,0,8,1,0,2,0,-3,-2,-4,0,2,-6,0,0,4,-6,0,-8,0,-7,-1,0,-2,-6,0,8,0,0,-6,8,0,-2,8,0,1]];
E[254,2] = [x, [1,1,-2,1,-3,-2,-1,1,1,-3,-3,-2,-4,-1,6,1,3,1,-7,-3,2,-3,3,-2,4,-4,4,-1,6,6,-4,1,6,3,3,1,2,-7,8,-3,9,2,-10,-3,-3,3,-6,-2,-6,4,-6,-4,3,4,9,-1,14,6,0,6,-10,-4,-1,1]];
E[254,3] = [x, [1,1,-2,1,0,-2,4,1,1,0,0,-2,6,4,0,1,-6,1,8,0,-8,0,4,-2,-5,6,4,4,-8,0,-8,1,0,-6,0,1,-6,8,-12,0,6,-8,-6,0,0,4,-8,-2,9,-5,12,6,-4,4,0,4,-16,-8,-2,0,6,-8,4,1]];
E[254,4] = [x^2+x-4, [1,1,2,1,x,2,-x,1,1,x,-x-4,2,-2*x-2,-x,2*x,1,-x-2,1,3*x+4,x,-2*x,-x-4,3*x,2,-x-1,-2*x-2,-4,-x,2*x+4,2*x,0,1,-2*x-8,-x-2,x-4,1,2,3*x+4,-4*x-4,x,5*x+2,-2*x,6,-x-4,x,3*x,-2*x+8,2,-x-3,-x-1,-2*x-4,-2*x-2,-5*x-4,-4,-3*x-4,-x,6*x+8,2*x+4,-2*x-6,2*x,6,0,-x,1]];
E[254,5] = [x^5+2*x^4-10*x^3-16*x^2+10*x+16, [2,-2,2*x,2,-5*x^4-4*x^3+54*x^2+14*x-62,-2*x,3*x^4+2*x^3-34*x^2-4*x+46,-2,2*x^2-6,5*x^4+4*x^3-54*x^2-14*x+62,x^4+2*x^3-10*x^2-12*x+10,2*x,4,-3*x^4-2*x^3+34*x^2+4*x-46,6*x^4+4*x^3-66*x^2-12*x+80,2,3*x^4+2*x^3-34*x^2-8*x+46,-2*x^2+6,-3*x^4-2*x^3+34*x^2+4*x-38,-5*x^4-4*x^3+54*x^2+14*x-62,-4*x^4-4*x^3+44*x^2+16*x-48,-x^4-2*x^3+10*x^2+12*x-10,-x^4-2*x^3+10*x^2+12*x-10,-2*x,x^4+2*x^3-12*x^2-16*x+24,-4,2*x^3-12*x,3*x^4+2*x^3-34*x^2-4*x+46,-4*x^4-2*x^3+44*x^2+2*x-52,-6*x^4-4*x^3+66*x^2+12*x-80,6*x^4+4*x^3-66*x^2-12*x+84,-2,4*x^2-16,-3*x^4-2*x^3+34*x^2+8*x-46,-5*x^4-6*x^3+54*x^2+32*x-66,2*x^2-6,-10*x^4-8*x^3+108*x^2+28*x-120,3*x^4+2*x^3-34*x^2-4*x+38,4*x,5*x^4+4*x^3-54*x^2-14*x+62,7*x^4+6*x^3-76*x^2-24*x+90,4*x^4+4*x^3-44*x^2-16*x+48,4*x^4+4*x^3-40*x^2-14*x+32,x^4+2*x^3-10*x^2-12*x+10,7*x^4+6*x^3-78*x^2-22*x+90,x^4+2*x^3-10*x^2-12*x+10,6*x^4+4*x^3-66*x^2-12*x+68,2*x,5*x^4+2*x^3-58*x^2+84,-x^4-2*x^3+12*x^2+16*x-24,-4*x^4-4*x^3+40*x^2+16*x-48,4,5*x^4+2*x^3-58*x^2+2*x+70,-2*x^3+12*x,-19*x^4-14*x^3+210*x^2+40*x-262,-3*x^4-2*x^3+34*x^2+4*x-46,4*x^4+4*x^3-44*x^2-8*x+48,4*x^4+2*x^3-44*x^2-2*x+52,4*x^4+4*x^3-40*x^2-18*x+32,6*x^4+4*x^3-66*x^2-12*x+80,4*x^4+4*x^3-44*x^2-24*x+52,-6*x^4-4*x^3+66*x^2+12*x-84,-5*x^4-2*x^3+54*x^2+4*x-74,2]];
E[254,6] = [x, [1,-1,0,1,-1,0,-3,-1,-3,1,1,0,-2,3,0,1,-1,3,-7,-1,0,-1,9,0,-4,2,0,-3,-6,0,-10,-1,0,1,3,-3,4,7,0,1,-3,0,12,1,3,-9,10,0,2,4,0,-2,-3,0,-1,3,0,6,-4,0,10,10,9,1]];

E[255,1] = [x^2-x-3, [1,x,-1,x+1,-1,-x,2*x-1,3,1,-x,5,-x-1,-2*x-2,x+6,1,x-2,1,x,-2*x-1,-x-1,-2*x+1,5*x,-2*x+2,-3,1,-4*x-6,-1,3*x+5,-2*x+5,x,-2*x-2,-x-3,-5,x,-2*x+1,x+1,-4*x+3,-3*x-6,2*x+2,-3,2*x+5,-x-6,4*x,5*x+5,-1,-6,4*x-7,-x+2,6,x,-1,-6*x-8,-2*x+1,-x,-5,6*x-3,2*x+1,3*x-6,2*x,x+1,2*x+2,-4*x-6,2*x-1,-6*x+1,2*x+2,-5*x,-2*x-8,x+1,2*x-2,-x-6,-4*x+8,3]];
E[255,2] = [x^2-3*x+1, [1,x,-1,3*x-3,1,-x,-2*x+3,4*x-3,1,x,-4*x+7,-3*x+3,-2*x+6,-3*x+2,-1,3*x+2,-1,x,2*x-9,3*x-3,2*x-3,-5*x+4,2*x+2,-4*x+3,1,2,-1,-3*x-3,-6*x+7,-x,-2*x-2,3*x+3,4*x-7,-x,-2*x+3,3*x-3,4*x-1,-3*x-2,2*x-6,4*x-3,6*x-9,3*x-2,4*x-12,-3*x-9,1,8*x-2,-8*x+15,-3*x-2,-2,x,1,6*x-12,2*x+7,-x,-4*x+7,-6*x-1,-2*x+9,-11*x+6,-2*x+4,-3*x+3,2*x-10,-8*x+2,-2*x+3,6*x-7,-2*x+6,5*x-4,-2*x,-3*x+3,-2*x-2,-3*x+2,12*x-16,4*x-3]];
E[255,3] = [x^4-x^3-8*x^2+7*x+9, [1,x,1,x^2-2,-1,x,-x^3-x^2+5*x+5,x^3-4*x,1,-x,x^3+x^2-7*x-3,x^2-2,-2*x^2+8,-2*x^3-3*x^2+12*x+9,-1,x^3+2*x^2-7*x-5,-1,x,x^3+x^2-5*x-1,-x^2+2,-x^3-x^2+5*x+5,2*x^3+x^2-10*x-9,-2*x^3+10*x,x^3-4*x,1,-2*x^3+8*x,1,-3*x^3-2*x^2+13*x+8,x^3+x^2-5*x-3,-x,-2*x+2,x^3+x^2-4*x-9,x^3+x^2-7*x-3,-x,x^3+x^2-5*x-5,x^2-2,x^3+3*x^2-5*x-13,2*x^3+3*x^2-8*x-9,-2*x^2+8,-x^3+4*x,x^3+x^2-9*x-3,-2*x^3-3*x^2+12*x+9,2*x^3-12*x+2,x^3+4*x^2-9*x-12,-1,-2*x^3-6*x^2+14*x+18,-x^3-x^2+7*x+3,x^3+2*x^2-7*x-5,-x^3+x^2+9*x,x,-1,-2*x^3-4*x^2+14*x+2,-x^3-x^2+9*x+3,x,-x^3-x^2+7*x+3,-x^3-5*x^2+5*x+9,x^3+x^2-5*x-1,2*x^3+3*x^2-10*x-9,-2*x^2+6,-x^2+2,-2*x^2+8,-2*x^2+2*x,-x^3-x^2+5*x+5,-2*x+1,2*x^2-8,2*x^3+x^2-10*x-9,-2*x^3+2*x^2+12*x-4,-x^2+2,-2*x^3+10*x,2*x^3+3*x^2-12*x-9,-2*x^3+12*x-6,x^3-4*x]];
