\\ an_s2g0new_101-200.gp \\ This is a PARI readable nonnormalized basis for S_2(Gamma_0(N)) for N \\ in the range: 101 <= N <= 200. \\ The number of a_n computed is sufficient to satisfy Sturm's bound. \\ William Stein (was@math.berkeley.edu) E[101,1] = [x^7-13*x^5+2*x^4+47*x^3-16*x^2-43*x+14, [4,4*x,x^6+x^5-10*x^4-10*x^3+19*x^2+17*x+2,4*x^2-8,-2*x^6-3*x^5+22*x^4+28*x^3-58*x^2-45*x+30,x^6+3*x^5-12*x^4-28*x^3+33*x^2+45*x-14,-x^5-2*x^4+10*x^3+16*x^2-21*x-14,4*x^3-16*x,x^6+2*x^5-10*x^4-20*x^3+21*x^2+34*x-4,-3*x^6-4*x^5+32*x^4+36*x^3-77*x^2-56*x+28,-x^6+12*x^4-35*x^2+20,x^6-x^5-10*x^4+6*x^3+23*x^2-5*x-18,3*x^6+4*x^5-34*x^4-36*x^3+91*x^2+48*x-40,-x^6-2*x^5+10*x^4+16*x^3-21*x^2-14*x,-3*x^6-3*x^5+34*x^4+30*x^3-93*x^2-55*x+50,4*x^4-24*x^2+16,3*x^6+3*x^5-32*x^4-28*x^3+79*x^2+45*x-42]]; E[101,2] = [x, [1,0,-2,-2,-1,0,-2,0,1,0,-2,4,1,0,2,4,3]]; E[102,1] = [x, [1,1,1,1,-2,1,0,1,1,-2,-4,1,-2,0,-2,1,1,1,4,-2,0,-4,0,1,-1,-2,1,0,-10,-2,8,1,-4,1,0,1]]; E[102,2] = [x, [1,-1,1,1,0,-1,2,-1,1,0,0,1,2,-2,0,1,-1,-1,-4,0,2,0,-6,-1,-5,-2,1,2,0,0,-10,-1,0,1,0,1]]; E[102,3] = [x, [1,-1,-1,1,-4,1,-2,-1,1,4,0,-1,-6,2,4,1,-1,-1,4,-4,2,0,6,1,11,6,-1,-2,-4,-4,-6,-1,0,1,8,1]]; E[103,1] = [x^2+3*x+1, [1,x,-1,-3*x-3,-x-3,-x,-1,4*x+3,-2,1,x,3*x+3,3*x+3,-x,x+3,-3*x+2,x-3]]; E[103,2] = [x^6-4*x^5-x^4+17*x^3-9*x^2-16*x+11, [1,x,-x^5+3*x^4+3*x^3-11*x^2-x+8,x^2-2,2*x^5-5*x^4-9*x^3+19*x^2+9*x-13,-x^5+2*x^4+6*x^3-10*x^2-8*x+11,-x^4+2*x^3+4*x^2-5*x-3,x^3-4*x,-x^5+3*x^4+5*x^3-15*x^2-7*x+17,3*x^5-7*x^4-15*x^3+27*x^2+19*x-22,-x^5+2*x^4+4*x^3-4*x^2-4*x-1,-x^4+x^3+5*x^2-3*x-5,2*x^5-4*x^4-11*x^3+15*x^2+14*x-11,-x^5+2*x^4+4*x^3-5*x^2-3*x,x^4-3*x^3-x^2+7*x-5,x^4-6*x^2+4,-3*x^5+7*x^4+16*x^3-30*x^2-21*x+30]]; E[104,1] = [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]]; E[104,2] = [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]]; E[105,1] = [x, [1,1,1,-1,1,1,1,-3,1,1,0,-1,-6,1,1,-1,2,1,-8,-1,1,0,8,-3,1,-6,1,-1,-2,1,4,5]]; E[105,2] = [x^2-5, [1,x,-1,3,-1,-x,1,x,1,-x,-2*x+2,-3,-2*x,x,1,-1,-2,x,2*x+2,-3,-1,2*x-10,4,-x,1,-10,-1,3,-2,x,2*x+6,-3*x]]; E[106,1] = [x, [1,1,-2,1,3,-2,2,1,1,3,-3,-2,-4,2,-6,1,3,1,-4,3,-4,-3,-9,-2,4,-4,4]]; E[106,2] = [x, [1,1,1,1,0,1,-4,1,-2,0,0,1,5,-4,0,1,-3,-2,-1,0,-4,0,3,1,-5,5,-5]]; E[106,3] = [x, [1,-1,2,1,1,-2,-2,-1,1,-1,5,2,-4,2,2,1,3,-1,-4,1,-4,-5,-3,-2,-4,4,-4]]; E[106,4] = [x, [1,-1,-1,1,-4,1,0,-1,-2,4,-4,-1,1,0,4,1,5,2,-7,-4,0,4,1,1,11,-1,5]]; E[107,1] = [x^2+x-1, [1,x,-x-2,-x-1,-x-2,-x-1,2*x-1,-2*x-1,3*x+2,-x-1,2*x+3,2*x+3,-6,-3*x+2,3*x+5,3*x,x-1,-x+3]]; E[107,2] = [x^7+x^6-10*x^5-7*x^4+29*x^3+12*x^2-20*x-8, [4,4*x,-x^6-x^5+10*x^4+3*x^3-29*x^2+8*x+16,4*x^2-8,2*x^6+2*x^5-16*x^4-10*x^3+30*x^2+4*x,-4*x^4+20*x^2-4*x-8,-2*x^6-2*x^5+16*x^4+14*x^3-30*x^2-24*x+8,4*x^3-16*x,x^6-x^5-8*x^4+9*x^3+15*x^2-18*x-4,4*x^5+4*x^4-28*x^3-20*x^2+40*x+16,2*x^5-2*x^4-16*x^3+10*x^2+22*x,2*x^6-2*x^5-20*x^4+14*x^3+54*x^2-24*x-32,2*x^6-22*x^4+2*x^3+68*x^2-14*x-32,-4*x^5+28*x^3-32*x-16,-2*x^6+2*x^5+24*x^4-22*x^3-78*x^2+56*x+40,4*x^4-24*x^2+16,4*x^5+4*x^4-28*x^3-20*x^2+40*x+16,-2*x^6+2*x^5+16*x^4-14*x^3-30*x^2+16*x+8]]; E[108,1] = [x, [1,0,0,0,0,0,5,0,0,0,0,0,-7,0,0,0,0,0,-1,0,0,0,0,0,-5,0,0,0,0,0,-4,0,0,0,0,0,-1,0,0,0,0,0,8,0,0,0,0,0,18,0,0,0,0,0,0,0,0,0,0,0,-13,0,0,0]]; E[109,1] = [x, [1,1,0,-1,3,0,2,-3,-3,3,1,0,0,2,0,-1,-8,-3]]; E[109,2] = [x^3+2*x^2-x-1, [1,x,-x-2,x^2-2,-2*x^2-3*x,-x^2-2*x,3*x^2+5*x-3,-2*x^2-3*x+1,x^2+4*x+1,x^2-2*x-2,x^2+2*x-5,x+3,-2*x^2-x+3,-x^2+3,3*x^2+8*x+2,-x^2-x+2,-x^2-3*x+1,2*x^2+2*x+1]]; E[109,3] = [x^4+x^3-5*x^2-4*x+3, [1,x,-x^3+4*x+1,x^2-2,-x,x^3-x^2-3*x+3,x^3-x^2-4*x+2,x^3-4*x,-x^3-x^2+3*x+4,-x^2,x^3+x^2-5*x,2*x^2-x-5,2*x^2+x-7,-2*x^3+x^2+6*x-3,-x^3+x^2+3*x-3,-x^3-x^2+4*x+1,x^3-x^2-2*x+6,-2*x^2+3]]; E[110,1] = [x, [1,1,-1,1,1,-1,3,1,-2,1,1,-1,-6,3,-1,1,-7,-2,5,1,-3,1,-6,-1,1,-6,5,3,5,-1,-3,1,-1,-7,3,-2]]; E[110,2] = [x, [1,1,1,1,-1,1,-1,1,-2,-1,-1,1,2,-1,-1,1,-3,-2,-1,-1,-1,-1,6,1,1,2,-5,-1,-9,-1,5,1,-1,-3,1,-2]]; E[110,3] = [x, [1,-1,1,1,-1,-1,5,-1,-2,1,1,1,2,-5,-1,1,3,2,-7,-1,5,-1,-6,-1,1,-2,-5,5,-3,1,-7,-1,1,-3,-5,-2]]; E[110,4] = [x^2+x-8, [1,-1,x,1,1,-x,-x,-1,-x+5,-1,-1,x,2,x,x,1,-x-2,x-5,x+4,1,x-8,1,-2*x-4,-x,1,-2,3*x-8,-x,-x-2,-x,-x,-1,-x,x+2,-x,-x+5]]; E[111,1] = [x^3-3*x^2-x+5, [1,x,-1,x^2-2,-x^2+5,-x,-2*x^2+2*x+4,3*x^2-3*x-5,1,-3*x^2+4*x+5,2*x^2-4*x-2,-x^2+2,2*x^2-4*x-4,-4*x^2+2*x+10,x^2-5,4*x^2-2*x-11,-x^2+4*x+1,x,2*x^2-2*x-8,-3*x^2+2*x+5,2*x^2-2*x-4,2*x^2-10,-x^2+2*x+1,-3*x^2+3*x+5,-2*x+5]]; E[111,2] = [x^4-6*x^2+2*x+5, [1,x,1,x^2-2,-x^3-2*x^2+3*x+4,x,2*x^3+2*x^2-8*x-2,x^3-4*x,1,-2*x^3-3*x^2+6*x+5,2*x^2-6,x^2-2,-2*x^3-4*x^2+6*x+10,2*x^3+4*x^2-6*x-10,-x^3-2*x^2+3*x+4,-2*x-1,-x^3+3*x-2,x,2*x^2+2*x-4,-x^3-2*x^2+3*x+2,2*x^3+2*x^2-8*x-2,2*x^3-6*x,3*x^3+2*x^2-11*x-4,x^3-4*x,2*x^3+4*x^2-4*x-9]]; E[112,1] = [x, [1,0,2,0,0,0,-1,0,1,0,0,0,-4,0,0,0,6,0,-2,0,-2,0,0,0,-5,0,-4,0,-6,0,4,0,0,0,0,0,2,0,-8,0,6,0,-8,0,0,0]]; E[112,2] = [x, [1,0,-2,0,-4,0,-1,0,1,0,0,0,0,0,8,0,-2,0,2,0,2,0,-8,0,11,0,4,0,2,0,-4,0,0,0,4,0,-6,0,0,0,-2,0,-8,0,-4,0]]; E[112,3] = [x, [1,0,0,0,2,0,1,0,-3,0,4,0,2,0,0,0,-6,0,-8,0,0,0,0,0,-1,0,0,0,6,0,-8,0,0,0,2,0,-2,0,0,0,2,0,4,0,-6,0]]; E[113,1] = [x, [1,-1,2,-1,2,-2,0,3,1,-2,0,-2,2,0,4,-1,-6,-1,6]]; E[113,2] = [x^3+2*x^2-x-1, [1,x,-x^2-2*x-1,x^2-2,2*x^2+2*x-3,-2*x-1,-x^2-x-2,-2*x^2-3*x+1,3*x^2+7*x,-2*x^2-x+2,-3*x^2-4*x+4,3*x+2,x^2+4*x-2,x^2-3*x-1,-x^2+1,-x^2-x+2,-x^2-5*x-2,x^2+3*x+3,3*x^2+5*x-4]]; E[113,3] = [x^3+2*x^2-5*x-9, [1,x,x^2-5,x^2-2,-1,-2*x^2+9,-x^2-x+6,-2*x^2+x+9,-x^2-x+4,-x,x^2-4,2*x^2-x-8,x^2-2,x^2+x-9,-x^2+5,3*x^2-x-14,x^2-x-2,x^2-x-9,-3*x^2+x+16]]; E[113,4] = [x^2-2*x-2, [1,1,x,-1,-2*x+2,x,4,-3,2*x-1,-2*x+2,-2*x,-x,2*x-4,4,-2*x-4,-1,-2,2*x-1,x-4]]; E[114,1] = [x, [1,-1,-1,1,0,1,4,-1,1,0,4,-1,0,-4,0,1,-2,-1,1,0,-4,-4,-2,1,-5,0,-1,4,-6,0,6,-1,-4,2,0,1,-8,-1,0,0]]; E[114,2] = [x, [1,1,-1,1,2,-1,0,1,1,2,-4,-1,2,0,-2,1,-6,1,-1,2,0,-4,-4,-1,-1,2,-1,0,-2,-2,4,1,4,-6,0,1,10,-1,-2,2]]; E[114,3] = [x, [1,1,1,1,0,1,-4,1,1,0,0,1,-4,-4,0,1,6,1,1,0,-4,0,-6,1,-5,-4,1,-4,6,0,2,1,0,6,0,1,-4,1,-4,0]]; E[115,1] = [x, [1,2,0,2,-1,0,1,0,-3,-2,2,0,-2,2,0,-4,3,-6,-2,-2,0,4,1,0]]; E[115,2] = [x^2+3*x+1, [1,x,-1,-3*x-3,-1,-x,-2*x-4,4*x+3,-2,-x,2*x+2,3*x+3,2*x-1,2*x+2,1,-3*x+2,-4*x-8,-2*x,6*x+10,3*x+3,2*x+4,-4*x-2,-1,-4*x-3]]; E[115,3] = [x^4-2*x^3-4*x^2+5*x+2, [1,x,-x^2+x+2,x^2-2,1,-x^3+x^2+2*x,x^3-2*x^2-4*x+3,x^3-4*x,x^2-x-1,x,-2*x+2,-x^3+3*x-2,-2*x^3+3*x^2+7*x-4,-2*x-2,-x^2+x+2,2*x^3-2*x^2-5*x+2,-x^3+2*x^2+2*x-3,x^3-x^2-x,2*x-2,x^2-2,2*x^3-2*x^2-8*x+4,-2*x^2+2*x,-1,-3*x^2-x+2]]; E[116,1] = [x, [1,0,1,0,3,0,-4,0,-2,0,3,0,5,0,3,0,-6,0,-4,0,-4,0,-6,0,4,0,-5,0,-1,0]]; E[116,2] = [x, [1,0,2,0,-2,0,4,0,1,0,-6,0,2,0,-4,0,2,0,-6,0,8,0,4,0,-1,0,-4,0,-1,0]]; E[116,3] = [x, [1,0,-3,0,3,0,4,0,6,0,-1,0,-3,0,-9,0,2,0,4,0,-12,0,-6,0,4,0,-9,0,-1,0]]; E[117,1] = [x, [1,-1,0,-1,-2,0,-4,3,0,2,-4,0,1,4,0,-1,-2,0,0,2,0,4,0,0,-1,-1,0,4]]; E[117,2] = [x^2-2*x-1, [1,x,0,2*x-1,-2*x+2,0,-2*x+2,x+2,0,-2*x-2,2,0,-1,-2*x-2,0,3,4*x-6,0,2*x-2,-2*x-6,0,2*x,4,0,3,-x,0,-2*x-6]]; E[117,3] = [x^2-3, [1,x,0,1,0,0,2,-x,0,0,-2*x,0,1,2*x,0,-5,-4*x,0,2,0,0,-6,4*x,0,-5,x,0,2]]; E[118,1] = [x, [1,1,2,1,-2,2,-3,1,1,-2,-1,2,-3,-3,-4,1,7,1,4,-2,-6,-1,4,2,-1,-3,-4,-3,4,-4]]; E[118,2] = [x, [1,1,-1,1,1,-1,3,1,-2,1,2,-1,-6,3,-1,1,-2,-2,-5,1,-3,2,4,-1,-4,-6,5,3,-5,-1]]; E[118,3] = [x, [1,-1,-1,1,-3,1,-1,-1,-2,3,-2,-1,-2,1,3,1,-2,2,3,-3,1,2,0,1,4,2,5,-1,-1,-3]]; E[118,4] = [x, [1,-1,2,1,2,-2,-3,-1,1,-2,1,2,3,3,4,1,-1,-1,-8,2,-6,-1,8,-2,-1,-3,-4,-3,-4,-4]]; E[119,1] = [x^4+x^3-5*x^2-x+3, [1,x,-x^3-x^2+4*x+1,x^2-2,x^3+x^2-4*x,-x^2+3,1,x^3-4*x,-x^3-3*x^2+2*x+7,x^2+x-3,-2*x,x^3+2*x^2-5*x-2,2*x^3+4*x^2-6*x-4,x,2*x^2+2*x-9,-x^3-x^2+x+1,-1,-2*x^3-3*x^2+6*x+3,-2*x^3-4*x^2+4*x+8,-x^3-x^2+5*x,-x^3-x^2+4*x+1,-2*x^2,2*x^2+4*x-6,x^3+2*x^2-x-9]]; E[119,2] = [x^5-2*x^4-8*x^3+14*x^2+14*x-17, [1,x,-x^4+6*x^2+x-4,x^2-2,2*x^4+x^3-15*x^2-6*x+18,-2*x^4-2*x^3+15*x^2+10*x-17,-1,x^3-4*x,2*x^4+x^3-13*x^2-8*x+13,5*x^4+x^3-34*x^2-10*x+34,-2*x^4-2*x^3+14*x^2+12*x-14,-4*x^4-x^3+26*x^2+9*x-26,-2*x^4+14*x^2-14,-x,-x^4-x^3+7*x^2+3*x-4,x^4-6*x^2+4,1,5*x^4+3*x^3-36*x^2-15*x+34,-2*x^4+14*x^2+2*x-14,7*x^4+4*x^3-50*x^2-24*x+49,x^4-6*x^2-x+4,-6*x^4-2*x^3+40*x^2+14*x-34,2*x^2-10,-5*x^4-2*x^3+35*x^2+10*x-34]]; E[120,1] = [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]]; E[120,2] = [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]]; E[121,1] = [x, [1,2,-1,2,1,-2,2,0,-2,2,0,-2,-4,4,-1,-4,2,-4,0,2,-2,0]]; E[121,2] = [x, [1,1,2,-1,1,2,-2,-3,1,1,0,-2,1,-2,2,-1,-5,1,6,-1,-4,0]]; E[121,3] = [x, [1,-1,2,-1,1,-2,2,3,1,-1,0,-2,-1,-2,2,-1,5,-1,-6,-1,4,0]]; E[121,4] = [x, [1,0,-1,-2,-3,0,0,0,-2,0,0,2,0,0,3,4,0,0,0,6,0,0]]; E[122,1] = [x^3+x^2-5*x+2, [1,1,x,1,-x^2-3*x+3,x,2*x^2+3*x-5,1,x^2-3,-x^2-3*x+3,-x^2-x+1,x,-x^2-x+3,2*x^2+3*x-5,-2*x^2-2*x+2,1,-2*x^2-4*x+4,x^2-3,x^2+2*x-4,-x^2-3*x+3,x^2+5*x-4,-x^2-x+1,3*x^2+4*x-9,x,3*x^2+5*x-6,-x^2-x+3,-x^2-x-2,2*x^2+3*x-5,x^2+4*x-2,-2*x^2-2*x+2,-2*x^2-x+6]]; E[122,2] = [x, [1,-1,-2,1,1,2,-5,-1,1,-1,-3,-2,-3,5,-2,1,0,-1,0,1,10,3,5,2,-4,3,4,-5,6,2,0]]; E[122,3] = [x^2-x-3, [1,-1,x,1,0,-x,-x+3,-1,x,0,-2*x+2,x,-2*x+4,x-3,0,1,2*x-2,-x,3*x-1,0,2*x-3,2*x-2,-3*x,-x,-5,2*x-4,-2*x+3,-x+3,-x-5,0,-x]]; E[123,1] = [x, [1,-2,1,2,-4,-2,-2,0,1,8,-3,2,-6,4,-4,-4,3,-2,0,-8,-2,6,-6,0,11,12,1,-4]]; E[123,2] = [x^2-2, [1,x,1,0,-x+2,x,x-2,-2*x,1,2*x-2,-x+1,0,-3*x+2,-2*x+2,-x+2,-4,x+1,x,x-4,0,x-2,x-2,x,-2*x,-4*x+1,2*x-6,1,0]]; E[123,3] = [x^3-x^2-4*x+2, [1,x,-1,x^2-2,-x^2+x+4,-x,-x^2-x+4,x^2-2,1,2,-x-1,-x^2+2,x^2-x,-2*x^2+2,x^2-x-4,-x^2+2*x+2,2*x^2-x-5,x,x^2-x-2,2*x^2-8,x^2+x-4,-x^2-x,x^2-x-6,-x^2+2,-4*x^2+2*x+13,4*x-2,-1,-4*x-4]]; E[123,4] = [x, [1,0,-1,-2,-2,0,-4,0,1,0,5,2,-4,0,2,4,-5,0,-2,4,4,0,4,0,-1,0,-1,8]]; E[124,1] = [x, [1,0,-2,0,-3,0,-1,0,1,0,-6,0,2,0,6,0,6,0,-1,0,2,0,-6,0,4,0,4,0,0,0,1,0]]; E[124,2] = [x, [1,0,0,0,1,0,3,0,-3,0,6,0,-4,0,0,0,0,0,-5,0,0,0,-4,0,-4,0,0,0,2,0,-1,0]]; E[125,1] = [x^2+x-1, [1,x,-x-2,-x-1,0,-x-1,-3,-2*x-1,3*x+2,0,-3,2*x+3,3*x,-3*x,0,3*x,-2*x+1,-x+3,x-2,0,3*x+6,-3*x,2*x+2,3*x+4,0]]; E[125,2] = [x^2-x-1, [1,x,-x+2,x-1,0,x-1,3,-2*x+1,-3*x+2,0,-3,2*x-3,3*x,3*x,0,-3*x,-2*x-1,-x-3,-x-2,0,-3*x+6,-3*x,2*x-2,-3*x+4,0]]; E[125,3] = [x^4-8*x^2+11, [2,2*x,-x^3+5*x,2*x^2-4,0,-3*x^2+11,x^3-7*x,2*x^3-8*x,-x^2+5,0,4,-x^3+x,-4*x,x^2-11,0,4*x^2-14,-2*x^3+10*x,-x^3+5*x,-2*x^2+18,0,4*x^2-22,4*x,x^3-3*x,-x^2-11,0]]; E[126,1] = [x, [1,-1,0,1,2,0,-1,-1,0,-2,4,0,6,1,0,1,-2,0,-4,2,0,-4,-8,0,-1,-6,0,-1,2,0,0,-1,0,2,-2,0,-10,4,0,-2