\\ serrepqdata.gp defines two matrices: \\ 1. E = a matrix \\ E[N,i] = [v,f] = ith newform at level N \\ v = vector of expressions in x. \\ think of x as a root of f. \\ This should be defined for all 11 <= N < 100 prime \\ and all N<1000 the product of exactly two primes \\ both >= 11. \\ 2. reducible = a matrix \\ reducible[N,i]= integer divisibile by exactly the primes for which \\ the representation associated to the N,i newform is reducible. \\ This should be defined for the primes p with 11<=p< 100. \\ It is 1 (not 0!) if there are no such reducible primes. E=matrix(1000,30,i,j,0); reducible=matrix(100,30,i,j,0); \\ This is probably NOT complete, there may be other primes for \\ which rho is reducible. \\ The numbers there now are just got from looking at torsion points \\ on elliptic curves. reducible[11,1]=5; reducible[17,1]=2; reducible[19,1]=3; reducible[23,1]=1; reducible[29,1]=1; reducible[31,1]=1; reducible[37,1]=1; reducible[37,2]=3; reducible[41,1]=1; reducible[43,1]=1; reducible[43,2]=1; reducible[47,1]=1; reducible[53,1]=1; reducible[53,2]=1; reducible[59,1]=1; reducible[61,1]=1; reducible[61,2]=1; reducible[67,1]=1; reducible[67,2]=1; reducible[67,3]=1; reducible[71,1]=1; reducible[71,2]=1; reducible[73,1]=2; reducible[73,2]=1; reducible[73,3]=1; reducible[79,1]=1; reducible[79,2]=1; reducible[83,1]=1; reducible[83,2]=1; reducible[89,1]=1; reducible[89,2]=2; reducible[89,3]=1; reducible[97,1]=1; reducible[97,2]=1; \\ the prime levels < 100 E[11,1]=[[-2,-1,1,-2,1,4,-2,0,-1,0,7,3,-8,-6,8,-6,5,12,-7,-3,4,-10,-6,15,-7], x-1]; E[17,1]=[[-1,0,-2,4,0,-2,1,-4,4,6,4,-2,-6,4,0,6,-12,-10,4,-4,-6,12,-4,10,2], x-1]; E[19,1]=[[0,-2,3,-1,3,-4,-3,1,0,6,-4,2,-6,-1,-3,12,-6,-1,-4,6,-7,8,12,12,8], x-1]; E[23,1]=[[x,-2*x-1,2*x,2*x+2,-2*x-4,3,-2*x+2,-2,1,-3,6*x+3,-2*x,-4*x-1,0,-2*x-1,4*x-2,4*x+4,-8*x-2,2*x-4,2*x+11,-4*x+9,-8*x-6,2*x-10,-4*x-8,6*x+14], x^2+x-1]; E[27,1]=[[0,0,0,-1,0,5,0,-7,0,0,-4,11,0,8,0,0,0,-1,5,0,-7,17,0,0,-19], x-1]; E[29,1]=[[x,-x,-1,2*x+2,x+2,2*x+1,-2*x-4,6,-4*x-6,1,-5*x-2,-4,6*x+10,x+6,3*x+4,-6*x-5,4*x+6,2*x,-4*x-4,2*x-4,4,x,-4*x-2,6*x+2,-6*x-10], x^2+2*x-1]; E[31,1]=[[x,-2*x,1,2*x-3,2,-2*x,-2*x+4,-2*x+1,6*x-4,-2*x+6,1,-2,7,2*x-2,4*x-4,-4*x-4,2*x-1,10*x-8,8,-10*x+7,4*x+2,-6*x-2,-8*x-2,6*x+2,-8*x-3], x^2-x-1]; E[32,1]=[[0,0,-2,0,0,6,2,0,0,-10,0,-2,10,0,0,14,0,-10,0,0,-6,0,0,10,18], x-1]; E[37,1]=[[-2,-3,-2,-1,-5,-2,0,0,2,6,-4,-1,-9,2,-9,1,8,-8,8,9,-1,4,-15,4,4], x-1]; E[37,2]=[[0,1,0,-1,3,-4,6,2,6,-6,-4,1,-9,8,3,-3,12,8,-4,-15,11,-10,9,6,8], x-1]; E[41,1]=[[x,-1/2*x^2-x+3/2,-x-1,1/2*x^2+x+1/2,3/2*x^2+x-9/2,-x^2+3,-2,-3/2*x^2-x+13/2,-2*x^2-2*x+8,x^2+2*x-5,2*x+6,-3*x-3,1,x^2-5,3/2*x^2-3*x-13/2,x^2+2*x-1,-2*x^2-2*x+4,-x^2+2*x+5,-3/2*x^2-x+9/2,-3/2*x^2+x+25/2,4*x^2+x-15,1/2*x^2-x+17/2,2*x^2+4*x-6,-4*x^2-2*x+12,-2*x^2-4*x+8], x^3+x^2-5*x-1]; E[43,1]=[[-2,-2,-4,0,3,-5,-3,-2,-1,-6,-1,0,5,-1,4,-5,-12,2,-3,2,2,-8,15,-4,7], x-1]; E[43,2]=[[x,-x,-x+2,x-2,2*x-1,2*x+1,2*x+5,-2*x-2,-4*x+1,3*x,-3,-6*x,-2*x-1,1,6,-2*x+11,2*x-2,3*x+4,6*x+1,-2*x-6,3*x-12,-2*x+2,4*x+9,-3*x-6,-2*x-1], x^2-2]; E[47,1]=[[x,x^3-x^2-6*x+4,-4*x^3+2*x^2+20*x-10,3*x^3-x^2-16*x+7,2*x^3-2*x^2-10*x+6,-4*x^3+2*x^2+22*x-8,x^3+x^2-6*x,-2*x^3+10*x-2,-2*x^3+12*x-4,-2*x^3+2*x^2+10*x-10,4*x^3-2*x^2-22*x+8,3*x^3-x^2-14*x+8,-2*x+2,-2*x^3+2*x^2+14*x-8,1,5*x^3-3*x^2-30*x+13,7*x^3-x^2-36*x+11,-7*x^3+5*x^2+38*x-23,-12*x^3+6*x^2+60*x-26,7*x^3-3*x^2-34*x+12,-2*x^2-4*x+12,7*x^3-3*x^2-34*x+20,8*x^3-4*x^2-40*x+24,5*x^3+x^2-26*x+1,-9*x^3+7*x^2+46*x-21], x^4-x^3-5*x^2+5*x-1]; E[49,1]=[[1,0,0,0,4,0,0,0,8,2,0,-6,0,-12,0,-10,0,0,4,16,0,8,0,0,0], x-1]; E[53,1]=[[-1,-3,0,-4,0,-3,-3,-5,7,-7,4,5,6,-2,-2,-1,-2,-8,-12,1,-4,-1,-1,-14,1], x-1]; E[53,2]=[[x,-x^2-x+3,x^2-3,x^2-1,x^2+2*x-3,1,2*x-1,x+4,2*x^2-x-4,-3*x^2-4*x+4,-x^2+4*x+3,x^2+6*x-2,-2*x-4,-3*x^2-6*x+11,-2*x^2-4*x,1,4*x^2+2*x-8,3*x^2-2*x-11,3*x^2+6*x-3,-3*x^2-7*x+3,x^2+4*x+1,5*x^2+3*x-13,3*x+10,-4*x^2+4*x+10,5*x^2-12], x^3+x^2-3*x-1]; E[59,1]=[[x,-1/4*x^4+5/4*x^2-1/2*x,3/4*x^4+1/2*x^3-23/4*x^2-3*x+7,-1/2*x^4-1/2*x^3+7/2*x^2+3/2*x-3,-1/2*x^4-x^3+9/2*x^2+6*x-8,-1/2*x^4-x^3+9/2*x^2+6*x-6,x^4-8*x^2+9,3/4*x^4+3/2*x^3-23/4*x^2-8*x+9,-1/2*x^4+9/2*x^2+x-8,-x^4-1/2*x^3+8*x^2+1/2*x-7,x^4+x^3-9*x^2-3*x+14,-x^4+7*x^2-2,1/4*x^4+x^3-13/4*x^2-17/2*x+6,-x^3+5*x-2,-2*x-4,1/4*x^4+x^3-13/4*x^2-9/2*x+6,1,1/2*x^4+x^3-9/2*x^2-2*x+12,-1/2*x^4-2*x^3+13/2*x^2+11*x-16,-x^4-2*x^3+8*x^2+10*x-11,1/2*x^4+2*x^3-5/2*x^2-9*x,7/4*x^4+2*x^3-51/4*x^2-21/2*x+16,1/2*x^4+3*x^3-5/2*x^2-16*x+4,-3/2*x^4-x^3+19/2*x^2+4*x-4,-3/2*x^4-2*x^3+27/2*x^2+11*x-26], x^5-9*x^3+2*x^2+16*x-8]; E[61,1]=[[-1,-2,-3,1,-5,1,4,-4,-9,-6,0,8,5,-8,4,6,9,-1,-7,-8,-11,3,4,-4,-14], x-1]; E[61,2]=[[x,-x^2+3,x^2-2*x-2,x^2-x-3,x+4,-2*x^2+2*x+1,-x^2+2*x+1,3*x^2-7,-x+2,-x^2+2*x+3,-x^2-4*x+3,3*x^2-9,4*x^2-4*x-7,-x^2+2*x-3,-4*x^2+6*x+6,-2*x,-x^2-3*x+13,1,-x^2-5*x+7,x^2+4*x+1,3*x^2-4*x-6,-4*x^2-x+14,4*x^2-12,4*x^2-2*x-10,-4*x^2+8*x+10], x^3-x^2-3*x+1]; E[67,1]=[[2,-2,2,-2,-4,2,3,7,9,-5,-10,-1,0,-2,-1,10,9,-2,1,0,-7,-8,4,7,0], x-1]; E[67,2]=[[x,x+1,-2*x+1,-x,1,x,-2*x+2,x-5,4*x+1,4*x+7,6*x+3,x+2,5*x+5,-5*x-7,-x-4,6*x+3,-6,-3*x-6,1,-14*x-7,8,-7*x-9,-3*x+5,6*x-5,6*x+3], x^2+x-1]; E[67,3]=[[x,-x-3,-3,3*x+4,-2*x-3,-3*x-8,-2*x-6,3*x+5,-4*x-3,4*x+3,-1,3*x+4,-x-3,-3*x-3,x-6,-9,6,9*x+10,-1,2*x+9,-4,-9*x-17,7*x+3,2*x+3,-12*x-17], x^2+3*x+1]; E[71,1]=[[x,-x^2+3,-x-1,2*x^2+2*x-6,-2*x^2-2*x+6,4,2*x^2+2*x-6,-x^2-x+7,2*x^2-4,x^2+2*x-5,-2*x-2,-3*x^2-x+13,2*x^2+2*x-2,-2*x^2-3*x+1,2*x^2-10,-2*x,2*x^2+2*x-14,-4*x^2-6*x+16,4*x-4,1,x+1,-2*x^2-7*x+9,-x^2-x+11,-5*x^2-2*x+21,-2*x^2-4*x+8], x^3-5*x+3]; E[71,2]=[[x,-x,-x^2+x+5,-2*x,2*x^2-6,-2*x^2+4,2*x^2+2*x-6,x^2+2*x-2,-4,-2*x^2+x+10,4,-x^2-2,-4*x-2,-x^2-x+7,2*x^2+2*x-4,-4*x^2+6,2*x^2-2*x-8,-4*x+4,-2*x^2+2,1,x^2+3*x+7,-x^2+3*x+3,x^2-2*x-10,-2*x^2-x+6,2*x+8], x^3+x^2-4*x-3]; E[73,1]=[[1,0,2,2,-2,-6,2,8,4,2,-2,-6,6,-2,6,10,-6,-14,8,0,1,-4,-14,-6,-10], x-1]; E[73,2]=[[x,-x+1,-x,-1,x+3,x-1,2*x-3,-7,x+6,-4*x+3,2*x+2,-2*x+5,-6,-4*x+5,9,4*x-3,0,-x-4,-6*x+5,-3*x+3,1,3*x-1,-5*x+6,6*x+3,-3*x-1], x^2-x-3]; E[73,3]=[[x,-x-3,x,-3,-x-3,3*x+5,-6*x-9,1,x-6,-4*x-3,6*x+10,-6*x-11,4*x+6,-1,-4*x-9,8*x+15,4*x,3*x+8,6*x+17,x-9,-1,3*x-5,-3*x-6,-2*x+3,-3*x-9], x^2+3*x+1]; E[79,1]=[[-1,-1,-3,-1,-2,3,-6,4,2,-6,-10,-2,-10,4,7,8,-3,-4,8,15,2,-1,-6,-7,-19], x-1]; E[79,2]=[[x,-x^4+x^3+3*x^2-3*x+1,x^4-4*x^2-x+3,x^4-x^3-5*x^2+3*x+3,-x^4-2*x^3+6*x^2+7*x-6,x^3+x^2-2*x-3,-2*x^3+6*x+2,-3*x^3+3*x^2+10*x-8,2*x^4+x^3-9*x^2-4*x+6,2*x^3-2*x^2-4*x+6,-x^4+2*x^3+6*x^2-5*x-6,2*x^4-2*x^3-10*x^2+4*x+8,2*x^3-6*x+6,-2*x^4+2*x^3+8*x^2-6*x-6,x^4-5*x^3-5*x^2+17*x+5,-4*x^4+16*x^2+2*x-6,x^4+x^3-5*x^2-7*x+5,-2*x^4+4*x^3+2*x^2-14*x+10,3*x^3-3*x^2-14*x+4,x^4+x^3-x^2-3*x-5,-x^3-x^2+2*x,1,2*x^4+2*x^3-10*x^2-6*x+2,-2*x^4-x^3+11*x^2+4*x-1,x^4-6*x^3+2*x^2+19*x-13], x^5-6*x^3+8*x-1]; E[83,1]=[[-1,-1,-2,-3,3,-6,5,2,-4,-7,5,-11,-2,-8,0,6,5,5,-2,2,0,14,-1,0,-8], x-1]; E[83,2]=[[x,1/2*x^4-1/2*x^3-7/2*x^2+3/2*x+4,-1/2*x^5-1/2*x^4+9/2*x^3+7/2*x^2-8*x-2,3/4*x^5-1/4*x^4-25/4*x^3+3/4*x^2+19/2*x,-1/4*x^5+1/4*x^4+5/4*x^3+1/4*x^2-4,x^3-5*x+2,1/4*x^5-3/4*x^4-7/4*x^3+17/4*x^2+7/2*x-4,3/2*x^5-1/2*x^4-23/2*x^3-1/2*x^2+16*x+4,-x^5+7*x^3+3*x^2-8*x-7,3/2*x^5-12*x^3-4*x^2+39/2*x+8,-3/4*x^5+3/4*x^4+23/4*x^3-21/4*x^2-8*x+8,-3/4*x^5+3/4*x^4+19/4*x^3-13/4*x^2-3*x+8,-x^5+9*x^3+x^2-16*x-1,1/2*x^5-1/2*x^4-9/2*x^3+3/2*x^2+10*x,-1/2*x^5+3/2*x^4+9/2*x^3-21/2*x^2-10*x+10,x^5-8*x^3+9*x,-5/4*x^5-1/4*x^4+39/4*x^3+11/4*x^2-29/2*x-4,3/2*x^5+2*x^4-14*x^3-16*x^2+55/2*x+16,-2*x^5-x^4+17*x^3+13*x^2-29*x-18,1/2*x^5+1/2*x^4-11/2*x^3-3/2*x^2+13*x-8,-1/2*x^5+5/2*x^4+7/2*x^3-31/2*x^2-5*x+12,-1/2*x^5-1/2*x^4+9/2*x^3+7/2*x^2-10*x-4,1,-x^5-x^4+9*x^3+9*x^2-20*x-14,2*x^4-2*x^3-16*x^2+10*x+22], x^6-x^5-9*x^4+7*x^3+20*x^2-12*x-8]; E[89,1]=[[-1,-1,-1,-4,-2,2,3,-5,7,0,-9,-2,0,-7,-12,-3,4,6,12,-10,7,-6,12,-1,9], x-1]; E[89,2]=[[1,2,-2,2,-4,2,6,-2,2,-6,6,10,-6,2,12,-6,-10,-6,12,4,10,-12,-6,1,-18], x-1]; E[89,3]=[[x,-1/2*x^4+1/2*x^3+7/2*x^2-5/2*x-4,-x^2+4,1/2*x^4-4*x^2-x+13/2,-x^3+5*x+2,-x^4+x^3+8*x^2-5*x-11,x^4-x^3-7*x^2+4*x+4,1/2*x^3-1/2*x^2-3/2*x+9/2,x^4-3/2*x^3-13/2*x^2+17/2*x+11/2,-x^4+9*x^2-14,1/2*x^4-3/2*x^3-7/2*x^2+15/2*x+8,x^4-2*x^3-8*x^2+10*x+9,-x^4+x^3+8*x^2-3*x-11,-3/2*x^3+1/2*x^2+17/2*x-1/2,x^3-7*x-2,-x^4+7*x^2+x-8,1/2*x^4+x^3-3*x^2-8*x-1/2,-x^2+5,-x^4+9*x^2-2*x-14,-2*x^4+4*x^3+16*x^2-20*x-24,x^4-7*x^2+1,-x^4+2*x^3+8*x^2-10*x-1,1/2*x^4-4*x^2-3*x+1/2,1,-x^3-x^2+2*x+7], x^5+x^4-10*x^3-10*x^2+21*x+17]; E[97,1]=[[x,-x^2-3*x-2,2*x^2+5*x-1,-x^2-3*x-3,x-1,-x-2,x^2+4*x+1,-4*x^2-6*x+7,-3*x-8,-4*x^2-14*x-5,x^2-6,6*x^2+17*x+2,x^2+x-1,3*x^2+8*x+1,4*x^2+12*x-3,-2*x^2-13*x-10,2*x^2+7*x+9,-5*x^2-8*x+7,3*x^2+13*x+7,3*x^2+11*x-3,-x^2-3*x-1,4*x^2+7*x-8,-8*x-10,-5*x^2-14*x+2,-1], x^3+4*x^2+3*x-1]; E[97,2]=[[x,-x^2+x+2,-x+1,x^3-x^2-4*x+2,-2*x^3+4*x^2+3*x-3,-3*x^3+4*x^2+8*x-5,2*x^3-3*x^2-4*x+3,-x^3+2*x^2+3*x-4,-x^3+4*x^2-1,x^3-2*x^2+x+2,3*x^3-7*x^2-3*x+7,-3*x^3+6*x^2+6*x-9,3*x^3-7*x^2-10*x+14,-x^2+5,x^3-4*x^2-x+12,-x^3-2*x^2+8*x+3,-2*x^3+11*x+1,4*x^3-9*x^2-8*x+11,3*x^3-x^2-10*x-6,-x^3-x^2+8*x+4,3*x^3-x^2-10*x-8,-3*x^3+14*x-1,2*x^3-4*x^2+2*x+4,x^3+3*x^2-11*x-11,1], x^4-3*x^3-x^2+6*x-1]; \\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\\ \\ this part is: \\ 11<=N<=700, N a product of exactly two primes both >=11. \\ E[N,ith eigenform]=[[a_2,...,a_97], f(x)] \\ where the a_i are defined over Q[x]/f(x). \\ Next \\ E[N,ith eigenform]=[[a_2,...,a_29], f(x)] \\ where 700<=N<=1000, N a product of exactly two primes both >=11. E[143,1]=[[x,-x^3+3*x^2-3,-2*x^2+2*x+4,x^3-x^2-4*x+2,1,-1,-4*x^2+6*x+8,-3*x^3+7*x^2+2*x-3,x^3-x^2-2*x-2,-2*x^3+4*x^2+4*x-6,4*x^3-6*x^2-8*x+2,-4*x^2+8*x+8,x^3-3*x^2+4*x+2,-2*x+8,-2*x^3+2*x^2+6*x-4,-x^3+3*x^2-2*x-3,2*x^3-2*x^2-4*x-6,-2*x^3+4*x^2+6*x-8,-4*x^3+4*x^2+14*x,-4*x^3+14*x^2-4*x-18,3*x^3-3*x^2-12*x+7,2*x^3-8*x^2-4*x+12,-x^3+5*x^2-4*x-6,-2*x^3+6*x^2-2*x-2,-6*x^3+20*x^2-18], x^4-3*x^3-x^2+5*x+1]; E[143,2]=[[x,-x^5-x^4+8*x^3+6*x^2-11*x-5,x^5+2*x^4-8*x^3-14*x^2+12*x+15,2*x^5+2*x^4-17*x^3-13*x^2+26*x+14,-1,1,-2*x,-2*x^5-3*x^4+16*x^3+20*x^2-23*x-22,-3*x^5-4*x^4+25*x^3+29*x^2-38*x-33,2*x^5+2*x^4-16*x^3-14*x^2+22*x+18,3*x^5+4*x^4-26*x^3-28*x^2+44*x+29,-x^5-2*x^4+8*x^3+16*x^2-10*x-19,2*x^5+2*x^4-17*x^3-11*x^2+26*x+6,-2*x^5-2*x^4+18*x^3+14*x^2-32*x-16,2*x^5+2*x^4-16*x^3-12*x^2+24*x+12,6*x^5+7*x^4-50*x^3-48*x^2+75*x+54,-5*x^5-6*x^4+42*x^3+38*x^2-66*x-33,4*x^5+6*x^4-32*x^3-42*x^2+44*x+50,x^5+2*x^4-8*x^3-16*x^2+12*x+23,-3*x^5-4*x^4+26*x^3+28*x^2-40*x-33,-x^4+8*x^2+x-4,2*x^5+2*x^4-16*x^3-14*x^2+22*x+20,2*x^4+x^3-15*x^2-6*x+12,x^5+2*x^4-10*x^3-14*x^2+20*x+9,-5*x^5-6*x^4+42*x^3+40*x^2-66*x-37], x^6-10*x^4+2*x^3+24*x^2-7*x-12]; E[143,3]=[[0,-1,-1,-2,-1,-1,-4,2,7,-2,-3,-11,10,-4,-4,2,-1,-2,-1,-9,-16,8,0,-7,-13], x-1]; E[187,1]=[[0,1,3,2,1,2,-1,2,-3,-6,-7,-7,12,-10,0,6,-3,8,-7,-9,2,8,6,15,11], x-1]; E[187,2]=[[2,x,-x,-x+1,1,0,-1,2*x-2,3*x+2,-x+7,x,-x+2,3*x-1,2,3*x-1,-x+5,-3,-2*x-6,-2*x-1,-3*x+2,3*x+7,6*x,-4*x-2,-6*x+1,-3*x-10], x^2+x-4]; E[187,3]=[[-x-1,x,-x-2,-2,1,x-5,1,-3*x-1,-x-2,x-3,-x+4,-x-2,2*x+6,-2,4*x-6,2*x-6,3,4*x-4,1,-x+2,-3*x+9,3*x-3,8*x+2,-4*x-5,x+14], x^2-3]; E[187,4]=[[-x^2-x+2,x,x^2+x-5,-2*x-2,-1,-3*x^2-3*x+8,-1,3*x^2+5*x-4,x-4,2*x^2+3*x-9,-3*x^2-5*x+3,2*x^2+7*x-4,-2*x-2,4*x^2+8*x-4,-x^2-4*x+5,-3*x^2-4*x-3,-5*x^2-4*x+14,2*x,-2*x^2-6*x-3,-3*x^2-3*x+7,x-3,-2*x^2-x+11,4*x^2+4*x-8,2*x^2-2*x-9,2*x^2+x-12], x^3+3*x^2-x-5]; E[187,5]=[[1/3*x^3-8/3*x+1/3,x,-1/3*x^3+8/3*x+2/3,0,-1,x^2-x-6,1,-2/3*x^3-x^2+13/3*x+16/3,-2/3*x^3+13/3*x+4/3,-1/3*x^3-x^2+8/3*x+26/3,x^3+2*x^2-6*x-16,2/3*x^3-13/3*x+14/3,-2*x+2,2*x^2-2*x-12,1/3*x^3-11/3*x+4/3,1/3*x^3-11/3*x+22/3,2/3*x^3+x^2-22/3*x-4/3,4/3*x^3-32/3*x+10/3,-5/3*x^3-x^2+37/3*x+16/3,-x^3+2*x^2+10*x-8,-5/3*x^3-3*x^2+40/3*x+46/3,x^3-x^2-6*x,8/3*x^3+2*x^2-58/3*x-28/3,7/3*x^3+3*x^2-47/3*x-62/3,-2/3*x^3+25/3*x+10/3], x^4-x^3-11*x^2+9*x+20]; E[187,6]=[[2,0,4,-5,-1,4,1,2,-2,-3,4,-2,-3,-2,3,9,-3,-10,7,2,-3,0,14,1,-10], x-1]; E[209,1]=[[x,-x-1,-1,-x-2,-1,3*x-2,x+2,-1,-3,-3*x-2,-x-5,5*x+3,-4*x+4,-4*x+6,2*x+6,-6*x+4,x-3,-5*x-4,-x-9,-x-11,-6*x+4,x-16,x+2,7*x-5,x+1], x^2-2]; E[209,2]=[[x,1/2*x^4-x^3-5/2*x^2+4*x+1,-1/2*x^3+7/2*x-1,-1/2*x^3+3/2*x+2,1,-1/2*x^4+7/2*x^2-2,x^4-x^3-5*x^2+3*x,-1,-x^4+x^3+8*x^2-5*x-9,3/2*x^4-x^3-17/2*x^2+2*x+6,-1/2*x^4+2*x^3+5/2*x^2-10*x+1,x^4-8*x^2+9,-5/2*x^4+3*x^3+27/2*x^2-13*x-4,-x^4+5/2*x^3+4*x^2-15/2*x+4,x^4-9*x^2+8,-x^4-x^3+9*x^2+5*x-14,-x^4-x^3+6*x^2+5*x-1,x^4-x^3-5*x^2+5*x-2,-5/2*x^4+3*x^3+25/2*x^2-9*x-1,-1/2*x^4+3*x^3+1/2*x^2-10*x+7,x^4-4*x^3-7*x^2+22*x+8,x^3-5*x+8,x^4-3/2*x^3-4*x^2+17/2*x-6,x^3-x^2-5*x-3,2*x^4-2*x^3-13*x^2+4*x+15], x^5-2*x^4-6*x^3+10*x^2+5*x-4]; E[209,3]=[[x,-1/2*x^4+7/2*x^2-x-2,1/2*x^5-9/2*x^3+7*x+3,-1/4*x^6+3*x^4-37/4*x^2+13/2,-1,-1/4*x^6-1/2*x^5+5/2*x^4+9/2*x^3-27/4*x^2-9*x+7/2,x^4-x^3-9*x^2+7*x+12,1,1/2*x^6-5*x^4+21/2*x^2+2*x,-1/2*x^4+9/2*x^2-x-9,1/4*x^6+1/2*x^5-5/2*x^4-9/2*x^3+23/4*x^2+9*x+7/2,-x^5-x^4+10*x^3+8*x^2-21*x-13,-1/4*x^6-1/2*x^5+5/2*x^4+7/2*x^3-27/4*x^2-2*x+3/2,-1/2*x^6-1/2*x^5+5*x^4+9/2*x^3-21/2*x^2-9*x-1,x^4-2*x^3-9*x^2+14*x+12,-x^5-x^4+9*x^3+9*x^2-16*x-18,2*x^5+x^4-19*x^3-6*x^2+37*x+9,x^4-x^3-9*x^2+9*x+14,1/4*x^6-1/2*x^5-5/2*x^4+9/2*x^3+15/4*x^2-9*x+7/2,-1/2*x^6-x^5+9/2*x^4+9*x^3-6*x^2-17*x-9,1/2*x^6+x^5-5*x^4-7*x^3+27/2*x^2+6*x-7,x^3-9*x+8,-1/2*x^6+1/2*x^5+7*x^4-11/2*x^3-57/2*x^2+12*x+27,-1/2*x^6-x^5+4*x^4+8*x^3-3/2*x^2-13*x-18,x^5+2*x^4-10*x^3-17*x^2+27*x+23], x^7+x^6-14*x^5-10*x^4+59*x^3+27*x^2-66*x-30]; E[209,4]=[[0,1,-3,-4,1,2,0,1,3,-6,-7,-7,0,-10,0,6,3,-10,11,15,8,-16,0,9,-1], x-1]; E[221,1]=[[1,2,2,2,-6,-1,1,4,6,-6,-2,2,-6,0,-4,14,4,2,0,-10,10,14,12,-18,2], x-1]; E[221,2]=[[-1,0,4,-2,6,-1,1,8,4,-6,-2,-8,0,4,0,-6,0,-10,-8,2,0,0,-4,-2,-4], x-1]; E[221,3]=[[x,-x+1,x-1,2,2,-1,1,-2*x+2,-x-3,-6,2*x,-x+5,-x+5,2*x-6,2*x-2,-2*x,2*x-2,2*x+4,4*x,4*x+2,3*x-7,x+7,4*x+4,-2,x-9], x^2-5]; E[221,4]=[[x,x-1,-2*x-1,-x-1,3*x,-1,-1,3*x-2,-2*x+2,2*x-3,-7,4*x+7,-4*x,-11,2*x+2,x-1,-2*x-5,3*x+3,-10*x-6,4*x+10,8*x-1,-4*x-3,-2*x-5,-3*x+6,-9*x-1], x^2+x-1]; E[221,5]=[[x,-x-1,-x^