E[255,4] = [x^3-4*x+1, [1,x,1,x^2-2,1,x,-x^2-x+4,-1,1,x,-x^2+x+2,x^2-2,2*x^2-4,-x^2+1,1,-2*x^2-x+4,1,x,-3*x^2-3*x+8,x^2-2,-x^2-x+4,x^2-2*x+1,-2*x-2,-1,1,4*x-2,1,2*x^2-x-7,3*x^2-x-10,x,4*x^2+2*x-10,-x^2-4*x+4,-x^2+x+2,x,-x^2-x+4,x^2-2,-x^2-3*x+8,-3*x^2-4*x+3,2*x^2-4,-1,3*x^2+3*x-10,-x^2+1,4*x,3*x-5,1,-2*x^2-2*x,x^2-x-6,-2*x^2-x+4,-3*x^2-x+7,x,1,-2*x+8,x^2+x-6,x,-x^2+x+2,x^2+x-4,-3*x^2-3*x+8,-x^2+2*x-3,2*x^2-4*x-10,x^2-2,-2*x^2+4*x+4,2*x^2+6*x-4,-x^2-x+4,2*x-7,2*x^2-4,x^2-2*x+1,2*x^2+8*x-6,x^2-2,-2*x-2,-x^2+1,-4*x^2+12,-1]];

E[256,1] = [x, [1,0,-2,0,0,0,0,0,1,0,-6,0,0,0,0,0,-6,0,-2,0,0,0,0,0,-5,0,4,0,0,0,0,0,12,0,0,0,0,0,0,0,6,0,10,0,0,0,0,0,-7,0,12,0,0,0,0,0,4,0,-6,0,0,0,0,0]];
E[256,2] = [x, [1,0,2,0,0,0,0,0,1,0,6,0,0,0,0,0,-6,0,2,0,0,0,0,0,-5,0,-4,0,0,0,0,0,12,0,0,0,0,0,0,0,6,0,-10,0,0,0,0,0,-7,0,-12,0,0,0,0,0,4,0,6,0,0,0,0,0]];
E[256,3] = [x^2-8, [1,0,x,0,0,0,0,0,5,0,-x,0,0,0,0,0,6,0,-3*x,0,0,0,0,0,-5,0,2*x,0,0,0,0,0,-8,0,0,0,0,0,0,0,6,0,3*x,0,0,0,0,0,-7,0,6*x,0,0,0,0,0,-24,0,-5*x,0,0,0,0,0]];
E[256,4] = [x, [1,0,0,0,-4,0,0,0,-3,0,0,0,-4,0,0,0,-2,0,0,0,0,0,0,0,11,0,0,0,-4,0,0,0,0,0,0,0,12,0,0,0,-10,0,0,0,12,0,0,0,-7,0,0,0,-4,0,0,0,0,0,0,0,12,0,0,0]];
E[256,5] = [x, [1,0,0,0,4,0,0,0,-3,0,0,0,4,0,0,0,-2,0,0,0,0,0,0,0,11,0,0,0,4,0,0,0,0,0,0,0,-12,0,0,0,-10,0,0,0,-12,0,0,0,-7,0,0,0,4,0,0,0,0,0,0,0,-12,0,0,0]];

E[257,1] = [x^7+3*x^6-3*x^5-11*x^4+3*x^3+10*x^2-x-1, [1,x,x^4+2*x^3-3*x^2-4*x+1,x^2-2,-x^5-4*x^4-x^3+9*x^2+4*x-3,x^5+2*x^4-3*x^3-4*x^2+x,x^6+4*x^5-12*x^3-4*x^2+8*x-1,x^3-4*x,-2*x^6-6*x^5+3*x^4+15*x^3+x^2-6*x-1,-x^6-4*x^5-x^4+9*x^3+4*x^2-3*x,-x^6-2*x^5+6*x^4+9*x^3-9*x^2-7*x,x^6+2*x^5-5*x^4-8*x^3+7*x^2+8*x-2,x^6+2*x^5-5*x^4-5*x^3+11*x^2-6,x^6+3*x^5-x^4-7*x^3-2*x^2+1,3*x^6+10*x^5-3*x^4-26*x^3-2*x^2+13*x-3,x^4-6*x^2+4,2*x^6+8*x^5+x^4-22*x^3-9*x^2+14*x,-3*x^5-7*x^4+7*x^3+14*x^2-3*x-2,-3*x^6-8*x^5+11*x^4+28*x^3-15*x^2-20*x+4,-x^6-2*x^5+6*x^4+9*x^3-11*x^2-9*x+5,-x^6-5*x^5-6*x^4+7*x^3+19*x^2+6*x-6,x^6+3*x^5-2*x^4-6*x^3+3*x^2-x-1,-x^6-5*x^5-2*x^4+16*x^3+9*x^2-12*x-4,-x^6-4*x^5-x^4+10*x^3+6*x^2-3*x+1,-3*x^6-9*x^5+8*x^4+30*x^3-7*x^2-20*x+2,-x^6-2*x^5+6*x^4+8*x^3-10*x^2-5*x+1,3*x^6+10*x^5-3*x^4-27*x^3-4*x^2+17*x,-2*x^6-6*x^5+4*x^4+19*x^3-2*x^2-14*x+3,x^5+x^4-7*x^3-8*x^2+6*x+9,x^6+6*x^5+7*x^4-11*x^3-17*x^2+3,-x^6-5*x^5-6*x^4+4*x^3+12*x^2+9*x-1,x^5-8*x^3+12*x,-x^6-4*x^5-x^4+8*x^3+3*x^2+2,2*x^6+7*x^5-15*x^3-6*x^2+2*x+2,4*x^5+15*x^4+2*x^3-34*x^2-15*x+10,x^6+5*x^5+x^4-16*x^3-5*x^2+10*x+2,3*x^6+7*x^5-13*x^4-27*x^3+17*x^2+25*x-6,x^6+2*x^5-5*x^4-6*x^3+10*x^2+x-3,2*x^6+5*x^5-10*x^4-22*x^3+16*x^2+21*x-5,3*x^6+11*x^5-26*x^3-7*x^2+10*x-1,2*x^6+6*x^5-3*x^4-10*x^3+9*x^2-4*x-7,-2*x^6-9*x^5-4*x^4+22*x^3+16*x^2-7*x-1,3*x^6+11*x^5-3*x^4-35*x^3-6*x^2+24*x-1]];