,6,0,-4,4,0,8,0,0]]; E[126,2] = [x, [1,1,0,1,0,0,1,1,0,0,0,0,-4,1,0,1,-6,0,2,0,0,0,0,0,-5,-4,0,1,6,0,-4,1,0,-6,0,0,2,2,0,0,-6,0,8,0,0,0,12,0]]; E[127,1] = [x^3+3*x^2-3, [1,x,-x^2-2*x,x^2-2,x^2+x-4,x^2-3,x^2+x-3,-3*x^2-4*x+3,x^2+3*x,-2*x^2-4*x+3,x^2+4*x+1,-x^2+x+3,-3*x^2-4*x+4,-2*x^2-3*x+3,2*x^2+5*x,3*x^2+3*x-5,-x-7,3,x^2+x-1,x+2,x^2+3*x]]; E[127,2] = [x^7-2*x^6-8*x^5+15*x^4+17*x^3-28*x^2-11*x+15, [1,x,x^6-2*x^5-6*x^4+12*x^3+4*x^2-11*x+4,x^2-2,-x^6+x^5+8*x^4-6*x^3-16*x^2+5*x+9,2*x^5-3*x^4-13*x^3+17*x^2+15*x-15,-x^5+x^4+7*x^3-7*x^2-9*x+8,x^3-4*x,x^5-3*x^4-7*x^3+19*x^2+9*x-17,-x^6+9*x^4+x^3-23*x^2-2*x+15,x^6-2*x^5-6*x^4+13*x^3+3*x^2-15*x+6,x^5-x^4-7*x^3+7*x^2+7*x-8,-2*x^6+6*x^5+11*x^4-38*x^3-2*x^2+39*x-13,-x^6+x^5+7*x^4-7*x^3-9*x^2+8*x,-x^5+4*x^4+6*x^3-24*x^2-8*x+21,x^4-6*x^2+4,x^6-x^5-9*x^4+6*x^3+24*x^2-6*x-15,x^6-3*x^5-7*x^4+19*x^3+9*x^2-17*x,2*x^6-5*x^5-11*x^4+32*x^3+2*x^2-33*x+11,-x^5+6*x^3+2*x^2-6*x-3,x^6-3*x^5-4*x^4+20*x^3-10*x^2-23*x+17]]; E[128,1] = [x, [1,0,-2,0,-2,0,-4,0,1,0,2,0,-2,0,4,0,-2,0,-2,0,8,0,4,0,-1,0,4,0,6,0,0,0]]; E[128,2] = [x, [1,0,-2,0,2,0,4,0,1,0,2,0,2,0,-4,0,-2,0,-2,0,-8,0,-4,0,-1,0,4,0,-6,0,0,0]]; E[128,3] = [x, [1,0,2,0,2,0,-4,0,1,0,-2,0,2,0,4,0,-2,0,2,0,-8,0,4,0,-1,0,-4,0,-6,0,0,0]]; E[128,4] = [x, [1,0,2,0,-2,0,4,0,1,0,-2,0,-2,0,-4,0,-2,0,2,0,8,0,-4,0,-1,0,-4,0,6,0,0,0]]; E[129,1] = [x, [1,1,1,-1,2,1,0,-3,1,2,0,-1,-2,0,2,-1,-6,1,4,-2,0,0,-4,-3,-1,-2,1,0,-6]]; E[129,2] = [x^2-2*x-1, [1,x,-1,2*x-1,-x+2,-x,-2*x+3,x+2,1,-1,-x+4,-2*x+1,-5,-x-2,x-2,3,-2*x,x,4*x-5,x-4,2*x-3,2*x-1,6,-x-2,-2*x,-5*x,-1,-7,3*x]]; E[129,3] = [x^3+2*x^2-5*x-8, [1,x,1,x^2-2,-x-2,x,-x^2+6,-2*x^2+x+8,1,-x^2-2*x,x^2-x-5,x^2-2,3,2*x^2+x-8,-x-2,3*x^2-2*x-12,-x^2+5,x,-x^2-2*x+2,-3*x-4,-x^2+6,-3*x^2+8,3*x^2+2*x-9,-2*x^2+x+8,x^2+4*x-1,3*x,1,-x^2+2*x+4,-x]]; E[129,4] = [x, [1,0,-1,-2,-2,0,-2,0,1,0,-5,2,3,0,2,4,-3,0,2,4,2,0,-1,0,-1,0,-1,4,0]]; E[130,1] = [x, [1,-1,-2,1,1,2,-4,-1,1,-1,-6,-2,1,4,-2,1,-6,-1,2,1,8,6,6,2,1,-1,4,-4,-6,2,2,-1,12,6,-4,1,2,-2,-2,-1,-6,-8]]; E[130,2] = [x, [1,1,2,1,-1,2,-4,1,1,-1,-2,2,-1,-4,-2,1,2,1,6,-1,-8,-2,6,2,1,-1,-4,-4,2,-2,-6,1,-4,2,4,1,-2,6,-2,-1,10,-8]]; E[130,3] = [x, [1,1,0,1,1,0,0,1,-3,1,0,0,1,0,0,1,2,-3,-8,1,0,0,-4,0,1,1,0,0,-2,0,-4,1,0,2,0,-3,6,-8,0,1,10,0]]; E[131,1] = [x^10-18*x^8+2*x^7+111*x^6-18*x^5-270*x^4+28*x^3+232*x^2+16*x-32, [16,16*x,2*x^8-32*x^6+162*x^4-268*x^2+80,16*x^2-32,-x^9+18*x^7+2*x^6-107*x^5-18*x^4+234*x^3+28*x^2-144*x+16,2*x^9-32*x^7+162*x^5-268*x^3+80*x,-2*x^9-4*x^8+28*x^7+56*x^6-114*x^5-252*x^4+88*x^3+376*x^2+120*x-48,16*x^3-64*x,3*x^9-50*x^7+10*x^6+273*x^5-90*x^4-522*x^3+156*x^2+248*x+16,4*x^7+4*x^6-36*x^5-36*x^4+56*x^3+88*x^2+32*x-32,-x^9+18*x^7-6*x^6-107*x^5+62*x^4+234*x^3-140*x^2-176*x+32,-4*x^7+4*x^6+36*x^5-52*x^4-56*x^3+152*x^2-32*x-96,x^9+2*x^8-14*x^7-30*x^6+55*x^5+136*x^4-34*x^3-168*x^2-80*x+16,-4*x^9-8*x^8+60*x^7+108*x^6-288*x^5-452*x^4+432*x^3+584*x^2-16*x-64,-2*x^9+2*x^8+36*x^7-40*x^6-218*x^5+242*x^4+488*x^3-436*x^2-328*x+80,16*x^4-96*x^2+64,2*x^9+4*x^8-28*x^7-52*x^6+118*x^5+200*x^4-124*x^3-192*x^2-64*x-64,4*x^8+4*x^7-60*x^6-36*x^5+288*x^4+72*x^3-448*x^2-32*x+96,2*x^9-36*x^7+4*x^6+206*x^5-52*x^4-380*x^3+168*x^2+96*x-96,2*x^9+4*x^8-32*x^7-40*x^6+178*x^5+92*x^4-380*x^3-24*x^2+256*x-32,x^9-18*x^7+2*x^6+119*x^5-10*x^4-326*x^3-12*x^2+264*x+48,-4*x^7+4*x^6+44*x^5-36*x^4-112*x^3+56*x^2+48*x-32]]; E[131,2] = [x, [1,0,-1,-2,-2,0,-1,0,-2,0,0,2,-3,0,2,4,4,0,-2,4,1,0]]; E[132,1] = [x, [1,0,1,0,2,0,-2,0,1,0,1,0,-2,0,2,0,4,0,-6,0,-2,0,0,0,-1,0,1,0,-8,0,-8,0,1,0,-4,0,10,0,-2,0,8,0,-2,0,2,0,-8,0]]; E[132,2] = [x, [1,0,-1,0,2,0,2,0,1,0,-1,0,6,0,-2,0,-4,0,-2,0,-2,0,-8,0,-1,0,-1,0,0,0,0,0,1,0,4,0,-6,0,-6,0,0,0,10,0,2,0,0,0]]; E[133,1] = [x^2-x-1, [1,x,-x+2,x-1,1,x-1,1,-2*x+1,-3*x+2,x,x-1,2*x-3,-1,x,-x+2,-3*x,3*x-1,-x-3,-1,x-1,-x+2,1,-4*x+1,-3*x+4,-4,-x]]; E[133,2] = [x^2+3*x+1, [1,x,x,-3*x-3,-2*x-3,-3*x-1,-1,4*x+3,-3*x-4,3*x+2,x-3,6*x+3,1,-x,3*x+2,-3*x+2,3*x+3,5*x+3,-1,-3*x+3,-x,-6*x-1,-3,-9*x-4,0,x]]; E[133,3] = [x^3-2*x^2-4*x+7, [1,x,-x^2+5,x^2-2,x^2-x-4,-2*x^2+x+7,-1,2*x^2-7,-2*x^2+x+8,x^2-7,-x+3,-x^2-x+4,x^2-x-4,-x,3*x^2-2*x-13,2*x^2+x-10,-2*x^2-x+11,-3*x^2+14,1,-x+1,x^2-5,-x^2+3*x,x^2+x,x^2-2*x-7,-3*x^2+x+11,x^2-7]]; E[133,4] = [x^2+x-3, [1,x,-x-2,-x+1,-3,-x-3,1,-3,3*x+4,-3*x,-x-3,1,2*x-1,x,3*x+6,-x-2,x-3,x+9,1,3*x-3,-x-2,-2*x-3,-3,3*x+6,4,-3*x+6]]; E[134,1] = [x^3-x^2-8*x+11, [1,-1,x,1,x^2+x-5,-x,-2*x^2-2*x+12,-1,x^2-3,-x^2-x+5,-x^2-2*x+6,x,x^2-2,2*x^2+2*x-12,2*x^2+3*x-11,1,-x^2-x+5,-x^2+3,2,x^2+x-5,-4*x^2-4*x+22,x^2+2*x-6,x-4,-x,2*x^2+3*x-13,-x^2+2,x^2+2*x-11,-2*x^2-2*x+12,0,-2*x^2-3*x+11,4*x^2+2*x-22,-1,-3*x^2-2*x+11,x^2+x-5]]; E[134,2] = [x^3-3*x^2+1, [1,1,x,1,-x^2+x+1,x,2*x^2-6*x,1,x^2-3,-x^2+x+1,-3*x^2+6*x+2,x,3*x^2-8*x-2,2*x^2-6*x,-2*x^2+x+1,1,-x^2+5*x-3,x^2-3,-4*x^2+12*x+2,-x^2+x+1,-2,-3*x^2+6*x+2,4*x^2-9*x-4,x,2*x^2+x-5,3*x^2-8*x-2,3*x^2-6*x-1,2*x^2-6*x,-4,-2*x^2+x+1,-2*x+6,1,-3*x^2+2*x+3,-x^2+5*x-3]]; E[135,1] = [x, [1,-2,0,2,-1,0,-3,0,0,2,-2,0,-5,6,0,-4,-8,0,1,-2,0,4,6,0,1,10,0,-6,2,0,0,8,0,16,3,0]]; E[135,2] = [x, [1,2,0,2,1,0,-3,0,0,2,2,0,-5,-6,0,-4,8,0,1,2,0,4,-6,0,1,-10,0,-6,-2,0,0,-8,0,16,-3,0]]; E[135,3] = [x^2-x-3, [1,x,0,x+1,-1,0,-2*x+2,3,0,-x,-2*x,0,2*x+2,-6,0,x-2,-2*x+3,0,2*x-1,-x-1,0,-2*x-6,3,0,1,4*x+6,0,-2*x-4,2*x-6,0,-2*x-1,-x-3,0,x-6,2*x-2,0]]; E[135,4] = [x^2+x-3, [1,x,0,-x+1,1,0,2*x+2,-3,0,x,-2*x,0,-2*x+2,6,0,-x-2,-2*x-3,0,-2*x-1,-x+1,0,2*x-6,-3,0,1,4*x-6,0,2*x-4,2*x+6,0,2*x-1,-x+3,0,-x-6,2*x+2,0]]; E[136,1] = [x, [1,0,-2,0,-2,0,-2,0,1,0,-6,0,2,0,4,0,1,0,0,0,4,0,6,0,-1,0,4,0,-10,0,2,0,12,0,4,0]]; E[136,2] = [x, [1,0,2,0,0,0,0,0,1,0,2,0,-6,0,0,0,-1,0,4,0,0,0,4,0,-5,0,-4,0,0,0,-8,0,4,0,0,0]]; E[136,3] = [x^2+2*x-4, [1,0,x,0,2,0,-x,0,-2*x+1,0,-x,0,2*x+2,0,2*x,0,1,0,-2*x-4,0,2*x-4,0,-x,0,-1,0,2*x-8,0,2,0,x,0,2*x-4,0,-2*x,0]]; E[137,1] = [x^4+3*x^3-4*x-1, [1,x,x^3+x^2-3*x-2,x^2-2,-2*x^3-3*x^2+3*x+1,-2*x^3-3*x^2+2*x+1,-x^3-2*x^2+2*x-1,x^3-4*x,2*x^2+3*x-1,3*x^3+3*x^2-7*x-2,4*x^3+9*x^2-4*x-8,x^3-x+2,x^2+3*x-2,x^3+2*x^2-5*x-1,4*x+1,-3*x^3-6*x^2+4*x+5,-x^3-5*x^2-2*x+5,2*x^3+3*x^2-x,-2*x^3-7*x^2-x+5,-2*x^3-x^2+4*x+1,-4*x^3-4*x^2+11*x+5,-3*x^3-4*x^2+8*x+4,x^2-2*x-4]]; E[137,2] = [x^7-10*x^5+28*x^3+3*x^2-19*x-7, [2,2*x,-x^6+x^5+11*x^4-9*x^3-33*x^2+18*x+21,2*x^2-4,2*x^6-2*x^5-20*x^4+16*x^3+52*x^2-26*x-26,x^6+x^5-9*x^4-5*x^3+21*x^2+2*x-7,-2*x^6+18*x^4-2*x^3-42*x^2+6*x+22,2*x^3-8*x,-4*x^6+2*x^5+38*x^4-20*x^3-96*x^2+40*x+50,-2*x^6+16*x^4-4*x^3-32*x^2+12*x+14,4*x^6-2*x^5-38*x^4+20*x^3+94*x^2-42*x-44,3*x^6-x^5-27*x^4+11*x^3+65*x^2-24*x-35,2*x^6-18*x^4+4*x^3+44*x^2-16*x-20,-2*x^5-2*x^4+14*x^3+12*x^2-16*x-14,2*x^6-20*x^4+2*x^3+54*x^2-10*x-28,2*x^4-12*x^2+8,2*x^5+2*x^4-14*x^3-10*x^2+18*x+6,2*x^6-2*x^5-20*x^4+16*x^3+52*x^2-26*x-28,2*x^6-2*x^5-20*x^4+16*x^3+56*x^2-26*x-34,-4*x^6+36*x^4-8*x^3-86*x^2+28*x+38,-6*x^6+4*x^5+62*x^4-36*x^3-174*x^2+68*x+98,-2*x^6+2*x^5+20*x^4-18*x^3-54*x^2+32*x+28,-x^6+x^5+7*x^4-11*x^3-9*x^2+24*x+1]]; E[138,1] = [x, [1,-1,-1,1,-2,1,-2,-1,1,2,-6,-1,-2,2,2,1,0,-1,0,-2,2,6,-1,1,-1,2,-1,-2,6,-2,8,-1,6,0,4,1,0,0,2,2,10,-2,-12,-6,-2,1,-8,-1]]; E[138,2] = [x, [1,-1,1,1,0,-1,2,-1,1,0,0,1,2,-2,0,1,0,-1,2,0,2,0,-1,-1,-5,-2,1,2,-6,0,-4,-1,0,0,0,1,-10,-2,2,0,-6,-2,2,0,0,1,0,1]]; E[138,3] = [x, [1,1,-1,1,2,-1,0,1,1,2,0,-1,-2,0,-2,1,2,1,-8,2,0,0,-1,-1,-1,-2,-1,0,-2,-2,-8,1,0,2,0,1,2,-8,2,2,10,0,8,0,2,-1,8,-1]]; E[138,4] = [x^2+2*x-4, [1,1,1,1,x,1,-2*x-2,1,1,x,-x-4,1,2*x+2,-2*x-2,x,1,-4,1,3*x+2,x,-2*x-2,-x-4,1,1,-2*x-1,2*x+2,1,-2*x-2,-2*x-2,x,-2*x,1,-x-4,-4,2*x-8,1,x+10,3*x+2,2*x+2,x,-2,-2*x-2,x-6,-x-4,x,1,4,1]]; E[139,1] = [x, [1,1,2,-1,-1,2,3,-3,1,-1,5,-2,-7,3,-2,-1,-6,1,-2,1,6,5,2]]; E[139,2] = [x^3+2*x^2-x-1, [1,x,-x^2-2*x,x^2-2,x^2+x-4,-x-1,2*x^2+3*x-2,-2*x^2-3*x+1,x^2+3*x-1,-x^2-3*x+1,-3*x^2-4*x+1,x^2+3*x,-3*x^2-5*x+3,-x^2+2,3*x^2+6*x-1,-x^2-x+2,x^2+3*x-1,x^2+1,2*x^2+7*x,-3*x^2-2*x+7,-x-3,2*x^2-2*x-3,4*x^2+5*x-7]]; E[139,3] = [x^7-x^6-11*x^5+8*x^4+35*x^3-10*x^2-32*x-8, [4,4*x,2*x^6-2*x^5-18*x^4+16*x^3+38*x^2-24*x-16,4*x^2-8,-x^6-x^5+9*x^4+6*x^3-19*x^2-4*x+12,4*x^5-32*x^3-4*x^2+48*x+16,-x^6+x^5+11*x^4-8*x^3-35*x^2+14*x+24,4*x^3-16*x,-4*x^5-4*x^4+36*x^3+28*x^2-72*x-28,-2*x^6-2*x^5+14*x^4+16*x^3-14*x^2-20*x-8,-2*x^6+4*x^5+20*x^4-34*x^3-50*x^2+54*x+28,4*x^5+4*x^4-36*x^3-28*x^2+64*x+32,2*x^5+2*x^4-18*x^3-16*x^2+34*x+28,4*x^2-8*x-8,4*x^6-36*x^4+76*x^2-4*x-24,4*x^4-24*x^2+16,2*x^6+2*x^5-18*x^4-16*x^3+34*x^2+24*x+8,-4*x^6-4*x^5+36*x^4+28*x^3-72*x^2-28*x,-4*x^4+28*x^2-32,-2*x^6-6*x^5+14*x^4+44*x^3-2*x^2-64*x-40,-4*x^4+4*x^3+28*x^2-20*x-32,2*x^6-2*x^5-18*x^4+20*x^3+34*x^2-36*x-16,2*x^6-2*x^5-18*x^4+20*x^3+42*x^2-40*x-32]]; E[140,1] = [x, [1,0,3,0,-1,0,-1,0,6,0,-5,0,-3,0,-3,0,-1,0,6,0,-3,0,6,0,1,0,9,0,-9,0,-4,0,-15,0,1,0,2,0,-9,0,-4,0,10,0,-6,0,-1,0]]; E[140,2] = [x, [1,0,1,0,1,0,1,0,-2,0,3,0,-1,0,1,0,-3,0,2,0,1,0,-6,0,1,0,-5,0,-9,0,8,0,3,0,1,0,-10,0,-1,0,0,0,2,0,-2,0,-3,0]]; E[141,1] = [x, [1,-2,1,2,-3,-2,-3,0,1,6,-5,2,2,6,-3,-4,-6,-2,-6,-6,-3,10,9,0,4,-4,1,-6,1,6,-2,8]]; E[141,2] = [x, [1,2,1,2,-1,2,-3,0,1,-2,1,2,-2,-6,-1,-4,2,2,6,-2,-3,2,3,0,-4,-4,1,-6,3,-2,2,-8]]; E[141,3] = [x^2+x-4, [1,x,-1,-x+2,x+1,-x,x+1,x-4,1,4,-x+3,x-2,-2*x-4,4,-x-1,-3*x,-2*x,x,6,2*x-2,-x-1,4*x-4,-3*x-3,-x+4,x,-2*x-8,-1,2*x-2,x-7,-4,2*x+4,x-4]]; E[141,4] = [x, [1,0,-1,-2,-1,0,-3,0,1,0,-3,2,-4,0,1,4,8,0,-6,2,3,0,3,0,-4,0,-1,6,-1,0,4,0]]; E[141,5] = [x, [1,-1,1,-1,2,-1,0,3,1,-2,4,-1,-2,0,2,-1,2,-1,0,-2,0,-4,0,3,-1,2,1,0,-6,-2,-4,-5]]; E[141,6] = [x, [1,-1,-1,-1,0,1,4,3,1,0,0,1,6,-4,0,-1,-6,-1,2,0,-4,0,4,-3,-5,-6,-1,-4,8,0,6,-5]]; E[142,1] = [x, [1,1,1,1,0,1,-1,1,-2,0,0,1,-1,-1,0,1,0,-2,-1,0,-1,0,3,1,-5,-1,-5,-1,0,0,5,1,0,0,0,-2]]; E[142,2] = [x, [1,1,-3,1,-4,-3,-3,1,6,-4,0,-3,1,-3,12,1,0,6,-5,-4,9,0,-7,-3,11,1,-9,-3,-8,12,7,1,0,0,12,6]]; E[142,3] = [x, [1,-1,-1,1,-2,1,-1,-1,-2,2,-2,-1,-3,1,2,1,-6,2,5,-2,1,2,-1,1,-1,3,5,-1,6,-2,1,-1,2,6,2,-2]]; E[142,4] = [x, [1,-1,3,1,2,-3,-3,-1,6,-2,-6,3,-5,3,6,1,6,-6,1,2,-9,6,5,-3,-1,5,9,-3,-2,-6,-5,-1,-18,-6,-6,6]]; E[142,5] = [x, [1,-1,0,1,2,0,0,-1,-3,-2,6,0,4,0,0,1,6,3,-8,2,0,-6,-4,0,-1,-4,0,0,-2,0,-8,-1,0,-6,0,-3]]; E[143,1] = [x^4-3*x^3-x^2+5*x+1, [1,x,-x^3+3*x^2-3,x^2-2,-2*x^2+2*x+4,-x^2+2*x+1,x^3-x^2-4*x+2,x^3-4*x,x^3-3*x^2-2*x+5,-2*x^3+2*x^2+4*x,1,x^3-4*x^2+x+6,-1,2*x^3-3*x^2-3*x-1,-2*x^3+6*x^2+2*x-10,3*x^3-5*x^2-5*x+3,-4*x^2+6*x+8,-x^2-1,-3*x^3+7*x^2+2*x-3,-4*x^3+6*x^2+6*x-6,-2*x^3+8*x^2-4*x-9,x,x^3-x^2-2*x-2,-x^3+4*x^2-3*x-3,4*x^3-8*x^2-4*x+7,-x,2*x^2-2*x-7,x^3+x^2-3*x-6]]; E[143,2] = [x^6-10*x^4+2*x^3+24