2-x+2,x-3,x^2-5,1,1,-x^2-3,4*x^2+2*x-10,-x^2+x+4,-3*x^2-x+6,x^2-5*x-4,-2*x^2+2*x+6,-3*x^2-x+10,-4*x^2-2*x+10,4*x^2+3*x-7,3*x^2-3*x-6,x-5,-2*x-6,2*x^2-2*x-12,5*x^2+3*x-12,3*x^2-x-16,-x^2+x+10,-x^2+2*x-3,2*x^2+7*x-5], x^3-4*x+1]; E[221,6]=[[x,-1/2*x^5+1/2*x^4+4*x^3-5/2*x^2-13/2*x+1,1/2*x^4-1/2*x^3-3*x^2+3/2*x+3/2,-x^3+5*x+2,-x^2+3,1,-1,x^5-x^4-8*x^3+6*x^2+13*x-1,1/2*x^5+1/2*x^4-4*x^3-7/2*x^2+13/2*x,-x^3+x^2+5*x-3,x^3+x^2-7*x-1,-x^5+1/2*x^4+17/2*x^3-2*x^2-29/2*x+1/2,-x^5+1/2*x^4+19/2*x^3-3*x^2-39/2*x+3/2,-x^4+5*x^2+2*x+2,-2*x^3+2*x^2+12*x-6,x^5-2*x^4-8*x^3+11*x^2+15*x-9,x^5-2*x^4-8*x^3+10*x^2+17*x,x^5-10*x^3-x^2+19*x+5,x^4+x^3-8*x^2-5*x+11,-x^4+x^3+8*x^2-9*x-9,-x^5+3/2*x^4+19/2*x^3-10*x^2-35/2*x+19/2,1/2*x^5+1/2*x^4-5*x^3-5/2*x^2+15/2*x-1,-x^5-x^4+9*x^3+10*x^2-20*x-9,x^5-x^4-6*x^3+4*x^2+5*x+3,-x^5+1/2*x^4+17/2*x^3-5*x^2-25/2*x+19/2], x^6-x^5-9*x^4+6*x^3+19*x^2-5*x-3]; E[221,7]=[[x,x+1,-1,-x-3,x+2,-1,1,-x+2,-2*x+2,9,2*x+5,-2*x-5,0,9,-2*x-2,x-5,-2*x+3,-x+9,-2*x-10,2,-2*x+3,2*x-3,-2*x-1,5*x-2,-5*x+1], x^2+x-5]; E[247,1]=[[x,2*x-2,2*x,-2,2*x-4,1,-4*x+5,-1,-2*x+5,4*x-2,2*x+1,4*x+1,-3,-2*x+5,-8*x+2,-4*x+6,-6*x+3,7,2*x-3,-4*x+4,2*x+8,-6*x-2,14,10,-17], x^2-x-1]; E[247,2]=[[x,-x^2-x+1,-x^2-2*x,2*x^2+3*x-4,x^2-3,1,x^2+4*x-3,1,-x^2-4*x-3,2*x^2+5*x-6,-4*x^2-3*x+8,5*x^2+6*x-7,-3*x^2-5*x+3,-3*x^2-6*x+8,-2*x^2-4*x+3,x^2+5*x-3,4*x^2+x-9,-6*x^2-12*x+2,-6*x^2-6*x+11,-2*x^2-2*x+9,3*x-4,3*x+5,3*x^2+6*x-9,-7*x^2-13*x+3,-8*x^2-12*x+14], x^3+3*x^2-3]; E[247,3]=[[x,-x^2+x+3,x^3-2*x^2-2*x+3,-x^4+2*x^3+3*x^2-4*x-1,x^4-4*x^3+9*x-2,-1,x^3-6*x+2,1,-2*x^4+3*x^3+10*x^2-8*x-10,-3*x^4+6*x^3+11*x^2-14*x-9,x^3-x^2-5*x+1,2*x^4-5*x^3-4*x^2+8*x+2,x^4-3*x^3-3*x^2+6*x+9,3*x^4-8*x^3-8*x^2+23*x-1,-x^4+3*x^3-5*x+7,-2*x^3+3*x^2+7*x-3,x^4-4*x^3+x^2+14*x-6,-x^4+x^3+4*x^2+3*x-6,4*x^4-12*x^3-6*x^2+24*x+1,-x^4+5*x^3-4*x^2-9*x+11,-x^4+2*x^3+5*x^2-8*x+3,-2*x^4+5*x^3+5*x^2-9*x-2,x^4-2*x^3-4*x^2+7*x+2,-6*x^4+14*x^3+21*x^2-37*x-13,-3*x^4+5*x^3+16*x^2-15*x-12], x^5-4*x^4+12*x^2-5*x-5]; E[247,4]=[[x,x^3-5*x,-x^3+4*x+1,-x^3-x^2+5*x+5,-x^2+5,1,x^2+1,-1,x^4-6*x^2-x+4,-x^4+x^3+6*x^2-6*x-4,x^4+x^3-6*x^2-4*x+2,-x^4+6*x^2-x-8,-x^3+2*x^2+7*x-2,x^3-6*x-1,x^4-x^3-4*x^2+5*x-1,2*x^4-x^3-10*x^2+3*x,x^4-7*x^2-2*x+8,x^4-2*x^3-5*x^2+7*x-1,-x^3+x^2+8*x-6,-2*x^4+x^3+9*x^2-2*x,-2*x^4-x^3+11*x^2+7*x-9,x^4-2*x^3-3*x^2+6*x-10,-3*x^4+2*x^3+18*x^2-7*x-16,3*x^3-2*x^2-13*x+2,-2*x^4+14*x^2-2*x-12], x^5-9*x^3-x^2+19*x+4]; E[247,5]=[[x,-x^3-2*x^2+3*x+4,x^3+2*x^2-4*x-7,x^3+x^2-5*x-3,x^2+2*x-3,-1,x^2-7,-1,-3*x^3-6*x^2+14*x+16,2*x^3+2*x^2-9*x-4,2*x^3+6*x^2-7*x-14,-5*x^3-10*x^2+18*x+24,-x^3-2*x^2+3*x-2,x^3-4*x-1,-2*x^3-4*x^2+6*x+3,-5*x^3-8*x^2+17*x+16,3*x^3+7*x^2-13*x-16,-x^3-x^2+6*x+11,5*x^3+7*x^2-16*x-10,-3*x^3-x^2+16*x+4,3*x^3+5*x^2-13*x-17,5*x^3+7*x^2-23*x-18,-x^3-4*x^2-2*x+4,-x^3-2*x^2+3*x-2,-6*x^3-10*x^2+24*x+20], x^4+3*x^3-2*x^2-9*x-4]; E[253,1]=[[x,-x^2+x+3,x^2-2*x,-x^2+x+3,-1,x^2-3*x-1,-x^2+2*x+2,2*x^2-4*x+1,1,-x^2-3*x+6,3*x^2-4*x-5,-3*x^2+6*x-3,-3*x^2+6*x+7,x^2+2*x-5,2*x^2-6*x+2,-2*x^2+5*x+7,-4*x^2+6*x+3,x^2+4*x-9,-6*x^2+14*x+6,6*x^2-5*x-19,5*x-8,-x+4,6*x^2-10*x-1,-2*x^2+11*x+2,-x^2-x+1], x^3-3*x^2+3]; E[253,2]=[[x,-x^2-x+1,x^2+2*x-4,-x^2-3*x+1,1,x^2+x-3,x^2-6,2*x-1,1,x^2+3*x+2,-5*x^2-8*x+11,x^2+2*x-7,5*x^2+6*x-11,-3*x^2-6*x+9,-2*x^2-2*x+2,2*x^2+3*x-3,-2*x-9,x^2-7,-2*x^2-2*x+2,-2*x^2-3*x-1,-4*x^2-7*x+16,7*x+4,-11,-2*x^2+x,-x^2-3*x-9], x^3+x^2-4*x+1]; E[253,3]=[[x,-x^4-3*x^3+3*x^2+10*x+1,2*x^4+5*x^3-8*x^2-18*x-1,-2*x^4-4*x^3+9*x^2+13*x-3,-1,-x^4-3*x^3+3*x^2+10*x-1,-x^3-2*x^2+6*x+5,x^4+3*x^3-2*x^2-11*x-7,-1,2*x^4+4*x^3-7*x^2-11*x-4,-2*x^4-5*x^3+6*x^2+18*x+6,-x^4-4*x^3+2*x^2+17*x+8,-6*x^4-15*x^3+20*x^2+48*x+8,5*x^4+12*x^3-18*x^2-41*x-8,3*x^4+7*x^3-12*x^2-25*x-8,-x^3-x^2+x,-7*x^4-19*x^3+22*x^2+65*x+13,x^4+2*x^3-4*x^2-3*x+6,-4*x^4-10*x^3+12*x^2+30*x+8,3*x^4+10*x^3-7*x^2-40*x-14,2*x^4+7*x^3-5*x^2-25*x-13,-3*x^4-8*x^3+13*x^2+30*x-3,-7*x^4-17*x^3+26*x^2+55*x-5,3*x^4+8*x^3-7*x^2-24*x-9,-2*x^3-x^2+9*x+5], x^5+4*x^4-14*x^2-13*x-1]; E[253,4]=[[x,x^4-x^3-5*x^2+4*x+3,-x^3+4*x+1,-x^5+6*x^3+x^2-6*x-2,1,-2*x^5+3*x^4+11*x^3-15*x^2-6*x+5,2*x^5-4*x^4-9*x^3+20*x^2-2*x-7,4*x^5-5*x^4-21*x^3+22*x^2+11*x-3,-1,-2*x^5+14*x^3+3*x^2-21*x-6,x^5-7*x^3+2*x^2+9*x-7,4*x^5-5*x^4-22*x^3+24*x^2+15*x-8,-5*x^5+6*x^4+29*x^3-28*x^2-25*x+7,-2*x^5+3*x^4+12*x^3-16*x^2-15*x+12,-x^5+x^4+7*x^3-6*x^2-6*x+5,3*x^5-2*x^4-17*x^3+9*x^2+12*x-3,-x^4+x^3+4*x^2-3*x+7,-4*x^5+3*x^4+22*x^3-14*x^2-11*x,-4*x^4+2*x^3+20*x^2-10*x-4,-4*x^5+3*x^4+22*x^3-15*x^2-12*x+10,4*x^5-4*x^4-23*x^3+19*x^2+17*x-7,-x^5-3*x^4+6*x^3+15*x^2-x-8,-x^4+3*x^3+6*x^2-15*x+3,5*x^5-5*x^4-28*x^3+21*x^2+17*x+4,-3*x^5+8*x^4+16*x^3-39*x^2-8*x+14], x^6-3*x^5-4*x^4+16*x^3-3*x^2-10*x+1]; E[299,1]=[[-x-1,x+1,x,-1,-x-3,-1,-3*x-5,-2*x-5,-1,3*x+5,3*x+5,2*x,-2*x+3,3*x+1,-3*x,4*x+3,5,4*x+1,-4*x-5,6*x+9,-x+4,x,9*x+18,6*x+8,6*x-3], x^2+3*x+1]; E[299,2]=[[-x+1,-x+1,x,1,-x+3,1,-x+3,2*x-7,-1,x-7,-x+7,2*x+4,2*x-7,-3*x+9,x,7,-4*x+11,5,5,2*x+3,-x+12,-x,5*x-6,2*x+4,-2*x+3], x^2-3*x-3]; E[299,3]=[[x-1,0,x,-x+2,-x-2,1,2,-x+6,-1,-2*x+6,-2*x+8,x,10,-2*x+8,-4,4*x-2,-2*x+4,-10,x-6,-2*x-8,-2*x-2,4*x,5*x-6,-3*x+4,3*x+8], x^2-2*x-4]; E[299,4]=[[-x-1,-x-1,x,2*x-1,x+1,1,-3*x-3,-4*x-1,1,-3*x-5,-x-7,-2*x-8,6*x-3,-x+3,9*x+2,2*x+9,-1,2*x-9,-6*x-5,-6*x-1,3*x-6,11*x+4,-3*x+2,-6*x+4,1], x^2+x-1]; E[299,5]=[[7325538/647051513*x^9-26382263/1294103026*x^8-529610753/1294103026*x^7+854214131/1294103026*x^6+3111048928/647051513*x^5-8760561717/1294103026*x^4-26566626335/1294103026*x^3+28789537995/1294103026*x^2+13298939618/647051513*x+285982256/647051513,11105665/647051513*x^9-8975947/647051513*x^8-408454909/647051513*x^7+261031726/647051513*x^6+4952890973/647051513*x^5-2339136221/647051513*x^4-23039305101/647051513*x^3+4878757863/647051513*x^2+31977328284/647051513*x+13571719580/647051513,x,8138414/647051513*x^9-381664/647051513*x^8-338063888/647051513*x^7+14284585/647051513*x^6+4791240438/647051513*x^5-289272366/647051513*x^4-26563820741/647051513*x^3-35565023/647051513*x^2+43050679639/647051513*x+19161391516/647051513,4484362/647051513*x^9+7801185/647051513*x^8-239545786/647051513*x^7-150080751/647051513*x^6+4092126821/647051513*x^5-299353465/647051513*x^4-24398516457/647051513*x^3+9009731123/647051513*x^2+30359650107/647051513*x+11549732256/647051513,-1,-21122508/647051513*x^9+17765672/647051513*x^8+813303675/647051513*x^7-567740890/647051513*x^6-10485794070/647051513*x^5+5806555898/647051513*x^4+52141081291/647051513*x^3-15933816984/647051513*x^2-74492005626/647051513*x-29936657158/647051513,-16679710/647051513*x^9+5379568/647051513*x^8+642761641/647051513*x^7-185798839/647051513*x^6-8178006687/647051513*x^5+2444187110/647051513*x^4+38709257322/647051513*x^3-9240749183/647051513*x^2-46079550705/647051513*x-18739707548/647051513,1,1276536/647051513*x^9-17334419/647051513*x^8+37765472/647051513*x^7+433938419/647051513*x^6-1838295928/647051513*x^5-2210788701/647051513*x^4+15344068534/647051513*x^3-3014715375/647051513*x^2-20841564504/647051513*x-6316030514/647051513,-21350925/647051513*x^9+10707996/647051513*x^8+849781009/647051513*x^7-394808643/647051513*x^6-11298848687/647051513*x^5+5148631852/647051513*x^4+56492269481/647051513*x^3-20530556247/647051513*x^2-73149167020/647051513*x-22590535422/647051513,3218540/647051513*x^9+20220368/647051513*x^8-169499079/647051513*x^7-534659512/647051513*x^6+2734106374/647051513*x^5+2946244102/647051513*x^4-14322952806/647051513*x^3+3738434480/647051513*x^2+6621445541/647051513*x-2299916752/647051513,14861662/647051513*x^9-21773485/647051513*x^8-550869862/647051513*x^7+725355582/647051513*x^6+6723215274/647051513*x^5-7761449963/647051513*x^4-30781309146/647051513*x^3+25531444696/647051513*x^2+37919505344/647051513*x+8979131942/647051513,-5283822/647051513*x^9+1317306/647051513*x^8+203757539/647051513*x^7-116855622/647051513*x^6-2504484212/647051513*x^5+2636994486/647051513*x^4+10245403957/647051513*x^3-16462083052/647051513*x^2-2795409452/647051513*x+7618862968/647051513,901969/647051513*x^9+12943391/647051513*x^8-36132561/647051513*x^7-404767993/647051513*x^6+391272697/647051513*x^5+3533374733/647051513*x^4-553033209/647051513*x^3-8456377199/647051513*x^2-7247315266/647051513*x+3611583358/647051513,3358558/647051513*x^9-4276703/647051513*x^8-153682262/647051513*x^7+234091850/647051513*x^6+2240491704/647051513*x^5-4016334219/647051513*x^4-10142825532/647051513*x^3+22277755704/647051513*x^2-2089415256/647051513*x-10477262790/647051513,-17552800/647051513*x^9+44774318/647051513*x^8+610338347/647051513*x^7-1434170475/647051513*x^6-6836480326/647051513*x^5+14092744028/647051513*x^4+28007075487/647051513*x^3-41873815173/647051513*x^2-29782347244/647051513*x-2198739142/647051513,-11106526/647051513*x^9+12994531/647051513*x^8+399609712/647051513*x^7-381557028/647051513*x^6-4665891990/647051513*x^5+3273117101/647051513*x^4+20373211954/647051513*x^3-6407319318/647051513*x^2-26257249656/647051513*x-7394987238/647051513,-10245260/647051513*x^9+1732049/647051513*x^8+441326100/647051513*x^7-133776917/647051513*x^6-6345957714/647051513*x^5+2809495631/647051513*x^4+33452964380/647051513*x^3-15004746871/647051513*x^2-40524787223/647051513*x-15489330972/647051513,16879812/647051513*x^9-23983462/647051513*x^8-638707077/647051513*x^7+694343335/647051513*x^6+8165966868/647051513*x^5-5664784120/647051513*x^4-41581727929/647051513*x^3+8673168015/647051513*x^2+69870168408/647051513*x+32695974658/647051513,24878505/647051513*x^9-30563210/647051513*x^8-955718628/647051513*x^7+1032064746/647051513*x^6+12256118371/647051513*x^5-11228869640/647051513*x^4-59883085336/647051513*x^3+37233555330/647051513*x^2+80434182686/647051513*x+18873554390/647051513,-54878506/647051513*x^9+33027059/647051513*x^8+2096404845/647051513*x^7-1049045272/647051513*x^6-26658639024/647051513*x^5+11166928761/647051513*x^4+129824867595/647051513*x^3-32555788050/647051513*x^2-179108674954/647051513*x-66536449488/647051513,13585690/647051513*x^9+22237505/647051513*x^8-616659291/647051513*x^7-680245723/647051513*x^6+9469215824/647051513*x^5+5752749333/647051513*x^4-55901875141/647051513*x^3-16413500523/647051513*x^2+93591465865/647051513*x+45103175832/647051513,-3194807/647051513*x^9-2481977/647051513*x^8+115713552/647051513*x^7+46710408/647051513*x^6-1261704135/647051513*x^5+457958929/647051513*x^4+3492765697/647051513*x^3-7982500694/647051513*x^2+9284317385/647051513*x+8053164356/647051513,39780870/647051513*x^9-28130822/647051513*x^8-1584437439/647051513*x^7+1104872224/647051513*x^6+21050672066/647051513*x^5-14993323400/647051513*x^4-104297180117/647051513*x^3+64200153406/647051513*x^2+125373910331/647051513*x+26617583164/647051513], x^10-3*x^9-37*x^8+112*x^7+443*x^6-1401*x^5-1817*x^4+6424*x^3+1108*x^2-6140*x-2372]; E[299,6]=[[-x+1,x,x,-2*x+2,x+2,1,-6,x+2,-1,2,4*x-4,2*x+4,-6,-2*x,-8,2*x+6,-8,-2*x+6,-3*x-2,4,-6*x+6,-2*x-8,-3*x-2,-6*x+8,3*x-8], x^2-x-4]; E[299,7]=[[0,-x^2+2*x+4,x,-x^2+2*x+5,x^2-x-3,1,2*x,-x^2+x+5,-1,2*x^2-2*x-6,-4,x^2-4*x-1,2*x^2-6*x-6,2*x^2-6*x-10,-2*x^2+6*x+12,-2*x-6,-2*x-6,4*x^2-8*x-16,-2*x^2+3*x+14,2*x^2-4*x-18,2*x^2-2*x-4,-2*x^2+2*x+14,-4*x^2+5*x+18,x^2+4*x-9,2*x^2-7*x-4], x^3-x^2-7*x-3]; E[319,1]=[[2,-3,1,4,-1,6,4,-2,3,1,-7,-11,4,-4,8,2,-3,2,-15,-7,2,6,-6,9,-17], x-1]; E[319,2]=[[x,-x,-2*x^2+x+2,2*x^2-2*x-5,1,x^2+x-4,-x^2+x-2,x-4,-4*x^2+4*x+8,1,3*x^2-2*x-9,4*x^2-x-3,-x^2+2*x-3,-5*x^2+x+13,-2*x^2+x+3,-x^2-5*x,-2*x^2-3*x+4,4*x^2-8*x-11,x^2+4*x+3,-x^2-3*x+10,-2*x^2+5*x+1,-5*x^2+7*x+15,7*x^2-x-18,x^2+x-14,-6*x^2+x+10], x^3-3*x-1]; E[319,3]=[[x,-x^3-2*x^2+2*x+1,x^3+2*x^2-2*x-3,x^3+2*x^2-3*x-2,-1,-2*x^3-5*x^2+x+4,3*x^2+5*x-6,x,-x^3-4*x^2-x+5,-1,-x^2+2*x+1,2*x^3+2*x^2-5*x-1,-x^3-x^2+x-10,5*x^3+11*x^2-6*x-8,-x^3+6*x-4,3*x^2+7*x,3*x^3+6*x^2-8*x-11,-3*x^3-4*x^2+13*x+4,2*x^3+9*x^2-2*x-15,x^3+7*x^2+6*x-15,-x^3-2*x^2-4*x-2,-3*x^3-9*x^2+10,-7*x^2-11*x+12,-5*x^3-13*x^2+10*x+9,-x^3-8*x^2-8*x+15], x^4+2*x^3-3*x^2-3*x+2]; E[319,4]=[[x,-x^4+x^3+5*x^2-3*x-3,x^5-x^4-6*x^3+4*x^2+7*x-1,x^6-3*x^5-4*x^4+14*x^3+2*x^2-11*x-1,1,x^5-2*x^4-4*x^3+6*x^2+2*x+1,x^6-3*x^5-4*x^4+15*x^3+x^2-15*x+3,-3*x^6+8*x^5+13*x^4-38*x^3-6*x^2+28*x+1,x^6-4*x^5-2*x^4+19*x^3-7*x^2-15*x+4,-1,x^6-4*x^5-x^4+17*x^3-13*x^2-6*x+7,-x^6+5*x^5+x^4-25*x^3+9*x^2+20*x,-x^6+x^5+7*x^4-4*x^3-12*x^2+7,-x^6+3*x^5+4*x^4-15*x^3+x^2+15*x-4,-3*x^6+7*x^5+13*x^4-33*x^3-5*x^2+28*x-2,x^6-3*x^5-4*x^4+15*x^3-x^2-15*x+7,x^6-6*x^5-x^4+36*x^3-10*x^2-46*x+1,3*x^6-10*x^5-8*x^4+47*x^3-13*x^2-33*x+5,x^6-3*x^5-5*x^4+16*x^3+4*x^2-14*x-3,-2*x^6+2*x^5+14*x^4-11*x^3-25*x^2+16*x+9,x^6-3*x^5-x^4+11*x^3-15*x^2+2*x+12,2*x^6-6*x^5-8*x^4+29*x^3+3*x^2-24*x,-2*x^6+9*x^5+4*x^4-46*x^3+12*x^2+44*x+3,-x^5+4*x^4+4*x^3-16*x^2-4*x+7,-x^4+x^3+3*x^2-x+3], x^7-3*x^6-4*x^5+15*x^4+x^3-14*x^2+1]; E[319,5]=[[x,-1/9*x^7-1/9*x^6+16/9*x^5+10/9*x^4-26/3*x^3-25/9*x^2+113/9*x+14/9,4/9*x^7-2/9*x^6-49/9*x^5+17/9*x^4+56/3*x^3-26/9*x^2-143/9*x+13/9,-2/9*x^7-1/3*x^6+3*x^5+34/9*x^4-12*x^3-98/9*x^2+13*x+29/9,-1,2/3*x^7-2/9*x^6-73/9*x^5+16/9*x^4+86/3*x^3-2*x^2-254/9*x-13/9,1/3*x^6-1/3*x^5-8/3*x^4+3*x^3+3*x^2-17/3*x+11/3,1/9*x^7+2/9*x^6-20/9*x^5-8/3*x^4+37/3*x^3+64/9*x^2-148/9*x-2/3,-4/9*x^7-5/9*x^6+50/9*x^5+6*x^4-61/3*x^3-139/9*x^2+181/9*x+10/3,1,1/9*x^7-4/3*x^5+4/9*x^4+4*x^3-23/9*x^2-2/3*x+14/9,7/9*x^7-31/3*x^5-8/9*x^4+40*x^3+55/9*x^2-116/3*x-19/9,2/9*x^7+1/3*x^6-3*x^5-43/9*x^4+12*x^3+170/9*x^2-14*x-83/9,-1/9*x^7+7/3*x^5+5/9*x^4-14*x^3-13/9*x^2+65/3*x-59/9,-1/3*x^7+5*x^5+2/3*x^4-22*x^3-13/3*x^2+24*x+7/3,10/9*x^7-5/9*x^6-127/9*x^5+38/9*x^4+161/3*x^3-29/9*x^2-533/9*x-53/9,-7/9*x^7+4/9*x^6+86/9*x^5-10/3*x^4-103/3*x^3+38/9*x^2+316/9*x+2/3,5/9*x^7-4/9*x^6-62/9*x^5+31/9*x^4+70/3*x^3-19/9*x^2-151/9*x-88/9,-1/9*x^6-5/9*x^5+23/9*x^4+16/3*x^3-40/3*x^2-100/9*x+109/9,1/3*x^7+1/9*x^6-40/9*x^5-11/9*x^4+50/3*x^3+11/3*x^2-134/9*x-4/9,-7/9*x^7+31/3*x^5+8/9*x^4-42*x^3-37/9*x^2+158/3*x-35/9,2/3*x^7-8*x^5-4/3*x^4+25*x^3+29/3*x^2-14*x-38/3,-2/9*x^6-1/9*x^5+28/9*x^4+2/3*x^3-32/3*x^2-20/9*x+11/9,-8/9*x^7+35/3*x^5+4/9*x^4-44*x^3-32/9*x^2+124/3*x