E[257,2] = [x^14-2*x^13-21*x^12+42*x^11+163*x^10-327*x^9-568*x^8+1153*x^7+830*x^6-1755*x^5-318*x^4+825*x^3+10*x^2-96*x-1, [144512,144512*x,1755*x^13-14949*x^12-30294*x^11+309516*x^10+155093*x^9-2369214*x^8-43698*x^7+8189141*x^6-1591687*x^5-12184782*x^4+3306652*x^3+5567751*x^2-838701*x-479015,144512*x^2-289024,12490*x^13-15606*x^12-265620*x^11+321640*x^10+2120086*x^9-2441540*x^8-7878108*x^7+8330454*x^6+13591118*x^5-12194276*x^4-9321848*x^3+5480882*x^2+2084890*x-429682,-11439*x^13+6561*x^12+235806*x^11-130972*x^10-1795329*x^9+953142*x^8+6165626*x^7-3048337*x^6-9104757*x^5+3864742*x^4+4119876*x^3-856251*x^2-310535*x+1755,3085*x^13-803*x^12-58810*x^11+10804*x^10+376483*x^9-26178*x^8-778222*x^7-168493*x^6-729569*x^5+869518*x^4+3466132*x^3-1185999*x^2-1265867*x+477775,144512*x^3-578048*x,-23224*x^13+39784*x^12+503152*x^11-827584*x^10-4085320*x^9+6346160*x^8+15292976*x^7-21801256*x^6-25688840*x^5+31479792*x^4+15122208*x^3-12461368*x^2-1970872*x+1073816,9374*x^13-3330*x^12-202940*x^11+84216*x^10+1642690*x^9-783788*x^8-6070516*x^7+3224418*x^6+9725674*x^5-5350028*x^4-4823368*x^3+1959990*x^2+769358*x+12490,29228*x^13-44052*x^12-625688*x^11+921136*x^10+5022804*x^9-7103928*x^8-18666632*x^7+24498708*x^6+31518180*x^5-35086520*x^4-19362128*x^3+12578588*x^2+2794444*x-382876,-19827*x^13+25485*x^12+410054*x^11-549804*x^10-3097597*x^9+4406702*x^8+10228226*x^7-15988669*x^6-13027329*x^5+24851838*x^4+1967620*x^3-11331647*x^2+581013*x+946591,860*x^13-3620*x^12-17624*x^11+71696*x^10+117892*x^9-509752*x^8-176424*x^7+1535108*x^6-1008268*x^5-1615768*x^4+3332368*x^3-184116*x^2-1697700*x+305748,5367*x^13+5975*x^12-118766*x^11-126372*x^10+982617*x^9+974058*x^8-3725498*x^7-3290119*x^6+6283693*x^5+4447162*x^4-3731124*x^3-1296717*x^2+773935*x+3085,-13110*x^13+28298*x^12+270764*x^11-590936*x^10-2042922*x^9+4580988*x^8+6716452*x^7-16130922*x^6-8234802*x^5+24631068*x^4-175928*x^3-11683150*x^2+1996506*x+1487182,144512*x^4-867072*x^2+578048,8160*x^13-16704*x^12-171424*x^11+362688*x^10+1321088*x^9-2937056*x^8-4489440*x^7+10826848*x^6+6031232*x^5-17281920*x^4-1129184*x^3+8482304*x^2-928768*x-868864,-6664*x^13+15448*x^12+147824*x^11-299808*x^10-1248088*x^9+2101744*x^8+4976016*x^7-6412920*x^6-9278328*x^5+7736976*x^4+6698432*x^3-1738632*x^2-1155688*x-23224,-24769*x^13+44607*x^12+527042*x^11-935172*x^10-4182639*x^9+7228538*x^8+15204534*x^7-24927727*x^6-24546683*x^5+35321866*x^4+13741260*x^3-11568517*x^2-2663753*x+320581,-9562*x^13+25126*x^12+221748*x^11-528552*x^10-1958662*x^9+4136996*x^8+8172412*x^7-14715654*x^6-16080894*x^5+22546116*x^4+12870136*x^3-10286146*x^2-3257386*x+868738,12756*x^13-45292*x^12-256872*x^11+941104*x^10+1839212*x^9-7244008*x^8-5311800*x^7+25268460*x^6+3676604*x^5-38178728*x^4+5901872*x^3+17876836*x^2-3080140*x-1629252,14404*x^13-11900*x^12-306440*x^11+258640*x^10+2453628*x^9-2065128*x^8-9201176*x^7+7258940*x^6+16208620*x^5-10067624*x^4-11534512*x^3+2502164*x^2+2423012*x+29228,-16068*x^13+35708*x^12+320712*x^11-743184*x^10-2269372*x^9+5693992*x^8+6435864*x^7-19480316*x^6-4147948*x^5+27847464*x^4-7699856*x^3-10902676*x^2+4022620*x+1198356,8709*x^13-19435*x^12-188682*x^11+396148*x^10+1513931*x^9-2939794*x^8-5459390*x^7+9525755*x^6+8264967*x^5-12066850*x^4-3214124*x^3+2491785*x^2-335731*x-23337,16600*x^13-22824*x^12-375472*x^11+464736*x^10+3225000*x^9-3448944*x^8-13080976*x^7+11158824*x^6+25215816*x^5-13846640*x^4-20380064*x^3+1951032*x^2+5228696*x+737864,-1900*x^13+436*x^12+35576*x^11-22288*x^10-228532*x^9+312056*x^8+543528*x^7-1722068*x^6-106468*x^5+3605848*x^4-893616*x^3-1706300*x^2+388308*x+860,-10266*x^13+12966*x^12+222228*x^11-249992*x^10-1825126*x^9+1675972*x^8+7135868*x^7-4273382*x^6-13579518*x^5+1382724*x^4+11135512*x^3+6780542*x^2-2414602*x-2169118,10539*x^