*x^2-7*x-12, [1,x,-x^5-x^4+8*x^3+6*x^2-11*x-5,x^2-2,x^5+2*x^4-8*x^3-14*x^2+12*x+15,-x^5-2*x^4+8*x^3+13*x^2-12*x-12,2*x^5+2*x^4-17*x^3-13*x^2+26*x+14,x^3-4*x,-3*x^5-4*x^4+25*x^3+27*x^2-38*x-26,2*x^5+2*x^4-16*x^3-12*x^2+22*x+12,-1,-x^3+3*x-2,1,2*x^5+3*x^4-17*x^3-22*x^2+28*x+24,3*x^5+4*x^4-24*x^3-28*x^2+30*x+33,x^4-6*x^2+4,-2*x,-4*x^5-5*x^4+33*x^3+34*x^2-47*x-36,-2*x^5-3*x^4+16*x^3+20*x^2-23*x-22,2*x^2+2*x-6,2*x^5+3*x^4-17*x^3-19*x^2+29*x+14,-x,-3*x^5-4*x^4+25*x^3+29*x^2-38*x-33,2*x^5+3*x^4-16*x^3-23*x^2+22*x+24,-3*x^5-4*x^4+26*x^3+26*x^2-44*x-20,x,-5*x^5-7*x^4+41*x^3+47*x^2-59*x-47,-x^5-x^4+8*x^3+6*x^2-14*x-4]]; E[143,3] = [x, [1,0,-1,-2,-1,0,-2,0,-2,0,-1,2,-1,0,1,4,-4,0,2,2,2,0,7,0,-4,0,5,4]]; E[144,1] = [x, [1,0,0,0,2,0,0,0,0,0,4,0,-2,0,0,0,-2,0,4,0,0,0,-8,0,-1,0,0,0,-6,0,-8,0,0,0,0,0,6,0,0,0,6,0,-4,0,0,0,0,0]]; E[144,2] = [x, [1,0,0,0,0,0,4,0,0,0,0,0,2,0,0,0,0,0,-8,0,0,0,0,0,-5,0,0,0,0,0,4,0,0,0,0,0,-10,0,0,0,0,0,-8,0,0,0,0,0]]; E[145,1] = [x, [1,-1,0,-1,-1,0,-2,3,-3,1,-6,0,2,2,0,-1,-2,3,-2,1,0,6,2,0,1,-2,0,2,-1,0]]; E[145,2] = [x^2+2*x-1, [1,x,-2,-2*x-1,1,-2*x,-2*x-4,x-2,1,x,2*x,4*x+2,-2,-2,-2,3,2*x+2,x,-2*x-4,-2*x-1,4*x+8,-4*x+2,2*x-4,-2*x+4,1,-2*x,4,2*x+8,1,-2*x]]; E[145,3] = [x^3-3*x^2-x+5, [1,x,-x^2+2*x+1,x^2-2,-1,-x^2+5,-x^2+3,3*x^2-3*x-5,-2*x+3,-x,x^2-2*x+1,-x^2+3,2*x-4,-3*x^2+2*x+5,x^2-2*x-1,4*x^2-2*x-11,-3*x^2+2*x+9,-2*x^2+3*x,3*x^2-4*x-7,-x^2+2,2*x-2,x^2+2*x-5,x^2-2*x+3,-x^2+2*x-5,1,2*x^2-4*x,2*x^2-10,-5*x^2+2*x+9,1,x^2-5]]; E[145,4] = [x^3-x^2-3*x+1, [1,x,-x^2+3,x^2-2,1,-x^2+1,x^2-1,x^2-x-1,-2*x^2+2*x+5,x,x^2-2*x-1,x^2-2*x-5,-2*x,x^2+2*x-1,-x^2+3,-2*x^2+2*x+3,3*x^2-4*x-7,-x+2,-x^2-1,x^2-2,-2*x-2,-x^2+2*x-1,-x^2+2*x+7,x^2-2*x-3,1,-2*x^2,-2*x^2+4*x+6,x^2+2*x+1,-1,-x^2+1]]; E[146,1] = [x^3-8*x+4, [2,-2,2*x,2,-x^2+4,-2*x,x^2,-2,2*x^2-6,x^2-4,-2*x^2-4*x+12,2*x,-x^2+8,-x^2,-4*x+4,2,2*x^2+4*x-12,-2*x^2+6,-2*x^2-4*x+16,-x^2+4,8*x-4,2*x^2+4*x-12,2*x^2-8,-2*x,-2*x-2,x^2-8,4*x-8,x^2,3*x^2-4*x-20,4*x-4,x^2+4*x-4,-2,-4*x^2-4*x+8,-2*x^2-4*x+12,-2*x^2+2*x,2*x^2-6,-4*x^2-4*x+12]]; E[146,2] = [x^4-8*x^2+4*x+4, [2,2,2*x,2,-x^3-x^2+4*x+2,2*x,2*x^3+x^2-14*x+2,2,2*x^2-6,-x^3-x^2+4*x+2,2*x^2-8,2*x,-3*x^2-2*x+10,2*x^3+x^2-14*x+2,-x^3-4*x^2+6*x+4,2,-2*x^3-2*x^2+12*x,2*x^2-6,2*x^2+4*x-8,-x^3-x^2+4*x+2,x^3+2*x^2-6*x-8,2*x^2-8,-2*x^3-2*x^2+16*x-4,2*x,4*x^2+2*x-10,-3*x^2-2*x+10,2*x^3-12*x,2*x^3+x^2-14*x+2,3*x^3+x^2-20*x+6,-x^3-4*x^2+6*x+4,-x^3+x^2+12*x-10,2,2*x^3-8*x,-2*x^3-2*x^2+12*x,2*x^3+2*x^2-14*x-8,2*x^2-6,2*x^3-16*x+12]]; E[147,1] = [x, [1,-1,-1,-1,2,1,0,3,1,-2,4,1,2,0,-2,-1,6,-1,-4,-2,0,-4,0,-3,-1,-2,-1,0,-2,2,0,-5,-4,-6,0,-1,6]]; E[147,2] = [x, [1,2,-1,2,2,-2,0,0,1,4,-2,-2,-1,0,-2,-4,0,2,-1,4,0,-4,0,0,-1,-2,-1,0,4,-4,-9,-8,2,0,0,2,3]]; E[147,3] = [x, [1,2,1,2,-2,2,0,0,1,-4,-2,2,1,0,-2,-4,0,2,1,-4,0,-4,0,0,-1,2,1,0,4,-4,9,-8,-2,0,0,2,3]]; E[147,4] = [x^2-2*x-7, [2,-x-1,-2,2*x,x-5,x+1,0,-x-5,2,x-1,-4,-2*x,-x-7,0,-x+5,6,-3*x-1,-x-1,-2*x+2,-3*x+7,0,2*x+2,4*x-8,x+5,-4*x+6,5*x+7,-2,0,2*x-10,-x+1,2*x+6,-x+7,4,5*x+11,0,2*x,-8]]; E[147,5] = [x^2-2*x-7, [2,-x-1,2,2*x,-x+5,-x-1,0,-x-5,2,-x+1,-4,2*x,x+7,0,-x+5,6,3*x+1,-x-1,2*x-2,3*x-7,0,2*x+2,4*x-8,-x-5,-4*x+6,-5*x-7,2,0,2*x-10,-x+1,-2*x-6,-x+7,-4,-5*x-11,0,2*x,-8]]; E[148,1] = [x, [1,0,-1,0,-4,0,-3,0,-2,0,5,0,0,0,4,0,-6,0,2,0,3,0,-6,0,11,0,5,0,-6,0,4,0,-5,0,12,0,1,0]]; E[148,2] = [x^2+x-4, [1,0,x,0,2,0,-x,0,-x+1,0,-x,0,2,0,2*x,0,-2*x+2,0,2*x-2,0,x-4,0,-2,0,-1,0,-x-4,0,4*x+2,0,-2*x-6,0,x-4,0,-2*x,0,-1,0]]; E[149,1] = [x^3+x^2-2*x-1, [1,x,-x^2-x,x^2-2,x^2-x-3,-2*x-1,x^2+x-3,-x^2-2*x+1,2*x^2+3*x-2,-2*x^2-x+1,-2*x^2+x+2,x,-2*x^2-x+2,-x+1,x^2+4*x+1,-3*x^2-x+3,4*x^2+3*x-4,x^2+2*x+2,-2*x^2-x-3,-x^2-x+4,x^2-1,3*x^2-2*x-2,-x^2-x+4,x^2+4*x+2,x+1]]; E[149,2] = [x^9+x^8-15*x^7-12*x^6+75*x^5+48*x^4-137*x^3-76*x^2+68*x+39, [4,4*x,-3*x^8-x^7+46*x^6+5*x^5-233*x^4+13*x^3+418*x^2-49*x-176,4*x^2-8,-x^8-x^7+14*x^6+9*x^5-63*x^4-19*x^3+92*x^2+3*x-26,2*x^8+x^7-31*x^6-8*x^5+157*x^4+7*x^3-277*x^2+28*x+117,4*x^8+2*x^7-58*x^6-12*x^5+278*x^4-6*x^3-474*x^2+56*x+202,4*x^3-16*x,-3*x^8+47*x^6-7*x^5-242*x^4+56*x^3+439*x^2-93*x-185,-x^7-3*x^6+12*x^5+29*x^4-45*x^3-73*x^2+42*x+39,3*x^8-49*x^6+3*x^5+258*x^4-30*x^3-471*x^2+63*x+207,5*x^8+x^7-76*x^6-3*x^5+377*x^4-29*x^3-656*x^2+79*x+274,4*x^8+2*x^7-58*x^6-12*x^5+278*x^4-6*x^3-470*x^2+56*x+190,-2*x^8+2*x^7+36*x^6-22*x^5-198*x^4+74*x^3+360*x^2-70*x-156,-7*x^8-3*x^7+104*x^6+21*x^5-503*x^4-9*x^3+844*x^2-77*x-338,4*x^4-24*x^2+16,-x^8-2*x^7+11*x^6+19*x^5-40*x^4-50*x^3+59*x^2+29*x-25,3*x^8+2*x^7-43*x^6-17*x^5+200*x^4+28*x^3-321*x^2+19*x+117,-2*x^8+30*x^6-6*x^5-148*x^4+48*x^3+262*x^2-82*x-110,x^8-x^7-16*x^6+11*x^5+81*x^4-35*x^3-142*x^2+33*x+52,2*x^8-30*x^6+6*x^5+144*x^4-48*x^3-230*x^2+74*x+82,-3*x^8-4*x^7+39*x^6+33*x^5-174*x^4-60*x^3+291*x^2+3*x-117,2*x^8-x^7-33*x^6+14*x^5+177*x^4-57*x^3-335*x^2+60*x+149,-8*x^8-3*x^7+119*x^6+18*x^5-583*x^4+15*x^3+1013*x^2-122*x-429,-2*x^8+x^7+33*x^6-16*x^5-179*x^4+71*x^3+347*x^2-76*x-163]]; E[150,1] = [x, [1,-1,-1,1,0,1,2,-1,1,0,2,-1,6,-2,0,1,2,-1,0,0,-2,-2,-4,1,0,-6,-1,2,0,0,-8,-1,-2,-2,0,1,2,0,-6,0,2,2,-4,2,0,4,-8,-1,-3,0,-2,6,6,1,0,-2,0,0,10,0]]; E[150,2] = [x, [1,1,-1,1,0,-1,4,1,1,0,0,-1,-2,4,0,1,-6,1,-4,0,-4,0,0,-1,0,-2,-1,4,-6,0,8,1,0,-6,0,1,-2,-4,2,0,-6,-4,4,0,0,0,0,-1,9,0,6,-2,6,-1,0,4,4,-6,0,0]]; E[150,3] = [x, [1,1,1,1,0,1,-2,1,1,0,2,1,-6,-2,0,1,-2,1,0,0,-2,2,4,1,0,-6,1,-2,0,0,-8,1,2,-2,0,1,-2,0,-6,0,2,-2,4,2,0,4,8,1,-3,0,-2,-6,-6,1,0,-2,0,0,10,0]]; E[151,1] = [x^3+2*x^2-x-1, [1,x,-x-1,x^2-2,-x^2-x-1,-x^2-x,-1,-2*x^2-3*x+1,x^2+2*x-2,x^2-2*x-1,2*x^2+4*x-3,x^2+x+1,3*x^2+5*x-3,-x,3*x+2,-x^2-x+2,-3*x^2-5*x,-x+1,-5*x^2-6*x+5,-2*x^2+2*x+3,x+1,-x+2,3*x^2+6*x-2,x^2+4*x+1,4*x^2+3*x-4]]; E[151,2] = [x^3-5*x+3, [1,x,2,x^2-2,-x^2-2*x+5,2*x,-2,x-3,1,-2*x^2+3,2*x^2+x-7,2*x^2-4,-2*x^2+6,-2*x,-2*x^2-4*x+10,-x^2-3*x+4,-x+3,x,3*x^2+3*x-9,2*x^2-3*x-4,-4,x^2+3*x-6,2*x,2*x-6,-x^2-3*x+8]]; E[151,3] = [x^6-x^5-7*x^4+3*x^3+13*x^2+3*x-1, [1,x,-x^5+x^4+7*x^3-4*x^2-12*x-1,x^2-2,x^5-x^4-6*x^3+3*x^2+9*x+2,-x^3+x^2+2*x-1,-x^4+3*x^2+3*x+3,x^3-4*x,-x^5+3*x^4+4*x^3-13*x^2-4*x+9,x^4-4*x^2-x+1,x^3-5*x,2*x^5-3*x^4-13*x^3+10*x^2+23*x+2,2*x^5-3*x^4-11*x^3+12*x^2+13*x-4,-x^5+3*x^3+3*x^2+3*x,-x^5+7*x^3+3*x^2-13*x-10,x^4-6*x^2+4,-x^4-2*x^3+6*x^2+8*x,2*x^5-3*x^4-10*x^3+9*x^2+12*x-1,2*x^5-x^4-12*x^3+2*x^2+15*x+1,-x^5+2*x^4+8*x^3-7*x^2-17*x-4,-3*x^5+5*x^4+19*x^3-16*x^2-36*x-5,x^4-5*x^2,-x^5+6*x^3-7*x+1,-x^5+x^4+6*x^3-5*x^2-8*x+4,2*x^5-x^4-13*x^3+x^2+21*x+5]]; E[152,1] = [x, [1,0,-2,0,-1,0,-3,0,1,0,-3,0,-4,0,2,0,5,0,-1,0,6,0,0,0,-4,0,4,0,2,0,8,0,6,0,3,0,-10,0,8,0]]; E[152,2] = [x, [1,0,1,0,0,0,3,0,-2,0,2,0,1,0,0,0,-5,0,1,0,3,0,-1,0,-5,0,-5,0,-3,0,4,0,2,0,0,0,2,0,1,0]]; E[152,3] = [x^3-x^2-10*x+8, [2,0,2*x,0,-x^2-x+8,0,x^2-x-4,0,2*x^2-6,0,-x^2-x+4,0,-2*x+4,0,-2*x^2-2*x+8,0,-x^2+x+8,0,-2,0,6*x-8,0,2*x^2-4*x-16,0,-x^2+3*x+10,0,2*x^2+8*x-16,0,2*x^2-20,0,0,0,-2*x^2-6*x+8,0,x^2-3*x-12,0,-4,0,-2*x^2+4*x,0]]; E[153,1] = [x, [1,2,0,2,1,0,-2,0,0,2,3,0,-5,-4,0,-4,1,0,-1,2,0,6,7,0,-4,-10,0,-4,-6,0,4,-8,0,2,-2,0]]; E[153,2] = [x, [1,-2,0,2,-1,0,-2,0,0,2,-3,0,-5,4,0,-4,-1,0,-1,-2,0,6,-7,0,-4,10,0,-4,6,0,4,8,0,2,2,0]]; E[153,3] = [x, [1,1,0,-1,2,0,4,-3,0,2,0,0,-2,4,0,-1,-1,0,-4,-2,0,0,-4,0,-1,-2,0,-4,-6,0,4,5,0,-1,8,0]]; E[153,4] = [x^2-x-4, [1,x,0,x+2,-x-1,0,0,x+4,0,-2*x-4,-x+1,0,-x+3,0,0,3*x,-1,0,-3*x+3,-4*x-6,0,-4,-x+5,0,3*x,2*x-4,0,0,4*x-2,0,2*x-2,x+4,0,-x,0,0]]; E[153,5] = [x, [1,0,0,-2,-3,0,-4,0,0,0,3,0,-1,0,0,4,1,0,-1,6,0,0,-9,0,4,0,0,8,-6,0,2,0,0,0,12,0]]; E[154,1] = [x, [1,-1,2,1,2,-2,-1,-1,1,-2,1,2,-4,1,4,1,0,-1,4,2,-2,-1,4,-2,-1,4,-4,-1,2,-4,-10,-1,2,0,-2,1,-6,-4,-8,-2,0,2,-4,1,2,-4,10,2]]; E[154,2] = [x, [1,-1,0,1,-4,0,-1,-1,-3,4,-1,0,2,1,0,1,-4,3,-6,-4,0,1,4,0,11,-2,0,-1,-2,0,-2,-1,0,4,4,-3,10,6,0,4,4,0,-8,-1,12,-4,2,0]]; E[154,3] = [x^2+2*x-4, [1,1,x,1,-x,x,1,1,-2*x+1,-x,1,x,-x-2,1,2*x-4,1,2*x,-2*x+1,-x-6,-x,x,1,4,x,-2*x-1,-x-2,2*x-8,1,2*x+2,2*x-4,2,1,x,2*x,-x,-2*x+1,4*x+2,-x-6,-4,-x,-2*x,x,-2*x-8,1,-5*x+8,4,-2,x]]; E[154,4] = [x, [1,1,0,1,2,0,-1,1,-3,2,-1,0,2,-1,0,1,2,-3,0,2,0,-1,-8,0,-1,2,0,-1,-2,0,-8,1,0,2,-2,-3,-2,0,0,2,10,0,4,-1,-6,-8,8,0]]; E[155,1] = [x, [1,-1,2,-1,-1,-2,4,3,1,1,4,-2,0,-4,-2,-1,-8,-1,4,1,8,-4,2,6,1,0,-4,-4,-6,2,1,-5]]; E[155,2] = [x, [1,-2,-1,2,1,2,-2,0,-2,-2,2,-2,-6,4,-1,-4,-7,4,-5,2,2,-4,4,0,1,12,5,-4,0,2,1,8]]; E[155,3] = [x^4-x^3-6*x^2+4*x+4, [2,2*x,-x^3+x^2+4*x-2,2*x^2-4,2,-2*x^2+2*x+4,-2*x^2-2*x+8,2*x^3-8*x,-2*x,2*x,-2*x^2+2*x+4,-4*x+4,2*x^3-10*x+4,-2*x^3-2*x^2+8*x,-x^3+x^2+4*x-2,2*x^3-8*x,x^3+x^2-6*x+2,-2*x^2,-2*x^3+2*x^2+6*x-6,2*x^2-4,-2*x^3+4*x^2+10*x-12,-2*x^3+2*x^2+4*x,2*x^2+2*x-8,-8,2,2*x^3+2*x^2-4*x-8,3*x^3-x^2-14*x+2,-4*x^3+12*x-8,2*x^3-4*x^2-10*x+8,-2*x^2+2*x+4,-2,-2*x^3+4*x^2+8*x-8]]; E[155,4] = [x^4+x^3-8*x^2-4*x+12, [2,2*x,-x^3-x^2+6*x+2,2*x^2-4,-2,-2*x^2-2*x+12,2*x^2+2*x-8,2*x^3-8*x,-4*x^2-2*x+20,-2*x,2*x^2-2*x-12,-4,-2*x^2-2*x+16,2*x^3+2*x^2-8*x,x^3+x^2-6*x-2,-2*x^3+4*x^2+8*x-16,-x^3+x^2+4*x-6,-4*x^3-2*x^2+20*x,2*x^3+2*x^2-10*x-2,-2*x^2+4,2*x^3-14*x+4,2*x^3-2*x^2-12*x,-2*x^3-4*x^2+6*x+12,4*x^2-24,2,-2*x^3-2*x^2+16*x,-3*x^3-x^2+20*x+2,4*x^2+4*x-8,-2*x^3+14*x,2*x^2+2*x-12,2,2*x^3-8*x^2-8*x+24]]; E[155,5] = [x, [1,0,-1,-2,-1,0,0,0,-2,0,-4,2,-6,0,1,4,5,0,-1,2,0,0,8,0,1,0,5,0,-10,0,-1,0]]; E[156,1] = [x, [1,0,-1,0,-4,0,-2,0,1,0,-4,0,1,0,4,0,2,0,-2,0,2,0,0,0,11,0,-1,0,-6,0,-10,0,4,0,8,0,10,0,-1,0,8,0,4,0,-4,0,-4,0,-3,0,-2,0,-10,0,16,0]]; E[156,2] = [x, [1,0,1,0,0,0,2,0,1,0,0,0,1,0,0,0,-6,0,2,0,2,0,0,0,-5,0,1,0,-6,0,2,0,0,0,0,0,2,0,1,0,-12,0,-4,0,0,0,0,0,-3,0,-6,0,6,0,0,0]]; E[157,1] = [x^5+5*x^4+5*x^3-6*x^2-7*x+1, [1,x,-x^4-3*x^3+3*x-1,x^2-2,2*x^4+7*x^3+x^2-10*x-2,2*x^4+5*x^3-3*x^2-8*x+1,-x^4-5*x^3-4*x^2+6*x+2,x^3-4*x,2*x^4+6*x^3+x^2-5*x-2,-3*x^4-9*x^3+2*x^2+12*x-2,-x^4-2*x^3+4*x^2+5*x-6,-3*x^4-7*x^3+4*x^2+9*x,x^3+3*x^2+x-3,x^3-5*x+1,-x^4-4*x^3-x^2+8*x+1,x^4-6*x^2+4,x^4+x^3-3*x^2+3*x,-4*x^4-9*x^3+7*x^2+12*x-2,-x^3-5*x^2-3*x+5,2*x^4+3*x^3-8*x^2-3*x+7,x^4+6*x^3+6*x^2-6*x-1,3*x^4+9*x^3-x^2-13*x+1,-x^4-5*x^3-6*x^2+3*x+3,4*x^4+9*x^3-3*x^2-5*x+1,-x^4-3*x^3-3*x^2-2*x+6,x^4+3*x^3+x^2-3*x]]; E[157,2] = [x^7-5*x^6+2*x^5+21*x^4-22*x^3-21*x^2+27*x-1, [1,x,x^4-3*x^3-2*x^2+7*x+1,x^2-2,x^6-4*x^5-2*x^4+18*x^3-2*x^2-20*x+3,x^5-3*x^4-2*x^3+7*x^2+x,-x^6+3*x^5+4*x^4-13*x^3-5*x^2+13*x+2,x^3-4*x,-2*x^6+7*x^5+7*x^4-35*x^3-3*x^2+42*x-3,x^6-4*x^5-3*x^4+20*x^3+x^2-24*x+1,-x^6+4*x^5+x^4-15*x^3+3*x^2+13*x+1,x^6-3*x^5-4*x^4+13*x^3+5*x^2-14*x-2,x^6-3*x^5-5*x^4+17*x^3+4*x^2-22*x+3,-2*x^6+6*x^5+8*x^4-27*x^3-8*x^2+29*x-1,3*x^6-11*x^5-