+95/9,-5/9*x^7+1/3*x^6+16/3*x^5-26/9*x^4-10*x^3+61/9*x^2-19/3*x-28/9], x^8-13*x^6-x^5+50*x^4+7*x^3-54*x^2-5*x+1]; E[323,1]=[[x,x+1,2,-2*x,-2,2,-1,1,-2*x,x+5,x-3,-2*x+6,2*x+6,3*x-5,x+1,10,-2*x-6,-4*x-2,-2*x+2,-8,-4*x+2,4*x+8,5*x+9,-2,3*x+3], x^2+x-4]; E[323,2]=[[x,x^3-2*x^2-4*x+5,-x^3+x^2+3*x-4,-x^3+2*x^2+3*x-8,-2*x^3+4*x^2+7*x-11,-2*x^3+x^2+7*x-4,1,1,3*x^3-8*x^2-9*x+21,2*x^3-x^2-7*x-1,3*x^3-4*x^2-7*x+10,x^3+2*x^2-3*x-12,-x^3+5*x^2-x-13,-x^3-3*x^2+6*x+6,3*x^3-2*x^2-10*x+4,x^3-6*x^2-x+12,-6*x^3+7*x^2+18*x-13,-5*x^3+3*x^2+16*x-8,-3*x^3+6*x^2+8*x-18,-x^3+5*x^2-2*x-15,3*x^3-5*x^2-10*x+7,-3*x^3+6*x^2+14*x-13,4*x^3+3*x^2-15*x-9,x^3-5*x^2+19,5*x^3-7*x^2-21*x+8], x^4-6*x^2-x+7]; E[323,3]=[[x,-x^3-2*x^2+2*x+1,x^4+3*x^3-x^2-6*x-1,x^3+2*x^2-x-2,-2*x^4-6*x^3+2*x^2+9*x-1,-x^2-x-2,-1,-1,x^4+5*x^3+4*x^2-8*x-4,-3*x^4-10*x^3+5*x^2+24*x-4,x^3-2*x^2-9*x+4,4*x^4+11*x^3-8*x^2-21*x+2,-x^3-3*x^2+5*x+7,-2*x^4-7*x^3+5*x^2+20*x-6,5*x^4+15*x^3-6*x^2-29*x+3,x^3-2*x^2-9*x+4,2*x^4+6*x^3-5*x^2-14*x+7,-2*x^4-5*x^3+7*x^2+12*x-12,3*x^4+7*x^3-10*x^2-21*x+5,-3*x^4-7*x^3+9*x^2+19*x,x^4+7*x^3+3*x^2-19*x-2,4*x^4+11*x^3-6*x^2-16*x+3,5*x^4+12*x^3-11*x^2-20*x+2,-x^4-5*x^3-x^2+9*x-12,-5*x^4-17*x^3-x^2+26*x+3], x^5+3*x^4-2*x^3-7*x^2+2*x+1]; E[323,4]=[[x,1/2*x^5-1/2*x^4-4*x^3+5/2*x^2+6*x-1/2,-x^4+x^3+7*x^2-4*x-9,1/2*x^5-1/2*x^4-4*x^3+5/2*x^2+7*x+1/2,1/2*x^5-1/2*x^4-5*x^3+5/2*x^2+11*x+3/2,-x^5+x^4+8*x^3-4*x^2-13*x-1,-1,1,-1/2*x^5-1/2*x^4+4*x^3+11/2*x^2-8*x-21/2,x^4-9*x^2+12,1/2*x^5-1/2*x^4-4*x^3+9/2*x^2+5*x-11/2,-x^3+3*x+2,x^5-x^4-7*x^3+6*x^2+7*x-6,x^5-x^4-7*x^3+6*x^2+6*x-1,-x^5+2*x^4+5*x^3-13*x^2+x+18,x^3+2*x^2-5*x-12,-2*x^5+18*x^3+5*x^2-36*x-21,x^3-x^2-6*x+8,3*x^4-3*x^3-24*x^2+17*x+35,1/2*x^5+1/2*x^4-6*x^3-5/2*x^2+17*x-3/2,x^4-x^3-11*x^2+7*x+26,1/2*x^5-1/2*x^4-4*x^3+5/2*x^2+8*x-5/2,-x^5+2*x^4+6*x^3-8*x^2-4*x-3,2*x^5+x^4-19*x^3-13*x^2+41*x+30,-2*x^5+x^4+19*x^3-3*x^2-40*x-7], x^6-2*x^5-9*x^4+15*x^3+23*x^2-23*x-21]; E[323,5]=[[x,1/2*x^6-1/2*x^5-5*x^4+7/2*x^3+13*x^2-7/2*x-5,x^6-10*x^4+26*x^2+x-10,-x^3+5*x,-x^6+11*x^4+x^3-33*x^2-6*x+18,-x^2-x+6,1,-1,-x^4+x^3+6*x^2-4*x-4,3/2*x^6-1/2*x^5-15*x^4+7/2*x^3+39*x^2-5/2*x-15,-3/2*x^6+1/2*x^5+14*x^4-9/2*x^3-32*x^2+11/2*x+13,-3*x^6+x^5+30*x^4-6*x^3-78*x^2+36,-3*x^6+2*x^5+31*x^4-14*x^3-82*x^2+12*x+32,-2*x^6+x^5+19*x^4-7*x^3-44*x^2+4*x+13,x^6-x^5-9*x^4+8*x^3+20*x^2-12*x-9,-3*x^6+x^5+32*x^4-6*x^3-90*x^2+38,-x^6+9*x^4-x^3-20*x^2+7*x+6,-x^6-x^5+10*x^4+8*x^3-29*x^2-11*x+22,3*x^6-2*x^5-32*x^4+12*x^3+89*x^2-4*x-34,2*x^6-21*x^4-x^3+59*x^2+7*x-30,-4*x^6+2*x^5+41*x^4-13*x^3-107*x^2+5*x+42,-x^6+7*x^4-7*x^2-3*x-6,-2*x^6+x^5+18*x^4-8*x^3-40*x^2+8*x+13,2*x^6-19*x^4+x^3+45*x^2-x-18,5/2*x^6-1/2*x^5-26*x^4+7/2*x^3+70*x^2+9/2*x-25], x^7-x^6-10*x^5+9*x^4+26*x^3-19*x^2-12*x+8]; E[323,6]=[[0,3,-2,4,-2,6,-1,1,0,-9,-9,2,-6,-1,-3,2,14,-6,-14,16,-2,8,-3,2,-7], x-1]; E[341,1]=[[-x-1,-1,x,3*x+5,1,-4*x-7,-2*x-5,-2*x-8,-2*x-4,0,1,2*x+1,5*x+12,x-7,5*x+3,-5*x-6,2*x+3,-5*x-13,-7,-5*x-13,6*x+13,-5,-x+10,-7*x-13,-8*x-4], x^2+3*x+1]; E[341,2]=[[-1/4*x^3+1/2*x^2+3/2*x-7/4,1/2*x^3-4*x-5/2,x,-1/2*x^3+3*x+1/2,-1,-1/2*x^3+4*x+1/2,-3/2*x^3+10*x+11/2,1/2*x^3-4*x-11/2,3/2*x^3-x^2-11*x-3/2,-1/2*x^3+x^2+x-11/2,-1,2*x^3-x^2-11*x-2,-x^3+7*x+3,-7/2*x^3+3*x^2+22*x-3/2,-x^3+2*x^2+3*x-4,2*x^3-3*x^2-8*x+11,7/2*x^3-x^2-23*x-17/2,-3/2*x^3+3*x^2+8*x-19/2,-x^3+x^2+7*x-3,-3/2*x^3+9*x+15/2,4*x^3-x^2-23*x-10,9/2*x^3-4*x^2-28*x-1/2,4*x^3-3*x^2-26*x-3,-1/2*x^3-x^2+11/2,-3*x^2-x+13], x^4+x^3-8*x^2-11*x+1]; E[341,3]=[[83/2282*x^7+361/1141*x^6-235/1141*x^5-5625/1141*x^4-8047/2282*x^3+24985/2282*x^2+7491/1141*x-3786/1141,-20/1141*x^7-64/1141*x^6+127/1141*x^5+855/1141*x^4+2104/1141*x^3-1374/1141*x^2-4160/1141*x+2182/1141,x,-79/2282*x^7-481/2282*x^6+901/2282*x^5+3828/1141*x^4+1693/2282*x^3-9959/1141*x^2-3652/1141*x+13297/2282,-1,-243/2282*x^7-617/1141*x^6+2627/2282*x^5+9045/1141*x^4+6623/2282*x^3-31413/2282*x^2-12891/2282*x+10195/2282,247/2282*x^7+1475/2282*x^6-1098/1141*x^5-10842/1141*x^4-12977/2282*x^3+18240/1141*x^2+20569/2282*x-2235/1141,-229/2282*x^7-961/2282*x^6+1212/1141*x^5+6749/1141*x^4+8345/2282*x^3-8836/1141*x^2-21389/2282*x+1139/1141,4/1141*x^7+241/1141*x^6+431/1141*x^5-3594/1141*x^4-6354/1141*x^3+6208/1141*x^2+8819/1141*x-2262/1141,-411/2282*x^7-1114/1141*x^6+5063/2282*x^5+17200/1141*x^4+1933/2282*x^3-75359/2282*x^2-11323/2282*x+18483/2282,1,5/163*x^7+16/163*x^6+9/163*x^5-173/163*x^4-1178/163*x^3-227/163*x^2+2344/163*x+677/163,-4/163*x^7-78/163*x^6-105/163*x^5+1149/163*x^4+2116/163*x^3-1807/163*x^2-2788/163*x+306/163,-29/1141*x^7-321/1141*x^6+13/1141*x^5+4948/1141*x^4+4420/1141*x^3-9637/1141*x^2-1468/1141*x+3278/1141,-268/1141*x^7-1314/1141*x^6+3071/1141*x^5+19444/1141*x^4+4689/1141*x^3-35983/1141*x^2-6681/1141*x+7788/1141,-12/1141*x^7+418/1141*x^6+989/1141*x^5-6333/1141*x^4-10604/1141*x^3+9901/1141*x^2+8914/1141*x-60/1141,160/1141*x^7+512/1141*x^6-2157/1141*x^5-7981/1141*x^4+283/1141*x^3+22402/1141*x^2+8178/1141*x-11751/1141,585/2282*x^7+3013/2282*x^6-7423/2282*x^5-22916/1141*x^4+1213/2282*x^3+47764/1141*x^2+367/1141*x-19895/2282,18/163*x^7+188/163*x^6+65/163*x^5-2807/163*x^4-4143/163*x^3+5116/163*x^2+6352/163*x-2029/163,-422/1141*x^7-2035/1141*x^6+5304/1141*x^5+31162/1141*x^4+1721/1141*x^3-68470/1141*x^2-18175/1141*x+19569/1141,-291/2282*x^7-703/2282*x^6+1580/1141*x^5+4366/1141*x^4+12129/2282*x^3-2180/1141*x^2-38849/2282*x-157/1141,283/1141*x^7+1362/1141*x^6-2881/1141*x^5-20941/1141*x^4-11972/1141*x^3+50135/1141*x^2+33762/1141*x-19123/1141,424/1141*x^7+1585/1141*x^6-5659/1141*x^5-23831/1141*x^4+1948/1141*x^3+51036/1141*x^2+9463/1141*x-13854/1141,-374/1141*x^7-1425/1141*x^6+4771/1141*x^5+19982/1141*x^4+779/1141*x^3-25922/1141*x^2-7050/1141*x-10998/1141,298/1141*x^7+1410/1141*x^6-3832/1141*x^5-21297/1141*x^4+142/1141*x^3+41467/1141*x^2+9498/1141*x-1933/1141], x^8+5*x^7-12*x^6-77*x^5-11*x^4+176*x^3+35*x^2-77*x+9]; 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x^11-3*x^10-35*x^9+106*x^8+423*x^7-1261*x^6-2318*x^5+6533*x^4+5956*x^3-14599*x^2-6045*x+10618]; E[377,1]=[[1,0,-2,0,-4,1,2,-4,8,1,-8,2,-10,-8,8,6,12,6,12,-16,-10,-12,-12,-10,14], x-1]; E[377,2]=[[x,x+1,-2*x,x+3,2,-1,-2*x-4,-2*x,2*x+2,1,-2*x+4,-4*x+2,-2,-x+3,-2*x,2*x+2,-3*x-9,-2*x+4,x+7,-x-11,4*x,5*x+5,-3*x+3,4*x-2,-4*x+6], x^2-3]; E[377,3]=[[x,x^3-3*x,-x^3-2*x^2+2*x+3,-x^4-x^3+4*x^2+2*x-5,x^3+3*x^2-2*x-5,-1,2*x^4+x^3-5*x^2-2,3*x^4+3*x^3-11*x^2-7*x+6,-2*x^4-x^3+6*x^2-x-3,-1,x^2+4*x-2,-2*x^4-5*x^3+4*x^2+12*x,-3*x^4-7*x^3+8*x^2+16*x-3,-2*x^4-2*x^3+7*x^2+4*x-9,2*x^4+6*x^3-6*x^2-15*x+2,2*x^4-3*x^3-13*x^2+10*x+13,2*x^4+5*x^3-4*x^2-16*x,-x^4-7*x^3-2*x^2+18*x+7,x^4+2*x^3-4*x^2-6*x,-4*x^4+2*x^3+17*x^2-8*x-9,-x^4+3*x^2-6*x+4,-x^4-5*x^3+2*x^2+15*x-7,3*x^4+4*x^3-4*x^2-7*x-4,-2*x^4-2*x^3+4*x^2+4*x+9,-x^4+5*x^3+10*x^2-11*x-9], x^5+x^4-5*x^3-3*x^2+6*x+1]; E[377,4]=[[x,-x^6+2*x^5+8*x^4-15*x^3-7*x^2+8*x+1,-x^6+2*x^5+8*x^4-15*x^3-7*x^2+9*x,4*x^6-3*x^5-40*x^4+16*x^3+83*x^2+28*x-6,-5*x^6+5*x^5+49*x^4-32*x^3-97*x^2-13*x+11,-1,3*x^6-2*x^5-30*x^4+9*x^3+62*x^2+29*x-1,4*x^6-4*x^5-39*x^4+25*x^3+75*x^2+15*x-6,-6*x^6+5*x^5+59*x^4-28*x^3-117*x^2-39*x+8,1,4*x^6-5*x^5-37*x^4+33*x^3+62*x^2+8*x-5,5*x^6-3*x^5-51*x^4+12*x^3+110*x^2+51*x-4,-11*x^6+9*x^5+108*x^4-50*x^3-212*x^2-75*x+7,-3*x^6+4*x^5+26*x^4-26*x^3-32*x^2-11*x-6,-7*x^6+7*x^5+67*x^4-43*x^3-122*x^2-32*x,-3*x^6+x^5+33*x^4-4*x^3-85*x^2-19*x+17,-8*x^6+9*x^5+75*x^4-58*x^3-129*x^2-22*x+3,-3*x^6+5*x^5+26*x^4-34*x^3-34*x^2-x+1,3*x^6-3*x^5-28*x^4+19*x^3+48*x^2+11*x-2,15*x^6-16*x^5-142*x^4+100*x^3+252*x^2+59*x-2,10*x^6-14*x^5-89*x^4+96*x^3+129*x^2+2*x,-3*x^6+2*x^5+31*x^4-9*x^3-69*x^2-30*x+14,-2*x^6-4*x^5+27*x^4+40*x^3-90*x^2-79*x,14*x^6-11*x^5-139*x^4+59*x^3+285*x^2+102*x-32,2*x^6-4*x^5-17*x^4+33*x^3+22*x^2-35*x-9], x^7-3*x^6-8*x^5+26*x^4+9*x^3-36*x^2-14*x+3]; E[377,5]=[[x,-2*x^4-5*x^3+8*x^2+21*x+6,2*x^4+5*x^3-8*x^2-22*x-7,x^4+3*x^3-4*x^2-14*x-7,-x^3-x^2+4*x+1,1,-2*x^4-3*x^3+11*x^2+12*x-2,x^4+3*x^3-3*x^2-11*x-8,-x^3+5*x-3,1,-x^2,2*x^4+3*x^3-12*x^2-12*x,-5*x^4-13*x^3+20*x^2+58*x+21,-4*x^4-8*x^3+19*x^2+36*x+5,6*x^4+14*x^3-26*x^2-59*x-18,-6*x^4-13*x^3+27*x^2+52*x+9,2*x^4+3*x^3-14*x^2-12*x+12,-x^4-3*x^3+6*x^2+14*x-3,x^4+4*x^3-2*x^2-14*x-12,2*x^4+6*x^3-7*x^2-26*x-5,5*x^4+12*x^3-21*x^2-54*x-22,-3*x^4-3*x^3+16*x^2+9*x-3,-9*x^4-22*x^3+38*x^2+95*x+26,-6*x^4-12*x^3+26*x^2+46*x+13,x^4-x^3-6*x^2+7*x-1], x^5+3*x^4-3*x^3-13*x^2-8*x-1]; E[377,6]=[[x,3/4*x^8-37/4*x^6+133/4*x^4-1/4*x^3-31*x^2-17/4*x+7/4,1/2*x^8-13/2*x^6+51/2*x^4-1/2*x^3-29*x^2-1/2*x+9/2,-1/4*x^8-1/2*x^7+13/4*x^6+6*x^5-51/4*x^4-83/4*x^3+15*x^2+75/4*x+5/4,-1/2*x^8+13/2*x^6-x^5-49/2*x^4+15/2*x^3+23*x^2-11/2*x-3/2,1,-1/2*x^8+13/2*x^6-51/2*x^4+1/2*x^3+28*x^2+1/2*x-3/2,-x^4+x^3+7*x^2-5*x-4,-1/2*x^8+11/2*x^6+x^5-33/2*x^4-13/2*x^3+9*x^2+17/2*x+15/2,-1,x^5-x^4-7*x^3+4*x^2+6*x+5,-3/2*x^8+39/2*x^6-x^5-151/2*x^4+17/2*x^3+82*x^2-9/2*x-23/2,1/2*x^8-13/2*x^6+x^5+51/2*x^4-15/2*x^3-30*x^2+11/2*x+15/2,-5/4*x^8+x^7+63/4*x^6-12*x^5-227/4*x^4+159/4*x^3+46*x^2-77/4*x-1/4,x^8+x^7-13*x^6-11*x^5+48*x^4+35*x^3-40*x^2-39*x-6,-1/2*x^8+13/2*x^6-x^5-49/2*x^4+15/2*x^3+25*x^2-11/2*x-15/2,-5/4*x^8-1/2*x^7+65/4*x^6+6*x^5-251/4*x^4-87/4*x^3+67*x^2+119/4*x-27/4,3/2*x^8+x^7-37/2*x^6-11*x^5+129/2*x^4+69/2*x^3-50*x^2-83/2*x-17/2,-3/4*x^8+1/2*x^7+35/4*x^6-6*x^5-113/4*x^4+83/4*x^3+20*x^2-43/4*x-1/4,-1/4*x^8+1/2*x^7+13/4*x^6-5*x^5-51/4*x^4+49/4*x^3+14*x^2-1/4*x-15/4,x^8-13*x^6+2*x^5+48*x^4-15*x^3-39*x^2+11*x-1,-7/4*x^8-x^7+85/4*x^6+12*x^5-293/4*x^4-159/4*x^3+59*x^2+173/4*x+29/4,1/4*x^8+1/2*x^7-13/4*x^6-7*x^5+55/4*x^4+107/4*x^3-22*x^2-79/4*x+27/4,3/2*x^8+x^7-39/2*x^6-11*x^5+147/2*x^4+71/2*x^3-69*x^2-93/2*x-3/2,3/2*x^8-37/2*x^6+135/2*x^4+1/2*x^3-70*x^2-27/2*x+25/2], x^9-x^8-13*x^7+13*x^6+51*x^5-50*x^4-59*x^3+45*x^2+20*x-3]; E[391,1]=[[x,-2,-x^2+2,-x,-x^2-x+3,2*x^2-x-6,-1,2*x^2+2*x-6,-1,2*x^2-10,2*x-2,-3*x^2-x+7,-8,4*x+2,-x^2+3*x+7,4*x^2+2*x-14,-3*x^2-6*x+10,-2*x^2-x+10,4*x^2-2*x-14,2*x^2-12,-4*x^2+2*x+16,-x^2+2*x-2,-2*x^2+12,4*x-4,7*x^2-3*x-23], x^3+x^2-4*x-3]; E[391,2]=[[x,0,-x^2-2*x+2,-x-2,x^2+3*x-3,2*x^2+3*x-6,1,-2*x^2-4*x+4,1,2*x-2,4*x^2+8*x-12,3*x^2+3*x-7,-2*x^2-4*x+2,-2*x^2-6*x,-5*x^2-5*x+15,-4*x^2-6*x+4,x^2+2*x-6,-6*x^2-5*x+16,-4*x^2-4*x+14,-4*x^2-8*x+12,6*x^2+8*x-14,-5*x^2-8*x+14,4*x^2+2*x-6,2*x^2-4*x-16,-3*x^2+x+11], x^3+x^2-4*x+1]; E[391,3]=[[x,-1/4*x^8+1/4*x^7+7/2*x^6-5/2*x^5-33/2*x^4+7*x^3+57/2*x^2-19/4*x-47/4,-1/4*x^8+1/4*x^7+13/4*x^6-11/4*x^5-55/4*x^4+35/4*x^3+85/4*x^2-13/2*x-9,-1/4*x^7+1/4*x^6+13/4*x^5-11/4*x^4-47/4*x^3+31/4*x^2+33/4*x-5/2,1/4*x^8-15/4*x^6+1/4*x^5+73/4*x^4-9/4*x^3-125/4*x^2+9/2*x+57/4,-x^8+3/2*x^7+12*x^6-16*x^5-43*x^4+47*x^3+43*x^2-26*x-23/2,-1,1/2*x^8-1/4*x^7-27/4*x^6+9/4*x^5+117/4*x^4-19/4*x^3-177/4*x^2+3/4*x+37/2,1,-3/4*x^8+3/4*x^7+37/4*x^6-31/4*x^5-131/4*x^4+83/4*x^3+105/4*x^2-7*x+3/2,1/2*x^8-1/4*x^7-27/4*x^6+9/4*x^5+117/4*x^4-19/4*x^3-169/4*x^2-5/4*x+25/2,3/4*x^8-1/2*x^7-39/4*x^6+17/4*x^5+161/4*x^4-29/4*x^3-221/4*x^2-5*x+83/4,7/4*x^8-2*x^7-23*x^6+21*x^5+95*x^4-119/2*x^3-257/2*x^2+113/4*x+51,-3/2*x^8+2*x^7+79/4*x^6-85/4*x^5-329/4*x^4+247/4*x^3+451/4*x^2-137/4*x-169/4,-1/2*x^6+1/2*x^5+11/2*x^4-9/2*x^3-31/2*x^2+13/2*x+15/2,5/4*x^8-5/4*x^7-16*x^6+12*x^5+64*x^4-59/2*x^3-83*x^2+33/4*x+129/4,1/2*x^7-5*x^5-x^4+13*x^3+6*x^2-5*x-15/2,-3/2*x^8+7/4*x^7+75/4*x^6-73/4*x^5-289/4*x^4+207/4*x^3+349/4*x^2-99/4*x-28,3/4*x^8-3/2*x^7-39/4*x^6+69/4*x^5+153/4*x^4-221/4*x^3-169/4*x^2+37*x+47/4,3/2*x^8-9/4*x^7-18*x^6+24*x^5+66*x^4-71*x^3-147/2*x^2+39*x+93/4,x^8-x^7-53/4*x^6+39/4*x^5+227/4*x^4-105/4*x^3-341/4*x^2+81/4*x+143/4,1/4*x^8-3/4*x^7-11/4*x^6+29/4*x^5+41/4*x^4-81/4*x^3-55/4*x^2+19*x+2,-x^8+1/2*x^7+55/4*x^6-21/4*x^5-233/4*x^4+59/4*x^3+291/4*x^2-31/4*x-51/4,-1/2*x^8+7/4*x^7+11/2*x^6-37/2*x^5-33/2*x^4+105/2*x^3+6*x^2-49/2*x+27/4,5/4*x^8-x^7-63/4*x^6+41/4*x^5+249/4*x^4-121/4*x^3-317/4*x^2+39/2*x+101/4], x^9-2*x^8-12*x^7+23*x^6+43*x^5-79*x^4-43*x^3+78*x^2+11*x-21]; E[391,4]=[[x,1,-2*x-2,2*x,-4,-1,-1,2,-1,-2*x-5,-4*x+1,8*x+4,6*x+1,-2*x+2,-2*x-9,4*x+2,4,4*x+2,-6*x+2,4*x-7,-6*x-9,-6*x,-4*x-2,4*x-4,-10*x-4], x^2+x-1]; E[391,5]=[[x,-9/14*x^11+12/7*x^10+19/2*x^9-181/7*x^8-89/2*x^7+888/7*x^6+460/7*x^5-429/2*x^4-30/7*x^3+867/14*x^2+7*x+9/14,-1/14*x^11-9/14*x^10+3*x^9+141/14*x^8-69/2*x^7-368/7*x^6+1084/7*x^5+205/2*x^4-3677/14*x^3-443/7*x^2+201/2*x+379/14,3/14*x^11-1/14*x^10-9/2*x^9+9/7*x^8+35*x^7-58/7*x^6-851/7*x^5+43/2*x^4+2435/14*x^3-191/14*x^2-60*x-82/7,13/7*x^11-39/14*x^10-33*x^9+295/7*x^8+425/2*x^7-1464/7*x^6-4230/7*x^5+366*x^4+10195/14*x^3-795/7*x^2-256*x-635/14,15/7*x^11-40/7*x^10-32*x^9+608/7*x^8+153*x^7-3030/7*x^6-1678/7*x^5+764*x^4+303/7*x^3-2012/7*x^2-22*x+97/7,1,-15/14*x^11+75/14*x^10+19/2*x^9-570/7*x^8+22*x^7+2838/7*x^6-2577/7*x^5-1433/2*x^4+11569/14*x^3+4161/14*x^2-279*x-521/7,-1,-55/14*x^11+121/14*x^10+63*x^9-1835/14*x^8-693/2*x^7+4561/7*x^6+5384/7*x^5-2289/2*x^4-9259/14*x^3+2837/7*x^2+503/2*x+391/14,-89/14*x^11+221/14*x^10+195/2*x^9-1674/7*x^8-493*x^7+8296/7*x^6+6351/7*x^5-4127/2*x^4-6737/14*x^3+9913/14*x^2+209*x+90/7,x^11-11/2*x^10-8*x^9+84*x^8-67/2*x^7-422*x^6+408*x^5+762*x^4-1781/2*x^3-346*x^2+321*x+175/2,-6/7*x^11+16/7*x^10+25/2*x^9-485/14*x^8-113/2*x^7+1205/7*x^6+499/7*x^5-304*x^4+219/7*x^3+1695/14*x^2-41/2*x-163/14,16/7*x^11-111/14*x^10-59/2*x^9+1683/14*x^8+93*x^7-4177/7*x^6+648/7*x^5+1047*x^4-7867/14*x^3-5619/14*x^2+377/2*x+404/7,-15/7*x^11+26/7*x^10+37*x^9-391/7*x^8-229*x^7+1910/7*x^6+4331/7*x^5-455*x^4-5000/7*x^3+696/7*x^2+277*x+379/7,85/14*x^11-104/7*x^10-187/2*x^9+1578/7*x^8+953/2*x^7-7850/7*x^6-6250/7*x^5+3949/2*x^4+3480/7*x^3-10111/14*x^2-198*x-29/14,-17/7*x^11+71/7*x^10+27*x^9-1082/7*x^8-33*x^7+5415/7*x^6-2974/7*x^5-1383*x^4+8191/7*x^3+4125/7*x^2-411*x-823/7,-55/14*x^11+163/14*x^10+111/2*x^9-1236/7*x^8-233*x^7+6136/7*x^6+1457/7*x^5-3071/2*x^4+4335/14*x^3+7977/14*x^2-79*x-368/7,-19/7*x^11+127/14*x^10+36*x^9-968/7*x^8-251/2*x^7+4846/7*x^6-227/7*x^5-1234*x^4+7337/14*x^3+3473/7*x^2-163*x-907/14,-29/14*x^11+41/7*x^10+30*x^9-1245/14*x^8-134*x^7+3097/7*x^6+1147/7*x^5-1557/2*x^4+552/7*x^3+2035/7*x^2-69/2*x-122/7,-55/7*x^11+277/14*x^10+239/2*x^9