13-4453*x^12-234166*x^11+86188*x^10+1976101*x^9-624686*x^8-7921826*x^7+2166069*x^6+15325385*x^5-3763454*x^4-12656756*x^3+3092263*x^2+3050051*x-950183,7292*x^13-20612*x^12-171448*x^11+411984*x^10+1566404*x^9-2991032*x^8-6990056*x^7+9458436*x^6+15524340*x^5-11597560*x^4-15119728*x^3+2161900*x^2+3997596*x-110924,2078*x^13-4546*x^12-40316*x^11+94008*x^10+294018*x^9-730028*x^8-1015092*x^7+2646498*x^6+1623018*x^5-4344908*x^4-867400*x^3+2127606*x^2+228622*x-13110,-17190*x^13+18586*x^12+374540*x^11-374872*x^10-3082810*x^9+2779932*x^8+11905604*x^7-9224698*x^6-21601090*x^5+12715196*x^4+16158536*x^3-3983998*x^2-4602134*x-119618,144512*x^5-1156096*x^3+1734144*x,26916*x^13-51964*x^12-595784*x^11+1060432*x^10+5001948*x^9-7878856*x^8-19770040*x^7+25490684*x^6+36542988*x^5-31617032*x^4-26238288*x^3+4347220*x^2+4426244*x+1380076,-384*x^13-64*x^12+19968*x^11-8992*x^10-268736*x^9+145440*x^8+1418368*x^7-741568*x^6-2961120*x^5+1465696*x^4+1750304*x^3-1010368*x^2-85504*x+8160,17390*x^13-11026*x^12-366876*x^11+240312*x^10+2890098*x^9-1945708*x^8-10479668*x^7+7188850*x^6+17143834*x^5-11934860*x^4-10367656*x^3+7525414*x^2+2283294*x-1508134,48568*x^13-71688*x^12-1026224*x^11+1493312*x^10+8093256*x^9-11501456*x^8-29315280*x^7+39855304*x^6+47419336*x^5-58380304*x^4-26485248*x^3+23833688*x^2+3278776*x-2154296,-25518*x^13+21714*x^12+572764*x^11-436664*x^10-4905330*x^9+3199724*x^8+20005172*x^7-10300786*x^6-39158810*x^5+13231436*x^4+32055336*x^3-3104102*x^2-7946782*x-324250,-4931*x^13+6893*x^12+105126*x^11-145292*x^10-870925*x^9+1135742*x^8+3630930*x^7-3988413*x^6-8147729*x^5+5864718*x^4+8865908*x^3-2416063*x^2-2057243*x-24769,28218*x^13-46102*x^12-577684*x^11+968424*x^10+4326886*x^9-7526932*x^8-14248844*x^7+26296886*x^6+18365374*x^5-38553940*x^4-2849960*x^3+14983922*x^2-2186550*x-1075506,-12746*x^13+27606*x^12+278932*x^11-568488*x^10-2275158*x^9+4308772*x^8+8450364*x^7-14593270*x^6-13686542*x^5+20529476*x^4+7249240*x^3-7081746*x^2-1587930*x-34542,-23804*x^13+17860*x^12+524280*x^11-365104*x^10-4379076*x^9+2741912*x^8+17256168*x^7-9191940*x^6-32084052*x^5+12988120*x^4+23762768*x^3-5577900*x^2-4133724*x+895340,-19780*x^13+11004*x^12+405352*x^11-240016*x^10-3072796*x^9+1933608*x^8+10560792*x^7-6910876*x^6-15791948*x^5+9958280*x^4+7353136*x^3-3207700*x^2-404676*x+12756,-19879*x^13+48809*x^12+403726*x^11-1027836*x^10-2940553*x^9+8004198*x^8+8868298*x^7-28019609*x^6-7732509*x^5+41398614*x^4-6723868*x^3-16904979*x^2+4334273*x+1465907]];

E[258,1] = [x, [1,-1,1,1,-3,-1,-3,-1,1,3,-5,1,-3,3,-3,1,0,-1,7,-3,-3,5,-4,-1,4,3,1,-3,1,3,-6,-1,-5,0,9,1,-6,-7,-3,3,0,3,1,-5,-3,4,-3,1,2,-4,0,-3,12,-1,15,3,7,-1,-4,-3,12,6,-3,1,9,5,10,0,-4,-9,8,-1,-16,6,4,7,15,3,-14,-3,1,0,-9,-3,0,-1,1,5]];
E[258,2] = [x, [1,-1,-1,1,1,1,-5,-1,1,-1,1,-1,-3,5,-1,1,0,-1,-7,1,5,-1,-4,1,-4,3,-1,-5,-3,1,-2,-1,-1,0,-5,1,2,7,3,-1,8,-5,-1,1,1,4,7,-1,18,4,0,-3,-12,1,1,5,7,3,12,-1,4,2,-5,1,-3,1,6,0,4,5,-8,-1,0,-2,4,-7,-5,-3,-10,1,1,-8,-3,5,0,1,3,-1]];
E[258,3] = [x, [1,-1,-1,1,-2,1,2,-1,1,2,0,-1,2,-2,2,1,6,-1,4,-2,-2,0,6,1,-1,-2,-1,2,-2,-2,4,-1,0,-6,-4,1,4,-4,-2,2,-2,2,1,0,-2,-6,6,-1,-3,1,-6,2,-4,1,0,-2,-4,2,-8,2,-12,-4,2,1,-4,0,4,6,-6,4,0,-1,-14,-4,1,4,0,2,8,-2,1,2,4,-2,-12,-1,2,0]];
E[258,4] = [x, [1,1,-1,1,-2,-1,4,1,1,-2,4,-1,6,4,2,1,-6,1,-4,-2,-4,4,-4,-1,-1,6,-1,4,6,2,-8,1,-4,-6,-8,1,2,-4,-6,-2,2,-4,-1,4,-2,-4,4,-1,9,-1,6,6,-6,-1,-8,4,4,6,-12,2,10,-8,4,1,-12,-4,12,-6,4,-8,-8,1,-6,2,1,-4,16,-6,-16,-2,1,2,-12,-4,12,-1,-6,4]];