8*x^4+50*x^3-57*x+5,x^4-6*x^2+4,x^6-3*x^5-4*x^4+13*x^3+6*x^2-16*x-2,-3*x^6+11*x^5+7*x^4-47*x^3+51*x-2,4*x^6-14*x^5-12*x^4+61*x^3+9*x^2-65*x-3,-x^6+3*x^5+3*x^4-13*x^3+x^2+14*x-5,x^4-2*x^3-4*x^2+4*x+3,-x^6+3*x^5+6*x^4-19*x^3-8*x^2+28*x-1,x^5-4*x^4+12*x^2-4*x-4,2*x^6-8*x^5-2*x^4+31*x^3-7*x^2-31*x+1,-x^6+4*x^5+3*x^4-20*x^3-2*x^2+26*x-1,2*x^6-7*x^5-4*x^4+26*x^3-x^2-24*x+1]]; E[158,1] = [x, [1,1,-3,1,-3,-3,-3,1,6,-3,-2,-3,-5,-3,9,1,6,6,0,-3,9,-2,-2,-3,4,-5,-9,-3,6,9,-10,1,6,6,9,6,-10,0,15,-3]]; E[158,2] = [x, [1,1,2,1,-2,2,0,1,1,-2,-4,2,2,0,-4,1,-2,1,0,-2,0,-4,0,2,-1,2,-4,0,8,-4,8,1,-8,-2,0,1,4,0,4,-2]]; E[158,3] = [x, [1,1,-1,1,1,-1,3,1,-2,1,2,-1,-1,3,-1,1,-2,-2,0,1,-3,2,-6,-1,-4,-1,5,3,-10,-1,2,1,-2,-2,3,-2,-2,0,1,1]]; E[158,4] = [x, [1,-1,-1,1,-1,1,-3,-1,-2,1,4,-1,-7,3,1,1,-4,2,-6,-1,3,-4,6,1,-4,7,5,-3,4,-1,8,-1,-4,4,3,-2,10,6,7,1]]; E[158,5] = [x, [1,-1,1,1,3,-1,-1,-1,-2,-3,0,1,5,1,3,1,0,2,2,3,-1,0,-6,-1,4,-5,-5,-1,0,-3,-4,-1,0,0,-3,-2,2,-2,5,-3]]; E[158,6] = [x^2-6, [1,-1,x,1,-2,-x,4,-1,3,2,0,x,-2*x+2,-4,-2*x,1,-2*x+2,-3,2*x,-2,4*x,0,2*x+2,-x,-1,2*x-2,0,4,-3*x-2,2*x,-2*x-2,-1,0,2*x-2,-8,3,-x-2,-2*x,2*x-12,2]]; E[159,1] = [x^4-3*x^3-x^2+7*x-3, [1,x,1,x^2-2,-x^3+x^2+2*x,x,x^3-3*x^2-2*x+5,x^3-4*x,1,-2*x^3+x^2+7*x-3,4*x^3-6*x^2-12*x+12,x^2-2,-3*x^3+5*x^2+8*x-10,-x^2-2*x+3,-x^3+x^2+2*x,3*x^3-5*x^2-7*x+7,-4*x^3+8*x^2+10*x-12,x,2*x^2-4*x-4,-3*x^3+3*x^2+7*x-6,x^3-3*x^2-2*x+5,6*x^3-8*x^2-16*x+12,-x^3+x^2+6*x-3,x^3-4*x,x^3+x^2-4*x-2,-4*x^3+5*x^2+11*x-9,1,-3*x^3+4*x^2+7*x-10,4*x^3-6*x^2-12*x+12,-2*x^3+x^2+7*x-3,2*x^2+2*x-10,2*x^3-4*x^2-6*x+9,4*x^3-6*x^2-12*x+12,-4*x^3+6*x^2+16*x-12,4*x^3-6*x^2-8*x+9,x^2-2]]; E[159,2] = [x^5-10*x^3+22*x+5, [3,3*x,-3,3*x^2-6,-3*x^3-3*x^2+18*x+12,-3*x,x^4+4*x^3-6*x^2-21*x+4,3*x^3-12*x,3,-3*x^4-3*x^3+18*x^2+12*x,-2*x^4-2*x^3+12*x^2+6*x-2,-3*x^2+6,2*x^4-x^3-15*x^2+6*x+20,4*x^4+4*x^3-21*x^2-18*x-5,3*x^3+3*x^2-18*x-12,3*x^4-18*x^2+12,-6*x,3*x,-2*x^4-2*x^3+12*x^2+6*x-2,-3*x^4-6*x^3+18*x^2+30*x-9,-x^4-4*x^3+6*x^2+21*x-4,-2*x^4-8*x^3+6*x^2+42*x+10,x^4+4*x^3-21*x-26,-3*x^3+12*x,-3*x^4+18*x^2-3*x+3,-x^4+5*x^3+6*x^2-24*x-10,-3,2*x^4+11*x^3-6*x^2-51*x-28,6*x^2-12,3*x^4+3*x^3-18*x^2-12*x,2*x^4+2*x^3-12*x^2-12*x+8,6*x^3-30*x-15,2*x^4+2*x^3-12*x^2-6*x+2,-6*x^2,5*x^4-x^3-39*x^2+9*x+26,3*x^2-6]]; E[160,1] = [x, [1,0,2,0,-1,0,2,0,1,0,4,0,-6,0,-2,0,2,0,-8,0,4,0,6,0,1,0,-4,0,-2,0,-4,0,8,0,-2,0,2,0,-12,0,-10,0,2,0,-1,0,2,0]]; E[160,2] = [x, [1,0,-2,0,-1,0,-2,0,1,0,-4,0,-6,0,2,0,2,0,8,0,4,0,-6,0,1,0,4,0,-2,0,4,0,8,0,2,0,2,0,12,0,-10,0,-2,0,-1,0,-2,0]]; E[160,3] = [x^2-8, [1,0,x,0,1,0,-x,0,5,0,-2*x,0,-2,0,x,0,2,0,0,0,-8,0,x,0,1,0,2*x,0,6,0,2*x,0,-16,0,-x,0,-10,0,-2*x,0,2,0,-3*x,0,5,0,-x,0]]; E[161,1] = [x, [1,-1,0,-1,2,0,1,3,-3,-2,4,0,6,-1,0,-1,-2,3,4,-2,0,-4,-1,0,-1,-6,0,-1,-2,0,-4,-5]]; E[161,2] = [x^2+x-1, [1,x,-1,-x-1,-2*x-2,-x,-1,-2*x-1,-2,-2,4*x+2,x+1,2*x-1,-x,2*x+2,3*x,0,-2*x,-2*x-6,2*x+4,1,-2*x+4,-1,2*x+1,4*x+3,-3*x+2,5,x+1,-4*x+1,2,-9,x+5]]; E[161,3] = [x^3+x^2-5*x-1, [2,2*x,-x^2+5,2*x^2-4,-x^2+5,x^2-1,-2,-2*x^2+2*x+2,-2*x^2-2*x+6,x^2-1,-2*x+2,x^2+4*x-9,2*x^2-6,-2*x,-2*x^2-2*x+12,-8*x+6,x^2-1,-4*x-2,4*x^2+4*x-8,x^2+4*x-9,x^2-5,-2*x^2+2*x,2,x^2-4*x+3,-2*x^2-2*x+2,-2*x^2+4*x+2,-4*x,-2*x^2+4,2*x^2+2*x-8,2*x-2,-3*x^2-8*x+19,-4*x^2+2*x-4]]; E[161,4] = [x^5-2*x^4-9*x^3+17*x^2+16*x-27, [2,2*x,x^4-x^3-8*x^2+5*x+11,2*x^2-4,-x^4-x^3+10*x^2+5*x-21,x^4+x^3-12*x^2-5*x+27,2,2*x^3-8*x,-2*x^2-2*x+14,-3*x^4+x^3+22*x^2-5*x-27,-2*x^4+16*x^2+2*x-24,x^4-x^3-6*x^2+x+5,2*x^4-18*x^2+28,2*x,2*x^3-16*x+6,2*x^4-12*x^2+8,x^4+x^3-6*x^2-5*x-3,-2*x^3-2*x^2+14*x,-4*x+4,-3*x^4-3*x^3+26*x^2+11*x-39,x^4-x^3-8*x^2+5*x+11,-4*x^4-2*x^3+36*x^2+8*x-54,-2,-x^4+x^3+8*x^2-x-27,2*x^3-12*x+8,4*x^4-34*x^2-4*x+54,-2*x^3+2*x^2+14*x-10,2*x^2-4,-6*x^2+2*x+24,2*x^4-16*x^2+6*x,-x^4+x^3+8*x^2-5*x+1,4*x^4+2*x^3-34*x^2-8*x+54]]; E[162,1] = [x, [1,-1,0,1,-3,0,-4,-1,0,3,0,0,-1,4,0,1,-3,0,-4,-3,0,0,0,0,4,1,0,-4,9,0,-4,-1,0,3,12,0,-1,4,0,3,6,0,8,0,0,0,-12,0,9,-4,0,-1,-6,0]]; E[162,2] = [x, [1,-1,0,1,0,0,2,-1,0,0,3,0,2,-2,0,1,3,0,-1,0,0,-3,6,0,-5,-2,0,2,-6,0,-4,-1,0,-3,0,0,-4,1,0,0,-9,0,-1,3,0,-6,6,0,-3,5,0,2,-12,0]]; E[162,3] = [x, [1,1,0,1,3,0,-4,1,0,3,0,0,-1,-4,0,1,3,0,-4,3,0,0,0,0,4,-1,0,-4,-9,0,-4,1,0,3,-12,0,-1,-4,0,3,-6,0,8,0,0,0,12,0,9,4,0,-1,6,0]]; E[162,4] = [x, [1,1,0,1,0,0,2,1,0,0,-3,0,2,2,0,1,-3,0,-1,0,0,-3,-6,0,-5,2,0,2,6,0,-4,1,0,-3,0,0,-4,-1,0,0,9,0,-1,-3,0,-6,-6,0,-3,-5,0,2,12,0]]; E[163,1] = [x^5+5*x^4+3*x^3-15*x^2-16*x+3, [1,x,-2*x^4-5*x^3+6*x^2+13*x-3,x^2-2,2*x^4+5*x^3-7*x^2-15*x+2,5*x^4+12*x^3-17*x^2-35*x+6,3*x^4+8*x^3-8*x^2-22*x-1,x^3-4*x,2*x^2+3*x-3,-5*x^4-13*x^3+15*x^2+34*x-6,-x^4-4*x^3+x^2+13*x+3,-9*x^4-22*x^3+28*x^2+60*x-9,-x^4-3*x^3+2*x^2+8*x-2,-7*x^4-17*x^3+23*x^2+47*x-9,5*x^4+13*x^3-14*x^2-32*x+6,x^4-6*x^2+4,-x^4-2*x^3+4*x^2+6*x-6,2*x^3+3*x^2-3*x,-2*x^4-3*x^3+9*x^2+8*x-3,8*x^4+20*x^3-27*x^2-56*x+11,2*x^4+5*x^3-8*x^2-14*x+6,x^4+4*x^3-2*x^2-13*x+3,2*x^4+3*x^3-8*x^2-7*x,13*x^4+31*x^3-41*x^2-83*x+15,-9*x^4-22*x^3+32*x^2+65*x-16,2*x^4+5*x^3-7*x^2-18*x+3,x^4+2*x^3-7*x^2-11*x+6]]; E[163,2] = [x^7-3*x^6-5*x^5+19*x^4-23*x^2+4*x+6, [1,x,x^5-x^4-6*x^3+5*x^2+5*x-2,x^2-2,-x^6+x^5+7*x^4-6*x^3-11*x^2+6*x+6,x^6-x^5-6*x^4+5*x^3+5*x^2-2*x,x^6-2*x^5-7*x^4+12*x^3+11*x^2-11*x-4,x^3-4*x,-x^6+x^5+7*x^4-5*x^3-12*x^2+2*x+7,-2*x^6+2*x^5+13*x^4-11*x^3-17*x^2+10*x+6,x^6-2*x^5-7*x^4+12*x^3+12*x^2-12*x-6,2*x^6-3*x^5-12*x^4+17*x^3+11*x^2-14*x-2,-x^6+x^5+8*x^4-6*x^3-16*x^2+5*x+8,x^6-2*x^5-7*x^4+11*x^3+12*x^2-8*x-6,2*x^5-x^4-13*x^3+4*x^2+14*x,x^4-6*x^2+4,x^6-x^5-6*x^4+5*x^3+6*x^2-3*x,-2*x^6+2*x^5+14*x^4-12*x^3-21*x^2+11*x+6,x^6-6*x^4-x^3+4*x^2+3*x+2,-2*x^6+x^5+13*x^4-5*x^3-14*x^2+2*x,-2*x^4+x^3+12*x^2-4*x-10,x^6-2*x^5-7*x^4+12*x^3+11*x^2-10*x-6,x^6-x^5-7*x^4+6*x^3+12*x^2-8*x-6,x^6-9*x^4+x^3+22*x^2-6*x-12,-3*x^6+4*x^5+21*x^4-24*x^3-33*x^2+24*x+13,-2*x^6+3*x^5+13*x^4-16*x^3-18*x^2+12*x+6,-x^6+x^5+6*x^4-5*x^3-5*x^2+2*x-2]]; E[163,3] = [x, [1,0,0,-2,-4,0,2,0,-3,0,-6,0,4,0,0,4,0,0,-6,8,0,0,6,0,11,0,0]]; E[164,1] = [x^4-2*x^3-10*x^2+22*x-2, [3,0,3*x,0,-2*x^3-x^2+16*x+2,0,3*x^3-27*x+12,0,3*x^2-9,0,x^3+2*x^2-11*x-4,0,2*x^3-2*x^2-22*x+22,0,-5*x^3-4*x^2+46*x-4,0,-2*x^3-4*x^2+16*x+14,0,-2*x^3+2*x^2+19*x-16,0,6*x^3+3*x^2-54*x+6,0,-2*x^3+2*x^2+16*x-28,0,-2*x^3+2*x^2+22*x-13,0,3*x^3-18*x,0,6*x-6,0,-4*x^3-2*x^2+32*x-8,0,4*x^3-x^2-26*x+2,0,5*x^3-2*x^2-52*x+16,0,3*x^2-6,0,2*x^3-2*x^2-22*x+4,0,-3,0]]; E[165,1] = [x^2+2*x-1, [1,x,-1,-2*x-1,-1,-x,-2*x-4,x-2,1,-x,-1,2*x+1,4*x+4,-2,1,3,-2*x-6,x,2*x-2,2*x+1,2*x+4,-x,-4,-x+2,1,-4*x+4,-1,2*x+8,2*x,x,0,x+4,1,-2*x-2,2*x+4,-2*x-1,-4*x+2,-6*x+2,-4*x-4,-x+2,-2*x,2,2*x-4,2*x+1,-1,-4*x,-4,-3]]; E[165,2] = [x^2-3, [1,x,1,1,-1,x,2,-x,1,-x,-1,1,-2*x+2,2*x,-1,-5,0,x,-2*x+2,-1,2,-x,-4*x,-x,1,2*x-6,1,2,2*x,-x,4*x-4,-3*x,-1,0,-2,1,4*x+2,2*x-6,-2*x+2,x,-2*x,2*x,4*x+2,-1,-1,-12,4*x,-5]]; E[165,3] = [x^3+x^2-5*x-1, [1,x,1,x^2-2,1,x,-x^2-2*x+3,-x^2+x+1,1,x,1,x^2-2,-x^2+3,-x^2-2*x-1,1,-4*x+3,x^2-2*x-5,x,2*x^2+2*x-4,x^2-2,-x^2-2*x+3,x,2*x^2+4*x-6,-x^2+x+1,1,x^2-2*x-1,1,x^2-2*x-7,-2*x-4,x,-2*x^2+10,-2*x^2+x-2,1,-3*x^2+1,-x^2-2*x+3,x^2-2,-2,6*x+2,-x^2+3,-x^2+x+1,2*x-4,-x^2-2*x-1,3*x^2+2*x-9,x^2-2,1,2*x^2+4*x+2,2*x^2-10,-4*x+3]]; E[166,1] = [x^3-x^2-6*x+4, [2,2,2*x,2,-x^2-x+4,2*x,x^2-3*x-2,2,2*x^2-6,-x^2-x+4,-2*x+4,2*x,-x^2+x-2,x^2-3*x-2,-2*x^2-2*x+4,2,3*x^2+x-16,2*x^2-6,-5*x^2+x+18,-x^2-x+4,-2*x^2+4*x-4,-2*x+4,x^2+x,2*x,x^2+3*x-8,-x^2+x-2,2*x^2-8,x^2-3*x-2,2*x^2,-2*x^2-2*x+4,3*x^2+x-16,2,-2*x^2+4*x,3*x^2+x-16,2*x^2-6,2*x^2-6,-2*x^2-4,-5*x^2+x+18,-8*x+4,-x^2-x+4,-x^2+5*x+10,-2*x^2+4*x-4]]; E[166,2] = [x, [1,-1,-1,1,-2,1,1,-1,-2,2,-5,-1,-2,-1,2,1,-3,2,-2,-2,-1,5,4,1,-1,2,5,1,-3,-2,1,-1,5,3,-2,-2,1,2,2,2,6,1]]; E[166,3] = [x^2+2*x-4, [2,-2,2*x,2,x+4,-2*x,x-2,-2,-4*x+2,-x-4,-2*x+4,2*x,-x+2,-x+2,2*x+4,2,x+8,4*x-2,-x-2,x+4,-4*x+4,2*x-4,-3*x,-2*x,3*x,x-2,4*x-16,x-2,8,-2*x-4,x-8,-2,8*x-8,-x-8,-2,-4*x+2,-8*x-12,x+2,4*x-4,-x-4,5*x+2,4*x-4]]; E[167,1] = [x^2+x-1, [1,x,-x-1,-x-1,-1,-1,x-2,-2*x-1,x-1,-x,0,x+2,-x-3,-3*x+1,x+1,3*x,x-2,-2*x+1,4*x+2,x+1,2*x+1,0,-x,x+3,-4,-2*x-1,4*x+3,2*x+1]]; E[167,2] = [x^12-2*x^11-17*x^10+33*x^9+103*x^8-189*x^7-277*x^6+447*x^5+363*x^4-433*x^3-205*x^2+120*x+9, [933,933*x,544*x^11+157*x^10-10187*x^9-3189*x^8+68788*x^7+22911*x^6-200347*x^5-70068*x^4+230499*x^3+80543*x^2-60181*x-3441,933*x^2-1866,-779*x^11+631*x^10+13207*x^9-8871*x^8-78341*x^7+37635*x^6+193997*x^5-40677*x^4-192843*x^3-12787*x^2+42281*x+3612,1245*x^11-939*x^10-21141*x^9+12756*x^8+125727*x^7-49659*x^6-313236*x^5+33027*x^4+316095*x^3+51339*x^2-68721*x-4896,-294*x^11-102*x^10+5406*x^9+2262*x^8-35598*x^7-17565*x^6+100383*x^5+56706*x^4-111492*x^3-64902*x^2+25050*x+6336,933*x^3-3732*x,-972*x^11+234*x^10+17454*x^9-2061*x^8-112398*x^7-3006*x^6+312990*x^5+58266*x^4-357315*x^3-99834*x^2+98508*x+5277,-927*x^11-36*x^10+16836*x^9+1896*x^8-109596*x^7-21786*x^6+307536*x^5+89934*x^4-350094*x^3-117414*x^2+97092*x+7011,-623*x^11+628*x^10+10567*x^9-9024*x^8-62594*x^7+39396*x^6+154004*x^5-45156*x^4-149088*x^3-12775*x^2+24248*x+5829,463*x^11-290*x^10-7955*x^9+3870*x^8+48070*x^7-14193*x^6-122794*x^5+4296*x^4+129426*x^3+25418*x^2-33934*x-4323,652*x^11-491*x^10-11297*x^9+6681*x^8+69355*x^7-25893*x^6-182461*x^5+15825*x^4+202299*x^3+30887*x^2-59101*x-2265,-690*x^11+408*x^10+11964*x^9-5316*x^8-73131*x^7+18945*x^6+188124*x^5-4770*x^4-192204*x^3-35220*x^2+41616*x+2646,2158*x^11-2063*x^10-36209*x^9+29139*x^8+211147*x^7-123831*x^6-508297*x^5+133815*x^4+484143*x^3+35309*x^2-83227*x-4941,933*x^4-5598*x^2+3732,7*x^11+580*x^10-884*x^9-9606*x^8+12088*x^7+54510*x^6-54838*x^5-124284*x^4+78894*x^3+107774*x^2-19834*x-9081,-1710*x^11+930*x^10+30015*x^9-12282*x^8-186714*x^7+43746*x^6+492750*x^5-4479*x^4-520710*x^3-100752*x^2+121917*x+8748,973*x^11+382*x^10-18380*x^9-7575*x^8+125854*x^7+53178*x^6-374938*x^5-158658*x^4+448557*x^3+179474*x^2-131464*x-13905,-332*x^11-185*x^10+6073*x^9+3627*x^8-40307*x^7-24513*x^6+116309*x^5+67761*x^4-133119*x^3-67369*x^2+33689*x+1119,1530*x^11+150*x^10-28476*x^9-4479*x^8+191367*x^7+41637*x^6-557703*x^5-153915*x^4+655101*x^3+197196*x^2-189960*x-9153,-618*x^11-24*x^10+11535*x^9+1575*x^8-78351*x^7-18567*x^6+233325*x^5+77061*x^4-282534*x^3-103467*x^2+80589*x+5607,125*x^11-1372*x^10-58*x^9+21462*x^8-17926*x^7-112086*x^6+112360*x^5+223770*x^4-191940*x^3-164318*x^2+79000*x+8445,-1854*x^11+1794*x^10+30873*x^9-25131*x^8-178140*x^7+104775*x^6+423807*x^5-104697*x^4-406293*x^3-41697*x^2+77559*x+5625,-2245*x^11+719*x^10+40265*x^9-8115*x^8-258487*x^7+15213*x^6+714025*x^5+76