-4195/14*x^8-594*x^7+10389/7*x^6+7310/7*x^5-2582*x^4-6359/14*x^3+12475/14*x^2+391/2*x-15/7,103/14*x^11-263/14*x^10-111*x^9+3985/14*x^8+1085/2*x^7-9878/7*x^6-6372/7*x^5+4921/2*x^4+4413/14*x^3-6031/7*x^2-331/2*x+121/14,-27/7*x^11+165/14*x^10+107/2*x^9-2501/14*x^8-214*x^7+6203/7*x^6+926/7*x^5-1550*x^4+5989/14*x^3+8023/14*x^2-231/2*x-393/7,-9/2*x^11+11*x^10+70*x^9-335/2*x^8-364*x^7+839*x^6+717*x^5-3007/2*x^4-468*x^3+603*x^2+359/2*x-6,39/7*x^11-215/14*x^10-82*x^9+1634/7*x^8+759/2*x^7-8144/7*x^6-3716/7*x^5+2054*x^4-817/14*x^3-5416/7*x^2+23*x+559/14], x^12-4*x^11-12*x^10+62*x^9+27*x^8-321*x^7+108*x^6+625*x^5-362*x^4-372*x^3+116*x^2+97*x+13]; E[403,1]=[[x,-2,2*x-3,1,-4*x+6,1,-2*x+6,1,2*x-6,2*x,-1,-6*x+6,-2*x+3,-6*x+4,-8*x+12,-2*x+12,-4*x+3,6*x-2,-8,3,14,4,8*x-6,-2*x,6*x-7], x^2-3*x+1]; E[403,2]=[[x,x^5-3*x^4-3*x^3+13*x^2-6*x,-x^5+2*x^4+5*x^3-9*x^2-2*x+4,x^4-2*x^3-5*x^2+8*x+2,-x^6+3*x^5+3*x^4-14*x^3+7*x^2+5*x-1,-1,-x^5+4*x^4+x^3-17*x^2+14*x,-x^6+4*x^5+2*x^4-20*x^3+10*x^2+10*x,-x^6+4*x^5+2*x^4-19*x^3+9*x^2+4*x+4,x^6-4*x^5+x^4+13*x^3-23*x^2+19*x-2,1,-2*x^5+5*x^4+9*x^3-22*x^2-x+7,-x^6+4*x^5+x^4-16*x^3+14*x^2-9*x+2,x^5-4*x^4-x^3+20*x^2-16*x-8,3*x^5-8*x^4-13*x^3+39*x^2-x-16,-3*x^4+5*x^3+14*x^2-22*x+4,3*x^6-8*x^5-14*x^4+42*x^3+4*x^2-35*x-2,-2*x^6+6*x^5+9*x^4-31*x^3-x^2+20*x,x^6-3*x^5-3*x^4+13*x^3-7*x^2-x-2,x^6+x^5-15*x^4-2*x^3+50*x^2-13*x-14,4*x^6-12*x^5-17*x^4+62*x^3-2*x^2-40*x-1,x^6-3*x^5-x^4+10*x^3-17*x^2+14*x+2,2*x^6-9*x^5+3*x^4+37*x^3-53*x^2+11*x+8,x^6-4*x^5+18*x^3-23*x^2-x+15,-x^6+3*x^5+2*x^4-16*x^3+13*x^2+15*x-4], x^7-2*x^6-9*x^5+17*x^4+20*x^3-37*x^2+x+4]; E[403,3]=[[x,-x^5-x^4+7*x^3+5*x^2-10*x-4,-x^7+10*x^5-x^4-29*x^3+25*x+8,2*x^6+2*x^5-15*x^4-10*x^3+25*x^2+10*x-2,x^6+x^5-7*x^4-4*x^3+11*x^2+x-3,1,x^7-10*x^5+x^4+27*x^3-2*x^2-17*x,-x^7-x^6+9*x^5+7*x^4-22*x^3-15*x^2+13*x+8,x^7-x^6-11*x^5+9*x^4+35*x^3-16*x^2-33*x,-x^7-x^6+7*x^5+4*x^4-9*x^3-6*x-2,-1,-2*x^6-2*x^5+15*x^4+9*x^3-26*x^2-5*x+5,x^7+x^6-7*x^5-6*x^4+8*x^3+11*x^2+8*x-2,x^5-9*x^3-2*x^2+18*x+8,-2*x^7+21*x^5-63*x^3-9*x^2+51*x+20,-2*x^6-2*x^5+15*x^4+11*x^3-22*x^2-16*x-4,3*x^6+2*x^5-24*x^4-8*x^3+44*x^2+7*x-6,x^7-4*x^6-17*x^5+28*x^4+69*x^3-36*x^2-71*x-16,-x^6+x^5+11*x^4-9*x^3-29*x^2+19*x+14,3*x^6+5*x^5-19*x^4-30*x^3+18*x^2+41*x+14,-2*x^7+18*x^5-5*x^4-42*x^3+18*x^2+18*x-11,-3*x^6-7*x^5+19*x^4+44*x^3-23*x^2-58*x-10,3*x^7+2*x^6-28*x^5-12*x^4+77*x^3+26*x^2-68*x-28,x^6+6*x^5-2*x^4-40*x^3-11*x^2+53*x+13,-2*x^7+3*x^6+27*x^5-20*x^4-100*x^3+17*x^2+105*x+24], x^8+x^7-11*x^6-10*x^5+37*x^4+33*x^3-36*x^2-33*x-4]; E[403,4]=[[x,-x^5-3*x^4+5*x^3+19*x^2+6*x-8,3*x^5+8*x^4-17*x^3-51*x^2-8*x+18,-2*x^5-5*x^4+12*x^3+31*x^2-10,5*x^5+12*x^4-29*x^3-75*x^2-8*x+24,1,-3*x^5-8*x^4+17*x^3+51*x^2+6*x-24,-12*x^5-29*x^4+69*x^3+184*x^2+23*x-67,4*x^5+11*x^4-22*x^3-71*x^2-13*x+27,8*x^5+20*x^4-46*x^3-127*x^2-14*x+45,1,-3*x^4-3*x^3+20*x^2+17*x-13,-14*x^5-34*x^4+81*x^3+214*x^2+26*x-75,7*x^5+20*x^4-37*x^3-128*x^2-32*x+50,-x^5-2*x^4+5*x^3+13*x^2+9*x-6,-2*x^5-5*x^4+11*x^3+30*x^2+6*x-12,16*x^5+39*x^4-93*x^3-246*x^2-26*x+87,12*x^5+29*x^4-71*x^3-185*x^2-14*x+68,-9*x^5-22*x^4+50*x^3+139*x^2+26*x-55,7*x^5+16*x^4-39*x^3-102*x^2-20*x+39,-8*x^5-21*x^4+44*x^3+134*x^2+28*x-55,11*x^5+26*x^4-63*x^3-163*x^2-21*x+53,3*x^5+7*x^4-19*x^3-45*x^2+3*x+18,-12*x^5-33*x^4+67*x^3+211*x^2+34*x-84,11*x^5+25*x^4-65*x^3-155*x^2-10*x+47], x^6+2*x^5-7*x^4-13*x^3+6*x^2+7*x-3]; E[403,5]=[[x,-x^7-3*x^6+6*x^5+19*x^4-12*x^3-36*x^2+8*x+19,-x^5-2*x^4+5*x^3+7*x^2-6*x-6,x^4+2*x^3-3*x^2-4*x,2*x^7+7*x^6-9*x^5-43*x^4+8*x^3+77*x^2+x-37,-1,-x^6-x^5+9*x^4+4*x^3-25*x^2-x+17,-x^6-4*x^5+16*x^3+14*x^2-14*x-16,x^7+4*x^6-3*x^5-22*x^4-2*x^3+32*x^2+8*x-11,-x^7-2*x^6+7*x^5+11*x^4-14*x^3-12*x^2+7*x-5,-1,2*x^7+8*x^6-6*x^5-45*x^4-x^3+74*x^2+5*x-33,x^6-11*x^4-2*x^3+28*x^2+5*x-20,-x^7-6*x^6+35*x^4+11*x^3-59*x^2-7*x+28,-x^7-5*x^6+4*x^5+38*x^4+2*x^3-84*x^2-13*x+47,-x^7-5*x^6+x^5+29*x^4+10*x^3-49*x^2-10*x+19,-3*x^7-11*x^6+11*x^5+61*x^4-6*x^3-95*x^2-2*x+36,-2*x^7-8*x^6+10*x^5+55*x^4-13*x^3-111*x^2+62,2*x^7+7*x^6-9*x^5-41*x^4+11*x^3+69*x^2-5*x-30,3*x^7+10*x^6-18*x^5-69*x^4+35*x^3+145*x^2-23*x-87,-x^7-3*x^6+5*x^5+17*x^4-7*x^3-31*x^2-2*x+22,x^7+4*x^6-8*x^5-33*x^4+21*x^3+72*x^2-16*x-33,2*x^7+7*x^6-9*x^5-44*x^4+10*x^3+91*x^2-4*x-61,-2*x^6-4*x^5+13*x^4+15*x^3-33*x^2-8*x+22,-3*x^7-11*x^6+14*x^5+69*x^4-20*x^3-134*x^2+12*x+76], x^8+5*x^7-30*x^5-24*x^4+54*x^3+54*x^2-28*x-29]; E[407,1]=[[x,x^3+x^2-4*x,-x^3-x^2+3*x,-2*x^3-3*x^2+6*x,-1,x^3+x^2-2*x-2,x^3+3*x^2-x-6,3*x^3+6*x^2-7*x-7,-x^3+5*x-3,x^3-6*x+2,3*x^3+2*x^2-11*x+4,-1,-x^3-x^2+2*x-2,-3*x^3-6*x^2+8*x+4,2*x^3+2*x^2-6*x+1,4*x^3+2*x^2-18*x+3,-3*x^3-7*x^2+2*x+9,-8*x^3-10*x^2+24*x+2,-6*x^3-6*x^2+25*x-1,4*x^3+6*x^2-11*x+2,3*x^3+2*x^2-10*x-5,2*x^3+6*x^2-2*x-1,5*x^2+x-12,-3*x^3-7*x^2+10*x+7,x^2+2*x-10], x^4+x^3-4*x^2+1]; E[407,2]=[[x,-x^3+x^2+2*x-2,x^3-x^2-3*x,-x^2+2,1,-x^3+x^2+2*x-4,-x^3-x^2+3*x,3*x^3-4*x^2-7*x+5,-x^3+4*x^2+x-9,-3*x^3+4*x^2+10*x-6,x^3+x-4,1,-x^3+3*x^2,x^3+6*x^2-4*x-16,2*x^3-6*x^2-2*x+9,-6*x^2+2*x+15,-x^3-5*x^2+10*x+9,2*x^2-10,-4*x^3+2*x^2+9*x-1,2*x^3-2*x^2-11*x+6,-x^3+2*x-7,2*x^3-14*x-1,2*x^3+7*x^2-11*x-12,-x^3+3*x^2-2*x-9,7*x^2-4*x-22], x^4-x^3-4*x^2+2*x+3]; E[407,3]=[[x,-370/249*x^11+52/249*x^10+6619/249*x^9-934/249*x^8-40324/249*x^7+1087/83*x^6+94670/249*x^5+5092/249*x^4-67508/249*x^3-10735/249*x^2+3599/249*x-66/83,142/249*x^11+11/249*x^10-2512/249*x^9-188/249*x^8+15010/249*x^7+704/83*x^6-33614/249*x^5-10396/249*x^4+19526/249*x^3+11563/249*x^2+2806/249*x-164/83,-239/249*x^11+113/249*x^10+4256/249*x^9-2135/249*x^8-25856/249*x^7+4078/83*x^6+61468/249*x^5-22588/249*x^4-49207/249*x^3+12121/249*x^2+8362/249*x-153/83,1,350/249*x^11+18/83*x^10-6250/249*x^9-285/83*x^8+38086/249*x^7+6716/249*x^6-89371/249*x^5-8440/83*x^4+61757/249*x^3+7256/83*x^2-320/249*x+1199/249,157/83*x^11+85/249*x^10-8470/249*x^9-1498/249*x^8+52099/249*x^7+12004/249*x^6-41344/83*x^5-43526/249*x^4+88595/249*x^3+39143/249*x^2-3587/249*x-512/249,-92/83*x^11+56/83*x^10+1631/83*x^9-1025/83*x^8-9830/83*x^7+5772/83*x^6+23147/83*x^5-10580/83*x^4-18885/83*x^3+5384/83*x^2+4227/83*x-143/83,295/249*x^11+55/249*x^10-1752/83*x^9-940/249*x^8+10630/83*x^7+7406/249*x^6-74114/249*x^5-27080/249*x^4+16469/83*x^3+25445/249*x^2+582/83*x-634/249,395/249*x^11+63/83*x^10-7018/249*x^9-1122/83*x^8+42250/249*x^7+23174/249*x^6-95131/249*x^5-22900/83*x^4+51602/249*x^3+19005/83*x^2+13654/249*x-1240/249,-733/249*x^11+14/83*x^10+13196/249*x^9-277/83*x^8-81284/249*x^7+926/249*x^6+194918/249*x^5+6900/83*x^4-146611/249*x^3-8946/83*x^2+13234/249*x-211/249,-1,-201/83*x^11-105/83*x^10+3613/83*x^9+1870/83*x^8-22218/83*x^7-12690/83*x^6+52454/83*x^5+36728/83*x^4-34487/83*x^3-30015/83*x^2-2043/83*x+818/83,-85/249*x^11-2/83*x^10+1589/249*x^9+87/83*x^8-10217/249*x^7-3310/249*x^6+25820/249*x^5+4848/83*x^4-20935/249*x^3-5528/83*x^2+2710/249*x+2117/249,270/83*x^11-143/249*x^10-14488/249*x^9+2693/249*x^8+88564/249*x^7-11852/249*x^6-70416/83*x^5+1186/249*x^4+163154/249*x^3+17009/249*x^2-22202/249*x-1157/249,-631/249*x^11+16/249*x^10+11422/249*x^9-115/249*x^8-70750/249*x^7-1549/83*x^6+170408/249*x^5+36082/249*x^4-127631/249*x^3-41017/249*x^2+11642/249*x+599/83,231/83*x^11-54/83*x^10-4125/83*x^9+1021/83*x^8+25160/83*x^7-5056/83*x^6-59946/83*x^5+4736/83*x^4+46807/83*x^3+1140/83*x^2-6403/83*x-37/83,-19/83*x^11-88/249*x^10+1006/249*x^9+1504/249*x^8-6121/249*x^7-9094/249*x^6+4756/83*x^5+22412/249*x^4-7721/249*x^3-17306/249*x^2-4105/249*x+284/249,-437/249*x^11+17/249*x^10+7685/249*x^9-449/249*x^8-45572/249*x^7+258/83*x^6+101254/249*x^5+10916/249*x^4-59803/249*x^3-14183/249*x^2-5465/249*x-593/83,28/249*x^11+499/249*x^10-139/83*x^9-8800/249*x^8+646/83*x^7+53063/249*x^6+400/249*x^5-123770/249*x^4-7824/83*x^3+86594/249*x^2+8629/83*x-2248/249,448/249*x^11-565/249*x^10-8083/249*x^9+9928/249*x^8+49600/249*x^7-18730/83*x^6-119594/249*x^5+111944/249*x^4+102860/249*x^3-64589/249*x^2-25625/249*x+516/83,-365/249*x^11-265/249*x^10+6506/249*x^9+4597/249*x^8-39557/249*x^7-9822/83*x^6+91042/249*x^5+79454/249*x^4-52147/249*x^3-63065/249*x^2-12887/249*x+895/83,216/83*x^11-99/83*x^10-3869/83*x^9+1775/83*x^8+23606/83*x^7-9380/83*x^6-55868/83*x^5+14382/83*x^4+42224/83*x^3-5463/83*x^2-4421/83*x+195/83,175/249*x^11+92/83*x^10-3125/249*x^9-1595/83*x^8+19292/249*x^7+29254/249*x^6-46304/249*x^5-23974/83*x^4+31003/249*x^3+17738/83*x^2+2081/249*x-3011/249,-427/83*x^11-191/249*x^10+22958/249*x^9+3287/249*x^8-140414/249*x^7-27542/249*x^6+110100/83*x^5+106084/249*x^4-226351/249*x^3-98233/249*x^2-356/249*x+3163/249], x^12-x^11-18*x^10+18*x^9+111*x^8-104*x^7-274*x^6+212*x^5+255*x^4-129*x^3-78*x^2+4*x+1]; E[407,4]=[[x,10/59*x^10-1/59*x^9-156/59*x^8+831/59*x^6+78/59*x^5-1732/59*x^4-330/59*x^3+1171/59*x^2+305/59*x-196/59,-83/59*x^10+26/59*x^9+1342/59*x^8-6*x^7-7564/59*x^6+1630/59*x^5+17420/59*x^4-2512/59*x^3-14457/59*x^2+448/59*x+3090/59,61/59*x^10-12/59*x^9-987/59*x^8+3*x^7+5547/59*x^6-893/59*x^5-12701/59*x^4+1409/59*x^3+10512/59*x^2-57/59*x-2234/59,-1,100/59*x^10-10/59*x^9-1619/59*x^8+2*x^7+9136/59*x^6-459/59*x^5-21096/59*x^4+181/59*x^3+17610/59*x^2+1044/59*x-3671/59,-1/59*x^10+6/59*x^9-8/59*x^8-2*x^7+265/59*x^6+771/59*x^5-1467/59*x^4-1855/59*x^3+2532/59*x^2+1238/59*x-771/59,-148/59*x^10+3/59*x^9+2415/59*x^8-13762/59*x^6-175/59*x^5+32218/59*x^4+1167/59*x^3-27526/59*x^2-1977/59*x+6193/59,161/59*x^10-22/59*x^9-2606/59*x^8+5*x^7+14683/59*x^6-1411/59*x^5-33797/59*x^4+2121/59*x^3+28122/59*x^2-75/59*x-6141/59,-161/59*x^10+22/59*x^9+2606/59*x^8-5*x^7-14683/59*x^6+1352/59*x^5+33797/59*x^4-1590/59*x^3-28122/59*x^2-987/59*x+6141/59,202/59*x^10-32/59*x^9-3281/59*x^8+7*x^7+18627/59*x^6-1811/59*x^5-43565/59*x^4+2243/59*x^3+37531/59*x^2+615/59*x-8396/59,1,-113/59*x^10+29/59*x^9+1810/59*x^8-7*x^7-10057/59*x^6+2045/59*x^5+22675/59*x^4-3469/59*x^3-18324/59*x^2+772/59*x+4209/59,-52/59*x^10+17/59*x^9+823/59*x^8-4*x^7-4451/59*x^6+1093/59*x^5+9325/59*x^4-1647/59*x^3-5747/59*x^2+243/59*x+382/59,-79/59*x^10+2/59*x^9+1315/59*x^8-7680/59*x^6-156/59*x^5+18568/59*x^4+896/59*x^3-16797/59*x^2-1200/59*x+4227/59,-344/59*x^10+58/59*x^9+5567/59*x^8-13*x^7-31324/59*x^6+3441/59*x^5+71723/59*x^4-4401/59*x^3-58596/59*x^2-1111/59*x+11958/59,174/59*x^10-41/59*x^9-2797/59*x^8+9*x^7+15663/59*x^6-2289/59*x^5-35907/59*x^4+2931/59*x^3+30075/59*x^2+410/59*x-7092/59,-258/59*x^10+14/59*x^9+4190/59*x^8-2*x^7-23847/59*x^6+265/59*x^5+56285/59*x^4+903/59*x^3-49729/59*x^2-2736/59*x+12007/59,31/59*x^10-9/59*x^9-519/59*x^8+x^7+3113/59*x^6+171/59*x^5-7977/59*x^4-1495/59*x^3+7884/59*x^2+1506/59*x-1646/59,311/59*x^10-37/59*x^9-5064/59*x^8+8*x^7+28741/59*x^6-2070/59*x^5-66680/59*x^4+2186/59*x^3+55776/59*x^2+1963/59*x-12090/59,53/59*x^10-23/59*x^9-874/59*x^8+6*x^7+5012/59*x^6-1864/59*x^5-11634/59*x^4+3502/59*x^3+9469/59*x^2-1245/59*x-1676/59,241/59*x^10-30/59*x^9-3913/59*x^8+6*x^7+22157/59*x^6-1377/59*x^5-51429/59*x^4+1133/59*x^3+43626/59*x^2+1362/59*x-10010/59,5*x^10-x^9-81*x^8+14*x^7+456*x^6-68*x^5-1042*x^4+108*x^3+843*x^2-11*x-171,76/59*x^10-43/59*x^9-1221/59*x^8+11*x^7+6823/59*x^6-3313/59*x^5-15535/59*x^4+5929/59*x^3+12711/59*x^2-1930/59*x-2646/59,103/59*x^10-28/59*x^9-1713/59*x^8+7*x^7+9993/59*x^6-2123/59*x^5-24011/59*x^4+3917/59*x^3+21106/59*x^2-1431/59*x-4898/59], x^11-2*x^10-16*x^9+32*x^8+89*x^7-179*x^6-201*x^5+407*x^4+168*x^3-333*x^2-51*x+75]; E[437,1]=[[2,2,1,-3,5,-2,3,-1,1,4,-4,-8,0,-3,-3,12,4,5,12,12,1,-10,12,-6,10], x-1]; E[437,2]=[[0,2,-1,-5,-1,0,-7,1,1,6,4,2,-2,-5,-3,-4,6,11,-16,-10,-7,4,4,-16,-4], x-1]; E[437,3]=[[-x-1,1/2*x,x,1/2*x-2,1/2*x-3,-2*x-2,-x+2,1,1,-x,5/2*x-1,1/2*x-10,3*x+6,1/2*x-7,-3*x-6,3/2*x+5,-3/2*x-13,-x,4*x-2,-5/2*x+5,1/2*x-4,4,-7/2*x-2,9/2*x+11,-4*x+2], x^2+2*x-4]; E[437,4]=[[-x-1,-x-3,x,-x-2,-x,4*x+4,-x-4,1,1,5*x+3,-2*x+2,-x-1,6,-x-10,3,-6*x-10,2,-7*x-12,7*x+1,-x+5,2*x+5,-8,4*x+4,6*x+14,2*x-10], x^2+2*x-1]; E[437,5]=[[-1,1/2*x-2,x,-3/2*x+2,-3/2*x-1,2*x-2,-x+2,-1,-1,-x-4,-1/2*x-7,-1/2*x-4,-3*x+6,1/2*x-9,-x+2,3/2*x+1,7/2*x-3,x+12,2*x-10,5/2*x-9,3/2*x-12,0,9/2*x-6,-3/2*x+3,-6*x+2], x^2-2*x-4]; 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E[473,3]=[[4/5*x^4+31/5*x^3+52/5*x^2-34/5*x-16,-x-2,-7/5*x^4-53/5*x^3-86/5*x^2+57/5*x+25,x,1,-3/5*x^4-17/5*x^3-4/5*x^2+38/5*x-1,7/5*x^4+48/5*x^3+56/5*x^2-67/5*x-17,17/5*x^4+123/5*x^3+176/5*x^2-147/5*x-52,8/5*x^4+62/5*x^3+104/5*x^2-73/5*x-31,-7/5*x^4-53/5*x^3-81/5*x^2+77/5*x+28,2/5*x^4+18/5*x^3+41/5*x^2-7/5*x-16,-2*x^4-13*x^3-13*x^2+19*x+16,-27/5*x^4-198/5*x^3-296/5*x^2+222/5*x+87,1,-12/5*x^4-83/5*x^3-106/5*x^2+97/5*x+21,3*x^4+21*x^3+28*x^2-22*x-33,13/5*x^4+97/5*x^3+154/5*x^2-108/5*x-51,-1/5*x^4-9/5*x^3-18/5*x^2+21/5*x+7,-16/5*x^4-124/5*x^3-218/5*x^2+96/5*x+57,x^4+7*x^3+10*x^2-9*x-20,-14/5*x^4-106/5*x^3-172/5*x^2+89/5*x+43,x^4+8*x^3+14*x^2-8*x-19,16/5*x^4+119/5*x^3+183/5*x^2-131/5*x-54,1/5*x^4+4/5*x^3-17/5*x^2-41/5*x+9,-23/5*x^4-162/5*x^3-214/5*x^2+203/5*x+54], x^5+9*x^4+23*x^3+9*x^2-30*x-25]; 