E[258,5] = [x, [1,1,-1,1,3,-1,-1,1,1,3,-1,-1,1,-1,-3,1,4,1,1,3,1,-1,-4,-1,4,1,-1,-1,-9,-3,2,1,1,4,-3,1,2,1,-1,3,-8,1,-1,-1,3,-4,-11,-1,-6,4,-4,1,4,-1,-3,-1,-1,-9,-12,-3,0,2,-1,1,3,1,2,4,4,-3,12,1,4,2,-4,1,1,-1,14,3,1,-8,3,1,12,-1,9,-1]];
E[258,6] = [x, [1,1,1,1,-1,1,1,1,1,-1,5,1,-7,1,-1,1,4,1,-1,-1,1,5,-4,1,-4,-7,1,1,-5,-1,-10,1,5,4,-1,1,10,-1,-7,-1,0,1,1,5,-1,-4,-1,1,-6,-4,4,-7,12,1,-5,1,-1,-5,4,-1,-8,-10,1,1,7,5,-2,4,-4,-1,-12,1,4,10,-4,-1,5,-7,10,-1,1,0,-7,1,-4,1,-5,5]];
E[258,7] = [x, [1,1,1,1,2,1,-2,1,1,2,-4,1,2,-2,2,1,-2,1,-4,2,-2,-4,2,1,-1,2,1,-2,10,2,-4,1,-4,-2,-4,1,-8,-4,2,2,6,-2,1,-4,2,2,2,1,-3,-1,-2,2,-12,1,-8,-2,-4,10,4,2,-8,-4,-2,1,4,-4,4,-2,2,-4,0,1,10,-8,-1,-4,8,2,-8,2,1,6,8,-2,-4,1,10,-4]];

E[259,1] = [x, [1,1,0,-1,4,0,1,-3,-3,4,4,0,4,1,0,-1,0,-3,-6,-4,0,4,-4,0,11,4,0,-1,-6,0,2,5,0,0,4,3,-1,-6,0,-12,-6,0,-4,-4,-12,-4,-12,0,1,11]];
E[259,2] = [x^2-x-4, [1,x,0,x+2,-x+1,0,1,x+4,-3,-4,x-1,0,-x+1,x,0,3*x,-2*x+2,-3*x,-2*x+4,-2*x-2,0,4,4,0,-x,-4,0,x+2,-2*x+4,0,x-3,x+4,0,-8,-x+1,-3*x-6,-1,2*x-8,0,-4*x,10,0,2*x-6,2*x+2,3*x-3,4*x,-2*x-2,0,1,-x-4]];
E[259,3] = [x^3-x^2-2*x+1, [1,x,-x^2+1,x^2-2,x^2-2*x-3,-x^2-x+1,-1,x^2-2*x-1,x^2+x-3,-x^2-x-1,x^2-2,-x-1,-3*x^2+x+5,-x,3*x^2+x-4,-3*x^2+x+3,3*x^2+2*x-8,2*x^2-x-1,-2*x^2+1,-4*x^2+x+7,x^2-1,x^2-1,-2*x^2+3*x+2,x^2+x-2,-3*x^2+5*x+7,-2*x^2-x+3,3*x^2-2*x-4,-x^2+2,-4*x^2+x+3,4*x^2+2*x-3,6*x^2-x-9,-4*x^2+x+5,-x-1,5*x^2-2*x-3,-x^2+2*x+3,-x^2+x+4,-1,-2*x^2-3*x+2,2*x+3,-x^2+x+6,-4*x^2+x+2,x^2+x-1,3*x^2-6*x-1,-x^2+x+3,-6*x^2+2*x+9,x^2-2*x+2,5*x^2-5*x-11,2*x^2+2*x+1,1,2*x^2+x+3]];
E[259,4] = [x^3+3*x^2-3, [1,x,-x^2-2*x+1,x^2-2,x^2+2*x-3,x^2+x-3,1,-3*x^2-4*x+3,-x^2-x+1,-x^2-3*x+3,x^2-6,x+1,3*x^2+3*x-7,x,3*x^2+5*x-6,3*x^2+3*x-5,-x^2-2*x,2*x^2+x-3,-2*x^2+5,-2*x^2-x+3,-x^2-2*x+1,-3*x^2-6*x+3,2*x^2+3*x-6,-x^2-x+6,-5*x^2-9*x+7,-6*x^2-7*x+9,3*x^2+6*x-2,x^2-2,3*x-3,-4*x^2-6*x+9,-4*x^2-3*x+11,3*x+3,4*x^2+9*x-3,x^2-3,x^2+2*x-3,-3*x^2-x+4,1,6*x^2+5*x-6,4*x^2+8*x-7,7*x^2+9*x-12,-4*x^2-7*x+6,x^2+x-3,-x^2-1,x^2+3*x+3,2*x^2+2*x-3,-3*x^2-6*x+6,5*x^2+9*x-3,2*x^2+4*x-5,1,6*x^2+7*x-15]];
E[259,5] = [x^4-x^3-6*x^2+5*x+4, [1,x,-x^3+4*x,x^2-2,x^2-3,-x^3-2*x^2+5*x+4,1,x^3-4*x,x^2+x+1,x^3-3*x,x^3-6*x+3,-x^3-x^2+x+4,-x^2+x+1,x,-x^2-3*x+4,x^3-5*x,-x^2+2*x+2,x^3+x^2+x,x^3+x^2-4*x-4,x^3+x^2-5*x+2,-x^3+4*x,x^3-2*x-4,-2*x^3+7*x,-x^2-x-4,x^3-5*x,-x^3+x^2+x,-2*x^3-3*x^2+6*x+8,x^2-2,x^3-x^2-5*x+8,-x^3-3*x^2+4*x,-x-3,-x^3+x^2+3*x-4,-x^3+3*x^2+x-12,-x^3+2*x^2+2*x,x^2-3,2*x^3+5*x^2-7*x-6,-1,2*x^3+2*x^2-9*x-4,x^3-x^2,x^2+3*x-4,-2*x^2-x+6,-x^3-2*x^2+5*x+4,-x^3+4*x+2,-x^3+4*x^2+3*x-10,2*x^3+4*x^2-8*x-7,-2*x^3-5*x^2+10*x+8,x^3-2*x^2-3*x+10,x^3+x^2-6*x-8,1,x^3+x^2-5*x-4]];
E[259,6] = [x^4-9*x^2+x+17, [1,x,-x^2+5,x^2-2,x^2-3,-x^3+5*x,-1,x^3-4*x,-x^2-x+5,x^3-3*x,-x^3-2*x^2+4*x+9,-2*x^2+x+7,x^3-5*x+2,-x,-x^2+x+2,3*x^2-x-13,x^3+2*x^2-6*x-5,-x^3-x^2+5*x,-x^3-x^2+6*x+2,4*x^2-x-11,x^2-5,-2*x^3-5*x^2+10*x+17,x^3+x^2-5*x-5,x^2-3*x,3*x^2-x-13,4*x^2+x-17,x^3+2*x^2-6*x-7,-x^2+2,-x+5,-x^3+x^2+2*x,-2*x^3-4*x^2+9*x+19,x^3-x^2-5*x,-2*x^2+x+11,2*x^3+3*x^2-6*x-17,-x^2+3,-x^3-2*x^2+3*x+7,1,-x^3-3*x^2+3*x+17,x^3-x^2-8*x+10,2*x^3-x^2-5*x,-x^3-x^2+7*x+1,x^3-5*x,2*x^3+5*x^2-8*x-23,-3*x^3-4*x^2+11*x+16,-x^3-x^2+4*x+2,x^3+4*x^2-6*x-17,-x^3+5*x+4,x^3+x^2-2*x-14,1,3*x^3-x^2-13*x]];
E[259,7] = [x^2-8, [2,0,2*x,-4,x+6,0,-2,0,10,0,-2*x-6,-4*x,-3*x+2,0,6*x+8,8,-2*x,0,4,-2*x-12,-2*x,0,-2*x,0,6*x+12,0,4*x,4,2*x,0,-3*x+2,0,-6*x-16,0,-x-6,-20,2,0,2*x-24,0,-2*x+12,0,-12,4*x+12,5*x+30,0,4*x-12,8*x,2,0]];