401*x^4-799587*x^3-184811*x^2+212977*x+11043,813*x^11-213*x^10-14835*x^9+2199*x^8+97335*x^7-1857*x^6-275619*x^5-34377*x^4+313203*x^3+74559*x^2-80505*x-5868,167*x^11+2108*x^10-6295*x^9-33375*x^8+67664*x^7+176721*x^6-277313*x^5-359592*x^4+394317*x^3+272401*x^2-137036*x-15252,-384*x^11+438*x^10+6642*x^9-6585*x^8-40269*x^7+32124*x^6+102894*x^5-55146*x^4-111006*x^3+29970*x^2+35346*x-6462]]; E[168,1] = [x, [1,0,1,0,2,0,-1,0,1,0,0,0,-2,0,2,0,6,0,-4,0,-1,0,-4,0,-1,0,1,0,6,0,-8,0,0,0,-2,0,-10,0,-2,0,-10,0,12,0,2,0,-8,0,1,0,6,0,6,0,0,0,-4,0,4,0,-10,0,-1,0]]; E[168,2] = [x, [1,0,-1,0,2,0,1,0,1,0,0,0,6,0,-2,0,-2,0,4,0,-1,0,-4,0,-1,0,-1,0,-10,0,-8,0,0,0,2,0,6,0,-6,0,-2,0,-4,0,2,0,8,0,1,0,2,0,-10,0,0,0,-4,0,12,0,-2,0,1,0]]; E[169,1] = [x^2-3, [1,x,2,1,-x,2*x,0,-x,1,-3,0,2,0,0,-2*x,-5,3,x,-2*x,-x,0,0,6,-2*x,-2,0,-4,0,3,-6]]; E[169,2] = [x^3+2*x^2-x-1, [1,x,-x^2-2*x,x^2-2,x^2+2*x-2,-x-1,x^2-3,-2*x^2-3*x+1,x^2+3*x-1,-x+1,-x^2-2*x-2,x^2+3*x,0,-2*x^2-2*x+1,x^2+x-2,-x^2-x+2,-x^2+x+2,x^2+1,-2*x^2-x+2,-3*x^2-3*x+4,2*x^2+5*x,-3*x-1,2*x^2+4*x-3,x^2+3*x+3,-3*x^2-5*x+1,0,3*x^2+4*x-3,-x+4,5*x^2+8*x-5,-x^2-x+1]]; E[169,3] = [x^3-2*x^2-x+1, [1,x,-x^2+2*x,x^2-2,-x^2+2*x+2,-x+1,-x^2+3,2*x^2-3*x-1,x^2-3*x-1,x+1,x^2-2*x+2,x^2-3*x,0,-2*x^2+2*x+1,-x^2+x+2,-x^2+x+2,-x^2-x+2,-x^2-1,2*x^2-x-2,3*x^2-3*x-4,-2*x^2+5*x,3*x-1,2*x^2-4*x-3,-x^2+3*x-3,-3*x^2+5*x+1,0,3*x^2-4*x-3,-x-4,5*x^2-8*x-5,-x^2+x+1]]; E[170,1] = [x, [1,1,1,1,-1,1,2,1,-2,-1,0,1,-1,2,-1,1,-1,-2,-1,-1,2,0,-6,1,1,-1,-5,2,-3,-1,5,1,0,-1,-2,-2,8,-1,-1,-1,6,2,-10,0,2,-6,-3,1,-3,1,-1,-1,-3,-5]]; E[170,2] = [x^2+x-4, [1,1,x,1,1,x,-2*x,1,-x+1,1,-4,x,-x+2,-2*x,x,1,1,-x+1,x,1,2*x-8,-4,2*x,x,1,-x+2,-x-4,-2*x,3*x+2,x,x-4,1,-4*x,1,-2*x,-x+1,2*x-2,x,3*x-4,1,-4*x-6,2*x-8,2*x+4,-4,-x+1,2*x,-x+4,x,-4*x+9,1,x,-x+2,x+2,-x-4]]; E[170,3] = [x, [1,-1,1,1,1,-1,2,-1,-2,-1,0,1,5,-2,1,1,-1,2,-1,1,2,0,6,-1,1,-5,-5,2,-9,-1,-1,-1,0,1,2,-2,-4,1,5,-1,-6,-2,2,0,-2,-6,-9,1,-3,-1,-1,5,-9,5]]; E[170,4] = [x, [1,-1,3,1,-1,-3,2,-1,6,1,-4,3,-3,-2,-3,1,1,-6,3,-1,6,4,-6,-3,1,3,9,2,9,3,-3,-1,-12,-1,-2,6,-8,-3,-9,1,-6,-6,6,-4,-6,6,-13,3,-3,-1,3,-3,-9,-9]]; E[170,5] = [x, [1,-1,-2,1,1,2,-2,-1,1,-1,-2,-2,-6,2,-2,1,1,-1,-8,1,4,2,-2,2,1,6,4,-2,6,2,-2,-1,4,-1,-2,1,6,8,12,-1,2,-4,-4,-2,1,2,4,-2,-3,-1,-2,-6,-10,-4]]; E[170,6] = [x, [1,-1,-2,1,-1,2,2,-1,1,1,6,-2,2,-2,2,1,1,-1,8,-1,-4,-6,-6,2,1,-2,4,2,-6,-2,2,-1,-12,-1,-2,1,2,-8,-4,1,-6,4,-4,6,-1,6,12,-2,-3,-1,-2,2,6,-4]]; E[171,1] = [x, [1,-1,0,-1,2,0,0,3,0,-2,0,0,6,0,0,-1,6,0,-1,-2,0,0,-4,0,-1,-6,0,0,-2,0,8,-5,0,-6,0,0,-10,1,0,6]]; E[171,2] = [x^4-9*x^2+12, [2,2*x,0,2*x^2-4,-x^3+5*x,0,-2*x^2+10,2*x^3-8*x,0,-4*x^2+12,x^3-9*x,0,4,-2*x^3+10*x,0,6*x^2-16,-x^3+5*x,0,2,-2*x^3+2*x,0,-12,2*x^3-14*x,0,2*x^2-4,4*x,0,-4*x^2+4,2*x^3-14*x,0,4*x^2-20,2*x^3,0,-4*x^2+12,-x^3+13*x,0,4*x^2-8,2*x,0,-8*x^2]]; E[171,3] = [x, [1,0,0,-2,-3,0,-1,0,0,0,-3,0,-4,0,0,4,3,0,1,6,0,0,0,0,4,0,0,2,-6,0,-4,0,0,0,3,0,2,0,0,0]]; E[171,4] = [x, [1,2,0,2,3,0,-5,0,0,6,-1,0,2,-10,0,-4,1,0,-1,6,0,-2,4,0,4,4,0,-10,2,0,-6,-8,0,2,-15,0,0,-2,0,0]]; E[171,5] = [x, [1,2,0,2,-1,0,3,0,0,-2,3,0,-6,6,0,-4,-3,0,-1,-2,0,6,-4,0,-4,-12,0,6,10,0,2,-8,0,-6,-3,0,8,-2,0,0]]; E[172,1] = [x, [1,0,-2,0,0,0,-4,0,1,0,-3,0,-1,0,0,0,-3,0,2,0,8,0,-3,0,-5,0,4,0,6,0,5,0,6,0,0,0,8,0,2,0,-3,0,1,0]]; E[172,2] = [x^2-4*x+2, [1,0,x,0,-x+2,0,-x+2,0,4*x-5,0,-2*x+5,0,-2*x+1,0,-2*x+2,0,2*x-3,0,-2*x+2,0,-2*x+2,0,3,0,-3,0,8*x-8,0,3*x-8,0,4*x-9,0,-3*x+4,0,2,0,2*x-8,0,-7*x+4,0,-6*x+11,0,-1,0]]; E[173,1] = [x^4+x^3-3*x^2-x+1, [1,x,-x^2-x,x^2-2,x^2-2,-x^3-x^2,x^3+x^2-3*x-3,x^3-4*x,x^3+4*x^2+x-4,x^3-2*x,-3*x^3-4*x^2+6*x+2,-x^2+x+1,-4*x^3-5*x^2+10*x+3,-2*x-1,-x^2+x+1,-x^3-3*x^2+x+3,4*x^3+5*x^2-7*x-3,3*x^3+4*x^2-3*x-1,2*x^3+3*x^2-2*x-4,-x^3-x^2+x+3,2*x^2+3*x+1,-x^3-3*x^2-x+3,3*x^3+2*x^2-8*x-3,x^3+3*x^2+x,-x^3-x^2+x-2,-x^3-2*x^2-x+4,-4*x^3-7*x^2+4*x+4,-2*x^3-4*x^2+5*x+6,-2*x^3-2*x^2+3*x+3]]; E[173,2] = [x^10-x^9-16*x^8+16*x^7+85*x^6-80*x^5-175*x^4+136*x^3+138*x^2-71*x-25, [116,116*x,9*x^9-22*x^8-138*x^7+324*x^6+645*x^5-1439*x^4-940*x^3+1860*x^2+392*x-303,116*x^2-232,-14*x^9+60*x^8+176*x^7-852*x^6-462*x^5+3566*x^4-716*x^3-4092*x^2+1504*x+742,-13*x^9+6*x^8+180*x^7-120*x^6-719*x^5+635*x^4+636*x^3-850*x^2+336*x+225,-2*x^9-37*x^8+79*x^7+537*x^6-849*x^5-2316*x^4+3125*x^3+2767*x^2-2913*x-387,116*x^3-464*x,36*x^9-59*x^8-523*x^7+861*x^6+2261*x^5-3610*x^4-2745*x^3+3641*x^2+611*x+151,46*x^9-48*x^8-628*x^7+728*x^6+2446*x^5-3166*x^4-2188*x^3+3436*x^2-252*x-350,23*x^9+5*x^8-343*x^7-71*x^6+1600*x^5+389*x^4-2399*x^3-921*x^2+715*x+550,-25*x^9+16*x^8+364*x^7-262*x^6-1695*x^5+1239*x^4+2798*x^3-1590*x^2-1482*x+281,-25*x^9-13*x^8+393*x^7+173*x^6-2014*x^5-791*x^4+3755*x^3+1455*x^2-2265*x-560,-39*x^9+47*x^8+569*x^7-679*x^6-2476*x^5+2775*x^4+3039*x^3-2637*x^2-529*x-50,-44*x^9+114*x^8+578*x^7-1642*x^6-1858*x^5+6932*x^4-502*x^3-7798*x^2+3194*x+1114,116*x^4-696*x^2+464,-10*x^9+18*x^8+134*x^7-302*x^6-504*x^5+1470*x^4+342*x^3-1854*x^2+254*x+124,-23*x^9+53*x^8+285*x^7-799*x^6-730*x^5+3555*x^4-1255*x^3-4357*x^2+2707*x+900,-47*x^9+73*x^8+653*x^7-1083*x^6-2566*x^5+4647*x^4+2141*x^3-5141*x^2+463*x+896,26*x^9-12*x^8-360*x^7+240*x^6+1438*x^5-1270*x^4-1388*x^3+1584*x^2-92*x-334,27*x^9-124*x^8-298*x^7+1842*x^6+311*x^5-8261*x^4+3734*x^3+11032*x^2-5378*x-3229,28*x^9+25*x^8-439*x^7-355*x^6+2229*x^5+1626*x^4-4049*x^3-2459*x^2+2183*x+575,10*x^9+40*x^8-192*x^7-568*x^6+1374*x^5+2474*x^4-4112*x^3-3308*x^2+3632*x+978,17*x^9-48*x^8-222*x^7+670*x^6+677*x^5-2847*x^4+538*x^3+3668*x^2-2166*x-1075,24*x^9-20*x^8-368*x^7+284*x^6+1720*x^5-1208*x^4-2352*x^3+1596*x^2+272*x-576,-38*x^9-7*x^8+573*x^7+111*x^6-2791*x^5-620*x^4+4855*x^3+1185*x^2-2335*x-625,111*x^9-107*x^8-1615*x^7+1589*x^6+7172*x^5-6631*x^4-9863*x^3+6207*x^2+3491*x+526,12*x^9+19*x^8-213*x^7-235*x^6+1353*x^5+846*x^4-3583*x^3-681*x^2+3007*x-201,x^9-54*x^8+4*x^7+732*x^6-257*x^5-2815*x^4+1352*x^3+2430*x^2-1168*x+179]]; E[174,1] = [x, [1,1,1,1,-1,1,1,1,1,-1,-2,1,0,1,-1,1,-3,1,-1,-1,1,-2,-4,1,-4,0,1,1,1,-1,4,1,-2,-3,-1,1,3,-1,0,-1,-7,1,9,-2,-1,-4,-1,1,-6,-4,-3,0,-2,1,2,1,-1,1,-3,-1]]; E[174,2] = [x, [1,1,-1,1,1,-1,1,1,1,1,6,-1,-4,1,-1,1,-7,1,-3,1,-1,6,4,-1,-4,-4,-1,1,-1,-1,0,1,-6,-7,1,1,-7,-3,4,1,5,-1,-5,6,1,4,-5,-1,-6,-4,7,-4,10,-1,6,1,3,-1,3,-1]]; E[174,3] = [x, [1,-1,-1,1,3,1,-3,-1,1,-3,6,-1,0,3,-3,1,7,-1,5,3,3,-6,-8,1,4,0,-1,-3,1,3,-8,-1,-6,-7,-9,1,-3,-5,0,-3,-5,-3,3,6,3,8,9,-1,2,-4,-7,0,-2,1,18,3,-5,-1,-11,-3]]; E[174,4] = [x, [1,-1,1,1,-3,-1,5,-1,1,3,6,1,-4,-5,-3,1,3,-1,-1,-3,5,-6,0,-1,4,4,1,5,-1,3,-4,-1,6,-3,-15,1,-1,1,-4,3,-9,-5,-7,6,-3,0,-3,1,18,-4,3,-4,-6,-1,-18,-5,-1,1,3,-3]]; E[174,5] = [x, [1,-1,1,1,2,-1,0,-1,1,-2,-4,1,6,0,2,1,-2,-1,4,2,0,4,0,-1,-1,-6,1,0,-1,-2,-4,-1,-4,2,0,1,-6,-4,6,-2,6,0,-12,-4,2,0,-8,1,-7,1,-2,6,-6,-1,-8,0,4,1,8,2]]; E[175,1] = [x, [1,2,1,2,0,2,-1,0,-2,0,-3,2,1,-2,0,-4,7,-4,0,0,-1,-6,6,0,0,2,-5,-2,-5,0,2,-8,-3,14,0,-4,2,0,1,0]]; E[175,2] = [x, [1,-2,-1,2,0,2,1,0,-2,0,-3,-2,-1,-2,0,-4,-7,4,0,0,-1,6,-6,0,0,2,5,2,-5,0,2,8,3,14,0,-4,-2,0,1,0]]; E[175,3] = [x^2-x-4, [1,x,-x+1,x+2,0,-4,1,x+4,-x+2,0,-x+1,-2*x-2,x-3,x,0,3*x,-x+3,x-4,-2*x-2,0,-x+1,-4,-2*x+2,-4*x,0,-2*x+4,x+3,x+2,3*x-1,0,0,x+4,-x+5,2*x-4,0,-x,-6,-4*x-8,3*x-7,0]]; E[175,4] = [x^2+x-1, [1,x,2*x+2,-x-1,0,2,-1,-2*x-1,4*x+5,0,-2*x+1,-2*x-4,-2*x,-x,0,3*x,-4*x,x+4,-4*x-2,0,-2*x-2,3*x-2,-2*x-5,-2*x-6,0,2*x-2,4*x+12,x+1,5,0,6*x,x+5,2*x-2,4*x-4,0,-5*x-9,-3,2*x-4,-4,0]]; E[175,5] = [x^2-x-1, [1,x,2*x-2,x-1,0,2,1,-2*x+1,-4*x+5,0,2*x+1,-2*x+4,-2*x,x,0,-3*x,-4*x,x-4,4*x-2,0,2*x-2,3*x+2,-2*x+5,2*x-6,0,-2*x-2,4*x-12,x-1,5,0,-6*x,x-5,2*x+2,-4*x-4,0,5*x-9,3,2*x+4,-4,0]]; E[175,6] = [x, [1,0,-1,-2,0,0,-1,0,-2,0,-3,2,-5,0,0,4,-3,0,2,0,1,0,6,0,0,0,5,2,3,0,-4,0,3,0,0,4,-2,0,5,0]]; E[176,1] = [x, [1,0,-1,0,-3,0,-2,0,-2,0,1,0,-4,0,3,0,6,0,-8,0,2,0,3,0,4,0,5,0,0,0,-5,0,-1,0,6,0,-1,0,4,0,0,0,10,0,6,0,0,0,-3,0,-6,0,-6,0,-3]]; E[176,2] = [x, [1,0,3,0,-3,0,2,0,6,0,1,0,0,0,-9,0,-6,0,-4,0,6,0,-1,0,4,0,9,0,-8,0,7,0,3,0,-6,0,-1,0,0,0,4,0,-6,0,-18,0,8,0,-3,0,-18,0,2,0,-3]]; E[176,3] = [x, [1,0,1,0,1,0,2,0,-2,0,-1,0,4,0,1,0,-2,0,0,0,2,0,1,0,-4,0,-5,0,0,0,-7,0,-1,0,2,0,3,0,4,0,-8,0,6,0,-2,0,-8,0,-3,0,-2,0,-6,0,-1]]; E[176,4] = [x^2+x-4, [1,0,x,0,x+2,0,-2*x,0,-x+1,0,1,0,-2*x-2,0,x+4,0,2,0,4,0,2*x-8,0,x-4,0,3*x+3,0,-x-4,0,-2*x-2,0,x+4,0,x,0,-2*x-8,0,-x-6,0,-8,0,-2*x+2,0,2*x+4,0,-2,0,-8,0,-4*x+9,0,2*x,0,4*x+6,0,x+2]]; E[177,1] = [x^2+x-1, [1,x,-1,-x-1,-2*x-1,-x,x-3,-2*x-1,1,x-2,2*x+1,x+1,-2*x-5,-4*x+1,2*x+1,3*x,3*x,x,5*x,x+3,-x+3,-x+2,-x-4,2*x+1,0,-3*x-2,-1,3*x+2,-x+7,-x+2,-9*x-5,x+5,-2*x-1,-3*x+3,7*x+1,-x-1,3*x-2,-5*x+5,2*x+5,5]]; E[177,2] = [x^2-x-1, [1,x,1,x-1,1,x,-x+1,-2*x+1,1,x,-2*x+3,x-1,-1,-1,1,-3*x,-3*x+2,x,3*x-4,x-1,-x+1,x-2,3*x,-2*x+1,-4,-x,1,x-2,-x+3,x,-3*x+1,x-5,-2*x+3,-x-3,-x+1,x-1,-x-4,-x+3,-1,-2*x+1]]; E[177,3] = [x^2+3*x+1, [1,x,1,-3*x-3,-3,x,-x-5,4*x+3,1,-3*x,-4*x-7,-3*x-3,6*x+9,-2*x+1,-3,-3*x+2,x,x,3*x+2,9*x+9,-x-5,5*x+4,-x-4,4*x+3,4,-9*x-6,1,9*x+12,-x-7,-3*x,-x-5,3*x-3,-4*x-7,-3*x-1,3*x+15,-3*x-3,-5*x-8,-7*x-3,6*x+9,-12*x-9]]; E[177,4] = [x^3-4*x-1, [1,x,-1,x^2-2,-x^2+x+2,-x,x+3,1,1,x^2-2*x-1,-x^2-x+2,-x^2+2,-x^2-x+4,x^2+3*x,x^2-x-2,-2*x^2+x+4,3*x^2-2*x-7,x,-x^2+5,x-3,-x-3,-x^2-2*x-1,-x^2-2*x+3,-1,x^2-3*x-3,-x^2-1,-1,3*x^2+2*x-5,2*x^2+x-9,-x^2+2*x+1,2*x^2-x-1,x^2-4*x-4,x^2+x-2,-2*x^2+5*x+3,-2*x^2+x+5,x^2-2,-x^2-2*x+1,x-1,x^2+x-4,-x^2+x+2]]; E[178,1] = [x, [1,-1,2,1,2,-2,0,-1,1,-2,0,2,-4,0,4,1,2,-1,-2,2,0,0,8,-2,-1,4,-4,0,0,-4,0,-1,0,-2,0,1,0,2,-8,-2,-10,0,-2,0,2]]; E[178,2] = [x^2+2*x-1, [1,-1,x,1,-2*x-3,-x,-2,-1,-2*x-2,2*x+3,2*x,x,-2,2,x-2,1,2*x-1,2*x+2,x+2,-2*x-3,-2*x,-2*x,-x-8,-x,4*x+8,2,-x-2,-2,-4*x-4,-x+2,-x+2,-1,-4*x+2,-2*x+1,4*x+6,-2*x-2,4*x+10,-x-2,-2*x,2*x+3,4*x+4,2*x,-5*x-2,2*x,2*x+10]]; E[178,3] = [x, [1,1,1,1,3,1,-4,1,-2,3,-6,1,2,-4,3,1,3,-2,5,3,-4,-6,-3,1,4,2,-5,-4,0,3,5,1,-6,3,-12,-2,-10,5,2,3,0,-4,-1,-6,-6]]; E[178,4] = [x^3-x^2-8*x+4, [2,2,2*x,2,-2*x,2*x,-x^2-x+6,2,2*x^2-6,-2*x,4,2*x,x^2-3*x-6,-x^2-x+6,-2*x^2,2,-2*x^2+8,2*x^2-6,2*x-8,-2*x,-2*x^2-2*x+4,4,3*x^2+x-14,2*x,2*x^2-10,x^2-3*x-6,2*x^2+4*x-8,-x^2-x+6,-3*x^2+5*x+18,-2*x^2,x^2-x-18,2,4*x,-2*x^2+8,2*x^2+2*x-4,2*x^2-6,x^2-3*x+2,2*x-8,-2*x^2+2*x-4,-2*x,-2*x^2+2*x+8,-2*x^2-2*x+4,-2*x^2+4*x+4,4,-2*x^2-10*x+8]]; E[179,1] = [x, [1,2,0,2,3,0,-4,0,-3,6,4,0,-1,-8,0,-4,1,-6,-3,6,0,8,6,0,4,-2,0,-8,3,0]]; E[179,2] = [x^3+x^2-2*x-1, [1,x,-x-1,x^2-2,-x^2-x,-x^2-x,x-1,-x^2-2*x+1,x^2+2*x-2,-2*x-1,2*x^2+x-4,1,-x^2-2,x^2-x,x^2+3*x+1,-3*x^2-x+3,5*x^2+2*x-7,x^2+1,-3*x^2+2,x,-x^2+1,-x^2+2,-3*x^2+8,2*x^2+3*x,2*x^2+3