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x^11-3*x^10-14*x^9+45*x^8+64*x^7-237*x^6-99*x^5+529*x^4-7*x^3-460*x^2+67*x+110]; E[481,4]=[[x,-5/4*x^10+5/2*x^9+16*x^8-129/4*x^7-241/4*x^6+120*x^5+293/4*x^4-130*x^3-139/4*x^2+101/4*x+5/2,-1/4*x^10+5/4*x^9+11/4*x^8-16*x^7-27/4*x^6+237/4*x^5-125/2*x^3-13/4*x^2+9*x+1,3/8*x^10-1/4*x^9-11/2*x^8+27/8*x^7+215/8*x^6-13*x^5-423/8*x^4+27/2*x^3+321/8*x^2+17/8*x-21/4,3/8*x^10-1/2*x^9-19/4*x^8+53/8*x^7+139/8*x^6-103/4*x^5-145/8*x^4+32*x^3+29/8*x^2-97/8*x+1/4,1,1/4*x^10+1/2*x^9-4*x^8-27/4*x^7+89/4*x^6+29*x^5-201/4*x^4-45*x^3+159/4*x^2+83/4*x-11/2,7/4*x^10-4*x^9-45/2*x^8+209/4*x^7+343/4*x^6-401/2*x^5-437/4*x^4+235*x^3+229/4*x^2-217/4*x-3/2,9/8*x^10-13/4*x^9-14*x^8+333/8*x^7+397/8*x^6-307/2*x^5-441/8*x^4+321/2*x^3+283/8*x^2-185/8*x-7/4,1/2*x^10-4*x^9-6*x^8+105/2*x^7+39/2*x^6-206*x^5-47/2*x^4+249*x^3+71/2*x^2-97/2*x-1,-x^10+7/2*x^9+25/2*x^8-91/2*x^7-45*x^6+347/2*x^5+111/2*x^4-196*x^3-47*x^2+63/2*x+7,-1,11/4*x^10-9/2*x^9-37*x^8+235/4*x^7+623/4*x^6-223*x^5-987/4*x^4+252*x^3+665/4*x^2-207/4*x-35/2,-9/8*x^10+5/2*x^9+57/4*x^8-255/8*x^7-425/8*x^6+465/4*x^5+547/8*x^4-120*x^3-391/8*x^2+147/8*x+25/4,5/8*x^10-7/2*x^9-33/4*x^8+363/8*x^7+269/8*x^6-697/4*x^5-463/8*x^4+203*x^3+475/8*x^2-295/8*x-17/4,-1/2*x^10-1/4*x^9+23/4*x^8+15/4*x^7-15*x^6-79/4*x^5-55/4*x^4+73/2*x^3+53*x^2-47/4*x-13/2,-1/2*x^10-1/2*x^9+17/2*x^8+6*x^7-101/2*x^6-41/2*x^5+120*x^4+19*x^3-177/2*x^2-6*x+6,-9/4*x^10+2*x^9+61/2*x^8-103/4*x^7-517/4*x^6+185/2*x^5+783/4*x^4-90*x^3-383/4*x^2+39/4*x+5/2,19/8*x^10-9/2*x^9-127/4*x^8+469/8*x^7+1051/8*x^6-891/4*x^5-1593/8*x^4+254*x^3+981/8*x^2-457/8*x-35/4,-13/8*x^10+15/4*x^9+45/2*x^8-397/8*x^7-801/8*x^6+196*x^5+1433/8*x^4-487/2*x^3-1143/8*x^2+441/8*x+75/4,-3/4*x^10+1/2*x^9+11*x^8-27/4*x^7-219/4*x^6+27*x^5+463/4*x^4-36*x^3-409/4*x^2+55/4*x+23/2,9/8*x^10+3/2*x^9-57/4*x^8-161/8*x^7+417/8*x^6+347/4*x^5-371/8*x^4-128*x^3-161/8*x^2+309/8*x+23/4,1/8*x^10-3/4*x^9-5/2*x^8+81/8*x^7+141/8*x^6-42*x^5-421/8*x^4+109/2*x^3+435/8*x^2-5/8*x-7/4,-1/2*x^10+6*x^8+1/2*x^7-37/2*x^6-7*x^5+5/2*x^4+21*x^3+57/2*x^2-15/2*x-5,1/4*x^10-15/4*x^9-13/4*x^8+97/2*x^7+55/4*x^6-743/4*x^5-75/2*x^4+423/2*x^3+293/4*x^2-53/2*x-18], x^11-3*x^10-12*x^9+39*x^8+38*x^7-149*x^6-23*x^5+175*x^4-5*x^3-48*x^2+5*x+2]; E[481,5]=[[x,-4*x^6-15*x^5+10*x^4+69*x^3+15*x^2-42*x+5,-3*x^6-11*x^5+10*x^4+54*x^3-41*x+8,8*x^6+30*x^5-21*x^4-140*x^3-26*x^2+88*x-13,9*x^6+34*x^5-24*x^4-160*x^3-27*x^2+105*x-15,-1,-x^6-4*x^5+2*x^4+18*x^3+6*x^2-8*x,9*x^6+32*x^5-30*x^4-154*x^3-3*x^2+111*x-22,-8*x^6-30*x^5+22*x^4+143*x^3+23*x^2-99*x+8,-15*x^6-56*x^5+41*x^4+263*x^3+41*x^2-171*x+24,-13*x^6-48*x^5+36*x^4+225*x^3+36*x^2-147*x+14,-1,4*x^6+15*x^5-9*x^4-67*x^3-22*x^2+32*x+3,2*x^6+7*x^5-8*x^4-34*x^3+8*x^2+22*x-14,9*x^6+33*x^5-26*x^4-157*x^3-20*x^2+113*x-15,-4*x^6-16*x^5+9*x^4+74*x^3+18*x^2-38*x+5,-2*x^6-4*x^5+16*x^4+25*x^3-38*x^2-36*x+16,-7*x^6-28*x^5+15*x^4+132*x^3+37*x^2-86*x+4,12*x^6+46*x^5-29*x^4-215*x^3-51*x^2+135*x-10,x^5+4*x^4-4*x^3-21*x^2+2*x+5,-9*x^6-31*x^5+34*x^4+153*x^3-16*x^2-122*x+31,x^6+6*x^5+4*x^4-26*x^3-33*x^2+13*x+14,-17*x^6-63*x^5+45*x^4+295*x^3+61*x^2-193*x+11,-x^6-3*x^5+3*x^4+14*x^3+9*x^2-8*x-16,11*x^6+40*x^5-33*x^4-190*x^3-25*x^2+130*x-4], x^7+5*x^6+2*x^5-21*x^4-25*x^3+8*x^2+13*x-2]; E[493,1]=[[-1,-3,1,-2,3,1,1,-4,-2,1,1,-2,6,1,-9,-9,-6,8,-14,-10,0,3,8,16,2], x-1]; E[493,2]=[[1,x,x+2,x+3,-x,-2*x-1,-1,-x-1,-2*x+4,1,-3*x,x+3,-x-3,2*x-3,2*x+7,-2*x+5,-14,x+9,-6*x,-x+5,x-11,-3*x-2,-2*x+2,-4,-2], x^2+x-4]; E[493,3]=[[-x^3+x^2+8*x-9,x,2*x^3-x^2-16*x+14,-2*x^3+x^2+16*x-13,-x^3+8*x,3*x^3-2*x^2-25*x+23,1,x^2-3,2*x^3-2*x^2-18*x+20,-1,-3*x^3+2*x^2+26*x-28,-6*x^3+x^2+48*x-27,-6*x^3+x^2+50*x-29,7*x^3-3*x^2-58*x+51,4*x^3-3*x^2-35*x+33,-x^3+9*x-3,-10,4*x^3-3*x^2-34*x+31,x^3-5*x+4,-5*x^3+x^2+39*x-19,-x^3-x^2+5*x+3,10*x^3-6*x^2-79*x+74,-5*x^3+4*x^2+41*x-34,-4*x^3+2*x^2+34*x-24,-11*x^3+6*x^2+89*x-78], x^4-3*x^3-7*x^2+27*x-16]; E[493,4]=[[x^4+x^3-5*x^2-5*x,x,-x^3-x^2+5*x+3,x^2-x-4,-x^4+5*x^2-x-4,x^3-5*x-2,1,2*x^3-9*x-2,x^4+2*x^3-6*x^2-10*x,1,-2*x^4-3*x^3+11*x^2+13*x-3,3*x^4+3*x^3-14*x^2-12*x+1,x^4+x^3-5*x^2-4*x,3*x^4+4*x^3-16*x^2-20*x,-2*x^4-6*x^3+11*x^2+30*x-3,3*x^4+6*x^3-15*x^2-28*x-4,-x^4-3*x^3+6*x^2+15*x-5,-2*x^4-3*x^3+12*x^2+15*x-4,-x^4-5*x^3+6*x^2+26*x-4,5*x^3-x^2-22*x+3,-x^4+8*x^2-x-4,-5*x^4-9*x^3+24*x^2+41*x+2,7*x^4+9*x^3-37*x^2-47*x+1,-3*x^4-5*x^3+12*x^2+23*x+5,4*x^4+2*x^3-23*x^2-12*x+13], x^5+2*x^4-5*x^3-10*x^2+1]; E[493,5]=[[-3/19*x^5+1/19*x^4+22/19*x^3+1/19*x^2-11/19*x+33/19,x,5/19*x^5-8/19*x^4-24/19*x^3+11/19*x^2-7/19*x+40/19,6/19*x^5-2/19*x^4-44/19*x^3-21/19*x^2+41/19*x+48/19,-6/19*x^5+21/19*x^4+44/19*x^3-131/19*x^2-117/19*x+104/19,-4/19*x^5+14/19*x^4+23/19*x^3-100/19*x^2-21/19*x+120/19,1,8/19*x^5-28/19*x^4-46/19*x^3+162/19*x^2+61/19*x-126/19,4/19*x^5-33/19*x^4-4/19*x^3+214/19*x^2+2/19*x-158/19,-1,3/19*x^5-20/19*x^4+16/19*x^3+75/19*x^2-103/19*x+24/19,-1/19*x^5-25/19*x^4+20/19*x^3+222/19*x^2-48/19*x-274/19,16/19*x^5-37/19*x^4-111/19*x^3+191/19*x^2+198/19*x-138/19,-10/19*x^5-3/19*x^4+86/19*x^3+54/19*x^2-100/19*x-4/19,7/19*x^5+4/19*x^4-83/19*x^3-53/19*x^2+222/19*x+132/19,6/19*x^5+17/19*x^4-120/19*x^3-97/19*x^2+364/19*x+86/19,3/19*x^5-1/19*x^4-22/19*x^3+18/19*x^2-27/19*x+62/19,24/19*x^5-46/19*x^4-157/19*x^3+220/19*x^2+221/19*x-188/19,12/19*x^5-23/19*x^4-107/19*x^3+148/19*x^2+196/19*x-132/19,-7/19*x^5+34/19*x^4+26/19*x^3-213/19*x^2-32/19*x+134/19,-4/19*x^5+33/19*x^4+42/19*x^3-214/19*x^2-211/19*x+44/19,-2/19*x^5-31/19*x^4+21/19*x^3+254/19*x^2+75/19*x-244/19,1/19*x^5-13/19*x^4-20/19*x^3+177/19*x^2+67/19*x-410/19,-9/19*x^5+3/19*x^4+66/19*x^3+22/19*x^2-33/19*x+4/19,-x^5+2*x^4+7*x^3-9*x^2-14*x+2], x^6-2*x^5-11*x^4+14*x^3+38*x^2-15*x-26]; E[493,6]=[[19/107*x^9+145/107*x^8+259/107*x^7-405/107*x^6-1383/107*x^5-226/107*x^4+1531/107*x^3+825/107*x^2-269/107*x-285/107,x,-15/107*x^9-137/107*x^8-334/107*x^7+224/107*x^6+1548/107*x^5+674/107*x^4-1479/107*x^3-916/107*x^2+4/107*x+118/107,-18/107*x^9-143/107*x^8-251/107*x^7+547/107*x^6+1665/107*x^5-304/107*x^4-2695/107*x^3-500/107*x^2+1139/107*x+270/107,36/107*x^9+286/107*x^8+502/107*x^7-1094/107*x^6-3330/107*x^5+715/107*x^4+5604/107*x^3+465/107*x^2-2599/107*x-326/107,-25/107*x^9-157/107*x^8-93/107*x^7+944/107*x^6+1082/107*x^5-1944/107*x^4-1930/107*x^3+1826/107*x^2+506/107*x-588/107,-1,60/107*x^9+548/107*x^8+1336/107*x^7-1003/107*x^6-6620/107*x^5-2375/107*x^4+7842/107*x^3+3022/107*x^2-2370/107*x-258/107,-25/107*x^9-157/107*x^8-93/107*x^7+944/107*x^6+1082/107*x^5-2051/107*x^4-2465/107*x^3+1612/107*x^2+1897/107*x-374/107,-1,-14/107*x^9-135/107*x^8-433/107*x^7-169/107*x^6+1830/107*x^5+2498/107*x^4-2215/107*x^3-3052/107*x^2+1623/107*x+424/107,9/107*x^9+125/107*x^8+393/107*x^7-327/107*x^6-2277/107*x^5-62/107*x^4+3755/107*x^3+250/107*x^2-1800/107*x-242/107,-27/107*x^9-375/107*x^8-1500/107*x^7-731/107*x^6+6403/107*x^5+7890/107*x^4-6878/107*x^3-8882/107*x^2+2618/107*x+726/107,-18/107*x^9-143/107*x^8-251/107*x^7+547/107*x^6+1665/107*x^5-411/107*x^4-2909/107*x^3+35/107*x^2+1674/107*x-372/107,27/107*x^9+161/107*x^8+109/107*x^7-767/107*x^6-1053/107*x^5+777/107*x^4+1956/107*x^3+643/107*x^2-906/107*x-940/107,10/107*x^9+20/107*x^8-241/107*x^7-720/107*x^6+359/107*x^5+2297/107*x^4+986/107*x^3-1458/107*x^2-1572/107*x-150/107,-35/107*x^9-391/107*x^8-1243/107*x^7+166/107*x^6+6073/107*x^5+4319/107*x^4-8373/107*x^3-5490/107*x^2+4432/107*x+632/107,21/107*x^9+149/107*x^8+168/107*x^7-870/107*x^6-1889/107*x^5+1068/107*x^4+4446/107*x^3+191/107*x^2-3130/107*x+220/107,-28/107*x^9-163/107*x^8+97/107*x^7+1695/107*x^6+771/107*x^5-5169/107*x^4-2290/107*x^3+4703/107*x^2+678/107*x-222/107,-30/107*x^9-274/107*x^8-561/107*x^7+1197/107*x^6+4166/107*x^5-899/107*x^4-8094/107*x^3-1618/107*x^2+3967/107*x+1306/107,-13/107*x^9-26/107*x^8+431/107*x^7+1471/107*x^6-884/107*x^5-6271/107*x^4-704/107*x^3+6796/107*x^2+460/107*x-982/107,-49/107*x^9-419/107*x^8-927/107*x^7+853/107*x^6+4372/107*x^5+1146/107*x^4-4168/107*x^3-624/107*x^2+491/107*x-656/107,7/107*x^9+121/107*x^8+698/107*x^7+1208/107*x^6-1878/107*x^5-6599/107*x^4-337/107*x^3+7090/107*x^2+1168/107*x-1496/107,-7/107*x^9-121/107*x^8-591/107*x^7-566/107*x^6+2413/107*x^5+4031/107*x^4-2873/107*x^3-3880/107*x^2+2042/107*x-216/107,5/107*x^9+10/107*x^8-281/107*x^7-1216/107*x^6+19/107*x^5+5375/107*x^4+3061/107*x^3-6079/107*x^2-2926/107*x+1316/107], x^10+9*x^9+22*x^8-16*x^7-115*x^6-54*x^5+155*x^4+95*x^3-65*x^2-24*x+2]; E[493,7]=[[14/107*x^7-54/107*x^6-117/107*x^5+457/107*x^4+376/107*x^3-1011/107*x^2-435/107*x+359/107,x,-11/107*x^7+73/107*x^6-38/107*x^5-489/107*x^4+530/107*x^3+802/107*x^2-690/107*x-198/107,-19/214*x^7+29/107*x^6+197/214*x^5-184/107*x^4-515/107*x^3+325/214*x^2+941/107*x+257/107,9/107*x^7-50/107*x^6-37/107*x^5+439/107*x^4-64/107*x^3-948/107*x^2+263/107*x+376/107,13/214*x^7-48/107*x^6+113/214*x^5+323/107*x^4-712/107*x^3-977/214*x^2+1468/107*x+117/107,-1,-13/214*x^7+48/107*x^6-113/214*x^5-323/107*x^4+605/107*x^3+1405/214*x^2-826/107*x-759/107,-3/107*x^7-19/107*x^6+155/107*x^5+32/107*x^4-906/107*x^3+209/107*x^2+1125/107*x+160/107,1,-77/107*x^7+404/107*x^6+162/107*x^5-2888/107*x^4+1142/107*x^3+4758/107*x^2-1727/107*x-744/107,-9/214*x^7+25/107*x^6+37/214*x^5-273/107*x^4+139/107*x^3+1269/214*x^2-292/107*x+133/107,-93/214*x^7+187/107*x^6+739/214*x^5-1537/107*x^4-1096/107*x^3+5623/214*x^2+1334/107*x+19/107,-119/214*x^7+283/107*x^6+513/214*x^5-2183/107*x^4+221/107*x^3+8219/214*x^2-1174/107*x-857/107,65/214*x^7-133/107*x^6-505/214*x^5+1080/107*x^4+720/107*x^3-3387/214*x^2-1006/107*x-699/107,-157/214*x^7+341/107*x^6+907/214*x^5-2551/107*x^4-809/107*x^3+8655/214*x^2+922/107*x-129/107,47/107*x^7-273/107*x^6+104/107*x^5+1710/107*x^4-2284/107*x^3-2133/107*x^2+3882/107*x+846/107,169/214*x^7-410/107*x^6-671/214*x^5+2915/107*x^4+160/107*x^3-9277/214*x^2-604/107*x+23/107,66/107*x^7-224/107*x^6-628/107*x^5+1757/107*x^4+2491/107*x^3-3100/107*x^2-3778/107*x-96/107,-53/214*x^7+64/107*x^6+741/214*x^5-609/107*x^4-1797/107*x^3+2123/214*x^2+3143/107*x+807/107,81/214*x^7-118/107*x^6-975/214*x^5+1066/107*x^4+2173/107*x^3-4573/214*x^2-3150/107*x+515/107,47/107*x^7-166/107*x^6-431/107*x^5+1389/107*x^4+1461/107*x^3-2775/107*x^2-2003/107*x+418/107,26/107*x^7-85/107*x^6-309/107*x^5+864/107*x^4+1218/107*x^3-2061/107*x^2-1618/107*x+1110/107,-30/107*x^7+131/107*x^6+159/107*x^5-964/107*x^4-286/107*x^3+1876/107*x^2+978/107*x-1396/107,83/107*x^7-366/107*x^6-472/107*x^5+2824/107*x^4+563/107*x^3-4748/107*x^2+12/107*x-646/107], x^8-6*x^7+x^6+44*x^5-42*x^4-85*x^3+80*x^2+42*x-8]; E[493,8]=[[-1,0,-2,-5,0,7,1,5,4,-1,4,-11,3,-5,9,-3,6,-1,4,5,3,-6,14,-8,2], x-1]; E[517,1]=[[0,3,3,-2,1,-2,4,4,-7,-6,5,3,-6,-6,-1,-6,5,-14,15,5,0,-12,6,-1,1], x-1]; E[517,2]=[[2,-1,-3,-2,1,0,-6,8,-5,-4,3,3,4,-6,1,2,-3,8,-11,-3,-4,2,-14,-1,-15], x-1]; E[517,3]=[[-1/4*x+1/2,3,-1/4*x-1/2,-1/4*x+1/2,-1,1/4*x-1/2,x,1/4*x+7/2,3/4*x-1/2,8,3/4*x-5/2,-1/2*x-6,-3/2*x+7,-3/4*x+7/2,1,1/2*x-5,2*x-7,1/2*x-5,-3/4*x+5/2,-3/2*x,x+6,-1/4*x-7/2,-5/4*x+5/2,7,1/2*x], x^2-4*x-28]; E[517,4]=[[x-3,x-4,x-4,-3,-1,-x+3,x,x,-x+3,-6,-3*x+15,1,-x+7,2*x,1,-2*x+9,2*x,3*x-12,3*x-15,-2*x+14,6*x-22,6*x-21,-10*x+41,-4*x+7,-6*x+21], x^2-8*x+14]; E[517,5]=[[-x+3,-x+4,x-4,2*x-5,1,x-1,x,3*x-8,x+1,4*x-6,-x+5,4*x-3,5*x-5,-2*x+4,-1,-2*x-3,2*x-12,-5*x+16,-3*x+15,-2*x+14,2*x-6,-3,-4*x+7,4*x-5,-2*x-11], x^2-4*x+2]; E[517,6]=[[1/2*x-1,-1,1/2*x,-1/2*x+1,1,-1/2*x-3,x,-3/2*x-1,-3/2*x-2,-x+2,-1/2*x-6,2*x-3,4,1/2*x-3,1,2*x-4,2*x-3,2*x-4,1/2*x-14,x+3,-4,1/2*x+11,-1/2*x+1,2*x-1,-3*x+3], x^2-12]; E[517,7]=[[1/9*x^2+2/9*x-17/9,1/9*x^2+5/9*x-14/9,1/3*x+4/3,1/3*x+7/3,-1,2/9*x^2+4/9*x-25/9,x,-1/9*x^2-5/9*x-22/9,-1/9*x^2-5/9*x+59/9,-1/9*x^2-8/9*x+38/9,2/9*x^2+13/9*x-7/9,-1/3*x^2-4/3*x+3,-1/9*x^2-14/9*x-13/9,-2/9*x^2+8/9*x+82/9,1,-2/3*x+25/3,-6,-2/9*x^2+5/9*x+70/9,-5/9*x^2-31/9*x+55/9,-2/9*x^2-28/9*x+46/9,-1/9*x^2-20/9*x-46/9,1/9*x^2-1/9*x+25/9,-5/9*x^2-31/9*x+91/9,1/9*x^2-10/9*x-47/9,2/9*x^2+4/9*x-115/9], x^3+6*x^2-18*x-50]; E[517,8]=[[-1,1/9*x^2-5/9*x-8/3,-2/9*x^2+1/9*x+10/3,1/3*x^2+1/3*x-7,1,-1/9*x^2-4/9*x+5/3,x,-1/9*x^2+5/9*x+2/3,-5/9*x^2+7/9*x+19/3,-1/9*x^2-4/9*x+2/3,2/3*x^2-1/3*x-13,1/9*x^2+4/9*x-23/3,-2/3*x^2-2/3*x+11,2/9*x^2-10/9*x-10/3,1,4/9*x^2-20/9*x-23/3,-10/9*x^2+14/9*x+50/3,2/9*x^2-1/9*x+14/3,1/9*x^2-5/9*x+7/3,8/9*x^2-4/9*x-58/3,x^2-22,-4/3*x^2-1/3*x+25,-x-5,-1/9*x^2+14/9*x-25/3,-4/9*x^2-16/9*x+47/3], x^3-4*x^2-20*x+66]; 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E[527,3]=[[x,-x^6+8*x^4-15*x^2+x+6,-x^6+7*x^4-9*x^2+2*x+1,x^6+x^5-7*x^4-7*x^3+8*x^2+6*x-2,2*x^6-x^5-16*x^4+6*x^3+31*x^2-8*x-14,-x^6+x^5+8*x^4-6*x^3-16*x^2+5*x+6,-1,-x^5-2*x^4+7*x^3+13*x^2-6*x-12,-3*x^6+23*x^4+x^3-38*x^2+x+12,5*x^6+x^5-37*x^4-8*x^3+57*x^2+3*x-19,-1,3*x^6-2*x^5-24*x^4+12*x^3+46*x^2-12*x-21,x^6-6*x^4-x^3+x^2+x+6,-2*x^5+15*x^3-x^2-21*x+4,2*x^6-2*x^5-16*x^4+13*x^3+28*x^2-16*x-5,x^6-5*x^4+x^3-4*x^2-5*x+8,3*x^6+3*x^5-23*x^4-19*x^3+37*x^2+13*x-13,-3*x^6-2*x^5+24*x^4+13*x^3-42*x^2-8*x+16,3*x^6+3*x^5-18*x^4-22*x^3+7*x^2+24*x+11,-3*x^6+3*x^5+23*x^4-19*x^3-39*x^2+21*x+9,x^6+6*x^5-4*x^4-43*x^3-12*x^2+50*x+6,-5*x^6-5*x^5+35*x^4+35*x^3-40*x^2-30*x+3,2*x^6-14*x^4+13*x^2-x+11,-4*x^6+2*x^5+28*x^4-13*x^3-37*x^2+21*x+8,-5*x^6+5*x^5+39*x^4-32*x^3-73*x^2+37*x+22], x^7+x^6-8*x^5-8*x^4+15*x^3+13*x^2-8*x-5]; 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x^11+2*x^10-14*x^9-26*x^8+64*x^7+103*x^6-117*x^5-149*x^4+65*x^3+71*x^2+5*x-1]; E[533,4]=[[x,x^6+x^5-6*x^4-5*x^3+9*x^2+6*x-3,-x^5+5*x^3-x^2-5*x+1,x^6-8*x^4+17*x^2-8,-x^6+x^5+8*x^4-4*x^3-16*x^2+x+5,1,x^6-9*x^4-x^3+20*x^2+2*x-7,-2*x^6-2*x^5+15*x^4+12*x^3-31*x^2-16*x+10,2*x^6+2*x^5-13*x^4-7*x^3+26*x^2+3*x-16,-x^6+8*x^4-2*x^3-17*x^2+5*x+5,2*x^5+x^4-12*x^3-4*x^2+14*x+1,-3*x^6+20*x^4-3*x^3-33*x^2+10*x+8,1,-x^6-x^5+6*x^4+5*x^3-9*x^2-3*x-3,x^5-2*x^4-7*x^3+7*x^2+10*x+1,-5*x^6-5*x^5+31*x^4+24*x^3-48*x^2-24*x+10,x^6-9*x^4-4*x^3+23*x^2+12*x-14,x^6+x^5-3*x^4-2*x^3-8*x^2-2*x+15,2*x^6+x^5-11*x^4-7*x^3+11*x^2+13*x+2,-x^6+3*x^4-8*x^3-x^2+22*x+6,x^6+x^5-8*x^4-4*x^3+14*x^2+1,-3*x^6-4*x^5+18*x^4+22*x^3-27*x^2-27*x+1,3*x^6+3*x^5-18*x^4-11*x^3+31*x^2+2*x-18,-5*x^6-7*x^5+30*x^4+33*x^3-43*x^2-30*x+6,2*x^6+x^5-14*x^4-4*x^3+32*x^2+2*x-27], x^7+2*x^6-6*x^5-12*x^4+9*x^3+19*x^2-x-5]; 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E[551,1]=[[-1,1,-1,2,-3,-5,2,1,0,1,-7,2,0,-11,-9,1,8,0,-4,0,2,3,4,0,4], x-1]; E[551,2]=[[-2,-2,-1,-1,1,2,3,1,8,1,-10,-8,-6,5,7,-12,-10,1,-2,-12,-9,12,-4,8,8], x-1]; E[551,3]=[[2,-2,-1,-1,-3,-2,-1,1,0,1,2,-4,-6,1,3,4,14,-3,2,0,11,-12,4,0,-8], x-1]; E[551,4]=[[-1,-x-1,-1,x,x+1,1,x,-1,-4,-1,x-1,-2,x-2,-3*x-3,-3*x+3,3,-x-2,-2*x-8,5*x+2,8,x-4,-5*x-7,3*x+2,-3*x-2,-8], x^2+2*x-4]; E[551,5]=[[-1/5*x^2-3/5*x+8/5,0,3/5*x^2+14/5*x-14/5,-1,-2/5*x^2-11/5*x-4/5,-2/5*x^2-11/5*x+1/5,x,-1,-1/5*x^2-8/5*x+13/5,-1,3/5*x^2+19/5*x-14/5,-3/5*x^2-19/5*x-6/5,-8/5*x^2-44/5*x+44/5,4/5*x^2+27/5*x-12/5,1/5*x^2+3/5*x-33/5,-8/5*x^2-44/5*x+24/5,2/5*x^2+6/5*x-6/5,3/5*x^2+29/5*x+1/5,2*x^2+11*x-9,6/5*x^2+43/5*x-13/5,11/5*x^2+63/5*x-63/5,-2/5*x^2-6/5*x+16/5,-7/5*x^2-46/5*x+61/5,-2*x-6,4/5*x^2+12/5*x-42/5], x^3+5*x^2-7*x-1]; 