E[260,1] = [x, [1,0,2,0,-1,0,2,0,1,0,4,0,-1,0,-2,0,2,0,0,0,4,0,-6,0,1,0,-4,0,-10,0,0,0,8,0,-2,0,10,0,-2,0,-2,0,2,0,-1,0,-6,0,-3,0,4,0,2,0,-4,0,0,0,-8,0,2,0,2,0,1,0,-6,0,-12,0,-8,0,10,0,2,0,8,0,-16,0,-11,0,6,0]];
E[260,2] = [x^3-2*x^2-8*x+12, [1,0,x,0,1,0,-x^2+6,0,x^2-3,0,x^2-x-6,0,1,0,x,0,-2*x+2,0,-x^2-x+10,0,-2*x^2-2*x+12,0,x-4,0,1,0,2*x^2+2*x-12,0,-x^2+10,0,x^2-x-10,0,x^2+2*x-12,0,-x^2+6,0,x^2-2*x-6,0,x,0,2*x-2,0,-x,0,x^2-3,0,x^2-10,0,4*x+5,0,-2*x^2+2*x,0,-2*x^2+2*x+6,0,x^2-x-6,0,-3*x^2+2*x+12,0,x^2-3*x-10,0,x^2-2,0,-3*x^2-4*x+6,0,1,0,-x^2+2*x+10,0,x^2-4*x,0,x^2-x-6,0,3*x^2-2*x-14,0,x,0,2*x^2-2*x-24,0,-2*x+4,0,3*x^2+4*x-15,0,x^2-4*x-6,0]];

E[261,1] = [x^2-x-1, [1,x,0,x-1,2,0,2*x-1,-2*x+1,0,2*x,-2*x+5,0,-4*x+1,x+2,0,-3*x,4*x-1,0,0,2*x-2,0,3*x-2,-4*x+6,0,-1,-3*x-4,0,-x+3,1,0,-8*x+4,x-5,0,3*x+4,4*x-2,0,-4,0,0,-4*x+2,-2,0,4*x-6,5*x-7,0,2*x-4,-6*x+1,0,-2,-x,0,x-5,-8,0,-4*x+10,-5,0,x,4*x+6,0]];
E[261,2] = [x^2-2*x-1, [1,x,0,2*x-1,1,0,-2*x+2,x+2,0,x,x-2,0,-2*x+1,-2*x-2,0,3,-2*x+4,0,6,2*x-1,0,1,-4*x+6,0,-4,-3*x-2,0,-2*x-6,-1,0,5*x-2,x-4,0,-2,-2*x+2,0,-4,6*x,0,x+2,6*x-10,0,-x+6,-x+4,0,-2*x-4,3*x-4,0,1,-4*x,0,-4*x-5,-6*x+5,0,x-2,-6*x+2,0,-x,4*x-6,0]];
E[261,3] = [x^3+2*x^2-4*x-7, [1,x,0,x^2-2,2*x^2-8,0,x^2+x-2,-2*x^2+7,0,-4*x^2+14,-x^2-x+6,0,-x^2+x+6,-x^2+2*x+7,0,2*x^2-x-10,-3*x^2-x+10,0,-2*x-2,4*x^2-2*x-12,0,x^2+2*x-7,2*x^2-10,0,-4*x+3,3*x^2+2*x-7,0,2*x^2+x-3,-1,0,-2*x^2+10,-x^2-2*x,0,5*x^2-2*x-21,-2*x+2,0,2*x+4,-2*x^2-2*x,0,-2*x^2+4*x,-4*x^2-4*x+14,0,-4*x^2-4*x+12,2*x^2-x-5,0,-4*x^2-2*x+14,3*x^2+3*x-6,0,x^2+3*x-3,-4*x^2+3*x,0,-2*x^2+3*x+9,-2*x^2+4*x+8,0,8*x^2+2*x-34,-x^2+x,0,-x,2*x^2+2*x,0]];
E[261,4] = [x^2+2*x-4, [2,-x-2,0,x,2*x,0,-2*x-6,2*x+2,0,-4,-2*x-6,0,4*x+2,3*x+10,0,-3*x-6,-6,0,2*x-8,-2*x+4,0,3*x+10,-6*x-4,0,-4*x-2,-x-10,0,-x-4,2,0,-6*x-12,-x+8,0,3*x+6,-2*x-8,0,-2*x+4,4*x+4,0,-2*x+8,-4,0,8,-x-4,0,2*x+16,6*x+10,0,8*x+12,x+10,0,-3*x+8,2*x-16,0,-2*x-8,-4*x-14,0,-x-2,4*x+4,0]];
E[261,5] = [x^2-5, [2,-x-1,0,x-1,-4,0,2*x,2*x,0,2*x+2,2*x-8,0,-4*x-2,-x-5,0,-3*x-3,-4*x-2,0,0,-2*x+2,0,3*x-1,4*x-8,0,-2,3*x+11,0,-x+5,-2,0,-8*x,-x+9,0,3*x+11,-4*x,0,-8,0,0,-4*x,4,0,4*x-8,-5*x+9,0,2*x-6,6*x+4,0,-4,x+1,0,x-9,16,0,-4*x+16,10,0,x+1,-4*x-16,0]];

E[262,1] = [x, [1,1,-2,1,-2,-2,-3,1,1,-2,-6,-2,4,-3,4,1,-4,1,3,-2,6,-6,-4,-2,-1,4,4,-3,3,4,-4,1,12,-4,6,1,-3,3,-8,-2,11,6,0,-6,-2,-4,0,-2,2,-1,8,4,-12,4,12,-3,-6,3,6,4,8,-4,-3,1,-8,12]];
E[262,2] = [x^2+2*x-2, [1,1,x,1,x+2,x,-x+1,1,-2*x-1,x+2,-2*x-2,x,-x-4,-x+1,2,1,-x,-2*x-1,x+5,x+2,3*x-2,-2*x-2,-x+6,x,2*x+1,-x-4,-4,-x+1,-3,2,3*x-2,1,2*x-4,-x,x,-2*x-1,2*x-3,x+5,-2*x-2,x+2,-2*x-5,3*x-2,0,-2*x-2,-x-6,-x+6,4,x,-4*x-4,2*x+1,2*x-2,-x-4,-3*x,-4,-2*x-8,-x+1,3*x+2,-3,3*x+4,2,8*x+8,3*x-2,-5*x+3,1,-4*x-10,2*x-4]];
E[262,3] = [x^2-3*x+1, [1,1,x,1,-x+1,x,-x+1,1,3*x-4,-x+1,-x+4,x,-3*x+6,-x+1,-2*x+1,1,2*x-4,3*x-4,4*x-10,-x+1,-2*x+1,-x+4,-2*x,x,x-5,-3*x+6,2*x-3,-x+1,-4*x+6,-2*x+1,-6*x+10,1,x+1,2*x-4,x,3*x-4,6*x-12,4*x-10,-3*x+3,-x+1,7*x-6,-2*x+1,-x+5,-x+4,-2*x-1,-2*x,8*x-14,x,x-7,x-5,2*x-2,-3*x+6,4*x-2,2*x-3,-2*x+3,-x+1,2*x-4,-4*x+6,-11*x+19,-2*x+1,3*x-11,-6*x+10,-2*x-1,1,3,x+1]];
E[262,4] = [x^2+x-3, [1,-1,x,1,-x-3,-x,-x+1,-1,-x,x+3,-x-4,x,x-2,x-1,-2*x-3,1,2*x,x,-2,-x-3,2*x-3,x+4,2*x,-x,5*x+7,-x+2,-2*x-3,-x+1,-6,2*x+3,-2*x+2,-1,-3*x-3,-2*x,x,-x,-2*x-4,2,-3*x+3,x+3,3*x+6,-2*x+3,3*x-3,-x-4,2*x+3,-2*x,-4*x-6,x,-3*x-3,-5*x-7,-2*x+6,x-2,4*x-2,2*x+3,6*x+15,x-1,-2*x,6,x+11,-2*x-3,-5*x+1,2*x-2,-2*x+3,1,3,3*x+3]];