*x-4,x^2-4*x-1,-2*x^2+x+4,-2*x^2+3,-5*x^2+8,2*x^2+3*x+1]]; E[179,3] = [x^11+3*x^10-14*x^9-45*x^8+59*x^7+225*x^6-58*x^5-427*x^4-76*x^3+240*x^2+56*x-16, [136,136*x,-42*x^10-68*x^9+690*x^8+942*x^7-3876*x^6-4112*x^5+8482*x^4+5986*x^3-5790*x^2-1244*x+360,136*x^2-272,-3*x^10-17*x^9+42*x^8+247*x^7-221*x^6-1151*x^5+618*x^4+1841*x^3-892*x^2-628*x+424,58*x^10+102*x^9-948*x^8-1398*x^7+5338*x^6+6046*x^5-11948*x^4-8982*x^3+8836*x^2+2712*x-672,14*x^10+34*x^9-196*x^8-518*x^7+850*x^6+2606*x^5-1116*x^4-4738*x^3-144*x^2+2160*x+288,136*x^3-544*x,-96*x^10-170*x^9+1514*x^8+2396*x^7-8058*x^6-10890*x^5+16410*x^4+17636*x^3-10082*x^2-6564*x+920,-8*x^10+112*x^8-44*x^7-476*x^6+444*x^5+560*x^4-1120*x^3+92*x^2+592*x-48,40*x^10+68*x^9-628*x^8-936*x^7+3332*x^6+4036*x^5-6812*x^4-5688*x^3+4164*x^2+984*x-32,12*x^10-168*x^8+32*x^7+748*x^6-360*x^5-1180*x^4+1272*x^3+372*x^2-1432*x+208,-17*x^10-17*x^9+272*x^8+221*x^7-1513*x^6-867*x^5+3468*x^4+1003*x^3-2754*x^2-136*x+408,-8*x^10+112*x^8+24*x^7-544*x^6-304*x^5+1240*x^4+920*x^3-1200*x^2-496*x+224,140*x^10+238*x^9-2266*x^8-3344*x^7+12546*x^6+15146*x^5-27310*x^4-24600*x^3+19402*x^2+9360*x-2016,136*x^4-816*x^2+544,39*x^10+51*x^9-648*x^8-695*x^7+3723*x^6+3029*x^5-8476*x^4-4689*x^3+5986*x^2+1500*x+64,118*x^10+170*x^9-1924*x^8-2394*x^7+10710*x^6+10842*x^5-23356*x^4-17378*x^3+16476*x^2+6296*x-1536,79*x^10+119*x^9-1276*x^8-1631*x^7+7055*x^6+7065*x^5-15424*x^4-10377*x^3+11374*x^2+2484*x-1328,30*x^10+34*x^9-488*x^8-498*x^7+2686*x^6+2398*x^5-5772*x^4-4198*x^3+4296*x^2+1656*x-976,-150*x^10-238*x^9+2440*x^8+3374*x^7-13566*x^6-15458*x^5+29608*x^4+25274*x^3-21004*x^2-9504*x+2160,-52*x^10-68*x^9+864*x^8+972*x^7-4964*x^6-4492*x^5+11392*x^4+7204*x^3-8616*x^2-2272*x+640,-176*x^10-272*x^9+2872*x^8+3792*x^7-16048*x^6-16888*x^5+35304*x^4+26224*x^3-25312*x^2-8328*x+1936,-152*x^10-204*x^9+2468*x^8+2836*x^7-13736*x^6-12576*x^5+30292*x^4+19248*x^3-21984*x^2-5888*x+1536,59*x^10+85*x^9-962*x^8-1163*x^7+5321*x^6+5047*x^5-11338*x^4-7533*x^3+7592*x^2+1720*x-496,34*x^10+34*x^9-544*x^8-510*x^7+2958*x^6+2482*x^5-6256*x^4-4046*x^3+3944*x^2+1360*x-272,-60*x^10-68*x^9+976*x^8+860*x^7-5372*x^6-3164*x^5+11272*x^4+2956*x^3-6960*x^2+1176*x-88,-4*x^10-68*x^9+56*x^8+964*x^7-204*x^6-4436*x^5-264*x^4+7668*x^3+1712*x^2-3648*x-704,155*x^10+221*x^9-2578*x^8-3083*x^7+14841*x^6+13727*x^5-34378*x^4-21293*x^3+27432*x^2+6856*x-3320,-182*x^10-306*x^9+2956*x^8+4286*x^7-16354*x^6-19190*x^5+35180*x^4+30042*x^3-24240*x^2-9856*x+2240]]; E[180,1] = [x, [1,0,0,0,1,0,2,0,0,0,0,0,2,0,0,0,6,0,-4,0,0,0,-6,0,1,0,0,0,-6,0,-4,0,0,0,2,0,2,0,0,0,-6,0,-10,0,0,0,6,0,-3,0,0,0,6,0,0,0,0,0,-12,0,2,0,0,0,2,0,2,0,0,0,12,0]]; E[181,1] = [x^5+3*x^4-x^3-7*x^2-2*x+1, [1,x,-x^4-2*x^3+2*x^2+3*x-1,x^2-2,2*x^4+5*x^3-4*x^2-11*x-1,x^4+x^3-4*x^2-3*x+1,-2*x^3-2*x^2+5*x+1,x^3-4*x,x^4+3*x^3-4*x-2,-x^4-2*x^3+3*x^2+3*x-2,-x^4-3*x^3+x^2+6*x-3,x^3-3*x+1,-2*x^4-3*x^3+8*x^2+8*x-5,-2*x^4-2*x^3+5*x^2+x,-x^4-3*x^3+3*x^2+9*x-2,x^4-6*x^2+4,2*x^4+4*x^3-5*x^2-8*x,x^3+3*x^2-1,-3*x^4-5*x^3+8*x^2+10*x-2,-3*x^4-8*x^3+4*x^2+18*x+3,2*x^4+5*x^3-4*x^2-8*x+2,-x^2-5*x+1,2*x^4+3*x^3-6*x^2-3*x+2,-x^4-2*x^3+5*x^2+7*x-2,-2*x^3-6*x^2+3*x+11,3*x^4+6*x^3-6*x^2-9*x+2,3*x^4+4*x^3-11*x^2-10*x+4,4*x^4+7*x^3-9*x^2-14*x,-x^4-x^3+3*x^2-x-5,2*x^3+2*x^2-4*x+1]]; E[181,2] = [x^9-3*x^8-9*x^7+29*x^6+23*x^5-84*x^4-23*x^3+89*x^2+8*x-27, [4,4*x,2*x^8-8*x^7-10*x^6+64*x^5-14*x^4-118*x^3+48*x^2+50*x-14,4*x^2-8,x^7-x^6-10*x^5+8*x^4+25*x^3-18*x^2-10*x+15,-2*x^8+8*x^7+6*x^6-60*x^5+50*x^4+94*x^3-128*x^2-30*x+54,x^8-3*x^7-4*x^6+20*x^5-19*x^4-20*x^3+58*x^2-x-22,4*x^3-16*x,-4*x^7+8*x^6+36*x^5-64*x^4-84*x^3+120*x^2+52*x-44,x^8-x^7-10*x^6+8*x^5+25*x^4-18*x^3-10*x^2+15*x,-2*x^8+2*x^7+24*x^6-16*x^5-94*x^4+32*x^3+140*x^2-18*x-48,-2*x^8+4*x^7+18*x^6-32*x^5-46*x^4+62*x^3+52*x^2-30*x-26,-2*x^8+7*x^7+11*x^6-58*x^5+14*x^4+121*x^3-82*x^2-72*x+47,5*x^7-9*x^6-42*x^5+64*x^4+81*x^3-90*x^2-30*x+27,10*x^7-26*x^6-76*x^5+204*x^4+118*x^3-368*x^2-40*x+150,4*x^4-24*x^2+16,6*x^8-18*x^7-40*x^6+140*x^5+26*x^4-244*x^3+68*x^2+90*x-48,-4*x^8+8*x^7+36*x^6-64*x^5-84*x^4+120*x^3+52*x^2-44*x,-3*x^8+11*x^7+14*x^6-84*x^5+33*x^4+134*x^3-106*x^2-33*x+44,2*x^8-3*x^7-19*x^6+22*x^5+50*x^4-37*x^3-38*x^2+12*x-3,4*x^8-6*x^7-42*x^6+48*x^5+136*x^4-90*x^3-164*x^2+20*x+50,-4*x^8+6*x^7+42*x^6-48*x^5-136*x^4+94*x^3+160*x^2-32*x-54,-5*x^8+19*x^7+24*x^6-152*x^5+51*x^4+288*x^3-182*x^2-147*x+90,2*x^8-16*x^7+14*x^6+120*x^5-206*x^4-182*x^3+404*x^2+50*x-162,-4*x^8+5*x^7+43*x^6-38*x^5-144*x^4+65*x^3+182*x^2-18*x-65,x^8-7*x^7+60*x^5-47*x^4-128*x^3+106*x^2+63*x-54,4*x^8-20*x^7-8*x^6+160*x^5-128*x^4-296*x^3+300*x^2+132*x-128,3*x^8-3*x^7-34*x^6+24*x^5+119*x^4-50*x^3-146*x^2+29*x+44,3*x^7-11*x^6-18*x^5+88*x^4+7*x^3-158*x^2+10*x+57,10*x^8-26*x^7-76*x^6+204*x^5+118*x^4-368*x^3-40*x^2+150*x]]; E[182,1] = [x, [1,-1,1,1,4,-1,-1,-1,-2,-4,-1,1,1,1,4,1,4,2,2,4,-1,1,-7,-1,11,-1,-5,-1,-8,-4,3,-1,-1,-4,-4,-2,7,-2,1,-4,-7,1,-8,-1,-8,7,3,1,1,-11,4,1,0,5,-4,1]]; E[182,2] = [x, [1,-1,3,1,0,-3,1,-1,6,0,-5,3,-1,-1,0,1,-4,-6,2,0,3,5,5,-3,-5,1,9,1,4,0,1,-1,-15,4,0,6,7,-2,-3,0,-9,-3,-12,-5,0,-5,-7,3,1,5,-12,-1,-4,-9,0,-1]]; E[182,3] = [x, [1,1,3,1,-4,3,-1,1,6,-4,1,3,-1,-1,-12,1,0,6,-6,-4,-3,1,-7,3,11,-1,9,-1,-4,-12,7,1,3,0,4,6,9,-6,-3,-4,-3,-3,4,1,-24,-7,7,3,1,11,0,-1,0,9,-4,-1]]; E[182,4] = [x, [1,1,1,1,0,1,1,1,-2,0,-3,1,1,1,0,1,0,-2,2,0,1,-3,-3,1,-5,1,-5,1,0,0,5,1,-3,0,0,-2,-7,2,1,0,3,1,8,-3,0,-3,-3,1,1,-5,0,1,-12,-5,0,1]]; E[182,5] = [x, [1,1,0,1,2,0,-1,1,-3,2,4,0,-1,-1,0,1,-6,-3,0,2,0,4,8,0,-1,-1,0,-1,-10,0,-8,1,0,-6,-2,-3,6,0,0,2,-6,0,4,4,-6,8,-8,0,1,-1,0,-1,6,0,8,-1]]; E[183,1] = [x^2+2*x-1, [1,x,-1,-2*x-1,-1,-x,-x-2,x-2,1,-x,-x-2,2*x+1,-3,-1,1,3,-6,x,4*x+6,2*x+1,x+2,-1,3*x+2,-x+2,-4,-3*x,-1,x+4,-4*x-4,x,4*x+6,x+4,x+2,-6*x,x+2,-2*x-1,2*x,-2*x+4,3,-x+2,-2*x-5]]; E[183,2] = [x^3-x^2-3*x+1, [1,x,-1,x^2-2,2,-x,-2*x^2+2*x+4,x^2-x-1,1,2*x,-x^2+3,-x^2+2,2*x^2-2*x-2,-2*x+2,-2,-2*x^2+2*x+3,-x^2-2*x+7,x,-2*x-2,2*x^2-4,2*x^2-2*x-4,-x^2+1,3*x^2-4*x-5,-x^2+x+1,-1,4*x-2,-1,2*x^2-2*x-8,-x^2+2*x+3,-2*x,2*x^2+2*x-8,-2*x^2-x+4,x^2-3,-3*x^2+4*x+1,-4*x^2+4*x+8,x^2-2,4*x^2-4*x-10,-2*x^2-2*x,-2*x^2+2*x+2,2*x^2-2*x-2,-2*x^2+4*x+4]]; E[183,3] = [x^6-11*x^4+2*x^3+31*x^2-10*x-17, [2,2*x,2,2*x^2-4,x^5+2*x^4-10*x^3-16*x^2+21*x+20,2*x,-2*x^5-3*x^4+18*x^3+22*x^2-34*x-23,2*x^3-8*x,2,2*x^5+x^4-18*x^3-10*x^2+30*x+17,-x^4+6*x^2-2*x-5,2*x^2-4,-x^5+10*x^3-21*x+2,-3*x^5-4*x^4+26*x^3+28*x^2-43*x-34,x^5+2*x^4-10*x^3-16*x^2+21*x+20,2*x^4-12*x^2+8,2*x^5+2*x^4-18*x^3-12*x^2+32*x+10,2*x,2*x^5+2*x^4-16*x^3-16*x^2+22*x+26,-x^5+6*x^3-5*x-6,-2*x^5-3*x^4+18*x^3+22*x^2-34*x-23,-x^5+6*x^3-2*x^2-5*x,-x^4+10*x^2-2*x-17,2*x^3-8*x,5*x^5+6*x^4-46*x^3-44*x^2+85*x+54,-x^4+2*x^3+10*x^2-8*x-17,2,-x^4-2*x^3+6*x^2+4*x-5,2*x^4+2*x^3-16*x^2-10*x+18,2*x^5+x^4-18*x^3-10*x^2+30*x+17,-4*x^5-6*x^4+36*x^3+48*x^2-64*x-62,2*x^5-16*x^3+24*x,-x^4+6*x^2-2*x-5,2*x^5+4*x^4-16*x^3-30*x^2+30*x+34,-4*x^5-3*x^4+38*x^3+26*x^2-72*x-43,2*x^2-4,-2*x^5-2*x^4+16*x^3+12*x^2-18*x-10,2*x^5+6*x^4-20*x^3-40*x^2+46*x+34,-x^5+10*x^3-21*x+2,-4*x^5-7*x^4+38*x^3+46*x^2-76*x-51,-3*x^5-4*x^4+26*x^3+32*x^2-39*x-46]]; E[184,1] = [x, [1,0,3,0,0,0,-2,0,6,0,0,0,-5,0,0,0,-6,0,6,0,-6,0,1,0,-5,0,9,0,9,0,3,0,0,0,0,0,-8,0,-15,0,3,0,-8,0,0,0,7,0]]; E[184,2] = [x^2+x-4, [1,0,x,0,2,0,0,0,-x+1,0,-2*x,0,-x+2,0,2*x,0,2*x+2,0,-2*x,0,0,0,-1,0,-1,0,-x-4,0,x+2,0,x-4,0,2*x-8,0,0,0,4*x+2,0,3*x-4,0,-5*x-2,0,-8,0,-2*x+2,0,-3*x+4,0]]; E[184,3] = [x, [1,0,0,0,0,0,4,0,-3,0,6,0,-2,0,0,0,6,0,-6,0,0,0,1,0,-5,0,0,0,-6,0,0,0,0,0,0,0,-8,0,0,0,6,0,-2,0,0,0,-8,0]]; E[184,4] = [x, [1,0,-1,0,-2,0,-4,0,-2,0,-2,0,7,0,2,0,-4,0,-6,0,4,0,-1,0,-1,0,5,0,5,0,3,0,2,0,8,0,2,0,-7,0,-9,0,8,0,4,0,-1,0]]; E[184,5] = [x, [1,0,-1,0,-4,0,2,0,-2,0,-4,0,-5,0,4,0,-2,0,6,0,-2,0,1,0,11,0,5,0,1,0,-9,0,4,0,-8,0,-4,0,5,0,3,0,8,0,8,0,-5,0]]; E[185,1] = [x, [1,-2,1,2,-1,-2,-5,0,-2,2,3,2,-2,10,-1,-4,-4,4,-4,-2,-5,-6,-2,0,1,4,-5,-10,2,2,0,8,3,8,5,-4,-1,8]]; E[185,2] = [x, [1,1,-2,-1,-1,-2,-2,-3,1,-1,0,2,-2,-2,2,-1,2,1,2,1,4,0,-8,6,1,-2,4,2,2,2,-6,5,0,2,2,-1,-1,2]]; E[185,3] = [x^5-2*x^4-8*x^3+14*x^2+11*x-12, [2,2*x,-x^3+5*x+2,2*x^2-4,-2,-x^4+5*x^2+2*x,x^4-7*x^2-2*x+10,2*x^3-8*x,x^4-x^3-7*x^2+5*x+8,-2*x,-2*x^2+6,-2*x^4-x^3+16*x^2+x-16,-x^4+x^3+5*x^2-5*x+4,2*x^4+x^3-16*x^2-x+12,x^3-5*x-2,2*x^4-12*x^2+8,-x^4+x^3+9*x^2-9*x-12,x^4+x^3-9*x^2-3*x+12,-2*x^4+x^3+16*x^2-5*x-20,-2*x^2+4,x^4-3*x^3-7*x^2+11*x+10,-2*x^3+6*x,-2*x^4+18*x^2-24,-3*x^4+19*x^2+2*x-24,2,-x^4-3*x^3+9*x^2+15*x-12,x^4+x^3-9*x^2-7*x+14,3*x^4-15*x^2-6*x+4,-2*x^3+10*x,x^4-5*x^2-2*x,-x^4+2*x^3+5*x^2-8*x+4,4*x^4-28*x^2+2*x+24,2*x^4-16*x^2+4*x+18,-x^4+x^3+5*x^2-x-12,-x^4+7*x^2+2*x-10,x^4+x^3-3*x^2-9*x-4,2,-3*x^4+23*x^2+2*x-24]]; E[185,4] = [x^5-8*x^3+2*x^2+11*x-2, [2,2*x,-x^4+7*x^2-2*x-6,2*x^2-4,2,-x^3+5*x-2,-x^3-2*x^2+5*x+8,2*x^3-8*x,x^4+x^3-9*x^2-5*x+14,2*x,2*x^4+2*x^3-12*x^2-6*x+10,x^4-9*x^2+2*x+12,-x^4-x^3+7*x^2+x-6,-x^4-2*x^3+5*x^2+8*x,-x^4+7*x^2-2*x-6,2*x^4-12*x^2+8,-x^4-x^3+7*x^2+5*x-10,x^4-x^3-7*x^2+3*x+2,-x^4-2*x^3+5*x^2+4*x+4,2*x^2-4,-3*x^4-x^3+23*x^2+x-28,2*x^4+4*x^3-10*x^2-12*x+4,2*x^4-14*x^2+12,x^3-9*x+6,2,-x^4-x^3+3*x^2+5*x-2,-x^4+x^3+11*x^2-7*x-20,-2*x^4-x^3+14*x^2+x-18,2*x^4+4*x^3-10*x^2-16*x+4,-x^3+5*x-2,2*x^4+3*x^3-14*x^2-11*x+18,-4*x^2+2*x+4,-2*x^4+16*x^2-4*x-26,-x^4-x^3+7*x^2+x-2,-x^3-2*x^2+5*x+8,-3*x^4-x^3+19*x^2+x-26,-2,-2*x^4-3*x^3+6*x^2+15*x-2]]; E[185,5] = [x, [1,0,-1,-2,1,0,-3,0,-2,0,-5,2,4,0,-1,4,-4,0,-8,-2,3,0,4,0,1,0,5,6,4,0,2,0,5,0,-3,4,1,0]]; E[186,1] = [x, [1,-1,-1,1,-1,1,2,-1,1,1,3,-1,3,-2,1,1,1,-1,7,-1,-2,-3,0,1,-4,-3,-1,2,4,-1,1,-1,-3,-1,-2,1,-10,-7,-3,1,-6,2,6,3,-1,0,-5,-1,-3,4,-1,3,-2,1,-3,-2,-7,-4,6,1,3,-1,2,1]]; E[186,2] = [x, [1,-1,1,1,3,-1,-2,-1,1,-3,5,1,-7,2,3,1,-1,-1,7,3,-2,-5,4,-1,4,7,1,-2,-8,-3,-1,-1,5,1,-6,1,-6,-7,-7,-3,-2,2,-10,5,3,-4,-1,1,-3,-4,-1,-7,6,-1,15,2,7,8,-10,3,1,1,-2,1]]; E[186,3] = [x, [1,1,1,1,1,1,-2,1,1,1,-3,1,-1,-2,1,1,3,1,-5,1,-2,-3,4,1,-4,-1,1,-2,0,1,1,1,-3,3,-2,1,-2,-5,-1,1,2,-2,-6,-3,1,4,-7,1,-3,-4,3,-1,14,1,-3,-2,-5,0,10,1,7,1,-2,1]]; E[186,4] = [x^2-3*x-2, [1,1,-1,1,x,-1,-2*x+4,1,1,x,x-2,-1,x,-2*x+4,-x,1,-3*x+4,1,x-2,x,2*x-4,x-2,-8,-1,3*x-3,x,-1,-2*x+4,2*x-6,-x,-1,1,-x+2,-3*x+4,-2*x-4,1,-4*x+6,x-2,-x,x,-4*x+2,2*x-4,2*x-8,x-2,x,-8,3*x-2,-1,-4*x+17,3*x-3,3*x-4,x,-2,-1,x+2,-2*x+4,-x+2,2*x-6,2*x,-x,x,-1,-2*x+4,1]]; E[187,1] = [x^2+2*x-2, [1,x,-x-1,-2*x,x-1,x-2,-2,2*x-4,0,-3*x+2,1,-2*x+4,-x-6,-2*x,2*x-1,-4*x+4,1,0,3*x+2,6*x-4,2*x+2,x,x-1,6*x,-4*x-2,-4*x-2,3*x+3,4*x,-x-4,-5*x+4,x+5,8*x,-x-1,x,-2*x+2,0]]; E[187,2] = [x^3+2*x^2-