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x^15-2*x^14-22*x^13+43*x^12+187*x^11-354*x^10-769*x^9+1395*x^8+1553*x^7-2684*x^6-1328*x^5+2265*x^4+241*x^3-606*x^2+33*x+13]; E[559,3]=[[x,-x^6-2*x^5+5*x^4+7*x^3-7*x^2-5*x+1,x^6+3*x^5-2*x^4-9*x^3-x^2+4*x,-x^5-4*x^4-x^3+10*x^2+7*x-2,x^4+2*x^3-4*x^2-4*x+2,-1,-x^5-3*x^4+3*x^3+9*x^2-3*x-5,x^6+2*x^5-6*x^4-7*x^3+13*x^2+4*x-6,2*x^6+5*x^5-4*x^4-8*x^3-8*x-3,-2*x^6-4*x^5+9*x^4+12*x^3-10*x^2-3*x-2,-x^6-3*x^5+2*x^4+9*x^3+2*x^2-6*x-4,-x^4-4*x^3+x^2+11*x+2,-3*x^6-5*x^5+17*x^4+17*x^3-27*x^2-12*x+3,-1,-x^6+12*x^4+5*x^3-26*x^2-7*x+6,-2*x^6-8*x^5+3*x^4+32*x^3-31*x+4,2*x^6+2*x^5-12*x^4-3*x^3+17*x^2-4*x-2,-x^6-3*x^5+3*x^3+3*x^2+6*x+3,-3*x^6-9*x^5+9*x^4+34*x^3-6*x^2-33*x+5,4*x^6+16*x^5-x^4-54*x^3-23*x^2+37*x+8,-6*x^6-18*x^5+16*x^4+61*x^3-5*x^2-40*x,-x^6-9*x^5-13*x^4+24*x^3+36*x^2-6*x-6,3*x^6+10*x^5-5*x^4-36*x^3-7*x^2+32*x,-2*x^6-4*x^5+10*x^4+15*x^3-12*x^2-8*x-3,x^6+2*x^5-2*x^4-x^3-6*x+1], x^7+2*x^6-6*x^5-9*x^4+11*x^3+10*x^2-5*x-1]; E[559,4]=[[x,-1963/1471*x^13+10940/1471*x^12+10027/1471*x^11-140569/1471*x^10+83093/1471*x^9+616701/1471*x^8-627484/1471*x^7-1139092/1471*x^6+1283819/1471*x^5+898190/1471*x^4-899391/1471*x^3-291733/1471*x^2+144509/1471*x+41169/1471,2498/1471*x^13-14345/1471*x^12-10146/1471*x^11+180010/1471*x^10-138201/1471*x^9-754700/1471*x^8+931786/1471*x^7+1270602/1471*x^6-1846577/1471*x^5-820275/1471*x^4+1257011/1471*x^3+185312/1471*x^2-188043/1471*x-35070/1471,-643/1471*x^13+3295/1471*x^12+4688/1471*x^11-43999/1471*x^10+9485/1471*x^9+206998/1471*x^8-131482/1471*x^7-434977/1471*x^6+302634/1471*x^5+430706/1471*x^4-239751/1471*x^3-187668/1471*x^2+54805/1471*x+23855/1471,-3091/1471*x^13+17473/1471*x^12+14108/1471*x^11-221354/1471*x^10+151183/1471*x^9+945254/1471*x^8-1067548/1471*x^7-1652664/1471*x^6+2136595/1471*x^5+1156915/1471*x^4-1466694/1471*x^3-299890/1471*x^2+230847/1471*x+49198/1471,1,940/1471*x^13-5199/1471*x^12-5117/1471*x^11+67566/1471*x^10-36638/1471*x^9-301498/1471*x^8+293170/1471*x^7+568212/1471*x^6-621406/1471*x^5-447777/1471*x^4+463191/1471*x^3+129626/1471*x^2-89110/1471*x-15762/1471,2430/1471*x^13-13706/1471*x^12-12336/1471*x^11+177576/1471*x^10-103946/1471*x^9-792706/1471*x^8+781975/1471*x^7+1521375/1471*x^6-1602238/1471*x^5-1305105/1471*x^4+1142392/1471*x^3+491023/1471*x^2-207261/1471*x-64971/1471,4926/1471*x^13-28162/1471*x^12-21335/1471*x^11+356303/1471*x^10-255114/1471*x^9-1519623/1471*x^8+1757768/1471*x^7+2661295/1471*x^6-3484850/1471*x^5-1900732/1471*x^4+2357483/1471*x^3+541904/1471*x^2-346634/1471*x-84177/1471,3333/1471*x^13-18752/1471*x^12-14621/1471*x^11+233910/1471*x^10-167914/1471*x^9-967827/1471*x^8+1153039/1471*x^7+1573973/1471*x^6-2248200/1471*x^5-899289/1471*x^4+1464064/1471*x^3+99667/1471*x^2-188845/1471*x-15254/1471,1151/1471*x^13-5992/1471*x^12-6239/1471*x^11+72739/1471*x^10-40327/1471*x^9-282514/1471*x^8+303940/1471*x^7+382134/1471*x^6-553847/1471*x^5-69342/1471*x^4+278579/1471*x^3-110323/1471*x^2+7081/1471*x+14004/1471,4680/1471*x^13-27105/1471*x^12-18528/1471*x^11+341181/1471*x^10-265788/1471*x^9-1440013/1471*x^8+1780885/1471*x^7+2462441/1471*x^6-3540930/1471*x^5-1650222/1471*x^4+2442496/1471*x^3+392360/1471*x^2-381027/1471*x-61386/1471,-3265/1471*x^13+19584/1471*x^12+9456/1471*x^11-241773/1471*x^10+227803/1471*x^9+980826/1471*x^8-1409224/1471*x^7-1527604/1471*x^6+2706999/1471*x^5+764828/1471*x^4-1780448/1471*x^3-15563/1471*x^2+234541/1471*x+17206/1471,-1,-4451/1471*x^13+25840/1471*x^12+17380/1471*x^11-324461/1471*x^10+253767/1471*x^9+1363405/1471*x^8-1680748/1471*x^7-2312322/1471*x^6+3284093/1471*x^5+1526368/1471*x^4-2179220/1471*x^3-359457/1471*x^2+296613/1471*x+58701/1471,261/1471*x^13-2431/1471*x^12+2565/1471*x^11+28422/1471*x^10-60503/1471*x^9-101901/1471*x^8+290393/1471*x^7+103668/1471*x^6-496682/1471*x^5+68132/1471*x^4+257336/1471*x^3-124200/1471*x^2+16524/1471*x+18568/1471,1327/1471*x^13-7992/1471*x^12-4205/1471*x^11+100325/1471*x^10-87799/1471*x^9-423832/1471*x^8+551595/1471*x^7+739325/1471*x^6-1067622/1471*x^5-546201/1471*x^4+726926/1471*x^3+182552/1471*x^2-123246/1471*x-30179/1471,4670/1471*x^13-26189/1471*x^12-23090/1471*x^11+336237/1471*x^10-208530/1471*x^9-1474676/1471*x^8+1547852/1471*x^7+2734290/1471*x^6-3175364/1471*x^5-2208335/1471*x^4+2244664/1471*x^3+776383/1471*x^2-371566/1471*x-108572/1471,-944/1471*x^13+4977/1471*x^12+5940/1471*x^11-64248/1471*x^10+23943/1471*x^9+284985/1471*x^8-219866/1471*x^7-541260/1471*x^6+434598/1471*x^5+458715/1471*x^4-263128/1471*x^3-174896/1471*x^2+23169/1471*x+22483/1471,-4807/1471*x^13+28147/1471*x^12+17077/1471*x^11-351308/1471*x^10+297770/1471*x^9+1458892/1471*x^8-1935060/1471*x^7-2415765/1471*x^6+3820338/1471*x^5+1526048/1471*x^4-2627252/1471*x^3-357947/1471*x^2+417776/1471*x+75825/1471,4354/1471*x^13-24604/1471*x^12-19855/1471*x^11+311514/1471*x^10-212626/1471*x^9-1330268/1471*x^8+1497527/1471*x^7+2336320/1471*x^6-2979010/1471*x^5-1684034/1471*x^4+2006915/1471*x^3+493622/1471*x^2-288247/1471*x-82166/1471,2100/1471*x^13-9956/1471*x^12-18724/1471*x^11+136517/1471*x^10+11542/1471*x^9-668583/1471*x^8+255656/1471*x^7+1483988/1471*x^6-721102/1471*x^5-1558926/1471*x^4+665630/1471*x^3+705883/1471*x^2-189248/1471*x-86385/1471,1073/1471*x^13-5908/1471*x^12-5636/1471*x^11+75658/1471*x^10-42958/1471*x^9-330176/1471*x^8+330034/1471*x^7+604672/1471*x^6-680913/1471*x^5-469458/1471*x^4+507456/1471*x^3+151350/1471*x^2-120356/1471*x-29250/1471,-9375/1471*x^13+54113/1471*x^12+37568/1471*x^11-680952/1471*x^10+526261/1471*x^9+2874368/1471*x^8-3538421/1471*x^7-4929724/1471*x^6+7035925/1471*x^5+3371617/1471*x^4-4846352/1471*x^3-899320/1471*x^2+754916/1471*x+168202/1471,7609/1471*x^13-41801/1471*x^12-41228/1471*x^11+538046/1471*x^10-290498/1471*x^9-2366351/1471*x^8+2285374/1471*x^7+4381430/1471*x^6-4687913/1471*x^5-3442391/1471*x^4+3270324/1471*x^3+1072670/1471*x^2-532450/1471*x-133319/1471], x^14-7*x^13+3*x^12+78*x^11-145*x^10-243*x^9+758*x^8+83*x^7-1422*x^6+532*x^5+1004*x^4-525*x^3-224*x^2+82*x+23]; E[559,5]=[[x,-x,-x^3-x^2+5*x+1,x^3-5*x+1,x^3+x^2-5*x-5,1,-5,-x^3-x^2+5*x+2,-2,-x^3-x^2+4*x-3,-x^3+7*x-1,x^3+4*x^2-4*x-11,2*x^3+2*x^2-6*x-5,1,-3*x^3+14*x,x^3-x^2-6*x+3,3*x^3+x^2-12*x+2,3*x^3+3*x^2-13*x-6,-3*x^3-3*x^2+17*x+9,-5*x^3-4*x^2+22*x+3,-3*x^3-3*x^2+16*x+6,-3*x^3-3*x^2+14*x+12,3*x^3-14*x-5,-5*x^3-4*x^2+18*x+11,x^3+2*x^2-9*x-7], x^4+x^3-5*x^2-3*x+1]; E[583,1]=[[1,-1,4,4,1,1,1,-3,5,-3,4,-3,10,-6,-10,-1,-10,12,-4,3,-8,-7,-15,-6,-7], x-1]; E[583,2]=[[2,1,3,0,-1,4,0,-4,-3,6,-3,7,-2,-2,0,1,5,0,7,3,-2,6,-10,-1,-7], x-1]; E[583,3]=[[2,3,-3,2,1,0,6,-8,-5,-4,-5,11,12,-2,-8,-1,13,-8,-3,1,-4,-10,2,7,1], x-1]; E[583,4]=[[x+1,x,-x-4,x+3,-1,-x-1,-4*x-6,-2*x+2,x-2,3*x+7,-3*x-4,2*x-7,3*x+1,-x+5,-10,-1,2*x-1,-x+9,-3*x-6,-5*x-6,4*x,-2*x+8,6*x+12,2*x-5,-6*x-13], x^2+2*x-1]; E[583,5]=[[x-1,x,-x,-x-1,-1,-x-3,2*x,-2*x-2,3*x+4,x-1,-3*x+4,2*x+5,-3*x-3,3*x-5,2*x-8,-1,-2*x-5,3*x-5,x+6,x+4,2*x+2,-2*x-4,-2*x-4,-11,-6*x-5], x^2-3]; E[583,6]=[[-x,x,-1/2*x^5+9/2*x^3-1/2*x^2-8*x+1/2,1/2*x^5-9/2*x^3-1/2*x^2+8*x+1/2,-1,1/2*x^5+1/2*x^4-4*x^3-7/2*x^2+13/2*x+3,1/2*x^5-9/2*x^3-1/2*x^2+8*x-5/2,1/2*x^5-3/2*x^4-4*x^3+21/2*x^2+7/2*x-8,1/2*x^5-1/2*x^4-3*x^3+7/2*x^2+1/2*x-4,-2*x^5+1/2*x^4+33/2*x^3-3*x^2-47/2*x-11/2,-3/2*x^5+3/2*x^4+12*x^3-19/2*x^2-31/2*x+3,x^5-x^4-10*x^3+8*x^2+19*x-8,-1/2*x^5+1/2*x^4+4*x^3-7/2*x^2-9/2*x,-2*x^5+3/2*x^4+33/2*x^3-11*x^2-47/2*x+13/2,1/2*x^5-x^4-9/2*x^3+11/2*x^2+6*x+7/2,-1,1/2*x^5-5/2*x^3+3/2*x^2-4*x-3/2,x^5-1/2*x^4-17/2*x^3+4*x^2+29/2*x-9/2,-1/2*x^5+3/2*x^4+2*x^3-19/2*x^2+11/2*x+7,x^5-3/2*x^4-13/2*x^3+12*x^2-5/2*x-23/2,1/2*x^5-1/2*x^4-3*x^3+3/2*x^2-1/2*x,-3/2*x^5+1/2*x^4+14*x^3-7/2*x^2-45/2*x-2,-5/2*x^5+5/2*x^4+20*x^3-39/2*x^2-51/2*x+14,x^5+1/2*x^4-15/2*x^3-4*x^2+15/2*x+21/2,3/2*x^5-x^4-27/2*x^3+5/2*x^2+24*x+23/2], x^6-2*x^5-8*x^4+16*x^3+10*x^2-20*x-1]; 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x^8+8*x^7+17*x^6-10*x^5-58*x^4-16*x^3+45*x^2+10*x-1]; 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x^9+3*x^8-6*x^7-21*x^6+8*x^5+42*x^4+2*x^3-25*x^2-6*x+1]; E[629,1]=[[1,0,1,-1,-5,-2,-1,3,2,3,-4,-1,6,-1,-6,1,-7,1,14,-15,-10,4,-6,16,1], x-1]; E[629,2]=[[-1,0,3,-1,-5,-2,1,1,-6,1,4,1,-6,-11,-10,1,3,-5,-6,1,14,-8,6,0,-13], x-1]; E[629,3]=[[2,3,-2,1,-3,4,1,2,-2,-6,-2,-1,-3,4,3,-3,0,2,4,-13,9,0,5,16,8], x-1]; E[629,4]=[[x,x^4-5*x^2+4,-x^4-2*x^3+5*x^2+7*x-7,x^3+x^2-3*x-4,-x^4+x^3+4*x^2-5*x-1,x^3-2*x^2-5*x+7,1,x^3-4*x-2,x^4+4*x^3-6*x^2-13*x+12,-x^4-4*x^3+8*x^2+13*x-19,3*x^4+4*x^3-17*x^2-13*x+20,1,4*x^4+6*x^3-22*x^2-20*x+31,-2*x^4-5*x^3+11*x^2+17*x-19,-x^3+3*x^2+3*x-11,2*x^4+x^3-13*x^2-7*x+17,-2*x^4-x^3+15*x^2+8*x-25,-3*x^4-9*x^3+19*x^2+32*x-31,x^4+x^3-5*x^2-2*x-3,-x^4-x^3+3*x^2+6*x+4,x^4+3*x^3-13*x^2-13*x+27,x^4-x^3-6*x^2+9*x+5,-3*x^4+17*x^2-x-20,5*x^4+3*x^3-17*x^2-5*x-1,-4*x^4-4*x^3+22*x^2+14*x-21], x^5-7*x^3+2*x^2+12*x-7]; 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x^8-10*x^6+29*x^4+3*x^3-24*x^2-7*x+2]; E[629,8]=[[0,-3,0,3,-1,0,1,-2,-2,2,-8,1,3,-12,3,-11,-4,4,4,-3,-1,-2,1,6,0], x-1]; E[649,1]=[[-1,1,-1,1,1,-4,-2,-1,6,-9,2,-4,-3,6,-12,-13,1,8,10,0,-4,-1,-6,0,-2], x-1]; E[649,2]=[[-1,-2,x,-x,1,-x+1,2*x,-x+1,x+1,0,-x-5,-10,0,-6,-3*x-6,x+9,1,-x-11,-3*x-2,-12,3*x+2,-4,-2*x+10,-6,4*x+8], x^2+x-9]; E[649,3]=[[-x^2-2*x+1,x^3+5*x^2+5*x-1,x,-x^3-5*x^2-6*x-1,1,-2*x^3-6*x^2+1,x^3+5*x^2+5*x-2,2*x^3+7*x^2-x-8,3*x^3+11*x^2+5*x-9,6*x^3+24*x^2+18*x-4,-x^3-8*x^2-14*x-3,-2*x^3-9*x^2-9*x+1,-7*x^3-26*x^2-10*x+13,-x^3-3*x^2+3*x+6,3*x^3+10*x^2+3*x+3,-5*x^3-22*x^2-17*x+5,1,-2*x^3-10*x^2-5*x+7,-2*x^3-6*x^2+1,2*x^3+12*x^2+16*x-11,-x^3-6*x^2-8*x+8,6*x^3+24*x^2+9*x-16,10*x^3+41*x^2+35*x-4,7*x^2+24*x+6,-4*x^3-24*x^2-35*x+1], x^4+5*x^3+6*x^2-1]; 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x^9+3*x^8-10*x^7-33*x^6+24*x^5+105*x^4-7*x^3-116*x^2-16*x+32]; E[697,1]=[[-1,x,-x^2+4,-x-2,2*x^2+x-6,-2*x^2-2*x+4,1,x^2-x-4,-x^2+4,0,x^2+2*x-8,x^2-4*x-8,1,2*x^2+2*x-8,-x^2+x,2*x-6,2*x^2+2*x,4*x^2+2*x-10,3*x^2+x-14,2*x^2+3*x-16,-x^2-4*x,-5*x,2*x-4,-8,2*x+8], x^3+2*x^2-4*x-6]; 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E[697,6]=[[543/11788*x^9+197/11788*x^8-9123/11788*x^7-539/1684*x^6+21117/5894*x^5+16413/11788*x^4-38335/11788*x^3+3147/2947*x^2+16397/5894*x-603/5894,x,-183/2947*x^9+48/421*x^8+3370/2947*x^7-5497/2947*x^6-19146/2947*x^5+3670/421*x^4+32453/2947*x^3-4201/421*x^2-592/421*x+11492/2947,155/2947*x^9-326/2947*x^8-3816/2947*x^7+4955/2947*x^6+32394/2947*x^5-16330/2947*x^4-101526/2947*x^3-17480/2947*x^2+54681/2947*x+210/421,-324/2947*x^9+236/2947*x^8+878/421*x^7-3866/2947*x^6-5302/421*x^5+17553/2947*x^4+10752/421*x^3-17322/2947*x^2-35047/2947*x+10698/2947,543/5894*x^9-645/5894*x^8-11649/5894*x^7+8857/5894*x^6+42167/2947*x^5-23161/5894*x^4-221891/5894*x^3-24018/2947*x^2+55129/2947*x+9501/2947,-1,193/2947*x^9-99/2947*x^8-4173/2947*x^7+1661/2947*x^6+31435/2947*x^5-7201/2947*x^4-93217/2947*x^3+4744/2947*x^2+71107/2947*x-14738/2947,-75/2947*x^9-304/2947*x^8+1602/2947*x^7+742/421*x^6-11125/2947*x^5-25208/2947*x^4+25468/2947*x^3+27308/2947*x^2-8600/2947*x+3716/2947,267/5894*x^9+55/5894*x^8-6663/5894*x^7-2139/5894*x^6+29275/2947*x^5+24957/5894*x^4-190241/5894*x^3-47160/2947*x^2+46883/2947*x+5123/2947,-533/5894*x^9+1303/5894*x^8+12109/5894*x^7-21955/5894*x^6-48021/2947*x^5+102695/5894*x^4+294163/5894*x^3-48306/2947*x^2-107321/2947*x+28029/2947,285/2947*x^9+229/2947*x^8-593/421*x^7-4076/2947*x^6+1709/421*x^5+16895/2947*x^4+3640/421*x^3+10489/2947*x^2-27102/2947*x-9574/2947,1,-1233/5894*x^9+4079/5894*x^8+26219/5894*x^7-9643/842*x^6-95868/2947*x^5+302173/5894*x^4+523725/5894*x^3-105828/2947*x^2-126685/2947*x+27127/2947,52/2947*x^9+152/421*x^8-555/2947*x^7-18600/2947*x^6-2531/2947*x^5+13025/421*x^4+30426/2947*x^3-12812/421*x^2-1173/421*x+24884/2947,789/5894*x^9-1635/5894*x^8-18857/5894*x^7+3999/842*x^6+77673/2947*x^5-130535/5894*x^4-480461/5894*x^3+52748/2947*x^2+154275/2947*x-30509/2947,149/5894*x^9+1721/5894*x^8-303/5894*x^7-27939/5894*x^6-12455/2947*x^5+116727/5894*x^4+155789/5894*x^3-17718/2947*x^2-58677/2947*x+617/421,-2953/5894*x^9+5415/5894*x^8+60769/5894*x^7-86361/5894*x^6-210103/2947*x^5+362081/5894*x^4+1062267/5894*x^3-94020/2947*x^2-260101/2947*x+36843/2947,-269/5894*x^9+2171/5894*x^8+677/5894*x^7-5551/842*x^6+20816/2947*x^5+219651/5894*x^4-250939/5894*x^3-204784/2947*x^2+74952/2947*x+40417/2947,1172/2947*x^9-1020/2947*x^8-23131/2947*x^7+16552/2947*x^6+147043/2947*x^5-76514/2947*x^4-320370/2947*x^3+90850/2947*x^2+164561/2947*x-5800/421,464/2947*x^9-1128/2947*x^8-9389/2947*x^7+19206/2947*x^6+63073/2947*x^5-95086/2947*x^4-155109/2947*x^3+120405/2947*x^2+89692/2947*x-4532/421,-1573/2947*x^9+1073/2947*x^8+4338/421*x^7-15804/2947*x^6-26757/421*x^5+55394/2947*x^4+54929/421*x^3+6332/2947*x^2-145147/2947*x+8006/2947,-1005/5894*x^9+389/5894*x^8+20709/5894*x^7-5591/5894*x^6-69696/2947*x^5+25199/5894*x^4+326873/5894*x^3-26526/2947*x^2-86669/2947*x+27339/2947,-1669/5894*x^9+145/5894*x^8+29739/5894*x^7-4491/5894*x^6-79930/2947*x^5+50257/5894*x^4+259547/5894*x^3-97540/2947*x^2-89655/2947*x+4193/421,-1287/2947*x^9+1031/2947*x^8+25840/2947*x^7-2137/421*x^6-170276/2947*x^5+42605/2947*x^4+392708/2947*x^3+84788/2947*x^2-165258/2947*x-37846/2947], x^10-2*x^9-20*x^8+34*x^7+133*x^6-167*x^5-324*x^4+209*x^3+190*x^2-100*x-2]; \\ levels 700-1000 \\ here I only computed the a_p for p<=29 in order to save