E[262,5] = [x^2-2, [1,-1,x,1,-x+2,-x,x+1,-1,-1,x-2,2*x+2,x,-3*x,-x-1,2*x-2,1,-x+4,1,-x-1,-x+2,x+2,-2*x-2,x+6,-x,-4*x+1,3*x,-4*x,x+1,2*x+3,-2*x+2,-3*x-2,-1,2*x+4,x-4,x,-1,6*x+3,x+1,-6,x-2,-2*x+3,-x-2,4*x-4,2*x+2,x-2,-x-6,-4*x-4,x,2*x-4,4*x-1,4*x-2,-3*x,-5*x-4,4*x,2*x,-x-1,-x-2,-2*x-3,-5*x-4,2*x-2,-8,3*x+2,-x-1,1,-6*x+6,-2*x-4]];
E[262,6] = [x, [1,-1,0,1,0,0,-5,-1,-3,0,2,0,-2,5,0,1,-6,3,7,0,0,-2,-6,0,-5,2,0,-5,-3,0,2,-1,0,6,0,-3,-1,-7,0,0,-9,0,12,2,0,6,0,0,18,5,0,-2,10,0,0,5,0,3,-4,0,-8,-2,15,1,0,0]];

E[263,1] = [x^5+2*x^4-3*x^3-6*x^2+1, [1,x,-x^4-x^3+3*x^2+2*x-1,x^2-2,x^4+x^3-4*x^2-3*x+1,x^4-4*x^2-x+1,x^4+2*x^3-3*x^2-6*x-1,x^3-4*x,x^4+x^3-2*x^2-2*x-2,-x^4-x^3+3*x^2+x-1,-x^3+x^2+3*x-2,x^3-x^2-3*x+1,-x^3-x^2+4*x-1,-x-1,x^2+2*x-1,x^4-6*x^2+4,-4*x^4-5*x^3+14*x^2+12*x-6,-x^4+x^3+4*x^2-2*x-1,-x^4-3*x^3+3*x^2+10*x-1,-x^4-2*x^3+3*x^2+5*x-1,x^2+x-1,-x^4+x^3+3*x^2-2*x,3*x^4+4*x^3-10*x^2-10*x+2,-x^4-x^3+5*x^2+3*x-2,x^3+x^2-2*x-4,-x^4-x^3+4*x^2-x,3*x^4+4*x^3-11*x^2-9*x+4,-2*x^4-4*x^3+5*x^2+11*x+2,-x^4+2*x^3+6*x^2-4*x-4,x^3+2*x^2-x,-2*x^4-4*x^3+5*x^2+12*x+1,-2*x^4-5*x^3+6*x^2+12*x-1,2*x^3-2*x^2-5*x+2,3*x^4+2*x^3-12*x^2-6*x+4,x+2,x^4-x^3-4*x^2+3*x+5,-x^4+2*x^3+5*x^2-8*x-5,-x^4+4*x^2-x+1,4*x^4+3*x^3-13*x^2-6*x+4,2*x^4+2*x^3-7*x^2-3*x+3,5*x^4+6*x^3-19*x^2-16*x+6,x^3+x^2-x,7*x^4+8*x^3-26*x^2-21*x+9,3*x^4+2*x^3-10*x^2-6*x+5]];
E[263,2] = [x^17-x^16-26*x^15+24*x^14+274*x^13-225*x^12-1505*x^11+1041*x^10+4613*x^9-2467*x^8-7815*x^7+2761*x^6+6709*x^5-974*x^4-2284*x^3-239*x^2+135*x+19, [668441,668441*x,85010*x^16-176339*x^15-2241538*x^14+4190472*x^13+23933223*x^12-39391493*x^11-132842471*x^10+186205893*x^9+408643734*x^8-465256935*x^7-683138027*x^6+586757546*x^5+555506577*x^4-303194375*x^3-158959094*x^2+17326687*x+6750715,668441*x^2-1336882,143848*x^16-199927*x^15-3606981*x^14+4857661*x^13+36214213*x^12-46276983*x^11-186415557*x^10+219401931*x^9+523834133*x^8-543663031*x^7-789092227*x^6+674003695*x^5+572350237*x^4-346151879*x^3-145298876*x^2+28757148*x+6281260,-91329*x^16-31278*x^15+2150232*x^14+640483*x^13-20264243*x^12-4902421*x^11+97710483*x^10+16492604*x^9-255537265*x^8-18784877*x^7+352044936*x^6-14825513*x^5-220394635*x^4+35203746*x^3+37644077*x^2-4725635*x-1615190,-43514*x^16+387440*x^15+1361549*x^14-9030537*x^13-16703058*x^12+83027396*x^11+103963774*x^10-382002286*x^9-350947554*x^8+922397046*x^7+629731852*x^6-1116987852*x^5-539197064*x^4+560122572*x^3+159965080*x^2-45325035*x-6004853,668441*x^3-2673764*x,42054*x^16-262455*x^15-1209902*x^14+6116298*x^13+14043018*x^12-56453950*x^11-84463769*x^10+262318806*x^9+280220078*x^8-644775138*x^7-501512106*x^6+801919566*x^5+434439282*x^4-416801437*x^3-135528601*x^2+35976810*x+9629069,-56079*x^16+133067*x^15+1405309*x^14-3200139*x^13-13911183*x^12+30075683*x^11+69656163*x^10-139736691*x^9-188790015*x^8+335079893*x^7+276839367*x^6-392725995*x^5-206043927*x^4+183249956*x^3+63136820*x^2-13138220*x-2733112,-47976*x^16-59269*x^15+1131843*x^14+1309592*x^13-10511458*x^12-11592732*x^11+48829796*x^10+52587277*x^9-120312720*x^8-129264310*x^7+158327476*x^6+165877480*x^5-115340775*x^4-92636576*x^3+50139863*x^2+9500135*x-3596410,-292627*x^16+128356*x^15+7315455*x^14-3621041*x^13-73317892*x^12+39043324*x^11+377251035*x^10-206648374*x^9-1061380988*x^8+568822671*x^7+1603609910*x^6-781183466*x^5-1164763854*x^4+435437391*x^3+291364