2*x-2, [1,x,-x^2-x+1,x^2-2,-x-3,x^2-x-2,2*x^2+2*x-4,-2*x^2-2*x+2,x^2-2,-x^2-3*x,-1,-x^2+2*x,3*x+2,-2*x^2+4,2*x^2+4*x-1,-2*x,-1,-2*x^2+2,-2*x^2-5*x+4,-x^2+4,2*x-4,-x,-x^2-x-3,2*x^2+2,x^2+6*x+4,3*x^2+2*x,2*x^2+5*x-3,-4*x+4,-x^2-3*x-4,3*x+4,2*x^2+5*x-5,2*x^2+4*x-4,x^2+x-1,-x,-4*x^2-6*x+8,2*x^2-2*x]]; E[187,3] = [x^4-x^3-6*x^2+2*x+2, [1,x,-x^3+x^2+5*x-1,x^2-2,-x+1,-x^2+x+2,0,x^3-4*x,-x^2+6,-x^2+x,-1,x^3-x^2-8*x+2,x^3-2*x^2-5*x+4,0,-x^3+2*x^2+4*x-3,x^3-2*x+2,1,-x^3+6*x,x^3-7*x-2,-x^3+x^2+2*x-2,0,-x,x^3-x^2-7*x+3,-2*x-6,x^2-2*x-4,-x^3+x^2+2*x-2,-2*x^3+2*x^2+13*x-3,0,x^2-x,x^3-2*x^2-x+2,-2*x^3+13*x-1,-x^3+4*x^2+8*x-2,x^3-x^2-5*x+1,x,0,-x^3+2*x^2+2*x-10]]; E[187,4] = [x, [1,0,1,-2,3,0,2,0,-2,0,1,-2,2,0,3,4,-1,0,2,-6,2,0,-3,0,4,0,-5,-4,-6,0,-7,0,1,0,6,4]]; E[187,5] = [x^2+x-4, [1,2,x,2,-x,2*x,-x+1,0,-x+1,-2*x,1,2*x,0,-2*x+2,x-4,-4,-1,-2*x+2,2*x-2,-2*x,2*x-4,2,3*x+2,0,-x-1,0,-x-4,-2*x+2,-x+7,2*x-8,x,-8,x,-2,-2*x+4,-2*x+2]]; E[187,6] = [x, [1,2,0,2,4,0,-5,0,-3,8,-1,0,4,-10,0,-4,1,-6,2,8,0,-2,-2,0,11,8,0,-10,-3,0,4,-8,0,2,-20,-6]]; E[188,1] = [x^2-x-3, [1,0,x,0,0,0,-x+3,0,x,0,-2*x+2,0,2,0,0,0,-x-2,0,-2*x+4,0,2*x-3,0,2*x-2,0,-5,0,-2*x+3,0,2*x-2,0,4*x-2,0,-6,0,0,0,-3*x+2,0,2*x,0,-6,0,2*x,0,0,0,-1,0]]; E[188,2] = [x^2+3*x+1, [1,0,x,0,-2*x-4,0,-x-5,0,-3*x-4,0,4*x+4,0,4*x+4,0,2*x+2,0,3*x+6,0,-6*x-10,0,-2*x+1,0,-4*x-6,0,4*x+7,0,2*x+3,0,0,0,0,0,-8*x-4,0,8*x+18,0,-3*x-10,0,-8*x-4,0,2*x+12,0,-10,0,2*x+10,0,1,0]]; E[189,1] = [x, [1,2,0,2,1,0,-1,0,0,2,4,0,-2,-2,0,-4,-3,0,-8,2,0,8,6,0,-4,-4,0,-2,4,0,6,-8,0,-6,-1,0,-3,-16,0,0,-1,0,11,8,0,12,-9,0]]; E[189,2] = [x, [1,-2,0,2,-1,0,-1,0,0,2,-4,0,-2,2,0,-4,3,0,-8,-2,0,8,-6,0,-4,4,0,-2,-4,0,6,8,0,-6,1,0,-3,16,0,0,1,0,11,-8,0,12,9,0]]; E[189,3] = [x^2-7, [1,x,0,5,-x,0,-1,3*x,0,-7,-x,0,-2,-x,0,11,0,0,7,-5*x,0,-7,-3*x,0,2,-2*x,0,-5,2*x,0,3,5*x,0,0,x,0,-3,7*x,0,-21,x,0,8,-5*x,0,-21,0,0]]; E[189,4] = [x^2-3, [1,x,0,1,x,0,1,-x,0,3,-x,0,2,x,0,-5,-4*x,0,5,x,0,-3,x,0,-2,2*x,0,1,-6*x,0,5,-3*x,0,-12,x,0,-7,5*x,0,-3,3*x,0,-4,-x,0,3,4*x,0]]; E[189,5] = [x, [1,0,0,-2,3,0,1,0,0,0,6,0,-4,0,0,4,3,0,2,-6,0,0,-6,0,4,0,0,-2,-6,0,-4,0,0,0,3,0,-7,0,0,0,-3,0,-1,-12,0,0,9,0]]; E[189,6] = [x, [1,0,0,-2,-3,0,1,0,0,0,-6,0,-4,0,0,4,-3,0,2,6,0,0,6,0,4,0,0,-2,6,0,-4,0,0,0,-3,0,-7,0,0,0,3,0,-1,12,0,0,-9,0]]; E[190,1] = [x, [1,1,1,1,1,1,-1,1,-2,1,0,1,-1,-1,1,1,-3,-2,1,1,-1,0,3,1,1,-1,-5,-1,-3,1,2,1,0,-3,-1,-2,-10,1,-1,1,6,-1,2,0,-2,3,0,1,-6,1,-3,-1,3,-5,0,-1,1,-3,3,1]]; E[190,2] = [x, [1,1,-3,1,-1,-3,-5,1,6,-1,-4,-3,-1,-5,3,1,-3,6,1,-1,15,-4,7,-3,1,-1,-9,-5,-3,3,-2,1,12,-3,5,6,-2,1,3,-1,-6,15,6,-4,-6,7,0,-3,18,1,9,-1,-13,-9,4,-5,-3,-3,-9,3]]; E[190,3] = [x, [1,-1,-1,1,-1,1,-1,-1,-2,1,0,-1,-3,1,1,1,-7,2,-1,-1,1,0,-5,1,1,3,5,-1,-5,-1,10,-1,0,7,1,-2,2,1,3,1,2,-1,6,0,2,5,0,-1,-6,-1,7,-3,9,-5,0,1,1,5,-7,1]]; E[190,4] = [x^2+x-4, [1,-1,x,1,1,-x,x,-1,-x+1,-1,4,x,-3*x-2,-x,x,1,x+6,x-1,-1,1,-x+4,-4,-3*x,-x,1,3*x+2,-x-4,x,3*x+2,-x,2*x,-1,4*x,-x-6,x,-x+1,-6,1,x-12,-1,-4*x+2,x-4,-2*x-8,4,-x+1,3*x,-4*x-4,x,-x-3,-1,5*x+4,-3*x-2,x-2,x+4,4,-x,-x,-3*x-2,-x,x]]; E[191,1] = [x^2+x-1, [1,x,-1,-x-1,-x-1,-x,-x-1,-2*x-1,-2,-1,x,x+1,3*x-2,-1,x+1,3*x,0,-2*x,-3,x+2,x+1,-x+1,x,2*x+1,x-3,-5*x+3,5,x+2,-2*x-1,1,5*x,x+5]]; E[191,2] = [x^14-23*x^12+x^11+205*x^10-13*x^9-895*x^8+35*x^7+1993*x^6+103*x^5-2135*x^4-465*x^3+853*x^2+374*x+41, [114035,114035*x,-145153*x^13+32777*x^12+3364061*x^11-874037*x^10-30238352*x^9+8179107*x^8+133274007*x^7-31876833*x^6-300314067*x^5+43961084*x^4+328052329*x^3+4557079*x^2-138909015*x-29013772,114035*x^2-228070,-44318*x^13-468*x^12+996676*x^11-67192*x^10-8645332*x^9+1110732*x^8+36541877*x^7-5434583*x^6-78444822*x^5+7801444*x^4+81404284*x^3+2785164*x^2-33114860*x-6986182,32777*x^13+25542*x^12-728884*x^11-481987*x^10+6292118*x^9+3362072*x^8-26796478*x^7-11024138*x^6+58911843*x^5+18150674*x^4-62939066*x^3-15093506*x^2+25273450*x+5951273,148787*x^13-73368*x^12-3418414*x^11+1764598*x^10+30273378*x^9-15485288*x^8-130230738*x^7+59339692*x^6+282975218*x^5-90112966*x^4-296004726*x^3+24031844*x^2+122955660*x+24473743,114035*x^3-456140*x,34542*x^13+21737*x^12-802949*x^11-412297*x^10+7331993*x^9+2916102*x^8-33454383*x^7-9948713*x^6+79726068*x^5+18237999*x^4-92932081*x^3-19074881*x^2+40503985*x+10072718,-468*x^13-22638*x^12-22874*x^11+439858*x^10+534598*x^9-3122733*x^8-3883453*x^7+9880952*x^6+12366198*x^5-13214646*x^4-17822706*x^3+4688394*x^2+9588750*x+1817038,-317749*x^13+87501*x^12+7255723*x^11-2329051*x^10-63902811*x^9+21925031*x^8+273703901*x^7-87350029*x^6-592597121*x^5+131174117*x^4+615896407*x^3-20228013*x^2-251185785*x-50606546,315848*x^13-40567*x^12-7242886*x^11+1320907*x^10+64264877*x^9-13819277*x^8-278719347*x^7+57340948*x^6+615402777*x^5-80882339*x^4-655956859*x^3-11799489*x^2+271510705*x+56683687,169418*x^13-44707*x^12-3873501*x^11+1208972*x^10+34207957*x^9-11502337*x^8-147297467*x^7+46178043*x^6+321976277*x^5-69816889*x^4-339639974*x^3+10698151*x^2+140483715*x+28321417,-73368*x^13+3687*x^12+1615811*x^11-227957*x^10-13551057*x^9+2933627*x^8+54132147*x^7-13557273*x^6-105438027*x^5+21655519*x^4+93217799*x^3-3959651*x^2-31172595*x-6100267,101858*x^13-58322*x^12-2292531*x^11+1387757*x^10+19694912*x^9-12095462*x^8-80836142*x^7+46393178*x^6+162965222*x^5-72409694*x^4-152342989*x^3+26703391*x^2+56663100*x+10449012,114035*x^4-684210*x^2+456140,303228*x^13-86692*x^12-6907461*x^11+2286332*x^10+60603762*x^9-21383092*x^8-257968172*x^7+84810468*x^6+552823792*x^5-127305184*x^4-565213084*x^3+21919331*x^2+225661240*x+45171892,21737*x^13-8483*x^12-446839*x^11+250883*x^10+3365148*x^9-2539293*x^8-11157683*x^7+10883862*x^6+14680173*x^5-19184911*x^4-3012851*x^3+11039659*x^2-2845990*x-1416222,-24374*x^13+60751*x^12+524093*x^11-1347011*x^10-4102891*x^9+11125891*x^8+13791251*x^7-41743519*x^6-16672401*x^5+68606947*x^4-1099913*x^3-38565303*x^2+5475825*x+3360679,65998*x^13-32702*x^12-1553026*x^11+764922*x^10+14161847*x^9-6523777*x^8-63186422*x^7+24168088*x^6+143723202*x^5-34424774*x^4-158337794*x^3+4417626*x^2+68221790*x+13991552,-504737*x^13+144888*x^12+11503414*x^11-3823758*x^10-101029758*x^9+35742508*x^8+430936308*x^7-141443112*x^6-927320908*x^5+210797716*x^4+955568936*x^3-32381654*x^2-386257350*x-78729853,87501*x^13-52504*x^12-2011302*x^11+1235734*x^10+17794294*x^9-10681454*x^8-76228814*x^7+40676636*x^6+163902264*x^5-62497708*x^4-167981298*x^3+19854112*x^2+68231580*x+13027709,199605*x^13-24565*x^12-4540865*x^11+828885*x^10+39868975*x^9-8841660*x^8-170474125*x^7+37341865*x^6+369158380*x^5-54982815*x^4-383903395*x^3-1030755*x^2+155364095*x+31399680,-106121*x^13-29466*x^12+2462827*x^11+480011*x^10-22297489*x^9-2759531*x^8+99879224*x^7+7965989*x^6-231238369*x^5-17922727*x^4+260947963*x^3+32279373*x^2-111990365*x-24852314,35334*x^13-1356*x^12-781783*x^11+88941*x^10+6620271*x^9-1141371*x^8-26952561*x^7+5136669*x^6+54351291*x^5-7626787*x^4-50630237*x^3+447033*x^2+17390910*x+2962646,-44707*x^13+23113*x^12+1039554*x^11-522733*x^10-9299903*x^9+4331643*x^8+40248413*x^7-15673797*x^6-87266943*x^5+22067456*x^4+89477521*x^3-4029839*x^2-35040915*x-6946138,-557464*x^13+145556*x^12+12789383*x^11-3857481*x^10-113360386*x^9+36119091*x^8+489914611*x^7-142576889*x^6-1074302751*x^5+208584342*x^4+1134739817*x^3-17430173*x^2-468279240*x-96218141,-293887*x^13+75083*x^12+6682239*x^11-2039813*x^10-58566913*x^9+19438363*x^8+249472083*x^7-77894987*x^6-536738013*x^5+116803051*x^4+553933681*x^3-16653379*x^2-224571955*x-45939398,148410*x^13+3425*x^12-3430505*x^11+110645*x^10+30786385*x^9-2140455*x^8-135693625*x^7+9762355*x^6+306221955*x^5-7078345*x^4-334632355*x^3-27289305*x^2+140696005*x+31227425,-58322*x^13+50203*x^12+1285899*x^11-1185978*x^10-10771308*x^9+10326768*x^8+42828148*x^7-40037772*x^6-82901068*x^5+65123841*x^4+74067361*x^3-30221774*x^2-27645880*x-4176178,141063*x^13-75647*x^12-3159481*x^11+1847727*x^10+27001997*x^9-16450667*x^8-110256147*x^7+64132173*x^6+221254747*x^5-101220029*x^4-206018409*x^3+37764231*x^2+75898305*x+14145902,114035*x^5-912280*x^3+1368420*x]]; E[192,1] = [x, [1,0,1,0,-2,0,4,0,1,0,4,0,2,0,-2,0,-6,0,-4,0,4,0,0,0,-1,0,1,0,-2,0,-4,0,4,0,-8,0,2,0,2,0,2,0,4,0,-2,0,-8,0,9,0,-6,0,-10,0,-8,0,-4,0,-4,0,-6,0,4,0]]; E[192,2] = [x, [1,0,1,0,2,0,0,0,1,0,-4,0,2,0,2,0,2,0,4,0,0,0,-8,0,-1,0,1,0,-6,0,8,0,-4,0,0,0,-6,0,2,0,-6,0,-4,0,2,0,0,0,-7,0,2,0,2,0,-8,0,4,0,-4,0,2,0,0,0]]; E[192,3] = [x, [1,0,-1,0,2,0,0,0,1,0,4,0,2,0,-2,0,2,0,-4,0,0,0,8,0,-1,0,-1,0,-6,0,-8,0,-4,0,0,0,-6,0,-2,0,-6,0,4,0,2,0,0,0,-7,0,-2,0,2,0,8,0,4,0,4,0,2,0,0,0]]; E[192,4] = [x, [1,0,-1,0,-2,0,-4,0,1,0,-4,0,2,0,2,0,-6,0,4,0,4,0,0,0,-1,0,-1,0,-2,0,4,0,4,0,8,0,2,0,-2,0,2,0,-4,0,-2,0,8,0,9,0,6,0,-10,0,8,0,-4,0,4,0,-6,0,-4,0]]; E[193,1] = [x^2+3*x+1, [1,x,-1,-3*x-3,2*x+3,-x,-3*x-5,4*x+3,-2,-3*x-2,-3*x-3,3*x+3,-3,4*x+3,-2*x-3,-3*x+2,2*x,-2*x,-7,3*x-3,3*x+5,6*x+3,3*x,-4*x-3,0,-3*x,5,-3*x+6,x+6,3*x+2,3*x+5,3*x-3]]; E[193,2] = [x^8-2*x^7-9*x^6+18*x^5+21*x^4-44*x^3-11*x^2+27*x+1, [7,7*x,-x^7+4*x^6+8*x^5-34*x^4-16*x^3+69*x^2+6*x-18,7*x^2-14,-8*x^7+4*x^6+78*x^5-27*x^4-212*x^3+41*x^2+160*x+10,2*x^7-x^6-16*x^5+5*x^4+25*x^3-5*x^2+9*x+1,15*x^7-11*x^6-148*x^5+83*x^4+408*x^3-146*x^2-307*x+18,7*x^3-28*x,-5*x^7+6*x^6+47*x^5-44*x^4-122*x^3+58*x^2+86*x+29,-12*x^7+6*x^6+117*x^5-44*x^4-311*x^3+72*x^2+226*x+8,3*x^7-5*x^6-31*x^5+39*x^4+97*x^3-67*x^2-95*x+19,5*x^7-6*x^6-47*x^5+51*x^4+115*x^3-107*x^2-65*x+34,-4*x^7+2*x^6+39*x^5-17*x^4-99*x^3+38*x^2+52*x-9,19*x^7-13*x^6-187*x^5+93*x^4+514*x^3-142*x^2-387*x-15,-11*x^7+9*x^6+109*x^5-66*x^4-309*x^3+108*x^2+248*x-2,7*x^4-42*x^2+28,23*x^7-15*x^6-219*x^5+110*x^4+564*x^3-187*x^2-383*x+15,-4*x^7+2*x^6+46*x^5-17*x^4-162*x^3+31*x^2+164*x+5,-26*x^7+13*x^6+264*x^5-93*x^4-759*x^3+149*x^2+604*x+22,-2*x^7+x^6+16*x^5-5*x^4-32*x^3+12*x^2+12*x-8,28*x^7-14*x^6-280*x^5+91*x^4+791*x^3-98*x^2-630*x-98,x^7-4*x^6-15*x^5+34*x^4+65*x^3-62*x^2-62*x-3,-19*x^7+13*x^6+187*x^5-93*x^4-514*x^3+142*x^2+380*x+36,-7*x^5+63*x^3-119*x-7,-10*x^7+5*x^6+94*x^5-32*x^4-244*x^3+53*x^2+179*x-26,-6*x^7+3*x^6+55*x^5-15*x^4-138*x^3+8*x^2+99*x+4,-21*x^7+14*x^6+203*x^5-105*x^4-532*x^3+182*x^2+357*x,-5*x^7+6*x^6+47*x^5-51*x^4-122*x^3+114*x^2+86*x-55,26*x^7-13*x^6-250*x^5+79*x^4+661*x^3-79*x^2-485*x-57,-13*x^7+10*x^6+132*x^5-78*x^4-376*x^3+127*x^2+295*x+11,-13*x^7+10*x^6+132*x^5-64*x^4-390*x^3+50*x^2+344*x+81,7*x^5-56*x^3+84*x]]; E[193,3] = [x^5+2*x^4-5*x^3-7*x^2+7*x+1, [1,x,x^4-5*x^2+x+1,x^2-2,-x^4+5*x^2-2*x-4,-2*x^4+8*x^2-6*x-1,-x^4-x^3+3*x^2+x-1,x^3-4*x,-x^4+x^3+7*x^2-4*x-3,2*x^4-9*x^2+