time. E[703,1]=[[-2,0,-3,3,-1,2,3,1,0,-4], x-1]; E[703,2]=[[x,-x+1,-2,2*x+1,-5,-2*x+2,-x,-1,x-2,6*x-2], x^2-2]; E[703,3]=[[x,-x^3-x^2+5*x-1,x^3+2*x^2-4*x-4,-x^2-2*x+3,-1,-2*x^2-2*x+6,x^2+x-6,1,x^3+3*x^2-x-6,3*x^3+4*x^2-10*x-2], x^4-6*x^2+4*x+2]; E[703,4]=[[x,-x^4-2*x^3+5*x^2+8*x-2,-2*x^4-3*x^3+10*x^2+12*x-3,-2*x^4-3*x^3+10*x^2+13*x-4,5*x^4+8*x^3-25*x^2-34*x+6,2*x^4+2*x^3-11*x^2-9*x+5,3*x^4+5*x^3-15*x^2-19*x+3,1,-x^4+5*x^2-2*x-6,-2*x^4-3*x^3+12*x^2+11*x-12], x^5+3*x^4-3*x^3-14*x^2-7*x+3]; E[703,5]=[[x,66/137*x^10-246/137*x^9-597/137*x^8+2839/137*x^7+805/137*x^6-9901/137*x^5+3213/137*x^4+10508/137*x^3-4049/137*x^2-3373/137*x+429/137,-14/137*x^10-35/137*x^9+438/137*x^8+253/137*x^7-3849/137*x^6+286/137*x^5+12732/137*x^4-3956/137*x^3-14838/137*x^2+3634/137*x+5252/137,-124/137*x^10+512/137*x^9+885/137*x^8-5666/137*x^7+1294/137*x^6+17838/137*x^5-16324/137*x^4-12884/137*x^3+20041/137*x^2+442/137*x-6149/137,143/137*x^10-533/137*x^9-1362/137*x^8+6311/137*x^7+2589/137*x^6-23119/137*x^5+3468/137*x^4+27608/137*x^3-3270/137*x^2-10208/137*x-1605/137,17/137*x^10-300/137*x^9+662/137*x^8+3108/137*x^7-9310/137*x^6-8078/137*x^5+34486/137*x^4-50/137*x^3-37350/137*x^2+5510/137*x+11550/137,-20/137*x^10+87/137*x^9+156/137*x^8-989/137*x^7+1/137*x^6+3266/137*x^5-1559/137*x^4-2794/137*x^3+1173/137*x^2+553/137*x+418/137,1,69/137*x^10-307/137*x^9-456/137*x^8+3460/137*x^7-1120/137*x^6-11391/137*x^5+10427/137*x^4+9790/137*x^3-12671/137*x^2-1079/137*x+3942/137,-105/137*x^10+354/137*x^9+1093/137*x^8-4199/137*x^7-2906/137*x^6+15434/137*x^5+549/137*x^4-18573/137*x^3+96/137*x^2+6842/137*x+1578/137], x^11-5*x^10-6*x^9+60*x^8-25*x^7-228*x^6+193*x^5+312*x^4-257*x^3-194*x^2+94*x+54]; E[703,6]=[[x,446/711*x^17-1021/1422*x^16-22751/1422*x^15+24089/1422*x^14+117188/711*x^13-74561/474*x^12-139137/158*x^11+57674/79*x^10+3711733/1422*x^9-844333/474*x^8-6079051/1422*x^7+1579385/711*x^6+5209915/1422*x^5-1879565/1422*x^4-1013036/711*x^3+253724/711*x^2+131507/711*x-26998/711,-883/1422*x^17+850/711*x^16+10912/711*x^15-41437/1422*x^14-215773/1422*x^13+201347/711*x^12+1091779/1422*x^11-1995443/1422*x^10-501581/237*x^9+2683252/711*x^8+1493857/474*x^7-862701/158*x^6-1718968/711*x^5+5739647/1422*x^4+607999/711*x^3-964991/711*x^2-26125/237*x+112343/711,820/711*x^17-449/711*x^16-22445/711*x^15+11035/711*x^14+252637/711*x^13-109978/711*x^12-1510207/711*x^11+579212/711*x^10+1723078/237*x^9-1775090/711*x^8-3397708/237*x^7+365894/79*x^6+11087522/711*x^5-3646193/711*x^4-5951834/711*x^3+2173801/711*x^2+397064/237*x-489133/711,-431/711*x^17+286/711*x^16+11845/711*x^15-7238/711*x^14-134057/711*x^13+74825/711*x^12+807479/711*x^11-411160/711*x^10-310442/79*x^9+1313011/711*x^8+621871/79*x^7-832111/237*x^6-6229897/711*x^5+2738362/711*x^4+3456124/711*x^3-1556060/711*x^2-239066/237*x+333101/711,-799/474*x^17+2861/1422*x^16+21467/474*x^15-36230/711*x^14-236959/474*x^13+744821/1422*x^12+2085094/711*x^11-4017025/1422*x^10-14059915/1422*x^9+12309823/1422*x^8+13776881/711*x^7-21760243/1422*x^6-30284045/1422*x^5+3586450/237*x^4+8400319/711*x^3-598810/79*x^2-1757171/711*x+1024160/711,-2036/711*x^17+6113/1422*x^16+105233/1422*x^15-151315/1422*x^14-553082/711*x^13+1505491/1422*x^12+6102493/1422*x^11-3872479/711*x^10-6355871/474*x^9+22162313/1422*x^8+11380001/474*x^7-5932661/237*x^6-34052519/1422*x^5+31193165/1422*x^4+8613433/711*x^3-6831566/711*x^2-186359/79*x+1144889/711,-1,2387/1422*x^17-5213/1422*x^16-60685/1422*x^15+65609/711*x^14+625901/1422*x^13-444491/474*x^12-563867/237*x^11+2347331/474*x^10+10383167/1422*x^9-6926335/474*x^8-9244534/711*x^7+34447271/1422*x^6+18932051/1422*x^5-15430181/711*x^4-5168644/711*x^3+6708439/711*x^2+1117108/711*x-1082402/711,-697/1422*x^17+275/1422*x^16+22811/1422*x^15-6023/711*x^14-307207/1422*x^13+193519/1422*x^12+1099562/711*x^11-1543757/1422*x^10-3006325/474*x^9+6711569/1422*x^8+3548420/237*x^7-1783641/158*x^6-27607721/1422*x^5+10038421/711*x^4+8797030/711*x^3-5870168/711*x^2-676975/237*x+1217306/711], x^18-3*x^17-25*x^16+78*x^15+251*x^14-827*x^13-1294*x^12+4619*x^11+3615*x^10-14679*x^9-5160*x^8+26821*x^7+2497*x^6-27186*x^5+2136*x^4+13772*x^3-2914*x^2-2636*x+836]; E[703,7]=[[x,2,-x^3+x^2+4*x-1,x^3-2*x^2-4*x+7,-x^3+x^2+3*x-1,x^3-2*x^2-5*x+4,-x^3+3*x^2+4*x-7,1,4*x^3-6*x^2-16*x+16,-2*x^2+x+6], x^4-3*x^3-2*x^2+9*x-4]; E[703,8]=[[x,1/8*x^8+3/8*x^7-11/8*x^6-13/4*x^5+43/8*x^4+49/8*x^3-37/4*x^2-3/4*x+3,-3/8*x^8-7/8*x^7+31/8*x^6+8*x^5-101/8*x^4-149/8*x^3+16*x^2+35/4*x-7/2,1/4*x^8+3/4*x^7-11/4*x^6-15/2*x^5+39/4*x^4+81/4*x^3-25/2*x^2-27/2*x+1,x^8+5/2*x^7-19/2*x^6-45/2*x^5+25*x^4+101/2*x^3-41/2*x^2-23*x+2,-1/4*x^8-1/2*x^7+7/2*x^6+19/4*x^5-65/4*x^4-21/2*x^3+103/4*x^2+3*x-15/2,-5/8*x^8-15/8*x^7+47/8*x^6+69/4*x^5-127/8*x^4-317/8*x^3+61/4*x^2+63/4*x-4,-1,-5/4*x^8-3*x^7+13*x^6+109/4*x^5-165/4*x^4-61*x^3+181/4*x^2+25*x-17/2,-3/4*x^7-5/4*x^6+29/4*x^5+21/2*x^4-77/4*x^3-87/4*x^2+27/2*x+13/2], x^9+3*x^8-9*x^7-28*x^6+21*x^5+69*x^4-12*x^3-44*x^2-4*x+4]; E[703,9]=[[0,3,-2,-1,3,6,2,1,0,6], x-1]; E[713,1]=[[1,1,0,-3,-4,2,3,-4,1,-6], x-1]; E[713,2]=[[x,2*x-2,-2*x-1,-1,-2,0,4,-4*x+3,-1,2*x+4], x^2-x-1]; E[713,3]=[[x,-x^3-2*x^2+3*x+3,x^4+2*x^3-2*x^2-3*x-2,2*x^4+5*x^3-4*x^2-11*x-3,x^4+4*x^3+2*x^2-7*x-3,3*x^3+4*x^2-9*x-4,-x^4-2*x^3+x^2,-2*x^4-6*x^3+3*x^2+15*x,-1,-3*x^4-6*x^3+9*x^2+10*x-5], x^5+4*x^4+x^3-9*x^2-5*x+1]; E[713,4]=[[x,-136807/5819940*x^14+39952/1454985*x^13+93799/161665*x^12-133643/187740*x^11-2681048/484995*x^10+4576473/646660*x^9+10519909/415710*x^8-32556337/969990*x^7-21653069/387996*x^6+21027649/277140*x^5+41720483/831420*x^4-132316729/1939980*x^3-212327/23095*x^2+15327632/1454985*x+2696893/1939980,85837/2909970*x^14+48136/1454985*x^13-120938/161665*x^12-71257/93870*x^11+3608821/484995*x^10+2184557/323330*x^9-7601899/207855*x^8-14095598/484995*x^7+17773709/193998*x^6+8402771/138570*x^5-45082013/415710*x^4-50612531/969990*x^3+1161469/23095*x^2+15339536/1454985*x-4041973/969990,16019/387996*x^14-1223/96999*x^13-65153/64666*x^12+4231/12516*x^11+613283/64666*x^10-451733/129332*x^9-593746/13857*x^8+1132125/64666*x^7+12021243/129332*x^6-801985/18476*x^5-4482691/55428*x^4+6003455/129332*x^3+111411/9238*x^2-1093231/96999*x+278693/129332,-8129/415710*x^14+9043/207855*x^13+9446/23095*x^12-12751/13410*x^11-229802/69285*x^10+376341/46190*x^9+2739596/207855*x^8-2376134/69285*x^7-741595/27714*x^6+10035821/138570*x^5+10799707/415710*x^4-9635033/138570*x^3-201386/23095*x^2+4635743/207855*x+83381/138570,-36052/484995*x^14+55528/484995*x^13+286058/161665*x^12-39398/15645*x^11-2668002/161665*x^10+3483164/161665*x^9+5218433/69285*x^8-14517929/161665*x^7-5486480/32333*x^6+4276479/23095*x^5+11263253/69285*x^4-26585239/161665*x^3-888219/23095*x^2+16335923/484995*x+537993/161665,27583/831420*x^14+1789/415710*x^13-20046/23095*x^12+857/26820*x^11+1229089/138570*x^10-140367/92380*x^9-18544477/415710*x^8+845564/69285*x^7+6285857/55428*x^6-10663747/277140*x^5-108962159/831420*x^4+12992611/277140*x^3+1069991/23095*x^2-5616391/415710*x-162697/277140,1987/969990*x^14-13123/969990*x^13-10663/323330*x^12+4609/15645*x^11+23161/161665*x^10-771299/323330*x^9+37747/138570*x^8+2700569/323330*x^7-133264/32333*x^6-426039/46190*x^5+978596/69285*x^4-2931951/323330*x^3-956681/46190*x^2+13826737/969990*x+1048371/161665,-1,36913/484995*x^14-33877/484995*x^13-277742/161665*x^12+22157/15645*x^11+2419663/161665*x^10-1767156/161665*x^9-4307927/69285*x^8+6430836/161665*x^7+3893532/32333*x^6-1570506/23095*x^5-5637782/69285*x^4+7340671/161665*x^3-177264/23095*x^2-1214117/484995*x+685103/161665], x^15-x^14-24*x^13+23*x^12+225*x^11-207*x^10-1031*x^9+912*x^8+2343*x^7-1992*x^6-2324*x^5+1872*x^4+675*x^3-428*x^2-69*x+9]; 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E[731,3]=[[-2*x^5-7*x^4+3*x^3+22*x^2+6*x-6,x,x^5+4*x^4-13*x^2-8*x+5,3*x^5+10*x^4-6*x^3-32*x^2-7*x+7,-2*x^5-6*x^4+5*x^3+18*x^2+2*x-3,-2*x^5-7*x^4+3*x^3+24*x^2+9*x-11,-1,-4*x^5-14*x^4+5*x^3+42*x^2+16*x-12,-x^5-4*x^4+x^3+15*x^2+4*x-8,7*x^5+22*x^4-17*x^3-70*x^2-7*x+16], x^6+3*x^5-3*x^4-10*x^3+x^2+4*x-1]; 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x^19-5*x^18-30*x^17+179*x^16+318*x^15-2624*x^14-1061*x^13+20311*x^12-4812*x^11-89702*x^10+50281*x^9+230680*x^8-159654*x^7-344023*x^6+234519*x^5+280066*x^4-154817*x^3-98750*x^2+33639*x+2568]; E[737,1]=[[-2,2,-2,-2,1,-2,7,3,-7,-9], x-1]; E[737,2]=[[x,x-2,x-2,2*x-2,1,-3*x,-x-3,x+1,-1,-3*x+1], x^2-2]; E[737,3]=[[x,-27575/2721286*x^16-13959/2721286*x^15+421780/1360643*x^14+226336/1360643*x^13-5145829/1360643*x^12-5668067/2721286*x^11+64184009/2721286*x^10+18133909/1360643*x^9-108214772/1360643*x^8-129471301/2721286*x^7+378647651/2721286*x^6+255334209/2721286*x^5-285346173/2721286*x^4-118464833/1360643*x^3+18588852/1360643*x^2+26293787/1360643*x-116947/1360643,-79595/1360643*x^16-1558/1360643*x^15+2027846/1360643*x^14-122103/1360643*x^13-21015197/1360643*x^12+2362756/1360643*x^11+114156154/1360643*x^10-15446807/1360643*x^9-348529496/1360643*x^8+45126608/1360643*x^7+590962892/1360643*x^6-60356771/1360643*x^5-500950147/1360643*x^4+38093562/1360643*x^3+152317469/1360643*x^2-20978969/1360643*x-2813674/1360643,-436709/2721286*x^16+160039/1360643*x^15+5661340/1360643*x^14-7612317/2721286*x^13-118167911/2721286*x^12+67982097/2721286*x^11+637884591/2721286*x^10-280545071/2721286*x^9-1901012233/2721286*x^8+511831833/2721286*x^7+3061470609/2721286*x^6-123898893/1360643*x^5-2325621837/2721286*x^4-92799286/1360643*x^3+254834310/1360643*x^2+6083559/1360643*x-4393979/1360643,1,674298/1360643*x^16-218655/1360643*x^15-34735067/2721286*x^14+5710751/1360643*x^13+360933595/2721286*x^12-109960013/2721286*x^11-971918078/1360643*x^10+245265824/1360643*x^9+5792436367/2721286*x^8-1023601847/2721286*x^7-4686751954/1360643*x^6+435458634/1360643*x^5+7296219993/2721286*x^4-147221772/1360643*x^3-907207135/1360643*x^2+160330356/1360643*x+2832435/1360643,175081/1360643*x^16-189075/1360643*x^15-4992326/1360643*x^14+4011681/1360643*x^13+57220778/1360643*x^12-31430453/1360643*x^11-339144855/1360643*x^10+106173948/1360643*x^9+1108362283/1360643*x^8-108307302/1360643*x^7-1948104866/1360643*x^6-165271890/1360643*x^5+1598499322/1360643*x^4+321706256/1360643*x^3-369696706/1360643*x^2-25262969/1360643*x+7143603/1360643,2375247/5442572*x^16-285489/1360643*x^15-15575793/1360643*x^14+28337525/5442572*x^13+660294635/5442572*x^12-265676361/5442572*x^11-3634362175/5442572*x^10+1179424583/5442572*x^9+11095636931/5442572*x^8-2514466743/5442572*x^7-18446939141/5442572*x^6+570195646/1360643*x^5+14819445489/5442572*x^4-397616943/2721286*x^3-969791216/1360643*x^2+315882101/2721286*x+20041495/2721286,8611/2721286*x^16+50462/1360643*x^15-113948/1360643*x^14-2701341/2721286*x^13+2303893/2721286*x^12+29563433/2721286*x^11-9914489/2721286*x^10-170052715/2721286*x^9+6542363/2721286*x^8+547603833/2721286*x^7+85269403/2721286*x^6-480783675/1360643*x^5-258058191/2721286*x^4+401502117/1360643*x^3+110846743/1360643*x^2-101466197/1360643*x+1577562/1360643,-495327/2721286*x^16-170990/1360643*x^15+6000119/1360643*x^14+6407591/2721286*x^13-117423713/2721286*x^12-45411131/2721286*x^11+595875329/2721286*x^10+150927509/2721286*x^9-1671971695/2721286*x^8-231017089/2721286*x^7+2537860253/2721286*x^6+50612395/1360643*x^5-1837775421/2721286*x^4+59239305/1360643*x^3+208995628/1360643*x^2-66647148/1360643*x+3903540/1360643], 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E[737,4]=[[x,-3/13*x^11-5/13*x^10+45/13*x^9+59/13*x^8-250/13*x^7-232/13*x^6+613/13*x^5+343/13*x^4-621/13*x^3-147/13*x^2+193/13*x+12/13,-5/13*x^11-15/13*x^10+54/13*x^9+183/13*x^8-163/13*x^7-759/13*x^6+3/13*x^5+1202/13*x^4+480/13*x^3-551/13*x^2-21*x+40/13,11/13*x^11+29/13*x^10-134/13*x^9-357/13*x^8+542/13*x^7+1501/13*x^6-740/13*x^5-2443/13*x^4+9/13*x^3+1208/13*x^2+210/13*x-128/13,-1,2/13*x^11+11/13*x^10-x^9-138/13*x^8-36/13*x^7+603/13*x^6+391/13*x^5-83*x^4-714/13*x^3+706/13*x^2+225/13*x-122/13,14/13*x^11+31/13*x^10-180/13*x^9-374/13*x^8+808/13*x^7+1531/13*x^6-1450/13*x^5-2399/13*x^4+860/13*x^3+1086/13*x^2-131/13*x-53/13,9/13*x^11+18/13*x^10-121/13*x^9-206/13*x^8+591/13*x^7+768/13*x^6-96*x^5-987/13*x^4+1048/13*x^3+190/13*x^2-249/13*x+59/13,-19/13*x^11-46/13*x^10+18*x^9+557/13*x^8-984/13*x^7-2303/13*x^6+1570/13*x^5+283*x^4-666/13*x^3-1741/13*x^2-12/13*x+93/13,-23/13*x^11-73/13*x^10+254/13*x^9+903/13*x^8-829/13*x^7-3824/13*x^6+375/13*x^5+6261/13*x^4+1622/13*x^3-2986/13*x^2-999/13*x+105/13], 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E[737,5]=[[x,-22786/27669*x^14+117353/55338*x^13+471050/27669*x^12-2508073/55338*x^11-7145261/55338*x^10+10162456/27669*x^9+11800910/27669*x^8-25961013/18446*x^7-27316081/55338*x^6+70546519/27669*x^5-2078627/9223*x^4-101446331/55338*x^3+14710864/27669*x^2+9113714/27669*x-1067672/9223,684/9223*x^14-2188/9223*x^13-14906/9223*x^12+49601/9223*x^11+120581/9223*x^10-429750/9223*x^9-431747/9223*x^8+1769565/9223*x^7+570167/9223*x^6-3454563/9223*x^5+146548/9223*x^4+2697746/9223*x^3-512623/9223*x^2-543101/9223*x+115044/9223,11021/27669*x^14-29645/27669*x^13-226771/27669*x^12+643447/27669*x^11+1689386/27669*x^10-5310596/27669*x^9-5240740/27669*x^8+6921898/9223*x^7+4156102/27669*x^6-38389202/27669*x^5+2876898/9223*x^4+28079162/27669*x^3-11705774/27669*x^2-5177314/27669*x+806498/9223,-1,80333/55338*x^14-96475/27669*x^13-1675759/55338*x^12+4114069/55338*x^11+6443791/27669*x^10-16626640/27669*x^9-43681729/55338*x^8+42360523/18446*x^7+27412583/27669*x^6-114769648/27669*x^5+4173631/18446*x^4+82112407/27669*x^3-23648059/27669*x^2-14727959/27669*x+1789760/9223,-81178/27669*x^14+201532/27669*x^13+1686272/27669*x^12-4297415/27669*x^11-12893899/27669*x^10+34736338/27669*x^9+43316411/27669*x^8-44248498/9223*x^7-53203226/27669*x^6+239813635/27669*x^5-4937857/9223*x^4-171912295/27669*x^3+48039040/27669*x^2+30970907/27669*x-3571017/9223,-19977/18446*x^14+22324/9223*x^13+420865/18446*x^12-952513/18446*x^11-1641419/9223*x^10+3853297/9223*x^9+11403109/18446*x^8-29498543/18446*x^7-7688932/9223*x^6+26694785/9223*x^5-368255/18446*x^4-19116222/9223*x^3+4913401/9223*x^2+3444175/9223*x-1119577/9223,-5719/9223*x^14+14195/9223*x^13+121044/9223*x^12-307374/9223*x^11-950035/9223*x^10+2527931/9223*x^9+3325765/9223*x^8-9832787/9223*x^7-4520002/9223*x^6+18032357/9223*x^5-132891/9223*x^4-13022134/9223*x^3+2877797/9223*x^2+2364556/9223*x-642165/9223,8038/27669*x^14-24202/27669*x^13-156128/27669*x^12+497585/27669*x^11+1092553/27669*x^10-3846832/27669*x^9-3254597/27669*x^8+4663313/9223*x^7+3244880/27669*x^6-24195811/27669*x^5+562383/9223*x^4+17252176/27669*x^3-3158818/27669*x^2-3186677/27669*x+229347/9223], x^15-2*x^14-22*x^13+43*x^12+185*x^11-353*x^10-745*x^9+1391*x^8+1463*x^7-2685*x^6-1277*x^5+2284*x^4+457*x^3-718*x^2-58*x+72]; E[737,6]=[[x,x^7-2*x^6-7*x^5+13*x^4+5*x^3-6*x^2-2*x-2,-4*x^7+10*x^6+25*x^5-69*x^4+x^3+52*x^2-11*x-4,3*x^7-8*x^6-18*x^5+56*x^4-6*x^3-47*x^2+12*x+6,1,x^7-4*x^6-4*x^5+29*x^4-15*x^3-29*x^2+12*x+6,3*x^7-7*x^6-21*x^5+50*x^4+14*x^3-47*x^2+x+5,-7*x^7+20*x^6+40*x^5-140*x^4+27*x^3+115*x^2-38*x-16,8*x^7-24*x^6-41*x^5+165*x^4-63*x^3-117*x^2+62*x+5,-4*x^7+13*x^6+19*x^5-90*x^4+41*x^3+67*x^2-37*x-5], x^8-2*x^7-8*x^6+15*x^5+12*x^4-19*x^3-7*x^2+6*x+1]; E[767,1]=[[-1,-x^2+x+5,x,-1,-x-1,1,-x^2+3,x^2-2*x-6,3*x^2-x-14,x^2-2*x-6], x^3+x^2-7*x-9]; E[767,2]=[[x^3+2*x^2-2*x-2,-x^3-x^2+2*x,x,2*x^3+x^2-5*x,-x^3-3*x^2+x+4,1,x^3-4*x-1,-x^3+x^2+x-4,2*x^2+2*x-5,-3*x^3-x^2+7*x-3], x^4+x^3-3*x^2-x+1]; E[767,3]=[[100/139*x^9+615/139*x^8-73/139*x^7-6165/139*x^6-7268/139*x^5+10892/139*x^4+10928/139*x^3-9587/139*x^2-145/139*x+296/139,-106/139*x^9-638/139*x^8+158/139*x^7+6521/139*x^6+6909/139*x^5-12563/139*x^4-10316/139*x^3+11972/139*x^2-722/139*x-614/139,x,6/139*x^9+23/139*x^8-85/139*x^7-356/139*x^6+359/139*x^5+1671/139*x^4-612/139*x^3-2385/139*x^2+728/139*x+40/139,401/139*x^9+2487/139*x^8-283/139*x^7-25229/139*x^6-29545/139*x^5+46974/139*x^4+46529/139*x^3-42985/139*x^2-1339/139*x+1932/139,-1,-460/139*x^9-2829/139*x^8+447/139*x^7+28915/139*x^6+32988/139*x^5-55274/139*x^4-54272/139*x^3+49549/139*x^2+3169/139*x-2001/139,-396/139*x^9-2491/139*x^8+50/139*x^7+24886/139*x^6+31489/139*x^5-43288/139*x^4-50236/139*x^3+37731/139*x^2+6023/139*x-2223/139,-73/139*x^9-442/139*x^8+38/139*x^7+4285/139*x^6+5339/139*x^5-6500/139*x^4-7149/139*x^3+5735/139*x^2-610/139*x-533/139,-27/139*x^9-173/139*x^8+35/139*x^7+1880/139*x^6+1929/139*x^5-4392/139*x^4-3779/139*x^3+3991/139*x^2+616/139*x-597/139], x^10+6*x^9-2*x^8-63*x^7-61*x^6+134*x^5+96*x^4-132*x^3+13*x^2+7*x-1]; E[767,4]=[[x,x,x,2*x+1,-3*x-3,-1,-2*x-2,-1,-x-1,7], x^2+2*x-1]; 