922*x^2-23939149*x-11766179,81195*x^16-58067*x^15-2131430*x^14+1449193*x^13+22632202*x^12-14341944*x^11-124620842*x^10+71906730*x^9+378754518*x^8-193643585*x^7-622117679*x^6+271133268*x^5+494039702*x^4-164894323*x^3-139152381*x^2+15752546*x+8602445,343926*x^16+230185*x^15-7986201*x^14-4780222*x^13+73236746*x^12+38475204*x^11-336704212*x^10-150217472*x^9+815048008*x^8+289669942*x^7-996845698*x^6-247261638*x^5+517739936*x^4+60579104*x^3-55724881*x^2-130463*x+826766,33901*x^16+195128*x^15-734373*x^14-4348962*x^13+5964676*x^12+38079778*x^11-21329382*x^10-165695826*x^9+24034258*x^8+373508124*x^7+41245074*x^6-413682388*x^5-118411148*x^4+187871331*x^3+74098916*x^2-21479655*x-4189942,668441*x^4-4010646*x^2+2673764,-163352*x^16-181517*x^15+3926005*x^14+3879384*x^13-37768822*x^12-31928283*x^11+185718644*x^10+125556894*x^9-494068580*x^8-234706784*x^7+687597052*x^6+170902912*x^5-422743240*x^4-10753004*x^3+54574006*x^2+56457*x+1613950,-220401*x^16-116498*x^15+5107002*x^14+2520222*x^13-46991800*x^12-21172499*x^11+218540592*x^10+86224976*x^9-541027920*x^8-172860096*x^7+685808472*x^6+152298996*x^5-375840841*x^4-39477265*x^3+46027716*x^2+3951779*x-799026,-305545*x^16+396376*x^15+7729643*x^14-9663251*x^13-78677679*x^12+92893507*x^11+412897535*x^10-447731635*x^9-1189364747*x^8+1138378461*x^7+1843017565*x^6-1462656613*x^5-1374163219*x^4+784387360*x^3+357763439*x^2-64709348*x-17273024,-210708*x^16+347109*x^15+5359719*x^14-8260859*x^13-54970518*x^12+77811234*x^11+291472662*x^10-368901450*x^9-850935266*x^8+925908044*x^7+1340292578*x^6-1177817306*x^5-1016071464*x^4+627356142*x^3+264056651*x^2-52676743*x-11497019,230655*x^16+104003*x^15-5477067*x^14-2081190*x^13+51975564*x^12+15945274*x^11-252394580*x^10-57891692*x^9+669784150*x^8+98335400*x^7-965614658*x^6-62142906*x^5+701195070*x^4-2680705*x^3-205873841*x^2+3745997*x+11268782,-107245*x^16-115533*x^15+2461016*x^14+2633966*x^13-22387332*x^12-23374084*x^11+102530293*x^10+101000568*x^9-247621102*x^8-216604964*x^7+298339216*x^6+206530209*x^5-139365200*x^4-59437321*x^3-1966129*x^2+2880350*x+911544,190268*x^16+65799*x^15-4573543*x^14-1121760*x^13+43799157*x^12+6118939*x^11-212988923*x^10-5212643*x^9+555260801*x^8-59217770*x^7-748409934*x^6+192621427*x^5+440494369*x^4-187017515*x^3-54965704*x^2+29420594*x+739471,18387*x^16-230291*x^15-898457*x^14+5580940*x^13+13730735*x^12-53347758*x^11-97444633*x^10+255522155*x^9+357986392*x^8-645700341*x^7-677330191*x^6+828121715*x^5+591207963*x^4-447402638*x^3-169165156*x^2+37189736*x+8790293,-182820*x^16+74928*x^15+4741247*x^14-2266478*x^13-49751449*x^12+26239789*x^11+271136067*x^10-150472493*x^9-818451701*x^8+455230155*x^7+1341380923*x^6-699413509*x^5-1060536893*x^4+448490811*x^3+286306875*x^2-41781650*x-14197232,23128*x^16-20360*x^15-499487*x^14+384772*x^13+3926931*x^12-2422367*x^11-12617265*x^10+4201983*x^9+6664480*x^8+12421246*x^7+46953873*x^6-50697553*x^5-85810393*x^4+46296999*x^3+35158151*x^2-2358880*x-1542705,128760*x^16-318437*x^15-3246680*x^14+7454516*x^13+32880147*x^12-68497690*x^11-171530087*x^10+312449599*x^9+491846360*x^8-736724891*x^7-763948559*x^6+842473872*x^5+582381989*x^4-362325457*x^3-161338545*x^2+2263337*x+4329747,661139*x^16+180995*x^15-15757544*x^14-2937904*x^13+149264670*x^12+14849626*x^11-716171986*x^10-7478058*x^9+1840030492*x^8-153858100*x^7-2456305028*x^6+444316106*x^5+1473957156*x^4-390443041*x^3-237862309*x^2+45046826*x+5475112,-