3*x+1,x^4+3*x^3-3*x^2-8*x+1,2*x^4-2*x^3-10*x^2+11*x,-x^4-4*x^3+3*x^2+13*x-4,x^4-2*x^3-6*x^2+6*x+1,-x^3+7*x-2,x^4-6*x^2+4,2*x^4+2*x^3-7*x^2-2*x-1,3*x^4+2*x^3-11*x^2+4*x+1,2*x^3-9*x+6,-2*x^4+x^3+7*x^2-9*x+6,-x^4+3*x^3+8*x^2-8*x-2,x^4+2*x^3-x^2-6*x-1,-x^4-2*x^3+2*x^2+5*x-2,-2*x^4+9*x^2-2*x,x^4+x^3-6*x^2-4*x+8,-2*x^4-2*x^3+6*x^2+3*x+1,-5*x^3-5*x^2+17*x-2,-2*x^4+x^3+7*x^2-8*x+1,-4*x^3+18*x-7,-x^4+7*x^2-2*x,x^4-4*x^2+x-2,-2*x^4-3*x^3+7*x^2+5*x-1]]; E[194,1] = [x^4-2*x^3-9*x^2+18*x+1, [2,-2,2*x,2,-x^3-x^2+9*x+2,-2*x,x^3-8*x+5,-2,2*x^2-6,x^3+x^2-9*x-2,-2*x+2,2*x,2*x^3-16*x+6,-x^3+8*x-5,-3*x^3+20*x+1,2,2*x^3-2*x^2-18*x+12,-2*x^2+6,-2*x^3-2*x^2+14*x+12,-x^3-x^2+9*x+2,2*x^3+x^2-13*x-1,2*x-2,-x^3+3*x^2+9*x-14,-2*x,-2*x^3+2*x^2+16*x-8,-2*x^3+16*x-6,2*x^3-12*x,x^3-8*x+5,x^3-4*x-3,3*x^3-20*x-1,-2*x^2-6*x+18,-2,-2*x^2+2*x,-2*x^3+2*x^2+18*x-12,-2*x^2-2*x+4,2*x^2-6,-3*x^3+2*x^2+22*x-17,2*x^3+2*x^2-14*x-12,4*x^3+2*x^2-30*x-2,x^3+x^2-9*x-2,2*x^2-2*x-18,-2*x^3-x^2+13*x+1,-2*x^3-2*x^2+20*x,-2*x+2,-3*x^3-4*x^2+28*x-3,x^3-3*x^2-9*x+14,2*x^3-16*x+2,2*x,2*x^3-14*x]]; E[194,2] = [x^4-2*x^3-9*x^2+18*x-7, [2,2,2*x,2,x^3-x^2-11*x+8,2*x,-x^3+8*x-1,2,2*x^2-6,x^3-x^2-11*x+8,-4*x^3+4*x^2+38*x-34,2*x,2*x^3-2*x^2-22*x+20,-x^3+8*x-1,x^3-2*x^2-10*x+7,2,2*x^3-2*x^2-18*x+12,2*x^2-6,2*x^3-2*x^2-18*x+16,x^3-x^2-11*x+8,-2*x^3-x^2+17*x-7,-4*x^3+4*x^2+38*x-34,3*x^3-3*x^2-29*x+20,2*x,-2*x^3+2*x^2+20*x-20,2*x^3-2*x^2-22*x+20,2*x^3-12*x,-x^3+8*x-1,-x^3+4*x^2+8*x-21,x^3-2*x^2-10*x+7,-4*x^3+6*x^2+42*x-42,2,-4*x^3+2*x^2+38*x-28,2*x^3-2*x^2-18*x+12,4*x^3-2*x^2-38*x+24,2*x^2-6,x^3-2*x^2-6*x+19,2*x^3-2*x^2-18*x+16,2*x^3-4*x^2-16*x+14,x^3-x^2-11*x+8,-2*x^2+2*x+10,-2*x^3-x^2+17*x-7,-6*x^3+6*x^2+56*x-44,-4*x^3+4*x^2+38*x-34,-3*x^3+2*x^2+22*x-17,3*x^3-3*x^2-29*x+20,2*x^3-4*x^2-20*x+14,2*x,-2*x^3+4*x^2+26*x-24]]; E[194,3] = [x, [1,1,0,1,4,0,-4,1,-3,4,4,0,-4,-4,0,1,6,-3,-6,4,0,4,-4,0,11,-4,0,-4,0,0,0,1,0,6,-16,-3,-8,-6,0,4,-2,0,-8,4,-12,-4,0,0,9]]; E[195,1] = [x, [1,-1,1,-1,1,-1,0,3,1,-1,4,-1,1,0,1,-1,2,-1,-4,-1,0,-4,8,3,1,-1,1,0,-2,-1,-8,-5,4,-2,0,-1,6,4,1,3,-6,0,-4,-4,1,-8,-8,-1,-7,-1,2,-1,6,-1,4,0]]; E[195,2] = [x^3-7*x-2, [1,x,-1,x^2-2,-1,-x,-x^2+5,3*x+2,1,-x,-x^2+5,-x^2+2,1,-2*x-2,1,x^2+2*x+4,x^2-2*x-5,x,-2*x+2,-x^2+2,x^2-5,-2*x-2,x^2-2*x-7,-3*x-2,1,x,-1,-2*x-10,6,x,2*x+2,2*x^2+5*x-2,x^2-5,-2*x^2+2*x+2,x^2-5,x^2-2,-x^2-2*x+9,-2*x^2+2*x,-1,-3*x-2,-x^2+2*x+5,2*x+2,4*x,-2*x-10,-1,-2*x^2+2,-2*x-6,-x^2-2*x-4,-3*x^2+2*x+18,x,-x^2+2*x+5,x^2-2,x^2-2*x-1,-x,x^2-5,-2*x^2-6*x+4]]; E[195,3] = [x, [1,2,-1,2,1,-2,3,0,1,2,-1,-2,-1,6,-1,-4,-1,2,-2,2,-3,-2,-3,0,1,-2,-1,6,-2,-2,-6,-8,1,-2,3,2,11,-4,1,0,-5,-6,4,-2,1,-6,-10,4,2,2,1,-2,11,-2,-1,0]]; E[195,4] = [x, [1,2,1,2,1,2,-3,0,1,2,-5,2,1,-6,1,-4,5,2,2,2,-3,-10,-1,0,1,2,1,-6,10,2,-2,-8,-5,10,-3,2,-3,4,1,0,-9,-6,-4,-10,1,-2,10,-4,2,2,5,2,9,2,-5,0]]; E[195,5] = [x, [1,2,1,2,-1,2,-1,0,1,-2,5,2,-1,-2,-1,-4,-7,2,-6,-2,-1,10,3,0,1,-2,1,-2,2,-2,2,-8,5,-14,1,2,7,-12,-1,0,9,-2,-8,10,-1,6,10,-4,-6,2,-7,-2,5,2,-5,0]]; E[196,1] = [x, [1,0,1,0,3,0,0,0,-2,0,-3,0,2,0,3,0,3,0,-1,0,0,0,3,0,4,0,-5,0,-6,0,-7,0,-3,0,0,0,-1,0,2,0,6,0,-4,0,-6,0,-9,0,0,0,3,0,3,0,-9,0]]; E[196,2] = [x, [1,0,-1,0,-3,0,0,0,-2,0,-3,0,-2,0,3,0,-3,0,1,0,0,0,3,0,4,0,5,0,-6,0,7,0,3,0,0,0,-1,0,2,0,-6,0,-4,0,6,0,9,0,0,0,3,0,3,0,9,0]]; E[196,3] = [x^2-8, [2,0,2*x,0,-x,0,0,0,10,0,8,0,-3*x,0,-8,0,-x,0,-2*x,0,0,0,-8,0,-6,0,4*x,0,16,0,0,0,8*x,0,0,0,-16,0,-24,0,5*x,0,-8,0,-5*x,0,-4*x,0,0,0,-8,0,20,0,-4*x,0]]; E[197,1] = [x, [1,-2,0,2,0,0,-3,0,-3,0,4,0,-2,6,0,-4,-8,6,-3,0,0,-8,-3,0,-5,4,0,-6,7,0,-10,8,0]]; E[197,2] = [x^5-5*x^3+x^2+3*x-1, [1,x,-x^4+4*x^2-x-2,x^2-2,3*x^4+x^3-14*x^2-3*x+5,-x^3+x-1,-2*x^4-2*x^3+9*x^2+6*x-6,x^3-4*x,2*x^4+x^3-7*x^2-2*x+2,x^4+x^3-6*x^2-4*x+3,-3*x^4-2*x^3+15*x^2+7*x-10,x^4-7*x^2+x+4,2*x^4+3*x^3-9*x^2-9*x+3,-2*x^4-x^3+8*x^2-2,-3*x^4-x^3+15*x^2+6*x-8,x^4-6*x^2+4,-3*x^4-x^3+14*x^2-4,x^4+3*x^3-4*x^2-4*x+2,4*x^4+x^3-19*x^2-x+5,-5*x^4-3*x^3+23*x^2+6*x-9,5*x^4+2*x^3-21*x^2-x+8,-2*x^4+10*x^2-x-3,-3*x^4-x^3+13*x^2+3*x-4,-x+3,-3*x^4-2*x^3+14*x^2+7*x-5,3*x^4+x^3-11*x^2-3*x+2,-2*x^3-5*x^2+7*x+3,3*x^4+2*x^3-16*x^2-8*x+10,-4*x^4-3*x^3+17*x^2+8*x-5,-x^4+9*x^2+x-3,x^3-6*x+1,-3*x^3-x^2+9*x+1,7*x^4+x^3-34*x^2-x+15]]; E[197,3] = [x^10-15*x^8+x^7+78*x^6-7*x^5-165*x^4+15*x^3+123*x^2-9*x-26, [4,4*x,x^8+2*x^7-10*x^6-17*x^5+30*x^4+36*x^3-27*x^2-7*x+10,4*x^2-8,-2*x^8+20*x^6-6*x^5-52*x^4+28*x^3+22*x^2-18*x+4,x^9+2*x^8-10*x^7-17*x^6+30*x^5+36*x^4-27*x^3-7*x^2+10*x,-4*x^7-4*x^6+40*x^5+32*x^4-108*x^3-72*x^2+56*x+36,4*x^3-16*x,-x^9-2*x^8+14*x^7+25*x^6-66*x^5-104*x^4+111*x^3+159*x^2-38*x-52,-2*x^9+20*x^7-6*x^6-52*x^5+28*x^4+22*x^3-18*x^2+4*x,-2*x^9+x^8+26*x^7-12*x^6-109*x^5+30*x^4+170*x^3+3*x^2-75*x-6,2*x^9+3*x^8-22*x^7-28*x^6+77*x^5+78*x^4-94*x^3-59*x^2+23*x+6,2*x^9+2*x^8-28*x^7-22*x^6+134*x^5+80*x^4-242*x^3-108*x^2+106*x+44,-4*x^8-4*x^7+40*x^6+32*x^5-108*x^4-72*x^3+56*x^2+36*x,2*x^9-4*x^8-24*x^7+46*x^6+80*x^5-144*x^4-70*x^3+114*x^2+4*x-16,4*x^4-24*x^2+16,-2*x^9+2*x^8+28*x^7-22*x^6-126*x^5+64*x^4+210*x^3-44*x^2-98*x+4,-2*x^9-x^8+26*x^7+12*x^6-111*x^5-54*x^4+174*x^3+85*x^2-61*x-26,4*x^3+4*x^2-20*x-4,-6*x^8-4*x^7+64*x^6+26*x^5-204*x^4-44*x^3+206*x^2+18*x-60,2*x^9+6*x^8-28*x^7-70*x^6+142*x^5+260*x^4-282*x^3-340*x^2+138*x+116,x^9-4*x^8-10*x^7+47*x^6+16*x^5-160*x^4+33*x^3+171*x^2-24*x-52,4*x^9+2*x^8-48*x^7-16*x^6+182*x^5+44*x^4-240*x^3-46*x^2+82*x+8,x^9+4*x^8-10*x^7-45*x^6+32*x^5+164*x^4-35*x^3-209*x^2+4*x+52,4*x^8+4*x^7-44*x^6-32*x^5+148*x^4+72*x^3-156*x^2-44*x+36,2*x^9+2*x^8-24*x^7-22*x^6+94*x^5+88*x^4-138*x^3-140*x^2+62*x+52,-4*x^9-8*x^8+52*x^7+92*x^6-232*x^5-348*x^4+388*x^3+480*x^2-152*x-160,-4*x^9-4*x^8+48*x^7+40*x^6-188*x^5-136*x^4+272*x^3+180*x^2-112*x-72,x^9+4*x^8-14*x^7-45*x^6+72*x^5+152*x^4-143*x^3-157*x^2+68*x+32,-4*x^9+6*x^8+44*x^7-76*x^6-130*x^5+260*x^4+84*x^3-242*x^2+2*x+52,-3*x^8+2*x^7+38*x^6-25*x^5-150*x^4+76*x^3+205*x^2-43*x-62,4*x^5-32*x^3+48*x,-6*x^9+2*x^8+76*x^7-26*x^6-306*x^5+64*x^4+442*x^3+20*x^2-162*x-28]]; E[198,1] = [x, [1,1,0,1,0,0,2,1,0,0,1,0,-4,2,0,1,6,0,-4,0,0,1,-6,0,-5,-4,0,2,-6,0,8,1,0,6,0,0,-10,-4,0,0,-6,0,8,1,0,-6,6,0,-3,-5,0,-4,0,0,0,2,0,-6,0,0,8,8,0,1,0,0,-4,6,0,0,-6,0]]; E[198,2] = [x, [1,1,0,1,0,0,2,1,0,0,-1,0,2,2,0,1,-6,0,2,0,0,-1,0,0,-5,2,0,2,-6,0,-4,1,0,-6,0,0,2,2,0,0,6,0,-10,-1,0,0,12,0,-3,-5,0,2,-12,0,0,2,0,-6,12,0,-10,-4,0,1,0,0,8,-6,0,0,12,0]]; E[198,3] = [x, [1,-1,0,1,4,0,-2,-1,0,-4,-1,0,4,2,0,1,2,0,0,4,0,1,6,0,11,-4,0,-2,-10,0,-8,-1,0,-2,-8,0,-2,0,0,-4,-2,0,4,-1,0,-6,2,0,-3,-11,0,4,-4,0,-4,2,0,10,0,0,-8,8,0,1,16,0,-12,2,0,8,-2,0]]; E[198,4] = [x, [1,-1,0,1,-2,0,-4,-1,0,2,1,0,-6,4,0,1,-2,0,4,-2,0,-1,-4,0,-1,6,0,-4,-6,0,0,-1,0,2,8,0,6,-4,0,2,6,0,4,1,0,4,12,0,9,1,0,-6,-2,0,-2,4,0,6,-12,0,-14,0,0,1,12,0,4,-2,0,-8,12,0]]; E[198,5] = [x, [1,-1,0,1,0,0,2,-1,0,0,1,0,2,-2,0,1,6,0,2,0,0,-1,0,0,-5,-2,0,2,6,0,-4,-1,0,-6,0,0,2,-2,0,0,-6,0,-10,1,0,0,-12,0,-3,5,0,2,12,0,0,-2,0,-6,-12,0,-10,4,0,1,0,0,8,6,0,0,-12,0]]; E[199,1] = [x^2+x-1, [1,x,2,-x-1,3,2*x,0,-2*x-1,1,3*x,2*x-2,-2*x-2,-4*x-1,0,6,3*x,-2*x,x,6*x+4,-3*x-3,0,-4*x+2,-6*x-3,-4*x-2,4,3*x-4,-4,0,-4*x+2,6*x,-2*x-3,x+5,4*x-4]]; E[199,2] = [x^4+3*x^3-4*x-1, [1,x,-x^3-2*x^2+x+1,x^2-2,x^3+x^2-3*x-2,x^3+x^2-3*x-1,2*x^3+5*x^2-2*x-6,x^3-4*x,x^3+2*x^2-x-3,-2*x^3-3*x^2+2*x+1,-2*x^3-4*x^2+3*x+2,x^2+x-1,-2*x^3-3*x^2+5*x+3,-x^3-2*x^2+2*x+2,x^2+3*x,-3*x^3-6*x^2+4*x+5,-2*x^3-3*x^2+4*x-1,-x^3-x^2+x+1,3*x^3+5*x^2-4*x-3,x^3-x+2,x^2+x-3,2*x^3+3*x^2-6*x-2,-4*x^2-4*x+5,-x^3-x^2+5*x+2,2*x^2+3*x-3,3*x^3+5*x^2-5*x-2,4*x^3+8*x^2-4*x-5,-3*x^3-8*x^2+2*x+11,3*x^2+6*x-7,x^3+3*x^2,-x^3-4*x^2-x+4,x^3+4*x^2+x-3,3*x^3+5*x^2-5*x-1]]; E[199,3] = [x^10-5*x^9-4*x^8+51*x^7-32*x^6-154*x^5+151*x^4+168*x^3-168*x^2-54*x+27, [9,9*x,-2*x^9+7*x^8+23*x^7-81*x^6-89*x^5+287*x^4+151*x^3-321*x^2-105*x+27,9*x^2-18,4*x^9-14*x^8-37*x^7+144*x^6+97*x^5-430*x^4-122*x^3+408*x^2+111*x-36,-3*x^9+15*x^8+21*x^7-153*x^6-21*x^5+453*x^4+15*x^3-441*x^2-81*x+54,7*x^9-29*x^8-58*x^7+306*x^6+109*x^5-964*x^4-74*x^3+1011*x^2+120*x-126,9*x^3-36*x,-24*x^9+78*x^8+225*x^7-813*x^6-582*x^5+2511*x^4+585*x^3-2580*x^2-369*x+396,6*x^9-21*x^8-60*x^7+225*x^6+186*x^5-726*x^4-264*x^3+783*x^2+180*x-108,11*x^9-34*x^8-104*x^7+351*x^6+278*x^5-1070*x^4-313*x^3+1086*x^2+204*x-126,4*x^9-5*x^8-46*x^7+45*x^6+169*x^5-106*x^4-239*x^3+57*x^2+102*x+27,-3*x^9+12*x^8+27*x^7-132*x^6-66*x^5+450*x^4+72*x^3-543*x^2-54*x+117,6*x^9-30*x^8-51*x^7+333*x^6+114*x^5-1131*x^4-165*x^3+1296*x^2+252*x-189,14*x^9-46*x^8-140*x^7+501*x^6+416*x^5-1664*x^4-493*x^3+1872*x^2+258*x-333,9*x^4-54*x^2+36,-17*x^9+55*x^8+164*x^7-576*x^6-473*x^5+1796*x^4+658*x^3-1869*x^2-546*x+261,-42*x^9+129*x^8+411*x^7-1350*x^6-1185*x^5+4209*x^4+1452*x^3-4401*x^2-900*x+648,3*x^8+3*x^7-48*x^6-27*x^5+237*x^4+60*x^3-357*x^2-63*x+54,x^9-8*x^8-7*x^7+90*x^6+4*x^5-310*x^4+19*x^3+372*x^2-6*x-90,34*x^9-107*x^8-334*x^7+1131*x^6+973*x^5-3580*x^4-1229*x^3+3795*x^2+822*x-549,21*x^9-60*x^8-210*x^7+630*x^6+624*x^5-1974*x^4-762*x^3+2052*x^2+468*x-297,19*x^9-68*x^8-175*x^7+717*x^6+454*x^5-2260*x^4-569*x^3+2391*x^2+534*x-324,21*x^9-60*x^8-201*x^7+603*x^6+552*x^5-1749*x^4-645*x^3+1656*x^2+405*x-216,-5*x^9+25*x^8+29*x^7-255*x^6+34*x^5+761*x^4-197*x^3-768*x^2+48*x+117,-3*x^9+15*x^8+21*x^7-162*x^6-12*x^5+525*x^4-39*x^3-558*x^2-45*x+81,-34*x^9+113*x^8+340*x^7-1218*x^6-1045*x^5+3964*x^4+1484*x^3-4275*x^2-1128*x+540,-14*x^9+31*x^8+143*x^7-306*x^6-425*x^5+857*x^4+436*x^3-762*x^2-105*x+90,-17*x^9+58*x^8+158*x^7-606*x^6-410*x^5+1880*x^4+466*x^3-1938*x^2-384*x+270,24*x^9-84*x^8-213*x^7+864*x^6+492*x^5-2607*x^4-480*x^3+2610*x^2+423*x-378,10*x^9-23*x^8-112*x^7+249*x^6+400*x^5-820*x^4-569*x^3+888*x^2+309*x-117,9*x^5-72*x^3+108*x,13*x^9-53*x^8-103*x^7+543*x^6+169*x^5-1639*x^4-101*x^3+1701*x^2+201*x-288]]; E[200,1] = [x, [1,0,3,0,0,0,-2,0,6,0,1,0,-4,0,0,0,-5,0,1,0,-6,0,2,0,0,0,9,0,-8,0,10,0,3,0,0,0,6,0,-12,0,-3,0,-4,0,0,0,-4,0,-3,0,-15,0,-6,0,0,0,3,0,8,0]]; E[200,2] = [x, [1,0,-2,0,0,0,-2,0,1,0,-4,0,-4,0,0,0,0,0,-4,0,4,0,2,0,0,0,4,0,2,0,0,0,8,0,0,0,-4,0,8,0,2,0,6,0,0,0,6,0,-3,0,0,0,4,0,0,0,8,0,-12,0]]; E[200,3] = [x, [1,0,-3,0,0,0,2,0,6,0,1,0,4,0,0,0,5,0,1,0,-6,0,-2,0,0,0,-9,0,-8,0,10,0,-3,0,0,0,-6,0,-12,0,-3,0,4,0,0,0,4,0,-3,0,-15,0,6,0,0,0,-3,0,8,0]]; E[200,4] = [x, [1,0,2,0,0,0,2,0,1,0,-4,0,4,0,0,0,0,0,-4,0,4,0,-2,0,0,0,-4,0,2,0,0,0,-8,0,0,0,4,0,8,0,2,0,-6,0,0,0,-6,0,-3,0,0,0,-4,0,0,0,-8,0,-12,0]]; E[200,5] = [x, [1,0,0,0,0,0,4,0,-3,0,4,0,2,0,0,0,-2,0,4,0,0,0,-4,0,0,0,0,0,-2,0,-8,0,0,0,0,0,-6,0,0,0,-6,0,8,0,0,0,-4,0,9,0,0,0,-6,0,0,0,0,0,-4,0]];