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x^20+2*x^19-94*x^18-145*x^17+3679*x^16+3686*x^15-77889*x^14-31965*x^13+960848*x^12-170343*x^11-6812398*x^10+4828640*x^9+25056784*x^8-28885904*x^7-37008736*x^6+56238784*x^5+17695232*x^4-37068288*x^3-4181504*x^2+7863296*x+1466368]; E[793,1]=[[1,0,2,-4,4,-1,-6,-2,-6,10], x-1]; 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x^16-3*x^15-20*x^14+63*x^13+148*x^12-507*x^11-487*x^10+1959*x^9+625*x^8-3706*x^7-35*x^6+3151*x^5-203*x^4-1134*x^3+22*x^2+123*x+13]; E[793,3]=[[x,43627/216585*x^14+288917/216585*x^13-17233/216585*x^12-3695777/216585*x^11-1728751/72195*x^10+3123640/43317*x^9+6825190/43317*x^8-23477776/216585*x^7-27885569/72195*x^6-177571/216585*x^5+5478814/14439*x^4+20537327/216585*x^3-22794557/216585*x^2-237028/14439*x+77963/24065,-27437/72195*x^14-179447/72195*x^13+11031/24065*x^12+2340092/72195*x^11+2955803/72195*x^10-2058413/14439*x^9-1328002/4813*x^8+5750062/24065*x^7+48900592/72195*x^6-4708159/72195*x^5-9462124/14439*x^4-9869062/72195*x^3+12199502/72195*x^2+424495/14439*x-97459/24065,2687/14439*x^14+17443/14439*x^13-4562/14439*x^12-230467/14439*x^11-91719/4813*x^10+1032208/14439*x^9+1905385/14439*x^8-1767470/14439*x^7-1583554/4813*x^6+484789/14439*x^5+1553389/4813*x^4+1078561/14439*x^3-1239961/14439*x^2-75138/4813*x+16061/4813,-12088/72195*x^14-90703/72195*x^13-12611/24065*x^12+1156168/72195*x^11+2075002/72195*x^10-966940/14439*x^9-862604/4813*x^8+2334163/24065*x^7+31773773/72195*x^6+672409/72195*x^5-6433988/14439*x^4-6263063/72195*x^3+9880168/72195*x^2+67160/14439*x-159536/24065,1,-7672/24065*x^14-54812/24065*x^13-9662/24065*x^12+713107/24065*x^11+1124058/24065*x^10-617194/4813*x^9-1456064/4813*x^8+4776226/24065*x^7+18074037/24065*x^6+58176/24065*x^5-3625849/4813*x^4-4583747/24065*x^3+5216287/24065*x^2+181084/4813*x-248577/24065,32954/43317*x^14+223603/43317*x^13-9908/43317*x^12-2922577/43317*x^11-446836/4813*x^10+12870625/43317*x^9+26646436/43317*x^8-21450824/43317*x^7-7311666/4813*x^6+5210956/43317*x^5+21679610/14439*x^4+13384717/43317*x^3-18160102/43317*x^2-1066982/14439*x+56650/4813,48377/72195*x^14+306542/72195*x^13-43821/24065*x^12-4135172/72195*x^11-4230908/72195*x^10+3904013/14439*x^9+2038871/4813*x^8-13062327/24065*x^7-77736382/72195*x^6+29319184/72195*x^5+15817993/14439*x^4-2105468/72195*x^3-24078332/72195*x^2+77996/14439*x+293314/24065,-84452/72195*x^14-544892/72195*x^13+52836/24065*x^12+7246937/72195*x^11+8470658/72195*x^10-6619127/14439*x^9-3961423/4813*x^8+20261722/24065*x^7+150589612/72195*x^6-30934219/72195*x^5-30665590/14439*x^4-16820782/72195*x^3+46365497/72195*x^2+889507/14439*x-704734/24065], x^15+8*x^14+8*x^13-89*x^12-231*x^11+242*x^10+1295*x^9+332*x^8-2847*x^7-2275*x^6+2304*x^5+2831*x^4-194*x^3-792*x^2-54*x+27]; E[793,4]=[[x,-x^6-x^5+8*x^4+9*x^3-11*x^2-13*x-3,x^6+x^5-8*x^4-9*x^3+11*x^2+12*x+2,-x^8+13*x^6+2*x^5-53*x^4-14*x^3+65*x^2+18*x-2,2*x^8+2*x^7-23*x^6-22*x^5+79*x^4+64*x^3-85*x^2-52*x-1,-1,x^8+x^7-10*x^6-9*x^5+27*x^4+15*x^3-25*x^2-3*x+5,-x^7-2*x^6+10*x^5+17*x^4-26*x^3-28*x^2+23*x+5,-x^8-x^7+11*x^6+9*x^5-35*x^4-15*x^3+36*x^2-2*x-4,-x^8-2*x^7+11*x^6+21*x^5-34*x^4-59*x^3+30*x^2+45*x+3], x^9+3*x^8-9*x^7-32*x^6+15*x^5+94*x^4+13*x^3-85*x^2-29*x+1]; E[793,5]=[[x,-x^3-x^2+5*x,-x^3-x^2+5*x-1,x^3+x^2-5*x-1,2*x^3+2*x^2-11*x-1,-1,-2*x^3-2*x^2+9*x-2,x^3+x^2-6*x-1,x^2+3*x-1,4*x^3+4*x^2-17*x-2], x^4+x^3-5*x^2-x+1]; E[793,6]=[[x,-178/58147*x^15-355/58147*x^14+633/58147*x^13+27103/58147*x^12+549/58147*x^11-391397/58147*x^10+127520/58147*x^9+2325796/58147*x^8-1226092/58147*x^7-6523673/58147*x^6+3859081/58147*x^5+8385810/58147*x^4-4408417/58147*x^3-4213487/58147*x^2+1496616/58147*x+444955/58147,1462/58147*x^15-17991/58147*x^14+18321/58147*x^13+306593/58147*x^12-608846/58147*x^11-1959697/58147*x^10+4715703/58147*x^9+5827150/58147*x^8-15859156/58147*x^7-8443784/58147*x^6+24662973/58147*x^5+6790178/58147*x^4-16600124/58147*x^3-3501094/58147*x^2+3516367/58147*x+774995/58147,16923/58147*x^15-69803/58147*x^14-252589/58147*x^13+1278251/58147*x^12+1185552/58147*x^11-9045945/58147*x^10-798115/58147*x^9+31093111/58147*x^8-8281163/58147*x^7-53935835/58147*x^6+21817177/58147*x^5+45424794/58147*x^4-19604397/58147*x^3-15495587/58147*x^2+5885106/58147*x+1024460/58147,32307/58147*x^15-139082/58147*x^14-492845/58147*x^13+2610842/58147*x^12+2429751/58147*x^11-19118368/58147*x^10-2386401/58147*x^9+68977588/58147*x^8-14587768/58147*x^7-128243920/58147*x^6+44294501/58147*x^5+118534943/58147*x^4-45068033/58147*x^3-45908510/58147*x^2+15726670/58147*x+3582891/58147,1,44340/58147*x^15-184664/58147*x^14-679044/58147*x^13+3439364/58147*x^12+3384077/58147*x^11-24926176/58147*x^10-3631374/58147*x^9+88667006/58147*x^8-18719230/58147*x^7-161559341/58147*x^6+57982830/58147*x^5+145138127/58147*x^4-57991253/58147*x^3-54212315/58147*x^2+19309814/58147*x+4196229/58147,12386/58147*x^15-47818/58147*x^14-187781/58147*x^13+869180/58147*x^12+909137/58147*x^11-6093610/58147*x^10-779193/58147*x^9+20750604/58147*x^8-5804206/58147*x^7-35982654/58147*x^6+16439274/58147*x^5+31508848/58147*x^4-15665371/58147*x^3-12479830/58147*x^2+4941534/58147*x+1375050/58147,-17383/58147*x^15+83259/58147*x^14+223518/58147*x^13-1521158/58147*x^12-561503/58147*x^11+10777832/58147*x^10-3826594/58147*x^9-37417631/58147*x^8+24538282/58147*x^7+67003663/58147*x^6-50271598/58147*x^5-61150614/58147*x^4+42980498/58147*x^3+24544688/58147*x^2-12831482/58147*x-1975055/58147,8499/58147*x^15-27150/58147*x^14-151418/58147*x^13+529045/58147*x^12+998546/58147*x^11-4103230/58147*x^10-2751476/58147*x^9+16093743/58147*x^8+1339521/58147*x^7-33410563/58147*x^6+7735563/58147*x^5+34805943/58147*x^4-13124560/58147*x^3-15173345/58147*x^2+5705779/58147*x+1381345/58147], x^16-5*x^15-12*x^14+91*x^13+14*x^12-637*x^11+375*x^10+2141*x^9-2071*x^8-3516*x^7+4367*x^6+2507*x^5-4115*x^4-320*x^3+1504*x^2-249*x-77]; E[799,1]=[[-1,2,4,-2,0,2,1,4,-4,8], x-1]; E[799,2]=[[x-1,-2*x-1,x,2*x,-3,-2*x+3,1,3*x+6,-x-3,-2*x-6], x^2+x-1]; 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E[913,3]=[[x,-240/5783*x^11+1251/5783*x^10-14/5783*x^9-13846/5783*x^8+33246/5783*x^7+27451/5783*x^6-193501/5783*x^5+96400/5783*x^4+288824/5783*x^3-205043/5783*x^2-65169/5783*x+36437/5783,-1691/5783*x^11+6718/5783*x^10+18166/5783*x^9-94135/5783*x^8-28447/5783*x^7+415892/5783*x^6-178415/5783*x^5-585331/5783*x^4+380875/5783*x^3+164686/5783*x^2-109949/5783*x-2759/5783,-1171/11566*x^11+6899/11566*x^10+2775/11566*x^9-89195/11566*x^8+59637/5783*x^7+163268/5783*x^6-373546/5783*x^5-196621/11566*x^4+1169997/11566*x^3-265251/11566*x^2-179551/5783*x+75399/11566,-1,-2307/11566*x^11+13977/11566*x^10+5793/11566*x^9-180949/11566*x^8+112874/5783*x^7+330980/5783*x^6-697140/5783*x^5-368747/11566*x^4+2059807/11566*x^3-687945/11566*x^2-240678/5783*x+190423/11566,3131/5783*x^11-8441/5783*x^10-46997/5783*x^9+125164/5783*x^8+239564/5783*x^7-615296/5783*x^6-493790/5783*x^5+1111484/5783*x^4+448050/5783*x^3-623064/5783*x^2-100469/5783*x+79070/5783,-412/5783*x^11+3015/5783*x^10+3253/5783*x^9-44395/5783*x^8+4447/5783*x^7+213771/5783*x^6-62207/5783*x^5-362694/5783*x^4+38572/5783*x^3+166841/5783*x^2+39352/5783*x-16195/5783,603/5783*x^11-3360/5783*x^10-1266/5783*x^9+43318/5783*x^8-66037/5783*x^7-158824/5783*x^6+417715/5783*x^5+104775/5783*x^4-667262/5783*x^3+94385/5783*x^2+176532/5783*x+5245/5783,1004/5783*x^11-2631/5783*x^10-15170/5783*x^9+38453/5783*x^8+78940/5783*x^7-189341/5783*x^6-165631/5783*x^5+358155/5783*x^4+134180/5783*x^3-230501/5783*x^2-31273/5783*x+23857/5783], 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x^17-9*x^16+15*x^15+91*x^14-345*x^13-66*x^12+1859*x^11-1804*x^10-3615*x^9+6684*x^8+1122*x^7-8208*x^6+3278*x^5+2853*x^4-2196*x^3+358*x^2-5*x-1]; E[913,6]=[[x,-x^4+x^3+4*x^2-2*x-1,-2*x^4+2*x^3+9*x^2-4*x-4,-x^2+x+3,-1,-x^4+7*x^2+2*x-8,-x^4+2*x^3+3*x^2-4*x,-2*x^4+4*x^3+8*x^2-10*x-5,x^4-5*x^2-x+3,2*x^4-3*x^3-9*x^2+9*x+4], x^5-x^4-5*x^3+3*x^2+4*x-1]; E[913,7]=[[x,-236/1473*x^14-1994/1473*x^13-943/491*x^12+18086/1473*x^11+17994/491*x^10-11064/491*x^9-80350/491*x^8-27236/491*x^7+412579/1473*x^6+87454/491*x^5-98850/491*x^4-68963/491*x^3+77810/1473*x^2+14823/491*x-3625/1473,327/491*x^14+2301/491*x^13+797/491*x^12-26046/491*x^11-41355/491*x^10+99468/491*x^9+221862/491*x^8-155080/491*x^7-456833/491*x^6+118506/491*x^5+419615/491*x^4-58819/491*x^3-158024/491*x^2+13118/491*x+19526/491,-1804/1473*x^14-3838/491*x^13+1122/491*x^12+146065/1473*x^11+148043/1473*x^10-679835/1473*x^9-979333/1473*x^8+1493476/1473*x^7+2362423/1473*x^6-1736215/1473*x^5-2522393/1473*x^4+1039085/1473*x^3+1107572/1473*x^2-213641/1473*x-54428/491,1,1699/1473*x^14+3871/491*x^13+566/491*x^12-137107/1473*x^11-190373/1473*x^10+569597/1473*x^9+1085434/1473*x^8-1062988/1473*x^7-2370394/1473*x^6+1079881/1473*x^5+2338811/1473*x^4-627236/1473*x^3-966635/1473*x^2+124193/1473*x+44422/491,1879/1473*x^14+4095/491*x^13-504/491*x^12-151201/1473*x^11-174623/1473*x^10+669986/1473*x^9+1077571/1473*x^8-1364749/1473*x^7-2456683/1473*x^6+1458214/1473*x^5+2441411/1473*x^4-821711/1473*x^3-966038/1473*x^2+155063/1473*x+42847/491,-1233/491*x^14-24317/1473*x^13+1121/491*x^12+101012/491*x^11+341888/1473*x^10-1376846/1473*x^9-2138824/1473*x^8+2950744/1473*x^7+4980230/1473*x^6-3428092/1473*x^5-5149193/1473*x^4+2119982/1473*x^3+2189302/1473*x^2-444116/1473*x-323320/1473,-1781/1473*x^14-11690/1473*x^13+467/491*x^12+144215/1473*x^11+55174/491*x^10-214368/491*x^9-339728/491*x^8+443704/491*x^7+2320456/1473*x^6-488164/491*x^5-768506/491*x^4+280536/491*x^3+897443/1473*x^2-51650/491*x-113683/1473,826/491*x^14+16027/1473*x^13-1637/491*x^12-69684/491*x^11-209854/1473*x^10+1010875/1473*x^9+1440023/1473*x^8-2322764/1473*x^7-3609082/1473*x^6+2784170/1473*x^5+3948475/1473*x^4-1682752/1473*x^3-1738121/1473*x^2+336106/1473*x+252875/1473], 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E[923,1]=[[x,-3947/35158*x^15-17897/35158*x^14+39205/35158*x^13+128875/17579*x^12-30460/17579*x^11-681182/17579*x^10-193312/17579*x^9+3371103/35158*x^8+636583/17579*x^7-4140801/35158*x^6-418525/17579*x^5+1215415/17579*x^4-242095/17579*x^3-285472/17579*x^2+155319/17579*x-2743/35158,-1115/17579*x^15-2241/17579*x^14+53723/35158*x^13+116021/35158*x^12-229311/17579*x^11-1053791/35158*x^10+869803/17579*x^9+4332813/35158*x^8-1434551/17579*x^7-4201998/17579*x^6+635911/17579*x^5+6989281/35158*x^4+476770/17579*x^3-1736881/35158*x^2-141923/17579*x+60843/35158,-7673/35158*x^15-11203/17579*x^14+67117/17579*x^13+196501/17579*x^12-917091/35158*x^11-1330757/17579*x^10+3128139/35158*x^9+8801595/35158*x^8-2809451/17579*x^7-14726083/35158*x^6+5073547/35158*x^5+5812269/17579*x^4-1870961/35158*x^3-1762072/17579*x^2+195789/35158*x+208947/35158,5643/35158*x^15+12395/17579*x^14-32535/17579*x^13-192607/17579*x^12+190589/35158*x^11+1145427/17579*x^10+245511/35158*x^9-6768441/35158*x^8-1042952/17579*x^7+10695979/35158*x^6+3613225/35158*x^5-4376770/17579*x^4-2449267/35158*x^3+1515561/17579*x^2+502971/35158*x-208505/35158,-1,-6770/17579*x^15-64027/35158*x^14+60066/17579*x^13+912797/35158*x^12+46685/35158*x^11-4685939/35158*x^10-3072941/35158*x^9+10718175/35158*x^8+5062716/17579*x^7-5371017/17579*x^6-12311491/35158*x^5+3803641/35158*x^4+5464641/35158*x^3-450593/35158*x^2-798061/35158*x-12033/35158,-112/17579*x^15+374/17579*x^14+8723/35158*x^13-6051/35158*x^12-46872/17579*x^11-14835/35158*x^10+195225/17579*x^9+246049/35158*x^8-237543/17579*x^7-342009/17579*x^6-425624/17579*x^5+512351/35158*x^4+1133532/17579*x^3+57497/35158*x^2-535493/17579*x-42747/35158,2639/17579*x^15+10964/17579*x^14-63805/35158*x^13-333155/35158*x^12+111208/17579*x^11+1860245/35158*x^10-26153/17579*x^9-4677967/35158*x^8-446773/17579*x^7+2430011/17579*x^6+544895/17579*x^5-570111/35158*x^4-54689/17579*x^3-1421793/35158*x^2-29438/17579*x+276599/35158,-16033/17579*x^15-101987/35158*x^14+248213/17579*x^13+1638953/35158*x^12-2942537/35158*x^11-10057907/35158*x^10+8640321/35158*x^9+30046123/35158*x^8-6643462/17579*x^7-22724582/17579*x^6+9618181/35158*x^5+31810277/35158*x^4-1770905/35158*x^3-7413727/35158*x^2-198271/35158*x+98791/35158], 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